Split (1)

train · 42.2k rows

Context stringlengths 285 157k	file_name stringlengths 21 79	start int64 14 3.67k	end int64 18 3.69k	theorem stringlengths 25 2.71k	proof stringlengths 5 10.6k
/- Copyright (c) 2018 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mitchell Rowett, Scott Morrison, Johan Commelin, Mario Carneiro, Michael Howes -/ import Mathlib.Algebra.Group.Subgroup.Basic import Mathlib.Deprecated.Submonoid #align_import deprecated.subgroup from "leanprover-community/mathlib"@"f93c11933efbc3c2f0299e47b8ff83e9b539cbf6" /-! # Unbundled subgroups (deprecated) This file is deprecated, and is no longer imported by anything in mathlib other than other deprecated files, and test files. You should not need to import it. This file defines unbundled multiplicative and additive subgroups. Instead of using this file, please use `Subgroup G` and `AddSubgroup A`, defined in `Mathlib.Algebra.Group.Subgroup.Basic`. ## Main definitions `IsAddSubgroup (S : Set A)` : the predicate that `S` is the underlying subset of an additive subgroup of `A`. The bundled variant `AddSubgroup A` should be used in preference to this. `IsSubgroup (S : Set G)` : the predicate that `S` is the underlying subset of a subgroup of `G`. The bundled variant `Subgroup G` should be used in preference to this. ## Tags subgroup, subgroups, IsSubgroup -/ open Set Function variable {G : Type} {H : Type} {A : Type} {a a₁ a₂ b c : G} section Group variable [Group G] [AddGroup A] /-- `s` is an additive subgroup: a set containing 0 and closed under addition and negation. -/ structure IsAddSubgroup (s : Set A) extends IsAddSubmonoid s : Prop where /-- The proposition that `s` is closed under negation. -/ neg_mem {a} : a ∈ s → -a ∈ s #align is_add_subgroup IsAddSubgroup /-- `s` is a subgroup: a set containing 1 and closed under multiplication and inverse. -/ @[to_additive] structure IsSubgroup (s : Set G) extends IsSubmonoid s : Prop where /-- The proposition that `s` is closed under inverse. -/ inv_mem {a} : a ∈ s → a⁻¹ ∈ s #align is_subgroup IsSubgroup @[to_additive] theorem IsSubgroup.div_mem {s : Set G} (hs : IsSubgroup s) {x y : G} (hx : x ∈ s) (hy : y ∈ s) : x / y ∈ s := by simpa only [div_eq_mul_inv] using hs.mul_mem hx (hs.inv_mem hy) #align is_subgroup.div_mem IsSubgroup.div_mem #align is_add_subgroup.sub_mem IsAddSubgroup.sub_mem theorem Additive.isAddSubgroup {s : Set G} (hs : IsSubgroup s) : @IsAddSubgroup (Additive G) _ s := @IsAddSubgroup.mk (Additive G) _ _ (Additive.isAddSubmonoid hs.toIsSubmonoid) hs.inv_mem #align additive.is_add_subgroup Additive.isAddSubgroup theorem Additive.isAddSubgroup_iff {s : Set G} : @IsAddSubgroup (Additive G) _ s ↔ IsSubgroup s := ⟨by rintro ⟨⟨h₁, h₂⟩, h₃⟩; exact @IsSubgroup.mk G _ _ ⟨h₁, @h₂⟩ @h₃, fun h => Additive.isAddSubgroup h⟩ #align additive.is_add_subgroup_iff Additive.isAddSubgroup_iff theorem Multiplicative.isSubgroup {s : Set A} (hs : IsAddSubgroup s) : @IsSubgroup (Multiplicative A) _ s := @IsSubgroup.mk (Multiplicative A) _ _ (Multiplicative.isSubmonoid hs.toIsAddSubmonoid) hs.neg_mem #align multiplicative.is_subgroup Multiplicative.isSubgroup theorem Multiplicative.isSubgroup_iff {s : Set A} : @IsSubgroup (Multiplicative A) _ s ↔ IsAddSubgroup s := ⟨by rintro ⟨⟨h₁, h₂⟩, h₃⟩; exact @IsAddSubgroup.mk A _ _ ⟨h₁, @h₂⟩ @h₃, fun h => Multiplicative.isSubgroup h⟩ #align multiplicative.is_subgroup_iff Multiplicative.isSubgroup_iff @[to_additive of_add_neg] theorem IsSubgroup.of_div (s : Set G) (one_mem : (1 : G) ∈ s) (div_mem : ∀ {a b : G}, a ∈ s → b ∈ s → a b⁻¹ ∈ s) : IsSubgroup s := have inv_mem : ∀ a, a ∈ s → a⁻¹ ∈ s := fun a ha => by have : 1 * a⁻¹ ∈ s := div_mem one_mem ha convert this using 1 rw [one_mul] { inv_mem := inv_mem _ mul_mem := fun {a b} ha hb => by have : a * b⁻¹⁻¹ ∈ s := div_mem ha (inv_mem b hb) convert this rw [inv_inv] one_mem } #align is_subgroup.of_div IsSubgroup.of_div #align is_add_subgroup.of_add_neg IsAddSubgroup.of_add_neg theorem IsAddSubgroup.of_sub (s : Set A) (zero_mem : (0 : A) ∈ s) (sub_mem : ∀ {a b : A}, a ∈ s → b ∈ s → a - b ∈ s) : IsAddSubgroup s := IsAddSubgroup.of_add_neg s zero_mem fun {x y} hx hy => by simpa only [sub_eq_add_neg] using sub_mem hx hy #align is_add_subgroup.of_sub IsAddSubgroup.of_sub @[to_additive] theorem IsSubgroup.inter {s₁ s₂ : Set G} (hs₁ : IsSubgroup s₁) (hs₂ : IsSubgroup s₂) : IsSubgroup (s₁ ∩ s₂) := { IsSubmonoid.inter hs₁.toIsSubmonoid hs₂.toIsSubmonoid with inv_mem := fun hx => ⟨hs₁.inv_mem hx.1, hs₂.inv_mem hx.2⟩ } #align is_subgroup.inter IsSubgroup.inter #align is_add_subgroup.inter IsAddSubgroup.inter @[to_additive] theorem IsSubgroup.iInter {ι : Sort} {s : ι → Set G} (hs : ∀ y : ι, IsSubgroup (s y)) : IsSubgroup (Set.iInter s) := { IsSubmonoid.iInter fun y => (hs y).toIsSubmonoid with inv_mem := fun h => Set.mem_iInter.2 fun y => IsSubgroup.inv_mem (hs _) (Set.mem_iInter.1 h y) } #align is_subgroup.Inter IsSubgroup.iInter #align is_add_subgroup.Inter IsAddSubgroup.iInter @[to_additive] theorem isSubgroup_iUnion_of_directed {ι : Type} [Nonempty ι] {s : ι → Set G} (hs : ∀ i, IsSubgroup (s i)) (directed : ∀ i j, ∃ k, s i ⊆ s k ∧ s j ⊆ s k) : IsSubgroup (⋃ i, s i) := { inv_mem := fun ha => let ⟨i, hi⟩ := Set.mem_iUnion.1 ha Set.mem_iUnion.2 ⟨i, (hs i).inv_mem hi⟩ toIsSubmonoid := isSubmonoid_iUnion_of_directed (fun i => (hs i).toIsSubmonoid) directed } #align is_subgroup_Union_of_directed isSubgroup_iUnion_of_directed #align is_add_subgroup_Union_of_directed isAddSubgroup_iUnion_of_directed end Group namespace IsSubgroup open IsSubmonoid variable [Group G] {s : Set G} (hs : IsSubgroup s) @[to_additive] theorem inv_mem_iff : a⁻¹ ∈ s ↔ a ∈ s := ⟨fun h => by simpa using hs.inv_mem h, inv_mem hs⟩ #align is_subgroup.inv_mem_iff IsSubgroup.inv_mem_iff #align is_add_subgroup.neg_mem_iff IsAddSubgroup.neg_mem_iff @[to_additive] theorem mul_mem_cancel_right (h : a ∈ s) : b * a ∈ s ↔ b ∈ s := ⟨fun hba => by simpa using hs.mul_mem hba (hs.inv_mem h), fun hb => hs.mul_mem hb h⟩ #align is_subgroup.mul_mem_cancel_right IsSubgroup.mul_mem_cancel_right #align is_add_subgroup.add_mem_cancel_right IsAddSubgroup.add_mem_cancel_right @[to_additive] theorem mul_mem_cancel_left (h : a ∈ s) : a * b ∈ s ↔ b ∈ s := ⟨fun hab => by simpa using hs.mul_mem (hs.inv_mem h) hab, hs.mul_mem h⟩ #align is_subgroup.mul_mem_cancel_left IsSubgroup.mul_mem_cancel_left #align is_add_subgroup.add_mem_cancel_left IsAddSubgroup.add_mem_cancel_left end IsSubgroup /-- `IsNormalAddSubgroup (s : Set A)` expresses the fact that `s` is a normal additive subgroup of the additive group `A`. Important: the preferred way to say this in Lean is via bundled subgroups `S : AddSubgroup A` and `hs : S.normal`, and not via this structure. -/ structure IsNormalAddSubgroup [AddGroup A] (s : Set A) extends IsAddSubgroup s : Prop where /-- The proposition that `s` is closed under (additive) conjugation. -/ normal : ∀ n ∈ s, ∀ g : A, g + n + -g ∈ s #align is_normal_add_subgroup IsNormalAddSubgroup /-- `IsNormalSubgroup (s : Set G)` expresses the fact that `s` is a normal subgroup of the group `G`. Important: the preferred way to say this in Lean is via bundled subgroups `S : Subgroup G` and not via this structure. -/ @[to_additive] structure IsNormalSubgroup [Group G] (s : Set G) extends IsSubgroup s : Prop where /-- The proposition that `s` is closed under conjugation. -/ normal : ∀ n ∈ s, ∀ g : G, g * n * g⁻¹ ∈ s #align is_normal_subgroup IsNormalSubgroup @[to_additive] theorem isNormalSubgroup_of_commGroup [CommGroup G] {s : Set G} (hs : IsSubgroup s) : IsNormalSubgroup s := { hs with normal := fun n hn g => by rwa [mul_right_comm, mul_right_inv, one_mul] } #align is_normal_subgroup_of_comm_group isNormalSubgroup_of_commGroup #align is_normal_add_subgroup_of_add_comm_group isNormalAddSubgroup_of_addCommGroup theorem Additive.isNormalAddSubgroup [Group G] {s : Set G} (hs : IsNormalSubgroup s) : @IsNormalAddSubgroup (Additive G) _ s := @IsNormalAddSubgroup.mk (Additive G) _ _ (Additive.isAddSubgroup hs.toIsSubgroup) (@IsNormalSubgroup.normal _ ‹Group (Additive G)› _ hs) -- Porting note: Lean needs help synthesising #align additive.is_normal_add_subgroup Additive.isNormalAddSubgroup theorem Additive.isNormalAddSubgroup_iff [Group G] {s : Set G} : @IsNormalAddSubgroup (Additive G) _ s ↔ IsNormalSubgroup s := ⟨by rintro ⟨h₁, h₂⟩; exact @IsNormalSubgroup.mk G _ _ (Additive.isAddSubgroup_iff.1 h₁) @h₂, fun h => Additive.isNormalAddSubgroup h⟩ #align additive.is_normal_add_subgroup_iff Additive.isNormalAddSubgroup_iff theorem Multiplicative.isNormalSubgroup [AddGroup A] {s : Set A} (hs : IsNormalAddSubgroup s) : @IsNormalSubgroup (Multiplicative A) _ s := @IsNormalSubgroup.mk (Multiplicative A) _ _ (Multiplicative.isSubgroup hs.toIsAddSubgroup) (@IsNormalAddSubgroup.normal _ ‹AddGroup (Multiplicative A)› _ hs) #align multiplicative.is_normal_subgroup Multiplicative.isNormalSubgroup theorem Multiplicative.isNormalSubgroup_iff [AddGroup A] {s : Set A} : @IsNormalSubgroup (Multiplicative A) _ s ↔ IsNormalAddSubgroup s := ⟨by rintro ⟨h₁, h₂⟩; exact @IsNormalAddSubgroup.mk A _ _ (Multiplicative.isSubgroup_iff.1 h₁) @h₂, fun h => Multiplicative.isNormalSubgroup h⟩ #align multiplicative.is_normal_subgroup_iff Multiplicative.isNormalSubgroup_iff namespace IsSubgroup variable [Group G] -- Normal subgroup properties @[to_additive]	Mathlib/Deprecated/Subgroup.lean	217	220	theorem mem_norm_comm {s : Set G} (hs : IsNormalSubgroup s) {a b : G} (hab : a * b ∈ s) : b * a ∈ s := by	have h : a⁻¹ * (a * b) * a⁻¹⁻¹ ∈ s := hs.normal (a * b) hab a⁻¹ simp at h; exact h
/- Copyright (c) 2021 Arthur Paulino. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Arthur Paulino, Kyle Miller -/ import Mathlib.Combinatorics.SimpleGraph.Clique import Mathlib.Data.ENat.Lattice import Mathlib.Data.Nat.Lattice import Mathlib.Data.Setoid.Partition import Mathlib.Order.Antichain #align_import combinatorics.simple_graph.coloring from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" /-! # Graph Coloring This module defines colorings of simple graphs (also known as proper colorings in the literature). A graph coloring is the attribution of "colors" to all of its vertices such that adjacent vertices have different colors. A coloring can be represented as a homomorphism into a complete graph, whose vertices represent the colors. ## Main definitions * `G.Coloring α` is the type of `α`-colorings of a simple graph `G`, with `α` being the set of available colors. The type is defined to be homomorphisms from `G` into the complete graph on `α`, and colorings have a coercion to `V → α`. * `G.Colorable n` is the proposition that `G` is `n`-colorable, which is whether there exists a coloring with at most n colors. * `G.chromaticNumber` is the minimal `n` such that `G` is `n`-colorable, or `⊤` if it cannot be colored with finitely many colors. (Cardinal-valued chromatic numbers are more niche, so we stick to `ℕ∞`.) We write `G.chromaticNumber ≠ ⊤` to mean a graph is colorable with finitely many colors. * `C.colorClass c` is the set of vertices colored by `c : α` in the coloring `C : G.Coloring α`. * `C.colorClasses` is the set containing all color classes. ## Todo: * Gather material from: * https://github.com/leanprover-community/mathlib/blob/simple_graph_matching/src/combinatorics/simple_graph/coloring.lean * https://github.com/kmill/lean-graphcoloring/blob/master/src/graph.lean * Trees * Planar graphs * Chromatic polynomials * develop API for partial colorings, likely as colorings of subgraphs (`H.coe.Coloring α`) -/ open Fintype Function universe u v namespace SimpleGraph variable {V : Type u} (G : SimpleGraph V) {n : ℕ} /-- An `α`-coloring of a simple graph `G` is a homomorphism of `G` into the complete graph on `α`. This is also known as a proper coloring. -/ abbrev Coloring (α : Type v) := G →g (⊤ : SimpleGraph α) #align simple_graph.coloring SimpleGraph.Coloring variable {G} {α β : Type} (C : G.Coloring α) theorem Coloring.valid {v w : V} (h : G.Adj v w) : C v ≠ C w := C.map_rel h #align simple_graph.coloring.valid SimpleGraph.Coloring.valid /-- Construct a term of `SimpleGraph.Coloring` using a function that assigns vertices to colors and a proof that it is as proper coloring. (Note: this is a definitionally the constructor for `SimpleGraph.Hom`, but with a syntactically better proper coloring hypothesis.) -/ @[match_pattern] def Coloring.mk (color : V → α) (valid : ∀ {v w : V}, G.Adj v w → color v ≠ color w) : G.Coloring α := ⟨color, @valid⟩ #align simple_graph.coloring.mk SimpleGraph.Coloring.mk /-- The color class of a given color. -/ def Coloring.colorClass (c : α) : Set V := { v : V \| C v = c } #align simple_graph.coloring.color_class SimpleGraph.Coloring.colorClass /-- The set containing all color classes. -/ def Coloring.colorClasses : Set (Set V) := (Setoid.ker C).classes #align simple_graph.coloring.color_classes SimpleGraph.Coloring.colorClasses theorem Coloring.mem_colorClass (v : V) : v ∈ C.colorClass (C v) := rfl #align simple_graph.coloring.mem_color_class SimpleGraph.Coloring.mem_colorClass theorem Coloring.colorClasses_isPartition : Setoid.IsPartition C.colorClasses := Setoid.isPartition_classes (Setoid.ker C) #align simple_graph.coloring.color_classes_is_partition SimpleGraph.Coloring.colorClasses_isPartition theorem Coloring.mem_colorClasses {v : V} : C.colorClass (C v) ∈ C.colorClasses := ⟨v, rfl⟩ #align simple_graph.coloring.mem_color_classes SimpleGraph.Coloring.mem_colorClasses theorem Coloring.colorClasses_finite [Finite α] : C.colorClasses.Finite := Setoid.finite_classes_ker _ #align simple_graph.coloring.color_classes_finite SimpleGraph.Coloring.colorClasses_finite theorem Coloring.card_colorClasses_le [Fintype α] [Fintype C.colorClasses] : Fintype.card C.colorClasses ≤ Fintype.card α := by simp [colorClasses] -- Porting note: brute force instance declaration `[Fintype (Setoid.classes (Setoid.ker C))]` haveI : Fintype (Setoid.classes (Setoid.ker C)) := by assumption convert Setoid.card_classes_ker_le C #align simple_graph.coloring.card_color_classes_le SimpleGraph.Coloring.card_colorClasses_le theorem Coloring.not_adj_of_mem_colorClass {c : α} {v w : V} (hv : v ∈ C.colorClass c) (hw : w ∈ C.colorClass c) : ¬G.Adj v w := fun h => C.valid h (Eq.trans hv (Eq.symm hw)) #align simple_graph.coloring.not_adj_of_mem_color_class SimpleGraph.Coloring.not_adj_of_mem_colorClass theorem Coloring.color_classes_independent (c : α) : IsAntichain G.Adj (C.colorClass c) := fun _ hv _ hw _ => C.not_adj_of_mem_colorClass hv hw #align simple_graph.coloring.color_classes_independent SimpleGraph.Coloring.color_classes_independent -- TODO make this computable noncomputable instance [Fintype V] [Fintype α] : Fintype (Coloring G α) := by classical change Fintype (RelHom G.Adj (⊤ : SimpleGraph α).Adj) apply Fintype.ofInjective _ RelHom.coe_fn_injective variable (G) /-- Whether a graph can be colored by at most `n` colors. -/ def Colorable (n : ℕ) : Prop := Nonempty (G.Coloring (Fin n)) #align simple_graph.colorable SimpleGraph.Colorable /-- The coloring of an empty graph. -/ def coloringOfIsEmpty [IsEmpty V] : G.Coloring α := Coloring.mk isEmptyElim fun {v} => isEmptyElim v #align simple_graph.coloring_of_is_empty SimpleGraph.coloringOfIsEmpty theorem colorable_of_isEmpty [IsEmpty V] (n : ℕ) : G.Colorable n := ⟨G.coloringOfIsEmpty⟩ #align simple_graph.colorable_of_is_empty SimpleGraph.colorable_of_isEmpty theorem isEmpty_of_colorable_zero (h : G.Colorable 0) : IsEmpty V := by constructor intro v obtain ⟨i, hi⟩ := h.some v exact Nat.not_lt_zero _ hi #align simple_graph.is_empty_of_colorable_zero SimpleGraph.isEmpty_of_colorable_zero /-- The "tautological" coloring of a graph, using the vertices of the graph as colors. -/ def selfColoring : G.Coloring V := Coloring.mk id fun {_ _} => G.ne_of_adj #align simple_graph.self_coloring SimpleGraph.selfColoring /-- The chromatic number of a graph is the minimal number of colors needed to color it. This is `⊤` (infinity) iff `G` isn't colorable with finitely many colors. If `G` is colorable, then `ENat.toNat G.chromaticNumber` is the `ℕ`-valued chromatic number. -/ noncomputable def chromaticNumber : ℕ∞ := ⨅ n ∈ setOf G.Colorable, (n : ℕ∞) #align simple_graph.chromatic_number SimpleGraph.chromaticNumber lemma chromaticNumber_eq_biInf {G : SimpleGraph V} : G.chromaticNumber = ⨅ n ∈ setOf G.Colorable, (n : ℕ∞) := rfl lemma chromaticNumber_eq_iInf {G : SimpleGraph V} : G.chromaticNumber = ⨅ n : {m \| G.Colorable m}, (n : ℕ∞) := by rw [chromaticNumber, iInf_subtype] lemma Colorable.chromaticNumber_eq_sInf {G : SimpleGraph V} {n} (h : G.Colorable n) : G.chromaticNumber = sInf {n' : ℕ \| G.Colorable n'} := by rw [ENat.coe_sInf, chromaticNumber] exact ⟨_, h⟩ /-- Given an embedding, there is an induced embedding of colorings. -/ def recolorOfEmbedding {α β : Type} (f : α ↪ β) : G.Coloring α ↪ G.Coloring β where toFun C := (Embedding.completeGraph f).toHom.comp C inj' := by -- this was strangely painful; seems like missing lemmas about embeddings intro C C' h dsimp only at h ext v apply (Embedding.completeGraph f).inj' change ((Embedding.completeGraph f).toHom.comp C) v = _ rw [h] rfl #align simple_graph.recolor_of_embedding SimpleGraph.recolorOfEmbedding @[simp] lemma coe_recolorOfEmbedding (f : α ↪ β) : ⇑(G.recolorOfEmbedding f) = (Embedding.completeGraph f).toHom.comp := rfl /-- Given an equivalence, there is an induced equivalence between colorings. -/ def recolorOfEquiv {α β : Type} (f : α ≃ β) : G.Coloring α ≃ G.Coloring β where toFun := G.recolorOfEmbedding f.toEmbedding invFun := G.recolorOfEmbedding f.symm.toEmbedding left_inv C := by ext v apply Equiv.symm_apply_apply right_inv C := by ext v apply Equiv.apply_symm_apply #align simple_graph.recolor_of_equiv SimpleGraph.recolorOfEquiv @[simp] lemma coe_recolorOfEquiv (f : α ≃ β) : ⇑(G.recolorOfEquiv f) = (Embedding.completeGraph f).toHom.comp := rfl /-- There is a noncomputable embedding of `α`-colorings to `β`-colorings if `β` has at least as large a cardinality as `α`. -/ noncomputable def recolorOfCardLE {α β : Type} [Fintype α] [Fintype β] (hn : Fintype.card α ≤ Fintype.card β) : G.Coloring α ↪ G.Coloring β := G.recolorOfEmbedding <\| (Function.Embedding.nonempty_of_card_le hn).some #align simple_graph.recolor_of_card_le SimpleGraph.recolorOfCardLE @[simp] lemma coe_recolorOfCardLE [Fintype α] [Fintype β] (hαβ : card α ≤ card β) : ⇑(G.recolorOfCardLE hαβ) = (Embedding.completeGraph (Embedding.nonempty_of_card_le hαβ).some).toHom.comp := rfl variable {G} theorem Colorable.mono {n m : ℕ} (h : n ≤ m) (hc : G.Colorable n) : G.Colorable m := ⟨G.recolorOfCardLE (by simp [h]) hc.some⟩ #align simple_graph.colorable.mono SimpleGraph.Colorable.mono theorem Coloring.colorable [Fintype α] (C : G.Coloring α) : G.Colorable (Fintype.card α) := ⟨G.recolorOfCardLE (by simp) C⟩ #align simple_graph.coloring.to_colorable SimpleGraph.Coloring.colorable theorem colorable_of_fintype (G : SimpleGraph V) [Fintype V] : G.Colorable (Fintype.card V) := G.selfColoring.colorable #align simple_graph.colorable_of_fintype SimpleGraph.colorable_of_fintype /-- Noncomputably get a coloring from colorability. -/ noncomputable def Colorable.toColoring [Fintype α] {n : ℕ} (hc : G.Colorable n) (hn : n ≤ Fintype.card α) : G.Coloring α := by rw [← Fintype.card_fin n] at hn exact G.recolorOfCardLE hn hc.some #align simple_graph.colorable.to_coloring SimpleGraph.Colorable.toColoring theorem Colorable.of_embedding {V' : Type*} {G' : SimpleGraph V'} (f : G ↪g G') {n : ℕ} (h : G'.Colorable n) : G.Colorable n := ⟨(h.toColoring (by simp)).comp f⟩ #align simple_graph.colorable.of_embedding SimpleGraph.Colorable.of_embedding theorem colorable_iff_exists_bdd_nat_coloring (n : ℕ) : G.Colorable n ↔ ∃ C : G.Coloring ℕ, ∀ v, C v < n := by constructor · rintro hc have C : G.Coloring (Fin n) := hc.toColoring (by simp) let f := Embedding.completeGraph (@Fin.valEmbedding n) use f.toHom.comp C intro v cases' C with color valid exact Fin.is_lt (color v) · rintro ⟨C, Cf⟩ refine ⟨Coloring.mk ?_ ?_⟩ · exact fun v => ⟨C v, Cf v⟩ · rintro v w hvw simp only [Fin.mk_eq_mk, Ne] exact C.valid hvw #align simple_graph.colorable_iff_exists_bdd_nat_coloring SimpleGraph.colorable_iff_exists_bdd_nat_coloring theorem colorable_set_nonempty_of_colorable {n : ℕ} (hc : G.Colorable n) : { n : ℕ \| G.Colorable n }.Nonempty := ⟨n, hc⟩ #align simple_graph.colorable_set_nonempty_of_colorable SimpleGraph.colorable_set_nonempty_of_colorable theorem chromaticNumber_bddBelow : BddBelow { n : ℕ \| G.Colorable n } := ⟨0, fun _ _ => zero_le _⟩ #align simple_graph.chromatic_number_bdd_below SimpleGraph.chromaticNumber_bddBelow theorem Colorable.chromaticNumber_le {n : ℕ} (hc : G.Colorable n) : G.chromaticNumber ≤ n := by rw [hc.chromaticNumber_eq_sInf] norm_cast apply csInf_le chromaticNumber_bddBelow exact hc #align simple_graph.chromatic_number_le_of_colorable SimpleGraph.Colorable.chromaticNumber_le theorem chromaticNumber_ne_top_iff_exists : G.chromaticNumber ≠ ⊤ ↔ ∃ n, G.Colorable n := by rw [chromaticNumber] convert_to ⨅ n : {m \| G.Colorable m}, (n : ℕ∞) ≠ ⊤ ↔ _ · rw [iInf_subtype] rw [← lt_top_iff_ne_top, ENat.iInf_coe_lt_top] simp theorem chromaticNumber_le_iff_colorable {n : ℕ} : G.chromaticNumber ≤ n ↔ G.Colorable n := by refine ⟨fun h ↦ ?_, Colorable.chromaticNumber_le⟩ have : G.chromaticNumber ≠ ⊤ := (trans h (WithTop.coe_lt_top n)).ne rw [chromaticNumber_ne_top_iff_exists] at this obtain ⟨m, hm⟩ := this rw [hm.chromaticNumber_eq_sInf, Nat.cast_le] at h have := Nat.sInf_mem (⟨m, hm⟩ : {n' \| G.Colorable n'}.Nonempty) rw [Set.mem_setOf_eq] at this exact this.mono h @[deprecated Colorable.chromaticNumber_le (since := "2024-03-21")] theorem chromaticNumber_le_card [Fintype α] (C : G.Coloring α) : G.chromaticNumber ≤ Fintype.card α := C.colorable.chromaticNumber_le #align simple_graph.chromatic_number_le_card SimpleGraph.chromaticNumber_le_card theorem colorable_chromaticNumber {m : ℕ} (hc : G.Colorable m) : G.Colorable (ENat.toNat G.chromaticNumber) := by classical rw [hc.chromaticNumber_eq_sInf, Nat.sInf_def] · apply Nat.find_spec · exact colorable_set_nonempty_of_colorable hc #align simple_graph.colorable_chromatic_number SimpleGraph.colorable_chromaticNumber theorem colorable_chromaticNumber_of_fintype (G : SimpleGraph V) [Finite V] : G.Colorable (ENat.toNat G.chromaticNumber) := by cases nonempty_fintype V exact colorable_chromaticNumber G.colorable_of_fintype #align simple_graph.colorable_chromatic_number_of_fintype SimpleGraph.colorable_chromaticNumber_of_fintype	Mathlib/Combinatorics/SimpleGraph/Coloring.lean	319	325	theorem chromaticNumber_le_one_of_subsingleton (G : SimpleGraph V) [Subsingleton V] : G.chromaticNumber ≤ 1 := by	rw [← Nat.cast_one, chromaticNumber_le_iff_colorable] refine ⟨Coloring.mk (fun _ => 0) ?_⟩ intros v w cases Subsingleton.elim v w simp
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.Algebra.Group.Equiv.Basic import Mathlib.Data.ENat.Lattice import Mathlib.Data.Part import Mathlib.Tactic.NormNum #align_import data.nat.part_enat from "leanprover-community/mathlib"@"3ff3f2d6a3118b8711063de7111a0d77a53219a8" /-! # Natural numbers with infinity The natural numbers and an extra `top` element `⊤`. This implementation uses `Part ℕ` as an implementation. Use `ℕ∞` instead unless you care about computability. ## Main definitions The following instances are defined: * `OrderedAddCommMonoid PartENat` * `CanonicallyOrderedAddCommMonoid PartENat` * `CompleteLinearOrder PartENat` There is no additive analogue of `MonoidWithZero`; if there were then `PartENat` could be an `AddMonoidWithTop`. * `toWithTop` : the map from `PartENat` to `ℕ∞`, with theorems that it plays well with `+` and `≤`. * `withTopAddEquiv : PartENat ≃+ ℕ∞` * `withTopOrderIso : PartENat ≃o ℕ∞` ## Implementation details `PartENat` is defined to be `Part ℕ`. `+` and `≤` are defined on `PartENat`, but there is an issue with `` because it's not clear what `0 ⊤` should be. `mul` is hence left undefined. Similarly `⊤ - ⊤` is ambiguous so there is no `-` defined on `PartENat`. Before the `open scoped Classical` line, various proofs are made with decidability assumptions. This can cause issues -- see for example the non-simp lemma `toWithTopZero` proved by `rfl`, followed by `@[simp] lemma toWithTopZero'` whose proof uses `convert`. ## Tags PartENat, ℕ∞ -/ open Part hiding some /-- Type of natural numbers with infinity (`⊤`) -/ def PartENat : Type := Part ℕ #align part_enat PartENat namespace PartENat /-- The computable embedding `ℕ → PartENat`. This coincides with the coercion `coe : ℕ → PartENat`, see `PartENat.some_eq_natCast`. -/ @[coe] def some : ℕ → PartENat := Part.some #align part_enat.some PartENat.some instance : Zero PartENat := ⟨some 0⟩ instance : Inhabited PartENat := ⟨0⟩ instance : One PartENat := ⟨some 1⟩ instance : Add PartENat := ⟨fun x y => ⟨x.Dom ∧ y.Dom, fun h => get x h.1 + get y h.2⟩⟩ instance (n : ℕ) : Decidable (some n).Dom := isTrue trivial @[simp] theorem dom_some (x : ℕ) : (some x).Dom := trivial #align part_enat.dom_some PartENat.dom_some instance addCommMonoid : AddCommMonoid PartENat where add := (· + ·) zero := 0 add_comm x y := Part.ext' and_comm fun _ _ => add_comm _ _ zero_add x := Part.ext' (true_and_iff _) fun _ _ => zero_add _ add_zero x := Part.ext' (and_true_iff _) fun _ _ => add_zero _ add_assoc x y z := Part.ext' and_assoc fun _ _ => add_assoc _ _ _ nsmul := nsmulRec instance : AddCommMonoidWithOne PartENat := { PartENat.addCommMonoid with one := 1 natCast := some natCast_zero := rfl natCast_succ := fun _ => Part.ext' (true_and_iff _).symm fun _ _ => rfl } theorem some_eq_natCast (n : ℕ) : some n = n := rfl #align part_enat.some_eq_coe PartENat.some_eq_natCast instance : CharZero PartENat where cast_injective := Part.some_injective /-- Alias of `Nat.cast_inj` specialized to `PartENat` --/ theorem natCast_inj {x y : ℕ} : (x : PartENat) = y ↔ x = y := Nat.cast_inj #align part_enat.coe_inj PartENat.natCast_inj @[simp] theorem dom_natCast (x : ℕ) : (x : PartENat).Dom := trivial #align part_enat.dom_coe PartENat.dom_natCast -- See note [no_index around OfNat.ofNat] @[simp] theorem dom_ofNat (x : ℕ) [x.AtLeastTwo] : (no_index (OfNat.ofNat x : PartENat)).Dom := trivial @[simp] theorem dom_zero : (0 : PartENat).Dom := trivial @[simp] theorem dom_one : (1 : PartENat).Dom := trivial instance : CanLift PartENat ℕ (↑) Dom := ⟨fun n hn => ⟨n.get hn, Part.some_get _⟩⟩ instance : LE PartENat := ⟨fun x y => ∃ h : y.Dom → x.Dom, ∀ hy : y.Dom, x.get (h hy) ≤ y.get hy⟩ instance : Top PartENat := ⟨none⟩ instance : Bot PartENat := ⟨0⟩ instance : Sup PartENat := ⟨fun x y => ⟨x.Dom ∧ y.Dom, fun h => x.get h.1 ⊔ y.get h.2⟩⟩ theorem le_def (x y : PartENat) : x ≤ y ↔ ∃ h : y.Dom → x.Dom, ∀ hy : y.Dom, x.get (h hy) ≤ y.get hy := Iff.rfl #align part_enat.le_def PartENat.le_def @[elab_as_elim] protected theorem casesOn' {P : PartENat → Prop} : ∀ a : PartENat, P ⊤ → (∀ n : ℕ, P (some n)) → P a := Part.induction_on #align part_enat.cases_on' PartENat.casesOn' @[elab_as_elim] protected theorem casesOn {P : PartENat → Prop} : ∀ a : PartENat, P ⊤ → (∀ n : ℕ, P n) → P a := by exact PartENat.casesOn' #align part_enat.cases_on PartENat.casesOn -- not a simp lemma as we will provide a `LinearOrderedAddCommMonoidWithTop` instance later theorem top_add (x : PartENat) : ⊤ + x = ⊤ := Part.ext' (false_and_iff _) fun h => h.left.elim #align part_enat.top_add PartENat.top_add -- not a simp lemma as we will provide a `LinearOrderedAddCommMonoidWithTop` instance later theorem add_top (x : PartENat) : x + ⊤ = ⊤ := by rw [add_comm, top_add] #align part_enat.add_top PartENat.add_top @[simp] theorem natCast_get {x : PartENat} (h : x.Dom) : (x.get h : PartENat) = x := by exact Part.ext' (iff_of_true trivial h) fun _ _ => rfl #align part_enat.coe_get PartENat.natCast_get @[simp, norm_cast] theorem get_natCast' (x : ℕ) (h : (x : PartENat).Dom) : get (x : PartENat) h = x := by rw [← natCast_inj, natCast_get] #align part_enat.get_coe' PartENat.get_natCast' theorem get_natCast {x : ℕ} : get (x : PartENat) (dom_natCast x) = x := get_natCast' _ _ #align part_enat.get_coe PartENat.get_natCast theorem coe_add_get {x : ℕ} {y : PartENat} (h : ((x : PartENat) + y).Dom) : get ((x : PartENat) + y) h = x + get y h.2 := by rfl #align part_enat.coe_add_get PartENat.coe_add_get @[simp] theorem get_add {x y : PartENat} (h : (x + y).Dom) : get (x + y) h = x.get h.1 + y.get h.2 := rfl #align part_enat.get_add PartENat.get_add @[simp] theorem get_zero (h : (0 : PartENat).Dom) : (0 : PartENat).get h = 0 := rfl #align part_enat.get_zero PartENat.get_zero @[simp] theorem get_one (h : (1 : PartENat).Dom) : (1 : PartENat).get h = 1 := rfl #align part_enat.get_one PartENat.get_one -- See note [no_index around OfNat.ofNat] @[simp] theorem get_ofNat' (x : ℕ) [x.AtLeastTwo] (h : (no_index (OfNat.ofNat x : PartENat)).Dom) : Part.get (no_index (OfNat.ofNat x : PartENat)) h = (no_index (OfNat.ofNat x)) := get_natCast' x h nonrec theorem get_eq_iff_eq_some {a : PartENat} {ha : a.Dom} {b : ℕ} : a.get ha = b ↔ a = some b := get_eq_iff_eq_some #align part_enat.get_eq_iff_eq_some PartENat.get_eq_iff_eq_some theorem get_eq_iff_eq_coe {a : PartENat} {ha : a.Dom} {b : ℕ} : a.get ha = b ↔ a = b := by rw [get_eq_iff_eq_some] rfl #align part_enat.get_eq_iff_eq_coe PartENat.get_eq_iff_eq_coe theorem dom_of_le_of_dom {x y : PartENat} : x ≤ y → y.Dom → x.Dom := fun ⟨h, _⟩ => h #align part_enat.dom_of_le_of_dom PartENat.dom_of_le_of_dom theorem dom_of_le_some {x : PartENat} {y : ℕ} (h : x ≤ some y) : x.Dom := dom_of_le_of_dom h trivial #align part_enat.dom_of_le_some PartENat.dom_of_le_some theorem dom_of_le_natCast {x : PartENat} {y : ℕ} (h : x ≤ y) : x.Dom := by exact dom_of_le_some h #align part_enat.dom_of_le_coe PartENat.dom_of_le_natCast instance decidableLe (x y : PartENat) [Decidable x.Dom] [Decidable y.Dom] : Decidable (x ≤ y) := if hx : x.Dom then decidable_of_decidable_of_iff (by rw [le_def]) else if hy : y.Dom then isFalse fun h => hx <\| dom_of_le_of_dom h hy else isTrue ⟨fun h => (hy h).elim, fun h => (hy h).elim⟩ #align part_enat.decidable_le PartENat.decidableLe -- Porting note: Removed. Use `Nat.castAddMonoidHom` instead. #noalign part_enat.coe_hom #noalign part_enat.coe_coe_hom instance partialOrder : PartialOrder PartENat where le := (· ≤ ·) le_refl _ := ⟨id, fun _ => le_rfl⟩ le_trans := fun _ _ _ ⟨hxy₁, hxy₂⟩ ⟨hyz₁, hyz₂⟩ => ⟨hxy₁ ∘ hyz₁, fun _ => le_trans (hxy₂ _) (hyz₂ _)⟩ lt_iff_le_not_le _ _ := Iff.rfl le_antisymm := fun _ _ ⟨hxy₁, hxy₂⟩ ⟨hyx₁, hyx₂⟩ => Part.ext' ⟨hyx₁, hxy₁⟩ fun _ _ => le_antisymm (hxy₂ _) (hyx₂ _) theorem lt_def (x y : PartENat) : x < y ↔ ∃ hx : x.Dom, ∀ hy : y.Dom, x.get hx < y.get hy := by rw [lt_iff_le_not_le, le_def, le_def, not_exists] constructor · rintro ⟨⟨hyx, H⟩, h⟩ by_cases hx : x.Dom · use hx intro hy specialize H hy specialize h fun _ => hy rw [not_forall] at h cases' h with hx' h rw [not_le] at h exact h · specialize h fun hx' => (hx hx').elim rw [not_forall] at h cases' h with hx' h exact (hx hx').elim · rintro ⟨hx, H⟩ exact ⟨⟨fun _ => hx, fun hy => (H hy).le⟩, fun hxy h => not_lt_of_le (h _) (H _)⟩ #align part_enat.lt_def PartENat.lt_def noncomputable instance orderedAddCommMonoid : OrderedAddCommMonoid PartENat := { PartENat.partialOrder, PartENat.addCommMonoid with add_le_add_left := fun a b ⟨h₁, h₂⟩ c => PartENat.casesOn c (by simp [top_add]) fun c => ⟨fun h => And.intro (dom_natCast _) (h₁ h.2), fun h => by simpa only [coe_add_get] using add_le_add_left (h₂ _) c⟩ } instance semilatticeSup : SemilatticeSup PartENat := { PartENat.partialOrder with sup := (· ⊔ ·) le_sup_left := fun _ _ => ⟨And.left, fun _ => le_sup_left⟩ le_sup_right := fun _ _ => ⟨And.right, fun _ => le_sup_right⟩ sup_le := fun _ _ _ ⟨hx₁, hx₂⟩ ⟨hy₁, hy₂⟩ => ⟨fun hz => ⟨hx₁ hz, hy₁ hz⟩, fun _ => sup_le (hx₂ _) (hy₂ _)⟩ } #align part_enat.semilattice_sup PartENat.semilatticeSup instance orderBot : OrderBot PartENat where bot := ⊥ bot_le _ := ⟨fun _ => trivial, fun _ => Nat.zero_le _⟩ #align part_enat.order_bot PartENat.orderBot instance orderTop : OrderTop PartENat where top := ⊤ le_top _ := ⟨fun h => False.elim h, fun hy => False.elim hy⟩ #align part_enat.order_top PartENat.orderTop instance : ZeroLEOneClass PartENat where zero_le_one := bot_le /-- Alias of `Nat.cast_le` specialized to `PartENat` --/ theorem coe_le_coe {x y : ℕ} : (x : PartENat) ≤ y ↔ x ≤ y := Nat.cast_le #align part_enat.coe_le_coe PartENat.coe_le_coe /-- Alias of `Nat.cast_lt` specialized to `PartENat` --/ theorem coe_lt_coe {x y : ℕ} : (x : PartENat) < y ↔ x < y := Nat.cast_lt #align part_enat.coe_lt_coe PartENat.coe_lt_coe @[simp] theorem get_le_get {x y : PartENat} {hx : x.Dom} {hy : y.Dom} : x.get hx ≤ y.get hy ↔ x ≤ y := by conv => lhs rw [← coe_le_coe, natCast_get, natCast_get] #align part_enat.get_le_get PartENat.get_le_get theorem le_coe_iff (x : PartENat) (n : ℕ) : x ≤ n ↔ ∃ h : x.Dom, x.get h ≤ n := by show (∃ h : True → x.Dom, _) ↔ ∃ h : x.Dom, x.get h ≤ n simp only [forall_prop_of_true, dom_natCast, get_natCast'] #align part_enat.le_coe_iff PartENat.le_coe_iff theorem lt_coe_iff (x : PartENat) (n : ℕ) : x < n ↔ ∃ h : x.Dom, x.get h < n := by simp only [lt_def, forall_prop_of_true, get_natCast', dom_natCast] #align part_enat.lt_coe_iff PartENat.lt_coe_iff theorem coe_le_iff (n : ℕ) (x : PartENat) : (n : PartENat) ≤ x ↔ ∀ h : x.Dom, n ≤ x.get h := by rw [← some_eq_natCast] simp only [le_def, exists_prop_of_true, dom_some, forall_true_iff] rfl #align part_enat.coe_le_iff PartENat.coe_le_iff theorem coe_lt_iff (n : ℕ) (x : PartENat) : (n : PartENat) < x ↔ ∀ h : x.Dom, n < x.get h := by rw [← some_eq_natCast] simp only [lt_def, exists_prop_of_true, dom_some, forall_true_iff] rfl #align part_enat.coe_lt_iff PartENat.coe_lt_iff nonrec theorem eq_zero_iff {x : PartENat} : x = 0 ↔ x ≤ 0 := eq_bot_iff #align part_enat.eq_zero_iff PartENat.eq_zero_iff theorem ne_zero_iff {x : PartENat} : x ≠ 0 ↔ ⊥ < x := bot_lt_iff_ne_bot.symm #align part_enat.ne_zero_iff PartENat.ne_zero_iff theorem dom_of_lt {x y : PartENat} : x < y → x.Dom := PartENat.casesOn x not_top_lt fun _ _ => dom_natCast _ #align part_enat.dom_of_lt PartENat.dom_of_lt theorem top_eq_none : (⊤ : PartENat) = Part.none := rfl #align part_enat.top_eq_none PartENat.top_eq_none @[simp] theorem natCast_lt_top (x : ℕ) : (x : PartENat) < ⊤ := Ne.lt_top fun h => absurd (congr_arg Dom h) <\| by simp only [dom_natCast]; exact true_ne_false #align part_enat.coe_lt_top PartENat.natCast_lt_top @[simp] theorem zero_lt_top : (0 : PartENat) < ⊤ := natCast_lt_top 0 @[simp] theorem one_lt_top : (1 : PartENat) < ⊤ := natCast_lt_top 1 -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_lt_top (x : ℕ) [x.AtLeastTwo] : (no_index (OfNat.ofNat x : PartENat)) < ⊤ := natCast_lt_top x @[simp] theorem natCast_ne_top (x : ℕ) : (x : PartENat) ≠ ⊤ := ne_of_lt (natCast_lt_top x) #align part_enat.coe_ne_top PartENat.natCast_ne_top @[simp] theorem zero_ne_top : (0 : PartENat) ≠ ⊤ := natCast_ne_top 0 @[simp] theorem one_ne_top : (1 : PartENat) ≠ ⊤ := natCast_ne_top 1 -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_ne_top (x : ℕ) [x.AtLeastTwo] : (no_index (OfNat.ofNat x : PartENat)) ≠ ⊤ := natCast_ne_top x theorem not_isMax_natCast (x : ℕ) : ¬IsMax (x : PartENat) := not_isMax_of_lt (natCast_lt_top x) #align part_enat.not_is_max_coe PartENat.not_isMax_natCast theorem ne_top_iff {x : PartENat} : x ≠ ⊤ ↔ ∃ n : ℕ, x = n := by simpa only [← some_eq_natCast] using Part.ne_none_iff #align part_enat.ne_top_iff PartENat.ne_top_iff theorem ne_top_iff_dom {x : PartENat} : x ≠ ⊤ ↔ x.Dom := by classical exact not_iff_comm.1 Part.eq_none_iff'.symm #align part_enat.ne_top_iff_dom PartENat.ne_top_iff_dom theorem not_dom_iff_eq_top {x : PartENat} : ¬x.Dom ↔ x = ⊤ := Iff.not_left ne_top_iff_dom.symm #align part_enat.not_dom_iff_eq_top PartENat.not_dom_iff_eq_top theorem ne_top_of_lt {x y : PartENat} (h : x < y) : x ≠ ⊤ := ne_of_lt <\| lt_of_lt_of_le h le_top #align part_enat.ne_top_of_lt PartENat.ne_top_of_lt theorem eq_top_iff_forall_lt (x : PartENat) : x = ⊤ ↔ ∀ n : ℕ, (n : PartENat) < x := by constructor · rintro rfl n exact natCast_lt_top _ · contrapose! rw [ne_top_iff] rintro ⟨n, rfl⟩ exact ⟨n, irrefl _⟩ #align part_enat.eq_top_iff_forall_lt PartENat.eq_top_iff_forall_lt theorem eq_top_iff_forall_le (x : PartENat) : x = ⊤ ↔ ∀ n : ℕ, (n : PartENat) ≤ x := (eq_top_iff_forall_lt x).trans ⟨fun h n => (h n).le, fun h n => lt_of_lt_of_le (coe_lt_coe.mpr n.lt_succ_self) (h (n + 1))⟩ #align part_enat.eq_top_iff_forall_le PartENat.eq_top_iff_forall_le theorem pos_iff_one_le {x : PartENat} : 0 < x ↔ 1 ≤ x := PartENat.casesOn x (by simp only [iff_true_iff, le_top, natCast_lt_top, ← @Nat.cast_zero PartENat]) fun n => by rw [← Nat.cast_zero, ← Nat.cast_one, PartENat.coe_lt_coe, PartENat.coe_le_coe] rfl #align part_enat.pos_iff_one_le PartENat.pos_iff_one_le instance isTotal : IsTotal PartENat (· ≤ ·) where total x y := PartENat.casesOn (P := fun z => z ≤ y ∨ y ≤ z) x (Or.inr le_top) (PartENat.casesOn y (fun _ => Or.inl le_top) fun x y => (le_total x y).elim (Or.inr ∘ coe_le_coe.2) (Or.inl ∘ coe_le_coe.2)) noncomputable instance linearOrder : LinearOrder PartENat := { PartENat.partialOrder with le_total := IsTotal.total decidableLE := Classical.decRel _ max := (· ⊔ ·) -- Porting note: was `max_def := @sup_eq_maxDefault _ _ (id _) _ }` max_def := fun a b => by change (fun a b => a ⊔ b) a b = _ rw [@sup_eq_maxDefault PartENat _ (id _) _] rfl } instance boundedOrder : BoundedOrder PartENat := { PartENat.orderTop, PartENat.orderBot with } noncomputable instance lattice : Lattice PartENat := { PartENat.semilatticeSup with inf := min inf_le_left := min_le_left inf_le_right := min_le_right le_inf := fun _ _ _ => le_min } noncomputable instance : CanonicallyOrderedAddCommMonoid PartENat := { PartENat.semilatticeSup, PartENat.orderBot, PartENat.orderedAddCommMonoid with le_self_add := fun a b => PartENat.casesOn b (le_top.trans_eq (add_top _).symm) fun b => PartENat.casesOn a (top_add _).ge fun a => (coe_le_coe.2 le_self_add).trans_eq (Nat.cast_add _ _) exists_add_of_le := fun {a b} => PartENat.casesOn b (fun _ => ⟨⊤, (add_top _).symm⟩) fun b => PartENat.casesOn a (fun h => ((natCast_lt_top _).not_le h).elim) fun a h => ⟨(b - a : ℕ), by rw [← Nat.cast_add, natCast_inj, add_comm, tsub_add_cancel_of_le (coe_le_coe.1 h)]⟩ } theorem eq_natCast_sub_of_add_eq_natCast {x y : PartENat} {n : ℕ} (h : x + y = n) : x = ↑(n - y.get (dom_of_le_natCast ((le_add_left le_rfl).trans_eq h))) := by lift x to ℕ using dom_of_le_natCast ((le_add_right le_rfl).trans_eq h) lift y to ℕ using dom_of_le_natCast ((le_add_left le_rfl).trans_eq h) rw [← Nat.cast_add, natCast_inj] at h rw [get_natCast, natCast_inj, eq_tsub_of_add_eq h] #align part_enat.eq_coe_sub_of_add_eq_coe PartENat.eq_natCast_sub_of_add_eq_natCast protected theorem add_lt_add_right {x y z : PartENat} (h : x < y) (hz : z ≠ ⊤) : x + z < y + z := by rcases ne_top_iff.mp (ne_top_of_lt h) with ⟨m, rfl⟩ rcases ne_top_iff.mp hz with ⟨k, rfl⟩ induction' y using PartENat.casesOn with n · rw [top_add] -- Porting note: was apply_mod_cast natCast_lt_top norm_cast; apply natCast_lt_top norm_cast at h -- Porting note: was `apply_mod_cast add_lt_add_right h` norm_cast; apply add_lt_add_right h #align part_enat.add_lt_add_right PartENat.add_lt_add_right protected theorem add_lt_add_iff_right {x y z : PartENat} (hz : z ≠ ⊤) : x + z < y + z ↔ x < y := ⟨lt_of_add_lt_add_right, fun h => PartENat.add_lt_add_right h hz⟩ #align part_enat.add_lt_add_iff_right PartENat.add_lt_add_iff_right protected theorem add_lt_add_iff_left {x y z : PartENat} (hz : z ≠ ⊤) : z + x < z + y ↔ x < y := by rw [add_comm z, add_comm z, PartENat.add_lt_add_iff_right hz] #align part_enat.add_lt_add_iff_left PartENat.add_lt_add_iff_left protected theorem lt_add_iff_pos_right {x y : PartENat} (hx : x ≠ ⊤) : x < x + y ↔ 0 < y := by conv_rhs => rw [← PartENat.add_lt_add_iff_left hx] rw [add_zero] #align part_enat.lt_add_iff_pos_right PartENat.lt_add_iff_pos_right theorem lt_add_one {x : PartENat} (hx : x ≠ ⊤) : x < x + 1 := by rw [PartENat.lt_add_iff_pos_right hx] norm_cast #align part_enat.lt_add_one PartENat.lt_add_one theorem le_of_lt_add_one {x y : PartENat} (h : x < y + 1) : x ≤ y := by induction' y using PartENat.casesOn with n · apply le_top rcases ne_top_iff.mp (ne_top_of_lt h) with ⟨m, rfl⟩ -- Porting note: was `apply_mod_cast Nat.le_of_lt_succ; apply_mod_cast h` norm_cast; apply Nat.le_of_lt_succ; norm_cast at h #align part_enat.le_of_lt_add_one PartENat.le_of_lt_add_one theorem add_one_le_of_lt {x y : PartENat} (h : x < y) : x + 1 ≤ y := by induction' y using PartENat.casesOn with n · apply le_top rcases ne_top_iff.mp (ne_top_of_lt h) with ⟨m, rfl⟩ -- Porting note: was `apply_mod_cast Nat.succ_le_of_lt; apply_mod_cast h` norm_cast; apply Nat.succ_le_of_lt; norm_cast at h #align part_enat.add_one_le_of_lt PartENat.add_one_le_of_lt theorem add_one_le_iff_lt {x y : PartENat} (hx : x ≠ ⊤) : x + 1 ≤ y ↔ x < y := by refine ⟨fun h => ?_, add_one_le_of_lt⟩ rcases ne_top_iff.mp hx with ⟨m, rfl⟩ induction' y using PartENat.casesOn with n · apply natCast_lt_top -- Porting note: was `apply_mod_cast Nat.lt_of_succ_le; apply_mod_cast h` norm_cast; apply Nat.lt_of_succ_le; norm_cast at h #align part_enat.add_one_le_iff_lt PartENat.add_one_le_iff_lt theorem coe_succ_le_iff {n : ℕ} {e : PartENat} : ↑n.succ ≤ e ↔ ↑n < e := by rw [Nat.succ_eq_add_one n, Nat.cast_add, Nat.cast_one, add_one_le_iff_lt (natCast_ne_top n)] #align part_enat.coe_succ_le_succ_iff PartENat.coe_succ_le_iff theorem lt_add_one_iff_lt {x y : PartENat} (hx : x ≠ ⊤) : x < y + 1 ↔ x ≤ y := by refine ⟨le_of_lt_add_one, fun h => ?_⟩ rcases ne_top_iff.mp hx with ⟨m, rfl⟩ induction' y using PartENat.casesOn with n · rw [top_add] apply natCast_lt_top -- Porting note: was `apply_mod_cast Nat.lt_succ_of_le; apply_mod_cast h` norm_cast; apply Nat.lt_succ_of_le; norm_cast at h #align part_enat.lt_add_one_iff_lt PartENat.lt_add_one_iff_lt lemma lt_coe_succ_iff_le {x : PartENat} {n : ℕ} (hx : x ≠ ⊤) : x < n.succ ↔ x ≤ n := by rw [Nat.succ_eq_add_one n, Nat.cast_add, Nat.cast_one, lt_add_one_iff_lt hx] #align part_enat.lt_coe_succ_iff_le PartENat.lt_coe_succ_iff_le theorem add_eq_top_iff {a b : PartENat} : a + b = ⊤ ↔ a = ⊤ ∨ b = ⊤ := by refine PartENat.casesOn a ?_ ?_ <;> refine PartENat.casesOn b ?_ ?_ <;> simp [top_add, add_top] simp only [← Nat.cast_add, PartENat.natCast_ne_top, forall_const, not_false_eq_true] #align part_enat.add_eq_top_iff PartENat.add_eq_top_iff protected theorem add_right_cancel_iff {a b c : PartENat} (hc : c ≠ ⊤) : a + c = b + c ↔ a = b := by rcases ne_top_iff.1 hc with ⟨c, rfl⟩ refine PartENat.casesOn a ?_ ?_ <;> refine PartENat.casesOn b ?_ ?_ <;> simp [add_eq_top_iff, natCast_ne_top, @eq_comm _ (⊤ : PartENat), top_add] simp only [← Nat.cast_add, add_left_cancel_iff, PartENat.natCast_inj, add_comm, forall_const] #align part_enat.add_right_cancel_iff PartENat.add_right_cancel_iff protected theorem add_left_cancel_iff {a b c : PartENat} (ha : a ≠ ⊤) : a + b = a + c ↔ b = c := by rw [add_comm a, add_comm a, PartENat.add_right_cancel_iff ha] #align part_enat.add_left_cancel_iff PartENat.add_left_cancel_iff section WithTop /-- Computably converts a `PartENat` to a `ℕ∞`. -/ def toWithTop (x : PartENat) [Decidable x.Dom] : ℕ∞ := x.toOption #align part_enat.to_with_top PartENat.toWithTop theorem toWithTop_top : have : Decidable (⊤ : PartENat).Dom := Part.noneDecidable toWithTop ⊤ = ⊤ := rfl #align part_enat.to_with_top_top PartENat.toWithTop_top @[simp] theorem toWithTop_top' {h : Decidable (⊤ : PartENat).Dom} : toWithTop ⊤ = ⊤ := by convert toWithTop_top #align part_enat.to_with_top_top' PartENat.toWithTop_top' theorem toWithTop_zero : have : Decidable (0 : PartENat).Dom := someDecidable 0 toWithTop 0 = 0 := rfl #align part_enat.to_with_top_zero PartENat.toWithTop_zero @[simp] theorem toWithTop_zero' {h : Decidable (0 : PartENat).Dom} : toWithTop 0 = 0 := by convert toWithTop_zero #align part_enat.to_with_top_zero' PartENat.toWithTop_zero' theorem toWithTop_one : have : Decidable (1 : PartENat).Dom := someDecidable 1 toWithTop 1 = 1 := rfl @[simp] theorem toWithTop_one' {h : Decidable (1 : PartENat).Dom} : toWithTop 1 = 1 := by convert toWithTop_one theorem toWithTop_some (n : ℕ) : toWithTop (some n) = n := rfl #align part_enat.to_with_top_some PartENat.toWithTop_some theorem toWithTop_natCast (n : ℕ) {_ : Decidable (n : PartENat).Dom} : toWithTop n = n := by simp only [← toWithTop_some] congr #align part_enat.to_with_top_coe PartENat.toWithTop_natCast @[simp] theorem toWithTop_natCast' (n : ℕ) {_ : Decidable (n : PartENat).Dom} : toWithTop (n : PartENat) = n := by rw [toWithTop_natCast n] #align part_enat.to_with_top_coe' PartENat.toWithTop_natCast' @[simp] theorem toWithTop_ofNat (n : ℕ) [n.AtLeastTwo] {_ : Decidable (OfNat.ofNat n : PartENat).Dom} : toWithTop (no_index (OfNat.ofNat n : PartENat)) = OfNat.ofNat n := toWithTop_natCast' n -- Porting note: statement changed. Mathlib 3 statement was -- ``` -- @[simp] lemma to_with_top_le {x y : part_enat} : -- Π [decidable x.dom] [decidable y.dom], by exactI to_with_top x ≤ to_with_top y ↔ x ≤ y := -- ``` -- This used to be really slow to typecheck when the definition of `ENat` -- was still `deriving AddCommMonoidWithOne`. Now that I removed that it is fine. -- (The problem was that the last `simp` got stuck at `CharZero ℕ∞ ≟ CharZero ℕ∞` where -- one side used `instENatAddCommMonoidWithOne` and the other used -- `NonAssocSemiring.toAddCommMonoidWithOne`. Now the former doesn't exist anymore.) @[simp] theorem toWithTop_le {x y : PartENat} [hx : Decidable x.Dom] [hy : Decidable y.Dom] : toWithTop x ≤ toWithTop y ↔ x ≤ y := by induction y using PartENat.casesOn generalizing hy · simp induction x using PartENat.casesOn generalizing hx · simp · simp -- Porting note: this takes too long. #align part_enat.to_with_top_le PartENat.toWithTop_le /- Porting note: As part of the investigation above, I noticed that Lean4 does not find the following two instances which it could find in Lean3 automatically: ``` #synth Decidable (⊤ : PartENat).Dom variable {n : ℕ} #synth Decidable (n : PartENat).Dom ``` -/ @[simp] theorem toWithTop_lt {x y : PartENat} [Decidable x.Dom] [Decidable y.Dom] : toWithTop x < toWithTop y ↔ x < y := lt_iff_lt_of_le_iff_le toWithTop_le #align part_enat.to_with_top_lt PartENat.toWithTop_lt end WithTop -- Porting note: new, extracted from `withTopEquiv`. /-- Coercion from `ℕ∞` to `PartENat`. -/ @[coe] def ofENat : ℕ∞ → PartENat := fun x => match x with \| Option.none => none \| Option.some n => some n -- Porting note (#10754): new instance instance : Coe ℕ∞ PartENat := ⟨ofENat⟩ -- Porting note: new. This could probably be moved to tests or removed. example (n : ℕ) : ((n : ℕ∞) : PartENat) = ↑n := rfl -- Porting note (#10756): new lemma @[simp, norm_cast] lemma ofENat_top : ofENat ⊤ = ⊤ := rfl -- Porting note (#10756): new lemma @[simp, norm_cast] lemma ofENat_coe (n : ℕ) : ofENat n = n := rfl @[simp, norm_cast] theorem ofENat_zero : ofENat 0 = 0 := rfl @[simp, norm_cast] theorem ofENat_one : ofENat 1 = 1 := rfl @[simp, norm_cast] theorem ofENat_ofNat (n : Nat) [n.AtLeastTwo] : ofENat (no_index (OfNat.ofNat n)) = OfNat.ofNat n := rfl -- Porting note (#10756): new theorem @[simp, norm_cast] theorem toWithTop_ofENat (n : ℕ∞) {_ : Decidable (n : PartENat).Dom} : toWithTop (↑n) = n := by cases n with \| top => simp \| coe n => simp @[simp, norm_cast] theorem ofENat_toWithTop (x : PartENat) {_ : Decidable (x : PartENat).Dom} : toWithTop x = x := by induction x using PartENat.casesOn <;> simp @[simp, norm_cast] theorem ofENat_le {x y : ℕ∞} : ofENat x ≤ ofENat y ↔ x ≤ y := by classical rw [← toWithTop_le, toWithTop_ofENat, toWithTop_ofENat] @[simp, norm_cast] theorem ofENat_lt {x y : ℕ∞} : ofENat x < ofENat y ↔ x < y := by classical rw [← toWithTop_lt, toWithTop_ofENat, toWithTop_ofENat] section WithTopEquiv open scoped Classical @[simp] theorem toWithTop_add {x y : PartENat} : toWithTop (x + y) = toWithTop x + toWithTop y := by refine PartENat.casesOn y ?_ ?_ <;> refine PartENat.casesOn x ?_ ?_ -- Porting note: was `simp [← Nat.cast_add, ← ENat.coe_add]` · simp only [add_top, toWithTop_top', _root_.add_top] · simp only [add_top, toWithTop_top', toWithTop_natCast', _root_.add_top, forall_const] · simp only [top_add, toWithTop_top', toWithTop_natCast', _root_.top_add, forall_const] · simp_rw [toWithTop_natCast', ← Nat.cast_add, toWithTop_natCast', forall_const] #align part_enat.to_with_top_add PartENat.toWithTop_add /-- `Equiv` between `PartENat` and `ℕ∞` (for the order isomorphism see `withTopOrderIso`). -/ @[simps] noncomputable def withTopEquiv : PartENat ≃ ℕ∞ where toFun x := toWithTop x invFun x := ↑x left_inv x := by simp right_inv x := by simp #align part_enat.with_top_equiv PartENat.withTopEquiv theorem withTopEquiv_top : withTopEquiv ⊤ = ⊤ := by simp #align part_enat.with_top_equiv_top PartENat.withTopEquiv_top theorem withTopEquiv_natCast (n : Nat) : withTopEquiv n = n := by simp #align part_enat.with_top_equiv_coe PartENat.withTopEquiv_natCast theorem withTopEquiv_zero : withTopEquiv 0 = 0 := by simp #align part_enat.with_top_equiv_zero PartENat.withTopEquiv_zero theorem withTopEquiv_one : withTopEquiv 1 = 1 := by simp theorem withTopEquiv_ofNat (n : Nat) [n.AtLeastTwo] : withTopEquiv (no_index (OfNat.ofNat n)) = OfNat.ofNat n := by simp theorem withTopEquiv_le {x y : PartENat} : withTopEquiv x ≤ withTopEquiv y ↔ x ≤ y := by simp #align part_enat.with_top_equiv_le PartENat.withTopEquiv_le theorem withTopEquiv_lt {x y : PartENat} : withTopEquiv x < withTopEquiv y ↔ x < y := by simp #align part_enat.with_top_equiv_lt PartENat.withTopEquiv_lt theorem withTopEquiv_symm_top : withTopEquiv.symm ⊤ = ⊤ := by simp #align part_enat.with_top_equiv_symm_top PartENat.withTopEquiv_symm_top theorem withTopEquiv_symm_coe (n : Nat) : withTopEquiv.symm n = n := by simp #align part_enat.with_top_equiv_symm_coe PartENat.withTopEquiv_symm_coe theorem withTopEquiv_symm_zero : withTopEquiv.symm 0 = 0 := by simp #align part_enat.with_top_equiv_symm_zero PartENat.withTopEquiv_symm_zero theorem withTopEquiv_symm_one : withTopEquiv.symm 1 = 1 := by simp theorem withTopEquiv_symm_ofNat (n : Nat) [n.AtLeastTwo] : withTopEquiv.symm (no_index (OfNat.ofNat n)) = OfNat.ofNat n := by simp theorem withTopEquiv_symm_le {x y : ℕ∞} : withTopEquiv.symm x ≤ withTopEquiv.symm y ↔ x ≤ y := by simp #align part_enat.with_top_equiv_symm_le PartENat.withTopEquiv_symm_le theorem withTopEquiv_symm_lt {x y : ℕ∞} : withTopEquiv.symm x < withTopEquiv.symm y ↔ x < y := by simp #align part_enat.with_top_equiv_symm_lt PartENat.withTopEquiv_symm_lt /-- `toWithTop` induces an order isomorphism between `PartENat` and `ℕ∞`. -/ noncomputable def withTopOrderIso : PartENat ≃o ℕ∞ := { withTopEquiv with map_rel_iff' := @fun _ _ => withTopEquiv_le } #align part_enat.with_top_order_iso PartENat.withTopOrderIso /-- `toWithTop` induces an additive monoid isomorphism between `PartENat` and `ℕ∞`. -/ noncomputable def withTopAddEquiv : PartENat ≃+ ℕ∞ := { withTopEquiv with map_add' := fun x y => by simp only [withTopEquiv] exact toWithTop_add } #align part_enat.with_top_add_equiv PartENat.withTopAddEquiv end WithTopEquiv	Mathlib/Data/Nat/PartENat.lean	821	825	theorem lt_wf : @WellFounded PartENat (· < ·) := by	classical change WellFounded fun a b : PartENat => a < b simp_rw [← withTopEquiv_lt] exact InvImage.wf _ wellFounded_lt
/- Copyright (c) 2021 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang, Yury G. Kudryashov -/ import Mathlib.Tactic.TFAE import Mathlib.Topology.ContinuousOn #align_import topology.inseparable from "leanprover-community/mathlib"@"bcfa726826abd57587355b4b5b7e78ad6527b7e4" /-! # Inseparable points in a topological space In this file we prove basic properties of the following notions defined elsewhere. * `Specializes` (notation: `x ⤳ y`) : a relation saying that `𝓝 x ≤ 𝓝 y`; * `Inseparable`: a relation saying that two points in a topological space have the same neighbourhoods; equivalently, they can't be separated by an open set; * `InseparableSetoid X`: same relation, as a `Setoid`; * `SeparationQuotient X`: the quotient of `X` by its `InseparableSetoid`. We also prove various basic properties of the relation `Inseparable`. ## Notations - `x ⤳ y`: notation for `Specializes x y`; - `x ~ᵢ y` is used as a local notation for `Inseparable x y`; - `𝓝 x` is the neighbourhoods filter `nhds x` of a point `x`, defined elsewhere. ## Tags topological space, separation setoid -/ open Set Filter Function Topology List variable {X Y Z α ι : Type} {π : ι → Type} [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] [∀ i, TopologicalSpace (π i)] {x y z : X} {s : Set X} {f g : X → Y} /-! ### `Specializes` relation -/ /-- A collection of equivalent definitions of `x ⤳ y`. The public API is given by `iff` lemmas below. -/ theorem specializes_TFAE (x y : X) : TFAE [x ⤳ y, pure x ≤ 𝓝 y, ∀ s : Set X , IsOpen s → y ∈ s → x ∈ s, ∀ s : Set X , IsClosed s → x ∈ s → y ∈ s, y ∈ closure ({ x } : Set X), closure ({ y } : Set X) ⊆ closure { x }, ClusterPt y (pure x)] := by tfae_have 1 → 2 · exact (pure_le_nhds _).trans tfae_have 2 → 3 · exact fun h s hso hy => h (hso.mem_nhds hy) tfae_have 3 → 4 · exact fun h s hsc hx => of_not_not fun hy => h sᶜ hsc.isOpen_compl hy hx tfae_have 4 → 5 · exact fun h => h _ isClosed_closure (subset_closure <\| mem_singleton _) tfae_have 6 ↔ 5 · exact isClosed_closure.closure_subset_iff.trans singleton_subset_iff tfae_have 5 ↔ 7 · rw [mem_closure_iff_clusterPt, principal_singleton] tfae_have 5 → 1 · refine fun h => (nhds_basis_opens _).ge_iff.2 ?_ rintro s ⟨hy, ho⟩ rcases mem_closure_iff.1 h s ho hy with ⟨z, hxs, rfl : z = x⟩ exact ho.mem_nhds hxs tfae_finish #align specializes_tfae specializes_TFAE theorem specializes_iff_nhds : x ⤳ y ↔ 𝓝 x ≤ 𝓝 y := Iff.rfl #align specializes_iff_nhds specializes_iff_nhds theorem Specializes.not_disjoint (h : x ⤳ y) : ¬Disjoint (𝓝 x) (𝓝 y) := fun hd ↦ absurd (hd.mono_right h) <\| by simp [NeBot.ne'] theorem specializes_iff_pure : x ⤳ y ↔ pure x ≤ 𝓝 y := (specializes_TFAE x y).out 0 1 #align specializes_iff_pure specializes_iff_pure alias ⟨Specializes.nhds_le_nhds, _⟩ := specializes_iff_nhds #align specializes.nhds_le_nhds Specializes.nhds_le_nhds alias ⟨Specializes.pure_le_nhds, _⟩ := specializes_iff_pure #align specializes.pure_le_nhds Specializes.pure_le_nhds theorem ker_nhds_eq_specializes : (𝓝 x).ker = {y \| y ⤳ x} := by ext; simp [specializes_iff_pure, le_def] theorem specializes_iff_forall_open : x ⤳ y ↔ ∀ s : Set X, IsOpen s → y ∈ s → x ∈ s := (specializes_TFAE x y).out 0 2 #align specializes_iff_forall_open specializes_iff_forall_open theorem Specializes.mem_open (h : x ⤳ y) (hs : IsOpen s) (hy : y ∈ s) : x ∈ s := specializes_iff_forall_open.1 h s hs hy #align specializes.mem_open Specializes.mem_open theorem IsOpen.not_specializes (hs : IsOpen s) (hx : x ∉ s) (hy : y ∈ s) : ¬x ⤳ y := fun h => hx <\| h.mem_open hs hy #align is_open.not_specializes IsOpen.not_specializes theorem specializes_iff_forall_closed : x ⤳ y ↔ ∀ s : Set X, IsClosed s → x ∈ s → y ∈ s := (specializes_TFAE x y).out 0 3 #align specializes_iff_forall_closed specializes_iff_forall_closed theorem Specializes.mem_closed (h : x ⤳ y) (hs : IsClosed s) (hx : x ∈ s) : y ∈ s := specializes_iff_forall_closed.1 h s hs hx #align specializes.mem_closed Specializes.mem_closed theorem IsClosed.not_specializes (hs : IsClosed s) (hx : x ∈ s) (hy : y ∉ s) : ¬x ⤳ y := fun h => hy <\| h.mem_closed hs hx #align is_closed.not_specializes IsClosed.not_specializes theorem specializes_iff_mem_closure : x ⤳ y ↔ y ∈ closure ({x} : Set X) := (specializes_TFAE x y).out 0 4 #align specializes_iff_mem_closure specializes_iff_mem_closure alias ⟨Specializes.mem_closure, _⟩ := specializes_iff_mem_closure #align specializes.mem_closure Specializes.mem_closure theorem specializes_iff_closure_subset : x ⤳ y ↔ closure ({y} : Set X) ⊆ closure {x} := (specializes_TFAE x y).out 0 5 #align specializes_iff_closure_subset specializes_iff_closure_subset alias ⟨Specializes.closure_subset, _⟩ := specializes_iff_closure_subset #align specializes.closure_subset Specializes.closure_subset -- Porting note (#10756): new lemma theorem specializes_iff_clusterPt : x ⤳ y ↔ ClusterPt y (pure x) := (specializes_TFAE x y).out 0 6 theorem Filter.HasBasis.specializes_iff {ι} {p : ι → Prop} {s : ι → Set X} (h : (𝓝 y).HasBasis p s) : x ⤳ y ↔ ∀ i, p i → x ∈ s i := specializes_iff_pure.trans h.ge_iff #align filter.has_basis.specializes_iff Filter.HasBasis.specializes_iff theorem specializes_rfl : x ⤳ x := le_rfl #align specializes_rfl specializes_rfl @[refl] theorem specializes_refl (x : X) : x ⤳ x := specializes_rfl #align specializes_refl specializes_refl @[trans] theorem Specializes.trans : x ⤳ y → y ⤳ z → x ⤳ z := le_trans #align specializes.trans Specializes.trans theorem specializes_of_eq (e : x = y) : x ⤳ y := e ▸ specializes_refl x #align specializes_of_eq specializes_of_eq theorem specializes_of_nhdsWithin (h₁ : 𝓝[s] x ≤ 𝓝[s] y) (h₂ : x ∈ s) : x ⤳ y := specializes_iff_pure.2 <\| calc pure x ≤ 𝓝[s] x := le_inf (pure_le_nhds _) (le_principal_iff.2 h₂) _ ≤ 𝓝[s] y := h₁ _ ≤ 𝓝 y := inf_le_left #align specializes_of_nhds_within specializes_of_nhdsWithin theorem Specializes.map_of_continuousAt (h : x ⤳ y) (hy : ContinuousAt f y) : f x ⤳ f y := specializes_iff_pure.2 fun _s hs => mem_pure.2 <\| mem_preimage.1 <\| mem_of_mem_nhds <\| hy.mono_left h hs #align specializes.map_of_continuous_at Specializes.map_of_continuousAt theorem Specializes.map (h : x ⤳ y) (hf : Continuous f) : f x ⤳ f y := h.map_of_continuousAt hf.continuousAt #align specializes.map Specializes.map theorem Inducing.specializes_iff (hf : Inducing f) : f x ⤳ f y ↔ x ⤳ y := by simp only [specializes_iff_mem_closure, hf.closure_eq_preimage_closure_image, image_singleton, mem_preimage] #align inducing.specializes_iff Inducing.specializes_iff theorem subtype_specializes_iff {p : X → Prop} (x y : Subtype p) : x ⤳ y ↔ (x : X) ⤳ y := inducing_subtype_val.specializes_iff.symm #align subtype_specializes_iff subtype_specializes_iff @[simp] theorem specializes_prod {x₁ x₂ : X} {y₁ y₂ : Y} : (x₁, y₁) ⤳ (x₂, y₂) ↔ x₁ ⤳ x₂ ∧ y₁ ⤳ y₂ := by simp only [Specializes, nhds_prod_eq, prod_le_prod] #align specializes_prod specializes_prod theorem Specializes.prod {x₁ x₂ : X} {y₁ y₂ : Y} (hx : x₁ ⤳ x₂) (hy : y₁ ⤳ y₂) : (x₁, y₁) ⤳ (x₂, y₂) := specializes_prod.2 ⟨hx, hy⟩ #align specializes.prod Specializes.prod theorem Specializes.fst {a b : X × Y} (h : a ⤳ b) : a.1 ⤳ b.1 := (specializes_prod.1 h).1 theorem Specializes.snd {a b : X × Y} (h : a ⤳ b) : a.2 ⤳ b.2 := (specializes_prod.1 h).2 @[simp] theorem specializes_pi {f g : ∀ i, π i} : f ⤳ g ↔ ∀ i, f i ⤳ g i := by simp only [Specializes, nhds_pi, pi_le_pi] #align specializes_pi specializes_pi theorem not_specializes_iff_exists_open : ¬x ⤳ y ↔ ∃ S : Set X, IsOpen S ∧ y ∈ S ∧ x ∉ S := by rw [specializes_iff_forall_open] push_neg rfl #align not_specializes_iff_exists_open not_specializes_iff_exists_open theorem not_specializes_iff_exists_closed : ¬x ⤳ y ↔ ∃ S : Set X, IsClosed S ∧ x ∈ S ∧ y ∉ S := by rw [specializes_iff_forall_closed] push_neg rfl #align not_specializes_iff_exists_closed not_specializes_iff_exists_closed theorem IsOpen.continuous_piecewise_of_specializes [DecidablePred (· ∈ s)] (hs : IsOpen s) (hf : Continuous f) (hg : Continuous g) (hspec : ∀ x, f x ⤳ g x) : Continuous (s.piecewise f g) := by have : ∀ U, IsOpen U → g ⁻¹' U ⊆ f ⁻¹' U := fun U hU x hx ↦ (hspec x).mem_open hU hx rw [continuous_def] intro U hU rw [piecewise_preimage, ite_eq_of_subset_right _ (this U hU)] exact hU.preimage hf \|>.inter hs \|>.union (hU.preimage hg) theorem IsClosed.continuous_piecewise_of_specializes [DecidablePred (· ∈ s)] (hs : IsClosed s) (hf : Continuous f) (hg : Continuous g) (hspec : ∀ x, g x ⤳ f x) : Continuous (s.piecewise f g) := by simpa only [piecewise_compl] using hs.isOpen_compl.continuous_piecewise_of_specializes hg hf hspec /-- A continuous function is monotone with respect to the specialization preorders on the domain and the codomain. -/ theorem Continuous.specialization_monotone (hf : Continuous f) : @Monotone _ _ (specializationPreorder X) (specializationPreorder Y) f := fun _ _ h => h.map hf #align continuous.specialization_monotone Continuous.specialization_monotone /-! ### `Inseparable` relation -/ local infixl:0 " ~ᵢ " => Inseparable theorem inseparable_def : (x ~ᵢ y) ↔ 𝓝 x = 𝓝 y := Iff.rfl #align inseparable_def inseparable_def theorem inseparable_iff_specializes_and : (x ~ᵢ y) ↔ x ⤳ y ∧ y ⤳ x := le_antisymm_iff #align inseparable_iff_specializes_and inseparable_iff_specializes_and theorem Inseparable.specializes (h : x ~ᵢ y) : x ⤳ y := h.le #align inseparable.specializes Inseparable.specializes theorem Inseparable.specializes' (h : x ~ᵢ y) : y ⤳ x := h.ge #align inseparable.specializes' Inseparable.specializes' theorem Specializes.antisymm (h₁ : x ⤳ y) (h₂ : y ⤳ x) : x ~ᵢ y := le_antisymm h₁ h₂ #align specializes.antisymm Specializes.antisymm theorem inseparable_iff_forall_open : (x ~ᵢ y) ↔ ∀ s : Set X, IsOpen s → (x ∈ s ↔ y ∈ s) := by simp only [inseparable_iff_specializes_and, specializes_iff_forall_open, ← forall_and, ← iff_def, Iff.comm] #align inseparable_iff_forall_open inseparable_iff_forall_open theorem not_inseparable_iff_exists_open : ¬(x ~ᵢ y) ↔ ∃ s : Set X, IsOpen s ∧ Xor' (x ∈ s) (y ∈ s) := by simp [inseparable_iff_forall_open, ← xor_iff_not_iff] #align not_inseparable_iff_exists_open not_inseparable_iff_exists_open theorem inseparable_iff_forall_closed : (x ~ᵢ y) ↔ ∀ s : Set X, IsClosed s → (x ∈ s ↔ y ∈ s) := by simp only [inseparable_iff_specializes_and, specializes_iff_forall_closed, ← forall_and, ← iff_def] #align inseparable_iff_forall_closed inseparable_iff_forall_closed theorem inseparable_iff_mem_closure : (x ~ᵢ y) ↔ x ∈ closure ({y} : Set X) ∧ y ∈ closure ({x} : Set X) := inseparable_iff_specializes_and.trans <\| by simp only [specializes_iff_mem_closure, and_comm] #align inseparable_iff_mem_closure inseparable_iff_mem_closure theorem inseparable_iff_closure_eq : (x ~ᵢ y) ↔ closure ({x} : Set X) = closure {y} := by simp only [inseparable_iff_specializes_and, specializes_iff_closure_subset, ← subset_antisymm_iff, eq_comm] #align inseparable_iff_closure_eq inseparable_iff_closure_eq theorem inseparable_of_nhdsWithin_eq (hx : x ∈ s) (hy : y ∈ s) (h : 𝓝[s] x = 𝓝[s] y) : x ~ᵢ y := (specializes_of_nhdsWithin h.le hx).antisymm (specializes_of_nhdsWithin h.ge hy) #align inseparable_of_nhds_within_eq inseparable_of_nhdsWithin_eq theorem Inducing.inseparable_iff (hf : Inducing f) : (f x ~ᵢ f y) ↔ (x ~ᵢ y) := by simp only [inseparable_iff_specializes_and, hf.specializes_iff] #align inducing.inseparable_iff Inducing.inseparable_iff theorem subtype_inseparable_iff {p : X → Prop} (x y : Subtype p) : (x ~ᵢ y) ↔ ((x : X) ~ᵢ y) := inducing_subtype_val.inseparable_iff.symm #align subtype_inseparable_iff subtype_inseparable_iff @[simp] theorem inseparable_prod {x₁ x₂ : X} {y₁ y₂ : Y} : ((x₁, y₁) ~ᵢ (x₂, y₂)) ↔ (x₁ ~ᵢ x₂) ∧ (y₁ ~ᵢ y₂) := by simp only [Inseparable, nhds_prod_eq, prod_inj] #align inseparable_prod inseparable_prod theorem Inseparable.prod {x₁ x₂ : X} {y₁ y₂ : Y} (hx : x₁ ~ᵢ x₂) (hy : y₁ ~ᵢ y₂) : (x₁, y₁) ~ᵢ (x₂, y₂) := inseparable_prod.2 ⟨hx, hy⟩ #align inseparable.prod Inseparable.prod @[simp] theorem inseparable_pi {f g : ∀ i, π i} : (f ~ᵢ g) ↔ ∀ i, f i ~ᵢ g i := by simp only [Inseparable, nhds_pi, funext_iff, pi_inj] #align inseparable_pi inseparable_pi namespace Inseparable @[refl] theorem refl (x : X) : x ~ᵢ x := Eq.refl (𝓝 x) #align inseparable.refl Inseparable.refl theorem rfl : x ~ᵢ x := refl x #align inseparable.rfl Inseparable.rfl theorem of_eq (e : x = y) : Inseparable x y := e ▸ refl x #align inseparable.of_eq Inseparable.of_eq @[symm] nonrec theorem symm (h : x ~ᵢ y) : y ~ᵢ x := h.symm #align inseparable.symm Inseparable.symm @[trans] nonrec theorem trans (h₁ : x ~ᵢ y) (h₂ : y ~ᵢ z) : x ~ᵢ z := h₁.trans h₂ #align inseparable.trans Inseparable.trans theorem nhds_eq (h : x ~ᵢ y) : 𝓝 x = 𝓝 y := h #align inseparable.nhds_eq Inseparable.nhds_eq theorem mem_open_iff (h : x ~ᵢ y) (hs : IsOpen s) : x ∈ s ↔ y ∈ s := inseparable_iff_forall_open.1 h s hs #align inseparable.mem_open_iff Inseparable.mem_open_iff theorem mem_closed_iff (h : x ~ᵢ y) (hs : IsClosed s) : x ∈ s ↔ y ∈ s := inseparable_iff_forall_closed.1 h s hs #align inseparable.mem_closed_iff Inseparable.mem_closed_iff theorem map_of_continuousAt (h : x ~ᵢ y) (hx : ContinuousAt f x) (hy : ContinuousAt f y) : f x ~ᵢ f y := (h.specializes.map_of_continuousAt hy).antisymm (h.specializes'.map_of_continuousAt hx) #align inseparable.map_of_continuous_at Inseparable.map_of_continuousAt theorem map (h : x ~ᵢ y) (hf : Continuous f) : f x ~ᵢ f y := h.map_of_continuousAt hf.continuousAt hf.continuousAt #align inseparable.map Inseparable.map end Inseparable theorem IsClosed.not_inseparable (hs : IsClosed s) (hx : x ∈ s) (hy : y ∉ s) : ¬(x ~ᵢ y) := fun h => hy <\| (h.mem_closed_iff hs).1 hx #align is_closed.not_inseparable IsClosed.not_inseparable theorem IsOpen.not_inseparable (hs : IsOpen s) (hx : x ∈ s) (hy : y ∉ s) : ¬(x ~ᵢ y) := fun h => hy <\| (h.mem_open_iff hs).1 hx #align is_open.not_inseparable IsOpen.not_inseparable /-! ### Separation quotient In this section we define the quotient of a topological space by the `Inseparable` relation. -/ variable (X) instance : TopologicalSpace (SeparationQuotient X) := instTopologicalSpaceQuotient variable {X} variable {t : Set (SeparationQuotient X)} namespace SeparationQuotient /-- The natural map from a topological space to its separation quotient. -/ def mk : X → SeparationQuotient X := Quotient.mk'' #align separation_quotient.mk SeparationQuotient.mk theorem quotientMap_mk : QuotientMap (mk : X → SeparationQuotient X) := quotientMap_quot_mk #align separation_quotient.quotient_map_mk SeparationQuotient.quotientMap_mk theorem continuous_mk : Continuous (mk : X → SeparationQuotient X) := continuous_quot_mk #align separation_quotient.continuous_mk SeparationQuotient.continuous_mk @[simp] theorem mk_eq_mk : mk x = mk y ↔ (x ~ᵢ y) := Quotient.eq'' #align separation_quotient.mk_eq_mk SeparationQuotient.mk_eq_mk theorem surjective_mk : Surjective (mk : X → SeparationQuotient X) := surjective_quot_mk _ #align separation_quotient.surjective_mk SeparationQuotient.surjective_mk @[simp] theorem range_mk : range (mk : X → SeparationQuotient X) = univ := surjective_mk.range_eq #align separation_quotient.range_mk SeparationQuotient.range_mk instance [Nonempty X] : Nonempty (SeparationQuotient X) := Nonempty.map mk ‹_› instance [Inhabited X] : Inhabited (SeparationQuotient X) := ⟨mk default⟩ instance [Subsingleton X] : Subsingleton (SeparationQuotient X) := surjective_mk.subsingleton theorem preimage_image_mk_open (hs : IsOpen s) : mk ⁻¹' (mk '' s) = s := by refine Subset.antisymm ?_ (subset_preimage_image _ _) rintro x ⟨y, hys, hxy⟩ exact ((mk_eq_mk.1 hxy).mem_open_iff hs).1 hys #align separation_quotient.preimage_image_mk_open SeparationQuotient.preimage_image_mk_open theorem isOpenMap_mk : IsOpenMap (mk : X → SeparationQuotient X) := fun s hs => quotientMap_mk.isOpen_preimage.1 <\| by rwa [preimage_image_mk_open hs] #align separation_quotient.is_open_map_mk SeparationQuotient.isOpenMap_mk theorem preimage_image_mk_closed (hs : IsClosed s) : mk ⁻¹' (mk '' s) = s := by refine Subset.antisymm ?_ (subset_preimage_image _ _) rintro x ⟨y, hys, hxy⟩ exact ((mk_eq_mk.1 hxy).mem_closed_iff hs).1 hys #align separation_quotient.preimage_image_mk_closed SeparationQuotient.preimage_image_mk_closed theorem inducing_mk : Inducing (mk : X → SeparationQuotient X) := ⟨le_antisymm (continuous_iff_le_induced.1 continuous_mk) fun s hs => ⟨mk '' s, isOpenMap_mk s hs, preimage_image_mk_open hs⟩⟩ #align separation_quotient.inducing_mk SeparationQuotient.inducing_mk theorem isClosedMap_mk : IsClosedMap (mk : X → SeparationQuotient X) := inducing_mk.isClosedMap <\| by rw [range_mk]; exact isClosed_univ #align separation_quotient.is_closed_map_mk SeparationQuotient.isClosedMap_mk @[simp] theorem comap_mk_nhds_mk : comap mk (𝓝 (mk x)) = 𝓝 x := (inducing_mk.nhds_eq_comap _).symm #align separation_quotient.comap_mk_nhds_mk SeparationQuotient.comap_mk_nhds_mk @[simp] theorem comap_mk_nhdsSet_image : comap mk (𝓝ˢ (mk '' s)) = 𝓝ˢ s := (inducing_mk.nhdsSet_eq_comap _).symm #align separation_quotient.comap_mk_nhds_set_image SeparationQuotient.comap_mk_nhdsSet_image	Mathlib/Topology/Inseparable.lean	453	454	theorem map_mk_nhds : map mk (𝓝 x) = 𝓝 (mk x) := by	rw [← comap_mk_nhds_mk, map_comap_of_surjective surjective_mk]
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.Data.Finset.Fin import Mathlib.Data.Int.Order.Units import Mathlib.GroupTheory.OrderOfElement import Mathlib.GroupTheory.Perm.Support import Mathlib.Logic.Equiv.Fintype #align_import group_theory.perm.sign from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" /-! # Permutations on `Fintype`s This file contains miscellaneous lemmas about `Equiv.Perm` and `Equiv.swap`, building on top of those in `Data/Equiv/Basic` and other files in `GroupTheory/Perm/`. -/ universe u v open Equiv Function Fintype Finset variable {α : Type u} {β : Type v} -- An example on how to determine the order of an element of a finite group. example : orderOf (-1 : ℤˣ) = 2 := orderOf_eq_prime (Int.units_sq _) (by decide) namespace Equiv.Perm section Conjugation variable [DecidableEq α] [Fintype α] {σ τ : Perm α} theorem isConj_of_support_equiv (f : { x // x ∈ (σ.support : Set α) } ≃ { x // x ∈ (τ.support : Set α) }) (hf : ∀ (x : α) (hx : x ∈ (σ.support : Set α)), (f ⟨σ x, apply_mem_support.2 hx⟩ : α) = τ ↑(f ⟨x, hx⟩)) : IsConj σ τ := by refine isConj_iff.2 ⟨Equiv.extendSubtype f, ?_⟩ rw [mul_inv_eq_iff_eq_mul] ext x simp only [Perm.mul_apply] by_cases hx : x ∈ σ.support · rw [Equiv.extendSubtype_apply_of_mem, Equiv.extendSubtype_apply_of_mem] · exact hf x (Finset.mem_coe.2 hx) · rwa [Classical.not_not.1 ((not_congr mem_support).1 (Equiv.extendSubtype_not_mem f _ _)), Classical.not_not.1 ((not_congr mem_support).mp hx)] #align equiv.perm.is_conj_of_support_equiv Equiv.Perm.isConj_of_support_equiv end Conjugation theorem perm_inv_on_of_perm_on_finset {s : Finset α} {f : Perm α} (h : ∀ x ∈ s, f x ∈ s) {y : α} (hy : y ∈ s) : f⁻¹ y ∈ s := by have h0 : ∀ y ∈ s, ∃ (x : _) (hx : x ∈ s), y = (fun i (_ : i ∈ s) => f i) x hx := Finset.surj_on_of_inj_on_of_card_le (fun x hx => (fun i _ => f i) x hx) (fun a ha => h a ha) (fun a₁ a₂ ha₁ ha₂ heq => (Equiv.apply_eq_iff_eq f).mp heq) rfl.ge obtain ⟨y2, hy2, heq⟩ := h0 y hy convert hy2 rw [heq] simp only [inv_apply_self] #align equiv.perm.perm_inv_on_of_perm_on_finset Equiv.Perm.perm_inv_on_of_perm_on_finset theorem perm_inv_mapsTo_of_mapsTo (f : Perm α) {s : Set α} [Finite s] (h : Set.MapsTo f s s) : Set.MapsTo (f⁻¹ : _) s s := by cases nonempty_fintype s exact fun x hx => Set.mem_toFinset.mp <\| perm_inv_on_of_perm_on_finset (fun a ha => Set.mem_toFinset.mpr (h (Set.mem_toFinset.mp ha))) (Set.mem_toFinset.mpr hx) #align equiv.perm.perm_inv_maps_to_of_maps_to Equiv.Perm.perm_inv_mapsTo_of_mapsTo @[simp] theorem perm_inv_mapsTo_iff_mapsTo {f : Perm α} {s : Set α} [Finite s] : Set.MapsTo (f⁻¹ : _) s s ↔ Set.MapsTo f s s := ⟨perm_inv_mapsTo_of_mapsTo f⁻¹, perm_inv_mapsTo_of_mapsTo f⟩ #align equiv.perm.perm_inv_maps_to_iff_maps_to Equiv.Perm.perm_inv_mapsTo_iff_mapsTo theorem perm_inv_on_of_perm_on_finite {f : Perm α} {p : α → Prop} [Finite { x // p x }] (h : ∀ x, p x → p (f x)) {x : α} (hx : p x) : p (f⁻¹ x) := -- Porting note: relies heavily on the definitions of `Subtype` and `setOf` unfolding to their -- underlying predicate. have : Finite { x \| p x } := ‹_› perm_inv_mapsTo_of_mapsTo (s := {x \| p x}) f h hx #align equiv.perm.perm_inv_on_of_perm_on_finite Equiv.Perm.perm_inv_on_of_perm_on_finite /-- If the permutation `f` maps `{x // p x}` into itself, then this returns the permutation on `{x // p x}` induced by `f`. Note that the `h` hypothesis is weaker than for `Equiv.Perm.subtypePerm`. -/ abbrev subtypePermOfFintype (f : Perm α) {p : α → Prop} [Finite { x // p x }] (h : ∀ x, p x → p (f x)) : Perm { x // p x } := f.subtypePerm fun x => ⟨h x, fun h₂ => f.inv_apply_self x ▸ perm_inv_on_of_perm_on_finite h h₂⟩ #align equiv.perm.subtype_perm_of_fintype Equiv.Perm.subtypePermOfFintype @[simp] theorem subtypePermOfFintype_apply (f : Perm α) {p : α → Prop} [Finite { x // p x }] (h : ∀ x, p x → p (f x)) (x : { x // p x }) : subtypePermOfFintype f h x = ⟨f x, h x x.2⟩ := rfl #align equiv.perm.subtype_perm_of_fintype_apply Equiv.Perm.subtypePermOfFintype_apply theorem subtypePermOfFintype_one (p : α → Prop) [Finite { x // p x }] (h : ∀ x, p x → p ((1 : Perm α) x)) : @subtypePermOfFintype α 1 p _ h = 1 := rfl #align equiv.perm.subtype_perm_of_fintype_one Equiv.Perm.subtypePermOfFintype_one theorem perm_mapsTo_inl_iff_mapsTo_inr {m n : Type} [Finite m] [Finite n] (σ : Perm (Sum m n)) : Set.MapsTo σ (Set.range Sum.inl) (Set.range Sum.inl) ↔ Set.MapsTo σ (Set.range Sum.inr) (Set.range Sum.inr) := by constructor <;> ( intro h classical rw [← perm_inv_mapsTo_iff_mapsTo] at h intro x cases' hx : σ x with l r) · rintro ⟨a, rfl⟩ obtain ⟨y, hy⟩ := h ⟨l, rfl⟩ rw [← hx, σ.inv_apply_self] at hy exact absurd hy Sum.inl_ne_inr · rintro _; exact ⟨r, rfl⟩ · rintro _; exact ⟨l, rfl⟩ · rintro ⟨a, rfl⟩ obtain ⟨y, hy⟩ := h ⟨r, rfl⟩ rw [← hx, σ.inv_apply_self] at hy exact absurd hy Sum.inr_ne_inl #align equiv.perm.perm_maps_to_inl_iff_maps_to_inr Equiv.Perm.perm_mapsTo_inl_iff_mapsTo_inr theorem mem_sumCongrHom_range_of_perm_mapsTo_inl {m n : Type} [Finite m] [Finite n] {σ : Perm (Sum m n)} (h : Set.MapsTo σ (Set.range Sum.inl) (Set.range Sum.inl)) : σ ∈ (sumCongrHom m n).range := by classical have h1 : ∀ x : Sum m n, (∃ a : m, Sum.inl a = x) → ∃ a : m, Sum.inl a = σ x := by rintro x ⟨a, ha⟩ apply h rw [← ha] exact ⟨a, rfl⟩ have h3 : ∀ x : Sum m n, (∃ b : n, Sum.inr b = x) → ∃ b : n, Sum.inr b = σ x := by rintro x ⟨b, hb⟩ apply (perm_mapsTo_inl_iff_mapsTo_inr σ).mp h rw [← hb] exact ⟨b, rfl⟩ let σ₁' := subtypePermOfFintype σ h1 let σ₂' := subtypePermOfFintype σ h3 let σ₁ := permCongr (Equiv.ofInjective _ Sum.inl_injective).symm σ₁' let σ₂ := permCongr (Equiv.ofInjective _ Sum.inr_injective).symm σ₂' rw [MonoidHom.mem_range, Prod.exists] use σ₁, σ₂ rw [Perm.sumCongrHom_apply] ext x cases' x with a b · rw [Equiv.sumCongr_apply, Sum.map_inl, permCongr_apply, Equiv.symm_symm, apply_ofInjective_symm Sum.inl_injective] rw [ofInjective_apply, Subtype.coe_mk, Subtype.coe_mk] -- This used to be `rw`, but we need `erw` after leanprover/lean4#2644 erw [subtypePerm_apply] · rw [Equiv.sumCongr_apply, Sum.map_inr, permCongr_apply, Equiv.symm_symm, apply_ofInjective_symm Sum.inr_injective] erw [subtypePerm_apply] rw [ofInjective_apply, Subtype.coe_mk, Subtype.coe_mk] #align equiv.perm.mem_sum_congr_hom_range_of_perm_maps_to_inl Equiv.Perm.mem_sumCongrHom_range_of_perm_mapsTo_inl nonrec theorem Disjoint.orderOf {σ τ : Perm α} (hστ : Disjoint σ τ) : orderOf (σ τ) = Nat.lcm (orderOf σ) (orderOf τ) := haveI h : ∀ n : ℕ, (σ * τ) ^ n = 1 ↔ σ ^ n = 1 ∧ τ ^ n = 1 := fun n => by rw [hστ.commute.mul_pow, Disjoint.mul_eq_one_iff (hστ.pow_disjoint_pow n n)] Nat.dvd_antisymm hστ.commute.orderOf_mul_dvd_lcm (Nat.lcm_dvd (orderOf_dvd_of_pow_eq_one ((h (orderOf (σ * τ))).mp (pow_orderOf_eq_one (σ * τ))).1) (orderOf_dvd_of_pow_eq_one ((h (orderOf (σ * τ))).mp (pow_orderOf_eq_one (σ * τ))).2)) #align equiv.perm.disjoint.order_of Equiv.Perm.Disjoint.orderOf theorem Disjoint.extendDomain {p : β → Prop} [DecidablePred p] (f : α ≃ Subtype p) {σ τ : Perm α} (h : Disjoint σ τ) : Disjoint (σ.extendDomain f) (τ.extendDomain f) := by intro b by_cases pb : p b · refine (h (f.symm ⟨b, pb⟩)).imp ?_ ?_ <;> · intro h rw [extendDomain_apply_subtype _ _ pb, h, apply_symm_apply, Subtype.coe_mk] · left rw [extendDomain_apply_not_subtype _ _ pb] #align equiv.perm.disjoint.extend_domain Equiv.Perm.Disjoint.extendDomain	Mathlib/GroupTheory/Perm/Finite.lean	187	231	theorem Disjoint.isConj_mul [Finite α] {σ τ π ρ : Perm α} (hc1 : IsConj σ π) (hc2 : IsConj τ ρ) (hd1 : Disjoint σ τ) (hd2 : Disjoint π ρ) : IsConj (σ * τ) (π * ρ) := by	classical cases nonempty_fintype α obtain ⟨f, rfl⟩ := isConj_iff.1 hc1 obtain ⟨g, rfl⟩ := isConj_iff.1 hc2 have hd1' := coe_inj.2 hd1.support_mul have hd2' := coe_inj.2 hd2.support_mul rw [coe_union] at * have hd1'' := disjoint_coe.2 (disjoint_iff_disjoint_support.1 hd1) have hd2'' := disjoint_coe.2 (disjoint_iff_disjoint_support.1 hd2) refine isConj_of_support_equiv ?_ ?_ · refine ((Equiv.Set.ofEq hd1').trans (Equiv.Set.union hd1''.le_bot)).trans ((Equiv.sumCongr (subtypeEquiv f fun a => ?_) (subtypeEquiv g fun a => ?_)).trans ((Equiv.Set.ofEq hd2').trans (Equiv.Set.union hd2''.le_bot)).symm) <;> · simp only [Set.mem_image, toEmbedding_apply, exists_eq_right, support_conj, coe_map, apply_eq_iff_eq] · intro x hx simp only [trans_apply, symm_trans_apply, Equiv.Set.ofEq_apply, Equiv.Set.ofEq_symm_apply, Equiv.sumCongr_apply] rw [hd1', Set.mem_union] at hx cases' hx with hxσ hxτ · rw [mem_coe, mem_support] at hxσ rw [Set.union_apply_left hd1''.le_bot _, Set.union_apply_left hd1''.le_bot _] · simp only [subtypeEquiv_apply, Perm.coe_mul, Sum.map_inl, comp_apply, Set.union_symm_apply_left, Subtype.coe_mk, apply_eq_iff_eq] have h := (hd2 (f x)).resolve_left ?_ · rw [mul_apply, mul_apply] at h rw [h, inv_apply_self, (hd1 x).resolve_left hxσ] · rwa [mul_apply, mul_apply, inv_apply_self, apply_eq_iff_eq] · rwa [Subtype.coe_mk, mem_coe, mem_support] · rwa [Subtype.coe_mk, Perm.mul_apply, (hd1 x).resolve_left hxσ, mem_coe, apply_mem_support, mem_support] · rw [mem_coe, ← apply_mem_support, mem_support] at hxτ rw [Set.union_apply_right hd1''.le_bot _, Set.union_apply_right hd1''.le_bot _] · simp only [subtypeEquiv_apply, Perm.coe_mul, Sum.map_inr, comp_apply, Set.union_symm_apply_right, Subtype.coe_mk, apply_eq_iff_eq] have h := (hd2 (g (τ x))).resolve_right ?_ · rw [mul_apply, mul_apply] at h rw [inv_apply_self, h, (hd1 (τ x)).resolve_right hxτ] · rwa [mul_apply, mul_apply, inv_apply_self, apply_eq_iff_eq] · rwa [Subtype.coe_mk, mem_coe, ← apply_mem_support, mem_support] · rwa [Subtype.coe_mk, Perm.mul_apply, (hd1 (τ x)).resolve_right hxτ, mem_coe, mem_support]
/- Copyright (c) 2021 Frédéric Dupuis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Frédéric Dupuis -/ import Mathlib.Analysis.Normed.Group.Hom import Mathlib.Analysis.NormedSpace.Basic import Mathlib.Analysis.NormedSpace.LinearIsometry import Mathlib.Algebra.Star.SelfAdjoint import Mathlib.Algebra.Star.Subalgebra import Mathlib.Algebra.Star.Unitary import Mathlib.Topology.Algebra.Module.Star #align_import analysis.normed_space.star.basic from "leanprover-community/mathlib"@"aa6669832974f87406a3d9d70fc5707a60546207" /-! # Normed star rings and algebras A normed star group is a normed group with a compatible `star` which is isometric. A C⋆-ring is a normed star group that is also a ring and that verifies the stronger condition `‖x⋆ * x‖ = ‖x‖^2` for all `x`. If a C⋆-ring is also a star algebra, then it is a C⋆-algebra. To get a C⋆-algebra `E` over field `𝕜`, use `[NormedField 𝕜] [StarRing 𝕜] [NormedRing E] [StarRing E] [CstarRing E] [NormedAlgebra 𝕜 E] [StarModule 𝕜 E]`. ## TODO - Show that `‖x⋆ * x‖ = ‖x‖^2` is equivalent to `‖x⋆ * x‖ = ‖x⋆‖ * ‖x‖`, which is used as the definition of C-algebras in some sources (e.g. Wikipedia). -/ open Topology local postfix:max "⋆" => star /-- A normed star group is a normed group with a compatible `star` which is isometric. -/ class NormedStarGroup (E : Type) [SeminormedAddCommGroup E] [StarAddMonoid E] : Prop where norm_star : ∀ x : E, ‖x⋆‖ = ‖x‖ #align normed_star_group NormedStarGroup export NormedStarGroup (norm_star) attribute [simp] norm_star variable {𝕜 E α : Type} section NormedStarGroup variable [SeminormedAddCommGroup E] [StarAddMonoid E] [NormedStarGroup E] @[simp] theorem nnnorm_star (x : E) : ‖star x‖₊ = ‖x‖₊ := Subtype.ext <\| norm_star _ #align nnnorm_star nnnorm_star /-- The `star` map in a normed star group is a normed group homomorphism. -/ def starNormedAddGroupHom : NormedAddGroupHom E E := { starAddEquiv with bound' := ⟨1, fun _ => le_trans (norm_star _).le (one_mul _).symm.le⟩ } #align star_normed_add_group_hom starNormedAddGroupHom /-- The `star` map in a normed star group is an isometry -/ theorem star_isometry : Isometry (star : E → E) := show Isometry starAddEquiv from AddMonoidHomClass.isometry_of_norm starAddEquiv (show ∀ x, ‖x⋆‖ = ‖x‖ from norm_star) #align star_isometry star_isometry instance (priority := 100) NormedStarGroup.to_continuousStar : ContinuousStar E := ⟨star_isometry.continuous⟩ #align normed_star_group.to_has_continuous_star NormedStarGroup.to_continuousStar end NormedStarGroup instance RingHomIsometric.starRingEnd [NormedCommRing E] [StarRing E] [NormedStarGroup E] : RingHomIsometric (starRingEnd E) := ⟨@norm_star _ _ _ _⟩ #align ring_hom_isometric.star_ring_end RingHomIsometric.starRingEnd /-- A C-ring is a normed star ring that satisfies the stronger condition `‖x⋆ * x‖ = ‖x‖^2` for every `x`. -/ class CstarRing (E : Type) [NonUnitalNormedRing E] [StarRing E] : Prop where norm_star_mul_self : ∀ {x : E}, ‖x⋆ x‖ = ‖x‖ * ‖x‖ #align cstar_ring CstarRing instance : CstarRing ℝ where norm_star_mul_self {x} := by simp only [star, id, norm_mul] namespace CstarRing section NonUnital variable [NonUnitalNormedRing E] [StarRing E] [CstarRing E] -- see Note [lower instance priority] /-- In a C-ring, star preserves the norm. -/ instance (priority := 100) to_normedStarGroup : NormedStarGroup E := ⟨by intro x by_cases htriv : x = 0 · simp only [htriv, star_zero] · have hnt : 0 < ‖x‖ := norm_pos_iff.mpr htriv have hnt_star : 0 < ‖x⋆‖ := norm_pos_iff.mpr ((AddEquiv.map_ne_zero_iff starAddEquiv (M := E)).mpr htriv) have h₁ := calc ‖x‖ ‖x‖ = ‖x⋆ * x‖ := norm_star_mul_self.symm _ ≤ ‖x⋆‖ * ‖x‖ := norm_mul_le _ _ have h₂ := calc ‖x⋆‖ * ‖x⋆‖ = ‖x * x⋆‖ := by rw [← norm_star_mul_self, star_star] _ ≤ ‖x‖ * ‖x⋆‖ := norm_mul_le _ _ exact le_antisymm (le_of_mul_le_mul_right h₂ hnt_star) (le_of_mul_le_mul_right h₁ hnt)⟩ #align cstar_ring.to_normed_star_group CstarRing.to_normedStarGroup theorem norm_self_mul_star {x : E} : ‖x * x⋆‖ = ‖x‖ * ‖x‖ := by nth_rw 1 [← star_star x] simp only [norm_star_mul_self, norm_star] #align cstar_ring.norm_self_mul_star CstarRing.norm_self_mul_star theorem norm_star_mul_self' {x : E} : ‖x⋆ * x‖ = ‖x⋆‖ * ‖x‖ := by rw [norm_star_mul_self, norm_star] #align cstar_ring.norm_star_mul_self' CstarRing.norm_star_mul_self' theorem nnnorm_self_mul_star {x : E} : ‖x * x⋆‖₊ = ‖x‖₊ * ‖x‖₊ := Subtype.ext norm_self_mul_star #align cstar_ring.nnnorm_self_mul_star CstarRing.nnnorm_self_mul_star theorem nnnorm_star_mul_self {x : E} : ‖x⋆ * x‖₊ = ‖x‖₊ * ‖x‖₊ := Subtype.ext norm_star_mul_self #align cstar_ring.nnnorm_star_mul_self CstarRing.nnnorm_star_mul_self @[simp]	Mathlib/Analysis/NormedSpace/Star/Basic.lean	135	137	theorem star_mul_self_eq_zero_iff (x : E) : x⋆ * x = 0 ↔ x = 0 := by	rw [← norm_eq_zero, norm_star_mul_self] exact mul_self_eq_zero.trans norm_eq_zero
/- Copyright (c) 2021 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne, Sébastien Gouëzel -/ import Mathlib.Analysis.NormedSpace.BoundedLinearMaps import Mathlib.MeasureTheory.Measure.WithDensity import Mathlib.MeasureTheory.Function.SimpleFuncDense import Mathlib.Topology.Algebra.Module.FiniteDimension #align_import measure_theory.function.strongly_measurable.basic from "leanprover-community/mathlib"@"3b52265189f3fb43aa631edffce5d060fafaf82f" /-! # Strongly measurable and finitely strongly measurable functions A function `f` is said to be strongly measurable if `f` is the sequential limit of simple functions. It is said to be finitely strongly measurable with respect to a measure `μ` if the supports of those simple functions have finite measure. We also provide almost everywhere versions of these notions. Almost everywhere strongly measurable functions form the largest class of functions that can be integrated using the Bochner integral. If the target space has a second countable topology, strongly measurable and measurable are equivalent. If the measure is sigma-finite, strongly measurable and finitely strongly measurable are equivalent. The main property of finitely strongly measurable functions is `FinStronglyMeasurable.exists_set_sigmaFinite`: there exists a measurable set `t` such that the function is supported on `t` and `μ.restrict t` is sigma-finite. As a consequence, we can prove some results for those functions as if the measure was sigma-finite. ## Main definitions * `StronglyMeasurable f`: `f : α → β` is the limit of a sequence `fs : ℕ → SimpleFunc α β`. * `FinStronglyMeasurable f μ`: `f : α → β` is the limit of a sequence `fs : ℕ → SimpleFunc α β` such that for all `n ∈ ℕ`, the measure of the support of `fs n` is finite. * `AEStronglyMeasurable f μ`: `f` is almost everywhere equal to a `StronglyMeasurable` function. * `AEFinStronglyMeasurable f μ`: `f` is almost everywhere equal to a `FinStronglyMeasurable` function. * `AEFinStronglyMeasurable.sigmaFiniteSet`: a measurable set `t` such that `f =ᵐ[μ.restrict tᶜ] 0` and `μ.restrict t` is sigma-finite. ## Main statements * `AEFinStronglyMeasurable.exists_set_sigmaFinite`: there exists a measurable set `t` such that `f =ᵐ[μ.restrict tᶜ] 0` and `μ.restrict t` is sigma-finite. We provide a solid API for strongly measurable functions, and for almost everywhere strongly measurable functions, as a basis for the Bochner integral. ## References * Hytönen, Tuomas, Jan Van Neerven, Mark Veraar, and Lutz Weis. Analysis in Banach spaces. Springer, 2016. -/ open MeasureTheory Filter TopologicalSpace Function Set MeasureTheory.Measure open ENNReal Topology MeasureTheory NNReal variable {α β γ ι : Type} [Countable ι] namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc section Definitions variable [TopologicalSpace β] /-- A function is `StronglyMeasurable` if it is the limit of simple functions. -/ def StronglyMeasurable [MeasurableSpace α] (f : α → β) : Prop := ∃ fs : ℕ → α →ₛ β, ∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x)) #align measure_theory.strongly_measurable MeasureTheory.StronglyMeasurable /-- The notation for StronglyMeasurable giving the measurable space instance explicitly. -/ scoped notation "StronglyMeasurable[" m "]" => @MeasureTheory.StronglyMeasurable _ _ _ m /-- A function is `FinStronglyMeasurable` with respect to a measure if it is the limit of simple functions with support with finite measure. -/ def FinStronglyMeasurable [Zero β] {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := ∃ fs : ℕ → α →ₛ β, (∀ n, μ (support (fs n)) < ∞) ∧ ∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x)) #align measure_theory.fin_strongly_measurable MeasureTheory.FinStronglyMeasurable /-- A function is `AEStronglyMeasurable` with respect to a measure `μ` if it is almost everywhere equal to the limit of a sequence of simple functions. -/ def AEStronglyMeasurable {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := ∃ g, StronglyMeasurable g ∧ f =ᵐ[μ] g #align measure_theory.ae_strongly_measurable MeasureTheory.AEStronglyMeasurable /-- A function is `AEFinStronglyMeasurable` with respect to a measure if it is almost everywhere equal to the limit of a sequence of simple functions with support with finite measure. -/ def AEFinStronglyMeasurable [Zero β] {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := ∃ g, FinStronglyMeasurable g μ ∧ f =ᵐ[μ] g #align measure_theory.ae_fin_strongly_measurable MeasureTheory.AEFinStronglyMeasurable end Definitions open MeasureTheory /-! ## Strongly measurable functions -/ @[aesop 30% apply (rule_sets := [Measurable])] protected theorem StronglyMeasurable.aestronglyMeasurable {α β} {_ : MeasurableSpace α} [TopologicalSpace β] {f : α → β} {μ : Measure α} (hf : StronglyMeasurable f) : AEStronglyMeasurable f μ := ⟨f, hf, EventuallyEq.refl _ _⟩ #align measure_theory.strongly_measurable.ae_strongly_measurable MeasureTheory.StronglyMeasurable.aestronglyMeasurable @[simp] theorem Subsingleton.stronglyMeasurable {α β} [MeasurableSpace α] [TopologicalSpace β] [Subsingleton β] (f : α → β) : StronglyMeasurable f := by let f_sf : α →ₛ β := ⟨f, fun x => ?_, Set.Subsingleton.finite Set.subsingleton_of_subsingleton⟩ · exact ⟨fun _ => f_sf, fun x => tendsto_const_nhds⟩ · have h_univ : f ⁻¹' {x} = Set.univ := by ext1 y simp [eq_iff_true_of_subsingleton] rw [h_univ] exact MeasurableSet.univ #align measure_theory.subsingleton.strongly_measurable MeasureTheory.Subsingleton.stronglyMeasurable theorem SimpleFunc.stronglyMeasurable {α β} {_ : MeasurableSpace α} [TopologicalSpace β] (f : α →ₛ β) : StronglyMeasurable f := ⟨fun _ => f, fun _ => tendsto_const_nhds⟩ #align measure_theory.simple_func.strongly_measurable MeasureTheory.SimpleFunc.stronglyMeasurable @[nontriviality] theorem StronglyMeasurable.of_finite [Finite α] {_ : MeasurableSpace α} [MeasurableSingletonClass α] [TopologicalSpace β] (f : α → β) : StronglyMeasurable f := ⟨fun _ => SimpleFunc.ofFinite f, fun _ => tendsto_const_nhds⟩ @[deprecated (since := "2024-02-05")] alias stronglyMeasurable_of_fintype := StronglyMeasurable.of_finite @[deprecated StronglyMeasurable.of_finite (since := "2024-02-06")] theorem stronglyMeasurable_of_isEmpty [IsEmpty α] {_ : MeasurableSpace α} [TopologicalSpace β] (f : α → β) : StronglyMeasurable f := .of_finite f #align measure_theory.strongly_measurable_of_is_empty MeasureTheory.StronglyMeasurable.of_finite theorem stronglyMeasurable_const {α β} {_ : MeasurableSpace α} [TopologicalSpace β] {b : β} : StronglyMeasurable fun _ : α => b := ⟨fun _ => SimpleFunc.const α b, fun _ => tendsto_const_nhds⟩ #align measure_theory.strongly_measurable_const MeasureTheory.stronglyMeasurable_const @[to_additive] theorem stronglyMeasurable_one {α β} {_ : MeasurableSpace α} [TopologicalSpace β] [One β] : StronglyMeasurable (1 : α → β) := stronglyMeasurable_const #align measure_theory.strongly_measurable_one MeasureTheory.stronglyMeasurable_one #align measure_theory.strongly_measurable_zero MeasureTheory.stronglyMeasurable_zero /-- A version of `stronglyMeasurable_const` that assumes `f x = f y` for all `x, y`. This version works for functions between empty types. -/ theorem stronglyMeasurable_const' {α β} {m : MeasurableSpace α} [TopologicalSpace β] {f : α → β} (hf : ∀ x y, f x = f y) : StronglyMeasurable f := by nontriviality α inhabit α convert stronglyMeasurable_const (β := β) using 1 exact funext fun x => hf x default #align measure_theory.strongly_measurable_const' MeasureTheory.stronglyMeasurable_const' -- Porting note: changed binding type of `MeasurableSpace α`. @[simp] theorem Subsingleton.stronglyMeasurable' {α β} [MeasurableSpace α] [TopologicalSpace β] [Subsingleton α] (f : α → β) : StronglyMeasurable f := stronglyMeasurable_const' fun x y => by rw [Subsingleton.elim x y] #align measure_theory.subsingleton.strongly_measurable' MeasureTheory.Subsingleton.stronglyMeasurable' namespace StronglyMeasurable variable {f g : α → β} section BasicPropertiesInAnyTopologicalSpace variable [TopologicalSpace β] /-- A sequence of simple functions such that `∀ x, Tendsto (fun n => hf.approx n x) atTop (𝓝 (f x))`. That property is given by `stronglyMeasurable.tendsto_approx`. -/ protected noncomputable def approx {_ : MeasurableSpace α} (hf : StronglyMeasurable f) : ℕ → α →ₛ β := hf.choose #align measure_theory.strongly_measurable.approx MeasureTheory.StronglyMeasurable.approx protected theorem tendsto_approx {_ : MeasurableSpace α} (hf : StronglyMeasurable f) : ∀ x, Tendsto (fun n => hf.approx n x) atTop (𝓝 (f x)) := hf.choose_spec #align measure_theory.strongly_measurable.tendsto_approx MeasureTheory.StronglyMeasurable.tendsto_approx /-- Similar to `stronglyMeasurable.approx`, but enforces that the norm of every function in the sequence is less than `c` everywhere. If `‖f x‖ ≤ c` this sequence of simple functions verifies `Tendsto (fun n => hf.approxBounded n x) atTop (𝓝 (f x))`. -/ noncomputable def approxBounded {_ : MeasurableSpace α} [Norm β] [SMul ℝ β] (hf : StronglyMeasurable f) (c : ℝ) : ℕ → SimpleFunc α β := fun n => (hf.approx n).map fun x => min 1 (c / ‖x‖) • x #align measure_theory.strongly_measurable.approx_bounded MeasureTheory.StronglyMeasurable.approxBounded theorem tendsto_approxBounded_of_norm_le {β} {f : α → β} [NormedAddCommGroup β] [NormedSpace ℝ β] {m : MeasurableSpace α} (hf : StronglyMeasurable[m] f) {c : ℝ} {x : α} (hfx : ‖f x‖ ≤ c) : Tendsto (fun n => hf.approxBounded c n x) atTop (𝓝 (f x)) := by have h_tendsto := hf.tendsto_approx x simp only [StronglyMeasurable.approxBounded, SimpleFunc.coe_map, Function.comp_apply] by_cases hfx0 : ‖f x‖ = 0 · rw [norm_eq_zero] at hfx0 rw [hfx0] at h_tendsto ⊢ have h_tendsto_norm : Tendsto (fun n => ‖hf.approx n x‖) atTop (𝓝 0) := by convert h_tendsto.norm rw [norm_zero] refine squeeze_zero_norm (fun n => ?_) h_tendsto_norm calc ‖min 1 (c / ‖hf.approx n x‖) • hf.approx n x‖ = ‖min 1 (c / ‖hf.approx n x‖)‖ ‖hf.approx n x‖ := norm_smul _ _ _ ≤ ‖(1 : ℝ)‖ * ‖hf.approx n x‖ := by refine mul_le_mul_of_nonneg_right ?_ (norm_nonneg _) rw [norm_one, Real.norm_of_nonneg] · exact min_le_left _ _ · exact le_min zero_le_one (div_nonneg ((norm_nonneg _).trans hfx) (norm_nonneg _)) _ = ‖hf.approx n x‖ := by rw [norm_one, one_mul] rw [← one_smul ℝ (f x)] refine Tendsto.smul ?_ h_tendsto have : min 1 (c / ‖f x‖) = 1 := by rw [min_eq_left_iff, one_le_div (lt_of_le_of_ne (norm_nonneg _) (Ne.symm hfx0))] exact hfx nth_rw 2 [this.symm] refine Tendsto.min tendsto_const_nhds ?_ exact Tendsto.div tendsto_const_nhds h_tendsto.norm hfx0 #align measure_theory.strongly_measurable.tendsto_approx_bounded_of_norm_le MeasureTheory.StronglyMeasurable.tendsto_approxBounded_of_norm_le theorem tendsto_approxBounded_ae {β} {f : α → β} [NormedAddCommGroup β] [NormedSpace ℝ β] {m m0 : MeasurableSpace α} {μ : Measure α} (hf : StronglyMeasurable[m] f) {c : ℝ} (hf_bound : ∀ᵐ x ∂μ, ‖f x‖ ≤ c) : ∀ᵐ x ∂μ, Tendsto (fun n => hf.approxBounded c n x) atTop (𝓝 (f x)) := by filter_upwards [hf_bound] with x hfx using tendsto_approxBounded_of_norm_le hf hfx #align measure_theory.strongly_measurable.tendsto_approx_bounded_ae MeasureTheory.StronglyMeasurable.tendsto_approxBounded_ae theorem norm_approxBounded_le {β} {f : α → β} [SeminormedAddCommGroup β] [NormedSpace ℝ β] {m : MeasurableSpace α} {c : ℝ} (hf : StronglyMeasurable[m] f) (hc : 0 ≤ c) (n : ℕ) (x : α) : ‖hf.approxBounded c n x‖ ≤ c := by simp only [StronglyMeasurable.approxBounded, SimpleFunc.coe_map, Function.comp_apply] refine (norm_smul_le _ _).trans ?_ by_cases h0 : ‖hf.approx n x‖ = 0 · simp only [h0, _root_.div_zero, min_eq_right, zero_le_one, norm_zero, mul_zero] exact hc rcases le_total ‖hf.approx n x‖ c with h \| h · rw [min_eq_left _] · simpa only [norm_one, one_mul] using h · rwa [one_le_div (lt_of_le_of_ne (norm_nonneg _) (Ne.symm h0))] · rw [min_eq_right _] · rw [norm_div, norm_norm, mul_comm, mul_div, div_eq_mul_inv, mul_comm, ← mul_assoc, inv_mul_cancel h0, one_mul, Real.norm_of_nonneg hc] · rwa [div_le_one (lt_of_le_of_ne (norm_nonneg _) (Ne.symm h0))] #align measure_theory.strongly_measurable.norm_approx_bounded_le MeasureTheory.StronglyMeasurable.norm_approxBounded_le theorem _root_.stronglyMeasurable_bot_iff [Nonempty β] [T2Space β] : StronglyMeasurable[⊥] f ↔ ∃ c, f = fun _ => c := by cases' isEmpty_or_nonempty α with hα hα · simp only [@Subsingleton.stronglyMeasurable' _ _ ⊥ _ _ f, eq_iff_true_of_subsingleton, exists_const] refine ⟨fun hf => ?_, fun hf_eq => ?_⟩ · refine ⟨f hα.some, ?_⟩ let fs := hf.approx have h_fs_tendsto : ∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x)) := hf.tendsto_approx have : ∀ n, ∃ c, ∀ x, fs n x = c := fun n => SimpleFunc.simpleFunc_bot (fs n) let cs n := (this n).choose have h_cs_eq : ∀ n, ⇑(fs n) = fun _ => cs n := fun n => funext (this n).choose_spec conv at h_fs_tendsto => enter [x, 1, n]; rw [h_cs_eq] have h_tendsto : Tendsto cs atTop (𝓝 (f hα.some)) := h_fs_tendsto hα.some ext1 x exact tendsto_nhds_unique (h_fs_tendsto x) h_tendsto · obtain ⟨c, rfl⟩ := hf_eq exact stronglyMeasurable_const #align strongly_measurable_bot_iff stronglyMeasurable_bot_iff end BasicPropertiesInAnyTopologicalSpace theorem finStronglyMeasurable_of_set_sigmaFinite [TopologicalSpace β] [Zero β] {m : MeasurableSpace α} {μ : Measure α} (hf_meas : StronglyMeasurable f) {t : Set α} (ht : MeasurableSet t) (hft_zero : ∀ x ∈ tᶜ, f x = 0) (htμ : SigmaFinite (μ.restrict t)) : FinStronglyMeasurable f μ := by haveI : SigmaFinite (μ.restrict t) := htμ let S := spanningSets (μ.restrict t) have hS_meas : ∀ n, MeasurableSet (S n) := measurable_spanningSets (μ.restrict t) let f_approx := hf_meas.approx let fs n := SimpleFunc.restrict (f_approx n) (S n ∩ t) have h_fs_t_compl : ∀ n, ∀ x, x ∉ t → fs n x = 0 := by intro n x hxt rw [SimpleFunc.restrict_apply _ ((hS_meas n).inter ht)] refine Set.indicator_of_not_mem ?_ _ simp [hxt] refine ⟨fs, ?_, fun x => ?_⟩ · simp_rw [SimpleFunc.support_eq] refine fun n => (measure_biUnion_finset_le _ _).trans_lt ?_ refine ENNReal.sum_lt_top_iff.mpr fun y hy => ?_ rw [SimpleFunc.restrict_preimage_singleton _ ((hS_meas n).inter ht)] swap · letI : (y : β) → Decidable (y = 0) := fun y => Classical.propDecidable _ rw [Finset.mem_filter] at hy exact hy.2 refine (measure_mono Set.inter_subset_left).trans_lt ?_ have h_lt_top := measure_spanningSets_lt_top (μ.restrict t) n rwa [Measure.restrict_apply' ht] at h_lt_top · by_cases hxt : x ∈ t swap · rw [funext fun n => h_fs_t_compl n x hxt, hft_zero x hxt] exact tendsto_const_nhds have h : Tendsto (fun n => (f_approx n) x) atTop (𝓝 (f x)) := hf_meas.tendsto_approx x obtain ⟨n₁, hn₁⟩ : ∃ n, ∀ m, n ≤ m → fs m x = f_approx m x := by obtain ⟨n, hn⟩ : ∃ n, ∀ m, n ≤ m → x ∈ S m ∩ t := by rsuffices ⟨n, hn⟩ : ∃ n, ∀ m, n ≤ m → x ∈ S m · exact ⟨n, fun m hnm => Set.mem_inter (hn m hnm) hxt⟩ rsuffices ⟨n, hn⟩ : ∃ n, x ∈ S n · exact ⟨n, fun m hnm => monotone_spanningSets (μ.restrict t) hnm hn⟩ rw [← Set.mem_iUnion, iUnion_spanningSets (μ.restrict t)] trivial refine ⟨n, fun m hnm => ?_⟩ simp_rw [fs, SimpleFunc.restrict_apply _ ((hS_meas m).inter ht), Set.indicator_of_mem (hn m hnm)] rw [tendsto_atTop'] at h ⊢ intro s hs obtain ⟨n₂, hn₂⟩ := h s hs refine ⟨max n₁ n₂, fun m hm => ?_⟩ rw [hn₁ m ((le_max_left _ _).trans hm.le)] exact hn₂ m ((le_max_right _ _).trans hm.le) #align measure_theory.strongly_measurable.fin_strongly_measurable_of_set_sigma_finite MeasureTheory.StronglyMeasurable.finStronglyMeasurable_of_set_sigmaFinite /-- If the measure is sigma-finite, all strongly measurable functions are `FinStronglyMeasurable`. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem finStronglyMeasurable [TopologicalSpace β] [Zero β] {m0 : MeasurableSpace α} (hf : StronglyMeasurable f) (μ : Measure α) [SigmaFinite μ] : FinStronglyMeasurable f μ := hf.finStronglyMeasurable_of_set_sigmaFinite MeasurableSet.univ (by simp) (by rwa [Measure.restrict_univ]) #align measure_theory.strongly_measurable.fin_strongly_measurable MeasureTheory.StronglyMeasurable.finStronglyMeasurable /-- A strongly measurable function is measurable. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem measurable {_ : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (hf : StronglyMeasurable f) : Measurable f := measurable_of_tendsto_metrizable (fun n => (hf.approx n).measurable) (tendsto_pi_nhds.mpr hf.tendsto_approx) #align measure_theory.strongly_measurable.measurable MeasureTheory.StronglyMeasurable.measurable /-- A strongly measurable function is almost everywhere measurable. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem aemeasurable {_ : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] {μ : Measure α} (hf : StronglyMeasurable f) : AEMeasurable f μ := hf.measurable.aemeasurable #align measure_theory.strongly_measurable.ae_measurable MeasureTheory.StronglyMeasurable.aemeasurable theorem _root_.Continuous.comp_stronglyMeasurable {_ : MeasurableSpace α} [TopologicalSpace β] [TopologicalSpace γ] {g : β → γ} {f : α → β} (hg : Continuous g) (hf : StronglyMeasurable f) : StronglyMeasurable fun x => g (f x) := ⟨fun n => SimpleFunc.map g (hf.approx n), fun x => (hg.tendsto _).comp (hf.tendsto_approx x)⟩ #align continuous.comp_strongly_measurable Continuous.comp_stronglyMeasurable @[to_additive] nonrec theorem measurableSet_mulSupport {m : MeasurableSpace α} [One β] [TopologicalSpace β] [MetrizableSpace β] (hf : StronglyMeasurable f) : MeasurableSet (mulSupport f) := by borelize β exact measurableSet_mulSupport hf.measurable #align measure_theory.strongly_measurable.measurable_set_mul_support MeasureTheory.StronglyMeasurable.measurableSet_mulSupport #align measure_theory.strongly_measurable.measurable_set_support MeasureTheory.StronglyMeasurable.measurableSet_support protected theorem mono {m m' : MeasurableSpace α} [TopologicalSpace β] (hf : StronglyMeasurable[m'] f) (h_mono : m' ≤ m) : StronglyMeasurable[m] f := by let f_approx : ℕ → @SimpleFunc α m β := fun n => @SimpleFunc.mk α m β (hf.approx n) (fun x => h_mono _ (SimpleFunc.measurableSet_fiber' _ x)) (SimpleFunc.finite_range (hf.approx n)) exact ⟨f_approx, hf.tendsto_approx⟩ #align measure_theory.strongly_measurable.mono MeasureTheory.StronglyMeasurable.mono protected theorem prod_mk {m : MeasurableSpace α} [TopologicalSpace β] [TopologicalSpace γ] {f : α → β} {g : α → γ} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable fun x => (f x, g x) := by refine ⟨fun n => SimpleFunc.pair (hf.approx n) (hg.approx n), fun x => ?_⟩ rw [nhds_prod_eq] exact Tendsto.prod_mk (hf.tendsto_approx x) (hg.tendsto_approx x) #align measure_theory.strongly_measurable.prod_mk MeasureTheory.StronglyMeasurable.prod_mk theorem comp_measurable [TopologicalSpace β] {_ : MeasurableSpace α} {_ : MeasurableSpace γ} {f : α → β} {g : γ → α} (hf : StronglyMeasurable f) (hg : Measurable g) : StronglyMeasurable (f ∘ g) := ⟨fun n => SimpleFunc.comp (hf.approx n) g hg, fun x => hf.tendsto_approx (g x)⟩ #align measure_theory.strongly_measurable.comp_measurable MeasureTheory.StronglyMeasurable.comp_measurable theorem of_uncurry_left [TopologicalSpace β] {_ : MeasurableSpace α} {_ : MeasurableSpace γ} {f : α → γ → β} (hf : StronglyMeasurable (uncurry f)) {x : α} : StronglyMeasurable (f x) := hf.comp_measurable measurable_prod_mk_left #align measure_theory.strongly_measurable.of_uncurry_left MeasureTheory.StronglyMeasurable.of_uncurry_left theorem of_uncurry_right [TopologicalSpace β] {_ : MeasurableSpace α} {_ : MeasurableSpace γ} {f : α → γ → β} (hf : StronglyMeasurable (uncurry f)) {y : γ} : StronglyMeasurable fun x => f x y := hf.comp_measurable measurable_prod_mk_right #align measure_theory.strongly_measurable.of_uncurry_right MeasureTheory.StronglyMeasurable.of_uncurry_right section Arithmetic variable {mα : MeasurableSpace α} [TopologicalSpace β] @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem mul [Mul β] [ContinuousMul β] (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (f * g) := ⟨fun n => hf.approx n * hg.approx n, fun x => (hf.tendsto_approx x).mul (hg.tendsto_approx x)⟩ #align measure_theory.strongly_measurable.mul MeasureTheory.StronglyMeasurable.mul #align measure_theory.strongly_measurable.add MeasureTheory.StronglyMeasurable.add @[to_additive (attr := measurability)] theorem mul_const [Mul β] [ContinuousMul β] (hf : StronglyMeasurable f) (c : β) : StronglyMeasurable fun x => f x * c := hf.mul stronglyMeasurable_const #align measure_theory.strongly_measurable.mul_const MeasureTheory.StronglyMeasurable.mul_const #align measure_theory.strongly_measurable.add_const MeasureTheory.StronglyMeasurable.add_const @[to_additive (attr := measurability)] theorem const_mul [Mul β] [ContinuousMul β] (hf : StronglyMeasurable f) (c : β) : StronglyMeasurable fun x => c * f x := stronglyMeasurable_const.mul hf #align measure_theory.strongly_measurable.const_mul MeasureTheory.StronglyMeasurable.const_mul #align measure_theory.strongly_measurable.const_add MeasureTheory.StronglyMeasurable.const_add @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable])) const_nsmul] protected theorem pow [Monoid β] [ContinuousMul β] (hf : StronglyMeasurable f) (n : ℕ) : StronglyMeasurable (f ^ n) := ⟨fun k => hf.approx k ^ n, fun x => (hf.tendsto_approx x).pow n⟩ @[to_additive (attr := measurability)] protected theorem inv [Inv β] [ContinuousInv β] (hf : StronglyMeasurable f) : StronglyMeasurable f⁻¹ := ⟨fun n => (hf.approx n)⁻¹, fun x => (hf.tendsto_approx x).inv⟩ #align measure_theory.strongly_measurable.inv MeasureTheory.StronglyMeasurable.inv #align measure_theory.strongly_measurable.neg MeasureTheory.StronglyMeasurable.neg @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem div [Div β] [ContinuousDiv β] (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (f / g) := ⟨fun n => hf.approx n / hg.approx n, fun x => (hf.tendsto_approx x).div' (hg.tendsto_approx x)⟩ #align measure_theory.strongly_measurable.div MeasureTheory.StronglyMeasurable.div #align measure_theory.strongly_measurable.sub MeasureTheory.StronglyMeasurable.sub @[to_additive] theorem mul_iff_right [CommGroup β] [TopologicalGroup β] (hf : StronglyMeasurable f) : StronglyMeasurable (f * g) ↔ StronglyMeasurable g := ⟨fun h ↦ show g = f * g * f⁻¹ by simp only [mul_inv_cancel_comm] ▸ h.mul hf.inv, fun h ↦ hf.mul h⟩ @[to_additive] theorem mul_iff_left [CommGroup β] [TopologicalGroup β] (hf : StronglyMeasurable f) : StronglyMeasurable (g * f) ↔ StronglyMeasurable g := mul_comm g f ▸ mul_iff_right hf @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem smul {𝕜} [TopologicalSpace 𝕜] [SMul 𝕜 β] [ContinuousSMul 𝕜 β] {f : α → 𝕜} {g : α → β} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable fun x => f x • g x := continuous_smul.comp_stronglyMeasurable (hf.prod_mk hg) #align measure_theory.strongly_measurable.smul MeasureTheory.StronglyMeasurable.smul #align measure_theory.strongly_measurable.vadd MeasureTheory.StronglyMeasurable.vadd @[to_additive (attr := measurability)] protected theorem const_smul {𝕜} [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (hf : StronglyMeasurable f) (c : 𝕜) : StronglyMeasurable (c • f) := ⟨fun n => c • hf.approx n, fun x => (hf.tendsto_approx x).const_smul c⟩ #align measure_theory.strongly_measurable.const_smul MeasureTheory.StronglyMeasurable.const_smul @[to_additive (attr := measurability)] protected theorem const_smul' {𝕜} [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (hf : StronglyMeasurable f) (c : 𝕜) : StronglyMeasurable fun x => c • f x := hf.const_smul c #align measure_theory.strongly_measurable.const_smul' MeasureTheory.StronglyMeasurable.const_smul' @[to_additive (attr := measurability)] protected theorem smul_const {𝕜} [TopologicalSpace 𝕜] [SMul 𝕜 β] [ContinuousSMul 𝕜 β] {f : α → 𝕜} (hf : StronglyMeasurable f) (c : β) : StronglyMeasurable fun x => f x • c := continuous_smul.comp_stronglyMeasurable (hf.prod_mk stronglyMeasurable_const) #align measure_theory.strongly_measurable.smul_const MeasureTheory.StronglyMeasurable.smul_const #align measure_theory.strongly_measurable.vadd_const MeasureTheory.StronglyMeasurable.vadd_const /-- In a normed vector space, the addition of a measurable function and a strongly measurable function is measurable. Note that this is not true without further second-countability assumptions for the addition of two measurable functions. -/ theorem _root_.Measurable.add_stronglyMeasurable {α E : Type} {_ : MeasurableSpace α} [AddGroup E] [TopologicalSpace E] [MeasurableSpace E] [BorelSpace E] [ContinuousAdd E] [PseudoMetrizableSpace E] {g f : α → E} (hg : Measurable g) (hf : StronglyMeasurable f) : Measurable (g + f) := by rcases hf with ⟨φ, hφ⟩ have : Tendsto (fun n x ↦ g x + φ n x) atTop (𝓝 (g + f)) := tendsto_pi_nhds.2 (fun x ↦ tendsto_const_nhds.add (hφ x)) apply measurable_of_tendsto_metrizable (fun n ↦ ?_) this exact hg.add_simpleFunc _ /-- In a normed vector space, the subtraction of a measurable function and a strongly measurable function is measurable. Note that this is not true without further second-countability assumptions for the subtraction of two measurable functions. -/ theorem _root_.Measurable.sub_stronglyMeasurable {α E : Type} {_ : MeasurableSpace α} [AddCommGroup E] [TopologicalSpace E] [MeasurableSpace E] [BorelSpace E] [ContinuousAdd E] [ContinuousNeg E] [PseudoMetrizableSpace E] {g f : α → E} (hg : Measurable g) (hf : StronglyMeasurable f) : Measurable (g - f) := by rw [sub_eq_add_neg] exact hg.add_stronglyMeasurable hf.neg /-- In a normed vector space, the addition of a strongly measurable function and a measurable function is measurable. Note that this is not true without further second-countability assumptions for the addition of two measurable functions. -/ theorem _root_.Measurable.stronglyMeasurable_add {α E : Type} {_ : MeasurableSpace α} [AddGroup E] [TopologicalSpace E] [MeasurableSpace E] [BorelSpace E] [ContinuousAdd E] [PseudoMetrizableSpace E] {g f : α → E} (hg : Measurable g) (hf : StronglyMeasurable f) : Measurable (f + g) := by rcases hf with ⟨φ, hφ⟩ have : Tendsto (fun n x ↦ φ n x + g x) atTop (𝓝 (f + g)) := tendsto_pi_nhds.2 (fun x ↦ (hφ x).add tendsto_const_nhds) apply measurable_of_tendsto_metrizable (fun n ↦ ?_) this exact hg.simpleFunc_add _ end Arithmetic section MulAction variable {M G G₀ : Type} variable [TopologicalSpace β] variable [Monoid M] [MulAction M β] [ContinuousConstSMul M β] variable [Group G] [MulAction G β] [ContinuousConstSMul G β] variable [GroupWithZero G₀] [MulAction G₀ β] [ContinuousConstSMul G₀ β] theorem _root_.stronglyMeasurable_const_smul_iff {m : MeasurableSpace α} (c : G) : (StronglyMeasurable fun x => c • f x) ↔ StronglyMeasurable f := ⟨fun h => by simpa only [inv_smul_smul] using h.const_smul' c⁻¹, fun h => h.const_smul c⟩ #align strongly_measurable_const_smul_iff stronglyMeasurable_const_smul_iff nonrec theorem _root_.IsUnit.stronglyMeasurable_const_smul_iff {_ : MeasurableSpace α} {c : M} (hc : IsUnit c) : (StronglyMeasurable fun x => c • f x) ↔ StronglyMeasurable f := let ⟨u, hu⟩ := hc hu ▸ stronglyMeasurable_const_smul_iff u #align is_unit.strongly_measurable_const_smul_iff IsUnit.stronglyMeasurable_const_smul_iff theorem _root_.stronglyMeasurable_const_smul_iff₀ {_ : MeasurableSpace α} {c : G₀} (hc : c ≠ 0) : (StronglyMeasurable fun x => c • f x) ↔ StronglyMeasurable f := (IsUnit.mk0 _ hc).stronglyMeasurable_const_smul_iff #align strongly_measurable_const_smul_iff₀ stronglyMeasurable_const_smul_iff₀ end MulAction section Order variable [MeasurableSpace α] [TopologicalSpace β] open Filter open Filter @[aesop safe 20 (rule_sets := [Measurable])] protected theorem sup [Sup β] [ContinuousSup β] (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (f ⊔ g) := ⟨fun n => hf.approx n ⊔ hg.approx n, fun x => (hf.tendsto_approx x).sup_nhds (hg.tendsto_approx x)⟩ #align measure_theory.strongly_measurable.sup MeasureTheory.StronglyMeasurable.sup @[aesop safe 20 (rule_sets := [Measurable])] protected theorem inf [Inf β] [ContinuousInf β] (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (f ⊓ g) := ⟨fun n => hf.approx n ⊓ hg.approx n, fun x => (hf.tendsto_approx x).inf_nhds (hg.tendsto_approx x)⟩ #align measure_theory.strongly_measurable.inf MeasureTheory.StronglyMeasurable.inf end Order /-! ### Big operators: `∏` and `∑` -/ section Monoid variable {M : Type} [Monoid M] [TopologicalSpace M] [ContinuousMul M] {m : MeasurableSpace α} @[to_additive (attr := measurability)] theorem _root_.List.stronglyMeasurable_prod' (l : List (α → M)) (hl : ∀ f ∈ l, StronglyMeasurable f) : StronglyMeasurable l.prod := by induction' l with f l ihl; · exact stronglyMeasurable_one rw [List.forall_mem_cons] at hl rw [List.prod_cons] exact hl.1.mul (ihl hl.2) #align list.strongly_measurable_prod' List.stronglyMeasurable_prod' #align list.strongly_measurable_sum' List.stronglyMeasurable_sum' @[to_additive (attr := measurability)] theorem _root_.List.stronglyMeasurable_prod (l : List (α → M)) (hl : ∀ f ∈ l, StronglyMeasurable f) : StronglyMeasurable fun x => (l.map fun f : α → M => f x).prod := by simpa only [← Pi.list_prod_apply] using l.stronglyMeasurable_prod' hl #align list.strongly_measurable_prod List.stronglyMeasurable_prod #align list.strongly_measurable_sum List.stronglyMeasurable_sum end Monoid section CommMonoid variable {M : Type} [CommMonoid M] [TopologicalSpace M] [ContinuousMul M] {m : MeasurableSpace α} @[to_additive (attr := measurability)] theorem _root_.Multiset.stronglyMeasurable_prod' (l : Multiset (α → M)) (hl : ∀ f ∈ l, StronglyMeasurable f) : StronglyMeasurable l.prod := by rcases l with ⟨l⟩ simpa using l.stronglyMeasurable_prod' (by simpa using hl) #align multiset.strongly_measurable_prod' Multiset.stronglyMeasurable_prod' #align multiset.strongly_measurable_sum' Multiset.stronglyMeasurable_sum' @[to_additive (attr := measurability)] theorem _root_.Multiset.stronglyMeasurable_prod (s : Multiset (α → M)) (hs : ∀ f ∈ s, StronglyMeasurable f) : StronglyMeasurable fun x => (s.map fun f : α → M => f x).prod := by simpa only [← Pi.multiset_prod_apply] using s.stronglyMeasurable_prod' hs #align multiset.strongly_measurable_prod Multiset.stronglyMeasurable_prod #align multiset.strongly_measurable_sum Multiset.stronglyMeasurable_sum @[to_additive (attr := measurability)] theorem _root_.Finset.stronglyMeasurable_prod' {ι : Type} {f : ι → α → M} (s : Finset ι) (hf : ∀ i ∈ s, StronglyMeasurable (f i)) : StronglyMeasurable (∏ i ∈ s, f i) := Finset.prod_induction _ _ (fun _a _b ha hb => ha.mul hb) (@stronglyMeasurable_one α M _ _ _) hf #align finset.strongly_measurable_prod' Finset.stronglyMeasurable_prod' #align finset.strongly_measurable_sum' Finset.stronglyMeasurable_sum' @[to_additive (attr := measurability)] theorem _root_.Finset.stronglyMeasurable_prod {ι : Type} {f : ι → α → M} (s : Finset ι) (hf : ∀ i ∈ s, StronglyMeasurable (f i)) : StronglyMeasurable fun a => ∏ i ∈ s, f i a := by simpa only [← Finset.prod_apply] using s.stronglyMeasurable_prod' hf #align finset.strongly_measurable_prod Finset.stronglyMeasurable_prod #align finset.strongly_measurable_sum Finset.stronglyMeasurable_sum end CommMonoid /-- The range of a strongly measurable function is separable. -/ protected theorem isSeparable_range {m : MeasurableSpace α} [TopologicalSpace β] (hf : StronglyMeasurable f) : TopologicalSpace.IsSeparable (range f) := by have : IsSeparable (closure (⋃ n, range (hf.approx n))) := .closure <\| .iUnion fun n => (hf.approx n).finite_range.isSeparable apply this.mono rintro _ ⟨x, rfl⟩ apply mem_closure_of_tendsto (hf.tendsto_approx x) filter_upwards with n apply mem_iUnion_of_mem n exact mem_range_self _ #align measure_theory.strongly_measurable.is_separable_range MeasureTheory.StronglyMeasurable.isSeparable_range theorem separableSpace_range_union_singleton {_ : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] (hf : StronglyMeasurable f) {b : β} : SeparableSpace (range f ∪ {b} : Set β) := letI := pseudoMetrizableSpacePseudoMetric β (hf.isSeparable_range.union (finite_singleton _).isSeparable).separableSpace #align measure_theory.strongly_measurable.separable_space_range_union_singleton MeasureTheory.StronglyMeasurable.separableSpace_range_union_singleton section SecondCountableStronglyMeasurable variable {mα : MeasurableSpace α} [MeasurableSpace β] /-- In a space with second countable topology, measurable implies strongly measurable. -/ @[aesop 90% apply (rule_sets := [Measurable])] theorem _root_.Measurable.stronglyMeasurable [TopologicalSpace β] [PseudoMetrizableSpace β] [SecondCountableTopology β] [OpensMeasurableSpace β] (hf : Measurable f) : StronglyMeasurable f := by letI := pseudoMetrizableSpacePseudoMetric β nontriviality β; inhabit β exact ⟨SimpleFunc.approxOn f hf Set.univ default (Set.mem_univ _), fun x ↦ SimpleFunc.tendsto_approxOn hf (Set.mem_univ _) (by rw [closure_univ]; simp)⟩ #align measurable.strongly_measurable Measurable.stronglyMeasurable /-- In a space with second countable topology, strongly measurable and measurable are equivalent. -/ theorem _root_.stronglyMeasurable_iff_measurable [TopologicalSpace β] [MetrizableSpace β] [BorelSpace β] [SecondCountableTopology β] : StronglyMeasurable f ↔ Measurable f := ⟨fun h => h.measurable, fun h => Measurable.stronglyMeasurable h⟩ #align strongly_measurable_iff_measurable stronglyMeasurable_iff_measurable @[measurability] theorem _root_.stronglyMeasurable_id [TopologicalSpace α] [PseudoMetrizableSpace α] [OpensMeasurableSpace α] [SecondCountableTopology α] : StronglyMeasurable (id : α → α) := measurable_id.stronglyMeasurable #align strongly_measurable_id stronglyMeasurable_id end SecondCountableStronglyMeasurable /-- A function is strongly measurable if and only if it is measurable and has separable range. -/ theorem _root_.stronglyMeasurable_iff_measurable_separable {m : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] : StronglyMeasurable f ↔ Measurable f ∧ IsSeparable (range f) := by refine ⟨fun H ↦ ⟨H.measurable, H.isSeparable_range⟩, fun ⟨Hm, Hsep⟩ ↦ ?_⟩ have := Hsep.secondCountableTopology have Hm' : StronglyMeasurable (rangeFactorization f) := Hm.subtype_mk.stronglyMeasurable exact continuous_subtype_val.comp_stronglyMeasurable Hm' #align strongly_measurable_iff_measurable_separable stronglyMeasurable_iff_measurable_separable /-- A continuous function is strongly measurable when either the source space or the target space is second-countable. -/ theorem _root_.Continuous.stronglyMeasurable [MeasurableSpace α] [TopologicalSpace α] [OpensMeasurableSpace α] [TopologicalSpace β] [PseudoMetrizableSpace β] [h : SecondCountableTopologyEither α β] {f : α → β} (hf : Continuous f) : StronglyMeasurable f := by borelize β cases h.out · rw [stronglyMeasurable_iff_measurable_separable] refine ⟨hf.measurable, ?_⟩ exact isSeparable_range hf · exact hf.measurable.stronglyMeasurable #align continuous.strongly_measurable Continuous.stronglyMeasurable /-- A continuous function whose support is contained in a compact set is strongly measurable. -/ @[to_additive] theorem _root_.Continuous.stronglyMeasurable_of_mulSupport_subset_isCompact [MeasurableSpace α] [TopologicalSpace α] [OpensMeasurableSpace α] [MeasurableSpace β] [TopologicalSpace β] [PseudoMetrizableSpace β] [BorelSpace β] [One β] {f : α → β} (hf : Continuous f) {k : Set α} (hk : IsCompact k) (h'f : mulSupport f ⊆ k) : StronglyMeasurable f := by letI : PseudoMetricSpace β := pseudoMetrizableSpacePseudoMetric β rw [stronglyMeasurable_iff_measurable_separable] exact ⟨hf.measurable, (isCompact_range_of_mulSupport_subset_isCompact hf hk h'f).isSeparable⟩ /-- A continuous function with compact support is strongly measurable. -/ @[to_additive] theorem _root_.Continuous.stronglyMeasurable_of_hasCompactMulSupport [MeasurableSpace α] [TopologicalSpace α] [OpensMeasurableSpace α] [MeasurableSpace β] [TopologicalSpace β] [PseudoMetrizableSpace β] [BorelSpace β] [One β] {f : α → β} (hf : Continuous f) (h'f : HasCompactMulSupport f) : StronglyMeasurable f := hf.stronglyMeasurable_of_mulSupport_subset_isCompact h'f (subset_mulTSupport f) /-- A continuous function with compact support on a product space is strongly measurable for the product sigma-algebra. The subtlety is that we do not assume that the spaces are separable, so the product of the Borel sigma algebras might not contain all open sets, but still it contains enough of them to approximate compactly supported continuous functions. -/ lemma _root_.HasCompactSupport.stronglyMeasurable_of_prod {X Y : Type} [Zero α] [TopologicalSpace X] [TopologicalSpace Y] [MeasurableSpace X] [MeasurableSpace Y] [OpensMeasurableSpace X] [OpensMeasurableSpace Y] [TopologicalSpace α] [PseudoMetrizableSpace α] {f : X × Y → α} (hf : Continuous f) (h'f : HasCompactSupport f) : StronglyMeasurable f := by borelize α apply stronglyMeasurable_iff_measurable_separable.2 ⟨h'f.measurable_of_prod hf, ?_⟩ letI : PseudoMetricSpace α := pseudoMetrizableSpacePseudoMetric α exact IsCompact.isSeparable (s := range f) (h'f.isCompact_range hf) /-- If `g` is a topological embedding, then `f` is strongly measurable iff `g ∘ f` is. -/ theorem _root_.Embedding.comp_stronglyMeasurable_iff {m : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] [TopologicalSpace γ] [PseudoMetrizableSpace γ] {g : β → γ} {f : α → β} (hg : Embedding g) : (StronglyMeasurable fun x => g (f x)) ↔ StronglyMeasurable f := by letI := pseudoMetrizableSpacePseudoMetric γ borelize β γ refine ⟨fun H => stronglyMeasurable_iff_measurable_separable.2 ⟨?_, ?_⟩, fun H => hg.continuous.comp_stronglyMeasurable H⟩ · let G : β → range g := rangeFactorization g have hG : ClosedEmbedding G := { hg.codRestrict _ _ with isClosed_range := by rw [surjective_onto_range.range_eq] exact isClosed_univ } have : Measurable (G ∘ f) := Measurable.subtype_mk H.measurable exact hG.measurableEmbedding.measurable_comp_iff.1 this · have : IsSeparable (g ⁻¹' range (g ∘ f)) := hg.isSeparable_preimage H.isSeparable_range rwa [range_comp, hg.inj.preimage_image] at this #align embedding.comp_strongly_measurable_iff Embedding.comp_stronglyMeasurable_iff /-- A sequential limit of strongly measurable functions is strongly measurable. -/ theorem _root_.stronglyMeasurable_of_tendsto {ι : Type} {m : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] (u : Filter ι) [NeBot u] [IsCountablyGenerated u] {f : ι → α → β} {g : α → β} (hf : ∀ i, StronglyMeasurable (f i)) (lim : Tendsto f u (𝓝 g)) : StronglyMeasurable g := by borelize β refine stronglyMeasurable_iff_measurable_separable.2 ⟨?_, ?_⟩ · exact measurable_of_tendsto_metrizable' u (fun i => (hf i).measurable) lim · rcases u.exists_seq_tendsto with ⟨v, hv⟩ have : IsSeparable (closure (⋃ i, range (f (v i)))) := .closure <\| .iUnion fun i => (hf (v i)).isSeparable_range apply this.mono rintro _ ⟨x, rfl⟩ rw [tendsto_pi_nhds] at lim apply mem_closure_of_tendsto ((lim x).comp hv) filter_upwards with n apply mem_iUnion_of_mem n exact mem_range_self _ #align strongly_measurable_of_tendsto stronglyMeasurable_of_tendsto protected theorem piecewise {m : MeasurableSpace α} [TopologicalSpace β] {s : Set α} {_ : DecidablePred (· ∈ s)} (hs : MeasurableSet s) (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (Set.piecewise s f g) := by refine ⟨fun n => SimpleFunc.piecewise s hs (hf.approx n) (hg.approx n), fun x => ?_⟩ by_cases hx : x ∈ s · simpa [@Set.piecewise_eq_of_mem _ _ _ _ _ (fun _ => Classical.propDecidable _) _ hx, hx] using hf.tendsto_approx x · simpa [@Set.piecewise_eq_of_not_mem _ _ _ _ _ (fun _ => Classical.propDecidable _) _ hx, hx] using hg.tendsto_approx x #align measure_theory.strongly_measurable.piecewise MeasureTheory.StronglyMeasurable.piecewise /-- this is slightly different from `StronglyMeasurable.piecewise`. It can be used to show `StronglyMeasurable (ite (x=0) 0 1)` by `exact StronglyMeasurable.ite (measurableSet_singleton 0) stronglyMeasurable_const stronglyMeasurable_const`, but replacing `StronglyMeasurable.ite` by `StronglyMeasurable.piecewise` in that example proof does not work. -/ protected theorem ite {_ : MeasurableSpace α} [TopologicalSpace β] {p : α → Prop} {_ : DecidablePred p} (hp : MeasurableSet { a : α \| p a }) (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable fun x => ite (p x) (f x) (g x) := StronglyMeasurable.piecewise hp hf hg #align measure_theory.strongly_measurable.ite MeasureTheory.StronglyMeasurable.ite @[measurability] theorem _root_.MeasurableEmbedding.stronglyMeasurable_extend {f : α → β} {g : α → γ} {g' : γ → β} {mα : MeasurableSpace α} {mγ : MeasurableSpace γ} [TopologicalSpace β] (hg : MeasurableEmbedding g) (hf : StronglyMeasurable f) (hg' : StronglyMeasurable g') : StronglyMeasurable (Function.extend g f g') := by refine ⟨fun n => SimpleFunc.extend (hf.approx n) g hg (hg'.approx n), ?_⟩ intro x by_cases hx : ∃ y, g y = x · rcases hx with ⟨y, rfl⟩ simpa only [SimpleFunc.extend_apply, hg.injective, Injective.extend_apply] using hf.tendsto_approx y · simpa only [hx, SimpleFunc.extend_apply', not_false_iff, extend_apply'] using hg'.tendsto_approx x #align measurable_embedding.strongly_measurable_extend MeasurableEmbedding.stronglyMeasurable_extend theorem _root_.MeasurableEmbedding.exists_stronglyMeasurable_extend {f : α → β} {g : α → γ} {_ : MeasurableSpace α} {_ : MeasurableSpace γ} [TopologicalSpace β] (hg : MeasurableEmbedding g) (hf : StronglyMeasurable f) (hne : γ → Nonempty β) : ∃ f' : γ → β, StronglyMeasurable f' ∧ f' ∘ g = f := ⟨Function.extend g f fun x => Classical.choice (hne x), hg.stronglyMeasurable_extend hf (stronglyMeasurable_const' fun _ _ => rfl), funext fun _ => hg.injective.extend_apply _ _ _⟩ #align measurable_embedding.exists_strongly_measurable_extend MeasurableEmbedding.exists_stronglyMeasurable_extend theorem _root_.stronglyMeasurable_of_stronglyMeasurable_union_cover {m : MeasurableSpace α} [TopologicalSpace β] {f : α → β} (s t : Set α) (hs : MeasurableSet s) (ht : MeasurableSet t) (h : univ ⊆ s ∪ t) (hc : StronglyMeasurable fun a : s => f a) (hd : StronglyMeasurable fun a : t => f a) : StronglyMeasurable f := by nontriviality β; inhabit β suffices Function.extend Subtype.val (fun x : s ↦ f x) (Function.extend (↑) (fun x : t ↦ f x) fun _ ↦ default) = f from this ▸ (MeasurableEmbedding.subtype_coe hs).stronglyMeasurable_extend hc <\| (MeasurableEmbedding.subtype_coe ht).stronglyMeasurable_extend hd stronglyMeasurable_const ext x by_cases hxs : x ∈ s · lift x to s using hxs simp [Subtype.coe_injective.extend_apply] · lift x to t using (h trivial).resolve_left hxs rw [extend_apply', Subtype.coe_injective.extend_apply] exact fun ⟨y, hy⟩ ↦ hxs <\| hy ▸ y.2 #align strongly_measurable_of_strongly_measurable_union_cover stronglyMeasurable_of_stronglyMeasurable_union_cover theorem _root_.stronglyMeasurable_of_restrict_of_restrict_compl {_ : MeasurableSpace α} [TopologicalSpace β] {f : α → β} {s : Set α} (hs : MeasurableSet s) (h₁ : StronglyMeasurable (s.restrict f)) (h₂ : StronglyMeasurable (sᶜ.restrict f)) : StronglyMeasurable f := stronglyMeasurable_of_stronglyMeasurable_union_cover s sᶜ hs hs.compl (union_compl_self s).ge h₁ h₂ #align strongly_measurable_of_restrict_of_restrict_compl stronglyMeasurable_of_restrict_of_restrict_compl @[measurability] protected theorem indicator {_ : MeasurableSpace α} [TopologicalSpace β] [Zero β] (hf : StronglyMeasurable f) {s : Set α} (hs : MeasurableSet s) : StronglyMeasurable (s.indicator f) := hf.piecewise hs stronglyMeasurable_const #align measure_theory.strongly_measurable.indicator MeasureTheory.StronglyMeasurable.indicator @[aesop safe 20 apply (rule_sets := [Measurable])] protected theorem dist {_ : MeasurableSpace α} {β : Type} [PseudoMetricSpace β] {f g : α → β} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable fun x => dist (f x) (g x) := continuous_dist.comp_stronglyMeasurable (hf.prod_mk hg) #align measure_theory.strongly_measurable.dist MeasureTheory.StronglyMeasurable.dist @[measurability] protected theorem norm {_ : MeasurableSpace α} {β : Type} [SeminormedAddCommGroup β] {f : α → β} (hf : StronglyMeasurable f) : StronglyMeasurable fun x => ‖f x‖ := continuous_norm.comp_stronglyMeasurable hf #align measure_theory.strongly_measurable.norm MeasureTheory.StronglyMeasurable.norm @[measurability] protected theorem nnnorm {_ : MeasurableSpace α} {β : Type} [SeminormedAddCommGroup β] {f : α → β} (hf : StronglyMeasurable f) : StronglyMeasurable fun x => ‖f x‖₊ := continuous_nnnorm.comp_stronglyMeasurable hf #align measure_theory.strongly_measurable.nnnorm MeasureTheory.StronglyMeasurable.nnnorm @[measurability] protected theorem ennnorm {_ : MeasurableSpace α} {β : Type} [SeminormedAddCommGroup β] {f : α → β} (hf : StronglyMeasurable f) : Measurable fun a => (‖f a‖₊ : ℝ≥0∞) := (ENNReal.continuous_coe.comp_stronglyMeasurable hf.nnnorm).measurable #align measure_theory.strongly_measurable.ennnorm MeasureTheory.StronglyMeasurable.ennnorm @[measurability] protected theorem real_toNNReal {_ : MeasurableSpace α} {f : α → ℝ} (hf : StronglyMeasurable f) : StronglyMeasurable fun x => (f x).toNNReal := continuous_real_toNNReal.comp_stronglyMeasurable hf #align measure_theory.strongly_measurable.real_to_nnreal MeasureTheory.StronglyMeasurable.real_toNNReal theorem measurableSet_eq_fun {m : MeasurableSpace α} {E} [TopologicalSpace E] [MetrizableSpace E] {f g : α → E} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : MeasurableSet { x \| f x = g x } := by borelize (E × E) exact (hf.prod_mk hg).measurable isClosed_diagonal.measurableSet #align measure_theory.strongly_measurable.measurable_set_eq_fun MeasureTheory.StronglyMeasurable.measurableSet_eq_fun theorem measurableSet_lt {m : MeasurableSpace α} [TopologicalSpace β] [LinearOrder β] [OrderClosedTopology β] [PseudoMetrizableSpace β] {f g : α → β} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : MeasurableSet { a \| f a < g a } := by borelize (β × β) exact (hf.prod_mk hg).measurable isOpen_lt_prod.measurableSet #align measure_theory.strongly_measurable.measurable_set_lt MeasureTheory.StronglyMeasurable.measurableSet_lt theorem measurableSet_le {m : MeasurableSpace α} [TopologicalSpace β] [Preorder β] [OrderClosedTopology β] [PseudoMetrizableSpace β] {f g : α → β} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : MeasurableSet { a \| f a ≤ g a } := by borelize (β × β) exact (hf.prod_mk hg).measurable isClosed_le_prod.measurableSet #align measure_theory.strongly_measurable.measurable_set_le MeasureTheory.StronglyMeasurable.measurableSet_le theorem stronglyMeasurable_in_set {m : MeasurableSpace α} [TopologicalSpace β] [Zero β] {s : Set α} {f : α → β} (hs : MeasurableSet s) (hf : StronglyMeasurable f) (hf_zero : ∀ x, x ∉ s → f x = 0) : ∃ fs : ℕ → α →ₛ β, (∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x))) ∧ ∀ x ∉ s, ∀ n, fs n x = 0 := by let g_seq_s : ℕ → @SimpleFunc α m β := fun n => (hf.approx n).restrict s have hg_eq : ∀ x ∈ s, ∀ n, g_seq_s n x = hf.approx n x := by intro x hx n rw [SimpleFunc.coe_restrict _ hs, Set.indicator_of_mem hx] have hg_zero : ∀ x ∉ s, ∀ n, g_seq_s n x = 0 := by intro x hx n rw [SimpleFunc.coe_restrict _ hs, Set.indicator_of_not_mem hx] refine ⟨g_seq_s, fun x => ?_, hg_zero⟩ by_cases hx : x ∈ s · simp_rw [hg_eq x hx] exact hf.tendsto_approx x · simp_rw [hg_zero x hx, hf_zero x hx] exact tendsto_const_nhds #align measure_theory.strongly_measurable.strongly_measurable_in_set MeasureTheory.StronglyMeasurable.stronglyMeasurable_in_set /-- If the restriction to a set `s` of a σ-algebra `m` is included in the restriction to `s` of another σ-algebra `m₂` (hypothesis `hs`), the set `s` is `m` measurable and a function `f` supported on `s` is `m`-strongly-measurable, then `f` is also `m₂`-strongly-measurable. -/ theorem stronglyMeasurable_of_measurableSpace_le_on {α E} {m m₂ : MeasurableSpace α} [TopologicalSpace E] [Zero E] {s : Set α} {f : α → E} (hs_m : MeasurableSet[m] s) (hs : ∀ t, MeasurableSet[m] (s ∩ t) → MeasurableSet[m₂] (s ∩ t)) (hf : StronglyMeasurable[m] f) (hf_zero : ∀ x ∉ s, f x = 0) : StronglyMeasurable[m₂] f := by have hs_m₂ : MeasurableSet[m₂] s := by rw [← Set.inter_univ s] refine hs Set.univ ?_ rwa [Set.inter_univ] obtain ⟨g_seq_s, hg_seq_tendsto, hg_seq_zero⟩ := stronglyMeasurable_in_set hs_m hf hf_zero let g_seq_s₂ : ℕ → @SimpleFunc α m₂ E := fun n => { toFun := g_seq_s n measurableSet_fiber' := fun x => by rw [← Set.inter_univ (g_seq_s n ⁻¹' {x}), ← Set.union_compl_self s, Set.inter_union_distrib_left, Set.inter_comm (g_seq_s n ⁻¹' {x})] refine MeasurableSet.union (hs _ (hs_m.inter ?_)) ?_ · exact @SimpleFunc.measurableSet_fiber _ _ m _ _ by_cases hx : x = 0 · suffices g_seq_s n ⁻¹' {x} ∩ sᶜ = sᶜ by rw [this] exact hs_m₂.compl ext1 y rw [hx, Set.mem_inter_iff, Set.mem_preimage, Set.mem_singleton_iff] exact ⟨fun h => h.2, fun h => ⟨hg_seq_zero y h n, h⟩⟩ · suffices g_seq_s n ⁻¹' {x} ∩ sᶜ = ∅ by rw [this] exact MeasurableSet.empty ext1 y simp only [mem_inter_iff, mem_preimage, mem_singleton_iff, mem_compl_iff, mem_empty_iff_false, iff_false_iff, not_and, not_not_mem] refine Function.mtr fun hys => ?_ rw [hg_seq_zero y hys n] exact Ne.symm hx finite_range' := @SimpleFunc.finite_range _ _ m (g_seq_s n) } exact ⟨g_seq_s₂, hg_seq_tendsto⟩ #align measure_theory.strongly_measurable.strongly_measurable_of_measurable_space_le_on MeasureTheory.StronglyMeasurable.stronglyMeasurable_of_measurableSpace_le_on /-- If a function `f` is strongly measurable w.r.t. a sub-σ-algebra `m` and the measure is σ-finite on `m`, then there exists spanning measurable sets with finite measure on which `f` has bounded norm. In particular, `f` is integrable on each of those sets. -/ theorem exists_spanning_measurableSet_norm_le [SeminormedAddCommGroup β] {m m0 : MeasurableSpace α} (hm : m ≤ m0) (hf : StronglyMeasurable[m] f) (μ : Measure α) [SigmaFinite (μ.trim hm)] : ∃ s : ℕ → Set α, (∀ n, MeasurableSet[m] (s n) ∧ μ (s n) < ∞ ∧ ∀ x ∈ s n, ‖f x‖ ≤ n) ∧ ⋃ i, s i = Set.univ := by obtain ⟨s, hs, hs_univ⟩ := exists_spanning_measurableSet_le hf.nnnorm.measurable (μ.trim hm) refine ⟨s, fun n ↦ ⟨(hs n).1, (le_trim hm).trans_lt (hs n).2.1, fun x hx ↦ ?_⟩, hs_univ⟩ have hx_nnnorm : ‖f x‖₊ ≤ n := (hs n).2.2 x hx rw [← coe_nnnorm] norm_cast #align measure_theory.strongly_measurable.exists_spanning_measurable_set_norm_le MeasureTheory.StronglyMeasurable.exists_spanning_measurableSet_norm_le end StronglyMeasurable /-! ## Finitely strongly measurable functions -/ theorem finStronglyMeasurable_zero {α β} {m : MeasurableSpace α} {μ : Measure α} [Zero β] [TopologicalSpace β] : FinStronglyMeasurable (0 : α → β) μ := ⟨0, by simp only [Pi.zero_apply, SimpleFunc.coe_zero, support_zero', measure_empty, zero_lt_top, forall_const], fun _ => tendsto_const_nhds⟩ #align measure_theory.fin_strongly_measurable_zero MeasureTheory.finStronglyMeasurable_zero namespace FinStronglyMeasurable variable {m0 : MeasurableSpace α} {μ : Measure α} {f g : α → β} theorem aefinStronglyMeasurable [Zero β] [TopologicalSpace β] (hf : FinStronglyMeasurable f μ) : AEFinStronglyMeasurable f μ := ⟨f, hf, ae_eq_refl f⟩ #align measure_theory.fin_strongly_measurable.ae_fin_strongly_measurable MeasureTheory.FinStronglyMeasurable.aefinStronglyMeasurable section sequence variable [Zero β] [TopologicalSpace β] (hf : FinStronglyMeasurable f μ) /-- A sequence of simple functions such that `∀ x, Tendsto (fun n ↦ hf.approx n x) atTop (𝓝 (f x))` and `∀ n, μ (support (hf.approx n)) < ∞`. These properties are given by `FinStronglyMeasurable.tendsto_approx` and `FinStronglyMeasurable.fin_support_approx`. -/ protected noncomputable def approx : ℕ → α →ₛ β := hf.choose #align measure_theory.fin_strongly_measurable.approx MeasureTheory.FinStronglyMeasurable.approx protected theorem fin_support_approx : ∀ n, μ (support (hf.approx n)) < ∞ := hf.choose_spec.1 #align measure_theory.fin_strongly_measurable.fin_support_approx MeasureTheory.FinStronglyMeasurable.fin_support_approx protected theorem tendsto_approx : ∀ x, Tendsto (fun n => hf.approx n x) atTop (𝓝 (f x)) := hf.choose_spec.2 #align measure_theory.fin_strongly_measurable.tendsto_approx MeasureTheory.FinStronglyMeasurable.tendsto_approx end sequence /-- A finitely strongly measurable function is strongly measurable. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem stronglyMeasurable [Zero β] [TopologicalSpace β] (hf : FinStronglyMeasurable f μ) : StronglyMeasurable f := ⟨hf.approx, hf.tendsto_approx⟩ #align measure_theory.fin_strongly_measurable.strongly_measurable MeasureTheory.FinStronglyMeasurable.stronglyMeasurable theorem exists_set_sigmaFinite [Zero β] [TopologicalSpace β] [T2Space β] (hf : FinStronglyMeasurable f μ) : ∃ t, MeasurableSet t ∧ (∀ x ∈ tᶜ, f x = 0) ∧ SigmaFinite (μ.restrict t) := by rcases hf with ⟨fs, hT_lt_top, h_approx⟩ let T n := support (fs n) have hT_meas : ∀ n, MeasurableSet (T n) := fun n => SimpleFunc.measurableSet_support (fs n) let t := ⋃ n, T n refine ⟨t, MeasurableSet.iUnion hT_meas, ?_, ?_⟩ · have h_fs_zero : ∀ n, ∀ x ∈ tᶜ, fs n x = 0 := by intro n x hxt rw [Set.mem_compl_iff, Set.mem_iUnion, not_exists] at hxt simpa [T] using hxt n refine fun x hxt => tendsto_nhds_unique (h_approx x) ?_ rw [funext fun n => h_fs_zero n x hxt] exact tendsto_const_nhds · refine ⟨⟨⟨fun n => tᶜ ∪ T n, fun _ => trivial, fun n => ?_, ?_⟩⟩⟩ · rw [Measure.restrict_apply' (MeasurableSet.iUnion hT_meas), Set.union_inter_distrib_right, Set.compl_inter_self t, Set.empty_union] exact (measure_mono Set.inter_subset_left).trans_lt (hT_lt_top n) · rw [← Set.union_iUnion tᶜ T] exact Set.compl_union_self _ #align measure_theory.fin_strongly_measurable.exists_set_sigma_finite MeasureTheory.FinStronglyMeasurable.exists_set_sigmaFinite /-- A finitely strongly measurable function is measurable. -/ protected theorem measurable [Zero β] [TopologicalSpace β] [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (hf : FinStronglyMeasurable f μ) : Measurable f := hf.stronglyMeasurable.measurable #align measure_theory.fin_strongly_measurable.measurable MeasureTheory.FinStronglyMeasurable.measurable section Arithmetic variable [TopologicalSpace β] @[aesop safe 20 (rule_sets := [Measurable])] protected theorem mul [MonoidWithZero β] [ContinuousMul β] (hf : FinStronglyMeasurable f μ) (hg : FinStronglyMeasurable g μ) : FinStronglyMeasurable (f * g) μ := by refine ⟨fun n => hf.approx n * hg.approx n, ?_, fun x => (hf.tendsto_approx x).mul (hg.tendsto_approx x)⟩ intro n exact (measure_mono (support_mul_subset_left _ _)).trans_lt (hf.fin_support_approx n) #align measure_theory.fin_strongly_measurable.mul MeasureTheory.FinStronglyMeasurable.mul @[aesop safe 20 (rule_sets := [Measurable])] protected theorem add [AddMonoid β] [ContinuousAdd β] (hf : FinStronglyMeasurable f μ) (hg : FinStronglyMeasurable g μ) : FinStronglyMeasurable (f + g) μ := ⟨fun n => hf.approx n + hg.approx n, fun n => (measure_mono (Function.support_add _ _)).trans_lt ((measure_union_le _ _).trans_lt (ENNReal.add_lt_top.mpr ⟨hf.fin_support_approx n, hg.fin_support_approx n⟩)), fun x => (hf.tendsto_approx x).add (hg.tendsto_approx x)⟩ #align measure_theory.fin_strongly_measurable.add MeasureTheory.FinStronglyMeasurable.add @[measurability] protected theorem neg [AddGroup β] [TopologicalAddGroup β] (hf : FinStronglyMeasurable f μ) : FinStronglyMeasurable (-f) μ := by refine ⟨fun n => -hf.approx n, fun n => ?_, fun x => (hf.tendsto_approx x).neg⟩ suffices μ (Function.support fun x => -(hf.approx n) x) < ∞ by convert this rw [Function.support_neg (hf.approx n)] exact hf.fin_support_approx n #align measure_theory.fin_strongly_measurable.neg MeasureTheory.FinStronglyMeasurable.neg @[measurability] protected theorem sub [AddGroup β] [ContinuousSub β] (hf : FinStronglyMeasurable f μ) (hg : FinStronglyMeasurable g μ) : FinStronglyMeasurable (f - g) μ := ⟨fun n => hf.approx n - hg.approx n, fun n => (measure_mono (Function.support_sub _ _)).trans_lt ((measure_union_le _ _).trans_lt (ENNReal.add_lt_top.mpr ⟨hf.fin_support_approx n, hg.fin_support_approx n⟩)), fun x => (hf.tendsto_approx x).sub (hg.tendsto_approx x)⟩ #align measure_theory.fin_strongly_measurable.sub MeasureTheory.FinStronglyMeasurable.sub @[measurability] protected theorem const_smul {𝕜} [TopologicalSpace 𝕜] [AddMonoid β] [Monoid 𝕜] [DistribMulAction 𝕜 β] [ContinuousSMul 𝕜 β] (hf : FinStronglyMeasurable f μ) (c : 𝕜) : FinStronglyMeasurable (c • f) μ := by refine ⟨fun n => c • hf.approx n, fun n => ?_, fun x => (hf.tendsto_approx x).const_smul c⟩ rw [SimpleFunc.coe_smul] exact (measure_mono (support_const_smul_subset c _)).trans_lt (hf.fin_support_approx n) #align measure_theory.fin_strongly_measurable.const_smul MeasureTheory.FinStronglyMeasurable.const_smul end Arithmetic section Order variable [TopologicalSpace β] [Zero β] @[aesop safe 20 (rule_sets := [Measurable])] protected theorem sup [SemilatticeSup β] [ContinuousSup β] (hf : FinStronglyMeasurable f μ) (hg : FinStronglyMeasurable g μ) : FinStronglyMeasurable (f ⊔ g) μ := by refine ⟨fun n => hf.approx n ⊔ hg.approx n, fun n => ?_, fun x => (hf.tendsto_approx x).sup_nhds (hg.tendsto_approx x)⟩ refine (measure_mono (support_sup _ _)).trans_lt ?_ exact measure_union_lt_top_iff.mpr ⟨hf.fin_support_approx n, hg.fin_support_approx n⟩ #align measure_theory.fin_strongly_measurable.sup MeasureTheory.FinStronglyMeasurable.sup @[aesop safe 20 (rule_sets := [Measurable])] protected theorem inf [SemilatticeInf β] [ContinuousInf β] (hf : FinStronglyMeasurable f μ) (hg : FinStronglyMeasurable g μ) : FinStronglyMeasurable (f ⊓ g) μ := by refine ⟨fun n => hf.approx n ⊓ hg.approx n, fun n => ?_, fun x => (hf.tendsto_approx x).inf_nhds (hg.tendsto_approx x)⟩ refine (measure_mono (support_inf _ _)).trans_lt ?_ exact measure_union_lt_top_iff.mpr ⟨hf.fin_support_approx n, hg.fin_support_approx n⟩ #align measure_theory.fin_strongly_measurable.inf MeasureTheory.FinStronglyMeasurable.inf end Order end FinStronglyMeasurable theorem finStronglyMeasurable_iff_stronglyMeasurable_and_exists_set_sigmaFinite {α β} {f : α → β} [TopologicalSpace β] [T2Space β] [Zero β] {_ : MeasurableSpace α} {μ : Measure α} : FinStronglyMeasurable f μ ↔ StronglyMeasurable f ∧ ∃ t, MeasurableSet t ∧ (∀ x ∈ tᶜ, f x = 0) ∧ SigmaFinite (μ.restrict t) := ⟨fun hf => ⟨hf.stronglyMeasurable, hf.exists_set_sigmaFinite⟩, fun hf => hf.1.finStronglyMeasurable_of_set_sigmaFinite hf.2.choose_spec.1 hf.2.choose_spec.2.1 hf.2.choose_spec.2.2⟩ #align measure_theory.fin_strongly_measurable_iff_strongly_measurable_and_exists_set_sigma_finite MeasureTheory.finStronglyMeasurable_iff_stronglyMeasurable_and_exists_set_sigmaFinite theorem aefinStronglyMeasurable_zero {α β} {_ : MeasurableSpace α} (μ : Measure α) [Zero β] [TopologicalSpace β] : AEFinStronglyMeasurable (0 : α → β) μ := ⟨0, finStronglyMeasurable_zero, EventuallyEq.rfl⟩ #align measure_theory.ae_fin_strongly_measurable_zero MeasureTheory.aefinStronglyMeasurable_zero /-! ## Almost everywhere strongly measurable functions -/ @[measurability] theorem aestronglyMeasurable_const {α β} {_ : MeasurableSpace α} {μ : Measure α} [TopologicalSpace β] {b : β} : AEStronglyMeasurable (fun _ : α => b) μ := stronglyMeasurable_const.aestronglyMeasurable #align measure_theory.ae_strongly_measurable_const MeasureTheory.aestronglyMeasurable_const @[to_additive (attr := measurability)] theorem aestronglyMeasurable_one {α β} {_ : MeasurableSpace α} {μ : Measure α} [TopologicalSpace β] [One β] : AEStronglyMeasurable (1 : α → β) μ := stronglyMeasurable_one.aestronglyMeasurable #align measure_theory.ae_strongly_measurable_one MeasureTheory.aestronglyMeasurable_one #align measure_theory.ae_strongly_measurable_zero MeasureTheory.aestronglyMeasurable_zero @[simp] theorem Subsingleton.aestronglyMeasurable {_ : MeasurableSpace α} [TopologicalSpace β] [Subsingleton β] {μ : Measure α} (f : α → β) : AEStronglyMeasurable f μ := (Subsingleton.stronglyMeasurable f).aestronglyMeasurable #align measure_theory.subsingleton.ae_strongly_measurable MeasureTheory.Subsingleton.aestronglyMeasurable @[simp] theorem Subsingleton.aestronglyMeasurable' {_ : MeasurableSpace α} [TopologicalSpace β] [Subsingleton α] {μ : Measure α} (f : α → β) : AEStronglyMeasurable f μ := (Subsingleton.stronglyMeasurable' f).aestronglyMeasurable #align measure_theory.subsingleton.ae_strongly_measurable' MeasureTheory.Subsingleton.aestronglyMeasurable' @[simp] theorem aestronglyMeasurable_zero_measure [MeasurableSpace α] [TopologicalSpace β] (f : α → β) : AEStronglyMeasurable f (0 : Measure α) := by nontriviality α inhabit α exact ⟨fun _ => f default, stronglyMeasurable_const, rfl⟩ #align measure_theory.ae_strongly_measurable_zero_measure MeasureTheory.aestronglyMeasurable_zero_measure @[measurability] theorem SimpleFunc.aestronglyMeasurable {_ : MeasurableSpace α} {μ : Measure α} [TopologicalSpace β] (f : α →ₛ β) : AEStronglyMeasurable f μ := f.stronglyMeasurable.aestronglyMeasurable #align measure_theory.simple_func.ae_strongly_measurable MeasureTheory.SimpleFunc.aestronglyMeasurable namespace AEStronglyMeasurable variable {m : MeasurableSpace α} {μ ν : Measure α} [TopologicalSpace β] [TopologicalSpace γ] {f g : α → β} section Mk /-- A `StronglyMeasurable` function such that `f =ᵐ[μ] hf.mk f`. See lemmas `stronglyMeasurable_mk` and `ae_eq_mk`. -/ protected noncomputable def mk (f : α → β) (hf : AEStronglyMeasurable f μ) : α → β := hf.choose #align measure_theory.ae_strongly_measurable.mk MeasureTheory.AEStronglyMeasurable.mk theorem stronglyMeasurable_mk (hf : AEStronglyMeasurable f μ) : StronglyMeasurable (hf.mk f) := hf.choose_spec.1 #align measure_theory.ae_strongly_measurable.strongly_measurable_mk MeasureTheory.AEStronglyMeasurable.stronglyMeasurable_mk theorem measurable_mk [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (hf : AEStronglyMeasurable f μ) : Measurable (hf.mk f) := hf.stronglyMeasurable_mk.measurable #align measure_theory.ae_strongly_measurable.measurable_mk MeasureTheory.AEStronglyMeasurable.measurable_mk theorem ae_eq_mk (hf : AEStronglyMeasurable f μ) : f =ᵐ[μ] hf.mk f := hf.choose_spec.2 #align measure_theory.ae_strongly_measurable.ae_eq_mk MeasureTheory.AEStronglyMeasurable.ae_eq_mk @[aesop 5% apply (rule_sets := [Measurable])] protected theorem aemeasurable {β} [MeasurableSpace β] [TopologicalSpace β] [PseudoMetrizableSpace β] [BorelSpace β] {f : α → β} (hf : AEStronglyMeasurable f μ) : AEMeasurable f μ := ⟨hf.mk f, hf.stronglyMeasurable_mk.measurable, hf.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.ae_measurable MeasureTheory.AEStronglyMeasurable.aemeasurable end Mk theorem congr (hf : AEStronglyMeasurable f μ) (h : f =ᵐ[μ] g) : AEStronglyMeasurable g μ := ⟨hf.mk f, hf.stronglyMeasurable_mk, h.symm.trans hf.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.congr MeasureTheory.AEStronglyMeasurable.congr theorem _root_.aestronglyMeasurable_congr (h : f =ᵐ[μ] g) : AEStronglyMeasurable f μ ↔ AEStronglyMeasurable g μ := ⟨fun hf => hf.congr h, fun hg => hg.congr h.symm⟩ #align ae_strongly_measurable_congr aestronglyMeasurable_congr theorem mono_measure {ν : Measure α} (hf : AEStronglyMeasurable f μ) (h : ν ≤ μ) : AEStronglyMeasurable f ν := ⟨hf.mk f, hf.stronglyMeasurable_mk, Eventually.filter_mono (ae_mono h) hf.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.mono_measure MeasureTheory.AEStronglyMeasurable.mono_measure protected lemma mono_ac (h : ν ≪ μ) (hμ : AEStronglyMeasurable f μ) : AEStronglyMeasurable f ν := let ⟨g, hg, hg'⟩ := hμ; ⟨g, hg, h.ae_eq hg'⟩ #align measure_theory.ae_strongly_measurable.mono' MeasureTheory.AEStronglyMeasurable.mono_ac #align measure_theory.ae_strongly_measurable_of_absolutely_continuous MeasureTheory.AEStronglyMeasurable.mono_ac @[deprecated (since := "2024-02-15")] protected alias mono' := AEStronglyMeasurable.mono_ac theorem mono_set {s t} (h : s ⊆ t) (ht : AEStronglyMeasurable f (μ.restrict t)) : AEStronglyMeasurable f (μ.restrict s) := ht.mono_measure (restrict_mono h le_rfl) #align measure_theory.ae_strongly_measurable.mono_set MeasureTheory.AEStronglyMeasurable.mono_set protected theorem restrict (hfm : AEStronglyMeasurable f μ) {s} : AEStronglyMeasurable f (μ.restrict s) := hfm.mono_measure Measure.restrict_le_self #align measure_theory.ae_strongly_measurable.restrict MeasureTheory.AEStronglyMeasurable.restrict theorem ae_mem_imp_eq_mk {s} (h : AEStronglyMeasurable f (μ.restrict s)) : ∀ᵐ x ∂μ, x ∈ s → f x = h.mk f x := ae_imp_of_ae_restrict h.ae_eq_mk #align measure_theory.ae_strongly_measurable.ae_mem_imp_eq_mk MeasureTheory.AEStronglyMeasurable.ae_mem_imp_eq_mk /-- The composition of a continuous function and an ae strongly measurable function is ae strongly measurable. -/ theorem _root_.Continuous.comp_aestronglyMeasurable {g : β → γ} {f : α → β} (hg : Continuous g) (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun x => g (f x)) μ := ⟨_, hg.comp_stronglyMeasurable hf.stronglyMeasurable_mk, EventuallyEq.fun_comp hf.ae_eq_mk g⟩ #align continuous.comp_ae_strongly_measurable Continuous.comp_aestronglyMeasurable /-- A continuous function from `α` to `β` is ae strongly measurable when one of the two spaces is second countable. -/ theorem _root_.Continuous.aestronglyMeasurable [TopologicalSpace α] [OpensMeasurableSpace α] [PseudoMetrizableSpace β] [SecondCountableTopologyEither α β] (hf : Continuous f) : AEStronglyMeasurable f μ := hf.stronglyMeasurable.aestronglyMeasurable #align continuous.ae_strongly_measurable Continuous.aestronglyMeasurable protected theorem prod_mk {f : α → β} {g : α → γ} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (fun x => (f x, g x)) μ := ⟨fun x => (hf.mk f x, hg.mk g x), hf.stronglyMeasurable_mk.prod_mk hg.stronglyMeasurable_mk, hf.ae_eq_mk.prod_mk hg.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.prod_mk MeasureTheory.AEStronglyMeasurable.prod_mk /-- The composition of a continuous function of two variables and two ae strongly measurable functions is ae strongly measurable. -/ theorem _root_.Continuous.comp_aestronglyMeasurable₂ {β' : Type} [TopologicalSpace β'] {g : β → β' → γ} {f : α → β} {f' : α → β'} (hg : Continuous g.uncurry) (hf : AEStronglyMeasurable f μ) (h'f : AEStronglyMeasurable f' μ) : AEStronglyMeasurable (fun x => g (f x) (f' x)) μ := hg.comp_aestronglyMeasurable (hf.prod_mk h'f) /-- In a space with second countable topology, measurable implies ae strongly measurable. -/ @[aesop unsafe 30% apply (rule_sets := [Measurable])] theorem _root_.Measurable.aestronglyMeasurable {_ : MeasurableSpace α} {μ : Measure α} [MeasurableSpace β] [PseudoMetrizableSpace β] [SecondCountableTopology β] [OpensMeasurableSpace β] (hf : Measurable f) : AEStronglyMeasurable f μ := hf.stronglyMeasurable.aestronglyMeasurable #align measurable.ae_strongly_measurable Measurable.aestronglyMeasurable section Arithmetic @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem mul [Mul β] [ContinuousMul β] (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (f g) μ := ⟨hf.mk f * hg.mk g, hf.stronglyMeasurable_mk.mul hg.stronglyMeasurable_mk, hf.ae_eq_mk.mul hg.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.mul MeasureTheory.AEStronglyMeasurable.mul #align measure_theory.ae_strongly_measurable.add MeasureTheory.AEStronglyMeasurable.add @[to_additive (attr := measurability)] protected theorem mul_const [Mul β] [ContinuousMul β] (hf : AEStronglyMeasurable f μ) (c : β) : AEStronglyMeasurable (fun x => f x * c) μ := hf.mul aestronglyMeasurable_const #align measure_theory.ae_strongly_measurable.mul_const MeasureTheory.AEStronglyMeasurable.mul_const #align measure_theory.ae_strongly_measurable.add_const MeasureTheory.AEStronglyMeasurable.add_const @[to_additive (attr := measurability)] protected theorem const_mul [Mul β] [ContinuousMul β] (hf : AEStronglyMeasurable f μ) (c : β) : AEStronglyMeasurable (fun x => c * f x) μ := aestronglyMeasurable_const.mul hf #align measure_theory.ae_strongly_measurable.const_mul MeasureTheory.AEStronglyMeasurable.const_mul #align measure_theory.ae_strongly_measurable.const_add MeasureTheory.AEStronglyMeasurable.const_add @[to_additive (attr := measurability)] protected theorem inv [Inv β] [ContinuousInv β] (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable f⁻¹ μ := ⟨(hf.mk f)⁻¹, hf.stronglyMeasurable_mk.inv, hf.ae_eq_mk.inv⟩ #align measure_theory.ae_strongly_measurable.inv MeasureTheory.AEStronglyMeasurable.inv #align measure_theory.ae_strongly_measurable.neg MeasureTheory.AEStronglyMeasurable.neg @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem div [Group β] [TopologicalGroup β] (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (f / g) μ := ⟨hf.mk f / hg.mk g, hf.stronglyMeasurable_mk.div hg.stronglyMeasurable_mk, hf.ae_eq_mk.div hg.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.div MeasureTheory.AEStronglyMeasurable.div #align measure_theory.ae_strongly_measurable.sub MeasureTheory.AEStronglyMeasurable.sub @[to_additive] theorem mul_iff_right [CommGroup β] [TopologicalGroup β] (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (f * g) μ ↔ AEStronglyMeasurable g μ := ⟨fun h ↦ show g = f * g * f⁻¹ by simp only [mul_inv_cancel_comm] ▸ h.mul hf.inv, fun h ↦ hf.mul h⟩ @[to_additive] theorem mul_iff_left [CommGroup β] [TopologicalGroup β] (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (g * f) μ ↔ AEStronglyMeasurable g μ := mul_comm g f ▸ AEStronglyMeasurable.mul_iff_right hf @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem smul {𝕜} [TopologicalSpace 𝕜] [SMul 𝕜 β] [ContinuousSMul 𝕜 β] {f : α → 𝕜} {g : α → β} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (fun x => f x • g x) μ := continuous_smul.comp_aestronglyMeasurable (hf.prod_mk hg) #align measure_theory.ae_strongly_measurable.smul MeasureTheory.AEStronglyMeasurable.smul #align measure_theory.ae_strongly_measurable.vadd MeasureTheory.AEStronglyMeasurable.vadd @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable])) const_nsmul] protected theorem pow [Monoid β] [ContinuousMul β] (hf : AEStronglyMeasurable f μ) (n : ℕ) : AEStronglyMeasurable (f ^ n) μ := ⟨hf.mk f ^ n, hf.stronglyMeasurable_mk.pow _, hf.ae_eq_mk.pow_const _⟩ @[to_additive (attr := measurability)] protected theorem const_smul {𝕜} [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (hf : AEStronglyMeasurable f μ) (c : 𝕜) : AEStronglyMeasurable (c • f) μ := ⟨c • hf.mk f, hf.stronglyMeasurable_mk.const_smul c, hf.ae_eq_mk.const_smul c⟩ #align measure_theory.ae_strongly_measurable.const_smul MeasureTheory.AEStronglyMeasurable.const_smul @[to_additive (attr := measurability)] protected theorem const_smul' {𝕜} [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (hf : AEStronglyMeasurable f μ) (c : 𝕜) : AEStronglyMeasurable (fun x => c • f x) μ := hf.const_smul c #align measure_theory.ae_strongly_measurable.const_smul' MeasureTheory.AEStronglyMeasurable.const_smul' @[to_additive (attr := measurability)] protected theorem smul_const {𝕜} [TopologicalSpace 𝕜] [SMul 𝕜 β] [ContinuousSMul 𝕜 β] {f : α → 𝕜} (hf : AEStronglyMeasurable f μ) (c : β) : AEStronglyMeasurable (fun x => f x • c) μ := continuous_smul.comp_aestronglyMeasurable (hf.prod_mk aestronglyMeasurable_const) #align measure_theory.ae_strongly_measurable.smul_const MeasureTheory.AEStronglyMeasurable.smul_const #align measure_theory.ae_strongly_measurable.vadd_const MeasureTheory.AEStronglyMeasurable.vadd_const end Arithmetic section Order @[aesop safe 20 apply (rule_sets := [Measurable])] protected theorem sup [SemilatticeSup β] [ContinuousSup β] (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (f ⊔ g) μ := ⟨hf.mk f ⊔ hg.mk g, hf.stronglyMeasurable_mk.sup hg.stronglyMeasurable_mk, hf.ae_eq_mk.sup hg.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.sup MeasureTheory.AEStronglyMeasurable.sup @[aesop safe 20 apply (rule_sets := [Measurable])] protected theorem inf [SemilatticeInf β] [ContinuousInf β] (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (f ⊓ g) μ := ⟨hf.mk f ⊓ hg.mk g, hf.stronglyMeasurable_mk.inf hg.stronglyMeasurable_mk, hf.ae_eq_mk.inf hg.ae_eq_mk⟩ #align measure_theory.ae_strongly_measurable.inf MeasureTheory.AEStronglyMeasurable.inf end Order /-! ### Big operators: `∏` and `∑` -/ section Monoid variable {M : Type} [Monoid M] [TopologicalSpace M] [ContinuousMul M] @[to_additive (attr := measurability)] theorem _root_.List.aestronglyMeasurable_prod' (l : List (α → M)) (hl : ∀ f ∈ l, AEStronglyMeasurable f μ) : AEStronglyMeasurable l.prod μ := by induction' l with f l ihl; · exact aestronglyMeasurable_one rw [List.forall_mem_cons] at hl rw [List.prod_cons] exact hl.1.mul (ihl hl.2) #align list.ae_strongly_measurable_prod' List.aestronglyMeasurable_prod' #align list.ae_strongly_measurable_sum' List.aestronglyMeasurable_sum' @[to_additive (attr := measurability)] theorem _root_.List.aestronglyMeasurable_prod (l : List (α → M)) (hl : ∀ f ∈ l, AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun x => (l.map fun f : α → M => f x).prod) μ := by simpa only [← Pi.list_prod_apply] using l.aestronglyMeasurable_prod' hl #align list.ae_strongly_measurable_prod List.aestronglyMeasurable_prod #align list.ae_strongly_measurable_sum List.aestronglyMeasurable_sum end Monoid section CommMonoid variable {M : Type} [CommMonoid M] [TopologicalSpace M] [ContinuousMul M] @[to_additive (attr := measurability)] theorem _root_.Multiset.aestronglyMeasurable_prod' (l : Multiset (α → M)) (hl : ∀ f ∈ l, AEStronglyMeasurable f μ) : AEStronglyMeasurable l.prod μ := by rcases l with ⟨l⟩ simpa using l.aestronglyMeasurable_prod' (by simpa using hl) #align multiset.ae_strongly_measurable_prod' Multiset.aestronglyMeasurable_prod' #align multiset.ae_strongly_measurable_sum' Multiset.aestronglyMeasurable_sum' @[to_additive (attr := measurability)] theorem _root_.Multiset.aestronglyMeasurable_prod (s : Multiset (α → M)) (hs : ∀ f ∈ s, AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun x => (s.map fun f : α → M => f x).prod) μ := by simpa only [← Pi.multiset_prod_apply] using s.aestronglyMeasurable_prod' hs #align multiset.ae_strongly_measurable_prod Multiset.aestronglyMeasurable_prod #align multiset.ae_strongly_measurable_sum Multiset.aestronglyMeasurable_sum @[to_additive (attr := measurability)] theorem _root_.Finset.aestronglyMeasurable_prod' {ι : Type} {f : ι → α → M} (s : Finset ι) (hf : ∀ i ∈ s, AEStronglyMeasurable (f i) μ) : AEStronglyMeasurable (∏ i ∈ s, f i) μ := Multiset.aestronglyMeasurable_prod' _ fun _g hg => let ⟨_i, hi, hg⟩ := Multiset.mem_map.1 hg hg ▸ hf _ hi #align finset.ae_strongly_measurable_prod' Finset.aestronglyMeasurable_prod' #align finset.ae_strongly_measurable_sum' Finset.aestronglyMeasurable_sum' @[to_additive (attr := measurability)] theorem _root_.Finset.aestronglyMeasurable_prod {ι : Type} {f : ι → α → M} (s : Finset ι) (hf : ∀ i ∈ s, AEStronglyMeasurable (f i) μ) : AEStronglyMeasurable (fun a => ∏ i ∈ s, f i a) μ := by simpa only [← Finset.prod_apply] using s.aestronglyMeasurable_prod' hf #align finset.ae_strongly_measurable_prod Finset.aestronglyMeasurable_prod #align finset.ae_strongly_measurable_sum Finset.aestronglyMeasurable_sum end CommMonoid section SecondCountableAEStronglyMeasurable variable [MeasurableSpace β] /-- In a space with second countable topology, measurable implies strongly measurable. -/ @[aesop 90% apply (rule_sets := [Measurable])] theorem _root_.AEMeasurable.aestronglyMeasurable [PseudoMetrizableSpace β] [OpensMeasurableSpace β] [SecondCountableTopology β] (hf : AEMeasurable f μ) : AEStronglyMeasurable f μ := ⟨hf.mk f, hf.measurable_mk.stronglyMeasurable, hf.ae_eq_mk⟩ #align ae_measurable.ae_strongly_measurable AEMeasurable.aestronglyMeasurable @[measurability] theorem _root_.aestronglyMeasurable_id {α : Type} [TopologicalSpace α] [PseudoMetrizableSpace α] {_ : MeasurableSpace α} [OpensMeasurableSpace α] [SecondCountableTopology α] {μ : Measure α} : AEStronglyMeasurable (id : α → α) μ := aemeasurable_id.aestronglyMeasurable #align ae_strongly_measurable_id aestronglyMeasurable_id /-- In a space with second countable topology, strongly measurable and measurable are equivalent. -/ theorem _root_.aestronglyMeasurable_iff_aemeasurable [PseudoMetrizableSpace β] [BorelSpace β] [SecondCountableTopology β] : AEStronglyMeasurable f μ ↔ AEMeasurable f μ := ⟨fun h => h.aemeasurable, fun h => h.aestronglyMeasurable⟩ #align ae_strongly_measurable_iff_ae_measurable aestronglyMeasurable_iff_aemeasurable end SecondCountableAEStronglyMeasurable @[aesop safe 20 apply (rule_sets := [Measurable])] protected theorem dist {β : Type} [PseudoMetricSpace β] {f g : α → β} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEStronglyMeasurable (fun x => dist (f x) (g x)) μ := continuous_dist.comp_aestronglyMeasurable (hf.prod_mk hg) #align measure_theory.ae_strongly_measurable.dist MeasureTheory.AEStronglyMeasurable.dist @[measurability] protected theorem norm {β : Type} [SeminormedAddCommGroup β] {f : α → β} (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun x => ‖f x‖) μ := continuous_norm.comp_aestronglyMeasurable hf #align measure_theory.ae_strongly_measurable.norm MeasureTheory.AEStronglyMeasurable.norm @[measurability] protected theorem nnnorm {β : Type} [SeminormedAddCommGroup β] {f : α → β} (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun x => ‖f x‖₊) μ := continuous_nnnorm.comp_aestronglyMeasurable hf #align measure_theory.ae_strongly_measurable.nnnorm MeasureTheory.AEStronglyMeasurable.nnnorm @[measurability] protected theorem ennnorm {β : Type} [SeminormedAddCommGroup β] {f : α → β} (hf : AEStronglyMeasurable f μ) : AEMeasurable (fun a => (‖f a‖₊ : ℝ≥0∞)) μ := (ENNReal.continuous_coe.comp_aestronglyMeasurable hf.nnnorm).aemeasurable #align measure_theory.ae_strongly_measurable.ennnorm MeasureTheory.AEStronglyMeasurable.ennnorm @[aesop safe 20 apply (rule_sets := [Measurable])] protected theorem edist {β : Type} [SeminormedAddCommGroup β] {f g : α → β} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : AEMeasurable (fun a => edist (f a) (g a)) μ := (continuous_edist.comp_aestronglyMeasurable (hf.prod_mk hg)).aemeasurable #align measure_theory.ae_strongly_measurable.edist MeasureTheory.AEStronglyMeasurable.edist @[measurability] protected theorem real_toNNReal {f : α → ℝ} (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun x => (f x).toNNReal) μ := continuous_real_toNNReal.comp_aestronglyMeasurable hf #align measure_theory.ae_strongly_measurable.real_to_nnreal MeasureTheory.AEStronglyMeasurable.real_toNNReal theorem _root_.aestronglyMeasurable_indicator_iff [Zero β] {s : Set α} (hs : MeasurableSet s) : AEStronglyMeasurable (indicator s f) μ ↔ AEStronglyMeasurable f (μ.restrict s) := by constructor · intro h exact (h.mono_measure Measure.restrict_le_self).congr (indicator_ae_eq_restrict hs) · intro h refine ⟨indicator s (h.mk f), h.stronglyMeasurable_mk.indicator hs, ?_⟩ have A : s.indicator f =ᵐ[μ.restrict s] s.indicator (h.mk f) := (indicator_ae_eq_restrict hs).trans (h.ae_eq_mk.trans <\| (indicator_ae_eq_restrict hs).symm) have B : s.indicator f =ᵐ[μ.restrict sᶜ] s.indicator (h.mk f) := (indicator_ae_eq_restrict_compl hs).trans (indicator_ae_eq_restrict_compl hs).symm exact ae_of_ae_restrict_of_ae_restrict_compl _ A B #align ae_strongly_measurable_indicator_iff aestronglyMeasurable_indicator_iff @[measurability] protected theorem indicator [Zero β] (hfm : AEStronglyMeasurable f μ) {s : Set α} (hs : MeasurableSet s) : AEStronglyMeasurable (s.indicator f) μ := (aestronglyMeasurable_indicator_iff hs).mpr hfm.restrict #align measure_theory.ae_strongly_measurable.indicator MeasureTheory.AEStronglyMeasurable.indicator theorem nullMeasurableSet_eq_fun {E} [TopologicalSpace E] [MetrizableSpace E] {f g : α → E} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : NullMeasurableSet { x \| f x = g x } μ := by apply (hf.stronglyMeasurable_mk.measurableSet_eq_fun hg.stronglyMeasurable_mk).nullMeasurableSet.congr filter_upwards [hf.ae_eq_mk, hg.ae_eq_mk] with x hfx hgx change (hf.mk f x = hg.mk g x) = (f x = g x) simp only [hfx, hgx] #align measure_theory.ae_strongly_measurable.null_measurable_set_eq_fun MeasureTheory.AEStronglyMeasurable.nullMeasurableSet_eq_fun @[to_additive] lemma nullMeasurableSet_mulSupport {E} [TopologicalSpace E] [MetrizableSpace E] [One E] {f : α → E} (hf : AEStronglyMeasurable f μ) : NullMeasurableSet (mulSupport f) μ := (hf.nullMeasurableSet_eq_fun stronglyMeasurable_const.aestronglyMeasurable).compl theorem nullMeasurableSet_lt [LinearOrder β] [OrderClosedTopology β] [PseudoMetrizableSpace β] {f g : α → β} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : NullMeasurableSet { a \| f a < g a } μ := by apply (hf.stronglyMeasurable_mk.measurableSet_lt hg.stronglyMeasurable_mk).nullMeasurableSet.congr filter_upwards [hf.ae_eq_mk, hg.ae_eq_mk] with x hfx hgx change (hf.mk f x < hg.mk g x) = (f x < g x) simp only [hfx, hgx] #align measure_theory.ae_strongly_measurable.null_measurable_set_lt MeasureTheory.AEStronglyMeasurable.nullMeasurableSet_lt theorem nullMeasurableSet_le [Preorder β] [OrderClosedTopology β] [PseudoMetrizableSpace β] {f g : α → β} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : NullMeasurableSet { a \| f a ≤ g a } μ := by apply (hf.stronglyMeasurable_mk.measurableSet_le hg.stronglyMeasurable_mk).nullMeasurableSet.congr filter_upwards [hf.ae_eq_mk, hg.ae_eq_mk] with x hfx hgx change (hf.mk f x ≤ hg.mk g x) = (f x ≤ g x) simp only [hfx, hgx] #align measure_theory.ae_strongly_measurable.null_measurable_set_le MeasureTheory.AEStronglyMeasurable.nullMeasurableSet_le theorem _root_.aestronglyMeasurable_of_aestronglyMeasurable_trim {α} {m m0 : MeasurableSpace α} {μ : Measure α} (hm : m ≤ m0) {f : α → β} (hf : AEStronglyMeasurable f (μ.trim hm)) : AEStronglyMeasurable f μ := ⟨hf.mk f, StronglyMeasurable.mono hf.stronglyMeasurable_mk hm, ae_eq_of_ae_eq_trim hf.ae_eq_mk⟩ #align ae_strongly_measurable_of_ae_strongly_measurable_trim aestronglyMeasurable_of_aestronglyMeasurable_trim theorem comp_aemeasurable {γ : Type} {_ : MeasurableSpace γ} {_ : MeasurableSpace α} {f : γ → α} {μ : Measure γ} (hg : AEStronglyMeasurable g (Measure.map f μ)) (hf : AEMeasurable f μ) : AEStronglyMeasurable (g ∘ f) μ := ⟨hg.mk g ∘ hf.mk f, hg.stronglyMeasurable_mk.comp_measurable hf.measurable_mk, (ae_eq_comp hf hg.ae_eq_mk).trans (hf.ae_eq_mk.fun_comp (hg.mk g))⟩ #align measure_theory.ae_strongly_measurable.comp_ae_measurable MeasureTheory.AEStronglyMeasurable.comp_aemeasurable theorem comp_measurable {γ : Type} {_ : MeasurableSpace γ} {_ : MeasurableSpace α} {f : γ → α} {μ : Measure γ} (hg : AEStronglyMeasurable g (Measure.map f μ)) (hf : Measurable f) : AEStronglyMeasurable (g ∘ f) μ := hg.comp_aemeasurable hf.aemeasurable #align measure_theory.ae_strongly_measurable.comp_measurable MeasureTheory.AEStronglyMeasurable.comp_measurable theorem comp_quasiMeasurePreserving {γ : Type} {_ : MeasurableSpace γ} {_ : MeasurableSpace α} {f : γ → α} {μ : Measure γ} {ν : Measure α} (hg : AEStronglyMeasurable g ν) (hf : QuasiMeasurePreserving f μ ν) : AEStronglyMeasurable (g ∘ f) μ := (hg.mono_ac hf.absolutelyContinuous).comp_measurable hf.measurable #align measure_theory.ae_strongly_measurable.comp_quasi_measure_preserving MeasureTheory.AEStronglyMeasurable.comp_quasiMeasurePreserving theorem comp_measurePreserving {γ : Type} {_ : MeasurableSpace γ} {_ : MeasurableSpace α} {f : γ → α} {μ : Measure γ} {ν : Measure α} (hg : AEStronglyMeasurable g ν) (hf : MeasurePreserving f μ ν) : AEStronglyMeasurable (g ∘ f) μ := hg.comp_quasiMeasurePreserving hf.quasiMeasurePreserving theorem isSeparable_ae_range (hf : AEStronglyMeasurable f μ) : ∃ t : Set β, IsSeparable t ∧ ∀ᵐ x ∂μ, f x ∈ t := by refine ⟨range (hf.mk f), hf.stronglyMeasurable_mk.isSeparable_range, ?_⟩ filter_upwards [hf.ae_eq_mk] with x hx simp [hx] #align measure_theory.ae_strongly_measurable.is_separable_ae_range MeasureTheory.AEStronglyMeasurable.isSeparable_ae_range /-- A function is almost everywhere strongly measurable if and only if it is almost everywhere measurable, and up to a zero measure set its range is contained in a separable set. -/ theorem _root_.aestronglyMeasurable_iff_aemeasurable_separable [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] : AEStronglyMeasurable f μ ↔ AEMeasurable f μ ∧ ∃ t : Set β, IsSeparable t ∧ ∀ᵐ x ∂μ, f x ∈ t := by refine ⟨fun H => ⟨H.aemeasurable, H.isSeparable_ae_range⟩, ?_⟩ rintro ⟨H, ⟨t, t_sep, ht⟩⟩ rcases eq_empty_or_nonempty t with (rfl \| h₀) · simp only [mem_empty_iff_false, eventually_false_iff_eq_bot, ae_eq_bot] at ht rw [ht] exact aestronglyMeasurable_zero_measure f · obtain ⟨g, g_meas, gt, fg⟩ : ∃ g : α → β, Measurable g ∧ range g ⊆ t ∧ f =ᵐ[μ] g := H.exists_ae_eq_range_subset ht h₀ refine ⟨g, ?_, fg⟩ exact stronglyMeasurable_iff_measurable_separable.2 ⟨g_meas, t_sep.mono gt⟩ #align ae_strongly_measurable_iff_ae_measurable_separable aestronglyMeasurable_iff_aemeasurable_separable theorem _root_.aestronglyMeasurable_iff_nullMeasurable_separable [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] : AEStronglyMeasurable f μ ↔ NullMeasurable f μ ∧ ∃ t : Set β, IsSeparable t ∧ ∀ᵐ x ∂μ, f x ∈ t := aestronglyMeasurable_iff_aemeasurable_separable.trans <\| and_congr_left fun ⟨_, hsep, h⟩ ↦ have := hsep.secondCountableTopology ⟨AEMeasurable.nullMeasurable, fun hf ↦ hf.aemeasurable_of_aerange h⟩ theorem _root_.MeasurableEmbedding.aestronglyMeasurable_map_iff {γ : Type*} {mγ : MeasurableSpace γ} {mα : MeasurableSpace α} {f : γ → α} {μ : Measure γ} (hf : MeasurableEmbedding f) {g : α → β} : AEStronglyMeasurable g (Measure.map f μ) ↔ AEStronglyMeasurable (g ∘ f) μ := by refine ⟨fun H => H.comp_measurable hf.measurable, ?_⟩ rintro ⟨g₁, hgm₁, heq⟩ rcases hf.exists_stronglyMeasurable_extend hgm₁ fun x => ⟨g x⟩ with ⟨g₂, hgm₂, rfl⟩ exact ⟨g₂, hgm₂, hf.ae_map_iff.2 heq⟩ #align measurable_embedding.ae_strongly_measurable_map_iff MeasurableEmbedding.aestronglyMeasurable_map_iff	Mathlib/MeasureTheory/Function/StronglyMeasurable/Basic.lean	1,693	1,708	theorem _root_.Embedding.aestronglyMeasurable_comp_iff [PseudoMetrizableSpace β] [PseudoMetrizableSpace γ] {g : β → γ} {f : α → β} (hg : Embedding g) : AEStronglyMeasurable (fun x => g (f x)) μ ↔ AEStronglyMeasurable f μ := by	letI := pseudoMetrizableSpacePseudoMetric γ borelize β γ refine ⟨fun H => aestronglyMeasurable_iff_aemeasurable_separable.2 ⟨?_, ?_⟩, fun H => hg.continuous.comp_aestronglyMeasurable H⟩ · let G : β → range g := rangeFactorization g have hG : ClosedEmbedding G := { hg.codRestrict _ _ with isClosed_range := by rw [surjective_onto_range.range_eq]; exact isClosed_univ } have : AEMeasurable (G ∘ f) μ := AEMeasurable.subtype_mk H.aemeasurable exact hG.measurableEmbedding.aemeasurable_comp_iff.1 this · rcases (aestronglyMeasurable_iff_aemeasurable_separable.1 H).2 with ⟨t, ht, h't⟩ exact ⟨g ⁻¹' t, hg.isSeparable_preimage ht, h't⟩
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Johannes Hölzl, Scott Morrison, Jens Wagemaker -/ import Mathlib.Algebra.Polynomial.Inductions import Mathlib.Algebra.Polynomial.Monic import Mathlib.RingTheory.Multiplicity import Mathlib.RingTheory.Ideal.Maps #align_import data.polynomial.div from "leanprover-community/mathlib"@"e1e7190efdcefc925cb36f257a8362ef22944204" /-! # Division of univariate polynomials The main defs are `divByMonic` and `modByMonic`. The compatibility between these is given by `modByMonic_add_div`. We also define `rootMultiplicity`. -/ noncomputable section open Polynomial open Finset namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {A : Type z} {a b : R} {n : ℕ} section Semiring variable [Semiring R] theorem X_dvd_iff {f : R[X]} : X ∣ f ↔ f.coeff 0 = 0 := ⟨fun ⟨g, hfg⟩ => by rw [hfg, coeff_X_mul_zero], fun hf => ⟨f.divX, by rw [← add_zero (X * f.divX), ← C_0, ← hf, X_mul_divX_add]⟩⟩ set_option linter.uppercaseLean3 false in #align polynomial.X_dvd_iff Polynomial.X_dvd_iff theorem X_pow_dvd_iff {f : R[X]} {n : ℕ} : X ^ n ∣ f ↔ ∀ d < n, f.coeff d = 0 := ⟨fun ⟨g, hgf⟩ d hd => by simp only [hgf, coeff_X_pow_mul', ite_eq_right_iff, not_le_of_lt hd, IsEmpty.forall_iff], fun hd => by induction' n with n hn · simp [pow_zero, one_dvd] · obtain ⟨g, hgf⟩ := hn fun d : ℕ => fun H : d < n => hd _ (Nat.lt_succ_of_lt H) have := coeff_X_pow_mul g n 0 rw [zero_add, ← hgf, hd n (Nat.lt_succ_self n)] at this obtain ⟨k, hgk⟩ := Polynomial.X_dvd_iff.mpr this.symm use k rwa [pow_succ, mul_assoc, ← hgk]⟩ set_option linter.uppercaseLean3 false in #align polynomial.X_pow_dvd_iff Polynomial.X_pow_dvd_iff variable {p q : R[X]} theorem multiplicity_finite_of_degree_pos_of_monic (hp : (0 : WithBot ℕ) < degree p) (hmp : Monic p) (hq : q ≠ 0) : multiplicity.Finite p q := have zn0 : (0 : R) ≠ 1 := haveI := Nontrivial.of_polynomial_ne hq zero_ne_one ⟨natDegree q, fun ⟨r, hr⟩ => by have hp0 : p ≠ 0 := fun hp0 => by simp [hp0] at hp have hr0 : r ≠ 0 := fun hr0 => by subst hr0; simp [hq] at hr have hpn1 : leadingCoeff p ^ (natDegree q + 1) = 1 := by simp [show _ = _ from hmp] have hpn0' : leadingCoeff p ^ (natDegree q + 1) ≠ 0 := hpn1.symm ▸ zn0.symm have hpnr0 : leadingCoeff (p ^ (natDegree q + 1)) * leadingCoeff r ≠ 0 := by simp only [leadingCoeff_pow' hpn0', leadingCoeff_eq_zero, hpn1, one_pow, one_mul, Ne, hr0, not_false_eq_true] have hnp : 0 < natDegree p := Nat.cast_lt.1 <\| by rw [← degree_eq_natDegree hp0]; exact hp have := congr_arg natDegree hr rw [natDegree_mul' hpnr0, natDegree_pow' hpn0', add_mul, add_assoc] at this exact ne_of_lt (lt_add_of_le_of_pos (le_mul_of_one_le_right (Nat.zero_le _) hnp) (add_pos_of_pos_of_nonneg (by rwa [one_mul]) (Nat.zero_le _))) this⟩ #align polynomial.multiplicity_finite_of_degree_pos_of_monic Polynomial.multiplicity_finite_of_degree_pos_of_monic end Semiring section Ring variable [Ring R] {p q : R[X]} theorem div_wf_lemma (h : degree q ≤ degree p ∧ p ≠ 0) (hq : Monic q) : degree (p - q * (C (leadingCoeff p) * X ^ (natDegree p - natDegree q))) < degree p := have hp : leadingCoeff p ≠ 0 := mt leadingCoeff_eq_zero.1 h.2 have hq0 : q ≠ 0 := hq.ne_zero_of_polynomial_ne h.2 have hlt : natDegree q ≤ natDegree p := Nat.cast_le.1 (by rw [← degree_eq_natDegree h.2, ← degree_eq_natDegree hq0]; exact h.1) degree_sub_lt (by rw [hq.degree_mul_comm, hq.degree_mul, degree_C_mul_X_pow _ hp, degree_eq_natDegree h.2, degree_eq_natDegree hq0, ← Nat.cast_add, tsub_add_cancel_of_le hlt]) h.2 (by rw [leadingCoeff_monic_mul hq, leadingCoeff_mul_X_pow, leadingCoeff_C]) #align polynomial.div_wf_lemma Polynomial.div_wf_lemma /-- See `divByMonic`. -/ noncomputable def divModByMonicAux : ∀ (_p : R[X]) {q : R[X]}, Monic q → R[X] × R[X] \| p, q, hq => letI := Classical.decEq R if h : degree q ≤ degree p ∧ p ≠ 0 then let z := C (leadingCoeff p) * X ^ (natDegree p - natDegree q) have _wf := div_wf_lemma h hq let dm := divModByMonicAux (p - q * z) hq ⟨z + dm.1, dm.2⟩ else ⟨0, p⟩ termination_by p => p #align polynomial.div_mod_by_monic_aux Polynomial.divModByMonicAux /-- `divByMonic` gives the quotient of `p` by a monic polynomial `q`. -/ def divByMonic (p q : R[X]) : R[X] := letI := Classical.decEq R if hq : Monic q then (divModByMonicAux p hq).1 else 0 #align polynomial.div_by_monic Polynomial.divByMonic /-- `modByMonic` gives the remainder of `p` by a monic polynomial `q`. -/ def modByMonic (p q : R[X]) : R[X] := letI := Classical.decEq R if hq : Monic q then (divModByMonicAux p hq).2 else p #align polynomial.mod_by_monic Polynomial.modByMonic @[inherit_doc] infixl:70 " /ₘ " => divByMonic @[inherit_doc] infixl:70 " %ₘ " => modByMonic theorem degree_modByMonic_lt [Nontrivial R] : ∀ (p : R[X]) {q : R[X]} (_hq : Monic q), degree (p %ₘ q) < degree q \| p, q, hq => letI := Classical.decEq R if h : degree q ≤ degree p ∧ p ≠ 0 then by have _wf := div_wf_lemma ⟨h.1, h.2⟩ hq have := degree_modByMonic_lt (p - q * (C (leadingCoeff p) * X ^ (natDegree p - natDegree q))) hq unfold modByMonic at this ⊢ unfold divModByMonicAux dsimp rw [dif_pos hq] at this ⊢ rw [if_pos h] exact this else Or.casesOn (not_and_or.1 h) (by unfold modByMonic divModByMonicAux dsimp rw [dif_pos hq, if_neg h] exact lt_of_not_ge) (by intro hp unfold modByMonic divModByMonicAux dsimp rw [dif_pos hq, if_neg h, Classical.not_not.1 hp] exact lt_of_le_of_ne bot_le (Ne.symm (mt degree_eq_bot.1 hq.ne_zero))) termination_by p => p #align polynomial.degree_mod_by_monic_lt Polynomial.degree_modByMonic_lt theorem natDegree_modByMonic_lt (p : R[X]) {q : R[X]} (hmq : Monic q) (hq : q ≠ 1) : natDegree (p %ₘ q) < q.natDegree := by by_cases hpq : p %ₘ q = 0 · rw [hpq, natDegree_zero, Nat.pos_iff_ne_zero] contrapose! hq exact eq_one_of_monic_natDegree_zero hmq hq · haveI := Nontrivial.of_polynomial_ne hpq exact natDegree_lt_natDegree hpq (degree_modByMonic_lt p hmq) @[simp]	Mathlib/Algebra/Polynomial/Div.lean	176	182	theorem zero_modByMonic (p : R[X]) : 0 %ₘ p = 0 := by	classical unfold modByMonic divModByMonicAux dsimp by_cases hp : Monic p · rw [dif_pos hp, if_neg (mt And.right (not_not_intro rfl))] · rw [dif_neg hp]
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Gabriel Ebner -/ import Mathlib.Init.Data.Nat.Lemmas import Mathlib.Data.Int.Cast.Defs import Mathlib.Algebra.Group.Basic #align_import data.int.cast.basic from "leanprover-community/mathlib"@"70d50ecfd4900dd6d328da39ab7ebd516abe4025" /-! # Cast of integers (additional theorems) This file proves additional properties about the canonical homomorphism from the integers into an additive group with a one (`Int.cast`). There is also `Data.Int.Cast.Lemmas`, which includes lemmas stated in terms of algebraic homomorphisms, and results involving the order structure of `ℤ`. By contrast, this file's only import beyond `Data.Int.Cast.Defs` is `Algebra.Group.Basic`. -/ universe u namespace Nat variable {R : Type u} [AddGroupWithOne R] @[simp, norm_cast] theorem cast_sub {m n} (h : m ≤ n) : ((n - m : ℕ) : R) = n - m := eq_sub_of_add_eq <\| by rw [← cast_add, Nat.sub_add_cancel h] #align nat.cast_sub Nat.cast_subₓ -- `HasLiftT` appeared in the type signature @[simp, norm_cast] theorem cast_pred : ∀ {n}, 0 < n → ((n - 1 : ℕ) : R) = n - 1 \| 0, h => by cases h \| n + 1, _ => by rw [cast_succ, add_sub_cancel_right]; rfl #align nat.cast_pred Nat.cast_pred end Nat open Nat namespace Int variable {R : Type u} [AddGroupWithOne R] @[simp, norm_cast squash] theorem cast_negSucc (n : ℕ) : (-[n+1] : R) = -(n + 1 : ℕ) := AddGroupWithOne.intCast_negSucc n #align int.cast_neg_succ_of_nat Int.cast_negSuccₓ -- expected `n` to be implicit, and `HasLiftT` @[simp, norm_cast] theorem cast_zero : ((0 : ℤ) : R) = 0 := (AddGroupWithOne.intCast_ofNat 0).trans Nat.cast_zero #align int.cast_zero Int.cast_zeroₓ -- type had `HasLiftT` -- This lemma competes with `Int.ofNat_eq_natCast` to come later @[simp high, nolint simpNF, norm_cast] theorem cast_natCast (n : ℕ) : ((n : ℤ) : R) = n := AddGroupWithOne.intCast_ofNat _ #align int.cast_coe_nat Int.cast_natCastₓ -- expected `n` to be implicit, and `HasLiftT` #align int.cast_of_nat Int.cast_natCastₓ -- See note [no_index around OfNat.ofNat] @[simp, norm_cast] theorem cast_ofNat (n : ℕ) [n.AtLeastTwo] : ((no_index (OfNat.ofNat n) : ℤ) : R) = OfNat.ofNat n := by simpa only [OfNat.ofNat] using AddGroupWithOne.intCast_ofNat (R := R) n @[simp, norm_cast] theorem cast_one : ((1 : ℤ) : R) = 1 := by erw [cast_natCast, Nat.cast_one] #align int.cast_one Int.cast_oneₓ -- type had `HasLiftT` @[simp, norm_cast] theorem cast_neg : ∀ n, ((-n : ℤ) : R) = -n \| (0 : ℕ) => by erw [cast_zero, neg_zero] \| (n + 1 : ℕ) => by erw [cast_natCast, cast_negSucc] \| -[n+1] => by erw [cast_natCast, cast_negSucc, neg_neg] #align int.cast_neg Int.cast_negₓ -- type had `HasLiftT` @[simp, norm_cast] theorem cast_subNatNat (m n) : ((Int.subNatNat m n : ℤ) : R) = m - n := by unfold subNatNat cases e : n - m · simp only [ofNat_eq_coe] simp [e, Nat.le_of_sub_eq_zero e] · rw [cast_negSucc, ← e, Nat.cast_sub <\| _root_.le_of_lt <\| Nat.lt_of_sub_eq_succ e, neg_sub] #align int.cast_sub_nat_nat Int.cast_subNatNatₓ -- type had `HasLiftT` #align int.neg_of_nat_eq Int.negOfNat_eq @[simp] theorem cast_negOfNat (n : ℕ) : ((negOfNat n : ℤ) : R) = -n := by simp [Int.cast_neg, negOfNat_eq] #align int.cast_neg_of_nat Int.cast_negOfNat @[simp, norm_cast] theorem cast_add : ∀ m n, ((m + n : ℤ) : R) = m + n \| (m : ℕ), (n : ℕ) => by simp [-Int.natCast_add, ← Int.ofNat_add] \| (m : ℕ), -[n+1] => by erw [cast_subNatNat, cast_natCast, cast_negSucc, sub_eq_add_neg] \| -[m+1], (n : ℕ) => by erw [cast_subNatNat, cast_natCast, cast_negSucc, sub_eq_iff_eq_add, add_assoc, eq_neg_add_iff_add_eq, ← Nat.cast_add, ← Nat.cast_add, Nat.add_comm] \| -[m+1], -[n+1] => show (-[m + n + 1+1] : R) = _ by rw [cast_negSucc, cast_negSucc, cast_negSucc, ← neg_add_rev, ← Nat.cast_add, Nat.add_right_comm m n 1, Nat.add_assoc, Nat.add_comm] #align int.cast_add Int.cast_addₓ -- type had `HasLiftT` @[simp, norm_cast]	Mathlib/Data/Int/Cast/Basic.lean	123	124	theorem cast_sub (m n) : ((m - n : ℤ) : R) = m - n := by	simp [Int.sub_eq_add_neg, sub_eq_add_neg, Int.cast_neg, Int.cast_add]
/- Copyright (c) 2020 Yury G. Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury G. Kudryashov, Patrick Massot, Sébastien Gouëzel -/ import Mathlib.Order.Interval.Set.Disjoint import Mathlib.MeasureTheory.Integral.SetIntegral import Mathlib.MeasureTheory.Measure.Lebesgue.Basic #align_import measure_theory.integral.interval_integral from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" /-! # Integral over an interval In this file we define `∫ x in a..b, f x ∂μ` to be `∫ x in Ioc a b, f x ∂μ` if `a ≤ b` and `-∫ x in Ioc b a, f x ∂μ` if `b ≤ a`. ## Implementation notes ### Avoiding `if`, `min`, and `max` In order to avoid `if`s in the definition, we define `IntervalIntegrable f μ a b` as `integrable_on f (Ioc a b) μ ∧ integrable_on f (Ioc b a) μ`. For any `a`, `b` one of these intervals is empty and the other coincides with `Set.uIoc a b = Set.Ioc (min a b) (max a b)`. Similarly, we define `∫ x in a..b, f x ∂μ` to be `∫ x in Ioc a b, f x ∂μ - ∫ x in Ioc b a, f x ∂μ`. Again, for any `a`, `b` one of these integrals is zero, and the other gives the expected result. This way some properties can be translated from integrals over sets without dealing with the cases `a ≤ b` and `b ≤ a` separately. ### Choice of the interval We use integral over `Set.uIoc a b = Set.Ioc (min a b) (max a b)` instead of one of the other three possible intervals with the same endpoints for two reasons: * this way `∫ x in a..b, f x ∂μ + ∫ x in b..c, f x ∂μ = ∫ x in a..c, f x ∂μ` holds whenever `f` is integrable on each interval; in particular, it works even if the measure `μ` has an atom at `b`; this rules out `Set.Ioo` and `Set.Icc` intervals; * with this definition for a probability measure `μ`, the integral `∫ x in a..b, 1 ∂μ` equals the difference $F_μ(b)-F_μ(a)$, where $F_μ(a)=μ(-∞, a]$ is the [cumulative distribution function](https://en.wikipedia.org/wiki/Cumulative_distribution_function) of `μ`. ## Tags integral -/ noncomputable section open scoped Classical open MeasureTheory Set Filter Function open scoped Classical Topology Filter ENNReal Interval NNReal variable {ι 𝕜 E F A : Type} [NormedAddCommGroup E] /-! ### Integrability on an interval -/ /-- A function `f` is called interval integrable* with respect to a measure `μ` on an unordered interval `a..b` if it is integrable on both intervals `(a, b]` and `(b, a]`. One of these intervals is always empty, so this property is equivalent to `f` being integrable on `(min a b, max a b]`. -/ def IntervalIntegrable (f : ℝ → E) (μ : Measure ℝ) (a b : ℝ) : Prop := IntegrableOn f (Ioc a b) μ ∧ IntegrableOn f (Ioc b a) μ #align interval_integrable IntervalIntegrable /-! ## Basic iff's for `IntervalIntegrable` -/ section variable {f : ℝ → E} {a b : ℝ} {μ : Measure ℝ} /-- A function is interval integrable with respect to a given measure `μ` on `a..b` if and only if it is integrable on `uIoc a b` with respect to `μ`. This is an equivalent definition of `IntervalIntegrable`. -/ theorem intervalIntegrable_iff : IntervalIntegrable f μ a b ↔ IntegrableOn f (Ι a b) μ := by rw [uIoc_eq_union, integrableOn_union, IntervalIntegrable] #align interval_integrable_iff intervalIntegrable_iff /-- If a function is interval integrable with respect to a given measure `μ` on `a..b` then it is integrable on `uIoc a b` with respect to `μ`. -/ theorem IntervalIntegrable.def' (h : IntervalIntegrable f μ a b) : IntegrableOn f (Ι a b) μ := intervalIntegrable_iff.mp h #align interval_integrable.def IntervalIntegrable.def' theorem intervalIntegrable_iff_integrableOn_Ioc_of_le (hab : a ≤ b) : IntervalIntegrable f μ a b ↔ IntegrableOn f (Ioc a b) μ := by rw [intervalIntegrable_iff, uIoc_of_le hab] #align interval_integrable_iff_integrable_Ioc_of_le intervalIntegrable_iff_integrableOn_Ioc_of_le theorem intervalIntegrable_iff' [NoAtoms μ] : IntervalIntegrable f μ a b ↔ IntegrableOn f (uIcc a b) μ := by rw [intervalIntegrable_iff, ← Icc_min_max, uIoc, integrableOn_Icc_iff_integrableOn_Ioc] #align interval_integrable_iff' intervalIntegrable_iff' theorem intervalIntegrable_iff_integrableOn_Icc_of_le {f : ℝ → E} {a b : ℝ} (hab : a ≤ b) {μ : Measure ℝ} [NoAtoms μ] : IntervalIntegrable f μ a b ↔ IntegrableOn f (Icc a b) μ := by rw [intervalIntegrable_iff_integrableOn_Ioc_of_le hab, integrableOn_Icc_iff_integrableOn_Ioc] #align interval_integrable_iff_integrable_Icc_of_le intervalIntegrable_iff_integrableOn_Icc_of_le theorem intervalIntegrable_iff_integrableOn_Ico_of_le [NoAtoms μ] (hab : a ≤ b) : IntervalIntegrable f μ a b ↔ IntegrableOn f (Ico a b) μ := by rw [intervalIntegrable_iff_integrableOn_Icc_of_le hab, integrableOn_Icc_iff_integrableOn_Ico] theorem intervalIntegrable_iff_integrableOn_Ioo_of_le [NoAtoms μ] (hab : a ≤ b) : IntervalIntegrable f μ a b ↔ IntegrableOn f (Ioo a b) μ := by rw [intervalIntegrable_iff_integrableOn_Icc_of_le hab, integrableOn_Icc_iff_integrableOn_Ioo] /-- If a function is integrable with respect to a given measure `μ` then it is interval integrable with respect to `μ` on `uIcc a b`. -/ theorem MeasureTheory.Integrable.intervalIntegrable (hf : Integrable f μ) : IntervalIntegrable f μ a b := ⟨hf.integrableOn, hf.integrableOn⟩ #align measure_theory.integrable.interval_integrable MeasureTheory.Integrable.intervalIntegrable theorem MeasureTheory.IntegrableOn.intervalIntegrable (hf : IntegrableOn f [[a, b]] μ) : IntervalIntegrable f μ a b := ⟨MeasureTheory.IntegrableOn.mono_set hf (Ioc_subset_Icc_self.trans Icc_subset_uIcc), MeasureTheory.IntegrableOn.mono_set hf (Ioc_subset_Icc_self.trans Icc_subset_uIcc')⟩ #align measure_theory.integrable_on.interval_integrable MeasureTheory.IntegrableOn.intervalIntegrable theorem intervalIntegrable_const_iff {c : E} : IntervalIntegrable (fun _ => c) μ a b ↔ c = 0 ∨ μ (Ι a b) < ∞ := by simp only [intervalIntegrable_iff, integrableOn_const] #align interval_integrable_const_iff intervalIntegrable_const_iff @[simp] theorem intervalIntegrable_const [IsLocallyFiniteMeasure μ] {c : E} : IntervalIntegrable (fun _ => c) μ a b := intervalIntegrable_const_iff.2 <\| Or.inr measure_Ioc_lt_top #align interval_integrable_const intervalIntegrable_const end /-! ## Basic properties of interval integrability - interval integrability is symmetric, reflexive, transitive - monotonicity and strong measurability of the interval integral - if `f` is interval integrable, so are its absolute value and norm - arithmetic properties -/ namespace IntervalIntegrable section variable {f : ℝ → E} {a b c d : ℝ} {μ ν : Measure ℝ} @[symm] nonrec theorem symm (h : IntervalIntegrable f μ a b) : IntervalIntegrable f μ b a := h.symm #align interval_integrable.symm IntervalIntegrable.symm @[refl, simp] -- Porting note: added `simp` theorem refl : IntervalIntegrable f μ a a := by constructor <;> simp #align interval_integrable.refl IntervalIntegrable.refl @[trans] theorem trans {a b c : ℝ} (hab : IntervalIntegrable f μ a b) (hbc : IntervalIntegrable f μ b c) : IntervalIntegrable f μ a c := ⟨(hab.1.union hbc.1).mono_set Ioc_subset_Ioc_union_Ioc, (hbc.2.union hab.2).mono_set Ioc_subset_Ioc_union_Ioc⟩ #align interval_integrable.trans IntervalIntegrable.trans theorem trans_iterate_Ico {a : ℕ → ℝ} {m n : ℕ} (hmn : m ≤ n) (hint : ∀ k ∈ Ico m n, IntervalIntegrable f μ (a k) (a <\| k + 1)) : IntervalIntegrable f μ (a m) (a n) := by revert hint refine Nat.le_induction ?_ ?_ n hmn · simp · intro p hp IH h exact (IH fun k hk => h k (Ico_subset_Ico_right p.le_succ hk)).trans (h p (by simp [hp])) #align interval_integrable.trans_iterate_Ico IntervalIntegrable.trans_iterate_Ico theorem trans_iterate {a : ℕ → ℝ} {n : ℕ} (hint : ∀ k < n, IntervalIntegrable f μ (a k) (a <\| k + 1)) : IntervalIntegrable f μ (a 0) (a n) := trans_iterate_Ico bot_le fun k hk => hint k hk.2 #align interval_integrable.trans_iterate IntervalIntegrable.trans_iterate theorem neg (h : IntervalIntegrable f μ a b) : IntervalIntegrable (-f) μ a b := ⟨h.1.neg, h.2.neg⟩ #align interval_integrable.neg IntervalIntegrable.neg theorem norm (h : IntervalIntegrable f μ a b) : IntervalIntegrable (fun x => ‖f x‖) μ a b := ⟨h.1.norm, h.2.norm⟩ #align interval_integrable.norm IntervalIntegrable.norm theorem intervalIntegrable_norm_iff {f : ℝ → E} {μ : Measure ℝ} {a b : ℝ} (hf : AEStronglyMeasurable f (μ.restrict (Ι a b))) : IntervalIntegrable (fun t => ‖f t‖) μ a b ↔ IntervalIntegrable f μ a b := by simp_rw [intervalIntegrable_iff, IntegrableOn]; exact integrable_norm_iff hf #align interval_integrable.interval_integrable_norm_iff IntervalIntegrable.intervalIntegrable_norm_iff theorem abs {f : ℝ → ℝ} (h : IntervalIntegrable f μ a b) : IntervalIntegrable (fun x => \|f x\|) μ a b := h.norm #align interval_integrable.abs IntervalIntegrable.abs theorem mono (hf : IntervalIntegrable f ν a b) (h1 : [[c, d]] ⊆ [[a, b]]) (h2 : μ ≤ ν) : IntervalIntegrable f μ c d := intervalIntegrable_iff.mpr <\| hf.def'.mono (uIoc_subset_uIoc_of_uIcc_subset_uIcc h1) h2 #align interval_integrable.mono IntervalIntegrable.mono theorem mono_measure (hf : IntervalIntegrable f ν a b) (h : μ ≤ ν) : IntervalIntegrable f μ a b := hf.mono Subset.rfl h #align interval_integrable.mono_measure IntervalIntegrable.mono_measure theorem mono_set (hf : IntervalIntegrable f μ a b) (h : [[c, d]] ⊆ [[a, b]]) : IntervalIntegrable f μ c d := hf.mono h le_rfl #align interval_integrable.mono_set IntervalIntegrable.mono_set theorem mono_set_ae (hf : IntervalIntegrable f μ a b) (h : Ι c d ≤ᵐ[μ] Ι a b) : IntervalIntegrable f μ c d := intervalIntegrable_iff.mpr <\| hf.def'.mono_set_ae h #align interval_integrable.mono_set_ae IntervalIntegrable.mono_set_ae theorem mono_set' (hf : IntervalIntegrable f μ a b) (hsub : Ι c d ⊆ Ι a b) : IntervalIntegrable f μ c d := hf.mono_set_ae <\| eventually_of_forall hsub #align interval_integrable.mono_set' IntervalIntegrable.mono_set' theorem mono_fun [NormedAddCommGroup F] {g : ℝ → F} (hf : IntervalIntegrable f μ a b) (hgm : AEStronglyMeasurable g (μ.restrict (Ι a b))) (hle : (fun x => ‖g x‖) ≤ᵐ[μ.restrict (Ι a b)] fun x => ‖f x‖) : IntervalIntegrable g μ a b := intervalIntegrable_iff.2 <\| hf.def'.integrable.mono hgm hle #align interval_integrable.mono_fun IntervalIntegrable.mono_fun theorem mono_fun' {g : ℝ → ℝ} (hg : IntervalIntegrable g μ a b) (hfm : AEStronglyMeasurable f (μ.restrict (Ι a b))) (hle : (fun x => ‖f x‖) ≤ᵐ[μ.restrict (Ι a b)] g) : IntervalIntegrable f μ a b := intervalIntegrable_iff.2 <\| hg.def'.integrable.mono' hfm hle #align interval_integrable.mono_fun' IntervalIntegrable.mono_fun' protected theorem aestronglyMeasurable (h : IntervalIntegrable f μ a b) : AEStronglyMeasurable f (μ.restrict (Ioc a b)) := h.1.aestronglyMeasurable #align interval_integrable.ae_strongly_measurable IntervalIntegrable.aestronglyMeasurable protected theorem aestronglyMeasurable' (h : IntervalIntegrable f μ a b) : AEStronglyMeasurable f (μ.restrict (Ioc b a)) := h.2.aestronglyMeasurable #align interval_integrable.ae_strongly_measurable' IntervalIntegrable.aestronglyMeasurable' end variable [NormedRing A] {f g : ℝ → E} {a b : ℝ} {μ : Measure ℝ} theorem smul [NormedField 𝕜] [NormedSpace 𝕜 E] {f : ℝ → E} {a b : ℝ} {μ : Measure ℝ} (h : IntervalIntegrable f μ a b) (r : 𝕜) : IntervalIntegrable (r • f) μ a b := ⟨h.1.smul r, h.2.smul r⟩ #align interval_integrable.smul IntervalIntegrable.smul @[simp] theorem add (hf : IntervalIntegrable f μ a b) (hg : IntervalIntegrable g μ a b) : IntervalIntegrable (fun x => f x + g x) μ a b := ⟨hf.1.add hg.1, hf.2.add hg.2⟩ #align interval_integrable.add IntervalIntegrable.add @[simp] theorem sub (hf : IntervalIntegrable f μ a b) (hg : IntervalIntegrable g μ a b) : IntervalIntegrable (fun x => f x - g x) μ a b := ⟨hf.1.sub hg.1, hf.2.sub hg.2⟩ #align interval_integrable.sub IntervalIntegrable.sub theorem sum (s : Finset ι) {f : ι → ℝ → E} (h : ∀ i ∈ s, IntervalIntegrable (f i) μ a b) : IntervalIntegrable (∑ i ∈ s, f i) μ a b := ⟨integrable_finset_sum' s fun i hi => (h i hi).1, integrable_finset_sum' s fun i hi => (h i hi).2⟩ #align interval_integrable.sum IntervalIntegrable.sum theorem mul_continuousOn {f g : ℝ → A} (hf : IntervalIntegrable f μ a b) (hg : ContinuousOn g [[a, b]]) : IntervalIntegrable (fun x => f x * g x) μ a b := by rw [intervalIntegrable_iff] at hf ⊢ exact hf.mul_continuousOn_of_subset hg measurableSet_Ioc isCompact_uIcc Ioc_subset_Icc_self #align interval_integrable.mul_continuous_on IntervalIntegrable.mul_continuousOn theorem continuousOn_mul {f g : ℝ → A} (hf : IntervalIntegrable f μ a b) (hg : ContinuousOn g [[a, b]]) : IntervalIntegrable (fun x => g x * f x) μ a b := by rw [intervalIntegrable_iff] at hf ⊢ exact hf.continuousOn_mul_of_subset hg isCompact_uIcc measurableSet_Ioc Ioc_subset_Icc_self #align interval_integrable.continuous_on_mul IntervalIntegrable.continuousOn_mul @[simp] theorem const_mul {f : ℝ → A} (hf : IntervalIntegrable f μ a b) (c : A) : IntervalIntegrable (fun x => c * f x) μ a b := hf.continuousOn_mul continuousOn_const #align interval_integrable.const_mul IntervalIntegrable.const_mul @[simp] theorem mul_const {f : ℝ → A} (hf : IntervalIntegrable f μ a b) (c : A) : IntervalIntegrable (fun x => f x * c) μ a b := hf.mul_continuousOn continuousOn_const #align interval_integrable.mul_const IntervalIntegrable.mul_const @[simp] theorem div_const {𝕜 : Type} {f : ℝ → 𝕜} [NormedField 𝕜] (h : IntervalIntegrable f μ a b) (c : 𝕜) : IntervalIntegrable (fun x => f x / c) μ a b := by simpa only [div_eq_mul_inv] using mul_const h c⁻¹ #align interval_integrable.div_const IntervalIntegrable.div_const theorem comp_mul_left (hf : IntervalIntegrable f volume a b) (c : ℝ) : IntervalIntegrable (fun x => f (c x)) volume (a / c) (b / c) := by rcases eq_or_ne c 0 with (hc \| hc); · rw [hc]; simp rw [intervalIntegrable_iff'] at hf ⊢ have A : MeasurableEmbedding fun x => x * c⁻¹ := (Homeomorph.mulRight₀ _ (inv_ne_zero hc)).closedEmbedding.measurableEmbedding rw [← Real.smul_map_volume_mul_right (inv_ne_zero hc), IntegrableOn, Measure.restrict_smul, integrable_smul_measure (by simpa : ENNReal.ofReal \|c⁻¹\| ≠ 0) ENNReal.ofReal_ne_top, ← IntegrableOn, MeasurableEmbedding.integrableOn_map_iff A] convert hf using 1 · ext; simp only [comp_apply]; congr 1; field_simp · rw [preimage_mul_const_uIcc (inv_ne_zero hc)]; field_simp [hc] #align interval_integrable.comp_mul_left IntervalIntegrable.comp_mul_left -- Porting note (#10756): new lemma theorem comp_mul_left_iff {c : ℝ} (hc : c ≠ 0) : IntervalIntegrable (fun x ↦ f (c * x)) volume (a / c) (b / c) ↔ IntervalIntegrable f volume a b := ⟨fun h ↦ by simpa [hc] using h.comp_mul_left c⁻¹, (comp_mul_left · c)⟩ theorem comp_mul_right (hf : IntervalIntegrable f volume a b) (c : ℝ) : IntervalIntegrable (fun x => f (x * c)) volume (a / c) (b / c) := by simpa only [mul_comm] using comp_mul_left hf c #align interval_integrable.comp_mul_right IntervalIntegrable.comp_mul_right theorem comp_add_right (hf : IntervalIntegrable f volume a b) (c : ℝ) : IntervalIntegrable (fun x => f (x + c)) volume (a - c) (b - c) := by wlog h : a ≤ b generalizing a b · exact IntervalIntegrable.symm (this hf.symm (le_of_not_le h)) rw [intervalIntegrable_iff'] at hf ⊢ have A : MeasurableEmbedding fun x => x + c := (Homeomorph.addRight c).closedEmbedding.measurableEmbedding rw [← map_add_right_eq_self volume c] at hf convert (MeasurableEmbedding.integrableOn_map_iff A).mp hf using 1 rw [preimage_add_const_uIcc] #align interval_integrable.comp_add_right IntervalIntegrable.comp_add_right theorem comp_add_left (hf : IntervalIntegrable f volume a b) (c : ℝ) : IntervalIntegrable (fun x => f (c + x)) volume (a - c) (b - c) := by simpa only [add_comm] using IntervalIntegrable.comp_add_right hf c #align interval_integrable.comp_add_left IntervalIntegrable.comp_add_left theorem comp_sub_right (hf : IntervalIntegrable f volume a b) (c : ℝ) : IntervalIntegrable (fun x => f (x - c)) volume (a + c) (b + c) := by simpa only [sub_neg_eq_add] using IntervalIntegrable.comp_add_right hf (-c) #align interval_integrable.comp_sub_right IntervalIntegrable.comp_sub_right theorem iff_comp_neg : IntervalIntegrable f volume a b ↔ IntervalIntegrable (fun x => f (-x)) volume (-a) (-b) := by rw [← comp_mul_left_iff (neg_ne_zero.2 one_ne_zero)]; simp [div_neg] #align interval_integrable.iff_comp_neg IntervalIntegrable.iff_comp_neg theorem comp_sub_left (hf : IntervalIntegrable f volume a b) (c : ℝ) : IntervalIntegrable (fun x => f (c - x)) volume (c - a) (c - b) := by simpa only [neg_sub, ← sub_eq_add_neg] using iff_comp_neg.mp (hf.comp_add_left c) #align interval_integrable.comp_sub_left IntervalIntegrable.comp_sub_left end IntervalIntegrable /-! ## Continuous functions are interval integrable -/ section variable {μ : Measure ℝ} [IsLocallyFiniteMeasure μ] theorem ContinuousOn.intervalIntegrable {u : ℝ → E} {a b : ℝ} (hu : ContinuousOn u (uIcc a b)) : IntervalIntegrable u μ a b := (ContinuousOn.integrableOn_Icc hu).intervalIntegrable #align continuous_on.interval_integrable ContinuousOn.intervalIntegrable theorem ContinuousOn.intervalIntegrable_of_Icc {u : ℝ → E} {a b : ℝ} (h : a ≤ b) (hu : ContinuousOn u (Icc a b)) : IntervalIntegrable u μ a b := ContinuousOn.intervalIntegrable ((uIcc_of_le h).symm ▸ hu) #align continuous_on.interval_integrable_of_Icc ContinuousOn.intervalIntegrable_of_Icc /-- A continuous function on `ℝ` is `IntervalIntegrable` with respect to any locally finite measure `ν` on ℝ. -/ theorem Continuous.intervalIntegrable {u : ℝ → E} (hu : Continuous u) (a b : ℝ) : IntervalIntegrable u μ a b := hu.continuousOn.intervalIntegrable #align continuous.interval_integrable Continuous.intervalIntegrable end /-! ## Monotone and antitone functions are integral integrable -/ section variable {μ : Measure ℝ} [IsLocallyFiniteMeasure μ] [ConditionallyCompleteLinearOrder E] [OrderTopology E] [SecondCountableTopology E] theorem MonotoneOn.intervalIntegrable {u : ℝ → E} {a b : ℝ} (hu : MonotoneOn u (uIcc a b)) : IntervalIntegrable u μ a b := by rw [intervalIntegrable_iff] exact (hu.integrableOn_isCompact isCompact_uIcc).mono_set Ioc_subset_Icc_self #align monotone_on.interval_integrable MonotoneOn.intervalIntegrable theorem AntitoneOn.intervalIntegrable {u : ℝ → E} {a b : ℝ} (hu : AntitoneOn u (uIcc a b)) : IntervalIntegrable u μ a b := hu.dual_right.intervalIntegrable #align antitone_on.interval_integrable AntitoneOn.intervalIntegrable theorem Monotone.intervalIntegrable {u : ℝ → E} {a b : ℝ} (hu : Monotone u) : IntervalIntegrable u μ a b := (hu.monotoneOn _).intervalIntegrable #align monotone.interval_integrable Monotone.intervalIntegrable theorem Antitone.intervalIntegrable {u : ℝ → E} {a b : ℝ} (hu : Antitone u) : IntervalIntegrable u μ a b := (hu.antitoneOn _).intervalIntegrable #align antitone.interval_integrable Antitone.intervalIntegrable end /-- Let `l'` be a measurably generated filter; let `l` be a of filter such that each `s ∈ l'` eventually includes `Ioc u v` as both `u` and `v` tend to `l`. Let `μ` be a measure finite at `l'`. Suppose that `f : ℝ → E` has a finite limit at `l' ⊓ ae μ`. Then `f` is interval integrable on `u..v` provided that both `u` and `v` tend to `l`. Typeclass instances allow Lean to find `l'` based on `l` but not vice versa, so `apply Tendsto.eventually_intervalIntegrable_ae` will generate goals `Filter ℝ` and `TendstoIxxClass Ioc ?m_1 l'`. -/ theorem Filter.Tendsto.eventually_intervalIntegrable_ae {f : ℝ → E} {μ : Measure ℝ} {l l' : Filter ℝ} (hfm : StronglyMeasurableAtFilter f l' μ) [TendstoIxxClass Ioc l l'] [IsMeasurablyGenerated l'] (hμ : μ.FiniteAtFilter l') {c : E} (hf : Tendsto f (l' ⊓ ae μ) (𝓝 c)) {u v : ι → ℝ} {lt : Filter ι} (hu : Tendsto u lt l) (hv : Tendsto v lt l) : ∀ᶠ t in lt, IntervalIntegrable f μ (u t) (v t) := have := (hf.integrableAtFilter_ae hfm hμ).eventually ((hu.Ioc hv).eventually this).and <\| (hv.Ioc hu).eventually this #align filter.tendsto.eventually_interval_integrable_ae Filter.Tendsto.eventually_intervalIntegrable_ae /-- Let `l'` be a measurably generated filter; let `l` be a of filter such that each `s ∈ l'` eventually includes `Ioc u v` as both `u` and `v` tend to `l`. Let `μ` be a measure finite at `l'`. Suppose that `f : ℝ → E` has a finite limit at `l`. Then `f` is interval integrable on `u..v` provided that both `u` and `v` tend to `l`. Typeclass instances allow Lean to find `l'` based on `l` but not vice versa, so `apply Tendsto.eventually_intervalIntegrable` will generate goals `Filter ℝ` and `TendstoIxxClass Ioc ?m_1 l'`. -/ theorem Filter.Tendsto.eventually_intervalIntegrable {f : ℝ → E} {μ : Measure ℝ} {l l' : Filter ℝ} (hfm : StronglyMeasurableAtFilter f l' μ) [TendstoIxxClass Ioc l l'] [IsMeasurablyGenerated l'] (hμ : μ.FiniteAtFilter l') {c : E} (hf : Tendsto f l' (𝓝 c)) {u v : ι → ℝ} {lt : Filter ι} (hu : Tendsto u lt l) (hv : Tendsto v lt l) : ∀ᶠ t in lt, IntervalIntegrable f μ (u t) (v t) := (hf.mono_left inf_le_left).eventually_intervalIntegrable_ae hfm hμ hu hv #align filter.tendsto.eventually_interval_integrable Filter.Tendsto.eventually_intervalIntegrable /-! ### Interval integral: definition and basic properties In this section we define `∫ x in a..b, f x ∂μ` as `∫ x in Ioc a b, f x ∂μ - ∫ x in Ioc b a, f x ∂μ` and prove some basic properties. -/ variable [CompleteSpace E] [NormedSpace ℝ E] /-- The interval integral `∫ x in a..b, f x ∂μ` is defined as `∫ x in Ioc a b, f x ∂μ - ∫ x in Ioc b a, f x ∂μ`. If `a ≤ b`, then it equals `∫ x in Ioc a b, f x ∂μ`, otherwise it equals `-∫ x in Ioc b a, f x ∂μ`. -/ def intervalIntegral (f : ℝ → E) (a b : ℝ) (μ : Measure ℝ) : E := (∫ x in Ioc a b, f x ∂μ) - ∫ x in Ioc b a, f x ∂μ #align interval_integral intervalIntegral notation3"∫ "(...)" in "a".."b", "r:60:(scoped f => f)" ∂"μ:70 => intervalIntegral r a b μ notation3"∫ "(...)" in "a".."b", "r:60:(scoped f => intervalIntegral f a b volume) => r namespace intervalIntegral section Basic variable {a b : ℝ} {f g : ℝ → E} {μ : Measure ℝ} @[simp] theorem integral_zero : (∫ _ in a..b, (0 : E) ∂μ) = 0 := by simp [intervalIntegral] #align interval_integral.integral_zero intervalIntegral.integral_zero theorem integral_of_le (h : a ≤ b) : ∫ x in a..b, f x ∂μ = ∫ x in Ioc a b, f x ∂μ := by simp [intervalIntegral, h] #align interval_integral.integral_of_le intervalIntegral.integral_of_le @[simp] theorem integral_same : ∫ x in a..a, f x ∂μ = 0 := sub_self _ #align interval_integral.integral_same intervalIntegral.integral_same theorem integral_symm (a b) : ∫ x in b..a, f x ∂μ = -∫ x in a..b, f x ∂μ := by simp only [intervalIntegral, neg_sub] #align interval_integral.integral_symm intervalIntegral.integral_symm theorem integral_of_ge (h : b ≤ a) : ∫ x in a..b, f x ∂μ = -∫ x in Ioc b a, f x ∂μ := by simp only [integral_symm b, integral_of_le h] #align interval_integral.integral_of_ge intervalIntegral.integral_of_ge theorem intervalIntegral_eq_integral_uIoc (f : ℝ → E) (a b : ℝ) (μ : Measure ℝ) : ∫ x in a..b, f x ∂μ = (if a ≤ b then 1 else -1 : ℝ) • ∫ x in Ι a b, f x ∂μ := by split_ifs with h · simp only [integral_of_le h, uIoc_of_le h, one_smul] · simp only [integral_of_ge (not_le.1 h).le, uIoc_of_lt (not_le.1 h), neg_one_smul] #align interval_integral.interval_integral_eq_integral_uIoc intervalIntegral.intervalIntegral_eq_integral_uIoc theorem norm_intervalIntegral_eq (f : ℝ → E) (a b : ℝ) (μ : Measure ℝ) : ‖∫ x in a..b, f x ∂μ‖ = ‖∫ x in Ι a b, f x ∂μ‖ := by simp_rw [intervalIntegral_eq_integral_uIoc, norm_smul] split_ifs <;> simp only [norm_neg, norm_one, one_mul] #align interval_integral.norm_interval_integral_eq intervalIntegral.norm_intervalIntegral_eq theorem abs_intervalIntegral_eq (f : ℝ → ℝ) (a b : ℝ) (μ : Measure ℝ) : \|∫ x in a..b, f x ∂μ\| = \|∫ x in Ι a b, f x ∂μ\| := norm_intervalIntegral_eq f a b μ #align interval_integral.abs_interval_integral_eq intervalIntegral.abs_intervalIntegral_eq theorem integral_cases (f : ℝ → E) (a b) : (∫ x in a..b, f x ∂μ) ∈ ({∫ x in Ι a b, f x ∂μ, -∫ x in Ι a b, f x ∂μ} : Set E) := by rw [intervalIntegral_eq_integral_uIoc]; split_ifs <;> simp #align interval_integral.integral_cases intervalIntegral.integral_cases nonrec theorem integral_undef (h : ¬IntervalIntegrable f μ a b) : ∫ x in a..b, f x ∂μ = 0 := by rw [intervalIntegrable_iff] at h rw [intervalIntegral_eq_integral_uIoc, integral_undef h, smul_zero] #align interval_integral.integral_undef intervalIntegral.integral_undef theorem intervalIntegrable_of_integral_ne_zero {a b : ℝ} {f : ℝ → E} {μ : Measure ℝ} (h : (∫ x in a..b, f x ∂μ) ≠ 0) : IntervalIntegrable f μ a b := not_imp_comm.1 integral_undef h #align interval_integral.interval_integrable_of_integral_ne_zero intervalIntegral.intervalIntegrable_of_integral_ne_zero nonrec theorem integral_non_aestronglyMeasurable (hf : ¬AEStronglyMeasurable f (μ.restrict (Ι a b))) : ∫ x in a..b, f x ∂μ = 0 := by rw [intervalIntegral_eq_integral_uIoc, integral_non_aestronglyMeasurable hf, smul_zero] #align interval_integral.integral_non_ae_strongly_measurable intervalIntegral.integral_non_aestronglyMeasurable theorem integral_non_aestronglyMeasurable_of_le (h : a ≤ b) (hf : ¬AEStronglyMeasurable f (μ.restrict (Ioc a b))) : ∫ x in a..b, f x ∂μ = 0 := integral_non_aestronglyMeasurable <\| by rwa [uIoc_of_le h] #align interval_integral.integral_non_ae_strongly_measurable_of_le intervalIntegral.integral_non_aestronglyMeasurable_of_le theorem norm_integral_min_max (f : ℝ → E) : ‖∫ x in min a b..max a b, f x ∂μ‖ = ‖∫ x in a..b, f x ∂μ‖ := by cases le_total a b <;> simp [, integral_symm a b] #align interval_integral.norm_integral_min_max intervalIntegral.norm_integral_min_max theorem norm_integral_eq_norm_integral_Ioc (f : ℝ → E) : ‖∫ x in a..b, f x ∂μ‖ = ‖∫ x in Ι a b, f x ∂μ‖ := by rw [← norm_integral_min_max, integral_of_le min_le_max, uIoc] #align interval_integral.norm_integral_eq_norm_integral_Ioc intervalIntegral.norm_integral_eq_norm_integral_Ioc theorem abs_integral_eq_abs_integral_uIoc (f : ℝ → ℝ) : \|∫ x in a..b, f x ∂μ\| = \|∫ x in Ι a b, f x ∂μ\| := norm_integral_eq_norm_integral_Ioc f #align interval_integral.abs_integral_eq_abs_integral_uIoc intervalIntegral.abs_integral_eq_abs_integral_uIoc theorem norm_integral_le_integral_norm_Ioc : ‖∫ x in a..b, f x ∂μ‖ ≤ ∫ x in Ι a b, ‖f x‖ ∂μ := calc ‖∫ x in a..b, f x ∂μ‖ = ‖∫ x in Ι a b, f x ∂μ‖ := norm_integral_eq_norm_integral_Ioc f _ ≤ ∫ x in Ι a b, ‖f x‖ ∂μ := norm_integral_le_integral_norm f #align interval_integral.norm_integral_le_integral_norm_Ioc intervalIntegral.norm_integral_le_integral_norm_Ioc theorem norm_integral_le_abs_integral_norm : ‖∫ x in a..b, f x ∂μ‖ ≤ \|∫ x in a..b, ‖f x‖ ∂μ\| := by simp only [← Real.norm_eq_abs, norm_integral_eq_norm_integral_Ioc] exact le_trans (norm_integral_le_integral_norm _) (le_abs_self _) #align interval_integral.norm_integral_le_abs_integral_norm intervalIntegral.norm_integral_le_abs_integral_norm theorem norm_integral_le_integral_norm (h : a ≤ b) : ‖∫ x in a..b, f x ∂μ‖ ≤ ∫ x in a..b, ‖f x‖ ∂μ := norm_integral_le_integral_norm_Ioc.trans_eq <\| by rw [uIoc_of_le h, integral_of_le h] #align interval_integral.norm_integral_le_integral_norm intervalIntegral.norm_integral_le_integral_norm nonrec theorem norm_integral_le_of_norm_le {g : ℝ → ℝ} (h : ∀ᵐ t ∂μ.restrict <\| Ι a b, ‖f t‖ ≤ g t) (hbound : IntervalIntegrable g μ a b) : ‖∫ t in a..b, f t ∂μ‖ ≤ \|∫ t in a..b, g t ∂μ\| := by simp_rw [norm_intervalIntegral_eq, abs_intervalIntegral_eq, abs_eq_self.mpr (integral_nonneg_of_ae <\| h.mono fun _t ht => (norm_nonneg _).trans ht), norm_integral_le_of_norm_le hbound.def' h] #align interval_integral.norm_integral_le_of_norm_le intervalIntegral.norm_integral_le_of_norm_le theorem norm_integral_le_of_norm_le_const_ae {a b C : ℝ} {f : ℝ → E} (h : ∀ᵐ x, x ∈ Ι a b → ‖f x‖ ≤ C) : ‖∫ x in a..b, f x‖ ≤ C \|b - a\| := by rw [norm_integral_eq_norm_integral_Ioc] convert norm_setIntegral_le_of_norm_le_const_ae'' _ measurableSet_Ioc h using 1 · rw [Real.volume_Ioc, max_sub_min_eq_abs, ENNReal.toReal_ofReal (abs_nonneg _)] · simp only [Real.volume_Ioc, ENNReal.ofReal_lt_top] #align interval_integral.norm_integral_le_of_norm_le_const_ae intervalIntegral.norm_integral_le_of_norm_le_const_ae theorem norm_integral_le_of_norm_le_const {a b C : ℝ} {f : ℝ → E} (h : ∀ x ∈ Ι a b, ‖f x‖ ≤ C) : ‖∫ x in a..b, f x‖ ≤ C * \|b - a\| := norm_integral_le_of_norm_le_const_ae <\| eventually_of_forall h #align interval_integral.norm_integral_le_of_norm_le_const intervalIntegral.norm_integral_le_of_norm_le_const @[simp] nonrec theorem integral_add (hf : IntervalIntegrable f μ a b) (hg : IntervalIntegrable g μ a b) : ∫ x in a..b, f x + g x ∂μ = (∫ x in a..b, f x ∂μ) + ∫ x in a..b, g x ∂μ := by simp only [intervalIntegral_eq_integral_uIoc, integral_add hf.def' hg.def', smul_add] #align interval_integral.integral_add intervalIntegral.integral_add nonrec theorem integral_finset_sum {ι} {s : Finset ι} {f : ι → ℝ → E} (h : ∀ i ∈ s, IntervalIntegrable (f i) μ a b) : ∫ x in a..b, ∑ i ∈ s, f i x ∂μ = ∑ i ∈ s, ∫ x in a..b, f i x ∂μ := by simp only [intervalIntegral_eq_integral_uIoc, integral_finset_sum s fun i hi => (h i hi).def', Finset.smul_sum] #align interval_integral.integral_finset_sum intervalIntegral.integral_finset_sum @[simp] nonrec theorem integral_neg : ∫ x in a..b, -f x ∂μ = -∫ x in a..b, f x ∂μ := by simp only [intervalIntegral, integral_neg]; abel #align interval_integral.integral_neg intervalIntegral.integral_neg @[simp] theorem integral_sub (hf : IntervalIntegrable f μ a b) (hg : IntervalIntegrable g μ a b) : ∫ x in a..b, f x - g x ∂μ = (∫ x in a..b, f x ∂μ) - ∫ x in a..b, g x ∂μ := by simpa only [sub_eq_add_neg] using (integral_add hf hg.neg).trans (congr_arg _ integral_neg) #align interval_integral.integral_sub intervalIntegral.integral_sub @[simp] nonrec theorem integral_smul {𝕜 : Type} [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℝ 𝕜 E] (r : 𝕜) (f : ℝ → E) : ∫ x in a..b, r • f x ∂μ = r • ∫ x in a..b, f x ∂μ := by simp only [intervalIntegral, integral_smul, smul_sub] #align interval_integral.integral_smul intervalIntegral.integral_smul @[simp] nonrec theorem integral_smul_const {𝕜 : Type} [RCLike 𝕜] [NormedSpace 𝕜 E] (f : ℝ → 𝕜) (c : E) : ∫ x in a..b, f x • c ∂μ = (∫ x in a..b, f x ∂μ) • c := by simp only [intervalIntegral_eq_integral_uIoc, integral_smul_const, smul_assoc] #align interval_integral.integral_smul_const intervalIntegral.integral_smul_const @[simp] theorem integral_const_mul {𝕜 : Type} [RCLike 𝕜] (r : 𝕜) (f : ℝ → 𝕜) : ∫ x in a..b, r f x ∂μ = r * ∫ x in a..b, f x ∂μ := integral_smul r f #align interval_integral.integral_const_mul intervalIntegral.integral_const_mul @[simp] theorem integral_mul_const {𝕜 : Type} [RCLike 𝕜] (r : 𝕜) (f : ℝ → 𝕜) : ∫ x in a..b, f x r ∂μ = (∫ x in a..b, f x ∂μ) * r := by simpa only [mul_comm r] using integral_const_mul r f #align interval_integral.integral_mul_const intervalIntegral.integral_mul_const @[simp] theorem integral_div {𝕜 : Type} [RCLike 𝕜] (r : 𝕜) (f : ℝ → 𝕜) : ∫ x in a..b, f x / r ∂μ = (∫ x in a..b, f x ∂μ) / r := by simpa only [div_eq_mul_inv] using integral_mul_const r⁻¹ f #align interval_integral.integral_div intervalIntegral.integral_div theorem integral_const' (c : E) : ∫ _ in a..b, c ∂μ = ((μ <\| Ioc a b).toReal - (μ <\| Ioc b a).toReal) • c := by simp only [intervalIntegral, setIntegral_const, sub_smul] #align interval_integral.integral_const' intervalIntegral.integral_const' @[simp] theorem integral_const (c : E) : ∫ _ in a..b, c = (b - a) • c := by simp only [integral_const', Real.volume_Ioc, ENNReal.toReal_ofReal', ← neg_sub b, max_zero_sub_eq_self] #align interval_integral.integral_const intervalIntegral.integral_const nonrec theorem integral_smul_measure (c : ℝ≥0∞) : ∫ x in a..b, f x ∂c • μ = c.toReal • ∫ x in a..b, f x ∂μ := by simp only [intervalIntegral, Measure.restrict_smul, integral_smul_measure, smul_sub] #align interval_integral.integral_smul_measure intervalIntegral.integral_smul_measure end Basic -- Porting note (#11215): TODO: add `Complex.ofReal` version of `_root_.integral_ofReal` nonrec theorem _root_.RCLike.intervalIntegral_ofReal {𝕜 : Type} [RCLike 𝕜] {a b : ℝ} {μ : Measure ℝ} {f : ℝ → ℝ} : (∫ x in a..b, (f x : 𝕜) ∂μ) = ↑(∫ x in a..b, f x ∂μ) := by simp only [intervalIntegral, integral_ofReal, RCLike.ofReal_sub] @[deprecated (since := "2024-04-06")] alias RCLike.interval_integral_ofReal := RCLike.intervalIntegral_ofReal nonrec theorem integral_ofReal {a b : ℝ} {μ : Measure ℝ} {f : ℝ → ℝ} : (∫ x in a..b, (f x : ℂ) ∂μ) = ↑(∫ x in a..b, f x ∂μ) := RCLike.intervalIntegral_ofReal #align interval_integral.integral_of_real intervalIntegral.integral_ofReal section ContinuousLinearMap variable {a b : ℝ} {μ : Measure ℝ} {f : ℝ → E} variable [RCLike 𝕜] [NormedSpace 𝕜 E] [NormedAddCommGroup F] [NormedSpace 𝕜 F] open ContinuousLinearMap theorem _root_.ContinuousLinearMap.intervalIntegral_apply {a b : ℝ} {φ : ℝ → F →L[𝕜] E} (hφ : IntervalIntegrable φ μ a b) (v : F) : (∫ x in a..b, φ x ∂μ) v = ∫ x in a..b, φ x v ∂μ := by simp_rw [intervalIntegral_eq_integral_uIoc, ← integral_apply hφ.def' v, coe_smul', Pi.smul_apply] #align continuous_linear_map.interval_integral_apply ContinuousLinearMap.intervalIntegral_apply variable [NormedSpace ℝ F] [CompleteSpace F] theorem _root_.ContinuousLinearMap.intervalIntegral_comp_comm (L : E →L[𝕜] F) (hf : IntervalIntegrable f μ a b) : (∫ x in a..b, L (f x) ∂μ) = L (∫ x in a..b, f x ∂μ) := by simp_rw [intervalIntegral, L.integral_comp_comm hf.1, L.integral_comp_comm hf.2, L.map_sub] #align continuous_linear_map.interval_integral_comp_comm ContinuousLinearMap.intervalIntegral_comp_comm end ContinuousLinearMap /-! ## Basic arithmetic Includes addition, scalar multiplication and affine transformations. -/ section Comp variable {a b c d : ℝ} (f : ℝ → E) /-! Porting note: some `@[simp]` attributes in this section were removed to make the `simpNF` linter happy. TODO: find out if these lemmas are actually good or bad `simp` lemmas. -/ -- Porting note (#10618): was @[simp] theorem integral_comp_mul_right (hc : c ≠ 0) : (∫ x in a..b, f (x * c)) = c⁻¹ • ∫ x in a * c..b * c, f x := by have A : MeasurableEmbedding fun x => x * c := (Homeomorph.mulRight₀ c hc).closedEmbedding.measurableEmbedding conv_rhs => rw [← Real.smul_map_volume_mul_right hc] simp_rw [integral_smul_measure, intervalIntegral, A.setIntegral_map, ENNReal.toReal_ofReal (abs_nonneg c)] cases' hc.lt_or_lt with h h · simp [h, mul_div_cancel_right₀, hc, abs_of_neg, Measure.restrict_congr_set (α := ℝ) (μ := volume) Ico_ae_eq_Ioc] · simp [h, mul_div_cancel_right₀, hc, abs_of_pos] #align interval_integral.integral_comp_mul_right intervalIntegral.integral_comp_mul_right -- Porting note (#10618): was @[simp] theorem smul_integral_comp_mul_right (c) : (c • ∫ x in a..b, f (x * c)) = ∫ x in a * c..b * c, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_mul_right] #align interval_integral.smul_integral_comp_mul_right intervalIntegral.smul_integral_comp_mul_right -- Porting note (#10618): was @[simp] theorem integral_comp_mul_left (hc : c ≠ 0) : (∫ x in a..b, f (c * x)) = c⁻¹ • ∫ x in c * a..c * b, f x := by simpa only [mul_comm c] using integral_comp_mul_right f hc #align interval_integral.integral_comp_mul_left intervalIntegral.integral_comp_mul_left -- Porting note (#10618): was @[simp] theorem smul_integral_comp_mul_left (c) : (c • ∫ x in a..b, f (c * x)) = ∫ x in c * a..c * b, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_mul_left] #align interval_integral.smul_integral_comp_mul_left intervalIntegral.smul_integral_comp_mul_left -- Porting note (#10618): was @[simp] theorem integral_comp_div (hc : c ≠ 0) : (∫ x in a..b, f (x / c)) = c • ∫ x in a / c..b / c, f x := by simpa only [inv_inv] using integral_comp_mul_right f (inv_ne_zero hc) #align interval_integral.integral_comp_div intervalIntegral.integral_comp_div -- Porting note (#10618): was @[simp] theorem inv_smul_integral_comp_div (c) : (c⁻¹ • ∫ x in a..b, f (x / c)) = ∫ x in a / c..b / c, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_div] #align interval_integral.inv_smul_integral_comp_div intervalIntegral.inv_smul_integral_comp_div -- Porting note (#10618): was @[simp] theorem integral_comp_add_right (d) : (∫ x in a..b, f (x + d)) = ∫ x in a + d..b + d, f x := have A : MeasurableEmbedding fun x => x + d := (Homeomorph.addRight d).closedEmbedding.measurableEmbedding calc (∫ x in a..b, f (x + d)) = ∫ x in a + d..b + d, f x ∂Measure.map (fun x => x + d) volume := by simp [intervalIntegral, A.setIntegral_map] _ = ∫ x in a + d..b + d, f x := by rw [map_add_right_eq_self] #align interval_integral.integral_comp_add_right intervalIntegral.integral_comp_add_right -- Porting note (#10618): was @[simp] nonrec theorem integral_comp_add_left (d) : (∫ x in a..b, f (d + x)) = ∫ x in d + a..d + b, f x := by simpa only [add_comm d] using integral_comp_add_right f d #align interval_integral.integral_comp_add_left intervalIntegral.integral_comp_add_left -- Porting note (#10618): was @[simp] theorem integral_comp_mul_add (hc : c ≠ 0) (d) : (∫ x in a..b, f (c * x + d)) = c⁻¹ • ∫ x in c * a + d..c * b + d, f x := by rw [← integral_comp_add_right, ← integral_comp_mul_left _ hc] #align interval_integral.integral_comp_mul_add intervalIntegral.integral_comp_mul_add -- Porting note (#10618): was @[simp] theorem smul_integral_comp_mul_add (c d) : (c • ∫ x in a..b, f (c * x + d)) = ∫ x in c * a + d..c * b + d, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_mul_add] #align interval_integral.smul_integral_comp_mul_add intervalIntegral.smul_integral_comp_mul_add -- Porting note (#10618): was @[simp] theorem integral_comp_add_mul (hc : c ≠ 0) (d) : (∫ x in a..b, f (d + c * x)) = c⁻¹ • ∫ x in d + c * a..d + c * b, f x := by rw [← integral_comp_add_left, ← integral_comp_mul_left _ hc] #align interval_integral.integral_comp_add_mul intervalIntegral.integral_comp_add_mul -- Porting note (#10618): was @[simp] theorem smul_integral_comp_add_mul (c d) : (c • ∫ x in a..b, f (d + c * x)) = ∫ x in d + c * a..d + c * b, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_add_mul] #align interval_integral.smul_integral_comp_add_mul intervalIntegral.smul_integral_comp_add_mul -- Porting note (#10618): was @[simp] theorem integral_comp_div_add (hc : c ≠ 0) (d) : (∫ x in a..b, f (x / c + d)) = c • ∫ x in a / c + d..b / c + d, f x := by simpa only [div_eq_inv_mul, inv_inv] using integral_comp_mul_add f (inv_ne_zero hc) d #align interval_integral.integral_comp_div_add intervalIntegral.integral_comp_div_add -- Porting note (#10618): was @[simp] theorem inv_smul_integral_comp_div_add (c d) : (c⁻¹ • ∫ x in a..b, f (x / c + d)) = ∫ x in a / c + d..b / c + d, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_div_add] #align interval_integral.inv_smul_integral_comp_div_add intervalIntegral.inv_smul_integral_comp_div_add -- Porting note (#10618): was @[simp] theorem integral_comp_add_div (hc : c ≠ 0) (d) : (∫ x in a..b, f (d + x / c)) = c • ∫ x in d + a / c..d + b / c, f x := by simpa only [div_eq_inv_mul, inv_inv] using integral_comp_add_mul f (inv_ne_zero hc) d #align interval_integral.integral_comp_add_div intervalIntegral.integral_comp_add_div -- Porting note (#10618): was @[simp] theorem inv_smul_integral_comp_add_div (c d) : (c⁻¹ • ∫ x in a..b, f (d + x / c)) = ∫ x in d + a / c..d + b / c, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_add_div] #align interval_integral.inv_smul_integral_comp_add_div intervalIntegral.inv_smul_integral_comp_add_div -- Porting note (#10618): was @[simp] theorem integral_comp_mul_sub (hc : c ≠ 0) (d) : (∫ x in a..b, f (c * x - d)) = c⁻¹ • ∫ x in c * a - d..c * b - d, f x := by simpa only [sub_eq_add_neg] using integral_comp_mul_add f hc (-d) #align interval_integral.integral_comp_mul_sub intervalIntegral.integral_comp_mul_sub -- Porting note (#10618): was @[simp] theorem smul_integral_comp_mul_sub (c d) : (c • ∫ x in a..b, f (c * x - d)) = ∫ x in c * a - d..c * b - d, f x := by by_cases hc : c = 0 <;> simp [hc, integral_comp_mul_sub] #align interval_integral.smul_integral_comp_mul_sub intervalIntegral.smul_integral_comp_mul_sub -- Porting note (#10618): was @[simp] theorem integral_comp_sub_mul (hc : c ≠ 0) (d) : (∫ x in a..b, f (d - c * x)) = c⁻¹ • ∫ x in d - c * b..d - c * a, f x := by simp only [sub_eq_add_neg, neg_mul_eq_neg_mul] rw [integral_comp_add_mul f (neg_ne_zero.mpr hc) d, integral_symm] simp only [inv_neg, smul_neg, neg_neg, neg_smul] #align interval_integral.integral_comp_sub_mul intervalIntegral.integral_comp_sub_mul -- Porting note (#10618): was @[simp]	Mathlib/MeasureTheory/Integral/IntervalIntegral.lean	850	852	theorem smul_integral_comp_sub_mul (c d) : (c • ∫ x in a..b, f (d - c * x)) = ∫ x in d - c * b..d - c * a, f x := by	by_cases hc : c = 0 <;> simp [hc, integral_comp_sub_mul]
/- Copyright (c) 2021 Vladimir Goryachev. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies, Vladimir Goryachev, Kyle Miller, Scott Morrison, Eric Rodriguez -/ import Mathlib.SetTheory.Cardinal.Basic import Mathlib.Tactic.Ring #align_import data.nat.count from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" /-! # Counting on ℕ This file defines the `count` function, which gives, for any predicate on the natural numbers, "how many numbers under `k` satisfy this predicate?". We then prove several expected lemmas about `count`, relating it to the cardinality of other objects, and helping to evaluate it for specific `k`. -/ open Finset namespace Nat variable (p : ℕ → Prop) section Count variable [DecidablePred p] /-- Count the number of naturals `k < n` satisfying `p k`. -/ def count (n : ℕ) : ℕ := (List.range n).countP p #align nat.count Nat.count @[simp] theorem count_zero : count p 0 = 0 := by rw [count, List.range_zero, List.countP, List.countP.go] #align nat.count_zero Nat.count_zero /-- A fintype instance for the set relevant to `Nat.count`. Locally an instance in locale `count` -/ def CountSet.fintype (n : ℕ) : Fintype { i // i < n ∧ p i } := by apply Fintype.ofFinset ((Finset.range n).filter p) intro x rw [mem_filter, mem_range] rfl #align nat.count_set.fintype Nat.CountSet.fintype scoped[Count] attribute [instance] Nat.CountSet.fintype open Count theorem count_eq_card_filter_range (n : ℕ) : count p n = ((range n).filter p).card := by rw [count, List.countP_eq_length_filter] rfl #align nat.count_eq_card_filter_range Nat.count_eq_card_filter_range /-- `count p n` can be expressed as the cardinality of `{k // k < n ∧ p k}`. -/ theorem count_eq_card_fintype (n : ℕ) : count p n = Fintype.card { k : ℕ // k < n ∧ p k } := by rw [count_eq_card_filter_range, ← Fintype.card_ofFinset, ← CountSet.fintype] rfl #align nat.count_eq_card_fintype Nat.count_eq_card_fintype theorem count_succ (n : ℕ) : count p (n + 1) = count p n + if p n then 1 else 0 := by split_ifs with h <;> simp [count, List.range_succ, h] #align nat.count_succ Nat.count_succ @[mono] theorem count_monotone : Monotone (count p) := monotone_nat_of_le_succ fun n ↦ by by_cases h : p n <;> simp [count_succ, h] #align nat.count_monotone Nat.count_monotone theorem count_add (a b : ℕ) : count p (a + b) = count p a + count (fun k ↦ p (a + k)) b := by have : Disjoint ((range a).filter p) (((range b).map <\| addLeftEmbedding a).filter p) := by apply disjoint_filter_filter rw [Finset.disjoint_left] simp_rw [mem_map, mem_range, addLeftEmbedding_apply] rintro x hx ⟨c, _, rfl⟩ exact (self_le_add_right _ _).not_lt hx simp_rw [count_eq_card_filter_range, range_add, filter_union, card_union_of_disjoint this, filter_map, addLeftEmbedding, card_map] rfl #align nat.count_add Nat.count_add theorem count_add' (a b : ℕ) : count p (a + b) = count (fun k ↦ p (k + b)) a + count p b := by rw [add_comm, count_add, add_comm] simp_rw [add_comm b] #align nat.count_add' Nat.count_add' theorem count_one : count p 1 = if p 0 then 1 else 0 := by simp [count_succ] #align nat.count_one Nat.count_one	Mathlib/Data/Nat/Count.lean	94	96	theorem count_succ' (n : ℕ) : count p (n + 1) = count (fun k ↦ p (k + 1)) n + if p 0 then 1 else 0 := by	rw [count_add', count_one]
/- Copyright (c) 2024 Josha Dekker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Josha Dekker, Devon Tuma, Kexing Ying -/ import Mathlib.Probability.Notation import Mathlib.Probability.Density import Mathlib.Probability.ConditionalProbability import Mathlib.Probability.ProbabilityMassFunction.Constructions /-! # Uniform distributions and probability mass functions This file defines two related notions of uniform distributions, which will be unified in the future. # Uniform distributions Defines the uniform distribution for any set with finite measure. ## Main definitions * `IsUniform X s ℙ μ` : A random variable `X` has uniform distribution on `s` under `ℙ` if the push-forward measure agrees with the rescaled restricted measure `μ`. # Uniform probability mass functions This file defines a number of uniform `PMF` distributions from various inputs, uniformly drawing from the corresponding object. ## Main definitions `PMF.uniformOfFinset` gives each element in the set equal probability, with `0` probability for elements not in the set. `PMF.uniformOfFintype` gives all elements equal probability, equal to the inverse of the size of the `Fintype`. `PMF.ofMultiset` draws randomly from the given `Multiset`, treating duplicate values as distinct. Each probability is given by the count of the element divided by the size of the `Multiset` # To Do: * Refactor the `PMF` definitions to come from a `uniformMeasure` on a `Finset`/`Fintype`/`Multiset`. -/ open scoped Classical MeasureTheory NNReal ENNReal -- TODO: We can't `open ProbabilityTheory` without opening the `ProbabilityTheory` locale :( open TopologicalSpace MeasureTheory.Measure PMF noncomputable section namespace MeasureTheory variable {E : Type} [MeasurableSpace E] {m : Measure E} {μ : Measure E} namespace pdf variable {Ω : Type} variable {_ : MeasurableSpace Ω} {ℙ : Measure Ω} /-- A random variable `X` has uniform distribution on `s` if its push-forward measure is `(μ s)⁻¹ • μ.restrict s`. -/ def IsUniform (X : Ω → E) (s : Set E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) := map X ℙ = ProbabilityTheory.cond μ s #align measure_theory.pdf.is_uniform MeasureTheory.pdf.IsUniform namespace IsUniform theorem aemeasurable {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : AEMeasurable X ℙ := by dsimp [IsUniform, ProbabilityTheory.cond] at hu by_contra h rw [map_of_not_aemeasurable h] at hu apply zero_ne_one' ℝ≥0∞ calc 0 = (0 : Measure E) Set.univ := rfl _ = _ := by rw [hu, smul_apply, restrict_apply MeasurableSet.univ, Set.univ_inter, smul_eq_mul, ENNReal.inv_mul_cancel hns hnt] theorem absolutelyContinuous {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) : map X ℙ ≪ μ := by rw [hu]; exact ProbabilityTheory.cond_absolutelyContinuous theorem measure_preimage {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) {A : Set E} (hA : MeasurableSet A) : ℙ (X ⁻¹' A) = μ (s ∩ A) / μ s := by rwa [← map_apply_of_aemeasurable (hu.aemeasurable hns hnt) hA, hu, ProbabilityTheory.cond_apply', ENNReal.div_eq_inv_mul] #align measure_theory.pdf.is_uniform.measure_preimage MeasureTheory.pdf.IsUniform.measure_preimage theorem isProbabilityMeasure {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : IsProbabilityMeasure ℙ := ⟨by have : X ⁻¹' Set.univ = Set.univ := Set.preimage_univ rw [← this, hu.measure_preimage hns hnt MeasurableSet.univ, Set.inter_univ, ENNReal.div_self hns hnt]⟩ #align measure_theory.pdf.is_uniform.is_probability_measure MeasureTheory.pdf.IsUniform.isProbabilityMeasure theorem toMeasurable_iff {X : Ω → E} {s : Set E} : IsUniform X (toMeasurable μ s) ℙ μ ↔ IsUniform X s ℙ μ := by unfold IsUniform rw [ProbabilityTheory.cond_toMeasurable_eq] protected theorem toMeasurable {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) : IsUniform X (toMeasurable μ s) ℙ μ := by unfold IsUniform at * rwa [ProbabilityTheory.cond_toMeasurable_eq] theorem hasPDF {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : HasPDF X ℙ μ := by let t := toMeasurable μ s apply hasPDF_of_map_eq_withDensity (hu.aemeasurable hns hnt) (t.indicator ((μ t)⁻¹ • 1)) <\| (measurable_one.aemeasurable.const_smul (μ t)⁻¹).indicator (measurableSet_toMeasurable μ s) rw [hu, withDensity_indicator (measurableSet_toMeasurable μ s), withDensity_smul _ measurable_one, withDensity_one, restrict_toMeasurable hnt, measure_toMeasurable, ProbabilityTheory.cond] #align measure_theory.pdf.is_uniform.has_pdf MeasureTheory.pdf.IsUniform.hasPDF theorem pdf_eq_zero_of_measure_eq_zero_or_top {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) (hμs : μ s = 0 ∨ μ s = ∞) : pdf X ℙ μ =ᵐ[μ] 0 := by rcases hμs with H\|H · simp only [IsUniform, ProbabilityTheory.cond, H, ENNReal.inv_zero, restrict_eq_zero.mpr H, smul_zero] at hu simp [pdf, hu] · simp only [IsUniform, ProbabilityTheory.cond, H, ENNReal.inv_top, zero_smul] at hu simp [pdf, hu] theorem pdf_eq {X : Ω → E} {s : Set E} (hms : MeasurableSet s) (hu : IsUniform X s ℙ μ) : pdf X ℙ μ =ᵐ[μ] s.indicator ((μ s)⁻¹ • (1 : E → ℝ≥0∞)) := by by_cases hnt : μ s = ∞ · simp [pdf_eq_zero_of_measure_eq_zero_or_top hu (Or.inr hnt), hnt] by_cases hns : μ s = 0 · filter_upwards [measure_zero_iff_ae_nmem.mp hns, pdf_eq_zero_of_measure_eq_zero_or_top hu (Or.inl hns)] with x hx h'x simp [hx, h'x, hns] have : HasPDF X ℙ μ := hasPDF hns hnt hu have : IsProbabilityMeasure ℙ := isProbabilityMeasure hns hnt hu apply (eq_of_map_eq_withDensity _ _).mp · rw [hu, withDensity_indicator hms, withDensity_smul _ measurable_one, withDensity_one, ProbabilityTheory.cond] · exact (measurable_one.aemeasurable.const_smul (μ s)⁻¹).indicator hms theorem pdf_toReal_ae_eq {X : Ω → E} {s : Set E} (hms : MeasurableSet s) (hX : IsUniform X s ℙ μ) : (fun x => (pdf X ℙ μ x).toReal) =ᵐ[μ] fun x => (s.indicator ((μ s)⁻¹ • (1 : E → ℝ≥0∞)) x).toReal := Filter.EventuallyEq.fun_comp (pdf_eq hms hX) ENNReal.toReal #align measure_theory.pdf.is_uniform.pdf_to_real_ae_eq MeasureTheory.pdf.IsUniform.pdf_toReal_ae_eq variable {X : Ω → ℝ} {s : Set ℝ} theorem mul_pdf_integrable (hcs : IsCompact s) (huX : IsUniform X s ℙ) : Integrable fun x : ℝ => x * (pdf X ℙ volume x).toReal := by by_cases hnt : volume s = 0 ∨ volume s = ∞ · have I : Integrable (fun x ↦ x * ENNReal.toReal (0)) := by simp apply I.congr filter_upwards [pdf_eq_zero_of_measure_eq_zero_or_top huX hnt] with x hx simp [hx] simp only [not_or] at hnt have : IsProbabilityMeasure ℙ := isProbabilityMeasure hnt.1 hnt.2 huX constructor · exact aestronglyMeasurable_id.mul (measurable_pdf X ℙ).aemeasurable.ennreal_toReal.aestronglyMeasurable refine hasFiniteIntegral_mul (pdf_eq hcs.measurableSet huX) ?_ set ind := (volume s)⁻¹ • (1 : ℝ → ℝ≥0∞) have : ∀ x, ↑‖x‖₊ * s.indicator ind x = s.indicator (fun x => ‖x‖₊ * ind x) x := fun x => (s.indicator_mul_right (fun x => ↑‖x‖₊) ind).symm simp only [ind, this, lintegral_indicator _ hcs.measurableSet, mul_one, Algebra.id.smul_eq_mul, Pi.one_apply, Pi.smul_apply] rw [lintegral_mul_const _ measurable_nnnorm.coe_nnreal_ennreal] exact (ENNReal.mul_lt_top (set_lintegral_lt_top_of_isCompact hnt.2 hcs continuous_nnnorm).ne (ENNReal.inv_lt_top.2 (pos_iff_ne_zero.mpr hnt.1)).ne).ne #align measure_theory.pdf.is_uniform.mul_pdf_integrable MeasureTheory.pdf.IsUniform.mul_pdf_integrable /-- A real uniform random variable `X` with support `s` has expectation `(λ s)⁻¹ * ∫ x in s, x ∂λ` where `λ` is the Lebesgue measure. -/ theorem integral_eq (huX : IsUniform X s ℙ) : ∫ x, X x ∂ℙ = (volume s)⁻¹.toReal * ∫ x in s, x := by rw [← smul_eq_mul, ← integral_smul_measure] dsimp only [IsUniform, ProbabilityTheory.cond] at huX rw [← huX] by_cases hX : AEMeasurable X ℙ · exact (integral_map hX aestronglyMeasurable_id).symm · rw [map_of_not_aemeasurable hX, integral_zero_measure, integral_non_aestronglyMeasurable] rwa [aestronglyMeasurable_iff_aemeasurable] #align measure_theory.pdf.is_uniform.integral_eq MeasureTheory.pdf.IsUniform.integral_eq end IsUniform variable {X : Ω → E} lemma IsUniform.cond {s : Set E} : IsUniform (id : E → E) s (ProbabilityTheory.cond μ s) μ := by unfold IsUniform rw [Measure.map_id] /-- The density of the uniform measure on a set with respect to itself. This allows us to abstract away the choice of random variable and probability space. -/ def uniformPDF (s : Set E) (x : E) (μ : Measure E := by volume_tac) : ℝ≥0∞ := s.indicator ((μ s)⁻¹ • (1 : E → ℝ≥0∞)) x /-- Check that indeed any uniform random variable has the uniformPDF. -/ lemma uniformPDF_eq_pdf {s : Set E} (hs : MeasurableSet s) (hu : pdf.IsUniform X s ℙ μ) : (fun x ↦ uniformPDF s x μ) =ᵐ[μ] pdf X ℙ μ := by unfold uniformPDF exact Filter.EventuallyEq.trans (pdf.IsUniform.pdf_eq hs hu).symm (ae_eq_refl _) /-- Alternative way of writing the uniformPDF. -/ lemma uniformPDF_ite {s : Set E} {x : E} : uniformPDF s x μ = if x ∈ s then (μ s)⁻¹ else 0 := by unfold uniformPDF unfold Set.indicator simp only [Pi.smul_apply, Pi.one_apply, smul_eq_mul, mul_one] end pdf end MeasureTheory noncomputable section namespace PMF variable {α β γ : Type} open scoped Classical NNReal ENNReal section UniformOfFinset /-- Uniform distribution taking the same non-zero probability on the nonempty finset `s` -/ def uniformOfFinset (s : Finset α) (hs : s.Nonempty) : PMF α := by refine ofFinset (fun a => if a ∈ s then s.card⁻¹ else 0) s ?_ ?_ · simp only [Finset.sum_ite_mem, Finset.inter_self, Finset.sum_const, nsmul_eq_mul] have : (s.card : ℝ≥0∞) ≠ 0 := by simpa only [Ne, Nat.cast_eq_zero, Finset.card_eq_zero] using Finset.nonempty_iff_ne_empty.1 hs exact ENNReal.mul_inv_cancel this <\| ENNReal.natCast_ne_top s.card · exact fun x hx => by simp only [hx, if_false] #align pmf.uniform_of_finset PMF.uniformOfFinset variable {s : Finset α} (hs : s.Nonempty) {a : α} @[simp] theorem uniformOfFinset_apply (a : α) : uniformOfFinset s hs a = if a ∈ s then (s.card : ℝ≥0∞)⁻¹ else 0 := rfl #align pmf.uniform_of_finset_apply PMF.uniformOfFinset_apply theorem uniformOfFinset_apply_of_mem (ha : a ∈ s) : uniformOfFinset s hs a = (s.card : ℝ≥0∞)⁻¹ := by simp [ha] #align pmf.uniform_of_finset_apply_of_mem PMF.uniformOfFinset_apply_of_mem theorem uniformOfFinset_apply_of_not_mem (ha : a ∉ s) : uniformOfFinset s hs a = 0 := by simp [ha] #align pmf.uniform_of_finset_apply_of_not_mem PMF.uniformOfFinset_apply_of_not_mem @[simp] theorem support_uniformOfFinset : (uniformOfFinset s hs).support = s := Set.ext (by let ⟨a, ha⟩ := hs simp [mem_support_iff, Finset.ne_empty_of_mem ha]) #align pmf.support_uniform_of_finset PMF.support_uniformOfFinset theorem mem_support_uniformOfFinset_iff (a : α) : a ∈ (uniformOfFinset s hs).support ↔ a ∈ s := by simp #align pmf.mem_support_uniform_of_finset_iff PMF.mem_support_uniformOfFinset_iff section Measure variable (t : Set α) @[simp] theorem toOuterMeasure_uniformOfFinset_apply : (uniformOfFinset s hs).toOuterMeasure t = (s.filter (· ∈ t)).card / s.card := calc (uniformOfFinset s hs).toOuterMeasure t = ∑' x, if x ∈ t then uniformOfFinset s hs x else 0 := toOuterMeasure_apply (uniformOfFinset s hs) t _ = ∑' x, if x ∈ s ∧ x ∈ t then (s.card : ℝ≥0∞)⁻¹ else 0 := (tsum_congr fun x => by simp_rw [uniformOfFinset_apply, ← ite_and, and_comm]) _ = ∑ x ∈ s.filter (· ∈ t), if x ∈ s ∧ x ∈ t then (s.card : ℝ≥0∞)⁻¹ else 0 := (tsum_eq_sum fun x hx => if_neg fun h => hx (Finset.mem_filter.2 h)) _ = ∑ _x ∈ s.filter (· ∈ t), (s.card : ℝ≥0∞)⁻¹ := (Finset.sum_congr rfl fun x hx => by let this : x ∈ s ∧ x ∈ t := by simpa using hx simp only [this, and_self_iff, if_true]) _ = (s.filter (· ∈ t)).card / s.card := by simp only [div_eq_mul_inv, Finset.sum_const, nsmul_eq_mul] #align pmf.to_outer_measure_uniform_of_finset_apply PMF.toOuterMeasure_uniformOfFinset_apply @[simp] theorem toMeasure_uniformOfFinset_apply [MeasurableSpace α] (ht : MeasurableSet t) : (uniformOfFinset s hs).toMeasure t = (s.filter (· ∈ t)).card / s.card := (toMeasure_apply_eq_toOuterMeasure_apply _ t ht).trans (toOuterMeasure_uniformOfFinset_apply hs t) #align pmf.to_measure_uniform_of_finset_apply PMF.toMeasure_uniformOfFinset_apply end Measure end UniformOfFinset section UniformOfFintype /-- The uniform pmf taking the same uniform value on all of the fintype `α` -/ def uniformOfFintype (α : Type) [Fintype α] [Nonempty α] : PMF α := uniformOfFinset Finset.univ Finset.univ_nonempty #align pmf.uniform_of_fintype PMF.uniformOfFintype variable [Fintype α] [Nonempty α] @[simp] theorem uniformOfFintype_apply (a : α) : uniformOfFintype α a = (Fintype.card α : ℝ≥0∞)⁻¹ := by simp [uniformOfFintype, Finset.mem_univ, if_true, uniformOfFinset_apply] #align pmf.uniform_of_fintype_apply PMF.uniformOfFintype_apply @[simp] theorem support_uniformOfFintype (α : Type) [Fintype α] [Nonempty α] : (uniformOfFintype α).support = ⊤ := Set.ext fun x => by simp [mem_support_iff] #align pmf.support_uniform_of_fintype PMF.support_uniformOfFintype theorem mem_support_uniformOfFintype (a : α) : a ∈ (uniformOfFintype α).support := by simp #align pmf.mem_support_uniform_of_fintype PMF.mem_support_uniformOfFintype section Measure variable (s : Set α) theorem toOuterMeasure_uniformOfFintype_apply : (uniformOfFintype α).toOuterMeasure s = Fintype.card s / Fintype.card α := by rw [uniformOfFintype, toOuterMeasure_uniformOfFinset_apply,Fintype.card_ofFinset] rfl #align pmf.to_outer_measure_uniform_of_fintype_apply PMF.toOuterMeasure_uniformOfFintype_apply theorem toMeasure_uniformOfFintype_apply [MeasurableSpace α] (hs : MeasurableSet s) : (uniformOfFintype α).toMeasure s = Fintype.card s / Fintype.card α := by simp [uniformOfFintype, hs] #align pmf.to_measure_uniform_of_fintype_apply PMF.toMeasure_uniformOfFintype_apply end Measure end UniformOfFintype section OfMultiset /-- Given a non-empty multiset `s` we construct the `PMF` which sends `a` to the fraction of elements in `s` that are `a`. -/ def ofMultiset (s : Multiset α) (hs : s ≠ 0) : PMF α := ⟨fun a => s.count a / (Multiset.card s), ENNReal.summable.hasSum_iff.2 (calc (∑' b : α, (s.count b : ℝ≥0∞) / (Multiset.card s)) = (Multiset.card s : ℝ≥0∞)⁻¹ ∑' b, (s.count b : ℝ≥0∞) := by simp_rw [ENNReal.div_eq_inv_mul, ENNReal.tsum_mul_left] _ = (Multiset.card s : ℝ≥0∞)⁻¹ * ∑ b ∈ s.toFinset, (s.count b : ℝ≥0∞) := (congr_arg (fun x => (Multiset.card s : ℝ≥0∞)⁻¹ * x) (tsum_eq_sum fun a ha => Nat.cast_eq_zero.2 <\| by rwa [Multiset.count_eq_zero, ← Multiset.mem_toFinset])) _ = 1 := by rw [← Nat.cast_sum, Multiset.toFinset_sum_count_eq s, ENNReal.inv_mul_cancel (Nat.cast_ne_zero.2 (hs ∘ Multiset.card_eq_zero.1)) (ENNReal.natCast_ne_top _)] )⟩ #align pmf.of_multiset PMF.ofMultiset variable {s : Multiset α} (hs : s ≠ 0) @[simp] theorem ofMultiset_apply (a : α) : ofMultiset s hs a = s.count a / (Multiset.card s) := rfl #align pmf.of_multiset_apply PMF.ofMultiset_apply @[simp] theorem support_ofMultiset : (ofMultiset s hs).support = s.toFinset := Set.ext (by simp [mem_support_iff, hs]) #align pmf.support_of_multiset PMF.support_ofMultiset	Mathlib/Probability/Distributions/Uniform.lean	371	372	theorem mem_support_ofMultiset_iff (a : α) : a ∈ (ofMultiset s hs).support ↔ a ∈ s.toFinset := by	simp
/- Copyright (c) 2020 Alexander Bentkamp. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alexander Bentkamp -/ import Mathlib.Algebra.Algebra.Spectrum import Mathlib.LinearAlgebra.GeneralLinearGroup import Mathlib.LinearAlgebra.FiniteDimensional import Mathlib.RingTheory.Nilpotent.Basic #align_import linear_algebra.eigenspace.basic from "leanprover-community/mathlib"@"6b0169218d01f2837d79ea2784882009a0da1aa1" /-! # Eigenvectors and eigenvalues This file defines eigenspaces, eigenvalues, and eigenvalues, as well as their generalized counterparts. We follow Axler's approach [axler2015] because it allows us to derive many properties without choosing a basis and without using matrices. An eigenspace of a linear map `f` for a scalar `μ` is the kernel of the map `(f - μ • id)`. The nonzero elements of an eigenspace are eigenvectors `x`. They have the property `f x = μ • x`. If there are eigenvectors for a scalar `μ`, the scalar `μ` is called an eigenvalue. There is no consensus in the literature whether `0` is an eigenvector. Our definition of `HasEigenvector` permits only nonzero vectors. For an eigenvector `x` that may also be `0`, we write `x ∈ f.eigenspace μ`. A generalized eigenspace of a linear map `f` for a natural number `k` and a scalar `μ` is the kernel of the map `(f - μ • id) ^ k`. The nonzero elements of a generalized eigenspace are generalized eigenvectors `x`. If there are generalized eigenvectors for a natural number `k` and a scalar `μ`, the scalar `μ` is called a generalized eigenvalue. The fact that the eigenvalues are the roots of the minimal polynomial is proved in `LinearAlgebra.Eigenspace.Minpoly`. The existence of eigenvalues over an algebraically closed field (and the fact that the generalized eigenspaces then span) is deferred to `LinearAlgebra.Eigenspace.IsAlgClosed`. ## References * [Sheldon Axler, Linear Algebra Done Right][axler2015] * https://en.wikipedia.org/wiki/Eigenvalues_and_eigenvectors ## Tags eigenspace, eigenvector, eigenvalue, eigen -/ universe u v w namespace Module namespace End open FiniteDimensional Set variable {K R : Type v} {V M : Type w} [CommRing R] [AddCommGroup M] [Module R M] [Field K] [AddCommGroup V] [Module K V] /-- The submodule `eigenspace f μ` for a linear map `f` and a scalar `μ` consists of all vectors `x` such that `f x = μ • x`. (Def 5.36 of [axler2015])-/ def eigenspace (f : End R M) (μ : R) : Submodule R M := LinearMap.ker (f - algebraMap R (End R M) μ) #align module.End.eigenspace Module.End.eigenspace @[simp] theorem eigenspace_zero (f : End R M) : f.eigenspace 0 = LinearMap.ker f := by simp [eigenspace] #align module.End.eigenspace_zero Module.End.eigenspace_zero /-- A nonzero element of an eigenspace is an eigenvector. (Def 5.7 of [axler2015]) -/ def HasEigenvector (f : End R M) (μ : R) (x : M) : Prop := x ∈ eigenspace f μ ∧ x ≠ 0 #align module.End.has_eigenvector Module.End.HasEigenvector /-- A scalar `μ` is an eigenvalue for a linear map `f` if there are nonzero vectors `x` such that `f x = μ • x`. (Def 5.5 of [axler2015]) -/ def HasEigenvalue (f : End R M) (a : R) : Prop := eigenspace f a ≠ ⊥ #align module.End.has_eigenvalue Module.End.HasEigenvalue /-- The eigenvalues of the endomorphism `f`, as a subtype of `R`. -/ def Eigenvalues (f : End R M) : Type _ := { μ : R // f.HasEigenvalue μ } #align module.End.eigenvalues Module.End.Eigenvalues @[coe] def Eigenvalues.val (f : Module.End R M) : Eigenvalues f → R := Subtype.val instance Eigenvalues.instCoeOut {f : Module.End R M} : CoeOut (Eigenvalues f) R where coe := Eigenvalues.val f instance Eigenvalues.instDecidableEq [DecidableEq R] (f : Module.End R M) : DecidableEq (Eigenvalues f) := inferInstanceAs (DecidableEq (Subtype (fun x : R => HasEigenvalue f x))) theorem hasEigenvalue_of_hasEigenvector {f : End R M} {μ : R} {x : M} (h : HasEigenvector f μ x) : HasEigenvalue f μ := by rw [HasEigenvalue, Submodule.ne_bot_iff] use x; exact h #align module.End.has_eigenvalue_of_has_eigenvector Module.End.hasEigenvalue_of_hasEigenvector theorem mem_eigenspace_iff {f : End R M} {μ : R} {x : M} : x ∈ eigenspace f μ ↔ f x = μ • x := by rw [eigenspace, LinearMap.mem_ker, LinearMap.sub_apply, algebraMap_end_apply, sub_eq_zero] #align module.End.mem_eigenspace_iff Module.End.mem_eigenspace_iff theorem HasEigenvector.apply_eq_smul {f : End R M} {μ : R} {x : M} (hx : f.HasEigenvector μ x) : f x = μ • x := mem_eigenspace_iff.mp hx.1 #align module.End.has_eigenvector.apply_eq_smul Module.End.HasEigenvector.apply_eq_smul theorem HasEigenvector.pow_apply {f : End R M} {μ : R} {v : M} (hv : f.HasEigenvector μ v) (n : ℕ) : (f ^ n) v = μ ^ n • v := by induction n <;> simp [, pow_succ f, hv.apply_eq_smul, smul_smul, pow_succ' μ] theorem HasEigenvalue.exists_hasEigenvector {f : End R M} {μ : R} (hμ : f.HasEigenvalue μ) : ∃ v, f.HasEigenvector μ v := Submodule.exists_mem_ne_zero_of_ne_bot hμ #align module.End.has_eigenvalue.exists_has_eigenvector Module.End.HasEigenvalue.exists_hasEigenvector lemma HasEigenvalue.pow {f : End R M} {μ : R} (h : f.HasEigenvalue μ) (n : ℕ) : (f ^ n).HasEigenvalue (μ ^ n) := by rw [HasEigenvalue, Submodule.ne_bot_iff] obtain ⟨m : M, hm⟩ := h.exists_hasEigenvector exact ⟨m, by simpa [mem_eigenspace_iff] using hm.pow_apply n, hm.2⟩ /-- A nilpotent endomorphism has nilpotent eigenvalues. See also `LinearMap.isNilpotent_trace_of_isNilpotent`. -/ lemma HasEigenvalue.isNilpotent_of_isNilpotent [NoZeroSMulDivisors R M] {f : End R M} (hfn : IsNilpotent f) {μ : R} (hf : f.HasEigenvalue μ) : IsNilpotent μ := by obtain ⟨m : M, hm⟩ := hf.exists_hasEigenvector obtain ⟨n : ℕ, hn : f ^ n = 0⟩ := hfn exact ⟨n, by simpa [hn, hm.2, eq_comm (a := (0 : M))] using hm.pow_apply n⟩ theorem HasEigenvalue.mem_spectrum {f : End R M} {μ : R} (hμ : HasEigenvalue f μ) : μ ∈ spectrum R f := by refine spectrum.mem_iff.mpr fun h_unit => ?_ set f' := LinearMap.GeneralLinearGroup.toLinearEquiv h_unit.unit rcases hμ.exists_hasEigenvector with ⟨v, hv⟩ refine hv.2 ((LinearMap.ker_eq_bot'.mp f'.ker) v (?_ : μ • v - f v = 0)) rw [hv.apply_eq_smul, sub_self] #align module.End.mem_spectrum_of_has_eigenvalue Module.End.HasEigenvalue.mem_spectrum theorem hasEigenvalue_iff_mem_spectrum [FiniteDimensional K V] {f : End K V} {μ : K} : f.HasEigenvalue μ ↔ μ ∈ spectrum K f := by rw [spectrum.mem_iff, IsUnit.sub_iff, LinearMap.isUnit_iff_ker_eq_bot, HasEigenvalue, eigenspace] #align module.End.has_eigenvalue_iff_mem_spectrum Module.End.hasEigenvalue_iff_mem_spectrum alias ⟨_, HasEigenvalue.of_mem_spectrum⟩ := hasEigenvalue_iff_mem_spectrum theorem eigenspace_div (f : End K V) (a b : K) (hb : b ≠ 0) : eigenspace f (a / b) = LinearMap.ker (b • f - algebraMap K (End K V) a) := calc eigenspace f (a / b) = eigenspace f (b⁻¹ a) := by rw [div_eq_mul_inv, mul_comm] _ = LinearMap.ker (f - (b⁻¹ * a) • LinearMap.id) := by rw [eigenspace]; rfl _ = LinearMap.ker (f - b⁻¹ • a • LinearMap.id) := by rw [smul_smul] _ = LinearMap.ker (f - b⁻¹ • algebraMap K (End K V) a) := rfl _ = LinearMap.ker (b • (f - b⁻¹ • algebraMap K (End K V) a)) := by rw [LinearMap.ker_smul _ b hb] _ = LinearMap.ker (b • f - algebraMap K (End K V) a) := by rw [smul_sub, smul_inv_smul₀ hb] #align module.End.eigenspace_div Module.End.eigenspace_div /-- The generalized eigenspace for a linear map `f`, a scalar `μ`, and an exponent `k ∈ ℕ` is the kernel of `(f - μ • id) ^ k`. (Def 8.10 of [axler2015]). Furthermore, a generalized eigenspace for some exponent `k` is contained in the generalized eigenspace for exponents larger than `k`. -/ def genEigenspace (f : End R M) (μ : R) : ℕ →o Submodule R M where toFun k := LinearMap.ker ((f - algebraMap R (End R M) μ) ^ k) monotone' k m hm := by simp only [← pow_sub_mul_pow _ hm] exact LinearMap.ker_le_ker_comp ((f - algebraMap R (End R M) μ) ^ k) ((f - algebraMap R (End R M) μ) ^ (m - k)) #align module.End.generalized_eigenspace Module.End.genEigenspace @[simp] theorem mem_genEigenspace (f : End R M) (μ : R) (k : ℕ) (m : M) : m ∈ f.genEigenspace μ k ↔ ((f - μ • (1 : End R M)) ^ k) m = 0 := Iff.rfl #align module.End.mem_generalized_eigenspace Module.End.mem_genEigenspace @[simp] theorem genEigenspace_zero (f : End R M) (k : ℕ) : f.genEigenspace 0 k = LinearMap.ker (f ^ k) := by simp [Module.End.genEigenspace] #align module.End.generalized_eigenspace_zero Module.End.genEigenspace_zero /-- A nonzero element of a generalized eigenspace is a generalized eigenvector. (Def 8.9 of [axler2015])-/ def HasGenEigenvector (f : End R M) (μ : R) (k : ℕ) (x : M) : Prop := x ≠ 0 ∧ x ∈ genEigenspace f μ k #align module.End.has_generalized_eigenvector Module.End.HasGenEigenvector /-- A scalar `μ` is a generalized eigenvalue for a linear map `f` and an exponent `k ∈ ℕ` if there are generalized eigenvectors for `f`, `k`, and `μ`. -/ def HasGenEigenvalue (f : End R M) (μ : R) (k : ℕ) : Prop := genEigenspace f μ k ≠ ⊥ #align module.End.has_generalized_eigenvalue Module.End.HasGenEigenvalue /-- The generalized eigenrange for a linear map `f`, a scalar `μ`, and an exponent `k ∈ ℕ` is the range of `(f - μ • id) ^ k`. -/ def genEigenrange (f : End R M) (μ : R) (k : ℕ) : Submodule R M := LinearMap.range ((f - algebraMap R (End R M) μ) ^ k) #align module.End.generalized_eigenrange Module.End.genEigenrange /-- The exponent of a generalized eigenvalue is never 0. -/ theorem exp_ne_zero_of_hasGenEigenvalue {f : End R M} {μ : R} {k : ℕ} (h : f.HasGenEigenvalue μ k) : k ≠ 0 := by rintro rfl exact h LinearMap.ker_id #align module.End.exp_ne_zero_of_has_generalized_eigenvalue Module.End.exp_ne_zero_of_hasGenEigenvalue /-- The union of the kernels of `(f - μ • id) ^ k` over all `k`. -/ def maxGenEigenspace (f : End R M) (μ : R) : Submodule R M := ⨆ k, f.genEigenspace μ k #align module.End.maximal_generalized_eigenspace Module.End.maxGenEigenspace theorem genEigenspace_le_maximal (f : End R M) (μ : R) (k : ℕ) : f.genEigenspace μ k ≤ f.maxGenEigenspace μ := le_iSup _ _ #align module.End.generalized_eigenspace_le_maximal Module.End.genEigenspace_le_maximal @[simp] theorem mem_maxGenEigenspace (f : End R M) (μ : R) (m : M) : m ∈ f.maxGenEigenspace μ ↔ ∃ k : ℕ, ((f - μ • (1 : End R M)) ^ k) m = 0 := by simp only [maxGenEigenspace, ← mem_genEigenspace, Submodule.mem_iSup_of_chain] #align module.End.mem_maximal_generalized_eigenspace Module.End.mem_maxGenEigenspace /-- If there exists a natural number `k` such that the kernel of `(f - μ • id) ^ k` is the maximal generalized eigenspace, then this value is the least such `k`. If not, this value is not meaningful. -/ noncomputable def maxGenEigenspaceIndex (f : End R M) (μ : R) := monotonicSequenceLimitIndex (f.genEigenspace μ) #align module.End.maximal_generalized_eigenspace_index Module.End.maxGenEigenspaceIndex /-- For an endomorphism of a Noetherian module, the maximal eigenspace is always of the form kernel `(f - μ • id) ^ k` for some `k`. -/ theorem maxGenEigenspace_eq [h : IsNoetherian R M] (f : End R M) (μ : R) : maxGenEigenspace f μ = f.genEigenspace μ (maxGenEigenspaceIndex f μ) := by rw [isNoetherian_iff_wellFounded] at h exact (WellFounded.iSup_eq_monotonicSequenceLimit h (f.genEigenspace μ) : _) #align module.End.maximal_generalized_eigenspace_eq Module.End.maxGenEigenspace_eq /-- A generalized eigenvalue for some exponent `k` is also a generalized eigenvalue for exponents larger than `k`. -/ theorem hasGenEigenvalue_of_hasGenEigenvalue_of_le {f : End R M} {μ : R} {k : ℕ} {m : ℕ} (hm : k ≤ m) (hk : f.HasGenEigenvalue μ k) : f.HasGenEigenvalue μ m := by unfold HasGenEigenvalue at * contrapose! hk rw [← le_bot_iff, ← hk] exact (f.genEigenspace μ).monotone hm #align module.End.has_generalized_eigenvalue_of_has_generalized_eigenvalue_of_le Module.End.hasGenEigenvalue_of_hasGenEigenvalue_of_le /-- The eigenspace is a subspace of the generalized eigenspace. -/ theorem eigenspace_le_genEigenspace {f : End R M} {μ : R} {k : ℕ} (hk : 0 < k) : f.eigenspace μ ≤ f.genEigenspace μ k := (f.genEigenspace μ).monotone (Nat.succ_le_of_lt hk) #align module.End.eigenspace_le_generalized_eigenspace Module.End.eigenspace_le_genEigenspace /-- All eigenvalues are generalized eigenvalues. -/ theorem hasGenEigenvalue_of_hasEigenvalue {f : End R M} {μ : R} {k : ℕ} (hk : 0 < k) (hμ : f.HasEigenvalue μ) : f.HasGenEigenvalue μ k := by apply hasGenEigenvalue_of_hasGenEigenvalue_of_le hk rw [HasGenEigenvalue, genEigenspace, OrderHom.coe_mk, pow_one] exact hμ #align module.End.has_generalized_eigenvalue_of_has_eigenvalue Module.End.hasGenEigenvalue_of_hasEigenvalue /-- All generalized eigenvalues are eigenvalues. -/ theorem hasEigenvalue_of_hasGenEigenvalue {f : End R M} {μ : R} {k : ℕ} (hμ : f.HasGenEigenvalue μ k) : f.HasEigenvalue μ := by intro contra; apply hμ erw [LinearMap.ker_eq_bot] at contra ⊢; rw [LinearMap.coe_pow] exact Function.Injective.iterate contra k #align module.End.has_eigenvalue_of_has_generalized_eigenvalue Module.End.hasEigenvalue_of_hasGenEigenvalue /-- Generalized eigenvalues are actually just eigenvalues. -/ @[simp] theorem hasGenEigenvalue_iff_hasEigenvalue {f : End R M} {μ : R} {k : ℕ} (hk : 0 < k) : f.HasGenEigenvalue μ k ↔ f.HasEigenvalue μ := ⟨hasEigenvalue_of_hasGenEigenvalue, hasGenEigenvalue_of_hasEigenvalue hk⟩ #align module.End.has_generalized_eigenvalue_iff_has_eigenvalue Module.End.hasGenEigenvalue_iff_hasEigenvalue /-- Every generalized eigenvector is a generalized eigenvector for exponent `finrank K V`. (Lemma 8.11 of [axler2015]) -/ theorem genEigenspace_le_genEigenspace_finrank [FiniteDimensional K V] (f : End K V) (μ : K) (k : ℕ) : f.genEigenspace μ k ≤ f.genEigenspace μ (finrank K V) := ker_pow_le_ker_pow_finrank _ _ #align module.End.generalized_eigenspace_le_generalized_eigenspace_finrank Module.End.genEigenspace_le_genEigenspace_finrank @[simp] theorem iSup_genEigenspace_eq_genEigenspace_finrank [FiniteDimensional K V] (f : End K V) (μ : K) : ⨆ k, f.genEigenspace μ k = f.genEigenspace μ (finrank K V) := le_antisymm (iSup_le (genEigenspace_le_genEigenspace_finrank f μ)) (le_iSup _ _) /-- Generalized eigenspaces for exponents at least `finrank K V` are equal to each other. -/ theorem genEigenspace_eq_genEigenspace_finrank_of_le [FiniteDimensional K V] (f : End K V) (μ : K) {k : ℕ} (hk : finrank K V ≤ k) : f.genEigenspace μ k = f.genEigenspace μ (finrank K V) := ker_pow_eq_ker_pow_finrank_of_le hk #align module.End.generalized_eigenspace_eq_generalized_eigenspace_finrank_of_le Module.End.genEigenspace_eq_genEigenspace_finrank_of_le lemma mapsTo_genEigenspace_of_comm {f g : End R M} (h : Commute f g) (μ : R) (k : ℕ) : MapsTo g (f.genEigenspace μ k) (f.genEigenspace μ k) := by replace h : Commute ((f - μ • (1 : End R M)) ^ k) g := (h.sub_left <\| Algebra.commute_algebraMap_left μ g).pow_left k intro x hx simp only [SetLike.mem_coe, mem_genEigenspace] at hx ⊢ rw [← LinearMap.comp_apply, ← LinearMap.mul_eq_comp, h.eq, LinearMap.mul_eq_comp, LinearMap.comp_apply, hx, map_zero] lemma mapsTo_iSup_genEigenspace_of_comm {f g : End R M} (h : Commute f g) (μ : R) : MapsTo g ↑(⨆ k, f.genEigenspace μ k) ↑(⨆ k, f.genEigenspace μ k) := by simp only [MapsTo, Submodule.coe_iSup_of_chain, mem_iUnion, SetLike.mem_coe] rintro x ⟨k, hk⟩ exact ⟨k, f.mapsTo_genEigenspace_of_comm h μ k hk⟩ /-- The restriction of `f - μ • 1` to the `k`-fold generalized `μ`-eigenspace is nilpotent. -/ lemma isNilpotent_restrict_sub_algebraMap (f : End R M) (μ : R) (k : ℕ) (h : MapsTo (f - algebraMap R (End R M) μ) (f.genEigenspace μ k) (f.genEigenspace μ k) := mapsTo_genEigenspace_of_comm (Algebra.mul_sub_algebraMap_commutes f μ) μ k) : IsNilpotent ((f - algebraMap R (End R M) μ).restrict h) := by use k ext simp [LinearMap.restrict_apply, LinearMap.pow_restrict _] /-- The restriction of `f - μ • 1` to the generalized `μ`-eigenspace is nilpotent. -/ lemma isNilpotent_restrict_iSup_sub_algebraMap [IsNoetherian R M] (f : End R M) (μ : R) (h : MapsTo (f - algebraMap R (End R M) μ) ↑(⨆ k, f.genEigenspace μ k) ↑(⨆ k, f.genEigenspace μ k) := mapsTo_iSup_genEigenspace_of_comm (Algebra.mul_sub_algebraMap_commutes f μ) μ) : IsNilpotent ((f - algebraMap R (End R M) μ).restrict h) := by obtain ⟨l, hl⟩ : ∃ l, ⨆ k, f.genEigenspace μ k = f.genEigenspace μ l := ⟨_, maxGenEigenspace_eq f μ⟩ use l ext ⟨x, hx⟩ simpa [hl, LinearMap.restrict_apply, LinearMap.pow_restrict _] using hx lemma disjoint_genEigenspace [NoZeroSMulDivisors R M] (f : End R M) {μ₁ μ₂ : R} (hμ : μ₁ ≠ μ₂) (k l : ℕ) : Disjoint (f.genEigenspace μ₁ k) (f.genEigenspace μ₂ l) := by nontriviality M have := NoZeroSMulDivisors.isReduced R M rw [disjoint_iff] set p := f.genEigenspace μ₁ k ⊓ f.genEigenspace μ₂ l by_contra hp replace hp : Nontrivial p := Submodule.nontrivial_iff_ne_bot.mpr hp let f₁ : End R p := (f - algebraMap R (End R M) μ₁).restrict <\| MapsTo.inter_inter (mapsTo_genEigenspace_of_comm (Algebra.mul_sub_algebraMap_commutes f μ₁) μ₁ k) (mapsTo_genEigenspace_of_comm (Algebra.mul_sub_algebraMap_commutes f μ₁) μ₂ l) let f₂ : End R p := (f - algebraMap R (End R M) μ₂).restrict <\| MapsTo.inter_inter (mapsTo_genEigenspace_of_comm (Algebra.mul_sub_algebraMap_commutes f μ₂) μ₁ k) (mapsTo_genEigenspace_of_comm (Algebra.mul_sub_algebraMap_commutes f μ₂) μ₂ l) have : IsNilpotent (f₂ - f₁) := by apply Commute.isNilpotent_sub (x := f₂) (y := f₁) _ ⟨l, ?_⟩ ⟨k, ?_⟩ · ext; simp [f₁, f₂, smul_sub, sub_sub, smul_comm μ₁, add_sub_left_comm] all_goals ext ⟨x, _, _⟩; simpa [LinearMap.restrict_apply, LinearMap.pow_restrict _] using ‹_› have hf₁₂ : f₂ - f₁ = algebraMap R (End R p) (μ₁ - μ₂) := by ext; simp [f₁, f₂, sub_smul] rw [hf₁₂, IsNilpotent.map_iff (NoZeroSMulDivisors.algebraMap_injective R (End R p)), isNilpotent_iff_eq_zero, sub_eq_zero] at this contradiction lemma disjoint_iSup_genEigenspace [NoZeroSMulDivisors R M] (f : End R M) {μ₁ μ₂ : R} (hμ : μ₁ ≠ μ₂) : Disjoint (⨆ k, f.genEigenspace μ₁ k) (⨆ k, f.genEigenspace μ₂ k) := by simp_rw [(f.genEigenspace μ₁).mono.directed_le.disjoint_iSup_left, (f.genEigenspace μ₂).mono.directed_le.disjoint_iSup_right] exact disjoint_genEigenspace f hμ lemma injOn_genEigenspace [NoZeroSMulDivisors R M] (f : End R M) : InjOn (⨆ k, f.genEigenspace · k) {μ \| ⨆ k, f.genEigenspace μ k ≠ ⊥} := by rintro μ₁ _ μ₂ hμ₂ (hμ₁₂ : ⨆ k, f.genEigenspace μ₁ k = ⨆ k, f.genEigenspace μ₂ k) by_contra contra apply hμ₂ simpa only [hμ₁₂, disjoint_self] using f.disjoint_iSup_genEigenspace contra theorem independent_genEigenspace [NoZeroSMulDivisors R M] (f : End R M) : CompleteLattice.Independent (fun μ ↦ ⨆ k, f.genEigenspace μ k) := by classical suffices ∀ μ (s : Finset R), μ ∉ s → Disjoint (⨆ k, f.genEigenspace μ k) (s.sup fun μ ↦ ⨆ k, f.genEigenspace μ k) by simp_rw [CompleteLattice.independent_iff_supIndep_of_injOn f.injOn_genEigenspace, Finset.supIndep_iff_disjoint_erase] exact fun s μ _ ↦ this _ _ (s.not_mem_erase μ) intro μ₁ s induction' s using Finset.induction_on with μ₂ s _ ih · simp intro hμ₁₂ obtain ⟨hμ₁₂ : μ₁ ≠ μ₂, hμ₁ : μ₁ ∉ s⟩ := by rwa [Finset.mem_insert, not_or] at hμ₁₂ specialize ih hμ₁ rw [Finset.sup_insert, disjoint_iff, Submodule.eq_bot_iff] rintro x ⟨hx, hx'⟩ simp only [SetLike.mem_coe] at hx hx' suffices x ∈ ⨆ k, genEigenspace f μ₂ k by rw [← Submodule.mem_bot (R := R), ← (f.disjoint_iSup_genEigenspace hμ₁₂).eq_bot] exact ⟨hx, this⟩ obtain ⟨y, hy, z, hz, rfl⟩ := Submodule.mem_sup.mp hx'; clear hx' let g := f - algebraMap R (End R M) μ₂ obtain ⟨k : ℕ, hk : (g ^ k) y = 0⟩ := by simpa using hy have hyz : (g ^ k) (y + z) ∈ (⨆ k, genEigenspace f μ₁ k) ⊓ s.sup fun μ ↦ ⨆ k, f.genEigenspace μ k := by refine ⟨f.mapsTo_iSup_genEigenspace_of_comm ?_ μ₁ hx, ?_⟩ · exact Algebra.mul_sub_algebraMap_pow_commutes f μ₂ k · rw [SetLike.mem_coe, map_add, hk, zero_add] suffices (s.sup fun μ ↦ ⨆ k, f.genEigenspace μ k).map (g ^ k) ≤ s.sup fun μ ↦ ⨆ k, f.genEigenspace μ k by exact this (Submodule.mem_map_of_mem hz) simp_rw [Finset.sup_eq_iSup, Submodule.map_iSup (ι := R), Submodule.map_iSup (ι := _ ∈ s)] refine iSup₂_mono fun μ _ ↦ ?_ rintro - ⟨u, hu, rfl⟩ refine f.mapsTo_iSup_genEigenspace_of_comm ?_ μ hu exact Algebra.mul_sub_algebraMap_pow_commutes f μ₂ k rw [ih.eq_bot, Submodule.mem_bot] at hyz simp_rw [Submodule.mem_iSup_of_chain, mem_genEigenspace] exact ⟨k, hyz⟩ /-- The eigenspaces of a linear operator form an independent family of subspaces of `M`. That is, any eigenspace has trivial intersection with the span of all the other eigenspaces. -/ theorem eigenspaces_independent [NoZeroSMulDivisors R M] (f : End R M) : CompleteLattice.Independent f.eigenspace := f.independent_genEigenspace.mono fun μ ↦ le_iSup (genEigenspace f μ) 1 /-- Eigenvectors corresponding to distinct eigenvalues of a linear operator are linearly independent. (Lemma 5.10 of [axler2015]) We use the eigenvalues as indexing set to ensure that there is only one eigenvector for each eigenvalue in the image of `xs`. -/ theorem eigenvectors_linearIndependent [NoZeroSMulDivisors R M] (f : End R M) (μs : Set R) (xs : μs → M) (h_eigenvec : ∀ μ : μs, f.HasEigenvector μ (xs μ)) : LinearIndependent R xs := CompleteLattice.Independent.linearIndependent _ (f.eigenspaces_independent.comp Subtype.coe_injective) (fun μ => (h_eigenvec μ).1) fun μ => (h_eigenvec μ).2 #align module.End.eigenvectors_linear_independent Module.End.eigenvectors_linearIndependent /-- If `f` maps a subspace `p` into itself, then the generalized eigenspace of the restriction of `f` to `p` is the part of the generalized eigenspace of `f` that lies in `p`. -/ theorem genEigenspace_restrict (f : End R M) (p : Submodule R M) (k : ℕ) (μ : R) (hfp : ∀ x : M, x ∈ p → f x ∈ p) : genEigenspace (LinearMap.restrict f hfp) μ k = Submodule.comap p.subtype (f.genEigenspace μ k) := by simp only [genEigenspace, OrderHom.coe_mk, ← LinearMap.ker_comp] induction' k with k ih · rw [pow_zero, pow_zero, LinearMap.one_eq_id] apply (Submodule.ker_subtype _).symm · erw [pow_succ, pow_succ, LinearMap.ker_comp, LinearMap.ker_comp, ih, ← LinearMap.ker_comp, LinearMap.comp_assoc] #align module.End.generalized_eigenspace_restrict Module.End.genEigenspace_restrict lemma _root_.Submodule.inf_genEigenspace (f : End R M) (p : Submodule R M) {k : ℕ} {μ : R} (hfp : ∀ x : M, x ∈ p → f x ∈ p) : p ⊓ f.genEigenspace μ k = (genEigenspace (LinearMap.restrict f hfp) μ k).map p.subtype := by rw [f.genEigenspace_restrict _ _ _ hfp, Submodule.map_comap_eq, Submodule.range_subtype] /-- If `p` is an invariant submodule of an endomorphism `f`, then the `μ`-eigenspace of the restriction of `f` to `p` is a submodule of the `μ`-eigenspace of `f`. -/ theorem eigenspace_restrict_le_eigenspace (f : End R M) {p : Submodule R M} (hfp : ∀ x ∈ p, f x ∈ p) (μ : R) : (eigenspace (f.restrict hfp) μ).map p.subtype ≤ f.eigenspace μ := by rintro a ⟨x, hx, rfl⟩ simp only [SetLike.mem_coe, mem_eigenspace_iff, LinearMap.restrict_apply] at hx ⊢ exact congr_arg Subtype.val hx #align module.End.eigenspace_restrict_le_eigenspace Module.End.eigenspace_restrict_le_eigenspace /-- Generalized eigenrange and generalized eigenspace for exponent `finrank K V` are disjoint. -/ theorem generalized_eigenvec_disjoint_range_ker [FiniteDimensional K V] (f : End K V) (μ : K) : Disjoint (f.genEigenrange μ (finrank K V)) (f.genEigenspace μ (finrank K V)) := by have h := calc Submodule.comap ((f - algebraMap _ _ μ) ^ finrank K V) (f.genEigenspace μ (finrank K V)) = LinearMap.ker ((f - algebraMap _ _ μ) ^ finrank K V * (f - algebraMap K (End K V) μ) ^ finrank K V) := by rw [genEigenspace, OrderHom.coe_mk, ← LinearMap.ker_comp]; rfl _ = f.genEigenspace μ (finrank K V + finrank K V) := by rw [← pow_add]; rfl _ = f.genEigenspace μ (finrank K V) := by rw [genEigenspace_eq_genEigenspace_finrank_of_le]; omega rw [disjoint_iff_inf_le, genEigenrange, LinearMap.range_eq_map, Submodule.map_inf_eq_map_inf_comap, top_inf_eq, h] apply Submodule.map_comap_le #align module.End.generalized_eigenvec_disjoint_range_ker Module.End.generalized_eigenvec_disjoint_range_ker /-- If an invariant subspace `p` of an endomorphism `f` is disjoint from the `μ`-eigenspace of `f`, then the restriction of `f` to `p` has trivial `μ`-eigenspace. -/ theorem eigenspace_restrict_eq_bot {f : End R M} {p : Submodule R M} (hfp : ∀ x ∈ p, f x ∈ p) {μ : R} (hμp : Disjoint (f.eigenspace μ) p) : eigenspace (f.restrict hfp) μ = ⊥ := by rw [eq_bot_iff] intro x hx simpa using hμp.le_bot ⟨eigenspace_restrict_le_eigenspace f hfp μ ⟨x, hx, rfl⟩, x.prop⟩ #align module.End.eigenspace_restrict_eq_bot Module.End.eigenspace_restrict_eq_bot /-- The generalized eigenspace of an eigenvalue has positive dimension for positive exponents. -/	Mathlib/LinearAlgebra/Eigenspace/Basic.lean	496	503	theorem pos_finrank_genEigenspace_of_hasEigenvalue [FiniteDimensional K V] {f : End K V} {k : ℕ} {μ : K} (hx : f.HasEigenvalue μ) (hk : 0 < k) : 0 < finrank K (f.genEigenspace μ k) := calc 0 = finrank K (⊥ : Submodule K V) := by	rw [finrank_bot] _ < finrank K (f.eigenspace μ) := Submodule.finrank_lt_finrank_of_lt (bot_lt_iff_ne_bot.2 hx) _ ≤ finrank K (f.genEigenspace μ k) := Submodule.finrank_mono ((f.genEigenspace μ).monotone (Nat.succ_le_of_lt hk))
/- Copyright (c) 2018 Scott Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Scott Morrison, Mario Carneiro, Reid Barton, Andrew Yang -/ import Mathlib.CategoryTheory.Limits.KanExtension import Mathlib.Topology.Category.TopCat.Opens import Mathlib.CategoryTheory.Adjunction.Unique import Mathlib.Topology.Sheaves.Init import Mathlib.Data.Set.Subsingleton #align_import topology.sheaves.presheaf from "leanprover-community/mathlib"@"5dc6092d09e5e489106865241986f7f2ad28d4c8" /-! # Presheaves on a topological space We define `TopCat.Presheaf C X` simply as `(TopologicalSpace.Opens X)ᵒᵖ ⥤ C`, and inherit the category structure with natural transformations as morphisms. We define * `TopCat.Presheaf.pushforwardObj {X Y : Top.{w}} (f : X ⟶ Y) (ℱ : X.Presheaf C) : Y.Presheaf C` with notation `f _* ℱ` and for `ℱ : X.Presheaf C` provide the natural isomorphisms * `TopCat.Presheaf.Pushforward.id : (𝟙 X) _* ℱ ≅ ℱ` * `TopCat.Presheaf.Pushforward.comp : (f ≫ g) _* ℱ ≅ g _* (f _* ℱ)` along with their `@[simp]` lemmas. We also define the functors `pushforward` and `pullback` between the categories `X.Presheaf C` and `Y.Presheaf C`, and provide their adjunction at `TopCat.Presheaf.pushforwardPullbackAdjunction`. -/ set_option autoImplicit true universe w v u open CategoryTheory TopologicalSpace Opposite variable (C : Type u) [Category.{v} C] namespace TopCat /-- The category of `C`-valued presheaves on a (bundled) topological space `X`. -/ -- Porting note(#5171): was @[nolint has_nonempty_instance] def Presheaf (X : TopCat.{w}) : Type max u v w := (Opens X)ᵒᵖ ⥤ C set_option linter.uppercaseLean3 false in #align Top.presheaf TopCat.Presheaf instance (X : TopCat.{w}) : Category (Presheaf.{w, v, u} C X) := inferInstanceAs (Category ((Opens X)ᵒᵖ ⥤ C : Type max u v w)) variable {C} namespace Presheaf @[simp] theorem comp_app {P Q R : Presheaf C X} (f : P ⟶ Q) (g : Q ⟶ R) : (f ≫ g).app U = f.app U ≫ g.app U := rfl -- Porting note (#10756): added an `ext` lemma, -- since `NatTrans.ext` can not see through the definition of `Presheaf`. -- See https://github.com/leanprover-community/mathlib4/issues/5229 @[ext] lemma ext {P Q : Presheaf C X} {f g : P ⟶ Q} (w : ∀ U : Opens X, f.app (op U) = g.app (op U)) : f = g := by apply NatTrans.ext ext U induction U with \| _ U => ?_ apply w attribute [local instance] CategoryTheory.ConcreteCategory.hasCoeToSort CategoryTheory.ConcreteCategory.instFunLike /-- attribute `sheaf_restrict` to mark lemmas related to restricting sheaves -/ macro "sheaf_restrict" : attr => `(attr\|aesop safe 50 apply (rule_sets := [$(Lean.mkIdent `Restrict):ident])) attribute [sheaf_restrict] bot_le le_top le_refl inf_le_left inf_le_right le_sup_left le_sup_right /-- `restrict_tac` solves relations among subsets (copied from `aesop cat`) -/ macro (name := restrict_tac) "restrict_tac" c:Aesop.tactic_clause* : tactic => `(tactic\| first \| assumption \| aesop $c* (config := { terminal := true assumptionTransparency := .reducible enableSimp := false }) (rule_sets := [-default, -builtin, $(Lean.mkIdent `Restrict):ident])) /-- `restrict_tac?` passes along `Try this` from `aesop` -/ macro (name := restrict_tac?) "restrict_tac?" c:Aesop.tactic_clause* : tactic => `(tactic\| aesop? $c* (config := { terminal := true assumptionTransparency := .reducible enableSimp := false maxRuleApplications := 300 }) (rule_sets := [-default, -builtin, $(Lean.mkIdent `Restrict):ident])) attribute[aesop 10% (rule_sets := [Restrict])] le_trans attribute[aesop safe destruct (rule_sets := [Restrict])] Eq.trans_le attribute[aesop safe -50 (rule_sets := [Restrict])] Aesop.BuiltinRules.assumption example {X} [CompleteLattice X] (v : Nat → X) (w x y z : X) (e : v 0 = v 1) (_ : v 1 = v 2) (h₀ : v 1 ≤ x) (_ : x ≤ z ⊓ w) (h₂ : x ≤ y ⊓ z) : v 0 ≤ y := by restrict_tac /-- The restriction of a section along an inclusion of open sets. For `x : F.obj (op V)`, we provide the notation `x \|_ₕ i` (`h` stands for `hom`) for `i : U ⟶ V`, and the notation `x \|_ₗ U ⟪i⟫` (`l` stands for `le`) for `i : U ≤ V`. -/ def restrict {X : TopCat} {C : Type} [Category C] [ConcreteCategory C] {F : X.Presheaf C} {V : Opens X} (x : F.obj (op V)) {U : Opens X} (h : U ⟶ V) : F.obj (op U) := F.map h.op x set_option linter.uppercaseLean3 false in #align Top.presheaf.restrict TopCat.Presheaf.restrict /-- restriction of a section along an inclusion -/ scoped[AlgebraicGeometry] infixl:80 " \|_ₕ " => TopCat.Presheaf.restrict /-- restriction of a section along a subset relation -/ scoped[AlgebraicGeometry] notation:80 x " \|_ₗ " U " ⟪" e "⟫ " => @TopCat.Presheaf.restrict _ _ _ _ _ _ x U (@homOfLE (Opens _) _ U _ e) open AlgebraicGeometry /-- The restriction of a section along an inclusion of open sets. For `x : F.obj (op V)`, we provide the notation `x \|_ U`, where the proof `U ≤ V` is inferred by the tactic `Top.presheaf.restrict_tac'` -/ abbrev restrictOpen {X : TopCat} {C : Type} [Category C] [ConcreteCategory C] {F : X.Presheaf C} {V : Opens X} (x : F.obj (op V)) (U : Opens X) (e : U ≤ V := by restrict_tac) : F.obj (op U) := x \|_ₗ U ⟪e⟫ set_option linter.uppercaseLean3 false in #align Top.presheaf.restrict_open TopCat.Presheaf.restrictOpen /-- restriction of a section to open subset -/ scoped[AlgebraicGeometry] infixl:80 " \|_ " => TopCat.Presheaf.restrictOpen -- Porting note: linter tells this lemma is no going to be picked up by the simplifier, hence -- `@[simp]` is removed theorem restrict_restrict {X : TopCat} {C : Type} [Category C] [ConcreteCategory C] {F : X.Presheaf C} {U V W : Opens X} (e₁ : U ≤ V) (e₂ : V ≤ W) (x : F.obj (op W)) : x \|_ V \|_ U = x \|_ U := by delta restrictOpen restrict rw [← comp_apply, ← Functor.map_comp] rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.restrict_restrict TopCat.Presheaf.restrict_restrict -- Porting note: linter tells this lemma is no going to be picked up by the simplifier, hence -- `@[simp]` is removed theorem map_restrict {X : TopCat} {C : Type} [Category C] [ConcreteCategory C] {F G : X.Presheaf C} (e : F ⟶ G) {U V : Opens X} (h : U ≤ V) (x : F.obj (op V)) : e.app _ (x \|_ U) = e.app _ x \|_ U := by delta restrictOpen restrict rw [← comp_apply, NatTrans.naturality, comp_apply] set_option linter.uppercaseLean3 false in #align Top.presheaf.map_restrict TopCat.Presheaf.map_restrict /-- Pushforward a presheaf on `X` along a continuous map `f : X ⟶ Y`, obtaining a presheaf on `Y`. -/ def pushforwardObj {X Y : TopCat.{w}} (f : X ⟶ Y) (ℱ : X.Presheaf C) : Y.Presheaf C := (Opens.map f).op ⋙ ℱ set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_obj TopCat.Presheaf.pushforwardObj /-- push forward of a presheaf-/ infixl:80 " _* " => pushforwardObj @[simp] theorem pushforwardObj_obj {X Y : TopCat.{w}} (f : X ⟶ Y) (ℱ : X.Presheaf C) (U : (Opens Y)ᵒᵖ) : (f _* ℱ).obj U = ℱ.obj ((Opens.map f).op.obj U) := rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_obj_obj TopCat.Presheaf.pushforwardObj_obj @[simp] theorem pushforwardObj_map {X Y : TopCat.{w}} (f : X ⟶ Y) (ℱ : X.Presheaf C) {U V : (Opens Y)ᵒᵖ} (i : U ⟶ V) : (f _* ℱ).map i = ℱ.map ((Opens.map f).op.map i) := rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_obj_map TopCat.Presheaf.pushforwardObj_map /-- An equality of continuous maps induces a natural isomorphism between the pushforwards of a presheaf along those maps. -/ def pushforwardEq {X Y : TopCat.{w}} {f g : X ⟶ Y} (h : f = g) (ℱ : X.Presheaf C) : f _* ℱ ≅ g _* ℱ := isoWhiskerRight (NatIso.op (Opens.mapIso f g h).symm) ℱ set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_eq TopCat.Presheaf.pushforwardEq theorem pushforward_eq' {X Y : TopCat.{w}} {f g : X ⟶ Y} (h : f = g) (ℱ : X.Presheaf C) : f _* ℱ = g _* ℱ := by rw [h] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_eq' TopCat.Presheaf.pushforward_eq' @[simp] theorem pushforwardEq_hom_app {X Y : TopCat.{w}} {f g : X ⟶ Y} (h : f = g) (ℱ : X.Presheaf C) (U) : (pushforwardEq h ℱ).hom.app U = ℱ.map (by dsimp [Functor.op]; apply Quiver.Hom.op; apply eqToHom; rw [h]) := by simp [pushforwardEq] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_eq_hom_app TopCat.Presheaf.pushforwardEq_hom_app theorem pushforward_eq'_hom_app {X Y : TopCat.{w}} {f g : X ⟶ Y} (h : f = g) (ℱ : X.Presheaf C) (U) : NatTrans.app (eqToHom (pushforward_eq' h ℱ)) U = ℱ.map (eqToHom (by rw [h])) := by rw [eqToHom_app, eqToHom_map] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_eq'_hom_app TopCat.Presheaf.pushforward_eq'_hom_app -- Porting note: This lemma is promoted to a higher priority to short circuit the simplifier @[simp (high)] theorem pushforwardEq_rfl {X Y : TopCat.{w}} (f : X ⟶ Y) (ℱ : X.Presheaf C) (U) : (pushforwardEq (rfl : f = f) ℱ).hom.app (op U) = 𝟙 _ := by dsimp [pushforwardEq] simp set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_eq_rfl TopCat.Presheaf.pushforwardEq_rfl theorem pushforwardEq_eq {X Y : TopCat.{w}} {f g : X ⟶ Y} (h₁ h₂ : f = g) (ℱ : X.Presheaf C) : ℱ.pushforwardEq h₁ = ℱ.pushforwardEq h₂ := rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_eq_eq TopCat.Presheaf.pushforwardEq_eq namespace Pushforward variable {X : TopCat.{w}} (ℱ : X.Presheaf C) /-- The natural isomorphism between the pushforward of a presheaf along the identity continuous map and the original presheaf. -/ def id : 𝟙 X _* ℱ ≅ ℱ := isoWhiskerRight (NatIso.op (Opens.mapId X).symm) ℱ ≪≫ Functor.leftUnitor _ set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.id TopCat.Presheaf.Pushforward.id theorem id_eq : 𝟙 X _* ℱ = ℱ := by unfold pushforwardObj rw [Opens.map_id_eq] erw [Functor.id_comp] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.id_eq TopCat.Presheaf.Pushforward.id_eq -- Porting note: This lemma is promoted to a higher priority to short circuit the simplifier @[simp (high)] theorem id_hom_app' (U) (p) : (id ℱ).hom.app (op ⟨U, p⟩) = ℱ.map (𝟙 (op ⟨U, p⟩)) := by dsimp [id] simp set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.id_hom_app' TopCat.Presheaf.Pushforward.id_hom_app' -- Porting note: -- the proof below could be `by aesop_cat` if -- https://github.com/JLimperg/aesop/issues/59 -- can be resolved, and we add: attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Opposite attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Opens @[simp] theorem id_hom_app (U) : (id ℱ).hom.app U = ℱ.map (eqToHom (Opens.op_map_id_obj U)) := by -- was `tidy`, see porting note above. induction U apply id_hom_app' set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.id_hom_app TopCat.Presheaf.Pushforward.id_hom_app @[simp] theorem id_inv_app' (U) (p) : (id ℱ).inv.app (op ⟨U, p⟩) = ℱ.map (𝟙 (op ⟨U, p⟩)) := by dsimp [id] simp [CategoryStruct.comp] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.id_inv_app' TopCat.Presheaf.Pushforward.id_inv_app' /-- The natural isomorphism between the pushforward of a presheaf along the composition of two continuous maps and the corresponding pushforward of a pushforward. -/ def comp {Y Z : TopCat.{w}} (f : X ⟶ Y) (g : Y ⟶ Z) : (f ≫ g) _* ℱ ≅ g _* (f _* ℱ) := isoWhiskerRight (NatIso.op (Opens.mapComp f g).symm) ℱ set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.comp TopCat.Presheaf.Pushforward.comp theorem comp_eq {Y Z : TopCat.{w}} (f : X ⟶ Y) (g : Y ⟶ Z) : (f ≫ g) _* ℱ = g _* (f _* ℱ) := rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.comp_eq TopCat.Presheaf.Pushforward.comp_eq @[simp] theorem comp_hom_app {Y Z : TopCat.{w}} (f : X ⟶ Y) (g : Y ⟶ Z) (U) : (comp ℱ f g).hom.app U = 𝟙 _ := by simp [comp] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.comp_hom_app TopCat.Presheaf.Pushforward.comp_hom_app @[simp] theorem comp_inv_app {Y Z : TopCat.{w}} (f : X ⟶ Y) (g : Y ⟶ Z) (U) : (comp ℱ f g).inv.app U = 𝟙 _ := by simp [comp] set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward.comp_inv_app TopCat.Presheaf.Pushforward.comp_inv_app end Pushforward /-- A morphism of presheaves gives rise to a morphisms of the pushforwards of those presheaves. -/ @[simps] def pushforwardMap {X Y : TopCat.{w}} (f : X ⟶ Y) {ℱ 𝒢 : X.Presheaf C} (α : ℱ ⟶ 𝒢) : f _* ℱ ⟶ f _* 𝒢 where app U := α.app _ naturality _ _ i := by erw [α.naturality]; rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_map TopCat.Presheaf.pushforwardMap open CategoryTheory.Limits noncomputable section Pullback variable [HasColimits C] /-- Pullback a presheaf on `Y` along a continuous map `f : X ⟶ Y`, obtaining a presheaf on `X`. This is defined in terms of left Kan extensions, which is just a fancy way of saying "take the colimits over the open sets whose preimage contains U". -/ @[simps!] def pullbackObj {X Y : TopCat.{v}} (f : X ⟶ Y) (ℱ : Y.Presheaf C) : X.Presheaf C := (lan (Opens.map f).op).obj ℱ set_option linter.uppercaseLean3 false in #align Top.presheaf.pullback_obj TopCat.Presheaf.pullbackObj /-- Pulling back along continuous maps is functorial. -/ def pullbackMap {X Y : TopCat.{v}} (f : X ⟶ Y) {ℱ 𝒢 : Y.Presheaf C} (α : ℱ ⟶ 𝒢) : pullbackObj f ℱ ⟶ pullbackObj f 𝒢 := (lan (Opens.map f).op).map α set_option linter.uppercaseLean3 false in #align Top.presheaf.pullback_map TopCat.Presheaf.pullbackMap /-- If `f '' U` is open, then `f⁻¹ℱ U ≅ ℱ (f '' U)`. -/ @[simps!] def pullbackObjObjOfImageOpen {X Y : TopCat.{v}} (f : X ⟶ Y) (ℱ : Y.Presheaf C) (U : Opens X) (H : IsOpen (f '' SetLike.coe U)) : (pullbackObj f ℱ).obj (op U) ≅ ℱ.obj (op ⟨_, H⟩) := by let x : CostructuredArrow (Opens.map f).op (op U) := CostructuredArrow.mk (@homOfLE _ _ _ ((Opens.map f).obj ⟨_, H⟩) (Set.image_preimage.le_u_l _)).op have hx : IsTerminal x := { lift := fun s ↦ by fapply CostructuredArrow.homMk · change op (unop _) ⟶ op (⟨_, H⟩ : Opens _) refine (homOfLE ?_).op apply (Set.image_subset f s.pt.hom.unop.le).trans exact Set.image_preimage.l_u_le (SetLike.coe s.pt.left.unop) · simp [autoParam, eq_iff_true_of_subsingleton] -- Porting note: add `fac`, `uniq` manually fac := fun _ _ => by ext; simp [eq_iff_true_of_subsingleton] uniq := fun _ _ _ => by ext; simp [eq_iff_true_of_subsingleton] } exact IsColimit.coconePointUniqueUpToIso (colimit.isColimit _) (colimitOfDiagramTerminal hx _) set_option linter.uppercaseLean3 false in #align Top.presheaf.pullback_obj_obj_of_image_open TopCat.Presheaf.pullbackObjObjOfImageOpen namespace Pullback variable {X Y : TopCat.{v}} (ℱ : Y.Presheaf C) /-- The pullback along the identity is isomorphic to the original presheaf. -/ def id : pullbackObj (𝟙 _) ℱ ≅ ℱ := NatIso.ofComponents (fun U => pullbackObjObjOfImageOpen (𝟙 _) ℱ (unop U) (by simpa using U.unop.2) ≪≫ ℱ.mapIso (eqToIso (by simp))) fun {U V} i => by simp only [pullbackObj_obj] ext simp only [Functor.comp_obj, CostructuredArrow.proj_obj, pullbackObj_map, Iso.trans_hom, Functor.mapIso_hom, eqToIso.hom, Category.assoc] erw [colimit.pre_desc_assoc, colimit.ι_desc_assoc, colimit.ι_desc_assoc] dsimp simp only [← ℱ.map_comp] -- Porting note: `congr` does not work, but `congr 1` does congr 1 set_option linter.uppercaseLean3 false in #align Top.presheaf.pullback.id TopCat.Presheaf.Pullback.id theorem id_inv_app (U : Opens Y) : (id ℱ).inv.app (op U) = colimit.ι (Lan.diagram (Opens.map (𝟙 Y)).op ℱ (op U)) (@CostructuredArrow.mk _ _ _ _ _ (op U) _ (eqToHom (by simp))) := by rw [← Category.id_comp ((id ℱ).inv.app (op U)), ← NatIso.app_inv, Iso.comp_inv_eq] dsimp [id] erw [colimit.ι_desc_assoc] dsimp rw [← ℱ.map_comp, ← ℱ.map_id]; rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pullback.id_inv_app TopCat.Presheaf.Pullback.id_inv_app end Pullback end Pullback variable (C) /-- The pushforward functor. -/ def pushforward {X Y : TopCat.{w}} (f : X ⟶ Y) : X.Presheaf C ⥤ Y.Presheaf C where obj := pushforwardObj f map := @pushforwardMap _ _ X Y f set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward TopCat.Presheaf.pushforward @[simp] theorem pushforward_map_app' {X Y : TopCat.{w}} (f : X ⟶ Y) {ℱ 𝒢 : X.Presheaf C} (α : ℱ ⟶ 𝒢) {U : (Opens Y)ᵒᵖ} : ((pushforward C f).map α).app U = α.app (op <\| (Opens.map f).obj U.unop) := rfl set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_map_app' TopCat.Presheaf.pushforward_map_app' theorem id_pushforward {X : TopCat.{w}} : pushforward C (𝟙 X) = 𝟭 (X.Presheaf C) := by apply CategoryTheory.Functor.ext · intros a b f ext U · erw [NatTrans.congr f (Opens.op_map_id_obj (op U))] · simp only [Functor.op_obj, eqToHom_refl, CategoryTheory.Functor.map_id, Category.comp_id, Category.id_comp, Functor.id_obj, Functor.id_map] apply Pushforward.id_eq set_option linter.uppercaseLean3 false in #align Top.presheaf.id_pushforward TopCat.Presheaf.id_pushforward section Iso /-- A homeomorphism of spaces gives an equivalence of categories of presheaves. -/ @[simps!] def presheafEquivOfIso {X Y : TopCat} (H : X ≅ Y) : X.Presheaf C ≌ Y.Presheaf C := Equivalence.congrLeft (Opens.mapMapIso H).symm.op set_option linter.uppercaseLean3 false in #align Top.presheaf.presheaf_equiv_of_iso TopCat.Presheaf.presheafEquivOfIso variable {C} /-- If `H : X ≅ Y` is a homeomorphism, then given an `H _* ℱ ⟶ 𝒢`, we may obtain an `ℱ ⟶ H ⁻¹ _* 𝒢`. -/ def toPushforwardOfIso {X Y : TopCat} (H : X ≅ Y) {ℱ : X.Presheaf C} {𝒢 : Y.Presheaf C} (α : H.hom _* ℱ ⟶ 𝒢) : ℱ ⟶ H.inv _* 𝒢 := (presheafEquivOfIso _ H).toAdjunction.homEquiv ℱ 𝒢 α set_option linter.uppercaseLean3 false in #align Top.presheaf.to_pushforward_of_iso TopCat.Presheaf.toPushforwardOfIso @[simp] theorem toPushforwardOfIso_app {X Y : TopCat} (H₁ : X ≅ Y) {ℱ : X.Presheaf C} {𝒢 : Y.Presheaf C} (H₂ : H₁.hom _* ℱ ⟶ 𝒢) (U : (Opens X)ᵒᵖ) : (toPushforwardOfIso H₁ H₂).app U = ℱ.map (eqToHom (by simp [Opens.map, Set.preimage_preimage])) ≫ H₂.app (op ((Opens.map H₁.inv).obj (unop U))) := by delta toPushforwardOfIso -- Porting note: originally is a single invocation of `simp` simp only [pushforwardObj_obj, Functor.op_obj, Equivalence.toAdjunction, Adjunction.homEquiv_unit, Functor.id_obj, Functor.comp_obj, Adjunction.mkOfUnitCounit_unit, unop_op, eqToHom_map] rw [NatTrans.comp_app, presheafEquivOfIso_inverse_map_app, Equivalence.Equivalence_mk'_unit] congr 1 simp only [Equivalence.unit, Equivalence.op, CategoryTheory.Equivalence.symm, Opens.mapMapIso, Functor.id_obj, Functor.comp_obj, Iso.symm_hom, NatIso.op_inv, Iso.symm_inv, NatTrans.op_app, NatIso.ofComponents_hom_app, eqToIso.hom, eqToHom_op, Equivalence.Equivalence_mk'_unitInv, Equivalence.Equivalence_mk'_counitInv, NatIso.op_hom, unop_op, op_unop, eqToIso.inv, NatIso.ofComponents_inv_app, eqToHom_unop, ← ℱ.map_comp, eqToHom_trans, eqToHom_map, presheafEquivOfIso_unitIso_hom_app_app] set_option linter.uppercaseLean3 false in #align Top.presheaf.to_pushforward_of_iso_app TopCat.Presheaf.toPushforwardOfIso_app /-- If `H : X ≅ Y` is a homeomorphism, then given an `H _* ℱ ⟶ 𝒢`, we may obtain an `ℱ ⟶ H ⁻¹ _* 𝒢`. -/ def pushforwardToOfIso {X Y : TopCat} (H₁ : X ≅ Y) {ℱ : Y.Presheaf C} {𝒢 : X.Presheaf C} (H₂ : ℱ ⟶ H₁.hom _* 𝒢) : H₁.inv _* ℱ ⟶ 𝒢 := ((presheafEquivOfIso _ H₁.symm).toAdjunction.homEquiv ℱ 𝒢).symm H₂ set_option linter.uppercaseLean3 false in #align Top.presheaf.pushforward_to_of_iso TopCat.Presheaf.pushforwardToOfIso @[simp]	Mathlib/Topology/Sheaves/Presheaf.lean	479	484	theorem pushforwardToOfIso_app {X Y : TopCat} (H₁ : X ≅ Y) {ℱ : Y.Presheaf C} {𝒢 : X.Presheaf C} (H₂ : ℱ ⟶ H₁.hom _* 𝒢) (U : (Opens X)ᵒᵖ) : (pushforwardToOfIso H₁ H₂).app U = H₂.app (op ((Opens.map H₁.inv).obj (unop U))) ≫ 𝒢.map (eqToHom (by simp [Opens.map, Set.preimage_preimage])) := by	simp [pushforwardToOfIso, Equivalence.toAdjunction]
/- Copyright (c) 2019 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Reid Barton, Mario Carneiro, Isabel Longbottom, Scott Morrison -/ import Mathlib.Algebra.Order.ZeroLEOne import Mathlib.Data.List.InsertNth import Mathlib.Logic.Relation import Mathlib.Logic.Small.Defs import Mathlib.Order.GameAdd #align_import set_theory.game.pgame from "leanprover-community/mathlib"@"8900d545017cd21961daa2a1734bb658ef52c618" /-! # Combinatorial (pre-)games. The basic theory of combinatorial games, following Conway's book `On Numbers and Games`. We construct "pregames", define an ordering and arithmetic operations on them, then show that the operations descend to "games", defined via the equivalence relation `p ≈ q ↔ p ≤ q ∧ q ≤ p`. The surreal numbers will be built as a quotient of a subtype of pregames. A pregame (`SetTheory.PGame` below) is axiomatised via an inductive type, whose sole constructor takes two types (thought of as indexing the possible moves for the players Left and Right), and a pair of functions out of these types to `SetTheory.PGame` (thought of as describing the resulting game after making a move). Combinatorial games themselves, as a quotient of pregames, are constructed in `Game.lean`. ## Conway induction By construction, the induction principle for pregames is exactly "Conway induction". That is, to prove some predicate `SetTheory.PGame → Prop` holds for all pregames, it suffices to prove that for every pregame `g`, if the predicate holds for every game resulting from making a move, then it also holds for `g`. While it is often convenient to work "by induction" on pregames, in some situations this becomes awkward, so we also define accessor functions `SetTheory.PGame.LeftMoves`, `SetTheory.PGame.RightMoves`, `SetTheory.PGame.moveLeft` and `SetTheory.PGame.moveRight`. There is a relation `PGame.Subsequent p q`, saying that `p` can be reached by playing some non-empty sequence of moves starting from `q`, an instance `WellFounded Subsequent`, and a local tactic `pgame_wf_tac` which is helpful for discharging proof obligations in inductive proofs relying on this relation. ## Order properties Pregames have both a `≤` and a `<` relation, satisfying the usual properties of a `Preorder`. The relation `0 < x` means that `x` can always be won by Left, while `0 ≤ x` means that `x` can be won by Left as the second player. It turns out to be quite convenient to define various relations on top of these. We define the "less or fuzzy" relation `x ⧏ y` as `¬ y ≤ x`, the equivalence relation `x ≈ y` as `x ≤ y ∧ y ≤ x`, and the fuzzy relation `x ‖ y` as `x ⧏ y ∧ y ⧏ x`. If `0 ⧏ x`, then `x` can be won by Left as the first player. If `x ≈ 0`, then `x` can be won by the second player. If `x ‖ 0`, then `x` can be won by the first player. Statements like `zero_le_lf`, `zero_lf_le`, etc. unfold these definitions. The theorems `le_def` and `lf_def` give a recursive characterisation of each relation in terms of themselves two moves later. The theorems `zero_le`, `zero_lf`, etc. also take into account that `0` has no moves. Later, games will be defined as the quotient by the `≈` relation; that is to say, the `Antisymmetrization` of `SetTheory.PGame`. ## Algebraic structures We next turn to defining the operations necessary to make games into a commutative additive group. Addition is defined for $x = \{xL \| xR\}$ and $y = \{yL \| yR\}$ by $x + y = \{xL + y, x + yL \| xR + y, x + yR\}$. Negation is defined by $\{xL \| xR\} = \{-xR \| -xL\}$. The order structures interact in the expected way with addition, so we have ``` theorem le_iff_sub_nonneg {x y : PGame} : x ≤ y ↔ 0 ≤ y - x := sorry theorem lt_iff_sub_pos {x y : PGame} : x < y ↔ 0 < y - x := sorry ``` We show that these operations respect the equivalence relation, and hence descend to games. At the level of games, these operations satisfy all the laws of a commutative group. To prove the necessary equivalence relations at the level of pregames, we introduce the notion of a `Relabelling` of a game, and show, for example, that there is a relabelling between `x + (y + z)` and `(x + y) + z`. ## Future work * The theory of dominated and reversible positions, and unique normal form for short games. * Analysis of basic domineering positions. * Hex. * Temperature. * The development of surreal numbers, based on this development of combinatorial games, is still quite incomplete. ## References The material here is all drawn from * [Conway, On numbers and games][conway2001] An interested reader may like to formalise some of the material from * [Andreas Blass, A game semantics for linear logic][MR1167694] * [André Joyal, Remarques sur la théorie des jeux à deux personnes][joyal1997] -/ set_option autoImplicit true namespace SetTheory open Function Relation -- We'd like to be able to use multi-character auto-implicits in this file. set_option relaxedAutoImplicit true /-! ### Pre-game moves -/ /-- The type of pre-games, before we have quotiented by equivalence (`PGame.Setoid`). In ZFC, a combinatorial game is constructed from two sets of combinatorial games that have been constructed at an earlier stage. To do this in type theory, we say that a pre-game is built inductively from two families of pre-games indexed over any type in Type u. The resulting type `PGame.{u}` lives in `Type (u+1)`, reflecting that it is a proper class in ZFC. -/ inductive PGame : Type (u + 1) \| mk : ∀ α β : Type u, (α → PGame) → (β → PGame) → PGame #align pgame SetTheory.PGame compile_inductive% PGame namespace PGame /-- The indexing type for allowable moves by Left. -/ def LeftMoves : PGame → Type u \| mk l _ _ _ => l #align pgame.left_moves SetTheory.PGame.LeftMoves /-- The indexing type for allowable moves by Right. -/ def RightMoves : PGame → Type u \| mk _ r _ _ => r #align pgame.right_moves SetTheory.PGame.RightMoves /-- The new game after Left makes an allowed move. -/ def moveLeft : ∀ g : PGame, LeftMoves g → PGame \| mk _l _ L _ => L #align pgame.move_left SetTheory.PGame.moveLeft /-- The new game after Right makes an allowed move. -/ def moveRight : ∀ g : PGame, RightMoves g → PGame \| mk _ _r _ R => R #align pgame.move_right SetTheory.PGame.moveRight @[simp] theorem leftMoves_mk {xl xr xL xR} : (⟨xl, xr, xL, xR⟩ : PGame).LeftMoves = xl := rfl #align pgame.left_moves_mk SetTheory.PGame.leftMoves_mk @[simp] theorem moveLeft_mk {xl xr xL xR} : (⟨xl, xr, xL, xR⟩ : PGame).moveLeft = xL := rfl #align pgame.move_left_mk SetTheory.PGame.moveLeft_mk @[simp] theorem rightMoves_mk {xl xr xL xR} : (⟨xl, xr, xL, xR⟩ : PGame).RightMoves = xr := rfl #align pgame.right_moves_mk SetTheory.PGame.rightMoves_mk @[simp] theorem moveRight_mk {xl xr xL xR} : (⟨xl, xr, xL, xR⟩ : PGame).moveRight = xR := rfl #align pgame.move_right_mk SetTheory.PGame.moveRight_mk -- TODO define this at the level of games, as well, and perhaps also for finsets of games. /-- Construct a pre-game from list of pre-games describing the available moves for Left and Right. -/ def ofLists (L R : List PGame.{u}) : PGame.{u} := mk (ULift (Fin L.length)) (ULift (Fin R.length)) (fun i => L.get i.down) fun j ↦ R.get j.down #align pgame.of_lists SetTheory.PGame.ofLists theorem leftMoves_ofLists (L R : List PGame) : (ofLists L R).LeftMoves = ULift (Fin L.length) := rfl #align pgame.left_moves_of_lists SetTheory.PGame.leftMoves_ofLists theorem rightMoves_ofLists (L R : List PGame) : (ofLists L R).RightMoves = ULift (Fin R.length) := rfl #align pgame.right_moves_of_lists SetTheory.PGame.rightMoves_ofLists /-- Converts a number into a left move for `ofLists`. -/ def toOfListsLeftMoves {L R : List PGame} : Fin L.length ≃ (ofLists L R).LeftMoves := ((Equiv.cast (leftMoves_ofLists L R).symm).trans Equiv.ulift).symm #align pgame.to_of_lists_left_moves SetTheory.PGame.toOfListsLeftMoves /-- Converts a number into a right move for `ofLists`. -/ def toOfListsRightMoves {L R : List PGame} : Fin R.length ≃ (ofLists L R).RightMoves := ((Equiv.cast (rightMoves_ofLists L R).symm).trans Equiv.ulift).symm #align pgame.to_of_lists_right_moves SetTheory.PGame.toOfListsRightMoves theorem ofLists_moveLeft {L R : List PGame} (i : Fin L.length) : (ofLists L R).moveLeft (toOfListsLeftMoves i) = L.get i := rfl #align pgame.of_lists_move_left SetTheory.PGame.ofLists_moveLeft @[simp] theorem ofLists_moveLeft' {L R : List PGame} (i : (ofLists L R).LeftMoves) : (ofLists L R).moveLeft i = L.get (toOfListsLeftMoves.symm i) := rfl #align pgame.of_lists_move_left' SetTheory.PGame.ofLists_moveLeft' theorem ofLists_moveRight {L R : List PGame} (i : Fin R.length) : (ofLists L R).moveRight (toOfListsRightMoves i) = R.get i := rfl #align pgame.of_lists_move_right SetTheory.PGame.ofLists_moveRight @[simp] theorem ofLists_moveRight' {L R : List PGame} (i : (ofLists L R).RightMoves) : (ofLists L R).moveRight i = R.get (toOfListsRightMoves.symm i) := rfl #align pgame.of_lists_move_right' SetTheory.PGame.ofLists_moveRight' /-- A variant of `PGame.recOn` expressed in terms of `PGame.moveLeft` and `PGame.moveRight`. Both this and `PGame.recOn` describe Conway induction on games. -/ @[elab_as_elim] def moveRecOn {C : PGame → Sort*} (x : PGame) (IH : ∀ y : PGame, (∀ i, C (y.moveLeft i)) → (∀ j, C (y.moveRight j)) → C y) : C x := x.recOn fun yl yr yL yR => IH (mk yl yr yL yR) #align pgame.move_rec_on SetTheory.PGame.moveRecOn /-- `IsOption x y` means that `x` is either a left or right option for `y`. -/ @[mk_iff] inductive IsOption : PGame → PGame → Prop \| moveLeft {x : PGame} (i : x.LeftMoves) : IsOption (x.moveLeft i) x \| moveRight {x : PGame} (i : x.RightMoves) : IsOption (x.moveRight i) x #align pgame.is_option SetTheory.PGame.IsOption theorem IsOption.mk_left {xl xr : Type u} (xL : xl → PGame) (xR : xr → PGame) (i : xl) : (xL i).IsOption (mk xl xr xL xR) := @IsOption.moveLeft (mk _ _ _ _) i #align pgame.is_option.mk_left SetTheory.PGame.IsOption.mk_left theorem IsOption.mk_right {xl xr : Type u} (xL : xl → PGame) (xR : xr → PGame) (i : xr) : (xR i).IsOption (mk xl xr xL xR) := @IsOption.moveRight (mk _ _ _ _) i #align pgame.is_option.mk_right SetTheory.PGame.IsOption.mk_right theorem wf_isOption : WellFounded IsOption := ⟨fun x => moveRecOn x fun x IHl IHr => Acc.intro x fun y h => by induction' h with _ i _ j · exact IHl i · exact IHr j⟩ #align pgame.wf_is_option SetTheory.PGame.wf_isOption /-- `Subsequent x y` says that `x` can be obtained by playing some nonempty sequence of moves from `y`. It is the transitive closure of `IsOption`. -/ def Subsequent : PGame → PGame → Prop := TransGen IsOption #align pgame.subsequent SetTheory.PGame.Subsequent instance : IsTrans _ Subsequent := inferInstanceAs <\| IsTrans _ (TransGen _) @[trans] theorem Subsequent.trans {x y z} : Subsequent x y → Subsequent y z → Subsequent x z := TransGen.trans #align pgame.subsequent.trans SetTheory.PGame.Subsequent.trans theorem wf_subsequent : WellFounded Subsequent := wf_isOption.transGen #align pgame.wf_subsequent SetTheory.PGame.wf_subsequent instance : WellFoundedRelation PGame := ⟨_, wf_subsequent⟩ @[simp] theorem Subsequent.moveLeft {x : PGame} (i : x.LeftMoves) : Subsequent (x.moveLeft i) x := TransGen.single (IsOption.moveLeft i) #align pgame.subsequent.move_left SetTheory.PGame.Subsequent.moveLeft @[simp] theorem Subsequent.moveRight {x : PGame} (j : x.RightMoves) : Subsequent (x.moveRight j) x := TransGen.single (IsOption.moveRight j) #align pgame.subsequent.move_right SetTheory.PGame.Subsequent.moveRight @[simp] theorem Subsequent.mk_left {xl xr} (xL : xl → PGame) (xR : xr → PGame) (i : xl) : Subsequent (xL i) (mk xl xr xL xR) := @Subsequent.moveLeft (mk _ _ _ _) i #align pgame.subsequent.mk_left SetTheory.PGame.Subsequent.mk_left @[simp] theorem Subsequent.mk_right {xl xr} (xL : xl → PGame) (xR : xr → PGame) (j : xr) : Subsequent (xR j) (mk xl xr xL xR) := @Subsequent.moveRight (mk _ _ _ _) j #align pgame.subsequent.mk_right SetTheory.PGame.Subsequent.mk_right /-- Discharges proof obligations of the form `⊢ Subsequent ..` arising in termination proofs of definitions using well-founded recursion on `PGame`. -/ macro "pgame_wf_tac" : tactic => `(tactic\| solve_by_elim (config := { maxDepth := 8 }) [Prod.Lex.left, Prod.Lex.right, PSigma.Lex.left, PSigma.Lex.right, Subsequent.moveLeft, Subsequent.moveRight, Subsequent.mk_left, Subsequent.mk_right, Subsequent.trans] ) -- Register some consequences of pgame_wf_tac as simp-lemmas for convenience -- (which are applied by default for WF goals) -- This is different from mk_right from the POV of the simplifier, -- because the unifier can't solve `xr =?= RightMoves (mk xl xr xL xR)` at reducible transparency. @[simp] theorem Subsequent.mk_right' (xL : xl → PGame) (xR : xr → PGame) (j : RightMoves (mk xl xr xL xR)) : Subsequent (xR j) (mk xl xr xL xR) := by pgame_wf_tac @[simp] theorem Subsequent.moveRight_mk_left (xL : xl → PGame) (j) : Subsequent ((xL i).moveRight j) (mk xl xr xL xR) := by pgame_wf_tac @[simp] theorem Subsequent.moveRight_mk_right (xR : xr → PGame) (j) : Subsequent ((xR i).moveRight j) (mk xl xr xL xR) := by pgame_wf_tac @[simp] theorem Subsequent.moveLeft_mk_left (xL : xl → PGame) (j) : Subsequent ((xL i).moveLeft j) (mk xl xr xL xR) := by pgame_wf_tac @[simp] theorem Subsequent.moveLeft_mk_right (xR : xr → PGame) (j) : Subsequent ((xR i).moveLeft j) (mk xl xr xL xR) := by pgame_wf_tac -- Porting note: linter claims these lemmas don't simplify? open Subsequent in attribute [nolint simpNF] mk_left mk_right mk_right' moveRight_mk_left moveRight_mk_right moveLeft_mk_left moveLeft_mk_right /-! ### Basic pre-games -/ /-- The pre-game `Zero` is defined by `0 = { \| }`. -/ instance : Zero PGame := ⟨⟨PEmpty, PEmpty, PEmpty.elim, PEmpty.elim⟩⟩ @[simp] theorem zero_leftMoves : LeftMoves 0 = PEmpty := rfl #align pgame.zero_left_moves SetTheory.PGame.zero_leftMoves @[simp] theorem zero_rightMoves : RightMoves 0 = PEmpty := rfl #align pgame.zero_right_moves SetTheory.PGame.zero_rightMoves instance isEmpty_zero_leftMoves : IsEmpty (LeftMoves 0) := instIsEmptyPEmpty #align pgame.is_empty_zero_left_moves SetTheory.PGame.isEmpty_zero_leftMoves instance isEmpty_zero_rightMoves : IsEmpty (RightMoves 0) := instIsEmptyPEmpty #align pgame.is_empty_zero_right_moves SetTheory.PGame.isEmpty_zero_rightMoves instance : Inhabited PGame := ⟨0⟩ /-- The pre-game `One` is defined by `1 = { 0 \| }`. -/ instance instOnePGame : One PGame := ⟨⟨PUnit, PEmpty, fun _ => 0, PEmpty.elim⟩⟩ @[simp] theorem one_leftMoves : LeftMoves 1 = PUnit := rfl #align pgame.one_left_moves SetTheory.PGame.one_leftMoves @[simp] theorem one_moveLeft (x) : moveLeft 1 x = 0 := rfl #align pgame.one_move_left SetTheory.PGame.one_moveLeft @[simp] theorem one_rightMoves : RightMoves 1 = PEmpty := rfl #align pgame.one_right_moves SetTheory.PGame.one_rightMoves instance uniqueOneLeftMoves : Unique (LeftMoves 1) := PUnit.unique #align pgame.unique_one_left_moves SetTheory.PGame.uniqueOneLeftMoves instance isEmpty_one_rightMoves : IsEmpty (RightMoves 1) := instIsEmptyPEmpty #align pgame.is_empty_one_right_moves SetTheory.PGame.isEmpty_one_rightMoves /-! ### Pre-game order relations -/ /-- The less or equal relation on pre-games. If `0 ≤ x`, then Left can win `x` as the second player. -/ instance le : LE PGame := ⟨Sym2.GameAdd.fix wf_isOption fun x y le => (∀ i, ¬le y (x.moveLeft i) (Sym2.GameAdd.snd_fst <\| IsOption.moveLeft i)) ∧ ∀ j, ¬le (y.moveRight j) x (Sym2.GameAdd.fst_snd <\| IsOption.moveRight j)⟩ /-- The less or fuzzy relation on pre-games. If `0 ⧏ x`, then Left can win `x` as the first player. -/ def LF (x y : PGame) : Prop := ¬y ≤ x #align pgame.lf SetTheory.PGame.LF @[inherit_doc] scoped infixl:50 " ⧏ " => PGame.LF @[simp] protected theorem not_le {x y : PGame} : ¬x ≤ y ↔ y ⧏ x := Iff.rfl #align pgame.not_le SetTheory.PGame.not_le @[simp] theorem not_lf {x y : PGame} : ¬x ⧏ y ↔ y ≤ x := Classical.not_not #align pgame.not_lf SetTheory.PGame.not_lf theorem _root_.LE.le.not_gf {x y : PGame} : x ≤ y → ¬y ⧏ x := not_lf.2 #align has_le.le.not_gf LE.le.not_gf theorem LF.not_ge {x y : PGame} : x ⧏ y → ¬y ≤ x := id #align pgame.lf.not_ge SetTheory.PGame.LF.not_ge /-- Definition of `x ≤ y` on pre-games, in terms of `⧏`. The ordering here is chosen so that `And.left` refer to moves by Left, and `And.right` refer to moves by Right. -/ theorem le_iff_forall_lf {x y : PGame} : x ≤ y ↔ (∀ i, x.moveLeft i ⧏ y) ∧ ∀ j, x ⧏ y.moveRight j := by unfold LE.le le simp only rw [Sym2.GameAdd.fix_eq] rfl #align pgame.le_iff_forall_lf SetTheory.PGame.le_iff_forall_lf /-- Definition of `x ≤ y` on pre-games built using the constructor. -/ @[simp] theorem mk_le_mk {xl xr xL xR yl yr yL yR} : mk xl xr xL xR ≤ mk yl yr yL yR ↔ (∀ i, xL i ⧏ mk yl yr yL yR) ∧ ∀ j, mk xl xr xL xR ⧏ yR j := le_iff_forall_lf #align pgame.mk_le_mk SetTheory.PGame.mk_le_mk theorem le_of_forall_lf {x y : PGame} (h₁ : ∀ i, x.moveLeft i ⧏ y) (h₂ : ∀ j, x ⧏ y.moveRight j) : x ≤ y := le_iff_forall_lf.2 ⟨h₁, h₂⟩ #align pgame.le_of_forall_lf SetTheory.PGame.le_of_forall_lf /-- Definition of `x ⧏ y` on pre-games, in terms of `≤`. The ordering here is chosen so that `or.inl` refer to moves by Left, and `or.inr` refer to moves by Right. -/ theorem lf_iff_exists_le {x y : PGame} : x ⧏ y ↔ (∃ i, x ≤ y.moveLeft i) ∨ ∃ j, x.moveRight j ≤ y := by rw [LF, le_iff_forall_lf, not_and_or] simp #align pgame.lf_iff_exists_le SetTheory.PGame.lf_iff_exists_le /-- Definition of `x ⧏ y` on pre-games built using the constructor. -/ @[simp] theorem mk_lf_mk {xl xr xL xR yl yr yL yR} : mk xl xr xL xR ⧏ mk yl yr yL yR ↔ (∃ i, mk xl xr xL xR ≤ yL i) ∨ ∃ j, xR j ≤ mk yl yr yL yR := lf_iff_exists_le #align pgame.mk_lf_mk SetTheory.PGame.mk_lf_mk theorem le_or_gf (x y : PGame) : x ≤ y ∨ y ⧏ x := by rw [← PGame.not_le] apply em #align pgame.le_or_gf SetTheory.PGame.le_or_gf theorem moveLeft_lf_of_le {x y : PGame} (h : x ≤ y) (i) : x.moveLeft i ⧏ y := (le_iff_forall_lf.1 h).1 i #align pgame.move_left_lf_of_le SetTheory.PGame.moveLeft_lf_of_le alias _root_.LE.le.moveLeft_lf := moveLeft_lf_of_le #align has_le.le.move_left_lf LE.le.moveLeft_lf theorem lf_moveRight_of_le {x y : PGame} (h : x ≤ y) (j) : x ⧏ y.moveRight j := (le_iff_forall_lf.1 h).2 j #align pgame.lf_move_right_of_le SetTheory.PGame.lf_moveRight_of_le alias _root_.LE.le.lf_moveRight := lf_moveRight_of_le #align has_le.le.lf_move_right LE.le.lf_moveRight theorem lf_of_moveRight_le {x y : PGame} {j} (h : x.moveRight j ≤ y) : x ⧏ y := lf_iff_exists_le.2 <\| Or.inr ⟨j, h⟩ #align pgame.lf_of_move_right_le SetTheory.PGame.lf_of_moveRight_le theorem lf_of_le_moveLeft {x y : PGame} {i} (h : x ≤ y.moveLeft i) : x ⧏ y := lf_iff_exists_le.2 <\| Or.inl ⟨i, h⟩ #align pgame.lf_of_le_move_left SetTheory.PGame.lf_of_le_moveLeft theorem lf_of_le_mk {xl xr xL xR y} : mk xl xr xL xR ≤ y → ∀ i, xL i ⧏ y := moveLeft_lf_of_le #align pgame.lf_of_le_mk SetTheory.PGame.lf_of_le_mk theorem lf_of_mk_le {x yl yr yL yR} : x ≤ mk yl yr yL yR → ∀ j, x ⧏ yR j := lf_moveRight_of_le #align pgame.lf_of_mk_le SetTheory.PGame.lf_of_mk_le theorem mk_lf_of_le {xl xr y j} (xL) {xR : xr → PGame} : xR j ≤ y → mk xl xr xL xR ⧏ y := @lf_of_moveRight_le (mk _ _ _ _) y j #align pgame.mk_lf_of_le SetTheory.PGame.mk_lf_of_le theorem lf_mk_of_le {x yl yr} {yL : yl → PGame} (yR) {i} : x ≤ yL i → x ⧏ mk yl yr yL yR := @lf_of_le_moveLeft x (mk _ _ _ _) i #align pgame.lf_mk_of_le SetTheory.PGame.lf_mk_of_le /- We prove that `x ≤ y → y ≤ z → x ≤ z` inductively, by also simultaneously proving its cyclic reorderings. This auxiliary lemma is used during said induction. -/ private theorem le_trans_aux {x y z : PGame} (h₁ : ∀ {i}, y ≤ z → z ≤ x.moveLeft i → y ≤ x.moveLeft i) (h₂ : ∀ {j}, z.moveRight j ≤ x → x ≤ y → z.moveRight j ≤ y) (hxy : x ≤ y) (hyz : y ≤ z) : x ≤ z := le_of_forall_lf (fun i => PGame.not_le.1 fun h => (h₁ hyz h).not_gf <\| hxy.moveLeft_lf i) fun j => PGame.not_le.1 fun h => (h₂ h hxy).not_gf <\| hyz.lf_moveRight j instance : Preorder PGame := { PGame.le with le_refl := fun x => by induction' x with _ _ _ _ IHl IHr exact le_of_forall_lf (fun i => lf_of_le_moveLeft (IHl i)) fun i => lf_of_moveRight_le (IHr i) le_trans := by suffices ∀ {x y z : PGame}, (x ≤ y → y ≤ z → x ≤ z) ∧ (y ≤ z → z ≤ x → y ≤ x) ∧ (z ≤ x → x ≤ y → z ≤ y) from fun x y z => this.1 intro x y z induction' x with xl xr xL xR IHxl IHxr generalizing y z induction' y with yl yr yL yR IHyl IHyr generalizing z induction' z with zl zr zL zR IHzl IHzr exact ⟨le_trans_aux (fun {i} => (IHxl i).2.1) fun {j} => (IHzr j).2.2, le_trans_aux (fun {i} => (IHyl i).2.2) fun {j} => (IHxr j).1, le_trans_aux (fun {i} => (IHzl i).1) fun {j} => (IHyr j).2.1⟩ lt := fun x y => x ≤ y ∧ x ⧏ y } theorem lt_iff_le_and_lf {x y : PGame} : x < y ↔ x ≤ y ∧ x ⧏ y := Iff.rfl #align pgame.lt_iff_le_and_lf SetTheory.PGame.lt_iff_le_and_lf theorem lt_of_le_of_lf {x y : PGame} (h₁ : x ≤ y) (h₂ : x ⧏ y) : x < y := ⟨h₁, h₂⟩ #align pgame.lt_of_le_of_lf SetTheory.PGame.lt_of_le_of_lf theorem lf_of_lt {x y : PGame} (h : x < y) : x ⧏ y := h.2 #align pgame.lf_of_lt SetTheory.PGame.lf_of_lt alias _root_.LT.lt.lf := lf_of_lt #align has_lt.lt.lf LT.lt.lf theorem lf_irrefl (x : PGame) : ¬x ⧏ x := le_rfl.not_gf #align pgame.lf_irrefl SetTheory.PGame.lf_irrefl instance : IsIrrefl _ (· ⧏ ·) := ⟨lf_irrefl⟩ @[trans] theorem lf_of_le_of_lf {x y z : PGame} (h₁ : x ≤ y) (h₂ : y ⧏ z) : x ⧏ z := by rw [← PGame.not_le] at h₂ ⊢ exact fun h₃ => h₂ (h₃.trans h₁) #align pgame.lf_of_le_of_lf SetTheory.PGame.lf_of_le_of_lf -- Porting note (#10754): added instance instance : Trans (· ≤ ·) (· ⧏ ·) (· ⧏ ·) := ⟨lf_of_le_of_lf⟩ @[trans] theorem lf_of_lf_of_le {x y z : PGame} (h₁ : x ⧏ y) (h₂ : y ≤ z) : x ⧏ z := by rw [← PGame.not_le] at h₁ ⊢ exact fun h₃ => h₁ (h₂.trans h₃) #align pgame.lf_of_lf_of_le SetTheory.PGame.lf_of_lf_of_le -- Porting note (#10754): added instance instance : Trans (· ⧏ ·) (· ≤ ·) (· ⧏ ·) := ⟨lf_of_lf_of_le⟩ alias _root_.LE.le.trans_lf := lf_of_le_of_lf #align has_le.le.trans_lf LE.le.trans_lf alias LF.trans_le := lf_of_lf_of_le #align pgame.lf.trans_le SetTheory.PGame.LF.trans_le @[trans] theorem lf_of_lt_of_lf {x y z : PGame} (h₁ : x < y) (h₂ : y ⧏ z) : x ⧏ z := h₁.le.trans_lf h₂ #align pgame.lf_of_lt_of_lf SetTheory.PGame.lf_of_lt_of_lf @[trans] theorem lf_of_lf_of_lt {x y z : PGame} (h₁ : x ⧏ y) (h₂ : y < z) : x ⧏ z := h₁.trans_le h₂.le #align pgame.lf_of_lf_of_lt SetTheory.PGame.lf_of_lf_of_lt alias _root_.LT.lt.trans_lf := lf_of_lt_of_lf #align has_lt.lt.trans_lf LT.lt.trans_lf alias LF.trans_lt := lf_of_lf_of_lt #align pgame.lf.trans_lt SetTheory.PGame.LF.trans_lt theorem moveLeft_lf {x : PGame} : ∀ i, x.moveLeft i ⧏ x := le_rfl.moveLeft_lf #align pgame.move_left_lf SetTheory.PGame.moveLeft_lf theorem lf_moveRight {x : PGame} : ∀ j, x ⧏ x.moveRight j := le_rfl.lf_moveRight #align pgame.lf_move_right SetTheory.PGame.lf_moveRight theorem lf_mk {xl xr} (xL : xl → PGame) (xR : xr → PGame) (i) : xL i ⧏ mk xl xr xL xR := @moveLeft_lf (mk _ _ _ _) i #align pgame.lf_mk SetTheory.PGame.lf_mk theorem mk_lf {xl xr} (xL : xl → PGame) (xR : xr → PGame) (j) : mk xl xr xL xR ⧏ xR j := @lf_moveRight (mk _ _ _ _) j #align pgame.mk_lf SetTheory.PGame.mk_lf /-- This special case of `PGame.le_of_forall_lf` is useful when dealing with surreals, where `<` is preferred over `⧏`. -/ theorem le_of_forall_lt {x y : PGame} (h₁ : ∀ i, x.moveLeft i < y) (h₂ : ∀ j, x < y.moveRight j) : x ≤ y := le_of_forall_lf (fun i => (h₁ i).lf) fun i => (h₂ i).lf #align pgame.le_of_forall_lt SetTheory.PGame.le_of_forall_lt /-- The definition of `x ≤ y` on pre-games, in terms of `≤` two moves later. -/ theorem le_def {x y : PGame} : x ≤ y ↔ (∀ i, (∃ i', x.moveLeft i ≤ y.moveLeft i') ∨ ∃ j, (x.moveLeft i).moveRight j ≤ y) ∧ ∀ j, (∃ i, x ≤ (y.moveRight j).moveLeft i) ∨ ∃ j', x.moveRight j' ≤ y.moveRight j := by rw [le_iff_forall_lf] conv => lhs simp only [lf_iff_exists_le] #align pgame.le_def SetTheory.PGame.le_def /-- The definition of `x ⧏ y` on pre-games, in terms of `⧏` two moves later. -/ theorem lf_def {x y : PGame} : x ⧏ y ↔ (∃ i, (∀ i', x.moveLeft i' ⧏ y.moveLeft i) ∧ ∀ j, x ⧏ (y.moveLeft i).moveRight j) ∨ ∃ j, (∀ i, (x.moveRight j).moveLeft i ⧏ y) ∧ ∀ j', x.moveRight j ⧏ y.moveRight j' := by rw [lf_iff_exists_le] conv => lhs simp only [le_iff_forall_lf] #align pgame.lf_def SetTheory.PGame.lf_def /-- The definition of `0 ≤ x` on pre-games, in terms of `0 ⧏`. -/ theorem zero_le_lf {x : PGame} : 0 ≤ x ↔ ∀ j, 0 ⧏ x.moveRight j := by rw [le_iff_forall_lf] simp #align pgame.zero_le_lf SetTheory.PGame.zero_le_lf /-- The definition of `x ≤ 0` on pre-games, in terms of `⧏ 0`. -/ theorem le_zero_lf {x : PGame} : x ≤ 0 ↔ ∀ i, x.moveLeft i ⧏ 0 := by rw [le_iff_forall_lf] simp #align pgame.le_zero_lf SetTheory.PGame.le_zero_lf /-- The definition of `0 ⧏ x` on pre-games, in terms of `0 ≤`. -/ theorem zero_lf_le {x : PGame} : 0 ⧏ x ↔ ∃ i, 0 ≤ x.moveLeft i := by rw [lf_iff_exists_le] simp #align pgame.zero_lf_le SetTheory.PGame.zero_lf_le /-- The definition of `x ⧏ 0` on pre-games, in terms of `≤ 0`. -/ theorem lf_zero_le {x : PGame} : x ⧏ 0 ↔ ∃ j, x.moveRight j ≤ 0 := by rw [lf_iff_exists_le] simp #align pgame.lf_zero_le SetTheory.PGame.lf_zero_le /-- The definition of `0 ≤ x` on pre-games, in terms of `0 ≤` two moves later. -/ theorem zero_le {x : PGame} : 0 ≤ x ↔ ∀ j, ∃ i, 0 ≤ (x.moveRight j).moveLeft i := by rw [le_def] simp #align pgame.zero_le SetTheory.PGame.zero_le /-- The definition of `x ≤ 0` on pre-games, in terms of `≤ 0` two moves later. -/ theorem le_zero {x : PGame} : x ≤ 0 ↔ ∀ i, ∃ j, (x.moveLeft i).moveRight j ≤ 0 := by rw [le_def] simp #align pgame.le_zero SetTheory.PGame.le_zero /-- The definition of `0 ⧏ x` on pre-games, in terms of `0 ⧏` two moves later. -/ theorem zero_lf {x : PGame} : 0 ⧏ x ↔ ∃ i, ∀ j, 0 ⧏ (x.moveLeft i).moveRight j := by rw [lf_def] simp #align pgame.zero_lf SetTheory.PGame.zero_lf /-- The definition of `x ⧏ 0` on pre-games, in terms of `⧏ 0` two moves later. -/ theorem lf_zero {x : PGame} : x ⧏ 0 ↔ ∃ j, ∀ i, (x.moveRight j).moveLeft i ⧏ 0 := by rw [lf_def] simp #align pgame.lf_zero SetTheory.PGame.lf_zero @[simp] theorem zero_le_of_isEmpty_rightMoves (x : PGame) [IsEmpty x.RightMoves] : 0 ≤ x := zero_le.2 isEmptyElim #align pgame.zero_le_of_is_empty_right_moves SetTheory.PGame.zero_le_of_isEmpty_rightMoves @[simp] theorem le_zero_of_isEmpty_leftMoves (x : PGame) [IsEmpty x.LeftMoves] : x ≤ 0 := le_zero.2 isEmptyElim #align pgame.le_zero_of_is_empty_left_moves SetTheory.PGame.le_zero_of_isEmpty_leftMoves /-- Given a game won by the right player when they play second, provide a response to any move by left. -/ noncomputable def rightResponse {x : PGame} (h : x ≤ 0) (i : x.LeftMoves) : (x.moveLeft i).RightMoves := Classical.choose <\| (le_zero.1 h) i #align pgame.right_response SetTheory.PGame.rightResponse /-- Show that the response for right provided by `rightResponse` preserves the right-player-wins condition. -/ theorem rightResponse_spec {x : PGame} (h : x ≤ 0) (i : x.LeftMoves) : (x.moveLeft i).moveRight (rightResponse h i) ≤ 0 := Classical.choose_spec <\| (le_zero.1 h) i #align pgame.right_response_spec SetTheory.PGame.rightResponse_spec /-- Given a game won by the left player when they play second, provide a response to any move by right. -/ noncomputable def leftResponse {x : PGame} (h : 0 ≤ x) (j : x.RightMoves) : (x.moveRight j).LeftMoves := Classical.choose <\| (zero_le.1 h) j #align pgame.left_response SetTheory.PGame.leftResponse /-- Show that the response for left provided by `leftResponse` preserves the left-player-wins condition. -/ theorem leftResponse_spec {x : PGame} (h : 0 ≤ x) (j : x.RightMoves) : 0 ≤ (x.moveRight j).moveLeft (leftResponse h j) := Classical.choose_spec <\| (zero_le.1 h) j #align pgame.left_response_spec SetTheory.PGame.leftResponse_spec #noalign pgame.upper_bound #noalign pgame.upper_bound_right_moves_empty #noalign pgame.le_upper_bound #noalign pgame.upper_bound_mem_upper_bounds /-- A small family of pre-games is bounded above. -/ lemma bddAbove_range_of_small [Small.{u} ι] (f : ι → PGame.{u}) : BddAbove (Set.range f) := by let x : PGame.{u} := ⟨Σ i, (f $ (equivShrink.{u} ι).symm i).LeftMoves, PEmpty, fun x ↦ moveLeft _ x.2, PEmpty.elim⟩ refine ⟨x, Set.forall_mem_range.2 fun i ↦ ?_⟩ rw [← (equivShrink ι).symm_apply_apply i, le_iff_forall_lf] simpa [x] using fun j ↦ @moveLeft_lf x ⟨equivShrink ι i, j⟩ /-- A small set of pre-games is bounded above. -/ lemma bddAbove_of_small (s : Set PGame.{u}) [Small.{u} s] : BddAbove s := by simpa using bddAbove_range_of_small (Subtype.val : s → PGame.{u}) #align pgame.bdd_above_of_small SetTheory.PGame.bddAbove_of_small #noalign pgame.lower_bound #noalign pgame.lower_bound_left_moves_empty #noalign pgame.lower_bound_le #noalign pgame.lower_bound_mem_lower_bounds /-- A small family of pre-games is bounded below. -/ lemma bddBelow_range_of_small [Small.{u} ι] (f : ι → PGame.{u}) : BddBelow (Set.range f) := by let x : PGame.{u} := ⟨PEmpty, Σ i, (f $ (equivShrink.{u} ι).symm i).RightMoves, PEmpty.elim, fun x ↦ moveRight _ x.2⟩ refine ⟨x, Set.forall_mem_range.2 fun i ↦ ?_⟩ rw [← (equivShrink ι).symm_apply_apply i, le_iff_forall_lf] simpa [x] using fun j ↦ @lf_moveRight x ⟨equivShrink ι i, j⟩ /-- A small set of pre-games is bounded below. -/ lemma bddBelow_of_small (s : Set PGame.{u}) [Small.{u} s] : BddBelow s := by simpa using bddBelow_range_of_small (Subtype.val : s → PGame.{u}) #align pgame.bdd_below_of_small SetTheory.PGame.bddBelow_of_small /-- The equivalence relation on pre-games. Two pre-games `x`, `y` are equivalent if `x ≤ y` and `y ≤ x`. If `x ≈ 0`, then the second player can always win `x`. -/ def Equiv (x y : PGame) : Prop := x ≤ y ∧ y ≤ x #align pgame.equiv SetTheory.PGame.Equiv -- Porting note: deleted the scoped notation due to notation overloading with the setoid -- instance and this causes the PGame.equiv docstring to not show up on hover. instance : IsEquiv _ PGame.Equiv where refl _ := ⟨le_rfl, le_rfl⟩ trans := fun _ _ _ ⟨xy, yx⟩ ⟨yz, zy⟩ => ⟨xy.trans yz, zy.trans yx⟩ symm _ _ := And.symm -- Porting note: moved the setoid instance from Basic.lean to here instance setoid : Setoid PGame := ⟨Equiv, refl, symm, Trans.trans⟩ #align pgame.setoid SetTheory.PGame.setoid theorem Equiv.le {x y : PGame} (h : x ≈ y) : x ≤ y := h.1 #align pgame.equiv.le SetTheory.PGame.Equiv.le theorem Equiv.ge {x y : PGame} (h : x ≈ y) : y ≤ x := h.2 #align pgame.equiv.ge SetTheory.PGame.Equiv.ge @[refl, simp] theorem equiv_rfl {x : PGame} : x ≈ x := refl x #align pgame.equiv_rfl SetTheory.PGame.equiv_rfl theorem equiv_refl (x : PGame) : x ≈ x := refl x #align pgame.equiv_refl SetTheory.PGame.equiv_refl @[symm] protected theorem Equiv.symm {x y : PGame} : (x ≈ y) → (y ≈ x) := symm #align pgame.equiv.symm SetTheory.PGame.Equiv.symm @[trans] protected theorem Equiv.trans {x y z : PGame} : (x ≈ y) → (y ≈ z) → (x ≈ z) := _root_.trans #align pgame.equiv.trans SetTheory.PGame.Equiv.trans protected theorem equiv_comm {x y : PGame} : (x ≈ y) ↔ (y ≈ x) := comm #align pgame.equiv_comm SetTheory.PGame.equiv_comm theorem equiv_of_eq {x y : PGame} (h : x = y) : x ≈ y := by subst h; rfl #align pgame.equiv_of_eq SetTheory.PGame.equiv_of_eq @[trans] theorem le_of_le_of_equiv {x y z : PGame} (h₁ : x ≤ y) (h₂ : y ≈ z) : x ≤ z := h₁.trans h₂.1 #align pgame.le_of_le_of_equiv SetTheory.PGame.le_of_le_of_equiv instance : Trans ((· ≤ ·) : PGame → PGame → Prop) ((· ≈ ·) : PGame → PGame → Prop) ((· ≤ ·) : PGame → PGame → Prop) where trans := le_of_le_of_equiv @[trans] theorem le_of_equiv_of_le {x y z : PGame} (h₁ : x ≈ y) : y ≤ z → x ≤ z := h₁.1.trans #align pgame.le_of_equiv_of_le SetTheory.PGame.le_of_equiv_of_le instance : Trans ((· ≈ ·) : PGame → PGame → Prop) ((· ≤ ·) : PGame → PGame → Prop) ((· ≤ ·) : PGame → PGame → Prop) where trans := le_of_equiv_of_le theorem LF.not_equiv {x y : PGame} (h : x ⧏ y) : ¬(x ≈ y) := fun h' => h.not_ge h'.2 #align pgame.lf.not_equiv SetTheory.PGame.LF.not_equiv theorem LF.not_equiv' {x y : PGame} (h : x ⧏ y) : ¬(y ≈ x) := fun h' => h.not_ge h'.1 #align pgame.lf.not_equiv' SetTheory.PGame.LF.not_equiv' theorem LF.not_gt {x y : PGame} (h : x ⧏ y) : ¬y < x := fun h' => h.not_ge h'.le #align pgame.lf.not_gt SetTheory.PGame.LF.not_gt theorem le_congr_imp {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) (h : x₁ ≤ y₁) : x₂ ≤ y₂ := hx.2.trans (h.trans hy.1) #align pgame.le_congr_imp SetTheory.PGame.le_congr_imp theorem le_congr {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) : x₁ ≤ y₁ ↔ x₂ ≤ y₂ := ⟨le_congr_imp hx hy, le_congr_imp (Equiv.symm hx) (Equiv.symm hy)⟩ #align pgame.le_congr SetTheory.PGame.le_congr theorem le_congr_left {x₁ x₂ y : PGame} (hx : x₁ ≈ x₂) : x₁ ≤ y ↔ x₂ ≤ y := le_congr hx equiv_rfl #align pgame.le_congr_left SetTheory.PGame.le_congr_left theorem le_congr_right {x y₁ y₂ : PGame} (hy : y₁ ≈ y₂) : x ≤ y₁ ↔ x ≤ y₂ := le_congr equiv_rfl hy #align pgame.le_congr_right SetTheory.PGame.le_congr_right theorem lf_congr {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) : x₁ ⧏ y₁ ↔ x₂ ⧏ y₂ := PGame.not_le.symm.trans <\| (not_congr (le_congr hy hx)).trans PGame.not_le #align pgame.lf_congr SetTheory.PGame.lf_congr theorem lf_congr_imp {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) : x₁ ⧏ y₁ → x₂ ⧏ y₂ := (lf_congr hx hy).1 #align pgame.lf_congr_imp SetTheory.PGame.lf_congr_imp theorem lf_congr_left {x₁ x₂ y : PGame} (hx : x₁ ≈ x₂) : x₁ ⧏ y ↔ x₂ ⧏ y := lf_congr hx equiv_rfl #align pgame.lf_congr_left SetTheory.PGame.lf_congr_left theorem lf_congr_right {x y₁ y₂ : PGame} (hy : y₁ ≈ y₂) : x ⧏ y₁ ↔ x ⧏ y₂ := lf_congr equiv_rfl hy #align pgame.lf_congr_right SetTheory.PGame.lf_congr_right @[trans] theorem lf_of_lf_of_equiv {x y z : PGame} (h₁ : x ⧏ y) (h₂ : y ≈ z) : x ⧏ z := lf_congr_imp equiv_rfl h₂ h₁ #align pgame.lf_of_lf_of_equiv SetTheory.PGame.lf_of_lf_of_equiv @[trans] theorem lf_of_equiv_of_lf {x y z : PGame} (h₁ : x ≈ y) : y ⧏ z → x ⧏ z := lf_congr_imp (Equiv.symm h₁) equiv_rfl #align pgame.lf_of_equiv_of_lf SetTheory.PGame.lf_of_equiv_of_lf @[trans] theorem lt_of_lt_of_equiv {x y z : PGame} (h₁ : x < y) (h₂ : y ≈ z) : x < z := h₁.trans_le h₂.1 #align pgame.lt_of_lt_of_equiv SetTheory.PGame.lt_of_lt_of_equiv @[trans] theorem lt_of_equiv_of_lt {x y z : PGame} (h₁ : x ≈ y) : y < z → x < z := h₁.1.trans_lt #align pgame.lt_of_equiv_of_lt SetTheory.PGame.lt_of_equiv_of_lt instance : Trans ((· ≈ ·) : PGame → PGame → Prop) ((· < ·) : PGame → PGame → Prop) ((· < ·) : PGame → PGame → Prop) where trans := lt_of_equiv_of_lt theorem lt_congr_imp {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) (h : x₁ < y₁) : x₂ < y₂ := hx.2.trans_lt (h.trans_le hy.1) #align pgame.lt_congr_imp SetTheory.PGame.lt_congr_imp theorem lt_congr {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) : x₁ < y₁ ↔ x₂ < y₂ := ⟨lt_congr_imp hx hy, lt_congr_imp (Equiv.symm hx) (Equiv.symm hy)⟩ #align pgame.lt_congr SetTheory.PGame.lt_congr theorem lt_congr_left {x₁ x₂ y : PGame} (hx : x₁ ≈ x₂) : x₁ < y ↔ x₂ < y := lt_congr hx equiv_rfl #align pgame.lt_congr_left SetTheory.PGame.lt_congr_left theorem lt_congr_right {x y₁ y₂ : PGame} (hy : y₁ ≈ y₂) : x < y₁ ↔ x < y₂ := lt_congr equiv_rfl hy #align pgame.lt_congr_right SetTheory.PGame.lt_congr_right theorem lt_or_equiv_of_le {x y : PGame} (h : x ≤ y) : x < y ∨ (x ≈ y) := and_or_left.mp ⟨h, (em <\| y ≤ x).symm.imp_left PGame.not_le.1⟩ #align pgame.lt_or_equiv_of_le SetTheory.PGame.lt_or_equiv_of_le theorem lf_or_equiv_or_gf (x y : PGame) : x ⧏ y ∨ (x ≈ y) ∨ y ⧏ x := by by_cases h : x ⧏ y · exact Or.inl h · right cases' lt_or_equiv_of_le (PGame.not_lf.1 h) with h' h' · exact Or.inr h'.lf · exact Or.inl (Equiv.symm h') #align pgame.lf_or_equiv_or_gf SetTheory.PGame.lf_or_equiv_or_gf theorem equiv_congr_left {y₁ y₂ : PGame} : (y₁ ≈ y₂) ↔ ∀ x₁, (x₁ ≈ y₁) ↔ (x₁ ≈ y₂) := ⟨fun h _ => ⟨fun h' => Equiv.trans h' h, fun h' => Equiv.trans h' (Equiv.symm h)⟩, fun h => (h y₁).1 <\| equiv_rfl⟩ #align pgame.equiv_congr_left SetTheory.PGame.equiv_congr_left theorem equiv_congr_right {x₁ x₂ : PGame} : (x₁ ≈ x₂) ↔ ∀ y₁, (x₁ ≈ y₁) ↔ (x₂ ≈ y₁) := ⟨fun h _ => ⟨fun h' => Equiv.trans (Equiv.symm h) h', fun h' => Equiv.trans h h'⟩, fun h => (h x₂).2 <\| equiv_rfl⟩ #align pgame.equiv_congr_right SetTheory.PGame.equiv_congr_right theorem equiv_of_mk_equiv {x y : PGame} (L : x.LeftMoves ≃ y.LeftMoves) (R : x.RightMoves ≃ y.RightMoves) (hl : ∀ i, x.moveLeft i ≈ y.moveLeft (L i)) (hr : ∀ j, x.moveRight j ≈ y.moveRight (R j)) : x ≈ y := by constructor <;> rw [le_def] · exact ⟨fun i => Or.inl ⟨_, (hl i).1⟩, fun j => Or.inr ⟨_, by simpa using (hr (R.symm j)).1⟩⟩ · exact ⟨fun i => Or.inl ⟨_, by simpa using (hl (L.symm i)).2⟩, fun j => Or.inr ⟨_, (hr j).2⟩⟩ #align pgame.equiv_of_mk_equiv SetTheory.PGame.equiv_of_mk_equiv /-- The fuzzy, confused, or incomparable relation on pre-games. If `x ‖ 0`, then the first player can always win `x`. -/ def Fuzzy (x y : PGame) : Prop := x ⧏ y ∧ y ⧏ x #align pgame.fuzzy SetTheory.PGame.Fuzzy @[inherit_doc] scoped infixl:50 " ‖ " => PGame.Fuzzy @[symm] theorem Fuzzy.swap {x y : PGame} : x ‖ y → y ‖ x := And.symm #align pgame.fuzzy.swap SetTheory.PGame.Fuzzy.swap instance : IsSymm _ (· ‖ ·) := ⟨fun _ _ => Fuzzy.swap⟩ theorem Fuzzy.swap_iff {x y : PGame} : x ‖ y ↔ y ‖ x := ⟨Fuzzy.swap, Fuzzy.swap⟩ #align pgame.fuzzy.swap_iff SetTheory.PGame.Fuzzy.swap_iff theorem fuzzy_irrefl (x : PGame) : ¬x ‖ x := fun h => lf_irrefl x h.1 #align pgame.fuzzy_irrefl SetTheory.PGame.fuzzy_irrefl instance : IsIrrefl _ (· ‖ ·) := ⟨fuzzy_irrefl⟩ theorem lf_iff_lt_or_fuzzy {x y : PGame} : x ⧏ y ↔ x < y ∨ x ‖ y := by simp only [lt_iff_le_and_lf, Fuzzy, ← PGame.not_le] tauto #align pgame.lf_iff_lt_or_fuzzy SetTheory.PGame.lf_iff_lt_or_fuzzy theorem lf_of_fuzzy {x y : PGame} (h : x ‖ y) : x ⧏ y := lf_iff_lt_or_fuzzy.2 (Or.inr h) #align pgame.lf_of_fuzzy SetTheory.PGame.lf_of_fuzzy alias Fuzzy.lf := lf_of_fuzzy #align pgame.fuzzy.lf SetTheory.PGame.Fuzzy.lf theorem lt_or_fuzzy_of_lf {x y : PGame} : x ⧏ y → x < y ∨ x ‖ y := lf_iff_lt_or_fuzzy.1 #align pgame.lt_or_fuzzy_of_lf SetTheory.PGame.lt_or_fuzzy_of_lf theorem Fuzzy.not_equiv {x y : PGame} (h : x ‖ y) : ¬(x ≈ y) := fun h' => h'.1.not_gf h.2 #align pgame.fuzzy.not_equiv SetTheory.PGame.Fuzzy.not_equiv theorem Fuzzy.not_equiv' {x y : PGame} (h : x ‖ y) : ¬(y ≈ x) := fun h' => h'.2.not_gf h.2 #align pgame.fuzzy.not_equiv' SetTheory.PGame.Fuzzy.not_equiv' theorem not_fuzzy_of_le {x y : PGame} (h : x ≤ y) : ¬x ‖ y := fun h' => h'.2.not_ge h #align pgame.not_fuzzy_of_le SetTheory.PGame.not_fuzzy_of_le theorem not_fuzzy_of_ge {x y : PGame} (h : y ≤ x) : ¬x ‖ y := fun h' => h'.1.not_ge h #align pgame.not_fuzzy_of_ge SetTheory.PGame.not_fuzzy_of_ge theorem Equiv.not_fuzzy {x y : PGame} (h : x ≈ y) : ¬x ‖ y := not_fuzzy_of_le h.1 #align pgame.equiv.not_fuzzy SetTheory.PGame.Equiv.not_fuzzy theorem Equiv.not_fuzzy' {x y : PGame} (h : x ≈ y) : ¬y ‖ x := not_fuzzy_of_le h.2 #align pgame.equiv.not_fuzzy' SetTheory.PGame.Equiv.not_fuzzy' theorem fuzzy_congr {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) : x₁ ‖ y₁ ↔ x₂ ‖ y₂ := show _ ∧ _ ↔ _ ∧ _ by rw [lf_congr hx hy, lf_congr hy hx] #align pgame.fuzzy_congr SetTheory.PGame.fuzzy_congr theorem fuzzy_congr_imp {x₁ y₁ x₂ y₂ : PGame} (hx : x₁ ≈ x₂) (hy : y₁ ≈ y₂) : x₁ ‖ y₁ → x₂ ‖ y₂ := (fuzzy_congr hx hy).1 #align pgame.fuzzy_congr_imp SetTheory.PGame.fuzzy_congr_imp theorem fuzzy_congr_left {x₁ x₂ y : PGame} (hx : x₁ ≈ x₂) : x₁ ‖ y ↔ x₂ ‖ y := fuzzy_congr hx equiv_rfl #align pgame.fuzzy_congr_left SetTheory.PGame.fuzzy_congr_left theorem fuzzy_congr_right {x y₁ y₂ : PGame} (hy : y₁ ≈ y₂) : x ‖ y₁ ↔ x ‖ y₂ := fuzzy_congr equiv_rfl hy #align pgame.fuzzy_congr_right SetTheory.PGame.fuzzy_congr_right @[trans] theorem fuzzy_of_fuzzy_of_equiv {x y z : PGame} (h₁ : x ‖ y) (h₂ : y ≈ z) : x ‖ z := (fuzzy_congr_right h₂).1 h₁ #align pgame.fuzzy_of_fuzzy_of_equiv SetTheory.PGame.fuzzy_of_fuzzy_of_equiv @[trans] theorem fuzzy_of_equiv_of_fuzzy {x y z : PGame} (h₁ : x ≈ y) (h₂ : y ‖ z) : x ‖ z := (fuzzy_congr_left h₁).2 h₂ #align pgame.fuzzy_of_equiv_of_fuzzy SetTheory.PGame.fuzzy_of_equiv_of_fuzzy /-- Exactly one of the following is true (although we don't prove this here). -/	Mathlib/SetTheory/Game/PGame.lean	1,051	1,065	theorem lt_or_equiv_or_gt_or_fuzzy (x y : PGame) : x < y ∨ (x ≈ y) ∨ y < x ∨ x ‖ y := by	cases' le_or_gf x y with h₁ h₁ <;> cases' le_or_gf y x with h₂ h₂ · right left exact ⟨h₁, h₂⟩ · left exact ⟨h₁, h₂⟩ · right right left exact ⟨h₂, h₁⟩ · right right right exact ⟨h₂, h₁⟩
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov, Sébastien Gouëzel, Heather Macbeth -/ import Mathlib.Analysis.Convex.Slope import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.Tactic.LinearCombination #align_import analysis.convex.specific_functions.basic from "leanprover-community/mathlib"@"8f9fea08977f7e450770933ee6abb20733b47c92" /-! # Collection of convex functions In this file we prove that the following functions are convex or strictly convex: * `strictConvexOn_exp` : The exponential function is strictly convex. * `strictConcaveOn_log_Ioi`, `strictConcaveOn_log_Iio`: `Real.log` is strictly concave on $(0, +∞)$ and $(-∞, 0)$ respectively. * `convexOn_rpow`, `strictConvexOn_rpow` : For `p : ℝ`, `fun x ↦ x ^ p` is convex on $[0, +∞)$ when `1 ≤ p` and strictly convex when `1 < p`. The proofs in this file are deliberately elementary, not by appealing to the sign of the second derivative. This is in order to keep this file early in the import hierarchy, since it is on the path to Hölder's and Minkowski's inequalities and after that to Lp spaces and most of measure theory. (Strict) concavity of `fun x ↦ x ^ p` for `0 < p < 1` (`0 ≤ p ≤ 1`) can be found in `Analysis.Convex.SpecificFunctions.Pow`. ## See also `Analysis.Convex.Mul` for convexity of `x ↦ x ^ n` -/ open Real Set NNReal /-- `Real.exp` is strictly convex on the whole real line. -/ theorem strictConvexOn_exp : StrictConvexOn ℝ univ exp := by apply strictConvexOn_of_slope_strict_mono_adjacent convex_univ rintro x y z - - hxy hyz trans exp y · have h1 : 0 < y - x := by linarith have h2 : x - y < 0 := by linarith rw [div_lt_iff h1] calc exp y - exp x = exp y - exp y * exp (x - y) := by rw [← exp_add]; ring_nf _ = exp y * (1 - exp (x - y)) := by ring _ < exp y * -(x - y) := by gcongr; linarith [add_one_lt_exp h2.ne] _ = exp y * (y - x) := by ring · have h1 : 0 < z - y := by linarith rw [lt_div_iff h1] calc exp y * (z - y) < exp y * (exp (z - y) - 1) := by gcongr _ * ?_ linarith [add_one_lt_exp h1.ne'] _ = exp (z - y) * exp y - exp y := by ring _ ≤ exp z - exp y := by rw [← exp_add]; ring_nf; rfl #align strict_convex_on_exp strictConvexOn_exp /-- `Real.exp` is convex on the whole real line. -/ theorem convexOn_exp : ConvexOn ℝ univ exp := strictConvexOn_exp.convexOn #align convex_on_exp convexOn_exp /-- `Real.log` is strictly concave on `(0, +∞)`. -/ theorem strictConcaveOn_log_Ioi : StrictConcaveOn ℝ (Ioi 0) log := by apply strictConcaveOn_of_slope_strict_anti_adjacent (convex_Ioi (0 : ℝ)) intro x y z (hx : 0 < x) (hz : 0 < z) hxy hyz have hy : 0 < y := hx.trans hxy trans y⁻¹ · have h : 0 < z - y := by linarith rw [div_lt_iff h] have hyz' : 0 < z / y := by positivity have hyz'' : z / y ≠ 1 := by contrapose! h rw [div_eq_one_iff_eq hy.ne'] at h simp [h] calc log z - log y = log (z / y) := by rw [← log_div hz.ne' hy.ne'] _ < z / y - 1 := log_lt_sub_one_of_pos hyz' hyz'' _ = y⁻¹ * (z - y) := by field_simp · have h : 0 < y - x := by linarith rw [lt_div_iff h] have hxy' : 0 < x / y := by positivity have hxy'' : x / y ≠ 1 := by contrapose! h rw [div_eq_one_iff_eq hy.ne'] at h simp [h] calc y⁻¹ * (y - x) = 1 - x / y := by field_simp _ < -log (x / y) := by linarith [log_lt_sub_one_of_pos hxy' hxy''] _ = -(log x - log y) := by rw [log_div hx.ne' hy.ne'] _ = log y - log x := by ring #align strict_concave_on_log_Ioi strictConcaveOn_log_Ioi /-- Bernoulli's inequality for real exponents, strict version: for `1 < p` and `-1 ≤ s`, with `s ≠ 0`, we have `1 + p * s < (1 + s) ^ p`. -/ theorem one_add_mul_self_lt_rpow_one_add {s : ℝ} (hs : -1 ≤ s) (hs' : s ≠ 0) {p : ℝ} (hp : 1 < p) : 1 + p * s < (1 + s) ^ p := by have hp' : 0 < p := zero_lt_one.trans hp rcases eq_or_lt_of_le hs with rfl \| hs · rwa [add_right_neg, zero_rpow hp'.ne', mul_neg_one, add_neg_lt_iff_lt_add, zero_add] have hs1 : 0 < 1 + s := neg_lt_iff_pos_add'.mp hs rcases le_or_lt (1 + p * s) 0 with hs2 \| hs2 · exact hs2.trans_lt (rpow_pos_of_pos hs1 _) have hs3 : 1 + s ≠ 1 := hs' ∘ add_right_eq_self.mp have hs4 : 1 + p * s ≠ 1 := by contrapose! hs'; rwa [add_right_eq_self, mul_eq_zero, eq_false_intro hp'.ne', false_or] at hs' rw [rpow_def_of_pos hs1, ← exp_log hs2] apply exp_strictMono cases' lt_or_gt_of_ne hs' with hs' hs' · rw [← div_lt_iff hp', ← div_lt_div_right_of_neg hs'] convert strictConcaveOn_log_Ioi.secant_strict_mono (zero_lt_one' ℝ) hs2 hs1 hs4 hs3 _ using 1 · rw [add_sub_cancel_left, log_one, sub_zero] · rw [add_sub_cancel_left, div_div, log_one, sub_zero] · apply add_lt_add_left (mul_lt_of_one_lt_left hs' hp) · rw [← div_lt_iff hp', ← div_lt_div_right hs'] convert strictConcaveOn_log_Ioi.secant_strict_mono (zero_lt_one' ℝ) hs1 hs2 hs3 hs4 _ using 1 · rw [add_sub_cancel_left, div_div, log_one, sub_zero] · rw [add_sub_cancel_left, log_one, sub_zero] · apply add_lt_add_left (lt_mul_of_one_lt_left hs' hp) #align one_add_mul_self_lt_rpow_one_add one_add_mul_self_lt_rpow_one_add /-- Bernoulli's inequality for real exponents, non-strict version: for `1 ≤ p` and `-1 ≤ s` we have `1 + p * s ≤ (1 + s) ^ p`. -/ theorem one_add_mul_self_le_rpow_one_add {s : ℝ} (hs : -1 ≤ s) {p : ℝ} (hp : 1 ≤ p) : 1 + p * s ≤ (1 + s) ^ p := by rcases eq_or_lt_of_le hp with (rfl \| hp) · simp by_cases hs' : s = 0 · simp [hs'] exact (one_add_mul_self_lt_rpow_one_add hs hs' hp).le #align one_add_mul_self_le_rpow_one_add one_add_mul_self_le_rpow_one_add /-- Bernoulli's inequality for real exponents, strict version: for `0 < p < 1` and `-1 ≤ s`, with `s ≠ 0`, we have `(1 + s) ^ p < 1 + p * s`. -/ theorem rpow_one_add_lt_one_add_mul_self {s : ℝ} (hs : -1 ≤ s) (hs' : s ≠ 0) {p : ℝ} (hp1 : 0 < p) (hp2 : p < 1) : (1 + s) ^ p < 1 + p * s := by rcases eq_or_lt_of_le hs with rfl \| hs · rwa [add_right_neg, zero_rpow hp1.ne', mul_neg_one, lt_add_neg_iff_add_lt, zero_add] have hs1 : 0 < 1 + s := neg_lt_iff_pos_add'.mp hs have hs2 : 0 < 1 + p * s := by rw [← neg_lt_iff_pos_add'] rcases lt_or_gt_of_ne hs' with h \| h · exact hs.trans (lt_mul_of_lt_one_left h hp2) · exact neg_one_lt_zero.trans (mul_pos hp1 h) have hs3 : 1 + s ≠ 1 := hs' ∘ add_right_eq_self.mp have hs4 : 1 + p * s ≠ 1 := by contrapose! hs'; rwa [add_right_eq_self, mul_eq_zero, eq_false_intro hp1.ne', false_or] at hs' rw [rpow_def_of_pos hs1, ← exp_log hs2] apply exp_strictMono cases' lt_or_gt_of_ne hs' with hs' hs' · rw [← lt_div_iff hp1, ← div_lt_div_right_of_neg hs'] convert strictConcaveOn_log_Ioi.secant_strict_mono (zero_lt_one' ℝ) hs1 hs2 hs3 hs4 _ using 1 · rw [add_sub_cancel_left, div_div, log_one, sub_zero] · rw [add_sub_cancel_left, log_one, sub_zero] · apply add_lt_add_left (lt_mul_of_lt_one_left hs' hp2) · rw [← lt_div_iff hp1, ← div_lt_div_right hs'] convert strictConcaveOn_log_Ioi.secant_strict_mono (zero_lt_one' ℝ) hs2 hs1 hs4 hs3 _ using 1 · rw [add_sub_cancel_left, log_one, sub_zero] · rw [add_sub_cancel_left, div_div, log_one, sub_zero] · apply add_lt_add_left (mul_lt_of_lt_one_left hs' hp2) /-- Bernoulli's inequality for real exponents, non-strict version: for `0 ≤ p ≤ 1` and `-1 ≤ s` we have `(1 + s) ^ p ≤ 1 + p * s`. -/ theorem rpow_one_add_le_one_add_mul_self {s : ℝ} (hs : -1 ≤ s) {p : ℝ} (hp1 : 0 ≤ p) (hp2 : p ≤ 1) : (1 + s) ^ p ≤ 1 + p * s := by rcases eq_or_lt_of_le hp1 with (rfl \| hp1) · simp rcases eq_or_lt_of_le hp2 with (rfl \| hp2) · simp by_cases hs' : s = 0 · simp [hs'] exact (rpow_one_add_lt_one_add_mul_self hs hs' hp1 hp2).le /-- For `p : ℝ` with `1 < p`, `fun x ↦ x ^ p` is strictly convex on $[0, +∞)$. -/ theorem strictConvexOn_rpow {p : ℝ} (hp : 1 < p) : StrictConvexOn ℝ (Ici 0) fun x : ℝ ↦ x ^ p := by apply strictConvexOn_of_slope_strict_mono_adjacent (convex_Ici (0 : ℝ)) intro x y z (hx : 0 ≤ x) (hz : 0 ≤ z) hxy hyz have hy : 0 < y := hx.trans_lt hxy have hy' : 0 < y ^ p := rpow_pos_of_pos hy _ trans p * y ^ (p - 1) · have q : 0 < y - x := by rwa [sub_pos] rw [div_lt_iff q, ← div_lt_div_right hy', _root_.sub_div, div_self hy'.ne', ← div_rpow hx hy.le, sub_lt_comm, ← add_sub_cancel_right (x / y) 1, add_comm, add_sub_assoc, ← div_mul_eq_mul_div, mul_div_assoc, ← rpow_sub hy, sub_sub_cancel_left, rpow_neg_one, mul_assoc, ← div_eq_inv_mul, sub_eq_add_neg, ← mul_neg, ← neg_div, neg_sub, _root_.sub_div, div_self hy.ne'] apply one_add_mul_self_lt_rpow_one_add _ _ hp · rw [le_sub_iff_add_le, add_left_neg, div_nonneg_iff] exact Or.inl ⟨hx, hy.le⟩ · rw [sub_ne_zero] exact ((div_lt_one hy).mpr hxy).ne · have q : 0 < z - y := by rwa [sub_pos] rw [lt_div_iff q, ← div_lt_div_right hy', _root_.sub_div, div_self hy'.ne', ← div_rpow hz hy.le, lt_sub_iff_add_lt', ← add_sub_cancel_right (z / y) 1, add_comm _ 1, add_sub_assoc, ← div_mul_eq_mul_div, mul_div_assoc, ← rpow_sub hy, sub_sub_cancel_left, rpow_neg_one, mul_assoc, ← div_eq_inv_mul, _root_.sub_div, div_self hy.ne'] apply one_add_mul_self_lt_rpow_one_add _ _ hp · rw [le_sub_iff_add_le, add_left_neg, div_nonneg_iff] exact Or.inl ⟨hz, hy.le⟩ · rw [sub_ne_zero] exact ((one_lt_div hy).mpr hyz).ne' #align strict_convex_on_rpow strictConvexOn_rpow theorem convexOn_rpow {p : ℝ} (hp : 1 ≤ p) : ConvexOn ℝ (Ici 0) fun x : ℝ ↦ x ^ p := by rcases eq_or_lt_of_le hp with (rfl \| hp) · simpa using convexOn_id (convex_Ici _) exact (strictConvexOn_rpow hp).convexOn #align convex_on_rpow convexOn_rpow	Mathlib/Analysis/Convex/SpecificFunctions/Basic.lean	212	222	theorem strictConcaveOn_log_Iio : StrictConcaveOn ℝ (Iio 0) log := by	refine ⟨convex_Iio _, ?_⟩ intro x (hx : x < 0) y (hy : y < 0) hxy a b ha hb hab have hx' : 0 < -x := by linarith have hy' : 0 < -y := by linarith have hxy' : -x ≠ -y := by contrapose! hxy; linarith calc a • log x + b • log y = a • log (-x) + b • log (-y) := by simp_rw [log_neg_eq_log] _ < log (a • -x + b • -y) := strictConcaveOn_log_Ioi.2 hx' hy' hxy' ha hb hab _ = log (-(a • x + b • y)) := by congr 1; simp only [Algebra.id.smul_eq_mul]; ring _ = _ := by rw [log_neg_eq_log]
/- Copyright (c) 2015 Nathaniel Thomas. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Nathaniel Thomas, Jeremy Avigad, Johannes Hölzl, Mario Carneiro -/ import Mathlib.Algebra.Group.Hom.End import Mathlib.Algebra.Ring.Invertible import Mathlib.Algebra.SMulWithZero import Mathlib.Data.Int.Cast.Lemmas import Mathlib.GroupTheory.GroupAction.Units #align_import algebra.module.basic from "leanprover-community/mathlib"@"30413fc89f202a090a54d78e540963ed3de0056e" /-! # Modules over a ring In this file we define * `Module R M` : an additive commutative monoid `M` is a `Module` over a `Semiring R` if for `r : R` and `x : M` their "scalar multiplication" `r • x : M` is defined, and the operation `•` satisfies some natural associativity and distributivity axioms similar to those on a ring. ## Implementation notes In typical mathematical usage, our definition of `Module` corresponds to "semimodule", and the word "module" is reserved for `Module R M` where `R` is a `Ring` and `M` an `AddCommGroup`. If `R` is a `Field` and `M` an `AddCommGroup`, `M` would be called an `R`-vector space. Since those assumptions can be made by changing the typeclasses applied to `R` and `M`, without changing the axioms in `Module`, mathlib calls everything a `Module`. In older versions of mathlib3, we had separate abbreviations for semimodules and vector spaces. This caused inference issues in some cases, while not providing any real advantages, so we decided to use a canonical `Module` typeclass throughout. ## Tags semimodule, module, vector space -/ assert_not_exists Multiset assert_not_exists Set.indicator assert_not_exists Pi.single_smul₀ open Function Set universe u v variable {α R k S M M₂ M₃ ι : Type} /-- A module is a generalization of vector spaces to a scalar semiring. It consists of a scalar semiring `R` and an additive monoid of "vectors" `M`, connected by a "scalar multiplication" operation `r • x : M` (where `r : R` and `x : M`) with some natural associativity and distributivity axioms similar to those on a ring. -/ @[ext] class Module (R : Type u) (M : Type v) [Semiring R] [AddCommMonoid M] extends DistribMulAction R M where /-- Scalar multiplication distributes over addition from the right. -/ protected add_smul : ∀ (r s : R) (x : M), (r + s) • x = r • x + s • x /-- Scalar multiplication by zero gives zero. -/ protected zero_smul : ∀ x : M, (0 : R) • x = 0 #align module Module #align module.ext Module.ext #align module.ext_iff Module.ext_iff section AddCommMonoid variable [Semiring R] [AddCommMonoid M] [Module R M] (r s : R) (x y : M) -- see Note [lower instance priority] /-- A module over a semiring automatically inherits a `MulActionWithZero` structure. -/ instance (priority := 100) Module.toMulActionWithZero : MulActionWithZero R M := { (inferInstance : MulAction R M) with smul_zero := smul_zero zero_smul := Module.zero_smul } #align module.to_mul_action_with_zero Module.toMulActionWithZero instance AddCommMonoid.natModule : Module ℕ M where one_smul := one_nsmul mul_smul m n a := mul_nsmul' a m n smul_add n a b := nsmul_add a b n smul_zero := nsmul_zero zero_smul := zero_nsmul add_smul r s x := add_nsmul x r s #align add_comm_monoid.nat_module AddCommMonoid.natModule theorem AddMonoid.End.natCast_def (n : ℕ) : (↑n : AddMonoid.End M) = DistribMulAction.toAddMonoidEnd ℕ M n := rfl #align add_monoid.End.nat_cast_def AddMonoid.End.natCast_def theorem add_smul : (r + s) • x = r • x + s • x := Module.add_smul r s x #align add_smul add_smul theorem Convex.combo_self {a b : R} (h : a + b = 1) (x : M) : a • x + b • x = x := by rw [← add_smul, h, one_smul] #align convex.combo_self Convex.combo_self variable (R) -- Porting note: this is the letter of the mathlib3 version, but not really the spirit theorem two_smul : (2 : R) • x = x + x := by rw [← one_add_one_eq_two, add_smul, one_smul] #align two_smul two_smul set_option linter.deprecated false in @[deprecated] theorem two_smul' : (2 : R) • x = bit0 x := two_smul R x #align two_smul' two_smul' @[simp] theorem invOf_two_smul_add_invOf_two_smul [Invertible (2 : R)] (x : M) : (⅟ 2 : R) • x + (⅟ 2 : R) • x = x := Convex.combo_self invOf_two_add_invOf_two _ #align inv_of_two_smul_add_inv_of_two_smul invOf_two_smul_add_invOf_two_smul /-- Pullback a `Module` structure along an injective additive monoid homomorphism. See note [reducible non-instances]. -/ protected abbrev Function.Injective.module [AddCommMonoid M₂] [SMul R M₂] (f : M₂ →+ M) (hf : Injective f) (smul : ∀ (c : R) (x), f (c • x) = c • f x) : Module R M₂ := { hf.distribMulAction f smul with add_smul := fun c₁ c₂ x => hf <\| by simp only [smul, f.map_add, add_smul] zero_smul := fun x => hf <\| by simp only [smul, zero_smul, f.map_zero] } #align function.injective.module Function.Injective.module /-- Pushforward a `Module` structure along a surjective additive monoid homomorphism. See note [reducible non-instances]. -/ protected abbrev Function.Surjective.module [AddCommMonoid M₂] [SMul R M₂] (f : M →+ M₂) (hf : Surjective f) (smul : ∀ (c : R) (x), f (c • x) = c • f x) : Module R M₂ := { toDistribMulAction := hf.distribMulAction f smul add_smul := fun c₁ c₂ x => by rcases hf x with ⟨x, rfl⟩ simp only [add_smul, ← smul, ← f.map_add] zero_smul := fun x => by rcases hf x with ⟨x, rfl⟩ rw [← f.map_zero, ← smul, zero_smul] } #align function.surjective.module Function.Surjective.module /-- Push forward the action of `R` on `M` along a compatible surjective map `f : R →+ S`. See also `Function.Surjective.mulActionLeft` and `Function.Surjective.distribMulActionLeft`. -/ abbrev Function.Surjective.moduleLeft {R S M : Type} [Semiring R] [AddCommMonoid M] [Module R M] [Semiring S] [SMul S M] (f : R →+ S) (hf : Function.Surjective f) (hsmul : ∀ (c) (x : M), f c • x = c • x) : Module S M := { hf.distribMulActionLeft f.toMonoidHom hsmul with zero_smul := fun x => by rw [← f.map_zero, hsmul, zero_smul] add_smul := hf.forall₂.mpr fun a b x => by simp only [← f.map_add, hsmul, add_smul] } #align function.surjective.module_left Function.Surjective.moduleLeft variable {R} (M) /-- Compose a `Module` with a `RingHom`, with action `f s • m`. See note [reducible non-instances]. -/ abbrev Module.compHom [Semiring S] (f : S →+* R) : Module S M := { MulActionWithZero.compHom M f.toMonoidWithZeroHom, DistribMulAction.compHom M (f : S →* R) with -- Porting note: the `show f (r + s) • x = f r • x + f s • x` wasn't needed in mathlib3. -- Somehow, now that `SMul` is heterogeneous, it can't unfold earlier fields of a definition for -- use in later fields. See -- https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/Heterogeneous.20scalar.20multiplication add_smul := fun r s x => show f (r + s) • x = f r • x + f s • x by simp [add_smul] } #align module.comp_hom Module.compHom variable (R) /-- `(•)` as an `AddMonoidHom`. This is a stronger version of `DistribMulAction.toAddMonoidEnd` -/ @[simps! apply_apply] def Module.toAddMonoidEnd : R →+* AddMonoid.End M := { DistribMulAction.toAddMonoidEnd R M with -- Porting note: the two `show`s weren't needed in mathlib3. -- Somehow, now that `SMul` is heterogeneous, it can't unfold earlier fields of a definition for -- use in later fields. See -- https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/Heterogeneous.20scalar.20multiplication map_zero' := AddMonoidHom.ext fun r => show (0:R) • r = 0 by simp map_add' := fun x y => AddMonoidHom.ext fun r => show (x + y) • r = x • r + y • r by simp [add_smul] } #align module.to_add_monoid_End Module.toAddMonoidEnd #align module.to_add_monoid_End_apply_apply Module.toAddMonoidEnd_apply_apply /-- A convenience alias for `Module.toAddMonoidEnd` as an `AddMonoidHom`, usually to allow the use of `AddMonoidHom.flip`. -/ def smulAddHom : R →+ M →+ M := (Module.toAddMonoidEnd R M).toAddMonoidHom #align smul_add_hom smulAddHom variable {R M} @[simp] theorem smulAddHom_apply (r : R) (x : M) : smulAddHom R M r x = r • x := rfl #align smul_add_hom_apply smulAddHom_apply theorem Module.eq_zero_of_zero_eq_one (zero_eq_one : (0 : R) = 1) : x = 0 := by rw [← one_smul R x, ← zero_eq_one, zero_smul] #align module.eq_zero_of_zero_eq_one Module.eq_zero_of_zero_eq_one @[simp]	Mathlib/Algebra/Module/Defs.lean	203	204	theorem smul_add_one_sub_smul {R : Type*} [Ring R] [Module R M] {r : R} {m : M} : r • m + (1 - r) • m = m := by	rw [← add_smul, add_sub_cancel, one_smul]
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Abhimanyu Pallavi Sudhir -/ import Mathlib.Algebra.Order.CauSeq.BigOperators import Mathlib.Data.Complex.Abs import Mathlib.Data.Complex.BigOperators import Mathlib.Data.Nat.Choose.Sum #align_import data.complex.exponential from "leanprover-community/mathlib"@"a8b2226cfb0a79f5986492053fc49b1a0c6aeffb" /-! # Exponential, trigonometric and hyperbolic trigonometric functions This file contains the definitions of the real and complex exponential, sine, cosine, tangent, hyperbolic sine, hyperbolic cosine, and hyperbolic tangent functions. -/ open CauSeq Finset IsAbsoluteValue open scoped Classical ComplexConjugate namespace Complex theorem isCauSeq_abs_exp (z : ℂ) : IsCauSeq _root_.abs fun n => ∑ m ∈ range n, abs (z ^ m / m.factorial) := let ⟨n, hn⟩ := exists_nat_gt (abs z) have hn0 : (0 : ℝ) < n := lt_of_le_of_lt (abs.nonneg _) hn IsCauSeq.series_ratio_test n (abs z / n) (div_nonneg (abs.nonneg _) (le_of_lt hn0)) (by rwa [div_lt_iff hn0, one_mul]) fun m hm => by rw [abs_abs, abs_abs, Nat.factorial_succ, pow_succ', mul_comm m.succ, Nat.cast_mul, ← div_div, mul_div_assoc, mul_div_right_comm, map_mul, map_div₀, abs_natCast] gcongr exact le_trans hm (Nat.le_succ _) #align complex.is_cau_abs_exp Complex.isCauSeq_abs_exp noncomputable section theorem isCauSeq_exp (z : ℂ) : IsCauSeq abs fun n => ∑ m ∈ range n, z ^ m / m.factorial := (isCauSeq_abs_exp z).of_abv #align complex.is_cau_exp Complex.isCauSeq_exp /-- The Cauchy sequence consisting of partial sums of the Taylor series of the complex exponential function -/ -- Porting note (#11180): removed `@[pp_nodot]` def exp' (z : ℂ) : CauSeq ℂ Complex.abs := ⟨fun n => ∑ m ∈ range n, z ^ m / m.factorial, isCauSeq_exp z⟩ #align complex.exp' Complex.exp' /-- The complex exponential function, defined via its Taylor series -/ -- Porting note (#11180): removed `@[pp_nodot]` -- Porting note: removed `irreducible` attribute, so I can prove things def exp (z : ℂ) : ℂ := CauSeq.lim (exp' z) #align complex.exp Complex.exp /-- The complex sine function, defined via `exp` -/ -- Porting note (#11180): removed `@[pp_nodot]` def sin (z : ℂ) : ℂ := (exp (-z * I) - exp (z * I)) * I / 2 #align complex.sin Complex.sin /-- The complex cosine function, defined via `exp` -/ -- Porting note (#11180): removed `@[pp_nodot]` def cos (z : ℂ) : ℂ := (exp (z * I) + exp (-z * I)) / 2 #align complex.cos Complex.cos /-- The complex tangent function, defined as `sin z / cos z` -/ -- Porting note (#11180): removed `@[pp_nodot]` def tan (z : ℂ) : ℂ := sin z / cos z #align complex.tan Complex.tan /-- The complex cotangent function, defined as `cos z / sin z` -/ def cot (z : ℂ) : ℂ := cos z / sin z /-- The complex hyperbolic sine function, defined via `exp` -/ -- Porting note (#11180): removed `@[pp_nodot]` def sinh (z : ℂ) : ℂ := (exp z - exp (-z)) / 2 #align complex.sinh Complex.sinh /-- The complex hyperbolic cosine function, defined via `exp` -/ -- Porting note (#11180): removed `@[pp_nodot]` def cosh (z : ℂ) : ℂ := (exp z + exp (-z)) / 2 #align complex.cosh Complex.cosh /-- The complex hyperbolic tangent function, defined as `sinh z / cosh z` -/ -- Porting note (#11180): removed `@[pp_nodot]` def tanh (z : ℂ) : ℂ := sinh z / cosh z #align complex.tanh Complex.tanh /-- scoped notation for the complex exponential function -/ scoped notation "cexp" => Complex.exp end end Complex namespace Real open Complex noncomputable section /-- The real exponential function, defined as the real part of the complex exponential -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def exp (x : ℝ) : ℝ := (exp x).re #align real.exp Real.exp /-- The real sine function, defined as the real part of the complex sine -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def sin (x : ℝ) : ℝ := (sin x).re #align real.sin Real.sin /-- The real cosine function, defined as the real part of the complex cosine -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def cos (x : ℝ) : ℝ := (cos x).re #align real.cos Real.cos /-- The real tangent function, defined as the real part of the complex tangent -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def tan (x : ℝ) : ℝ := (tan x).re #align real.tan Real.tan /-- The real cotangent function, defined as the real part of the complex cotangent -/ nonrec def cot (x : ℝ) : ℝ := (cot x).re /-- The real hypebolic sine function, defined as the real part of the complex hyperbolic sine -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def sinh (x : ℝ) : ℝ := (sinh x).re #align real.sinh Real.sinh /-- The real hypebolic cosine function, defined as the real part of the complex hyperbolic cosine -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def cosh (x : ℝ) : ℝ := (cosh x).re #align real.cosh Real.cosh /-- The real hypebolic tangent function, defined as the real part of the complex hyperbolic tangent -/ -- Porting note (#11180): removed `@[pp_nodot]` nonrec def tanh (x : ℝ) : ℝ := (tanh x).re #align real.tanh Real.tanh /-- scoped notation for the real exponential function -/ scoped notation "rexp" => Real.exp end end Real namespace Complex variable (x y : ℂ) @[simp] theorem exp_zero : exp 0 = 1 := by rw [exp] refine lim_eq_of_equiv_const fun ε ε0 => ⟨1, fun j hj => ?_⟩ convert (config := .unfoldSameFun) ε0 -- Porting note: ε0 : ε > 0 but goal is _ < ε cases' j with j j · exact absurd hj (not_le_of_gt zero_lt_one) · dsimp [exp'] induction' j with j ih · dsimp [exp']; simp [show Nat.succ 0 = 1 from rfl] · rw [← ih (by simp [Nat.succ_le_succ])] simp only [sum_range_succ, pow_succ] simp #align complex.exp_zero Complex.exp_zero theorem exp_add : exp (x + y) = exp x * exp y := by have hj : ∀ j : ℕ, (∑ m ∈ range j, (x + y) ^ m / m.factorial) = ∑ i ∈ range j, ∑ k ∈ range (i + 1), x ^ k / k.factorial * (y ^ (i - k) / (i - k).factorial) := by intro j refine Finset.sum_congr rfl fun m _ => ?_ rw [add_pow, div_eq_mul_inv, sum_mul] refine Finset.sum_congr rfl fun I hi => ?_ have h₁ : (m.choose I : ℂ) ≠ 0 := Nat.cast_ne_zero.2 (pos_iff_ne_zero.1 (Nat.choose_pos (Nat.le_of_lt_succ (mem_range.1 hi)))) have h₂ := Nat.choose_mul_factorial_mul_factorial (Nat.le_of_lt_succ <\| Finset.mem_range.1 hi) rw [← h₂, Nat.cast_mul, Nat.cast_mul, mul_inv, mul_inv] simp only [mul_left_comm (m.choose I : ℂ), mul_assoc, mul_left_comm (m.choose I : ℂ)⁻¹, mul_comm (m.choose I : ℂ)] rw [inv_mul_cancel h₁] simp [div_eq_mul_inv, mul_comm, mul_assoc, mul_left_comm] simp_rw [exp, exp', lim_mul_lim] apply (lim_eq_lim_of_equiv _).symm simp only [hj] exact cauchy_product (isCauSeq_abs_exp x) (isCauSeq_exp y) #align complex.exp_add Complex.exp_add -- Porting note (#11445): new definition /-- the exponential function as a monoid hom from `Multiplicative ℂ` to `ℂ` -/ noncomputable def expMonoidHom : MonoidHom (Multiplicative ℂ) ℂ := { toFun := fun z => exp (Multiplicative.toAdd z), map_one' := by simp, map_mul' := by simp [exp_add] } theorem exp_list_sum (l : List ℂ) : exp l.sum = (l.map exp).prod := map_list_prod (M := Multiplicative ℂ) expMonoidHom l #align complex.exp_list_sum Complex.exp_list_sum theorem exp_multiset_sum (s : Multiset ℂ) : exp s.sum = (s.map exp).prod := @MonoidHom.map_multiset_prod (Multiplicative ℂ) ℂ _ _ expMonoidHom s #align complex.exp_multiset_sum Complex.exp_multiset_sum theorem exp_sum {α : Type} (s : Finset α) (f : α → ℂ) : exp (∑ x ∈ s, f x) = ∏ x ∈ s, exp (f x) := map_prod (β := Multiplicative ℂ) expMonoidHom f s #align complex.exp_sum Complex.exp_sum lemma exp_nsmul (x : ℂ) (n : ℕ) : exp (n • x) = exp x ^ n := @MonoidHom.map_pow (Multiplicative ℂ) ℂ _ _ expMonoidHom _ _ theorem exp_nat_mul (x : ℂ) : ∀ n : ℕ, exp (n x) = exp x ^ n \| 0 => by rw [Nat.cast_zero, zero_mul, exp_zero, pow_zero] \| Nat.succ n => by rw [pow_succ, Nat.cast_add_one, add_mul, exp_add, ← exp_nat_mul _ n, one_mul] #align complex.exp_nat_mul Complex.exp_nat_mul theorem exp_ne_zero : exp x ≠ 0 := fun h => zero_ne_one <\| by rw [← exp_zero, ← add_neg_self x, exp_add, h]; simp #align complex.exp_ne_zero Complex.exp_ne_zero theorem exp_neg : exp (-x) = (exp x)⁻¹ := by rw [← mul_right_inj' (exp_ne_zero x), ← exp_add]; simp [mul_inv_cancel (exp_ne_zero x)] #align complex.exp_neg Complex.exp_neg theorem exp_sub : exp (x - y) = exp x / exp y := by simp [sub_eq_add_neg, exp_add, exp_neg, div_eq_mul_inv] #align complex.exp_sub Complex.exp_sub theorem exp_int_mul (z : ℂ) (n : ℤ) : Complex.exp (n * z) = Complex.exp z ^ n := by cases n · simp [exp_nat_mul] · simp [exp_add, add_mul, pow_add, exp_neg, exp_nat_mul] #align complex.exp_int_mul Complex.exp_int_mul @[simp] theorem exp_conj : exp (conj x) = conj (exp x) := by dsimp [exp] rw [← lim_conj] refine congr_arg CauSeq.lim (CauSeq.ext fun _ => ?_) dsimp [exp', Function.comp_def, cauSeqConj] rw [map_sum (starRingEnd _)] refine sum_congr rfl fun n _ => ?_ rw [map_div₀, map_pow, ← ofReal_natCast, conj_ofReal] #align complex.exp_conj Complex.exp_conj @[simp] theorem ofReal_exp_ofReal_re (x : ℝ) : ((exp x).re : ℂ) = exp x := conj_eq_iff_re.1 <\| by rw [← exp_conj, conj_ofReal] #align complex.of_real_exp_of_real_re Complex.ofReal_exp_ofReal_re @[simp, norm_cast] theorem ofReal_exp (x : ℝ) : (Real.exp x : ℂ) = exp x := ofReal_exp_ofReal_re _ #align complex.of_real_exp Complex.ofReal_exp @[simp] theorem exp_ofReal_im (x : ℝ) : (exp x).im = 0 := by rw [← ofReal_exp_ofReal_re, ofReal_im] #align complex.exp_of_real_im Complex.exp_ofReal_im theorem exp_ofReal_re (x : ℝ) : (exp x).re = Real.exp x := rfl #align complex.exp_of_real_re Complex.exp_ofReal_re theorem two_sinh : 2 * sinh x = exp x - exp (-x) := mul_div_cancel₀ _ two_ne_zero #align complex.two_sinh Complex.two_sinh theorem two_cosh : 2 * cosh x = exp x + exp (-x) := mul_div_cancel₀ _ two_ne_zero #align complex.two_cosh Complex.two_cosh @[simp] theorem sinh_zero : sinh 0 = 0 := by simp [sinh] #align complex.sinh_zero Complex.sinh_zero @[simp] theorem sinh_neg : sinh (-x) = -sinh x := by simp [sinh, exp_neg, (neg_div _ _).symm, add_mul] #align complex.sinh_neg Complex.sinh_neg private theorem sinh_add_aux {a b c d : ℂ} : (a - b) * (c + d) + (a + b) * (c - d) = 2 * (a * c - b * d) := by ring theorem sinh_add : sinh (x + y) = sinh x * cosh y + cosh x * sinh y := by rw [← mul_right_inj' (two_ne_zero' ℂ), two_sinh, exp_add, neg_add, exp_add, eq_comm, mul_add, ← mul_assoc, two_sinh, mul_left_comm, two_sinh, ← mul_right_inj' (two_ne_zero' ℂ), mul_add, mul_left_comm, two_cosh, ← mul_assoc, two_cosh] exact sinh_add_aux #align complex.sinh_add Complex.sinh_add @[simp] theorem cosh_zero : cosh 0 = 1 := by simp [cosh] #align complex.cosh_zero Complex.cosh_zero @[simp] theorem cosh_neg : cosh (-x) = cosh x := by simp [add_comm, cosh, exp_neg] #align complex.cosh_neg Complex.cosh_neg private theorem cosh_add_aux {a b c d : ℂ} : (a + b) * (c + d) + (a - b) * (c - d) = 2 * (a * c + b * d) := by ring theorem cosh_add : cosh (x + y) = cosh x * cosh y + sinh x * sinh y := by rw [← mul_right_inj' (two_ne_zero' ℂ), two_cosh, exp_add, neg_add, exp_add, eq_comm, mul_add, ← mul_assoc, two_cosh, ← mul_assoc, two_sinh, ← mul_right_inj' (two_ne_zero' ℂ), mul_add, mul_left_comm, two_cosh, mul_left_comm, two_sinh] exact cosh_add_aux #align complex.cosh_add Complex.cosh_add theorem sinh_sub : sinh (x - y) = sinh x * cosh y - cosh x * sinh y := by simp [sub_eq_add_neg, sinh_add, sinh_neg, cosh_neg] #align complex.sinh_sub Complex.sinh_sub theorem cosh_sub : cosh (x - y) = cosh x * cosh y - sinh x * sinh y := by simp [sub_eq_add_neg, cosh_add, sinh_neg, cosh_neg] #align complex.cosh_sub Complex.cosh_sub theorem sinh_conj : sinh (conj x) = conj (sinh x) := by rw [sinh, ← RingHom.map_neg, exp_conj, exp_conj, ← RingHom.map_sub, sinh, map_div₀] -- Porting note: not nice simp [← one_add_one_eq_two] #align complex.sinh_conj Complex.sinh_conj @[simp] theorem ofReal_sinh_ofReal_re (x : ℝ) : ((sinh x).re : ℂ) = sinh x := conj_eq_iff_re.1 <\| by rw [← sinh_conj, conj_ofReal] #align complex.of_real_sinh_of_real_re Complex.ofReal_sinh_ofReal_re @[simp, norm_cast] theorem ofReal_sinh (x : ℝ) : (Real.sinh x : ℂ) = sinh x := ofReal_sinh_ofReal_re _ #align complex.of_real_sinh Complex.ofReal_sinh @[simp] theorem sinh_ofReal_im (x : ℝ) : (sinh x).im = 0 := by rw [← ofReal_sinh_ofReal_re, ofReal_im] #align complex.sinh_of_real_im Complex.sinh_ofReal_im theorem sinh_ofReal_re (x : ℝ) : (sinh x).re = Real.sinh x := rfl #align complex.sinh_of_real_re Complex.sinh_ofReal_re theorem cosh_conj : cosh (conj x) = conj (cosh x) := by rw [cosh, ← RingHom.map_neg, exp_conj, exp_conj, ← RingHom.map_add, cosh, map_div₀] -- Porting note: not nice simp [← one_add_one_eq_two] #align complex.cosh_conj Complex.cosh_conj theorem ofReal_cosh_ofReal_re (x : ℝ) : ((cosh x).re : ℂ) = cosh x := conj_eq_iff_re.1 <\| by rw [← cosh_conj, conj_ofReal] #align complex.of_real_cosh_of_real_re Complex.ofReal_cosh_ofReal_re @[simp, norm_cast] theorem ofReal_cosh (x : ℝ) : (Real.cosh x : ℂ) = cosh x := ofReal_cosh_ofReal_re _ #align complex.of_real_cosh Complex.ofReal_cosh @[simp] theorem cosh_ofReal_im (x : ℝ) : (cosh x).im = 0 := by rw [← ofReal_cosh_ofReal_re, ofReal_im] #align complex.cosh_of_real_im Complex.cosh_ofReal_im @[simp] theorem cosh_ofReal_re (x : ℝ) : (cosh x).re = Real.cosh x := rfl #align complex.cosh_of_real_re Complex.cosh_ofReal_re theorem tanh_eq_sinh_div_cosh : tanh x = sinh x / cosh x := rfl #align complex.tanh_eq_sinh_div_cosh Complex.tanh_eq_sinh_div_cosh @[simp] theorem tanh_zero : tanh 0 = 0 := by simp [tanh] #align complex.tanh_zero Complex.tanh_zero @[simp] theorem tanh_neg : tanh (-x) = -tanh x := by simp [tanh, neg_div] #align complex.tanh_neg Complex.tanh_neg theorem tanh_conj : tanh (conj x) = conj (tanh x) := by rw [tanh, sinh_conj, cosh_conj, ← map_div₀, tanh] #align complex.tanh_conj Complex.tanh_conj @[simp] theorem ofReal_tanh_ofReal_re (x : ℝ) : ((tanh x).re : ℂ) = tanh x := conj_eq_iff_re.1 <\| by rw [← tanh_conj, conj_ofReal] #align complex.of_real_tanh_of_real_re Complex.ofReal_tanh_ofReal_re @[simp, norm_cast] theorem ofReal_tanh (x : ℝ) : (Real.tanh x : ℂ) = tanh x := ofReal_tanh_ofReal_re _ #align complex.of_real_tanh Complex.ofReal_tanh @[simp] theorem tanh_ofReal_im (x : ℝ) : (tanh x).im = 0 := by rw [← ofReal_tanh_ofReal_re, ofReal_im] #align complex.tanh_of_real_im Complex.tanh_ofReal_im theorem tanh_ofReal_re (x : ℝ) : (tanh x).re = Real.tanh x := rfl #align complex.tanh_of_real_re Complex.tanh_ofReal_re @[simp] theorem cosh_add_sinh : cosh x + sinh x = exp x := by rw [← mul_right_inj' (two_ne_zero' ℂ), mul_add, two_cosh, two_sinh, add_add_sub_cancel, two_mul] #align complex.cosh_add_sinh Complex.cosh_add_sinh @[simp] theorem sinh_add_cosh : sinh x + cosh x = exp x := by rw [add_comm, cosh_add_sinh] #align complex.sinh_add_cosh Complex.sinh_add_cosh @[simp] theorem exp_sub_cosh : exp x - cosh x = sinh x := sub_eq_iff_eq_add.2 (sinh_add_cosh x).symm #align complex.exp_sub_cosh Complex.exp_sub_cosh @[simp] theorem exp_sub_sinh : exp x - sinh x = cosh x := sub_eq_iff_eq_add.2 (cosh_add_sinh x).symm #align complex.exp_sub_sinh Complex.exp_sub_sinh @[simp] theorem cosh_sub_sinh : cosh x - sinh x = exp (-x) := by rw [← mul_right_inj' (two_ne_zero' ℂ), mul_sub, two_cosh, two_sinh, add_sub_sub_cancel, two_mul] #align complex.cosh_sub_sinh Complex.cosh_sub_sinh @[simp] theorem sinh_sub_cosh : sinh x - cosh x = -exp (-x) := by rw [← neg_sub, cosh_sub_sinh] #align complex.sinh_sub_cosh Complex.sinh_sub_cosh @[simp] theorem cosh_sq_sub_sinh_sq : cosh x ^ 2 - sinh x ^ 2 = 1 := by rw [sq_sub_sq, cosh_add_sinh, cosh_sub_sinh, ← exp_add, add_neg_self, exp_zero] #align complex.cosh_sq_sub_sinh_sq Complex.cosh_sq_sub_sinh_sq theorem cosh_sq : cosh x ^ 2 = sinh x ^ 2 + 1 := by rw [← cosh_sq_sub_sinh_sq x] ring #align complex.cosh_sq Complex.cosh_sq theorem sinh_sq : sinh x ^ 2 = cosh x ^ 2 - 1 := by rw [← cosh_sq_sub_sinh_sq x] ring #align complex.sinh_sq Complex.sinh_sq theorem cosh_two_mul : cosh (2 * x) = cosh x ^ 2 + sinh x ^ 2 := by rw [two_mul, cosh_add, sq, sq] #align complex.cosh_two_mul Complex.cosh_two_mul theorem sinh_two_mul : sinh (2 * x) = 2 * sinh x * cosh x := by rw [two_mul, sinh_add] ring #align complex.sinh_two_mul Complex.sinh_two_mul theorem cosh_three_mul : cosh (3 * x) = 4 * cosh x ^ 3 - 3 * cosh x := by have h1 : x + 2 * x = 3 * x := by ring rw [← h1, cosh_add x (2 * x)] simp only [cosh_two_mul, sinh_two_mul] have h2 : sinh x * (2 * sinh x * cosh x) = 2 * cosh x * sinh x ^ 2 := by ring rw [h2, sinh_sq] ring #align complex.cosh_three_mul Complex.cosh_three_mul theorem sinh_three_mul : sinh (3 * x) = 4 * sinh x ^ 3 + 3 * sinh x := by have h1 : x + 2 * x = 3 * x := by ring rw [← h1, sinh_add x (2 * x)] simp only [cosh_two_mul, sinh_two_mul] have h2 : cosh x * (2 * sinh x * cosh x) = 2 * sinh x * cosh x ^ 2 := by ring rw [h2, cosh_sq] ring #align complex.sinh_three_mul Complex.sinh_three_mul @[simp] theorem sin_zero : sin 0 = 0 := by simp [sin] #align complex.sin_zero Complex.sin_zero @[simp] theorem sin_neg : sin (-x) = -sin x := by simp [sin, sub_eq_add_neg, exp_neg, (neg_div _ _).symm, add_mul] #align complex.sin_neg Complex.sin_neg theorem two_sin : 2 * sin x = (exp (-x * I) - exp (x * I)) * I := mul_div_cancel₀ _ two_ne_zero #align complex.two_sin Complex.two_sin theorem two_cos : 2 * cos x = exp (x * I) + exp (-x * I) := mul_div_cancel₀ _ two_ne_zero #align complex.two_cos Complex.two_cos theorem sinh_mul_I : sinh (x * I) = sin x * I := by rw [← mul_right_inj' (two_ne_zero' ℂ), two_sinh, ← mul_assoc, two_sin, mul_assoc, I_mul_I, mul_neg_one, neg_sub, neg_mul_eq_neg_mul] set_option linter.uppercaseLean3 false in #align complex.sinh_mul_I Complex.sinh_mul_I theorem cosh_mul_I : cosh (x * I) = cos x := by rw [← mul_right_inj' (two_ne_zero' ℂ), two_cosh, two_cos, neg_mul_eq_neg_mul] set_option linter.uppercaseLean3 false in #align complex.cosh_mul_I Complex.cosh_mul_I theorem tanh_mul_I : tanh (x * I) = tan x * I := by rw [tanh_eq_sinh_div_cosh, cosh_mul_I, sinh_mul_I, mul_div_right_comm, tan] set_option linter.uppercaseLean3 false in #align complex.tanh_mul_I Complex.tanh_mul_I theorem cos_mul_I : cos (x * I) = cosh x := by rw [← cosh_mul_I]; ring_nf; simp set_option linter.uppercaseLean3 false in #align complex.cos_mul_I Complex.cos_mul_I theorem sin_mul_I : sin (x * I) = sinh x * I := by have h : I * sin (x * I) = -sinh x := by rw [mul_comm, ← sinh_mul_I] ring_nf simp rw [← neg_neg (sinh x), ← h] apply Complex.ext <;> simp set_option linter.uppercaseLean3 false in #align complex.sin_mul_I Complex.sin_mul_I theorem tan_mul_I : tan (x * I) = tanh x * I := by rw [tan, sin_mul_I, cos_mul_I, mul_div_right_comm, tanh_eq_sinh_div_cosh] set_option linter.uppercaseLean3 false in #align complex.tan_mul_I Complex.tan_mul_I theorem sin_add : sin (x + y) = sin x * cos y + cos x * sin y := by rw [← mul_left_inj' I_ne_zero, ← sinh_mul_I, add_mul, add_mul, mul_right_comm, ← sinh_mul_I, mul_assoc, ← sinh_mul_I, ← cosh_mul_I, ← cosh_mul_I, sinh_add] #align complex.sin_add Complex.sin_add @[simp] theorem cos_zero : cos 0 = 1 := by simp [cos] #align complex.cos_zero Complex.cos_zero @[simp] theorem cos_neg : cos (-x) = cos x := by simp [cos, sub_eq_add_neg, exp_neg, add_comm] #align complex.cos_neg Complex.cos_neg private theorem cos_add_aux {a b c d : ℂ} : (a + b) * (c + d) - (b - a) * (d - c) * -1 = 2 * (a * c + b * d) := by ring theorem cos_add : cos (x + y) = cos x * cos y - sin x * sin y := by rw [← cosh_mul_I, add_mul, cosh_add, cosh_mul_I, cosh_mul_I, sinh_mul_I, sinh_mul_I, mul_mul_mul_comm, I_mul_I, mul_neg_one, sub_eq_add_neg] #align complex.cos_add Complex.cos_add theorem sin_sub : sin (x - y) = sin x * cos y - cos x * sin y := by simp [sub_eq_add_neg, sin_add, sin_neg, cos_neg] #align complex.sin_sub Complex.sin_sub theorem cos_sub : cos (x - y) = cos x * cos y + sin x * sin y := by simp [sub_eq_add_neg, cos_add, sin_neg, cos_neg] #align complex.cos_sub Complex.cos_sub theorem sin_add_mul_I (x y : ℂ) : sin (x + y * I) = sin x * cosh y + cos x * sinh y * I := by rw [sin_add, cos_mul_I, sin_mul_I, mul_assoc] set_option linter.uppercaseLean3 false in #align complex.sin_add_mul_I Complex.sin_add_mul_I theorem sin_eq (z : ℂ) : sin z = sin z.re * cosh z.im + cos z.re * sinh z.im * I := by convert sin_add_mul_I z.re z.im; exact (re_add_im z).symm #align complex.sin_eq Complex.sin_eq theorem cos_add_mul_I (x y : ℂ) : cos (x + y * I) = cos x * cosh y - sin x * sinh y * I := by rw [cos_add, cos_mul_I, sin_mul_I, mul_assoc] set_option linter.uppercaseLean3 false in #align complex.cos_add_mul_I Complex.cos_add_mul_I theorem cos_eq (z : ℂ) : cos z = cos z.re * cosh z.im - sin z.re * sinh z.im * I := by convert cos_add_mul_I z.re z.im; exact (re_add_im z).symm #align complex.cos_eq Complex.cos_eq theorem sin_sub_sin : sin x - sin y = 2 * sin ((x - y) / 2) * cos ((x + y) / 2) := by have s1 := sin_add ((x + y) / 2) ((x - y) / 2) have s2 := sin_sub ((x + y) / 2) ((x - y) / 2) rw [div_add_div_same, add_sub, add_right_comm, add_sub_cancel_right, half_add_self] at s1 rw [div_sub_div_same, ← sub_add, add_sub_cancel_left, half_add_self] at s2 rw [s1, s2] ring #align complex.sin_sub_sin Complex.sin_sub_sin theorem cos_sub_cos : cos x - cos y = -2 * sin ((x + y) / 2) * sin ((x - y) / 2) := by have s1 := cos_add ((x + y) / 2) ((x - y) / 2) have s2 := cos_sub ((x + y) / 2) ((x - y) / 2) rw [div_add_div_same, add_sub, add_right_comm, add_sub_cancel_right, half_add_self] at s1 rw [div_sub_div_same, ← sub_add, add_sub_cancel_left, half_add_self] at s2 rw [s1, s2] ring #align complex.cos_sub_cos Complex.cos_sub_cos theorem sin_add_sin : sin x + sin y = 2 * sin ((x + y) / 2) * cos ((x - y) / 2) := by simpa using sin_sub_sin x (-y) theorem cos_add_cos : cos x + cos y = 2 * cos ((x + y) / 2) * cos ((x - y) / 2) := by calc cos x + cos y = cos ((x + y) / 2 + (x - y) / 2) + cos ((x + y) / 2 - (x - y) / 2) := ?_ _ = cos ((x + y) / 2) * cos ((x - y) / 2) - sin ((x + y) / 2) * sin ((x - y) / 2) + (cos ((x + y) / 2) * cos ((x - y) / 2) + sin ((x + y) / 2) * sin ((x - y) / 2)) := ?_ _ = 2 * cos ((x + y) / 2) * cos ((x - y) / 2) := ?_ · congr <;> field_simp · rw [cos_add, cos_sub] ring #align complex.cos_add_cos Complex.cos_add_cos theorem sin_conj : sin (conj x) = conj (sin x) := by rw [← mul_left_inj' I_ne_zero, ← sinh_mul_I, ← conj_neg_I, ← RingHom.map_mul, ← RingHom.map_mul, sinh_conj, mul_neg, sinh_neg, sinh_mul_I, mul_neg] #align complex.sin_conj Complex.sin_conj @[simp] theorem ofReal_sin_ofReal_re (x : ℝ) : ((sin x).re : ℂ) = sin x := conj_eq_iff_re.1 <\| by rw [← sin_conj, conj_ofReal] #align complex.of_real_sin_of_real_re Complex.ofReal_sin_ofReal_re @[simp, norm_cast] theorem ofReal_sin (x : ℝ) : (Real.sin x : ℂ) = sin x := ofReal_sin_ofReal_re _ #align complex.of_real_sin Complex.ofReal_sin @[simp] theorem sin_ofReal_im (x : ℝ) : (sin x).im = 0 := by rw [← ofReal_sin_ofReal_re, ofReal_im] #align complex.sin_of_real_im Complex.sin_ofReal_im theorem sin_ofReal_re (x : ℝ) : (sin x).re = Real.sin x := rfl #align complex.sin_of_real_re Complex.sin_ofReal_re theorem cos_conj : cos (conj x) = conj (cos x) := by rw [← cosh_mul_I, ← conj_neg_I, ← RingHom.map_mul, ← cosh_mul_I, cosh_conj, mul_neg, cosh_neg] #align complex.cos_conj Complex.cos_conj @[simp] theorem ofReal_cos_ofReal_re (x : ℝ) : ((cos x).re : ℂ) = cos x := conj_eq_iff_re.1 <\| by rw [← cos_conj, conj_ofReal] #align complex.of_real_cos_of_real_re Complex.ofReal_cos_ofReal_re @[simp, norm_cast] theorem ofReal_cos (x : ℝ) : (Real.cos x : ℂ) = cos x := ofReal_cos_ofReal_re _ #align complex.of_real_cos Complex.ofReal_cos @[simp] theorem cos_ofReal_im (x : ℝ) : (cos x).im = 0 := by rw [← ofReal_cos_ofReal_re, ofReal_im] #align complex.cos_of_real_im Complex.cos_ofReal_im theorem cos_ofReal_re (x : ℝ) : (cos x).re = Real.cos x := rfl #align complex.cos_of_real_re Complex.cos_ofReal_re @[simp] theorem tan_zero : tan 0 = 0 := by simp [tan] #align complex.tan_zero Complex.tan_zero theorem tan_eq_sin_div_cos : tan x = sin x / cos x := rfl #align complex.tan_eq_sin_div_cos Complex.tan_eq_sin_div_cos theorem tan_mul_cos {x : ℂ} (hx : cos x ≠ 0) : tan x * cos x = sin x := by rw [tan_eq_sin_div_cos, div_mul_cancel₀ _ hx] #align complex.tan_mul_cos Complex.tan_mul_cos @[simp] theorem tan_neg : tan (-x) = -tan x := by simp [tan, neg_div] #align complex.tan_neg Complex.tan_neg theorem tan_conj : tan (conj x) = conj (tan x) := by rw [tan, sin_conj, cos_conj, ← map_div₀, tan] #align complex.tan_conj Complex.tan_conj @[simp] theorem ofReal_tan_ofReal_re (x : ℝ) : ((tan x).re : ℂ) = tan x := conj_eq_iff_re.1 <\| by rw [← tan_conj, conj_ofReal] #align complex.of_real_tan_of_real_re Complex.ofReal_tan_ofReal_re @[simp, norm_cast] theorem ofReal_tan (x : ℝ) : (Real.tan x : ℂ) = tan x := ofReal_tan_ofReal_re _ #align complex.of_real_tan Complex.ofReal_tan @[simp] theorem tan_ofReal_im (x : ℝ) : (tan x).im = 0 := by rw [← ofReal_tan_ofReal_re, ofReal_im] #align complex.tan_of_real_im Complex.tan_ofReal_im theorem tan_ofReal_re (x : ℝ) : (tan x).re = Real.tan x := rfl #align complex.tan_of_real_re Complex.tan_ofReal_re theorem cos_add_sin_I : cos x + sin x * I = exp (x * I) := by rw [← cosh_add_sinh, sinh_mul_I, cosh_mul_I] set_option linter.uppercaseLean3 false in #align complex.cos_add_sin_I Complex.cos_add_sin_I theorem cos_sub_sin_I : cos x - sin x * I = exp (-x * I) := by rw [neg_mul, ← cosh_sub_sinh, sinh_mul_I, cosh_mul_I] set_option linter.uppercaseLean3 false in #align complex.cos_sub_sin_I Complex.cos_sub_sin_I @[simp] theorem sin_sq_add_cos_sq : sin x ^ 2 + cos x ^ 2 = 1 := Eq.trans (by rw [cosh_mul_I, sinh_mul_I, mul_pow, I_sq, mul_neg_one, sub_neg_eq_add, add_comm]) (cosh_sq_sub_sinh_sq (x * I)) #align complex.sin_sq_add_cos_sq Complex.sin_sq_add_cos_sq @[simp] theorem cos_sq_add_sin_sq : cos x ^ 2 + sin x ^ 2 = 1 := by rw [add_comm, sin_sq_add_cos_sq] #align complex.cos_sq_add_sin_sq Complex.cos_sq_add_sin_sq theorem cos_two_mul' : cos (2 * x) = cos x ^ 2 - sin x ^ 2 := by rw [two_mul, cos_add, ← sq, ← sq] #align complex.cos_two_mul' Complex.cos_two_mul' theorem cos_two_mul : cos (2 * x) = 2 * cos x ^ 2 - 1 := by rw [cos_two_mul', eq_sub_iff_add_eq.2 (sin_sq_add_cos_sq x), ← sub_add, sub_add_eq_add_sub, two_mul] #align complex.cos_two_mul Complex.cos_two_mul theorem sin_two_mul : sin (2 * x) = 2 * sin x * cos x := by rw [two_mul, sin_add, two_mul, add_mul, mul_comm] #align complex.sin_two_mul Complex.sin_two_mul theorem cos_sq : cos x ^ 2 = 1 / 2 + cos (2 * x) / 2 := by simp [cos_two_mul, div_add_div_same, mul_div_cancel_left₀, two_ne_zero, -one_div] #align complex.cos_sq Complex.cos_sq theorem cos_sq' : cos x ^ 2 = 1 - sin x ^ 2 := by rw [← sin_sq_add_cos_sq x, add_sub_cancel_left] #align complex.cos_sq' Complex.cos_sq' theorem sin_sq : sin x ^ 2 = 1 - cos x ^ 2 := by rw [← sin_sq_add_cos_sq x, add_sub_cancel_right] #align complex.sin_sq Complex.sin_sq theorem inv_one_add_tan_sq {x : ℂ} (hx : cos x ≠ 0) : (1 + tan x ^ 2)⁻¹ = cos x ^ 2 := by rw [tan_eq_sin_div_cos, div_pow] field_simp #align complex.inv_one_add_tan_sq Complex.inv_one_add_tan_sq theorem tan_sq_div_one_add_tan_sq {x : ℂ} (hx : cos x ≠ 0) : tan x ^ 2 / (1 + tan x ^ 2) = sin x ^ 2 := by simp only [← tan_mul_cos hx, mul_pow, ← inv_one_add_tan_sq hx, div_eq_mul_inv, one_mul] #align complex.tan_sq_div_one_add_tan_sq Complex.tan_sq_div_one_add_tan_sq theorem cos_three_mul : cos (3 * x) = 4 * cos x ^ 3 - 3 * cos x := by have h1 : x + 2 * x = 3 * x := by ring rw [← h1, cos_add x (2 * x)] simp only [cos_two_mul, sin_two_mul, mul_add, mul_sub, mul_one, sq] have h2 : 4 * cos x ^ 3 = 2 * cos x * cos x * cos x + 2 * cos x * cos x ^ 2 := by ring rw [h2, cos_sq'] ring #align complex.cos_three_mul Complex.cos_three_mul theorem sin_three_mul : sin (3 * x) = 3 * sin x - 4 * sin x ^ 3 := by have h1 : x + 2 * x = 3 * x := by ring rw [← h1, sin_add x (2 * x)] simp only [cos_two_mul, sin_two_mul, cos_sq'] have h2 : cos x * (2 * sin x * cos x) = 2 * sin x * cos x ^ 2 := by ring rw [h2, cos_sq'] ring #align complex.sin_three_mul Complex.sin_three_mul theorem exp_mul_I : exp (x * I) = cos x + sin x * I := (cos_add_sin_I _).symm set_option linter.uppercaseLean3 false in #align complex.exp_mul_I Complex.exp_mul_I theorem exp_add_mul_I : exp (x + y * I) = exp x * (cos y + sin y * I) := by rw [exp_add, exp_mul_I] set_option linter.uppercaseLean3 false in #align complex.exp_add_mul_I Complex.exp_add_mul_I theorem exp_eq_exp_re_mul_sin_add_cos : exp x = exp x.re * (cos x.im + sin x.im * I) := by rw [← exp_add_mul_I, re_add_im] #align complex.exp_eq_exp_re_mul_sin_add_cos Complex.exp_eq_exp_re_mul_sin_add_cos theorem exp_re : (exp x).re = Real.exp x.re * Real.cos x.im := by rw [exp_eq_exp_re_mul_sin_add_cos] simp [exp_ofReal_re, cos_ofReal_re] #align complex.exp_re Complex.exp_re theorem exp_im : (exp x).im = Real.exp x.re * Real.sin x.im := by rw [exp_eq_exp_re_mul_sin_add_cos] simp [exp_ofReal_re, sin_ofReal_re] #align complex.exp_im Complex.exp_im @[simp] theorem exp_ofReal_mul_I_re (x : ℝ) : (exp (x * I)).re = Real.cos x := by simp [exp_mul_I, cos_ofReal_re] set_option linter.uppercaseLean3 false in #align complex.exp_of_real_mul_I_re Complex.exp_ofReal_mul_I_re @[simp] theorem exp_ofReal_mul_I_im (x : ℝ) : (exp (x * I)).im = Real.sin x := by simp [exp_mul_I, sin_ofReal_re] set_option linter.uppercaseLean3 false in #align complex.exp_of_real_mul_I_im Complex.exp_ofReal_mul_I_im /-- De Moivre's formula -/ theorem cos_add_sin_mul_I_pow (n : ℕ) (z : ℂ) : (cos z + sin z * I) ^ n = cos (↑n * z) + sin (↑n * z) * I := by rw [← exp_mul_I, ← exp_mul_I] induction' n with n ih · rw [pow_zero, Nat.cast_zero, zero_mul, zero_mul, exp_zero] · rw [pow_succ, ih, Nat.cast_succ, add_mul, add_mul, one_mul, exp_add] set_option linter.uppercaseLean3 false in #align complex.cos_add_sin_mul_I_pow Complex.cos_add_sin_mul_I_pow end Complex namespace Real open Complex variable (x y : ℝ) @[simp] theorem exp_zero : exp 0 = 1 := by simp [Real.exp] #align real.exp_zero Real.exp_zero nonrec theorem exp_add : exp (x + y) = exp x * exp y := by simp [exp_add, exp] #align real.exp_add Real.exp_add -- Porting note (#11445): new definition /-- the exponential function as a monoid hom from `Multiplicative ℝ` to `ℝ` -/ noncomputable def expMonoidHom : MonoidHom (Multiplicative ℝ) ℝ := { toFun := fun x => exp (Multiplicative.toAdd x), map_one' := by simp, map_mul' := by simp [exp_add] } theorem exp_list_sum (l : List ℝ) : exp l.sum = (l.map exp).prod := map_list_prod (M := Multiplicative ℝ) expMonoidHom l #align real.exp_list_sum Real.exp_list_sum theorem exp_multiset_sum (s : Multiset ℝ) : exp s.sum = (s.map exp).prod := @MonoidHom.map_multiset_prod (Multiplicative ℝ) ℝ _ _ expMonoidHom s #align real.exp_multiset_sum Real.exp_multiset_sum theorem exp_sum {α : Type} (s : Finset α) (f : α → ℝ) : exp (∑ x ∈ s, f x) = ∏ x ∈ s, exp (f x) := map_prod (β := Multiplicative ℝ) expMonoidHom f s #align real.exp_sum Real.exp_sum lemma exp_nsmul (x : ℝ) (n : ℕ) : exp (n • x) = exp x ^ n := @MonoidHom.map_pow (Multiplicative ℝ) ℝ _ _ expMonoidHom _ _ nonrec theorem exp_nat_mul (x : ℝ) (n : ℕ) : exp (n x) = exp x ^ n := ofReal_injective (by simp [exp_nat_mul]) #align real.exp_nat_mul Real.exp_nat_mul nonrec theorem exp_ne_zero : exp x ≠ 0 := fun h => exp_ne_zero x <\| by rw [exp, ← ofReal_inj] at h; simp_all #align real.exp_ne_zero Real.exp_ne_zero nonrec theorem exp_neg : exp (-x) = (exp x)⁻¹ := ofReal_injective <\| by simp [exp_neg] #align real.exp_neg Real.exp_neg theorem exp_sub : exp (x - y) = exp x / exp y := by simp [sub_eq_add_neg, exp_add, exp_neg, div_eq_mul_inv] #align real.exp_sub Real.exp_sub @[simp] theorem sin_zero : sin 0 = 0 := by simp [sin] #align real.sin_zero Real.sin_zero @[simp] theorem sin_neg : sin (-x) = -sin x := by simp [sin, exp_neg, (neg_div _ _).symm, add_mul] #align real.sin_neg Real.sin_neg nonrec theorem sin_add : sin (x + y) = sin x * cos y + cos x * sin y := ofReal_injective <\| by simp [sin_add] #align real.sin_add Real.sin_add @[simp] theorem cos_zero : cos 0 = 1 := by simp [cos] #align real.cos_zero Real.cos_zero @[simp] theorem cos_neg : cos (-x) = cos x := by simp [cos, exp_neg] #align real.cos_neg Real.cos_neg @[simp] theorem cos_abs : cos \|x\| = cos x := by cases le_total x 0 <;> simp only [, _root_.abs_of_nonneg, abs_of_nonpos, cos_neg] #align real.cos_abs Real.cos_abs nonrec theorem cos_add : cos (x + y) = cos x cos y - sin x * sin y := ofReal_injective <\| by simp [cos_add] #align real.cos_add Real.cos_add theorem sin_sub : sin (x - y) = sin x * cos y - cos x * sin y := by simp [sub_eq_add_neg, sin_add, sin_neg, cos_neg] #align real.sin_sub Real.sin_sub theorem cos_sub : cos (x - y) = cos x * cos y + sin x * sin y := by simp [sub_eq_add_neg, cos_add, sin_neg, cos_neg] #align real.cos_sub Real.cos_sub nonrec theorem sin_sub_sin : sin x - sin y = 2 * sin ((x - y) / 2) * cos ((x + y) / 2) := ofReal_injective <\| by simp [sin_sub_sin] #align real.sin_sub_sin Real.sin_sub_sin nonrec theorem cos_sub_cos : cos x - cos y = -2 * sin ((x + y) / 2) * sin ((x - y) / 2) := ofReal_injective <\| by simp [cos_sub_cos] #align real.cos_sub_cos Real.cos_sub_cos nonrec theorem cos_add_cos : cos x + cos y = 2 * cos ((x + y) / 2) * cos ((x - y) / 2) := ofReal_injective <\| by simp [cos_add_cos] #align real.cos_add_cos Real.cos_add_cos nonrec theorem tan_eq_sin_div_cos : tan x = sin x / cos x := ofReal_injective <\| by simp [tan_eq_sin_div_cos] #align real.tan_eq_sin_div_cos Real.tan_eq_sin_div_cos theorem tan_mul_cos {x : ℝ} (hx : cos x ≠ 0) : tan x * cos x = sin x := by rw [tan_eq_sin_div_cos, div_mul_cancel₀ _ hx] #align real.tan_mul_cos Real.tan_mul_cos @[simp] theorem tan_zero : tan 0 = 0 := by simp [tan] #align real.tan_zero Real.tan_zero @[simp] theorem tan_neg : tan (-x) = -tan x := by simp [tan, neg_div] #align real.tan_neg Real.tan_neg @[simp] nonrec theorem sin_sq_add_cos_sq : sin x ^ 2 + cos x ^ 2 = 1 := ofReal_injective (by simp [sin_sq_add_cos_sq]) #align real.sin_sq_add_cos_sq Real.sin_sq_add_cos_sq @[simp] theorem cos_sq_add_sin_sq : cos x ^ 2 + sin x ^ 2 = 1 := by rw [add_comm, sin_sq_add_cos_sq] #align real.cos_sq_add_sin_sq Real.cos_sq_add_sin_sq theorem sin_sq_le_one : sin x ^ 2 ≤ 1 := by rw [← sin_sq_add_cos_sq x]; exact le_add_of_nonneg_right (sq_nonneg _) #align real.sin_sq_le_one Real.sin_sq_le_one theorem cos_sq_le_one : cos x ^ 2 ≤ 1 := by rw [← sin_sq_add_cos_sq x]; exact le_add_of_nonneg_left (sq_nonneg _) #align real.cos_sq_le_one Real.cos_sq_le_one theorem abs_sin_le_one : \|sin x\| ≤ 1 := abs_le_one_iff_mul_self_le_one.2 <\| by simp only [← sq, sin_sq_le_one] #align real.abs_sin_le_one Real.abs_sin_le_one theorem abs_cos_le_one : \|cos x\| ≤ 1 := abs_le_one_iff_mul_self_le_one.2 <\| by simp only [← sq, cos_sq_le_one] #align real.abs_cos_le_one Real.abs_cos_le_one theorem sin_le_one : sin x ≤ 1 := (abs_le.1 (abs_sin_le_one _)).2 #align real.sin_le_one Real.sin_le_one theorem cos_le_one : cos x ≤ 1 := (abs_le.1 (abs_cos_le_one _)).2 #align real.cos_le_one Real.cos_le_one theorem neg_one_le_sin : -1 ≤ sin x := (abs_le.1 (abs_sin_le_one _)).1 #align real.neg_one_le_sin Real.neg_one_le_sin theorem neg_one_le_cos : -1 ≤ cos x := (abs_le.1 (abs_cos_le_one _)).1 #align real.neg_one_le_cos Real.neg_one_le_cos nonrec theorem cos_two_mul : cos (2 * x) = 2 * cos x ^ 2 - 1 := ofReal_injective <\| by simp [cos_two_mul] #align real.cos_two_mul Real.cos_two_mul nonrec theorem cos_two_mul' : cos (2 * x) = cos x ^ 2 - sin x ^ 2 := ofReal_injective <\| by simp [cos_two_mul'] #align real.cos_two_mul' Real.cos_two_mul' nonrec theorem sin_two_mul : sin (2 * x) = 2 * sin x * cos x := ofReal_injective <\| by simp [sin_two_mul] #align real.sin_two_mul Real.sin_two_mul nonrec theorem cos_sq : cos x ^ 2 = 1 / 2 + cos (2 * x) / 2 := ofReal_injective <\| by simp [cos_sq] #align real.cos_sq Real.cos_sq theorem cos_sq' : cos x ^ 2 = 1 - sin x ^ 2 := by rw [← sin_sq_add_cos_sq x, add_sub_cancel_left] #align real.cos_sq' Real.cos_sq' theorem sin_sq : sin x ^ 2 = 1 - cos x ^ 2 := eq_sub_iff_add_eq.2 <\| sin_sq_add_cos_sq _ #align real.sin_sq Real.sin_sq lemma sin_sq_eq_half_sub : sin x ^ 2 = 1 / 2 - cos (2 * x) / 2 := by rw [sin_sq, cos_sq, ← sub_sub, sub_half] theorem abs_sin_eq_sqrt_one_sub_cos_sq (x : ℝ) : \|sin x\| = √(1 - cos x ^ 2) := by rw [← sin_sq, sqrt_sq_eq_abs] #align real.abs_sin_eq_sqrt_one_sub_cos_sq Real.abs_sin_eq_sqrt_one_sub_cos_sq theorem abs_cos_eq_sqrt_one_sub_sin_sq (x : ℝ) : \|cos x\| = √(1 - sin x ^ 2) := by rw [← cos_sq', sqrt_sq_eq_abs] #align real.abs_cos_eq_sqrt_one_sub_sin_sq Real.abs_cos_eq_sqrt_one_sub_sin_sq theorem inv_one_add_tan_sq {x : ℝ} (hx : cos x ≠ 0) : (1 + tan x ^ 2)⁻¹ = cos x ^ 2 := have : Complex.cos x ≠ 0 := mt (congr_arg re) hx ofReal_inj.1 <\| by simpa using Complex.inv_one_add_tan_sq this #align real.inv_one_add_tan_sq Real.inv_one_add_tan_sq theorem tan_sq_div_one_add_tan_sq {x : ℝ} (hx : cos x ≠ 0) : tan x ^ 2 / (1 + tan x ^ 2) = sin x ^ 2 := by simp only [← tan_mul_cos hx, mul_pow, ← inv_one_add_tan_sq hx, div_eq_mul_inv, one_mul] #align real.tan_sq_div_one_add_tan_sq Real.tan_sq_div_one_add_tan_sq theorem inv_sqrt_one_add_tan_sq {x : ℝ} (hx : 0 < cos x) : (√(1 + tan x ^ 2))⁻¹ = cos x := by rw [← sqrt_sq hx.le, ← sqrt_inv, inv_one_add_tan_sq hx.ne'] #align real.inv_sqrt_one_add_tan_sq Real.inv_sqrt_one_add_tan_sq theorem tan_div_sqrt_one_add_tan_sq {x : ℝ} (hx : 0 < cos x) : tan x / √(1 + tan x ^ 2) = sin x := by rw [← tan_mul_cos hx.ne', ← inv_sqrt_one_add_tan_sq hx, div_eq_mul_inv] #align real.tan_div_sqrt_one_add_tan_sq Real.tan_div_sqrt_one_add_tan_sq nonrec theorem cos_three_mul : cos (3 * x) = 4 * cos x ^ 3 - 3 * cos x := by rw [← ofReal_inj]; simp [cos_three_mul] #align real.cos_three_mul Real.cos_three_mul nonrec theorem sin_three_mul : sin (3 * x) = 3 * sin x - 4 * sin x ^ 3 := by rw [← ofReal_inj]; simp [sin_three_mul] #align real.sin_three_mul Real.sin_three_mul /-- The definition of `sinh` in terms of `exp`. -/ nonrec theorem sinh_eq (x : ℝ) : sinh x = (exp x - exp (-x)) / 2 := ofReal_injective <\| by simp [Complex.sinh] #align real.sinh_eq Real.sinh_eq @[simp] theorem sinh_zero : sinh 0 = 0 := by simp [sinh] #align real.sinh_zero Real.sinh_zero @[simp] theorem sinh_neg : sinh (-x) = -sinh x := by simp [sinh, exp_neg, (neg_div _ _).symm, add_mul] #align real.sinh_neg Real.sinh_neg nonrec theorem sinh_add : sinh (x + y) = sinh x * cosh y + cosh x * sinh y := by rw [← ofReal_inj]; simp [sinh_add] #align real.sinh_add Real.sinh_add /-- The definition of `cosh` in terms of `exp`. -/ theorem cosh_eq (x : ℝ) : cosh x = (exp x + exp (-x)) / 2 := eq_div_of_mul_eq two_ne_zero <\| by rw [cosh, exp, exp, Complex.ofReal_neg, Complex.cosh, mul_two, ← Complex.add_re, ← mul_two, div_mul_cancel₀ _ (two_ne_zero' ℂ), Complex.add_re] #align real.cosh_eq Real.cosh_eq @[simp] theorem cosh_zero : cosh 0 = 1 := by simp [cosh] #align real.cosh_zero Real.cosh_zero @[simp] theorem cosh_neg : cosh (-x) = cosh x := ofReal_inj.1 <\| by simp #align real.cosh_neg Real.cosh_neg @[simp] theorem cosh_abs : cosh \|x\| = cosh x := by cases le_total x 0 <;> simp [, _root_.abs_of_nonneg, abs_of_nonpos] #align real.cosh_abs Real.cosh_abs nonrec theorem cosh_add : cosh (x + y) = cosh x cosh y + sinh x * sinh y := by rw [← ofReal_inj]; simp [cosh_add] #align real.cosh_add Real.cosh_add theorem sinh_sub : sinh (x - y) = sinh x * cosh y - cosh x * sinh y := by simp [sub_eq_add_neg, sinh_add, sinh_neg, cosh_neg] #align real.sinh_sub Real.sinh_sub theorem cosh_sub : cosh (x - y) = cosh x * cosh y - sinh x * sinh y := by simp [sub_eq_add_neg, cosh_add, sinh_neg, cosh_neg] #align real.cosh_sub Real.cosh_sub nonrec theorem tanh_eq_sinh_div_cosh : tanh x = sinh x / cosh x := ofReal_inj.1 <\| by simp [tanh_eq_sinh_div_cosh] #align real.tanh_eq_sinh_div_cosh Real.tanh_eq_sinh_div_cosh @[simp] theorem tanh_zero : tanh 0 = 0 := by simp [tanh] #align real.tanh_zero Real.tanh_zero @[simp] theorem tanh_neg : tanh (-x) = -tanh x := by simp [tanh, neg_div] #align real.tanh_neg Real.tanh_neg @[simp] theorem cosh_add_sinh : cosh x + sinh x = exp x := by rw [← ofReal_inj]; simp #align real.cosh_add_sinh Real.cosh_add_sinh @[simp] theorem sinh_add_cosh : sinh x + cosh x = exp x := by rw [add_comm, cosh_add_sinh] #align real.sinh_add_cosh Real.sinh_add_cosh @[simp] theorem exp_sub_cosh : exp x - cosh x = sinh x := sub_eq_iff_eq_add.2 (sinh_add_cosh x).symm #align real.exp_sub_cosh Real.exp_sub_cosh @[simp] theorem exp_sub_sinh : exp x - sinh x = cosh x := sub_eq_iff_eq_add.2 (cosh_add_sinh x).symm #align real.exp_sub_sinh Real.exp_sub_sinh @[simp] theorem cosh_sub_sinh : cosh x - sinh x = exp (-x) := by rw [← ofReal_inj] simp #align real.cosh_sub_sinh Real.cosh_sub_sinh @[simp] theorem sinh_sub_cosh : sinh x - cosh x = -exp (-x) := by rw [← neg_sub, cosh_sub_sinh] #align real.sinh_sub_cosh Real.sinh_sub_cosh @[simp] theorem cosh_sq_sub_sinh_sq (x : ℝ) : cosh x ^ 2 - sinh x ^ 2 = 1 := by rw [← ofReal_inj]; simp #align real.cosh_sq_sub_sinh_sq Real.cosh_sq_sub_sinh_sq nonrec theorem cosh_sq : cosh x ^ 2 = sinh x ^ 2 + 1 := by rw [← ofReal_inj]; simp [cosh_sq] #align real.cosh_sq Real.cosh_sq theorem cosh_sq' : cosh x ^ 2 = 1 + sinh x ^ 2 := (cosh_sq x).trans (add_comm _ _) #align real.cosh_sq' Real.cosh_sq' nonrec theorem sinh_sq : sinh x ^ 2 = cosh x ^ 2 - 1 := by rw [← ofReal_inj]; simp [sinh_sq] #align real.sinh_sq Real.sinh_sq nonrec theorem cosh_two_mul : cosh (2 * x) = cosh x ^ 2 + sinh x ^ 2 := by rw [← ofReal_inj]; simp [cosh_two_mul] #align real.cosh_two_mul Real.cosh_two_mul nonrec theorem sinh_two_mul : sinh (2 * x) = 2 * sinh x * cosh x := by rw [← ofReal_inj]; simp [sinh_two_mul] #align real.sinh_two_mul Real.sinh_two_mul nonrec theorem cosh_three_mul : cosh (3 * x) = 4 * cosh x ^ 3 - 3 * cosh x := by rw [← ofReal_inj]; simp [cosh_three_mul] #align real.cosh_three_mul Real.cosh_three_mul nonrec theorem sinh_three_mul : sinh (3 * x) = 4 * sinh x ^ 3 + 3 * sinh x := by rw [← ofReal_inj]; simp [sinh_three_mul] #align real.sinh_three_mul Real.sinh_three_mul open IsAbsoluteValue Nat theorem sum_le_exp_of_nonneg {x : ℝ} (hx : 0 ≤ x) (n : ℕ) : ∑ i ∈ range n, x ^ i / i ! ≤ exp x := calc ∑ i ∈ range n, x ^ i / i ! ≤ lim (⟨_, isCauSeq_re (exp' x)⟩ : CauSeq ℝ abs) := by refine le_lim (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp only [exp', const_apply, re_sum] norm_cast refine sum_le_sum_of_subset_of_nonneg (range_mono hj) fun _ _ _ ↦ ?_ positivity _ = exp x := by rw [exp, Complex.exp, ← cauSeqRe, lim_re] #align real.sum_le_exp_of_nonneg Real.sum_le_exp_of_nonneg lemma pow_div_factorial_le_exp (hx : 0 ≤ x) (n : ℕ) : x ^ n / n ! ≤ exp x := calc x ^ n / n ! ≤ ∑ k ∈ range (n + 1), x ^ k / k ! := single_le_sum (f := fun k ↦ x ^ k / k !) (fun k _ ↦ by positivity) (self_mem_range_succ n) _ ≤ exp x := sum_le_exp_of_nonneg hx _ theorem quadratic_le_exp_of_nonneg {x : ℝ} (hx : 0 ≤ x) : 1 + x + x ^ 2 / 2 ≤ exp x := calc 1 + x + x ^ 2 / 2 = ∑ i ∈ range 3, x ^ i / i ! := by simp only [sum_range_succ, range_one, sum_singleton, _root_.pow_zero, factorial, cast_one, ne_eq, one_ne_zero, not_false_eq_true, div_self, pow_one, mul_one, div_one, Nat.mul_one, cast_succ, add_right_inj] ring_nf _ ≤ exp x := sum_le_exp_of_nonneg hx 3 #align real.quadratic_le_exp_of_nonneg Real.quadratic_le_exp_of_nonneg private theorem add_one_lt_exp_of_pos {x : ℝ} (hx : 0 < x) : x + 1 < exp x := (by nlinarith : x + 1 < 1 + x + x ^ 2 / 2).trans_le (quadratic_le_exp_of_nonneg hx.le) private theorem add_one_le_exp_of_nonneg {x : ℝ} (hx : 0 ≤ x) : x + 1 ≤ exp x := by rcases eq_or_lt_of_le hx with (rfl \| h) · simp exact (add_one_lt_exp_of_pos h).le theorem one_le_exp {x : ℝ} (hx : 0 ≤ x) : 1 ≤ exp x := by linarith [add_one_le_exp_of_nonneg hx] #align real.one_le_exp Real.one_le_exp theorem exp_pos (x : ℝ) : 0 < exp x := (le_total 0 x).elim (lt_of_lt_of_le zero_lt_one ∘ one_le_exp) fun h => by rw [← neg_neg x, Real.exp_neg] exact inv_pos.2 (lt_of_lt_of_le zero_lt_one (one_le_exp (neg_nonneg.2 h))) #align real.exp_pos Real.exp_pos lemma exp_nonneg (x : ℝ) : 0 ≤ exp x := x.exp_pos.le @[simp] theorem abs_exp (x : ℝ) : \|exp x\| = exp x := abs_of_pos (exp_pos _) #align real.abs_exp Real.abs_exp lemma exp_abs_le (x : ℝ) : exp \|x\| ≤ exp x + exp (-x) := by cases le_total x 0 <;> simp [abs_of_nonpos, _root_.abs_of_nonneg, exp_nonneg, ] @[mono] theorem exp_strictMono : StrictMono exp := fun x y h => by rw [← sub_add_cancel y x, Real.exp_add] exact (lt_mul_iff_one_lt_left (exp_pos _)).2 (lt_of_lt_of_le (by linarith) (add_one_le_exp_of_nonneg (by linarith))) #align real.exp_strict_mono Real.exp_strictMono @[gcongr] theorem exp_lt_exp_of_lt {x y : ℝ} (h : x < y) : exp x < exp y := exp_strictMono h @[mono] theorem exp_monotone : Monotone exp := exp_strictMono.monotone #align real.exp_monotone Real.exp_monotone @[gcongr] theorem exp_le_exp_of_le {x y : ℝ} (h : x ≤ y) : exp x ≤ exp y := exp_monotone h @[simp] theorem exp_lt_exp {x y : ℝ} : exp x < exp y ↔ x < y := exp_strictMono.lt_iff_lt #align real.exp_lt_exp Real.exp_lt_exp @[simp] theorem exp_le_exp {x y : ℝ} : exp x ≤ exp y ↔ x ≤ y := exp_strictMono.le_iff_le #align real.exp_le_exp Real.exp_le_exp theorem exp_injective : Function.Injective exp := exp_strictMono.injective #align real.exp_injective Real.exp_injective @[simp] theorem exp_eq_exp {x y : ℝ} : exp x = exp y ↔ x = y := exp_injective.eq_iff #align real.exp_eq_exp Real.exp_eq_exp @[simp] theorem exp_eq_one_iff : exp x = 1 ↔ x = 0 := exp_injective.eq_iff' exp_zero #align real.exp_eq_one_iff Real.exp_eq_one_iff @[simp] theorem one_lt_exp_iff {x : ℝ} : 1 < exp x ↔ 0 < x := by rw [← exp_zero, exp_lt_exp] #align real.one_lt_exp_iff Real.one_lt_exp_iff @[simp] theorem exp_lt_one_iff {x : ℝ} : exp x < 1 ↔ x < 0 := by rw [← exp_zero, exp_lt_exp] #align real.exp_lt_one_iff Real.exp_lt_one_iff @[simp] theorem exp_le_one_iff {x : ℝ} : exp x ≤ 1 ↔ x ≤ 0 := exp_zero ▸ exp_le_exp #align real.exp_le_one_iff Real.exp_le_one_iff @[simp] theorem one_le_exp_iff {x : ℝ} : 1 ≤ exp x ↔ 0 ≤ x := exp_zero ▸ exp_le_exp #align real.one_le_exp_iff Real.one_le_exp_iff /-- `Real.cosh` is always positive -/ theorem cosh_pos (x : ℝ) : 0 < Real.cosh x := (cosh_eq x).symm ▸ half_pos (add_pos (exp_pos x) (exp_pos (-x))) #align real.cosh_pos Real.cosh_pos theorem sinh_lt_cosh : sinh x < cosh x := lt_of_pow_lt_pow_left 2 (cosh_pos _).le <\| (cosh_sq x).symm ▸ lt_add_one _ #align real.sinh_lt_cosh Real.sinh_lt_cosh end Real namespace Complex theorem sum_div_factorial_le {α : Type} [LinearOrderedField α] (n j : ℕ) (hn : 0 < n) : (∑ m ∈ filter (fun k => n ≤ k) (range j), (1 / m.factorial : α)) ≤ n.succ / (n.factorial * n) := calc (∑ m ∈ filter (fun k => n ≤ k) (range j), (1 / m.factorial : α)) = ∑ m ∈ range (j - n), (1 / ((m + n).factorial : α)) := by refine sum_nbij' (· - n) (· + n) ?_ ?_ ?_ ?_ ?_ <;> simp (config := { contextual := true }) [lt_tsub_iff_right, tsub_add_cancel_of_le] _ ≤ ∑ m ∈ range (j - n), ((n.factorial : α) * (n.succ : α) ^ m)⁻¹ := by simp_rw [one_div] gcongr rw [← Nat.cast_pow, ← Nat.cast_mul, Nat.cast_le, add_comm] exact Nat.factorial_mul_pow_le_factorial _ = (n.factorial : α)⁻¹ * ∑ m ∈ range (j - n), (n.succ : α)⁻¹ ^ m := by simp [mul_inv, ← mul_sum, ← sum_mul, mul_comm, inv_pow] _ = ((n.succ : α) - n.succ * (n.succ : α)⁻¹ ^ (j - n)) / (n.factorial * n) := by have h₁ : (n.succ : α) ≠ 1 := @Nat.cast_one α _ ▸ mt Nat.cast_inj.1 (mt Nat.succ.inj (pos_iff_ne_zero.1 hn)) have h₂ : (n.succ : α) ≠ 0 := by positivity have h₃ : (n.factorial * n : α) ≠ 0 := by positivity have h₄ : (n.succ - 1 : α) = n := by simp rw [geom_sum_inv h₁ h₂, eq_div_iff_mul_eq h₃, mul_comm _ (n.factorial * n : α), ← mul_assoc (n.factorial⁻¹ : α), ← mul_inv_rev, h₄, ← mul_assoc (n.factorial * n : α), mul_comm (n : α) n.factorial, mul_inv_cancel h₃, one_mul, mul_comm] _ ≤ n.succ / (n.factorial * n : α) := by gcongr; apply sub_le_self; positivity #align complex.sum_div_factorial_le Complex.sum_div_factorial_le theorem exp_bound {x : ℂ} (hx : abs x ≤ 1) {n : ℕ} (hn : 0 < n) : abs (exp x - ∑ m ∈ range n, x ^ m / m.factorial) ≤ abs x ^ n * ((n.succ : ℝ) * (n.factorial * n : ℝ)⁻¹) := by rw [← lim_const (abv := Complex.abs) (∑ m ∈ range n, _), exp, sub_eq_add_neg, ← lim_neg, lim_add, ← lim_abs] refine lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show abs ((∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial) ≤ abs x ^ n * ((n.succ : ℝ) * (n.factorial * n : ℝ)⁻¹) rw [sum_range_sub_sum_range hj] calc abs (∑ m ∈ (range j).filter fun k => n ≤ k, (x ^ m / m.factorial : ℂ)) = abs (∑ m ∈ (range j).filter fun k => n ≤ k, (x ^ n * (x ^ (m - n) / m.factorial) : ℂ)) := by refine congr_arg abs (sum_congr rfl fun m hm => ?_) rw [mem_filter, mem_range] at hm rw [← mul_div_assoc, ← pow_add, add_tsub_cancel_of_le hm.2] _ ≤ ∑ m ∈ filter (fun k => n ≤ k) (range j), abs (x ^ n * (x ^ (m - n) / m.factorial)) := (IsAbsoluteValue.abv_sum Complex.abs _ _) _ ≤ ∑ m ∈ filter (fun k => n ≤ k) (range j), abs x ^ n * (1 / m.factorial) := by simp_rw [map_mul, map_pow, map_div₀, abs_natCast] gcongr rw [abv_pow abs] exact pow_le_one _ (abs.nonneg _) hx _ = abs x ^ n * ∑ m ∈ (range j).filter fun k => n ≤ k, (1 / m.factorial : ℝ) := by simp [abs_mul, abv_pow abs, abs_div, ← mul_sum] _ ≤ abs x ^ n * (n.succ * (n.factorial * n : ℝ)⁻¹) := by gcongr exact sum_div_factorial_le _ _ hn #align complex.exp_bound Complex.exp_bound theorem exp_bound' {x : ℂ} {n : ℕ} (hx : abs x / n.succ ≤ 1 / 2) : abs (exp x - ∑ m ∈ range n, x ^ m / m.factorial) ≤ abs x ^ n / n.factorial * 2 := by rw [← lim_const (abv := Complex.abs) (∑ m ∈ range n, _), exp, sub_eq_add_neg, ← lim_neg, lim_add, ← lim_abs] refine lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show abs ((∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial) ≤ abs x ^ n / n.factorial * 2 let k := j - n have hj : j = n + k := (add_tsub_cancel_of_le hj).symm rw [hj, sum_range_add_sub_sum_range] calc abs (∑ i ∈ range k, x ^ (n + i) / ((n + i).factorial : ℂ)) ≤ ∑ i ∈ range k, abs (x ^ (n + i) / ((n + i).factorial : ℂ)) := IsAbsoluteValue.abv_sum _ _ _ _ ≤ ∑ i ∈ range k, abs x ^ (n + i) / (n + i).factorial := by simp [Complex.abs_natCast, map_div₀, abv_pow abs] _ ≤ ∑ i ∈ range k, abs x ^ (n + i) / ((n.factorial : ℝ) * (n.succ : ℝ) ^ i) := ?_ _ = ∑ i ∈ range k, abs x ^ n / n.factorial * (abs x ^ i / (n.succ : ℝ) ^ i) := ?_ _ ≤ abs x ^ n / ↑n.factorial * 2 := ?_ · gcongr exact mod_cast Nat.factorial_mul_pow_le_factorial · refine Finset.sum_congr rfl fun _ _ => ?_ simp only [pow_add, div_eq_inv_mul, mul_inv, mul_left_comm, mul_assoc] · rw [← mul_sum] gcongr simp_rw [← div_pow] rw [geom_sum_eq, div_le_iff_of_neg] · trans (-1 : ℝ) · linarith · simp only [neg_le_sub_iff_le_add, div_pow, Nat.cast_succ, le_add_iff_nonneg_left] positivity · linarith · linarith #align complex.exp_bound' Complex.exp_bound' theorem abs_exp_sub_one_le {x : ℂ} (hx : abs x ≤ 1) : abs (exp x - 1) ≤ 2 * abs x := calc abs (exp x - 1) = abs (exp x - ∑ m ∈ range 1, x ^ m / m.factorial) := by simp [sum_range_succ] _ ≤ abs x ^ 1 * ((Nat.succ 1 : ℝ) * ((Nat.factorial 1) * (1 : ℕ) : ℝ)⁻¹) := (exp_bound hx (by decide)) _ = 2 * abs x := by simp [two_mul, mul_two, mul_add, mul_comm, add_mul, Nat.factorial] #align complex.abs_exp_sub_one_le Complex.abs_exp_sub_one_le theorem abs_exp_sub_one_sub_id_le {x : ℂ} (hx : abs x ≤ 1) : abs (exp x - 1 - x) ≤ abs x ^ 2 := calc abs (exp x - 1 - x) = abs (exp x - ∑ m ∈ range 2, x ^ m / m.factorial) := by simp [sub_eq_add_neg, sum_range_succ_comm, add_assoc, Nat.factorial] _ ≤ abs x ^ 2 * ((Nat.succ 2 : ℝ) * (Nat.factorial 2 * (2 : ℕ) : ℝ)⁻¹) := (exp_bound hx (by decide)) _ ≤ abs x ^ 2 * 1 := by gcongr; norm_num [Nat.factorial] _ = abs x ^ 2 := by rw [mul_one] #align complex.abs_exp_sub_one_sub_id_le Complex.abs_exp_sub_one_sub_id_le end Complex namespace Real open Complex Finset nonrec theorem exp_bound {x : ℝ} (hx : \|x\| ≤ 1) {n : ℕ} (hn : 0 < n) : \|exp x - ∑ m ∈ range n, x ^ m / m.factorial\| ≤ \|x\| ^ n * (n.succ / (n.factorial * n)) := by have hxc : Complex.abs x ≤ 1 := mod_cast hx convert exp_bound hxc hn using 2 <;> -- Porting note: was `norm_cast` simp only [← abs_ofReal, ← ofReal_sub, ← ofReal_exp, ← ofReal_sum, ← ofReal_pow, ← ofReal_div, ← ofReal_natCast] #align real.exp_bound Real.exp_bound theorem exp_bound' {x : ℝ} (h1 : 0 ≤ x) (h2 : x ≤ 1) {n : ℕ} (hn : 0 < n) : Real.exp x ≤ (∑ m ∈ Finset.range n, x ^ m / m.factorial) + x ^ n * (n + 1) / (n.factorial * n) := by have h3 : \|x\| = x := by simpa have h4 : \|x\| ≤ 1 := by rwa [h3] have h' := Real.exp_bound h4 hn rw [h3] at h' have h'' := (abs_sub_le_iff.1 h').1 have t := sub_le_iff_le_add'.1 h'' simpa [mul_div_assoc] using t #align real.exp_bound' Real.exp_bound' theorem abs_exp_sub_one_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1\| ≤ 2 * \|x\| := by have : \|x\| ≤ 1 := mod_cast hx -- Porting note: was --exact_mod_cast Complex.abs_exp_sub_one_le (x := x) this have := Complex.abs_exp_sub_one_le (x := x) (by simpa using this) rw [← ofReal_exp, ← ofReal_one, ← ofReal_sub, abs_ofReal, abs_ofReal] at this exact this #align real.abs_exp_sub_one_le Real.abs_exp_sub_one_le theorem abs_exp_sub_one_sub_id_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1 - x\| ≤ x ^ 2 := by rw [← _root_.sq_abs] -- Porting note: was -- exact_mod_cast Complex.abs_exp_sub_one_sub_id_le this have : Complex.abs x ≤ 1 := mod_cast hx have := Complex.abs_exp_sub_one_sub_id_le this rw [← ofReal_one, ← ofReal_exp, ← ofReal_sub, ← ofReal_sub, abs_ofReal, abs_ofReal] at this exact this #align real.abs_exp_sub_one_sub_id_le Real.abs_exp_sub_one_sub_id_le /-- A finite initial segment of the exponential series, followed by an arbitrary tail. For fixed `n` this is just a linear map wrt `r`, and each map is a simple linear function of the previous (see `expNear_succ`), with `expNear n x r ⟶ exp x` as `n ⟶ ∞`, for any `r`. -/ noncomputable def expNear (n : ℕ) (x r : ℝ) : ℝ := (∑ m ∈ range n, x ^ m / m.factorial) + x ^ n / n.factorial * r #align real.exp_near Real.expNear @[simp]	Mathlib/Data/Complex/Exponential.lean	1,453	1,453	theorem expNear_zero (x r) : expNear 0 x r = r := by	simp [expNear]
/- Copyright (c) 2021 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne -/ import Mathlib.MeasureTheory.Function.ConditionalExpectation.CondexpL2 #align_import measure_theory.function.conditional_expectation.condexp_L1 from "leanprover-community/mathlib"@"d8bbb04e2d2a44596798a9207ceefc0fb236e41e" /-! # Conditional expectation in L1 This file contains two more steps of the construction of the conditional expectation, which is completed in `MeasureTheory.Function.ConditionalExpectation.Basic`. See that file for a description of the full process. The contitional expectation of an `L²` function is defined in `MeasureTheory.Function.ConditionalExpectation.CondexpL2`. In this file, we perform two steps. * Show that the conditional expectation of the indicator of a measurable set with finite measure is integrable and define a map `Set α → (E →L[ℝ] (α →₁[μ] E))` which to a set associates a linear map. That linear map sends `x ∈ E` to the conditional expectation of the indicator of the set with value `x`. * Extend that map to `condexpL1CLM : (α →₁[μ] E) →L[ℝ] (α →₁[μ] E)`. This is done using the same construction as the Bochner integral (see the file `MeasureTheory/Integral/SetToL1`). ## Main definitions * `condexpL1`: Conditional expectation of a function as a linear map from `L1` to itself. -/ noncomputable section open TopologicalSpace MeasureTheory.Lp Filter ContinuousLinearMap open scoped NNReal ENNReal Topology MeasureTheory namespace MeasureTheory variable {α β F F' G G' 𝕜 : Type*} {p : ℝ≥0∞} [RCLike 𝕜] -- 𝕜 for ℝ or ℂ -- F for a Lp submodule [NormedAddCommGroup F] [NormedSpace 𝕜 F] -- F' for integrals on a Lp submodule [NormedAddCommGroup F'] [NormedSpace 𝕜 F'] [NormedSpace ℝ F'] [CompleteSpace F'] -- G for a Lp add_subgroup [NormedAddCommGroup G] -- G' for integrals on a Lp add_subgroup [NormedAddCommGroup G'] [NormedSpace ℝ G'] [CompleteSpace G'] section CondexpInd /-! ## Conditional expectation of an indicator as a continuous linear map. The goal of this section is to build `condexpInd (hm : m ≤ m0) (μ : Measure α) (s : Set s) : G →L[ℝ] α →₁[μ] G`, which takes `x : G` to the conditional expectation of the indicator of the set `s` with value `x`, seen as an element of `α →₁[μ] G`. -/ variable {m m0 : MeasurableSpace α} {μ : Measure α} {s t : Set α} [NormedSpace ℝ G] section CondexpIndL1Fin set_option linter.uppercaseLean3 false /-- Conditional expectation of the indicator of a measurable set with finite measure, as a function in L1. -/ def condexpIndL1Fin (hm : m ≤ m0) [SigmaFinite (μ.trim hm)] (hs : MeasurableSet s) (hμs : μ s ≠ ∞) (x : G) : α →₁[μ] G := (integrable_condexpIndSMul hm hs hμs x).toL1 _ #align measure_theory.condexp_ind_L1_fin MeasureTheory.condexpIndL1Fin theorem condexpIndL1Fin_ae_eq_condexpIndSMul (hm : m ≤ m0) [SigmaFinite (μ.trim hm)] (hs : MeasurableSet s) (hμs : μ s ≠ ∞) (x : G) : condexpIndL1Fin hm hs hμs x =ᵐ[μ] condexpIndSMul hm hs hμs x := (integrable_condexpIndSMul hm hs hμs x).coeFn_toL1 #align measure_theory.condexp_ind_L1_fin_ae_eq_condexp_ind_smul MeasureTheory.condexpIndL1Fin_ae_eq_condexpIndSMul variable {hm : m ≤ m0} [SigmaFinite (μ.trim hm)] -- Porting note: this lemma fills the hole in `refine' (Memℒp.coeFn_toLp _) ...` -- which is not automatically filled in Lean 4 private theorem q {hs : MeasurableSet s} {hμs : μ s ≠ ∞} {x : G} : Memℒp (condexpIndSMul hm hs hμs x) 1 μ := by rw [memℒp_one_iff_integrable]; apply integrable_condexpIndSMul theorem condexpIndL1Fin_add (hs : MeasurableSet s) (hμs : μ s ≠ ∞) (x y : G) : condexpIndL1Fin hm hs hμs (x + y) = condexpIndL1Fin hm hs hμs x + condexpIndL1Fin hm hs hμs y := by ext1 refine (Memℒp.coeFn_toLp q).trans ?_ refine EventuallyEq.trans ?_ (Lp.coeFn_add _ _).symm refine EventuallyEq.trans ?_ (EventuallyEq.add (Memℒp.coeFn_toLp q).symm (Memℒp.coeFn_toLp q).symm) rw [condexpIndSMul_add] refine (Lp.coeFn_add _ _).trans (eventually_of_forall fun a => ?_) rfl #align measure_theory.condexp_ind_L1_fin_add MeasureTheory.condexpIndL1Fin_add theorem condexpIndL1Fin_smul (hs : MeasurableSet s) (hμs : μ s ≠ ∞) (c : ℝ) (x : G) : condexpIndL1Fin hm hs hμs (c • x) = c • condexpIndL1Fin hm hs hμs x := by ext1 refine (Memℒp.coeFn_toLp q).trans ?_ refine EventuallyEq.trans ?_ (Lp.coeFn_smul _ _).symm rw [condexpIndSMul_smul hs hμs c x] refine (Lp.coeFn_smul _ _).trans ?_ refine (condexpIndL1Fin_ae_eq_condexpIndSMul hm hs hμs x).mono fun y hy => ?_ simp only [Pi.smul_apply, hy] #align measure_theory.condexp_ind_L1_fin_smul MeasureTheory.condexpIndL1Fin_smul	Mathlib/MeasureTheory/Function/ConditionalExpectation/CondexpL1.lean	116	125	theorem condexpIndL1Fin_smul' [NormedSpace ℝ F] [SMulCommClass ℝ 𝕜 F] (hs : MeasurableSet s) (hμs : μ s ≠ ∞) (c : 𝕜) (x : F) : condexpIndL1Fin hm hs hμs (c • x) = c • condexpIndL1Fin hm hs hμs x := by	ext1 refine (Memℒp.coeFn_toLp q).trans ?_ refine EventuallyEq.trans ?_ (Lp.coeFn_smul _ _).symm rw [condexpIndSMul_smul' hs hμs c x] refine (Lp.coeFn_smul _ _).trans ?_ refine (condexpIndL1Fin_ae_eq_condexpIndSMul hm hs hμs x).mono fun y hy => ?_ simp only [Pi.smul_apply, hy]
/- Copyright (c) 2016 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Mario Carneiro, Johannes Hölzl -/ import Mathlib.Algebra.Order.Monoid.Defs import Mathlib.Algebra.Order.Sub.Defs import Mathlib.Util.AssertExists #align_import algebra.order.group.defs from "leanprover-community/mathlib"@"b599f4e4e5cf1fbcb4194503671d3d9e569c1fce" /-! # Ordered groups This file develops the basics of ordered groups. ## Implementation details Unfortunately, the number of `'` appended to lemmas in this file may differ between the multiplicative and the additive version of a lemma. The reason is that we did not want to change existing names in the library. -/ open Function universe u variable {α : Type u} /-- An ordered additive commutative group is an additive commutative group with a partial order in which addition is strictly monotone. -/ class OrderedAddCommGroup (α : Type u) extends AddCommGroup α, PartialOrder α where /-- Addition is monotone in an ordered additive commutative group. -/ protected add_le_add_left : ∀ a b : α, a ≤ b → ∀ c : α, c + a ≤ c + b #align ordered_add_comm_group OrderedAddCommGroup /-- An ordered commutative group is a commutative group with a partial order in which multiplication is strictly monotone. -/ class OrderedCommGroup (α : Type u) extends CommGroup α, PartialOrder α where /-- Multiplication is monotone in an ordered commutative group. -/ protected mul_le_mul_left : ∀ a b : α, a ≤ b → ∀ c : α, c * a ≤ c * b #align ordered_comm_group OrderedCommGroup attribute [to_additive] OrderedCommGroup @[to_additive] instance OrderedCommGroup.to_covariantClass_left_le (α : Type u) [OrderedCommGroup α] : CovariantClass α α (· * ·) (· ≤ ·) where elim a b c bc := OrderedCommGroup.mul_le_mul_left b c bc a #align ordered_comm_group.to_covariant_class_left_le OrderedCommGroup.to_covariantClass_left_le #align ordered_add_comm_group.to_covariant_class_left_le OrderedAddCommGroup.to_covariantClass_left_le -- See note [lower instance priority] @[to_additive OrderedAddCommGroup.toOrderedCancelAddCommMonoid] instance (priority := 100) OrderedCommGroup.toOrderedCancelCommMonoid [OrderedCommGroup α] : OrderedCancelCommMonoid α := { ‹OrderedCommGroup α› with le_of_mul_le_mul_left := fun a b c ↦ le_of_mul_le_mul_left' } #align ordered_comm_group.to_ordered_cancel_comm_monoid OrderedCommGroup.toOrderedCancelCommMonoid #align ordered_add_comm_group.to_ordered_cancel_add_comm_monoid OrderedAddCommGroup.toOrderedCancelAddCommMonoid example (α : Type u) [OrderedAddCommGroup α] : CovariantClass α α (swap (· + ·)) (· < ·) := IsRightCancelAdd.covariant_swap_add_lt_of_covariant_swap_add_le α -- Porting note: this instance is not used, -- and causes timeouts after lean4#2210. -- It was introduced in https://github.com/leanprover-community/mathlib/pull/17564 -- but without the motivation clearly explained. /-- A choice-free shortcut instance. -/ @[to_additive "A choice-free shortcut instance."] theorem OrderedCommGroup.to_contravariantClass_left_le (α : Type u) [OrderedCommGroup α] : ContravariantClass α α (· * ·) (· ≤ ·) where elim a b c bc := by simpa using mul_le_mul_left' bc a⁻¹ #align ordered_comm_group.to_contravariant_class_left_le OrderedCommGroup.to_contravariantClass_left_le #align ordered_add_comm_group.to_contravariant_class_left_le OrderedAddCommGroup.to_contravariantClass_left_le -- Porting note: this instance is not used, -- and causes timeouts after lean4#2210. -- See further explanation on `OrderedCommGroup.to_contravariantClass_left_le`. /-- A choice-free shortcut instance. -/ @[to_additive "A choice-free shortcut instance."] theorem OrderedCommGroup.to_contravariantClass_right_le (α : Type u) [OrderedCommGroup α] : ContravariantClass α α (swap (· * ·)) (· ≤ ·) where elim a b c bc := by simpa using mul_le_mul_right' bc a⁻¹ #align ordered_comm_group.to_contravariant_class_right_le OrderedCommGroup.to_contravariantClass_right_le #align ordered_add_comm_group.to_contravariant_class_right_le OrderedAddCommGroup.to_contravariantClass_right_le section Group variable [Group α] section TypeclassesLeftLE variable [LE α] [CovariantClass α α (· * ·) (· ≤ ·)] {a b c d : α} /-- Uses `left` co(ntra)variant. -/ @[to_additive (attr := simp) "Uses `left` co(ntra)variant."] theorem Left.inv_le_one_iff : a⁻¹ ≤ 1 ↔ 1 ≤ a := by rw [← mul_le_mul_iff_left a] simp #align left.inv_le_one_iff Left.inv_le_one_iff #align left.neg_nonpos_iff Left.neg_nonpos_iff /-- Uses `left` co(ntra)variant. -/ @[to_additive (attr := simp) "Uses `left` co(ntra)variant."] theorem Left.one_le_inv_iff : 1 ≤ a⁻¹ ↔ a ≤ 1 := by rw [← mul_le_mul_iff_left a] simp #align left.one_le_inv_iff Left.one_le_inv_iff #align left.nonneg_neg_iff Left.nonneg_neg_iff @[to_additive (attr := simp)] theorem le_inv_mul_iff_mul_le : b ≤ a⁻¹ * c ↔ a * b ≤ c := by rw [← mul_le_mul_iff_left a] simp #align le_inv_mul_iff_mul_le le_inv_mul_iff_mul_le #align le_neg_add_iff_add_le le_neg_add_iff_add_le @[to_additive (attr := simp)] theorem inv_mul_le_iff_le_mul : b⁻¹ * a ≤ c ↔ a ≤ b * c := by rw [← mul_le_mul_iff_left b, mul_inv_cancel_left] #align inv_mul_le_iff_le_mul inv_mul_le_iff_le_mul #align neg_add_le_iff_le_add neg_add_le_iff_le_add @[to_additive neg_le_iff_add_nonneg'] theorem inv_le_iff_one_le_mul' : a⁻¹ ≤ b ↔ 1 ≤ a * b := (mul_le_mul_iff_left a).symm.trans <\| by rw [mul_inv_self] #align inv_le_iff_one_le_mul' inv_le_iff_one_le_mul' #align neg_le_iff_add_nonneg' neg_le_iff_add_nonneg' @[to_additive] theorem le_inv_iff_mul_le_one_left : a ≤ b⁻¹ ↔ b * a ≤ 1 := (mul_le_mul_iff_left b).symm.trans <\| by rw [mul_inv_self] #align le_inv_iff_mul_le_one_left le_inv_iff_mul_le_one_left #align le_neg_iff_add_nonpos_left le_neg_iff_add_nonpos_left @[to_additive] theorem le_inv_mul_iff_le : 1 ≤ b⁻¹ * a ↔ b ≤ a := by rw [← mul_le_mul_iff_left b, mul_one, mul_inv_cancel_left] #align le_inv_mul_iff_le le_inv_mul_iff_le #align le_neg_add_iff_le le_neg_add_iff_le @[to_additive] theorem inv_mul_le_one_iff : a⁻¹ * b ≤ 1 ↔ b ≤ a := -- Porting note: why is the `_root_` needed? _root_.trans inv_mul_le_iff_le_mul <\| by rw [mul_one] #align inv_mul_le_one_iff inv_mul_le_one_iff #align neg_add_nonpos_iff neg_add_nonpos_iff end TypeclassesLeftLE section TypeclassesLeftLT variable [LT α] [CovariantClass α α (· * ·) (· < ·)] {a b c : α} /-- Uses `left` co(ntra)variant. -/ @[to_additive (attr := simp) Left.neg_pos_iff "Uses `left` co(ntra)variant."] theorem Left.one_lt_inv_iff : 1 < a⁻¹ ↔ a < 1 := by rw [← mul_lt_mul_iff_left a, mul_inv_self, mul_one] #align left.one_lt_inv_iff Left.one_lt_inv_iff #align left.neg_pos_iff Left.neg_pos_iff /-- Uses `left` co(ntra)variant. -/ @[to_additive (attr := simp) "Uses `left` co(ntra)variant."] theorem Left.inv_lt_one_iff : a⁻¹ < 1 ↔ 1 < a := by rw [← mul_lt_mul_iff_left a, mul_inv_self, mul_one] #align left.inv_lt_one_iff Left.inv_lt_one_iff #align left.neg_neg_iff Left.neg_neg_iff @[to_additive (attr := simp)] theorem lt_inv_mul_iff_mul_lt : b < a⁻¹ * c ↔ a * b < c := by rw [← mul_lt_mul_iff_left a] simp #align lt_inv_mul_iff_mul_lt lt_inv_mul_iff_mul_lt #align lt_neg_add_iff_add_lt lt_neg_add_iff_add_lt @[to_additive (attr := simp)] theorem inv_mul_lt_iff_lt_mul : b⁻¹ * a < c ↔ a < b * c := by rw [← mul_lt_mul_iff_left b, mul_inv_cancel_left] #align inv_mul_lt_iff_lt_mul inv_mul_lt_iff_lt_mul #align neg_add_lt_iff_lt_add neg_add_lt_iff_lt_add @[to_additive] theorem inv_lt_iff_one_lt_mul' : a⁻¹ < b ↔ 1 < a * b := (mul_lt_mul_iff_left a).symm.trans <\| by rw [mul_inv_self] #align inv_lt_iff_one_lt_mul' inv_lt_iff_one_lt_mul' #align neg_lt_iff_pos_add' neg_lt_iff_pos_add' @[to_additive] theorem lt_inv_iff_mul_lt_one' : a < b⁻¹ ↔ b * a < 1 := (mul_lt_mul_iff_left b).symm.trans <\| by rw [mul_inv_self] #align lt_inv_iff_mul_lt_one' lt_inv_iff_mul_lt_one' #align lt_neg_iff_add_neg' lt_neg_iff_add_neg' @[to_additive] theorem lt_inv_mul_iff_lt : 1 < b⁻¹ * a ↔ b < a := by rw [← mul_lt_mul_iff_left b, mul_one, mul_inv_cancel_left] #align lt_inv_mul_iff_lt lt_inv_mul_iff_lt #align lt_neg_add_iff_lt lt_neg_add_iff_lt @[to_additive] theorem inv_mul_lt_one_iff : a⁻¹ * b < 1 ↔ b < a := _root_.trans inv_mul_lt_iff_lt_mul <\| by rw [mul_one] #align inv_mul_lt_one_iff inv_mul_lt_one_iff #align neg_add_neg_iff neg_add_neg_iff end TypeclassesLeftLT section TypeclassesRightLE variable [LE α] [CovariantClass α α (swap (· * ·)) (· ≤ ·)] {a b c : α} /-- Uses `right` co(ntra)variant. -/ @[to_additive (attr := simp) "Uses `right` co(ntra)variant."] theorem Right.inv_le_one_iff : a⁻¹ ≤ 1 ↔ 1 ≤ a := by rw [← mul_le_mul_iff_right a] simp #align right.inv_le_one_iff Right.inv_le_one_iff #align right.neg_nonpos_iff Right.neg_nonpos_iff /-- Uses `right` co(ntra)variant. -/ @[to_additive (attr := simp) "Uses `right` co(ntra)variant."] theorem Right.one_le_inv_iff : 1 ≤ a⁻¹ ↔ a ≤ 1 := by rw [← mul_le_mul_iff_right a] simp #align right.one_le_inv_iff Right.one_le_inv_iff #align right.nonneg_neg_iff Right.nonneg_neg_iff @[to_additive neg_le_iff_add_nonneg] theorem inv_le_iff_one_le_mul : a⁻¹ ≤ b ↔ 1 ≤ b * a := (mul_le_mul_iff_right a).symm.trans <\| by rw [inv_mul_self] #align inv_le_iff_one_le_mul inv_le_iff_one_le_mul #align neg_le_iff_add_nonneg neg_le_iff_add_nonneg @[to_additive] theorem le_inv_iff_mul_le_one_right : a ≤ b⁻¹ ↔ a * b ≤ 1 := (mul_le_mul_iff_right b).symm.trans <\| by rw [inv_mul_self] #align le_inv_iff_mul_le_one_right le_inv_iff_mul_le_one_right #align le_neg_iff_add_nonpos_right le_neg_iff_add_nonpos_right @[to_additive (attr := simp)] theorem mul_inv_le_iff_le_mul : a * b⁻¹ ≤ c ↔ a ≤ c * b := (mul_le_mul_iff_right b).symm.trans <\| by rw [inv_mul_cancel_right] #align mul_inv_le_iff_le_mul mul_inv_le_iff_le_mul #align add_neg_le_iff_le_add add_neg_le_iff_le_add @[to_additive (attr := simp)] theorem le_mul_inv_iff_mul_le : c ≤ a * b⁻¹ ↔ c * b ≤ a := (mul_le_mul_iff_right b).symm.trans <\| by rw [inv_mul_cancel_right] #align le_mul_inv_iff_mul_le le_mul_inv_iff_mul_le #align le_add_neg_iff_add_le le_add_neg_iff_add_le -- Porting note (#10618): `simp` can prove this @[to_additive] theorem mul_inv_le_one_iff_le : a * b⁻¹ ≤ 1 ↔ a ≤ b := mul_inv_le_iff_le_mul.trans <\| by rw [one_mul] #align mul_inv_le_one_iff_le mul_inv_le_one_iff_le #align add_neg_nonpos_iff_le add_neg_nonpos_iff_le @[to_additive] theorem le_mul_inv_iff_le : 1 ≤ a * b⁻¹ ↔ b ≤ a := by rw [← mul_le_mul_iff_right b, one_mul, inv_mul_cancel_right] #align le_mul_inv_iff_le le_mul_inv_iff_le #align le_add_neg_iff_le le_add_neg_iff_le @[to_additive] theorem mul_inv_le_one_iff : b * a⁻¹ ≤ 1 ↔ b ≤ a := _root_.trans mul_inv_le_iff_le_mul <\| by rw [one_mul] #align mul_inv_le_one_iff mul_inv_le_one_iff #align add_neg_nonpos_iff add_neg_nonpos_iff end TypeclassesRightLE section TypeclassesRightLT variable [LT α] [CovariantClass α α (swap (· * ·)) (· < ·)] {a b c : α} /-- Uses `right` co(ntra)variant. -/ @[to_additive (attr := simp) "Uses `right` co(ntra)variant."] theorem Right.inv_lt_one_iff : a⁻¹ < 1 ↔ 1 < a := by rw [← mul_lt_mul_iff_right a, inv_mul_self, one_mul] #align right.inv_lt_one_iff Right.inv_lt_one_iff #align right.neg_neg_iff Right.neg_neg_iff /-- Uses `right` co(ntra)variant. -/ @[to_additive (attr := simp) Right.neg_pos_iff "Uses `right` co(ntra)variant."] theorem Right.one_lt_inv_iff : 1 < a⁻¹ ↔ a < 1 := by rw [← mul_lt_mul_iff_right a, inv_mul_self, one_mul] #align right.one_lt_inv_iff Right.one_lt_inv_iff #align right.neg_pos_iff Right.neg_pos_iff @[to_additive] theorem inv_lt_iff_one_lt_mul : a⁻¹ < b ↔ 1 < b * a := (mul_lt_mul_iff_right a).symm.trans <\| by rw [inv_mul_self] #align inv_lt_iff_one_lt_mul inv_lt_iff_one_lt_mul #align neg_lt_iff_pos_add neg_lt_iff_pos_add @[to_additive] theorem lt_inv_iff_mul_lt_one : a < b⁻¹ ↔ a * b < 1 := (mul_lt_mul_iff_right b).symm.trans <\| by rw [inv_mul_self] #align lt_inv_iff_mul_lt_one lt_inv_iff_mul_lt_one #align lt_neg_iff_add_neg lt_neg_iff_add_neg @[to_additive (attr := simp)] theorem mul_inv_lt_iff_lt_mul : a * b⁻¹ < c ↔ a < c * b := by rw [← mul_lt_mul_iff_right b, inv_mul_cancel_right] #align mul_inv_lt_iff_lt_mul mul_inv_lt_iff_lt_mul #align add_neg_lt_iff_lt_add add_neg_lt_iff_lt_add @[to_additive (attr := simp)] theorem lt_mul_inv_iff_mul_lt : c < a * b⁻¹ ↔ c * b < a := (mul_lt_mul_iff_right b).symm.trans <\| by rw [inv_mul_cancel_right] #align lt_mul_inv_iff_mul_lt lt_mul_inv_iff_mul_lt #align lt_add_neg_iff_add_lt lt_add_neg_iff_add_lt -- Porting note (#10618): `simp` can prove this @[to_additive] theorem inv_mul_lt_one_iff_lt : a * b⁻¹ < 1 ↔ a < b := by rw [← mul_lt_mul_iff_right b, inv_mul_cancel_right, one_mul] #align inv_mul_lt_one_iff_lt inv_mul_lt_one_iff_lt #align neg_add_neg_iff_lt neg_add_neg_iff_lt @[to_additive] theorem lt_mul_inv_iff_lt : 1 < a * b⁻¹ ↔ b < a := by rw [← mul_lt_mul_iff_right b, one_mul, inv_mul_cancel_right] #align lt_mul_inv_iff_lt lt_mul_inv_iff_lt #align lt_add_neg_iff_lt lt_add_neg_iff_lt @[to_additive] theorem mul_inv_lt_one_iff : b * a⁻¹ < 1 ↔ b < a := _root_.trans mul_inv_lt_iff_lt_mul <\| by rw [one_mul] #align mul_inv_lt_one_iff mul_inv_lt_one_iff #align add_neg_neg_iff add_neg_neg_iff end TypeclassesRightLT section TypeclassesLeftRightLE variable [LE α] [CovariantClass α α (· * ·) (· ≤ ·)] [CovariantClass α α (swap (· * ·)) (· ≤ ·)] {a b c d : α} @[to_additive (attr := simp)] theorem inv_le_inv_iff : a⁻¹ ≤ b⁻¹ ↔ b ≤ a := by rw [← mul_le_mul_iff_left a, ← mul_le_mul_iff_right b] simp #align inv_le_inv_iff inv_le_inv_iff #align neg_le_neg_iff neg_le_neg_iff alias ⟨le_of_neg_le_neg, _⟩ := neg_le_neg_iff #align le_of_neg_le_neg le_of_neg_le_neg @[to_additive] theorem mul_inv_le_inv_mul_iff : a * b⁻¹ ≤ d⁻¹ * c ↔ d * a ≤ c * b := by rw [← mul_le_mul_iff_left d, ← mul_le_mul_iff_right b, mul_inv_cancel_left, mul_assoc, inv_mul_cancel_right] #align mul_inv_le_inv_mul_iff mul_inv_le_inv_mul_iff #align add_neg_le_neg_add_iff add_neg_le_neg_add_iff @[to_additive (attr := simp)] theorem div_le_self_iff (a : α) {b : α} : a / b ≤ a ↔ 1 ≤ b := by simp [div_eq_mul_inv] #align div_le_self_iff div_le_self_iff #align sub_le_self_iff sub_le_self_iff @[to_additive (attr := simp)] theorem le_div_self_iff (a : α) {b : α} : a ≤ a / b ↔ b ≤ 1 := by simp [div_eq_mul_inv] #align le_div_self_iff le_div_self_iff #align le_sub_self_iff le_sub_self_iff alias ⟨_, sub_le_self⟩ := sub_le_self_iff #align sub_le_self sub_le_self end TypeclassesLeftRightLE section TypeclassesLeftRightLT variable [LT α] [CovariantClass α α (· * ·) (· < ·)] [CovariantClass α α (swap (· * ·)) (· < ·)] {a b c d : α} @[to_additive (attr := simp)] theorem inv_lt_inv_iff : a⁻¹ < b⁻¹ ↔ b < a := by rw [← mul_lt_mul_iff_left a, ← mul_lt_mul_iff_right b] simp #align inv_lt_inv_iff inv_lt_inv_iff #align neg_lt_neg_iff neg_lt_neg_iff @[to_additive neg_lt] theorem inv_lt' : a⁻¹ < b ↔ b⁻¹ < a := by rw [← inv_lt_inv_iff, inv_inv] #align inv_lt' inv_lt' #align neg_lt neg_lt @[to_additive lt_neg] theorem lt_inv' : a < b⁻¹ ↔ b < a⁻¹ := by rw [← inv_lt_inv_iff, inv_inv] #align lt_inv' lt_inv' #align lt_neg lt_neg alias ⟨lt_inv_of_lt_inv, _⟩ := lt_inv' #align lt_inv_of_lt_inv lt_inv_of_lt_inv attribute [to_additive] lt_inv_of_lt_inv #align lt_neg_of_lt_neg lt_neg_of_lt_neg alias ⟨inv_lt_of_inv_lt', _⟩ := inv_lt' #align inv_lt_of_inv_lt' inv_lt_of_inv_lt' attribute [to_additive neg_lt_of_neg_lt] inv_lt_of_inv_lt' #align neg_lt_of_neg_lt neg_lt_of_neg_lt @[to_additive] theorem mul_inv_lt_inv_mul_iff : a * b⁻¹ < d⁻¹ * c ↔ d * a < c * b := by rw [← mul_lt_mul_iff_left d, ← mul_lt_mul_iff_right b, mul_inv_cancel_left, mul_assoc, inv_mul_cancel_right] #align mul_inv_lt_inv_mul_iff mul_inv_lt_inv_mul_iff #align add_neg_lt_neg_add_iff add_neg_lt_neg_add_iff @[to_additive (attr := simp)] theorem div_lt_self_iff (a : α) {b : α} : a / b < a ↔ 1 < b := by simp [div_eq_mul_inv] #align div_lt_self_iff div_lt_self_iff #align sub_lt_self_iff sub_lt_self_iff alias ⟨_, sub_lt_self⟩ := sub_lt_self_iff #align sub_lt_self sub_lt_self end TypeclassesLeftRightLT section Preorder variable [Preorder α] section LeftLE variable [CovariantClass α α (· * ·) (· ≤ ·)] {a : α} @[to_additive] theorem Left.inv_le_self (h : 1 ≤ a) : a⁻¹ ≤ a := le_trans (Left.inv_le_one_iff.mpr h) h #align left.inv_le_self Left.inv_le_self #align left.neg_le_self Left.neg_le_self alias neg_le_self := Left.neg_le_self #align neg_le_self neg_le_self @[to_additive] theorem Left.self_le_inv (h : a ≤ 1) : a ≤ a⁻¹ := le_trans h (Left.one_le_inv_iff.mpr h) #align left.self_le_inv Left.self_le_inv #align left.self_le_neg Left.self_le_neg end LeftLE section LeftLT variable [CovariantClass α α (· * ·) (· < ·)] {a : α} @[to_additive] theorem Left.inv_lt_self (h : 1 < a) : a⁻¹ < a := (Left.inv_lt_one_iff.mpr h).trans h #align left.inv_lt_self Left.inv_lt_self #align left.neg_lt_self Left.neg_lt_self alias neg_lt_self := Left.neg_lt_self #align neg_lt_self neg_lt_self @[to_additive] theorem Left.self_lt_inv (h : a < 1) : a < a⁻¹ := lt_trans h (Left.one_lt_inv_iff.mpr h) #align left.self_lt_inv Left.self_lt_inv #align left.self_lt_neg Left.self_lt_neg end LeftLT section RightLE variable [CovariantClass α α (swap (· * ·)) (· ≤ ·)] {a : α} @[to_additive] theorem Right.inv_le_self (h : 1 ≤ a) : a⁻¹ ≤ a := le_trans (Right.inv_le_one_iff.mpr h) h #align right.inv_le_self Right.inv_le_self #align right.neg_le_self Right.neg_le_self @[to_additive] theorem Right.self_le_inv (h : a ≤ 1) : a ≤ a⁻¹ := le_trans h (Right.one_le_inv_iff.mpr h) #align right.self_le_inv Right.self_le_inv #align right.self_le_neg Right.self_le_neg end RightLE section RightLT variable [CovariantClass α α (swap (· * ·)) (· < ·)] {a : α} @[to_additive] theorem Right.inv_lt_self (h : 1 < a) : a⁻¹ < a := (Right.inv_lt_one_iff.mpr h).trans h #align right.inv_lt_self Right.inv_lt_self #align right.neg_lt_self Right.neg_lt_self @[to_additive] theorem Right.self_lt_inv (h : a < 1) : a < a⁻¹ := lt_trans h (Right.one_lt_inv_iff.mpr h) #align right.self_lt_inv Right.self_lt_inv #align right.self_lt_neg Right.self_lt_neg end RightLT end Preorder end Group section CommGroup variable [CommGroup α] section LE variable [LE α] [CovariantClass α α (· * ·) (· ≤ ·)] {a b c d : α} @[to_additive] theorem inv_mul_le_iff_le_mul' : c⁻¹ * a ≤ b ↔ a ≤ b * c := by rw [inv_mul_le_iff_le_mul, mul_comm] #align inv_mul_le_iff_le_mul' inv_mul_le_iff_le_mul' #align neg_add_le_iff_le_add' neg_add_le_iff_le_add' -- Porting note: `simp` simplifies LHS to `a ≤ c * b` @[to_additive] theorem mul_inv_le_iff_le_mul' : a * b⁻¹ ≤ c ↔ a ≤ b * c := by rw [← inv_mul_le_iff_le_mul, mul_comm] #align mul_inv_le_iff_le_mul' mul_inv_le_iff_le_mul' #align add_neg_le_iff_le_add' add_neg_le_iff_le_add' @[to_additive add_neg_le_add_neg_iff] theorem mul_inv_le_mul_inv_iff' : a * b⁻¹ ≤ c * d⁻¹ ↔ a * d ≤ c * b := by rw [mul_comm c, mul_inv_le_inv_mul_iff, mul_comm] #align mul_inv_le_mul_inv_iff' mul_inv_le_mul_inv_iff' #align add_neg_le_add_neg_iff add_neg_le_add_neg_iff end LE section LT variable [LT α] [CovariantClass α α (· * ·) (· < ·)] {a b c d : α} @[to_additive] theorem inv_mul_lt_iff_lt_mul' : c⁻¹ * a < b ↔ a < b * c := by rw [inv_mul_lt_iff_lt_mul, mul_comm] #align inv_mul_lt_iff_lt_mul' inv_mul_lt_iff_lt_mul' #align neg_add_lt_iff_lt_add' neg_add_lt_iff_lt_add' -- Porting note: `simp` simplifies LHS to `a < c * b` @[to_additive] theorem mul_inv_lt_iff_le_mul' : a * b⁻¹ < c ↔ a < b * c := by rw [← inv_mul_lt_iff_lt_mul, mul_comm] #align mul_inv_lt_iff_le_mul' mul_inv_lt_iff_le_mul' #align add_neg_lt_iff_le_add' add_neg_lt_iff_le_add' @[to_additive add_neg_lt_add_neg_iff] theorem mul_inv_lt_mul_inv_iff' : a * b⁻¹ < c * d⁻¹ ↔ a * d < c * b := by rw [mul_comm c, mul_inv_lt_inv_mul_iff, mul_comm] #align mul_inv_lt_mul_inv_iff' mul_inv_lt_mul_inv_iff' #align add_neg_lt_add_neg_iff add_neg_lt_add_neg_iff end LT end CommGroup alias ⟨one_le_of_inv_le_one, _⟩ := Left.inv_le_one_iff #align one_le_of_inv_le_one one_le_of_inv_le_one attribute [to_additive] one_le_of_inv_le_one #align nonneg_of_neg_nonpos nonneg_of_neg_nonpos alias ⟨le_one_of_one_le_inv, _⟩ := Left.one_le_inv_iff #align le_one_of_one_le_inv le_one_of_one_le_inv attribute [to_additive nonpos_of_neg_nonneg] le_one_of_one_le_inv #align nonpos_of_neg_nonneg nonpos_of_neg_nonneg alias ⟨lt_of_inv_lt_inv, _⟩ := inv_lt_inv_iff #align lt_of_inv_lt_inv lt_of_inv_lt_inv attribute [to_additive] lt_of_inv_lt_inv #align lt_of_neg_lt_neg lt_of_neg_lt_neg alias ⟨one_lt_of_inv_lt_one, _⟩ := Left.inv_lt_one_iff #align one_lt_of_inv_lt_one one_lt_of_inv_lt_one attribute [to_additive] one_lt_of_inv_lt_one #align pos_of_neg_neg pos_of_neg_neg alias inv_lt_one_iff_one_lt := Left.inv_lt_one_iff #align inv_lt_one_iff_one_lt inv_lt_one_iff_one_lt attribute [to_additive] inv_lt_one_iff_one_lt #align neg_neg_iff_pos neg_neg_iff_pos alias inv_lt_one' := Left.inv_lt_one_iff #align inv_lt_one' inv_lt_one' attribute [to_additive neg_lt_zero] inv_lt_one' #align neg_lt_zero neg_lt_zero alias ⟨inv_of_one_lt_inv, _⟩ := Left.one_lt_inv_iff #align inv_of_one_lt_inv inv_of_one_lt_inv attribute [to_additive neg_of_neg_pos] inv_of_one_lt_inv #align neg_of_neg_pos neg_of_neg_pos alias ⟨_, one_lt_inv_of_inv⟩ := Left.one_lt_inv_iff #align one_lt_inv_of_inv one_lt_inv_of_inv attribute [to_additive neg_pos_of_neg] one_lt_inv_of_inv #align neg_pos_of_neg neg_pos_of_neg alias ⟨mul_le_of_le_inv_mul, _⟩ := le_inv_mul_iff_mul_le #align mul_le_of_le_inv_mul mul_le_of_le_inv_mul attribute [to_additive] mul_le_of_le_inv_mul #align add_le_of_le_neg_add add_le_of_le_neg_add alias ⟨_, le_inv_mul_of_mul_le⟩ := le_inv_mul_iff_mul_le #align le_inv_mul_of_mul_le le_inv_mul_of_mul_le attribute [to_additive] le_inv_mul_of_mul_le #align le_neg_add_of_add_le le_neg_add_of_add_le alias ⟨_, inv_mul_le_of_le_mul⟩ := inv_mul_le_iff_le_mul #align inv_mul_le_of_le_mul inv_mul_le_of_le_mul -- Porting note: was `inv_mul_le_iff_le_mul` attribute [to_additive] inv_mul_le_of_le_mul alias ⟨mul_lt_of_lt_inv_mul, _⟩ := lt_inv_mul_iff_mul_lt #align mul_lt_of_lt_inv_mul mul_lt_of_lt_inv_mul attribute [to_additive] mul_lt_of_lt_inv_mul #align add_lt_of_lt_neg_add add_lt_of_lt_neg_add alias ⟨_, lt_inv_mul_of_mul_lt⟩ := lt_inv_mul_iff_mul_lt #align lt_inv_mul_of_mul_lt lt_inv_mul_of_mul_lt attribute [to_additive] lt_inv_mul_of_mul_lt #align lt_neg_add_of_add_lt lt_neg_add_of_add_lt alias ⟨lt_mul_of_inv_mul_lt, inv_mul_lt_of_lt_mul⟩ := inv_mul_lt_iff_lt_mul #align lt_mul_of_inv_mul_lt lt_mul_of_inv_mul_lt #align inv_mul_lt_of_lt_mul inv_mul_lt_of_lt_mul attribute [to_additive] lt_mul_of_inv_mul_lt #align lt_add_of_neg_add_lt lt_add_of_neg_add_lt attribute [to_additive] inv_mul_lt_of_lt_mul #align neg_add_lt_of_lt_add neg_add_lt_of_lt_add alias lt_mul_of_inv_mul_lt_left := lt_mul_of_inv_mul_lt #align lt_mul_of_inv_mul_lt_left lt_mul_of_inv_mul_lt_left attribute [to_additive] lt_mul_of_inv_mul_lt_left #align lt_add_of_neg_add_lt_left lt_add_of_neg_add_lt_left alias inv_le_one' := Left.inv_le_one_iff #align inv_le_one' inv_le_one' attribute [to_additive neg_nonpos] inv_le_one' #align neg_nonpos neg_nonpos alias one_le_inv' := Left.one_le_inv_iff #align one_le_inv' one_le_inv' attribute [to_additive neg_nonneg] one_le_inv' #align neg_nonneg neg_nonneg alias one_lt_inv' := Left.one_lt_inv_iff #align one_lt_inv' one_lt_inv' attribute [to_additive neg_pos] one_lt_inv' #align neg_pos neg_pos alias OrderedCommGroup.mul_lt_mul_left' := mul_lt_mul_left' #align ordered_comm_group.mul_lt_mul_left' OrderedCommGroup.mul_lt_mul_left' attribute [to_additive OrderedAddCommGroup.add_lt_add_left] OrderedCommGroup.mul_lt_mul_left' #align ordered_add_comm_group.add_lt_add_left OrderedAddCommGroup.add_lt_add_left alias OrderedCommGroup.le_of_mul_le_mul_left := le_of_mul_le_mul_left' #align ordered_comm_group.le_of_mul_le_mul_left OrderedCommGroup.le_of_mul_le_mul_left attribute [to_additive] OrderedCommGroup.le_of_mul_le_mul_left #align ordered_add_comm_group.le_of_add_le_add_left OrderedAddCommGroup.le_of_add_le_add_left alias OrderedCommGroup.lt_of_mul_lt_mul_left := lt_of_mul_lt_mul_left' #align ordered_comm_group.lt_of_mul_lt_mul_left OrderedCommGroup.lt_of_mul_lt_mul_left attribute [to_additive] OrderedCommGroup.lt_of_mul_lt_mul_left #align ordered_add_comm_group.lt_of_add_lt_add_left OrderedAddCommGroup.lt_of_add_lt_add_left -- Most of the lemmas that are primed in this section appear in ordered_field. -- I (DT) did not try to minimise the assumptions. section Group variable [Group α] [LE α] section Right variable [CovariantClass α α (swap (· * ·)) (· ≤ ·)] {a b c d : α} @[to_additive] theorem div_le_div_iff_right (c : α) : a / c ≤ b / c ↔ a ≤ b := by simpa only [div_eq_mul_inv] using mul_le_mul_iff_right _ #align div_le_div_iff_right div_le_div_iff_right #align sub_le_sub_iff_right sub_le_sub_iff_right @[to_additive (attr := gcongr) sub_le_sub_right] theorem div_le_div_right' (h : a ≤ b) (c : α) : a / c ≤ b / c := (div_le_div_iff_right c).2 h #align div_le_div_right' div_le_div_right' #align sub_le_sub_right sub_le_sub_right @[to_additive (attr := simp) sub_nonneg] theorem one_le_div' : 1 ≤ a / b ↔ b ≤ a := by rw [← mul_le_mul_iff_right b, one_mul, div_eq_mul_inv, inv_mul_cancel_right] #align one_le_div' one_le_div' #align sub_nonneg sub_nonneg alias ⟨le_of_sub_nonneg, sub_nonneg_of_le⟩ := sub_nonneg #align sub_nonneg_of_le sub_nonneg_of_le #align le_of_sub_nonneg le_of_sub_nonneg @[to_additive sub_nonpos] theorem div_le_one' : a / b ≤ 1 ↔ a ≤ b := by rw [← mul_le_mul_iff_right b, one_mul, div_eq_mul_inv, inv_mul_cancel_right] #align div_le_one' div_le_one' #align sub_nonpos sub_nonpos alias ⟨le_of_sub_nonpos, sub_nonpos_of_le⟩ := sub_nonpos #align sub_nonpos_of_le sub_nonpos_of_le #align le_of_sub_nonpos le_of_sub_nonpos @[to_additive] theorem le_div_iff_mul_le : a ≤ c / b ↔ a * b ≤ c := by rw [← mul_le_mul_iff_right b, div_eq_mul_inv, inv_mul_cancel_right] #align le_div_iff_mul_le le_div_iff_mul_le #align le_sub_iff_add_le le_sub_iff_add_le alias ⟨add_le_of_le_sub_right, le_sub_right_of_add_le⟩ := le_sub_iff_add_le #align add_le_of_le_sub_right add_le_of_le_sub_right #align le_sub_right_of_add_le le_sub_right_of_add_le @[to_additive] theorem div_le_iff_le_mul : a / c ≤ b ↔ a ≤ b * c := by rw [← mul_le_mul_iff_right c, div_eq_mul_inv, inv_mul_cancel_right] #align div_le_iff_le_mul div_le_iff_le_mul #align sub_le_iff_le_add sub_le_iff_le_add -- Note: we intentionally don't have `@[simp]` for the additive version, -- since the LHS simplifies with `tsub_le_iff_right` attribute [simp] div_le_iff_le_mul -- TODO: Should we get rid of `sub_le_iff_le_add` in favor of -- (a renamed version of) `tsub_le_iff_right`? -- see Note [lower instance priority] instance (priority := 100) AddGroup.toHasOrderedSub {α : Type} [AddGroup α] [LE α] [CovariantClass α α (swap (· + ·)) (· ≤ ·)] : OrderedSub α := ⟨fun _ _ _ => sub_le_iff_le_add⟩ #align add_group.to_has_ordered_sub AddGroup.toHasOrderedSub end Right section Left variable [CovariantClass α α (· ·) (· ≤ ·)] variable [CovariantClass α α (swap (· * ·)) (· ≤ ·)] {a b c : α} @[to_additive] theorem div_le_div_iff_left (a : α) : a / b ≤ a / c ↔ c ≤ b := by rw [div_eq_mul_inv, div_eq_mul_inv, ← mul_le_mul_iff_left a⁻¹, inv_mul_cancel_left, inv_mul_cancel_left, inv_le_inv_iff] #align div_le_div_iff_left div_le_div_iff_left #align sub_le_sub_iff_left sub_le_sub_iff_left @[to_additive (attr := gcongr) sub_le_sub_left] theorem div_le_div_left' (h : a ≤ b) (c : α) : c / b ≤ c / a := (div_le_div_iff_left c).2 h #align div_le_div_left' div_le_div_left' #align sub_le_sub_left sub_le_sub_left end Left end Group section CommGroup variable [CommGroup α] section LE variable [LE α] [CovariantClass α α (· * ·) (· ≤ ·)] {a b c d : α} @[to_additive sub_le_sub_iff] theorem div_le_div_iff' : a / b ≤ c / d ↔ a * d ≤ c * b := by simpa only [div_eq_mul_inv] using mul_inv_le_mul_inv_iff' #align div_le_div_iff' div_le_div_iff' #align sub_le_sub_iff sub_le_sub_iff @[to_additive] theorem le_div_iff_mul_le' : b ≤ c / a ↔ a * b ≤ c := by rw [le_div_iff_mul_le, mul_comm] #align le_div_iff_mul_le' le_div_iff_mul_le' #align le_sub_iff_add_le' le_sub_iff_add_le' alias ⟨add_le_of_le_sub_left, le_sub_left_of_add_le⟩ := le_sub_iff_add_le' #align le_sub_left_of_add_le le_sub_left_of_add_le #align add_le_of_le_sub_left add_le_of_le_sub_left @[to_additive] theorem div_le_iff_le_mul' : a / b ≤ c ↔ a ≤ b * c := by rw [div_le_iff_le_mul, mul_comm] #align div_le_iff_le_mul' div_le_iff_le_mul' #align sub_le_iff_le_add' sub_le_iff_le_add' alias ⟨le_add_of_sub_left_le, sub_left_le_of_le_add⟩ := sub_le_iff_le_add' #align sub_left_le_of_le_add sub_left_le_of_le_add #align le_add_of_sub_left_le le_add_of_sub_left_le @[to_additive (attr := simp)] theorem inv_le_div_iff_le_mul : b⁻¹ ≤ a / c ↔ c ≤ a * b := le_div_iff_mul_le.trans inv_mul_le_iff_le_mul' #align inv_le_div_iff_le_mul inv_le_div_iff_le_mul #align neg_le_sub_iff_le_add neg_le_sub_iff_le_add @[to_additive] theorem inv_le_div_iff_le_mul' : a⁻¹ ≤ b / c ↔ c ≤ a * b := by rw [inv_le_div_iff_le_mul, mul_comm] #align inv_le_div_iff_le_mul' inv_le_div_iff_le_mul' #align neg_le_sub_iff_le_add' neg_le_sub_iff_le_add' @[to_additive] theorem div_le_comm : a / b ≤ c ↔ a / c ≤ b := div_le_iff_le_mul'.trans div_le_iff_le_mul.symm #align div_le_comm div_le_comm #align sub_le_comm sub_le_comm @[to_additive] theorem le_div_comm : a ≤ b / c ↔ c ≤ b / a := le_div_iff_mul_le'.trans le_div_iff_mul_le.symm #align le_div_comm le_div_comm #align le_sub_comm le_sub_comm end LE section Preorder variable [Preorder α] [CovariantClass α α (· * ·) (· ≤ ·)] {a b c d : α} @[to_additive (attr := gcongr) sub_le_sub] theorem div_le_div'' (hab : a ≤ b) (hcd : c ≤ d) : a / d ≤ b / c := by rw [div_eq_mul_inv, div_eq_mul_inv, mul_comm b, mul_inv_le_inv_mul_iff, mul_comm] exact mul_le_mul' hab hcd #align div_le_div'' div_le_div'' #align sub_le_sub sub_le_sub end Preorder end CommGroup -- Most of the lemmas that are primed in this section appear in ordered_field. -- I (DT) did not try to minimise the assumptions. section Group variable [Group α] [LT α] section Right variable [CovariantClass α α (swap (· * ·)) (· < ·)] {a b c d : α} @[to_additive (attr := simp)] theorem div_lt_div_iff_right (c : α) : a / c < b / c ↔ a < b := by simpa only [div_eq_mul_inv] using mul_lt_mul_iff_right _ #align div_lt_div_iff_right div_lt_div_iff_right #align sub_lt_sub_iff_right sub_lt_sub_iff_right @[to_additive (attr := gcongr) sub_lt_sub_right] theorem div_lt_div_right' (h : a < b) (c : α) : a / c < b / c := (div_lt_div_iff_right c).2 h #align div_lt_div_right' div_lt_div_right' #align sub_lt_sub_right sub_lt_sub_right @[to_additive (attr := simp) sub_pos] theorem one_lt_div' : 1 < a / b ↔ b < a := by rw [← mul_lt_mul_iff_right b, one_mul, div_eq_mul_inv, inv_mul_cancel_right] #align one_lt_div' one_lt_div' #align sub_pos sub_pos alias ⟨lt_of_sub_pos, sub_pos_of_lt⟩ := sub_pos #align lt_of_sub_pos lt_of_sub_pos #align sub_pos_of_lt sub_pos_of_lt @[to_additive (attr := simp) sub_neg "For `a - -b = a + b`, see `sub_neg_eq_add`."] theorem div_lt_one' : a / b < 1 ↔ a < b := by rw [← mul_lt_mul_iff_right b, one_mul, div_eq_mul_inv, inv_mul_cancel_right] #align div_lt_one' div_lt_one' #align sub_neg sub_neg alias ⟨lt_of_sub_neg, sub_neg_of_lt⟩ := sub_neg #align lt_of_sub_neg lt_of_sub_neg #align sub_neg_of_lt sub_neg_of_lt alias sub_lt_zero := sub_neg #align sub_lt_zero sub_lt_zero @[to_additive] theorem lt_div_iff_mul_lt : a < c / b ↔ a * b < c := by rw [← mul_lt_mul_iff_right b, div_eq_mul_inv, inv_mul_cancel_right] #align lt_div_iff_mul_lt lt_div_iff_mul_lt #align lt_sub_iff_add_lt lt_sub_iff_add_lt alias ⟨add_lt_of_lt_sub_right, lt_sub_right_of_add_lt⟩ := lt_sub_iff_add_lt #align add_lt_of_lt_sub_right add_lt_of_lt_sub_right #align lt_sub_right_of_add_lt lt_sub_right_of_add_lt @[to_additive] theorem div_lt_iff_lt_mul : a / c < b ↔ a < b * c := by rw [← mul_lt_mul_iff_right c, div_eq_mul_inv, inv_mul_cancel_right] #align div_lt_iff_lt_mul div_lt_iff_lt_mul #align sub_lt_iff_lt_add sub_lt_iff_lt_add alias ⟨lt_add_of_sub_right_lt, sub_right_lt_of_lt_add⟩ := sub_lt_iff_lt_add #align lt_add_of_sub_right_lt lt_add_of_sub_right_lt #align sub_right_lt_of_lt_add sub_right_lt_of_lt_add end Right section Left variable [CovariantClass α α (· * ·) (· < ·)] [CovariantClass α α (swap (· * ·)) (· < ·)] {a b c : α} @[to_additive (attr := simp)] theorem div_lt_div_iff_left (a : α) : a / b < a / c ↔ c < b := by rw [div_eq_mul_inv, div_eq_mul_inv, ← mul_lt_mul_iff_left a⁻¹, inv_mul_cancel_left, inv_mul_cancel_left, inv_lt_inv_iff] #align div_lt_div_iff_left div_lt_div_iff_left #align sub_lt_sub_iff_left sub_lt_sub_iff_left @[to_additive (attr := simp)] theorem inv_lt_div_iff_lt_mul : a⁻¹ < b / c ↔ c < a * b := by rw [div_eq_mul_inv, lt_mul_inv_iff_mul_lt, inv_mul_lt_iff_lt_mul] #align inv_lt_div_iff_lt_mul inv_lt_div_iff_lt_mul #align neg_lt_sub_iff_lt_add neg_lt_sub_iff_lt_add @[to_additive (attr := gcongr) sub_lt_sub_left] theorem div_lt_div_left' (h : a < b) (c : α) : c / b < c / a := (div_lt_div_iff_left c).2 h #align div_lt_div_left' div_lt_div_left' #align sub_lt_sub_left sub_lt_sub_left end Left end Group section CommGroup variable [CommGroup α] section LT variable [LT α] [CovariantClass α α (· * ·) (· < ·)] {a b c d : α} @[to_additive sub_lt_sub_iff] theorem div_lt_div_iff' : a / b < c / d ↔ a * d < c * b := by simpa only [div_eq_mul_inv] using mul_inv_lt_mul_inv_iff' #align div_lt_div_iff' div_lt_div_iff' #align sub_lt_sub_iff sub_lt_sub_iff @[to_additive] theorem lt_div_iff_mul_lt' : b < c / a ↔ a * b < c := by rw [lt_div_iff_mul_lt, mul_comm] #align lt_div_iff_mul_lt' lt_div_iff_mul_lt' #align lt_sub_iff_add_lt' lt_sub_iff_add_lt' alias ⟨add_lt_of_lt_sub_left, lt_sub_left_of_add_lt⟩ := lt_sub_iff_add_lt' #align lt_sub_left_of_add_lt lt_sub_left_of_add_lt #align add_lt_of_lt_sub_left add_lt_of_lt_sub_left @[to_additive] theorem div_lt_iff_lt_mul' : a / b < c ↔ a < b * c := by rw [div_lt_iff_lt_mul, mul_comm] #align div_lt_iff_lt_mul' div_lt_iff_lt_mul' #align sub_lt_iff_lt_add' sub_lt_iff_lt_add' alias ⟨lt_add_of_sub_left_lt, sub_left_lt_of_lt_add⟩ := sub_lt_iff_lt_add' #align lt_add_of_sub_left_lt lt_add_of_sub_left_lt #align sub_left_lt_of_lt_add sub_left_lt_of_lt_add @[to_additive] theorem inv_lt_div_iff_lt_mul' : b⁻¹ < a / c ↔ c < a * b := lt_div_iff_mul_lt.trans inv_mul_lt_iff_lt_mul' #align inv_lt_div_iff_lt_mul' inv_lt_div_iff_lt_mul' #align neg_lt_sub_iff_lt_add' neg_lt_sub_iff_lt_add' @[to_additive] theorem div_lt_comm : a / b < c ↔ a / c < b := div_lt_iff_lt_mul'.trans div_lt_iff_lt_mul.symm #align div_lt_comm div_lt_comm #align sub_lt_comm sub_lt_comm @[to_additive] theorem lt_div_comm : a < b / c ↔ c < b / a := lt_div_iff_mul_lt'.trans lt_div_iff_mul_lt.symm #align lt_div_comm lt_div_comm #align lt_sub_comm lt_sub_comm end LT section Preorder variable [Preorder α] [CovariantClass α α (· * ·) (· < ·)] {a b c d : α} @[to_additive (attr := gcongr) sub_lt_sub] theorem div_lt_div'' (hab : a < b) (hcd : c < d) : a / d < b / c := by rw [div_eq_mul_inv, div_eq_mul_inv, mul_comm b, mul_inv_lt_inv_mul_iff, mul_comm] exact mul_lt_mul_of_lt_of_lt hab hcd #align div_lt_div'' div_lt_div'' #align sub_lt_sub sub_lt_sub end Preorder section LinearOrder variable [LinearOrder α] [CovariantClass α α (· * ·) (· ≤ ·)] {a b c d : α} @[to_additive] lemma lt_or_lt_of_div_lt_div : a / d < b / c → a < b ∨ c < d := by contrapose!; exact fun h ↦ div_le_div'' h.1 h.2 end LinearOrder end CommGroup section LinearOrder variable [Group α] [LinearOrder α] @[to_additive (attr := simp) cmp_sub_zero] theorem cmp_div_one' [CovariantClass α α (swap (· * ·)) (· ≤ ·)] (a b : α) : cmp (a / b) 1 = cmp a b := by rw [← cmp_mul_right' _ _ b, one_mul, div_mul_cancel] #align cmp_div_one' cmp_div_one' #align cmp_sub_zero cmp_sub_zero variable [CovariantClass α α (· * ·) (· ≤ ·)] section VariableNames variable {a b c : α} @[to_additive] theorem le_of_forall_one_lt_lt_mul (h : ∀ ε : α, 1 < ε → a < b * ε) : a ≤ b := le_of_not_lt fun h₁ => lt_irrefl a (by simpa using h _ (lt_inv_mul_iff_lt.mpr h₁)) #align le_of_forall_one_lt_lt_mul le_of_forall_one_lt_lt_mul #align le_of_forall_pos_lt_add le_of_forall_pos_lt_add @[to_additive] theorem le_iff_forall_one_lt_lt_mul : a ≤ b ↔ ∀ ε, 1 < ε → a < b * ε := ⟨fun h _ => lt_mul_of_le_of_one_lt h, le_of_forall_one_lt_lt_mul⟩ #align le_iff_forall_one_lt_lt_mul le_iff_forall_one_lt_lt_mul #align le_iff_forall_pos_lt_add le_iff_forall_pos_lt_add /- I (DT) introduced this lemma to prove (the additive version `sub_le_sub_flip` of) `div_le_div_flip` below. Now I wonder what is the point of either of these lemmas... -/ @[to_additive]	Mathlib/Algebra/Order/Group/Defs.lean	1,064	1,069	theorem div_le_inv_mul_iff [CovariantClass α α (swap (· * ·)) (· ≤ ·)] : a / b ≤ a⁻¹ * b ↔ a ≤ b := by	rw [div_eq_mul_inv, mul_inv_le_inv_mul_iff] exact ⟨fun h => not_lt.mp fun k => not_lt.mpr h (mul_lt_mul_of_lt_of_lt k k), fun h => mul_le_mul' h h⟩
/- Copyright (c) 2020 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau -/ import Mathlib.RingTheory.Polynomial.Basic import Mathlib.RingTheory.Ideal.LocalRing #align_import data.polynomial.expand from "leanprover-community/mathlib"@"bbeb185db4ccee8ed07dc48449414ebfa39cb821" /-! # Expand a polynomial by a factor of p, so `∑ aₙ xⁿ` becomes `∑ aₙ xⁿᵖ`. ## Main definitions * `Polynomial.expand R p f`: expand the polynomial `f` with coefficients in a commutative semiring `R` by a factor of p, so `expand R p (∑ aₙ xⁿ)` is `∑ aₙ xⁿᵖ`. * `Polynomial.contract p f`: the opposite of `expand`, so it sends `∑ aₙ xⁿᵖ` to `∑ aₙ xⁿ`. -/ universe u v w open Polynomial open Finset namespace Polynomial section CommSemiring variable (R : Type u) [CommSemiring R] {S : Type v} [CommSemiring S] (p q : ℕ) /-- Expand the polynomial by a factor of p, so `∑ aₙ xⁿ` becomes `∑ aₙ xⁿᵖ`. -/ noncomputable def expand : R[X] →ₐ[R] R[X] := { (eval₂RingHom C (X ^ p) : R[X] →+* R[X]) with commutes' := fun _ => eval₂_C _ _ } #align polynomial.expand Polynomial.expand theorem coe_expand : (expand R p : R[X] → R[X]) = eval₂ C (X ^ p) := rfl #align polynomial.coe_expand Polynomial.coe_expand variable {R} theorem expand_eq_comp_X_pow {f : R[X]} : expand R p f = f.comp (X ^ p) := rfl theorem expand_eq_sum {f : R[X]} : expand R p f = f.sum fun e a => C a * (X ^ p) ^ e := by simp [expand, eval₂] #align polynomial.expand_eq_sum Polynomial.expand_eq_sum @[simp] theorem expand_C (r : R) : expand R p (C r) = C r := eval₂_C _ _ set_option linter.uppercaseLean3 false in #align polynomial.expand_C Polynomial.expand_C @[simp] theorem expand_X : expand R p X = X ^ p := eval₂_X _ _ set_option linter.uppercaseLean3 false in #align polynomial.expand_X Polynomial.expand_X @[simp] theorem expand_monomial (r : R) : expand R p (monomial q r) = monomial (q * p) r := by simp_rw [← smul_X_eq_monomial, AlgHom.map_smul, AlgHom.map_pow, expand_X, mul_comm, pow_mul] #align polynomial.expand_monomial Polynomial.expand_monomial theorem expand_expand (f : R[X]) : expand R p (expand R q f) = expand R (p * q) f := Polynomial.induction_on f (fun r => by simp_rw [expand_C]) (fun f g ihf ihg => by simp_rw [AlgHom.map_add, ihf, ihg]) fun n r _ => by simp_rw [AlgHom.map_mul, expand_C, AlgHom.map_pow, expand_X, AlgHom.map_pow, expand_X, pow_mul] #align polynomial.expand_expand Polynomial.expand_expand theorem expand_mul (f : R[X]) : expand R (p * q) f = expand R p (expand R q f) := (expand_expand p q f).symm #align polynomial.expand_mul Polynomial.expand_mul @[simp] theorem expand_zero (f : R[X]) : expand R 0 f = C (eval 1 f) := by simp [expand] #align polynomial.expand_zero Polynomial.expand_zero @[simp] theorem expand_one (f : R[X]) : expand R 1 f = f := Polynomial.induction_on f (fun r => by rw [expand_C]) (fun f g ihf ihg => by rw [AlgHom.map_add, ihf, ihg]) fun n r _ => by rw [AlgHom.map_mul, expand_C, AlgHom.map_pow, expand_X, pow_one] #align polynomial.expand_one Polynomial.expand_one theorem expand_pow (f : R[X]) : expand R (p ^ q) f = (expand R p)^[q] f := Nat.recOn q (by rw [pow_zero, expand_one, Function.iterate_zero, id]) fun n ih => by rw [Function.iterate_succ_apply', pow_succ', expand_mul, ih] #align polynomial.expand_pow Polynomial.expand_pow theorem derivative_expand (f : R[X]) : Polynomial.derivative (expand R p f) = expand R p (Polynomial.derivative f) * (p * (X ^ (p - 1) : R[X])) := by rw [coe_expand, derivative_eval₂_C, derivative_pow, C_eq_natCast, derivative_X, mul_one] #align polynomial.derivative_expand Polynomial.derivative_expand theorem coeff_expand {p : ℕ} (hp : 0 < p) (f : R[X]) (n : ℕ) : (expand R p f).coeff n = if p ∣ n then f.coeff (n / p) else 0 := by simp only [expand_eq_sum] simp_rw [coeff_sum, ← pow_mul, C_mul_X_pow_eq_monomial, coeff_monomial, sum] split_ifs with h · rw [Finset.sum_eq_single (n / p), Nat.mul_div_cancel' h, if_pos rfl] · intro b _ hb2 rw [if_neg] intro hb3 apply hb2 rw [← hb3, Nat.mul_div_cancel_left b hp] · intro hn rw [not_mem_support_iff.1 hn] split_ifs <;> rfl · rw [Finset.sum_eq_zero] intro k _ rw [if_neg] exact fun hkn => h ⟨k, hkn.symm⟩ #align polynomial.coeff_expand Polynomial.coeff_expand @[simp] theorem coeff_expand_mul {p : ℕ} (hp : 0 < p) (f : R[X]) (n : ℕ) : (expand R p f).coeff (n * p) = f.coeff n := by rw [coeff_expand hp, if_pos (dvd_mul_left _ _), Nat.mul_div_cancel _ hp] #align polynomial.coeff_expand_mul Polynomial.coeff_expand_mul @[simp] theorem coeff_expand_mul' {p : ℕ} (hp : 0 < p) (f : R[X]) (n : ℕ) : (expand R p f).coeff (p * n) = f.coeff n := by rw [mul_comm, coeff_expand_mul hp] #align polynomial.coeff_expand_mul' Polynomial.coeff_expand_mul' /-- Expansion is injective. -/ theorem expand_injective {n : ℕ} (hn : 0 < n) : Function.Injective (expand R n) := fun g g' H => ext fun k => by rw [← coeff_expand_mul hn, H, coeff_expand_mul hn] #align polynomial.expand_injective Polynomial.expand_injective theorem expand_inj {p : ℕ} (hp : 0 < p) {f g : R[X]} : expand R p f = expand R p g ↔ f = g := (expand_injective hp).eq_iff #align polynomial.expand_inj Polynomial.expand_inj theorem expand_eq_zero {p : ℕ} (hp : 0 < p) {f : R[X]} : expand R p f = 0 ↔ f = 0 := (expand_injective hp).eq_iff' (map_zero _) #align polynomial.expand_eq_zero Polynomial.expand_eq_zero theorem expand_ne_zero {p : ℕ} (hp : 0 < p) {f : R[X]} : expand R p f ≠ 0 ↔ f ≠ 0 := (expand_eq_zero hp).not #align polynomial.expand_ne_zero Polynomial.expand_ne_zero theorem expand_eq_C {p : ℕ} (hp : 0 < p) {f : R[X]} {r : R} : expand R p f = C r ↔ f = C r := by rw [← expand_C, expand_inj hp, expand_C] set_option linter.uppercaseLean3 false in #align polynomial.expand_eq_C Polynomial.expand_eq_C theorem natDegree_expand (p : ℕ) (f : R[X]) : (expand R p f).natDegree = f.natDegree * p := by rcases p.eq_zero_or_pos with hp \| hp · rw [hp, coe_expand, pow_zero, mul_zero, ← C_1, eval₂_hom, natDegree_C] by_cases hf : f = 0 · rw [hf, AlgHom.map_zero, natDegree_zero, zero_mul] have hf1 : expand R p f ≠ 0 := mt (expand_eq_zero hp).1 hf rw [← WithBot.coe_eq_coe] convert (degree_eq_natDegree hf1).symm -- Porting note: was `rw [degree_eq_natDegree hf1]` symm refine le_antisymm ((degree_le_iff_coeff_zero _ _).2 fun n hn => ?_) ?_ · rw [coeff_expand hp] split_ifs with hpn · rw [coeff_eq_zero_of_natDegree_lt] contrapose! hn erw [WithBot.coe_le_coe, ← Nat.div_mul_cancel hpn] exact Nat.mul_le_mul_right p hn · rfl · refine le_degree_of_ne_zero ?_ erw [coeff_expand_mul hp, ← leadingCoeff] exact mt leadingCoeff_eq_zero.1 hf #align polynomial.nat_degree_expand Polynomial.natDegree_expand theorem leadingCoeff_expand {p : ℕ} {f : R[X]} (hp : 0 < p) : (expand R p f).leadingCoeff = f.leadingCoeff := by simp_rw [leadingCoeff, natDegree_expand, coeff_expand_mul hp] theorem monic_expand_iff {p : ℕ} {f : R[X]} (hp : 0 < p) : (expand R p f).Monic ↔ f.Monic := by simp only [Monic, leadingCoeff_expand hp] alias ⟨_, Monic.expand⟩ := monic_expand_iff #align polynomial.monic.expand Polynomial.Monic.expand	Mathlib/Algebra/Polynomial/Expand.lean	185	191	theorem map_expand {p : ℕ} {f : R →+* S} {q : R[X]} : map f (expand R p q) = expand S p (map f q) := by	by_cases hp : p = 0 · simp [hp] ext rw [coeff_map, coeff_expand (Nat.pos_of_ne_zero hp), coeff_expand (Nat.pos_of_ne_zero hp)] split_ifs <;> simp_all
/- Copyright (c) 2019 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen, Lu-Ming Zhang -/ import Mathlib.Data.Matrix.Invertible import Mathlib.LinearAlgebra.Matrix.Adjugate import Mathlib.LinearAlgebra.FiniteDimensional #align_import linear_algebra.matrix.nonsingular_inverse from "leanprover-community/mathlib"@"722b3b152ddd5e0cf21c0a29787c76596cb6b422" /-! # Nonsingular inverses In this file, we define an inverse for square matrices of invertible determinant. For matrices that are not square or not of full rank, there is a more general notion of pseudoinverses which we do not consider here. The definition of inverse used in this file is the adjugate divided by the determinant. We show that dividing the adjugate by `det A` (if possible), giving a matrix `A⁻¹` (`nonsing_inv`), will result in a multiplicative inverse to `A`. Note that there are at least three different inverses in mathlib: * `A⁻¹` (`Inv.inv`): alone, this satisfies no properties, although it is usually used in conjunction with `Group` or `GroupWithZero`. On matrices, this is defined to be zero when no inverse exists. * `⅟A` (`invOf`): this is only available in the presence of `[Invertible A]`, which guarantees an inverse exists. * `Ring.inverse A`: this is defined on any `MonoidWithZero`, and just like `⁻¹` on matrices, is defined to be zero when no inverse exists. We start by working with `Invertible`, and show the main results: * `Matrix.invertibleOfDetInvertible` * `Matrix.detInvertibleOfInvertible` * `Matrix.isUnit_iff_isUnit_det` * `Matrix.mul_eq_one_comm` After this we define `Matrix.inv` and show it matches `⅟A` and `Ring.inverse A`. The rest of the results in the file are then about `A⁻¹` ## References * https://en.wikipedia.org/wiki/Cramer's_rule#Finding_inverse_matrix ## Tags matrix inverse, cramer, cramer's rule, adjugate -/ namespace Matrix universe u u' v variable {l : Type} {m : Type u} {n : Type u'} {α : Type v} open Matrix Equiv Equiv.Perm Finset /-! ### Matrices are `Invertible` iff their determinants are -/ section Invertible variable [Fintype n] [DecidableEq n] [CommRing α] variable (A : Matrix n n α) (B : Matrix n n α) /-- If `A.det` has a constructive inverse, produce one for `A`. -/ def invertibleOfDetInvertible [Invertible A.det] : Invertible A where invOf := ⅟ A.det • A.adjugate mul_invOf_self := by rw [mul_smul_comm, mul_adjugate, smul_smul, invOf_mul_self, one_smul] invOf_mul_self := by rw [smul_mul_assoc, adjugate_mul, smul_smul, invOf_mul_self, one_smul] #align matrix.invertible_of_det_invertible Matrix.invertibleOfDetInvertible theorem invOf_eq [Invertible A.det] [Invertible A] : ⅟ A = ⅟ A.det • A.adjugate := by letI := invertibleOfDetInvertible A convert (rfl : ⅟ A = _) #align matrix.inv_of_eq Matrix.invOf_eq /-- `A.det` is invertible if `A` has a left inverse. -/ def detInvertibleOfLeftInverse (h : B A = 1) : Invertible A.det where invOf := B.det mul_invOf_self := by rw [mul_comm, ← det_mul, h, det_one] invOf_mul_self := by rw [← det_mul, h, det_one] #align matrix.det_invertible_of_left_inverse Matrix.detInvertibleOfLeftInverse /-- `A.det` is invertible if `A` has a right inverse. -/ def detInvertibleOfRightInverse (h : A * B = 1) : Invertible A.det where invOf := B.det mul_invOf_self := by rw [← det_mul, h, det_one] invOf_mul_self := by rw [mul_comm, ← det_mul, h, det_one] #align matrix.det_invertible_of_right_inverse Matrix.detInvertibleOfRightInverse /-- If `A` has a constructive inverse, produce one for `A.det`. -/ def detInvertibleOfInvertible [Invertible A] : Invertible A.det := detInvertibleOfLeftInverse A (⅟ A) (invOf_mul_self _) #align matrix.det_invertible_of_invertible Matrix.detInvertibleOfInvertible theorem det_invOf [Invertible A] [Invertible A.det] : (⅟ A).det = ⅟ A.det := by letI := detInvertibleOfInvertible A convert (rfl : _ = ⅟ A.det) #align matrix.det_inv_of Matrix.det_invOf /-- Together `Matrix.detInvertibleOfInvertible` and `Matrix.invertibleOfDetInvertible` form an equivalence, although both sides of the equiv are subsingleton anyway. -/ @[simps] def invertibleEquivDetInvertible : Invertible A ≃ Invertible A.det where toFun := @detInvertibleOfInvertible _ _ _ _ _ A invFun := @invertibleOfDetInvertible _ _ _ _ _ A left_inv _ := Subsingleton.elim _ _ right_inv _ := Subsingleton.elim _ _ #align matrix.invertible_equiv_det_invertible Matrix.invertibleEquivDetInvertible variable {A B} theorem mul_eq_one_comm : A * B = 1 ↔ B * A = 1 := suffices ∀ A B : Matrix n n α, A * B = 1 → B * A = 1 from ⟨this A B, this B A⟩ fun A B h => by letI : Invertible B.det := detInvertibleOfLeftInverse _ _ h letI : Invertible B := invertibleOfDetInvertible B calc B * A = B * A * (B * ⅟ B) := by rw [mul_invOf_self, Matrix.mul_one] _ = B * (A * B * ⅟ B) := by simp only [Matrix.mul_assoc] _ = B * ⅟ B := by rw [h, Matrix.one_mul] _ = 1 := mul_invOf_self B #align matrix.mul_eq_one_comm Matrix.mul_eq_one_comm variable (A B) /-- We can construct an instance of invertible A if A has a left inverse. -/ def invertibleOfLeftInverse (h : B * A = 1) : Invertible A := ⟨B, h, mul_eq_one_comm.mp h⟩ #align matrix.invertible_of_left_inverse Matrix.invertibleOfLeftInverse /-- We can construct an instance of invertible A if A has a right inverse. -/ def invertibleOfRightInverse (h : A * B = 1) : Invertible A := ⟨B, mul_eq_one_comm.mp h, h⟩ #align matrix.invertible_of_right_inverse Matrix.invertibleOfRightInverse /-- Given a proof that `A.det` has a constructive inverse, lift `A` to `(Matrix n n α)ˣ`-/ def unitOfDetInvertible [Invertible A.det] : (Matrix n n α)ˣ := @unitOfInvertible _ _ A (invertibleOfDetInvertible A) #align matrix.unit_of_det_invertible Matrix.unitOfDetInvertible /-- When lowered to a prop, `Matrix.invertibleEquivDetInvertible` forms an `iff`. -/ theorem isUnit_iff_isUnit_det : IsUnit A ↔ IsUnit A.det := by simp only [← nonempty_invertible_iff_isUnit, (invertibleEquivDetInvertible A).nonempty_congr] #align matrix.is_unit_iff_is_unit_det Matrix.isUnit_iff_isUnit_det @[simp] theorem isUnits_det_units (A : (Matrix n n α)ˣ) : IsUnit (A : Matrix n n α).det := isUnit_iff_isUnit_det _ \|>.mp A.isUnit /-! #### Variants of the statements above with `IsUnit`-/ theorem isUnit_det_of_invertible [Invertible A] : IsUnit A.det := @isUnit_of_invertible _ _ _ (detInvertibleOfInvertible A) #align matrix.is_unit_det_of_invertible Matrix.isUnit_det_of_invertible variable {A B} theorem isUnit_of_left_inverse (h : B * A = 1) : IsUnit A := ⟨⟨A, B, mul_eq_one_comm.mp h, h⟩, rfl⟩ #align matrix.is_unit_of_left_inverse Matrix.isUnit_of_left_inverse theorem exists_left_inverse_iff_isUnit : (∃ B, B * A = 1) ↔ IsUnit A := ⟨fun ⟨_, h⟩ ↦ isUnit_of_left_inverse h, fun h ↦ have := h.invertible; ⟨⅟A, invOf_mul_self' A⟩⟩ theorem isUnit_of_right_inverse (h : A * B = 1) : IsUnit A := ⟨⟨A, B, h, mul_eq_one_comm.mp h⟩, rfl⟩ #align matrix.is_unit_of_right_inverse Matrix.isUnit_of_right_inverse theorem exists_right_inverse_iff_isUnit : (∃ B, A * B = 1) ↔ IsUnit A := ⟨fun ⟨_, h⟩ ↦ isUnit_of_right_inverse h, fun h ↦ have := h.invertible; ⟨⅟A, mul_invOf_self' A⟩⟩ theorem isUnit_det_of_left_inverse (h : B * A = 1) : IsUnit A.det := @isUnit_of_invertible _ _ _ (detInvertibleOfLeftInverse _ _ h) #align matrix.is_unit_det_of_left_inverse Matrix.isUnit_det_of_left_inverse theorem isUnit_det_of_right_inverse (h : A * B = 1) : IsUnit A.det := @isUnit_of_invertible _ _ _ (detInvertibleOfRightInverse _ _ h) #align matrix.is_unit_det_of_right_inverse Matrix.isUnit_det_of_right_inverse theorem det_ne_zero_of_left_inverse [Nontrivial α] (h : B * A = 1) : A.det ≠ 0 := (isUnit_det_of_left_inverse h).ne_zero #align matrix.det_ne_zero_of_left_inverse Matrix.det_ne_zero_of_left_inverse theorem det_ne_zero_of_right_inverse [Nontrivial α] (h : A * B = 1) : A.det ≠ 0 := (isUnit_det_of_right_inverse h).ne_zero #align matrix.det_ne_zero_of_right_inverse Matrix.det_ne_zero_of_right_inverse end Invertible section Inv variable [Fintype n] [DecidableEq n] [CommRing α] variable (A : Matrix n n α) (B : Matrix n n α) theorem isUnit_det_transpose (h : IsUnit A.det) : IsUnit Aᵀ.det := by rw [det_transpose] exact h #align matrix.is_unit_det_transpose Matrix.isUnit_det_transpose /-! ### A noncomputable `Inv` instance -/ /-- The inverse of a square matrix, when it is invertible (and zero otherwise). -/ noncomputable instance inv : Inv (Matrix n n α) := ⟨fun A => Ring.inverse A.det • A.adjugate⟩ theorem inv_def (A : Matrix n n α) : A⁻¹ = Ring.inverse A.det • A.adjugate := rfl #align matrix.inv_def Matrix.inv_def theorem nonsing_inv_apply_not_isUnit (h : ¬IsUnit A.det) : A⁻¹ = 0 := by rw [inv_def, Ring.inverse_non_unit _ h, zero_smul] #align matrix.nonsing_inv_apply_not_is_unit Matrix.nonsing_inv_apply_not_isUnit theorem nonsing_inv_apply (h : IsUnit A.det) : A⁻¹ = (↑h.unit⁻¹ : α) • A.adjugate := by rw [inv_def, ← Ring.inverse_unit h.unit, IsUnit.unit_spec] #align matrix.nonsing_inv_apply Matrix.nonsing_inv_apply /-- The nonsingular inverse is the same as `invOf` when `A` is invertible. -/ @[simp] theorem invOf_eq_nonsing_inv [Invertible A] : ⅟ A = A⁻¹ := by letI := detInvertibleOfInvertible A rw [inv_def, Ring.inverse_invertible, invOf_eq] #align matrix.inv_of_eq_nonsing_inv Matrix.invOf_eq_nonsing_inv /-- Coercing the result of `Units.instInv` is the same as coercing first and applying the nonsingular inverse. -/ @[simp, norm_cast] theorem coe_units_inv (A : (Matrix n n α)ˣ) : ↑A⁻¹ = (A⁻¹ : Matrix n n α) := by letI := A.invertible rw [← invOf_eq_nonsing_inv, invOf_units] #align matrix.coe_units_inv Matrix.coe_units_inv /-- The nonsingular inverse is the same as the general `Ring.inverse`. -/ theorem nonsing_inv_eq_ring_inverse : A⁻¹ = Ring.inverse A := by by_cases h_det : IsUnit A.det · cases (A.isUnit_iff_isUnit_det.mpr h_det).nonempty_invertible rw [← invOf_eq_nonsing_inv, Ring.inverse_invertible] · have h := mt A.isUnit_iff_isUnit_det.mp h_det rw [Ring.inverse_non_unit _ h, nonsing_inv_apply_not_isUnit A h_det] #align matrix.nonsing_inv_eq_ring_inverse Matrix.nonsing_inv_eq_ring_inverse theorem transpose_nonsing_inv : A⁻¹ᵀ = Aᵀ⁻¹ := by rw [inv_def, inv_def, transpose_smul, det_transpose, adjugate_transpose] #align matrix.transpose_nonsing_inv Matrix.transpose_nonsing_inv	Mathlib/LinearAlgebra/Matrix/NonsingularInverse.lean	257	259	theorem conjTranspose_nonsing_inv [StarRing α] : A⁻¹ᴴ = Aᴴ⁻¹ := by	rw [inv_def, inv_def, conjTranspose_smul, det_conjTranspose, adjugate_conjTranspose, Ring.inverse_star]
/- Copyright (c) 2020 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.LinearAlgebra.AffineSpace.AffineEquiv #align_import linear_algebra.affine_space.affine_subspace from "leanprover-community/mathlib"@"e96bdfbd1e8c98a09ff75f7ac6204d142debc840" /-! # Affine spaces This file defines affine subspaces (over modules) and the affine span of a set of points. ## Main definitions * `AffineSubspace k P` is the type of affine subspaces. Unlike affine spaces, affine subspaces are allowed to be empty, and lemmas that do not apply to empty affine subspaces have `Nonempty` hypotheses. There is a `CompleteLattice` structure on affine subspaces. * `AffineSubspace.direction` gives the `Submodule` spanned by the pairwise differences of points in an `AffineSubspace`. There are various lemmas relating to the set of vectors in the `direction`, and relating the lattice structure on affine subspaces to that on their directions. * `AffineSubspace.parallel`, notation `∥`, gives the property of two affine subspaces being parallel (one being a translate of the other). * `affineSpan` gives the affine subspace spanned by a set of points, with `vectorSpan` giving its direction. The `affineSpan` is defined in terms of `spanPoints`, which gives an explicit description of the points contained in the affine span; `spanPoints` itself should generally only be used when that description is required, with `affineSpan` being the main definition for other purposes. Two other descriptions of the affine span are proved equivalent: it is the `sInf` of affine subspaces containing the points, and (if `[Nontrivial k]`) it contains exactly those points that are affine combinations of points in the given set. ## Implementation notes `outParam` is used in the definition of `AddTorsor V P` to make `V` an implicit argument (deduced from `P`) in most cases. As for modules, `k` is an explicit argument rather than implied by `P` or `V`. This file only provides purely algebraic definitions and results. Those depending on analysis or topology are defined elsewhere; see `Analysis.NormedSpace.AddTorsor` and `Topology.Algebra.Affine`. ## References * https://en.wikipedia.org/wiki/Affine_space * https://en.wikipedia.org/wiki/Principal_homogeneous_space -/ noncomputable section open Affine open Set section variable (k : Type) {V : Type} {P : Type} [Ring k] [AddCommGroup V] [Module k V] variable [AffineSpace V P] /-- The submodule spanning the differences of a (possibly empty) set of points. -/ def vectorSpan (s : Set P) : Submodule k V := Submodule.span k (s -ᵥ s) #align vector_span vectorSpan /-- The definition of `vectorSpan`, for rewriting. -/ theorem vectorSpan_def (s : Set P) : vectorSpan k s = Submodule.span k (s -ᵥ s) := rfl #align vector_span_def vectorSpan_def /-- `vectorSpan` is monotone. -/ theorem vectorSpan_mono {s₁ s₂ : Set P} (h : s₁ ⊆ s₂) : vectorSpan k s₁ ≤ vectorSpan k s₂ := Submodule.span_mono (vsub_self_mono h) #align vector_span_mono vectorSpan_mono variable (P) /-- The `vectorSpan` of the empty set is `⊥`. -/ @[simp] theorem vectorSpan_empty : vectorSpan k (∅ : Set P) = (⊥ : Submodule k V) := by rw [vectorSpan_def, vsub_empty, Submodule.span_empty] #align vector_span_empty vectorSpan_empty variable {P} /-- The `vectorSpan` of a single point is `⊥`. -/ @[simp] theorem vectorSpan_singleton (p : P) : vectorSpan k ({p} : Set P) = ⊥ := by simp [vectorSpan_def] #align vector_span_singleton vectorSpan_singleton /-- The `s -ᵥ s` lies within the `vectorSpan k s`. -/ theorem vsub_set_subset_vectorSpan (s : Set P) : s -ᵥ s ⊆ ↑(vectorSpan k s) := Submodule.subset_span #align vsub_set_subset_vector_span vsub_set_subset_vectorSpan /-- Each pairwise difference is in the `vectorSpan`. -/ theorem vsub_mem_vectorSpan {s : Set P} {p1 p2 : P} (hp1 : p1 ∈ s) (hp2 : p2 ∈ s) : p1 -ᵥ p2 ∈ vectorSpan k s := vsub_set_subset_vectorSpan k s (vsub_mem_vsub hp1 hp2) #align vsub_mem_vector_span vsub_mem_vectorSpan /-- The points in the affine span of a (possibly empty) set of points. Use `affineSpan` instead to get an `AffineSubspace k P`. -/ def spanPoints (s : Set P) : Set P := { p \| ∃ p1 ∈ s, ∃ v ∈ vectorSpan k s, p = v +ᵥ p1 } #align span_points spanPoints /-- A point in a set is in its affine span. -/ theorem mem_spanPoints (p : P) (s : Set P) : p ∈ s → p ∈ spanPoints k s \| hp => ⟨p, hp, 0, Submodule.zero_mem _, (zero_vadd V p).symm⟩ #align mem_span_points mem_spanPoints /-- A set is contained in its `spanPoints`. -/ theorem subset_spanPoints (s : Set P) : s ⊆ spanPoints k s := fun p => mem_spanPoints k p s #align subset_span_points subset_spanPoints /-- The `spanPoints` of a set is nonempty if and only if that set is. -/ @[simp] theorem spanPoints_nonempty (s : Set P) : (spanPoints k s).Nonempty ↔ s.Nonempty := by constructor · contrapose rw [Set.not_nonempty_iff_eq_empty, Set.not_nonempty_iff_eq_empty] intro h simp [h, spanPoints] · exact fun h => h.mono (subset_spanPoints _ _) #align span_points_nonempty spanPoints_nonempty /-- Adding a point in the affine span and a vector in the spanning submodule produces a point in the affine span. -/ theorem vadd_mem_spanPoints_of_mem_spanPoints_of_mem_vectorSpan {s : Set P} {p : P} {v : V} (hp : p ∈ spanPoints k s) (hv : v ∈ vectorSpan k s) : v +ᵥ p ∈ spanPoints k s := by rcases hp with ⟨p2, ⟨hp2, ⟨v2, ⟨hv2, hv2p⟩⟩⟩⟩ rw [hv2p, vadd_vadd] exact ⟨p2, hp2, v + v2, (vectorSpan k s).add_mem hv hv2, rfl⟩ #align vadd_mem_span_points_of_mem_span_points_of_mem_vector_span vadd_mem_spanPoints_of_mem_spanPoints_of_mem_vectorSpan /-- Subtracting two points in the affine span produces a vector in the spanning submodule. -/ theorem vsub_mem_vectorSpan_of_mem_spanPoints_of_mem_spanPoints {s : Set P} {p1 p2 : P} (hp1 : p1 ∈ spanPoints k s) (hp2 : p2 ∈ spanPoints k s) : p1 -ᵥ p2 ∈ vectorSpan k s := by rcases hp1 with ⟨p1a, ⟨hp1a, ⟨v1, ⟨hv1, hv1p⟩⟩⟩⟩ rcases hp2 with ⟨p2a, ⟨hp2a, ⟨v2, ⟨hv2, hv2p⟩⟩⟩⟩ rw [hv1p, hv2p, vsub_vadd_eq_vsub_sub (v1 +ᵥ p1a), vadd_vsub_assoc, add_comm, add_sub_assoc] have hv1v2 : v1 - v2 ∈ vectorSpan k s := (vectorSpan k s).sub_mem hv1 hv2 refine (vectorSpan k s).add_mem ?_ hv1v2 exact vsub_mem_vectorSpan k hp1a hp2a #align vsub_mem_vector_span_of_mem_span_points_of_mem_span_points vsub_mem_vectorSpan_of_mem_spanPoints_of_mem_spanPoints end /-- An `AffineSubspace k P` is a subset of an `AffineSpace V P` that, if not empty, has an affine space structure induced by a corresponding subspace of the `Module k V`. -/ structure AffineSubspace (k : Type) {V : Type} (P : Type) [Ring k] [AddCommGroup V] [Module k V] [AffineSpace V P] where /-- The affine subspace seen as a subset. -/ carrier : Set P smul_vsub_vadd_mem : ∀ (c : k) {p1 p2 p3 : P}, p1 ∈ carrier → p2 ∈ carrier → p3 ∈ carrier → c • (p1 -ᵥ p2 : V) +ᵥ p3 ∈ carrier #align affine_subspace AffineSubspace namespace Submodule variable {k V : Type} [Ring k] [AddCommGroup V] [Module k V] /-- Reinterpret `p : Submodule k V` as an `AffineSubspace k V`. -/ def toAffineSubspace (p : Submodule k V) : AffineSubspace k V where carrier := p smul_vsub_vadd_mem _ _ _ _ h₁ h₂ h₃ := p.add_mem (p.smul_mem _ (p.sub_mem h₁ h₂)) h₃ #align submodule.to_affine_subspace Submodule.toAffineSubspace end Submodule namespace AffineSubspace variable (k : Type) {V : Type} (P : Type) [Ring k] [AddCommGroup V] [Module k V] [AffineSpace V P] instance : SetLike (AffineSubspace k P) P where coe := carrier coe_injective' p q _ := by cases p; cases q; congr /-- A point is in an affine subspace coerced to a set if and only if it is in that affine subspace. -/ -- Porting note: removed `simp`, proof is `simp only [SetLike.mem_coe]` theorem mem_coe (p : P) (s : AffineSubspace k P) : p ∈ (s : Set P) ↔ p ∈ s := Iff.rfl #align affine_subspace.mem_coe AffineSubspace.mem_coe variable {k P} /-- The direction of an affine subspace is the submodule spanned by the pairwise differences of points. (Except in the case of an empty affine subspace, where the direction is the zero submodule, every vector in the direction is the difference of two points in the affine subspace.) -/ def direction (s : AffineSubspace k P) : Submodule k V := vectorSpan k (s : Set P) #align affine_subspace.direction AffineSubspace.direction /-- The direction equals the `vectorSpan`. -/ theorem direction_eq_vectorSpan (s : AffineSubspace k P) : s.direction = vectorSpan k (s : Set P) := rfl #align affine_subspace.direction_eq_vector_span AffineSubspace.direction_eq_vectorSpan /-- Alternative definition of the direction when the affine subspace is nonempty. This is defined so that the order on submodules (as used in the definition of `Submodule.span`) can be used in the proof of `coe_direction_eq_vsub_set`, and is not intended to be used beyond that proof. -/ def directionOfNonempty {s : AffineSubspace k P} (h : (s : Set P).Nonempty) : Submodule k V where carrier := (s : Set P) -ᵥ s zero_mem' := by cases' h with p hp exact vsub_self p ▸ vsub_mem_vsub hp hp add_mem' := by rintro _ _ ⟨p1, hp1, p2, hp2, rfl⟩ ⟨p3, hp3, p4, hp4, rfl⟩ rw [← vadd_vsub_assoc] refine vsub_mem_vsub ?_ hp4 convert s.smul_vsub_vadd_mem 1 hp1 hp2 hp3 rw [one_smul] smul_mem' := by rintro c _ ⟨p1, hp1, p2, hp2, rfl⟩ rw [← vadd_vsub (c • (p1 -ᵥ p2)) p2] refine vsub_mem_vsub ?_ hp2 exact s.smul_vsub_vadd_mem c hp1 hp2 hp2 #align affine_subspace.direction_of_nonempty AffineSubspace.directionOfNonempty /-- `direction_of_nonempty` gives the same submodule as `direction`. -/ theorem directionOfNonempty_eq_direction {s : AffineSubspace k P} (h : (s : Set P).Nonempty) : directionOfNonempty h = s.direction := by refine le_antisymm ?_ (Submodule.span_le.2 Set.Subset.rfl) rw [← SetLike.coe_subset_coe, directionOfNonempty, direction, Submodule.coe_set_mk, AddSubmonoid.coe_set_mk] exact vsub_set_subset_vectorSpan k _ #align affine_subspace.direction_of_nonempty_eq_direction AffineSubspace.directionOfNonempty_eq_direction /-- The set of vectors in the direction of a nonempty affine subspace is given by `vsub_set`. -/ theorem coe_direction_eq_vsub_set {s : AffineSubspace k P} (h : (s : Set P).Nonempty) : (s.direction : Set V) = (s : Set P) -ᵥ s := directionOfNonempty_eq_direction h ▸ rfl #align affine_subspace.coe_direction_eq_vsub_set AffineSubspace.coe_direction_eq_vsub_set /-- A vector is in the direction of a nonempty affine subspace if and only if it is the subtraction of two vectors in the subspace. -/ theorem mem_direction_iff_eq_vsub {s : AffineSubspace k P} (h : (s : Set P).Nonempty) (v : V) : v ∈ s.direction ↔ ∃ p1 ∈ s, ∃ p2 ∈ s, v = p1 -ᵥ p2 := by rw [← SetLike.mem_coe, coe_direction_eq_vsub_set h, Set.mem_vsub] simp only [SetLike.mem_coe, eq_comm] #align affine_subspace.mem_direction_iff_eq_vsub AffineSubspace.mem_direction_iff_eq_vsub /-- Adding a vector in the direction to a point in the subspace produces a point in the subspace. -/ theorem vadd_mem_of_mem_direction {s : AffineSubspace k P} {v : V} (hv : v ∈ s.direction) {p : P} (hp : p ∈ s) : v +ᵥ p ∈ s := by rw [mem_direction_iff_eq_vsub ⟨p, hp⟩] at hv rcases hv with ⟨p1, hp1, p2, hp2, hv⟩ rw [hv] convert s.smul_vsub_vadd_mem 1 hp1 hp2 hp rw [one_smul] exact s.mem_coe k P _ #align affine_subspace.vadd_mem_of_mem_direction AffineSubspace.vadd_mem_of_mem_direction /-- Subtracting two points in the subspace produces a vector in the direction. -/ theorem vsub_mem_direction {s : AffineSubspace k P} {p1 p2 : P} (hp1 : p1 ∈ s) (hp2 : p2 ∈ s) : p1 -ᵥ p2 ∈ s.direction := vsub_mem_vectorSpan k hp1 hp2 #align affine_subspace.vsub_mem_direction AffineSubspace.vsub_mem_direction /-- Adding a vector to a point in a subspace produces a point in the subspace if and only if the vector is in the direction. -/ theorem vadd_mem_iff_mem_direction {s : AffineSubspace k P} (v : V) {p : P} (hp : p ∈ s) : v +ᵥ p ∈ s ↔ v ∈ s.direction := ⟨fun h => by simpa using vsub_mem_direction h hp, fun h => vadd_mem_of_mem_direction h hp⟩ #align affine_subspace.vadd_mem_iff_mem_direction AffineSubspace.vadd_mem_iff_mem_direction /-- Adding a vector in the direction to a point produces a point in the subspace if and only if the original point is in the subspace. -/ theorem vadd_mem_iff_mem_of_mem_direction {s : AffineSubspace k P} {v : V} (hv : v ∈ s.direction) {p : P} : v +ᵥ p ∈ s ↔ p ∈ s := by refine ⟨fun h => ?_, fun h => vadd_mem_of_mem_direction hv h⟩ convert vadd_mem_of_mem_direction (Submodule.neg_mem _ hv) h simp #align affine_subspace.vadd_mem_iff_mem_of_mem_direction AffineSubspace.vadd_mem_iff_mem_of_mem_direction /-- Given a point in an affine subspace, the set of vectors in its direction equals the set of vectors subtracting that point on the right. -/ theorem coe_direction_eq_vsub_set_right {s : AffineSubspace k P} {p : P} (hp : p ∈ s) : (s.direction : Set V) = (· -ᵥ p) '' s := by rw [coe_direction_eq_vsub_set ⟨p, hp⟩] refine le_antisymm ?_ ?_ · rintro v ⟨p1, hp1, p2, hp2, rfl⟩ exact ⟨p1 -ᵥ p2 +ᵥ p, vadd_mem_of_mem_direction (vsub_mem_direction hp1 hp2) hp, vadd_vsub _ _⟩ · rintro v ⟨p2, hp2, rfl⟩ exact ⟨p2, hp2, p, hp, rfl⟩ #align affine_subspace.coe_direction_eq_vsub_set_right AffineSubspace.coe_direction_eq_vsub_set_right /-- Given a point in an affine subspace, the set of vectors in its direction equals the set of vectors subtracting that point on the left. -/ theorem coe_direction_eq_vsub_set_left {s : AffineSubspace k P} {p : P} (hp : p ∈ s) : (s.direction : Set V) = (p -ᵥ ·) '' s := by ext v rw [SetLike.mem_coe, ← Submodule.neg_mem_iff, ← SetLike.mem_coe, coe_direction_eq_vsub_set_right hp, Set.mem_image, Set.mem_image] conv_lhs => congr ext rw [← neg_vsub_eq_vsub_rev, neg_inj] #align affine_subspace.coe_direction_eq_vsub_set_left AffineSubspace.coe_direction_eq_vsub_set_left /-- Given a point in an affine subspace, a vector is in its direction if and only if it results from subtracting that point on the right. -/ theorem mem_direction_iff_eq_vsub_right {s : AffineSubspace k P} {p : P} (hp : p ∈ s) (v : V) : v ∈ s.direction ↔ ∃ p2 ∈ s, v = p2 -ᵥ p := by rw [← SetLike.mem_coe, coe_direction_eq_vsub_set_right hp] exact ⟨fun ⟨p2, hp2, hv⟩ => ⟨p2, hp2, hv.symm⟩, fun ⟨p2, hp2, hv⟩ => ⟨p2, hp2, hv.symm⟩⟩ #align affine_subspace.mem_direction_iff_eq_vsub_right AffineSubspace.mem_direction_iff_eq_vsub_right /-- Given a point in an affine subspace, a vector is in its direction if and only if it results from subtracting that point on the left. -/ theorem mem_direction_iff_eq_vsub_left {s : AffineSubspace k P} {p : P} (hp : p ∈ s) (v : V) : v ∈ s.direction ↔ ∃ p2 ∈ s, v = p -ᵥ p2 := by rw [← SetLike.mem_coe, coe_direction_eq_vsub_set_left hp] exact ⟨fun ⟨p2, hp2, hv⟩ => ⟨p2, hp2, hv.symm⟩, fun ⟨p2, hp2, hv⟩ => ⟨p2, hp2, hv.symm⟩⟩ #align affine_subspace.mem_direction_iff_eq_vsub_left AffineSubspace.mem_direction_iff_eq_vsub_left /-- Given a point in an affine subspace, a result of subtracting that point on the right is in the direction if and only if the other point is in the subspace. -/ theorem vsub_right_mem_direction_iff_mem {s : AffineSubspace k P} {p : P} (hp : p ∈ s) (p2 : P) : p2 -ᵥ p ∈ s.direction ↔ p2 ∈ s := by rw [mem_direction_iff_eq_vsub_right hp] simp #align affine_subspace.vsub_right_mem_direction_iff_mem AffineSubspace.vsub_right_mem_direction_iff_mem /-- Given a point in an affine subspace, a result of subtracting that point on the left is in the direction if and only if the other point is in the subspace. -/ theorem vsub_left_mem_direction_iff_mem {s : AffineSubspace k P} {p : P} (hp : p ∈ s) (p2 : P) : p -ᵥ p2 ∈ s.direction ↔ p2 ∈ s := by rw [mem_direction_iff_eq_vsub_left hp] simp #align affine_subspace.vsub_left_mem_direction_iff_mem AffineSubspace.vsub_left_mem_direction_iff_mem /-- Two affine subspaces are equal if they have the same points. -/ theorem coe_injective : Function.Injective ((↑) : AffineSubspace k P → Set P) := SetLike.coe_injective #align affine_subspace.coe_injective AffineSubspace.coe_injective @[ext] theorem ext {p q : AffineSubspace k P} (h : ∀ x, x ∈ p ↔ x ∈ q) : p = q := SetLike.ext h #align affine_subspace.ext AffineSubspace.ext -- Porting note: removed `simp`, proof is `simp only [SetLike.ext'_iff]` theorem ext_iff (s₁ s₂ : AffineSubspace k P) : (s₁ : Set P) = s₂ ↔ s₁ = s₂ := SetLike.ext'_iff.symm #align affine_subspace.ext_iff AffineSubspace.ext_iff /-- Two affine subspaces with the same direction and nonempty intersection are equal. -/ theorem ext_of_direction_eq {s1 s2 : AffineSubspace k P} (hd : s1.direction = s2.direction) (hn : ((s1 : Set P) ∩ s2).Nonempty) : s1 = s2 := by ext p have hq1 := Set.mem_of_mem_inter_left hn.some_mem have hq2 := Set.mem_of_mem_inter_right hn.some_mem constructor · intro hp rw [← vsub_vadd p hn.some] refine vadd_mem_of_mem_direction ?_ hq2 rw [← hd] exact vsub_mem_direction hp hq1 · intro hp rw [← vsub_vadd p hn.some] refine vadd_mem_of_mem_direction ?_ hq1 rw [hd] exact vsub_mem_direction hp hq2 #align affine_subspace.ext_of_direction_eq AffineSubspace.ext_of_direction_eq -- See note [reducible non instances] /-- This is not an instance because it loops with `AddTorsor.nonempty`. -/ abbrev toAddTorsor (s : AffineSubspace k P) [Nonempty s] : AddTorsor s.direction s where vadd a b := ⟨(a : V) +ᵥ (b : P), vadd_mem_of_mem_direction a.2 b.2⟩ zero_vadd := fun a => by ext exact zero_vadd _ _ add_vadd a b c := by ext apply add_vadd vsub a b := ⟨(a : P) -ᵥ (b : P), (vsub_left_mem_direction_iff_mem a.2 _).mpr b.2⟩ vsub_vadd' a b := by ext apply AddTorsor.vsub_vadd' vadd_vsub' a b := by ext apply AddTorsor.vadd_vsub' #align affine_subspace.to_add_torsor AffineSubspace.toAddTorsor attribute [local instance] toAddTorsor @[simp, norm_cast] theorem coe_vsub (s : AffineSubspace k P) [Nonempty s] (a b : s) : ↑(a -ᵥ b) = (a : P) -ᵥ (b : P) := rfl #align affine_subspace.coe_vsub AffineSubspace.coe_vsub @[simp, norm_cast] theorem coe_vadd (s : AffineSubspace k P) [Nonempty s] (a : s.direction) (b : s) : ↑(a +ᵥ b) = (a : V) +ᵥ (b : P) := rfl #align affine_subspace.coe_vadd AffineSubspace.coe_vadd /-- Embedding of an affine subspace to the ambient space, as an affine map. -/ protected def subtype (s : AffineSubspace k P) [Nonempty s] : s →ᵃ[k] P where toFun := (↑) linear := s.direction.subtype map_vadd' _ _ := rfl #align affine_subspace.subtype AffineSubspace.subtype @[simp] theorem subtype_linear (s : AffineSubspace k P) [Nonempty s] : s.subtype.linear = s.direction.subtype := rfl #align affine_subspace.subtype_linear AffineSubspace.subtype_linear theorem subtype_apply (s : AffineSubspace k P) [Nonempty s] (p : s) : s.subtype p = p := rfl #align affine_subspace.subtype_apply AffineSubspace.subtype_apply @[simp] theorem coeSubtype (s : AffineSubspace k P) [Nonempty s] : (s.subtype : s → P) = ((↑) : s → P) := rfl #align affine_subspace.coe_subtype AffineSubspace.coeSubtype theorem injective_subtype (s : AffineSubspace k P) [Nonempty s] : Function.Injective s.subtype := Subtype.coe_injective #align affine_subspace.injective_subtype AffineSubspace.injective_subtype /-- Two affine subspaces with nonempty intersection are equal if and only if their directions are equal. -/ theorem eq_iff_direction_eq_of_mem {s₁ s₂ : AffineSubspace k P} {p : P} (h₁ : p ∈ s₁) (h₂ : p ∈ s₂) : s₁ = s₂ ↔ s₁.direction = s₂.direction := ⟨fun h => h ▸ rfl, fun h => ext_of_direction_eq h ⟨p, h₁, h₂⟩⟩ #align affine_subspace.eq_iff_direction_eq_of_mem AffineSubspace.eq_iff_direction_eq_of_mem /-- Construct an affine subspace from a point and a direction. -/ def mk' (p : P) (direction : Submodule k V) : AffineSubspace k P where carrier := { q \| ∃ v ∈ direction, q = v +ᵥ p } smul_vsub_vadd_mem c p1 p2 p3 hp1 hp2 hp3 := by rcases hp1 with ⟨v1, hv1, hp1⟩ rcases hp2 with ⟨v2, hv2, hp2⟩ rcases hp3 with ⟨v3, hv3, hp3⟩ use c • (v1 - v2) + v3, direction.add_mem (direction.smul_mem c (direction.sub_mem hv1 hv2)) hv3 simp [hp1, hp2, hp3, vadd_vadd] #align affine_subspace.mk' AffineSubspace.mk' /-- An affine subspace constructed from a point and a direction contains that point. -/ theorem self_mem_mk' (p : P) (direction : Submodule k V) : p ∈ mk' p direction := ⟨0, ⟨direction.zero_mem, (zero_vadd _ _).symm⟩⟩ #align affine_subspace.self_mem_mk' AffineSubspace.self_mem_mk' /-- An affine subspace constructed from a point and a direction contains the result of adding a vector in that direction to that point. -/ theorem vadd_mem_mk' {v : V} (p : P) {direction : Submodule k V} (hv : v ∈ direction) : v +ᵥ p ∈ mk' p direction := ⟨v, hv, rfl⟩ #align affine_subspace.vadd_mem_mk' AffineSubspace.vadd_mem_mk' /-- An affine subspace constructed from a point and a direction is nonempty. -/ theorem mk'_nonempty (p : P) (direction : Submodule k V) : (mk' p direction : Set P).Nonempty := ⟨p, self_mem_mk' p direction⟩ #align affine_subspace.mk'_nonempty AffineSubspace.mk'_nonempty /-- The direction of an affine subspace constructed from a point and a direction. -/ @[simp] theorem direction_mk' (p : P) (direction : Submodule k V) : (mk' p direction).direction = direction := by ext v rw [mem_direction_iff_eq_vsub (mk'_nonempty _ _)] constructor · rintro ⟨p1, ⟨v1, hv1, hp1⟩, p2, ⟨v2, hv2, hp2⟩, hv⟩ rw [hv, hp1, hp2, vadd_vsub_vadd_cancel_right] exact direction.sub_mem hv1 hv2 · exact fun hv => ⟨v +ᵥ p, vadd_mem_mk' _ hv, p, self_mem_mk' _ _, (vadd_vsub _ _).symm⟩ #align affine_subspace.direction_mk' AffineSubspace.direction_mk' /-- A point lies in an affine subspace constructed from another point and a direction if and only if their difference is in that direction. -/ theorem mem_mk'_iff_vsub_mem {p₁ p₂ : P} {direction : Submodule k V} : p₂ ∈ mk' p₁ direction ↔ p₂ -ᵥ p₁ ∈ direction := by refine ⟨fun h => ?_, fun h => ?_⟩ · rw [← direction_mk' p₁ direction] exact vsub_mem_direction h (self_mem_mk' _ _) · rw [← vsub_vadd p₂ p₁] exact vadd_mem_mk' p₁ h #align affine_subspace.mem_mk'_iff_vsub_mem AffineSubspace.mem_mk'_iff_vsub_mem /-- Constructing an affine subspace from a point in a subspace and that subspace's direction yields the original subspace. -/ @[simp] theorem mk'_eq {s : AffineSubspace k P} {p : P} (hp : p ∈ s) : mk' p s.direction = s := ext_of_direction_eq (direction_mk' p s.direction) ⟨p, Set.mem_inter (self_mem_mk' _ _) hp⟩ #align affine_subspace.mk'_eq AffineSubspace.mk'_eq /-- If an affine subspace contains a set of points, it contains the `spanPoints` of that set. -/ theorem spanPoints_subset_coe_of_subset_coe {s : Set P} {s1 : AffineSubspace k P} (h : s ⊆ s1) : spanPoints k s ⊆ s1 := by rintro p ⟨p1, hp1, v, hv, hp⟩ rw [hp] have hp1s1 : p1 ∈ (s1 : Set P) := Set.mem_of_mem_of_subset hp1 h refine vadd_mem_of_mem_direction ?_ hp1s1 have hs : vectorSpan k s ≤ s1.direction := vectorSpan_mono k h rw [SetLike.le_def] at hs rw [← SetLike.mem_coe] exact Set.mem_of_mem_of_subset hv hs #align affine_subspace.span_points_subset_coe_of_subset_coe AffineSubspace.spanPoints_subset_coe_of_subset_coe end AffineSubspace namespace Submodule variable {k V : Type} [Ring k] [AddCommGroup V] [Module k V] @[simp] theorem mem_toAffineSubspace {p : Submodule k V} {x : V} : x ∈ p.toAffineSubspace ↔ x ∈ p := Iff.rfl @[simp] theorem toAffineSubspace_direction (s : Submodule k V) : s.toAffineSubspace.direction = s := by ext x; simp [← s.toAffineSubspace.vadd_mem_iff_mem_direction _ s.zero_mem] end Submodule theorem AffineMap.lineMap_mem {k V P : Type} [Ring k] [AddCommGroup V] [Module k V] [AddTorsor V P] {Q : AffineSubspace k P} {p₀ p₁ : P} (c : k) (h₀ : p₀ ∈ Q) (h₁ : p₁ ∈ Q) : AffineMap.lineMap p₀ p₁ c ∈ Q := by rw [AffineMap.lineMap_apply] exact Q.smul_vsub_vadd_mem c h₁ h₀ h₀ #align affine_map.line_map_mem AffineMap.lineMap_mem section affineSpan variable (k : Type) {V : Type} {P : Type} [Ring k] [AddCommGroup V] [Module k V] [AffineSpace V P] /-- The affine span of a set of points is the smallest affine subspace containing those points. (Actually defined here in terms of spans in modules.) -/ def affineSpan (s : Set P) : AffineSubspace k P where carrier := spanPoints k s smul_vsub_vadd_mem c _ _ _ hp1 hp2 hp3 := vadd_mem_spanPoints_of_mem_spanPoints_of_mem_vectorSpan k hp3 ((vectorSpan k s).smul_mem c (vsub_mem_vectorSpan_of_mem_spanPoints_of_mem_spanPoints k hp1 hp2)) #align affine_span affineSpan /-- The affine span, converted to a set, is `spanPoints`. -/ @[simp] theorem coe_affineSpan (s : Set P) : (affineSpan k s : Set P) = spanPoints k s := rfl #align coe_affine_span coe_affineSpan /-- A set is contained in its affine span. -/ theorem subset_affineSpan (s : Set P) : s ⊆ affineSpan k s := subset_spanPoints k s #align subset_affine_span subset_affineSpan /-- The direction of the affine span is the `vectorSpan`. -/ theorem direction_affineSpan (s : Set P) : (affineSpan k s).direction = vectorSpan k s := by apply le_antisymm · refine Submodule.span_le.2 ?_ rintro v ⟨p1, ⟨p2, hp2, v1, hv1, hp1⟩, p3, ⟨p4, hp4, v2, hv2, hp3⟩, rfl⟩ simp only [SetLike.mem_coe] rw [hp1, hp3, vsub_vadd_eq_vsub_sub, vadd_vsub_assoc] exact (vectorSpan k s).sub_mem ((vectorSpan k s).add_mem hv1 (vsub_mem_vectorSpan k hp2 hp4)) hv2 · exact vectorSpan_mono k (subset_spanPoints k s) #align direction_affine_span direction_affineSpan /-- A point in a set is in its affine span. -/ theorem mem_affineSpan {p : P} {s : Set P} (hp : p ∈ s) : p ∈ affineSpan k s := mem_spanPoints k p s hp #align mem_affine_span mem_affineSpan end affineSpan namespace AffineSubspace variable {k : Type} {V : Type} {P : Type} [Ring k] [AddCommGroup V] [Module k V] [S : AffineSpace V P] instance : CompleteLattice (AffineSubspace k P) := { PartialOrder.lift ((↑) : AffineSubspace k P → Set P) coe_injective with sup := fun s1 s2 => affineSpan k (s1 ∪ s2) le_sup_left := fun s1 s2 => Set.Subset.trans Set.subset_union_left (subset_spanPoints k _) le_sup_right := fun s1 s2 => Set.Subset.trans Set.subset_union_right (subset_spanPoints k _) sup_le := fun s1 s2 s3 hs1 hs2 => spanPoints_subset_coe_of_subset_coe (Set.union_subset hs1 hs2) inf := fun s1 s2 => mk (s1 ∩ s2) fun c p1 p2 p3 hp1 hp2 hp3 => ⟨s1.smul_vsub_vadd_mem c hp1.1 hp2.1 hp3.1, s2.smul_vsub_vadd_mem c hp1.2 hp2.2 hp3.2⟩ inf_le_left := fun _ _ => Set.inter_subset_left inf_le_right := fun _ _ => Set.inter_subset_right le_sInf := fun S s1 hs1 => by -- Porting note: surely there is an easier way? refine Set.subset_sInter (t := (s1 : Set P)) ?_ rintro t ⟨s, _hs, rfl⟩ exact Set.subset_iInter (hs1 s) top := { carrier := Set.univ smul_vsub_vadd_mem := fun _ _ _ _ _ _ _ => Set.mem_univ _ } le_top := fun _ _ _ => Set.mem_univ _ bot := { carrier := ∅ smul_vsub_vadd_mem := fun _ _ _ _ => False.elim } bot_le := fun _ _ => False.elim sSup := fun s => affineSpan k (⋃ s' ∈ s, (s' : Set P)) sInf := fun s => mk (⋂ s' ∈ s, (s' : Set P)) fun c p1 p2 p3 hp1 hp2 hp3 => Set.mem_iInter₂.2 fun s2 hs2 => by rw [Set.mem_iInter₂] at * exact s2.smul_vsub_vadd_mem c (hp1 s2 hs2) (hp2 s2 hs2) (hp3 s2 hs2) le_sSup := fun _ _ h => Set.Subset.trans (Set.subset_biUnion_of_mem h) (subset_spanPoints k _) sSup_le := fun _ _ h => spanPoints_subset_coe_of_subset_coe (Set.iUnion₂_subset h) sInf_le := fun _ _ => Set.biInter_subset_of_mem le_inf := fun _ _ _ => Set.subset_inter } instance : Inhabited (AffineSubspace k P) := ⟨⊤⟩ /-- The `≤` order on subspaces is the same as that on the corresponding sets. -/ theorem le_def (s1 s2 : AffineSubspace k P) : s1 ≤ s2 ↔ (s1 : Set P) ⊆ s2 := Iff.rfl #align affine_subspace.le_def AffineSubspace.le_def /-- One subspace is less than or equal to another if and only if all its points are in the second subspace. -/ theorem le_def' (s1 s2 : AffineSubspace k P) : s1 ≤ s2 ↔ ∀ p ∈ s1, p ∈ s2 := Iff.rfl #align affine_subspace.le_def' AffineSubspace.le_def' /-- The `<` order on subspaces is the same as that on the corresponding sets. -/ theorem lt_def (s1 s2 : AffineSubspace k P) : s1 < s2 ↔ (s1 : Set P) ⊂ s2 := Iff.rfl #align affine_subspace.lt_def AffineSubspace.lt_def /-- One subspace is not less than or equal to another if and only if it has a point not in the second subspace. -/ theorem not_le_iff_exists (s1 s2 : AffineSubspace k P) : ¬s1 ≤ s2 ↔ ∃ p ∈ s1, p ∉ s2 := Set.not_subset #align affine_subspace.not_le_iff_exists AffineSubspace.not_le_iff_exists /-- If a subspace is less than another, there is a point only in the second. -/ theorem exists_of_lt {s1 s2 : AffineSubspace k P} (h : s1 < s2) : ∃ p ∈ s2, p ∉ s1 := Set.exists_of_ssubset h #align affine_subspace.exists_of_lt AffineSubspace.exists_of_lt /-- A subspace is less than another if and only if it is less than or equal to the second subspace and there is a point only in the second. -/ theorem lt_iff_le_and_exists (s1 s2 : AffineSubspace k P) : s1 < s2 ↔ s1 ≤ s2 ∧ ∃ p ∈ s2, p ∉ s1 := by rw [lt_iff_le_not_le, not_le_iff_exists] #align affine_subspace.lt_iff_le_and_exists AffineSubspace.lt_iff_le_and_exists /-- If an affine subspace is nonempty and contained in another with the same direction, they are equal. -/ theorem eq_of_direction_eq_of_nonempty_of_le {s₁ s₂ : AffineSubspace k P} (hd : s₁.direction = s₂.direction) (hn : (s₁ : Set P).Nonempty) (hle : s₁ ≤ s₂) : s₁ = s₂ := let ⟨p, hp⟩ := hn ext_of_direction_eq hd ⟨p, hp, hle hp⟩ #align affine_subspace.eq_of_direction_eq_of_nonempty_of_le AffineSubspace.eq_of_direction_eq_of_nonempty_of_le variable (k V) /-- The affine span is the `sInf` of subspaces containing the given points. -/ theorem affineSpan_eq_sInf (s : Set P) : affineSpan k s = sInf { s' : AffineSubspace k P \| s ⊆ s' } := le_antisymm (spanPoints_subset_coe_of_subset_coe <\| Set.subset_iInter₂ fun _ => id) (sInf_le (subset_spanPoints k _)) #align affine_subspace.affine_span_eq_Inf AffineSubspace.affineSpan_eq_sInf variable (P) /-- The Galois insertion formed by `affineSpan` and coercion back to a set. -/ protected def gi : GaloisInsertion (affineSpan k) ((↑) : AffineSubspace k P → Set P) where choice s _ := affineSpan k s gc s1 _s2 := ⟨fun h => Set.Subset.trans (subset_spanPoints k s1) h, spanPoints_subset_coe_of_subset_coe⟩ le_l_u _ := subset_spanPoints k _ choice_eq _ _ := rfl #align affine_subspace.gi AffineSubspace.gi /-- The span of the empty set is `⊥`. -/ @[simp] theorem span_empty : affineSpan k (∅ : Set P) = ⊥ := (AffineSubspace.gi k V P).gc.l_bot #align affine_subspace.span_empty AffineSubspace.span_empty /-- The span of `univ` is `⊤`. -/ @[simp] theorem span_univ : affineSpan k (Set.univ : Set P) = ⊤ := eq_top_iff.2 <\| subset_spanPoints k _ #align affine_subspace.span_univ AffineSubspace.span_univ variable {k V P} theorem _root_.affineSpan_le {s : Set P} {Q : AffineSubspace k P} : affineSpan k s ≤ Q ↔ s ⊆ (Q : Set P) := (AffineSubspace.gi k V P).gc _ _ #align affine_span_le affineSpan_le variable (k V) {p₁ p₂ : P} /-- The affine span of a single point, coerced to a set, contains just that point. -/ @[simp 1001] -- Porting note: this needs to take priority over `coe_affineSpan` theorem coe_affineSpan_singleton (p : P) : (affineSpan k ({p} : Set P) : Set P) = {p} := by ext x rw [mem_coe, ← vsub_right_mem_direction_iff_mem (mem_affineSpan k (Set.mem_singleton p)) _, direction_affineSpan] simp #align affine_subspace.coe_affine_span_singleton AffineSubspace.coe_affineSpan_singleton /-- A point is in the affine span of a single point if and only if they are equal. -/ @[simp] theorem mem_affineSpan_singleton : p₁ ∈ affineSpan k ({p₂} : Set P) ↔ p₁ = p₂ := by simp [← mem_coe] #align affine_subspace.mem_affine_span_singleton AffineSubspace.mem_affineSpan_singleton @[simp] theorem preimage_coe_affineSpan_singleton (x : P) : ((↑) : affineSpan k ({x} : Set P) → P) ⁻¹' {x} = univ := eq_univ_of_forall fun y => (AffineSubspace.mem_affineSpan_singleton _ _).1 y.2 #align affine_subspace.preimage_coe_affine_span_singleton AffineSubspace.preimage_coe_affineSpan_singleton /-- The span of a union of sets is the sup of their spans. -/ theorem span_union (s t : Set P) : affineSpan k (s ∪ t) = affineSpan k s ⊔ affineSpan k t := (AffineSubspace.gi k V P).gc.l_sup #align affine_subspace.span_union AffineSubspace.span_union /-- The span of a union of an indexed family of sets is the sup of their spans. -/ theorem span_iUnion {ι : Type} (s : ι → Set P) : affineSpan k (⋃ i, s i) = ⨆ i, affineSpan k (s i) := (AffineSubspace.gi k V P).gc.l_iSup #align affine_subspace.span_Union AffineSubspace.span_iUnion variable (P) /-- `⊤`, coerced to a set, is the whole set of points. -/ @[simp] theorem top_coe : ((⊤ : AffineSubspace k P) : Set P) = Set.univ := rfl #align affine_subspace.top_coe AffineSubspace.top_coe variable {P} /-- All points are in `⊤`. -/ @[simp] theorem mem_top (p : P) : p ∈ (⊤ : AffineSubspace k P) := Set.mem_univ p #align affine_subspace.mem_top AffineSubspace.mem_top variable (P) /-- The direction of `⊤` is the whole module as a submodule. -/ @[simp] theorem direction_top : (⊤ : AffineSubspace k P).direction = ⊤ := by cases' S.nonempty with p ext v refine ⟨imp_intro Submodule.mem_top, fun _hv => ?_⟩ have hpv : (v +ᵥ p -ᵥ p : V) ∈ (⊤ : AffineSubspace k P).direction := vsub_mem_direction (mem_top k V _) (mem_top k V _) rwa [vadd_vsub] at hpv #align affine_subspace.direction_top AffineSubspace.direction_top /-- `⊥`, coerced to a set, is the empty set. -/ @[simp] theorem bot_coe : ((⊥ : AffineSubspace k P) : Set P) = ∅ := rfl #align affine_subspace.bot_coe AffineSubspace.bot_coe theorem bot_ne_top : (⊥ : AffineSubspace k P) ≠ ⊤ := by intro contra rw [← ext_iff, bot_coe, top_coe] at contra exact Set.empty_ne_univ contra #align affine_subspace.bot_ne_top AffineSubspace.bot_ne_top instance : Nontrivial (AffineSubspace k P) := ⟨⟨⊥, ⊤, bot_ne_top k V P⟩⟩ theorem nonempty_of_affineSpan_eq_top {s : Set P} (h : affineSpan k s = ⊤) : s.Nonempty := by rw [Set.nonempty_iff_ne_empty] rintro rfl rw [AffineSubspace.span_empty] at h exact bot_ne_top k V P h #align affine_subspace.nonempty_of_affine_span_eq_top AffineSubspace.nonempty_of_affineSpan_eq_top /-- If the affine span of a set is `⊤`, then the vector span of the same set is the `⊤`. -/ theorem vectorSpan_eq_top_of_affineSpan_eq_top {s : Set P} (h : affineSpan k s = ⊤) : vectorSpan k s = ⊤ := by rw [← direction_affineSpan, h, direction_top] #align affine_subspace.vector_span_eq_top_of_affine_span_eq_top AffineSubspace.vectorSpan_eq_top_of_affineSpan_eq_top /-- For a nonempty set, the affine span is `⊤` iff its vector span is `⊤`. -/ theorem affineSpan_eq_top_iff_vectorSpan_eq_top_of_nonempty {s : Set P} (hs : s.Nonempty) : affineSpan k s = ⊤ ↔ vectorSpan k s = ⊤ := by refine ⟨vectorSpan_eq_top_of_affineSpan_eq_top k V P, ?_⟩ intro h suffices Nonempty (affineSpan k s) by obtain ⟨p, hp : p ∈ affineSpan k s⟩ := this rw [eq_iff_direction_eq_of_mem hp (mem_top k V p), direction_affineSpan, h, direction_top] obtain ⟨x, hx⟩ := hs exact ⟨⟨x, mem_affineSpan k hx⟩⟩ #align affine_subspace.affine_span_eq_top_iff_vector_span_eq_top_of_nonempty AffineSubspace.affineSpan_eq_top_iff_vectorSpan_eq_top_of_nonempty /-- For a non-trivial space, the affine span of a set is `⊤` iff its vector span is `⊤`. -/ theorem affineSpan_eq_top_iff_vectorSpan_eq_top_of_nontrivial {s : Set P} [Nontrivial P] : affineSpan k s = ⊤ ↔ vectorSpan k s = ⊤ := by rcases s.eq_empty_or_nonempty with hs \| hs · simp [hs, subsingleton_iff_bot_eq_top, AddTorsor.subsingleton_iff V P, not_subsingleton] · rw [affineSpan_eq_top_iff_vectorSpan_eq_top_of_nonempty k V P hs] #align affine_subspace.affine_span_eq_top_iff_vector_span_eq_top_of_nontrivial AffineSubspace.affineSpan_eq_top_iff_vectorSpan_eq_top_of_nontrivial theorem card_pos_of_affineSpan_eq_top {ι : Type} [Fintype ι] {p : ι → P} (h : affineSpan k (range p) = ⊤) : 0 < Fintype.card ι := by obtain ⟨-, ⟨i, -⟩⟩ := nonempty_of_affineSpan_eq_top k V P h exact Fintype.card_pos_iff.mpr ⟨i⟩ #align affine_subspace.card_pos_of_affine_span_eq_top AffineSubspace.card_pos_of_affineSpan_eq_top attribute [local instance] toAddTorsor /-- The top affine subspace is linearly equivalent to the affine space. This is the affine version of `Submodule.topEquiv`. -/ @[simps! linear apply symm_apply_coe] def topEquiv : (⊤ : AffineSubspace k P) ≃ᵃ[k] P where toEquiv := Equiv.Set.univ P linear := .ofEq _ _ (direction_top _ _ _) ≪≫ₗ Submodule.topEquiv map_vadd' _p _v := rfl variable {P} /-- No points are in `⊥`. -/ theorem not_mem_bot (p : P) : p ∉ (⊥ : AffineSubspace k P) := Set.not_mem_empty p #align affine_subspace.not_mem_bot AffineSubspace.not_mem_bot variable (P) /-- The direction of `⊥` is the submodule `⊥`. -/ @[simp] theorem direction_bot : (⊥ : AffineSubspace k P).direction = ⊥ := by rw [direction_eq_vectorSpan, bot_coe, vectorSpan_def, vsub_empty, Submodule.span_empty] #align affine_subspace.direction_bot AffineSubspace.direction_bot variable {k V P} @[simp] theorem coe_eq_bot_iff (Q : AffineSubspace k P) : (Q : Set P) = ∅ ↔ Q = ⊥ := coe_injective.eq_iff' (bot_coe _ _ _) #align affine_subspace.coe_eq_bot_iff AffineSubspace.coe_eq_bot_iff @[simp] theorem coe_eq_univ_iff (Q : AffineSubspace k P) : (Q : Set P) = univ ↔ Q = ⊤ := coe_injective.eq_iff' (top_coe _ _ _) #align affine_subspace.coe_eq_univ_iff AffineSubspace.coe_eq_univ_iff theorem nonempty_iff_ne_bot (Q : AffineSubspace k P) : (Q : Set P).Nonempty ↔ Q ≠ ⊥ := by rw [nonempty_iff_ne_empty] exact not_congr Q.coe_eq_bot_iff #align affine_subspace.nonempty_iff_ne_bot AffineSubspace.nonempty_iff_ne_bot theorem eq_bot_or_nonempty (Q : AffineSubspace k P) : Q = ⊥ ∨ (Q : Set P).Nonempty := by rw [nonempty_iff_ne_bot] apply eq_or_ne #align affine_subspace.eq_bot_or_nonempty AffineSubspace.eq_bot_or_nonempty theorem subsingleton_of_subsingleton_span_eq_top {s : Set P} (h₁ : s.Subsingleton) (h₂ : affineSpan k s = ⊤) : Subsingleton P := by obtain ⟨p, hp⟩ := AffineSubspace.nonempty_of_affineSpan_eq_top k V P h₂ have : s = {p} := Subset.antisymm (fun q hq => h₁ hq hp) (by simp [hp]) rw [this, ← AffineSubspace.ext_iff, AffineSubspace.coe_affineSpan_singleton, AffineSubspace.top_coe, eq_comm, ← subsingleton_iff_singleton (mem_univ _)] at h₂ exact subsingleton_of_univ_subsingleton h₂ #align affine_subspace.subsingleton_of_subsingleton_span_eq_top AffineSubspace.subsingleton_of_subsingleton_span_eq_top theorem eq_univ_of_subsingleton_span_eq_top {s : Set P} (h₁ : s.Subsingleton) (h₂ : affineSpan k s = ⊤) : s = (univ : Set P) := by obtain ⟨p, hp⟩ := AffineSubspace.nonempty_of_affineSpan_eq_top k V P h₂ have : s = {p} := Subset.antisymm (fun q hq => h₁ hq hp) (by simp [hp]) rw [this, eq_comm, ← subsingleton_iff_singleton (mem_univ p), subsingleton_univ_iff] exact subsingleton_of_subsingleton_span_eq_top h₁ h₂ #align affine_subspace.eq_univ_of_subsingleton_span_eq_top AffineSubspace.eq_univ_of_subsingleton_span_eq_top /-- A nonempty affine subspace is `⊤` if and only if its direction is `⊤`. -/ @[simp] theorem direction_eq_top_iff_of_nonempty {s : AffineSubspace k P} (h : (s : Set P).Nonempty) : s.direction = ⊤ ↔ s = ⊤ := by constructor · intro hd rw [← direction_top k V P] at hd refine ext_of_direction_eq hd ?_ simp [h] · rintro rfl simp #align affine_subspace.direction_eq_top_iff_of_nonempty AffineSubspace.direction_eq_top_iff_of_nonempty /-- The inf of two affine subspaces, coerced to a set, is the intersection of the two sets of points. -/ @[simp] theorem inf_coe (s1 s2 : AffineSubspace k P) : (s1 ⊓ s2 : Set P) = (s1 : Set P) ∩ s2 := rfl #align affine_subspace.inf_coe AffineSubspace.inf_coe /-- A point is in the inf of two affine subspaces if and only if it is in both of them. -/ theorem mem_inf_iff (p : P) (s1 s2 : AffineSubspace k P) : p ∈ s1 ⊓ s2 ↔ p ∈ s1 ∧ p ∈ s2 := Iff.rfl #align affine_subspace.mem_inf_iff AffineSubspace.mem_inf_iff /-- The direction of the inf of two affine subspaces is less than or equal to the inf of their directions. -/ theorem direction_inf (s1 s2 : AffineSubspace k P) : (s1 ⊓ s2).direction ≤ s1.direction ⊓ s2.direction := by simp only [direction_eq_vectorSpan, vectorSpan_def] exact le_inf (sInf_le_sInf fun p hp => trans (vsub_self_mono inter_subset_left) hp) (sInf_le_sInf fun p hp => trans (vsub_self_mono inter_subset_right) hp) #align affine_subspace.direction_inf AffineSubspace.direction_inf /-- If two affine subspaces have a point in common, the direction of their inf equals the inf of their directions. -/ theorem direction_inf_of_mem {s₁ s₂ : AffineSubspace k P} {p : P} (h₁ : p ∈ s₁) (h₂ : p ∈ s₂) : (s₁ ⊓ s₂).direction = s₁.direction ⊓ s₂.direction := by ext v rw [Submodule.mem_inf, ← vadd_mem_iff_mem_direction v h₁, ← vadd_mem_iff_mem_direction v h₂, ← vadd_mem_iff_mem_direction v ((mem_inf_iff p s₁ s₂).2 ⟨h₁, h₂⟩), mem_inf_iff] #align affine_subspace.direction_inf_of_mem AffineSubspace.direction_inf_of_mem /-- If two affine subspaces have a point in their inf, the direction of their inf equals the inf of their directions. -/ theorem direction_inf_of_mem_inf {s₁ s₂ : AffineSubspace k P} {p : P} (h : p ∈ s₁ ⊓ s₂) : (s₁ ⊓ s₂).direction = s₁.direction ⊓ s₂.direction := direction_inf_of_mem ((mem_inf_iff p s₁ s₂).1 h).1 ((mem_inf_iff p s₁ s₂).1 h).2 #align affine_subspace.direction_inf_of_mem_inf AffineSubspace.direction_inf_of_mem_inf /-- If one affine subspace is less than or equal to another, the same applies to their directions. -/ theorem direction_le {s1 s2 : AffineSubspace k P} (h : s1 ≤ s2) : s1.direction ≤ s2.direction := by simp only [direction_eq_vectorSpan, vectorSpan_def] exact vectorSpan_mono k h #align affine_subspace.direction_le AffineSubspace.direction_le /-- If one nonempty affine subspace is less than another, the same applies to their directions -/ theorem direction_lt_of_nonempty {s1 s2 : AffineSubspace k P} (h : s1 < s2) (hn : (s1 : Set P).Nonempty) : s1.direction < s2.direction := by cases' hn with p hp rw [lt_iff_le_and_exists] at h rcases h with ⟨hle, p2, hp2, hp2s1⟩ rw [SetLike.lt_iff_le_and_exists] use direction_le hle, p2 -ᵥ p, vsub_mem_direction hp2 (hle hp) intro hm rw [vsub_right_mem_direction_iff_mem hp p2] at hm exact hp2s1 hm #align affine_subspace.direction_lt_of_nonempty AffineSubspace.direction_lt_of_nonempty /-- The sup of the directions of two affine subspaces is less than or equal to the direction of their sup. -/ theorem sup_direction_le (s1 s2 : AffineSubspace k P) : s1.direction ⊔ s2.direction ≤ (s1 ⊔ s2).direction := by simp only [direction_eq_vectorSpan, vectorSpan_def] exact sup_le (sInf_le_sInf fun p hp => Set.Subset.trans (vsub_self_mono (le_sup_left : s1 ≤ s1 ⊔ s2)) hp) (sInf_le_sInf fun p hp => Set.Subset.trans (vsub_self_mono (le_sup_right : s2 ≤ s1 ⊔ s2)) hp) #align affine_subspace.sup_direction_le AffineSubspace.sup_direction_le /-- The sup of the directions of two nonempty affine subspaces with empty intersection is less than the direction of their sup. -/ theorem sup_direction_lt_of_nonempty_of_inter_empty {s1 s2 : AffineSubspace k P} (h1 : (s1 : Set P).Nonempty) (h2 : (s2 : Set P).Nonempty) (he : (s1 ∩ s2 : Set P) = ∅) : s1.direction ⊔ s2.direction < (s1 ⊔ s2).direction := by cases' h1 with p1 hp1 cases' h2 with p2 hp2 rw [SetLike.lt_iff_le_and_exists] use sup_direction_le s1 s2, p2 -ᵥ p1, vsub_mem_direction ((le_sup_right : s2 ≤ s1 ⊔ s2) hp2) ((le_sup_left : s1 ≤ s1 ⊔ s2) hp1) intro h rw [Submodule.mem_sup] at h rcases h with ⟨v1, hv1, v2, hv2, hv1v2⟩ rw [← sub_eq_zero, sub_eq_add_neg, neg_vsub_eq_vsub_rev, add_comm v1, add_assoc, ← vadd_vsub_assoc, ← neg_neg v2, add_comm, ← sub_eq_add_neg, ← vsub_vadd_eq_vsub_sub, vsub_eq_zero_iff_eq] at hv1v2 refine Set.Nonempty.ne_empty ?_ he use v1 +ᵥ p1, vadd_mem_of_mem_direction hv1 hp1 rw [hv1v2] exact vadd_mem_of_mem_direction (Submodule.neg_mem _ hv2) hp2 #align affine_subspace.sup_direction_lt_of_nonempty_of_inter_empty AffineSubspace.sup_direction_lt_of_nonempty_of_inter_empty /-- If the directions of two nonempty affine subspaces span the whole module, they have nonempty intersection. -/ theorem inter_nonempty_of_nonempty_of_sup_direction_eq_top {s1 s2 : AffineSubspace k P} (h1 : (s1 : Set P).Nonempty) (h2 : (s2 : Set P).Nonempty) (hd : s1.direction ⊔ s2.direction = ⊤) : ((s1 : Set P) ∩ s2).Nonempty := by by_contra h rw [Set.not_nonempty_iff_eq_empty] at h have hlt := sup_direction_lt_of_nonempty_of_inter_empty h1 h2 h rw [hd] at hlt exact not_top_lt hlt #align affine_subspace.inter_nonempty_of_nonempty_of_sup_direction_eq_top AffineSubspace.inter_nonempty_of_nonempty_of_sup_direction_eq_top /-- If the directions of two nonempty affine subspaces are complements of each other, they intersect in exactly one point. -/ theorem inter_eq_singleton_of_nonempty_of_isCompl {s1 s2 : AffineSubspace k P} (h1 : (s1 : Set P).Nonempty) (h2 : (s2 : Set P).Nonempty) (hd : IsCompl s1.direction s2.direction) : ∃ p, (s1 : Set P) ∩ s2 = {p} := by cases' inter_nonempty_of_nonempty_of_sup_direction_eq_top h1 h2 hd.sup_eq_top with p hp use p ext q rw [Set.mem_singleton_iff] constructor · rintro ⟨hq1, hq2⟩ have hqp : q -ᵥ p ∈ s1.direction ⊓ s2.direction := ⟨vsub_mem_direction hq1 hp.1, vsub_mem_direction hq2 hp.2⟩ rwa [hd.inf_eq_bot, Submodule.mem_bot, vsub_eq_zero_iff_eq] at hqp · exact fun h => h.symm ▸ hp #align affine_subspace.inter_eq_singleton_of_nonempty_of_is_compl AffineSubspace.inter_eq_singleton_of_nonempty_of_isCompl /-- Coercing a subspace to a set then taking the affine span produces the original subspace. -/ @[simp] theorem affineSpan_coe (s : AffineSubspace k P) : affineSpan k (s : Set P) = s := by refine le_antisymm ?_ (subset_spanPoints _ _) rintro p ⟨p1, hp1, v, hv, rfl⟩ exact vadd_mem_of_mem_direction hv hp1 #align affine_subspace.affine_span_coe AffineSubspace.affineSpan_coe end AffineSubspace section AffineSpace' variable (k : Type) {V : Type} {P : Type} [Ring k] [AddCommGroup V] [Module k V] [AffineSpace V P] variable {ι : Type} open AffineSubspace Set /-- The `vectorSpan` is the span of the pairwise subtractions with a given point on the left. -/ theorem vectorSpan_eq_span_vsub_set_left {s : Set P} {p : P} (hp : p ∈ s) : vectorSpan k s = Submodule.span k ((p -ᵥ ·) '' s) := by rw [vectorSpan_def] refine le_antisymm ?_ (Submodule.span_mono ?_) · rw [Submodule.span_le] rintro v ⟨p1, hp1, p2, hp2, hv⟩ simp_rw [← vsub_sub_vsub_cancel_left p1 p2 p] at hv rw [← hv, SetLike.mem_coe, Submodule.mem_span] exact fun m hm => Submodule.sub_mem _ (hm ⟨p2, hp2, rfl⟩) (hm ⟨p1, hp1, rfl⟩) · rintro v ⟨p2, hp2, hv⟩ exact ⟨p, hp, p2, hp2, hv⟩ #align vector_span_eq_span_vsub_set_left vectorSpan_eq_span_vsub_set_left /-- The `vectorSpan` is the span of the pairwise subtractions with a given point on the right. -/ theorem vectorSpan_eq_span_vsub_set_right {s : Set P} {p : P} (hp : p ∈ s) : vectorSpan k s = Submodule.span k ((· -ᵥ p) '' s) := by rw [vectorSpan_def] refine le_antisymm ?_ (Submodule.span_mono ?_) · rw [Submodule.span_le] rintro v ⟨p1, hp1, p2, hp2, hv⟩ simp_rw [← vsub_sub_vsub_cancel_right p1 p2 p] at hv rw [← hv, SetLike.mem_coe, Submodule.mem_span] exact fun m hm => Submodule.sub_mem _ (hm ⟨p1, hp1, rfl⟩) (hm ⟨p2, hp2, rfl⟩) · rintro v ⟨p2, hp2, hv⟩ exact ⟨p2, hp2, p, hp, hv⟩ #align vector_span_eq_span_vsub_set_right vectorSpan_eq_span_vsub_set_right /-- The `vectorSpan` is the span of the pairwise subtractions with a given point on the left, excluding the subtraction of that point from itself. -/ theorem vectorSpan_eq_span_vsub_set_left_ne {s : Set P} {p : P} (hp : p ∈ s) : vectorSpan k s = Submodule.span k ((p -ᵥ ·) '' (s \ {p})) := by conv_lhs => rw [vectorSpan_eq_span_vsub_set_left k hp, ← Set.insert_eq_of_mem hp, ← Set.insert_diff_singleton, Set.image_insert_eq] simp [Submodule.span_insert_eq_span] #align vector_span_eq_span_vsub_set_left_ne vectorSpan_eq_span_vsub_set_left_ne /-- The `vectorSpan` is the span of the pairwise subtractions with a given point on the right, excluding the subtraction of that point from itself. -/ theorem vectorSpan_eq_span_vsub_set_right_ne {s : Set P} {p : P} (hp : p ∈ s) : vectorSpan k s = Submodule.span k ((· -ᵥ p) '' (s \ {p})) := by conv_lhs => rw [vectorSpan_eq_span_vsub_set_right k hp, ← Set.insert_eq_of_mem hp, ← Set.insert_diff_singleton, Set.image_insert_eq] simp [Submodule.span_insert_eq_span] #align vector_span_eq_span_vsub_set_right_ne vectorSpan_eq_span_vsub_set_right_ne /-- The `vectorSpan` is the span of the pairwise subtractions with a given point on the right, excluding the subtraction of that point from itself. -/ theorem vectorSpan_eq_span_vsub_finset_right_ne [DecidableEq P] [DecidableEq V] {s : Finset P} {p : P} (hp : p ∈ s) : vectorSpan k (s : Set P) = Submodule.span k ((s.erase p).image (· -ᵥ p)) := by simp [vectorSpan_eq_span_vsub_set_right_ne _ (Finset.mem_coe.mpr hp)] #align vector_span_eq_span_vsub_finset_right_ne vectorSpan_eq_span_vsub_finset_right_ne /-- The `vectorSpan` of the image of a function is the span of the pairwise subtractions with a given point on the left, excluding the subtraction of that point from itself. -/ theorem vectorSpan_image_eq_span_vsub_set_left_ne (p : ι → P) {s : Set ι} {i : ι} (hi : i ∈ s) : vectorSpan k (p '' s) = Submodule.span k ((p i -ᵥ ·) '' (p '' (s \ {i}))) := by conv_lhs => rw [vectorSpan_eq_span_vsub_set_left k (Set.mem_image_of_mem p hi), ← Set.insert_eq_of_mem hi, ← Set.insert_diff_singleton, Set.image_insert_eq, Set.image_insert_eq] simp [Submodule.span_insert_eq_span] #align vector_span_image_eq_span_vsub_set_left_ne vectorSpan_image_eq_span_vsub_set_left_ne /-- The `vectorSpan` of the image of a function is the span of the pairwise subtractions with a given point on the right, excluding the subtraction of that point from itself. -/ theorem vectorSpan_image_eq_span_vsub_set_right_ne (p : ι → P) {s : Set ι} {i : ι} (hi : i ∈ s) : vectorSpan k (p '' s) = Submodule.span k ((· -ᵥ p i) '' (p '' (s \ {i}))) := by conv_lhs => rw [vectorSpan_eq_span_vsub_set_right k (Set.mem_image_of_mem p hi), ← Set.insert_eq_of_mem hi, ← Set.insert_diff_singleton, Set.image_insert_eq, Set.image_insert_eq] simp [Submodule.span_insert_eq_span] #align vector_span_image_eq_span_vsub_set_right_ne vectorSpan_image_eq_span_vsub_set_right_ne /-- The `vectorSpan` of an indexed family is the span of the pairwise subtractions with a given point on the left. -/ theorem vectorSpan_range_eq_span_range_vsub_left (p : ι → P) (i0 : ι) : vectorSpan k (Set.range p) = Submodule.span k (Set.range fun i : ι => p i0 -ᵥ p i) := by rw [vectorSpan_eq_span_vsub_set_left k (Set.mem_range_self i0), ← Set.range_comp] congr #align vector_span_range_eq_span_range_vsub_left vectorSpan_range_eq_span_range_vsub_left /-- The `vectorSpan` of an indexed family is the span of the pairwise subtractions with a given point on the right. -/ theorem vectorSpan_range_eq_span_range_vsub_right (p : ι → P) (i0 : ι) : vectorSpan k (Set.range p) = Submodule.span k (Set.range fun i : ι => p i -ᵥ p i0) := by rw [vectorSpan_eq_span_vsub_set_right k (Set.mem_range_self i0), ← Set.range_comp] congr #align vector_span_range_eq_span_range_vsub_right vectorSpan_range_eq_span_range_vsub_right /-- The `vectorSpan` of an indexed family is the span of the pairwise subtractions with a given point on the left, excluding the subtraction of that point from itself. -/ theorem vectorSpan_range_eq_span_range_vsub_left_ne (p : ι → P) (i₀ : ι) : vectorSpan k (Set.range p) = Submodule.span k (Set.range fun i : { x // x ≠ i₀ } => p i₀ -ᵥ p i) := by rw [← Set.image_univ, vectorSpan_image_eq_span_vsub_set_left_ne k _ (Set.mem_univ i₀)] congr with v simp only [Set.mem_range, Set.mem_image, Set.mem_diff, Set.mem_singleton_iff, Subtype.exists, Subtype.coe_mk] constructor · rintro ⟨x, ⟨i₁, ⟨⟨_, hi₁⟩, rfl⟩⟩, hv⟩ exact ⟨i₁, hi₁, hv⟩ · exact fun ⟨i₁, hi₁, hv⟩ => ⟨p i₁, ⟨i₁, ⟨Set.mem_univ _, hi₁⟩, rfl⟩, hv⟩ #align vector_span_range_eq_span_range_vsub_left_ne vectorSpan_range_eq_span_range_vsub_left_ne /-- The `vectorSpan` of an indexed family is the span of the pairwise subtractions with a given point on the right, excluding the subtraction of that point from itself. -/ theorem vectorSpan_range_eq_span_range_vsub_right_ne (p : ι → P) (i₀ : ι) : vectorSpan k (Set.range p) = Submodule.span k (Set.range fun i : { x // x ≠ i₀ } => p i -ᵥ p i₀) := by rw [← Set.image_univ, vectorSpan_image_eq_span_vsub_set_right_ne k _ (Set.mem_univ i₀)] congr with v simp only [Set.mem_range, Set.mem_image, Set.mem_diff, Set.mem_singleton_iff, Subtype.exists, Subtype.coe_mk] constructor · rintro ⟨x, ⟨i₁, ⟨⟨_, hi₁⟩, rfl⟩⟩, hv⟩ exact ⟨i₁, hi₁, hv⟩ · exact fun ⟨i₁, hi₁, hv⟩ => ⟨p i₁, ⟨i₁, ⟨Set.mem_univ _, hi₁⟩, rfl⟩, hv⟩ #align vector_span_range_eq_span_range_vsub_right_ne vectorSpan_range_eq_span_range_vsub_right_ne section variable {s : Set P} /-- The affine span of a set is nonempty if and only if that set is. -/ theorem affineSpan_nonempty : (affineSpan k s : Set P).Nonempty ↔ s.Nonempty := spanPoints_nonempty k s #align affine_span_nonempty affineSpan_nonempty alias ⟨_, _root_.Set.Nonempty.affineSpan⟩ := affineSpan_nonempty #align set.nonempty.affine_span Set.Nonempty.affineSpan /-- The affine span of a nonempty set is nonempty. -/ instance [Nonempty s] : Nonempty (affineSpan k s) := ((nonempty_coe_sort.1 ‹_›).affineSpan _).to_subtype /-- The affine span of a set is `⊥` if and only if that set is empty. -/ @[simp] theorem affineSpan_eq_bot : affineSpan k s = ⊥ ↔ s = ∅ := by rw [← not_iff_not, ← Ne, ← Ne, ← nonempty_iff_ne_bot, affineSpan_nonempty, nonempty_iff_ne_empty] #align affine_span_eq_bot affineSpan_eq_bot @[simp] theorem bot_lt_affineSpan : ⊥ < affineSpan k s ↔ s.Nonempty := by rw [bot_lt_iff_ne_bot, nonempty_iff_ne_empty] exact (affineSpan_eq_bot _).not #align bot_lt_affine_span bot_lt_affineSpan end variable {k} /-- An induction principle for span membership. If `p` holds for all elements of `s` and is preserved under certain affine combinations, then `p` holds for all elements of the span of `s`. -/ theorem affineSpan_induction {x : P} {s : Set P} {p : P → Prop} (h : x ∈ affineSpan k s) (mem : ∀ x : P, x ∈ s → p x) (smul_vsub_vadd : ∀ (c : k) (u v w : P), p u → p v → p w → p (c • (u -ᵥ v) +ᵥ w)) : p x := (affineSpan_le (Q := ⟨p, smul_vsub_vadd⟩)).mpr mem h #align affine_span_induction affineSpan_induction /-- A dependent version of `affineSpan_induction`. -/ @[elab_as_elim] theorem affineSpan_induction' {s : Set P} {p : ∀ x, x ∈ affineSpan k s → Prop} (mem : ∀ (y) (hys : y ∈ s), p y (subset_affineSpan k _ hys)) (smul_vsub_vadd : ∀ (c : k) (u hu v hv w hw), p u hu → p v hv → p w hw → p (c • (u -ᵥ v) +ᵥ w) (AffineSubspace.smul_vsub_vadd_mem _ _ hu hv hw)) {x : P} (h : x ∈ affineSpan k s) : p x h := by refine Exists.elim ?_ fun (hx : x ∈ affineSpan k s) (hc : p x hx) => hc -- Porting note: Lean couldn't infer the motive refine affineSpan_induction (p := fun y => ∃ z, p y z) h ?_ ?_ · exact fun y hy => ⟨subset_affineSpan _ _ hy, mem y hy⟩ · exact fun c u v w hu hv hw => Exists.elim hu fun hu' hu => Exists.elim hv fun hv' hv => Exists.elim hw fun hw' hw => ⟨AffineSubspace.smul_vsub_vadd_mem _ _ hu' hv' hw', smul_vsub_vadd _ _ _ _ _ _ _ hu hv hw⟩ #align affine_span_induction' affineSpan_induction' section WithLocalInstance attribute [local instance] AffineSubspace.toAddTorsor /-- A set, considered as a subset of its spanned affine subspace, spans the whole subspace. -/ @[simp] theorem affineSpan_coe_preimage_eq_top (A : Set P) [Nonempty A] : affineSpan k (((↑) : affineSpan k A → P) ⁻¹' A) = ⊤ := by rw [eq_top_iff] rintro ⟨x, hx⟩ - refine affineSpan_induction' (fun y hy ↦ ?_) (fun c u hu v hv w hw ↦ ?_) hx · exact subset_affineSpan _ _ hy · exact AffineSubspace.smul_vsub_vadd_mem _ _ #align affine_span_coe_preimage_eq_top affineSpan_coe_preimage_eq_top end WithLocalInstance /-- Suppose a set of vectors spans `V`. Then a point `p`, together with those vectors added to `p`, spans `P`. -/	Mathlib/LinearAlgebra/AffineSpace/AffineSubspace.lean	1,241	1,252	theorem affineSpan_singleton_union_vadd_eq_top_of_span_eq_top {s : Set V} (p : P) (h : Submodule.span k (Set.range ((↑) : s → V)) = ⊤) : affineSpan k ({p} ∪ (fun v => v +ᵥ p) '' s) = ⊤ := by	convert ext_of_direction_eq _ ⟨p, mem_affineSpan k (Set.mem_union_left _ (Set.mem_singleton _)), mem_top k V p⟩ rw [direction_affineSpan, direction_top, vectorSpan_eq_span_vsub_set_right k (Set.mem_union_left _ (Set.mem_singleton _) : p ∈ _), eq_top_iff, ← h] apply Submodule.span_mono rintro v ⟨v', rfl⟩ use (v' : V) +ᵥ p simp
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Floris van Doorn -/ import Mathlib.Data.Fintype.BigOperators import Mathlib.Data.Finsupp.Defs import Mathlib.Data.Nat.Cast.Order import Mathlib.Data.Set.Countable import Mathlib.Logic.Small.Set import Mathlib.Order.SuccPred.CompleteLinearOrder import Mathlib.SetTheory.Cardinal.SchroederBernstein #align_import set_theory.cardinal.basic from "leanprover-community/mathlib"@"3ff3f2d6a3118b8711063de7111a0d77a53219a8" /-! # Cardinal Numbers We define cardinal numbers as a quotient of types under the equivalence relation of equinumerity. ## Main definitions * `Cardinal` is the type of cardinal numbers (in a given universe). * `Cardinal.mk α` or `#α` is the cardinality of `α`. The notation `#` lives in the locale `Cardinal`. * Addition `c₁ + c₂` is defined by `Cardinal.add_def α β : #α + #β = #(α ⊕ β)`. * Multiplication `c₁ * c₂` is defined by `Cardinal.mul_def : #α * #β = #(α × β)`. * The order `c₁ ≤ c₂` is defined by `Cardinal.le_def α β : #α ≤ #β ↔ Nonempty (α ↪ β)`. * Exponentiation `c₁ ^ c₂` is defined by `Cardinal.power_def α β : #α ^ #β = #(β → α)`. * `Cardinal.isLimit c` means that `c` is a (weak) limit cardinal: `c ≠ 0 ∧ ∀ x < c, succ x < c`. * `Cardinal.aleph0` or `ℵ₀` is the cardinality of `ℕ`. This definition is universe polymorphic: `Cardinal.aleph0.{u} : Cardinal.{u}` (contrast with `ℕ : Type`, which lives in a specific universe). In some cases the universe level has to be given explicitly. * `Cardinal.sum` is the sum of an indexed family of cardinals, i.e. the cardinality of the corresponding sigma type. * `Cardinal.prod` is the product of an indexed family of cardinals, i.e. the cardinality of the corresponding pi type. * `Cardinal.powerlt a b` or `a ^< b` is defined as the supremum of `a ^ c` for `c < b`. ## Main instances * Cardinals form a `CanonicallyOrderedCommSemiring` with the aforementioned sum and product. * Cardinals form a `SuccOrder`. Use `Order.succ c` for the smallest cardinal greater than `c`. * The less than relation on cardinals forms a well-order. * Cardinals form a `ConditionallyCompleteLinearOrderBot`. Bounded sets for cardinals in universe `u` are precisely the sets indexed by some type in universe `u`, see `Cardinal.bddAbove_iff_small`. One can use `sSup` for the cardinal supremum, and `sInf` for the minimum of a set of cardinals. ## Main Statements * Cantor's theorem: `Cardinal.cantor c : c < 2 ^ c`. * König's theorem: `Cardinal.sum_lt_prod` ## Implementation notes * There is a type of cardinal numbers in every universe level: `Cardinal.{u} : Type (u + 1)` is the quotient of types in `Type u`. The operation `Cardinal.lift` lifts cardinal numbers to a higher level. * Cardinal arithmetic specifically for infinite cardinals (like `κ * κ = κ`) is in the file `Mathlib/SetTheory/Cardinal/Ordinal.lean`. * There is an instance `Pow Cardinal`, but this will only fire if Lean already knows that both the base and the exponent live in the same universe. As a workaround, you can add ``` local infixr:80 " ^' " => @HPow.hPow Cardinal Cardinal Cardinal _ ``` to a file. This notation will work even if Lean doesn't know yet that the base and the exponent live in the same universe (but no exponents in other types can be used). (Porting note: This last point might need to be updated.) ## References * <https://en.wikipedia.org/wiki/Cardinal_number> ## Tags cardinal number, cardinal arithmetic, cardinal exponentiation, aleph, Cantor's theorem, König's theorem, Konig's theorem -/ assert_not_exists Field assert_not_exists Module open scoped Classical open Function Set Order noncomputable section universe u v w variable {α β : Type u} /-- The equivalence relation on types given by equivalence (bijective correspondence) of types. Quotienting by this equivalence relation gives the cardinal numbers. -/ instance Cardinal.isEquivalent : Setoid (Type u) where r α β := Nonempty (α ≃ β) iseqv := ⟨ fun α => ⟨Equiv.refl α⟩, fun ⟨e⟩ => ⟨e.symm⟩, fun ⟨e₁⟩ ⟨e₂⟩ => ⟨e₁.trans e₂⟩⟩ #align cardinal.is_equivalent Cardinal.isEquivalent /-- `Cardinal.{u}` is the type of cardinal numbers in `Type u`, defined as the quotient of `Type u` by existence of an equivalence (a bijection with explicit inverse). -/ @[pp_with_univ] def Cardinal : Type (u + 1) := Quotient Cardinal.isEquivalent #align cardinal Cardinal namespace Cardinal /-- The cardinal number of a type -/ def mk : Type u → Cardinal := Quotient.mk' #align cardinal.mk Cardinal.mk @[inherit_doc] scoped prefix:max "#" => Cardinal.mk instance canLiftCardinalType : CanLift Cardinal.{u} (Type u) mk fun _ => True := ⟨fun c _ => Quot.inductionOn c fun α => ⟨α, rfl⟩⟩ #align cardinal.can_lift_cardinal_Type Cardinal.canLiftCardinalType @[elab_as_elim] theorem inductionOn {p : Cardinal → Prop} (c : Cardinal) (h : ∀ α, p #α) : p c := Quotient.inductionOn c h #align cardinal.induction_on Cardinal.inductionOn @[elab_as_elim] theorem inductionOn₂ {p : Cardinal → Cardinal → Prop} (c₁ : Cardinal) (c₂ : Cardinal) (h : ∀ α β, p #α #β) : p c₁ c₂ := Quotient.inductionOn₂ c₁ c₂ h #align cardinal.induction_on₂ Cardinal.inductionOn₂ @[elab_as_elim] theorem inductionOn₃ {p : Cardinal → Cardinal → Cardinal → Prop} (c₁ : Cardinal) (c₂ : Cardinal) (c₃ : Cardinal) (h : ∀ α β γ, p #α #β #γ) : p c₁ c₂ c₃ := Quotient.inductionOn₃ c₁ c₂ c₃ h #align cardinal.induction_on₃ Cardinal.inductionOn₃ protected theorem eq : #α = #β ↔ Nonempty (α ≃ β) := Quotient.eq' #align cardinal.eq Cardinal.eq @[simp] theorem mk'_def (α : Type u) : @Eq Cardinal ⟦α⟧ #α := rfl #align cardinal.mk_def Cardinal.mk'_def @[simp] theorem mk_out (c : Cardinal) : #c.out = c := Quotient.out_eq _ #align cardinal.mk_out Cardinal.mk_out /-- The representative of the cardinal of a type is equivalent to the original type. -/ def outMkEquiv {α : Type v} : (#α).out ≃ α := Nonempty.some <\| Cardinal.eq.mp (by simp) #align cardinal.out_mk_equiv Cardinal.outMkEquiv theorem mk_congr (e : α ≃ β) : #α = #β := Quot.sound ⟨e⟩ #align cardinal.mk_congr Cardinal.mk_congr alias _root_.Equiv.cardinal_eq := mk_congr #align equiv.cardinal_eq Equiv.cardinal_eq /-- Lift a function between `Type`s to a function between `Cardinal`s. -/ def map (f : Type u → Type v) (hf : ∀ α β, α ≃ β → f α ≃ f β) : Cardinal.{u} → Cardinal.{v} := Quotient.map f fun α β ⟨e⟩ => ⟨hf α β e⟩ #align cardinal.map Cardinal.map @[simp] theorem map_mk (f : Type u → Type v) (hf : ∀ α β, α ≃ β → f α ≃ f β) (α : Type u) : map f hf #α = #(f α) := rfl #align cardinal.map_mk Cardinal.map_mk /-- Lift a binary operation `Type → Type* → Type` to a binary operation on `Cardinal`s. -/ def map₂ (f : Type u → Type v → Type w) (hf : ∀ α β γ δ, α ≃ β → γ ≃ δ → f α γ ≃ f β δ) : Cardinal.{u} → Cardinal.{v} → Cardinal.{w} := Quotient.map₂ f fun α β ⟨e₁⟩ γ δ ⟨e₂⟩ => ⟨hf α β γ δ e₁ e₂⟩ #align cardinal.map₂ Cardinal.map₂ /-- The universe lift operation on cardinals. You can specify the universes explicitly with `lift.{u v} : Cardinal.{v} → Cardinal.{max v u}` -/ @[pp_with_univ] def lift (c : Cardinal.{v}) : Cardinal.{max v u} := map ULift.{u, v} (fun _ _ e => Equiv.ulift.trans <\| e.trans Equiv.ulift.symm) c #align cardinal.lift Cardinal.lift @[simp] theorem mk_uLift (α) : #(ULift.{v, u} α) = lift.{v} #α := rfl #align cardinal.mk_ulift Cardinal.mk_uLift -- Porting note: simpNF is not happy with universe levels, but this is needed as simp lemma -- further down in this file /-- `lift.{max u v, u}` equals `lift.{v, u}`. -/ @[simp, nolint simpNF] theorem lift_umax : lift.{max u v, u} = lift.{v, u} := funext fun a => inductionOn a fun _ => (Equiv.ulift.trans Equiv.ulift.symm).cardinal_eq #align cardinal.lift_umax Cardinal.lift_umax -- Porting note: simpNF is not happy with universe levels, but this is needed as simp lemma -- further down in this file /-- `lift.{max v u, u}` equals `lift.{v, u}`. -/ @[simp, nolint simpNF] theorem lift_umax' : lift.{max v u, u} = lift.{v, u} := lift_umax #align cardinal.lift_umax' Cardinal.lift_umax' -- Porting note: simpNF is not happy with universe levels, but this is needed as simp lemma -- further down in this file /-- A cardinal lifted to a lower or equal universe equals itself. -/ @[simp, nolint simpNF] theorem lift_id' (a : Cardinal.{max u v}) : lift.{u} a = a := inductionOn a fun _ => mk_congr Equiv.ulift #align cardinal.lift_id' Cardinal.lift_id' /-- A cardinal lifted to the same universe equals itself. -/ @[simp] theorem lift_id (a : Cardinal) : lift.{u, u} a = a := lift_id'.{u, u} a #align cardinal.lift_id Cardinal.lift_id /-- A cardinal lifted to the zero universe equals itself. -/ -- porting note (#10618): simp can prove this -- @[simp] theorem lift_uzero (a : Cardinal.{u}) : lift.{0} a = a := lift_id'.{0, u} a #align cardinal.lift_uzero Cardinal.lift_uzero @[simp] theorem lift_lift.{u_1} (a : Cardinal.{u_1}) : lift.{w} (lift.{v} a) = lift.{max v w} a := inductionOn a fun _ => (Equiv.ulift.trans <\| Equiv.ulift.trans Equiv.ulift.symm).cardinal_eq #align cardinal.lift_lift Cardinal.lift_lift /-- We define the order on cardinal numbers by `#α ≤ #β` if and only if there exists an embedding (injective function) from α to β. -/ instance : LE Cardinal.{u} := ⟨fun q₁ q₂ => Quotient.liftOn₂ q₁ q₂ (fun α β => Nonempty <\| α ↪ β) fun _ _ _ _ ⟨e₁⟩ ⟨e₂⟩ => propext ⟨fun ⟨e⟩ => ⟨e.congr e₁ e₂⟩, fun ⟨e⟩ => ⟨e.congr e₁.symm e₂.symm⟩⟩⟩ instance partialOrder : PartialOrder Cardinal.{u} where le := (· ≤ ·) le_refl := by rintro ⟨α⟩ exact ⟨Embedding.refl _⟩ le_trans := by rintro ⟨α⟩ ⟨β⟩ ⟨γ⟩ ⟨e₁⟩ ⟨e₂⟩ exact ⟨e₁.trans e₂⟩ le_antisymm := by rintro ⟨α⟩ ⟨β⟩ ⟨e₁⟩ ⟨e₂⟩ exact Quotient.sound (e₁.antisymm e₂) instance linearOrder : LinearOrder Cardinal.{u} := { Cardinal.partialOrder with le_total := by rintro ⟨α⟩ ⟨β⟩ apply Embedding.total decidableLE := Classical.decRel _ } theorem le_def (α β : Type u) : #α ≤ #β ↔ Nonempty (α ↪ β) := Iff.rfl #align cardinal.le_def Cardinal.le_def theorem mk_le_of_injective {α β : Type u} {f : α → β} (hf : Injective f) : #α ≤ #β := ⟨⟨f, hf⟩⟩ #align cardinal.mk_le_of_injective Cardinal.mk_le_of_injective theorem _root_.Function.Embedding.cardinal_le {α β : Type u} (f : α ↪ β) : #α ≤ #β := ⟨f⟩ #align function.embedding.cardinal_le Function.Embedding.cardinal_le theorem mk_le_of_surjective {α β : Type u} {f : α → β} (hf : Surjective f) : #β ≤ #α := ⟨Embedding.ofSurjective f hf⟩ #align cardinal.mk_le_of_surjective Cardinal.mk_le_of_surjective theorem le_mk_iff_exists_set {c : Cardinal} {α : Type u} : c ≤ #α ↔ ∃ p : Set α, #p = c := ⟨inductionOn c fun _ ⟨⟨f, hf⟩⟩ => ⟨Set.range f, (Equiv.ofInjective f hf).cardinal_eq.symm⟩, fun ⟨_, e⟩ => e ▸ ⟨⟨Subtype.val, fun _ _ => Subtype.eq⟩⟩⟩ #align cardinal.le_mk_iff_exists_set Cardinal.le_mk_iff_exists_set theorem mk_subtype_le {α : Type u} (p : α → Prop) : #(Subtype p) ≤ #α := ⟨Embedding.subtype p⟩ #align cardinal.mk_subtype_le Cardinal.mk_subtype_le theorem mk_set_le (s : Set α) : #s ≤ #α := mk_subtype_le s #align cardinal.mk_set_le Cardinal.mk_set_le @[simp] lemma mk_preimage_down {s : Set α} : #(ULift.down.{v} ⁻¹' s) = lift.{v} (#s) := by rw [← mk_uLift, Cardinal.eq] constructor let f : ULift.down ⁻¹' s → ULift s := fun x ↦ ULift.up (restrictPreimage s ULift.down x) have : Function.Bijective f := ULift.up_bijective.comp (restrictPreimage_bijective _ (ULift.down_bijective)) exact Equiv.ofBijective f this theorem out_embedding {c c' : Cardinal} : c ≤ c' ↔ Nonempty (c.out ↪ c'.out) := by trans · rw [← Quotient.out_eq c, ← Quotient.out_eq c'] · rw [mk'_def, mk'_def, le_def] #align cardinal.out_embedding Cardinal.out_embedding theorem lift_mk_le {α : Type v} {β : Type w} : lift.{max u w} #α ≤ lift.{max u v} #β ↔ Nonempty (α ↪ β) := ⟨fun ⟨f⟩ => ⟨Embedding.congr Equiv.ulift Equiv.ulift f⟩, fun ⟨f⟩ => ⟨Embedding.congr Equiv.ulift.symm Equiv.ulift.symm f⟩⟩ #align cardinal.lift_mk_le Cardinal.lift_mk_le /-- A variant of `Cardinal.lift_mk_le` with specialized universes. Because Lean often can not realize it should use this specialization itself, we provide this statement separately so you don't have to solve the specialization problem either. -/ theorem lift_mk_le' {α : Type u} {β : Type v} : lift.{v} #α ≤ lift.{u} #β ↔ Nonempty (α ↪ β) := lift_mk_le.{0} #align cardinal.lift_mk_le' Cardinal.lift_mk_le' theorem lift_mk_eq {α : Type u} {β : Type v} : lift.{max v w} #α = lift.{max u w} #β ↔ Nonempty (α ≃ β) := Quotient.eq'.trans ⟨fun ⟨f⟩ => ⟨Equiv.ulift.symm.trans <\| f.trans Equiv.ulift⟩, fun ⟨f⟩ => ⟨Equiv.ulift.trans <\| f.trans Equiv.ulift.symm⟩⟩ #align cardinal.lift_mk_eq Cardinal.lift_mk_eq /-- A variant of `Cardinal.lift_mk_eq` with specialized universes. Because Lean often can not realize it should use this specialization itself, we provide this statement separately so you don't have to solve the specialization problem either. -/ theorem lift_mk_eq' {α : Type u} {β : Type v} : lift.{v} #α = lift.{u} #β ↔ Nonempty (α ≃ β) := lift_mk_eq.{u, v, 0} #align cardinal.lift_mk_eq' Cardinal.lift_mk_eq' @[simp] theorem lift_le {a b : Cardinal.{v}} : lift.{u, v} a ≤ lift.{u, v} b ↔ a ≤ b := inductionOn₂ a b fun α β => by rw [← lift_umax] exact lift_mk_le.{u} #align cardinal.lift_le Cardinal.lift_le -- Porting note: changed `simps` to `simps!` because the linter told to do so. /-- `Cardinal.lift` as an `OrderEmbedding`. -/ @[simps! (config := .asFn)] def liftOrderEmbedding : Cardinal.{v} ↪o Cardinal.{max v u} := OrderEmbedding.ofMapLEIff lift.{u, v} fun _ _ => lift_le #align cardinal.lift_order_embedding Cardinal.liftOrderEmbedding theorem lift_injective : Injective lift.{u, v} := liftOrderEmbedding.injective #align cardinal.lift_injective Cardinal.lift_injective @[simp] theorem lift_inj {a b : Cardinal.{u}} : lift.{v, u} a = lift.{v, u} b ↔ a = b := lift_injective.eq_iff #align cardinal.lift_inj Cardinal.lift_inj @[simp] theorem lift_lt {a b : Cardinal.{u}} : lift.{v, u} a < lift.{v, u} b ↔ a < b := liftOrderEmbedding.lt_iff_lt #align cardinal.lift_lt Cardinal.lift_lt theorem lift_strictMono : StrictMono lift := fun _ _ => lift_lt.2 #align cardinal.lift_strict_mono Cardinal.lift_strictMono theorem lift_monotone : Monotone lift := lift_strictMono.monotone #align cardinal.lift_monotone Cardinal.lift_monotone instance : Zero Cardinal.{u} := -- `PEmpty` might be more canonical, but this is convenient for defeq with natCast ⟨lift #(Fin 0)⟩ instance : Inhabited Cardinal.{u} := ⟨0⟩ @[simp] theorem mk_eq_zero (α : Type u) [IsEmpty α] : #α = 0 := (Equiv.equivOfIsEmpty α (ULift (Fin 0))).cardinal_eq #align cardinal.mk_eq_zero Cardinal.mk_eq_zero @[simp] theorem lift_zero : lift 0 = 0 := mk_eq_zero _ #align cardinal.lift_zero Cardinal.lift_zero @[simp] theorem lift_eq_zero {a : Cardinal.{v}} : lift.{u} a = 0 ↔ a = 0 := lift_injective.eq_iff' lift_zero #align cardinal.lift_eq_zero Cardinal.lift_eq_zero theorem mk_eq_zero_iff {α : Type u} : #α = 0 ↔ IsEmpty α := ⟨fun e => let ⟨h⟩ := Quotient.exact e h.isEmpty, @mk_eq_zero α⟩ #align cardinal.mk_eq_zero_iff Cardinal.mk_eq_zero_iff theorem mk_ne_zero_iff {α : Type u} : #α ≠ 0 ↔ Nonempty α := (not_iff_not.2 mk_eq_zero_iff).trans not_isEmpty_iff #align cardinal.mk_ne_zero_iff Cardinal.mk_ne_zero_iff @[simp] theorem mk_ne_zero (α : Type u) [Nonempty α] : #α ≠ 0 := mk_ne_zero_iff.2 ‹_› #align cardinal.mk_ne_zero Cardinal.mk_ne_zero instance : One Cardinal.{u} := -- `PUnit` might be more canonical, but this is convenient for defeq with natCast ⟨lift #(Fin 1)⟩ instance : Nontrivial Cardinal.{u} := ⟨⟨1, 0, mk_ne_zero _⟩⟩ theorem mk_eq_one (α : Type u) [Unique α] : #α = 1 := (Equiv.equivOfUnique α (ULift (Fin 1))).cardinal_eq #align cardinal.mk_eq_one Cardinal.mk_eq_one theorem le_one_iff_subsingleton {α : Type u} : #α ≤ 1 ↔ Subsingleton α := ⟨fun ⟨f⟩ => ⟨fun _ _ => f.injective (Subsingleton.elim _ _)⟩, fun ⟨h⟩ => ⟨fun _ => ULift.up 0, fun _ _ _ => h _ _⟩⟩ #align cardinal.le_one_iff_subsingleton Cardinal.le_one_iff_subsingleton @[simp] theorem mk_le_one_iff_set_subsingleton {s : Set α} : #s ≤ 1 ↔ s.Subsingleton := le_one_iff_subsingleton.trans s.subsingleton_coe #align cardinal.mk_le_one_iff_set_subsingleton Cardinal.mk_le_one_iff_set_subsingleton alias ⟨_, _root_.Set.Subsingleton.cardinal_mk_le_one⟩ := mk_le_one_iff_set_subsingleton #align set.subsingleton.cardinal_mk_le_one Set.Subsingleton.cardinal_mk_le_one instance : Add Cardinal.{u} := ⟨map₂ Sum fun _ _ _ _ => Equiv.sumCongr⟩ theorem add_def (α β : Type u) : #α + #β = #(Sum α β) := rfl #align cardinal.add_def Cardinal.add_def instance : NatCast Cardinal.{u} := ⟨fun n => lift #(Fin n)⟩ @[simp] theorem mk_sum (α : Type u) (β : Type v) : #(α ⊕ β) = lift.{v, u} #α + lift.{u, v} #β := mk_congr (Equiv.ulift.symm.sumCongr Equiv.ulift.symm) #align cardinal.mk_sum Cardinal.mk_sum @[simp] theorem mk_option {α : Type u} : #(Option α) = #α + 1 := by rw [(Equiv.optionEquivSumPUnit.{u, u} α).cardinal_eq, mk_sum, mk_eq_one PUnit, lift_id, lift_id] #align cardinal.mk_option Cardinal.mk_option @[simp] theorem mk_psum (α : Type u) (β : Type v) : #(PSum α β) = lift.{v} #α + lift.{u} #β := (mk_congr (Equiv.psumEquivSum α β)).trans (mk_sum α β) #align cardinal.mk_psum Cardinal.mk_psum @[simp] theorem mk_fintype (α : Type u) [h : Fintype α] : #α = Fintype.card α := mk_congr (Fintype.equivOfCardEq (by simp)) protected theorem cast_succ (n : ℕ) : ((n + 1 : ℕ) : Cardinal.{u}) = n + 1 := by change #(ULift.{u} (Fin (n+1))) = # (ULift.{u} (Fin n)) + 1 rw [← mk_option, mk_fintype, mk_fintype] simp only [Fintype.card_ulift, Fintype.card_fin, Fintype.card_option] instance : Mul Cardinal.{u} := ⟨map₂ Prod fun _ _ _ _ => Equiv.prodCongr⟩ theorem mul_def (α β : Type u) : #α #β = #(α × β) := rfl #align cardinal.mul_def Cardinal.mul_def @[simp] theorem mk_prod (α : Type u) (β : Type v) : #(α × β) = lift.{v, u} #α * lift.{u, v} #β := mk_congr (Equiv.ulift.symm.prodCongr Equiv.ulift.symm) #align cardinal.mk_prod Cardinal.mk_prod private theorem mul_comm' (a b : Cardinal.{u}) : a * b = b * a := inductionOn₂ a b fun α β => mk_congr <\| Equiv.prodComm α β /-- The cardinal exponential. `#α ^ #β` is the cardinal of `β → α`. -/ instance instPowCardinal : Pow Cardinal.{u} Cardinal.{u} := ⟨map₂ (fun α β => β → α) fun _ _ _ _ e₁ e₂ => e₂.arrowCongr e₁⟩ theorem power_def (α β : Type u) : #α ^ #β = #(β → α) := rfl #align cardinal.power_def Cardinal.power_def theorem mk_arrow (α : Type u) (β : Type v) : #(α → β) = (lift.{u} #β^lift.{v} #α) := mk_congr (Equiv.ulift.symm.arrowCongr Equiv.ulift.symm) #align cardinal.mk_arrow Cardinal.mk_arrow @[simp] theorem lift_power (a b : Cardinal.{u}) : lift.{v} (a ^ b) = lift.{v} a ^ lift.{v} b := inductionOn₂ a b fun _ _ => mk_congr <\| Equiv.ulift.trans (Equiv.ulift.arrowCongr Equiv.ulift).symm #align cardinal.lift_power Cardinal.lift_power @[simp] theorem power_zero {a : Cardinal} : a ^ (0 : Cardinal) = 1 := inductionOn a fun _ => mk_eq_one _ #align cardinal.power_zero Cardinal.power_zero @[simp] theorem power_one {a : Cardinal.{u}} : a ^ (1 : Cardinal) = a := inductionOn a fun α => mk_congr (Equiv.funUnique (ULift.{u} (Fin 1)) α) #align cardinal.power_one Cardinal.power_one theorem power_add {a b c : Cardinal} : a ^ (b + c) = a ^ b * a ^ c := inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.sumArrowEquivProdArrow β γ α #align cardinal.power_add Cardinal.power_add instance commSemiring : CommSemiring Cardinal.{u} where zero := 0 one := 1 add := (· + ·) mul := (· * ·) zero_add a := inductionOn a fun α => mk_congr <\| Equiv.emptySum (ULift (Fin 0)) α add_zero a := inductionOn a fun α => mk_congr <\| Equiv.sumEmpty α (ULift (Fin 0)) add_assoc a b c := inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.sumAssoc α β γ add_comm a b := inductionOn₂ a b fun α β => mk_congr <\| Equiv.sumComm α β zero_mul a := inductionOn a fun α => mk_eq_zero _ mul_zero a := inductionOn a fun α => mk_eq_zero _ one_mul a := inductionOn a fun α => mk_congr <\| Equiv.uniqueProd α (ULift (Fin 1)) mul_one a := inductionOn a fun α => mk_congr <\| Equiv.prodUnique α (ULift (Fin 1)) mul_assoc a b c := inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.prodAssoc α β γ mul_comm := mul_comm' left_distrib a b c := inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.prodSumDistrib α β γ right_distrib a b c := inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.sumProdDistrib α β γ nsmul := nsmulRec npow n c := c ^ (n : Cardinal) npow_zero := @power_zero npow_succ n c := show c ^ (↑(n + 1) : Cardinal) = c ^ (↑n : Cardinal) * c by rw [Cardinal.cast_succ, power_add, power_one, mul_comm'] natCast := (fun n => lift.{u} #(Fin n) : ℕ → Cardinal.{u}) natCast_zero := rfl natCast_succ := Cardinal.cast_succ /-! Porting note (#11229): Deprecated section. Remove. -/ section deprecated set_option linter.deprecated false @[deprecated (since := "2023-02-11")] theorem power_bit0 (a b : Cardinal) : a ^ bit0 b = a ^ b * a ^ b := power_add #align cardinal.power_bit0 Cardinal.power_bit0 @[deprecated (since := "2023-02-11")] theorem power_bit1 (a b : Cardinal) : a ^ bit1 b = a ^ b * a ^ b * a := by rw [bit1, ← power_bit0, power_add, power_one] #align cardinal.power_bit1 Cardinal.power_bit1 end deprecated @[simp] theorem one_power {a : Cardinal} : (1 : Cardinal) ^ a = 1 := inductionOn a fun _ => mk_eq_one _ #align cardinal.one_power Cardinal.one_power -- porting note (#10618): simp can prove this -- @[simp] theorem mk_bool : #Bool = 2 := by simp #align cardinal.mk_bool Cardinal.mk_bool -- porting note (#10618): simp can prove this -- @[simp] theorem mk_Prop : #Prop = 2 := by simp #align cardinal.mk_Prop Cardinal.mk_Prop @[simp] theorem zero_power {a : Cardinal} : a ≠ 0 → (0 : Cardinal) ^ a = 0 := inductionOn a fun _ heq => mk_eq_zero_iff.2 <\| isEmpty_pi.2 <\| let ⟨a⟩ := mk_ne_zero_iff.1 heq ⟨a, inferInstance⟩ #align cardinal.zero_power Cardinal.zero_power theorem power_ne_zero {a : Cardinal} (b : Cardinal) : a ≠ 0 → a ^ b ≠ 0 := inductionOn₂ a b fun _ _ h => let ⟨a⟩ := mk_ne_zero_iff.1 h mk_ne_zero_iff.2 ⟨fun _ => a⟩ #align cardinal.power_ne_zero Cardinal.power_ne_zero theorem mul_power {a b c : Cardinal} : (a * b) ^ c = a ^ c * b ^ c := inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.arrowProdEquivProdArrow α β γ #align cardinal.mul_power Cardinal.mul_power theorem power_mul {a b c : Cardinal} : a ^ (b * c) = (a ^ b) ^ c := by rw [mul_comm b c] exact inductionOn₃ a b c fun α β γ => mk_congr <\| Equiv.curry γ β α #align cardinal.power_mul Cardinal.power_mul @[simp] theorem pow_cast_right (a : Cardinal.{u}) (n : ℕ) : a ^ (↑n : Cardinal.{u}) = a ^ n := rfl #align cardinal.pow_cast_right Cardinal.pow_cast_right @[simp] theorem lift_one : lift 1 = 1 := mk_eq_one _ #align cardinal.lift_one Cardinal.lift_one @[simp] theorem lift_eq_one {a : Cardinal.{v}} : lift.{u} a = 1 ↔ a = 1 := lift_injective.eq_iff' lift_one @[simp] theorem lift_add (a b : Cardinal.{u}) : lift.{v} (a + b) = lift.{v} a + lift.{v} b := inductionOn₂ a b fun _ _ => mk_congr <\| Equiv.ulift.trans (Equiv.sumCongr Equiv.ulift Equiv.ulift).symm #align cardinal.lift_add Cardinal.lift_add @[simp] theorem lift_mul (a b : Cardinal.{u}) : lift.{v} (a * b) = lift.{v} a * lift.{v} b := inductionOn₂ a b fun _ _ => mk_congr <\| Equiv.ulift.trans (Equiv.prodCongr Equiv.ulift Equiv.ulift).symm #align cardinal.lift_mul Cardinal.lift_mul /-! Porting note (#11229): Deprecated section. Remove. -/ section deprecated set_option linter.deprecated false @[simp, deprecated (since := "2023-02-11")] theorem lift_bit0 (a : Cardinal) : lift.{v} (bit0 a) = bit0 (lift.{v} a) := lift_add a a #align cardinal.lift_bit0 Cardinal.lift_bit0 @[simp, deprecated (since := "2023-02-11")] theorem lift_bit1 (a : Cardinal) : lift.{v} (bit1 a) = bit1 (lift.{v} a) := by simp [bit1] #align cardinal.lift_bit1 Cardinal.lift_bit1 end deprecated -- Porting note: Proof used to be simp, needed to remind simp that 1 + 1 = 2 theorem lift_two : lift.{u, v} 2 = 2 := by simp [← one_add_one_eq_two] #align cardinal.lift_two Cardinal.lift_two @[simp] theorem mk_set {α : Type u} : #(Set α) = 2 ^ #α := by simp [← one_add_one_eq_two, Set, mk_arrow] #align cardinal.mk_set Cardinal.mk_set /-- A variant of `Cardinal.mk_set` expressed in terms of a `Set` instead of a `Type`. -/ @[simp] theorem mk_powerset {α : Type u} (s : Set α) : #(↥(𝒫 s)) = 2 ^ #(↥s) := (mk_congr (Equiv.Set.powerset s)).trans mk_set #align cardinal.mk_powerset Cardinal.mk_powerset theorem lift_two_power (a : Cardinal) : lift.{v} (2 ^ a) = 2 ^ lift.{v} a := by simp [← one_add_one_eq_two] #align cardinal.lift_two_power Cardinal.lift_two_power section OrderProperties open Sum protected theorem zero_le : ∀ a : Cardinal, 0 ≤ a := by rintro ⟨α⟩ exact ⟨Embedding.ofIsEmpty⟩ #align cardinal.zero_le Cardinal.zero_le private theorem add_le_add' : ∀ {a b c d : Cardinal}, a ≤ b → c ≤ d → a + c ≤ b + d := by rintro ⟨α⟩ ⟨β⟩ ⟨γ⟩ ⟨δ⟩ ⟨e₁⟩ ⟨e₂⟩; exact ⟨e₁.sumMap e₂⟩ -- #align cardinal.add_le_add' Cardinal.add_le_add' instance add_covariantClass : CovariantClass Cardinal Cardinal (· + ·) (· ≤ ·) := ⟨fun _ _ _ => add_le_add' le_rfl⟩ #align cardinal.add_covariant_class Cardinal.add_covariantClass instance add_swap_covariantClass : CovariantClass Cardinal Cardinal (swap (· + ·)) (· ≤ ·) := ⟨fun _ _ _ h => add_le_add' h le_rfl⟩ #align cardinal.add_swap_covariant_class Cardinal.add_swap_covariantClass instance canonicallyOrderedCommSemiring : CanonicallyOrderedCommSemiring Cardinal.{u} := { Cardinal.commSemiring, Cardinal.partialOrder with bot := 0 bot_le := Cardinal.zero_le add_le_add_left := fun a b => add_le_add_left exists_add_of_le := fun {a b} => inductionOn₂ a b fun α β ⟨⟨f, hf⟩⟩ => have : Sum α ((range f)ᶜ : Set β) ≃ β := (Equiv.sumCongr (Equiv.ofInjective f hf) (Equiv.refl _)).trans <\| Equiv.Set.sumCompl (range f) ⟨#(↥(range f)ᶜ), mk_congr this.symm⟩ le_self_add := fun a b => (add_zero a).ge.trans <\| add_le_add_left (Cardinal.zero_le _) _ eq_zero_or_eq_zero_of_mul_eq_zero := fun {a b} => inductionOn₂ a b fun α β => by simpa only [mul_def, mk_eq_zero_iff, isEmpty_prod] using id } instance : CanonicallyLinearOrderedAddCommMonoid Cardinal.{u} := { Cardinal.canonicallyOrderedCommSemiring, Cardinal.linearOrder with } -- Computable instance to prevent a non-computable one being found via the one above instance : CanonicallyOrderedAddCommMonoid Cardinal.{u} := { Cardinal.canonicallyOrderedCommSemiring with } instance : LinearOrderedCommMonoidWithZero Cardinal.{u} := { Cardinal.commSemiring, Cardinal.linearOrder with mul_le_mul_left := @mul_le_mul_left' _ _ _ _ zero_le_one := zero_le _ } -- Computable instance to prevent a non-computable one being found via the one above instance : CommMonoidWithZero Cardinal.{u} := { Cardinal.canonicallyOrderedCommSemiring with } -- Porting note: new -- Computable instance to prevent a non-computable one being found via the one above instance : CommMonoid Cardinal.{u} := { Cardinal.canonicallyOrderedCommSemiring with } theorem zero_power_le (c : Cardinal.{u}) : (0 : Cardinal.{u}) ^ c ≤ 1 := by by_cases h : c = 0 · rw [h, power_zero] · rw [zero_power h] apply zero_le #align cardinal.zero_power_le Cardinal.zero_power_le theorem power_le_power_left : ∀ {a b c : Cardinal}, a ≠ 0 → b ≤ c → a ^ b ≤ a ^ c := by rintro ⟨α⟩ ⟨β⟩ ⟨γ⟩ hα ⟨e⟩ let ⟨a⟩ := mk_ne_zero_iff.1 hα exact ⟨@Function.Embedding.arrowCongrLeft _ _ _ ⟨a⟩ e⟩ #align cardinal.power_le_power_left Cardinal.power_le_power_left theorem self_le_power (a : Cardinal) {b : Cardinal} (hb : 1 ≤ b) : a ≤ a ^ b := by rcases eq_or_ne a 0 with (rfl \| ha) · exact zero_le _ · convert power_le_power_left ha hb exact power_one.symm #align cardinal.self_le_power Cardinal.self_le_power /-- Cantor's theorem -/ theorem cantor (a : Cardinal.{u}) : a < 2 ^ a := by induction' a using Cardinal.inductionOn with α rw [← mk_set] refine ⟨⟨⟨singleton, fun a b => singleton_eq_singleton_iff.1⟩⟩, ?_⟩ rintro ⟨⟨f, hf⟩⟩ exact cantor_injective f hf #align cardinal.cantor Cardinal.cantor instance : NoMaxOrder Cardinal.{u} where exists_gt a := ⟨_, cantor a⟩ -- short-circuit type class inference instance : DistribLattice Cardinal.{u} := inferInstance theorem one_lt_iff_nontrivial {α : Type u} : 1 < #α ↔ Nontrivial α := by rw [← not_le, le_one_iff_subsingleton, ← not_nontrivial_iff_subsingleton, Classical.not_not] #align cardinal.one_lt_iff_nontrivial Cardinal.one_lt_iff_nontrivial theorem power_le_max_power_one {a b c : Cardinal} (h : b ≤ c) : a ^ b ≤ max (a ^ c) 1 := by by_cases ha : a = 0 · simp [ha, zero_power_le] · exact (power_le_power_left ha h).trans (le_max_left _ _) #align cardinal.power_le_max_power_one Cardinal.power_le_max_power_one theorem power_le_power_right {a b c : Cardinal} : a ≤ b → a ^ c ≤ b ^ c := inductionOn₃ a b c fun _ _ _ ⟨e⟩ => ⟨Embedding.arrowCongrRight e⟩ #align cardinal.power_le_power_right Cardinal.power_le_power_right theorem power_pos {a : Cardinal} (b : Cardinal) (ha : 0 < a) : 0 < a ^ b := (power_ne_zero _ ha.ne').bot_lt #align cardinal.power_pos Cardinal.power_pos end OrderProperties protected theorem lt_wf : @WellFounded Cardinal.{u} (· < ·) := ⟨fun a => by_contradiction fun h => by let ι := { c : Cardinal // ¬Acc (· < ·) c } let f : ι → Cardinal := Subtype.val haveI hι : Nonempty ι := ⟨⟨_, h⟩⟩ obtain ⟨⟨c : Cardinal, hc : ¬Acc (· < ·) c⟩, ⟨h_1 : ∀ j, (f ⟨c, hc⟩).out ↪ (f j).out⟩⟩ := Embedding.min_injective fun i => (f i).out refine hc (Acc.intro _ fun j h' => by_contradiction fun hj => h'.2 ?_) have : #_ ≤ #_ := ⟨h_1 ⟨j, hj⟩⟩ simpa only [mk_out] using this⟩ #align cardinal.lt_wf Cardinal.lt_wf instance : WellFoundedRelation Cardinal.{u} := ⟨(· < ·), Cardinal.lt_wf⟩ -- Porting note: this no longer is automatically inferred. instance : WellFoundedLT Cardinal.{u} := ⟨Cardinal.lt_wf⟩ instance wo : @IsWellOrder Cardinal.{u} (· < ·) where #align cardinal.wo Cardinal.wo instance : ConditionallyCompleteLinearOrderBot Cardinal := IsWellOrder.conditionallyCompleteLinearOrderBot _ @[simp] theorem sInf_empty : sInf (∅ : Set Cardinal.{u}) = 0 := dif_neg Set.not_nonempty_empty #align cardinal.Inf_empty Cardinal.sInf_empty lemma sInf_eq_zero_iff {s : Set Cardinal} : sInf s = 0 ↔ s = ∅ ∨ ∃ a ∈ s, a = 0 := by refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rcases s.eq_empty_or_nonempty with rfl \| hne · exact Or.inl rfl · exact Or.inr ⟨sInf s, csInf_mem hne, h⟩ · rcases h with rfl \| ⟨a, ha, rfl⟩ · exact Cardinal.sInf_empty · exact eq_bot_iff.2 (csInf_le' ha) lemma iInf_eq_zero_iff {ι : Sort} {f : ι → Cardinal} : (⨅ i, f i) = 0 ↔ IsEmpty ι ∨ ∃ i, f i = 0 := by simp [iInf, sInf_eq_zero_iff] /-- Note that the successor of `c` is not the same as `c + 1` except in the case of finite `c`. -/ instance : SuccOrder Cardinal := SuccOrder.ofSuccLeIff (fun c => sInf { c' \| c < c' }) -- Porting note: Needed to insert `by apply` in the next line ⟨by apply lt_of_lt_of_le <\| csInf_mem <\| exists_gt _, -- Porting note used to be just `csInf_le'` fun h ↦ csInf_le' h⟩ theorem succ_def (c : Cardinal) : succ c = sInf { c' \| c < c' } := rfl #align cardinal.succ_def Cardinal.succ_def theorem succ_pos : ∀ c : Cardinal, 0 < succ c := bot_lt_succ #align cardinal.succ_pos Cardinal.succ_pos theorem succ_ne_zero (c : Cardinal) : succ c ≠ 0 := (succ_pos _).ne' #align cardinal.succ_ne_zero Cardinal.succ_ne_zero theorem add_one_le_succ (c : Cardinal.{u}) : c + 1 ≤ succ c := by -- Porting note: rewrote the next three lines to avoid defeq abuse. have : Set.Nonempty { c' \| c < c' } := exists_gt c simp_rw [succ_def, le_csInf_iff'' this, mem_setOf] intro b hlt rcases b, c with ⟨⟨β⟩, ⟨γ⟩⟩ cases' le_of_lt hlt with f have : ¬Surjective f := fun hn => (not_le_of_lt hlt) (mk_le_of_surjective hn) simp only [Surjective, not_forall] at this rcases this with ⟨b, hb⟩ calc #γ + 1 = #(Option γ) := mk_option.symm _ ≤ #β := (f.optionElim b hb).cardinal_le #align cardinal.add_one_le_succ Cardinal.add_one_le_succ /-- A cardinal is a limit if it is not zero or a successor cardinal. Note that `ℵ₀` is a limit cardinal by this definition, but `0` isn't. Use `IsSuccLimit` if you want to include the `c = 0` case. -/ def IsLimit (c : Cardinal) : Prop := c ≠ 0 ∧ IsSuccLimit c #align cardinal.is_limit Cardinal.IsLimit protected theorem IsLimit.ne_zero {c} (h : IsLimit c) : c ≠ 0 := h.1 #align cardinal.is_limit.ne_zero Cardinal.IsLimit.ne_zero protected theorem IsLimit.isSuccLimit {c} (h : IsLimit c) : IsSuccLimit c := h.2 #align cardinal.is_limit.is_succ_limit Cardinal.IsLimit.isSuccLimit theorem IsLimit.succ_lt {x c} (h : IsLimit c) : x < c → succ x < c := h.isSuccLimit.succ_lt #align cardinal.is_limit.succ_lt Cardinal.IsLimit.succ_lt theorem isSuccLimit_zero : IsSuccLimit (0 : Cardinal) := isSuccLimit_bot #align cardinal.is_succ_limit_zero Cardinal.isSuccLimit_zero /-- The indexed sum of cardinals is the cardinality of the indexed disjoint union, i.e. sigma type. -/ def sum {ι} (f : ι → Cardinal) : Cardinal := mk (Σi, (f i).out) #align cardinal.sum Cardinal.sum theorem le_sum {ι} (f : ι → Cardinal) (i) : f i ≤ sum f := by rw [← Quotient.out_eq (f i)] exact ⟨⟨fun a => ⟨i, a⟩, fun a b h => by injection h⟩⟩ #align cardinal.le_sum Cardinal.le_sum @[simp] theorem mk_sigma {ι} (f : ι → Type) : #(Σ i, f i) = sum fun i => #(f i) := mk_congr <\| Equiv.sigmaCongrRight fun _ => outMkEquiv.symm #align cardinal.mk_sigma Cardinal.mk_sigma @[simp] theorem sum_const (ι : Type u) (a : Cardinal.{v}) : (sum fun _ : ι => a) = lift.{v} #ι * lift.{u} a := inductionOn a fun α => mk_congr <\| calc (Σ _ : ι, Quotient.out #α) ≃ ι × Quotient.out #α := Equiv.sigmaEquivProd _ _ _ ≃ ULift ι × ULift α := Equiv.ulift.symm.prodCongr (outMkEquiv.trans Equiv.ulift.symm) #align cardinal.sum_const Cardinal.sum_const theorem sum_const' (ι : Type u) (a : Cardinal.{u}) : (sum fun _ : ι => a) = #ι * a := by simp #align cardinal.sum_const' Cardinal.sum_const' @[simp] theorem sum_add_distrib {ι} (f g : ι → Cardinal) : sum (f + g) = sum f + sum g := by have := mk_congr (Equiv.sigmaSumDistrib (Quotient.out ∘ f) (Quotient.out ∘ g)) simp only [comp_apply, mk_sigma, mk_sum, mk_out, lift_id] at this exact this #align cardinal.sum_add_distrib Cardinal.sum_add_distrib @[simp] theorem sum_add_distrib' {ι} (f g : ι → Cardinal) : (Cardinal.sum fun i => f i + g i) = sum f + sum g := sum_add_distrib f g #align cardinal.sum_add_distrib' Cardinal.sum_add_distrib' @[simp] theorem lift_sum {ι : Type u} (f : ι → Cardinal.{v}) : Cardinal.lift.{w} (Cardinal.sum f) = Cardinal.sum fun i => Cardinal.lift.{w} (f i) := Equiv.cardinal_eq <\| Equiv.ulift.trans <\| Equiv.sigmaCongrRight fun a => -- Porting note: Inserted universe hint .{_,_,v} below Nonempty.some <\| by rw [← lift_mk_eq.{_,_,v}, mk_out, mk_out, lift_lift] #align cardinal.lift_sum Cardinal.lift_sum theorem sum_le_sum {ι} (f g : ι → Cardinal) (H : ∀ i, f i ≤ g i) : sum f ≤ sum g := ⟨(Embedding.refl _).sigmaMap fun i => Classical.choice <\| by have := H i; rwa [← Quot.out_eq (f i), ← Quot.out_eq (g i)] at this⟩ #align cardinal.sum_le_sum Cardinal.sum_le_sum theorem mk_le_mk_mul_of_mk_preimage_le {c : Cardinal} (f : α → β) (hf : ∀ b : β, #(f ⁻¹' {b}) ≤ c) : #α ≤ #β * c := by simpa only [← mk_congr (@Equiv.sigmaFiberEquiv α β f), mk_sigma, ← sum_const'] using sum_le_sum _ _ hf #align cardinal.mk_le_mk_mul_of_mk_preimage_le Cardinal.mk_le_mk_mul_of_mk_preimage_le theorem lift_mk_le_lift_mk_mul_of_lift_mk_preimage_le {α : Type u} {β : Type v} {c : Cardinal} (f : α → β) (hf : ∀ b : β, lift.{v} #(f ⁻¹' {b}) ≤ c) : lift.{v} #α ≤ lift.{u} #β * c := (mk_le_mk_mul_of_mk_preimage_le fun x : ULift.{v} α => ULift.up.{u} (f x.1)) <\| ULift.forall.2 fun b => (mk_congr <\| (Equiv.ulift.image _).trans (Equiv.trans (by rw [Equiv.image_eq_preimage] /- Porting note: Need to insert the following `have` b/c bad fun coercion behaviour for Equivs -/ have : DFunLike.coe (Equiv.symm (Equiv.ulift (α := α))) = ULift.up (α := α) := rfl rw [this] simp only [preimage, mem_singleton_iff, ULift.up_inj, mem_setOf_eq, coe_setOf] exact Equiv.refl _) Equiv.ulift.symm)).trans_le (hf b) #align cardinal.lift_mk_le_lift_mk_mul_of_lift_mk_preimage_le Cardinal.lift_mk_le_lift_mk_mul_of_lift_mk_preimage_le /-- The range of an indexed cardinal function, whose outputs live in a higher universe than the inputs, is always bounded above. -/ theorem bddAbove_range {ι : Type u} (f : ι → Cardinal.{max u v}) : BddAbove (Set.range f) := ⟨_, by rintro a ⟨i, rfl⟩ -- Porting note: Added universe reference below exact le_sum.{v,u} f i⟩ #align cardinal.bdd_above_range Cardinal.bddAbove_range instance (a : Cardinal.{u}) : Small.{u} (Set.Iic a) := by rw [← mk_out a] apply @small_of_surjective (Set a.out) (Iic #a.out) _ fun x => ⟨#x, mk_set_le x⟩ rintro ⟨x, hx⟩ simpa using le_mk_iff_exists_set.1 hx instance (a : Cardinal.{u}) : Small.{u} (Set.Iio a) := small_subset Iio_subset_Iic_self /-- A set of cardinals is bounded above iff it's small, i.e. it corresponds to a usual ZFC set. -/ theorem bddAbove_iff_small {s : Set Cardinal.{u}} : BddAbove s ↔ Small.{u} s := ⟨fun ⟨a, ha⟩ => @small_subset _ (Iic a) s (fun x h => ha h) _, by rintro ⟨ι, ⟨e⟩⟩ suffices (range fun x : ι => (e.symm x).1) = s by rw [← this] apply bddAbove_range.{u, u} ext x refine ⟨?_, fun hx => ⟨e ⟨x, hx⟩, ?_⟩⟩ · rintro ⟨a, rfl⟩ exact (e.symm a).2 · simp_rw [Equiv.symm_apply_apply]⟩ #align cardinal.bdd_above_iff_small Cardinal.bddAbove_iff_small theorem bddAbove_of_small (s : Set Cardinal.{u}) [h : Small.{u} s] : BddAbove s := bddAbove_iff_small.2 h #align cardinal.bdd_above_of_small Cardinal.bddAbove_of_small theorem bddAbove_image (f : Cardinal.{u} → Cardinal.{max u v}) {s : Set Cardinal.{u}} (hs : BddAbove s) : BddAbove (f '' s) := by rw [bddAbove_iff_small] at hs ⊢ -- Porting note: added universes below exact small_lift.{_,v,_} _ #align cardinal.bdd_above_image Cardinal.bddAbove_image theorem bddAbove_range_comp {ι : Type u} {f : ι → Cardinal.{v}} (hf : BddAbove (range f)) (g : Cardinal.{v} → Cardinal.{max v w}) : BddAbove (range (g ∘ f)) := by rw [range_comp] exact bddAbove_image.{v,w} g hf #align cardinal.bdd_above_range_comp Cardinal.bddAbove_range_comp theorem iSup_le_sum {ι} (f : ι → Cardinal) : iSup f ≤ sum f := ciSup_le' <\| le_sum.{u_2,u_1} _ #align cardinal.supr_le_sum Cardinal.iSup_le_sum -- Porting note: Added universe hint .{v,_} below theorem sum_le_iSup_lift {ι : Type u} (f : ι → Cardinal.{max u v}) : sum f ≤ Cardinal.lift.{v,_} #ι * iSup f := by rw [← (iSup f).lift_id, ← lift_umax, lift_umax.{max u v, u}, ← sum_const] exact sum_le_sum _ _ (le_ciSup <\| bddAbove_range.{u, v} f) #align cardinal.sum_le_supr_lift Cardinal.sum_le_iSup_lift theorem sum_le_iSup {ι : Type u} (f : ι → Cardinal.{u}) : sum f ≤ #ι * iSup f := by rw [← lift_id #ι] exact sum_le_iSup_lift f #align cardinal.sum_le_supr Cardinal.sum_le_iSup theorem sum_nat_eq_add_sum_succ (f : ℕ → Cardinal.{u}) : Cardinal.sum f = f 0 + Cardinal.sum fun i => f (i + 1) := by refine (Equiv.sigmaNatSucc fun i => Quotient.out (f i)).cardinal_eq.trans ?_ simp only [mk_sum, mk_out, lift_id, mk_sigma] #align cardinal.sum_nat_eq_add_sum_succ Cardinal.sum_nat_eq_add_sum_succ -- Porting note: LFS is not in normal form. -- @[simp] /-- A variant of `ciSup_of_empty` but with `0` on the RHS for convenience -/ protected theorem iSup_of_empty {ι} (f : ι → Cardinal) [IsEmpty ι] : iSup f = 0 := ciSup_of_empty f #align cardinal.supr_of_empty Cardinal.iSup_of_empty lemma exists_eq_of_iSup_eq_of_not_isSuccLimit {ι : Type u} (f : ι → Cardinal.{v}) (ω : Cardinal.{v}) (hω : ¬ Order.IsSuccLimit ω) (h : ⨆ i : ι, f i = ω) : ∃ i, f i = ω := by subst h refine (isLUB_csSup' ?_).exists_of_not_isSuccLimit hω contrapose! hω with hf rw [iSup, csSup_of_not_bddAbove hf, csSup_empty] exact Order.isSuccLimit_bot lemma exists_eq_of_iSup_eq_of_not_isLimit {ι : Type u} [hι : Nonempty ι] (f : ι → Cardinal.{v}) (hf : BddAbove (range f)) (ω : Cardinal.{v}) (hω : ¬ ω.IsLimit) (h : ⨆ i : ι, f i = ω) : ∃ i, f i = ω := by refine (not_and_or.mp hω).elim (fun e ↦ ⟨hι.some, ?_⟩) (Cardinal.exists_eq_of_iSup_eq_of_not_isSuccLimit.{u, v} f ω · h) cases not_not.mp e rw [← le_zero_iff] at h ⊢ exact (le_ciSup hf _).trans h -- Porting note: simpNF is not happy with universe levels. @[simp, nolint simpNF] theorem lift_mk_shrink (α : Type u) [Small.{v} α] : Cardinal.lift.{max u w} #(Shrink.{v} α) = Cardinal.lift.{max v w} #α := -- Porting note: Added .{v,u,w} universe hint below lift_mk_eq.{v,u,w}.2 ⟨(equivShrink α).symm⟩ #align cardinal.lift_mk_shrink Cardinal.lift_mk_shrink @[simp] theorem lift_mk_shrink' (α : Type u) [Small.{v} α] : Cardinal.lift.{u} #(Shrink.{v} α) = Cardinal.lift.{v} #α := lift_mk_shrink.{u, v, 0} α #align cardinal.lift_mk_shrink' Cardinal.lift_mk_shrink' @[simp] theorem lift_mk_shrink'' (α : Type max u v) [Small.{v} α] : Cardinal.lift.{u} #(Shrink.{v} α) = #α := by rw [← lift_umax', lift_mk_shrink.{max u v, v, 0} α, ← lift_umax, lift_id] #align cardinal.lift_mk_shrink'' Cardinal.lift_mk_shrink'' /-- The indexed product of cardinals is the cardinality of the Pi type (dependent product). -/ def prod {ι : Type u} (f : ι → Cardinal) : Cardinal := #(∀ i, (f i).out) #align cardinal.prod Cardinal.prod @[simp] theorem mk_pi {ι : Type u} (α : ι → Type v) : #(∀ i, α i) = prod fun i => #(α i) := mk_congr <\| Equiv.piCongrRight fun _ => outMkEquiv.symm #align cardinal.mk_pi Cardinal.mk_pi @[simp] theorem prod_const (ι : Type u) (a : Cardinal.{v}) : (prod fun _ : ι => a) = lift.{u} a ^ lift.{v} #ι := inductionOn a fun _ => mk_congr <\| Equiv.piCongr Equiv.ulift.symm fun _ => outMkEquiv.trans Equiv.ulift.symm #align cardinal.prod_const Cardinal.prod_const theorem prod_const' (ι : Type u) (a : Cardinal.{u}) : (prod fun _ : ι => a) = a ^ #ι := inductionOn a fun _ => (mk_pi _).symm #align cardinal.prod_const' Cardinal.prod_const' theorem prod_le_prod {ι} (f g : ι → Cardinal) (H : ∀ i, f i ≤ g i) : prod f ≤ prod g := ⟨Embedding.piCongrRight fun i => Classical.choice <\| by have := H i; rwa [← mk_out (f i), ← mk_out (g i)] at this⟩ #align cardinal.prod_le_prod Cardinal.prod_le_prod @[simp] theorem prod_eq_zero {ι} (f : ι → Cardinal.{u}) : prod f = 0 ↔ ∃ i, f i = 0 := by lift f to ι → Type u using fun _ => trivial simp only [mk_eq_zero_iff, ← mk_pi, isEmpty_pi] #align cardinal.prod_eq_zero Cardinal.prod_eq_zero theorem prod_ne_zero {ι} (f : ι → Cardinal) : prod f ≠ 0 ↔ ∀ i, f i ≠ 0 := by simp [prod_eq_zero] #align cardinal.prod_ne_zero Cardinal.prod_ne_zero @[simp] theorem lift_prod {ι : Type u} (c : ι → Cardinal.{v}) : lift.{w} (prod c) = prod fun i => lift.{w} (c i) := by lift c to ι → Type v using fun _ => trivial simp only [← mk_pi, ← mk_uLift] exact mk_congr (Equiv.ulift.trans <\| Equiv.piCongrRight fun i => Equiv.ulift.symm) #align cardinal.lift_prod Cardinal.lift_prod theorem prod_eq_of_fintype {α : Type u} [h : Fintype α] (f : α → Cardinal.{v}) : prod f = Cardinal.lift.{u} (∏ i, f i) := by revert f refine Fintype.induction_empty_option ?_ ?_ ?_ α (h_fintype := h) · intro α β hβ e h f letI := Fintype.ofEquiv β e.symm rw [← e.prod_comp f, ← h] exact mk_congr (e.piCongrLeft _).symm · intro f rw [Fintype.univ_pempty, Finset.prod_empty, lift_one, Cardinal.prod, mk_eq_one] · intro α hα h f rw [Cardinal.prod, mk_congr Equiv.piOptionEquivProd, mk_prod, lift_umax'.{v, u}, mk_out, ← Cardinal.prod, lift_prod, Fintype.prod_option, lift_mul, ← h fun a => f (some a)] simp only [lift_id] #align cardinal.prod_eq_of_fintype Cardinal.prod_eq_of_fintype -- Porting note: Inserted .{u,v} below @[simp] theorem lift_sInf (s : Set Cardinal) : lift.{u,v} (sInf s) = sInf (lift.{u,v} '' s) := by rcases eq_empty_or_nonempty s with (rfl \| hs) · simp · exact lift_monotone.map_csInf hs #align cardinal.lift_Inf Cardinal.lift_sInf -- Porting note: Inserted .{u,v} below @[simp] theorem lift_iInf {ι} (f : ι → Cardinal) : lift.{u,v} (iInf f) = ⨅ i, lift.{u,v} (f i) := by unfold iInf convert lift_sInf (range f) simp_rw [← comp_apply (f := lift), range_comp] #align cardinal.lift_infi Cardinal.lift_iInf theorem lift_down {a : Cardinal.{u}} {b : Cardinal.{max u v}} : b ≤ lift.{v,u} a → ∃ a', lift.{v,u} a' = b := inductionOn₂ a b fun α β => by rw [← lift_id #β, ← lift_umax, ← lift_umax.{u, v}, lift_mk_le.{v}] exact fun ⟨f⟩ => ⟨#(Set.range f), Eq.symm <\| lift_mk_eq.{_, _, v}.2 ⟨Function.Embedding.equivOfSurjective (Embedding.codRestrict _ f Set.mem_range_self) fun ⟨a, ⟨b, e⟩⟩ => ⟨b, Subtype.eq e⟩⟩⟩ #align cardinal.lift_down Cardinal.lift_down -- Porting note: Inserted .{u,v} below theorem le_lift_iff {a : Cardinal.{u}} {b : Cardinal.{max u v}} : b ≤ lift.{v,u} a ↔ ∃ a', lift.{v,u} a' = b ∧ a' ≤ a := ⟨fun h => let ⟨a', e⟩ := lift_down h ⟨a', e, lift_le.1 <\| e.symm ▸ h⟩, fun ⟨_, e, h⟩ => e ▸ lift_le.2 h⟩ #align cardinal.le_lift_iff Cardinal.le_lift_iff -- Porting note: Inserted .{u,v} below theorem lt_lift_iff {a : Cardinal.{u}} {b : Cardinal.{max u v}} : b < lift.{v,u} a ↔ ∃ a', lift.{v,u} a' = b ∧ a' < a := ⟨fun h => let ⟨a', e⟩ := lift_down h.le ⟨a', e, lift_lt.1 <\| e.symm ▸ h⟩, fun ⟨_, e, h⟩ => e ▸ lift_lt.2 h⟩ #align cardinal.lt_lift_iff Cardinal.lt_lift_iff -- Porting note: Inserted .{u,v} below @[simp] theorem lift_succ (a) : lift.{v,u} (succ a) = succ (lift.{v,u} a) := le_antisymm (le_of_not_gt fun h => by rcases lt_lift_iff.1 h with ⟨b, e, h⟩ rw [lt_succ_iff, ← lift_le, e] at h exact h.not_lt (lt_succ _)) (succ_le_of_lt <\| lift_lt.2 <\| lt_succ a) #align cardinal.lift_succ Cardinal.lift_succ -- Porting note: simpNF is not happy with universe levels. -- Porting note: Inserted .{u,v} below @[simp, nolint simpNF] theorem lift_umax_eq {a : Cardinal.{u}} {b : Cardinal.{v}} : lift.{max v w} a = lift.{max u w} b ↔ lift.{v} a = lift.{u} b := by rw [← lift_lift.{v, w, u}, ← lift_lift.{u, w, v}, lift_inj] #align cardinal.lift_umax_eq Cardinal.lift_umax_eq -- Porting note: Inserted .{u,v} below @[simp] theorem lift_min {a b : Cardinal} : lift.{u,v} (min a b) = min (lift.{u,v} a) (lift.{u,v} b) := lift_monotone.map_min #align cardinal.lift_min Cardinal.lift_min -- Porting note: Inserted .{u,v} below @[simp] theorem lift_max {a b : Cardinal} : lift.{u,v} (max a b) = max (lift.{u,v} a) (lift.{u,v} b) := lift_monotone.map_max #align cardinal.lift_max Cardinal.lift_max /-- The lift of a supremum is the supremum of the lifts. -/ theorem lift_sSup {s : Set Cardinal} (hs : BddAbove s) : lift.{u} (sSup s) = sSup (lift.{u} '' s) := by apply ((le_csSup_iff' (bddAbove_image.{_,u} _ hs)).2 fun c hc => _).antisymm (csSup_le' _) · intro c hc by_contra h obtain ⟨d, rfl⟩ := Cardinal.lift_down (not_le.1 h).le simp_rw [lift_le] at h hc rw [csSup_le_iff' hs] at h exact h fun a ha => lift_le.1 <\| hc (mem_image_of_mem _ ha) · rintro i ⟨j, hj, rfl⟩ exact lift_le.2 (le_csSup hs hj) #align cardinal.lift_Sup Cardinal.lift_sSup /-- The lift of a supremum is the supremum of the lifts. -/ theorem lift_iSup {ι : Type v} {f : ι → Cardinal.{w}} (hf : BddAbove (range f)) : lift.{u} (iSup f) = ⨆ i, lift.{u} (f i) := by rw [iSup, iSup, lift_sSup hf, ← range_comp] simp [Function.comp] #align cardinal.lift_supr Cardinal.lift_iSup /-- To prove that the lift of a supremum is bounded by some cardinal `t`, it suffices to show that the lift of each cardinal is bounded by `t`. -/ theorem lift_iSup_le {ι : Type v} {f : ι → Cardinal.{w}} {t : Cardinal} (hf : BddAbove (range f)) (w : ∀ i, lift.{u} (f i) ≤ t) : lift.{u} (iSup f) ≤ t := by rw [lift_iSup hf] exact ciSup_le' w #align cardinal.lift_supr_le Cardinal.lift_iSup_le @[simp] theorem lift_iSup_le_iff {ι : Type v} {f : ι → Cardinal.{w}} (hf : BddAbove (range f)) {t : Cardinal} : lift.{u} (iSup f) ≤ t ↔ ∀ i, lift.{u} (f i) ≤ t := by rw [lift_iSup hf] exact ciSup_le_iff' (bddAbove_range_comp.{_,_,u} hf _) #align cardinal.lift_supr_le_iff Cardinal.lift_iSup_le_iff universe v' w' /-- To prove an inequality between the lifts to a common universe of two different supremums, it suffices to show that the lift of each cardinal from the smaller supremum if bounded by the lift of some cardinal from the larger supremum. -/ theorem lift_iSup_le_lift_iSup {ι : Type v} {ι' : Type v'} {f : ι → Cardinal.{w}} {f' : ι' → Cardinal.{w'}} (hf : BddAbove (range f)) (hf' : BddAbove (range f')) {g : ι → ι'} (h : ∀ i, lift.{w'} (f i) ≤ lift.{w} (f' (g i))) : lift.{w'} (iSup f) ≤ lift.{w} (iSup f') := by rw [lift_iSup hf, lift_iSup hf'] exact ciSup_mono' (bddAbove_range_comp.{_,_,w} hf' _) fun i => ⟨_, h i⟩ #align cardinal.lift_supr_le_lift_supr Cardinal.lift_iSup_le_lift_iSup /-- A variant of `lift_iSup_le_lift_iSup` with universes specialized via `w = v` and `w' = v'`. This is sometimes necessary to avoid universe unification issues. -/ theorem lift_iSup_le_lift_iSup' {ι : Type v} {ι' : Type v'} {f : ι → Cardinal.{v}} {f' : ι' → Cardinal.{v'}} (hf : BddAbove (range f)) (hf' : BddAbove (range f')) (g : ι → ι') (h : ∀ i, lift.{v'} (f i) ≤ lift.{v} (f' (g i))) : lift.{v'} (iSup f) ≤ lift.{v} (iSup f') := lift_iSup_le_lift_iSup hf hf' h #align cardinal.lift_supr_le_lift_supr' Cardinal.lift_iSup_le_lift_iSup' /-- `ℵ₀` is the smallest infinite cardinal. -/ def aleph0 : Cardinal.{u} := lift #ℕ #align cardinal.aleph_0 Cardinal.aleph0 @[inherit_doc] scoped notation "ℵ₀" => Cardinal.aleph0 theorem mk_nat : #ℕ = ℵ₀ := (lift_id _).symm #align cardinal.mk_nat Cardinal.mk_nat theorem aleph0_ne_zero : ℵ₀ ≠ 0 := mk_ne_zero _ #align cardinal.aleph_0_ne_zero Cardinal.aleph0_ne_zero theorem aleph0_pos : 0 < ℵ₀ := pos_iff_ne_zero.2 aleph0_ne_zero #align cardinal.aleph_0_pos Cardinal.aleph0_pos @[simp] theorem lift_aleph0 : lift ℵ₀ = ℵ₀ := lift_lift _ #align cardinal.lift_aleph_0 Cardinal.lift_aleph0 @[simp] theorem aleph0_le_lift {c : Cardinal.{u}} : ℵ₀ ≤ lift.{v} c ↔ ℵ₀ ≤ c := by rw [← lift_aleph0.{u,v}, lift_le] #align cardinal.aleph_0_le_lift Cardinal.aleph0_le_lift @[simp] theorem lift_le_aleph0 {c : Cardinal.{u}} : lift.{v} c ≤ ℵ₀ ↔ c ≤ ℵ₀ := by rw [← lift_aleph0.{u,v}, lift_le] #align cardinal.lift_le_aleph_0 Cardinal.lift_le_aleph0 @[simp] theorem aleph0_lt_lift {c : Cardinal.{u}} : ℵ₀ < lift.{v} c ↔ ℵ₀ < c := by rw [← lift_aleph0.{u,v}, lift_lt] #align cardinal.aleph_0_lt_lift Cardinal.aleph0_lt_lift @[simp] theorem lift_lt_aleph0 {c : Cardinal.{u}} : lift.{v} c < ℵ₀ ↔ c < ℵ₀ := by rw [← lift_aleph0.{u,v}, lift_lt] #align cardinal.lift_lt_aleph_0 Cardinal.lift_lt_aleph0 /-! ### Properties about the cast from `ℕ` -/ section castFromN -- porting note (#10618): simp can prove this -- @[simp] theorem mk_fin (n : ℕ) : #(Fin n) = n := by simp #align cardinal.mk_fin Cardinal.mk_fin @[simp] theorem lift_natCast (n : ℕ) : lift.{u} (n : Cardinal.{v}) = n := by induction n <;> simp [] #align cardinal.lift_nat_cast Cardinal.lift_natCast -- See note [no_index around OfNat.ofNat] @[simp] theorem lift_ofNat (n : ℕ) [n.AtLeastTwo] : lift.{u} (no_index (OfNat.ofNat n : Cardinal.{v})) = OfNat.ofNat n := lift_natCast n @[simp] theorem lift_eq_nat_iff {a : Cardinal.{u}} {n : ℕ} : lift.{v} a = n ↔ a = n := lift_injective.eq_iff' (lift_natCast n) #align cardinal.lift_eq_nat_iff Cardinal.lift_eq_nat_iff @[simp] theorem lift_eq_ofNat_iff {a : Cardinal.{u}} {n : ℕ} [n.AtLeastTwo] : lift.{v} a = (no_index (OfNat.ofNat n)) ↔ a = OfNat.ofNat n := lift_eq_nat_iff @[simp] theorem nat_eq_lift_iff {n : ℕ} {a : Cardinal.{u}} : (n : Cardinal) = lift.{v} a ↔ (n : Cardinal) = a := by rw [← lift_natCast.{v,u} n, lift_inj] #align cardinal.nat_eq_lift_iff Cardinal.nat_eq_lift_iff @[simp] theorem zero_eq_lift_iff {a : Cardinal.{u}} : (0 : Cardinal) = lift.{v} a ↔ 0 = a := by simpa using nat_eq_lift_iff (n := 0) @[simp] theorem one_eq_lift_iff {a : Cardinal.{u}} : (1 : Cardinal) = lift.{v} a ↔ 1 = a := by simpa using nat_eq_lift_iff (n := 1) -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_eq_lift_iff {a : Cardinal.{u}} {n : ℕ} [n.AtLeastTwo] : (no_index (OfNat.ofNat n : Cardinal)) = lift.{v} a ↔ (OfNat.ofNat n : Cardinal) = a := nat_eq_lift_iff @[simp] theorem lift_le_nat_iff {a : Cardinal.{u}} {n : ℕ} : lift.{v} a ≤ n ↔ a ≤ n := by rw [← lift_natCast.{v,u}, lift_le] #align cardinal.lift_le_nat_iff Cardinal.lift_le_nat_iff @[simp] theorem lift_le_one_iff {a : Cardinal.{u}} : lift.{v} a ≤ 1 ↔ a ≤ 1 := by simpa using lift_le_nat_iff (n := 1) -- See note [no_index around OfNat.ofNat] @[simp] theorem lift_le_ofNat_iff {a : Cardinal.{u}} {n : ℕ} [n.AtLeastTwo] : lift.{v} a ≤ (no_index (OfNat.ofNat n)) ↔ a ≤ OfNat.ofNat n := lift_le_nat_iff @[simp] theorem nat_le_lift_iff {n : ℕ} {a : Cardinal.{u}} : n ≤ lift.{v} a ↔ n ≤ a := by rw [← lift_natCast.{v,u}, lift_le] #align cardinal.nat_le_lift_iff Cardinal.nat_le_lift_iff @[simp] theorem one_le_lift_iff {a : Cardinal.{u}} : (1 : Cardinal) ≤ lift.{v} a ↔ 1 ≤ a := by simpa using nat_le_lift_iff (n := 1) -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_le_lift_iff {a : Cardinal.{u}} {n : ℕ} [n.AtLeastTwo] : (no_index (OfNat.ofNat n : Cardinal)) ≤ lift.{v} a ↔ (OfNat.ofNat n : Cardinal) ≤ a := nat_le_lift_iff @[simp] theorem lift_lt_nat_iff {a : Cardinal.{u}} {n : ℕ} : lift.{v} a < n ↔ a < n := by rw [← lift_natCast.{v,u}, lift_lt] #align cardinal.lift_lt_nat_iff Cardinal.lift_lt_nat_iff -- See note [no_index around OfNat.ofNat] @[simp] theorem lift_lt_ofNat_iff {a : Cardinal.{u}} {n : ℕ} [n.AtLeastTwo] : lift.{v} a < (no_index (OfNat.ofNat n)) ↔ a < OfNat.ofNat n := lift_lt_nat_iff @[simp] theorem nat_lt_lift_iff {n : ℕ} {a : Cardinal.{u}} : n < lift.{v} a ↔ n < a := by rw [← lift_natCast.{v,u}, lift_lt] #align cardinal.nat_lt_lift_iff Cardinal.nat_lt_lift_iff -- See note [no_index around OfNat.ofNat] @[simp] theorem zero_lt_lift_iff {a : Cardinal.{u}} : (0 : Cardinal) < lift.{v} a ↔ 0 < a := by simpa using nat_lt_lift_iff (n := 0) @[simp] theorem one_lt_lift_iff {a : Cardinal.{u}} : (1 : Cardinal) < lift.{v} a ↔ 1 < a := by simpa using nat_lt_lift_iff (n := 1) -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_lt_lift_iff {a : Cardinal.{u}} {n : ℕ} [n.AtLeastTwo] : (no_index (OfNat.ofNat n : Cardinal)) < lift.{v} a ↔ (OfNat.ofNat n : Cardinal) < a := nat_lt_lift_iff theorem lift_mk_fin (n : ℕ) : lift #(Fin n) = n := rfl #align cardinal.lift_mk_fin Cardinal.lift_mk_fin theorem mk_coe_finset {α : Type u} {s : Finset α} : #s = ↑(Finset.card s) := by simp #align cardinal.mk_coe_finset Cardinal.mk_coe_finset theorem mk_finset_of_fintype [Fintype α] : #(Finset α) = 2 ^ Fintype.card α := by simp [Pow.pow] #align cardinal.mk_finset_of_fintype Cardinal.mk_finset_of_fintype @[simp] theorem mk_finsupp_lift_of_fintype (α : Type u) (β : Type v) [Fintype α] [Zero β] : #(α →₀ β) = lift.{u} #β ^ Fintype.card α := by simpa using (@Finsupp.equivFunOnFinite α β _ _).cardinal_eq #align cardinal.mk_finsupp_lift_of_fintype Cardinal.mk_finsupp_lift_of_fintype theorem mk_finsupp_of_fintype (α β : Type u) [Fintype α] [Zero β] : #(α →₀ β) = #β ^ Fintype.card α := by simp #align cardinal.mk_finsupp_of_fintype Cardinal.mk_finsupp_of_fintype theorem card_le_of_finset {α} (s : Finset α) : (s.card : Cardinal) ≤ #α := @mk_coe_finset _ s ▸ mk_set_le _ #align cardinal.card_le_of_finset Cardinal.card_le_of_finset -- Porting note: was `simp`. LHS is not normal form. -- @[simp, norm_cast] @[norm_cast] theorem natCast_pow {m n : ℕ} : (↑(m ^ n) : Cardinal) = (↑m : Cardinal) ^ (↑n : Cardinal) := by induction n <;> simp [pow_succ, power_add, , Pow.pow] #align cardinal.nat_cast_pow Cardinal.natCast_pow -- porting note (#10618): simp can prove this -- @[simp, norm_cast] @[norm_cast] theorem natCast_le {m n : ℕ} : (m : Cardinal) ≤ n ↔ m ≤ n := by rw [← lift_mk_fin, ← lift_mk_fin, lift_le, le_def, Function.Embedding.nonempty_iff_card_le, Fintype.card_fin, Fintype.card_fin] #align cardinal.nat_cast_le Cardinal.natCast_le -- porting note (#10618): simp can prove this -- @[simp, norm_cast] @[norm_cast] theorem natCast_lt {m n : ℕ} : (m : Cardinal) < n ↔ m < n := by rw [lt_iff_le_not_le, ← not_le] simp only [natCast_le, not_le, and_iff_right_iff_imp] exact fun h ↦ le_of_lt h #align cardinal.nat_cast_lt Cardinal.natCast_lt instance : CharZero Cardinal := ⟨StrictMono.injective fun _ _ => natCast_lt.2⟩ theorem natCast_inj {m n : ℕ} : (m : Cardinal) = n ↔ m = n := Nat.cast_inj #align cardinal.nat_cast_inj Cardinal.natCast_inj theorem natCast_injective : Injective ((↑) : ℕ → Cardinal) := Nat.cast_injective #align cardinal.nat_cast_injective Cardinal.natCast_injective @[norm_cast] theorem nat_succ (n : ℕ) : (n.succ : Cardinal) = succ ↑n := by rw [Nat.cast_succ] refine (add_one_le_succ _).antisymm (succ_le_of_lt ?_) rw [← Nat.cast_succ] exact natCast_lt.2 (Nat.lt_succ_self _) lemma succ_natCast (n : ℕ) : Order.succ (n : Cardinal) = n + 1 := by rw [← Cardinal.nat_succ] norm_cast lemma natCast_add_one_le_iff {n : ℕ} {c : Cardinal} : n + 1 ≤ c ↔ n < c := by rw [← Order.succ_le_iff, Cardinal.succ_natCast] lemma two_le_iff_one_lt {c : Cardinal} : 2 ≤ c ↔ 1 < c := by convert natCast_add_one_le_iff norm_cast @[simp] theorem succ_zero : succ (0 : Cardinal) = 1 := by norm_cast #align cardinal.succ_zero Cardinal.succ_zero theorem exists_finset_le_card (α : Type) (n : ℕ) (h : n ≤ #α) : ∃ s : Finset α, n ≤ s.card := by obtain hα\|hα := finite_or_infinite α · let hα := Fintype.ofFinite α use Finset.univ simpa only [mk_fintype, Nat.cast_le] using h · obtain ⟨s, hs⟩ := Infinite.exists_subset_card_eq α n exact ⟨s, hs.ge⟩ theorem card_le_of {α : Type u} {n : ℕ} (H : ∀ s : Finset α, s.card ≤ n) : #α ≤ n := by contrapose! H apply exists_finset_le_card α (n+1) simpa only [nat_succ, succ_le_iff] using H #align cardinal.card_le_of Cardinal.card_le_of theorem cantor' (a) {b : Cardinal} (hb : 1 < b) : a < b ^ a := by rw [← succ_le_iff, (by norm_cast : succ (1 : Cardinal) = 2)] at hb exact (cantor a).trans_le (power_le_power_right hb) #align cardinal.cantor' Cardinal.cantor' theorem one_le_iff_pos {c : Cardinal} : 1 ≤ c ↔ 0 < c := by rw [← succ_zero, succ_le_iff] #align cardinal.one_le_iff_pos Cardinal.one_le_iff_pos theorem one_le_iff_ne_zero {c : Cardinal} : 1 ≤ c ↔ c ≠ 0 := by rw [one_le_iff_pos, pos_iff_ne_zero] #align cardinal.one_le_iff_ne_zero Cardinal.one_le_iff_ne_zero @[simp] theorem lt_one_iff_zero {c : Cardinal} : c < 1 ↔ c = 0 := by simpa using lt_succ_bot_iff (a := c) theorem nat_lt_aleph0 (n : ℕ) : (n : Cardinal.{u}) < ℵ₀ := succ_le_iff.1 (by rw [← nat_succ, ← lift_mk_fin, aleph0, lift_mk_le.{u}] exact ⟨⟨(↑), fun a b => Fin.ext⟩⟩) #align cardinal.nat_lt_aleph_0 Cardinal.nat_lt_aleph0 @[simp] theorem one_lt_aleph0 : 1 < ℵ₀ := by simpa using nat_lt_aleph0 1 #align cardinal.one_lt_aleph_0 Cardinal.one_lt_aleph0 theorem one_le_aleph0 : 1 ≤ ℵ₀ := one_lt_aleph0.le #align cardinal.one_le_aleph_0 Cardinal.one_le_aleph0 theorem lt_aleph0 {c : Cardinal} : c < ℵ₀ ↔ ∃ n : ℕ, c = n := ⟨fun h => by rcases lt_lift_iff.1 h with ⟨c, rfl, h'⟩ rcases le_mk_iff_exists_set.1 h'.1 with ⟨S, rfl⟩ suffices S.Finite by lift S to Finset ℕ using this simp contrapose! h' haveI := Infinite.to_subtype h' exact ⟨Infinite.natEmbedding S⟩, fun ⟨n, e⟩ => e.symm ▸ nat_lt_aleph0 _⟩ #align cardinal.lt_aleph_0 Cardinal.lt_aleph0 lemma succ_eq_of_lt_aleph0 {c : Cardinal} (h : c < ℵ₀) : Order.succ c = c + 1 := by obtain ⟨n, hn⟩ := Cardinal.lt_aleph0.mp h rw [hn, succ_natCast] theorem aleph0_le {c : Cardinal} : ℵ₀ ≤ c ↔ ∀ n : ℕ, ↑n ≤ c := ⟨fun h n => (nat_lt_aleph0 _).le.trans h, fun h => le_of_not_lt fun hn => by rcases lt_aleph0.1 hn with ⟨n, rfl⟩ exact (Nat.lt_succ_self _).not_le (natCast_le.1 (h (n + 1)))⟩ #align cardinal.aleph_0_le Cardinal.aleph0_le theorem isSuccLimit_aleph0 : IsSuccLimit ℵ₀ := isSuccLimit_of_succ_lt fun a ha => by rcases lt_aleph0.1 ha with ⟨n, rfl⟩ rw [← nat_succ] apply nat_lt_aleph0 #align cardinal.is_succ_limit_aleph_0 Cardinal.isSuccLimit_aleph0 theorem isLimit_aleph0 : IsLimit ℵ₀ := ⟨aleph0_ne_zero, isSuccLimit_aleph0⟩ #align cardinal.is_limit_aleph_0 Cardinal.isLimit_aleph0 lemma not_isLimit_natCast : (n : ℕ) → ¬ IsLimit (n : Cardinal.{u}) \| 0, e => e.1 rfl \| Nat.succ n, e => Order.not_isSuccLimit_succ _ (nat_succ n ▸ e.2) theorem IsLimit.aleph0_le {c : Cardinal} (h : IsLimit c) : ℵ₀ ≤ c := by by_contra! h' rcases lt_aleph0.1 h' with ⟨n, rfl⟩ exact not_isLimit_natCast n h lemma exists_eq_natCast_of_iSup_eq {ι : Type u} [Nonempty ι] (f : ι → Cardinal.{v}) (hf : BddAbove (range f)) (n : ℕ) (h : ⨆ i, f i = n) : ∃ i, f i = n := exists_eq_of_iSup_eq_of_not_isLimit.{u, v} f hf _ (not_isLimit_natCast n) h @[simp] theorem range_natCast : range ((↑) : ℕ → Cardinal) = Iio ℵ₀ := ext fun x => by simp only [mem_Iio, mem_range, eq_comm, lt_aleph0] #align cardinal.range_nat_cast Cardinal.range_natCast theorem mk_eq_nat_iff {α : Type u} {n : ℕ} : #α = n ↔ Nonempty (α ≃ Fin n) := by rw [← lift_mk_fin, ← lift_uzero #α, lift_mk_eq'] #align cardinal.mk_eq_nat_iff Cardinal.mk_eq_nat_iff theorem lt_aleph0_iff_finite {α : Type u} : #α < ℵ₀ ↔ Finite α := by simp only [lt_aleph0, mk_eq_nat_iff, finite_iff_exists_equiv_fin] #align cardinal.lt_aleph_0_iff_finite Cardinal.lt_aleph0_iff_finite theorem lt_aleph0_iff_fintype {α : Type u} : #α < ℵ₀ ↔ Nonempty (Fintype α) := lt_aleph0_iff_finite.trans (finite_iff_nonempty_fintype _) #align cardinal.lt_aleph_0_iff_fintype Cardinal.lt_aleph0_iff_fintype theorem lt_aleph0_of_finite (α : Type u) [Finite α] : #α < ℵ₀ := lt_aleph0_iff_finite.2 ‹_› #align cardinal.lt_aleph_0_of_finite Cardinal.lt_aleph0_of_finite -- porting note (#10618): simp can prove this -- @[simp] theorem lt_aleph0_iff_set_finite {S : Set α} : #S < ℵ₀ ↔ S.Finite := lt_aleph0_iff_finite.trans finite_coe_iff #align cardinal.lt_aleph_0_iff_set_finite Cardinal.lt_aleph0_iff_set_finite alias ⟨_, _root_.Set.Finite.lt_aleph0⟩ := lt_aleph0_iff_set_finite #align set.finite.lt_aleph_0 Set.Finite.lt_aleph0 @[simp] theorem lt_aleph0_iff_subtype_finite {p : α → Prop} : #{ x // p x } < ℵ₀ ↔ { x \| p x }.Finite := lt_aleph0_iff_set_finite #align cardinal.lt_aleph_0_iff_subtype_finite Cardinal.lt_aleph0_iff_subtype_finite theorem mk_le_aleph0_iff : #α ≤ ℵ₀ ↔ Countable α := by rw [countable_iff_nonempty_embedding, aleph0, ← lift_uzero #α, lift_mk_le'] #align cardinal.mk_le_aleph_0_iff Cardinal.mk_le_aleph0_iff @[simp] theorem mk_le_aleph0 [Countable α] : #α ≤ ℵ₀ := mk_le_aleph0_iff.mpr ‹_› #align cardinal.mk_le_aleph_0 Cardinal.mk_le_aleph0 -- porting note (#10618): simp can prove this -- @[simp] theorem le_aleph0_iff_set_countable {s : Set α} : #s ≤ ℵ₀ ↔ s.Countable := mk_le_aleph0_iff #align cardinal.le_aleph_0_iff_set_countable Cardinal.le_aleph0_iff_set_countable alias ⟨_, _root_.Set.Countable.le_aleph0⟩ := le_aleph0_iff_set_countable #align set.countable.le_aleph_0 Set.Countable.le_aleph0 @[simp] theorem le_aleph0_iff_subtype_countable {p : α → Prop} : #{ x // p x } ≤ ℵ₀ ↔ { x \| p x }.Countable := le_aleph0_iff_set_countable #align cardinal.le_aleph_0_iff_subtype_countable Cardinal.le_aleph0_iff_subtype_countable instance canLiftCardinalNat : CanLift Cardinal ℕ (↑) fun x => x < ℵ₀ := ⟨fun _ hx => let ⟨n, hn⟩ := lt_aleph0.mp hx ⟨n, hn.symm⟩⟩ #align cardinal.can_lift_cardinal_nat Cardinal.canLiftCardinalNat theorem add_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a + b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← Nat.cast_add]; apply nat_lt_aleph0 #align cardinal.add_lt_aleph_0 Cardinal.add_lt_aleph0 theorem add_lt_aleph0_iff {a b : Cardinal} : a + b < ℵ₀ ↔ a < ℵ₀ ∧ b < ℵ₀ := ⟨fun h => ⟨(self_le_add_right _ _).trans_lt h, (self_le_add_left _ _).trans_lt h⟩, fun ⟨h1, h2⟩ => add_lt_aleph0 h1 h2⟩ #align cardinal.add_lt_aleph_0_iff Cardinal.add_lt_aleph0_iff theorem aleph0_le_add_iff {a b : Cardinal} : ℵ₀ ≤ a + b ↔ ℵ₀ ≤ a ∨ ℵ₀ ≤ b := by simp only [← not_lt, add_lt_aleph0_iff, not_and_or] #align cardinal.aleph_0_le_add_iff Cardinal.aleph0_le_add_iff /-- See also `Cardinal.nsmul_lt_aleph0_iff_of_ne_zero` if you already have `n ≠ 0`. -/ theorem nsmul_lt_aleph0_iff {n : ℕ} {a : Cardinal} : n • a < ℵ₀ ↔ n = 0 ∨ a < ℵ₀ := by cases n with \| zero => simpa using nat_lt_aleph0 0 \| succ n => simp only [Nat.succ_ne_zero, false_or_iff] induction' n with n ih · simp rw [succ_nsmul, add_lt_aleph0_iff, ih, and_self_iff] #align cardinal.nsmul_lt_aleph_0_iff Cardinal.nsmul_lt_aleph0_iff /-- See also `Cardinal.nsmul_lt_aleph0_iff` for a hypothesis-free version. -/ theorem nsmul_lt_aleph0_iff_of_ne_zero {n : ℕ} {a : Cardinal} (h : n ≠ 0) : n • a < ℵ₀ ↔ a < ℵ₀ := nsmul_lt_aleph0_iff.trans <\| or_iff_right h #align cardinal.nsmul_lt_aleph_0_iff_of_ne_zero Cardinal.nsmul_lt_aleph0_iff_of_ne_zero theorem mul_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← Nat.cast_mul]; apply nat_lt_aleph0 #align cardinal.mul_lt_aleph_0 Cardinal.mul_lt_aleph0 theorem mul_lt_aleph0_iff {a b : Cardinal} : a * b < ℵ₀ ↔ a = 0 ∨ b = 0 ∨ a < ℵ₀ ∧ b < ℵ₀ := by refine ⟨fun h => ?_, ?_⟩ · by_cases ha : a = 0 · exact Or.inl ha right by_cases hb : b = 0 · exact Or.inl hb right rw [← Ne, ← one_le_iff_ne_zero] at ha hb constructor · rw [← mul_one a] exact (mul_le_mul' le_rfl hb).trans_lt h · rw [← one_mul b] exact (mul_le_mul' ha le_rfl).trans_lt h rintro (rfl \| rfl \| ⟨ha, hb⟩) <;> simp only [, mul_lt_aleph0, aleph0_pos, zero_mul, mul_zero] #align cardinal.mul_lt_aleph_0_iff Cardinal.mul_lt_aleph0_iff /-- See also `Cardinal.aleph0_le_mul_iff`. -/ theorem aleph0_le_mul_iff {a b : Cardinal} : ℵ₀ ≤ a b ↔ a ≠ 0 ∧ b ≠ 0 ∧ (ℵ₀ ≤ a ∨ ℵ₀ ≤ b) := by let h := (@mul_lt_aleph0_iff a b).not rwa [not_lt, not_or, not_or, not_and_or, not_lt, not_lt] at h #align cardinal.aleph_0_le_mul_iff Cardinal.aleph0_le_mul_iff /-- See also `Cardinal.aleph0_le_mul_iff'`. -/ theorem aleph0_le_mul_iff' {a b : Cardinal.{u}} : ℵ₀ ≤ a * b ↔ a ≠ 0 ∧ ℵ₀ ≤ b ∨ ℵ₀ ≤ a ∧ b ≠ 0 := by have : ∀ {a : Cardinal.{u}}, ℵ₀ ≤ a → a ≠ 0 := fun a => ne_bot_of_le_ne_bot aleph0_ne_zero a simp only [aleph0_le_mul_iff, and_or_left, and_iff_right_of_imp this, @and_left_comm (a ≠ 0)] simp only [and_comm, or_comm] #align cardinal.aleph_0_le_mul_iff' Cardinal.aleph0_le_mul_iff' theorem mul_lt_aleph0_iff_of_ne_zero {a b : Cardinal} (ha : a ≠ 0) (hb : b ≠ 0) : a * b < ℵ₀ ↔ a < ℵ₀ ∧ b < ℵ₀ := by simp [mul_lt_aleph0_iff, ha, hb] #align cardinal.mul_lt_aleph_0_iff_of_ne_zero Cardinal.mul_lt_aleph0_iff_of_ne_zero theorem power_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a ^ b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← natCast_pow]; apply nat_lt_aleph0 #align cardinal.power_lt_aleph_0 Cardinal.power_lt_aleph0 theorem eq_one_iff_unique {α : Type} : #α = 1 ↔ Subsingleton α ∧ Nonempty α := calc #α = 1 ↔ #α ≤ 1 ∧ 1 ≤ #α := le_antisymm_iff _ ↔ Subsingleton α ∧ Nonempty α := le_one_iff_subsingleton.and (one_le_iff_ne_zero.trans mk_ne_zero_iff) #align cardinal.eq_one_iff_unique Cardinal.eq_one_iff_unique theorem infinite_iff {α : Type u} : Infinite α ↔ ℵ₀ ≤ #α := by rw [← not_lt, lt_aleph0_iff_finite, not_finite_iff_infinite] #align cardinal.infinite_iff Cardinal.infinite_iff lemma aleph0_le_mk_iff : ℵ₀ ≤ #α ↔ Infinite α := infinite_iff.symm lemma mk_lt_aleph0_iff : #α < ℵ₀ ↔ Finite α := by simp [← not_le, aleph0_le_mk_iff] @[simp] theorem aleph0_le_mk (α : Type u) [Infinite α] : ℵ₀ ≤ #α := infinite_iff.1 ‹_› #align cardinal.aleph_0_le_mk Cardinal.aleph0_le_mk @[simp] theorem mk_eq_aleph0 (α : Type) [Countable α] [Infinite α] : #α = ℵ₀ := mk_le_aleph0.antisymm <\| aleph0_le_mk _ #align cardinal.mk_eq_aleph_0 Cardinal.mk_eq_aleph0 theorem denumerable_iff {α : Type u} : Nonempty (Denumerable α) ↔ #α = ℵ₀ := ⟨fun ⟨h⟩ => mk_congr ((@Denumerable.eqv α h).trans Equiv.ulift.symm), fun h => by cases' Quotient.exact h with f exact ⟨Denumerable.mk' <\| f.trans Equiv.ulift⟩⟩ #align cardinal.denumerable_iff Cardinal.denumerable_iff -- porting note (#10618): simp can prove this -- @[simp] theorem mk_denumerable (α : Type u) [Denumerable α] : #α = ℵ₀ := denumerable_iff.1 ⟨‹_›⟩ #align cardinal.mk_denumerable Cardinal.mk_denumerable theorem _root_.Set.countable_infinite_iff_nonempty_denumerable {α : Type} {s : Set α} : s.Countable ∧ s.Infinite ↔ Nonempty (Denumerable s) := by rw [nonempty_denumerable_iff, ← Set.infinite_coe_iff, countable_coe_iff] @[simp] theorem aleph0_add_aleph0 : ℵ₀ + ℵ₀ = ℵ₀ := mk_denumerable _ #align cardinal.aleph_0_add_aleph_0 Cardinal.aleph0_add_aleph0 theorem aleph0_mul_aleph0 : ℵ₀ ℵ₀ = ℵ₀ := mk_denumerable _ #align cardinal.aleph_0_mul_aleph_0 Cardinal.aleph0_mul_aleph0 @[simp] theorem nat_mul_aleph0 {n : ℕ} (hn : n ≠ 0) : ↑n * ℵ₀ = ℵ₀ := le_antisymm (lift_mk_fin n ▸ mk_le_aleph0) <\| le_mul_of_one_le_left (zero_le _) <\| by rwa [← Nat.cast_one, natCast_le, Nat.one_le_iff_ne_zero] #align cardinal.nat_mul_aleph_0 Cardinal.nat_mul_aleph0 @[simp] theorem aleph0_mul_nat {n : ℕ} (hn : n ≠ 0) : ℵ₀ * n = ℵ₀ := by rw [mul_comm, nat_mul_aleph0 hn] #align cardinal.aleph_0_mul_nat Cardinal.aleph0_mul_nat -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_mul_aleph0 {n : ℕ} [Nat.AtLeastTwo n] : no_index (OfNat.ofNat n) * ℵ₀ = ℵ₀ := nat_mul_aleph0 (NeZero.ne n) -- See note [no_index around OfNat.ofNat] @[simp] theorem aleph0_mul_ofNat {n : ℕ} [Nat.AtLeastTwo n] : ℵ₀ * no_index (OfNat.ofNat n) = ℵ₀ := aleph0_mul_nat (NeZero.ne n) @[simp] theorem add_le_aleph0 {c₁ c₂ : Cardinal} : c₁ + c₂ ≤ ℵ₀ ↔ c₁ ≤ ℵ₀ ∧ c₂ ≤ ℵ₀ := ⟨fun h => ⟨le_self_add.trans h, le_add_self.trans h⟩, fun h => aleph0_add_aleph0 ▸ add_le_add h.1 h.2⟩ #align cardinal.add_le_aleph_0 Cardinal.add_le_aleph0 @[simp] theorem aleph0_add_nat (n : ℕ) : ℵ₀ + n = ℵ₀ := (add_le_aleph0.2 ⟨le_rfl, (nat_lt_aleph0 n).le⟩).antisymm le_self_add #align cardinal.aleph_0_add_nat Cardinal.aleph0_add_nat @[simp]	Mathlib/SetTheory/Cardinal/Basic.lean	1,820	1,820	theorem nat_add_aleph0 (n : ℕ) : ↑n + ℵ₀ = ℵ₀ := by	rw [add_comm, aleph0_add_nat]
/- Copyright (c) 2014 Parikshit Khanna. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Parikshit Khanna, Jeremy Avigad, Leonardo de Moura, Floris van Doorn, Mario Carneiro, Scott Morrison -/ import Mathlib.Data.List.Basic #align_import data.list.lattice from "leanprover-community/mathlib"@"dd71334db81d0bd444af1ee339a29298bef40734" /-! # Lattice structure of lists This files prove basic properties about `List.disjoint`, `List.union`, `List.inter` and `List.bagInter`, which are defined in core Lean and `Data.List.Defs`. `l₁ ∪ l₂` is the list where all elements of `l₁` have been inserted in `l₂` in order. For example, `[0, 0, 1, 2, 2, 3] ∪ [4, 3, 3, 0] = [1, 2, 4, 3, 3, 0]` `l₁ ∩ l₂` is the list of elements of `l₁` in order which are in `l₂`. For example, `[0, 0, 1, 2, 2, 3] ∪ [4, 3, 3, 0] = [0, 0, 3]` `List.bagInter l₁ l₂` is the list of elements that are in both `l₁` and `l₂`, counted with multiplicity and in the order they appear in `l₁`. As opposed to `List.inter`, `List.bagInter` copes well with multiplicity. For example, `bagInter [0, 1, 2, 3, 2, 1, 0] [1, 0, 1, 4, 3] = [0, 1, 3, 1]` -/ open Nat namespace List variable {α : Type*} {l l₁ l₂ : List α} {p : α → Prop} {a : α} /-! ### `Disjoint` -/ section Disjoint @[symm] theorem Disjoint.symm (d : Disjoint l₁ l₂) : Disjoint l₂ l₁ := fun _ i₂ i₁ => d i₁ i₂ #align list.disjoint.symm List.Disjoint.symm #align list.disjoint_comm List.disjoint_comm #align list.disjoint_left List.disjoint_left #align list.disjoint_right List.disjoint_right #align list.disjoint_iff_ne List.disjoint_iff_ne #align list.disjoint_of_subset_left List.disjoint_of_subset_leftₓ #align list.disjoint_of_subset_right List.disjoint_of_subset_right #align list.disjoint_of_disjoint_cons_left List.disjoint_of_disjoint_cons_left #align list.disjoint_of_disjoint_cons_right List.disjoint_of_disjoint_cons_right #align list.disjoint_nil_left List.disjoint_nil_left #align list.disjoint_nil_right List.disjoint_nil_right #align list.singleton_disjoint List.singleton_disjointₓ #align list.disjoint_singleton List.disjoint_singleton #align list.disjoint_append_left List.disjoint_append_leftₓ #align list.disjoint_append_right List.disjoint_append_right #align list.disjoint_cons_left List.disjoint_cons_leftₓ #align list.disjoint_cons_right List.disjoint_cons_right #align list.disjoint_of_disjoint_append_left_left List.disjoint_of_disjoint_append_left_leftₓ #align list.disjoint_of_disjoint_append_left_right List.disjoint_of_disjoint_append_left_rightₓ #align list.disjoint_of_disjoint_append_right_left List.disjoint_of_disjoint_append_right_left #align list.disjoint_of_disjoint_append_right_right List.disjoint_of_disjoint_append_right_right #align list.disjoint_take_drop List.disjoint_take_dropₓ end Disjoint variable [DecidableEq α] /-! ### `union` -/ section Union #align list.nil_union List.nil_union #align list.cons_union List.cons_unionₓ #align list.mem_union List.mem_union_iff theorem mem_union_left (h : a ∈ l₁) (l₂ : List α) : a ∈ l₁ ∪ l₂ := mem_union_iff.2 (Or.inl h) #align list.mem_union_left List.mem_union_left theorem mem_union_right (l₁ : List α) (h : a ∈ l₂) : a ∈ l₁ ∪ l₂ := mem_union_iff.2 (Or.inr h) #align list.mem_union_right List.mem_union_right theorem sublist_suffix_of_union : ∀ l₁ l₂ : List α, ∃ t, t <+ l₁ ∧ t ++ l₂ = l₁ ∪ l₂ \| [], l₂ => ⟨[], by rfl, rfl⟩ \| a :: l₁, l₂ => let ⟨t, s, e⟩ := sublist_suffix_of_union l₁ l₂ if h : a ∈ l₁ ∪ l₂ then ⟨t, sublist_cons_of_sublist _ s, by simp only [e, cons_union, insert_of_mem h]⟩ else ⟨a :: t, s.cons_cons _, by simp only [cons_append, cons_union, e, insert_of_not_mem h]⟩ #align list.sublist_suffix_of_union List.sublist_suffix_of_union theorem suffix_union_right (l₁ l₂ : List α) : l₂ <:+ l₁ ∪ l₂ := (sublist_suffix_of_union l₁ l₂).imp fun _ => And.right #align list.suffix_union_right List.suffix_union_right theorem union_sublist_append (l₁ l₂ : List α) : l₁ ∪ l₂ <+ l₁ ++ l₂ := let ⟨_, s, e⟩ := sublist_suffix_of_union l₁ l₂ e ▸ (append_sublist_append_right _).2 s #align list.union_sublist_append List.union_sublist_append theorem forall_mem_union : (∀ x ∈ l₁ ∪ l₂, p x) ↔ (∀ x ∈ l₁, p x) ∧ ∀ x ∈ l₂, p x := by simp only [mem_union_iff, or_imp, forall_and] #align list.forall_mem_union List.forall_mem_union theorem forall_mem_of_forall_mem_union_left (h : ∀ x ∈ l₁ ∪ l₂, p x) : ∀ x ∈ l₁, p x := (forall_mem_union.1 h).1 #align list.forall_mem_of_forall_mem_union_left List.forall_mem_of_forall_mem_union_left theorem forall_mem_of_forall_mem_union_right (h : ∀ x ∈ l₁ ∪ l₂, p x) : ∀ x ∈ l₂, p x := (forall_mem_union.1 h).2 #align list.forall_mem_of_forall_mem_union_right List.forall_mem_of_forall_mem_union_right end Union /-! ### `inter` -/ section Inter @[simp] theorem inter_nil (l : List α) : [] ∩ l = [] := rfl #align list.inter_nil List.inter_nil @[simp]	Mathlib/Data/List/Lattice.lean	134	135	theorem inter_cons_of_mem (l₁ : List α) (h : a ∈ l₂) : (a :: l₁) ∩ l₂ = a :: l₁ ∩ l₂ := by	simp [Inter.inter, List.inter, h]
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Geometry.Euclidean.Angle.Oriented.Affine import Mathlib.Geometry.Euclidean.Angle.Unoriented.RightAngle #align_import geometry.euclidean.angle.oriented.right_angle from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" /-! # Oriented angles in right-angled triangles. This file proves basic geometrical results about distances and oriented angles in (possibly degenerate) right-angled triangles in real inner product spaces and Euclidean affine spaces. -/ noncomputable section open scoped EuclideanGeometry open scoped Real open scoped RealInnerProductSpace namespace Orientation open FiniteDimensional variable {V : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] variable [hd2 : Fact (finrank ℝ V = 2)] (o : Orientation ℝ V (Fin 2)) /-- An angle in a right-angled triangle expressed using `arccos`. -/ theorem oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle x (x + y) = Real.arccos (‖x‖ / ‖x + y‖) := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_add_eq_arccos_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arccos`. -/ theorem oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x + y) y = Real.arccos (‖y‖ / ‖x + y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two h #align orientation.oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arcsin`. -/ theorem oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle x (x + y) = Real.arcsin (‖y‖ / ‖x + y‖) := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_add_eq_arcsin_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arcsin`. -/ theorem oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x + y) y = Real.arcsin (‖x‖ / ‖x + y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two h #align orientation.oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arctan`. -/ theorem oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle x (x + y) = Real.arctan (‖y‖ / ‖x‖) := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_add_eq_arctan_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (o.left_ne_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arctan`. -/ theorem oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x + y) y = Real.arctan (‖x‖ / ‖y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two h #align orientation.oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two /-- The cosine of an angle in a right-angled triangle as a ratio of sides. -/ theorem cos_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle x (x + y)) = ‖x‖ / ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, InnerProductGeometry.cos_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.cos_oangle_add_right_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_right_of_oangle_eq_pi_div_two /-- The cosine of an angle in a right-angled triangle as a ratio of sides. -/ theorem cos_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle (x + y) y) = ‖y‖ / ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).cos_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.cos_oangle_add_left_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_left_of_oangle_eq_pi_div_two /-- The sine of an angle in a right-angled triangle as a ratio of sides. -/ theorem sin_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle x (x + y)) = ‖y‖ / ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, InnerProductGeometry.sin_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.sin_oangle_add_right_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_right_of_oangle_eq_pi_div_two /-- The sine of an angle in a right-angled triangle as a ratio of sides. -/ theorem sin_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle (x + y) y) = ‖x‖ / ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).sin_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.sin_oangle_add_left_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_left_of_oangle_eq_pi_div_two /-- The tangent of an angle in a right-angled triangle as a ratio of sides. -/ theorem tan_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle x (x + y)) = ‖y‖ / ‖x‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, InnerProductGeometry.tan_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.tan_oangle_add_right_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_right_of_oangle_eq_pi_div_two /-- The tangent of an angle in a right-angled triangle as a ratio of sides. -/ theorem tan_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle (x + y) y) = ‖x‖ / ‖y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).tan_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.tan_oangle_add_left_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_left_of_oangle_eq_pi_div_two /-- The cosine of an angle in a right-angled triangle multiplied by the hypotenuse equals the adjacent side. -/ theorem cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle x (x + y)) ‖x + y‖ = ‖x‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, InnerProductGeometry.cos_angle_add_mul_norm_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two /-- The cosine of an angle in a right-angled triangle multiplied by the hypotenuse equals the adjacent side. -/ theorem cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle (x + y) y) * ‖x + y‖ = ‖y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h #align orientation.cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two /-- The sine of an angle in a right-angled triangle multiplied by the hypotenuse equals the opposite side. -/ theorem sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle x (x + y)) * ‖x + y‖ = ‖y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, InnerProductGeometry.sin_angle_add_mul_norm_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two /-- The sine of an angle in a right-angled triangle multiplied by the hypotenuse equals the opposite side. -/ theorem sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle (x + y) y) * ‖x + y‖ = ‖x‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h #align orientation.sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two /-- The tangent of an angle in a right-angled triangle multiplied by the adjacent side equals the opposite side. -/ theorem tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle x (x + y)) * ‖x‖ = ‖y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, InnerProductGeometry.tan_angle_add_mul_norm_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two /-- The tangent of an angle in a right-angled triangle multiplied by the adjacent side equals the opposite side. -/ theorem tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle (x + y) y) * ‖y‖ = ‖x‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h #align orientation.tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two /-- A side of a right-angled triangle divided by the cosine of the adjacent angle equals the hypotenuse. -/ theorem norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.cos (o.oangle x (x + y)) = ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, InnerProductGeometry.norm_div_cos_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two /-- A side of a right-angled triangle divided by the cosine of the adjacent angle equals the hypotenuse. -/ theorem norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.cos (o.oangle (x + y) y) = ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two /-- A side of a right-angled triangle divided by the sine of the opposite angle equals the hypotenuse. -/ theorem norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.sin (o.oangle x (x + y)) = ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, InnerProductGeometry.norm_div_sin_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inr (o.right_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two /-- A side of a right-angled triangle divided by the sine of the opposite angle equals the hypotenuse. -/ theorem norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.sin (o.oangle (x + y) y) = ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two /-- A side of a right-angled triangle divided by the tangent of the opposite angle equals the adjacent side. -/ theorem norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.tan (o.oangle x (x + y)) = ‖x‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, InnerProductGeometry.norm_div_tan_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inr (o.right_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two /-- A side of a right-angled triangle divided by the tangent of the opposite angle equals the adjacent side. -/ theorem norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.tan (o.oangle (x + y) y) = ‖y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arccos`, version subtracting vectors. -/ theorem oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle y (y - x) = Real.arccos (‖y‖ / ‖y - x‖) := by have hs : (o.oangle y (y - x)).sign = 1 := by rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_sub_eq_arccos_of_inner_eq_zero (o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two /-- An angle in a right-angled triangle expressed using `arccos`, version subtracting vectors. -/	Mathlib/Geometry/Euclidean/Angle/Oriented/RightAngle.lean	277	280	theorem oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x - y) x = Real.arccos (‖x‖ / ‖x - y‖) := by	rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ exact (-o).oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two h
/- Copyright (c) 2021 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen -/ import Mathlib.FieldTheory.RatFunc.Defs import Mathlib.RingTheory.EuclideanDomain import Mathlib.RingTheory.Localization.FractionRing import Mathlib.RingTheory.Polynomial.Content #align_import field_theory.ratfunc from "leanprover-community/mathlib"@"bf9bbbcf0c1c1ead18280b0d010e417b10abb1b6" /-! # The field structure of rational functions ## Main definitions Working with rational functions as polynomials: - `RatFunc.instField` provides a field structure You can use `IsFractionRing` API to treat `RatFunc` as the field of fractions of polynomials: * `algebraMap K[X] (RatFunc K)` maps polynomials to rational functions * `IsFractionRing.algEquiv` maps other fields of fractions of `K[X]` to `RatFunc K`, in particular: * `FractionRing.algEquiv K[X] (RatFunc K)` maps the generic field of fraction construction to `RatFunc K`. Combine this with `AlgEquiv.restrictScalars` to change the `FractionRing K[X] ≃ₐ[K[X]] RatFunc K` to `FractionRing K[X] ≃ₐ[K] RatFunc K`. Working with rational functions as fractions: - `RatFunc.num` and `RatFunc.denom` give the numerator and denominator. These values are chosen to be coprime and such that `RatFunc.denom` is monic. Lifting homomorphisms of polynomials to other types, by mapping and dividing, as long as the homomorphism retains the non-zero-divisor property: - `RatFunc.liftMonoidWithZeroHom` lifts a `K[X] →₀ G₀` to a `RatFunc K →₀ G₀`, where `[CommRing K] [CommGroupWithZero G₀]` - `RatFunc.liftRingHom` lifts a `K[X] →+* L` to a `RatFunc K →+* L`, where `[CommRing K] [Field L]` - `RatFunc.liftAlgHom` lifts a `K[X] →ₐ[S] L` to a `RatFunc K →ₐ[S] L`, where `[CommRing K] [Field L] [CommSemiring S] [Algebra S K[X]] [Algebra S L]` This is satisfied by injective homs. We also have lifting homomorphisms of polynomials to other polynomials, with the same condition on retaining the non-zero-divisor property across the map: - `RatFunc.map` lifts `K[X] →* R[X]` when `[CommRing K] [CommRing R]` - `RatFunc.mapRingHom` lifts `K[X] →+* R[X]` when `[CommRing K] [CommRing R]` - `RatFunc.mapAlgHom` lifts `K[X] →ₐ[S] R[X]` when `[CommRing K] [IsDomain K] [CommRing R] [IsDomain R]` -/ universe u v noncomputable section open scoped Classical open scoped nonZeroDivisors Polynomial variable {K : Type u} namespace RatFunc section Field variable [CommRing K] /-- The zero rational function. -/ protected irreducible_def zero : RatFunc K := ⟨0⟩ #align ratfunc.zero RatFunc.zero instance : Zero (RatFunc K) := ⟨RatFunc.zero⟩ -- Porting note: added `OfNat.ofNat`. using `simp?` produces `simp only [zero_def]` -- that does not close the goal theorem ofFractionRing_zero : (ofFractionRing 0 : RatFunc K) = 0 := by simp only [Zero.zero, OfNat.ofNat, RatFunc.zero] #align ratfunc.of_fraction_ring_zero RatFunc.ofFractionRing_zero /-- Addition of rational functions. -/ protected irreducible_def add : RatFunc K → RatFunc K → RatFunc K \| ⟨p⟩, ⟨q⟩ => ⟨p + q⟩ #align ratfunc.add RatFunc.add instance : Add (RatFunc K) := ⟨RatFunc.add⟩ -- Porting note: added `HAdd.hAdd`. using `simp?` produces `simp only [add_def]` -- that does not close the goal theorem ofFractionRing_add (p q : FractionRing K[X]) : ofFractionRing (p + q) = ofFractionRing p + ofFractionRing q := by simp only [HAdd.hAdd, Add.add, RatFunc.add] #align ratfunc.of_fraction_ring_add RatFunc.ofFractionRing_add /-- Subtraction of rational functions. -/ protected irreducible_def sub : RatFunc K → RatFunc K → RatFunc K \| ⟨p⟩, ⟨q⟩ => ⟨p - q⟩ #align ratfunc.sub RatFunc.sub instance : Sub (RatFunc K) := ⟨RatFunc.sub⟩ -- Porting note: added `HSub.hSub`. using `simp?` produces `simp only [sub_def]` -- that does not close the goal	Mathlib/FieldTheory/RatFunc/Basic.lean	104	106	theorem ofFractionRing_sub (p q : FractionRing K[X]) : ofFractionRing (p - q) = ofFractionRing p - ofFractionRing q := by	simp only [Sub.sub, HSub.hSub, RatFunc.sub]
/- Copyright (c) 2021 Kalle Kytölä. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kalle Kytölä -/ import Mathlib.Topology.MetricSpace.HausdorffDistance #align_import topology.metric_space.hausdorff_distance from "leanprover-community/mathlib"@"bc91ed7093bf098d253401e69df601fc33dde156" /-! # Thickenings in pseudo-metric spaces ## Main definitions * `Metric.thickening δ s`, the open thickening by radius `δ` of a set `s` in a pseudo emetric space. * `Metric.cthickening δ s`, the closed thickening by radius `δ` of a set `s` in a pseudo emetric space. ## Main results * `Disjoint.exists_thickenings`: two disjoint sets admit disjoint thickenings * `Disjoint.exists_cthickenings`: two disjoint sets admit disjoint closed thickenings * `IsCompact.exists_cthickening_subset_open`: if `s` is compact, `t` is open and `s ⊆ t`, some `cthickening` of `s` is contained in `t`. * `Metric.hasBasis_nhdsSet_cthickening`: the `cthickening`s of a compact set `K` form a basis of the neighbourhoods of `K` * `Metric.closure_eq_iInter_cthickening'`: the closure of a set equals the intersection of its closed thickenings of positive radii accumulating at zero. The same holds for open thickenings. * `IsCompact.cthickening_eq_biUnion_closedBall`: if `s` is compact, `cthickening δ s` is the union of `closedBall`s of radius `δ` around `x : E`. -/ noncomputable section open NNReal ENNReal Topology Set Filter Bornology universe u v w variable {ι : Sort} {α : Type u} {β : Type v} namespace Metric section Thickening variable [PseudoEMetricSpace α] {δ : ℝ} {s : Set α} {x : α} open EMetric /-- The (open) `δ`-thickening `Metric.thickening δ E` of a subset `E` in a pseudo emetric space consists of those points that are at distance less than `δ` from some point of `E`. -/ def thickening (δ : ℝ) (E : Set α) : Set α := { x : α \| infEdist x E < ENNReal.ofReal δ } #align metric.thickening Metric.thickening theorem mem_thickening_iff_infEdist_lt : x ∈ thickening δ s ↔ infEdist x s < ENNReal.ofReal δ := Iff.rfl #align metric.mem_thickening_iff_inf_edist_lt Metric.mem_thickening_iff_infEdist_lt /-- An exterior point of a subset `E` (i.e., a point outside the closure of `E`) is not in the (open) `δ`-thickening of `E` for small enough positive `δ`. -/ lemma eventually_not_mem_thickening_of_infEdist_pos {E : Set α} {x : α} (h : x ∉ closure E) : ∀ᶠ δ in 𝓝 (0 : ℝ), x ∉ Metric.thickening δ E := by obtain ⟨ε, ⟨ε_pos, ε_lt⟩⟩ := exists_real_pos_lt_infEdist_of_not_mem_closure h filter_upwards [eventually_lt_nhds ε_pos] with δ hδ simp only [thickening, mem_setOf_eq, not_lt] exact (ENNReal.ofReal_le_ofReal hδ.le).trans ε_lt.le /-- The (open) thickening equals the preimage of an open interval under `EMetric.infEdist`. -/ theorem thickening_eq_preimage_infEdist (δ : ℝ) (E : Set α) : thickening δ E = (infEdist · E) ⁻¹' Iio (ENNReal.ofReal δ) := rfl #align metric.thickening_eq_preimage_inf_edist Metric.thickening_eq_preimage_infEdist /-- The (open) thickening is an open set. -/ theorem isOpen_thickening {δ : ℝ} {E : Set α} : IsOpen (thickening δ E) := Continuous.isOpen_preimage continuous_infEdist _ isOpen_Iio #align metric.is_open_thickening Metric.isOpen_thickening /-- The (open) thickening of the empty set is empty. -/ @[simp] theorem thickening_empty (δ : ℝ) : thickening δ (∅ : Set α) = ∅ := by simp only [thickening, setOf_false, infEdist_empty, not_top_lt] #align metric.thickening_empty Metric.thickening_empty theorem thickening_of_nonpos (hδ : δ ≤ 0) (s : Set α) : thickening δ s = ∅ := eq_empty_of_forall_not_mem fun _ => ((ENNReal.ofReal_of_nonpos hδ).trans_le bot_le).not_lt #align metric.thickening_of_nonpos Metric.thickening_of_nonpos /-- The (open) thickening `Metric.thickening δ E` of a fixed subset `E` is an increasing function of the thickening radius `δ`. -/ theorem thickening_mono {δ₁ δ₂ : ℝ} (hle : δ₁ ≤ δ₂) (E : Set α) : thickening δ₁ E ⊆ thickening δ₂ E := preimage_mono (Iio_subset_Iio (ENNReal.ofReal_le_ofReal hle)) #align metric.thickening_mono Metric.thickening_mono /-- The (open) thickening `Metric.thickening δ E` with a fixed thickening radius `δ` is an increasing function of the subset `E`. -/ theorem thickening_subset_of_subset (δ : ℝ) {E₁ E₂ : Set α} (h : E₁ ⊆ E₂) : thickening δ E₁ ⊆ thickening δ E₂ := fun _ hx => lt_of_le_of_lt (infEdist_anti h) hx #align metric.thickening_subset_of_subset Metric.thickening_subset_of_subset theorem mem_thickening_iff_exists_edist_lt {δ : ℝ} (E : Set α) (x : α) : x ∈ thickening δ E ↔ ∃ z ∈ E, edist x z < ENNReal.ofReal δ := infEdist_lt_iff #align metric.mem_thickening_iff_exists_edist_lt Metric.mem_thickening_iff_exists_edist_lt /-- The frontier of the (open) thickening of a set is contained in an `EMetric.infEdist` level set. -/ theorem frontier_thickening_subset (E : Set α) {δ : ℝ} : frontier (thickening δ E) ⊆ { x : α \| infEdist x E = ENNReal.ofReal δ } := frontier_lt_subset_eq continuous_infEdist continuous_const #align metric.frontier_thickening_subset Metric.frontier_thickening_subset theorem frontier_thickening_disjoint (A : Set α) : Pairwise (Disjoint on fun r : ℝ => frontier (thickening r A)) := by refine (pairwise_disjoint_on _).2 fun r₁ r₂ hr => ?_ rcases le_total r₁ 0 with h₁ \| h₁ · simp [thickening_of_nonpos h₁] refine ((disjoint_singleton.2 fun h => hr.ne ?_).preimage _).mono (frontier_thickening_subset _) (frontier_thickening_subset _) apply_fun ENNReal.toReal at h rwa [ENNReal.toReal_ofReal h₁, ENNReal.toReal_ofReal (h₁.trans hr.le)] at h #align metric.frontier_thickening_disjoint Metric.frontier_thickening_disjoint /-- Any set is contained in the complement of the δ-thickening of the complement of its δ-thickening. -/ lemma subset_compl_thickening_compl_thickening_self (δ : ℝ) (E : Set α) : E ⊆ (thickening δ (thickening δ E)ᶜ)ᶜ := by intro x x_in_E simp only [thickening, mem_compl_iff, mem_setOf_eq, not_lt] apply EMetric.le_infEdist.mpr fun y hy ↦ ?_ simp only [mem_compl_iff, mem_setOf_eq, not_lt] at hy simpa only [edist_comm] using le_trans hy <\| EMetric.infEdist_le_edist_of_mem x_in_E /-- The δ-thickening of the complement of the δ-thickening of a set is contained in the complement of the set. -/ lemma thickening_compl_thickening_self_subset_compl (δ : ℝ) (E : Set α) : thickening δ (thickening δ E)ᶜ ⊆ Eᶜ := by apply compl_subset_compl.mp simpa only [compl_compl] using subset_compl_thickening_compl_thickening_self δ E variable {X : Type u} [PseudoMetricSpace X] -- Porting note (#10756): new lemma theorem mem_thickening_iff_infDist_lt {E : Set X} {x : X} (h : E.Nonempty) : x ∈ thickening δ E ↔ infDist x E < δ := lt_ofReal_iff_toReal_lt (infEdist_ne_top h) /-- A point in a metric space belongs to the (open) `δ`-thickening of a subset `E` if and only if it is at distance less than `δ` from some point of `E`. -/ theorem mem_thickening_iff {E : Set X} {x : X} : x ∈ thickening δ E ↔ ∃ z ∈ E, dist x z < δ := by have key_iff : ∀ z : X, edist x z < ENNReal.ofReal δ ↔ dist x z < δ := fun z ↦ by rw [dist_edist, lt_ofReal_iff_toReal_lt (edist_ne_top _ _)] simp_rw [mem_thickening_iff_exists_edist_lt, key_iff] #align metric.mem_thickening_iff Metric.mem_thickening_iff @[simp] theorem thickening_singleton (δ : ℝ) (x : X) : thickening δ ({x} : Set X) = ball x δ := by ext simp [mem_thickening_iff] #align metric.thickening_singleton Metric.thickening_singleton theorem ball_subset_thickening {x : X} {E : Set X} (hx : x ∈ E) (δ : ℝ) : ball x δ ⊆ thickening δ E := Subset.trans (by simp [Subset.rfl]) (thickening_subset_of_subset δ <\| singleton_subset_iff.mpr hx) #align metric.ball_subset_thickening Metric.ball_subset_thickening /-- The (open) `δ`-thickening `Metric.thickening δ E` of a subset `E` in a metric space equals the union of balls of radius `δ` centered at points of `E`. -/ theorem thickening_eq_biUnion_ball {δ : ℝ} {E : Set X} : thickening δ E = ⋃ x ∈ E, ball x δ := by ext x simp only [mem_iUnion₂, exists_prop] exact mem_thickening_iff #align metric.thickening_eq_bUnion_ball Metric.thickening_eq_biUnion_ball protected theorem _root_.Bornology.IsBounded.thickening {δ : ℝ} {E : Set X} (h : IsBounded E) : IsBounded (thickening δ E) := by rcases E.eq_empty_or_nonempty with rfl \| ⟨x, hx⟩ · simp · refine (isBounded_iff_subset_closedBall x).2 ⟨δ + diam E, fun y hy ↦ ?_⟩ calc dist y x ≤ infDist y E + diam E := dist_le_infDist_add_diam (x := y) h hx _ ≤ δ + diam E := add_le_add_right ((mem_thickening_iff_infDist_lt ⟨x, hx⟩).1 hy).le _ #align metric.bounded.thickening Bornology.IsBounded.thickening end Thickening section Cthickening variable [PseudoEMetricSpace α] {δ ε : ℝ} {s t : Set α} {x : α} open EMetric /-- The closed `δ`-thickening `Metric.cthickening δ E` of a subset `E` in a pseudo emetric space consists of those points that are at infimum distance at most `δ` from `E`. -/ def cthickening (δ : ℝ) (E : Set α) : Set α := { x : α \| infEdist x E ≤ ENNReal.ofReal δ } #align metric.cthickening Metric.cthickening @[simp] theorem mem_cthickening_iff : x ∈ cthickening δ s ↔ infEdist x s ≤ ENNReal.ofReal δ := Iff.rfl #align metric.mem_cthickening_iff Metric.mem_cthickening_iff /-- An exterior point of a subset `E` (i.e., a point outside the closure of `E`) is not in the closed `δ`-thickening of `E` for small enough positive `δ`. -/ lemma eventually_not_mem_cthickening_of_infEdist_pos {E : Set α} {x : α} (h : x ∉ closure E) : ∀ᶠ δ in 𝓝 (0 : ℝ), x ∉ Metric.cthickening δ E := by obtain ⟨ε, ⟨ε_pos, ε_lt⟩⟩ := exists_real_pos_lt_infEdist_of_not_mem_closure h filter_upwards [eventually_lt_nhds ε_pos] with δ hδ simp only [cthickening, mem_setOf_eq, not_le] exact ((ofReal_lt_ofReal_iff ε_pos).mpr hδ).trans ε_lt theorem mem_cthickening_of_edist_le (x y : α) (δ : ℝ) (E : Set α) (h : y ∈ E) (h' : edist x y ≤ ENNReal.ofReal δ) : x ∈ cthickening δ E := (infEdist_le_edist_of_mem h).trans h' #align metric.mem_cthickening_of_edist_le Metric.mem_cthickening_of_edist_le theorem mem_cthickening_of_dist_le {α : Type} [PseudoMetricSpace α] (x y : α) (δ : ℝ) (E : Set α) (h : y ∈ E) (h' : dist x y ≤ δ) : x ∈ cthickening δ E := by apply mem_cthickening_of_edist_le x y δ E h rw [edist_dist] exact ENNReal.ofReal_le_ofReal h' #align metric.mem_cthickening_of_dist_le Metric.mem_cthickening_of_dist_le theorem cthickening_eq_preimage_infEdist (δ : ℝ) (E : Set α) : cthickening δ E = (fun x => infEdist x E) ⁻¹' Iic (ENNReal.ofReal δ) := rfl #align metric.cthickening_eq_preimage_inf_edist Metric.cthickening_eq_preimage_infEdist /-- The closed thickening is a closed set. -/ theorem isClosed_cthickening {δ : ℝ} {E : Set α} : IsClosed (cthickening δ E) := IsClosed.preimage continuous_infEdist isClosed_Iic #align metric.is_closed_cthickening Metric.isClosed_cthickening /-- The closed thickening of the empty set is empty. -/ @[simp] theorem cthickening_empty (δ : ℝ) : cthickening δ (∅ : Set α) = ∅ := by simp only [cthickening, ENNReal.ofReal_ne_top, setOf_false, infEdist_empty, top_le_iff] #align metric.cthickening_empty Metric.cthickening_empty theorem cthickening_of_nonpos {δ : ℝ} (hδ : δ ≤ 0) (E : Set α) : cthickening δ E = closure E := by ext x simp [mem_closure_iff_infEdist_zero, cthickening, ENNReal.ofReal_eq_zero.2 hδ] #align metric.cthickening_of_nonpos Metric.cthickening_of_nonpos /-- The closed thickening with radius zero is the closure of the set. -/ @[simp] theorem cthickening_zero (E : Set α) : cthickening 0 E = closure E := cthickening_of_nonpos le_rfl E #align metric.cthickening_zero Metric.cthickening_zero theorem cthickening_max_zero (δ : ℝ) (E : Set α) : cthickening (max 0 δ) E = cthickening δ E := by cases le_total δ 0 <;> simp [cthickening_of_nonpos, ] #align metric.cthickening_max_zero Metric.cthickening_max_zero /-- The closed thickening `Metric.cthickening δ E` of a fixed subset `E` is an increasing function of the thickening radius `δ`. -/ theorem cthickening_mono {δ₁ δ₂ : ℝ} (hle : δ₁ ≤ δ₂) (E : Set α) : cthickening δ₁ E ⊆ cthickening δ₂ E := preimage_mono (Iic_subset_Iic.mpr (ENNReal.ofReal_le_ofReal hle)) #align metric.cthickening_mono Metric.cthickening_mono @[simp] theorem cthickening_singleton {α : Type} [PseudoMetricSpace α] (x : α) {δ : ℝ} (hδ : 0 ≤ δ) : cthickening δ ({x} : Set α) = closedBall x δ := by ext y simp [cthickening, edist_dist, ENNReal.ofReal_le_ofReal_iff hδ] #align metric.cthickening_singleton Metric.cthickening_singleton theorem closedBall_subset_cthickening_singleton {α : Type} [PseudoMetricSpace α] (x : α) (δ : ℝ) : closedBall x δ ⊆ cthickening δ ({x} : Set α) := by rcases lt_or_le δ 0 with (hδ \| hδ) · simp only [closedBall_eq_empty.mpr hδ, empty_subset] · simp only [cthickening_singleton x hδ, Subset.rfl] #align metric.closed_ball_subset_cthickening_singleton Metric.closedBall_subset_cthickening_singleton /-- The closed thickening `Metric.cthickening δ E` with a fixed thickening radius `δ` is an increasing function of the subset `E`. -/ theorem cthickening_subset_of_subset (δ : ℝ) {E₁ E₂ : Set α} (h : E₁ ⊆ E₂) : cthickening δ E₁ ⊆ cthickening δ E₂ := fun _ hx => le_trans (infEdist_anti h) hx #align metric.cthickening_subset_of_subset Metric.cthickening_subset_of_subset theorem cthickening_subset_thickening {δ₁ : ℝ≥0} {δ₂ : ℝ} (hlt : (δ₁ : ℝ) < δ₂) (E : Set α) : cthickening δ₁ E ⊆ thickening δ₂ E := fun _ hx => hx.out.trans_lt ((ENNReal.ofReal_lt_ofReal_iff (lt_of_le_of_lt δ₁.prop hlt)).mpr hlt) #align metric.cthickening_subset_thickening Metric.cthickening_subset_thickening /-- The closed thickening `Metric.cthickening δ₁ E` is contained in the open thickening `Metric.thickening δ₂ E` if the radius of the latter is positive and larger. -/ theorem cthickening_subset_thickening' {δ₁ δ₂ : ℝ} (δ₂_pos : 0 < δ₂) (hlt : δ₁ < δ₂) (E : Set α) : cthickening δ₁ E ⊆ thickening δ₂ E := fun _ hx => lt_of_le_of_lt hx.out ((ENNReal.ofReal_lt_ofReal_iff δ₂_pos).mpr hlt) #align metric.cthickening_subset_thickening' Metric.cthickening_subset_thickening' /-- The open thickening `Metric.thickening δ E` is contained in the closed thickening `Metric.cthickening δ E` with the same radius. -/ theorem thickening_subset_cthickening (δ : ℝ) (E : Set α) : thickening δ E ⊆ cthickening δ E := by intro x hx rw [thickening, mem_setOf_eq] at hx exact hx.le #align metric.thickening_subset_cthickening Metric.thickening_subset_cthickening theorem thickening_subset_cthickening_of_le {δ₁ δ₂ : ℝ} (hle : δ₁ ≤ δ₂) (E : Set α) : thickening δ₁ E ⊆ cthickening δ₂ E := (thickening_subset_cthickening δ₁ E).trans (cthickening_mono hle E) #align metric.thickening_subset_cthickening_of_le Metric.thickening_subset_cthickening_of_le theorem _root_.Bornology.IsBounded.cthickening {α : Type} [PseudoMetricSpace α] {δ : ℝ} {E : Set α} (h : IsBounded E) : IsBounded (cthickening δ E) := by have : IsBounded (thickening (max (δ + 1) 1) E) := h.thickening apply this.subset exact cthickening_subset_thickening' (zero_lt_one.trans_le (le_max_right _ _)) ((lt_add_one _).trans_le (le_max_left _ _)) _ #align metric.bounded.cthickening Bornology.IsBounded.cthickening protected theorem _root_.IsCompact.cthickening {α : Type} [PseudoMetricSpace α] [ProperSpace α] {s : Set α} (hs : IsCompact s) {r : ℝ} : IsCompact (cthickening r s) := isCompact_of_isClosed_isBounded isClosed_cthickening hs.isBounded.cthickening theorem thickening_subset_interior_cthickening (δ : ℝ) (E : Set α) : thickening δ E ⊆ interior (cthickening δ E) := (subset_interior_iff_isOpen.mpr isOpen_thickening).trans (interior_mono (thickening_subset_cthickening δ E)) #align metric.thickening_subset_interior_cthickening Metric.thickening_subset_interior_cthickening theorem closure_thickening_subset_cthickening (δ : ℝ) (E : Set α) : closure (thickening δ E) ⊆ cthickening δ E := (closure_mono (thickening_subset_cthickening δ E)).trans isClosed_cthickening.closure_subset #align metric.closure_thickening_subset_cthickening Metric.closure_thickening_subset_cthickening /-- The closed thickening of a set contains the closure of the set. -/ theorem closure_subset_cthickening (δ : ℝ) (E : Set α) : closure E ⊆ cthickening δ E := by rw [← cthickening_of_nonpos (min_le_right δ 0)] exact cthickening_mono (min_le_left δ 0) E #align metric.closure_subset_cthickening Metric.closure_subset_cthickening /-- The (open) thickening of a set contains the closure of the set. -/ theorem closure_subset_thickening {δ : ℝ} (δ_pos : 0 < δ) (E : Set α) : closure E ⊆ thickening δ E := by rw [← cthickening_zero] exact cthickening_subset_thickening' δ_pos δ_pos E #align metric.closure_subset_thickening Metric.closure_subset_thickening /-- A set is contained in its own (open) thickening. -/ theorem self_subset_thickening {δ : ℝ} (δ_pos : 0 < δ) (E : Set α) : E ⊆ thickening δ E := (@subset_closure _ E).trans (closure_subset_thickening δ_pos E) #align metric.self_subset_thickening Metric.self_subset_thickening /-- A set is contained in its own closed thickening. -/ theorem self_subset_cthickening {δ : ℝ} (E : Set α) : E ⊆ cthickening δ E := subset_closure.trans (closure_subset_cthickening δ E) #align metric.self_subset_cthickening Metric.self_subset_cthickening theorem thickening_mem_nhdsSet (E : Set α) {δ : ℝ} (hδ : 0 < δ) : thickening δ E ∈ 𝓝ˢ E := isOpen_thickening.mem_nhdsSet.2 <\| self_subset_thickening hδ E #align metric.thickening_mem_nhds_set Metric.thickening_mem_nhdsSet theorem cthickening_mem_nhdsSet (E : Set α) {δ : ℝ} (hδ : 0 < δ) : cthickening δ E ∈ 𝓝ˢ E := mem_of_superset (thickening_mem_nhdsSet E hδ) (thickening_subset_cthickening _ _) #align metric.cthickening_mem_nhds_set Metric.cthickening_mem_nhdsSet @[simp] theorem thickening_union (δ : ℝ) (s t : Set α) : thickening δ (s ∪ t) = thickening δ s ∪ thickening δ t := by simp_rw [thickening, infEdist_union, inf_eq_min, min_lt_iff, setOf_or] #align metric.thickening_union Metric.thickening_union @[simp] theorem cthickening_union (δ : ℝ) (s t : Set α) : cthickening δ (s ∪ t) = cthickening δ s ∪ cthickening δ t := by simp_rw [cthickening, infEdist_union, inf_eq_min, min_le_iff, setOf_or] #align metric.cthickening_union Metric.cthickening_union @[simp] theorem thickening_iUnion (δ : ℝ) (f : ι → Set α) : thickening δ (⋃ i, f i) = ⋃ i, thickening δ (f i) := by simp_rw [thickening, infEdist_iUnion, iInf_lt_iff, setOf_exists] #align metric.thickening_Union Metric.thickening_iUnion lemma thickening_biUnion {ι : Type} (δ : ℝ) (f : ι → Set α) (I : Set ι) : thickening δ (⋃ i ∈ I, f i) = ⋃ i ∈ I, thickening δ (f i) := by simp only [thickening_iUnion] theorem ediam_cthickening_le (ε : ℝ≥0) : EMetric.diam (cthickening ε s) ≤ EMetric.diam s + 2 * ε := by refine diam_le fun x hx y hy => ENNReal.le_of_forall_pos_le_add fun δ hδ _ => ?_ rw [mem_cthickening_iff, ENNReal.ofReal_coe_nnreal] at hx hy have hε : (ε : ℝ≥0∞) < ε + δ := ENNReal.coe_lt_coe.2 (lt_add_of_pos_right _ hδ) replace hx := hx.trans_lt hε obtain ⟨x', hx', hxx'⟩ := infEdist_lt_iff.mp hx calc edist x y ≤ edist x x' + edist y x' := edist_triangle_right _ _ _ _ ≤ ε + δ + (infEdist y s + EMetric.diam s) := add_le_add hxx'.le (edist_le_infEdist_add_ediam hx') _ ≤ ε + δ + (ε + EMetric.diam s) := add_le_add_left (add_le_add_right hy _) _ _ = _ := by rw [two_mul]; ac_rfl #align metric.ediam_cthickening_le Metric.ediam_cthickening_le theorem ediam_thickening_le (ε : ℝ≥0) : EMetric.diam (thickening ε s) ≤ EMetric.diam s + 2 * ε := (EMetric.diam_mono <\| thickening_subset_cthickening _ _).trans <\| ediam_cthickening_le _ #align metric.ediam_thickening_le Metric.ediam_thickening_le theorem diam_cthickening_le {α : Type} [PseudoMetricSpace α] (s : Set α) (hε : 0 ≤ ε) : diam (cthickening ε s) ≤ diam s + 2 ε := by lift ε to ℝ≥0 using hε refine (toReal_le_add' (ediam_cthickening_le _) ?_ ?_).trans_eq ?_ · exact fun h ↦ top_unique <\| h ▸ EMetric.diam_mono (self_subset_cthickening _) · simp [mul_eq_top] · simp [diam] #align metric.diam_cthickening_le Metric.diam_cthickening_le theorem diam_thickening_le {α : Type} [PseudoMetricSpace α] (s : Set α) (hε : 0 ≤ ε) : diam (thickening ε s) ≤ diam s + 2 ε := by by_cases hs : IsBounded s · exact (diam_mono (thickening_subset_cthickening _ _) hs.cthickening).trans (diam_cthickening_le _ hε) obtain rfl \| hε := hε.eq_or_lt · simp [thickening_of_nonpos, diam_nonneg] · rw [diam_eq_zero_of_unbounded (mt (IsBounded.subset · <\| self_subset_thickening hε _) hs)] positivity #align metric.diam_thickening_le Metric.diam_thickening_le @[simp] theorem thickening_closure : thickening δ (closure s) = thickening δ s := by simp_rw [thickening, infEdist_closure] #align metric.thickening_closure Metric.thickening_closure @[simp] theorem cthickening_closure : cthickening δ (closure s) = cthickening δ s := by simp_rw [cthickening, infEdist_closure] #align metric.cthickening_closure Metric.cthickening_closure open ENNReal theorem _root_.Disjoint.exists_thickenings (hst : Disjoint s t) (hs : IsCompact s) (ht : IsClosed t) : ∃ δ, 0 < δ ∧ Disjoint (thickening δ s) (thickening δ t) := by obtain ⟨r, hr, h⟩ := exists_pos_forall_lt_edist hs ht hst refine ⟨r / 2, half_pos (NNReal.coe_pos.2 hr), ?_⟩ rw [disjoint_iff_inf_le] rintro z ⟨hzs, hzt⟩ rw [mem_thickening_iff_exists_edist_lt] at hzs hzt rw [← NNReal.coe_two, ← NNReal.coe_div, ENNReal.ofReal_coe_nnreal] at hzs hzt obtain ⟨x, hx, hzx⟩ := hzs obtain ⟨y, hy, hzy⟩ := hzt refine (h x hx y hy).not_le ?_ calc edist x y ≤ edist z x + edist z y := edist_triangle_left _ _ _ _ ≤ ↑(r / 2) + ↑(r / 2) := add_le_add hzx.le hzy.le _ = r := by rw [← ENNReal.coe_add, add_halves] #align disjoint.exists_thickenings Disjoint.exists_thickenings theorem _root_.Disjoint.exists_cthickenings (hst : Disjoint s t) (hs : IsCompact s) (ht : IsClosed t) : ∃ δ, 0 < δ ∧ Disjoint (cthickening δ s) (cthickening δ t) := by obtain ⟨δ, hδ, h⟩ := hst.exists_thickenings hs ht refine ⟨δ / 2, half_pos hδ, h.mono ?_ ?_⟩ <;> exact cthickening_subset_thickening' hδ (half_lt_self hδ) _ #align disjoint.exists_cthickenings Disjoint.exists_cthickenings /-- If `s` is compact, `t` is open and `s ⊆ t`, some `cthickening` of `s` is contained in `t`. -/ theorem _root_.IsCompact.exists_cthickening_subset_open (hs : IsCompact s) (ht : IsOpen t) (hst : s ⊆ t) : ∃ δ, 0 < δ ∧ cthickening δ s ⊆ t := (hst.disjoint_compl_right.exists_cthickenings hs ht.isClosed_compl).imp fun _ h => ⟨h.1, disjoint_compl_right_iff_subset.1 <\| h.2.mono_right <\| self_subset_cthickening _⟩ #align is_compact.exists_cthickening_subset_open IsCompact.exists_cthickening_subset_open theorem _root_.IsCompact.exists_isCompact_cthickening [LocallyCompactSpace α] (hs : IsCompact s) : ∃ δ, 0 < δ ∧ IsCompact (cthickening δ s) := by rcases exists_compact_superset hs with ⟨K, K_compact, hK⟩ rcases hs.exists_cthickening_subset_open isOpen_interior hK with ⟨δ, δpos, hδ⟩ refine ⟨δ, δpos, ?_⟩ exact K_compact.of_isClosed_subset isClosed_cthickening (hδ.trans interior_subset) theorem _root_.IsCompact.exists_thickening_subset_open (hs : IsCompact s) (ht : IsOpen t) (hst : s ⊆ t) : ∃ δ, 0 < δ ∧ thickening δ s ⊆ t := let ⟨δ, h₀, hδ⟩ := hs.exists_cthickening_subset_open ht hst ⟨δ, h₀, (thickening_subset_cthickening _ _).trans hδ⟩ #align is_compact.exists_thickening_subset_open IsCompact.exists_thickening_subset_open theorem hasBasis_nhdsSet_thickening {K : Set α} (hK : IsCompact K) : (𝓝ˢ K).HasBasis (fun δ : ℝ => 0 < δ) fun δ => thickening δ K := (hasBasis_nhdsSet K).to_hasBasis' (fun _U hU => hK.exists_thickening_subset_open hU.1 hU.2) fun _ => thickening_mem_nhdsSet K #align metric.has_basis_nhds_set_thickening Metric.hasBasis_nhdsSet_thickening theorem hasBasis_nhdsSet_cthickening {K : Set α} (hK : IsCompact K) : (𝓝ˢ K).HasBasis (fun δ : ℝ => 0 < δ) fun δ => cthickening δ K := (hasBasis_nhdsSet K).to_hasBasis' (fun _U hU => hK.exists_cthickening_subset_open hU.1 hU.2) fun _ => cthickening_mem_nhdsSet K #align metric.has_basis_nhds_set_cthickening Metric.hasBasis_nhdsSet_cthickening theorem cthickening_eq_iInter_cthickening' {δ : ℝ} (s : Set ℝ) (hsδ : s ⊆ Ioi δ) (hs : ∀ ε, δ < ε → (s ∩ Ioc δ ε).Nonempty) (E : Set α) : cthickening δ E = ⋂ ε ∈ s, cthickening ε E := by apply Subset.antisymm · exact subset_iInter₂ fun _ hε => cthickening_mono (le_of_lt (hsδ hε)) E · unfold cthickening intro x hx simp only [mem_iInter, mem_setOf_eq] at * apply ENNReal.le_of_forall_pos_le_add intro η η_pos _ rcases hs (δ + η) (lt_add_of_pos_right _ (NNReal.coe_pos.mpr η_pos)) with ⟨ε, ⟨hsε, hε⟩⟩ apply ((hx ε hsε).trans (ENNReal.ofReal_le_ofReal hε.2)).trans rw [ENNReal.coe_nnreal_eq η] exact ENNReal.ofReal_add_le #align metric.cthickening_eq_Inter_cthickening' Metric.cthickening_eq_iInter_cthickening' theorem cthickening_eq_iInter_cthickening {δ : ℝ} (E : Set α) : cthickening δ E = ⋂ (ε : ℝ) (_ : δ < ε), cthickening ε E := by apply cthickening_eq_iInter_cthickening' (Ioi δ) rfl.subset simp_rw [inter_eq_right.mpr Ioc_subset_Ioi_self] exact fun _ hε => nonempty_Ioc.mpr hε #align metric.cthickening_eq_Inter_cthickening Metric.cthickening_eq_iInter_cthickening theorem cthickening_eq_iInter_thickening' {δ : ℝ} (δ_nn : 0 ≤ δ) (s : Set ℝ) (hsδ : s ⊆ Ioi δ) (hs : ∀ ε, δ < ε → (s ∩ Ioc δ ε).Nonempty) (E : Set α) : cthickening δ E = ⋂ ε ∈ s, thickening ε E := by refine (subset_iInter₂ fun ε hε => ?_).antisymm ?_ · obtain ⟨ε', -, hε'⟩ := hs ε (hsδ hε) have ss := cthickening_subset_thickening' (lt_of_le_of_lt δ_nn hε'.1) hε'.1 E exact ss.trans (thickening_mono hε'.2 E) · rw [cthickening_eq_iInter_cthickening' s hsδ hs E] exact iInter₂_mono fun ε _ => thickening_subset_cthickening ε E #align metric.cthickening_eq_Inter_thickening' Metric.cthickening_eq_iInter_thickening' theorem cthickening_eq_iInter_thickening {δ : ℝ} (δ_nn : 0 ≤ δ) (E : Set α) : cthickening δ E = ⋂ (ε : ℝ) (_ : δ < ε), thickening ε E := by apply cthickening_eq_iInter_thickening' δ_nn (Ioi δ) rfl.subset simp_rw [inter_eq_right.mpr Ioc_subset_Ioi_self] exact fun _ hε => nonempty_Ioc.mpr hε #align metric.cthickening_eq_Inter_thickening Metric.cthickening_eq_iInter_thickening theorem cthickening_eq_iInter_thickening'' (δ : ℝ) (E : Set α) : cthickening δ E = ⋂ (ε : ℝ) (_ : max 0 δ < ε), thickening ε E := by rw [← cthickening_max_zero, cthickening_eq_iInter_thickening] exact le_max_left _ _ #align metric.cthickening_eq_Inter_thickening'' Metric.cthickening_eq_iInter_thickening'' /-- The closure of a set equals the intersection of its closed thickenings of positive radii accumulating at zero. -/ theorem closure_eq_iInter_cthickening' (E : Set α) (s : Set ℝ) (hs : ∀ ε, 0 < ε → (s ∩ Ioc 0 ε).Nonempty) : closure E = ⋂ δ ∈ s, cthickening δ E := by by_cases hs₀ : s ⊆ Ioi 0 · rw [← cthickening_zero] apply cthickening_eq_iInter_cthickening' _ hs₀ hs obtain ⟨δ, hδs, δ_nonpos⟩ := not_subset.mp hs₀ rw [Set.mem_Ioi, not_lt] at δ_nonpos apply Subset.antisymm · exact subset_iInter₂ fun ε _ => closure_subset_cthickening ε E · rw [← cthickening_of_nonpos δ_nonpos E] exact biInter_subset_of_mem hδs #align metric.closure_eq_Inter_cthickening' Metric.closure_eq_iInter_cthickening' /-- The closure of a set equals the intersection of its closed thickenings of positive radii. -/ theorem closure_eq_iInter_cthickening (E : Set α) : closure E = ⋂ (δ : ℝ) (_ : 0 < δ), cthickening δ E := by rw [← cthickening_zero] exact cthickening_eq_iInter_cthickening E #align metric.closure_eq_Inter_cthickening Metric.closure_eq_iInter_cthickening /-- The closure of a set equals the intersection of its open thickenings of positive radii accumulating at zero. -/	Mathlib/Topology/MetricSpace/Thickening.lean	566	569	theorem closure_eq_iInter_thickening' (E : Set α) (s : Set ℝ) (hs₀ : s ⊆ Ioi 0) (hs : ∀ ε, 0 < ε → (s ∩ Ioc 0 ε).Nonempty) : closure E = ⋂ δ ∈ s, thickening δ E := by	rw [← cthickening_zero] apply cthickening_eq_iInter_thickening' le_rfl _ hs₀ hs
/- Copyright (c) 2021 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne, Sébastien Gouëzel -/ import Mathlib.Analysis.NormedSpace.BoundedLinearMaps import Mathlib.MeasureTheory.Measure.WithDensity import Mathlib.MeasureTheory.Function.SimpleFuncDense import Mathlib.Topology.Algebra.Module.FiniteDimension #align_import measure_theory.function.strongly_measurable.basic from "leanprover-community/mathlib"@"3b52265189f3fb43aa631edffce5d060fafaf82f" /-! # Strongly measurable and finitely strongly measurable functions A function `f` is said to be strongly measurable if `f` is the sequential limit of simple functions. It is said to be finitely strongly measurable with respect to a measure `μ` if the supports of those simple functions have finite measure. We also provide almost everywhere versions of these notions. Almost everywhere strongly measurable functions form the largest class of functions that can be integrated using the Bochner integral. If the target space has a second countable topology, strongly measurable and measurable are equivalent. If the measure is sigma-finite, strongly measurable and finitely strongly measurable are equivalent. The main property of finitely strongly measurable functions is `FinStronglyMeasurable.exists_set_sigmaFinite`: there exists a measurable set `t` such that the function is supported on `t` and `μ.restrict t` is sigma-finite. As a consequence, we can prove some results for those functions as if the measure was sigma-finite. ## Main definitions * `StronglyMeasurable f`: `f : α → β` is the limit of a sequence `fs : ℕ → SimpleFunc α β`. * `FinStronglyMeasurable f μ`: `f : α → β` is the limit of a sequence `fs : ℕ → SimpleFunc α β` such that for all `n ∈ ℕ`, the measure of the support of `fs n` is finite. * `AEStronglyMeasurable f μ`: `f` is almost everywhere equal to a `StronglyMeasurable` function. * `AEFinStronglyMeasurable f μ`: `f` is almost everywhere equal to a `FinStronglyMeasurable` function. * `AEFinStronglyMeasurable.sigmaFiniteSet`: a measurable set `t` such that `f =ᵐ[μ.restrict tᶜ] 0` and `μ.restrict t` is sigma-finite. ## Main statements * `AEFinStronglyMeasurable.exists_set_sigmaFinite`: there exists a measurable set `t` such that `f =ᵐ[μ.restrict tᶜ] 0` and `μ.restrict t` is sigma-finite. We provide a solid API for strongly measurable functions, and for almost everywhere strongly measurable functions, as a basis for the Bochner integral. ## References * Hytönen, Tuomas, Jan Van Neerven, Mark Veraar, and Lutz Weis. Analysis in Banach spaces. Springer, 2016. -/ open MeasureTheory Filter TopologicalSpace Function Set MeasureTheory.Measure open ENNReal Topology MeasureTheory NNReal variable {α β γ ι : Type} [Countable ι] namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc section Definitions variable [TopologicalSpace β] /-- A function is `StronglyMeasurable` if it is the limit of simple functions. -/ def StronglyMeasurable [MeasurableSpace α] (f : α → β) : Prop := ∃ fs : ℕ → α →ₛ β, ∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x)) #align measure_theory.strongly_measurable MeasureTheory.StronglyMeasurable /-- The notation for StronglyMeasurable giving the measurable space instance explicitly. -/ scoped notation "StronglyMeasurable[" m "]" => @MeasureTheory.StronglyMeasurable _ _ _ m /-- A function is `FinStronglyMeasurable` with respect to a measure if it is the limit of simple functions with support with finite measure. -/ def FinStronglyMeasurable [Zero β] {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := ∃ fs : ℕ → α →ₛ β, (∀ n, μ (support (fs n)) < ∞) ∧ ∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x)) #align measure_theory.fin_strongly_measurable MeasureTheory.FinStronglyMeasurable /-- A function is `AEStronglyMeasurable` with respect to a measure `μ` if it is almost everywhere equal to the limit of a sequence of simple functions. -/ def AEStronglyMeasurable {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := ∃ g, StronglyMeasurable g ∧ f =ᵐ[μ] g #align measure_theory.ae_strongly_measurable MeasureTheory.AEStronglyMeasurable /-- A function is `AEFinStronglyMeasurable` with respect to a measure if it is almost everywhere equal to the limit of a sequence of simple functions with support with finite measure. -/ def AEFinStronglyMeasurable [Zero β] {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := ∃ g, FinStronglyMeasurable g μ ∧ f =ᵐ[μ] g #align measure_theory.ae_fin_strongly_measurable MeasureTheory.AEFinStronglyMeasurable end Definitions open MeasureTheory /-! ## Strongly measurable functions -/ @[aesop 30% apply (rule_sets := [Measurable])] protected theorem StronglyMeasurable.aestronglyMeasurable {α β} {_ : MeasurableSpace α} [TopologicalSpace β] {f : α → β} {μ : Measure α} (hf : StronglyMeasurable f) : AEStronglyMeasurable f μ := ⟨f, hf, EventuallyEq.refl _ _⟩ #align measure_theory.strongly_measurable.ae_strongly_measurable MeasureTheory.StronglyMeasurable.aestronglyMeasurable @[simp] theorem Subsingleton.stronglyMeasurable {α β} [MeasurableSpace α] [TopologicalSpace β] [Subsingleton β] (f : α → β) : StronglyMeasurable f := by let f_sf : α →ₛ β := ⟨f, fun x => ?_, Set.Subsingleton.finite Set.subsingleton_of_subsingleton⟩ · exact ⟨fun _ => f_sf, fun x => tendsto_const_nhds⟩ · have h_univ : f ⁻¹' {x} = Set.univ := by ext1 y simp [eq_iff_true_of_subsingleton] rw [h_univ] exact MeasurableSet.univ #align measure_theory.subsingleton.strongly_measurable MeasureTheory.Subsingleton.stronglyMeasurable theorem SimpleFunc.stronglyMeasurable {α β} {_ : MeasurableSpace α} [TopologicalSpace β] (f : α →ₛ β) : StronglyMeasurable f := ⟨fun _ => f, fun _ => tendsto_const_nhds⟩ #align measure_theory.simple_func.strongly_measurable MeasureTheory.SimpleFunc.stronglyMeasurable @[nontriviality] theorem StronglyMeasurable.of_finite [Finite α] {_ : MeasurableSpace α} [MeasurableSingletonClass α] [TopologicalSpace β] (f : α → β) : StronglyMeasurable f := ⟨fun _ => SimpleFunc.ofFinite f, fun _ => tendsto_const_nhds⟩ @[deprecated (since := "2024-02-05")] alias stronglyMeasurable_of_fintype := StronglyMeasurable.of_finite @[deprecated StronglyMeasurable.of_finite (since := "2024-02-06")] theorem stronglyMeasurable_of_isEmpty [IsEmpty α] {_ : MeasurableSpace α} [TopologicalSpace β] (f : α → β) : StronglyMeasurable f := .of_finite f #align measure_theory.strongly_measurable_of_is_empty MeasureTheory.StronglyMeasurable.of_finite theorem stronglyMeasurable_const {α β} {_ : MeasurableSpace α} [TopologicalSpace β] {b : β} : StronglyMeasurable fun _ : α => b := ⟨fun _ => SimpleFunc.const α b, fun _ => tendsto_const_nhds⟩ #align measure_theory.strongly_measurable_const MeasureTheory.stronglyMeasurable_const @[to_additive] theorem stronglyMeasurable_one {α β} {_ : MeasurableSpace α} [TopologicalSpace β] [One β] : StronglyMeasurable (1 : α → β) := stronglyMeasurable_const #align measure_theory.strongly_measurable_one MeasureTheory.stronglyMeasurable_one #align measure_theory.strongly_measurable_zero MeasureTheory.stronglyMeasurable_zero /-- A version of `stronglyMeasurable_const` that assumes `f x = f y` for all `x, y`. This version works for functions between empty types. -/ theorem stronglyMeasurable_const' {α β} {m : MeasurableSpace α} [TopologicalSpace β] {f : α → β} (hf : ∀ x y, f x = f y) : StronglyMeasurable f := by nontriviality α inhabit α convert stronglyMeasurable_const (β := β) using 1 exact funext fun x => hf x default #align measure_theory.strongly_measurable_const' MeasureTheory.stronglyMeasurable_const' -- Porting note: changed binding type of `MeasurableSpace α`. @[simp] theorem Subsingleton.stronglyMeasurable' {α β} [MeasurableSpace α] [TopologicalSpace β] [Subsingleton α] (f : α → β) : StronglyMeasurable f := stronglyMeasurable_const' fun x y => by rw [Subsingleton.elim x y] #align measure_theory.subsingleton.strongly_measurable' MeasureTheory.Subsingleton.stronglyMeasurable' namespace StronglyMeasurable variable {f g : α → β} section BasicPropertiesInAnyTopologicalSpace variable [TopologicalSpace β] /-- A sequence of simple functions such that `∀ x, Tendsto (fun n => hf.approx n x) atTop (𝓝 (f x))`. That property is given by `stronglyMeasurable.tendsto_approx`. -/ protected noncomputable def approx {_ : MeasurableSpace α} (hf : StronglyMeasurable f) : ℕ → α →ₛ β := hf.choose #align measure_theory.strongly_measurable.approx MeasureTheory.StronglyMeasurable.approx protected theorem tendsto_approx {_ : MeasurableSpace α} (hf : StronglyMeasurable f) : ∀ x, Tendsto (fun n => hf.approx n x) atTop (𝓝 (f x)) := hf.choose_spec #align measure_theory.strongly_measurable.tendsto_approx MeasureTheory.StronglyMeasurable.tendsto_approx /-- Similar to `stronglyMeasurable.approx`, but enforces that the norm of every function in the sequence is less than `c` everywhere. If `‖f x‖ ≤ c` this sequence of simple functions verifies `Tendsto (fun n => hf.approxBounded n x) atTop (𝓝 (f x))`. -/ noncomputable def approxBounded {_ : MeasurableSpace α} [Norm β] [SMul ℝ β] (hf : StronglyMeasurable f) (c : ℝ) : ℕ → SimpleFunc α β := fun n => (hf.approx n).map fun x => min 1 (c / ‖x‖) • x #align measure_theory.strongly_measurable.approx_bounded MeasureTheory.StronglyMeasurable.approxBounded theorem tendsto_approxBounded_of_norm_le {β} {f : α → β} [NormedAddCommGroup β] [NormedSpace ℝ β] {m : MeasurableSpace α} (hf : StronglyMeasurable[m] f) {c : ℝ} {x : α} (hfx : ‖f x‖ ≤ c) : Tendsto (fun n => hf.approxBounded c n x) atTop (𝓝 (f x)) := by have h_tendsto := hf.tendsto_approx x simp only [StronglyMeasurable.approxBounded, SimpleFunc.coe_map, Function.comp_apply] by_cases hfx0 : ‖f x‖ = 0 · rw [norm_eq_zero] at hfx0 rw [hfx0] at h_tendsto ⊢ have h_tendsto_norm : Tendsto (fun n => ‖hf.approx n x‖) atTop (𝓝 0) := by convert h_tendsto.norm rw [norm_zero] refine squeeze_zero_norm (fun n => ?_) h_tendsto_norm calc ‖min 1 (c / ‖hf.approx n x‖) • hf.approx n x‖ = ‖min 1 (c / ‖hf.approx n x‖)‖ ‖hf.approx n x‖ := norm_smul _ _ _ ≤ ‖(1 : ℝ)‖ * ‖hf.approx n x‖ := by refine mul_le_mul_of_nonneg_right ?_ (norm_nonneg _) rw [norm_one, Real.norm_of_nonneg] · exact min_le_left _ _ · exact le_min zero_le_one (div_nonneg ((norm_nonneg _).trans hfx) (norm_nonneg _)) _ = ‖hf.approx n x‖ := by rw [norm_one, one_mul] rw [← one_smul ℝ (f x)] refine Tendsto.smul ?_ h_tendsto have : min 1 (c / ‖f x‖) = 1 := by rw [min_eq_left_iff, one_le_div (lt_of_le_of_ne (norm_nonneg _) (Ne.symm hfx0))] exact hfx nth_rw 2 [this.symm] refine Tendsto.min tendsto_const_nhds ?_ exact Tendsto.div tendsto_const_nhds h_tendsto.norm hfx0 #align measure_theory.strongly_measurable.tendsto_approx_bounded_of_norm_le MeasureTheory.StronglyMeasurable.tendsto_approxBounded_of_norm_le theorem tendsto_approxBounded_ae {β} {f : α → β} [NormedAddCommGroup β] [NormedSpace ℝ β] {m m0 : MeasurableSpace α} {μ : Measure α} (hf : StronglyMeasurable[m] f) {c : ℝ} (hf_bound : ∀ᵐ x ∂μ, ‖f x‖ ≤ c) : ∀ᵐ x ∂μ, Tendsto (fun n => hf.approxBounded c n x) atTop (𝓝 (f x)) := by filter_upwards [hf_bound] with x hfx using tendsto_approxBounded_of_norm_le hf hfx #align measure_theory.strongly_measurable.tendsto_approx_bounded_ae MeasureTheory.StronglyMeasurable.tendsto_approxBounded_ae theorem norm_approxBounded_le {β} {f : α → β} [SeminormedAddCommGroup β] [NormedSpace ℝ β] {m : MeasurableSpace α} {c : ℝ} (hf : StronglyMeasurable[m] f) (hc : 0 ≤ c) (n : ℕ) (x : α) : ‖hf.approxBounded c n x‖ ≤ c := by simp only [StronglyMeasurable.approxBounded, SimpleFunc.coe_map, Function.comp_apply] refine (norm_smul_le _ _).trans ?_ by_cases h0 : ‖hf.approx n x‖ = 0 · simp only [h0, _root_.div_zero, min_eq_right, zero_le_one, norm_zero, mul_zero] exact hc rcases le_total ‖hf.approx n x‖ c with h \| h · rw [min_eq_left _] · simpa only [norm_one, one_mul] using h · rwa [one_le_div (lt_of_le_of_ne (norm_nonneg _) (Ne.symm h0))] · rw [min_eq_right _] · rw [norm_div, norm_norm, mul_comm, mul_div, div_eq_mul_inv, mul_comm, ← mul_assoc, inv_mul_cancel h0, one_mul, Real.norm_of_nonneg hc] · rwa [div_le_one (lt_of_le_of_ne (norm_nonneg _) (Ne.symm h0))] #align measure_theory.strongly_measurable.norm_approx_bounded_le MeasureTheory.StronglyMeasurable.norm_approxBounded_le theorem _root_.stronglyMeasurable_bot_iff [Nonempty β] [T2Space β] : StronglyMeasurable[⊥] f ↔ ∃ c, f = fun _ => c := by cases' isEmpty_or_nonempty α with hα hα · simp only [@Subsingleton.stronglyMeasurable' _ _ ⊥ _ _ f, eq_iff_true_of_subsingleton, exists_const] refine ⟨fun hf => ?_, fun hf_eq => ?_⟩ · refine ⟨f hα.some, ?_⟩ let fs := hf.approx have h_fs_tendsto : ∀ x, Tendsto (fun n => fs n x) atTop (𝓝 (f x)) := hf.tendsto_approx have : ∀ n, ∃ c, ∀ x, fs n x = c := fun n => SimpleFunc.simpleFunc_bot (fs n) let cs n := (this n).choose have h_cs_eq : ∀ n, ⇑(fs n) = fun _ => cs n := fun n => funext (this n).choose_spec conv at h_fs_tendsto => enter [x, 1, n]; rw [h_cs_eq] have h_tendsto : Tendsto cs atTop (𝓝 (f hα.some)) := h_fs_tendsto hα.some ext1 x exact tendsto_nhds_unique (h_fs_tendsto x) h_tendsto · obtain ⟨c, rfl⟩ := hf_eq exact stronglyMeasurable_const #align strongly_measurable_bot_iff stronglyMeasurable_bot_iff end BasicPropertiesInAnyTopologicalSpace theorem finStronglyMeasurable_of_set_sigmaFinite [TopologicalSpace β] [Zero β] {m : MeasurableSpace α} {μ : Measure α} (hf_meas : StronglyMeasurable f) {t : Set α} (ht : MeasurableSet t) (hft_zero : ∀ x ∈ tᶜ, f x = 0) (htμ : SigmaFinite (μ.restrict t)) : FinStronglyMeasurable f μ := by haveI : SigmaFinite (μ.restrict t) := htμ let S := spanningSets (μ.restrict t) have hS_meas : ∀ n, MeasurableSet (S n) := measurable_spanningSets (μ.restrict t) let f_approx := hf_meas.approx let fs n := SimpleFunc.restrict (f_approx n) (S n ∩ t) have h_fs_t_compl : ∀ n, ∀ x, x ∉ t → fs n x = 0 := by intro n x hxt rw [SimpleFunc.restrict_apply _ ((hS_meas n).inter ht)] refine Set.indicator_of_not_mem ?_ _ simp [hxt] refine ⟨fs, ?_, fun x => ?_⟩ · simp_rw [SimpleFunc.support_eq] refine fun n => (measure_biUnion_finset_le _ _).trans_lt ?_ refine ENNReal.sum_lt_top_iff.mpr fun y hy => ?_ rw [SimpleFunc.restrict_preimage_singleton _ ((hS_meas n).inter ht)] swap · letI : (y : β) → Decidable (y = 0) := fun y => Classical.propDecidable _ rw [Finset.mem_filter] at hy exact hy.2 refine (measure_mono Set.inter_subset_left).trans_lt ?_ have h_lt_top := measure_spanningSets_lt_top (μ.restrict t) n rwa [Measure.restrict_apply' ht] at h_lt_top · by_cases hxt : x ∈ t swap · rw [funext fun n => h_fs_t_compl n x hxt, hft_zero x hxt] exact tendsto_const_nhds have h : Tendsto (fun n => (f_approx n) x) atTop (𝓝 (f x)) := hf_meas.tendsto_approx x obtain ⟨n₁, hn₁⟩ : ∃ n, ∀ m, n ≤ m → fs m x = f_approx m x := by obtain ⟨n, hn⟩ : ∃ n, ∀ m, n ≤ m → x ∈ S m ∩ t := by rsuffices ⟨n, hn⟩ : ∃ n, ∀ m, n ≤ m → x ∈ S m · exact ⟨n, fun m hnm => Set.mem_inter (hn m hnm) hxt⟩ rsuffices ⟨n, hn⟩ : ∃ n, x ∈ S n · exact ⟨n, fun m hnm => monotone_spanningSets (μ.restrict t) hnm hn⟩ rw [← Set.mem_iUnion, iUnion_spanningSets (μ.restrict t)] trivial refine ⟨n, fun m hnm => ?_⟩ simp_rw [fs, SimpleFunc.restrict_apply _ ((hS_meas m).inter ht), Set.indicator_of_mem (hn m hnm)] rw [tendsto_atTop'] at h ⊢ intro s hs obtain ⟨n₂, hn₂⟩ := h s hs refine ⟨max n₁ n₂, fun m hm => ?_⟩ rw [hn₁ m ((le_max_left _ _).trans hm.le)] exact hn₂ m ((le_max_right _ _).trans hm.le) #align measure_theory.strongly_measurable.fin_strongly_measurable_of_set_sigma_finite MeasureTheory.StronglyMeasurable.finStronglyMeasurable_of_set_sigmaFinite /-- If the measure is sigma-finite, all strongly measurable functions are `FinStronglyMeasurable`. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem finStronglyMeasurable [TopologicalSpace β] [Zero β] {m0 : MeasurableSpace α} (hf : StronglyMeasurable f) (μ : Measure α) [SigmaFinite μ] : FinStronglyMeasurable f μ := hf.finStronglyMeasurable_of_set_sigmaFinite MeasurableSet.univ (by simp) (by rwa [Measure.restrict_univ]) #align measure_theory.strongly_measurable.fin_strongly_measurable MeasureTheory.StronglyMeasurable.finStronglyMeasurable /-- A strongly measurable function is measurable. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem measurable {_ : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (hf : StronglyMeasurable f) : Measurable f := measurable_of_tendsto_metrizable (fun n => (hf.approx n).measurable) (tendsto_pi_nhds.mpr hf.tendsto_approx) #align measure_theory.strongly_measurable.measurable MeasureTheory.StronglyMeasurable.measurable /-- A strongly measurable function is almost everywhere measurable. -/ @[aesop 5% apply (rule_sets := [Measurable])] protected theorem aemeasurable {_ : MeasurableSpace α} [TopologicalSpace β] [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] {μ : Measure α} (hf : StronglyMeasurable f) : AEMeasurable f μ := hf.measurable.aemeasurable #align measure_theory.strongly_measurable.ae_measurable MeasureTheory.StronglyMeasurable.aemeasurable theorem _root_.Continuous.comp_stronglyMeasurable {_ : MeasurableSpace α} [TopologicalSpace β] [TopologicalSpace γ] {g : β → γ} {f : α → β} (hg : Continuous g) (hf : StronglyMeasurable f) : StronglyMeasurable fun x => g (f x) := ⟨fun n => SimpleFunc.map g (hf.approx n), fun x => (hg.tendsto _).comp (hf.tendsto_approx x)⟩ #align continuous.comp_strongly_measurable Continuous.comp_stronglyMeasurable @[to_additive] nonrec theorem measurableSet_mulSupport {m : MeasurableSpace α} [One β] [TopologicalSpace β] [MetrizableSpace β] (hf : StronglyMeasurable f) : MeasurableSet (mulSupport f) := by borelize β exact measurableSet_mulSupport hf.measurable #align measure_theory.strongly_measurable.measurable_set_mul_support MeasureTheory.StronglyMeasurable.measurableSet_mulSupport #align measure_theory.strongly_measurable.measurable_set_support MeasureTheory.StronglyMeasurable.measurableSet_support protected theorem mono {m m' : MeasurableSpace α} [TopologicalSpace β] (hf : StronglyMeasurable[m'] f) (h_mono : m' ≤ m) : StronglyMeasurable[m] f := by let f_approx : ℕ → @SimpleFunc α m β := fun n => @SimpleFunc.mk α m β (hf.approx n) (fun x => h_mono _ (SimpleFunc.measurableSet_fiber' _ x)) (SimpleFunc.finite_range (hf.approx n)) exact ⟨f_approx, hf.tendsto_approx⟩ #align measure_theory.strongly_measurable.mono MeasureTheory.StronglyMeasurable.mono protected theorem prod_mk {m : MeasurableSpace α} [TopologicalSpace β] [TopologicalSpace γ] {f : α → β} {g : α → γ} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable fun x => (f x, g x) := by refine ⟨fun n => SimpleFunc.pair (hf.approx n) (hg.approx n), fun x => ?_⟩ rw [nhds_prod_eq] exact Tendsto.prod_mk (hf.tendsto_approx x) (hg.tendsto_approx x) #align measure_theory.strongly_measurable.prod_mk MeasureTheory.StronglyMeasurable.prod_mk theorem comp_measurable [TopologicalSpace β] {_ : MeasurableSpace α} {_ : MeasurableSpace γ} {f : α → β} {g : γ → α} (hf : StronglyMeasurable f) (hg : Measurable g) : StronglyMeasurable (f ∘ g) := ⟨fun n => SimpleFunc.comp (hf.approx n) g hg, fun x => hf.tendsto_approx (g x)⟩ #align measure_theory.strongly_measurable.comp_measurable MeasureTheory.StronglyMeasurable.comp_measurable theorem of_uncurry_left [TopologicalSpace β] {_ : MeasurableSpace α} {_ : MeasurableSpace γ} {f : α → γ → β} (hf : StronglyMeasurable (uncurry f)) {x : α} : StronglyMeasurable (f x) := hf.comp_measurable measurable_prod_mk_left #align measure_theory.strongly_measurable.of_uncurry_left MeasureTheory.StronglyMeasurable.of_uncurry_left theorem of_uncurry_right [TopologicalSpace β] {_ : MeasurableSpace α} {_ : MeasurableSpace γ} {f : α → γ → β} (hf : StronglyMeasurable (uncurry f)) {y : γ} : StronglyMeasurable fun x => f x y := hf.comp_measurable measurable_prod_mk_right #align measure_theory.strongly_measurable.of_uncurry_right MeasureTheory.StronglyMeasurable.of_uncurry_right section Arithmetic variable {mα : MeasurableSpace α} [TopologicalSpace β] @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem mul [Mul β] [ContinuousMul β] (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (f * g) := ⟨fun n => hf.approx n * hg.approx n, fun x => (hf.tendsto_approx x).mul (hg.tendsto_approx x)⟩ #align measure_theory.strongly_measurable.mul MeasureTheory.StronglyMeasurable.mul #align measure_theory.strongly_measurable.add MeasureTheory.StronglyMeasurable.add @[to_additive (attr := measurability)] theorem mul_const [Mul β] [ContinuousMul β] (hf : StronglyMeasurable f) (c : β) : StronglyMeasurable fun x => f x * c := hf.mul stronglyMeasurable_const #align measure_theory.strongly_measurable.mul_const MeasureTheory.StronglyMeasurable.mul_const #align measure_theory.strongly_measurable.add_const MeasureTheory.StronglyMeasurable.add_const @[to_additive (attr := measurability)] theorem const_mul [Mul β] [ContinuousMul β] (hf : StronglyMeasurable f) (c : β) : StronglyMeasurable fun x => c * f x := stronglyMeasurable_const.mul hf #align measure_theory.strongly_measurable.const_mul MeasureTheory.StronglyMeasurable.const_mul #align measure_theory.strongly_measurable.const_add MeasureTheory.StronglyMeasurable.const_add @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable])) const_nsmul] protected theorem pow [Monoid β] [ContinuousMul β] (hf : StronglyMeasurable f) (n : ℕ) : StronglyMeasurable (f ^ n) := ⟨fun k => hf.approx k ^ n, fun x => (hf.tendsto_approx x).pow n⟩ @[to_additive (attr := measurability)] protected theorem inv [Inv β] [ContinuousInv β] (hf : StronglyMeasurable f) : StronglyMeasurable f⁻¹ := ⟨fun n => (hf.approx n)⁻¹, fun x => (hf.tendsto_approx x).inv⟩ #align measure_theory.strongly_measurable.inv MeasureTheory.StronglyMeasurable.inv #align measure_theory.strongly_measurable.neg MeasureTheory.StronglyMeasurable.neg @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem div [Div β] [ContinuousDiv β] (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable (f / g) := ⟨fun n => hf.approx n / hg.approx n, fun x => (hf.tendsto_approx x).div' (hg.tendsto_approx x)⟩ #align measure_theory.strongly_measurable.div MeasureTheory.StronglyMeasurable.div #align measure_theory.strongly_measurable.sub MeasureTheory.StronglyMeasurable.sub @[to_additive] theorem mul_iff_right [CommGroup β] [TopologicalGroup β] (hf : StronglyMeasurable f) : StronglyMeasurable (f * g) ↔ StronglyMeasurable g := ⟨fun h ↦ show g = f * g * f⁻¹ by simp only [mul_inv_cancel_comm] ▸ h.mul hf.inv, fun h ↦ hf.mul h⟩ @[to_additive] theorem mul_iff_left [CommGroup β] [TopologicalGroup β] (hf : StronglyMeasurable f) : StronglyMeasurable (g * f) ↔ StronglyMeasurable g := mul_comm g f ▸ mul_iff_right hf @[to_additive (attr := aesop safe 20 apply (rule_sets := [Measurable]))] protected theorem smul {𝕜} [TopologicalSpace 𝕜] [SMul 𝕜 β] [ContinuousSMul 𝕜 β] {f : α → 𝕜} {g : α → β} (hf : StronglyMeasurable f) (hg : StronglyMeasurable g) : StronglyMeasurable fun x => f x • g x := continuous_smul.comp_stronglyMeasurable (hf.prod_mk hg) #align measure_theory.strongly_measurable.smul MeasureTheory.StronglyMeasurable.smul #align measure_theory.strongly_measurable.vadd MeasureTheory.StronglyMeasurable.vadd @[to_additive (attr := measurability)] protected theorem const_smul {𝕜} [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (hf : StronglyMeasurable f) (c : 𝕜) : StronglyMeasurable (c • f) := ⟨fun n => c • hf.approx n, fun x => (hf.tendsto_approx x).const_smul c⟩ #align measure_theory.strongly_measurable.const_smul MeasureTheory.StronglyMeasurable.const_smul @[to_additive (attr := measurability)] protected theorem const_smul' {𝕜} [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (hf : StronglyMeasurable f) (c : 𝕜) : StronglyMeasurable fun x => c • f x := hf.const_smul c #align measure_theory.strongly_measurable.const_smul' MeasureTheory.StronglyMeasurable.const_smul' @[to_additive (attr := measurability)] protected theorem smul_const {𝕜} [TopologicalSpace 𝕜] [SMul 𝕜 β] [ContinuousSMul 𝕜 β] {f : α → 𝕜} (hf : StronglyMeasurable f) (c : β) : StronglyMeasurable fun x => f x • c := continuous_smul.comp_stronglyMeasurable (hf.prod_mk stronglyMeasurable_const) #align measure_theory.strongly_measurable.smul_const MeasureTheory.StronglyMeasurable.smul_const #align measure_theory.strongly_measurable.vadd_const MeasureTheory.StronglyMeasurable.vadd_const /-- In a normed vector space, the addition of a measurable function and a strongly measurable function is measurable. Note that this is not true without further second-countability assumptions for the addition of two measurable functions. -/ theorem _root_.Measurable.add_stronglyMeasurable {α E : Type} {_ : MeasurableSpace α} [AddGroup E] [TopologicalSpace E] [MeasurableSpace E] [BorelSpace E] [ContinuousAdd E] [PseudoMetrizableSpace E] {g f : α → E} (hg : Measurable g) (hf : StronglyMeasurable f) : Measurable (g + f) := by rcases hf with ⟨φ, hφ⟩ have : Tendsto (fun n x ↦ g x + φ n x) atTop (𝓝 (g + f)) := tendsto_pi_nhds.2 (fun x ↦ tendsto_const_nhds.add (hφ x)) apply measurable_of_tendsto_metrizable (fun n ↦ ?_) this exact hg.add_simpleFunc _ /-- In a normed vector space, the subtraction of a measurable function and a strongly measurable function is measurable. Note that this is not true without further second-countability assumptions for the subtraction of two measurable functions. -/ theorem _root_.Measurable.sub_stronglyMeasurable {α E : Type} {_ : MeasurableSpace α} [AddCommGroup E] [TopologicalSpace E] [MeasurableSpace E] [BorelSpace E] [ContinuousAdd E] [ContinuousNeg E] [PseudoMetrizableSpace E] {g f : α → E} (hg : Measurable g) (hf : StronglyMeasurable f) : Measurable (g - f) := by rw [sub_eq_add_neg] exact hg.add_stronglyMeasurable hf.neg /-- In a normed vector space, the addition of a strongly measurable function and a measurable function is measurable. Note that this is not true without further second-countability assumptions for the addition of two measurable functions. -/	Mathlib/MeasureTheory/Function/StronglyMeasurable/Basic.lean	521	530	theorem _root_.Measurable.stronglyMeasurable_add {α E : Type*} {_ : MeasurableSpace α} [AddGroup E] [TopologicalSpace E] [MeasurableSpace E] [BorelSpace E] [ContinuousAdd E] [PseudoMetrizableSpace E] {g f : α → E} (hg : Measurable g) (hf : StronglyMeasurable f) : Measurable (f + g) := by	rcases hf with ⟨φ, hφ⟩ have : Tendsto (fun n x ↦ φ n x + g x) atTop (𝓝 (f + g)) := tendsto_pi_nhds.2 (fun x ↦ (hφ x).add tendsto_const_nhds) apply measurable_of_tendsto_metrizable (fun n ↦ ?_) this exact hg.simpleFunc_add _
/- Copyright (c) 2019 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Analysis.Calculus.FDeriv.Equiv import Mathlib.Analysis.Calculus.FormalMultilinearSeries #align_import analysis.calculus.cont_diff_def from "leanprover-community/mathlib"@"3a69562db5a458db8322b190ec8d9a8bbd8a5b14" /-! # Higher differentiability A function is `C^1` on a domain if it is differentiable there, and its derivative is continuous. By induction, it is `C^n` if it is `C^{n-1}` and its (n-1)-th derivative is `C^1` there or, equivalently, if it is `C^1` and its derivative is `C^{n-1}`. Finally, it is `C^∞` if it is `C^n` for all n. We formalize these notions by defining iteratively the `n+1`-th derivative of a function as the derivative of the `n`-th derivative. It is called `iteratedFDeriv 𝕜 n f x` where `𝕜` is the field, `n` is the number of iterations, `f` is the function and `x` is the point, and it is given as an `n`-multilinear map. We also define a version `iteratedFDerivWithin` relative to a domain, as well as predicates `ContDiffWithinAt`, `ContDiffAt`, `ContDiffOn` and `ContDiff` saying that the function is `C^n` within a set at a point, at a point, on a set and on the whole space respectively. To avoid the issue of choice when choosing a derivative in sets where the derivative is not necessarily unique, `ContDiffOn` is not defined directly in terms of the regularity of the specific choice `iteratedFDerivWithin 𝕜 n f s` inside `s`, but in terms of the existence of a nice sequence of derivatives, expressed with a predicate `HasFTaylorSeriesUpToOn`. We prove basic properties of these notions. ## Main definitions and results Let `f : E → F` be a map between normed vector spaces over a nontrivially normed field `𝕜`. * `HasFTaylorSeriesUpTo n f p`: expresses that the formal multilinear series `p` is a sequence of iterated derivatives of `f`, up to the `n`-th term (where `n` is a natural number or `∞`). * `HasFTaylorSeriesUpToOn n f p s`: same thing, but inside a set `s`. The notion of derivative is now taken inside `s`. In particular, derivatives don't have to be unique. * `ContDiff 𝕜 n f`: expresses that `f` is `C^n`, i.e., it admits a Taylor series up to rank `n`. * `ContDiffOn 𝕜 n f s`: expresses that `f` is `C^n` in `s`. * `ContDiffAt 𝕜 n f x`: expresses that `f` is `C^n` around `x`. * `ContDiffWithinAt 𝕜 n f s x`: expresses that `f` is `C^n` around `x` within the set `s`. * `iteratedFDerivWithin 𝕜 n f s x` is an `n`-th derivative of `f` over the field `𝕜` on the set `s` at the point `x`. It is a continuous multilinear map from `E^n` to `F`, defined as a derivative within `s` of `iteratedFDerivWithin 𝕜 (n-1) f s` if one exists, and `0` otherwise. * `iteratedFDeriv 𝕜 n f x` is the `n`-th derivative of `f` over the field `𝕜` at the point `x`. It is a continuous multilinear map from `E^n` to `F`, defined as a derivative of `iteratedFDeriv 𝕜 (n-1) f` if one exists, and `0` otherwise. In sets of unique differentiability, `ContDiffOn 𝕜 n f s` can be expressed in terms of the properties of `iteratedFDerivWithin 𝕜 m f s` for `m ≤ n`. In the whole space, `ContDiff 𝕜 n f` can be expressed in terms of the properties of `iteratedFDeriv 𝕜 m f` for `m ≤ n`. ## Implementation notes The definitions in this file are designed to work on any field `𝕜`. They are sometimes slightly more complicated than the naive definitions one would guess from the intuition over the real or complex numbers, but they are designed to circumvent the lack of gluing properties and partitions of unity in general. In the usual situations, they coincide with the usual definitions. ### Definition of `C^n` functions in domains One could define `C^n` functions in a domain `s` by fixing an arbitrary choice of derivatives (this is what we do with `iteratedFDerivWithin`) and requiring that all these derivatives up to `n` are continuous. If the derivative is not unique, this could lead to strange behavior like two `C^n` functions `f` and `g` on `s` whose sum is not `C^n`. A better definition is thus to say that a function is `C^n` inside `s` if it admits a sequence of derivatives up to `n` inside `s`. This definition still has the problem that a function which is locally `C^n` would not need to be `C^n`, as different choices of sequences of derivatives around different points might possibly not be glued together to give a globally defined sequence of derivatives. (Note that this issue can not happen over reals, thanks to partition of unity, but the behavior over a general field is not so clear, and we want a definition for general fields). Also, there are locality problems for the order parameter: one could image a function which, for each `n`, has a nice sequence of derivatives up to order `n`, but they do not coincide for varying `n` and can therefore not be glued to give rise to an infinite sequence of derivatives. This would give a function which is `C^n` for all `n`, but not `C^∞`. We solve this issue by putting locality conditions in space and order in our definition of `ContDiffWithinAt` and `ContDiffOn`. The resulting definition is slightly more complicated to work with (in fact not so much), but it gives rise to completely satisfactory theorems. For instance, with this definition, a real function which is `C^m` (but not better) on `(-1/m, 1/m)` for each natural `m` is by definition `C^∞` at `0`. There is another issue with the definition of `ContDiffWithinAt 𝕜 n f s x`. We can require the existence and good behavior of derivatives up to order `n` on a neighborhood of `x` within `s`. However, this does not imply continuity or differentiability within `s` of the function at `x` when `x` does not belong to `s`. Therefore, we require such existence and good behavior on a neighborhood of `x` within `s ∪ {x}` (which appears as `insert x s` in this file). ### Side of the composition, and universe issues With a naïve direct definition, the `n`-th derivative of a function belongs to the space `E →L[𝕜] (E →L[𝕜] (E ... F)...)))` where there are n iterations of `E →L[𝕜]`. This space may also be seen as the space of continuous multilinear functions on `n` copies of `E` with values in `F`, by uncurrying. This is the point of view that is usually adopted in textbooks, and that we also use. This means that the definition and the first proofs are slightly involved, as one has to keep track of the uncurrying operation. The uncurrying can be done from the left or from the right, amounting to defining the `n+1`-th derivative either as the derivative of the `n`-th derivative, or as the `n`-th derivative of the derivative. For proofs, it would be more convenient to use the latter approach (from the right), as it means to prove things at the `n+1`-th step we only need to understand well enough the derivative in `E →L[𝕜] F` (contrary to the approach from the left, where one would need to know enough on the `n`-th derivative to deduce things on the `n+1`-th derivative). However, the definition from the right leads to a universe polymorphism problem: if we define `iteratedFDeriv 𝕜 (n + 1) f x = iteratedFDeriv 𝕜 n (fderiv 𝕜 f) x` by induction, we need to generalize over all spaces (as `f` and `fderiv 𝕜 f` don't take values in the same space). It is only possible to generalize over all spaces in some fixed universe in an inductive definition. For `f : E → F`, then `fderiv 𝕜 f` is a map `E → (E →L[𝕜] F)`. Therefore, the definition will only work if `F` and `E →L[𝕜] F` are in the same universe. This issue does not appear with the definition from the left, where one does not need to generalize over all spaces. Therefore, we use the definition from the left. This means some proofs later on become a little bit more complicated: to prove that a function is `C^n`, the most efficient approach is to exhibit a formula for its `n`-th derivative and prove it is continuous (contrary to the inductive approach where one would prove smoothness statements without giving a formula for the derivative). In the end, this approach is still satisfactory as it is good to have formulas for the iterated derivatives in various constructions. One point where we depart from this explicit approach is in the proof of smoothness of a composition: there is a formula for the `n`-th derivative of a composition (Faà di Bruno's formula), but it is very complicated and barely usable, while the inductive proof is very simple. Thus, we give the inductive proof. As explained above, it works by generalizing over the target space, hence it only works well if all spaces belong to the same universe. To get the general version, we lift things to a common universe using a trick. ### Variables management The textbook definitions and proofs use various identifications and abuse of notations, for instance when saying that the natural space in which the derivative lives, i.e., `E →L[𝕜] (E →L[𝕜] ( ... →L[𝕜] F))`, is the same as a space of multilinear maps. When doing things formally, we need to provide explicit maps for these identifications, and chase some diagrams to see everything is compatible with the identifications. In particular, one needs to check that taking the derivative and then doing the identification, or first doing the identification and then taking the derivative, gives the same result. The key point for this is that taking the derivative commutes with continuous linear equivalences. Therefore, we need to implement all our identifications with continuous linear equivs. ## Notations We use the notation `E [×n]→L[𝕜] F` for the space of continuous multilinear maps on `E^n` with values in `F`. This is the space in which the `n`-th derivative of a function from `E` to `F` lives. In this file, we denote `⊤ : ℕ∞` with `∞`. ## Tags derivative, differentiability, higher derivative, `C^n`, multilinear, Taylor series, formal series -/ noncomputable section open scoped Classical open NNReal Topology Filter local notation "∞" => (⊤ : ℕ∞) /- Porting note: These lines are not required in Mathlib4. attribute [local instance 1001] NormedAddCommGroup.toAddCommGroup NormedSpace.toModule' AddCommGroup.toAddCommMonoid -/ open Set Fin Filter Function universe u uE uF uG uX variable {𝕜 : Type u} [NontriviallyNormedField 𝕜] {E : Type uE} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {F : Type uF} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {G : Type uG} [NormedAddCommGroup G] [NormedSpace 𝕜 G] {X : Type uX} [NormedAddCommGroup X] [NormedSpace 𝕜 X] {s s₁ t u : Set E} {f f₁ : E → F} {g : F → G} {x x₀ : E} {c : F} {m n : ℕ∞} {p : E → FormalMultilinearSeries 𝕜 E F} /-! ### Functions with a Taylor series on a domain -/ /-- `HasFTaylorSeriesUpToOn n f p s` registers the fact that `p 0 = f` and `p (m+1)` is a derivative of `p m` for `m < n`, and is continuous for `m ≤ n`. This is a predicate analogous to `HasFDerivWithinAt` but for higher order derivatives. Notice that `p` does not sum up to `f` on the diagonal (`FormalMultilinearSeries.sum`), even if `f` is analytic and `n = ∞`: an additional `1/m!` factor on the `m`th term is necessary for that. -/ structure HasFTaylorSeriesUpToOn (n : ℕ∞) (f : E → F) (p : E → FormalMultilinearSeries 𝕜 E F) (s : Set E) : Prop where zero_eq : ∀ x ∈ s, (p x 0).uncurry0 = f x protected fderivWithin : ∀ m : ℕ, (m : ℕ∞) < n → ∀ x ∈ s, HasFDerivWithinAt (p · m) (p x m.succ).curryLeft s x cont : ∀ m : ℕ, (m : ℕ∞) ≤ n → ContinuousOn (p · m) s #align has_ftaylor_series_up_to_on HasFTaylorSeriesUpToOn theorem HasFTaylorSeriesUpToOn.zero_eq' (h : HasFTaylorSeriesUpToOn n f p s) {x : E} (hx : x ∈ s) : p x 0 = (continuousMultilinearCurryFin0 𝕜 E F).symm (f x) := by rw [← h.zero_eq x hx] exact (p x 0).uncurry0_curry0.symm #align has_ftaylor_series_up_to_on.zero_eq' HasFTaylorSeriesUpToOn.zero_eq' /-- If two functions coincide on a set `s`, then a Taylor series for the first one is as well a Taylor series for the second one. -/ theorem HasFTaylorSeriesUpToOn.congr (h : HasFTaylorSeriesUpToOn n f p s) (h₁ : ∀ x ∈ s, f₁ x = f x) : HasFTaylorSeriesUpToOn n f₁ p s := by refine ⟨fun x hx => ?_, h.fderivWithin, h.cont⟩ rw [h₁ x hx] exact h.zero_eq x hx #align has_ftaylor_series_up_to_on.congr HasFTaylorSeriesUpToOn.congr theorem HasFTaylorSeriesUpToOn.mono (h : HasFTaylorSeriesUpToOn n f p s) {t : Set E} (hst : t ⊆ s) : HasFTaylorSeriesUpToOn n f p t := ⟨fun x hx => h.zero_eq x (hst hx), fun m hm x hx => (h.fderivWithin m hm x (hst hx)).mono hst, fun m hm => (h.cont m hm).mono hst⟩ #align has_ftaylor_series_up_to_on.mono HasFTaylorSeriesUpToOn.mono theorem HasFTaylorSeriesUpToOn.of_le (h : HasFTaylorSeriesUpToOn n f p s) (hmn : m ≤ n) : HasFTaylorSeriesUpToOn m f p s := ⟨h.zero_eq, fun k hk x hx => h.fderivWithin k (lt_of_lt_of_le hk hmn) x hx, fun k hk => h.cont k (le_trans hk hmn)⟩ #align has_ftaylor_series_up_to_on.of_le HasFTaylorSeriesUpToOn.of_le theorem HasFTaylorSeriesUpToOn.continuousOn (h : HasFTaylorSeriesUpToOn n f p s) : ContinuousOn f s := by have := (h.cont 0 bot_le).congr fun x hx => (h.zero_eq' hx).symm rwa [← (continuousMultilinearCurryFin0 𝕜 E F).symm.comp_continuousOn_iff] #align has_ftaylor_series_up_to_on.continuous_on HasFTaylorSeriesUpToOn.continuousOn theorem hasFTaylorSeriesUpToOn_zero_iff : HasFTaylorSeriesUpToOn 0 f p s ↔ ContinuousOn f s ∧ ∀ x ∈ s, (p x 0).uncurry0 = f x := by refine ⟨fun H => ⟨H.continuousOn, H.zero_eq⟩, fun H => ⟨H.2, fun m hm => False.elim (not_le.2 hm bot_le), fun m hm ↦ ?_⟩⟩ obtain rfl : m = 0 := mod_cast hm.antisymm (zero_le _) have : EqOn (p · 0) ((continuousMultilinearCurryFin0 𝕜 E F).symm ∘ f) s := fun x hx ↦ (continuousMultilinearCurryFin0 𝕜 E F).eq_symm_apply.2 (H.2 x hx) rw [continuousOn_congr this, LinearIsometryEquiv.comp_continuousOn_iff] exact H.1 #align has_ftaylor_series_up_to_on_zero_iff hasFTaylorSeriesUpToOn_zero_iff theorem hasFTaylorSeriesUpToOn_top_iff : HasFTaylorSeriesUpToOn ∞ f p s ↔ ∀ n : ℕ, HasFTaylorSeriesUpToOn n f p s := by constructor · intro H n; exact H.of_le le_top · intro H constructor · exact (H 0).zero_eq · intro m _ apply (H m.succ).fderivWithin m (WithTop.coe_lt_coe.2 (lt_add_one m)) · intro m _ apply (H m).cont m le_rfl #align has_ftaylor_series_up_to_on_top_iff hasFTaylorSeriesUpToOn_top_iff /-- In the case that `n = ∞` we don't need the continuity assumption in `HasFTaylorSeriesUpToOn`. -/ theorem hasFTaylorSeriesUpToOn_top_iff' : HasFTaylorSeriesUpToOn ∞ f p s ↔ (∀ x ∈ s, (p x 0).uncurry0 = f x) ∧ ∀ m : ℕ, ∀ x ∈ s, HasFDerivWithinAt (fun y => p y m) (p x m.succ).curryLeft s x := -- Everything except for the continuity is trivial: ⟨fun h => ⟨h.1, fun m => h.2 m (WithTop.coe_lt_top m)⟩, fun h => ⟨h.1, fun m _ => h.2 m, fun m _ x hx => -- The continuity follows from the existence of a derivative: (h.2 m x hx).continuousWithinAt⟩⟩ #align has_ftaylor_series_up_to_on_top_iff' hasFTaylorSeriesUpToOn_top_iff' /-- If a function has a Taylor series at order at least `1`, then the term of order `1` of this series is a derivative of `f`. -/ theorem HasFTaylorSeriesUpToOn.hasFDerivWithinAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : x ∈ s) : HasFDerivWithinAt f (continuousMultilinearCurryFin1 𝕜 E F (p x 1)) s x := by have A : ∀ y ∈ s, f y = (continuousMultilinearCurryFin0 𝕜 E F) (p y 0) := fun y hy ↦ (h.zero_eq y hy).symm suffices H : HasFDerivWithinAt (continuousMultilinearCurryFin0 𝕜 E F ∘ (p · 0)) (continuousMultilinearCurryFin1 𝕜 E F (p x 1)) s x from H.congr A (A x hx) rw [LinearIsometryEquiv.comp_hasFDerivWithinAt_iff'] have : ((0 : ℕ) : ℕ∞) < n := zero_lt_one.trans_le hn convert h.fderivWithin _ this x hx ext y v change (p x 1) (snoc 0 y) = (p x 1) (cons y v) congr with i rw [Unique.eq_default (α := Fin 1) i] rfl #align has_ftaylor_series_up_to_on.has_fderiv_within_at HasFTaylorSeriesUpToOn.hasFDerivWithinAt theorem HasFTaylorSeriesUpToOn.differentiableOn (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) : DifferentiableOn 𝕜 f s := fun _x hx => (h.hasFDerivWithinAt hn hx).differentiableWithinAt #align has_ftaylor_series_up_to_on.differentiable_on HasFTaylorSeriesUpToOn.differentiableOn /-- If a function has a Taylor series at order at least `1` on a neighborhood of `x`, then the term of order `1` of this series is a derivative of `f` at `x`. -/ theorem HasFTaylorSeriesUpToOn.hasFDerivAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : s ∈ 𝓝 x) : HasFDerivAt f (continuousMultilinearCurryFin1 𝕜 E F (p x 1)) x := (h.hasFDerivWithinAt hn (mem_of_mem_nhds hx)).hasFDerivAt hx #align has_ftaylor_series_up_to_on.has_fderiv_at HasFTaylorSeriesUpToOn.hasFDerivAt /-- If a function has a Taylor series at order at least `1` on a neighborhood of `x`, then in a neighborhood of `x`, the term of order `1` of this series is a derivative of `f`. -/ theorem HasFTaylorSeriesUpToOn.eventually_hasFDerivAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : s ∈ 𝓝 x) : ∀ᶠ y in 𝓝 x, HasFDerivAt f (continuousMultilinearCurryFin1 𝕜 E F (p y 1)) y := (eventually_eventually_nhds.2 hx).mono fun _y hy => h.hasFDerivAt hn hy #align has_ftaylor_series_up_to_on.eventually_has_fderiv_at HasFTaylorSeriesUpToOn.eventually_hasFDerivAt /-- If a function has a Taylor series at order at least `1` on a neighborhood of `x`, then it is differentiable at `x`. -/ theorem HasFTaylorSeriesUpToOn.differentiableAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : s ∈ 𝓝 x) : DifferentiableAt 𝕜 f x := (h.hasFDerivAt hn hx).differentiableAt #align has_ftaylor_series_up_to_on.differentiable_at HasFTaylorSeriesUpToOn.differentiableAt /-- `p` is a Taylor series of `f` up to `n+1` if and only if `p` is a Taylor series up to `n`, and `p (n + 1)` is a derivative of `p n`. -/ theorem hasFTaylorSeriesUpToOn_succ_iff_left {n : ℕ} : HasFTaylorSeriesUpToOn (n + 1) f p s ↔ HasFTaylorSeriesUpToOn n f p s ∧ (∀ x ∈ s, HasFDerivWithinAt (fun y => p y n) (p x n.succ).curryLeft s x) ∧ ContinuousOn (fun x => p x (n + 1)) s := by constructor · exact fun h ↦ ⟨h.of_le (WithTop.coe_le_coe.2 (Nat.le_succ n)), h.fderivWithin _ (WithTop.coe_lt_coe.2 (lt_add_one n)), h.cont (n + 1) le_rfl⟩ · intro h constructor · exact h.1.zero_eq · intro m hm by_cases h' : m < n · exact h.1.fderivWithin m (WithTop.coe_lt_coe.2 h') · have : m = n := Nat.eq_of_lt_succ_of_not_lt (WithTop.coe_lt_coe.1 hm) h' rw [this] exact h.2.1 · intro m hm by_cases h' : m ≤ n · apply h.1.cont m (WithTop.coe_le_coe.2 h') · have : m = n + 1 := le_antisymm (WithTop.coe_le_coe.1 hm) (not_le.1 h') rw [this] exact h.2.2 #align has_ftaylor_series_up_to_on_succ_iff_left hasFTaylorSeriesUpToOn_succ_iff_left #adaptation_note /-- After https://github.com/leanprover/lean4/pull/4119, without `set_option maxSynthPendingDepth 2` this proof needs substantial repair. -/ set_option maxSynthPendingDepth 2 in -- Porting note: this was split out from `hasFTaylorSeriesUpToOn_succ_iff_right` to avoid a timeout. theorem HasFTaylorSeriesUpToOn.shift_of_succ {n : ℕ} (H : HasFTaylorSeriesUpToOn (n + 1 : ℕ) f p s) : (HasFTaylorSeriesUpToOn n (fun x => continuousMultilinearCurryFin1 𝕜 E F (p x 1)) (fun x => (p x).shift)) s := by constructor · intro x _ rfl · intro m (hm : (m : ℕ∞) < n) x (hx : x ∈ s) have A : (m.succ : ℕ∞) < n.succ := by rw [Nat.cast_lt] at hm ⊢ exact Nat.succ_lt_succ hm change HasFDerivWithinAt ((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm ∘ (p · m.succ)) (p x m.succ.succ).curryRight.curryLeft s x rw [((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm).comp_hasFDerivWithinAt_iff'] convert H.fderivWithin _ A x hx ext y v change p x (m + 2) (snoc (cons y (init v)) (v (last _))) = p x (m + 2) (cons y v) rw [← cons_snoc_eq_snoc_cons, snoc_init_self] · intro m (hm : (m : ℕ∞) ≤ n) suffices A : ContinuousOn (p · (m + 1)) s from ((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm).continuous.comp_continuousOn A refine H.cont _ ?_ rw [Nat.cast_le] at hm ⊢ exact Nat.succ_le_succ hm /-- `p` is a Taylor series of `f` up to `n+1` if and only if `p.shift` is a Taylor series up to `n` for `p 1`, which is a derivative of `f`. -/ theorem hasFTaylorSeriesUpToOn_succ_iff_right {n : ℕ} : HasFTaylorSeriesUpToOn (n + 1 : ℕ) f p s ↔ (∀ x ∈ s, (p x 0).uncurry0 = f x) ∧ (∀ x ∈ s, HasFDerivWithinAt (fun y => p y 0) (p x 1).curryLeft s x) ∧ HasFTaylorSeriesUpToOn n (fun x => continuousMultilinearCurryFin1 𝕜 E F (p x 1)) (fun x => (p x).shift) s := by constructor · intro H refine ⟨H.zero_eq, H.fderivWithin 0 (Nat.cast_lt.2 (Nat.succ_pos n)), ?_⟩ exact H.shift_of_succ · rintro ⟨Hzero_eq, Hfderiv_zero, Htaylor⟩ constructor · exact Hzero_eq · intro m (hm : (m : ℕ∞) < n.succ) x (hx : x ∈ s) cases' m with m · exact Hfderiv_zero x hx · have A : (m : ℕ∞) < n := by rw [Nat.cast_lt] at hm ⊢ exact Nat.lt_of_succ_lt_succ hm have : HasFDerivWithinAt ((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm ∘ (p · m.succ)) ((p x).shift m.succ).curryLeft s x := Htaylor.fderivWithin _ A x hx rw [LinearIsometryEquiv.comp_hasFDerivWithinAt_iff'] at this convert this ext y v change (p x (Nat.succ (Nat.succ m))) (cons y v) = (p x m.succ.succ) (snoc (cons y (init v)) (v (last _))) rw [← cons_snoc_eq_snoc_cons, snoc_init_self] · intro m (hm : (m : ℕ∞) ≤ n.succ) cases' m with m · have : DifferentiableOn 𝕜 (fun x => p x 0) s := fun x hx => (Hfderiv_zero x hx).differentiableWithinAt exact this.continuousOn · refine (continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm.comp_continuousOn_iff.mp ?_ refine Htaylor.cont _ ?_ rw [Nat.cast_le] at hm ⊢ exact Nat.lt_succ_iff.mp hm #align has_ftaylor_series_up_to_on_succ_iff_right hasFTaylorSeriesUpToOn_succ_iff_right /-! ### Smooth functions within a set around a point -/ variable (𝕜) /-- A function is continuously differentiable up to order `n` within a set `s` at a point `x` if it admits continuous derivatives up to order `n` in a neighborhood of `x` in `s ∪ {x}`. For `n = ∞`, we only require that this holds up to any finite order (where the neighborhood may depend on the finite order we consider). For instance, a real function which is `C^m` on `(-1/m, 1/m)` for each natural `m`, but not better, is `C^∞` at `0` within `univ`. -/ def ContDiffWithinAt (n : ℕ∞) (f : E → F) (s : Set E) (x : E) : Prop := ∀ m : ℕ, (m : ℕ∞) ≤ n → ∃ u ∈ 𝓝[insert x s] x, ∃ p : E → FormalMultilinearSeries 𝕜 E F, HasFTaylorSeriesUpToOn m f p u #align cont_diff_within_at ContDiffWithinAt variable {𝕜} theorem contDiffWithinAt_nat {n : ℕ} : ContDiffWithinAt 𝕜 n f s x ↔ ∃ u ∈ 𝓝[insert x s] x, ∃ p : E → FormalMultilinearSeries 𝕜 E F, HasFTaylorSeriesUpToOn n f p u := ⟨fun H => H n le_rfl, fun ⟨u, hu, p, hp⟩ _m hm => ⟨u, hu, p, hp.of_le hm⟩⟩ #align cont_diff_within_at_nat contDiffWithinAt_nat theorem ContDiffWithinAt.of_le (h : ContDiffWithinAt 𝕜 n f s x) (hmn : m ≤ n) : ContDiffWithinAt 𝕜 m f s x := fun k hk => h k (le_trans hk hmn) #align cont_diff_within_at.of_le ContDiffWithinAt.of_le theorem contDiffWithinAt_iff_forall_nat_le : ContDiffWithinAt 𝕜 n f s x ↔ ∀ m : ℕ, ↑m ≤ n → ContDiffWithinAt 𝕜 m f s x := ⟨fun H _m hm => H.of_le hm, fun H m hm => H m hm _ le_rfl⟩ #align cont_diff_within_at_iff_forall_nat_le contDiffWithinAt_iff_forall_nat_le theorem contDiffWithinAt_top : ContDiffWithinAt 𝕜 ∞ f s x ↔ ∀ n : ℕ, ContDiffWithinAt 𝕜 n f s x := contDiffWithinAt_iff_forall_nat_le.trans <\| by simp only [forall_prop_of_true, le_top] #align cont_diff_within_at_top contDiffWithinAt_top theorem ContDiffWithinAt.continuousWithinAt (h : ContDiffWithinAt 𝕜 n f s x) : ContinuousWithinAt f s x := by rcases h 0 bot_le with ⟨u, hu, p, H⟩ rw [mem_nhdsWithin_insert] at hu exact (H.continuousOn.continuousWithinAt hu.1).mono_of_mem hu.2 #align cont_diff_within_at.continuous_within_at ContDiffWithinAt.continuousWithinAt theorem ContDiffWithinAt.congr_of_eventuallyEq (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : f₁ =ᶠ[𝓝[s] x] f) (hx : f₁ x = f x) : ContDiffWithinAt 𝕜 n f₁ s x := fun m hm => let ⟨u, hu, p, H⟩ := h m hm ⟨{ x ∈ u \| f₁ x = f x }, Filter.inter_mem hu (mem_nhdsWithin_insert.2 ⟨hx, h₁⟩), p, (H.mono (sep_subset _ _)).congr fun _ => And.right⟩ #align cont_diff_within_at.congr_of_eventually_eq ContDiffWithinAt.congr_of_eventuallyEq theorem ContDiffWithinAt.congr_of_eventuallyEq_insert (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : f₁ =ᶠ[𝓝[insert x s] x] f) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr_of_eventuallyEq (nhdsWithin_mono x (subset_insert x s) h₁) (mem_of_mem_nhdsWithin (mem_insert x s) h₁ : _) #align cont_diff_within_at.congr_of_eventually_eq_insert ContDiffWithinAt.congr_of_eventuallyEq_insert theorem ContDiffWithinAt.congr_of_eventually_eq' (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : f₁ =ᶠ[𝓝[s] x] f) (hx : x ∈ s) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr_of_eventuallyEq h₁ <\| h₁.self_of_nhdsWithin hx #align cont_diff_within_at.congr_of_eventually_eq' ContDiffWithinAt.congr_of_eventually_eq' theorem Filter.EventuallyEq.contDiffWithinAt_iff (h₁ : f₁ =ᶠ[𝓝[s] x] f) (hx : f₁ x = f x) : ContDiffWithinAt 𝕜 n f₁ s x ↔ ContDiffWithinAt 𝕜 n f s x := ⟨fun H => ContDiffWithinAt.congr_of_eventuallyEq H h₁.symm hx.symm, fun H => H.congr_of_eventuallyEq h₁ hx⟩ #align filter.eventually_eq.cont_diff_within_at_iff Filter.EventuallyEq.contDiffWithinAt_iff theorem ContDiffWithinAt.congr (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : ∀ y ∈ s, f₁ y = f y) (hx : f₁ x = f x) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr_of_eventuallyEq (Filter.eventuallyEq_of_mem self_mem_nhdsWithin h₁) hx #align cont_diff_within_at.congr ContDiffWithinAt.congr theorem ContDiffWithinAt.congr' (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : ∀ y ∈ s, f₁ y = f y) (hx : x ∈ s) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr h₁ (h₁ _ hx) #align cont_diff_within_at.congr' ContDiffWithinAt.congr' theorem ContDiffWithinAt.mono_of_mem (h : ContDiffWithinAt 𝕜 n f s x) {t : Set E} (hst : s ∈ 𝓝[t] x) : ContDiffWithinAt 𝕜 n f t x := by intro m hm rcases h m hm with ⟨u, hu, p, H⟩ exact ⟨u, nhdsWithin_le_of_mem (insert_mem_nhdsWithin_insert hst) hu, p, H⟩ #align cont_diff_within_at.mono_of_mem ContDiffWithinAt.mono_of_mem theorem ContDiffWithinAt.mono (h : ContDiffWithinAt 𝕜 n f s x) {t : Set E} (hst : t ⊆ s) : ContDiffWithinAt 𝕜 n f t x := h.mono_of_mem <\| Filter.mem_of_superset self_mem_nhdsWithin hst #align cont_diff_within_at.mono ContDiffWithinAt.mono theorem ContDiffWithinAt.congr_nhds (h : ContDiffWithinAt 𝕜 n f s x) {t : Set E} (hst : 𝓝[s] x = 𝓝[t] x) : ContDiffWithinAt 𝕜 n f t x := h.mono_of_mem <\| hst ▸ self_mem_nhdsWithin #align cont_diff_within_at.congr_nhds ContDiffWithinAt.congr_nhds theorem contDiffWithinAt_congr_nhds {t : Set E} (hst : 𝓝[s] x = 𝓝[t] x) : ContDiffWithinAt 𝕜 n f s x ↔ ContDiffWithinAt 𝕜 n f t x := ⟨fun h => h.congr_nhds hst, fun h => h.congr_nhds hst.symm⟩ #align cont_diff_within_at_congr_nhds contDiffWithinAt_congr_nhds theorem contDiffWithinAt_inter' (h : t ∈ 𝓝[s] x) : ContDiffWithinAt 𝕜 n f (s ∩ t) x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAt_congr_nhds <\| Eq.symm <\| nhdsWithin_restrict'' _ h #align cont_diff_within_at_inter' contDiffWithinAt_inter' theorem contDiffWithinAt_inter (h : t ∈ 𝓝 x) : ContDiffWithinAt 𝕜 n f (s ∩ t) x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAt_inter' (mem_nhdsWithin_of_mem_nhds h) #align cont_diff_within_at_inter contDiffWithinAt_inter theorem contDiffWithinAt_insert_self : ContDiffWithinAt 𝕜 n f (insert x s) x ↔ ContDiffWithinAt 𝕜 n f s x := by simp_rw [ContDiffWithinAt, insert_idem] theorem contDiffWithinAt_insert {y : E} : ContDiffWithinAt 𝕜 n f (insert y s) x ↔ ContDiffWithinAt 𝕜 n f s x := by rcases eq_or_ne x y with (rfl \| h) · exact contDiffWithinAt_insert_self simp_rw [ContDiffWithinAt, insert_comm x y, nhdsWithin_insert_of_ne h] #align cont_diff_within_at_insert contDiffWithinAt_insert alias ⟨ContDiffWithinAt.of_insert, ContDiffWithinAt.insert'⟩ := contDiffWithinAt_insert #align cont_diff_within_at.of_insert ContDiffWithinAt.of_insert #align cont_diff_within_at.insert' ContDiffWithinAt.insert' protected theorem ContDiffWithinAt.insert (h : ContDiffWithinAt 𝕜 n f s x) : ContDiffWithinAt 𝕜 n f (insert x s) x := h.insert' #align cont_diff_within_at.insert ContDiffWithinAt.insert /-- If a function is `C^n` within a set at a point, with `n ≥ 1`, then it is differentiable within this set at this point. -/ theorem ContDiffWithinAt.differentiable_within_at' (h : ContDiffWithinAt 𝕜 n f s x) (hn : 1 ≤ n) : DifferentiableWithinAt 𝕜 f (insert x s) x := by rcases h 1 hn with ⟨u, hu, p, H⟩ rcases mem_nhdsWithin.1 hu with ⟨t, t_open, xt, tu⟩ rw [inter_comm] at tu have := ((H.mono tu).differentiableOn le_rfl) x ⟨mem_insert x s, xt⟩ exact (differentiableWithinAt_inter (IsOpen.mem_nhds t_open xt)).1 this #align cont_diff_within_at.differentiable_within_at' ContDiffWithinAt.differentiable_within_at' theorem ContDiffWithinAt.differentiableWithinAt (h : ContDiffWithinAt 𝕜 n f s x) (hn : 1 ≤ n) : DifferentiableWithinAt 𝕜 f s x := (h.differentiable_within_at' hn).mono (subset_insert x s) #align cont_diff_within_at.differentiable_within_at ContDiffWithinAt.differentiableWithinAt /-- A function is `C^(n + 1)` on a domain iff locally, it has a derivative which is `C^n`. -/ theorem contDiffWithinAt_succ_iff_hasFDerivWithinAt {n : ℕ} : ContDiffWithinAt 𝕜 (n + 1 : ℕ) f s x ↔ ∃ u ∈ 𝓝[insert x s] x, ∃ f' : E → E →L[𝕜] F, (∀ x ∈ u, HasFDerivWithinAt f (f' x) u x) ∧ ContDiffWithinAt 𝕜 n f' u x := by constructor · intro h rcases h n.succ le_rfl with ⟨u, hu, p, Hp⟩ refine ⟨u, hu, fun y => (continuousMultilinearCurryFin1 𝕜 E F) (p y 1), fun y hy => Hp.hasFDerivWithinAt (WithTop.coe_le_coe.2 (Nat.le_add_left 1 n)) hy, ?_⟩ intro m hm refine ⟨u, ?_, fun y : E => (p y).shift, ?_⟩ · -- Porting note: without the explicit argument Lean is not sure of the type. convert @self_mem_nhdsWithin _ _ x u have : x ∈ insert x s := by simp exact insert_eq_of_mem (mem_of_mem_nhdsWithin this hu) · rw [hasFTaylorSeriesUpToOn_succ_iff_right] at Hp exact Hp.2.2.of_le hm · rintro ⟨u, hu, f', f'_eq_deriv, Hf'⟩ rw [contDiffWithinAt_nat] rcases Hf' n le_rfl with ⟨v, hv, p', Hp'⟩ refine ⟨v ∩ u, ?_, fun x => (p' x).unshift (f x), ?_⟩ · apply Filter.inter_mem _ hu apply nhdsWithin_le_of_mem hu exact nhdsWithin_mono _ (subset_insert x u) hv · rw [hasFTaylorSeriesUpToOn_succ_iff_right] refine ⟨fun y _ => rfl, fun y hy => ?_, ?_⟩ · change HasFDerivWithinAt (fun z => (continuousMultilinearCurryFin0 𝕜 E F).symm (f z)) (FormalMultilinearSeries.unshift (p' y) (f y) 1).curryLeft (v ∩ u) y -- Porting note: needed `erw` here. -- https://github.com/leanprover-community/mathlib4/issues/5164 erw [LinearIsometryEquiv.comp_hasFDerivWithinAt_iff'] convert (f'_eq_deriv y hy.2).mono inter_subset_right rw [← Hp'.zero_eq y hy.1] ext z change ((p' y 0) (init (@cons 0 (fun _ => E) z 0))) (@cons 0 (fun _ => E) z 0 (last 0)) = ((p' y 0) 0) z congr norm_num [eq_iff_true_of_subsingleton] · convert (Hp'.mono inter_subset_left).congr fun x hx => Hp'.zero_eq x hx.1 using 1 · ext x y change p' x 0 (init (@snoc 0 (fun _ : Fin 1 => E) 0 y)) y = p' x 0 0 y rw [init_snoc] · ext x k v y change p' x k (init (@snoc k (fun _ : Fin k.succ => E) v y)) (@snoc k (fun _ : Fin k.succ => E) v y (last k)) = p' x k v y rw [snoc_last, init_snoc] #align cont_diff_within_at_succ_iff_has_fderiv_within_at contDiffWithinAt_succ_iff_hasFDerivWithinAt /-- A version of `contDiffWithinAt_succ_iff_hasFDerivWithinAt` where all derivatives are taken within the same set. -/ theorem contDiffWithinAt_succ_iff_hasFDerivWithinAt' {n : ℕ} : ContDiffWithinAt 𝕜 (n + 1 : ℕ) f s x ↔ ∃ u ∈ 𝓝[insert x s] x, u ⊆ insert x s ∧ ∃ f' : E → E →L[𝕜] F, (∀ x ∈ u, HasFDerivWithinAt f (f' x) s x) ∧ ContDiffWithinAt 𝕜 n f' s x := by refine ⟨fun hf => ?_, ?_⟩ · obtain ⟨u, hu, f', huf', hf'⟩ := contDiffWithinAt_succ_iff_hasFDerivWithinAt.mp hf obtain ⟨w, hw, hxw, hwu⟩ := mem_nhdsWithin.mp hu rw [inter_comm] at hwu refine ⟨insert x s ∩ w, inter_mem_nhdsWithin _ (hw.mem_nhds hxw), inter_subset_left, f', fun y hy => ?_, ?_⟩ · refine ((huf' y <\| hwu hy).mono hwu).mono_of_mem ?_ refine mem_of_superset ?_ (inter_subset_inter_left _ (subset_insert _ _)) exact inter_mem_nhdsWithin _ (hw.mem_nhds hy.2) · exact hf'.mono_of_mem (nhdsWithin_mono _ (subset_insert _ _) hu) · rw [← contDiffWithinAt_insert, contDiffWithinAt_succ_iff_hasFDerivWithinAt, insert_eq_of_mem (mem_insert _ _)] rintro ⟨u, hu, hus, f', huf', hf'⟩ exact ⟨u, hu, f', fun y hy => (huf' y hy).insert'.mono hus, hf'.insert.mono hus⟩ #align cont_diff_within_at_succ_iff_has_fderiv_within_at' contDiffWithinAt_succ_iff_hasFDerivWithinAt' /-! ### Smooth functions within a set -/ variable (𝕜) /-- A function is continuously differentiable up to `n` on `s` if, for any point `x` in `s`, it admits continuous derivatives up to order `n` on a neighborhood of `x` in `s`. For `n = ∞`, we only require that this holds up to any finite order (where the neighborhood may depend on the finite order we consider). -/ def ContDiffOn (n : ℕ∞) (f : E → F) (s : Set E) : Prop := ∀ x ∈ s, ContDiffWithinAt 𝕜 n f s x #align cont_diff_on ContDiffOn variable {𝕜} theorem HasFTaylorSeriesUpToOn.contDiffOn {f' : E → FormalMultilinearSeries 𝕜 E F} (hf : HasFTaylorSeriesUpToOn n f f' s) : ContDiffOn 𝕜 n f s := by intro x hx m hm use s simp only [Set.insert_eq_of_mem hx, self_mem_nhdsWithin, true_and_iff] exact ⟨f', hf.of_le hm⟩ #align has_ftaylor_series_up_to_on.cont_diff_on HasFTaylorSeriesUpToOn.contDiffOn theorem ContDiffOn.contDiffWithinAt (h : ContDiffOn 𝕜 n f s) (hx : x ∈ s) : ContDiffWithinAt 𝕜 n f s x := h x hx #align cont_diff_on.cont_diff_within_at ContDiffOn.contDiffWithinAt theorem ContDiffWithinAt.contDiffOn' {m : ℕ} (hm : (m : ℕ∞) ≤ n) (h : ContDiffWithinAt 𝕜 n f s x) : ∃ u, IsOpen u ∧ x ∈ u ∧ ContDiffOn 𝕜 m f (insert x s ∩ u) := by rcases h m hm with ⟨t, ht, p, hp⟩ rcases mem_nhdsWithin.1 ht with ⟨u, huo, hxu, hut⟩ rw [inter_comm] at hut exact ⟨u, huo, hxu, (hp.mono hut).contDiffOn⟩ #align cont_diff_within_at.cont_diff_on' ContDiffWithinAt.contDiffOn' theorem ContDiffWithinAt.contDiffOn {m : ℕ} (hm : (m : ℕ∞) ≤ n) (h : ContDiffWithinAt 𝕜 n f s x) : ∃ u ∈ 𝓝[insert x s] x, u ⊆ insert x s ∧ ContDiffOn 𝕜 m f u := let ⟨_u, uo, xu, h⟩ := h.contDiffOn' hm ⟨_, inter_mem_nhdsWithin _ (uo.mem_nhds xu), inter_subset_left, h⟩ #align cont_diff_within_at.cont_diff_on ContDiffWithinAt.contDiffOn protected theorem ContDiffWithinAt.eventually {n : ℕ} (h : ContDiffWithinAt 𝕜 n f s x) : ∀ᶠ y in 𝓝[insert x s] x, ContDiffWithinAt 𝕜 n f s y := by rcases h.contDiffOn le_rfl with ⟨u, hu, _, hd⟩ have : ∀ᶠ y : E in 𝓝[insert x s] x, u ∈ 𝓝[insert x s] y ∧ y ∈ u := (eventually_nhdsWithin_nhdsWithin.2 hu).and hu refine this.mono fun y hy => (hd y hy.2).mono_of_mem ?_ exact nhdsWithin_mono y (subset_insert _ _) hy.1 #align cont_diff_within_at.eventually ContDiffWithinAt.eventually theorem ContDiffOn.of_le (h : ContDiffOn 𝕜 n f s) (hmn : m ≤ n) : ContDiffOn 𝕜 m f s := fun x hx => (h x hx).of_le hmn #align cont_diff_on.of_le ContDiffOn.of_le theorem ContDiffOn.of_succ {n : ℕ} (h : ContDiffOn 𝕜 (n + 1) f s) : ContDiffOn 𝕜 n f s := h.of_le <\| WithTop.coe_le_coe.mpr le_self_add #align cont_diff_on.of_succ ContDiffOn.of_succ theorem ContDiffOn.one_of_succ {n : ℕ} (h : ContDiffOn 𝕜 (n + 1) f s) : ContDiffOn 𝕜 1 f s := h.of_le <\| WithTop.coe_le_coe.mpr le_add_self #align cont_diff_on.one_of_succ ContDiffOn.one_of_succ theorem contDiffOn_iff_forall_nat_le : ContDiffOn 𝕜 n f s ↔ ∀ m : ℕ, ↑m ≤ n → ContDiffOn 𝕜 m f s := ⟨fun H _ hm => H.of_le hm, fun H x hx m hm => H m hm x hx m le_rfl⟩ #align cont_diff_on_iff_forall_nat_le contDiffOn_iff_forall_nat_le theorem contDiffOn_top : ContDiffOn 𝕜 ∞ f s ↔ ∀ n : ℕ, ContDiffOn 𝕜 n f s := contDiffOn_iff_forall_nat_le.trans <\| by simp only [le_top, forall_prop_of_true] #align cont_diff_on_top contDiffOn_top theorem contDiffOn_all_iff_nat : (∀ n, ContDiffOn 𝕜 n f s) ↔ ∀ n : ℕ, ContDiffOn 𝕜 n f s := by refine ⟨fun H n => H n, ?_⟩ rintro H (_ \| n) exacts [contDiffOn_top.2 H, H n] #align cont_diff_on_all_iff_nat contDiffOn_all_iff_nat theorem ContDiffOn.continuousOn (h : ContDiffOn 𝕜 n f s) : ContinuousOn f s := fun x hx => (h x hx).continuousWithinAt #align cont_diff_on.continuous_on ContDiffOn.continuousOn theorem ContDiffOn.congr (h : ContDiffOn 𝕜 n f s) (h₁ : ∀ x ∈ s, f₁ x = f x) : ContDiffOn 𝕜 n f₁ s := fun x hx => (h x hx).congr h₁ (h₁ x hx) #align cont_diff_on.congr ContDiffOn.congr theorem contDiffOn_congr (h₁ : ∀ x ∈ s, f₁ x = f x) : ContDiffOn 𝕜 n f₁ s ↔ ContDiffOn 𝕜 n f s := ⟨fun H => H.congr fun x hx => (h₁ x hx).symm, fun H => H.congr h₁⟩ #align cont_diff_on_congr contDiffOn_congr theorem ContDiffOn.mono (h : ContDiffOn 𝕜 n f s) {t : Set E} (hst : t ⊆ s) : ContDiffOn 𝕜 n f t := fun x hx => (h x (hst hx)).mono hst #align cont_diff_on.mono ContDiffOn.mono theorem ContDiffOn.congr_mono (hf : ContDiffOn 𝕜 n f s) (h₁ : ∀ x ∈ s₁, f₁ x = f x) (hs : s₁ ⊆ s) : ContDiffOn 𝕜 n f₁ s₁ := (hf.mono hs).congr h₁ #align cont_diff_on.congr_mono ContDiffOn.congr_mono /-- If a function is `C^n` on a set with `n ≥ 1`, then it is differentiable there. -/ theorem ContDiffOn.differentiableOn (h : ContDiffOn 𝕜 n f s) (hn : 1 ≤ n) : DifferentiableOn 𝕜 f s := fun x hx => (h x hx).differentiableWithinAt hn #align cont_diff_on.differentiable_on ContDiffOn.differentiableOn /-- If a function is `C^n` around each point in a set, then it is `C^n` on the set. -/ theorem contDiffOn_of_locally_contDiffOn (h : ∀ x ∈ s, ∃ u, IsOpen u ∧ x ∈ u ∧ ContDiffOn 𝕜 n f (s ∩ u)) : ContDiffOn 𝕜 n f s := by intro x xs rcases h x xs with ⟨u, u_open, xu, hu⟩ apply (contDiffWithinAt_inter _).1 (hu x ⟨xs, xu⟩) exact IsOpen.mem_nhds u_open xu #align cont_diff_on_of_locally_cont_diff_on contDiffOn_of_locally_contDiffOn /-- A function is `C^(n + 1)` on a domain iff locally, it has a derivative which is `C^n`. -/ theorem contDiffOn_succ_iff_hasFDerivWithinAt {n : ℕ} : ContDiffOn 𝕜 (n + 1 : ℕ) f s ↔ ∀ x ∈ s, ∃ u ∈ 𝓝[insert x s] x, ∃ f' : E → E →L[𝕜] F, (∀ x ∈ u, HasFDerivWithinAt f (f' x) u x) ∧ ContDiffOn 𝕜 n f' u := by constructor · intro h x hx rcases (h x hx) n.succ le_rfl with ⟨u, hu, p, Hp⟩ refine ⟨u, hu, fun y => (continuousMultilinearCurryFin1 𝕜 E F) (p y 1), fun y hy => Hp.hasFDerivWithinAt (WithTop.coe_le_coe.2 (Nat.le_add_left 1 n)) hy, ?_⟩ rw [hasFTaylorSeriesUpToOn_succ_iff_right] at Hp intro z hz m hm refine ⟨u, ?_, fun x : E => (p x).shift, Hp.2.2.of_le hm⟩ -- Porting note: without the explicit arguments `convert` can not determine the type. convert @self_mem_nhdsWithin _ _ z u exact insert_eq_of_mem hz · intro h x hx rw [contDiffWithinAt_succ_iff_hasFDerivWithinAt] rcases h x hx with ⟨u, u_nhbd, f', hu, hf'⟩ have : x ∈ u := mem_of_mem_nhdsWithin (mem_insert _ _) u_nhbd exact ⟨u, u_nhbd, f', hu, hf' x this⟩ #align cont_diff_on_succ_iff_has_fderiv_within_at contDiffOn_succ_iff_hasFDerivWithinAt /-! ### Iterated derivative within a set -/ variable (𝕜) /-- The `n`-th derivative of a function along a set, defined inductively by saying that the `n+1`-th derivative of `f` is the derivative of the `n`-th derivative of `f` along this set, together with an uncurrying step to see it as a multilinear map in `n+1` variables.. -/ noncomputable def iteratedFDerivWithin (n : ℕ) (f : E → F) (s : Set E) : E → E[×n]→L[𝕜] F := Nat.recOn n (fun x => ContinuousMultilinearMap.curry0 𝕜 E (f x)) fun _ rec x => ContinuousLinearMap.uncurryLeft (fderivWithin 𝕜 rec s x) #align iterated_fderiv_within iteratedFDerivWithin /-- Formal Taylor series associated to a function within a set. -/ def ftaylorSeriesWithin (f : E → F) (s : Set E) (x : E) : FormalMultilinearSeries 𝕜 E F := fun n => iteratedFDerivWithin 𝕜 n f s x #align ftaylor_series_within ftaylorSeriesWithin variable {𝕜} @[simp] theorem iteratedFDerivWithin_zero_apply (m : Fin 0 → E) : (iteratedFDerivWithin 𝕜 0 f s x : (Fin 0 → E) → F) m = f x := rfl #align iterated_fderiv_within_zero_apply iteratedFDerivWithin_zero_apply theorem iteratedFDerivWithin_zero_eq_comp : iteratedFDerivWithin 𝕜 0 f s = (continuousMultilinearCurryFin0 𝕜 E F).symm ∘ f := rfl #align iterated_fderiv_within_zero_eq_comp iteratedFDerivWithin_zero_eq_comp @[simp] theorem norm_iteratedFDerivWithin_zero : ‖iteratedFDerivWithin 𝕜 0 f s x‖ = ‖f x‖ := by -- Porting note: added `comp_apply`. rw [iteratedFDerivWithin_zero_eq_comp, comp_apply, LinearIsometryEquiv.norm_map] #align norm_iterated_fderiv_within_zero norm_iteratedFDerivWithin_zero theorem iteratedFDerivWithin_succ_apply_left {n : ℕ} (m : Fin (n + 1) → E) : (iteratedFDerivWithin 𝕜 (n + 1) f s x : (Fin (n + 1) → E) → F) m = (fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n f s) s x : E → E[×n]→L[𝕜] F) (m 0) (tail m) := rfl #align iterated_fderiv_within_succ_apply_left iteratedFDerivWithin_succ_apply_left /-- Writing explicitly the `n+1`-th derivative as the composition of a currying linear equiv, and the derivative of the `n`-th derivative. -/ theorem iteratedFDerivWithin_succ_eq_comp_left {n : ℕ} : iteratedFDerivWithin 𝕜 (n + 1) f s = (continuousMultilinearCurryLeftEquiv 𝕜 (fun _ : Fin (n + 1) => E) F : (E →L[𝕜] (E [×n]→L[𝕜] F)) → (E [×n.succ]→L[𝕜] F)) ∘ fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n f s) s := rfl #align iterated_fderiv_within_succ_eq_comp_left iteratedFDerivWithin_succ_eq_comp_left theorem fderivWithin_iteratedFDerivWithin {s : Set E} {n : ℕ} : fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n f s) s = (continuousMultilinearCurryLeftEquiv 𝕜 (fun _ : Fin (n + 1) => E) F).symm ∘ iteratedFDerivWithin 𝕜 (n + 1) f s := by rw [iteratedFDerivWithin_succ_eq_comp_left] ext1 x simp only [Function.comp_apply, LinearIsometryEquiv.symm_apply_apply] theorem norm_fderivWithin_iteratedFDerivWithin {n : ℕ} : ‖fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n f s) s x‖ = ‖iteratedFDerivWithin 𝕜 (n + 1) f s x‖ := by -- Porting note: added `comp_apply`. rw [iteratedFDerivWithin_succ_eq_comp_left, comp_apply, LinearIsometryEquiv.norm_map] #align norm_fderiv_within_iterated_fderiv_within norm_fderivWithin_iteratedFDerivWithin theorem iteratedFDerivWithin_succ_apply_right {n : ℕ} (hs : UniqueDiffOn 𝕜 s) (hx : x ∈ s) (m : Fin (n + 1) → E) : (iteratedFDerivWithin 𝕜 (n + 1) f s x : (Fin (n + 1) → E) → F) m = iteratedFDerivWithin 𝕜 n (fun y => fderivWithin 𝕜 f s y) s x (init m) (m (last n)) := by induction' n with n IH generalizing x · rw [iteratedFDerivWithin_succ_eq_comp_left, iteratedFDerivWithin_zero_eq_comp, iteratedFDerivWithin_zero_apply, Function.comp_apply, LinearIsometryEquiv.comp_fderivWithin _ (hs x hx)] rfl · let I := continuousMultilinearCurryRightEquiv' 𝕜 n E F have A : ∀ y ∈ s, iteratedFDerivWithin 𝕜 n.succ f s y = (I ∘ iteratedFDerivWithin 𝕜 n (fun y => fderivWithin 𝕜 f s y) s) y := fun y hy ↦ by ext m rw [@IH y hy m] rfl calc (iteratedFDerivWithin 𝕜 (n + 2) f s x : (Fin (n + 2) → E) → F) m = (fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n.succ f s) s x : E → E[×n + 1]→L[𝕜] F) (m 0) (tail m) := rfl _ = (fderivWithin 𝕜 (I ∘ iteratedFDerivWithin 𝕜 n (fderivWithin 𝕜 f s) s) s x : E → E[×n + 1]→L[𝕜] F) (m 0) (tail m) := by rw [fderivWithin_congr A (A x hx)] _ = (I ∘ fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n (fderivWithin 𝕜 f s) s) s x : E → E[×n + 1]→L[𝕜] F) (m 0) (tail m) := by #adaptation_note /-- After https://github.com/leanprover/lean4/pull/4119 we need to either use `set_option maxSynthPendingDepth 2 in` or fill in an explicit argument as ``` simp only [LinearIsometryEquiv.comp_fderivWithin _ (f := iteratedFDerivWithin 𝕜 n (fderivWithin 𝕜 f s) s) (hs x hx)] ``` -/ set_option maxSynthPendingDepth 2 in simp only [LinearIsometryEquiv.comp_fderivWithin _ (hs x hx)] rfl _ = (fderivWithin 𝕜 (iteratedFDerivWithin 𝕜 n (fun y => fderivWithin 𝕜 f s y) s) s x : E → E[×n]→L[𝕜] E →L[𝕜] F) (m 0) (init (tail m)) ((tail m) (last n)) := rfl _ = iteratedFDerivWithin 𝕜 (Nat.succ n) (fun y => fderivWithin 𝕜 f s y) s x (init m) (m (last (n + 1))) := by rw [iteratedFDerivWithin_succ_apply_left, tail_init_eq_init_tail] rfl #align iterated_fderiv_within_succ_apply_right iteratedFDerivWithin_succ_apply_right /-- Writing explicitly the `n+1`-th derivative as the composition of a currying linear equiv, and the `n`-th derivative of the derivative. -/ theorem iteratedFDerivWithin_succ_eq_comp_right {n : ℕ} (hs : UniqueDiffOn 𝕜 s) (hx : x ∈ s) : iteratedFDerivWithin 𝕜 (n + 1) f s x = (continuousMultilinearCurryRightEquiv' 𝕜 n E F ∘ iteratedFDerivWithin 𝕜 n (fun y => fderivWithin 𝕜 f s y) s) x := by ext m; rw [iteratedFDerivWithin_succ_apply_right hs hx]; rfl #align iterated_fderiv_within_succ_eq_comp_right iteratedFDerivWithin_succ_eq_comp_right theorem norm_iteratedFDerivWithin_fderivWithin {n : ℕ} (hs : UniqueDiffOn 𝕜 s) (hx : x ∈ s) : ‖iteratedFDerivWithin 𝕜 n (fderivWithin 𝕜 f s) s x‖ = ‖iteratedFDerivWithin 𝕜 (n + 1) f s x‖ := by -- Porting note: added `comp_apply`. rw [iteratedFDerivWithin_succ_eq_comp_right hs hx, comp_apply, LinearIsometryEquiv.norm_map] #align norm_iterated_fderiv_within_fderiv_within norm_iteratedFDerivWithin_fderivWithin @[simp] theorem iteratedFDerivWithin_one_apply (h : UniqueDiffWithinAt 𝕜 s x) (m : Fin 1 → E) : iteratedFDerivWithin 𝕜 1 f s x m = fderivWithin 𝕜 f s x (m 0) := by simp only [iteratedFDerivWithin_succ_apply_left, iteratedFDerivWithin_zero_eq_comp, (continuousMultilinearCurryFin0 𝕜 E F).symm.comp_fderivWithin h] rfl #align iterated_fderiv_within_one_apply iteratedFDerivWithin_one_apply /-- On a set of unique differentiability, the second derivative is obtained by taking the derivative of the derivative. -/ lemma iteratedFDerivWithin_two_apply (f : E → F) {z : E} (hs : UniqueDiffOn 𝕜 s) (hz : z ∈ s) (m : Fin 2 → E) : iteratedFDerivWithin 𝕜 2 f s z m = fderivWithin 𝕜 (fderivWithin 𝕜 f s) s z (m 0) (m 1) := by simp only [iteratedFDerivWithin_succ_apply_right hs hz] rfl theorem Filter.EventuallyEq.iteratedFDerivWithin' (h : f₁ =ᶠ[𝓝[s] x] f) (ht : t ⊆ s) (n : ℕ) : iteratedFDerivWithin 𝕜 n f₁ t =ᶠ[𝓝[s] x] iteratedFDerivWithin 𝕜 n f t := by induction' n with n ihn · exact h.mono fun y hy => DFunLike.ext _ _ fun _ => hy · have : fderivWithin 𝕜 _ t =ᶠ[𝓝[s] x] fderivWithin 𝕜 _ t := ihn.fderivWithin' ht apply this.mono intro y hy simp only [iteratedFDerivWithin_succ_eq_comp_left, hy, (· ∘ ·)] #align filter.eventually_eq.iterated_fderiv_within' Filter.EventuallyEq.iteratedFDerivWithin' protected theorem Filter.EventuallyEq.iteratedFDerivWithin (h : f₁ =ᶠ[𝓝[s] x] f) (n : ℕ) : iteratedFDerivWithin 𝕜 n f₁ s =ᶠ[𝓝[s] x] iteratedFDerivWithin 𝕜 n f s := h.iteratedFDerivWithin' Subset.rfl n #align filter.eventually_eq.iterated_fderiv_within Filter.EventuallyEq.iteratedFDerivWithin /-- If two functions coincide in a neighborhood of `x` within a set `s` and at `x`, then their iterated differentials within this set at `x` coincide. -/ theorem Filter.EventuallyEq.iteratedFDerivWithin_eq (h : f₁ =ᶠ[𝓝[s] x] f) (hx : f₁ x = f x) (n : ℕ) : iteratedFDerivWithin 𝕜 n f₁ s x = iteratedFDerivWithin 𝕜 n f s x := have : f₁ =ᶠ[𝓝[insert x s] x] f := by simpa [EventuallyEq, hx] (this.iteratedFDerivWithin' (subset_insert _ _) n).self_of_nhdsWithin (mem_insert _ _) #align filter.eventually_eq.iterated_fderiv_within_eq Filter.EventuallyEq.iteratedFDerivWithin_eq /-- If two functions coincide on a set `s`, then their iterated differentials within this set coincide. See also `Filter.EventuallyEq.iteratedFDerivWithin_eq` and `Filter.EventuallyEq.iteratedFDerivWithin`. -/ theorem iteratedFDerivWithin_congr (hs : EqOn f₁ f s) (hx : x ∈ s) (n : ℕ) : iteratedFDerivWithin 𝕜 n f₁ s x = iteratedFDerivWithin 𝕜 n f s x := (hs.eventuallyEq.filter_mono inf_le_right).iteratedFDerivWithin_eq (hs hx) _ #align iterated_fderiv_within_congr iteratedFDerivWithin_congr /-- If two functions coincide on a set `s`, then their iterated differentials within this set coincide. See also `Filter.EventuallyEq.iteratedFDerivWithin_eq` and `Filter.EventuallyEq.iteratedFDerivWithin`. -/ protected theorem Set.EqOn.iteratedFDerivWithin (hs : EqOn f₁ f s) (n : ℕ) : EqOn (iteratedFDerivWithin 𝕜 n f₁ s) (iteratedFDerivWithin 𝕜 n f s) s := fun _x hx => iteratedFDerivWithin_congr hs hx n #align set.eq_on.iterated_fderiv_within Set.EqOn.iteratedFDerivWithin theorem iteratedFDerivWithin_eventually_congr_set' (y : E) (h : s =ᶠ[𝓝[{y}ᶜ] x] t) (n : ℕ) : iteratedFDerivWithin 𝕜 n f s =ᶠ[𝓝 x] iteratedFDerivWithin 𝕜 n f t := by induction' n with n ihn generalizing x · rfl · refine (eventually_nhds_nhdsWithin.2 h).mono fun y hy => ?_ simp only [iteratedFDerivWithin_succ_eq_comp_left, (· ∘ ·)] rw [(ihn hy).fderivWithin_eq_nhds, fderivWithin_congr_set' _ hy] #align iterated_fderiv_within_eventually_congr_set' iteratedFDerivWithin_eventually_congr_set' theorem iteratedFDerivWithin_eventually_congr_set (h : s =ᶠ[𝓝 x] t) (n : ℕ) : iteratedFDerivWithin 𝕜 n f s =ᶠ[𝓝 x] iteratedFDerivWithin 𝕜 n f t := iteratedFDerivWithin_eventually_congr_set' x (h.filter_mono inf_le_left) n #align iterated_fderiv_within_eventually_congr_set iteratedFDerivWithin_eventually_congr_set theorem iteratedFDerivWithin_congr_set (h : s =ᶠ[𝓝 x] t) (n : ℕ) : iteratedFDerivWithin 𝕜 n f s x = iteratedFDerivWithin 𝕜 n f t x := (iteratedFDerivWithin_eventually_congr_set h n).self_of_nhds #align iterated_fderiv_within_congr_set iteratedFDerivWithin_congr_set /-- The iterated differential within a set `s` at a point `x` is not modified if one intersects `s` with a neighborhood of `x` within `s`. -/ theorem iteratedFDerivWithin_inter' {n : ℕ} (hu : u ∈ 𝓝[s] x) : iteratedFDerivWithin 𝕜 n f (s ∩ u) x = iteratedFDerivWithin 𝕜 n f s x := iteratedFDerivWithin_congr_set (nhdsWithin_eq_iff_eventuallyEq.1 <\| nhdsWithin_inter_of_mem' hu) _ #align iterated_fderiv_within_inter' iteratedFDerivWithin_inter' /-- The iterated differential within a set `s` at a point `x` is not modified if one intersects `s` with a neighborhood of `x`. -/ theorem iteratedFDerivWithin_inter {n : ℕ} (hu : u ∈ 𝓝 x) : iteratedFDerivWithin 𝕜 n f (s ∩ u) x = iteratedFDerivWithin 𝕜 n f s x := iteratedFDerivWithin_inter' (mem_nhdsWithin_of_mem_nhds hu) #align iterated_fderiv_within_inter iteratedFDerivWithin_inter /-- The iterated differential within a set `s` at a point `x` is not modified if one intersects `s` with an open set containing `x`. -/ theorem iteratedFDerivWithin_inter_open {n : ℕ} (hu : IsOpen u) (hx : x ∈ u) : iteratedFDerivWithin 𝕜 n f (s ∩ u) x = iteratedFDerivWithin 𝕜 n f s x := iteratedFDerivWithin_inter (hu.mem_nhds hx) #align iterated_fderiv_within_inter_open iteratedFDerivWithin_inter_open @[simp] theorem contDiffOn_zero : ContDiffOn 𝕜 0 f s ↔ ContinuousOn f s := by refine ⟨fun H => H.continuousOn, fun H => ?_⟩ intro x hx m hm have : (m : ℕ∞) = 0 := le_antisymm hm bot_le rw [this] refine ⟨insert x s, self_mem_nhdsWithin, ftaylorSeriesWithin 𝕜 f s, ?_⟩ rw [hasFTaylorSeriesUpToOn_zero_iff] exact ⟨by rwa [insert_eq_of_mem hx], fun x _ => by simp [ftaylorSeriesWithin]⟩ #align cont_diff_on_zero contDiffOn_zero theorem contDiffWithinAt_zero (hx : x ∈ s) : ContDiffWithinAt 𝕜 0 f s x ↔ ∃ u ∈ 𝓝[s] x, ContinuousOn f (s ∩ u) := by constructor · intro h obtain ⟨u, H, p, hp⟩ := h 0 le_rfl refine ⟨u, ?_, ?_⟩ · simpa [hx] using H · simp only [Nat.cast_zero, hasFTaylorSeriesUpToOn_zero_iff] at hp exact hp.1.mono inter_subset_right · rintro ⟨u, H, hu⟩ rw [← contDiffWithinAt_inter' H] have h' : x ∈ s ∩ u := ⟨hx, mem_of_mem_nhdsWithin hx H⟩ exact (contDiffOn_zero.mpr hu).contDiffWithinAt h' #align cont_diff_within_at_zero contDiffWithinAt_zero /-- On a set with unique differentiability, any choice of iterated differential has to coincide with the one we have chosen in `iteratedFDerivWithin 𝕜 m f s`. -/ theorem HasFTaylorSeriesUpToOn.eq_iteratedFDerivWithin_of_uniqueDiffOn (h : HasFTaylorSeriesUpToOn n f p s) {m : ℕ} (hmn : (m : ℕ∞) ≤ n) (hs : UniqueDiffOn 𝕜 s) (hx : x ∈ s) : p x m = iteratedFDerivWithin 𝕜 m f s x := by induction' m with m IH generalizing x · rw [h.zero_eq' hx, iteratedFDerivWithin_zero_eq_comp]; rfl · have A : (m : ℕ∞) < n := lt_of_lt_of_le (WithTop.coe_lt_coe.2 (lt_add_one m)) hmn have : HasFDerivWithinAt (fun y : E => iteratedFDerivWithin 𝕜 m f s y) (ContinuousMultilinearMap.curryLeft (p x (Nat.succ m))) s x := (h.fderivWithin m A x hx).congr (fun y hy => (IH (le_of_lt A) hy).symm) (IH (le_of_lt A) hx).symm rw [iteratedFDerivWithin_succ_eq_comp_left, Function.comp_apply, this.fderivWithin (hs x hx)] exact (ContinuousMultilinearMap.uncurry_curryLeft _).symm #align has_ftaylor_series_up_to_on.eq_ftaylor_series_of_unique_diff_on HasFTaylorSeriesUpToOn.eq_iteratedFDerivWithin_of_uniqueDiffOn @[deprecated] alias HasFTaylorSeriesUpToOn.eq_ftaylor_series_of_uniqueDiffOn := HasFTaylorSeriesUpToOn.eq_iteratedFDerivWithin_of_uniqueDiffOn -- 2024-03-28 /-- When a function is `C^n` in a set `s` of unique differentiability, it admits `ftaylorSeriesWithin 𝕜 f s` as a Taylor series up to order `n` in `s`. -/ protected theorem ContDiffOn.ftaylorSeriesWithin (h : ContDiffOn 𝕜 n f s) (hs : UniqueDiffOn 𝕜 s) : HasFTaylorSeriesUpToOn n f (ftaylorSeriesWithin 𝕜 f s) s := by constructor · intro x _ simp only [ftaylorSeriesWithin, ContinuousMultilinearMap.uncurry0_apply, iteratedFDerivWithin_zero_apply] · intro m hm x hx rcases (h x hx) m.succ (ENat.add_one_le_of_lt hm) with ⟨u, hu, p, Hp⟩ rw [insert_eq_of_mem hx] at hu rcases mem_nhdsWithin.1 hu with ⟨o, o_open, xo, ho⟩ rw [inter_comm] at ho have : p x m.succ = ftaylorSeriesWithin 𝕜 f s x m.succ := by change p x m.succ = iteratedFDerivWithin 𝕜 m.succ f s x rw [← iteratedFDerivWithin_inter_open o_open xo] exact (Hp.mono ho).eq_iteratedFDerivWithin_of_uniqueDiffOn le_rfl (hs.inter o_open) ⟨hx, xo⟩ rw [← this, ← hasFDerivWithinAt_inter (IsOpen.mem_nhds o_open xo)] have A : ∀ y ∈ s ∩ o, p y m = ftaylorSeriesWithin 𝕜 f s y m := by rintro y ⟨hy, yo⟩ change p y m = iteratedFDerivWithin 𝕜 m f s y rw [← iteratedFDerivWithin_inter_open o_open yo] exact (Hp.mono ho).eq_iteratedFDerivWithin_of_uniqueDiffOn (WithTop.coe_le_coe.2 (Nat.le_succ m)) (hs.inter o_open) ⟨hy, yo⟩ exact ((Hp.mono ho).fderivWithin m (WithTop.coe_lt_coe.2 (lt_add_one m)) x ⟨hx, xo⟩).congr (fun y hy => (A y hy).symm) (A x ⟨hx, xo⟩).symm · intro m hm apply continuousOn_of_locally_continuousOn intro x hx rcases h x hx m hm with ⟨u, hu, p, Hp⟩ rcases mem_nhdsWithin.1 hu with ⟨o, o_open, xo, ho⟩ rw [insert_eq_of_mem hx] at ho rw [inter_comm] at ho refine ⟨o, o_open, xo, ?_⟩ have A : ∀ y ∈ s ∩ o, p y m = ftaylorSeriesWithin 𝕜 f s y m := by rintro y ⟨hy, yo⟩ change p y m = iteratedFDerivWithin 𝕜 m f s y rw [← iteratedFDerivWithin_inter_open o_open yo] exact (Hp.mono ho).eq_iteratedFDerivWithin_of_uniqueDiffOn le_rfl (hs.inter o_open) ⟨hy, yo⟩ exact ((Hp.mono ho).cont m le_rfl).congr fun y hy => (A y hy).symm #align cont_diff_on.ftaylor_series_within ContDiffOn.ftaylorSeriesWithin theorem contDiffOn_of_continuousOn_differentiableOn (Hcont : ∀ m : ℕ, (m : ℕ∞) ≤ n → ContinuousOn (fun x => iteratedFDerivWithin 𝕜 m f s x) s) (Hdiff : ∀ m : ℕ, (m : ℕ∞) < n → DifferentiableOn 𝕜 (fun x => iteratedFDerivWithin 𝕜 m f s x) s) : ContDiffOn 𝕜 n f s := by intro x hx m hm rw [insert_eq_of_mem hx] refine ⟨s, self_mem_nhdsWithin, ftaylorSeriesWithin 𝕜 f s, ?_⟩ constructor · intro y _ simp only [ftaylorSeriesWithin, ContinuousMultilinearMap.uncurry0_apply, iteratedFDerivWithin_zero_apply] · intro k hk y hy convert (Hdiff k (lt_of_lt_of_le hk hm) y hy).hasFDerivWithinAt · intro k hk exact Hcont k (le_trans hk hm) #align cont_diff_on_of_continuous_on_differentiable_on contDiffOn_of_continuousOn_differentiableOn theorem contDiffOn_of_differentiableOn (h : ∀ m : ℕ, (m : ℕ∞) ≤ n → DifferentiableOn 𝕜 (iteratedFDerivWithin 𝕜 m f s) s) : ContDiffOn 𝕜 n f s := contDiffOn_of_continuousOn_differentiableOn (fun m hm => (h m hm).continuousOn) fun m hm => h m (le_of_lt hm) #align cont_diff_on_of_differentiable_on contDiffOn_of_differentiableOn theorem ContDiffOn.continuousOn_iteratedFDerivWithin {m : ℕ} (h : ContDiffOn 𝕜 n f s) (hmn : (m : ℕ∞) ≤ n) (hs : UniqueDiffOn 𝕜 s) : ContinuousOn (iteratedFDerivWithin 𝕜 m f s) s := (h.ftaylorSeriesWithin hs).cont m hmn #align cont_diff_on.continuous_on_iterated_fderiv_within ContDiffOn.continuousOn_iteratedFDerivWithin theorem ContDiffOn.differentiableOn_iteratedFDerivWithin {m : ℕ} (h : ContDiffOn 𝕜 n f s) (hmn : (m : ℕ∞) < n) (hs : UniqueDiffOn 𝕜 s) : DifferentiableOn 𝕜 (iteratedFDerivWithin 𝕜 m f s) s := fun x hx => ((h.ftaylorSeriesWithin hs).fderivWithin m hmn x hx).differentiableWithinAt #align cont_diff_on.differentiable_on_iterated_fderiv_within ContDiffOn.differentiableOn_iteratedFDerivWithin theorem ContDiffWithinAt.differentiableWithinAt_iteratedFDerivWithin {m : ℕ} (h : ContDiffWithinAt 𝕜 n f s x) (hmn : (m : ℕ∞) < n) (hs : UniqueDiffOn 𝕜 (insert x s)) : DifferentiableWithinAt 𝕜 (iteratedFDerivWithin 𝕜 m f s) s x := by rcases h.contDiffOn' (ENat.add_one_le_of_lt hmn) with ⟨u, uo, xu, hu⟩ set t := insert x s ∩ u have A : t =ᶠ[𝓝[≠] x] s := by simp only [set_eventuallyEq_iff_inf_principal, ← nhdsWithin_inter'] rw [← inter_assoc, nhdsWithin_inter_of_mem', ← diff_eq_compl_inter, insert_diff_of_mem, diff_eq_compl_inter] exacts [rfl, mem_nhdsWithin_of_mem_nhds (uo.mem_nhds xu)] have B : iteratedFDerivWithin 𝕜 m f s =ᶠ[𝓝 x] iteratedFDerivWithin 𝕜 m f t := iteratedFDerivWithin_eventually_congr_set' _ A.symm _ have C : DifferentiableWithinAt 𝕜 (iteratedFDerivWithin 𝕜 m f t) t x := hu.differentiableOn_iteratedFDerivWithin (Nat.cast_lt.2 m.lt_succ_self) (hs.inter uo) x ⟨mem_insert _ _, xu⟩ rw [differentiableWithinAt_congr_set' _ A] at C exact C.congr_of_eventuallyEq (B.filter_mono inf_le_left) B.self_of_nhds #align cont_diff_within_at.differentiable_within_at_iterated_fderiv_within ContDiffWithinAt.differentiableWithinAt_iteratedFDerivWithin theorem contDiffOn_iff_continuousOn_differentiableOn (hs : UniqueDiffOn 𝕜 s) : ContDiffOn 𝕜 n f s ↔ (∀ m : ℕ, (m : ℕ∞) ≤ n → ContinuousOn (fun x => iteratedFDerivWithin 𝕜 m f s x) s) ∧ ∀ m : ℕ, (m : ℕ∞) < n → DifferentiableOn 𝕜 (fun x => iteratedFDerivWithin 𝕜 m f s x) s := ⟨fun h => ⟨fun _m hm => h.continuousOn_iteratedFDerivWithin hm hs, fun _m hm => h.differentiableOn_iteratedFDerivWithin hm hs⟩, fun h => contDiffOn_of_continuousOn_differentiableOn h.1 h.2⟩ #align cont_diff_on_iff_continuous_on_differentiable_on contDiffOn_iff_continuousOn_differentiableOn theorem contDiffOn_succ_of_fderivWithin {n : ℕ} (hf : DifferentiableOn 𝕜 f s) (h : ContDiffOn 𝕜 n (fun y => fderivWithin 𝕜 f s y) s) : ContDiffOn 𝕜 (n + 1 : ℕ) f s := by intro x hx rw [contDiffWithinAt_succ_iff_hasFDerivWithinAt, insert_eq_of_mem hx] exact ⟨s, self_mem_nhdsWithin, fderivWithin 𝕜 f s, fun y hy => (hf y hy).hasFDerivWithinAt, h x hx⟩ #align cont_diff_on_succ_of_fderiv_within contDiffOn_succ_of_fderivWithin /-- A function is `C^(n + 1)` on a domain with unique derivatives if and only if it is differentiable there, and its derivative (expressed with `fderivWithin`) is `C^n`. -/ theorem contDiffOn_succ_iff_fderivWithin {n : ℕ} (hs : UniqueDiffOn 𝕜 s) : ContDiffOn 𝕜 (n + 1 : ℕ) f s ↔ DifferentiableOn 𝕜 f s ∧ ContDiffOn 𝕜 n (fun y => fderivWithin 𝕜 f s y) s := by refine ⟨fun H => ?_, fun h => contDiffOn_succ_of_fderivWithin h.1 h.2⟩ refine ⟨H.differentiableOn (WithTop.coe_le_coe.2 (Nat.le_add_left 1 n)), fun x hx => ?_⟩ rcases contDiffWithinAt_succ_iff_hasFDerivWithinAt.1 (H x hx) with ⟨u, hu, f', hff', hf'⟩ rcases mem_nhdsWithin.1 hu with ⟨o, o_open, xo, ho⟩ rw [inter_comm, insert_eq_of_mem hx] at ho have := hf'.mono ho rw [contDiffWithinAt_inter' (mem_nhdsWithin_of_mem_nhds (IsOpen.mem_nhds o_open xo))] at this apply this.congr_of_eventually_eq' _ hx have : o ∩ s ∈ 𝓝[s] x := mem_nhdsWithin.2 ⟨o, o_open, xo, Subset.refl _⟩ rw [inter_comm] at this refine Filter.eventuallyEq_of_mem this fun y hy => ?_ have A : fderivWithin 𝕜 f (s ∩ o) y = f' y := ((hff' y (ho hy)).mono ho).fderivWithin (hs.inter o_open y hy) rwa [fderivWithin_inter (o_open.mem_nhds hy.2)] at A #align cont_diff_on_succ_iff_fderiv_within contDiffOn_succ_iff_fderivWithin theorem contDiffOn_succ_iff_hasFDerivWithin {n : ℕ} (hs : UniqueDiffOn 𝕜 s) : ContDiffOn 𝕜 (n + 1 : ℕ) f s ↔ ∃ f' : E → E →L[𝕜] F, ContDiffOn 𝕜 n f' s ∧ ∀ x, x ∈ s → HasFDerivWithinAt f (f' x) s x := by rw [contDiffOn_succ_iff_fderivWithin hs] refine ⟨fun h => ⟨fderivWithin 𝕜 f s, h.2, fun x hx => (h.1 x hx).hasFDerivWithinAt⟩, fun h => ?_⟩ rcases h with ⟨f', h1, h2⟩ refine ⟨fun x hx => (h2 x hx).differentiableWithinAt, fun x hx => ?_⟩ exact (h1 x hx).congr' (fun y hy => (h2 y hy).fderivWithin (hs y hy)) hx #align cont_diff_on_succ_iff_has_fderiv_within contDiffOn_succ_iff_hasFDerivWithin /-- A function is `C^(n + 1)` on an open domain if and only if it is differentiable there, and its derivative (expressed with `fderiv`) is `C^n`. -/ theorem contDiffOn_succ_iff_fderiv_of_isOpen {n : ℕ} (hs : IsOpen s) : ContDiffOn 𝕜 (n + 1 : ℕ) f s ↔ DifferentiableOn 𝕜 f s ∧ ContDiffOn 𝕜 n (fun y => fderiv 𝕜 f y) s := by rw [contDiffOn_succ_iff_fderivWithin hs.uniqueDiffOn] exact Iff.rfl.and (contDiffOn_congr fun x hx ↦ fderivWithin_of_isOpen hs hx) #align cont_diff_on_succ_iff_fderiv_of_open contDiffOn_succ_iff_fderiv_of_isOpen /-- A function is `C^∞` on a domain with unique derivatives if and only if it is differentiable there, and its derivative (expressed with `fderivWithin`) is `C^∞`. -/ theorem contDiffOn_top_iff_fderivWithin (hs : UniqueDiffOn 𝕜 s) : ContDiffOn 𝕜 ∞ f s ↔ DifferentiableOn 𝕜 f s ∧ ContDiffOn 𝕜 ∞ (fun y => fderivWithin 𝕜 f s y) s := by constructor · intro h refine ⟨h.differentiableOn le_top, ?_⟩ refine contDiffOn_top.2 fun n => ((contDiffOn_succ_iff_fderivWithin hs).1 ?_).2 exact h.of_le le_top · intro h refine contDiffOn_top.2 fun n => ?_ have A : (n : ℕ∞) ≤ ∞ := le_top apply ((contDiffOn_succ_iff_fderivWithin hs).2 ⟨h.1, h.2.of_le A⟩).of_le exact WithTop.coe_le_coe.2 (Nat.le_succ n) #align cont_diff_on_top_iff_fderiv_within contDiffOn_top_iff_fderivWithin /-- A function is `C^∞` on an open domain if and only if it is differentiable there, and its derivative (expressed with `fderiv`) is `C^∞`. -/ theorem contDiffOn_top_iff_fderiv_of_isOpen (hs : IsOpen s) : ContDiffOn 𝕜 ∞ f s ↔ DifferentiableOn 𝕜 f s ∧ ContDiffOn 𝕜 ∞ (fun y => fderiv 𝕜 f y) s := by rw [contDiffOn_top_iff_fderivWithin hs.uniqueDiffOn] exact Iff.rfl.and <\| contDiffOn_congr fun x hx ↦ fderivWithin_of_isOpen hs hx #align cont_diff_on_top_iff_fderiv_of_open contDiffOn_top_iff_fderiv_of_isOpen protected theorem ContDiffOn.fderivWithin (hf : ContDiffOn 𝕜 n f s) (hs : UniqueDiffOn 𝕜 s) (hmn : m + 1 ≤ n) : ContDiffOn 𝕜 m (fun y => fderivWithin 𝕜 f s y) s := by cases' m with m · change ∞ + 1 ≤ n at hmn have : n = ∞ := by simpa using hmn rw [this] at hf exact ((contDiffOn_top_iff_fderivWithin hs).1 hf).2 · change (m.succ : ℕ∞) ≤ n at hmn exact ((contDiffOn_succ_iff_fderivWithin hs).1 (hf.of_le hmn)).2 #align cont_diff_on.fderiv_within ContDiffOn.fderivWithin theorem ContDiffOn.fderiv_of_isOpen (hf : ContDiffOn 𝕜 n f s) (hs : IsOpen s) (hmn : m + 1 ≤ n) : ContDiffOn 𝕜 m (fun y => fderiv 𝕜 f y) s := (hf.fderivWithin hs.uniqueDiffOn hmn).congr fun _ hx => (fderivWithin_of_isOpen hs hx).symm #align cont_diff_on.fderiv_of_open ContDiffOn.fderiv_of_isOpen theorem ContDiffOn.continuousOn_fderivWithin (h : ContDiffOn 𝕜 n f s) (hs : UniqueDiffOn 𝕜 s) (hn : 1 ≤ n) : ContinuousOn (fun x => fderivWithin 𝕜 f s x) s := ((contDiffOn_succ_iff_fderivWithin hs).1 (h.of_le hn)).2.continuousOn #align cont_diff_on.continuous_on_fderiv_within ContDiffOn.continuousOn_fderivWithin theorem ContDiffOn.continuousOn_fderiv_of_isOpen (h : ContDiffOn 𝕜 n f s) (hs : IsOpen s) (hn : 1 ≤ n) : ContinuousOn (fun x => fderiv 𝕜 f x) s := ((contDiffOn_succ_iff_fderiv_of_isOpen hs).1 (h.of_le hn)).2.continuousOn #align cont_diff_on.continuous_on_fderiv_of_open ContDiffOn.continuousOn_fderiv_of_isOpen /-! ### Functions with a Taylor series on the whole space -/ /-- `HasFTaylorSeriesUpTo n f p` registers the fact that `p 0 = f` and `p (m+1)` is a derivative of `p m` for `m < n`, and is continuous for `m ≤ n`. This is a predicate analogous to `HasFDerivAt` but for higher order derivatives. Notice that `p` does not sum up to `f` on the diagonal (`FormalMultilinearSeries.sum`), even if `f` is analytic and `n = ∞`: an addition `1/m!` factor on the `m`th term is necessary for that. -/ structure HasFTaylorSeriesUpTo (n : ℕ∞) (f : E → F) (p : E → FormalMultilinearSeries 𝕜 E F) : Prop where zero_eq : ∀ x, (p x 0).uncurry0 = f x fderiv : ∀ m : ℕ, (m : ℕ∞) < n → ∀ x, HasFDerivAt (fun y => p y m) (p x m.succ).curryLeft x cont : ∀ m : ℕ, (m : ℕ∞) ≤ n → Continuous fun x => p x m #align has_ftaylor_series_up_to HasFTaylorSeriesUpTo theorem HasFTaylorSeriesUpTo.zero_eq' (h : HasFTaylorSeriesUpTo n f p) (x : E) : p x 0 = (continuousMultilinearCurryFin0 𝕜 E F).symm (f x) := by rw [← h.zero_eq x] exact (p x 0).uncurry0_curry0.symm #align has_ftaylor_series_up_to.zero_eq' HasFTaylorSeriesUpTo.zero_eq' theorem hasFTaylorSeriesUpToOn_univ_iff : HasFTaylorSeriesUpToOn n f p univ ↔ HasFTaylorSeriesUpTo n f p := by constructor · intro H constructor · exact fun x => H.zero_eq x (mem_univ x) · intro m hm x rw [← hasFDerivWithinAt_univ] exact H.fderivWithin m hm x (mem_univ x) · intro m hm rw [continuous_iff_continuousOn_univ] exact H.cont m hm · intro H constructor · exact fun x _ => H.zero_eq x · intro m hm x _ rw [hasFDerivWithinAt_univ] exact H.fderiv m hm x · intro m hm rw [← continuous_iff_continuousOn_univ] exact H.cont m hm #align has_ftaylor_series_up_to_on_univ_iff hasFTaylorSeriesUpToOn_univ_iff theorem HasFTaylorSeriesUpTo.hasFTaylorSeriesUpToOn (h : HasFTaylorSeriesUpTo n f p) (s : Set E) : HasFTaylorSeriesUpToOn n f p s := (hasFTaylorSeriesUpToOn_univ_iff.2 h).mono (subset_univ _) #align has_ftaylor_series_up_to.has_ftaylor_series_up_to_on HasFTaylorSeriesUpTo.hasFTaylorSeriesUpToOn theorem HasFTaylorSeriesUpTo.ofLe (h : HasFTaylorSeriesUpTo n f p) (hmn : m ≤ n) : HasFTaylorSeriesUpTo m f p := by rw [← hasFTaylorSeriesUpToOn_univ_iff] at h ⊢; exact h.of_le hmn #align has_ftaylor_series_up_to.of_le HasFTaylorSeriesUpTo.ofLe theorem HasFTaylorSeriesUpTo.continuous (h : HasFTaylorSeriesUpTo n f p) : Continuous f := by rw [← hasFTaylorSeriesUpToOn_univ_iff] at h rw [continuous_iff_continuousOn_univ] exact h.continuousOn #align has_ftaylor_series_up_to.continuous HasFTaylorSeriesUpTo.continuous	Mathlib/Analysis/Calculus/ContDiff/Defs.lean	1,308	1,311	theorem hasFTaylorSeriesUpTo_zero_iff : HasFTaylorSeriesUpTo 0 f p ↔ Continuous f ∧ ∀ x, (p x 0).uncurry0 = f x := by	simp [hasFTaylorSeriesUpToOn_univ_iff.symm, continuous_iff_continuousOn_univ, hasFTaylorSeriesUpToOn_zero_iff]
/- Copyright (c) 2020 Anatole Dedecker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anatole Dedecker, Devon Tuma -/ import Mathlib.Algebra.Polynomial.Roots import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.Asymptotics.SpecificAsymptotics #align_import analysis.special_functions.polynomials from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" /-! # Limits related to polynomial and rational functions This file proves basic facts about limits of polynomial and rationals functions. The main result is `eval_is_equivalent_at_top_eval_lead`, which states that for any polynomial `P` of degree `n` with leading coefficient `a`, the corresponding polynomial function is equivalent to `a * x^n` as `x` goes to +∞. We can then use this result to prove various limits for polynomial and rational functions, depending on the degrees and leading coefficients of the considered polynomials. -/ open Filter Finset Asymptotics open Asymptotics Polynomial Topology namespace Polynomial variable {𝕜 : Type} [NormedLinearOrderedField 𝕜] (P Q : 𝕜[X]) theorem eventually_no_roots (hP : P ≠ 0) : ∀ᶠ x in atTop, ¬P.IsRoot x := atTop_le_cofinite <\| (finite_setOf_isRoot hP).compl_mem_cofinite #align polynomial.eventually_no_roots Polynomial.eventually_no_roots variable [OrderTopology 𝕜] section PolynomialAtTop theorem isEquivalent_atTop_lead : (fun x => eval x P) ~[atTop] fun x => P.leadingCoeff x ^ P.natDegree := by by_cases h : P = 0 · simp [h, IsEquivalent.refl] · simp only [Polynomial.eval_eq_sum_range, sum_range_succ] exact IsLittleO.add_isEquivalent (IsLittleO.sum fun i hi => IsLittleO.const_mul_left ((IsLittleO.const_mul_right fun hz => h <\| leadingCoeff_eq_zero.mp hz) <\| isLittleO_pow_pow_atTop_of_lt (mem_range.mp hi)) _) IsEquivalent.refl #align polynomial.is_equivalent_at_top_lead Polynomial.isEquivalent_atTop_lead theorem tendsto_atTop_of_leadingCoeff_nonneg (hdeg : 0 < P.degree) (hnng : 0 ≤ P.leadingCoeff) : Tendsto (fun x => eval x P) atTop atTop := P.isEquivalent_atTop_lead.symm.tendsto_atTop <\| tendsto_const_mul_pow_atTop (natDegree_pos_iff_degree_pos.2 hdeg).ne' <\| hnng.lt_of_ne' <\| leadingCoeff_ne_zero.mpr <\| ne_zero_of_degree_gt hdeg #align polynomial.tendsto_at_top_of_leading_coeff_nonneg Polynomial.tendsto_atTop_of_leadingCoeff_nonneg theorem tendsto_atTop_iff_leadingCoeff_nonneg : Tendsto (fun x => eval x P) atTop atTop ↔ 0 < P.degree ∧ 0 ≤ P.leadingCoeff := by refine ⟨fun h => ?_, fun h => tendsto_atTop_of_leadingCoeff_nonneg P h.1 h.2⟩ have : Tendsto (fun x => P.leadingCoeff * x ^ P.natDegree) atTop atTop := (isEquivalent_atTop_lead P).tendsto_atTop h rw [tendsto_const_mul_pow_atTop_iff, ← pos_iff_ne_zero, natDegree_pos_iff_degree_pos] at this exact ⟨this.1, this.2.le⟩ #align polynomial.tendsto_at_top_iff_leading_coeff_nonneg Polynomial.tendsto_atTop_iff_leadingCoeff_nonneg theorem tendsto_atBot_iff_leadingCoeff_nonpos : Tendsto (fun x => eval x P) atTop atBot ↔ 0 < P.degree ∧ P.leadingCoeff ≤ 0 := by simp only [← tendsto_neg_atTop_iff, ← eval_neg, tendsto_atTop_iff_leadingCoeff_nonneg, degree_neg, leadingCoeff_neg, neg_nonneg] #align polynomial.tendsto_at_bot_iff_leading_coeff_nonpos Polynomial.tendsto_atBot_iff_leadingCoeff_nonpos theorem tendsto_atBot_of_leadingCoeff_nonpos (hdeg : 0 < P.degree) (hnps : P.leadingCoeff ≤ 0) : Tendsto (fun x => eval x P) atTop atBot := P.tendsto_atBot_iff_leadingCoeff_nonpos.2 ⟨hdeg, hnps⟩ #align polynomial.tendsto_at_bot_of_leading_coeff_nonpos Polynomial.tendsto_atBot_of_leadingCoeff_nonpos theorem abs_tendsto_atTop (hdeg : 0 < P.degree) : Tendsto (fun x => abs <\| eval x P) atTop atTop := by rcases le_total 0 P.leadingCoeff with hP \| hP · exact tendsto_abs_atTop_atTop.comp (P.tendsto_atTop_of_leadingCoeff_nonneg hdeg hP) · exact tendsto_abs_atBot_atTop.comp (P.tendsto_atBot_of_leadingCoeff_nonpos hdeg hP) #align polynomial.abs_tendsto_at_top Polynomial.abs_tendsto_atTop theorem abs_isBoundedUnder_iff : (IsBoundedUnder (· ≤ ·) atTop fun x => \|eval x P\|) ↔ P.degree ≤ 0 := by refine ⟨fun h => ?_, fun h => ⟨\|P.coeff 0\|, eventually_map.mpr (eventually_of_forall (forall_imp (fun _ => le_of_eq) fun x => congr_arg abs <\| _root_.trans (congr_arg (eval x) (eq_C_of_degree_le_zero h)) eval_C))⟩⟩ contrapose! h exact not_isBoundedUnder_of_tendsto_atTop (abs_tendsto_atTop P h) #align polynomial.abs_is_bounded_under_iff Polynomial.abs_isBoundedUnder_iff theorem abs_tendsto_atTop_iff : Tendsto (fun x => abs <\| eval x P) atTop atTop ↔ 0 < P.degree := ⟨fun h => not_le.mp (mt (abs_isBoundedUnder_iff P).mpr (not_isBoundedUnder_of_tendsto_atTop h)), abs_tendsto_atTop P⟩ #align polynomial.abs_tendsto_at_top_iff Polynomial.abs_tendsto_atTop_iff	Mathlib/Analysis/SpecialFunctions/Polynomials.lean	105	117	theorem tendsto_nhds_iff {c : 𝕜} : Tendsto (fun x => eval x P) atTop (𝓝 c) ↔ P.leadingCoeff = c ∧ P.degree ≤ 0 := by	refine ⟨fun h => ?_, fun h => ?_⟩ · have := P.isEquivalent_atTop_lead.tendsto_nhds h by_cases hP : P.leadingCoeff = 0 · simp only [hP, zero_mul, tendsto_const_nhds_iff] at this exact ⟨_root_.trans hP this, by simp [leadingCoeff_eq_zero.1 hP]⟩ · rw [tendsto_const_mul_pow_nhds_iff hP, natDegree_eq_zero_iff_degree_le_zero] at this exact this.symm · refine P.isEquivalent_atTop_lead.symm.tendsto_nhds ?_ have : P.natDegree = 0 := natDegree_eq_zero_iff_degree_le_zero.2 h.2 simp only [h.1, this, pow_zero, mul_one] exact tendsto_const_nhds
/- Copyright (c) 2018 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Mario Carneiro, Johan Commelin, Amelia Livingston, Anne Baanen -/ import Mathlib.RingTheory.Localization.FractionRing import Mathlib.RingTheory.Localization.Integer import Mathlib.RingTheory.UniqueFactorizationDomain #align_import ring_theory.localization.num_denom from "leanprover-community/mathlib"@"831c494092374cfe9f50591ed0ac81a25efc5b86" /-! # Numerator and denominator in a localization ## Implementation notes See `Mathlib/RingTheory/Localization/Basic.lean` for a design overview. ## Tags localization, ring localization, commutative ring localization, characteristic predicate, commutative ring, field of fractions -/ variable {R : Type} [CommRing R] (M : Submonoid R) {S : Type} [CommRing S] variable [Algebra R S] {P : Type} [CommRing P] namespace IsFractionRing open IsLocalization section NumDen variable (A : Type) [CommRing A] [IsDomain A] [UniqueFactorizationMonoid A] variable {K : Type*} [Field K] [Algebra A K] [IsFractionRing A K]	Mathlib/RingTheory/Localization/NumDen.lean	37	47	theorem exists_reduced_fraction (x : K) : ∃ (a : A) (b : nonZeroDivisors A), IsRelPrime a b ∧ mk' K a b = x := by	obtain ⟨⟨b, b_nonzero⟩, a, hab⟩ := exists_integer_multiple (nonZeroDivisors A) x obtain ⟨a', b', c', no_factor, rfl, rfl⟩ := UniqueFactorizationMonoid.exists_reduced_factors' a b (mem_nonZeroDivisors_iff_ne_zero.mp b_nonzero) obtain ⟨_, b'_nonzero⟩ := mul_mem_nonZeroDivisors.mp b_nonzero refine ⟨a', ⟨b', b'_nonzero⟩, no_factor, ?_⟩ refine mul_left_cancel₀ (IsFractionRing.to_map_ne_zero_of_mem_nonZeroDivisors b_nonzero) ?_ simp only [Subtype.coe_mk, RingHom.map_mul, Algebra.smul_def] at * erw [← hab, mul_assoc, mk'_spec' _ a' ⟨b', b'_nonzero⟩]
/- Copyright (c) 2018 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl -/ import Mathlib.Algebra.Algebra.Equiv import Mathlib.Algebra.Field.Basic import Mathlib.Logic.Equiv.Defs import Mathlib.Logic.Small.Defs #align_import logic.equiv.transfer_instance from "leanprover-community/mathlib"@"ec1c7d810034d4202b0dd239112d1792be9f6fdc" /-! # Transfer algebraic structures across `Equiv`s In this file we prove theorems of the following form: if `β` has a group structure and `α ≃ β` then `α` has a group structure, and similarly for monoids, semigroups, rings, integral domains, fields and so on. Note that most of these constructions can also be obtained using the `transport` tactic. ### Implementation details When adding new definitions that transfer type-classes across an equivalence, please use `abbrev`. See note [reducible non-instances]. ## Tags equiv, group, ring, field, module, algebra -/ universe u v variable {α : Type u} {β : Type v} namespace Equiv section Instances variable (e : α ≃ β) /-- Transfer `One` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `Zero` across an `Equiv`"] protected def one [One β] : One α := ⟨e.symm 1⟩ #align equiv.has_one Equiv.one #align equiv.has_zero Equiv.zero @[to_additive] theorem one_def [One β] : letI := e.one 1 = e.symm 1 := rfl #align equiv.one_def Equiv.one_def #align equiv.zero_def Equiv.zero_def @[to_additive] noncomputable instance [Small.{v} α] [One α] : One (Shrink.{v} α) := (equivShrink α).symm.one /-- Transfer `Mul` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `Add` across an `Equiv`"] protected def mul [Mul β] : Mul α := ⟨fun x y => e.symm (e x * e y)⟩ #align equiv.has_mul Equiv.mul #align equiv.has_add Equiv.add @[to_additive] theorem mul_def [Mul β] (x y : α) : letI := Equiv.mul e x * y = e.symm (e x * e y) := rfl #align equiv.mul_def Equiv.mul_def #align equiv.add_def Equiv.add_def @[to_additive] noncomputable instance [Small.{v} α] [Mul α] : Mul (Shrink.{v} α) := (equivShrink α).symm.mul /-- Transfer `Div` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `Sub` across an `Equiv`"] protected def div [Div β] : Div α := ⟨fun x y => e.symm (e x / e y)⟩ #align equiv.has_div Equiv.div #align equiv.has_sub Equiv.sub @[to_additive] theorem div_def [Div β] (x y : α) : letI := Equiv.div e x / y = e.symm (e x / e y) := rfl #align equiv.div_def Equiv.div_def #align equiv.sub_def Equiv.sub_def @[to_additive] noncomputable instance [Small.{v} α] [Div α] : Div (Shrink.{v} α) := (equivShrink α).symm.div -- Porting note: this should be called `inv`, -- but we already have an `Equiv.inv` (which perhaps should move to `Perm.inv`?) /-- Transfer `Inv` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `Neg` across an `Equiv`"] protected def Inv [Inv β] : Inv α := ⟨fun x => e.symm (e x)⁻¹⟩ #align equiv.has_inv Equiv.Inv #align equiv.has_neg Equiv.Neg @[to_additive] theorem inv_def [Inv β] (x : α) : letI := Equiv.Inv e x⁻¹ = e.symm (e x)⁻¹ := rfl #align equiv.inv_def Equiv.inv_def #align equiv.neg_def Equiv.neg_def @[to_additive] noncomputable instance [Small.{v} α] [Inv α] : Inv (Shrink.{v} α) := (equivShrink α).symm.Inv /-- Transfer `SMul` across an `Equiv` -/ protected abbrev smul (R : Type) [SMul R β] : SMul R α := ⟨fun r x => e.symm (r • e x)⟩ #align equiv.has_smul Equiv.smul theorem smul_def {R : Type} [SMul R β] (r : R) (x : α) : letI := e.smul R r • x = e.symm (r • e x) := rfl #align equiv.smul_def Equiv.smul_def noncomputable instance [Small.{v} α] (R : Type) [SMul R α] : SMul R (Shrink.{v} α) := (equivShrink α).symm.smul R /-- Transfer `Pow` across an `Equiv` -/ @[reducible, to_additive existing smul] protected def pow (N : Type) [Pow β N] : Pow α N := ⟨fun x n => e.symm (e x ^ n)⟩ #align equiv.has_pow Equiv.pow theorem pow_def {N : Type} [Pow β N] (n : N) (x : α) : letI := e.pow N x ^ n = e.symm (e x ^ n) := rfl #align equiv.pow_def Equiv.pow_def noncomputable instance [Small.{v} α] (N : Type) [Pow α N] : Pow (Shrink.{v} α) N := (equivShrink α).symm.pow N /-- An equivalence `e : α ≃ β` gives a multiplicative equivalence `α ≃* β` where the multiplicative structure on `α` is the one obtained by transporting a multiplicative structure on `β` back along `e`. -/ @[to_additive "An equivalence `e : α ≃ β` gives an additive equivalence `α ≃+ β` where the additive structure on `α` is the one obtained by transporting an additive structure on `β` back along `e`."] def mulEquiv (e : α ≃ β) [Mul β] : let mul := Equiv.mul e α ≃* β := by intros exact { e with map_mul' := fun x y => by apply e.symm.injective simp [mul_def] } #align equiv.mul_equiv Equiv.mulEquiv #align equiv.add_equiv Equiv.addEquiv @[to_additive (attr := simp)] theorem mulEquiv_apply (e : α ≃ β) [Mul β] (a : α) : (mulEquiv e) a = e a := rfl #align equiv.mul_equiv_apply Equiv.mulEquiv_apply #align equiv.add_equiv_apply Equiv.addEquiv_apply @[to_additive] theorem mulEquiv_symm_apply (e : α ≃ β) [Mul β] (b : β) : letI := Equiv.mul e (mulEquiv e).symm b = e.symm b := rfl #align equiv.mul_equiv_symm_apply Equiv.mulEquiv_symm_apply #align equiv.add_equiv_symm_apply Equiv.addEquiv_symm_apply /-- Shrink `α` to a smaller universe preserves multiplication. -/ @[to_additive "Shrink `α` to a smaller universe preserves addition."] noncomputable def _root_.Shrink.mulEquiv [Small.{v} α] [Mul α] : Shrink.{v} α ≃* α := (equivShrink α).symm.mulEquiv /-- An equivalence `e : α ≃ β` gives a ring equivalence `α ≃+* β` where the ring structure on `α` is the one obtained by transporting a ring structure on `β` back along `e`. -/ def ringEquiv (e : α ≃ β) [Add β] [Mul β] : by let add := Equiv.add e let mul := Equiv.mul e exact α ≃+* β := by intros exact { e with map_add' := fun x y => by apply e.symm.injective simp [add_def] map_mul' := fun x y => by apply e.symm.injective simp [mul_def] } #align equiv.ring_equiv Equiv.ringEquiv @[simp] theorem ringEquiv_apply (e : α ≃ β) [Add β] [Mul β] (a : α) : (ringEquiv e) a = e a := rfl #align equiv.ring_equiv_apply Equiv.ringEquiv_apply theorem ringEquiv_symm_apply (e : α ≃ β) [Add β] [Mul β] (b : β) : by letI := Equiv.add e letI := Equiv.mul e exact (ringEquiv e).symm b = e.symm b := rfl #align equiv.ring_equiv_symm_apply Equiv.ringEquiv_symm_apply variable (α) in /-- Shrink `α` to a smaller universe preserves ring structure. -/ noncomputable def _root_.Shrink.ringEquiv [Small.{v} α] [Ring α] : Shrink.{v} α ≃+* α := (equivShrink α).symm.ringEquiv /-- Transfer `Semigroup` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `add_semigroup` across an `Equiv`"] protected def semigroup [Semigroup β] : Semigroup α := by let mul := e.mul apply e.injective.semigroup _; intros; exact e.apply_symm_apply _ #align equiv.semigroup Equiv.semigroup #align equiv.add_semigroup Equiv.addSemigroup @[to_additive] noncomputable instance [Small.{v} α] [Semigroup α] : Semigroup (Shrink.{v} α) := (equivShrink α).symm.semigroup /-- Transfer `SemigroupWithZero` across an `Equiv` -/ protected abbrev semigroupWithZero [SemigroupWithZero β] : SemigroupWithZero α := by let mul := e.mul let zero := e.zero apply e.injective.semigroupWithZero _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.semigroup_with_zero Equiv.semigroupWithZero @[to_additive] noncomputable instance [Small.{v} α] [SemigroupWithZero α] : SemigroupWithZero (Shrink.{v} α) := (equivShrink α).symm.semigroupWithZero /-- Transfer `CommSemigroup` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `AddCommSemigroup` across an `Equiv`"] protected def commSemigroup [CommSemigroup β] : CommSemigroup α := by let mul := e.mul apply e.injective.commSemigroup _; intros; exact e.apply_symm_apply _ #align equiv.comm_semigroup Equiv.commSemigroup #align equiv.add_comm_semigroup Equiv.addCommSemigroup @[to_additive] noncomputable instance [Small.{v} α] [CommSemigroup α] : CommSemigroup (Shrink.{v} α) := (equivShrink α).symm.commSemigroup /-- Transfer `MulZeroClass` across an `Equiv` -/ protected abbrev mulZeroClass [MulZeroClass β] : MulZeroClass α := by let zero := e.zero let mul := e.mul apply e.injective.mulZeroClass _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.mul_zero_class Equiv.mulZeroClass noncomputable instance [Small.{v} α] [MulZeroClass α] : MulZeroClass (Shrink.{v} α) := (equivShrink α).symm.mulZeroClass /-- Transfer `MulOneClass` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `AddZeroClass` across an `Equiv`"] protected def mulOneClass [MulOneClass β] : MulOneClass α := by let one := e.one let mul := e.mul apply e.injective.mulOneClass _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.mul_one_class Equiv.mulOneClass #align equiv.add_zero_class Equiv.addZeroClass @[to_additive] noncomputable instance [Small.{v} α] [MulOneClass α] : MulOneClass (Shrink.{v} α) := (equivShrink α).symm.mulOneClass /-- Transfer `MulZeroOneClass` across an `Equiv` -/ protected abbrev mulZeroOneClass [MulZeroOneClass β] : MulZeroOneClass α := by let zero := e.zero let one := e.one let mul := e.mul apply e.injective.mulZeroOneClass _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.mul_zero_one_class Equiv.mulZeroOneClass noncomputable instance [Small.{v} α] [MulZeroOneClass α] : MulZeroOneClass (Shrink.{v} α) := (equivShrink α).symm.mulZeroOneClass /-- Transfer `Monoid` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `AddMonoid` across an `Equiv`"] protected def monoid [Monoid β] : Monoid α := by let one := e.one let mul := e.mul let pow := e.pow ℕ apply e.injective.monoid _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.monoid Equiv.monoid #align equiv.add_monoid Equiv.addMonoid @[to_additive] noncomputable instance [Small.{v} α] [Monoid α] : Monoid (Shrink.{v} α) := (equivShrink α).symm.monoid /-- Transfer `CommMonoid` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `AddCommMonoid` across an `Equiv`"] protected def commMonoid [CommMonoid β] : CommMonoid α := by let one := e.one let mul := e.mul let pow := e.pow ℕ apply e.injective.commMonoid _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.comm_monoid Equiv.commMonoid #align equiv.add_comm_monoid Equiv.addCommMonoid @[to_additive] noncomputable instance [Small.{v} α] [CommMonoid α] : CommMonoid (Shrink.{v} α) := (equivShrink α).symm.commMonoid /-- Transfer `Group` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `AddGroup` across an `Equiv`"] protected def group [Group β] : Group α := by let one := e.one let mul := e.mul let inv := e.Inv let div := e.div let npow := e.pow ℕ let zpow := e.pow ℤ apply e.injective.group _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.group Equiv.group #align equiv.add_group Equiv.addGroup @[to_additive] noncomputable instance [Small.{v} α] [Group α] : Group (Shrink.{v} α) := (equivShrink α).symm.group /-- Transfer `CommGroup` across an `Equiv` -/ @[to_additive (attr := reducible) "Transfer `AddCommGroup` across an `Equiv`"] protected def commGroup [CommGroup β] : CommGroup α := by let one := e.one let mul := e.mul let inv := e.Inv let div := e.div let npow := e.pow ℕ let zpow := e.pow ℤ apply e.injective.commGroup _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.comm_group Equiv.commGroup #align equiv.add_comm_group Equiv.addCommGroup @[to_additive] noncomputable instance [Small.{v} α] [CommGroup α] : CommGroup (Shrink.{v} α) := (equivShrink α).symm.commGroup /-- Transfer `NonUnitalNonAssocSemiring` across an `Equiv` -/ protected abbrev nonUnitalNonAssocSemiring [NonUnitalNonAssocSemiring β] : NonUnitalNonAssocSemiring α := by let zero := e.zero let add := e.add let mul := e.mul let nsmul := e.smul ℕ apply e.injective.nonUnitalNonAssocSemiring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_unital_non_assoc_semiring Equiv.nonUnitalNonAssocSemiring noncomputable instance [Small.{v} α] [NonUnitalNonAssocSemiring α] : NonUnitalNonAssocSemiring (Shrink.{v} α) := (equivShrink α).symm.nonUnitalNonAssocSemiring /-- Transfer `NonUnitalSemiring` across an `Equiv` -/ protected abbrev nonUnitalSemiring [NonUnitalSemiring β] : NonUnitalSemiring α := by let zero := e.zero let add := e.add let mul := e.mul let nsmul := e.smul ℕ apply e.injective.nonUnitalSemiring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_unital_semiring Equiv.nonUnitalSemiring noncomputable instance [Small.{v} α] [NonUnitalSemiring α] : NonUnitalSemiring (Shrink.{v} α) := (equivShrink α).symm.nonUnitalSemiring /-- Transfer `AddMonoidWithOne` across an `Equiv` -/ protected abbrev addMonoidWithOne [AddMonoidWithOne β] : AddMonoidWithOne α := { e.addMonoid, e.one with natCast := fun n => e.symm n natCast_zero := e.injective (by simp [zero_def]) natCast_succ := fun n => e.injective (by simp [add_def, one_def]) } #align equiv.add_monoid_with_one Equiv.addMonoidWithOne noncomputable instance [Small.{v} α] [AddMonoidWithOne α] : AddMonoidWithOne (Shrink.{v} α) := (equivShrink α).symm.addMonoidWithOne /-- Transfer `AddGroupWithOne` across an `Equiv` -/ protected abbrev addGroupWithOne [AddGroupWithOne β] : AddGroupWithOne α := { e.addMonoidWithOne, e.addGroup with intCast := fun n => e.symm n intCast_ofNat := fun n => by simp only [Int.cast_natCast]; rfl intCast_negSucc := fun n => congr_arg e.symm <\| (Int.cast_negSucc _).trans <\| congr_arg _ (e.apply_symm_apply _).symm } #align equiv.add_group_with_one Equiv.addGroupWithOne noncomputable instance [Small.{v} α] [AddGroupWithOne α] : AddGroupWithOne (Shrink.{v} α) := (equivShrink α).symm.addGroupWithOne /-- Transfer `NonAssocSemiring` across an `Equiv` -/ protected abbrev nonAssocSemiring [NonAssocSemiring β] : NonAssocSemiring α := by let mul := e.mul let add_monoid_with_one := e.addMonoidWithOne apply e.injective.nonAssocSemiring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_assoc_semiring Equiv.nonAssocSemiring noncomputable instance [Small.{v} α] [NonAssocSemiring α] : NonAssocSemiring (Shrink.{v} α) := (equivShrink α).symm.nonAssocSemiring /-- Transfer `Semiring` across an `Equiv` -/ protected abbrev semiring [Semiring β] : Semiring α := by let mul := e.mul let add_monoid_with_one := e.addMonoidWithOne let npow := e.pow ℕ apply e.injective.semiring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.semiring Equiv.semiring noncomputable instance [Small.{v} α] [Semiring α] : Semiring (Shrink.{v} α) := (equivShrink α).symm.semiring /-- Transfer `NonUnitalCommSemiring` across an `Equiv` -/ protected abbrev nonUnitalCommSemiring [NonUnitalCommSemiring β] : NonUnitalCommSemiring α := by let zero := e.zero let add := e.add let mul := e.mul let nsmul := e.smul ℕ apply e.injective.nonUnitalCommSemiring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_unital_comm_semiring Equiv.nonUnitalCommSemiring noncomputable instance [Small.{v} α] [NonUnitalCommSemiring α] : NonUnitalCommSemiring (Shrink.{v} α) := (equivShrink α).symm.nonUnitalCommSemiring /-- Transfer `CommSemiring` across an `Equiv` -/ protected abbrev commSemiring [CommSemiring β] : CommSemiring α := by let mul := e.mul let add_monoid_with_one := e.addMonoidWithOne let npow := e.pow ℕ apply e.injective.commSemiring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.comm_semiring Equiv.commSemiring noncomputable instance [Small.{v} α] [CommSemiring α] : CommSemiring (Shrink.{v} α) := (equivShrink α).symm.commSemiring /-- Transfer `NonUnitalNonAssocRing` across an `Equiv` -/ protected abbrev nonUnitalNonAssocRing [NonUnitalNonAssocRing β] : NonUnitalNonAssocRing α := by let zero := e.zero let add := e.add let mul := e.mul let neg := e.Neg let sub := e.sub let nsmul := e.smul ℕ let zsmul := e.smul ℤ apply e.injective.nonUnitalNonAssocRing _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_unital_non_assoc_ring Equiv.nonUnitalNonAssocRing noncomputable instance [Small.{v} α] [NonUnitalNonAssocRing α] : NonUnitalNonAssocRing (Shrink.{v} α) := (equivShrink α).symm.nonUnitalNonAssocRing /-- Transfer `NonUnitalRing` across an `Equiv` -/ protected abbrev nonUnitalRing [NonUnitalRing β] : NonUnitalRing α := by let zero := e.zero let add := e.add let mul := e.mul let neg := e.Neg let sub := e.sub let nsmul := e.smul ℕ let zsmul := e.smul ℤ apply e.injective.nonUnitalRing _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_unital_ring Equiv.nonUnitalRing noncomputable instance [Small.{v} α] [NonUnitalRing α] : NonUnitalRing (Shrink.{v} α) := (equivShrink α).symm.nonUnitalRing /-- Transfer `NonAssocRing` across an `Equiv` -/ protected abbrev nonAssocRing [NonAssocRing β] : NonAssocRing α := by let add_group_with_one := e.addGroupWithOne let mul := e.mul apply e.injective.nonAssocRing _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_assoc_ring Equiv.nonAssocRing noncomputable instance [Small.{v} α] [NonAssocRing α] : NonAssocRing (Shrink.{v} α) := (equivShrink α).symm.nonAssocRing /-- Transfer `Ring` across an `Equiv` -/ protected abbrev ring [Ring β] : Ring α := by let mul := e.mul let add_group_with_one := e.addGroupWithOne let npow := e.pow ℕ apply e.injective.ring _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.ring Equiv.ring noncomputable instance [Small.{v} α] [Ring α] : Ring (Shrink.{v} α) := (equivShrink α).symm.ring /-- Transfer `NonUnitalCommRing` across an `Equiv` -/ protected abbrev nonUnitalCommRing [NonUnitalCommRing β] : NonUnitalCommRing α := by let zero := e.zero let add := e.add let mul := e.mul let neg := e.Neg let sub := e.sub let nsmul := e.smul ℕ let zsmul := e.smul ℤ apply e.injective.nonUnitalCommRing _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.non_unital_comm_ring Equiv.nonUnitalCommRing noncomputable instance [Small.{v} α] [NonUnitalCommRing α] : NonUnitalCommRing (Shrink.{v} α) := (equivShrink α).symm.nonUnitalCommRing /-- Transfer `CommRing` across an `Equiv` -/ protected abbrev commRing [CommRing β] : CommRing α := by let mul := e.mul let add_group_with_one := e.addGroupWithOne let npow := e.pow ℕ apply e.injective.commRing _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.comm_ring Equiv.commRing noncomputable instance [Small.{v} α] [CommRing α] : CommRing (Shrink.{v} α) := (equivShrink α).symm.commRing /-- Transfer `Nontrivial` across an `Equiv` -/ protected theorem nontrivial [Nontrivial β] : Nontrivial α := e.surjective.nontrivial #align equiv.nontrivial Equiv.nontrivial noncomputable instance [Small.{v} α] [Nontrivial α] : Nontrivial (Shrink.{v} α) := (equivShrink α).symm.nontrivial /-- Transfer `IsDomain` across an `Equiv` -/ protected theorem isDomain [Ring α] [Ring β] [IsDomain β] (e : α ≃+* β) : IsDomain α := Function.Injective.isDomain e.toRingHom e.injective #align equiv.is_domain Equiv.isDomain noncomputable instance [Small.{v} α] [Ring α] [IsDomain α] : IsDomain (Shrink.{v} α) := Equiv.isDomain (Shrink.ringEquiv α) /-- Transfer `NNRatCast` across an `Equiv` -/ protected abbrev nnratCast [NNRatCast β] : NNRatCast α where nnratCast q := e.symm q /-- Transfer `RatCast` across an `Equiv` -/ protected abbrev ratCast [RatCast β] : RatCast α where ratCast n := e.symm n #align equiv.has_rat_cast Equiv.ratCast noncomputable instance _root_.Shrink.instNNRatCast [Small.{v} α] [NNRatCast α] : NNRatCast (Shrink.{v} α) := (equivShrink α).symm.nnratCast noncomputable instance _root_.Shrink.instRatCast [Small.{v} α] [RatCast α] : RatCast (Shrink.{v} α) := (equivShrink α).symm.ratCast /-- Transfer `DivisionRing` across an `Equiv` -/ protected abbrev divisionRing [DivisionRing β] : DivisionRing α := by let add_group_with_one := e.addGroupWithOne let inv := e.Inv let div := e.div let mul := e.mul let npow := e.pow ℕ let zpow := e.pow ℤ let nnratCast := e.nnratCast let ratCast := e.ratCast let nnqsmul := e.smul ℚ≥0 let qsmul := e.smul ℚ apply e.injective.divisionRing _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.division_ring Equiv.divisionRing noncomputable instance [Small.{v} α] [DivisionRing α] : DivisionRing (Shrink.{v} α) := (equivShrink α).symm.divisionRing /-- Transfer `Field` across an `Equiv` -/ protected abbrev field [Field β] : Field α := by let add_group_with_one := e.addGroupWithOne let neg := e.Neg let inv := e.Inv let div := e.div let mul := e.mul let npow := e.pow ℕ let zpow := e.pow ℤ let nnratCast := e.nnratCast let ratCast := e.ratCast let nnqsmul := e.smul ℚ≥0 let qsmul := e.smul ℚ apply e.injective.field _ <;> intros <;> exact e.apply_symm_apply _ #align equiv.field Equiv.field noncomputable instance [Small.{v} α] [Field α] : Field (Shrink.{v} α) := (equivShrink α).symm.field section R variable (R : Type) section variable [Monoid R] /-- Transfer `MulAction` across an `Equiv` -/ protected abbrev mulAction (e : α ≃ β) [MulAction R β] : MulAction R α := { e.smul R with one_smul := by simp [smul_def] mul_smul := by simp [smul_def, mul_smul] } #align equiv.mul_action Equiv.mulAction noncomputable instance [Small.{v} α] [MulAction R α] : MulAction R (Shrink.{v} α) := (equivShrink α).symm.mulAction R /-- Transfer `DistribMulAction` across an `Equiv` -/ protected abbrev distribMulAction (e : α ≃ β) [AddCommMonoid β] : letI := Equiv.addCommMonoid e ∀ [DistribMulAction R β], DistribMulAction R α := by intros letI := Equiv.addCommMonoid e exact ({ Equiv.mulAction R e with smul_zero := by simp [zero_def, smul_def] smul_add := by simp [add_def, smul_def, smul_add] } : DistribMulAction R α) #align equiv.distrib_mul_action Equiv.distribMulAction noncomputable instance [Small.{v} α] [AddCommMonoid α] [DistribMulAction R α] : DistribMulAction R (Shrink.{v} α) := (equivShrink α).symm.distribMulAction R end section variable [Semiring R] /-- Transfer `Module` across an `Equiv` -/ protected abbrev module (e : α ≃ β) [AddCommMonoid β] : let addCommMonoid := Equiv.addCommMonoid e ∀ [Module R β], Module R α := by intros exact ({ Equiv.distribMulAction R e with zero_smul := by simp [smul_def, zero_smul, zero_def] add_smul := by simp [add_def, smul_def, add_smul] } : Module R α) #align equiv.module Equiv.module noncomputable instance [Small.{v} α] [AddCommMonoid α] [Module R α] : Module R (Shrink.{v} α) := (equivShrink α).symm.module R /-- An equivalence `e : α ≃ β` gives a linear equivalence `α ≃ₗ[R] β` where the `R`-module structure on `α` is the one obtained by transporting an `R`-module structure on `β` back along `e`. -/ def linearEquiv (e : α ≃ β) [AddCommMonoid β] [Module R β] : by let addCommMonoid := Equiv.addCommMonoid e let module := Equiv.module R e exact α ≃ₗ[R] β := by intros exact { Equiv.addEquiv e with map_smul' := fun r x => by apply e.symm.injective simp only [toFun_as_coe, RingHom.id_apply, EmbeddingLike.apply_eq_iff_eq] exact Iff.mpr (apply_eq_iff_eq_symm_apply _) rfl } #align equiv.linear_equiv Equiv.linearEquiv variable (α) in /-- Shrink `α` to a smaller universe preserves module structure. -/ @[simps!] noncomputable def _root_.Shrink.linearEquiv [Small.{v} α] [AddCommMonoid α] [Module R α] : Shrink.{v} α ≃ₗ[R] α := Equiv.linearEquiv _ (equivShrink α).symm end section variable [CommSemiring R] /-- Transfer `Algebra` across an `Equiv` -/ protected abbrev algebra (e : α ≃ β) [Semiring β] : let semiring := Equiv.semiring e ∀ [Algebra R β], Algebra R α := by intros letI : Module R α := e.module R fapply Algebra.ofModule · intro r x y show e.symm (e (e.symm (r • e x)) e y) = e.symm (r • e.ringEquiv (x * y)) simp only [apply_symm_apply, Algebra.smul_mul_assoc, map_mul, ringEquiv_apply] · intro r x y show e.symm (e x * e (e.symm (r • e y))) = e.symm (r • e (e.symm (e x * e y))) simp only [apply_symm_apply, Algebra.mul_smul_comm] #align equiv.algebra Equiv.algebra lemma algebraMap_def (e : α ≃ β) [Semiring β] [Algebra R β] (r : R) : let semiring := Equiv.semiring e let algebra := Equiv.algebra R e (algebraMap R α) r = e.symm ((algebraMap R β) r) := by intros simp only [Algebra.algebraMap_eq_smul_one] show e.symm (r • e 1) = e.symm (r • 1) simp only [Equiv.one_def, apply_symm_apply] noncomputable instance [Small.{v} α] [Semiring α] [Algebra R α] : Algebra R (Shrink.{v} α) := (equivShrink α).symm.algebra _ /-- An equivalence `e : α ≃ β` gives an algebra equivalence `α ≃ₐ[R] β` where the `R`-algebra structure on `α` is the one obtained by transporting an `R`-algebra structure on `β` back along `e`. -/ def algEquiv (e : α ≃ β) [Semiring β] [Algebra R β] : by let semiring := Equiv.semiring e let algebra := Equiv.algebra R e exact α ≃ₐ[R] β := by intros exact { Equiv.ringEquiv e with commutes' := fun r => by apply e.symm.injective simp only [RingEquiv.toEquiv_eq_coe, toFun_as_coe, EquivLike.coe_coe, ringEquiv_apply, symm_apply_apply, algebraMap_def] } #align equiv.alg_equiv Equiv.algEquiv @[simp] theorem algEquiv_apply (e : α ≃ β) [Semiring β] [Algebra R β] (a : α) : (algEquiv R e) a = e a := rfl	Mathlib/Logic/Equiv/TransferInstance.lean	728	731	theorem algEquiv_symm_apply (e : α ≃ β) [Semiring β] [Algebra R β] (b : β) : by letI := Equiv.semiring e letI := Equiv.algebra R e exact (algEquiv R e).symm b = e.symm b := by	intros; rfl
/- Copyright (c) 2021 Heather Macbeth. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Heather Macbeth -/ import Mathlib.Analysis.MeanInequalities import Mathlib.Analysis.MeanInequalitiesPow import Mathlib.Analysis.SpecialFunctions.Pow.Continuity import Mathlib.Data.Set.Image import Mathlib.Topology.Algebra.Order.LiminfLimsup #align_import analysis.normed_space.lp_space from "leanprover-community/mathlib"@"de83b43717abe353f425855fcf0cedf9ea0fe8a4" /-! # ℓp space This file describes properties of elements `f` of a pi-type `∀ i, E i` with finite "norm", defined for `p : ℝ≥0∞` as the size of the support of `f` if `p=0`, `(∑' a, ‖f a‖^p) ^ (1/p)` for `0 < p < ∞` and `⨆ a, ‖f a‖` for `p=∞`. The Prop-valued `Memℓp f p` states that a function `f : ∀ i, E i` has finite norm according to the above definition; that is, `f` has finite support if `p = 0`, `Summable (fun a ↦ ‖f a‖^p)` if `0 < p < ∞`, and `BddAbove (norm '' (Set.range f))` if `p = ∞`. The space `lp E p` is the subtype of elements of `∀ i : α, E i` which satisfy `Memℓp f p`. For `1 ≤ p`, the "norm" is genuinely a norm and `lp` is a complete metric space. ## Main definitions * `Memℓp f p` : property that the function `f` satisfies, as appropriate, `f` finitely supported if `p = 0`, `Summable (fun a ↦ ‖f a‖^p)` if `0 < p < ∞`, and `BddAbove (norm '' (Set.range f))` if `p = ∞`. * `lp E p` : elements of `∀ i : α, E i` such that `Memℓp f p`. Defined as an `AddSubgroup` of a type synonym `PreLp` for `∀ i : α, E i`, and equipped with a `NormedAddCommGroup` structure. Under appropriate conditions, this is also equipped with the instances `lp.normedSpace`, `lp.completeSpace`. For `p=∞`, there is also `lp.inftyNormedRing`, `lp.inftyNormedAlgebra`, `lp.inftyStarRing` and `lp.inftyCstarRing`. ## Main results * `Memℓp.of_exponent_ge`: For `q ≤ p`, a function which is `Memℓp` for `q` is also `Memℓp` for `p`. * `lp.memℓp_of_tendsto`, `lp.norm_le_of_tendsto`: A pointwise limit of functions in `lp`, all with `lp` norm `≤ C`, is itself in `lp` and has `lp` norm `≤ C`. * `lp.tsum_mul_le_mul_norm`: basic form of Hölder's inequality ## Implementation Since `lp` is defined as an `AddSubgroup`, dot notation does not work. Use `lp.norm_neg f` to say that `‖-f‖ = ‖f‖`, instead of the non-working `f.norm_neg`. ## TODO * More versions of Hölder's inequality (for example: the case `p = 1`, `q = ∞`; a version for normed rings which has `‖∑' i, f i * g i‖` rather than `∑' i, ‖f i‖ * g i‖` on the RHS; a version for three exponents satisfying `1 / r = 1 / p + 1 / q`) -/ noncomputable section open scoped NNReal ENNReal Function variable {α : Type} {E : α → Type} {p q : ℝ≥0∞} [∀ i, NormedAddCommGroup (E i)] /-! ### `Memℓp` predicate -/ /-- The property that `f : ∀ i : α, E i` * is finitely supported, if `p = 0`, or * admits an upper bound for `Set.range (fun i ↦ ‖f i‖)`, if `p = ∞`, or * has the series `∑' i, ‖f i‖ ^ p` be summable, if `0 < p < ∞`. -/ def Memℓp (f : ∀ i, E i) (p : ℝ≥0∞) : Prop := if p = 0 then Set.Finite { i \| f i ≠ 0 } else if p = ∞ then BddAbove (Set.range fun i => ‖f i‖) else Summable fun i => ‖f i‖ ^ p.toReal #align mem_ℓp Memℓp theorem memℓp_zero_iff {f : ∀ i, E i} : Memℓp f 0 ↔ Set.Finite { i \| f i ≠ 0 } := by dsimp [Memℓp] rw [if_pos rfl] #align mem_ℓp_zero_iff memℓp_zero_iff theorem memℓp_zero {f : ∀ i, E i} (hf : Set.Finite { i \| f i ≠ 0 }) : Memℓp f 0 := memℓp_zero_iff.2 hf #align mem_ℓp_zero memℓp_zero theorem memℓp_infty_iff {f : ∀ i, E i} : Memℓp f ∞ ↔ BddAbove (Set.range fun i => ‖f i‖) := by dsimp [Memℓp] rw [if_neg ENNReal.top_ne_zero, if_pos rfl] #align mem_ℓp_infty_iff memℓp_infty_iff theorem memℓp_infty {f : ∀ i, E i} (hf : BddAbove (Set.range fun i => ‖f i‖)) : Memℓp f ∞ := memℓp_infty_iff.2 hf #align mem_ℓp_infty memℓp_infty theorem memℓp_gen_iff (hp : 0 < p.toReal) {f : ∀ i, E i} : Memℓp f p ↔ Summable fun i => ‖f i‖ ^ p.toReal := by rw [ENNReal.toReal_pos_iff] at hp dsimp [Memℓp] rw [if_neg hp.1.ne', if_neg hp.2.ne] #align mem_ℓp_gen_iff memℓp_gen_iff theorem memℓp_gen {f : ∀ i, E i} (hf : Summable fun i => ‖f i‖ ^ p.toReal) : Memℓp f p := by rcases p.trichotomy with (rfl \| rfl \| hp) · apply memℓp_zero have H : Summable fun _ : α => (1 : ℝ) := by simpa using hf exact (Set.Finite.of_summable_const (by norm_num) H).subset (Set.subset_univ _) · apply memℓp_infty have H : Summable fun _ : α => (1 : ℝ) := by simpa using hf simpa using ((Set.Finite.of_summable_const (by norm_num) H).image fun i => ‖f i‖).bddAbove exact (memℓp_gen_iff hp).2 hf #align mem_ℓp_gen memℓp_gen theorem memℓp_gen' {C : ℝ} {f : ∀ i, E i} (hf : ∀ s : Finset α, ∑ i ∈ s, ‖f i‖ ^ p.toReal ≤ C) : Memℓp f p := by apply memℓp_gen use ⨆ s : Finset α, ∑ i ∈ s, ‖f i‖ ^ p.toReal apply hasSum_of_isLUB_of_nonneg · intro b exact Real.rpow_nonneg (norm_nonneg _) _ apply isLUB_ciSup use C rintro - ⟨s, rfl⟩ exact hf s #align mem_ℓp_gen' memℓp_gen' theorem zero_memℓp : Memℓp (0 : ∀ i, E i) p := by rcases p.trichotomy with (rfl \| rfl \| hp) · apply memℓp_zero simp · apply memℓp_infty simp only [norm_zero, Pi.zero_apply] exact bddAbove_singleton.mono Set.range_const_subset · apply memℓp_gen simp [Real.zero_rpow hp.ne', summable_zero] #align zero_mem_ℓp zero_memℓp theorem zero_mem_ℓp' : Memℓp (fun i : α => (0 : E i)) p := zero_memℓp #align zero_mem_ℓp' zero_mem_ℓp' namespace Memℓp theorem finite_dsupport {f : ∀ i, E i} (hf : Memℓp f 0) : Set.Finite { i \| f i ≠ 0 } := memℓp_zero_iff.1 hf #align mem_ℓp.finite_dsupport Memℓp.finite_dsupport theorem bddAbove {f : ∀ i, E i} (hf : Memℓp f ∞) : BddAbove (Set.range fun i => ‖f i‖) := memℓp_infty_iff.1 hf #align mem_ℓp.bdd_above Memℓp.bddAbove theorem summable (hp : 0 < p.toReal) {f : ∀ i, E i} (hf : Memℓp f p) : Summable fun i => ‖f i‖ ^ p.toReal := (memℓp_gen_iff hp).1 hf #align mem_ℓp.summable Memℓp.summable theorem neg {f : ∀ i, E i} (hf : Memℓp f p) : Memℓp (-f) p := by rcases p.trichotomy with (rfl \| rfl \| hp) · apply memℓp_zero simp [hf.finite_dsupport] · apply memℓp_infty simpa using hf.bddAbove · apply memℓp_gen simpa using hf.summable hp #align mem_ℓp.neg Memℓp.neg @[simp] theorem neg_iff {f : ∀ i, E i} : Memℓp (-f) p ↔ Memℓp f p := ⟨fun h => neg_neg f ▸ h.neg, Memℓp.neg⟩ #align mem_ℓp.neg_iff Memℓp.neg_iff theorem of_exponent_ge {p q : ℝ≥0∞} {f : ∀ i, E i} (hfq : Memℓp f q) (hpq : q ≤ p) : Memℓp f p := by rcases ENNReal.trichotomy₂ hpq with (⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩ \| ⟨rfl, hp⟩ \| ⟨rfl, rfl⟩ \| ⟨hq, rfl⟩ \| ⟨hq, _, hpq'⟩) · exact hfq · apply memℓp_infty obtain ⟨C, hC⟩ := (hfq.finite_dsupport.image fun i => ‖f i‖).bddAbove use max 0 C rintro x ⟨i, rfl⟩ by_cases hi : f i = 0 · simp [hi] · exact (hC ⟨i, hi, rfl⟩).trans (le_max_right _ _) · apply memℓp_gen have : ∀ i ∉ hfq.finite_dsupport.toFinset, ‖f i‖ ^ p.toReal = 0 := by intro i hi have : f i = 0 := by simpa using hi simp [this, Real.zero_rpow hp.ne'] exact summable_of_ne_finset_zero this · exact hfq · apply memℓp_infty obtain ⟨A, hA⟩ := (hfq.summable hq).tendsto_cofinite_zero.bddAbove_range_of_cofinite use A ^ q.toReal⁻¹ rintro x ⟨i, rfl⟩ have : 0 ≤ ‖f i‖ ^ q.toReal := by positivity simpa [← Real.rpow_mul, mul_inv_cancel hq.ne'] using Real.rpow_le_rpow this (hA ⟨i, rfl⟩) (inv_nonneg.mpr hq.le) · apply memℓp_gen have hf' := hfq.summable hq refine .of_norm_bounded_eventually _ hf' (@Set.Finite.subset _ { i \| 1 ≤ ‖f i‖ } ?_ _ ?_) · have H : { x : α \| 1 ≤ ‖f x‖ ^ q.toReal }.Finite := by simpa using eventually_lt_of_tendsto_lt (by norm_num) hf'.tendsto_cofinite_zero exact H.subset fun i hi => Real.one_le_rpow hi hq.le · show ∀ i, ¬\|‖f i‖ ^ p.toReal\| ≤ ‖f i‖ ^ q.toReal → 1 ≤ ‖f i‖ intro i hi have : 0 ≤ ‖f i‖ ^ p.toReal := Real.rpow_nonneg (norm_nonneg _) p.toReal simp only [abs_of_nonneg, this] at hi contrapose! hi exact Real.rpow_le_rpow_of_exponent_ge' (norm_nonneg _) hi.le hq.le hpq' #align mem_ℓp.of_exponent_ge Memℓp.of_exponent_ge theorem add {f g : ∀ i, E i} (hf : Memℓp f p) (hg : Memℓp g p) : Memℓp (f + g) p := by rcases p.trichotomy with (rfl \| rfl \| hp) · apply memℓp_zero refine (hf.finite_dsupport.union hg.finite_dsupport).subset fun i => ?_ simp only [Pi.add_apply, Ne, Set.mem_union, Set.mem_setOf_eq] contrapose! rintro ⟨hf', hg'⟩ simp [hf', hg'] · apply memℓp_infty obtain ⟨A, hA⟩ := hf.bddAbove obtain ⟨B, hB⟩ := hg.bddAbove refine ⟨A + B, ?_⟩ rintro a ⟨i, rfl⟩ exact le_trans (norm_add_le _ _) (add_le_add (hA ⟨i, rfl⟩) (hB ⟨i, rfl⟩)) apply memℓp_gen let C : ℝ := if p.toReal < 1 then 1 else (2 : ℝ) ^ (p.toReal - 1) refine .of_nonneg_of_le ?_ (fun i => ?_) (((hf.summable hp).add (hg.summable hp)).mul_left C) · intro; positivity · refine (Real.rpow_le_rpow (norm_nonneg _) (norm_add_le _ _) hp.le).trans ?_ dsimp only [C] split_ifs with h · simpa using NNReal.coe_le_coe.2 (NNReal.rpow_add_le_add_rpow ‖f i‖₊ ‖g i‖₊ hp.le h.le) · let F : Fin 2 → ℝ≥0 := ![‖f i‖₊, ‖g i‖₊] simp only [not_lt] at h simpa [Fin.sum_univ_succ] using Real.rpow_sum_le_const_mul_sum_rpow_of_nonneg Finset.univ h fun i _ => (F i).coe_nonneg #align mem_ℓp.add Memℓp.add theorem sub {f g : ∀ i, E i} (hf : Memℓp f p) (hg : Memℓp g p) : Memℓp (f - g) p := by rw [sub_eq_add_neg]; exact hf.add hg.neg #align mem_ℓp.sub Memℓp.sub theorem finset_sum {ι} (s : Finset ι) {f : ι → ∀ i, E i} (hf : ∀ i ∈ s, Memℓp (f i) p) : Memℓp (fun a => ∑ i ∈ s, f i a) p := by haveI : DecidableEq ι := Classical.decEq _ revert hf refine Finset.induction_on s ?_ ?_ · simp only [zero_mem_ℓp', Finset.sum_empty, imp_true_iff] · intro i s his ih hf simp only [his, Finset.sum_insert, not_false_iff] exact (hf i (s.mem_insert_self i)).add (ih fun j hj => hf j (Finset.mem_insert_of_mem hj)) #align mem_ℓp.finset_sum Memℓp.finset_sum section BoundedSMul variable {𝕜 : Type} [NormedRing 𝕜] [∀ i, Module 𝕜 (E i)] [∀ i, BoundedSMul 𝕜 (E i)] theorem const_smul {f : ∀ i, E i} (hf : Memℓp f p) (c : 𝕜) : Memℓp (c • f) p := by rcases p.trichotomy with (rfl \| rfl \| hp) · apply memℓp_zero refine hf.finite_dsupport.subset fun i => (?_ : ¬c • f i = 0 → ¬f i = 0) exact not_imp_not.mpr fun hf' => hf'.symm ▸ smul_zero c · obtain ⟨A, hA⟩ := hf.bddAbove refine memℓp_infty ⟨‖c‖ A, ?_⟩ rintro a ⟨i, rfl⟩ dsimp only [Pi.smul_apply] refine (norm_smul_le _ _).trans ?_ gcongr exact hA ⟨i, rfl⟩ · apply memℓp_gen dsimp only [Pi.smul_apply] have := (hf.summable hp).mul_left (↑(‖c‖₊ ^ p.toReal) : ℝ) simp_rw [← coe_nnnorm, ← NNReal.coe_rpow, ← NNReal.coe_mul, NNReal.summable_coe, ← NNReal.mul_rpow] at this ⊢ refine NNReal.summable_of_le ?_ this intro i gcongr apply nnnorm_smul_le #align mem_ℓp.const_smul Memℓp.const_smul theorem const_mul {f : α → 𝕜} (hf : Memℓp f p) (c : 𝕜) : Memℓp (fun x => c * f x) p := @Memℓp.const_smul α (fun _ => 𝕜) _ _ 𝕜 _ _ (fun i => by infer_instance) _ hf c #align mem_ℓp.const_mul Memℓp.const_mul end BoundedSMul end Memℓp /-! ### lp space The space of elements of `∀ i, E i` satisfying the predicate `Memℓp`. -/ /-- We define `PreLp E` to be a type synonym for `∀ i, E i` which, importantly, does not inherit the `pi` topology on `∀ i, E i` (otherwise this topology would descend to `lp E p` and conflict with the normed group topology we will later equip it with.) We choose to deal with this issue by making a type synonym for `∀ i, E i` rather than for the `lp` subgroup itself, because this allows all the spaces `lp E p` (for varying `p`) to be subgroups of the same ambient group, which permits lemma statements like `lp.monotone` (below). -/ @[nolint unusedArguments] def PreLp (E : α → Type) [∀ i, NormedAddCommGroup (E i)] : Type _ := ∀ i, E i --deriving AddCommGroup #align pre_lp PreLp instance : AddCommGroup (PreLp E) := by unfold PreLp; infer_instance instance PreLp.unique [IsEmpty α] : Unique (PreLp E) := Pi.uniqueOfIsEmpty E #align pre_lp.unique PreLp.unique /-- lp space -/ def lp (E : α → Type) [∀ i, NormedAddCommGroup (E i)] (p : ℝ≥0∞) : AddSubgroup (PreLp E) where carrier := { f \| Memℓp f p } zero_mem' := zero_memℓp add_mem' := Memℓp.add neg_mem' := Memℓp.neg #align lp lp @[inherit_doc] scoped[lp] notation "ℓ^∞(" ι ", " E ")" => lp (fun i : ι => E) ∞ @[inherit_doc] scoped[lp] notation "ℓ^∞(" ι ")" => lp (fun i : ι => ℝ) ∞ namespace lp -- Porting note: was `Coe` instance : CoeOut (lp E p) (∀ i, E i) := ⟨Subtype.val (α := ∀ i, E i)⟩ -- Porting note: Originally `coeSubtype` instance coeFun : CoeFun (lp E p) fun _ => ∀ i, E i := ⟨fun f => (f : ∀ i, E i)⟩ @[ext] theorem ext {f g : lp E p} (h : (f : ∀ i, E i) = g) : f = g := Subtype.ext h #align lp.ext lp.ext protected theorem ext_iff {f g : lp E p} : f = g ↔ (f : ∀ i, E i) = g := Subtype.ext_iff #align lp.ext_iff lp.ext_iff theorem eq_zero' [IsEmpty α] (f : lp E p) : f = 0 := Subsingleton.elim f 0 #align lp.eq_zero' lp.eq_zero' protected theorem monotone {p q : ℝ≥0∞} (hpq : q ≤ p) : lp E q ≤ lp E p := fun _ hf => Memℓp.of_exponent_ge hf hpq #align lp.monotone lp.monotone protected theorem memℓp (f : lp E p) : Memℓp f p := f.prop #align lp.mem_ℓp lp.memℓp variable (E p) @[simp] theorem coeFn_zero : ⇑(0 : lp E p) = 0 := rfl #align lp.coe_fn_zero lp.coeFn_zero variable {E p} @[simp] theorem coeFn_neg (f : lp E p) : ⇑(-f) = -f := rfl #align lp.coe_fn_neg lp.coeFn_neg @[simp] theorem coeFn_add (f g : lp E p) : ⇑(f + g) = f + g := rfl #align lp.coe_fn_add lp.coeFn_add -- porting note (#10618): removed `@[simp]` because `simp` can prove this theorem coeFn_sum {ι : Type} (f : ι → lp E p) (s : Finset ι) : ⇑(∑ i ∈ s, f i) = ∑ i ∈ s, ⇑(f i) := by simp #align lp.coe_fn_sum lp.coeFn_sum @[simp] theorem coeFn_sub (f g : lp E p) : ⇑(f - g) = f - g := rfl #align lp.coe_fn_sub lp.coeFn_sub instance : Norm (lp E p) where norm f := if hp : p = 0 then by subst hp exact ((lp.memℓp f).finite_dsupport.toFinset.card : ℝ) else if p = ∞ then ⨆ i, ‖f i‖ else (∑' i, ‖f i‖ ^ p.toReal) ^ (1 / p.toReal) theorem norm_eq_card_dsupport (f : lp E 0) : ‖f‖ = (lp.memℓp f).finite_dsupport.toFinset.card := dif_pos rfl #align lp.norm_eq_card_dsupport lp.norm_eq_card_dsupport theorem norm_eq_ciSup (f : lp E ∞) : ‖f‖ = ⨆ i, ‖f i‖ := by dsimp [norm] rw [dif_neg ENNReal.top_ne_zero, if_pos rfl] #align lp.norm_eq_csupr lp.norm_eq_ciSup theorem isLUB_norm [Nonempty α] (f : lp E ∞) : IsLUB (Set.range fun i => ‖f i‖) ‖f‖ := by rw [lp.norm_eq_ciSup] exact isLUB_ciSup (lp.memℓp f) #align lp.is_lub_norm lp.isLUB_norm theorem norm_eq_tsum_rpow (hp : 0 < p.toReal) (f : lp E p) : ‖f‖ = (∑' i, ‖f i‖ ^ p.toReal) ^ (1 / p.toReal) := by dsimp [norm] rw [ENNReal.toReal_pos_iff] at hp rw [dif_neg hp.1.ne', if_neg hp.2.ne] #align lp.norm_eq_tsum_rpow lp.norm_eq_tsum_rpow theorem norm_rpow_eq_tsum (hp : 0 < p.toReal) (f : lp E p) : ‖f‖ ^ p.toReal = ∑' i, ‖f i‖ ^ p.toReal := by rw [norm_eq_tsum_rpow hp, ← Real.rpow_mul] · field_simp apply tsum_nonneg intro i calc (0 : ℝ) = (0 : ℝ) ^ p.toReal := by rw [Real.zero_rpow hp.ne'] _ ≤ _ := by gcongr; apply norm_nonneg #align lp.norm_rpow_eq_tsum lp.norm_rpow_eq_tsum theorem hasSum_norm (hp : 0 < p.toReal) (f : lp E p) : HasSum (fun i => ‖f i‖ ^ p.toReal) (‖f‖ ^ p.toReal) := by rw [norm_rpow_eq_tsum hp] exact ((lp.memℓp f).summable hp).hasSum #align lp.has_sum_norm lp.hasSum_norm theorem norm_nonneg' (f : lp E p) : 0 ≤ ‖f‖ := by rcases p.trichotomy with (rfl \| rfl \| hp) · simp [lp.norm_eq_card_dsupport f] · cases' isEmpty_or_nonempty α with _i _i · rw [lp.norm_eq_ciSup] simp [Real.iSup_of_isEmpty] inhabit α exact (norm_nonneg (f default)).trans ((lp.isLUB_norm f).1 ⟨default, rfl⟩) · rw [lp.norm_eq_tsum_rpow hp f] refine Real.rpow_nonneg (tsum_nonneg ?_) _ exact fun i => Real.rpow_nonneg (norm_nonneg _) _ #align lp.norm_nonneg' lp.norm_nonneg' @[simp] theorem norm_zero : ‖(0 : lp E p)‖ = 0 := by rcases p.trichotomy with (rfl \| rfl \| hp) · simp [lp.norm_eq_card_dsupport] · simp [lp.norm_eq_ciSup] · rw [lp.norm_eq_tsum_rpow hp] have hp' : 1 / p.toReal ≠ 0 := one_div_ne_zero hp.ne' simpa [Real.zero_rpow hp.ne'] using Real.zero_rpow hp' #align lp.norm_zero lp.norm_zero theorem norm_eq_zero_iff {f : lp E p} : ‖f‖ = 0 ↔ f = 0 := by refine ⟨fun h => ?_, by rintro rfl; exact norm_zero⟩ rcases p.trichotomy with (rfl \| rfl \| hp) · ext i have : { i : α \| ¬f i = 0 } = ∅ := by simpa [lp.norm_eq_card_dsupport f] using h have : (¬f i = 0) = False := congr_fun this i tauto · cases' isEmpty_or_nonempty α with _i _i · simp [eq_iff_true_of_subsingleton] have H : IsLUB (Set.range fun i => ‖f i‖) 0 := by simpa [h] using lp.isLUB_norm f ext i have : ‖f i‖ = 0 := le_antisymm (H.1 ⟨i, rfl⟩) (norm_nonneg _) simpa using this · have hf : HasSum (fun i : α => ‖f i‖ ^ p.toReal) 0 := by have := lp.hasSum_norm hp f rwa [h, Real.zero_rpow hp.ne'] at this have : ∀ i, 0 ≤ ‖f i‖ ^ p.toReal := fun i => Real.rpow_nonneg (norm_nonneg _) _ rw [hasSum_zero_iff_of_nonneg this] at hf ext i have : f i = 0 ∧ p.toReal ≠ 0 := by simpa [Real.rpow_eq_zero_iff_of_nonneg (norm_nonneg (f i))] using congr_fun hf i exact this.1 #align lp.norm_eq_zero_iff lp.norm_eq_zero_iff theorem eq_zero_iff_coeFn_eq_zero {f : lp E p} : f = 0 ↔ ⇑f = 0 := by rw [lp.ext_iff, coeFn_zero] #align lp.eq_zero_iff_coe_fn_eq_zero lp.eq_zero_iff_coeFn_eq_zero -- porting note (#11083): this was very slow, so I squeezed the `simp` calls @[simp] theorem norm_neg ⦃f : lp E p⦄ : ‖-f‖ = ‖f‖ := by rcases p.trichotomy with (rfl \| rfl \| hp) · simp only [norm_eq_card_dsupport, coeFn_neg, Pi.neg_apply, ne_eq, neg_eq_zero] · cases isEmpty_or_nonempty α · simp only [lp.eq_zero' f, neg_zero, norm_zero] apply (lp.isLUB_norm (-f)).unique simpa only [coeFn_neg, Pi.neg_apply, norm_neg] using lp.isLUB_norm f · suffices ‖-f‖ ^ p.toReal = ‖f‖ ^ p.toReal by exact Real.rpow_left_injOn hp.ne' (norm_nonneg' _) (norm_nonneg' _) this apply (lp.hasSum_norm hp (-f)).unique simpa only [coeFn_neg, Pi.neg_apply, _root_.norm_neg] using lp.hasSum_norm hp f #align lp.norm_neg lp.norm_neg instance normedAddCommGroup [hp : Fact (1 ≤ p)] : NormedAddCommGroup (lp E p) := AddGroupNorm.toNormedAddCommGroup { toFun := norm map_zero' := norm_zero neg' := norm_neg add_le' := fun f g => by rcases p.dichotomy with (rfl \| hp') · cases isEmpty_or_nonempty α · simp only [lp.eq_zero' f, zero_add, norm_zero, le_refl] refine (lp.isLUB_norm (f + g)).2 ?_ rintro x ⟨i, rfl⟩ refine le_trans ?_ (add_mem_upperBounds_add (lp.isLUB_norm f).1 (lp.isLUB_norm g).1 ⟨_, ⟨i, rfl⟩, _, ⟨i, rfl⟩, rfl⟩) exact norm_add_le (f i) (g i) · have hp'' : 0 < p.toReal := zero_lt_one.trans_le hp' have hf₁ : ∀ i, 0 ≤ ‖f i‖ := fun i => norm_nonneg _ have hg₁ : ∀ i, 0 ≤ ‖g i‖ := fun i => norm_nonneg _ have hf₂ := lp.hasSum_norm hp'' f have hg₂ := lp.hasSum_norm hp'' g -- apply Minkowski's inequality obtain ⟨C, hC₁, hC₂, hCfg⟩ := Real.Lp_add_le_hasSum_of_nonneg hp' hf₁ hg₁ (norm_nonneg' _) (norm_nonneg' _) hf₂ hg₂ refine le_trans ?_ hC₂ rw [← Real.rpow_le_rpow_iff (norm_nonneg' (f + g)) hC₁ hp''] refine hasSum_le ?_ (lp.hasSum_norm hp'' (f + g)) hCfg intro i gcongr apply norm_add_le eq_zero_of_map_eq_zero' := fun f => norm_eq_zero_iff.1 } -- TODO: define an `ENNReal` version of `IsConjExponent`, and then express this inequality -- in a better version which also covers the case `p = 1, q = ∞`. /-- Hölder inequality -/ protected theorem tsum_mul_le_mul_norm {p q : ℝ≥0∞} (hpq : p.toReal.IsConjExponent q.toReal) (f : lp E p) (g : lp E q) : (Summable fun i => ‖f i‖ ‖g i‖) ∧ ∑' i, ‖f i‖ * ‖g i‖ ≤ ‖f‖ * ‖g‖ := by have hf₁ : ∀ i, 0 ≤ ‖f i‖ := fun i => norm_nonneg _ have hg₁ : ∀ i, 0 ≤ ‖g i‖ := fun i => norm_nonneg _ have hf₂ := lp.hasSum_norm hpq.pos f have hg₂ := lp.hasSum_norm hpq.symm.pos g obtain ⟨C, -, hC', hC⟩ := Real.inner_le_Lp_mul_Lq_hasSum_of_nonneg hpq (norm_nonneg' _) (norm_nonneg' _) hf₁ hg₁ hf₂ hg₂ rw [← hC.tsum_eq] at hC' exact ⟨hC.summable, hC'⟩ #align lp.tsum_mul_le_mul_norm lp.tsum_mul_le_mul_norm protected theorem summable_mul {p q : ℝ≥0∞} (hpq : p.toReal.IsConjExponent q.toReal) (f : lp E p) (g : lp E q) : Summable fun i => ‖f i‖ * ‖g i‖ := (lp.tsum_mul_le_mul_norm hpq f g).1 #align lp.summable_mul lp.summable_mul protected theorem tsum_mul_le_mul_norm' {p q : ℝ≥0∞} (hpq : p.toReal.IsConjExponent q.toReal) (f : lp E p) (g : lp E q) : ∑' i, ‖f i‖ * ‖g i‖ ≤ ‖f‖ * ‖g‖ := (lp.tsum_mul_le_mul_norm hpq f g).2 #align lp.tsum_mul_le_mul_norm' lp.tsum_mul_le_mul_norm' section ComparePointwise theorem norm_apply_le_norm (hp : p ≠ 0) (f : lp E p) (i : α) : ‖f i‖ ≤ ‖f‖ := by rcases eq_or_ne p ∞ with (rfl \| hp') · haveI : Nonempty α := ⟨i⟩ exact (isLUB_norm f).1 ⟨i, rfl⟩ have hp'' : 0 < p.toReal := ENNReal.toReal_pos hp hp' have : ∀ i, 0 ≤ ‖f i‖ ^ p.toReal := fun i => Real.rpow_nonneg (norm_nonneg _) _ rw [← Real.rpow_le_rpow_iff (norm_nonneg _) (norm_nonneg' _) hp''] convert le_hasSum (hasSum_norm hp'' f) i fun i _ => this i #align lp.norm_apply_le_norm lp.norm_apply_le_norm theorem sum_rpow_le_norm_rpow (hp : 0 < p.toReal) (f : lp E p) (s : Finset α) : ∑ i ∈ s, ‖f i‖ ^ p.toReal ≤ ‖f‖ ^ p.toReal := by rw [lp.norm_rpow_eq_tsum hp f] have : ∀ i, 0 ≤ ‖f i‖ ^ p.toReal := fun i => Real.rpow_nonneg (norm_nonneg _) _ refine sum_le_tsum _ (fun i _ => this i) ?_ exact (lp.memℓp f).summable hp #align lp.sum_rpow_le_norm_rpow lp.sum_rpow_le_norm_rpow theorem norm_le_of_forall_le' [Nonempty α] {f : lp E ∞} (C : ℝ) (hCf : ∀ i, ‖f i‖ ≤ C) : ‖f‖ ≤ C := by refine (isLUB_norm f).2 ?_ rintro - ⟨i, rfl⟩ exact hCf i #align lp.norm_le_of_forall_le' lp.norm_le_of_forall_le' theorem norm_le_of_forall_le {f : lp E ∞} {C : ℝ} (hC : 0 ≤ C) (hCf : ∀ i, ‖f i‖ ≤ C) : ‖f‖ ≤ C := by cases isEmpty_or_nonempty α · simpa [eq_zero' f] using hC · exact norm_le_of_forall_le' C hCf #align lp.norm_le_of_forall_le lp.norm_le_of_forall_le theorem norm_le_of_tsum_le (hp : 0 < p.toReal) {C : ℝ} (hC : 0 ≤ C) {f : lp E p} (hf : ∑' i, ‖f i‖ ^ p.toReal ≤ C ^ p.toReal) : ‖f‖ ≤ C := by rw [← Real.rpow_le_rpow_iff (norm_nonneg' _) hC hp, norm_rpow_eq_tsum hp] exact hf #align lp.norm_le_of_tsum_le lp.norm_le_of_tsum_le theorem norm_le_of_forall_sum_le (hp : 0 < p.toReal) {C : ℝ} (hC : 0 ≤ C) {f : lp E p} (hf : ∀ s : Finset α, ∑ i ∈ s, ‖f i‖ ^ p.toReal ≤ C ^ p.toReal) : ‖f‖ ≤ C := norm_le_of_tsum_le hp hC (tsum_le_of_sum_le ((lp.memℓp f).summable hp) hf) #align lp.norm_le_of_forall_sum_le lp.norm_le_of_forall_sum_le end ComparePointwise section BoundedSMul variable {𝕜 : Type} {𝕜' : Type} variable [NormedRing 𝕜] [NormedRing 𝕜'] variable [∀ i, Module 𝕜 (E i)] [∀ i, Module 𝕜' (E i)] instance : Module 𝕜 (PreLp E) := Pi.module α E 𝕜 instance [∀ i, SMulCommClass 𝕜' 𝕜 (E i)] : SMulCommClass 𝕜' 𝕜 (PreLp E) := Pi.smulCommClass instance [SMul 𝕜' 𝕜] [∀ i, IsScalarTower 𝕜' 𝕜 (E i)] : IsScalarTower 𝕜' 𝕜 (PreLp E) := Pi.isScalarTower instance [∀ i, Module 𝕜ᵐᵒᵖ (E i)] [∀ i, IsCentralScalar 𝕜 (E i)] : IsCentralScalar 𝕜 (PreLp E) := Pi.isCentralScalar variable [∀ i, BoundedSMul 𝕜 (E i)] [∀ i, BoundedSMul 𝕜' (E i)] theorem mem_lp_const_smul (c : 𝕜) (f : lp E p) : c • (f : PreLp E) ∈ lp E p := (lp.memℓp f).const_smul c #align lp.mem_lp_const_smul lp.mem_lp_const_smul variable (E p 𝕜) /-- The `𝕜`-submodule of elements of `∀ i : α, E i` whose `lp` norm is finite. This is `lp E p`, with extra structure. -/ def _root_.lpSubmodule : Submodule 𝕜 (PreLp E) := { lp E p with smul_mem' := fun c f hf => by simpa using mem_lp_const_smul c ⟨f, hf⟩ } #align lp_submodule lpSubmodule variable {E p 𝕜} theorem coe_lpSubmodule : (lpSubmodule E p 𝕜).toAddSubgroup = lp E p := rfl #align lp.coe_lp_submodule lp.coe_lpSubmodule instance : Module 𝕜 (lp E p) := { (lpSubmodule E p 𝕜).module with } @[simp] theorem coeFn_smul (c : 𝕜) (f : lp E p) : ⇑(c • f) = c • ⇑f := rfl #align lp.coe_fn_smul lp.coeFn_smul instance [∀ i, SMulCommClass 𝕜' 𝕜 (E i)] : SMulCommClass 𝕜' 𝕜 (lp E p) := ⟨fun _ _ _ => Subtype.ext <\| smul_comm _ _ _⟩ instance [SMul 𝕜' 𝕜] [∀ i, IsScalarTower 𝕜' 𝕜 (E i)] : IsScalarTower 𝕜' 𝕜 (lp E p) := ⟨fun _ _ _ => Subtype.ext <\| smul_assoc _ _ _⟩ instance [∀ i, Module 𝕜ᵐᵒᵖ (E i)] [∀ i, IsCentralScalar 𝕜 (E i)] : IsCentralScalar 𝕜 (lp E p) := ⟨fun _ _ => Subtype.ext <\| op_smul_eq_smul _ _⟩ theorem norm_const_smul_le (hp : p ≠ 0) (c : 𝕜) (f : lp E p) : ‖c • f‖ ≤ ‖c‖ * ‖f‖ := by rcases p.trichotomy with (rfl \| rfl \| hp) · exact absurd rfl hp · cases isEmpty_or_nonempty α · simp [lp.eq_zero' f] have hcf := lp.isLUB_norm (c • f) have hfc := (lp.isLUB_norm f).mul_left (norm_nonneg c) simp_rw [← Set.range_comp, Function.comp] at hfc -- TODO: some `IsLUB` API should make it a one-liner from here. refine hcf.right ?_ have := hfc.left simp_rw [mem_upperBounds, Set.mem_range, forall_exists_index, forall_apply_eq_imp_iff] at this ⊢ intro a exact (norm_smul_le _ _).trans (this a) · letI inst : NNNorm (lp E p) := ⟨fun f => ⟨‖f‖, norm_nonneg' _⟩⟩ have coe_nnnorm : ∀ f : lp E p, ↑‖f‖₊ = ‖f‖ := fun _ => rfl suffices ‖c • f‖₊ ^ p.toReal ≤ (‖c‖₊ * ‖f‖₊) ^ p.toReal by rwa [NNReal.rpow_le_rpow_iff hp] at this clear_value inst rw [NNReal.mul_rpow] have hLHS := lp.hasSum_norm hp (c • f) have hRHS := (lp.hasSum_norm hp f).mul_left (‖c‖ ^ p.toReal) simp_rw [← coe_nnnorm, ← _root_.coe_nnnorm, ← NNReal.coe_rpow, ← NNReal.coe_mul, NNReal.hasSum_coe] at hRHS hLHS refine hasSum_mono hLHS hRHS fun i => ?_ dsimp only rw [← NNReal.mul_rpow] -- Porting note: added rw [lp.coeFn_smul, Pi.smul_apply] gcongr apply nnnorm_smul_le #align lp.norm_const_smul_le lp.norm_const_smul_le instance [Fact (1 ≤ p)] : BoundedSMul 𝕜 (lp E p) := BoundedSMul.of_norm_smul_le <\| norm_const_smul_le (zero_lt_one.trans_le <\| Fact.out).ne' end BoundedSMul section DivisionRing variable {𝕜 : Type*} variable [NormedDivisionRing 𝕜] [∀ i, Module 𝕜 (E i)] [∀ i, BoundedSMul 𝕜 (E i)]	Mathlib/Analysis/NormedSpace/lpSpace.lean	701	706	theorem norm_const_smul (hp : p ≠ 0) {c : 𝕜} (f : lp E p) : ‖c • f‖ = ‖c‖ * ‖f‖ := by	obtain rfl \| hc := eq_or_ne c 0 · simp refine le_antisymm (norm_const_smul_le hp c f) ?_ have := mul_le_mul_of_nonneg_left (norm_const_smul_le hp c⁻¹ (c • f)) (norm_nonneg c) rwa [inv_smul_smul₀ hc, norm_inv, mul_inv_cancel_left₀ (norm_ne_zero_iff.mpr hc)] at this
/- Copyright (c) 2017 Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Y. Lewis, Keeley Hoek -/ import Mathlib.Algebra.NeZero import Mathlib.Data.Nat.Defs import Mathlib.Logic.Embedding.Basic import Mathlib.Logic.Equiv.Set import Mathlib.Tactic.Common #align_import data.fin.basic from "leanprover-community/mathlib"@"3a2b5524a138b5d0b818b858b516d4ac8a484b03" /-! # The finite type with `n` elements `Fin n` is the type whose elements are natural numbers smaller than `n`. This file expands on the development in the core library. ## Main definitions ### Induction principles * `finZeroElim` : Elimination principle for the empty set `Fin 0`, generalizes `Fin.elim0`. * `Fin.succRec` : Define `C n i` by induction on `i : Fin n` interpreted as `(0 : Fin (n - i)).succ.succ…`. This function has two arguments: `H0 n` defines `0`-th element `C (n+1) 0` of an `(n+1)`-tuple, and `Hs n i` defines `(i+1)`-st element of `(n+1)`-tuple based on `n`, `i`, and `i`-th element of `n`-tuple. * `Fin.succRecOn` : same as `Fin.succRec` but `i : Fin n` is the first argument; * `Fin.induction` : Define `C i` by induction on `i : Fin (n + 1)`, separating into the `Nat`-like base cases of `C 0` and `C (i.succ)`. * `Fin.inductionOn` : same as `Fin.induction` but with `i : Fin (n + 1)` as the first argument. * `Fin.cases` : define `f : Π i : Fin n.succ, C i` by separately handling the cases `i = 0` and `i = Fin.succ j`, `j : Fin n`, defined using `Fin.induction`. * `Fin.reverseInduction`: reverse induction on `i : Fin (n + 1)`; given `C (Fin.last n)` and `∀ i : Fin n, C (Fin.succ i) → C (Fin.castSucc i)`, constructs all values `C i` by going down; * `Fin.lastCases`: define `f : Π i, Fin (n + 1), C i` by separately handling the cases `i = Fin.last n` and `i = Fin.castSucc j`, a special case of `Fin.reverseInduction`; * `Fin.addCases`: define a function on `Fin (m + n)` by separately handling the cases `Fin.castAdd n i` and `Fin.natAdd m i`; * `Fin.succAboveCases`: given `i : Fin (n + 1)`, define a function on `Fin (n + 1)` by separately handling the cases `j = i` and `j = Fin.succAbove i k`, same as `Fin.insertNth` but marked as eliminator and works for `Sort`. -- Porting note: this is in another file ### Embeddings and isomorphisms `Fin.valEmbedding` : coercion to natural numbers as an `Embedding`; * `Fin.succEmb` : `Fin.succ` as an `Embedding`; * `Fin.castLEEmb h` : `Fin.castLE` as an `Embedding`, embed `Fin n` into `Fin m`, `h : n ≤ m`; * `finCongr` : `Fin.cast` as an `Equiv`, equivalence between `Fin n` and `Fin m` when `n = m`; * `Fin.castAddEmb m` : `Fin.castAdd` as an `Embedding`, embed `Fin n` into `Fin (n+m)`; * `Fin.castSuccEmb` : `Fin.castSucc` as an `Embedding`, embed `Fin n` into `Fin (n+1)`; * `Fin.addNatEmb m i` : `Fin.addNat` as an `Embedding`, add `m` on `i` on the right, generalizes `Fin.succ`; * `Fin.natAddEmb n i` : `Fin.natAdd` as an `Embedding`, adds `n` on `i` on the left; ### Other casts * `Fin.ofNat'`: given a positive number `n` (deduced from `[NeZero n]`), `Fin.ofNat' i` is `i % n` interpreted as an element of `Fin n`; * `Fin.divNat i` : divides `i : Fin (m * n)` by `n`; * `Fin.modNat i` : takes the mod of `i : Fin (m * n)` by `n`; ### Misc definitions * `Fin.revPerm : Equiv.Perm (Fin n)` : `Fin.rev` as an `Equiv.Perm`, the antitone involution given by `i ↦ n-(i+1)` -/ assert_not_exists Monoid universe u v open Fin Nat Function /-- Elimination principle for the empty set `Fin 0`, dependent version. -/ def finZeroElim {α : Fin 0 → Sort} (x : Fin 0) : α x := x.elim0 #align fin_zero_elim finZeroElim namespace Fin instance {n : ℕ} : CanLift ℕ (Fin n) Fin.val (· < n) where prf k hk := ⟨⟨k, hk⟩, rfl⟩ /-- A dependent variant of `Fin.elim0`. -/ def rec0 {α : Fin 0 → Sort} (i : Fin 0) : α i := absurd i.2 (Nat.not_lt_zero _) #align fin.elim0' Fin.elim0 variable {n m : ℕ} --variable {a b : Fin n} -- this really breaks stuff #align fin.fin_to_nat Fin.coeToNat theorem val_injective : Function.Injective (@Fin.val n) := @Fin.eq_of_val_eq n #align fin.val_injective Fin.val_injective /-- If you actually have an element of `Fin n`, then the `n` is always positive -/ lemma size_positive : Fin n → 0 < n := Fin.pos lemma size_positive' [Nonempty (Fin n)] : 0 < n := ‹Nonempty (Fin n)›.elim Fin.pos protected theorem prop (a : Fin n) : a.val < n := a.2 #align fin.prop Fin.prop #align fin.is_lt Fin.is_lt #align fin.pos Fin.pos #align fin.pos_iff_nonempty Fin.pos_iff_nonempty section Order variable {a b c : Fin n} protected lemma lt_of_le_of_lt : a ≤ b → b < c → a < c := Nat.lt_of_le_of_lt protected lemma lt_of_lt_of_le : a < b → b ≤ c → a < c := Nat.lt_of_lt_of_le protected lemma le_rfl : a ≤ a := Nat.le_refl _ protected lemma lt_iff_le_and_ne : a < b ↔ a ≤ b ∧ a ≠ b := by rw [← val_ne_iff]; exact Nat.lt_iff_le_and_ne protected lemma lt_or_lt_of_ne (h : a ≠ b) : a < b ∨ b < a := Nat.lt_or_lt_of_ne $ val_ne_iff.2 h protected lemma lt_or_le (a b : Fin n) : a < b ∨ b ≤ a := Nat.lt_or_ge _ _ protected lemma le_or_lt (a b : Fin n) : a ≤ b ∨ b < a := (b.lt_or_le a).symm protected lemma le_of_eq (hab : a = b) : a ≤ b := Nat.le_of_eq $ congr_arg val hab protected lemma ge_of_eq (hab : a = b) : b ≤ a := Fin.le_of_eq hab.symm protected lemma eq_or_lt_of_le : a ≤ b → a = b ∨ a < b := by rw [ext_iff]; exact Nat.eq_or_lt_of_le protected lemma lt_or_eq_of_le : a ≤ b → a < b ∨ a = b := by rw [ext_iff]; exact Nat.lt_or_eq_of_le end Order lemma lt_last_iff_ne_last {a : Fin (n + 1)} : a < last n ↔ a ≠ last n := by simp [Fin.lt_iff_le_and_ne, le_last] lemma ne_zero_of_lt {a b : Fin (n + 1)} (hab : a < b) : b ≠ 0 := Fin.ne_of_gt $ Fin.lt_of_le_of_lt a.zero_le hab lemma ne_last_of_lt {a b : Fin (n + 1)} (hab : a < b) : a ≠ last n := Fin.ne_of_lt $ Fin.lt_of_lt_of_le hab b.le_last /-- Equivalence between `Fin n` and `{ i // i < n }`. -/ @[simps apply symm_apply] def equivSubtype : Fin n ≃ { i // i < n } where toFun a := ⟨a.1, a.2⟩ invFun a := ⟨a.1, a.2⟩ left_inv := fun ⟨_, _⟩ => rfl right_inv := fun ⟨_, _⟩ => rfl #align fin.equiv_subtype Fin.equivSubtype #align fin.equiv_subtype_symm_apply Fin.equivSubtype_symm_apply #align fin.equiv_subtype_apply Fin.equivSubtype_apply section coe /-! ### coercions and constructions -/ #align fin.eta Fin.eta #align fin.ext Fin.ext #align fin.ext_iff Fin.ext_iff #align fin.coe_injective Fin.val_injective theorem val_eq_val (a b : Fin n) : (a : ℕ) = b ↔ a = b := ext_iff.symm #align fin.coe_eq_coe Fin.val_eq_val @[deprecated ext_iff (since := "2024-02-20")] theorem eq_iff_veq (a b : Fin n) : a = b ↔ a.1 = b.1 := ext_iff #align fin.eq_iff_veq Fin.eq_iff_veq theorem ne_iff_vne (a b : Fin n) : a ≠ b ↔ a.1 ≠ b.1 := ext_iff.not #align fin.ne_iff_vne Fin.ne_iff_vne -- Porting note: I'm not sure if this comment still applies. -- built-in reduction doesn't always work @[simp, nolint simpNF] theorem mk_eq_mk {a h a' h'} : @mk n a h = @mk n a' h' ↔ a = a' := ext_iff #align fin.mk_eq_mk Fin.mk_eq_mk #align fin.mk.inj_iff Fin.mk.inj_iff #align fin.mk_val Fin.val_mk #align fin.eq_mk_iff_coe_eq Fin.eq_mk_iff_val_eq #align fin.coe_mk Fin.val_mk #align fin.mk_coe Fin.mk_val -- syntactic tautologies now #noalign fin.coe_eq_val #noalign fin.val_eq_coe /-- Assume `k = l`. If two functions defined on `Fin k` and `Fin l` are equal on each element, then they coincide (in the heq sense). -/ protected theorem heq_fun_iff {α : Sort} {k l : ℕ} (h : k = l) {f : Fin k → α} {g : Fin l → α} : HEq f g ↔ ∀ i : Fin k, f i = g ⟨(i : ℕ), h ▸ i.2⟩ := by subst h simp [Function.funext_iff] #align fin.heq_fun_iff Fin.heq_fun_iff /-- Assume `k = l` and `k' = l'`. If two functions `Fin k → Fin k' → α` and `Fin l → Fin l' → α` are equal on each pair, then they coincide (in the heq sense). -/ protected theorem heq_fun₂_iff {α : Sort} {k l k' l' : ℕ} (h : k = l) (h' : k' = l') {f : Fin k → Fin k' → α} {g : Fin l → Fin l' → α} : HEq f g ↔ ∀ (i : Fin k) (j : Fin k'), f i j = g ⟨(i : ℕ), h ▸ i.2⟩ ⟨(j : ℕ), h' ▸ j.2⟩ := by subst h subst h' simp [Function.funext_iff] protected theorem heq_ext_iff {k l : ℕ} (h : k = l) {i : Fin k} {j : Fin l} : HEq i j ↔ (i : ℕ) = (j : ℕ) := by subst h simp [val_eq_val] #align fin.heq_ext_iff Fin.heq_ext_iff #align fin.exists_iff Fin.exists_iff #align fin.forall_iff Fin.forall_iff end coe section Order /-! ### order -/ #align fin.is_le Fin.is_le #align fin.is_le' Fin.is_le' #align fin.lt_iff_coe_lt_coe Fin.lt_iff_val_lt_val theorem le_iff_val_le_val {a b : Fin n} : a ≤ b ↔ (a : ℕ) ≤ b := Iff.rfl #align fin.le_iff_coe_le_coe Fin.le_iff_val_le_val #align fin.mk_lt_of_lt_coe Fin.mk_lt_of_lt_val #align fin.mk_le_of_le_coe Fin.mk_le_of_le_val /-- `a < b` as natural numbers if and only if `a < b` in `Fin n`. -/ @[norm_cast, simp] theorem val_fin_lt {n : ℕ} {a b : Fin n} : (a : ℕ) < (b : ℕ) ↔ a < b := Iff.rfl #align fin.coe_fin_lt Fin.val_fin_lt /-- `a ≤ b` as natural numbers if and only if `a ≤ b` in `Fin n`. -/ @[norm_cast, simp] theorem val_fin_le {n : ℕ} {a b : Fin n} : (a : ℕ) ≤ (b : ℕ) ↔ a ≤ b := Iff.rfl #align fin.coe_fin_le Fin.val_fin_le #align fin.mk_le_mk Fin.mk_le_mk #align fin.mk_lt_mk Fin.mk_lt_mk -- @[simp] -- Porting note (#10618): simp can prove this theorem min_val {a : Fin n} : min (a : ℕ) n = a := by simp #align fin.min_coe Fin.min_val -- @[simp] -- Porting note (#10618): simp can prove this theorem max_val {a : Fin n} : max (a : ℕ) n = n := by simp #align fin.max_coe Fin.max_val /-- The inclusion map `Fin n → ℕ` is an embedding. -/ @[simps apply] def valEmbedding : Fin n ↪ ℕ := ⟨val, val_injective⟩ #align fin.coe_embedding Fin.valEmbedding @[simp] theorem equivSubtype_symm_trans_valEmbedding : equivSubtype.symm.toEmbedding.trans valEmbedding = Embedding.subtype (· < n) := rfl #align fin.equiv_subtype_symm_trans_val_embedding Fin.equivSubtype_symm_trans_valEmbedding /-- Use the ordering on `Fin n` for checking recursive definitions. For example, the following definition is not accepted by the termination checker, unless we declare the `WellFoundedRelation` instance: ```lean def factorial {n : ℕ} : Fin n → ℕ \| ⟨0, _⟩ := 1 \| ⟨i + 1, hi⟩ := (i + 1) * factorial ⟨i, i.lt_succ_self.trans hi⟩ ``` -/ instance {n : ℕ} : WellFoundedRelation (Fin n) := measure (val : Fin n → ℕ) /-- Given a positive `n`, `Fin.ofNat' i` is `i % n` as an element of `Fin n`. -/ def ofNat'' [NeZero n] (i : ℕ) : Fin n := ⟨i % n, mod_lt _ n.pos_of_neZero⟩ #align fin.of_nat' Fin.ofNat''ₓ -- Porting note: `Fin.ofNat'` conflicts with something in core (there the hypothesis is `n > 0`), -- so for now we make this double-prime `''`. This is also the reason for the dubious translation. instance {n : ℕ} [NeZero n] : Zero (Fin n) := ⟨ofNat'' 0⟩ instance {n : ℕ} [NeZero n] : One (Fin n) := ⟨ofNat'' 1⟩ #align fin.coe_zero Fin.val_zero /-- The `Fin.val_zero` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem val_zero' (n : ℕ) [NeZero n] : ((0 : Fin n) : ℕ) = 0 := rfl #align fin.val_zero' Fin.val_zero' #align fin.mk_zero Fin.mk_zero /-- The `Fin.zero_le` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] protected theorem zero_le' [NeZero n] (a : Fin n) : 0 ≤ a := Nat.zero_le a.val #align fin.zero_le Fin.zero_le' #align fin.zero_lt_one Fin.zero_lt_one #align fin.not_lt_zero Fin.not_lt_zero /-- The `Fin.pos_iff_ne_zero` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ theorem pos_iff_ne_zero' [NeZero n] (a : Fin n) : 0 < a ↔ a ≠ 0 := by rw [← val_fin_lt, val_zero', Nat.pos_iff_ne_zero, Ne, Ne, ext_iff, val_zero'] #align fin.pos_iff_ne_zero Fin.pos_iff_ne_zero' #align fin.eq_zero_or_eq_succ Fin.eq_zero_or_eq_succ #align fin.eq_succ_of_ne_zero Fin.eq_succ_of_ne_zero @[simp] lemma cast_eq_self (a : Fin n) : cast rfl a = a := rfl theorem rev_involutive : Involutive (rev : Fin n → Fin n) := fun i => ext <\| by dsimp only [rev] rw [← Nat.sub_sub, Nat.sub_sub_self (Nat.add_one_le_iff.2 i.is_lt), Nat.add_sub_cancel_right] #align fin.rev_involutive Fin.rev_involutive /-- `Fin.rev` as an `Equiv.Perm`, the antitone involution `Fin n → Fin n` given by `i ↦ n-(i+1)`. -/ @[simps! apply symm_apply] def revPerm : Equiv.Perm (Fin n) := Involutive.toPerm rev rev_involutive #align fin.rev Fin.revPerm #align fin.coe_rev Fin.val_revₓ theorem rev_injective : Injective (@rev n) := rev_involutive.injective #align fin.rev_injective Fin.rev_injective theorem rev_surjective : Surjective (@rev n) := rev_involutive.surjective #align fin.rev_surjective Fin.rev_surjective theorem rev_bijective : Bijective (@rev n) := rev_involutive.bijective #align fin.rev_bijective Fin.rev_bijective #align fin.rev_inj Fin.rev_injₓ #align fin.rev_rev Fin.rev_revₓ @[simp] theorem revPerm_symm : (@revPerm n).symm = revPerm := rfl #align fin.rev_symm Fin.revPerm_symm #align fin.rev_eq Fin.rev_eqₓ #align fin.rev_le_rev Fin.rev_le_revₓ #align fin.rev_lt_rev Fin.rev_lt_revₓ theorem cast_rev (i : Fin n) (h : n = m) : cast h i.rev = (i.cast h).rev := by subst h; simp theorem rev_eq_iff {i j : Fin n} : rev i = j ↔ i = rev j := by rw [← rev_inj, rev_rev] theorem rev_ne_iff {i j : Fin n} : rev i ≠ j ↔ i ≠ rev j := rev_eq_iff.not theorem rev_lt_iff {i j : Fin n} : rev i < j ↔ rev j < i := by rw [← rev_lt_rev, rev_rev] theorem rev_le_iff {i j : Fin n} : rev i ≤ j ↔ rev j ≤ i := by rw [← rev_le_rev, rev_rev] theorem lt_rev_iff {i j : Fin n} : i < rev j ↔ j < rev i := by rw [← rev_lt_rev, rev_rev] theorem le_rev_iff {i j : Fin n} : i ≤ rev j ↔ j ≤ rev i := by rw [← rev_le_rev, rev_rev] #align fin.last Fin.last #align fin.coe_last Fin.val_last -- Porting note: this is now syntactically equal to `val_last` #align fin.last_val Fin.val_last #align fin.le_last Fin.le_last #align fin.last_pos Fin.last_pos #align fin.eq_last_of_not_lt Fin.eq_last_of_not_lt theorem last_pos' [NeZero n] : 0 < last n := n.pos_of_neZero theorem one_lt_last [NeZero n] : 1 < last (n + 1) := Nat.lt_add_left_iff_pos.2 n.pos_of_neZero end Order section Add /-! ### addition, numerals, and coercion from Nat -/ #align fin.val_one Fin.val_one #align fin.coe_one Fin.val_one @[simp] theorem val_one' (n : ℕ) [NeZero n] : ((1 : Fin n) : ℕ) = 1 % n := rfl #align fin.coe_one' Fin.val_one' -- Porting note: Delete this lemma after porting theorem val_one'' {n : ℕ} : ((1 : Fin (n + 1)) : ℕ) = 1 % (n + 1) := rfl #align fin.one_val Fin.val_one'' #align fin.mk_one Fin.mk_one instance nontrivial {n : ℕ} : Nontrivial (Fin (n + 2)) where exists_pair_ne := ⟨0, 1, (ne_iff_vne 0 1).mpr (by simp [val_one, val_zero])⟩ theorem nontrivial_iff_two_le : Nontrivial (Fin n) ↔ 2 ≤ n := by rcases n with (_ \| _ \| n) <;> simp [← Nat.one_eq_succ_zero, Fin.nontrivial, not_nontrivial, Nat.succ_le_iff] -- Porting note: here and in the next lemma, had to use `← Nat.one_eq_succ_zero`. #align fin.nontrivial_iff_two_le Fin.nontrivial_iff_two_le #align fin.subsingleton_iff_le_one Fin.subsingleton_iff_le_one section Monoid -- Porting note (#10618): removing `simp`, `simp` can prove it with AddCommMonoid instance protected theorem add_zero [NeZero n] (k : Fin n) : k + 0 = k := by simp only [add_def, val_zero', Nat.add_zero, mod_eq_of_lt (is_lt k)] #align fin.add_zero Fin.add_zero -- Porting note (#10618): removing `simp`, `simp` can prove it with AddCommMonoid instance protected theorem zero_add [NeZero n] (k : Fin n) : 0 + k = k := by simp [ext_iff, add_def, mod_eq_of_lt (is_lt k)] #align fin.zero_add Fin.zero_add instance {a : ℕ} [NeZero n] : OfNat (Fin n) a where ofNat := Fin.ofNat' a n.pos_of_neZero instance inhabited (n : ℕ) [NeZero n] : Inhabited (Fin n) := ⟨0⟩ instance inhabitedFinOneAdd (n : ℕ) : Inhabited (Fin (1 + n)) := haveI : NeZero (1 + n) := by rw [Nat.add_comm]; infer_instance inferInstance @[simp] theorem default_eq_zero (n : ℕ) [NeZero n] : (default : Fin n) = 0 := rfl #align fin.default_eq_zero Fin.default_eq_zero section from_ad_hoc @[simp] lemma ofNat'_zero {h : 0 < n} [NeZero n] : (Fin.ofNat' 0 h : Fin n) = 0 := rfl @[simp] lemma ofNat'_one {h : 0 < n} [NeZero n] : (Fin.ofNat' 1 h : Fin n) = 1 := rfl end from_ad_hoc instance instNatCast [NeZero n] : NatCast (Fin n) where natCast n := Fin.ofNat'' n lemma natCast_def [NeZero n] (a : ℕ) : (a : Fin n) = ⟨a % n, mod_lt _ n.pos_of_neZero⟩ := rfl end Monoid #align fin.val_add Fin.val_add #align fin.coe_add Fin.val_add theorem val_add_eq_ite {n : ℕ} (a b : Fin n) : (↑(a + b) : ℕ) = if n ≤ a + b then a + b - n else a + b := by rw [Fin.val_add, Nat.add_mod_eq_ite, Nat.mod_eq_of_lt (show ↑a < n from a.2), Nat.mod_eq_of_lt (show ↑b < n from b.2)] #align fin.coe_add_eq_ite Fin.val_add_eq_ite section deprecated set_option linter.deprecated false @[deprecated] theorem val_bit0 {n : ℕ} (k : Fin n) : ((bit0 k : Fin n) : ℕ) = bit0 (k : ℕ) % n := by cases k rfl #align fin.coe_bit0 Fin.val_bit0 @[deprecated] theorem val_bit1 {n : ℕ} [NeZero n] (k : Fin n) : ((bit1 k : Fin n) : ℕ) = bit1 (k : ℕ) % n := by cases n; · cases' k with k h cases k · show _ % _ = _ simp at h cases' h with _ h simp [bit1, Fin.val_bit0, Fin.val_add, Fin.val_one] #align fin.coe_bit1 Fin.val_bit1 end deprecated #align fin.coe_add_one_of_lt Fin.val_add_one_of_lt #align fin.last_add_one Fin.last_add_one #align fin.coe_add_one Fin.val_add_one section Bit set_option linter.deprecated false @[simp, deprecated] theorem mk_bit0 {m n : ℕ} (h : bit0 m < n) : (⟨bit0 m, h⟩ : Fin n) = (bit0 ⟨m, (Nat.le_add_right m m).trans_lt h⟩ : Fin _) := eq_of_val_eq (Nat.mod_eq_of_lt h).symm #align fin.mk_bit0 Fin.mk_bit0 @[simp, deprecated] theorem mk_bit1 {m n : ℕ} [NeZero n] (h : bit1 m < n) : (⟨bit1 m, h⟩ : Fin n) = (bit1 ⟨m, (Nat.le_add_right m m).trans_lt ((m + m).lt_succ_self.trans h)⟩ : Fin _) := by ext simp only [bit1, bit0] at h simp only [bit1, bit0, val_add, val_one', ← Nat.add_mod, Nat.mod_eq_of_lt h] #align fin.mk_bit1 Fin.mk_bit1 end Bit #align fin.val_two Fin.val_two --- Porting note: syntactically the same as the above #align fin.coe_two Fin.val_two section OfNatCoe @[simp] theorem ofNat''_eq_cast (n : ℕ) [NeZero n] (a : ℕ) : (Fin.ofNat'' a : Fin n) = a := rfl #align fin.of_nat_eq_coe Fin.ofNat''_eq_cast @[simp] lemma val_natCast (a n : ℕ) [NeZero n] : (a : Fin n).val = a % n := rfl @[deprecated (since := "2024-04-17")] alias val_nat_cast := val_natCast -- Porting note: is this the right name for things involving `Nat.cast`? /-- Converting an in-range number to `Fin (n + 1)` produces a result whose value is the original number. -/ theorem val_cast_of_lt {n : ℕ} [NeZero n] {a : ℕ} (h : a < n) : (a : Fin n).val = a := Nat.mod_eq_of_lt h #align fin.coe_val_of_lt Fin.val_cast_of_lt /-- If `n` is non-zero, converting the value of a `Fin n` to `Fin n` results in the same value. -/ @[simp] theorem cast_val_eq_self {n : ℕ} [NeZero n] (a : Fin n) : (a.val : Fin n) = a := ext <\| val_cast_of_lt a.isLt #align fin.coe_val_eq_self Fin.cast_val_eq_self -- Porting note: this is syntactically the same as `val_cast_of_lt` #align fin.coe_coe_of_lt Fin.val_cast_of_lt -- Porting note: this is syntactically the same as `cast_val_of_lt` #align fin.coe_coe_eq_self Fin.cast_val_eq_self @[simp] lemma natCast_self (n : ℕ) [NeZero n] : (n : Fin n) = 0 := by ext; simp @[deprecated (since := "2024-04-17")] alias nat_cast_self := natCast_self @[simp] lemma natCast_eq_zero {a n : ℕ} [NeZero n] : (a : Fin n) = 0 ↔ n ∣ a := by simp [ext_iff, Nat.dvd_iff_mod_eq_zero] @[deprecated (since := "2024-04-17")] alias nat_cast_eq_zero := natCast_eq_zero @[simp] theorem natCast_eq_last (n) : (n : Fin (n + 1)) = Fin.last n := by ext; simp #align fin.coe_nat_eq_last Fin.natCast_eq_last @[deprecated (since := "2024-05-04")] alias cast_nat_eq_last := natCast_eq_last theorem le_val_last (i : Fin (n + 1)) : i ≤ n := by rw [Fin.natCast_eq_last] exact Fin.le_last i #align fin.le_coe_last Fin.le_val_last variable {a b : ℕ} lemma natCast_le_natCast (han : a ≤ n) (hbn : b ≤ n) : (a : Fin (n + 1)) ≤ b ↔ a ≤ b := by rw [← Nat.lt_succ_iff] at han hbn simp [le_iff_val_le_val, -val_fin_le, Nat.mod_eq_of_lt, han, hbn] lemma natCast_lt_natCast (han : a ≤ n) (hbn : b ≤ n) : (a : Fin (n + 1)) < b ↔ a < b := by rw [← Nat.lt_succ_iff] at han hbn; simp [lt_iff_val_lt_val, Nat.mod_eq_of_lt, han, hbn] lemma natCast_mono (hbn : b ≤ n) (hab : a ≤ b) : (a : Fin (n + 1)) ≤ b := (natCast_le_natCast (hab.trans hbn) hbn).2 hab lemma natCast_strictMono (hbn : b ≤ n) (hab : a < b) : (a : Fin (n + 1)) < b := (natCast_lt_natCast (hab.le.trans hbn) hbn).2 hab end OfNatCoe #align fin.add_one_pos Fin.add_one_pos #align fin.one_pos Fin.one_pos #align fin.zero_ne_one Fin.zero_ne_one @[simp] theorem one_eq_zero_iff [NeZero n] : (1 : Fin n) = 0 ↔ n = 1 := by obtain _ \| _ \| n := n <;> simp [Fin.ext_iff] #align fin.one_eq_zero_iff Fin.one_eq_zero_iff @[simp] theorem zero_eq_one_iff [NeZero n] : (0 : Fin n) = 1 ↔ n = 1 := by rw [eq_comm, one_eq_zero_iff] #align fin.zero_eq_one_iff Fin.zero_eq_one_iff end Add section Succ /-! ### succ and casts into larger Fin types -/ #align fin.coe_succ Fin.val_succ #align fin.succ_pos Fin.succ_pos lemma succ_injective (n : ℕ) : Injective (@Fin.succ n) := fun a b ↦ by simp [ext_iff] #align fin.succ_injective Fin.succ_injective /-- `Fin.succ` as an `Embedding` -/ def succEmb (n : ℕ) : Fin n ↪ Fin (n + 1) where toFun := succ inj' := succ_injective _ @[simp] theorem val_succEmb : ⇑(succEmb n) = Fin.succ := rfl #align fin.succ_le_succ_iff Fin.succ_le_succ_iff #align fin.succ_lt_succ_iff Fin.succ_lt_succ_iff @[simp] theorem exists_succ_eq {x : Fin (n + 1)} : (∃ y, Fin.succ y = x) ↔ x ≠ 0 := ⟨fun ⟨_, hy⟩ => hy ▸ succ_ne_zero _, x.cases (fun h => h.irrefl.elim) (fun _ _ => ⟨_, rfl⟩)⟩ #align fin.exists_succ_eq_iff Fin.exists_succ_eq theorem exists_succ_eq_of_ne_zero {x : Fin (n + 1)} (h : x ≠ 0) : ∃ y, Fin.succ y = x := exists_succ_eq.mpr h #align fin.succ_inj Fin.succ_inj #align fin.succ_ne_zero Fin.succ_ne_zero @[simp]	Mathlib/Data/Fin/Basic.lean	671	674	theorem succ_zero_eq_one' [NeZero n] : Fin.succ (0 : Fin n) = 1 := by	cases n · exact (NeZero.ne 0 rfl).elim · rfl
/- Copyright (c) 2018 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau -/ import Mathlib.RingTheory.Ideal.Operations #align_import ring_theory.ideal.operations from "leanprover-community/mathlib"@"e7f0ddbf65bd7181a85edb74b64bdc35ba4bdc74" /-! # Maps on modules and ideals -/ assert_not_exists Basis -- See `RingTheory.Ideal.Basis` assert_not_exists Submodule.hasQuotient -- See `RingTheory.Ideal.QuotientOperations` universe u v w x open Pointwise namespace Ideal section MapAndComap variable {R : Type u} {S : Type v} section Semiring variable {F : Type} [Semiring R] [Semiring S] variable [FunLike F R S] [rc : RingHomClass F R S] variable (f : F) variable {I J : Ideal R} {K L : Ideal S} /-- `I.map f` is the span of the image of the ideal `I` under `f`, which may be bigger than the image itself. -/ def map (I : Ideal R) : Ideal S := span (f '' I) #align ideal.map Ideal.map /-- `I.comap f` is the preimage of `I` under `f`. -/ def comap (I : Ideal S) : Ideal R where carrier := f ⁻¹' I add_mem' {x y} hx hy := by simp only [Set.mem_preimage, SetLike.mem_coe, map_add f] at hx hy ⊢ exact add_mem hx hy zero_mem' := by simp only [Set.mem_preimage, map_zero, SetLike.mem_coe, Submodule.zero_mem] smul_mem' c x hx := by simp only [smul_eq_mul, Set.mem_preimage, map_mul, SetLike.mem_coe] at exact mul_mem_left I _ hx #align ideal.comap Ideal.comap @[simp] theorem coe_comap (I : Ideal S) : (comap f I : Set R) = f ⁻¹' I := rfl variable {f} theorem map_mono (h : I ≤ J) : map f I ≤ map f J := span_mono <\| Set.image_subset _ h #align ideal.map_mono Ideal.map_mono theorem mem_map_of_mem (f : F) {I : Ideal R} {x : R} (h : x ∈ I) : f x ∈ map f I := subset_span ⟨x, h, rfl⟩ #align ideal.mem_map_of_mem Ideal.mem_map_of_mem theorem apply_coe_mem_map (f : F) (I : Ideal R) (x : I) : f x ∈ I.map f := mem_map_of_mem f x.2 #align ideal.apply_coe_mem_map Ideal.apply_coe_mem_map theorem map_le_iff_le_comap : map f I ≤ K ↔ I ≤ comap f K := span_le.trans Set.image_subset_iff #align ideal.map_le_iff_le_comap Ideal.map_le_iff_le_comap @[simp] theorem mem_comap {x} : x ∈ comap f K ↔ f x ∈ K := Iff.rfl #align ideal.mem_comap Ideal.mem_comap theorem comap_mono (h : K ≤ L) : comap f K ≤ comap f L := Set.preimage_mono fun _ hx => h hx #align ideal.comap_mono Ideal.comap_mono variable (f) theorem comap_ne_top (hK : K ≠ ⊤) : comap f K ≠ ⊤ := (ne_top_iff_one _).2 <\| by rw [mem_comap, map_one]; exact (ne_top_iff_one _).1 hK #align ideal.comap_ne_top Ideal.comap_ne_top variable {G : Type} [FunLike G S R] [rcg : RingHomClass G S R] theorem map_le_comap_of_inv_on (g : G) (I : Ideal R) (hf : Set.LeftInvOn g f I) : I.map f ≤ I.comap g := by refine Ideal.span_le.2 ?_ rintro x ⟨x, hx, rfl⟩ rw [SetLike.mem_coe, mem_comap, hf hx] exact hx #align ideal.map_le_comap_of_inv_on Ideal.map_le_comap_of_inv_on theorem comap_le_map_of_inv_on (g : G) (I : Ideal S) (hf : Set.LeftInvOn g f (f ⁻¹' I)) : I.comap f ≤ I.map g := fun x (hx : f x ∈ I) => hf hx ▸ Ideal.mem_map_of_mem g hx #align ideal.comap_le_map_of_inv_on Ideal.comap_le_map_of_inv_on /-- The `Ideal` version of `Set.image_subset_preimage_of_inverse`. -/ theorem map_le_comap_of_inverse (g : G) (I : Ideal R) (h : Function.LeftInverse g f) : I.map f ≤ I.comap g := map_le_comap_of_inv_on _ _ _ <\| h.leftInvOn _ #align ideal.map_le_comap_of_inverse Ideal.map_le_comap_of_inverse /-- The `Ideal` version of `Set.preimage_subset_image_of_inverse`. -/ theorem comap_le_map_of_inverse (g : G) (I : Ideal S) (h : Function.LeftInverse g f) : I.comap f ≤ I.map g := comap_le_map_of_inv_on _ _ _ <\| h.leftInvOn _ #align ideal.comap_le_map_of_inverse Ideal.comap_le_map_of_inverse instance IsPrime.comap [hK : K.IsPrime] : (comap f K).IsPrime := ⟨comap_ne_top _ hK.1, fun {x y} => by simp only [mem_comap, map_mul]; apply hK.2⟩ #align ideal.is_prime.comap Ideal.IsPrime.comap variable (I J K L) theorem map_top : map f ⊤ = ⊤ := (eq_top_iff_one _).2 <\| subset_span ⟨1, trivial, map_one f⟩ #align ideal.map_top Ideal.map_top theorem gc_map_comap : GaloisConnection (Ideal.map f) (Ideal.comap f) := fun _ _ => Ideal.map_le_iff_le_comap #align ideal.gc_map_comap Ideal.gc_map_comap @[simp] theorem comap_id : I.comap (RingHom.id R) = I := Ideal.ext fun _ => Iff.rfl #align ideal.comap_id Ideal.comap_id @[simp] theorem map_id : I.map (RingHom.id R) = I := (gc_map_comap (RingHom.id R)).l_unique GaloisConnection.id comap_id #align ideal.map_id Ideal.map_id theorem comap_comap {T : Type} [Semiring T] {I : Ideal T} (f : R →+* S) (g : S →+* T) : (I.comap g).comap f = I.comap (g.comp f) := rfl #align ideal.comap_comap Ideal.comap_comap theorem map_map {T : Type} [Semiring T] {I : Ideal R} (f : R →+ S) (g : S →+* T) : (I.map f).map g = I.map (g.comp f) := ((gc_map_comap f).compose (gc_map_comap g)).l_unique (gc_map_comap (g.comp f)) fun _ => comap_comap _ _ #align ideal.map_map Ideal.map_map theorem map_span (f : F) (s : Set R) : map f (span s) = span (f '' s) := by refine (Submodule.span_eq_of_le _ ?_ ?_).symm · rintro _ ⟨x, hx, rfl⟩; exact mem_map_of_mem f (subset_span hx) · rw [map_le_iff_le_comap, span_le, coe_comap, ← Set.image_subset_iff] exact subset_span #align ideal.map_span Ideal.map_span variable {f I J K L} theorem map_le_of_le_comap : I ≤ K.comap f → I.map f ≤ K := (gc_map_comap f).l_le #align ideal.map_le_of_le_comap Ideal.map_le_of_le_comap theorem le_comap_of_map_le : I.map f ≤ K → I ≤ K.comap f := (gc_map_comap f).le_u #align ideal.le_comap_of_map_le Ideal.le_comap_of_map_le theorem le_comap_map : I ≤ (I.map f).comap f := (gc_map_comap f).le_u_l _ #align ideal.le_comap_map Ideal.le_comap_map theorem map_comap_le : (K.comap f).map f ≤ K := (gc_map_comap f).l_u_le _ #align ideal.map_comap_le Ideal.map_comap_le @[simp] theorem comap_top : (⊤ : Ideal S).comap f = ⊤ := (gc_map_comap f).u_top #align ideal.comap_top Ideal.comap_top @[simp] theorem comap_eq_top_iff {I : Ideal S} : I.comap f = ⊤ ↔ I = ⊤ := ⟨fun h => I.eq_top_iff_one.mpr (map_one f ▸ mem_comap.mp ((I.comap f).eq_top_iff_one.mp h)), fun h => by rw [h, comap_top]⟩ #align ideal.comap_eq_top_iff Ideal.comap_eq_top_iff @[simp] theorem map_bot : (⊥ : Ideal R).map f = ⊥ := (gc_map_comap f).l_bot #align ideal.map_bot Ideal.map_bot variable (f I J K L) @[simp] theorem map_comap_map : ((I.map f).comap f).map f = I.map f := (gc_map_comap f).l_u_l_eq_l I #align ideal.map_comap_map Ideal.map_comap_map @[simp] theorem comap_map_comap : ((K.comap f).map f).comap f = K.comap f := (gc_map_comap f).u_l_u_eq_u K #align ideal.comap_map_comap Ideal.comap_map_comap theorem map_sup : (I ⊔ J).map f = I.map f ⊔ J.map f := (gc_map_comap f : GaloisConnection (map f) (comap f)).l_sup #align ideal.map_sup Ideal.map_sup theorem comap_inf : comap f (K ⊓ L) = comap f K ⊓ comap f L := rfl #align ideal.comap_inf Ideal.comap_inf variable {ι : Sort} theorem map_iSup (K : ι → Ideal R) : (iSup K).map f = ⨆ i, (K i).map f := (gc_map_comap f : GaloisConnection (map f) (comap f)).l_iSup #align ideal.map_supr Ideal.map_iSup theorem comap_iInf (K : ι → Ideal S) : (iInf K).comap f = ⨅ i, (K i).comap f := (gc_map_comap f : GaloisConnection (map f) (comap f)).u_iInf #align ideal.comap_infi Ideal.comap_iInf theorem map_sSup (s : Set (Ideal R)) : (sSup s).map f = ⨆ I ∈ s, (I : Ideal R).map f := (gc_map_comap f : GaloisConnection (map f) (comap f)).l_sSup #align ideal.map_Sup Ideal.map_sSup theorem comap_sInf (s : Set (Ideal S)) : (sInf s).comap f = ⨅ I ∈ s, (I : Ideal S).comap f := (gc_map_comap f : GaloisConnection (map f) (comap f)).u_sInf #align ideal.comap_Inf Ideal.comap_sInf theorem comap_sInf' (s : Set (Ideal S)) : (sInf s).comap f = ⨅ I ∈ comap f '' s, I := _root_.trans (comap_sInf f s) (by rw [iInf_image]) #align ideal.comap_Inf' Ideal.comap_sInf' theorem comap_isPrime [H : IsPrime K] : IsPrime (comap f K) := ⟨comap_ne_top f H.ne_top, fun {x y} h => H.mem_or_mem <\| by rwa [mem_comap, map_mul] at h⟩ #align ideal.comap_is_prime Ideal.comap_isPrime variable {I J K L} theorem map_inf_le : map f (I ⊓ J) ≤ map f I ⊓ map f J := (gc_map_comap f : GaloisConnection (map f) (comap f)).monotone_l.map_inf_le _ _ #align ideal.map_inf_le Ideal.map_inf_le theorem le_comap_sup : comap f K ⊔ comap f L ≤ comap f (K ⊔ L) := (gc_map_comap f : GaloisConnection (map f) (comap f)).monotone_u.le_map_sup _ _ #align ideal.le_comap_sup Ideal.le_comap_sup -- TODO: Should these be simp lemmas? theorem _root_.element_smul_restrictScalars {R S M} [CommSemiring R] [CommSemiring S] [Algebra R S] [AddCommMonoid M] [Module R M] [Module S M] [IsScalarTower R S M] (r : R) (N : Submodule S M) : (algebraMap R S r • N).restrictScalars R = r • N.restrictScalars R := SetLike.coe_injective (congrArg (· '' _) (funext (algebraMap_smul S r))) theorem smul_restrictScalars {R S M} [CommSemiring R] [CommSemiring S] [Algebra R S] [AddCommMonoid M] [Module R M] [Module S M] [IsScalarTower R S M] (I : Ideal R) (N : Submodule S M) : (I.map (algebraMap R S) • N).restrictScalars R = I • N.restrictScalars R := by simp_rw [map, Submodule.span_smul_eq, ← Submodule.coe_set_smul, Submodule.set_smul_eq_iSup, ← element_smul_restrictScalars, iSup_image] exact (_root_.map_iSup₂ (Submodule.restrictScalarsLatticeHom R S M) _) @[simp] theorem smul_top_eq_map {R S : Type} [CommSemiring R] [CommSemiring S] [Algebra R S] (I : Ideal R) : I • (⊤ : Submodule R S) = (I.map (algebraMap R S)).restrictScalars R := Eq.trans (smul_restrictScalars I (⊤ : Ideal S)).symm <\| congrArg _ <\| Eq.trans (Ideal.smul_eq_mul _ _) (Ideal.mul_top _) #align ideal.smul_top_eq_map Ideal.smul_top_eq_map @[simp] theorem coe_restrictScalars {R S : Type} [CommSemiring R] [Semiring S] [Algebra R S] (I : Ideal S) : (I.restrictScalars R : Set S) = ↑I := rfl #align ideal.coe_restrict_scalars Ideal.coe_restrictScalars /-- The smallest `S`-submodule that contains all `x ∈ I y ∈ J` is also the smallest `R`-submodule that does so. -/ @[simp] theorem restrictScalars_mul {R S : Type} [CommSemiring R] [CommSemiring S] [Algebra R S] (I J : Ideal S) : (I J).restrictScalars R = I.restrictScalars R * J.restrictScalars R := le_antisymm (fun _ hx => Submodule.mul_induction_on hx (fun _ hx _ hy => Submodule.mul_mem_mul hx hy) fun _ _ => Submodule.add_mem _) (Submodule.mul_le.mpr fun _ hx _ hy => Ideal.mul_mem_mul hx hy) #align ideal.restrict_scalars_mul Ideal.restrictScalars_mul section Surjective variable (hf : Function.Surjective f) open Function theorem map_comap_of_surjective (I : Ideal S) : map f (comap f I) = I := le_antisymm (map_le_iff_le_comap.2 le_rfl) fun s hsi => let ⟨r, hfrs⟩ := hf s hfrs ▸ (mem_map_of_mem f <\| show f r ∈ I from hfrs.symm ▸ hsi) #align ideal.map_comap_of_surjective Ideal.map_comap_of_surjective /-- `map` and `comap` are adjoint, and the composition `map f ∘ comap f` is the identity -/ def giMapComap : GaloisInsertion (map f) (comap f) := GaloisInsertion.monotoneIntro (gc_map_comap f).monotone_u (gc_map_comap f).monotone_l (fun _ => le_comap_map) (map_comap_of_surjective _ hf) #align ideal.gi_map_comap Ideal.giMapComap theorem map_surjective_of_surjective : Surjective (map f) := (giMapComap f hf).l_surjective #align ideal.map_surjective_of_surjective Ideal.map_surjective_of_surjective theorem comap_injective_of_surjective : Injective (comap f) := (giMapComap f hf).u_injective #align ideal.comap_injective_of_surjective Ideal.comap_injective_of_surjective theorem map_sup_comap_of_surjective (I J : Ideal S) : (I.comap f ⊔ J.comap f).map f = I ⊔ J := (giMapComap f hf).l_sup_u _ _ #align ideal.map_sup_comap_of_surjective Ideal.map_sup_comap_of_surjective theorem map_iSup_comap_of_surjective (K : ι → Ideal S) : (⨆ i, (K i).comap f).map f = iSup K := (giMapComap f hf).l_iSup_u _ #align ideal.map_supr_comap_of_surjective Ideal.map_iSup_comap_of_surjective theorem map_inf_comap_of_surjective (I J : Ideal S) : (I.comap f ⊓ J.comap f).map f = I ⊓ J := (giMapComap f hf).l_inf_u _ _ #align ideal.map_inf_comap_of_surjective Ideal.map_inf_comap_of_surjective theorem map_iInf_comap_of_surjective (K : ι → Ideal S) : (⨅ i, (K i).comap f).map f = iInf K := (giMapComap f hf).l_iInf_u _ #align ideal.map_infi_comap_of_surjective Ideal.map_iInf_comap_of_surjective theorem mem_image_of_mem_map_of_surjective {I : Ideal R} {y} (H : y ∈ map f I) : y ∈ f '' I := Submodule.span_induction H (fun _ => id) ⟨0, I.zero_mem, map_zero f⟩ (fun _ _ ⟨x1, hx1i, hxy1⟩ ⟨x2, hx2i, hxy2⟩ => ⟨x1 + x2, I.add_mem hx1i hx2i, hxy1 ▸ hxy2 ▸ map_add f _ _⟩) fun c _ ⟨x, hxi, hxy⟩ => let ⟨d, hdc⟩ := hf c ⟨d * x, I.mul_mem_left _ hxi, hdc ▸ hxy ▸ map_mul f _ _⟩ #align ideal.mem_image_of_mem_map_of_surjective Ideal.mem_image_of_mem_map_of_surjective theorem mem_map_iff_of_surjective {I : Ideal R} {y} : y ∈ map f I ↔ ∃ x, x ∈ I ∧ f x = y := ⟨fun h => (Set.mem_image _ _ _).2 (mem_image_of_mem_map_of_surjective f hf h), fun ⟨_, hx⟩ => hx.right ▸ mem_map_of_mem f hx.left⟩ #align ideal.mem_map_iff_of_surjective Ideal.mem_map_iff_of_surjective theorem le_map_of_comap_le_of_surjective : comap f K ≤ I → K ≤ map f I := fun h => map_comap_of_surjective f hf K ▸ map_mono h #align ideal.le_map_of_comap_le_of_surjective Ideal.le_map_of_comap_le_of_surjective theorem map_eq_submodule_map (f : R →+* S) [h : RingHomSurjective f] (I : Ideal R) : I.map f = Submodule.map f.toSemilinearMap I := Submodule.ext fun _ => mem_map_iff_of_surjective f h.1 #align ideal.map_eq_submodule_map Ideal.map_eq_submodule_map end Surjective section Injective variable (hf : Function.Injective f) theorem comap_bot_le_of_injective : comap f ⊥ ≤ I := by refine le_trans (fun x hx => ?_) bot_le rw [mem_comap, Submodule.mem_bot, ← map_zero f] at hx exact Eq.symm (hf hx) ▸ Submodule.zero_mem ⊥ #align ideal.comap_bot_le_of_injective Ideal.comap_bot_le_of_injective theorem comap_bot_of_injective : Ideal.comap f ⊥ = ⊥ := le_bot_iff.mp (Ideal.comap_bot_le_of_injective f hf) #align ideal.comap_bot_of_injective Ideal.comap_bot_of_injective end Injective /-- If `f : R ≃+* S` is a ring isomorphism and `I : Ideal R`, then `map f.symm (map f I) = I`. -/ @[simp]	Mathlib/RingTheory/Ideal/Maps.lean	372	375	theorem map_of_equiv (I : Ideal R) (f : R ≃+* S) : (I.map (f : R →+* S)).map (f.symm : S →+* R) = I := by	rw [← RingEquiv.toRingHom_eq_coe, ← RingEquiv.toRingHom_eq_coe, map_map, RingEquiv.toRingHom_eq_coe, RingEquiv.toRingHom_eq_coe, RingEquiv.symm_comp, map_id]
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Algebra.Group.Support import Mathlib.Data.Int.Cast.Field import Mathlib.Data.Int.Cast.Lemmas #align_import data.int.char_zero from "leanprover-community/mathlib"@"29cb56a7b35f72758b05a30490e1f10bd62c35c1" /-! # Injectivity of `Int.Cast` into characteristic zero rings and fields. -/ open Nat Set variable {α β : Type} namespace Int @[simp, norm_cast] theorem cast_div_charZero {k : Type} [DivisionRing k] [CharZero k] {m n : ℤ} (n_dvd : n ∣ m) : ((m / n : ℤ) : k) = m / n := by rcases eq_or_ne n 0 with (rfl \| hn) · simp [Int.ediv_zero] · exact cast_div n_dvd (cast_ne_zero.mpr hn) #align int.cast_div_char_zero Int.cast_div_charZero -- Necessary for confluence with `ofNat_ediv` and `cast_div_charZero`. @[simp, norm_cast]	Mathlib/Data/Int/CharZero.lean	33	35	theorem cast_div_ofNat_charZero {k : Type*} [DivisionRing k] [CharZero k] {m n : ℕ} (n_dvd : n ∣ m) : (((m : ℤ) / (n : ℤ) : ℤ) : k) = m / n := by	rw [cast_div_charZero (Int.ofNat_dvd.mpr n_dvd), cast_natCast, cast_natCast]
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Yury Kudryashov -/ import Mathlib.Topology.Order.Basic import Mathlib.Data.Set.Pointwise.Basic /-! # Neighborhoods to the left and to the right on an `OrderTopology` We've seen some properties of left and right neighborhood of a point in an `OrderClosedTopology`. In an `OrderTopology`, such neighborhoods can be characterized as the sets containing suitable intervals to the right or to the left of `a`. We give now these characterizations. -/ open Set Filter TopologicalSpace Topology Function open OrderDual (toDual ofDual) variable {α β γ : Type*} section LinearOrder variable [TopologicalSpace α] [LinearOrder α] section OrderTopology variable [OrderTopology α] open List in /-- The following statements are equivalent: 0. `s` is a neighborhood of `a` within `(a, +∞)`; 1. `s` is a neighborhood of `a` within `(a, b]`; 2. `s` is a neighborhood of `a` within `(a, b)`; 3. `s` includes `(a, u)` for some `u ∈ (a, b]`; 4. `s` includes `(a, u)` for some `u > a`. -/ theorem TFAE_mem_nhdsWithin_Ioi {a b : α} (hab : a < b) (s : Set α) : TFAE [s ∈ 𝓝[>] a, s ∈ 𝓝[Ioc a b] a, s ∈ 𝓝[Ioo a b] a, ∃ u ∈ Ioc a b, Ioo a u ⊆ s, ∃ u ∈ Ioi a, Ioo a u ⊆ s] := by tfae_have 1 ↔ 2 · rw [nhdsWithin_Ioc_eq_nhdsWithin_Ioi hab] tfae_have 1 ↔ 3 · rw [nhdsWithin_Ioo_eq_nhdsWithin_Ioi hab] tfae_have 4 → 5 · exact fun ⟨u, umem, hu⟩ => ⟨u, umem.1, hu⟩ tfae_have 5 → 1 · rintro ⟨u, hau, hu⟩ exact mem_of_superset (Ioo_mem_nhdsWithin_Ioi ⟨le_refl a, hau⟩) hu tfae_have 1 → 4 · intro h rcases mem_nhdsWithin_iff_exists_mem_nhds_inter.1 h with ⟨v, va, hv⟩ rcases exists_Ico_subset_of_mem_nhds' va hab with ⟨u, au, hu⟩ exact ⟨u, au, fun x hx => hv ⟨hu ⟨le_of_lt hx.1, hx.2⟩, hx.1⟩⟩ tfae_finish #align tfae_mem_nhds_within_Ioi TFAE_mem_nhdsWithin_Ioi theorem mem_nhdsWithin_Ioi_iff_exists_mem_Ioc_Ioo_subset {a u' : α} {s : Set α} (hu' : a < u') : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioc a u', Ioo a u ⊆ s := (TFAE_mem_nhdsWithin_Ioi hu' s).out 0 3 #align mem_nhds_within_Ioi_iff_exists_mem_Ioc_Ioo_subset mem_nhdsWithin_Ioi_iff_exists_mem_Ioc_Ioo_subset /-- A set is a neighborhood of `a` within `(a, +∞)` if and only if it contains an interval `(a, u)` with `a < u < u'`, provided `a` is not a top element. -/ theorem mem_nhdsWithin_Ioi_iff_exists_Ioo_subset' {a u' : α} {s : Set α} (hu' : a < u') : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioi a, Ioo a u ⊆ s := (TFAE_mem_nhdsWithin_Ioi hu' s).out 0 4 #align mem_nhds_within_Ioi_iff_exists_Ioo_subset' mem_nhdsWithin_Ioi_iff_exists_Ioo_subset' theorem nhdsWithin_Ioi_basis' {a : α} (h : ∃ b, a < b) : (𝓝[>] a).HasBasis (a < ·) (Ioo a) := let ⟨_, h⟩ := h ⟨fun _ => mem_nhdsWithin_Ioi_iff_exists_Ioo_subset' h⟩ lemma nhdsWithin_Ioi_basis [NoMaxOrder α] (a : α) : (𝓝[>] a).HasBasis (a < ·) (Ioo a) := nhdsWithin_Ioi_basis' <\| exists_gt a theorem nhdsWithin_Ioi_eq_bot_iff {a : α} : 𝓝[>] a = ⊥ ↔ IsTop a ∨ ∃ b, a ⋖ b := by by_cases ha : IsTop a · simp [ha, ha.isMax.Ioi_eq] · simp only [ha, false_or] rw [isTop_iff_isMax, not_isMax_iff] at ha simp only [(nhdsWithin_Ioi_basis' ha).eq_bot_iff, covBy_iff_Ioo_eq] /-- A set is a neighborhood of `a` within `(a, +∞)` if and only if it contains an interval `(a, u)` with `a < u`. -/ theorem mem_nhdsWithin_Ioi_iff_exists_Ioo_subset [NoMaxOrder α] {a : α} {s : Set α} : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioi a, Ioo a u ⊆ s := let ⟨_u', hu'⟩ := exists_gt a mem_nhdsWithin_Ioi_iff_exists_Ioo_subset' hu' #align mem_nhds_within_Ioi_iff_exists_Ioo_subset mem_nhdsWithin_Ioi_iff_exists_Ioo_subset /-- The set of points which are isolated on the right is countable when the space is second-countable. -/ theorem countable_setOf_isolated_right [SecondCountableTopology α] : { x : α \| 𝓝[>] x = ⊥ }.Countable := by simp only [nhdsWithin_Ioi_eq_bot_iff, setOf_or] exact (subsingleton_isTop α).countable.union countable_setOf_covBy_right /-- The set of points which are isolated on the left is countable when the space is second-countable. -/ theorem countable_setOf_isolated_left [SecondCountableTopology α] : { x : α \| 𝓝[<] x = ⊥ }.Countable := countable_setOf_isolated_right (α := αᵒᵈ) /-- A set is a neighborhood of `a` within `(a, +∞)` if and only if it contains an interval `(a, u]` with `a < u`. -/	Mathlib/Topology/Order/LeftRightNhds.lean	112	120	theorem mem_nhdsWithin_Ioi_iff_exists_Ioc_subset [NoMaxOrder α] [DenselyOrdered α] {a : α} {s : Set α} : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioi a, Ioc a u ⊆ s := by	rw [mem_nhdsWithin_Ioi_iff_exists_Ioo_subset] constructor · rintro ⟨u, au, as⟩ rcases exists_between au with ⟨v, hv⟩ exact ⟨v, hv.1, fun x hx => as ⟨hx.1, lt_of_le_of_lt hx.2 hv.2⟩⟩ · rintro ⟨u, au, as⟩ exact ⟨u, au, Subset.trans Ioo_subset_Ioc_self as⟩
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Johannes Hölzl, Scott Morrison, Jens Wagemaker -/ import Mathlib.Algebra.MonoidAlgebra.Degree import Mathlib.Algebra.Polynomial.Coeff import Mathlib.Algebra.Polynomial.Monomial import Mathlib.Data.Fintype.BigOperators import Mathlib.Data.Nat.WithBot import Mathlib.Data.Nat.Cast.WithTop import Mathlib.Data.Nat.SuccPred #align_import data.polynomial.degree.definitions from "leanprover-community/mathlib"@"808ea4ebfabeb599f21ec4ae87d6dc969597887f" /-! # Theory of univariate polynomials The definitions include `degree`, `Monic`, `leadingCoeff` Results include - `degree_mul` : The degree of the product is the sum of degrees - `leadingCoeff_add_of_degree_eq` and `leadingCoeff_add_of_degree_lt` : The leading_coefficient of a sum is determined by the leading coefficients and degrees -/ -- Porting note: `Mathlib.Data.Nat.Cast.WithTop` should be imported for `Nat.cast_withBot`. set_option linter.uppercaseLean3 false noncomputable section open Finsupp Finset open Polynomial namespace Polynomial universe u v variable {R : Type u} {S : Type v} {a b c d : R} {n m : ℕ} section Semiring variable [Semiring R] {p q r : R[X]} /-- `degree p` is the degree of the polynomial `p`, i.e. the largest `X`-exponent in `p`. `degree p = some n` when `p ≠ 0` and `n` is the highest power of `X` that appears in `p`, otherwise `degree 0 = ⊥`. -/ def degree (p : R[X]) : WithBot ℕ := p.support.max #align polynomial.degree Polynomial.degree theorem supDegree_eq_degree (p : R[X]) : p.toFinsupp.supDegree WithBot.some = p.degree := max_eq_sup_coe theorem degree_lt_wf : WellFounded fun p q : R[X] => degree p < degree q := InvImage.wf degree wellFounded_lt #align polynomial.degree_lt_wf Polynomial.degree_lt_wf instance : WellFoundedRelation R[X] := ⟨_, degree_lt_wf⟩ /-- `natDegree p` forces `degree p` to ℕ, by defining `natDegree 0 = 0`. -/ def natDegree (p : R[X]) : ℕ := (degree p).unbot' 0 #align polynomial.nat_degree Polynomial.natDegree /-- `leadingCoeff p` gives the coefficient of the highest power of `X` in `p`-/ def leadingCoeff (p : R[X]) : R := coeff p (natDegree p) #align polynomial.leading_coeff Polynomial.leadingCoeff /-- a polynomial is `Monic` if its leading coefficient is 1 -/ def Monic (p : R[X]) := leadingCoeff p = (1 : R) #align polynomial.monic Polynomial.Monic @[nontriviality] theorem monic_of_subsingleton [Subsingleton R] (p : R[X]) : Monic p := Subsingleton.elim _ _ #align polynomial.monic_of_subsingleton Polynomial.monic_of_subsingleton theorem Monic.def : Monic p ↔ leadingCoeff p = 1 := Iff.rfl #align polynomial.monic.def Polynomial.Monic.def instance Monic.decidable [DecidableEq R] : Decidable (Monic p) := by unfold Monic; infer_instance #align polynomial.monic.decidable Polynomial.Monic.decidable @[simp] theorem Monic.leadingCoeff {p : R[X]} (hp : p.Monic) : leadingCoeff p = 1 := hp #align polynomial.monic.leading_coeff Polynomial.Monic.leadingCoeff theorem Monic.coeff_natDegree {p : R[X]} (hp : p.Monic) : p.coeff p.natDegree = 1 := hp #align polynomial.monic.coeff_nat_degree Polynomial.Monic.coeff_natDegree @[simp] theorem degree_zero : degree (0 : R[X]) = ⊥ := rfl #align polynomial.degree_zero Polynomial.degree_zero @[simp] theorem natDegree_zero : natDegree (0 : R[X]) = 0 := rfl #align polynomial.nat_degree_zero Polynomial.natDegree_zero @[simp] theorem coeff_natDegree : coeff p (natDegree p) = leadingCoeff p := rfl #align polynomial.coeff_nat_degree Polynomial.coeff_natDegree @[simp] theorem degree_eq_bot : degree p = ⊥ ↔ p = 0 := ⟨fun h => support_eq_empty.1 (Finset.max_eq_bot.1 h), fun h => h.symm ▸ rfl⟩ #align polynomial.degree_eq_bot Polynomial.degree_eq_bot @[nontriviality] theorem degree_of_subsingleton [Subsingleton R] : degree p = ⊥ := by rw [Subsingleton.elim p 0, degree_zero] #align polynomial.degree_of_subsingleton Polynomial.degree_of_subsingleton @[nontriviality] theorem natDegree_of_subsingleton [Subsingleton R] : natDegree p = 0 := by rw [Subsingleton.elim p 0, natDegree_zero] #align polynomial.nat_degree_of_subsingleton Polynomial.natDegree_of_subsingleton theorem degree_eq_natDegree (hp : p ≠ 0) : degree p = (natDegree p : WithBot ℕ) := by let ⟨n, hn⟩ := not_forall.1 (mt Option.eq_none_iff_forall_not_mem.2 (mt degree_eq_bot.1 hp)) have hn : degree p = some n := Classical.not_not.1 hn rw [natDegree, hn]; rfl #align polynomial.degree_eq_nat_degree Polynomial.degree_eq_natDegree theorem supDegree_eq_natDegree (p : R[X]) : p.toFinsupp.supDegree id = p.natDegree := by obtain rfl\|h := eq_or_ne p 0 · simp apply WithBot.coe_injective rw [← AddMonoidAlgebra.supDegree_withBot_some_comp, Function.comp_id, supDegree_eq_degree, degree_eq_natDegree h, Nat.cast_withBot] rwa [support_toFinsupp, nonempty_iff_ne_empty, Ne, support_eq_empty] theorem degree_eq_iff_natDegree_eq {p : R[X]} {n : ℕ} (hp : p ≠ 0) : p.degree = n ↔ p.natDegree = n := by rw [degree_eq_natDegree hp]; exact WithBot.coe_eq_coe #align polynomial.degree_eq_iff_nat_degree_eq Polynomial.degree_eq_iff_natDegree_eq theorem degree_eq_iff_natDegree_eq_of_pos {p : R[X]} {n : ℕ} (hn : 0 < n) : p.degree = n ↔ p.natDegree = n := by obtain rfl\|h := eq_or_ne p 0 · simp [hn.ne] · exact degree_eq_iff_natDegree_eq h #align polynomial.degree_eq_iff_nat_degree_eq_of_pos Polynomial.degree_eq_iff_natDegree_eq_of_pos theorem natDegree_eq_of_degree_eq_some {p : R[X]} {n : ℕ} (h : degree p = n) : natDegree p = n := by -- Porting note: `Nat.cast_withBot` is required. rw [natDegree, h, Nat.cast_withBot, WithBot.unbot'_coe] #align polynomial.nat_degree_eq_of_degree_eq_some Polynomial.natDegree_eq_of_degree_eq_some theorem degree_ne_of_natDegree_ne {n : ℕ} : p.natDegree ≠ n → degree p ≠ n := mt natDegree_eq_of_degree_eq_some #align polynomial.degree_ne_of_nat_degree_ne Polynomial.degree_ne_of_natDegree_ne @[simp] theorem degree_le_natDegree : degree p ≤ natDegree p := WithBot.giUnbot'Bot.gc.le_u_l _ #align polynomial.degree_le_nat_degree Polynomial.degree_le_natDegree theorem natDegree_eq_of_degree_eq [Semiring S] {q : S[X]} (h : degree p = degree q) : natDegree p = natDegree q := by unfold natDegree; rw [h] #align polynomial.nat_degree_eq_of_degree_eq Polynomial.natDegree_eq_of_degree_eq theorem le_degree_of_ne_zero (h : coeff p n ≠ 0) : (n : WithBot ℕ) ≤ degree p := by rw [Nat.cast_withBot] exact Finset.le_sup (mem_support_iff.2 h) #align polynomial.le_degree_of_ne_zero Polynomial.le_degree_of_ne_zero theorem le_natDegree_of_ne_zero (h : coeff p n ≠ 0) : n ≤ natDegree p := by rw [← Nat.cast_le (α := WithBot ℕ), ← degree_eq_natDegree] · exact le_degree_of_ne_zero h · rintro rfl exact h rfl #align polynomial.le_nat_degree_of_ne_zero Polynomial.le_natDegree_of_ne_zero theorem le_natDegree_of_mem_supp (a : ℕ) : a ∈ p.support → a ≤ natDegree p := le_natDegree_of_ne_zero ∘ mem_support_iff.mp #align polynomial.le_nat_degree_of_mem_supp Polynomial.le_natDegree_of_mem_supp theorem degree_eq_of_le_of_coeff_ne_zero (pn : p.degree ≤ n) (p1 : p.coeff n ≠ 0) : p.degree = n := pn.antisymm (le_degree_of_ne_zero p1) #align polynomial.degree_eq_of_le_of_coeff_ne_zero Polynomial.degree_eq_of_le_of_coeff_ne_zero theorem natDegree_eq_of_le_of_coeff_ne_zero (pn : p.natDegree ≤ n) (p1 : p.coeff n ≠ 0) : p.natDegree = n := pn.antisymm (le_natDegree_of_ne_zero p1) #align polynomial.nat_degree_eq_of_le_of_coeff_ne_zero Polynomial.natDegree_eq_of_le_of_coeff_ne_zero theorem degree_mono [Semiring S] {f : R[X]} {g : S[X]} (h : f.support ⊆ g.support) : f.degree ≤ g.degree := Finset.sup_mono h #align polynomial.degree_mono Polynomial.degree_mono theorem supp_subset_range (h : natDegree p < m) : p.support ⊆ Finset.range m := fun _n hn => mem_range.2 <\| (le_natDegree_of_mem_supp _ hn).trans_lt h #align polynomial.supp_subset_range Polynomial.supp_subset_range theorem supp_subset_range_natDegree_succ : p.support ⊆ Finset.range (natDegree p + 1) := supp_subset_range (Nat.lt_succ_self _) #align polynomial.supp_subset_range_nat_degree_succ Polynomial.supp_subset_range_natDegree_succ theorem degree_le_degree (h : coeff q (natDegree p) ≠ 0) : degree p ≤ degree q := by by_cases hp : p = 0 · rw [hp, degree_zero] exact bot_le · rw [degree_eq_natDegree hp] exact le_degree_of_ne_zero h #align polynomial.degree_le_degree Polynomial.degree_le_degree theorem natDegree_le_iff_degree_le {n : ℕ} : natDegree p ≤ n ↔ degree p ≤ n := WithBot.unbot'_le_iff (fun _ ↦ bot_le) #align polynomial.nat_degree_le_iff_degree_le Polynomial.natDegree_le_iff_degree_le theorem natDegree_lt_iff_degree_lt (hp : p ≠ 0) : p.natDegree < n ↔ p.degree < ↑n := WithBot.unbot'_lt_iff (absurd · (degree_eq_bot.not.mpr hp)) #align polynomial.nat_degree_lt_iff_degree_lt Polynomial.natDegree_lt_iff_degree_lt alias ⟨degree_le_of_natDegree_le, natDegree_le_of_degree_le⟩ := natDegree_le_iff_degree_le #align polynomial.degree_le_of_nat_degree_le Polynomial.degree_le_of_natDegree_le #align polynomial.nat_degree_le_of_degree_le Polynomial.natDegree_le_of_degree_le theorem natDegree_le_natDegree [Semiring S] {q : S[X]} (hpq : p.degree ≤ q.degree) : p.natDegree ≤ q.natDegree := WithBot.giUnbot'Bot.gc.monotone_l hpq #align polynomial.nat_degree_le_nat_degree Polynomial.natDegree_le_natDegree theorem natDegree_lt_natDegree {p q : R[X]} (hp : p ≠ 0) (hpq : p.degree < q.degree) : p.natDegree < q.natDegree := by by_cases hq : q = 0 · exact (not_lt_bot <\| hq ▸ hpq).elim rwa [degree_eq_natDegree hp, degree_eq_natDegree hq, Nat.cast_lt] at hpq #align polynomial.nat_degree_lt_nat_degree Polynomial.natDegree_lt_natDegree @[simp] theorem degree_C (ha : a ≠ 0) : degree (C a) = (0 : WithBot ℕ) := by rw [degree, ← monomial_zero_left, support_monomial 0 ha, max_eq_sup_coe, sup_singleton, WithBot.coe_zero] #align polynomial.degree_C Polynomial.degree_C theorem degree_C_le : degree (C a) ≤ 0 := by by_cases h : a = 0 · rw [h, C_0] exact bot_le · rw [degree_C h] #align polynomial.degree_C_le Polynomial.degree_C_le theorem degree_C_lt : degree (C a) < 1 := degree_C_le.trans_lt <\| WithBot.coe_lt_coe.mpr zero_lt_one #align polynomial.degree_C_lt Polynomial.degree_C_lt theorem degree_one_le : degree (1 : R[X]) ≤ (0 : WithBot ℕ) := by rw [← C_1]; exact degree_C_le #align polynomial.degree_one_le Polynomial.degree_one_le @[simp] theorem natDegree_C (a : R) : natDegree (C a) = 0 := by by_cases ha : a = 0 · have : C a = 0 := by rw [ha, C_0] rw [natDegree, degree_eq_bot.2 this, WithBot.unbot'_bot] · rw [natDegree, degree_C ha, WithBot.unbot_zero'] #align polynomial.nat_degree_C Polynomial.natDegree_C @[simp] theorem natDegree_one : natDegree (1 : R[X]) = 0 := natDegree_C 1 #align polynomial.nat_degree_one Polynomial.natDegree_one @[simp] theorem natDegree_natCast (n : ℕ) : natDegree (n : R[X]) = 0 := by simp only [← C_eq_natCast, natDegree_C] #align polynomial.nat_degree_nat_cast Polynomial.natDegree_natCast @[deprecated (since := "2024-04-17")] alias natDegree_nat_cast := natDegree_natCast theorem degree_natCast_le (n : ℕ) : degree (n : R[X]) ≤ 0 := degree_le_of_natDegree_le (by simp) @[deprecated (since := "2024-04-17")] alias degree_nat_cast_le := degree_natCast_le @[simp] theorem degree_monomial (n : ℕ) (ha : a ≠ 0) : degree (monomial n a) = n := by rw [degree, support_monomial n ha, max_singleton, Nat.cast_withBot] #align polynomial.degree_monomial Polynomial.degree_monomial @[simp] theorem degree_C_mul_X_pow (n : ℕ) (ha : a ≠ 0) : degree (C a * X ^ n) = n := by rw [C_mul_X_pow_eq_monomial, degree_monomial n ha] #align polynomial.degree_C_mul_X_pow Polynomial.degree_C_mul_X_pow theorem degree_C_mul_X (ha : a ≠ 0) : degree (C a * X) = 1 := by simpa only [pow_one] using degree_C_mul_X_pow 1 ha #align polynomial.degree_C_mul_X Polynomial.degree_C_mul_X theorem degree_monomial_le (n : ℕ) (a : R) : degree (monomial n a) ≤ n := letI := Classical.decEq R if h : a = 0 then by rw [h, (monomial n).map_zero, degree_zero]; exact bot_le else le_of_eq (degree_monomial n h) #align polynomial.degree_monomial_le Polynomial.degree_monomial_le theorem degree_C_mul_X_pow_le (n : ℕ) (a : R) : degree (C a * X ^ n) ≤ n := by rw [C_mul_X_pow_eq_monomial] apply degree_monomial_le #align polynomial.degree_C_mul_X_pow_le Polynomial.degree_C_mul_X_pow_le theorem degree_C_mul_X_le (a : R) : degree (C a * X) ≤ 1 := by simpa only [pow_one] using degree_C_mul_X_pow_le 1 a #align polynomial.degree_C_mul_X_le Polynomial.degree_C_mul_X_le @[simp] theorem natDegree_C_mul_X_pow (n : ℕ) (a : R) (ha : a ≠ 0) : natDegree (C a * X ^ n) = n := natDegree_eq_of_degree_eq_some (degree_C_mul_X_pow n ha) #align polynomial.nat_degree_C_mul_X_pow Polynomial.natDegree_C_mul_X_pow @[simp] theorem natDegree_C_mul_X (a : R) (ha : a ≠ 0) : natDegree (C a * X) = 1 := by simpa only [pow_one] using natDegree_C_mul_X_pow 1 a ha #align polynomial.nat_degree_C_mul_X Polynomial.natDegree_C_mul_X @[simp] theorem natDegree_monomial [DecidableEq R] (i : ℕ) (r : R) : natDegree (monomial i r) = if r = 0 then 0 else i := by split_ifs with hr · simp [hr] · rw [← C_mul_X_pow_eq_monomial, natDegree_C_mul_X_pow i r hr] #align polynomial.nat_degree_monomial Polynomial.natDegree_monomial theorem natDegree_monomial_le (a : R) {m : ℕ} : (monomial m a).natDegree ≤ m := by classical rw [Polynomial.natDegree_monomial] split_ifs exacts [Nat.zero_le _, le_rfl] #align polynomial.nat_degree_monomial_le Polynomial.natDegree_monomial_le theorem natDegree_monomial_eq (i : ℕ) {r : R} (r0 : r ≠ 0) : (monomial i r).natDegree = i := letI := Classical.decEq R Eq.trans (natDegree_monomial _ _) (if_neg r0) #align polynomial.nat_degree_monomial_eq Polynomial.natDegree_monomial_eq theorem coeff_eq_zero_of_degree_lt (h : degree p < n) : coeff p n = 0 := Classical.not_not.1 (mt le_degree_of_ne_zero (not_le_of_gt h)) #align polynomial.coeff_eq_zero_of_degree_lt Polynomial.coeff_eq_zero_of_degree_lt theorem coeff_eq_zero_of_natDegree_lt {p : R[X]} {n : ℕ} (h : p.natDegree < n) : p.coeff n = 0 := by apply coeff_eq_zero_of_degree_lt by_cases hp : p = 0 · subst hp exact WithBot.bot_lt_coe n · rwa [degree_eq_natDegree hp, Nat.cast_lt] #align polynomial.coeff_eq_zero_of_nat_degree_lt Polynomial.coeff_eq_zero_of_natDegree_lt theorem ext_iff_natDegree_le {p q : R[X]} {n : ℕ} (hp : p.natDegree ≤ n) (hq : q.natDegree ≤ n) : p = q ↔ ∀ i ≤ n, p.coeff i = q.coeff i := by refine Iff.trans Polynomial.ext_iff ?_ refine forall_congr' fun i => ⟨fun h _ => h, fun h => ?_⟩ refine (le_or_lt i n).elim h fun k => ?_ exact (coeff_eq_zero_of_natDegree_lt (hp.trans_lt k)).trans (coeff_eq_zero_of_natDegree_lt (hq.trans_lt k)).symm #align polynomial.ext_iff_nat_degree_le Polynomial.ext_iff_natDegree_le theorem ext_iff_degree_le {p q : R[X]} {n : ℕ} (hp : p.degree ≤ n) (hq : q.degree ≤ n) : p = q ↔ ∀ i ≤ n, p.coeff i = q.coeff i := ext_iff_natDegree_le (natDegree_le_of_degree_le hp) (natDegree_le_of_degree_le hq) #align polynomial.ext_iff_degree_le Polynomial.ext_iff_degree_le @[simp] theorem coeff_natDegree_succ_eq_zero {p : R[X]} : p.coeff (p.natDegree + 1) = 0 := coeff_eq_zero_of_natDegree_lt (lt_add_one _) #align polynomial.coeff_nat_degree_succ_eq_zero Polynomial.coeff_natDegree_succ_eq_zero -- We need the explicit `Decidable` argument here because an exotic one shows up in a moment! theorem ite_le_natDegree_coeff (p : R[X]) (n : ℕ) (I : Decidable (n < 1 + natDegree p)) : @ite _ (n < 1 + natDegree p) I (coeff p n) 0 = coeff p n := by split_ifs with h · rfl · exact (coeff_eq_zero_of_natDegree_lt (not_le.1 fun w => h (Nat.lt_one_add_iff.2 w))).symm #align polynomial.ite_le_nat_degree_coeff Polynomial.ite_le_natDegree_coeff theorem as_sum_support (p : R[X]) : p = ∑ i ∈ p.support, monomial i (p.coeff i) := (sum_monomial_eq p).symm #align polynomial.as_sum_support Polynomial.as_sum_support theorem as_sum_support_C_mul_X_pow (p : R[X]) : p = ∑ i ∈ p.support, C (p.coeff i) * X ^ i := _root_.trans p.as_sum_support <\| by simp only [C_mul_X_pow_eq_monomial] #align polynomial.as_sum_support_C_mul_X_pow Polynomial.as_sum_support_C_mul_X_pow /-- We can reexpress a sum over `p.support` as a sum over `range n`, for any `n` satisfying `p.natDegree < n`. -/ theorem sum_over_range' [AddCommMonoid S] (p : R[X]) {f : ℕ → R → S} (h : ∀ n, f n 0 = 0) (n : ℕ) (w : p.natDegree < n) : p.sum f = ∑ a ∈ range n, f a (coeff p a) := by rcases p with ⟨⟩ have := supp_subset_range w simp only [Polynomial.sum, support, coeff, natDegree, degree] at this ⊢ exact Finsupp.sum_of_support_subset _ this _ fun n _hn => h n #align polynomial.sum_over_range' Polynomial.sum_over_range' /-- We can reexpress a sum over `p.support` as a sum over `range (p.natDegree + 1)`. -/ theorem sum_over_range [AddCommMonoid S] (p : R[X]) {f : ℕ → R → S} (h : ∀ n, f n 0 = 0) : p.sum f = ∑ a ∈ range (p.natDegree + 1), f a (coeff p a) := sum_over_range' p h (p.natDegree + 1) (lt_add_one _) #align polynomial.sum_over_range Polynomial.sum_over_range -- TODO this is essentially a duplicate of `sum_over_range`, and should be removed. theorem sum_fin [AddCommMonoid S] (f : ℕ → R → S) (hf : ∀ i, f i 0 = 0) {n : ℕ} {p : R[X]} (hn : p.degree < n) : (∑ i : Fin n, f i (p.coeff i)) = p.sum f := by by_cases hp : p = 0 · rw [hp, sum_zero_index, Finset.sum_eq_zero] intro i _ exact hf i rw [sum_over_range' _ hf n ((natDegree_lt_iff_degree_lt hp).mpr hn), Fin.sum_univ_eq_sum_range fun i => f i (p.coeff i)] #align polynomial.sum_fin Polynomial.sum_fin theorem as_sum_range' (p : R[X]) (n : ℕ) (w : p.natDegree < n) : p = ∑ i ∈ range n, monomial i (coeff p i) := p.sum_monomial_eq.symm.trans <\| p.sum_over_range' monomial_zero_right _ w #align polynomial.as_sum_range' Polynomial.as_sum_range' theorem as_sum_range (p : R[X]) : p = ∑ i ∈ range (p.natDegree + 1), monomial i (coeff p i) := p.sum_monomial_eq.symm.trans <\| p.sum_over_range <\| monomial_zero_right #align polynomial.as_sum_range Polynomial.as_sum_range theorem as_sum_range_C_mul_X_pow (p : R[X]) : p = ∑ i ∈ range (p.natDegree + 1), C (coeff p i) * X ^ i := p.as_sum_range.trans <\| by simp only [C_mul_X_pow_eq_monomial] #align polynomial.as_sum_range_C_mul_X_pow Polynomial.as_sum_range_C_mul_X_pow theorem coeff_ne_zero_of_eq_degree (hn : degree p = n) : coeff p n ≠ 0 := fun h => mem_support_iff.mp (mem_of_max hn) h #align polynomial.coeff_ne_zero_of_eq_degree Polynomial.coeff_ne_zero_of_eq_degree theorem eq_X_add_C_of_degree_le_one (h : degree p ≤ 1) : p = C (p.coeff 1) * X + C (p.coeff 0) := ext fun n => Nat.casesOn n (by simp) fun n => Nat.casesOn n (by simp [coeff_C]) fun m => by -- Porting note: `by decide` → `Iff.mpr ..` have : degree p < m.succ.succ := lt_of_le_of_lt h (Iff.mpr WithBot.coe_lt_coe <\| Nat.succ_lt_succ <\| Nat.zero_lt_succ m) simp [coeff_eq_zero_of_degree_lt this, coeff_C, Nat.succ_ne_zero, coeff_X, Nat.succ_inj', @eq_comm ℕ 0] #align polynomial.eq_X_add_C_of_degree_le_one Polynomial.eq_X_add_C_of_degree_le_one theorem eq_X_add_C_of_degree_eq_one (h : degree p = 1) : p = C p.leadingCoeff * X + C (p.coeff 0) := (eq_X_add_C_of_degree_le_one h.le).trans (by rw [← Nat.cast_one] at h; rw [leadingCoeff, natDegree_eq_of_degree_eq_some h]) #align polynomial.eq_X_add_C_of_degree_eq_one Polynomial.eq_X_add_C_of_degree_eq_one theorem eq_X_add_C_of_natDegree_le_one (h : natDegree p ≤ 1) : p = C (p.coeff 1) * X + C (p.coeff 0) := eq_X_add_C_of_degree_le_one <\| degree_le_of_natDegree_le h #align polynomial.eq_X_add_C_of_nat_degree_le_one Polynomial.eq_X_add_C_of_natDegree_le_one theorem Monic.eq_X_add_C (hm : p.Monic) (hnd : p.natDegree = 1) : p = X + C (p.coeff 0) := by rw [← one_mul X, ← C_1, ← hm.coeff_natDegree, hnd, ← eq_X_add_C_of_natDegree_le_one hnd.le] #align polynomial.monic.eq_X_add_C Polynomial.Monic.eq_X_add_C theorem exists_eq_X_add_C_of_natDegree_le_one (h : natDegree p ≤ 1) : ∃ a b, p = C a * X + C b := ⟨p.coeff 1, p.coeff 0, eq_X_add_C_of_natDegree_le_one h⟩ #align polynomial.exists_eq_X_add_C_of_natDegree_le_one Polynomial.exists_eq_X_add_C_of_natDegree_le_one theorem degree_X_pow_le (n : ℕ) : degree (X ^ n : R[X]) ≤ n := by simpa only [C_1, one_mul] using degree_C_mul_X_pow_le n (1 : R) #align polynomial.degree_X_pow_le Polynomial.degree_X_pow_le theorem degree_X_le : degree (X : R[X]) ≤ 1 := degree_monomial_le _ _ #align polynomial.degree_X_le Polynomial.degree_X_le theorem natDegree_X_le : (X : R[X]).natDegree ≤ 1 := natDegree_le_of_degree_le degree_X_le #align polynomial.nat_degree_X_le Polynomial.natDegree_X_le theorem mem_support_C_mul_X_pow {n a : ℕ} {c : R} (h : a ∈ support (C c * X ^ n)) : a = n := mem_singleton.1 <\| support_C_mul_X_pow' n c h #align polynomial.mem_support_C_mul_X_pow Polynomial.mem_support_C_mul_X_pow theorem card_support_C_mul_X_pow_le_one {c : R} {n : ℕ} : card (support (C c * X ^ n)) ≤ 1 := by rw [← card_singleton n] apply card_le_card (support_C_mul_X_pow' n c) #align polynomial.card_support_C_mul_X_pow_le_one Polynomial.card_support_C_mul_X_pow_le_one theorem card_supp_le_succ_natDegree (p : R[X]) : p.support.card ≤ p.natDegree + 1 := by rw [← Finset.card_range (p.natDegree + 1)] exact Finset.card_le_card supp_subset_range_natDegree_succ #align polynomial.card_supp_le_succ_nat_degree Polynomial.card_supp_le_succ_natDegree theorem le_degree_of_mem_supp (a : ℕ) : a ∈ p.support → ↑a ≤ degree p := le_degree_of_ne_zero ∘ mem_support_iff.mp #align polynomial.le_degree_of_mem_supp Polynomial.le_degree_of_mem_supp theorem nonempty_support_iff : p.support.Nonempty ↔ p ≠ 0 := by rw [Ne, nonempty_iff_ne_empty, Ne, ← support_eq_empty] #align polynomial.nonempty_support_iff Polynomial.nonempty_support_iff end Semiring section NonzeroSemiring variable [Semiring R] [Nontrivial R] {p q : R[X]} @[simp] theorem degree_one : degree (1 : R[X]) = (0 : WithBot ℕ) := degree_C one_ne_zero #align polynomial.degree_one Polynomial.degree_one @[simp] theorem degree_X : degree (X : R[X]) = 1 := degree_monomial _ one_ne_zero #align polynomial.degree_X Polynomial.degree_X @[simp] theorem natDegree_X : (X : R[X]).natDegree = 1 := natDegree_eq_of_degree_eq_some degree_X #align polynomial.nat_degree_X Polynomial.natDegree_X end NonzeroSemiring section Ring variable [Ring R] theorem coeff_mul_X_sub_C {p : R[X]} {r : R} {a : ℕ} : coeff (p * (X - C r)) (a + 1) = coeff p a - coeff p (a + 1) * r := by simp [mul_sub] #align polynomial.coeff_mul_X_sub_C Polynomial.coeff_mul_X_sub_C @[simp] theorem degree_neg (p : R[X]) : degree (-p) = degree p := by unfold degree; rw [support_neg] #align polynomial.degree_neg Polynomial.degree_neg theorem degree_neg_le_of_le {a : WithBot ℕ} {p : R[X]} (hp : degree p ≤ a) : degree (-p) ≤ a := p.degree_neg.le.trans hp @[simp] theorem natDegree_neg (p : R[X]) : natDegree (-p) = natDegree p := by simp [natDegree] #align polynomial.nat_degree_neg Polynomial.natDegree_neg theorem natDegree_neg_le_of_le {p : R[X]} (hp : natDegree p ≤ m) : natDegree (-p) ≤ m := (natDegree_neg p).le.trans hp @[simp] theorem natDegree_intCast (n : ℤ) : natDegree (n : R[X]) = 0 := by rw [← C_eq_intCast, natDegree_C] #align polynomial.nat_degree_intCast Polynomial.natDegree_intCast @[deprecated (since := "2024-04-17")] alias natDegree_int_cast := natDegree_intCast theorem degree_intCast_le (n : ℤ) : degree (n : R[X]) ≤ 0 := degree_le_of_natDegree_le (by simp) @[deprecated (since := "2024-04-17")] alias degree_int_cast_le := degree_intCast_le @[simp] theorem leadingCoeff_neg (p : R[X]) : (-p).leadingCoeff = -p.leadingCoeff := by rw [leadingCoeff, leadingCoeff, natDegree_neg, coeff_neg] #align polynomial.leading_coeff_neg Polynomial.leadingCoeff_neg end Ring section Semiring variable [Semiring R] {p : R[X]} /-- The second-highest coefficient, or 0 for constants -/ def nextCoeff (p : R[X]) : R := if p.natDegree = 0 then 0 else p.coeff (p.natDegree - 1) #align polynomial.next_coeff Polynomial.nextCoeff lemma nextCoeff_eq_zero : p.nextCoeff = 0 ↔ p.natDegree = 0 ∨ 0 < p.natDegree ∧ p.coeff (p.natDegree - 1) = 0 := by simp [nextCoeff, or_iff_not_imp_left, pos_iff_ne_zero]; aesop lemma nextCoeff_ne_zero : p.nextCoeff ≠ 0 ↔ p.natDegree ≠ 0 ∧ p.coeff (p.natDegree - 1) ≠ 0 := by simp [nextCoeff] @[simp] theorem nextCoeff_C_eq_zero (c : R) : nextCoeff (C c) = 0 := by rw [nextCoeff] simp #align polynomial.next_coeff_C_eq_zero Polynomial.nextCoeff_C_eq_zero theorem nextCoeff_of_natDegree_pos (hp : 0 < p.natDegree) : nextCoeff p = p.coeff (p.natDegree - 1) := by rw [nextCoeff, if_neg] contrapose! hp simpa #align polynomial.next_coeff_of_pos_nat_degree Polynomial.nextCoeff_of_natDegree_pos variable {p q : R[X]} {ι : Type} theorem coeff_natDegree_eq_zero_of_degree_lt (h : degree p < degree q) : coeff p (natDegree q) = 0 := coeff_eq_zero_of_degree_lt (lt_of_lt_of_le h degree_le_natDegree) #align polynomial.coeff_nat_degree_eq_zero_of_degree_lt Polynomial.coeff_natDegree_eq_zero_of_degree_lt theorem ne_zero_of_degree_gt {n : WithBot ℕ} (h : n < degree p) : p ≠ 0 := mt degree_eq_bot.2 h.ne_bot #align polynomial.ne_zero_of_degree_gt Polynomial.ne_zero_of_degree_gt theorem ne_zero_of_degree_ge_degree (hpq : p.degree ≤ q.degree) (hp : p ≠ 0) : q ≠ 0 := Polynomial.ne_zero_of_degree_gt (lt_of_lt_of_le (bot_lt_iff_ne_bot.mpr (by rwa [Ne, Polynomial.degree_eq_bot])) hpq : q.degree > ⊥) #align polynomial.ne_zero_of_degree_ge_degree Polynomial.ne_zero_of_degree_ge_degree theorem ne_zero_of_natDegree_gt {n : ℕ} (h : n < natDegree p) : p ≠ 0 := fun H => by simp [H, Nat.not_lt_zero] at h #align polynomial.ne_zero_of_nat_degree_gt Polynomial.ne_zero_of_natDegree_gt theorem degree_lt_degree (h : natDegree p < natDegree q) : degree p < degree q := by by_cases hp : p = 0 · simp [hp] rw [bot_lt_iff_ne_bot] intro hq simp [hp, degree_eq_bot.mp hq, lt_irrefl] at h · rwa [degree_eq_natDegree hp, degree_eq_natDegree <\| ne_zero_of_natDegree_gt h, Nat.cast_lt] #align polynomial.degree_lt_degree Polynomial.degree_lt_degree theorem natDegree_lt_natDegree_iff (hp : p ≠ 0) : natDegree p < natDegree q ↔ degree p < degree q := ⟨degree_lt_degree, fun h ↦ by have hq : q ≠ 0 := ne_zero_of_degree_gt h rwa [degree_eq_natDegree hp, degree_eq_natDegree hq, Nat.cast_lt] at h⟩ #align polynomial.nat_degree_lt_nat_degree_iff Polynomial.natDegree_lt_natDegree_iff theorem eq_C_of_degree_le_zero (h : degree p ≤ 0) : p = C (coeff p 0) := by ext (_ \| n) · simp rw [coeff_C, if_neg (Nat.succ_ne_zero _), coeff_eq_zero_of_degree_lt] exact h.trans_lt (WithBot.coe_lt_coe.2 n.succ_pos) #align polynomial.eq_C_of_degree_le_zero Polynomial.eq_C_of_degree_le_zero theorem eq_C_of_degree_eq_zero (h : degree p = 0) : p = C (coeff p 0) := eq_C_of_degree_le_zero h.le #align polynomial.eq_C_of_degree_eq_zero Polynomial.eq_C_of_degree_eq_zero theorem degree_le_zero_iff : degree p ≤ 0 ↔ p = C (coeff p 0) := ⟨eq_C_of_degree_le_zero, fun h => h.symm ▸ degree_C_le⟩ #align polynomial.degree_le_zero_iff Polynomial.degree_le_zero_iff theorem degree_add_le (p q : R[X]) : degree (p + q) ≤ max (degree p) (degree q) := by simpa only [degree, ← support_toFinsupp, toFinsupp_add] using AddMonoidAlgebra.sup_support_add_le _ _ _ #align polynomial.degree_add_le Polynomial.degree_add_le theorem degree_add_le_of_degree_le {p q : R[X]} {n : ℕ} (hp : degree p ≤ n) (hq : degree q ≤ n) : degree (p + q) ≤ n := (degree_add_le p q).trans <\| max_le hp hq #align polynomial.degree_add_le_of_degree_le Polynomial.degree_add_le_of_degree_le theorem degree_add_le_of_le {a b : WithBot ℕ} (hp : degree p ≤ a) (hq : degree q ≤ b) : degree (p + q) ≤ max a b := (p.degree_add_le q).trans <\| max_le_max ‹_› ‹_› theorem natDegree_add_le (p q : R[X]) : natDegree (p + q) ≤ max (natDegree p) (natDegree q) := by cases' le_max_iff.1 (degree_add_le p q) with h h <;> simp [natDegree_le_natDegree h] #align polynomial.nat_degree_add_le Polynomial.natDegree_add_le theorem natDegree_add_le_of_degree_le {p q : R[X]} {n : ℕ} (hp : natDegree p ≤ n) (hq : natDegree q ≤ n) : natDegree (p + q) ≤ n := (natDegree_add_le p q).trans <\| max_le hp hq #align polynomial.nat_degree_add_le_of_degree_le Polynomial.natDegree_add_le_of_degree_le theorem natDegree_add_le_of_le (hp : natDegree p ≤ m) (hq : natDegree q ≤ n) : natDegree (p + q) ≤ max m n := (p.natDegree_add_le q).trans <\| max_le_max ‹_› ‹_› @[simp] theorem leadingCoeff_zero : leadingCoeff (0 : R[X]) = 0 := rfl #align polynomial.leading_coeff_zero Polynomial.leadingCoeff_zero @[simp] theorem leadingCoeff_eq_zero : leadingCoeff p = 0 ↔ p = 0 := ⟨fun h => Classical.by_contradiction fun hp => mt mem_support_iff.1 (Classical.not_not.2 h) (mem_of_max (degree_eq_natDegree hp)), fun h => h.symm ▸ leadingCoeff_zero⟩ #align polynomial.leading_coeff_eq_zero Polynomial.leadingCoeff_eq_zero theorem leadingCoeff_ne_zero : leadingCoeff p ≠ 0 ↔ p ≠ 0 := by rw [Ne, leadingCoeff_eq_zero] #align polynomial.leading_coeff_ne_zero Polynomial.leadingCoeff_ne_zero theorem leadingCoeff_eq_zero_iff_deg_eq_bot : leadingCoeff p = 0 ↔ degree p = ⊥ := by rw [leadingCoeff_eq_zero, degree_eq_bot] #align polynomial.leading_coeff_eq_zero_iff_deg_eq_bot Polynomial.leadingCoeff_eq_zero_iff_deg_eq_bot lemma natDegree_le_pred (hf : p.natDegree ≤ n) (hn : p.coeff n = 0) : p.natDegree ≤ n - 1 := by obtain _ \| n := n · exact hf · refine (Nat.le_succ_iff_eq_or_le.1 hf).resolve_left fun h ↦ ?_ rw [← Nat.succ_eq_add_one, ← h, coeff_natDegree, leadingCoeff_eq_zero] at hn aesop theorem natDegree_mem_support_of_nonzero (H : p ≠ 0) : p.natDegree ∈ p.support := by rw [mem_support_iff] exact (not_congr leadingCoeff_eq_zero).mpr H #align polynomial.nat_degree_mem_support_of_nonzero Polynomial.natDegree_mem_support_of_nonzero theorem natDegree_eq_support_max' (h : p ≠ 0) : p.natDegree = p.support.max' (nonempty_support_iff.mpr h) := (le_max' _ _ <\| natDegree_mem_support_of_nonzero h).antisymm <\| max'_le _ _ _ le_natDegree_of_mem_supp #align polynomial.nat_degree_eq_support_max' Polynomial.natDegree_eq_support_max' theorem natDegree_C_mul_X_pow_le (a : R) (n : ℕ) : natDegree (C a X ^ n) ≤ n := natDegree_le_iff_degree_le.2 <\| degree_C_mul_X_pow_le _ _ #align polynomial.nat_degree_C_mul_X_pow_le Polynomial.natDegree_C_mul_X_pow_le theorem degree_add_eq_left_of_degree_lt (h : degree q < degree p) : degree (p + q) = degree p := le_antisymm (max_eq_left_of_lt h ▸ degree_add_le _ _) <\| degree_le_degree <\| by rw [coeff_add, coeff_natDegree_eq_zero_of_degree_lt h, add_zero] exact mt leadingCoeff_eq_zero.1 (ne_zero_of_degree_gt h) #align polynomial.degree_add_eq_left_of_degree_lt Polynomial.degree_add_eq_left_of_degree_lt theorem degree_add_eq_right_of_degree_lt (h : degree p < degree q) : degree (p + q) = degree q := by rw [add_comm, degree_add_eq_left_of_degree_lt h] #align polynomial.degree_add_eq_right_of_degree_lt Polynomial.degree_add_eq_right_of_degree_lt theorem natDegree_add_eq_left_of_natDegree_lt (h : natDegree q < natDegree p) : natDegree (p + q) = natDegree p := natDegree_eq_of_degree_eq (degree_add_eq_left_of_degree_lt (degree_lt_degree h)) #align polynomial.nat_degree_add_eq_left_of_nat_degree_lt Polynomial.natDegree_add_eq_left_of_natDegree_lt theorem natDegree_add_eq_right_of_natDegree_lt (h : natDegree p < natDegree q) : natDegree (p + q) = natDegree q := natDegree_eq_of_degree_eq (degree_add_eq_right_of_degree_lt (degree_lt_degree h)) #align polynomial.nat_degree_add_eq_right_of_nat_degree_lt Polynomial.natDegree_add_eq_right_of_natDegree_lt theorem degree_add_C (hp : 0 < degree p) : degree (p + C a) = degree p := add_comm (C a) p ▸ degree_add_eq_right_of_degree_lt <\| lt_of_le_of_lt degree_C_le hp #align polynomial.degree_add_C Polynomial.degree_add_C @[simp] theorem natDegree_add_C {a : R} : (p + C a).natDegree = p.natDegree := by rcases eq_or_ne p 0 with rfl \| hp · simp by_cases hpd : p.degree ≤ 0 · rw [eq_C_of_degree_le_zero hpd, ← C_add, natDegree_C, natDegree_C] · rw [not_le, degree_eq_natDegree hp, Nat.cast_pos, ← natDegree_C a] at hpd exact natDegree_add_eq_left_of_natDegree_lt hpd @[simp] theorem natDegree_C_add {a : R} : (C a + p).natDegree = p.natDegree := by simp [add_comm _ p] theorem degree_add_eq_of_leadingCoeff_add_ne_zero (h : leadingCoeff p + leadingCoeff q ≠ 0) : degree (p + q) = max p.degree q.degree := le_antisymm (degree_add_le _ _) <\| match lt_trichotomy (degree p) (degree q) with \| Or.inl hlt => by rw [degree_add_eq_right_of_degree_lt hlt, max_eq_right_of_lt hlt] \| Or.inr (Or.inl HEq) => le_of_not_gt fun hlt : max (degree p) (degree q) > degree (p + q) => h <\| show leadingCoeff p + leadingCoeff q = 0 by rw [HEq, max_self] at hlt rw [leadingCoeff, leadingCoeff, natDegree_eq_of_degree_eq HEq, ← coeff_add] exact coeff_natDegree_eq_zero_of_degree_lt hlt \| Or.inr (Or.inr hlt) => by rw [degree_add_eq_left_of_degree_lt hlt, max_eq_left_of_lt hlt] #align polynomial.degree_add_eq_of_leading_coeff_add_ne_zero Polynomial.degree_add_eq_of_leadingCoeff_add_ne_zero lemma natDegree_eq_of_natDegree_add_lt_left (p q : R[X]) (H : natDegree (p + q) < natDegree p) : natDegree p = natDegree q := by by_contra h cases Nat.lt_or_lt_of_ne h with \| inl h => exact lt_asymm h (by rwa [natDegree_add_eq_right_of_natDegree_lt h] at H) \| inr h => rw [natDegree_add_eq_left_of_natDegree_lt h] at H exact LT.lt.false H lemma natDegree_eq_of_natDegree_add_lt_right (p q : R[X]) (H : natDegree (p + q) < natDegree q) : natDegree p = natDegree q := (natDegree_eq_of_natDegree_add_lt_left q p (add_comm p q ▸ H)).symm lemma natDegree_eq_of_natDegree_add_eq_zero (p q : R[X]) (H : natDegree (p + q) = 0) : natDegree p = natDegree q := by by_cases h₁ : natDegree p = 0; on_goal 1 => by_cases h₂ : natDegree q = 0 · exact h₁.trans h₂.symm · apply natDegree_eq_of_natDegree_add_lt_right; rwa [H, Nat.pos_iff_ne_zero] · apply natDegree_eq_of_natDegree_add_lt_left; rwa [H, Nat.pos_iff_ne_zero] theorem degree_erase_le (p : R[X]) (n : ℕ) : degree (p.erase n) ≤ degree p := by rcases p with ⟨p⟩ simp only [erase_def, degree, coeff, support] -- Porting note: simpler convert-free proof to be explicit about definition unfolding apply sup_mono rw [Finsupp.support_erase] apply Finset.erase_subset #align polynomial.degree_erase_le Polynomial.degree_erase_le theorem degree_erase_lt (hp : p ≠ 0) : degree (p.erase (natDegree p)) < degree p := by apply lt_of_le_of_ne (degree_erase_le _ _) rw [degree_eq_natDegree hp, degree, support_erase] exact fun h => not_mem_erase _ _ (mem_of_max h) #align polynomial.degree_erase_lt Polynomial.degree_erase_lt theorem degree_update_le (p : R[X]) (n : ℕ) (a : R) : degree (p.update n a) ≤ max (degree p) n := by classical rw [degree, support_update] split_ifs · exact (Finset.max_mono (erase_subset _ _)).trans (le_max_left _ _) · rw [max_insert, max_comm] exact le_rfl #align polynomial.degree_update_le Polynomial.degree_update_le theorem degree_sum_le (s : Finset ι) (f : ι → R[X]) : degree (∑ i ∈ s, f i) ≤ s.sup fun b => degree (f b) := Finset.cons_induction_on s (by simp only [sum_empty, sup_empty, degree_zero, le_refl]) fun a s has ih => calc degree (∑ i ∈ cons a s has, f i) ≤ max (degree (f a)) (degree (∑ i ∈ s, f i)) := by rw [Finset.sum_cons]; exact degree_add_le _ _ _ ≤ _ := by rw [sup_cons, sup_eq_max]; exact max_le_max le_rfl ih #align polynomial.degree_sum_le Polynomial.degree_sum_le theorem degree_mul_le (p q : R[X]) : degree (p * q) ≤ degree p + degree q := by simpa only [degree, ← support_toFinsupp, toFinsupp_mul] using AddMonoidAlgebra.sup_support_mul_le (WithBot.coe_add _ _).le _ _ #align polynomial.degree_mul_le Polynomial.degree_mul_le theorem degree_mul_le_of_le {a b : WithBot ℕ} (hp : degree p ≤ a) (hq : degree q ≤ b) : degree (p * q) ≤ a + b := (p.degree_mul_le _).trans <\| add_le_add ‹_› ‹_› theorem degree_pow_le (p : R[X]) : ∀ n : ℕ, degree (p ^ n) ≤ n • degree p \| 0 => by rw [pow_zero, zero_nsmul]; exact degree_one_le \| n + 1 => calc degree (p ^ (n + 1)) ≤ degree (p ^ n) + degree p := by rw [pow_succ]; exact degree_mul_le _ _ _ ≤ _ := by rw [succ_nsmul]; exact add_le_add_right (degree_pow_le _ _) _ #align polynomial.degree_pow_le Polynomial.degree_pow_le theorem degree_pow_le_of_le {a : WithBot ℕ} (b : ℕ) (hp : degree p ≤ a) : degree (p ^ b) ≤ b * a := by induction b with \| zero => simp [degree_one_le] \| succ n hn => rw [Nat.cast_succ, add_mul, one_mul, pow_succ] exact degree_mul_le_of_le hn hp @[simp] theorem leadingCoeff_monomial (a : R) (n : ℕ) : leadingCoeff (monomial n a) = a := by classical by_cases ha : a = 0 · simp only [ha, (monomial n).map_zero, leadingCoeff_zero] · rw [leadingCoeff, natDegree_monomial, if_neg ha, coeff_monomial] simp #align polynomial.leading_coeff_monomial Polynomial.leadingCoeff_monomial theorem leadingCoeff_C_mul_X_pow (a : R) (n : ℕ) : leadingCoeff (C a * X ^ n) = a := by rw [C_mul_X_pow_eq_monomial, leadingCoeff_monomial] #align polynomial.leading_coeff_C_mul_X_pow Polynomial.leadingCoeff_C_mul_X_pow theorem leadingCoeff_C_mul_X (a : R) : leadingCoeff (C a * X) = a := by simpa only [pow_one] using leadingCoeff_C_mul_X_pow a 1 #align polynomial.leading_coeff_C_mul_X Polynomial.leadingCoeff_C_mul_X @[simp] theorem leadingCoeff_C (a : R) : leadingCoeff (C a) = a := leadingCoeff_monomial a 0 #align polynomial.leading_coeff_C Polynomial.leadingCoeff_C -- @[simp] -- Porting note (#10618): simp can prove this theorem leadingCoeff_X_pow (n : ℕ) : leadingCoeff ((X : R[X]) ^ n) = 1 := by simpa only [C_1, one_mul] using leadingCoeff_C_mul_X_pow (1 : R) n #align polynomial.leading_coeff_X_pow Polynomial.leadingCoeff_X_pow -- @[simp] -- Porting note (#10618): simp can prove this theorem leadingCoeff_X : leadingCoeff (X : R[X]) = 1 := by simpa only [pow_one] using @leadingCoeff_X_pow R _ 1 #align polynomial.leading_coeff_X Polynomial.leadingCoeff_X @[simp] theorem monic_X_pow (n : ℕ) : Monic (X ^ n : R[X]) := leadingCoeff_X_pow n #align polynomial.monic_X_pow Polynomial.monic_X_pow @[simp] theorem monic_X : Monic (X : R[X]) := leadingCoeff_X #align polynomial.monic_X Polynomial.monic_X -- @[simp] -- Porting note (#10618): simp can prove this theorem leadingCoeff_one : leadingCoeff (1 : R[X]) = 1 := leadingCoeff_C 1 #align polynomial.leading_coeff_one Polynomial.leadingCoeff_one @[simp] theorem monic_one : Monic (1 : R[X]) := leadingCoeff_C _ #align polynomial.monic_one Polynomial.monic_one theorem Monic.ne_zero {R : Type} [Semiring R] [Nontrivial R] {p : R[X]} (hp : p.Monic) : p ≠ 0 := by rintro rfl simp [Monic] at hp #align polynomial.monic.ne_zero Polynomial.Monic.ne_zero theorem Monic.ne_zero_of_ne (h : (0 : R) ≠ 1) {p : R[X]} (hp : p.Monic) : p ≠ 0 := by nontriviality R exact hp.ne_zero #align polynomial.monic.ne_zero_of_ne Polynomial.Monic.ne_zero_of_ne theorem monic_of_natDegree_le_of_coeff_eq_one (n : ℕ) (pn : p.natDegree ≤ n) (p1 : p.coeff n = 1) : Monic p := by unfold Monic nontriviality refine (congr_arg _ <\| natDegree_eq_of_le_of_coeff_ne_zero pn ?_).trans p1 exact ne_of_eq_of_ne p1 one_ne_zero #align polynomial.monic_of_nat_degree_le_of_coeff_eq_one Polynomial.monic_of_natDegree_le_of_coeff_eq_one theorem monic_of_degree_le_of_coeff_eq_one (n : ℕ) (pn : p.degree ≤ n) (p1 : p.coeff n = 1) : Monic p := monic_of_natDegree_le_of_coeff_eq_one n (natDegree_le_of_degree_le pn) p1 #align polynomial.monic_of_degree_le_of_coeff_eq_one Polynomial.monic_of_degree_le_of_coeff_eq_one theorem Monic.ne_zero_of_polynomial_ne {r} (hp : Monic p) (hne : q ≠ r) : p ≠ 0 := haveI := Nontrivial.of_polynomial_ne hne hp.ne_zero #align polynomial.monic.ne_zero_of_polynomial_ne Polynomial.Monic.ne_zero_of_polynomial_ne theorem leadingCoeff_add_of_degree_lt (h : degree p < degree q) : leadingCoeff (p + q) = leadingCoeff q := by have : coeff p (natDegree q) = 0 := coeff_natDegree_eq_zero_of_degree_lt h simp only [leadingCoeff, natDegree_eq_of_degree_eq (degree_add_eq_right_of_degree_lt h), this, coeff_add, zero_add] #align polynomial.leading_coeff_add_of_degree_lt Polynomial.leadingCoeff_add_of_degree_lt theorem leadingCoeff_add_of_degree_lt' (h : degree q < degree p) : leadingCoeff (p + q) = leadingCoeff p := by rw [add_comm] exact leadingCoeff_add_of_degree_lt h theorem leadingCoeff_add_of_degree_eq (h : degree p = degree q) (hlc : leadingCoeff p + leadingCoeff q ≠ 0) : leadingCoeff (p + q) = leadingCoeff p + leadingCoeff q := by have : natDegree (p + q) = natDegree p := by apply natDegree_eq_of_degree_eq rw [degree_add_eq_of_leadingCoeff_add_ne_zero hlc, h, max_self] simp only [leadingCoeff, this, natDegree_eq_of_degree_eq h, coeff_add] #align polynomial.leading_coeff_add_of_degree_eq Polynomial.leadingCoeff_add_of_degree_eq @[simp] theorem coeff_mul_degree_add_degree (p q : R[X]) : coeff (p q) (natDegree p + natDegree q) = leadingCoeff p * leadingCoeff q := calc coeff (p * q) (natDegree p + natDegree q) = ∑ x ∈ antidiagonal (natDegree p + natDegree q), coeff p x.1 * coeff q x.2 := coeff_mul _ _ _ _ = coeff p (natDegree p) * coeff q (natDegree q) := by refine Finset.sum_eq_single (natDegree p, natDegree q) ?_ ?_ · rintro ⟨i, j⟩ h₁ h₂ rw [mem_antidiagonal] at h₁ by_cases H : natDegree p < i · rw [coeff_eq_zero_of_degree_lt (lt_of_le_of_lt degree_le_natDegree (WithBot.coe_lt_coe.2 H)), zero_mul] · rw [not_lt_iff_eq_or_lt] at H cases' H with H H · subst H rw [add_left_cancel_iff] at h₁ dsimp at h₁ subst h₁ exact (h₂ rfl).elim · suffices natDegree q < j by rw [coeff_eq_zero_of_degree_lt (lt_of_le_of_lt degree_le_natDegree (WithBot.coe_lt_coe.2 this)), mul_zero] by_contra! H' exact ne_of_lt (Nat.lt_of_lt_of_le (Nat.add_lt_add_right H j) (Nat.add_le_add_left H' _)) h₁ · intro H exfalso apply H rw [mem_antidiagonal] #align polynomial.coeff_mul_degree_add_degree Polynomial.coeff_mul_degree_add_degree theorem degree_mul' (h : leadingCoeff p * leadingCoeff q ≠ 0) : degree (p * q) = degree p + degree q := have hp : p ≠ 0 := by refine mt ?_ h; exact fun hp => by rw [hp, leadingCoeff_zero, zero_mul] have hq : q ≠ 0 := by refine mt ?_ h; exact fun hq => by rw [hq, leadingCoeff_zero, mul_zero] le_antisymm (degree_mul_le _ _) (by rw [degree_eq_natDegree hp, degree_eq_natDegree hq] refine le_degree_of_ne_zero (n := natDegree p + natDegree q) ?_ rwa [coeff_mul_degree_add_degree]) #align polynomial.degree_mul' Polynomial.degree_mul' theorem Monic.degree_mul (hq : Monic q) : degree (p * q) = degree p + degree q := letI := Classical.decEq R if hp : p = 0 then by simp [hp] else degree_mul' <\| by rwa [hq.leadingCoeff, mul_one, Ne, leadingCoeff_eq_zero] #align polynomial.monic.degree_mul Polynomial.Monic.degree_mul theorem natDegree_mul' (h : leadingCoeff p * leadingCoeff q ≠ 0) : natDegree (p * q) = natDegree p + natDegree q := have hp : p ≠ 0 := mt leadingCoeff_eq_zero.2 fun h₁ => h <\| by rw [h₁, zero_mul] have hq : q ≠ 0 := mt leadingCoeff_eq_zero.2 fun h₁ => h <\| by rw [h₁, mul_zero] natDegree_eq_of_degree_eq_some <\| by rw [degree_mul' h, Nat.cast_add, degree_eq_natDegree hp, degree_eq_natDegree hq] #align polynomial.nat_degree_mul' Polynomial.natDegree_mul' theorem leadingCoeff_mul' (h : leadingCoeff p * leadingCoeff q ≠ 0) : leadingCoeff (p * q) = leadingCoeff p * leadingCoeff q := by unfold leadingCoeff rw [natDegree_mul' h, coeff_mul_degree_add_degree] rfl #align polynomial.leading_coeff_mul' Polynomial.leadingCoeff_mul' theorem monomial_natDegree_leadingCoeff_eq_self (h : p.support.card ≤ 1) : monomial p.natDegree p.leadingCoeff = p := by classical rcases card_support_le_one_iff_monomial.1 h with ⟨n, a, rfl⟩ by_cases ha : a = 0 <;> simp [ha] #align polynomial.monomial_nat_degree_leading_coeff_eq_self Polynomial.monomial_natDegree_leadingCoeff_eq_self theorem C_mul_X_pow_eq_self (h : p.support.card ≤ 1) : C p.leadingCoeff * X ^ p.natDegree = p := by rw [C_mul_X_pow_eq_monomial, monomial_natDegree_leadingCoeff_eq_self h] #align polynomial.C_mul_X_pow_eq_self Polynomial.C_mul_X_pow_eq_self theorem leadingCoeff_pow' : leadingCoeff p ^ n ≠ 0 → leadingCoeff (p ^ n) = leadingCoeff p ^ n := Nat.recOn n (by simp) fun n ih h => by have h₁ : leadingCoeff p ^ n ≠ 0 := fun h₁ => h <\| by rw [pow_succ, h₁, zero_mul] have h₂ : leadingCoeff p * leadingCoeff (p ^ n) ≠ 0 := by rwa [pow_succ', ← ih h₁] at h rw [pow_succ', pow_succ', leadingCoeff_mul' h₂, ih h₁] #align polynomial.leading_coeff_pow' Polynomial.leadingCoeff_pow' theorem degree_pow' : ∀ {n : ℕ}, leadingCoeff p ^ n ≠ 0 → degree (p ^ n) = n • degree p \| 0 => fun h => by rw [pow_zero, ← C_1] at ; rw [degree_C h, zero_nsmul] \| n + 1 => fun h => by have h₁ : leadingCoeff p ^ n ≠ 0 := fun h₁ => h <\| by rw [pow_succ, h₁, zero_mul] have h₂ : leadingCoeff (p ^ n) leadingCoeff p ≠ 0 := by rwa [pow_succ, ← leadingCoeff_pow' h₁] at h rw [pow_succ, degree_mul' h₂, succ_nsmul, degree_pow' h₁] #align polynomial.degree_pow' Polynomial.degree_pow' theorem natDegree_pow' {n : ℕ} (h : leadingCoeff p ^ n ≠ 0) : natDegree (p ^ n) = n * natDegree p := letI := Classical.decEq R if hp0 : p = 0 then if hn0 : n = 0 then by simp [] else by rw [hp0, zero_pow hn0]; simp else have hpn : p ^ n ≠ 0 := fun hpn0 => by have h1 := h rw [← leadingCoeff_pow' h1, hpn0, leadingCoeff_zero] at h; exact h rfl Option.some_inj.1 <\| show (natDegree (p ^ n) : WithBot ℕ) = (n natDegree p : ℕ) by rw [← degree_eq_natDegree hpn, degree_pow' h, degree_eq_natDegree hp0]; simp #align polynomial.nat_degree_pow' Polynomial.natDegree_pow' theorem leadingCoeff_monic_mul {p q : R[X]} (hp : Monic p) : leadingCoeff (p * q) = leadingCoeff q := by rcases eq_or_ne q 0 with (rfl \| H) · simp · rw [leadingCoeff_mul', hp.leadingCoeff, one_mul] rwa [hp.leadingCoeff, one_mul, Ne, leadingCoeff_eq_zero] #align polynomial.leading_coeff_monic_mul Polynomial.leadingCoeff_monic_mul theorem leadingCoeff_mul_monic {p q : R[X]} (hq : Monic q) : leadingCoeff (p * q) = leadingCoeff p := letI := Classical.decEq R Decidable.byCases (fun H : leadingCoeff p = 0 => by rw [H, leadingCoeff_eq_zero.1 H, zero_mul, leadingCoeff_zero]) fun H : leadingCoeff p ≠ 0 => by rw [leadingCoeff_mul', hq.leadingCoeff, mul_one] rwa [hq.leadingCoeff, mul_one] #align polynomial.leading_coeff_mul_monic Polynomial.leadingCoeff_mul_monic @[simp] theorem leadingCoeff_mul_X_pow {p : R[X]} {n : ℕ} : leadingCoeff (p * X ^ n) = leadingCoeff p := leadingCoeff_mul_monic (monic_X_pow n) #align polynomial.leading_coeff_mul_X_pow Polynomial.leadingCoeff_mul_X_pow @[simp] theorem leadingCoeff_mul_X {p : R[X]} : leadingCoeff (p * X) = leadingCoeff p := leadingCoeff_mul_monic monic_X #align polynomial.leading_coeff_mul_X Polynomial.leadingCoeff_mul_X theorem natDegree_mul_le {p q : R[X]} : natDegree (p * q) ≤ natDegree p + natDegree q := by apply natDegree_le_of_degree_le apply le_trans (degree_mul_le p q) rw [Nat.cast_add] apply add_le_add <;> apply degree_le_natDegree #align polynomial.nat_degree_mul_le Polynomial.natDegree_mul_le theorem natDegree_mul_le_of_le (hp : natDegree p ≤ m) (hg : natDegree q ≤ n) : natDegree (p * q) ≤ m + n := natDegree_mul_le.trans <\| add_le_add ‹_› ‹_› theorem natDegree_pow_le {p : R[X]} {n : ℕ} : (p ^ n).natDegree ≤ n * p.natDegree := by induction' n with i hi · simp · rw [pow_succ, Nat.succ_mul] apply le_trans natDegree_mul_le exact add_le_add_right hi _ #align polynomial.nat_degree_pow_le Polynomial.natDegree_pow_le theorem natDegree_pow_le_of_le (n : ℕ) (hp : natDegree p ≤ m) : natDegree (p ^ n) ≤ n * m := natDegree_pow_le.trans (Nat.mul_le_mul le_rfl ‹_›) @[simp] theorem coeff_pow_mul_natDegree (p : R[X]) (n : ℕ) : (p ^ n).coeff (n * p.natDegree) = p.leadingCoeff ^ n := by induction' n with i hi · simp · rw [pow_succ, pow_succ, Nat.succ_mul] by_cases hp1 : p.leadingCoeff ^ i = 0 · rw [hp1, zero_mul] by_cases hp2 : p ^ i = 0 · rw [hp2, zero_mul, coeff_zero] · apply coeff_eq_zero_of_natDegree_lt have h1 : (p ^ i).natDegree < i * p.natDegree := by refine lt_of_le_of_ne natDegree_pow_le fun h => hp2 ?_ rw [← h, hp1] at hi exact leadingCoeff_eq_zero.mp hi calc (p ^ i * p).natDegree ≤ (p ^ i).natDegree + p.natDegree := natDegree_mul_le _ < i * p.natDegree + p.natDegree := add_lt_add_right h1 _ · rw [← natDegree_pow' hp1, ← leadingCoeff_pow' hp1] exact coeff_mul_degree_add_degree _ _ #align polynomial.coeff_pow_mul_nat_degree Polynomial.coeff_pow_mul_natDegree theorem coeff_mul_add_eq_of_natDegree_le {df dg : ℕ} {f g : R[X]} (hdf : natDegree f ≤ df) (hdg : natDegree g ≤ dg) : (f * g).coeff (df + dg) = f.coeff df * g.coeff dg := by rw [coeff_mul, Finset.sum_eq_single_of_mem (df, dg)] · rw [mem_antidiagonal] rintro ⟨df', dg'⟩ hmem hne obtain h \| hdf' := lt_or_le df df' · rw [coeff_eq_zero_of_natDegree_lt (hdf.trans_lt h), zero_mul] obtain h \| hdg' := lt_or_le dg dg' · rw [coeff_eq_zero_of_natDegree_lt (hdg.trans_lt h), mul_zero] obtain ⟨rfl, rfl⟩ := (add_eq_add_iff_eq_and_eq hdf' hdg').mp (mem_antidiagonal.1 hmem) exact (hne rfl).elim theorem zero_le_degree_iff : 0 ≤ degree p ↔ p ≠ 0 := by rw [← not_lt, Nat.WithBot.lt_zero_iff, degree_eq_bot] #align polynomial.zero_le_degree_iff Polynomial.zero_le_degree_iff theorem natDegree_eq_zero_iff_degree_le_zero : p.natDegree = 0 ↔ p.degree ≤ 0 := by rw [← nonpos_iff_eq_zero, natDegree_le_iff_degree_le, Nat.cast_zero] #align polynomial.nat_degree_eq_zero_iff_degree_le_zero Polynomial.natDegree_eq_zero_iff_degree_le_zero theorem degree_zero_le : degree (0 : R[X]) ≤ 0 := natDegree_eq_zero_iff_degree_le_zero.mp rfl theorem degree_le_iff_coeff_zero (f : R[X]) (n : WithBot ℕ) : degree f ≤ n ↔ ∀ m : ℕ, n < m → coeff f m = 0 := by -- Porting note: `Nat.cast_withBot` is required. simp only [degree, Finset.max, Finset.sup_le_iff, mem_support_iff, Ne, ← not_le, not_imp_comm, Nat.cast_withBot] #align polynomial.degree_le_iff_coeff_zero Polynomial.degree_le_iff_coeff_zero theorem degree_lt_iff_coeff_zero (f : R[X]) (n : ℕ) : degree f < n ↔ ∀ m : ℕ, n ≤ m → coeff f m = 0 := by simp only [degree, Finset.sup_lt_iff (WithBot.bot_lt_coe n), mem_support_iff, WithBot.coe_lt_coe, ← @not_le ℕ, max_eq_sup_coe, Nat.cast_withBot, Ne, not_imp_not] #align polynomial.degree_lt_iff_coeff_zero Polynomial.degree_lt_iff_coeff_zero theorem degree_smul_le (a : R) (p : R[X]) : degree (a • p) ≤ degree p := by refine (degree_le_iff_coeff_zero _ _).2 fun m hm => ?_ rw [degree_lt_iff_coeff_zero] at hm simp [hm m le_rfl] #align polynomial.degree_smul_le Polynomial.degree_smul_le theorem natDegree_smul_le (a : R) (p : R[X]) : natDegree (a • p) ≤ natDegree p := natDegree_le_natDegree (degree_smul_le a p) #align polynomial.nat_degree_smul_le Polynomial.natDegree_smul_le theorem degree_lt_degree_mul_X (hp : p ≠ 0) : p.degree < (p * X).degree := by haveI := Nontrivial.of_polynomial_ne hp have : leadingCoeff p * leadingCoeff X ≠ 0 := by simpa erw [degree_mul' this, degree_eq_natDegree hp, degree_X, ← WithBot.coe_one, ← WithBot.coe_add, WithBot.coe_lt_coe]; exact Nat.lt_succ_self _ #align polynomial.degree_lt_degree_mul_X Polynomial.degree_lt_degree_mul_X theorem natDegree_pos_iff_degree_pos : 0 < natDegree p ↔ 0 < degree p := lt_iff_lt_of_le_iff_le natDegree_le_iff_degree_le #align polynomial.nat_degree_pos_iff_degree_pos Polynomial.natDegree_pos_iff_degree_pos theorem eq_C_of_natDegree_le_zero (h : natDegree p ≤ 0) : p = C (coeff p 0) := eq_C_of_degree_le_zero <\| degree_le_of_natDegree_le h #align polynomial.eq_C_of_nat_degree_le_zero Polynomial.eq_C_of_natDegree_le_zero theorem eq_C_of_natDegree_eq_zero (h : natDegree p = 0) : p = C (coeff p 0) := eq_C_of_natDegree_le_zero h.le #align polynomial.eq_C_of_nat_degree_eq_zero Polynomial.eq_C_of_natDegree_eq_zero lemma natDegree_eq_zero {p : R[X]} : p.natDegree = 0 ↔ ∃ x, C x = p := ⟨fun h ↦ ⟨_, (eq_C_of_natDegree_eq_zero h).symm⟩, by aesop⟩ theorem eq_C_coeff_zero_iff_natDegree_eq_zero : p = C (p.coeff 0) ↔ p.natDegree = 0 := ⟨fun h ↦ by rw [h, natDegree_C], eq_C_of_natDegree_eq_zero⟩ theorem eq_one_of_monic_natDegree_zero (hf : p.Monic) (hfd : p.natDegree = 0) : p = 1 := by rw [Monic.def, leadingCoeff, hfd] at hf rw [eq_C_of_natDegree_eq_zero hfd, hf, map_one] theorem ne_zero_of_coe_le_degree (hdeg : ↑n ≤ p.degree) : p ≠ 0 := zero_le_degree_iff.mp <\| (WithBot.coe_le_coe.mpr n.zero_le).trans hdeg #align polynomial.ne_zero_of_coe_le_degree Polynomial.ne_zero_of_coe_le_degree theorem le_natDegree_of_coe_le_degree (hdeg : ↑n ≤ p.degree) : n ≤ p.natDegree := -- Porting note: `.. ▸ ..` → `rwa [..] at ..` WithBot.coe_le_coe.mp <\| by rwa [degree_eq_natDegree <\| ne_zero_of_coe_le_degree hdeg] at hdeg #align polynomial.le_nat_degree_of_coe_le_degree Polynomial.le_natDegree_of_coe_le_degree theorem degree_sum_fin_lt {n : ℕ} (f : Fin n → R) : degree (∑ i : Fin n, C (f i) * X ^ (i : ℕ)) < n := (degree_sum_le _ _).trans_lt <\| (Finset.sup_lt_iff <\| WithBot.bot_lt_coe n).2 fun k _hk => (degree_C_mul_X_pow_le _ _).trans_lt <\| WithBot.coe_lt_coe.2 k.is_lt #align polynomial.degree_sum_fin_lt Polynomial.degree_sum_fin_lt theorem degree_linear_le : degree (C a * X + C b) ≤ 1 := degree_add_le_of_degree_le (degree_C_mul_X_le _) <\| le_trans degree_C_le Nat.WithBot.coe_nonneg #align polynomial.degree_linear_le Polynomial.degree_linear_le theorem degree_linear_lt : degree (C a * X + C b) < 2 := degree_linear_le.trans_lt <\| WithBot.coe_lt_coe.mpr one_lt_two #align polynomial.degree_linear_lt Polynomial.degree_linear_lt theorem degree_C_lt_degree_C_mul_X (ha : a ≠ 0) : degree (C b) < degree (C a * X) := by simpa only [degree_C_mul_X ha] using degree_C_lt #align polynomial.degree_C_lt_degree_C_mul_X Polynomial.degree_C_lt_degree_C_mul_X @[simp] theorem degree_linear (ha : a ≠ 0) : degree (C a * X + C b) = 1 := by rw [degree_add_eq_left_of_degree_lt <\| degree_C_lt_degree_C_mul_X ha, degree_C_mul_X ha] #align polynomial.degree_linear Polynomial.degree_linear theorem natDegree_linear_le : natDegree (C a * X + C b) ≤ 1 := natDegree_le_of_degree_le degree_linear_le #align polynomial.nat_degree_linear_le Polynomial.natDegree_linear_le theorem natDegree_linear (ha : a ≠ 0) : natDegree (C a * X + C b) = 1 := by rw [natDegree_add_C, natDegree_C_mul_X a ha] #align polynomial.nat_degree_linear Polynomial.natDegree_linear @[simp] theorem leadingCoeff_linear (ha : a ≠ 0) : leadingCoeff (C a * X + C b) = a := by rw [add_comm, leadingCoeff_add_of_degree_lt (degree_C_lt_degree_C_mul_X ha), leadingCoeff_C_mul_X] #align polynomial.leading_coeff_linear Polynomial.leadingCoeff_linear theorem degree_quadratic_le : degree (C a * X ^ 2 + C b * X + C c) ≤ 2 := by simpa only [add_assoc] using degree_add_le_of_degree_le (degree_C_mul_X_pow_le 2 a) (le_trans degree_linear_le <\| WithBot.coe_le_coe.mpr one_le_two) #align polynomial.degree_quadratic_le Polynomial.degree_quadratic_le theorem degree_quadratic_lt : degree (C a * X ^ 2 + C b * X + C c) < 3 := degree_quadratic_le.trans_lt <\| WithBot.coe_lt_coe.mpr <\| lt_add_one 2 #align polynomial.degree_quadratic_lt Polynomial.degree_quadratic_lt theorem degree_linear_lt_degree_C_mul_X_sq (ha : a ≠ 0) : degree (C b * X + C c) < degree (C a * X ^ 2) := by simpa only [degree_C_mul_X_pow 2 ha] using degree_linear_lt #align polynomial.degree_linear_lt_degree_C_mul_X_sq Polynomial.degree_linear_lt_degree_C_mul_X_sq @[simp] theorem degree_quadratic (ha : a ≠ 0) : degree (C a * X ^ 2 + C b * X + C c) = 2 := by rw [add_assoc, degree_add_eq_left_of_degree_lt <\| degree_linear_lt_degree_C_mul_X_sq ha, degree_C_mul_X_pow 2 ha] rfl #align polynomial.degree_quadratic Polynomial.degree_quadratic theorem natDegree_quadratic_le : natDegree (C a * X ^ 2 + C b * X + C c) ≤ 2 := natDegree_le_of_degree_le degree_quadratic_le #align polynomial.nat_degree_quadratic_le Polynomial.natDegree_quadratic_le theorem natDegree_quadratic (ha : a ≠ 0) : natDegree (C a * X ^ 2 + C b * X + C c) = 2 := natDegree_eq_of_degree_eq_some <\| degree_quadratic ha #align polynomial.nat_degree_quadratic Polynomial.natDegree_quadratic @[simp] theorem leadingCoeff_quadratic (ha : a ≠ 0) : leadingCoeff (C a * X ^ 2 + C b * X + C c) = a := by rw [add_assoc, add_comm, leadingCoeff_add_of_degree_lt <\| degree_linear_lt_degree_C_mul_X_sq ha, leadingCoeff_C_mul_X_pow] #align polynomial.leading_coeff_quadratic Polynomial.leadingCoeff_quadratic theorem degree_cubic_le : degree (C a * X ^ 3 + C b * X ^ 2 + C c * X + C d) ≤ 3 := by simpa only [add_assoc] using degree_add_le_of_degree_le (degree_C_mul_X_pow_le 3 a) (le_trans degree_quadratic_le <\| WithBot.coe_le_coe.mpr <\| Nat.le_succ 2) #align polynomial.degree_cubic_le Polynomial.degree_cubic_le theorem degree_cubic_lt : degree (C a * X ^ 3 + C b * X ^ 2 + C c * X + C d) < 4 := degree_cubic_le.trans_lt <\| WithBot.coe_lt_coe.mpr <\| lt_add_one 3 #align polynomial.degree_cubic_lt Polynomial.degree_cubic_lt theorem degree_quadratic_lt_degree_C_mul_X_cb (ha : a ≠ 0) : degree (C b * X ^ 2 + C c * X + C d) < degree (C a * X ^ 3) := by simpa only [degree_C_mul_X_pow 3 ha] using degree_quadratic_lt #align polynomial.degree_quadratic_lt_degree_C_mul_X_cb Polynomial.degree_quadratic_lt_degree_C_mul_X_cb @[simp] theorem degree_cubic (ha : a ≠ 0) : degree (C a * X ^ 3 + C b * X ^ 2 + C c * X + C d) = 3 := by rw [add_assoc, add_assoc, ← add_assoc (C b * X ^ 2), degree_add_eq_left_of_degree_lt <\| degree_quadratic_lt_degree_C_mul_X_cb ha, degree_C_mul_X_pow 3 ha] rfl #align polynomial.degree_cubic Polynomial.degree_cubic theorem natDegree_cubic_le : natDegree (C a * X ^ 3 + C b * X ^ 2 + C c * X + C d) ≤ 3 := natDegree_le_of_degree_le degree_cubic_le #align polynomial.nat_degree_cubic_le Polynomial.natDegree_cubic_le theorem natDegree_cubic (ha : a ≠ 0) : natDegree (C a * X ^ 3 + C b * X ^ 2 + C c * X + C d) = 3 := natDegree_eq_of_degree_eq_some <\| degree_cubic ha #align polynomial.nat_degree_cubic Polynomial.natDegree_cubic @[simp] theorem leadingCoeff_cubic (ha : a ≠ 0) : leadingCoeff (C a * X ^ 3 + C b * X ^ 2 + C c * X + C d) = a := by rw [add_assoc, add_assoc, ← add_assoc (C b * X ^ 2), add_comm, leadingCoeff_add_of_degree_lt <\| degree_quadratic_lt_degree_C_mul_X_cb ha, leadingCoeff_C_mul_X_pow] #align polynomial.leading_coeff_cubic Polynomial.leadingCoeff_cubic end Semiring section NontrivialSemiring variable [Semiring R] [Nontrivial R] {p q : R[X]} (n : ℕ) @[simp] theorem degree_X_pow : degree ((X : R[X]) ^ n) = n := by rw [X_pow_eq_monomial, degree_monomial _ (one_ne_zero' R)] #align polynomial.degree_X_pow Polynomial.degree_X_pow @[simp] theorem natDegree_X_pow : natDegree ((X : R[X]) ^ n) = n := natDegree_eq_of_degree_eq_some (degree_X_pow n) #align polynomial.nat_degree_X_pow Polynomial.natDegree_X_pow @[simp] lemma natDegree_mul_X (hp : p ≠ 0) : natDegree (p * X) = natDegree p + 1 := by rw [natDegree_mul' (by simpa), natDegree_X] @[simp] lemma natDegree_X_mul (hp : p ≠ 0) : natDegree (X * p) = natDegree p + 1 := by rw [commute_X p, natDegree_mul_X hp] @[simp] lemma natDegree_mul_X_pow (hp : p ≠ 0) : natDegree (p * X ^ n) = natDegree p + n := by rw [natDegree_mul' (by simpa), natDegree_X_pow] @[simp] lemma natDegree_X_pow_mul (hp : p ≠ 0) : natDegree (X ^ n * p) = natDegree p + n := by rw [commute_X_pow, natDegree_mul_X_pow n hp] -- This lemma explicitly does not require the `Nontrivial R` assumption.	Mathlib/Algebra/Polynomial/Degree/Definitions.lean	1,370	1,372	theorem natDegree_X_pow_le {R : Type*} [Semiring R] (n : ℕ) : (X ^ n : R[X]).natDegree ≤ n := by	nontriviality R rw [Polynomial.natDegree_X_pow]
/- Copyright (c) 2023 Matthew Robert Ballard. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Matthew Robert Ballard -/ import Mathlib.Algebra.Divisibility.Units import Mathlib.Algebra.Order.Ring.Nat import Mathlib.Tactic.Common /-! # The maximal power of one natural number dividing another Here we introduce `p.maxPowDiv n` which returns the maximal `k : ℕ` for which `p ^ k ∣ n` with the convention that `maxPowDiv 1 n = 0` for all `n`. We prove enough about `maxPowDiv` in this file to show equality with `Nat.padicValNat` in `padicValNat.padicValNat_eq_maxPowDiv`. The implementation of `maxPowDiv` improves on the speed of `padicValNat`. -/ namespace Nat open Nat /-- Tail recursive function which returns the largest `k : ℕ` such that `p ^ k ∣ n` for any `p : ℕ`. `padicValNat_eq_maxPowDiv` allows the code generator to use this definition for `padicValNat` -/ def maxPowDiv (p n : ℕ) : ℕ := go 0 p n where go (k p n : ℕ) : ℕ := if 1 < p ∧ 0 < n ∧ n % p = 0 then go (k+1) p (n / p) else k termination_by n decreasing_by apply Nat.div_lt_self <;> tauto attribute [inherit_doc maxPowDiv] maxPowDiv.go end Nat namespace Nat.maxPowDiv theorem go_succ {k p n : ℕ} : go (k+1) p n = go k p n + 1 := by induction k, p, n using go.induct case case1 h ih => unfold go simp only [if_pos h] exact ih case case2 h => unfold go simp only [if_neg h] @[simp] theorem zero_base {n : ℕ} : maxPowDiv 0 n = 0 := by dsimp [maxPowDiv] rw [maxPowDiv.go] simp @[simp]	Mathlib/Data/Nat/MaxPowDiv.lean	63	66	theorem zero {p : ℕ} : maxPowDiv p 0 = 0 := by	dsimp [maxPowDiv] rw [maxPowDiv.go] simp
/- Copyright (c) 2019 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Analysis.Calculus.FDeriv.Equiv import Mathlib.Analysis.Calculus.FormalMultilinearSeries #align_import analysis.calculus.cont_diff_def from "leanprover-community/mathlib"@"3a69562db5a458db8322b190ec8d9a8bbd8a5b14" /-! # Higher differentiability A function is `C^1` on a domain if it is differentiable there, and its derivative is continuous. By induction, it is `C^n` if it is `C^{n-1}` and its (n-1)-th derivative is `C^1` there or, equivalently, if it is `C^1` and its derivative is `C^{n-1}`. Finally, it is `C^∞` if it is `C^n` for all n. We formalize these notions by defining iteratively the `n+1`-th derivative of a function as the derivative of the `n`-th derivative. It is called `iteratedFDeriv 𝕜 n f x` where `𝕜` is the field, `n` is the number of iterations, `f` is the function and `x` is the point, and it is given as an `n`-multilinear map. We also define a version `iteratedFDerivWithin` relative to a domain, as well as predicates `ContDiffWithinAt`, `ContDiffAt`, `ContDiffOn` and `ContDiff` saying that the function is `C^n` within a set at a point, at a point, on a set and on the whole space respectively. To avoid the issue of choice when choosing a derivative in sets where the derivative is not necessarily unique, `ContDiffOn` is not defined directly in terms of the regularity of the specific choice `iteratedFDerivWithin 𝕜 n f s` inside `s`, but in terms of the existence of a nice sequence of derivatives, expressed with a predicate `HasFTaylorSeriesUpToOn`. We prove basic properties of these notions. ## Main definitions and results Let `f : E → F` be a map between normed vector spaces over a nontrivially normed field `𝕜`. * `HasFTaylorSeriesUpTo n f p`: expresses that the formal multilinear series `p` is a sequence of iterated derivatives of `f`, up to the `n`-th term (where `n` is a natural number or `∞`). * `HasFTaylorSeriesUpToOn n f p s`: same thing, but inside a set `s`. The notion of derivative is now taken inside `s`. In particular, derivatives don't have to be unique. * `ContDiff 𝕜 n f`: expresses that `f` is `C^n`, i.e., it admits a Taylor series up to rank `n`. * `ContDiffOn 𝕜 n f s`: expresses that `f` is `C^n` in `s`. * `ContDiffAt 𝕜 n f x`: expresses that `f` is `C^n` around `x`. * `ContDiffWithinAt 𝕜 n f s x`: expresses that `f` is `C^n` around `x` within the set `s`. * `iteratedFDerivWithin 𝕜 n f s x` is an `n`-th derivative of `f` over the field `𝕜` on the set `s` at the point `x`. It is a continuous multilinear map from `E^n` to `F`, defined as a derivative within `s` of `iteratedFDerivWithin 𝕜 (n-1) f s` if one exists, and `0` otherwise. * `iteratedFDeriv 𝕜 n f x` is the `n`-th derivative of `f` over the field `𝕜` at the point `x`. It is a continuous multilinear map from `E^n` to `F`, defined as a derivative of `iteratedFDeriv 𝕜 (n-1) f` if one exists, and `0` otherwise. In sets of unique differentiability, `ContDiffOn 𝕜 n f s` can be expressed in terms of the properties of `iteratedFDerivWithin 𝕜 m f s` for `m ≤ n`. In the whole space, `ContDiff 𝕜 n f` can be expressed in terms of the properties of `iteratedFDeriv 𝕜 m f` for `m ≤ n`. ## Implementation notes The definitions in this file are designed to work on any field `𝕜`. They are sometimes slightly more complicated than the naive definitions one would guess from the intuition over the real or complex numbers, but they are designed to circumvent the lack of gluing properties and partitions of unity in general. In the usual situations, they coincide with the usual definitions. ### Definition of `C^n` functions in domains One could define `C^n` functions in a domain `s` by fixing an arbitrary choice of derivatives (this is what we do with `iteratedFDerivWithin`) and requiring that all these derivatives up to `n` are continuous. If the derivative is not unique, this could lead to strange behavior like two `C^n` functions `f` and `g` on `s` whose sum is not `C^n`. A better definition is thus to say that a function is `C^n` inside `s` if it admits a sequence of derivatives up to `n` inside `s`. This definition still has the problem that a function which is locally `C^n` would not need to be `C^n`, as different choices of sequences of derivatives around different points might possibly not be glued together to give a globally defined sequence of derivatives. (Note that this issue can not happen over reals, thanks to partition of unity, but the behavior over a general field is not so clear, and we want a definition for general fields). Also, there are locality problems for the order parameter: one could image a function which, for each `n`, has a nice sequence of derivatives up to order `n`, but they do not coincide for varying `n` and can therefore not be glued to give rise to an infinite sequence of derivatives. This would give a function which is `C^n` for all `n`, but not `C^∞`. We solve this issue by putting locality conditions in space and order in our definition of `ContDiffWithinAt` and `ContDiffOn`. The resulting definition is slightly more complicated to work with (in fact not so much), but it gives rise to completely satisfactory theorems. For instance, with this definition, a real function which is `C^m` (but not better) on `(-1/m, 1/m)` for each natural `m` is by definition `C^∞` at `0`. There is another issue with the definition of `ContDiffWithinAt 𝕜 n f s x`. We can require the existence and good behavior of derivatives up to order `n` on a neighborhood of `x` within `s`. However, this does not imply continuity or differentiability within `s` of the function at `x` when `x` does not belong to `s`. Therefore, we require such existence and good behavior on a neighborhood of `x` within `s ∪ {x}` (which appears as `insert x s` in this file). ### Side of the composition, and universe issues With a naïve direct definition, the `n`-th derivative of a function belongs to the space `E →L[𝕜] (E →L[𝕜] (E ... F)...)))` where there are n iterations of `E →L[𝕜]`. This space may also be seen as the space of continuous multilinear functions on `n` copies of `E` with values in `F`, by uncurrying. This is the point of view that is usually adopted in textbooks, and that we also use. This means that the definition and the first proofs are slightly involved, as one has to keep track of the uncurrying operation. The uncurrying can be done from the left or from the right, amounting to defining the `n+1`-th derivative either as the derivative of the `n`-th derivative, or as the `n`-th derivative of the derivative. For proofs, it would be more convenient to use the latter approach (from the right), as it means to prove things at the `n+1`-th step we only need to understand well enough the derivative in `E →L[𝕜] F` (contrary to the approach from the left, where one would need to know enough on the `n`-th derivative to deduce things on the `n+1`-th derivative). However, the definition from the right leads to a universe polymorphism problem: if we define `iteratedFDeriv 𝕜 (n + 1) f x = iteratedFDeriv 𝕜 n (fderiv 𝕜 f) x` by induction, we need to generalize over all spaces (as `f` and `fderiv 𝕜 f` don't take values in the same space). It is only possible to generalize over all spaces in some fixed universe in an inductive definition. For `f : E → F`, then `fderiv 𝕜 f` is a map `E → (E →L[𝕜] F)`. Therefore, the definition will only work if `F` and `E →L[𝕜] F` are in the same universe. This issue does not appear with the definition from the left, where one does not need to generalize over all spaces. Therefore, we use the definition from the left. This means some proofs later on become a little bit more complicated: to prove that a function is `C^n`, the most efficient approach is to exhibit a formula for its `n`-th derivative and prove it is continuous (contrary to the inductive approach where one would prove smoothness statements without giving a formula for the derivative). In the end, this approach is still satisfactory as it is good to have formulas for the iterated derivatives in various constructions. One point where we depart from this explicit approach is in the proof of smoothness of a composition: there is a formula for the `n`-th derivative of a composition (Faà di Bruno's formula), but it is very complicated and barely usable, while the inductive proof is very simple. Thus, we give the inductive proof. As explained above, it works by generalizing over the target space, hence it only works well if all spaces belong to the same universe. To get the general version, we lift things to a common universe using a trick. ### Variables management The textbook definitions and proofs use various identifications and abuse of notations, for instance when saying that the natural space in which the derivative lives, i.e., `E →L[𝕜] (E →L[𝕜] ( ... →L[𝕜] F))`, is the same as a space of multilinear maps. When doing things formally, we need to provide explicit maps for these identifications, and chase some diagrams to see everything is compatible with the identifications. In particular, one needs to check that taking the derivative and then doing the identification, or first doing the identification and then taking the derivative, gives the same result. The key point for this is that taking the derivative commutes with continuous linear equivalences. Therefore, we need to implement all our identifications with continuous linear equivs. ## Notations We use the notation `E [×n]→L[𝕜] F` for the space of continuous multilinear maps on `E^n` with values in `F`. This is the space in which the `n`-th derivative of a function from `E` to `F` lives. In this file, we denote `⊤ : ℕ∞` with `∞`. ## Tags derivative, differentiability, higher derivative, `C^n`, multilinear, Taylor series, formal series -/ noncomputable section open scoped Classical open NNReal Topology Filter local notation "∞" => (⊤ : ℕ∞) /- Porting note: These lines are not required in Mathlib4. attribute [local instance 1001] NormedAddCommGroup.toAddCommGroup NormedSpace.toModule' AddCommGroup.toAddCommMonoid -/ open Set Fin Filter Function universe u uE uF uG uX variable {𝕜 : Type u} [NontriviallyNormedField 𝕜] {E : Type uE} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {F : Type uF} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {G : Type uG} [NormedAddCommGroup G] [NormedSpace 𝕜 G] {X : Type uX} [NormedAddCommGroup X] [NormedSpace 𝕜 X] {s s₁ t u : Set E} {f f₁ : E → F} {g : F → G} {x x₀ : E} {c : F} {m n : ℕ∞} {p : E → FormalMultilinearSeries 𝕜 E F} /-! ### Functions with a Taylor series on a domain -/ /-- `HasFTaylorSeriesUpToOn n f p s` registers the fact that `p 0 = f` and `p (m+1)` is a derivative of `p m` for `m < n`, and is continuous for `m ≤ n`. This is a predicate analogous to `HasFDerivWithinAt` but for higher order derivatives. Notice that `p` does not sum up to `f` on the diagonal (`FormalMultilinearSeries.sum`), even if `f` is analytic and `n = ∞`: an additional `1/m!` factor on the `m`th term is necessary for that. -/ structure HasFTaylorSeriesUpToOn (n : ℕ∞) (f : E → F) (p : E → FormalMultilinearSeries 𝕜 E F) (s : Set E) : Prop where zero_eq : ∀ x ∈ s, (p x 0).uncurry0 = f x protected fderivWithin : ∀ m : ℕ, (m : ℕ∞) < n → ∀ x ∈ s, HasFDerivWithinAt (p · m) (p x m.succ).curryLeft s x cont : ∀ m : ℕ, (m : ℕ∞) ≤ n → ContinuousOn (p · m) s #align has_ftaylor_series_up_to_on HasFTaylorSeriesUpToOn theorem HasFTaylorSeriesUpToOn.zero_eq' (h : HasFTaylorSeriesUpToOn n f p s) {x : E} (hx : x ∈ s) : p x 0 = (continuousMultilinearCurryFin0 𝕜 E F).symm (f x) := by rw [← h.zero_eq x hx] exact (p x 0).uncurry0_curry0.symm #align has_ftaylor_series_up_to_on.zero_eq' HasFTaylorSeriesUpToOn.zero_eq' /-- If two functions coincide on a set `s`, then a Taylor series for the first one is as well a Taylor series for the second one. -/ theorem HasFTaylorSeriesUpToOn.congr (h : HasFTaylorSeriesUpToOn n f p s) (h₁ : ∀ x ∈ s, f₁ x = f x) : HasFTaylorSeriesUpToOn n f₁ p s := by refine ⟨fun x hx => ?_, h.fderivWithin, h.cont⟩ rw [h₁ x hx] exact h.zero_eq x hx #align has_ftaylor_series_up_to_on.congr HasFTaylorSeriesUpToOn.congr theorem HasFTaylorSeriesUpToOn.mono (h : HasFTaylorSeriesUpToOn n f p s) {t : Set E} (hst : t ⊆ s) : HasFTaylorSeriesUpToOn n f p t := ⟨fun x hx => h.zero_eq x (hst hx), fun m hm x hx => (h.fderivWithin m hm x (hst hx)).mono hst, fun m hm => (h.cont m hm).mono hst⟩ #align has_ftaylor_series_up_to_on.mono HasFTaylorSeriesUpToOn.mono theorem HasFTaylorSeriesUpToOn.of_le (h : HasFTaylorSeriesUpToOn n f p s) (hmn : m ≤ n) : HasFTaylorSeriesUpToOn m f p s := ⟨h.zero_eq, fun k hk x hx => h.fderivWithin k (lt_of_lt_of_le hk hmn) x hx, fun k hk => h.cont k (le_trans hk hmn)⟩ #align has_ftaylor_series_up_to_on.of_le HasFTaylorSeriesUpToOn.of_le theorem HasFTaylorSeriesUpToOn.continuousOn (h : HasFTaylorSeriesUpToOn n f p s) : ContinuousOn f s := by have := (h.cont 0 bot_le).congr fun x hx => (h.zero_eq' hx).symm rwa [← (continuousMultilinearCurryFin0 𝕜 E F).symm.comp_continuousOn_iff] #align has_ftaylor_series_up_to_on.continuous_on HasFTaylorSeriesUpToOn.continuousOn theorem hasFTaylorSeriesUpToOn_zero_iff : HasFTaylorSeriesUpToOn 0 f p s ↔ ContinuousOn f s ∧ ∀ x ∈ s, (p x 0).uncurry0 = f x := by refine ⟨fun H => ⟨H.continuousOn, H.zero_eq⟩, fun H => ⟨H.2, fun m hm => False.elim (not_le.2 hm bot_le), fun m hm ↦ ?_⟩⟩ obtain rfl : m = 0 := mod_cast hm.antisymm (zero_le _) have : EqOn (p · 0) ((continuousMultilinearCurryFin0 𝕜 E F).symm ∘ f) s := fun x hx ↦ (continuousMultilinearCurryFin0 𝕜 E F).eq_symm_apply.2 (H.2 x hx) rw [continuousOn_congr this, LinearIsometryEquiv.comp_continuousOn_iff] exact H.1 #align has_ftaylor_series_up_to_on_zero_iff hasFTaylorSeriesUpToOn_zero_iff theorem hasFTaylorSeriesUpToOn_top_iff : HasFTaylorSeriesUpToOn ∞ f p s ↔ ∀ n : ℕ, HasFTaylorSeriesUpToOn n f p s := by constructor · intro H n; exact H.of_le le_top · intro H constructor · exact (H 0).zero_eq · intro m _ apply (H m.succ).fderivWithin m (WithTop.coe_lt_coe.2 (lt_add_one m)) · intro m _ apply (H m).cont m le_rfl #align has_ftaylor_series_up_to_on_top_iff hasFTaylorSeriesUpToOn_top_iff /-- In the case that `n = ∞` we don't need the continuity assumption in `HasFTaylorSeriesUpToOn`. -/ theorem hasFTaylorSeriesUpToOn_top_iff' : HasFTaylorSeriesUpToOn ∞ f p s ↔ (∀ x ∈ s, (p x 0).uncurry0 = f x) ∧ ∀ m : ℕ, ∀ x ∈ s, HasFDerivWithinAt (fun y => p y m) (p x m.succ).curryLeft s x := -- Everything except for the continuity is trivial: ⟨fun h => ⟨h.1, fun m => h.2 m (WithTop.coe_lt_top m)⟩, fun h => ⟨h.1, fun m _ => h.2 m, fun m _ x hx => -- The continuity follows from the existence of a derivative: (h.2 m x hx).continuousWithinAt⟩⟩ #align has_ftaylor_series_up_to_on_top_iff' hasFTaylorSeriesUpToOn_top_iff' /-- If a function has a Taylor series at order at least `1`, then the term of order `1` of this series is a derivative of `f`. -/ theorem HasFTaylorSeriesUpToOn.hasFDerivWithinAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : x ∈ s) : HasFDerivWithinAt f (continuousMultilinearCurryFin1 𝕜 E F (p x 1)) s x := by have A : ∀ y ∈ s, f y = (continuousMultilinearCurryFin0 𝕜 E F) (p y 0) := fun y hy ↦ (h.zero_eq y hy).symm suffices H : HasFDerivWithinAt (continuousMultilinearCurryFin0 𝕜 E F ∘ (p · 0)) (continuousMultilinearCurryFin1 𝕜 E F (p x 1)) s x from H.congr A (A x hx) rw [LinearIsometryEquiv.comp_hasFDerivWithinAt_iff'] have : ((0 : ℕ) : ℕ∞) < n := zero_lt_one.trans_le hn convert h.fderivWithin _ this x hx ext y v change (p x 1) (snoc 0 y) = (p x 1) (cons y v) congr with i rw [Unique.eq_default (α := Fin 1) i] rfl #align has_ftaylor_series_up_to_on.has_fderiv_within_at HasFTaylorSeriesUpToOn.hasFDerivWithinAt theorem HasFTaylorSeriesUpToOn.differentiableOn (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) : DifferentiableOn 𝕜 f s := fun _x hx => (h.hasFDerivWithinAt hn hx).differentiableWithinAt #align has_ftaylor_series_up_to_on.differentiable_on HasFTaylorSeriesUpToOn.differentiableOn /-- If a function has a Taylor series at order at least `1` on a neighborhood of `x`, then the term of order `1` of this series is a derivative of `f` at `x`. -/ theorem HasFTaylorSeriesUpToOn.hasFDerivAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : s ∈ 𝓝 x) : HasFDerivAt f (continuousMultilinearCurryFin1 𝕜 E F (p x 1)) x := (h.hasFDerivWithinAt hn (mem_of_mem_nhds hx)).hasFDerivAt hx #align has_ftaylor_series_up_to_on.has_fderiv_at HasFTaylorSeriesUpToOn.hasFDerivAt /-- If a function has a Taylor series at order at least `1` on a neighborhood of `x`, then in a neighborhood of `x`, the term of order `1` of this series is a derivative of `f`. -/ theorem HasFTaylorSeriesUpToOn.eventually_hasFDerivAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : s ∈ 𝓝 x) : ∀ᶠ y in 𝓝 x, HasFDerivAt f (continuousMultilinearCurryFin1 𝕜 E F (p y 1)) y := (eventually_eventually_nhds.2 hx).mono fun _y hy => h.hasFDerivAt hn hy #align has_ftaylor_series_up_to_on.eventually_has_fderiv_at HasFTaylorSeriesUpToOn.eventually_hasFDerivAt /-- If a function has a Taylor series at order at least `1` on a neighborhood of `x`, then it is differentiable at `x`. -/ theorem HasFTaylorSeriesUpToOn.differentiableAt (h : HasFTaylorSeriesUpToOn n f p s) (hn : 1 ≤ n) (hx : s ∈ 𝓝 x) : DifferentiableAt 𝕜 f x := (h.hasFDerivAt hn hx).differentiableAt #align has_ftaylor_series_up_to_on.differentiable_at HasFTaylorSeriesUpToOn.differentiableAt /-- `p` is a Taylor series of `f` up to `n+1` if and only if `p` is a Taylor series up to `n`, and `p (n + 1)` is a derivative of `p n`. -/ theorem hasFTaylorSeriesUpToOn_succ_iff_left {n : ℕ} : HasFTaylorSeriesUpToOn (n + 1) f p s ↔ HasFTaylorSeriesUpToOn n f p s ∧ (∀ x ∈ s, HasFDerivWithinAt (fun y => p y n) (p x n.succ).curryLeft s x) ∧ ContinuousOn (fun x => p x (n + 1)) s := by constructor · exact fun h ↦ ⟨h.of_le (WithTop.coe_le_coe.2 (Nat.le_succ n)), h.fderivWithin _ (WithTop.coe_lt_coe.2 (lt_add_one n)), h.cont (n + 1) le_rfl⟩ · intro h constructor · exact h.1.zero_eq · intro m hm by_cases h' : m < n · exact h.1.fderivWithin m (WithTop.coe_lt_coe.2 h') · have : m = n := Nat.eq_of_lt_succ_of_not_lt (WithTop.coe_lt_coe.1 hm) h' rw [this] exact h.2.1 · intro m hm by_cases h' : m ≤ n · apply h.1.cont m (WithTop.coe_le_coe.2 h') · have : m = n + 1 := le_antisymm (WithTop.coe_le_coe.1 hm) (not_le.1 h') rw [this] exact h.2.2 #align has_ftaylor_series_up_to_on_succ_iff_left hasFTaylorSeriesUpToOn_succ_iff_left #adaptation_note /-- After https://github.com/leanprover/lean4/pull/4119, without `set_option maxSynthPendingDepth 2` this proof needs substantial repair. -/ set_option maxSynthPendingDepth 2 in -- Porting note: this was split out from `hasFTaylorSeriesUpToOn_succ_iff_right` to avoid a timeout. theorem HasFTaylorSeriesUpToOn.shift_of_succ {n : ℕ} (H : HasFTaylorSeriesUpToOn (n + 1 : ℕ) f p s) : (HasFTaylorSeriesUpToOn n (fun x => continuousMultilinearCurryFin1 𝕜 E F (p x 1)) (fun x => (p x).shift)) s := by constructor · intro x _ rfl · intro m (hm : (m : ℕ∞) < n) x (hx : x ∈ s) have A : (m.succ : ℕ∞) < n.succ := by rw [Nat.cast_lt] at hm ⊢ exact Nat.succ_lt_succ hm change HasFDerivWithinAt ((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm ∘ (p · m.succ)) (p x m.succ.succ).curryRight.curryLeft s x rw [((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm).comp_hasFDerivWithinAt_iff'] convert H.fderivWithin _ A x hx ext y v change p x (m + 2) (snoc (cons y (init v)) (v (last _))) = p x (m + 2) (cons y v) rw [← cons_snoc_eq_snoc_cons, snoc_init_self] · intro m (hm : (m : ℕ∞) ≤ n) suffices A : ContinuousOn (p · (m + 1)) s from ((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm).continuous.comp_continuousOn A refine H.cont _ ?_ rw [Nat.cast_le] at hm ⊢ exact Nat.succ_le_succ hm /-- `p` is a Taylor series of `f` up to `n+1` if and only if `p.shift` is a Taylor series up to `n` for `p 1`, which is a derivative of `f`. -/ theorem hasFTaylorSeriesUpToOn_succ_iff_right {n : ℕ} : HasFTaylorSeriesUpToOn (n + 1 : ℕ) f p s ↔ (∀ x ∈ s, (p x 0).uncurry0 = f x) ∧ (∀ x ∈ s, HasFDerivWithinAt (fun y => p y 0) (p x 1).curryLeft s x) ∧ HasFTaylorSeriesUpToOn n (fun x => continuousMultilinearCurryFin1 𝕜 E F (p x 1)) (fun x => (p x).shift) s := by constructor · intro H refine ⟨H.zero_eq, H.fderivWithin 0 (Nat.cast_lt.2 (Nat.succ_pos n)), ?_⟩ exact H.shift_of_succ · rintro ⟨Hzero_eq, Hfderiv_zero, Htaylor⟩ constructor · exact Hzero_eq · intro m (hm : (m : ℕ∞) < n.succ) x (hx : x ∈ s) cases' m with m · exact Hfderiv_zero x hx · have A : (m : ℕ∞) < n := by rw [Nat.cast_lt] at hm ⊢ exact Nat.lt_of_succ_lt_succ hm have : HasFDerivWithinAt ((continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm ∘ (p · m.succ)) ((p x).shift m.succ).curryLeft s x := Htaylor.fderivWithin _ A x hx rw [LinearIsometryEquiv.comp_hasFDerivWithinAt_iff'] at this convert this ext y v change (p x (Nat.succ (Nat.succ m))) (cons y v) = (p x m.succ.succ) (snoc (cons y (init v)) (v (last _))) rw [← cons_snoc_eq_snoc_cons, snoc_init_self] · intro m (hm : (m : ℕ∞) ≤ n.succ) cases' m with m · have : DifferentiableOn 𝕜 (fun x => p x 0) s := fun x hx => (Hfderiv_zero x hx).differentiableWithinAt exact this.continuousOn · refine (continuousMultilinearCurryRightEquiv' 𝕜 m E F).symm.comp_continuousOn_iff.mp ?_ refine Htaylor.cont _ ?_ rw [Nat.cast_le] at hm ⊢ exact Nat.lt_succ_iff.mp hm #align has_ftaylor_series_up_to_on_succ_iff_right hasFTaylorSeriesUpToOn_succ_iff_right /-! ### Smooth functions within a set around a point -/ variable (𝕜) /-- A function is continuously differentiable up to order `n` within a set `s` at a point `x` if it admits continuous derivatives up to order `n` in a neighborhood of `x` in `s ∪ {x}`. For `n = ∞`, we only require that this holds up to any finite order (where the neighborhood may depend on the finite order we consider). For instance, a real function which is `C^m` on `(-1/m, 1/m)` for each natural `m`, but not better, is `C^∞` at `0` within `univ`. -/ def ContDiffWithinAt (n : ℕ∞) (f : E → F) (s : Set E) (x : E) : Prop := ∀ m : ℕ, (m : ℕ∞) ≤ n → ∃ u ∈ 𝓝[insert x s] x, ∃ p : E → FormalMultilinearSeries 𝕜 E F, HasFTaylorSeriesUpToOn m f p u #align cont_diff_within_at ContDiffWithinAt variable {𝕜} theorem contDiffWithinAt_nat {n : ℕ} : ContDiffWithinAt 𝕜 n f s x ↔ ∃ u ∈ 𝓝[insert x s] x, ∃ p : E → FormalMultilinearSeries 𝕜 E F, HasFTaylorSeriesUpToOn n f p u := ⟨fun H => H n le_rfl, fun ⟨u, hu, p, hp⟩ _m hm => ⟨u, hu, p, hp.of_le hm⟩⟩ #align cont_diff_within_at_nat contDiffWithinAt_nat theorem ContDiffWithinAt.of_le (h : ContDiffWithinAt 𝕜 n f s x) (hmn : m ≤ n) : ContDiffWithinAt 𝕜 m f s x := fun k hk => h k (le_trans hk hmn) #align cont_diff_within_at.of_le ContDiffWithinAt.of_le theorem contDiffWithinAt_iff_forall_nat_le : ContDiffWithinAt 𝕜 n f s x ↔ ∀ m : ℕ, ↑m ≤ n → ContDiffWithinAt 𝕜 m f s x := ⟨fun H _m hm => H.of_le hm, fun H m hm => H m hm _ le_rfl⟩ #align cont_diff_within_at_iff_forall_nat_le contDiffWithinAt_iff_forall_nat_le theorem contDiffWithinAt_top : ContDiffWithinAt 𝕜 ∞ f s x ↔ ∀ n : ℕ, ContDiffWithinAt 𝕜 n f s x := contDiffWithinAt_iff_forall_nat_le.trans <\| by simp only [forall_prop_of_true, le_top] #align cont_diff_within_at_top contDiffWithinAt_top theorem ContDiffWithinAt.continuousWithinAt (h : ContDiffWithinAt 𝕜 n f s x) : ContinuousWithinAt f s x := by rcases h 0 bot_le with ⟨u, hu, p, H⟩ rw [mem_nhdsWithin_insert] at hu exact (H.continuousOn.continuousWithinAt hu.1).mono_of_mem hu.2 #align cont_diff_within_at.continuous_within_at ContDiffWithinAt.continuousWithinAt theorem ContDiffWithinAt.congr_of_eventuallyEq (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : f₁ =ᶠ[𝓝[s] x] f) (hx : f₁ x = f x) : ContDiffWithinAt 𝕜 n f₁ s x := fun m hm => let ⟨u, hu, p, H⟩ := h m hm ⟨{ x ∈ u \| f₁ x = f x }, Filter.inter_mem hu (mem_nhdsWithin_insert.2 ⟨hx, h₁⟩), p, (H.mono (sep_subset _ _)).congr fun _ => And.right⟩ #align cont_diff_within_at.congr_of_eventually_eq ContDiffWithinAt.congr_of_eventuallyEq theorem ContDiffWithinAt.congr_of_eventuallyEq_insert (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : f₁ =ᶠ[𝓝[insert x s] x] f) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr_of_eventuallyEq (nhdsWithin_mono x (subset_insert x s) h₁) (mem_of_mem_nhdsWithin (mem_insert x s) h₁ : _) #align cont_diff_within_at.congr_of_eventually_eq_insert ContDiffWithinAt.congr_of_eventuallyEq_insert theorem ContDiffWithinAt.congr_of_eventually_eq' (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : f₁ =ᶠ[𝓝[s] x] f) (hx : x ∈ s) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr_of_eventuallyEq h₁ <\| h₁.self_of_nhdsWithin hx #align cont_diff_within_at.congr_of_eventually_eq' ContDiffWithinAt.congr_of_eventually_eq' theorem Filter.EventuallyEq.contDiffWithinAt_iff (h₁ : f₁ =ᶠ[𝓝[s] x] f) (hx : f₁ x = f x) : ContDiffWithinAt 𝕜 n f₁ s x ↔ ContDiffWithinAt 𝕜 n f s x := ⟨fun H => ContDiffWithinAt.congr_of_eventuallyEq H h₁.symm hx.symm, fun H => H.congr_of_eventuallyEq h₁ hx⟩ #align filter.eventually_eq.cont_diff_within_at_iff Filter.EventuallyEq.contDiffWithinAt_iff theorem ContDiffWithinAt.congr (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : ∀ y ∈ s, f₁ y = f y) (hx : f₁ x = f x) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr_of_eventuallyEq (Filter.eventuallyEq_of_mem self_mem_nhdsWithin h₁) hx #align cont_diff_within_at.congr ContDiffWithinAt.congr theorem ContDiffWithinAt.congr' (h : ContDiffWithinAt 𝕜 n f s x) (h₁ : ∀ y ∈ s, f₁ y = f y) (hx : x ∈ s) : ContDiffWithinAt 𝕜 n f₁ s x := h.congr h₁ (h₁ _ hx) #align cont_diff_within_at.congr' ContDiffWithinAt.congr' theorem ContDiffWithinAt.mono_of_mem (h : ContDiffWithinAt 𝕜 n f s x) {t : Set E} (hst : s ∈ 𝓝[t] x) : ContDiffWithinAt 𝕜 n f t x := by intro m hm rcases h m hm with ⟨u, hu, p, H⟩ exact ⟨u, nhdsWithin_le_of_mem (insert_mem_nhdsWithin_insert hst) hu, p, H⟩ #align cont_diff_within_at.mono_of_mem ContDiffWithinAt.mono_of_mem theorem ContDiffWithinAt.mono (h : ContDiffWithinAt 𝕜 n f s x) {t : Set E} (hst : t ⊆ s) : ContDiffWithinAt 𝕜 n f t x := h.mono_of_mem <\| Filter.mem_of_superset self_mem_nhdsWithin hst #align cont_diff_within_at.mono ContDiffWithinAt.mono theorem ContDiffWithinAt.congr_nhds (h : ContDiffWithinAt 𝕜 n f s x) {t : Set E} (hst : 𝓝[s] x = 𝓝[t] x) : ContDiffWithinAt 𝕜 n f t x := h.mono_of_mem <\| hst ▸ self_mem_nhdsWithin #align cont_diff_within_at.congr_nhds ContDiffWithinAt.congr_nhds theorem contDiffWithinAt_congr_nhds {t : Set E} (hst : 𝓝[s] x = 𝓝[t] x) : ContDiffWithinAt 𝕜 n f s x ↔ ContDiffWithinAt 𝕜 n f t x := ⟨fun h => h.congr_nhds hst, fun h => h.congr_nhds hst.symm⟩ #align cont_diff_within_at_congr_nhds contDiffWithinAt_congr_nhds theorem contDiffWithinAt_inter' (h : t ∈ 𝓝[s] x) : ContDiffWithinAt 𝕜 n f (s ∩ t) x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAt_congr_nhds <\| Eq.symm <\| nhdsWithin_restrict'' _ h #align cont_diff_within_at_inter' contDiffWithinAt_inter' theorem contDiffWithinAt_inter (h : t ∈ 𝓝 x) : ContDiffWithinAt 𝕜 n f (s ∩ t) x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAt_inter' (mem_nhdsWithin_of_mem_nhds h) #align cont_diff_within_at_inter contDiffWithinAt_inter theorem contDiffWithinAt_insert_self : ContDiffWithinAt 𝕜 n f (insert x s) x ↔ ContDiffWithinAt 𝕜 n f s x := by simp_rw [ContDiffWithinAt, insert_idem] theorem contDiffWithinAt_insert {y : E} : ContDiffWithinAt 𝕜 n f (insert y s) x ↔ ContDiffWithinAt 𝕜 n f s x := by rcases eq_or_ne x y with (rfl \| h) · exact contDiffWithinAt_insert_self simp_rw [ContDiffWithinAt, insert_comm x y, nhdsWithin_insert_of_ne h] #align cont_diff_within_at_insert contDiffWithinAt_insert alias ⟨ContDiffWithinAt.of_insert, ContDiffWithinAt.insert'⟩ := contDiffWithinAt_insert #align cont_diff_within_at.of_insert ContDiffWithinAt.of_insert #align cont_diff_within_at.insert' ContDiffWithinAt.insert' protected theorem ContDiffWithinAt.insert (h : ContDiffWithinAt 𝕜 n f s x) : ContDiffWithinAt 𝕜 n f (insert x s) x := h.insert' #align cont_diff_within_at.insert ContDiffWithinAt.insert /-- If a function is `C^n` within a set at a point, with `n ≥ 1`, then it is differentiable within this set at this point. -/ theorem ContDiffWithinAt.differentiable_within_at' (h : ContDiffWithinAt 𝕜 n f s x) (hn : 1 ≤ n) : DifferentiableWithinAt 𝕜 f (insert x s) x := by rcases h 1 hn with ⟨u, hu, p, H⟩ rcases mem_nhdsWithin.1 hu with ⟨t, t_open, xt, tu⟩ rw [inter_comm] at tu have := ((H.mono tu).differentiableOn le_rfl) x ⟨mem_insert x s, xt⟩ exact (differentiableWithinAt_inter (IsOpen.mem_nhds t_open xt)).1 this #align cont_diff_within_at.differentiable_within_at' ContDiffWithinAt.differentiable_within_at' theorem ContDiffWithinAt.differentiableWithinAt (h : ContDiffWithinAt 𝕜 n f s x) (hn : 1 ≤ n) : DifferentiableWithinAt 𝕜 f s x := (h.differentiable_within_at' hn).mono (subset_insert x s) #align cont_diff_within_at.differentiable_within_at ContDiffWithinAt.differentiableWithinAt /-- A function is `C^(n + 1)` on a domain iff locally, it has a derivative which is `C^n`. -/ theorem contDiffWithinAt_succ_iff_hasFDerivWithinAt {n : ℕ} : ContDiffWithinAt 𝕜 (n + 1 : ℕ) f s x ↔ ∃ u ∈ 𝓝[insert x s] x, ∃ f' : E → E →L[𝕜] F, (∀ x ∈ u, HasFDerivWithinAt f (f' x) u x) ∧ ContDiffWithinAt 𝕜 n f' u x := by constructor · intro h rcases h n.succ le_rfl with ⟨u, hu, p, Hp⟩ refine ⟨u, hu, fun y => (continuousMultilinearCurryFin1 𝕜 E F) (p y 1), fun y hy => Hp.hasFDerivWithinAt (WithTop.coe_le_coe.2 (Nat.le_add_left 1 n)) hy, ?_⟩ intro m hm refine ⟨u, ?_, fun y : E => (p y).shift, ?_⟩ · -- Porting note: without the explicit argument Lean is not sure of the type. convert @self_mem_nhdsWithin _ _ x u have : x ∈ insert x s := by simp exact insert_eq_of_mem (mem_of_mem_nhdsWithin this hu) · rw [hasFTaylorSeriesUpToOn_succ_iff_right] at Hp exact Hp.2.2.of_le hm · rintro ⟨u, hu, f', f'_eq_deriv, Hf'⟩ rw [contDiffWithinAt_nat] rcases Hf' n le_rfl with ⟨v, hv, p', Hp'⟩ refine ⟨v ∩ u, ?_, fun x => (p' x).unshift (f x), ?_⟩ · apply Filter.inter_mem _ hu apply nhdsWithin_le_of_mem hu exact nhdsWithin_mono _ (subset_insert x u) hv · rw [hasFTaylorSeriesUpToOn_succ_iff_right] refine ⟨fun y _ => rfl, fun y hy => ?_, ?_⟩ · change HasFDerivWithinAt (fun z => (continuousMultilinearCurryFin0 𝕜 E F).symm (f z)) (FormalMultilinearSeries.unshift (p' y) (f y) 1).curryLeft (v ∩ u) y -- Porting note: needed `erw` here. -- https://github.com/leanprover-community/mathlib4/issues/5164 erw [LinearIsometryEquiv.comp_hasFDerivWithinAt_iff'] convert (f'_eq_deriv y hy.2).mono inter_subset_right rw [← Hp'.zero_eq y hy.1] ext z change ((p' y 0) (init (@cons 0 (fun _ => E) z 0))) (@cons 0 (fun _ => E) z 0 (last 0)) = ((p' y 0) 0) z congr norm_num [eq_iff_true_of_subsingleton] · convert (Hp'.mono inter_subset_left).congr fun x hx => Hp'.zero_eq x hx.1 using 1 · ext x y change p' x 0 (init (@snoc 0 (fun _ : Fin 1 => E) 0 y)) y = p' x 0 0 y rw [init_snoc] · ext x k v y change p' x k (init (@snoc k (fun _ : Fin k.succ => E) v y)) (@snoc k (fun _ : Fin k.succ => E) v y (last k)) = p' x k v y rw [snoc_last, init_snoc] #align cont_diff_within_at_succ_iff_has_fderiv_within_at contDiffWithinAt_succ_iff_hasFDerivWithinAt /-- A version of `contDiffWithinAt_succ_iff_hasFDerivWithinAt` where all derivatives are taken within the same set. -/	Mathlib/Analysis/Calculus/ContDiff/Defs.lean	610	627	theorem contDiffWithinAt_succ_iff_hasFDerivWithinAt' {n : ℕ} : ContDiffWithinAt 𝕜 (n + 1 : ℕ) f s x ↔ ∃ u ∈ 𝓝[insert x s] x, u ⊆ insert x s ∧ ∃ f' : E → E →L[𝕜] F, (∀ x ∈ u, HasFDerivWithinAt f (f' x) s x) ∧ ContDiffWithinAt 𝕜 n f' s x := by	refine ⟨fun hf => ?_, ?_⟩ · obtain ⟨u, hu, f', huf', hf'⟩ := contDiffWithinAt_succ_iff_hasFDerivWithinAt.mp hf obtain ⟨w, hw, hxw, hwu⟩ := mem_nhdsWithin.mp hu rw [inter_comm] at hwu refine ⟨insert x s ∩ w, inter_mem_nhdsWithin _ (hw.mem_nhds hxw), inter_subset_left, f', fun y hy => ?_, ?_⟩ · refine ((huf' y <\| hwu hy).mono hwu).mono_of_mem ?_ refine mem_of_superset ?_ (inter_subset_inter_left _ (subset_insert _ _)) exact inter_mem_nhdsWithin _ (hw.mem_nhds hy.2) · exact hf'.mono_of_mem (nhdsWithin_mono _ (subset_insert _ _) hu) · rw [← contDiffWithinAt_insert, contDiffWithinAt_succ_iff_hasFDerivWithinAt, insert_eq_of_mem (mem_insert _ _)] rintro ⟨u, hu, hus, f', huf', hf'⟩ exact ⟨u, hu, f', fun y hy => (huf' y hy).insert'.mono hus, hf'.insert.mono hus⟩
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Johannes Hölzl, Scott Morrison, Jens Wagemaker, Johan Commelin -/ import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.RingTheory.Localization.FractionRing #align_import data.polynomial.ring_division from "leanprover-community/mathlib"@"8efcf8022aac8e01df8d302dcebdbc25d6a886c8" /-! # Theory of univariate polynomials We define the multiset of roots of a polynomial, and prove basic results about it. ## Main definitions * `Polynomial.roots p`: The multiset containing all the roots of `p`, including their multiplicities. * `Polynomial.rootSet p E`: The set of distinct roots of `p` in an algebra `E`. ## Main statements * `Polynomial.C_leadingCoeff_mul_prod_multiset_X_sub_C`: If a polynomial has as many roots as its degree, it can be written as the product of its leading coefficient with `∏ (X - a)` where `a` ranges through its roots. -/ noncomputable section namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section CommRing variable [CommRing R] [IsDomain R] {p q : R[X]} section Roots open Multiset Finset /-- `roots p` noncomputably gives a multiset containing all the roots of `p`, including their multiplicities. -/ noncomputable def roots (p : R[X]) : Multiset R := haveI := Classical.decEq R haveI := Classical.dec (p = 0) if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) #align polynomial.roots Polynomial.roots theorem roots_def [DecidableEq R] (p : R[X]) [Decidable (p = 0)] : p.roots = if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) := by -- porting noteL `‹_›` doesn't work for instance arguments rename_i iR ip0 obtain rfl := Subsingleton.elim iR (Classical.decEq R) obtain rfl := Subsingleton.elim ip0 (Classical.dec (p = 0)) rfl #align polynomial.roots_def Polynomial.roots_def @[simp] theorem roots_zero : (0 : R[X]).roots = 0 := dif_pos rfl #align polynomial.roots_zero Polynomial.roots_zero theorem card_roots (hp0 : p ≠ 0) : (Multiset.card (roots p) : WithBot ℕ) ≤ degree p := by classical unfold roots rw [dif_neg hp0] exact (Classical.choose_spec (exists_multiset_roots hp0)).1 #align polynomial.card_roots Polynomial.card_roots theorem card_roots' (p : R[X]) : Multiset.card p.roots ≤ natDegree p := by by_cases hp0 : p = 0 · simp [hp0] exact WithBot.coe_le_coe.1 (le_trans (card_roots hp0) (le_of_eq <\| degree_eq_natDegree hp0)) #align polynomial.card_roots' Polynomial.card_roots' theorem card_roots_sub_C {p : R[X]} {a : R} (hp0 : 0 < degree p) : (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree p := calc (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree (p - C a) := card_roots <\| mt sub_eq_zero.1 fun h => not_le_of_gt hp0 <\| h.symm ▸ degree_C_le _ = degree p := by rw [sub_eq_add_neg, ← C_neg]; exact degree_add_C hp0 set_option linter.uppercaseLean3 false in #align polynomial.card_roots_sub_C Polynomial.card_roots_sub_C theorem card_roots_sub_C' {p : R[X]} {a : R} (hp0 : 0 < degree p) : Multiset.card (p - C a).roots ≤ natDegree p := WithBot.coe_le_coe.1 (le_trans (card_roots_sub_C hp0) (le_of_eq <\| degree_eq_natDegree fun h => by simp_all [lt_irrefl])) set_option linter.uppercaseLean3 false in #align polynomial.card_roots_sub_C' Polynomial.card_roots_sub_C' @[simp] theorem count_roots [DecidableEq R] (p : R[X]) : p.roots.count a = rootMultiplicity a p := by classical by_cases hp : p = 0 · simp [hp] rw [roots_def, dif_neg hp] exact (Classical.choose_spec (exists_multiset_roots hp)).2 a #align polynomial.count_roots Polynomial.count_roots @[simp] theorem mem_roots' : a ∈ p.roots ↔ p ≠ 0 ∧ IsRoot p a := by classical rw [← count_pos, count_roots p, rootMultiplicity_pos'] #align polynomial.mem_roots' Polynomial.mem_roots' theorem mem_roots (hp : p ≠ 0) : a ∈ p.roots ↔ IsRoot p a := mem_roots'.trans <\| and_iff_right hp #align polynomial.mem_roots Polynomial.mem_roots theorem ne_zero_of_mem_roots (h : a ∈ p.roots) : p ≠ 0 := (mem_roots'.1 h).1 #align polynomial.ne_zero_of_mem_roots Polynomial.ne_zero_of_mem_roots theorem isRoot_of_mem_roots (h : a ∈ p.roots) : IsRoot p a := (mem_roots'.1 h).2 #align polynomial.is_root_of_mem_roots Polynomial.isRoot_of_mem_roots -- Porting note: added during port. lemma mem_roots_iff_aeval_eq_zero {x : R} (w : p ≠ 0) : x ∈ roots p ↔ aeval x p = 0 := by rw [mem_roots w, IsRoot.def, aeval_def, eval₂_eq_eval_map] simp theorem card_le_degree_of_subset_roots {p : R[X]} {Z : Finset R} (h : Z.val ⊆ p.roots) : Z.card ≤ p.natDegree := (Multiset.card_le_card (Finset.val_le_iff_val_subset.2 h)).trans (Polynomial.card_roots' p) #align polynomial.card_le_degree_of_subset_roots Polynomial.card_le_degree_of_subset_roots theorem finite_setOf_isRoot {p : R[X]} (hp : p ≠ 0) : Set.Finite { x \| IsRoot p x } := by classical simpa only [← Finset.setOf_mem, Multiset.mem_toFinset, mem_roots hp] using p.roots.toFinset.finite_toSet #align polynomial.finite_set_of_is_root Polynomial.finite_setOf_isRoot theorem eq_zero_of_infinite_isRoot (p : R[X]) (h : Set.Infinite { x \| IsRoot p x }) : p = 0 := not_imp_comm.mp finite_setOf_isRoot h #align polynomial.eq_zero_of_infinite_is_root Polynomial.eq_zero_of_infinite_isRoot theorem exists_max_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x ≤ x₀ := Set.exists_upper_bound_image _ _ <\| finite_setOf_isRoot hp #align polynomial.exists_max_root Polynomial.exists_max_root theorem exists_min_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x₀ ≤ x := Set.exists_lower_bound_image _ _ <\| finite_setOf_isRoot hp #align polynomial.exists_min_root Polynomial.exists_min_root theorem eq_of_infinite_eval_eq (p q : R[X]) (h : Set.Infinite { x \| eval x p = eval x q }) : p = q := by rw [← sub_eq_zero] apply eq_zero_of_infinite_isRoot simpa only [IsRoot, eval_sub, sub_eq_zero] #align polynomial.eq_of_infinite_eval_eq Polynomial.eq_of_infinite_eval_eq theorem roots_mul {p q : R[X]} (hpq : p * q ≠ 0) : (p * q).roots = p.roots + q.roots := by classical exact Multiset.ext.mpr fun r => by rw [count_add, count_roots, count_roots, count_roots, rootMultiplicity_mul hpq] #align polynomial.roots_mul Polynomial.roots_mul theorem roots.le_of_dvd (h : q ≠ 0) : p ∣ q → roots p ≤ roots q := by rintro ⟨k, rfl⟩ exact Multiset.le_iff_exists_add.mpr ⟨k.roots, roots_mul h⟩ #align polynomial.roots.le_of_dvd Polynomial.roots.le_of_dvd theorem mem_roots_sub_C' {p : R[X]} {a x : R} : x ∈ (p - C a).roots ↔ p ≠ C a ∧ p.eval x = a := by rw [mem_roots', IsRoot.def, sub_ne_zero, eval_sub, sub_eq_zero, eval_C] set_option linter.uppercaseLean3 false in #align polynomial.mem_roots_sub_C' Polynomial.mem_roots_sub_C' theorem mem_roots_sub_C {p : R[X]} {a x : R} (hp0 : 0 < degree p) : x ∈ (p - C a).roots ↔ p.eval x = a := mem_roots_sub_C'.trans <\| and_iff_right fun hp => hp0.not_le <\| hp.symm ▸ degree_C_le set_option linter.uppercaseLean3 false in #align polynomial.mem_roots_sub_C Polynomial.mem_roots_sub_C @[simp] theorem roots_X_sub_C (r : R) : roots (X - C r) = {r} := by classical ext s rw [count_roots, rootMultiplicity_X_sub_C, count_singleton] set_option linter.uppercaseLean3 false in #align polynomial.roots_X_sub_C Polynomial.roots_X_sub_C @[simp] theorem roots_X : roots (X : R[X]) = {0} := by rw [← roots_X_sub_C, C_0, sub_zero] set_option linter.uppercaseLean3 false in #align polynomial.roots_X Polynomial.roots_X @[simp] theorem roots_C (x : R) : (C x).roots = 0 := by classical exact if H : x = 0 then by rw [H, C_0, roots_zero] else Multiset.ext.mpr fun r => (by rw [count_roots, count_zero, rootMultiplicity_eq_zero (not_isRoot_C _ _ H)]) set_option linter.uppercaseLean3 false in #align polynomial.roots_C Polynomial.roots_C @[simp] theorem roots_one : (1 : R[X]).roots = ∅ := roots_C 1 #align polynomial.roots_one Polynomial.roots_one @[simp] theorem roots_C_mul (p : R[X]) (ha : a ≠ 0) : (C a * p).roots = p.roots := by by_cases hp : p = 0 <;> simp only [roots_mul, , Ne, mul_eq_zero, C_eq_zero, or_self_iff, not_false_iff, roots_C, zero_add, mul_zero] set_option linter.uppercaseLean3 false in #align polynomial.roots_C_mul Polynomial.roots_C_mul @[simp] theorem roots_smul_nonzero (p : R[X]) (ha : a ≠ 0) : (a • p).roots = p.roots := by rw [smul_eq_C_mul, roots_C_mul _ ha] #align polynomial.roots_smul_nonzero Polynomial.roots_smul_nonzero @[simp] lemma roots_neg (p : R[X]) : (-p).roots = p.roots := by rw [← neg_one_smul R p, roots_smul_nonzero p (neg_ne_zero.mpr one_ne_zero)] theorem roots_list_prod (L : List R[X]) : (0 : R[X]) ∉ L → L.prod.roots = (L : Multiset R[X]).bind roots := List.recOn L (fun _ => roots_one) fun hd tl ih H => by rw [List.mem_cons, not_or] at H rw [List.prod_cons, roots_mul (mul_ne_zero (Ne.symm H.1) <\| List.prod_ne_zero H.2), ← Multiset.cons_coe, Multiset.cons_bind, ih H.2] #align polynomial.roots_list_prod Polynomial.roots_list_prod theorem roots_multiset_prod (m : Multiset R[X]) : (0 : R[X]) ∉ m → m.prod.roots = m.bind roots := by rcases m with ⟨L⟩ simpa only [Multiset.prod_coe, quot_mk_to_coe''] using roots_list_prod L #align polynomial.roots_multiset_prod Polynomial.roots_multiset_prod theorem roots_prod {ι : Type} (f : ι → R[X]) (s : Finset ι) : s.prod f ≠ 0 → (s.prod f).roots = s.val.bind fun i => roots (f i) := by rcases s with ⟨m, hm⟩ simpa [Multiset.prod_eq_zero_iff, Multiset.bind_map] using roots_multiset_prod (m.map f) #align polynomial.roots_prod Polynomial.roots_prod @[simp] theorem roots_pow (p : R[X]) (n : ℕ) : (p ^ n).roots = n • p.roots := by induction' n with n ihn · rw [pow_zero, roots_one, zero_smul, empty_eq_zero] · rcases eq_or_ne p 0 with (rfl \| hp) · rw [zero_pow n.succ_ne_zero, roots_zero, smul_zero] · rw [pow_succ, roots_mul (mul_ne_zero (pow_ne_zero _ hp) hp), ihn, add_smul, one_smul] #align polynomial.roots_pow Polynomial.roots_pow theorem roots_X_pow (n : ℕ) : (X ^ n : R[X]).roots = n • ({0} : Multiset R) := by rw [roots_pow, roots_X] set_option linter.uppercaseLean3 false in #align polynomial.roots_X_pow Polynomial.roots_X_pow theorem roots_C_mul_X_pow (ha : a ≠ 0) (n : ℕ) : Polynomial.roots (C a * X ^ n) = n • ({0} : Multiset R) := by rw [roots_C_mul _ ha, roots_X_pow] set_option linter.uppercaseLean3 false in #align polynomial.roots_C_mul_X_pow Polynomial.roots_C_mul_X_pow @[simp] theorem roots_monomial (ha : a ≠ 0) (n : ℕ) : (monomial n a).roots = n • ({0} : Multiset R) := by rw [← C_mul_X_pow_eq_monomial, roots_C_mul_X_pow ha] #align polynomial.roots_monomial Polynomial.roots_monomial theorem roots_prod_X_sub_C (s : Finset R) : (s.prod fun a => X - C a).roots = s.val := by apply (roots_prod (fun a => X - C a) s ?_).trans · simp_rw [roots_X_sub_C] rw [Multiset.bind_singleton, Multiset.map_id'] · refine prod_ne_zero_iff.mpr (fun a _ => X_sub_C_ne_zero a) set_option linter.uppercaseLean3 false in #align polynomial.roots_prod_X_sub_C Polynomial.roots_prod_X_sub_C @[simp] theorem roots_multiset_prod_X_sub_C (s : Multiset R) : (s.map fun a => X - C a).prod.roots = s := by rw [roots_multiset_prod, Multiset.bind_map] · simp_rw [roots_X_sub_C] rw [Multiset.bind_singleton, Multiset.map_id'] · rw [Multiset.mem_map] rintro ⟨a, -, h⟩ exact X_sub_C_ne_zero a h set_option linter.uppercaseLean3 false in #align polynomial.roots_multiset_prod_X_sub_C Polynomial.roots_multiset_prod_X_sub_C theorem card_roots_X_pow_sub_C {n : ℕ} (hn : 0 < n) (a : R) : Multiset.card (roots ((X : R[X]) ^ n - C a)) ≤ n := WithBot.coe_le_coe.1 <\| calc (Multiset.card (roots ((X : R[X]) ^ n - C a)) : WithBot ℕ) ≤ degree ((X : R[X]) ^ n - C a) := card_roots (X_pow_sub_C_ne_zero hn a) _ = n := degree_X_pow_sub_C hn a set_option linter.uppercaseLean3 false in #align polynomial.card_roots_X_pow_sub_C Polynomial.card_roots_X_pow_sub_C section NthRoots /-- `nthRoots n a` noncomputably returns the solutions to `x ^ n = a`-/ def nthRoots (n : ℕ) (a : R) : Multiset R := roots ((X : R[X]) ^ n - C a) #align polynomial.nth_roots Polynomial.nthRoots @[simp] theorem mem_nthRoots {n : ℕ} (hn : 0 < n) {a x : R} : x ∈ nthRoots n a ↔ x ^ n = a := by rw [nthRoots, mem_roots (X_pow_sub_C_ne_zero hn a), IsRoot.def, eval_sub, eval_C, eval_pow, eval_X, sub_eq_zero] #align polynomial.mem_nth_roots Polynomial.mem_nthRoots @[simp] theorem nthRoots_zero (r : R) : nthRoots 0 r = 0 := by simp only [empty_eq_zero, pow_zero, nthRoots, ← C_1, ← C_sub, roots_C] #align polynomial.nth_roots_zero Polynomial.nthRoots_zero @[simp] theorem nthRoots_zero_right {R} [CommRing R] [IsDomain R] (n : ℕ) : nthRoots n (0 : R) = Multiset.replicate n 0 := by rw [nthRoots, C.map_zero, sub_zero, roots_pow, roots_X, Multiset.nsmul_singleton] theorem card_nthRoots (n : ℕ) (a : R) : Multiset.card (nthRoots n a) ≤ n := by classical exact (if hn : n = 0 then if h : (X : R[X]) ^ n - C a = 0 then by simp [Nat.zero_le, nthRoots, roots, h, dif_pos rfl, empty_eq_zero, Multiset.card_zero] else WithBot.coe_le_coe.1 (le_trans (card_roots h) (by rw [hn, pow_zero, ← C_1, ← RingHom.map_sub] exact degree_C_le)) else by rw [← Nat.cast_le (α := WithBot ℕ)] rw [← degree_X_pow_sub_C (Nat.pos_of_ne_zero hn) a] exact card_roots (X_pow_sub_C_ne_zero (Nat.pos_of_ne_zero hn) a)) #align polynomial.card_nth_roots Polynomial.card_nthRoots @[simp] theorem nthRoots_two_eq_zero_iff {r : R} : nthRoots 2 r = 0 ↔ ¬IsSquare r := by simp_rw [isSquare_iff_exists_sq, eq_zero_iff_forall_not_mem, mem_nthRoots (by norm_num : 0 < 2), ← not_exists, eq_comm] #align polynomial.nth_roots_two_eq_zero_iff Polynomial.nthRoots_two_eq_zero_iff /-- The multiset `nthRoots ↑n (1 : R)` as a Finset. -/ def nthRootsFinset (n : ℕ) (R : Type) [CommRing R] [IsDomain R] : Finset R := haveI := Classical.decEq R Multiset.toFinset (nthRoots n (1 : R)) #align polynomial.nth_roots_finset Polynomial.nthRootsFinset -- Porting note (#10756): new lemma lemma nthRootsFinset_def (n : ℕ) (R : Type) [CommRing R] [IsDomain R] [DecidableEq R] : nthRootsFinset n R = Multiset.toFinset (nthRoots n (1 : R)) := by unfold nthRootsFinset convert rfl @[simp] theorem mem_nthRootsFinset {n : ℕ} (h : 0 < n) {x : R} : x ∈ nthRootsFinset n R ↔ x ^ (n : ℕ) = 1 := by classical rw [nthRootsFinset_def, mem_toFinset, mem_nthRoots h] #align polynomial.mem_nth_roots_finset Polynomial.mem_nthRootsFinset @[simp] theorem nthRootsFinset_zero : nthRootsFinset 0 R = ∅ := by classical simp [nthRootsFinset_def] #align polynomial.nth_roots_finset_zero Polynomial.nthRootsFinset_zero theorem mul_mem_nthRootsFinset {η₁ η₂ : R} (hη₁ : η₁ ∈ nthRootsFinset n R) (hη₂ : η₂ ∈ nthRootsFinset n R) : η₁ * η₂ ∈ nthRootsFinset n R := by cases n with \| zero => simp only [Nat.zero_eq, nthRootsFinset_zero, not_mem_empty] at hη₁ \| succ n => rw [mem_nthRootsFinset n.succ_pos] at hη₁ hη₂ ⊢ rw [mul_pow, hη₁, hη₂, one_mul] theorem ne_zero_of_mem_nthRootsFinset {η : R} (hη : η ∈ nthRootsFinset n R) : η ≠ 0 := by nontriviality R rintro rfl cases n with \| zero => simp only [Nat.zero_eq, nthRootsFinset_zero, not_mem_empty] at hη \| succ n => rw [mem_nthRootsFinset n.succ_pos, zero_pow n.succ_ne_zero] at hη exact zero_ne_one hη theorem one_mem_nthRootsFinset (hn : 0 < n) : 1 ∈ nthRootsFinset n R := by rw [mem_nthRootsFinset hn, one_pow] end NthRoots	Mathlib/Algebra/Polynomial/Roots.lean	395	399	theorem zero_of_eval_zero [Infinite R] (p : R[X]) (h : ∀ x, p.eval x = 0) : p = 0 := by	classical by_contra hp refine @Fintype.false R _ ?_ exact ⟨p.roots.toFinset, fun x => Multiset.mem_toFinset.mpr ((mem_roots hp).mpr (h _))⟩
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Floris van Doorn, Yury Kudryashov, Neil Strickland -/ import Mathlib.Algebra.Group.Defs import Mathlib.Algebra.GroupWithZero.Defs import Mathlib.Data.Int.Cast.Defs import Mathlib.Tactic.Spread import Mathlib.Util.AssertExists #align_import algebra.ring.defs from "leanprover-community/mathlib"@"76de8ae01554c3b37d66544866659ff174e66e1f" /-! # Semirings and rings This file defines semirings, rings and domains. This is analogous to `Algebra.Group.Defs` and `Algebra.Group.Basic`, the difference being that the former is about `+` and `` separately, while the present file is about their interaction. ## Main definitions `Distrib`: Typeclass for distributivity of multiplication over addition. * `HasDistribNeg`: Typeclass for commutativity of negation and multiplication. This is useful when dealing with multiplicative submonoids which are closed under negation without being closed under addition, for example `Units`. * `(NonUnital)(NonAssoc)(Semi)Ring`: Typeclasses for possibly non-unital or non-associative rings and semirings. Some combinations are not defined yet because they haven't found use. ## Tags `Semiring`, `CommSemiring`, `Ring`, `CommRing`, domain, `IsDomain`, nonzero, units -/ universe u v w x variable {α : Type u} {β : Type v} {γ : Type w} {R : Type x} open Function /-! ### `Distrib` class -/ /-- A typeclass stating that multiplication is left and right distributive over addition. -/ class Distrib (R : Type) extends Mul R, Add R where /-- Multiplication is left distributive over addition -/ protected left_distrib : ∀ a b c : R, a (b + c) = a * b + a * c /-- Multiplication is right distributive over addition -/ protected right_distrib : ∀ a b c : R, (a + b) * c = a * c + b * c #align distrib Distrib /-- A typeclass stating that multiplication is left distributive over addition. -/ class LeftDistribClass (R : Type) [Mul R] [Add R] : Prop where /-- Multiplication is left distributive over addition -/ protected left_distrib : ∀ a b c : R, a (b + c) = a * b + a * c #align left_distrib_class LeftDistribClass /-- A typeclass stating that multiplication is right distributive over addition. -/ class RightDistribClass (R : Type) [Mul R] [Add R] : Prop where /-- Multiplication is right distributive over addition -/ protected right_distrib : ∀ a b c : R, (a + b) c = a * c + b * c #align right_distrib_class RightDistribClass -- see Note [lower instance priority] instance (priority := 100) Distrib.leftDistribClass (R : Type) [Distrib R] : LeftDistribClass R := ⟨Distrib.left_distrib⟩ #align distrib.left_distrib_class Distrib.leftDistribClass -- see Note [lower instance priority] instance (priority := 100) Distrib.rightDistribClass (R : Type) [Distrib R] : RightDistribClass R := ⟨Distrib.right_distrib⟩ #align distrib.right_distrib_class Distrib.rightDistribClass theorem left_distrib [Mul R] [Add R] [LeftDistribClass R] (a b c : R) : a * (b + c) = a * b + a * c := LeftDistribClass.left_distrib a b c #align left_distrib left_distrib alias mul_add := left_distrib #align mul_add mul_add theorem right_distrib [Mul R] [Add R] [RightDistribClass R] (a b c : R) : (a + b) * c = a * c + b * c := RightDistribClass.right_distrib a b c #align right_distrib right_distrib alias add_mul := right_distrib #align add_mul add_mul theorem distrib_three_right [Mul R] [Add R] [RightDistribClass R] (a b c d : R) : (a + b + c) * d = a * d + b * d + c * d := by simp [right_distrib] #align distrib_three_right distrib_three_right /-! ### Classes of semirings and rings We make sure that the canonical path from `NonAssocSemiring` to `Ring` passes through `Semiring`, as this is a path which is followed all the time in linear algebra where the defining semilinear map `σ : R →+* S` depends on the `NonAssocSemiring` structure of `R` and `S` while the module definition depends on the `Semiring` structure. It is not currently possible to adjust priorities by hand (see lean4#2115). Instead, the last declared instance is used, so we make sure that `Semiring` is declared after `NonAssocRing`, so that `Semiring -> NonAssocSemiring` is tried before `NonAssocRing -> NonAssocSemiring`. TODO: clean this once lean4#2115 is fixed -/ /-- A not-necessarily-unital, not-necessarily-associative semiring. -/ class NonUnitalNonAssocSemiring (α : Type u) extends AddCommMonoid α, Distrib α, MulZeroClass α #align non_unital_non_assoc_semiring NonUnitalNonAssocSemiring /-- An associative but not-necessarily unital semiring. -/ class NonUnitalSemiring (α : Type u) extends NonUnitalNonAssocSemiring α, SemigroupWithZero α #align non_unital_semiring NonUnitalSemiring /-- A unital but not-necessarily-associative semiring. -/ class NonAssocSemiring (α : Type u) extends NonUnitalNonAssocSemiring α, MulZeroOneClass α, AddCommMonoidWithOne α #align non_assoc_semiring NonAssocSemiring /-- A not-necessarily-unital, not-necessarily-associative ring. -/ class NonUnitalNonAssocRing (α : Type u) extends AddCommGroup α, NonUnitalNonAssocSemiring α #align non_unital_non_assoc_ring NonUnitalNonAssocRing /-- An associative but not-necessarily unital ring. -/ class NonUnitalRing (α : Type) extends NonUnitalNonAssocRing α, NonUnitalSemiring α #align non_unital_ring NonUnitalRing /-- A unital but not-necessarily-associative ring. -/ class NonAssocRing (α : Type) extends NonUnitalNonAssocRing α, NonAssocSemiring α, AddCommGroupWithOne α #align non_assoc_ring NonAssocRing /-- A `Semiring` is a type with addition, multiplication, a `0` and a `1` where addition is commutative and associative, multiplication is associative and left and right distributive over addition, and `0` and `1` are additive and multiplicative identities. -/ class Semiring (α : Type u) extends NonUnitalSemiring α, NonAssocSemiring α, MonoidWithZero α #align semiring Semiring /-- A `Ring` is a `Semiring` with negation making it an additive group. -/ class Ring (R : Type u) extends Semiring R, AddCommGroup R, AddGroupWithOne R #align ring Ring /-! ### Semirings -/ section DistribMulOneClass variable [Add α] [MulOneClass α] theorem add_one_mul [RightDistribClass α] (a b : α) : (a + 1) * b = a * b + b := by rw [add_mul, one_mul] #align add_one_mul add_one_mul theorem mul_add_one [LeftDistribClass α] (a b : α) : a * (b + 1) = a * b + a := by rw [mul_add, mul_one] #align mul_add_one mul_add_one theorem one_add_mul [RightDistribClass α] (a b : α) : (1 + a) * b = b + a * b := by rw [add_mul, one_mul] #align one_add_mul one_add_mul theorem mul_one_add [LeftDistribClass α] (a b : α) : a * (1 + b) = a + a * b := by rw [mul_add, mul_one] #align mul_one_add mul_one_add end DistribMulOneClass section NonAssocSemiring variable [NonAssocSemiring α] -- Porting note: was [has_add α] [mul_one_class α] [right_distrib_class α] theorem two_mul (n : α) : 2 * n = n + n := (congrArg₂ _ one_add_one_eq_two.symm rfl).trans <\| (right_distrib 1 1 n).trans (by rw [one_mul]) #align two_mul two_mul -- Porting note: was [has_add α] [mul_one_class α] [right_distrib_class α] set_option linter.deprecated false in theorem bit0_eq_two_mul (n : α) : bit0 n = 2 * n := (two_mul _).symm #align bit0_eq_two_mul bit0_eq_two_mul -- Porting note: was [has_add α] [mul_one_class α] [left_distrib_class α] theorem mul_two (n : α) : n * 2 = n + n := (congrArg₂ _ rfl one_add_one_eq_two.symm).trans <\| (left_distrib n 1 1).trans (by rw [mul_one]) #align mul_two mul_two end NonAssocSemiring @[to_additive] theorem mul_ite {α} [Mul α] (P : Prop) [Decidable P] (a b c : α) : (a * if P then b else c) = if P then a * b else a * c := by split_ifs <;> rfl #align mul_ite mul_ite #align add_ite add_ite @[to_additive] theorem ite_mul {α} [Mul α] (P : Prop) [Decidable P] (a b c : α) : (if P then a else b) * c = if P then a * c else b * c := by split_ifs <;> rfl #align ite_mul ite_mul #align ite_add ite_add -- We make `mul_ite` and `ite_mul` simp lemmas, -- but not `add_ite` or `ite_add`. -- The problem we're trying to avoid is dealing with -- summations of the form `∑ x ∈ s, (f x + ite P 1 0)`, -- in which `add_ite` followed by `sum_ite` would needlessly slice up -- the `f x` terms according to whether `P` holds at `x`. -- There doesn't appear to be a corresponding difficulty so far with -- `mul_ite` and `ite_mul`. attribute [simp] mul_ite ite_mul theorem ite_sub_ite {α} [Sub α] (P : Prop) [Decidable P] (a b c d : α) : ((if P then a else b) - if P then c else d) = if P then a - c else b - d := by split repeat rfl theorem ite_add_ite {α} [Add α] (P : Prop) [Decidable P] (a b c d : α) : ((if P then a else b) + if P then c else d) = if P then a + c else b + d := by split repeat rfl section MulZeroClass variable [MulZeroClass α] (P Q : Prop) [Decidable P] [Decidable Q] (a b : α) lemma ite_zero_mul : ite P a 0 * b = ite P (a * b) 0 := by simp #align ite_mul_zero_left ite_zero_mul lemma mul_ite_zero : a * ite P b 0 = ite P (a * b) 0 := by simp #align ite_mul_zero_right mul_ite_zero lemma ite_zero_mul_ite_zero : ite P a 0 * ite Q b 0 = ite (P ∧ Q) (a * b) 0 := by simp only [← ite_and, ite_mul, mul_ite, mul_zero, zero_mul, and_comm] #align ite_and_mul_zero ite_zero_mul_ite_zero end MulZeroClass -- Porting note: no @[simp] because simp proves it theorem mul_boole {α} [MulZeroOneClass α] (P : Prop) [Decidable P] (a : α) : (a * if P then 1 else 0) = if P then a else 0 := by simp #align mul_boole mul_boole -- Porting note: no @[simp] because simp proves it theorem boole_mul {α} [MulZeroOneClass α] (P : Prop) [Decidable P] (a : α) : (if P then 1 else 0) * a = if P then a else 0 := by simp #align boole_mul boole_mul /-- A not-necessarily-unital, not-necessarily-associative, but commutative semiring. -/ class NonUnitalNonAssocCommSemiring (α : Type u) extends NonUnitalNonAssocSemiring α, CommMagma α /-- A non-unital commutative semiring is a `NonUnitalSemiring` with commutative multiplication. In other words, it is a type with the following structures: additive commutative monoid (`AddCommMonoid`), commutative semigroup (`CommSemigroup`), distributive laws (`Distrib`), and multiplication by zero law (`MulZeroClass`). -/ class NonUnitalCommSemiring (α : Type u) extends NonUnitalSemiring α, CommSemigroup α #align non_unital_comm_semiring NonUnitalCommSemiring /-- A commutative semiring is a semiring with commutative multiplication. -/ class CommSemiring (R : Type u) extends Semiring R, CommMonoid R #align comm_semiring CommSemiring -- see Note [lower instance priority] instance (priority := 100) CommSemiring.toNonUnitalCommSemiring [CommSemiring α] : NonUnitalCommSemiring α := { inferInstanceAs (CommMonoid α), inferInstanceAs (CommSemiring α) with } #align comm_semiring.to_non_unital_comm_semiring CommSemiring.toNonUnitalCommSemiring -- see Note [lower instance priority] instance (priority := 100) CommSemiring.toCommMonoidWithZero [CommSemiring α] : CommMonoidWithZero α := { inferInstanceAs (CommMonoid α), inferInstanceAs (CommSemiring α) with } #align comm_semiring.to_comm_monoid_with_zero CommSemiring.toCommMonoidWithZero section CommSemiring variable [CommSemiring α] {a b c : α} theorem add_mul_self_eq (a b : α) : (a + b) * (a + b) = a * a + 2 * a * b + b * b := by simp only [two_mul, add_mul, mul_add, add_assoc, mul_comm b] #align add_mul_self_eq add_mul_self_eq lemma add_sq (a b : α) : (a + b) ^ 2 = a ^ 2 + 2 * a * b + b ^ 2 := by simp only [sq, add_mul_self_eq] #align add_sq add_sq lemma add_sq' (a b : α) : (a + b) ^ 2 = a ^ 2 + b ^ 2 + 2 * a * b := by rw [add_sq, add_assoc, add_comm _ (b ^ 2), add_assoc] #align add_sq' add_sq' alias add_pow_two := add_sq #align add_pow_two add_pow_two end CommSemiring section HasDistribNeg /-- Typeclass for a negation operator that distributes across multiplication. This is useful for dealing with submonoids of a ring that contain `-1` without having to duplicate lemmas. -/ class HasDistribNeg (α : Type) [Mul α] extends InvolutiveNeg α where /-- Negation is left distributive over multiplication -/ neg_mul : ∀ x y : α, -x y = -(x * y) /-- Negation is right distributive over multiplication -/ mul_neg : ∀ x y : α, x * -y = -(x * y) #align has_distrib_neg HasDistribNeg section Mul variable [Mul α] [HasDistribNeg α] @[simp] theorem neg_mul (a b : α) : -a * b = -(a * b) := HasDistribNeg.neg_mul _ _ #align neg_mul neg_mul @[simp] theorem mul_neg (a b : α) : a * -b = -(a * b) := HasDistribNeg.mul_neg _ _ #align mul_neg mul_neg theorem neg_mul_neg (a b : α) : -a * -b = a * b := by simp #align neg_mul_neg neg_mul_neg theorem neg_mul_eq_neg_mul (a b : α) : -(a * b) = -a * b := (neg_mul _ _).symm #align neg_mul_eq_neg_mul neg_mul_eq_neg_mul theorem neg_mul_eq_mul_neg (a b : α) : -(a * b) = a * -b := (mul_neg _ _).symm #align neg_mul_eq_mul_neg neg_mul_eq_mul_neg theorem neg_mul_comm (a b : α) : -a * b = a * -b := by simp #align neg_mul_comm neg_mul_comm end Mul section MulOneClass variable [MulOneClass α] [HasDistribNeg α]	Mathlib/Algebra/Ring/Defs.lean	347	347	theorem neg_eq_neg_one_mul (a : α) : -a = -1 * a := by	simp
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Morenikeji Neri -/ import Mathlib.Algebra.EuclideanDomain.Instances import Mathlib.RingTheory.Ideal.Colon import Mathlib.RingTheory.UniqueFactorizationDomain #align_import ring_theory.principal_ideal_domain from "leanprover-community/mathlib"@"6010cf523816335f7bae7f8584cb2edaace73940" /-! # Principal ideal rings, principal ideal domains, and Bézout rings A principal ideal ring (PIR) is a ring in which all left ideals are principal. A principal ideal domain (PID) is an integral domain which is a principal ideal ring. # Main definitions Note that for principal ideal domains, one should use `[IsDomain R] [IsPrincipalIdealRing R]`. There is no explicit definition of a PID. Theorems about PID's are in the `principal_ideal_ring` namespace. - `IsPrincipalIdealRing`: a predicate on rings, saying that every left ideal is principal. - `IsBezout`: the predicate saying that every finitely generated left ideal is principal. - `generator`: a generator of a principal ideal (or more generally submodule) - `to_unique_factorization_monoid`: a PID is a unique factorization domain # Main results - `to_maximal_ideal`: a non-zero prime ideal in a PID is maximal. - `EuclideanDomain.to_principal_ideal_domain` : a Euclidean domain is a PID. - `IsBezout.nonemptyGCDMonoid`: Every Bézout domain is a GCD domain. -/ universe u v variable {R : Type u} {M : Type v} open Set Function open Submodule section variable [Ring R] [AddCommGroup M] [Module R M] instance bot_isPrincipal : (⊥ : Submodule R M).IsPrincipal := ⟨⟨0, by simp⟩⟩ #align bot_is_principal bot_isPrincipal instance top_isPrincipal : (⊤ : Submodule R R).IsPrincipal := ⟨⟨1, Ideal.span_singleton_one.symm⟩⟩ #align top_is_principal top_isPrincipal variable (R) /-- A Bézout ring is a ring whose finitely generated ideals are principal. -/ class IsBezout : Prop where /-- Any finitely generated ideal is principal. -/ isPrincipal_of_FG : ∀ I : Ideal R, I.FG → I.IsPrincipal #align is_bezout IsBezout instance (priority := 100) IsBezout.of_isPrincipalIdealRing [IsPrincipalIdealRing R] : IsBezout R := ⟨fun I _ => IsPrincipalIdealRing.principal I⟩ #align is_bezout.of_is_principal_ideal_ring IsBezout.of_isPrincipalIdealRing instance (priority := 100) DivisionRing.isPrincipalIdealRing (K : Type u) [DivisionRing K] : IsPrincipalIdealRing K where principal S := by rcases Ideal.eq_bot_or_top S with (rfl \| rfl) · apply bot_isPrincipal · apply top_isPrincipal #align division_ring.is_principal_ideal_ring DivisionRing.isPrincipalIdealRing end namespace Submodule.IsPrincipal variable [AddCommGroup M] section Ring variable [Ring R] [Module R M] /-- `generator I`, if `I` is a principal submodule, is an `x ∈ M` such that `span R {x} = I` -/ noncomputable def generator (S : Submodule R M) [S.IsPrincipal] : M := Classical.choose (principal S) #align submodule.is_principal.generator Submodule.IsPrincipal.generator theorem span_singleton_generator (S : Submodule R M) [S.IsPrincipal] : span R {generator S} = S := Eq.symm (Classical.choose_spec (principal S)) #align submodule.is_principal.span_singleton_generator Submodule.IsPrincipal.span_singleton_generator @[simp] theorem _root_.Ideal.span_singleton_generator (I : Ideal R) [I.IsPrincipal] : Ideal.span ({generator I} : Set R) = I := Eq.symm (Classical.choose_spec (principal I)) #align ideal.span_singleton_generator Ideal.span_singleton_generator @[simp] theorem generator_mem (S : Submodule R M) [S.IsPrincipal] : generator S ∈ S := by conv_rhs => rw [← span_singleton_generator S] exact subset_span (mem_singleton _) #align submodule.is_principal.generator_mem Submodule.IsPrincipal.generator_mem theorem mem_iff_eq_smul_generator (S : Submodule R M) [S.IsPrincipal] {x : M} : x ∈ S ↔ ∃ s : R, x = s • generator S := by simp_rw [@eq_comm _ x, ← mem_span_singleton, span_singleton_generator] #align submodule.is_principal.mem_iff_eq_smul_generator Submodule.IsPrincipal.mem_iff_eq_smul_generator theorem eq_bot_iff_generator_eq_zero (S : Submodule R M) [S.IsPrincipal] : S = ⊥ ↔ generator S = 0 := by rw [← @span_singleton_eq_bot R M, span_singleton_generator] #align submodule.is_principal.eq_bot_iff_generator_eq_zero Submodule.IsPrincipal.eq_bot_iff_generator_eq_zero end Ring section CommRing variable [CommRing R] [Module R M] theorem associated_generator_span_self [IsPrincipalIdealRing R] [IsDomain R] (r : R) : Associated (generator <\| Ideal.span {r}) r := by rw [← Ideal.span_singleton_eq_span_singleton] exact Ideal.span_singleton_generator _ theorem mem_iff_generator_dvd (S : Ideal R) [S.IsPrincipal] {x : R} : x ∈ S ↔ generator S ∣ x := (mem_iff_eq_smul_generator S).trans (exists_congr fun a => by simp only [mul_comm, smul_eq_mul]) #align submodule.is_principal.mem_iff_generator_dvd Submodule.IsPrincipal.mem_iff_generator_dvd theorem prime_generator_of_isPrime (S : Ideal R) [S.IsPrincipal] [is_prime : S.IsPrime] (ne_bot : S ≠ ⊥) : Prime (generator S) := ⟨fun h => ne_bot ((eq_bot_iff_generator_eq_zero S).2 h), fun h => is_prime.ne_top (S.eq_top_of_isUnit_mem (generator_mem S) h), fun _ _ => by simpa only [← mem_iff_generator_dvd S] using is_prime.2⟩ #align submodule.is_principal.prime_generator_of_is_prime Submodule.IsPrincipal.prime_generator_of_isPrime -- Note that the converse may not hold if `ϕ` is not injective. theorem generator_map_dvd_of_mem {N : Submodule R M} (ϕ : M →ₗ[R] R) [(N.map ϕ).IsPrincipal] {x : M} (hx : x ∈ N) : generator (N.map ϕ) ∣ ϕ x := by rw [← mem_iff_generator_dvd, Submodule.mem_map] exact ⟨x, hx, rfl⟩ #align submodule.is_principal.generator_map_dvd_of_mem Submodule.IsPrincipal.generator_map_dvd_of_mem -- Note that the converse may not hold if `ϕ` is not injective. theorem generator_submoduleImage_dvd_of_mem {N O : Submodule R M} (hNO : N ≤ O) (ϕ : O →ₗ[R] R) [(ϕ.submoduleImage N).IsPrincipal] {x : M} (hx : x ∈ N) : generator (ϕ.submoduleImage N) ∣ ϕ ⟨x, hNO hx⟩ := by rw [← mem_iff_generator_dvd, LinearMap.mem_submoduleImage_of_le hNO] exact ⟨x, hx, rfl⟩ #align submodule.is_principal.generator_submodule_image_dvd_of_mem Submodule.IsPrincipal.generator_submoduleImage_dvd_of_mem end CommRing end Submodule.IsPrincipal namespace IsBezout section variable [Ring R] instance span_pair_isPrincipal [IsBezout R] (x y : R) : (Ideal.span {x, y}).IsPrincipal := by classical exact isPrincipal_of_FG (Ideal.span {x, y}) ⟨{x, y}, by simp⟩ #align is_bezout.span_pair_is_principal IsBezout.span_pair_isPrincipal variable (x y : R) [(Ideal.span {x, y}).IsPrincipal] /-- A choice of gcd of two elements in a Bézout domain. Note that the choice is usually not unique. -/ noncomputable def gcd : R := Submodule.IsPrincipal.generator (Ideal.span {x, y}) #align is_bezout.gcd IsBezout.gcd theorem span_gcd : Ideal.span {gcd x y} = Ideal.span {x, y} := Ideal.span_singleton_generator _ #align is_bezout.span_gcd IsBezout.span_gcd end variable [CommRing R] (x y z : R) [(Ideal.span {x, y}).IsPrincipal] theorem gcd_dvd_left : gcd x y ∣ x := (Submodule.IsPrincipal.mem_iff_generator_dvd _).mp (Ideal.subset_span (by simp)) #align is_bezout.gcd_dvd_left IsBezout.gcd_dvd_left theorem gcd_dvd_right : gcd x y ∣ y := (Submodule.IsPrincipal.mem_iff_generator_dvd _).mp (Ideal.subset_span (by simp)) #align is_bezout.gcd_dvd_right IsBezout.gcd_dvd_right variable {x y z} in theorem dvd_gcd (hx : z ∣ x) (hy : z ∣ y) : z ∣ gcd x y := by rw [← Ideal.span_singleton_le_span_singleton] at hx hy ⊢ rw [span_gcd, Ideal.span_insert, sup_le_iff] exact ⟨hx, hy⟩ #align is_bezout.dvd_gcd IsBezout.dvd_gcd theorem gcd_eq_sum : ∃ a b : R, a * x + b * y = gcd x y := Ideal.mem_span_pair.mp (by rw [← span_gcd]; apply Ideal.subset_span; simp) #align is_bezout.gcd_eq_sum IsBezout.gcd_eq_sum variable {x y} theorem _root_.IsRelPrime.isCoprime (h : IsRelPrime x y) : IsCoprime x y := by rw [← Ideal.isCoprime_span_singleton_iff, Ideal.isCoprime_iff_sup_eq, ← Ideal.span_union, Set.singleton_union, ← span_gcd, Ideal.span_singleton_eq_top] exact h (gcd_dvd_left x y) (gcd_dvd_right x y) theorem _root_.isRelPrime_iff_isCoprime : IsRelPrime x y ↔ IsCoprime x y := ⟨IsRelPrime.isCoprime, IsCoprime.isRelPrime⟩ variable (R) /-- Any Bézout domain is a GCD domain. This is not an instance since `GCDMonoid` contains data, and this might not be how we would like to construct it. -/ noncomputable def toGCDDomain [IsBezout R] [IsDomain R] [DecidableEq R] : GCDMonoid R := gcdMonoidOfGCD (gcd · ·) (gcd_dvd_left · ·) (gcd_dvd_right · ·) dvd_gcd #align is_bezout.to_gcd_domain IsBezout.toGCDDomain instance nonemptyGCDMonoid [IsBezout R] [IsDomain R] : Nonempty (GCDMonoid R) := by classical exact ⟨toGCDDomain R⟩ theorem associated_gcd_gcd [IsDomain R] [GCDMonoid R] : Associated (IsBezout.gcd x y) (GCDMonoid.gcd x y) := gcd_greatest_associated (gcd_dvd_left _ _ ) (gcd_dvd_right _ _) (fun _ => dvd_gcd) end IsBezout namespace IsPrime open Submodule.IsPrincipal Ideal -- TODO -- for a non-ID one could perhaps prove that if p < q are prime then q maximal; -- 0 isn't prime in a non-ID PIR but the Krull dimension is still <= 1. -- The below result follows from this, but we could also use the below result to -- prove this (quotient out by p). theorem to_maximal_ideal [CommRing R] [IsDomain R] [IsPrincipalIdealRing R] {S : Ideal R} [hpi : IsPrime S] (hS : S ≠ ⊥) : IsMaximal S := isMaximal_iff.2 ⟨(ne_top_iff_one S).1 hpi.1, by intro T x hST hxS hxT cases' (mem_iff_generator_dvd _).1 (hST <\| generator_mem S) with z hz cases hpi.mem_or_mem (show generator T * z ∈ S from hz ▸ generator_mem S) with \| inl h => have hTS : T ≤ S := by rwa [← T.span_singleton_generator, Ideal.span_le, singleton_subset_iff] exact (hxS <\| hTS hxT).elim \| inr h => cases' (mem_iff_generator_dvd _).1 h with y hy have : generator S ≠ 0 := mt (eq_bot_iff_generator_eq_zero _).2 hS rw [← mul_one (generator S), hy, mul_left_comm, mul_right_inj' this] at hz exact hz.symm ▸ T.mul_mem_right _ (generator_mem T)⟩ #align is_prime.to_maximal_ideal IsPrime.to_maximal_ideal end IsPrime section open EuclideanDomain variable [EuclideanDomain R] theorem mod_mem_iff {S : Ideal R} {x y : R} (hy : y ∈ S) : x % y ∈ S ↔ x ∈ S := ⟨fun hxy => div_add_mod x y ▸ S.add_mem (S.mul_mem_right _ hy) hxy, fun hx => (mod_eq_sub_mul_div x y).symm ▸ S.sub_mem hx (S.mul_mem_right _ hy)⟩ #align mod_mem_iff mod_mem_iff -- see Note [lower instance priority] instance (priority := 100) EuclideanDomain.to_principal_ideal_domain : IsPrincipalIdealRing R where principal S := by classical exact ⟨if h : { x : R \| x ∈ S ∧ x ≠ 0 }.Nonempty then have wf : WellFounded (EuclideanDomain.r : R → R → Prop) := EuclideanDomain.r_wellFounded have hmin : WellFounded.min wf { x : R \| x ∈ S ∧ x ≠ 0 } h ∈ S ∧ WellFounded.min wf { x : R \| x ∈ S ∧ x ≠ 0 } h ≠ 0 := WellFounded.min_mem wf { x : R \| x ∈ S ∧ x ≠ 0 } h ⟨WellFounded.min wf { x : R \| x ∈ S ∧ x ≠ 0 } h, Submodule.ext fun x => ⟨fun hx => div_add_mod x (WellFounded.min wf { x : R \| x ∈ S ∧ x ≠ 0 } h) ▸ (Ideal.mem_span_singleton.2 <\| dvd_add (dvd_mul_right _ _) <\| by have : x % WellFounded.min wf { x : R \| x ∈ S ∧ x ≠ 0 } h ∉ { x : R \| x ∈ S ∧ x ≠ 0 } := fun h₁ => WellFounded.not_lt_min wf _ h h₁ (mod_lt x hmin.2) have : x % WellFounded.min wf { x : R \| x ∈ S ∧ x ≠ 0 } h = 0 := by simp only [not_and_or, Set.mem_setOf_eq, not_ne_iff] at this exact this.neg_resolve_left <\| (mod_mem_iff hmin.1).2 hx simp []), fun hx => let ⟨y, hy⟩ := Ideal.mem_span_singleton.1 hx hy.symm ▸ S.mul_mem_right _ hmin.1⟩⟩ else ⟨0, Submodule.ext fun a => by rw [← @Submodule.bot_coe R R _ _ _, span_eq, Submodule.mem_bot] exact ⟨fun haS => by_contra fun ha0 => h ⟨a, ⟨haS, ha0⟩⟩, fun h₁ => h₁.symm ▸ S.zero_mem⟩⟩⟩ #align euclidean_domain.to_principal_ideal_domain EuclideanDomain.to_principal_ideal_domain end theorem IsField.isPrincipalIdealRing {R : Type} [CommRing R] (h : IsField R) : IsPrincipalIdealRing R := @EuclideanDomain.to_principal_ideal_domain R (@Field.toEuclideanDomain R h.toField) #align is_field.is_principal_ideal_ring IsField.isPrincipalIdealRing namespace PrincipalIdealRing open IsPrincipalIdealRing -- see Note [lower instance priority] instance (priority := 100) isNoetherianRing [Ring R] [IsPrincipalIdealRing R] : IsNoetherianRing R := isNoetherianRing_iff.2 ⟨fun s : Ideal R => by rcases (IsPrincipalIdealRing.principal s).principal with ⟨a, rfl⟩ rw [← Finset.coe_singleton] exact ⟨{a}, SetLike.coe_injective rfl⟩⟩ #align principal_ideal_ring.is_noetherian_ring PrincipalIdealRing.isNoetherianRing theorem isMaximal_of_irreducible [CommRing R] [IsPrincipalIdealRing R] {p : R} (hp : Irreducible p) : Ideal.IsMaximal (span R ({p} : Set R)) := ⟨⟨mt Ideal.span_singleton_eq_top.1 hp.1, fun I hI => by rcases principal I with ⟨a, rfl⟩ erw [Ideal.span_singleton_eq_top] rcases Ideal.span_singleton_le_span_singleton.1 (le_of_lt hI) with ⟨b, rfl⟩ refine (of_irreducible_mul hp).resolve_right (mt (fun hb => ?_) (not_le_of_lt hI)) erw [Ideal.span_singleton_le_span_singleton, IsUnit.mul_right_dvd hb]⟩⟩ #align principal_ideal_ring.is_maximal_of_irreducible PrincipalIdealRing.isMaximal_of_irreducible @[deprecated] protected alias irreducible_iff_prime := irreducible_iff_prime #align principal_ideal_ring.irreducible_iff_prime irreducible_iff_prime @[deprecated] protected alias associates_irreducible_iff_prime := associates_irreducible_iff_prime #align principal_ideal_ring.associates_irreducible_iff_prime associates_irreducible_iff_prime variable [CommRing R] [IsDomain R] [IsPrincipalIdealRing R] section open scoped Classical /-- `factors a` is a multiset of irreducible elements whose product is `a`, up to units -/ noncomputable def factors (a : R) : Multiset R := if h : a = 0 then ∅ else Classical.choose (WfDvdMonoid.exists_factors a h) #align principal_ideal_ring.factors PrincipalIdealRing.factors theorem factors_spec (a : R) (h : a ≠ 0) : (∀ b ∈ factors a, Irreducible b) ∧ Associated (factors a).prod a := by unfold factors; rw [dif_neg h] exact Classical.choose_spec (WfDvdMonoid.exists_factors a h) #align principal_ideal_ring.factors_spec PrincipalIdealRing.factors_spec theorem ne_zero_of_mem_factors {R : Type v} [CommRing R] [IsDomain R] [IsPrincipalIdealRing R] {a b : R} (ha : a ≠ 0) (hb : b ∈ factors a) : b ≠ 0 := Irreducible.ne_zero ((factors_spec a ha).1 b hb) #align principal_ideal_ring.ne_zero_of_mem_factors PrincipalIdealRing.ne_zero_of_mem_factors theorem mem_submonoid_of_factors_subset_of_units_subset (s : Submonoid R) {a : R} (ha : a ≠ 0) (hfac : ∀ b ∈ factors a, b ∈ s) (hunit : ∀ c : Rˣ, (c : R) ∈ s) : a ∈ s := by rcases (factors_spec a ha).2 with ⟨c, hc⟩ rw [← hc] exact mul_mem (multiset_prod_mem _ hfac) (hunit _) #align principal_ideal_ring.mem_submonoid_of_factors_subset_of_units_subset PrincipalIdealRing.mem_submonoid_of_factors_subset_of_units_subset /-- If a `RingHom` maps all units and all factors of an element `a` into a submonoid `s`, then it also maps `a` into that submonoid. -/ theorem ringHom_mem_submonoid_of_factors_subset_of_units_subset {R S : Type} [CommRing R] [IsDomain R] [IsPrincipalIdealRing R] [Semiring S] (f : R →+ S) (s : Submonoid S) (a : R) (ha : a ≠ 0) (h : ∀ b ∈ factors a, f b ∈ s) (hf : ∀ c : Rˣ, f c ∈ s) : f a ∈ s := mem_submonoid_of_factors_subset_of_units_subset (s.comap f.toMonoidHom) ha h hf #align principal_ideal_ring.ring_hom_mem_submonoid_of_factors_subset_of_units_subset PrincipalIdealRing.ringHom_mem_submonoid_of_factors_subset_of_units_subset -- see Note [lower instance priority] /-- A principal ideal domain has unique factorization -/ instance (priority := 100) to_uniqueFactorizationMonoid : UniqueFactorizationMonoid R := { (IsNoetherianRing.wfDvdMonoid : WfDvdMonoid R) with irreducible_iff_prime := irreducible_iff_prime } #align principal_ideal_ring.to_unique_factorization_monoid PrincipalIdealRing.to_uniqueFactorizationMonoid end end PrincipalIdealRing section Surjective open Submodule variable {S N : Type} [Ring R] [AddCommGroup M] [AddCommGroup N] [Ring S] variable [Module R M] [Module R N] theorem Submodule.IsPrincipal.of_comap (f : M →ₗ[R] N) (hf : Function.Surjective f) (S : Submodule R N) [hI : IsPrincipal (S.comap f)] : IsPrincipal S := ⟨⟨f (IsPrincipal.generator (S.comap f)), by rw [← Set.image_singleton, ← Submodule.map_span, IsPrincipal.span_singleton_generator, Submodule.map_comap_eq_of_surjective hf]⟩⟩ #align submodule.is_principal.of_comap Submodule.IsPrincipal.of_comap theorem Ideal.IsPrincipal.of_comap (f : R →+ S) (hf : Function.Surjective f) (I : Ideal S) [hI : IsPrincipal (I.comap f)] : IsPrincipal I := ⟨⟨f (IsPrincipal.generator (I.comap f)), by rw [Ideal.submodule_span_eq, ← Set.image_singleton, ← Ideal.map_span, Ideal.span_singleton_generator, Ideal.map_comap_of_surjective f hf]⟩⟩ #align ideal.is_principal.of_comap Ideal.IsPrincipal.of_comap /-- The surjective image of a principal ideal ring is again a principal ideal ring. -/ theorem IsPrincipalIdealRing.of_surjective [IsPrincipalIdealRing R] (f : R →+* S) (hf : Function.Surjective f) : IsPrincipalIdealRing S := ⟨fun I => Ideal.IsPrincipal.of_comap f hf I⟩ #align is_principal_ideal_ring.of_surjective IsPrincipalIdealRing.of_surjective end Surjective section open Ideal variable [CommRing R] [IsDomain R] section Bezout variable [IsBezout R] section GCD variable [GCDMonoid R] theorem IsBezout.span_gcd_eq_span_gcd (x y : R) : span {GCDMonoid.gcd x y} = span {IsBezout.gcd x y} := by rw [Ideal.span_singleton_eq_span_singleton] exact associated_of_dvd_dvd (IsBezout.dvd_gcd (GCDMonoid.gcd_dvd_left _ _) <\| GCDMonoid.gcd_dvd_right _ _) (GCDMonoid.dvd_gcd (IsBezout.gcd_dvd_left _ _) <\| IsBezout.gcd_dvd_right _ _) theorem span_gcd (x y : R) : span {gcd x y} = span {x, y} := by rw [← IsBezout.span_gcd, IsBezout.span_gcd_eq_span_gcd] #align span_gcd span_gcd theorem gcd_dvd_iff_exists (a b : R) {z} : gcd a b ∣ z ↔ ∃ x y, z = a * x + b * y := by simp_rw [mul_comm a, mul_comm b, @eq_comm _ z, ← Ideal.mem_span_pair, ← span_gcd, Ideal.mem_span_singleton] #align gcd_dvd_iff_exists gcd_dvd_iff_exists /-- Bézout's lemma -/ theorem exists_gcd_eq_mul_add_mul (a b : R) : ∃ x y, gcd a b = a * x + b * y := by rw [← gcd_dvd_iff_exists] #align exists_gcd_eq_mul_add_mul exists_gcd_eq_mul_add_mul theorem gcd_isUnit_iff (x y : R) : IsUnit (gcd x y) ↔ IsCoprime x y := by rw [IsCoprime, ← Ideal.mem_span_pair, ← span_gcd, ← span_singleton_eq_top, eq_top_iff_one] #align gcd_is_unit_iff gcd_isUnit_iff end GCD theorem isCoprime_of_dvd (x y : R) (nonzero : ¬(x = 0 ∧ y = 0)) (H : ∀ z ∈ nonunits R, z ≠ 0 → z ∣ x → ¬z ∣ y) : IsCoprime x y := (isRelPrime_of_no_nonunits_factors nonzero H).isCoprime #align is_coprime_of_dvd isCoprime_of_dvd theorem dvd_or_coprime (x y : R) (h : Irreducible x) : x ∣ y ∨ IsCoprime x y := h.dvd_or_isRelPrime.imp_right IsRelPrime.isCoprime #align dvd_or_coprime dvd_or_coprime /-- See also `Irreducible.isRelPrime_iff_not_dvd`. -/ theorem Irreducible.coprime_iff_not_dvd {p n : R} (hp : Irreducible p) : IsCoprime p n ↔ ¬p ∣ n := by rw [← isRelPrime_iff_isCoprime, hp.isRelPrime_iff_not_dvd] #align irreducible.coprime_iff_not_dvd Irreducible.coprime_iff_not_dvd theorem Prime.coprime_iff_not_dvd {p n : R} (hp : Prime p) : IsCoprime p n ↔ ¬p ∣ n := hp.irreducible.coprime_iff_not_dvd #align prime.coprime_iff_not_dvd Prime.coprime_iff_not_dvd /-- See also `Irreducible.coprime_iff_not_dvd'`. -/ theorem Irreducible.dvd_iff_not_coprime {p n : R} (hp : Irreducible p) : p ∣ n ↔ ¬IsCoprime p n := iff_not_comm.2 hp.coprime_iff_not_dvd #align irreducible.dvd_iff_not_coprime Irreducible.dvd_iff_not_coprime theorem Irreducible.coprime_pow_of_not_dvd {p a : R} (m : ℕ) (hp : Irreducible p) (h : ¬p ∣ a) : IsCoprime a (p ^ m) := (hp.coprime_iff_not_dvd.2 h).symm.pow_right #align irreducible.coprime_pow_of_not_dvd Irreducible.coprime_pow_of_not_dvd theorem Irreducible.coprime_or_dvd {p : R} (hp : Irreducible p) (i : R) : IsCoprime p i ∨ p ∣ i := (_root_.em _).imp_right hp.dvd_iff_not_coprime.2 #align irreducible.coprime_or_dvd Irreducible.coprime_or_dvd theorem exists_associated_pow_of_mul_eq_pow' {a b c : R} (hab : IsCoprime a b) {k : ℕ} (h : a * b = c ^ k) : ∃ d : R, Associated (d ^ k) a := by classical letI := IsBezout.toGCDDomain R exact exists_associated_pow_of_mul_eq_pow ((gcd_isUnit_iff _ _).mpr hab) h #align exists_associated_pow_of_mul_eq_pow' exists_associated_pow_of_mul_eq_pow' end Bezout variable [IsPrincipalIdealRing R] theorem isCoprime_of_irreducible_dvd {x y : R} (nonzero : ¬(x = 0 ∧ y = 0)) (H : ∀ z : R, Irreducible z → z ∣ x → ¬z ∣ y) : IsCoprime x y := (WfDvdMonoid.isRelPrime_of_no_irreducible_factors nonzero H).isCoprime #align is_coprime_of_irreducible_dvd isCoprime_of_irreducible_dvd theorem isCoprime_of_prime_dvd {x y : R} (nonzero : ¬(x = 0 ∧ y = 0)) (H : ∀ z : R, Prime z → z ∣ x → ¬z ∣ y) : IsCoprime x y := isCoprime_of_irreducible_dvd nonzero fun z zi ↦ H z zi.prime #align is_coprime_of_prime_dvd isCoprime_of_prime_dvd end section PrincipalOfPrime open Set Ideal variable (R) [CommRing R] /-- `nonPrincipals R` is the set of all ideals of `R` that are not principal ideals. -/ def nonPrincipals := { I : Ideal R \| ¬I.IsPrincipal } #align non_principals nonPrincipals theorem nonPrincipals_def {I : Ideal R} : I ∈ nonPrincipals R ↔ ¬I.IsPrincipal := Iff.rfl #align non_principals_def nonPrincipals_def variable {R}	Mathlib/RingTheory/PrincipalIdealDomain.lean	522	523	theorem nonPrincipals_eq_empty_iff : nonPrincipals R = ∅ ↔ IsPrincipalIdealRing R := by	simp [Set.eq_empty_iff_forall_not_mem, isPrincipalIdealRing_iff, nonPrincipals_def]
/- Copyright (c) 2023 Adrian Wüthrich. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Adrian Wüthrich -/ import Mathlib.Combinatorics.SimpleGraph.AdjMatrix import Mathlib.LinearAlgebra.Matrix.PosDef /-! # Laplacian Matrix This module defines the Laplacian matrix of a graph, and proves some of its elementary properties. ## Main definitions & Results * `SimpleGraph.degMatrix`: The degree matrix of a simple graph * `SimpleGraph.lapMatrix`: The Laplacian matrix of a simple graph, defined as the difference between the degree matrix and the adjacency matrix. * `isPosSemidef_lapMatrix`: The Laplacian matrix is positive semidefinite. * `rank_ker_lapMatrix_eq_card_ConnectedComponent`: The number of connected components in `G` is the dimension of the nullspace of its Laplacian matrix. -/ open Finset Matrix namespace SimpleGraph variable {V : Type} (R : Type) variable [Fintype V] [DecidableEq V] (G : SimpleGraph V) [DecidableRel G.Adj] /-- The diagonal matrix consisting of the degrees of the vertices in the graph. -/ def degMatrix [AddMonoidWithOne R] : Matrix V V R := Matrix.diagonal (G.degree ·) /-- The Laplacian matrix `lapMatrix G R` of a graph `G` is the matrix `L = D - A` where `D` is the degree and `A` the adjacency matrix of `G`. -/ def lapMatrix [AddGroupWithOne R] : Matrix V V R := G.degMatrix R - G.adjMatrix R variable {R} theorem isSymm_degMatrix [AddMonoidWithOne R] : (G.degMatrix R).IsSymm := isSymm_diagonal _ theorem isSymm_lapMatrix [AddGroupWithOne R] : (G.lapMatrix R).IsSymm := (isSymm_degMatrix _).sub (isSymm_adjMatrix _) theorem degMatrix_mulVec_apply [NonAssocSemiring R] (v : V) (vec : V → R) : (G.degMatrix R ᵥ vec) v = G.degree v vec v := by rw [degMatrix, mulVec_diagonal] theorem lapMatrix_mulVec_apply [NonAssocRing R] (v : V) (vec : V → R) : (G.lapMatrix R ᵥ vec) v = G.degree v vec v - ∑ u ∈ G.neighborFinset v, vec u := by simp_rw [lapMatrix, sub_mulVec, Pi.sub_apply, degMatrix_mulVec_apply, adjMatrix_mulVec_apply] theorem lapMatrix_mulVec_const_eq_zero [Ring R] : mulVec (G.lapMatrix R) (fun _ ↦ 1) = 0 := by ext1 i rw [lapMatrix_mulVec_apply] simp	Mathlib/Combinatorics/SimpleGraph/LapMatrix.lean	61	63	theorem dotProduct_mulVec_degMatrix [CommRing R] (x : V → R) : x ⬝ᵥ (G.degMatrix R ᵥ x) = ∑ i : V, G.degree i x i * x i := by	simp only [dotProduct, degMatrix, mulVec_diagonal, ← mul_assoc, mul_comm]
/- Copyright (c) 2018 Reid Barton. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Reid Barton -/ import Mathlib.Topology.ContinuousFunction.Basic #align_import topology.compact_open from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" /-! # The compact-open topology In this file, we define the compact-open topology on the set of continuous maps between two topological spaces. ## Main definitions * `ContinuousMap.compactOpen` is the compact-open topology on `C(X, Y)`. It is declared as an instance. * `ContinuousMap.coev` is the coevaluation map `Y → C(X, Y × X)`. It is always continuous. * `ContinuousMap.curry` is the currying map `C(X × Y, Z) → C(X, C(Y, Z))`. This map always exists and it is continuous as long as `X × Y` is locally compact. * `ContinuousMap.uncurry` is the uncurrying map `C(X, C(Y, Z)) → C(X × Y, Z)`. For this map to exist, we need `Y` to be locally compact. If `X` is also locally compact, then this map is continuous. * `Homeomorph.curry` combines the currying and uncurrying operations into a homeomorphism `C(X × Y, Z) ≃ₜ C(X, C(Y, Z))`. This homeomorphism exists if `X` and `Y` are locally compact. ## Tags compact-open, curry, function space -/ open Set Filter TopologicalSpace open scoped Topology namespace ContinuousMap section CompactOpen variable {α X Y Z T : Type} variable [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] [TopologicalSpace T] variable {K : Set X} {U : Set Y} #noalign continuous_map.compact_open.gen #noalign continuous_map.gen_empty #noalign continuous_map.gen_univ #noalign continuous_map.gen_inter #noalign continuous_map.gen_union #noalign continuous_map.gen_empty_right /-- The compact-open topology on the space of continuous maps `C(X, Y)`. -/ instance compactOpen : TopologicalSpace C(X, Y) := .generateFrom <\| image2 (fun K U ↦ {f \| MapsTo f K U}) {K \| IsCompact K} {U \| IsOpen U} #align continuous_map.compact_open ContinuousMap.compactOpen /-- Definition of `ContinuousMap.compactOpen`. -/ theorem compactOpen_eq : @compactOpen X Y _ _ = .generateFrom (image2 (fun K U ↦ {f \| MapsTo f K U}) {K \| IsCompact K} {t \| IsOpen t}) := rfl theorem isOpen_setOf_mapsTo (hK : IsCompact K) (hU : IsOpen U) : IsOpen {f : C(X, Y) \| MapsTo f K U} := isOpen_generateFrom_of_mem <\| mem_image2_of_mem hK hU #align continuous_map.is_open_gen ContinuousMap.isOpen_setOf_mapsTo lemma eventually_mapsTo {f : C(X, Y)} (hK : IsCompact K) (hU : IsOpen U) (h : MapsTo f K U) : ∀ᶠ g : C(X, Y) in 𝓝 f, MapsTo g K U := (isOpen_setOf_mapsTo hK hU).mem_nhds h lemma nhds_compactOpen (f : C(X, Y)) : 𝓝 f = ⨅ (K : Set X) (_ : IsCompact K) (U : Set Y) (_ : IsOpen U) (_ : MapsTo f K U), 𝓟 {g : C(X, Y) \| MapsTo g K U} := by simp_rw [compactOpen_eq, nhds_generateFrom, mem_setOf_eq, @and_comm (f ∈ _), iInf_and, ← image_prod, iInf_image, biInf_prod, mem_setOf_eq] lemma tendsto_nhds_compactOpen {l : Filter α} {f : α → C(Y, Z)} {g : C(Y, Z)} : Tendsto f l (𝓝 g) ↔ ∀ K, IsCompact K → ∀ U, IsOpen U → MapsTo g K U → ∀ᶠ a in l, MapsTo (f a) K U := by simp [nhds_compactOpen] lemma continuous_compactOpen {f : X → C(Y, Z)} : Continuous f ↔ ∀ K, IsCompact K → ∀ U, IsOpen U → IsOpen {x \| MapsTo (f x) K U} := continuous_generateFrom_iff.trans forall_image2_iff section Functorial /-- `C(X, ·)` is a functor. -/ theorem continuous_comp (g : C(Y, Z)) : Continuous (ContinuousMap.comp g : C(X, Y) → C(X, Z)) := continuous_compactOpen.2 fun _K hK _U hU ↦ isOpen_setOf_mapsTo hK (hU.preimage g.2) #align continuous_map.continuous_comp ContinuousMap.continuous_comp /-- If `g : C(Y, Z)` is a topology inducing map, then the composition `ContinuousMap.comp g : C(X, Y) → C(X, Z)` is a topology inducing map too. -/ theorem inducing_comp (g : C(Y, Z)) (hg : Inducing g) : Inducing (g.comp : C(X, Y) → C(X, Z)) where induced := by simp only [compactOpen_eq, induced_generateFrom_eq, image_image2, hg.setOf_isOpen, image2_image_right, MapsTo, mem_preimage, preimage_setOf_eq, comp_apply] /-- If `g : C(Y, Z)` is a topological embedding, then the composition `ContinuousMap.comp g : C(X, Y) → C(X, Z)` is an embedding too. -/ theorem embedding_comp (g : C(Y, Z)) (hg : Embedding g) : Embedding (g.comp : C(X, Y) → C(X, Z)) := ⟨inducing_comp g hg.1, fun _ _ ↦ (cancel_left hg.2).1⟩ /-- `C(·, Z)` is a functor. -/ theorem continuous_comp_left (f : C(X, Y)) : Continuous (fun g => g.comp f : C(Y, Z) → C(X, Z)) := continuous_compactOpen.2 fun K hK U hU ↦ by simpa only [mapsTo_image_iff] using isOpen_setOf_mapsTo (hK.image f.2) hU #align continuous_map.continuous_comp_left ContinuousMap.continuous_comp_left /-- Any pair of homeomorphisms `X ≃ₜ Z` and `Y ≃ₜ T` gives rise to a homeomorphism `C(X, Y) ≃ₜ C(Z, T)`. -/ protected def _root_.Homeomorph.arrowCongr (φ : X ≃ₜ Z) (ψ : Y ≃ₜ T) : C(X, Y) ≃ₜ C(Z, T) where toFun f := .comp ψ <\| f.comp φ.symm invFun f := .comp ψ.symm <\| f.comp φ left_inv f := ext fun _ ↦ ψ.left_inv (f _) \|>.trans <\| congrArg f <\| φ.left_inv _ right_inv f := ext fun _ ↦ ψ.right_inv (f _) \|>.trans <\| congrArg f <\| φ.right_inv _ continuous_toFun := continuous_comp _ \|>.comp <\| continuous_comp_left _ continuous_invFun := continuous_comp _ \|>.comp <\| continuous_comp_left _ variable [LocallyCompactPair Y Z] /-- Composition is a continuous map from `C(X, Y) × C(Y, Z)` to `C(X, Z)`, provided that `Y` is locally compact. This is Prop. 9 of Chap. X, §3, №. 4 of Bourbaki's Topologie Générale. -/ theorem continuous_comp' : Continuous fun x : C(X, Y) × C(Y, Z) => x.2.comp x.1 := by simp_rw [continuous_iff_continuousAt, ContinuousAt, tendsto_nhds_compactOpen] intro ⟨f, g⟩ K hK U hU (hKU : MapsTo (g ∘ f) K U) obtain ⟨L, hKL, hLc, hLU⟩ : ∃ L ∈ 𝓝ˢ (f '' K), IsCompact L ∧ MapsTo g L U := exists_mem_nhdsSet_isCompact_mapsTo g.continuous (hK.image f.continuous) hU (mapsTo_image_iff.2 hKU) rw [← subset_interior_iff_mem_nhdsSet, ← mapsTo'] at hKL exact ((eventually_mapsTo hK isOpen_interior hKL).prod_nhds (eventually_mapsTo hLc hU hLU)).mono fun ⟨f', g'⟩ ⟨hf', hg'⟩ ↦ hg'.comp <\| hf'.mono_right interior_subset #align continuous_map.continuous_comp' ContinuousMap.continuous_comp' lemma _root_.Filter.Tendsto.compCM {α : Type} {l : Filter α} {g : α → C(Y, Z)} {g₀ : C(Y, Z)} {f : α → C(X, Y)} {f₀ : C(X, Y)} (hg : Tendsto g l (𝓝 g₀)) (hf : Tendsto f l (𝓝 f₀)) : Tendsto (fun a ↦ (g a).comp (f a)) l (𝓝 (g₀.comp f₀)) := (continuous_comp'.tendsto (f₀, g₀)).comp (hf.prod_mk_nhds hg) variable {X' : Type} [TopologicalSpace X'] {a : X'} {g : X' → C(Y, Z)} {f : X' → C(X, Y)} {s : Set X'} nonrec lemma _root_.ContinuousAt.compCM (hg : ContinuousAt g a) (hf : ContinuousAt f a) : ContinuousAt (fun x ↦ (g x).comp (f x)) a := hg.compCM hf nonrec lemma _root_.ContinuousWithinAt.compCM (hg : ContinuousWithinAt g s a) (hf : ContinuousWithinAt f s a) : ContinuousWithinAt (fun x ↦ (g x).comp (f x)) s a := hg.compCM hf lemma _root_.ContinuousOn.compCM (hg : ContinuousOn g s) (hf : ContinuousOn f s) : ContinuousOn (fun x ↦ (g x).comp (f x)) s := fun a ha ↦ (hg a ha).compCM (hf a ha) lemma _root_.Continuous.compCM (hg : Continuous g) (hf : Continuous f) : Continuous fun x => (g x).comp (f x) := continuous_comp'.comp (hf.prod_mk hg) @[deprecated _root_.Continuous.compCM (since := "2024-01-30")] lemma continuous.comp' (hf : Continuous f) (hg : Continuous g) : Continuous fun x => (g x).comp (f x) := hg.compCM hf #align continuous_map.continuous.comp' ContinuousMap.continuous.comp' end Functorial section Ev /-- The evaluation map `C(X, Y) × X → Y` is continuous if `X, Y` is a locally compact pair of spaces. -/ @[continuity] theorem continuous_eval [LocallyCompactPair X Y] : Continuous fun p : C(X, Y) × X => p.1 p.2 := by simp_rw [continuous_iff_continuousAt, ContinuousAt, (nhds_basis_opens _).tendsto_right_iff] rintro ⟨f, x⟩ U ⟨hx : f x ∈ U, hU : IsOpen U⟩ rcases exists_mem_nhds_isCompact_mapsTo f.continuous (hU.mem_nhds hx) with ⟨K, hxK, hK, hKU⟩ filter_upwards [prod_mem_nhds (eventually_mapsTo hK hU hKU) hxK] using fun _ h ↦ h.1 h.2 #align continuous_map.continuous_eval' ContinuousMap.continuous_eval #align continuous_map.continuous_eval ContinuousMap.continuous_eval @[deprecated] alias continuous_eval' := continuous_eval /-- Evaluation of a continuous map `f` at a point `x` is continuous in `f`. Porting note: merged `continuous_eval_const` with `continuous_eval_const'` removing unneeded assumptions. -/ @[continuity] theorem continuous_eval_const (a : X) : Continuous fun f : C(X, Y) => f a := continuous_def.2 fun U hU ↦ by simpa using isOpen_setOf_mapsTo (isCompact_singleton (x := a)) hU #align continuous_map.continuous_eval_const' ContinuousMap.continuous_eval_const #align continuous_map.continuous_eval_const ContinuousMap.continuous_eval_const /-- Coercion from `C(X, Y)` with compact-open topology to `X → Y` with pointwise convergence topology is a continuous map. Porting note: merged `continuous_coe` with `continuous_coe'` removing unneeded assumptions. -/ theorem continuous_coe : Continuous ((⇑) : C(X, Y) → (X → Y)) := continuous_pi continuous_eval_const #align continuous_map.continuous_coe' ContinuousMap.continuous_coe #align continuous_map.continuous_coe ContinuousMap.continuous_coe lemma isClosed_setOf_mapsTo {t : Set Y} (ht : IsClosed t) (s : Set X) : IsClosed {f : C(X, Y) \| MapsTo f s t} := ht.setOf_mapsTo fun _ _ ↦ continuous_eval_const _ lemma isClopen_setOf_mapsTo (hK : IsCompact K) (hU : IsClopen U) : IsClopen {f : C(X, Y) \| MapsTo f K U} := ⟨isClosed_setOf_mapsTo hU.isClosed K, isOpen_setOf_mapsTo hK hU.isOpen⟩ @[norm_cast] lemma specializes_coe {f g : C(X, Y)} : ⇑f ⤳ ⇑g ↔ f ⤳ g := by refine ⟨fun h ↦ ?_, fun h ↦ h.map continuous_coe⟩ suffices ∀ K, IsCompact K → ∀ U, IsOpen U → MapsTo g K U → MapsTo f K U by simpa [specializes_iff_pure, nhds_compactOpen] exact fun K _ U hU hg x hx ↦ (h.map (continuous_apply x)).mem_open hU (hg hx) @[norm_cast] lemma inseparable_coe {f g : C(X, Y)} : Inseparable (f : X → Y) g ↔ Inseparable f g := by simp only [inseparable_iff_specializes_and, specializes_coe] instance [T0Space Y] : T0Space C(X, Y) := t0Space_of_injective_of_continuous DFunLike.coe_injective continuous_coe instance [R0Space Y] : R0Space C(X, Y) where specializes_symmetric f g h := by rw [← specializes_coe] at h ⊢ exact h.symm instance [T1Space Y] : T1Space C(X, Y) := t1Space_of_injective_of_continuous DFunLike.coe_injective continuous_coe instance [R1Space Y] : R1Space C(X, Y) := .of_continuous_specializes_imp continuous_coe fun _ _ ↦ specializes_coe.1 instance [T2Space Y] : T2Space C(X, Y) := inferInstance instance [RegularSpace Y] : RegularSpace C(X, Y) := .of_lift'_closure_le fun f ↦ by rw [← tendsto_id', tendsto_nhds_compactOpen] intro K hK U hU hf rcases (hK.image f.continuous).exists_isOpen_closure_subset (hU.mem_nhdsSet.2 hf.image_subset) with ⟨V, hVo, hKV, hVU⟩ filter_upwards [mem_lift' (eventually_mapsTo hK hVo (mapsTo'.2 hKV))] with g hg refine ((isClosed_setOf_mapsTo isClosed_closure K).closure_subset ?_).mono_right hVU exact closure_mono (fun _ h ↦ h.mono_right subset_closure) hg instance [T3Space Y] : T3Space C(X, Y) := inferInstance end Ev section InfInduced /-- For any subset `s` of `X`, the restriction of continuous functions to `s` is continuous as a function from `C(X, Y)` to `C(s, Y)` with their respective compact-open topologies. -/ theorem continuous_restrict (s : Set X) : Continuous fun F : C(X, Y) => F.restrict s := continuous_comp_left <\| restrict s <\| .id X #align continuous_map.continuous_restrict ContinuousMap.continuous_restrict theorem compactOpen_le_induced (s : Set X) : (ContinuousMap.compactOpen : TopologicalSpace C(X, Y)) ≤ .induced (restrict s) ContinuousMap.compactOpen := (continuous_restrict s).le_induced #align continuous_map.compact_open_le_induced ContinuousMap.compactOpen_le_induced /-- The compact-open topology on `C(X, Y)` is equal to the infimum of the compact-open topologies on `C(s, Y)` for `s` a compact subset of `X`. The key point of the proof is that for every compact set `K`, the universal set `Set.univ : Set K` is a compact set as well. -/ theorem compactOpen_eq_iInf_induced : (ContinuousMap.compactOpen : TopologicalSpace C(X, Y)) = ⨅ (K : Set X) (_ : IsCompact K), .induced (.restrict K) ContinuousMap.compactOpen := by refine le_antisymm (le_iInf₂ fun s _ ↦ compactOpen_le_induced s) ?_ refine le_generateFrom <\| forall_image2_iff.2 fun K (hK : IsCompact K) U hU ↦ ?_ refine TopologicalSpace.le_def.1 (iInf₂_le K hK) _ ?_ convert isOpen_induced (isOpen_setOf_mapsTo (isCompact_iff_isCompact_univ.1 hK) hU) simp only [mapsTo_univ_iff, Subtype.forall] rfl #align continuous_map.compact_open_eq_Inf_induced ContinuousMap.compactOpen_eq_iInf_induced @[deprecated] alias compactOpen_eq_sInf_induced := compactOpen_eq_iInf_induced theorem nhds_compactOpen_eq_iInf_nhds_induced (f : C(X, Y)) : 𝓝 f = ⨅ (s) (hs : IsCompact s), (𝓝 (f.restrict s)).comap (ContinuousMap.restrict s) := by rw [compactOpen_eq_iInf_induced] simp only [nhds_iInf, nhds_induced] #align continuous_map.nhds_compact_open_eq_Inf_nhds_induced ContinuousMap.nhds_compactOpen_eq_iInf_nhds_induced @[deprecated] alias nhds_compactOpen_eq_sInf_nhds_induced := nhds_compactOpen_eq_iInf_nhds_induced theorem tendsto_compactOpen_restrict {ι : Type} {l : Filter ι} {F : ι → C(X, Y)} {f : C(X, Y)} (hFf : Filter.Tendsto F l (𝓝 f)) (s : Set X) : Tendsto (fun i => (F i).restrict s) l (𝓝 (f.restrict s)) := (continuous_restrict s).continuousAt.tendsto.comp hFf #align continuous_map.tendsto_compact_open_restrict ContinuousMap.tendsto_compactOpen_restrict	Mathlib/Topology/CompactOpen.lean	301	305	theorem tendsto_compactOpen_iff_forall {ι : Type*} {l : Filter ι} (F : ι → C(X, Y)) (f : C(X, Y)) : Tendsto F l (𝓝 f) ↔ ∀ K, IsCompact K → Tendsto (fun i => (F i).restrict K) l (𝓝 (f.restrict K)) := by	rw [compactOpen_eq_iInf_induced] simp [nhds_iInf, nhds_induced, Filter.tendsto_comap_iff, Function.comp]
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Algebra.Equiv import Mathlib.LinearAlgebra.Dimension.StrongRankCondition import Mathlib.LinearAlgebra.FreeModule.Basic import Mathlib.LinearAlgebra.FreeModule.Finite.Basic import Mathlib.SetTheory.Cardinal.Ordinal #align_import algebra.quaternion from "leanprover-community/mathlib"@"cf7a7252c1989efe5800e0b3cdfeb4228ac6b40e" /-! # Quaternions In this file we define quaternions `ℍ[R]` over a commutative ring `R`, and define some algebraic structures on `ℍ[R]`. ## Main definitions * `QuaternionAlgebra R a b`, `ℍ[R, a, b]` : [quaternion algebra](https://en.wikipedia.org/wiki/Quaternion_algebra) with coefficients `a`, `b` * `Quaternion R`, `ℍ[R]` : the space of quaternions, a.k.a. `QuaternionAlgebra R (-1) (-1)`; * `Quaternion.normSq` : square of the norm of a quaternion; We also define the following algebraic structures on `ℍ[R]`: * `Ring ℍ[R, a, b]`, `StarRing ℍ[R, a, b]`, and `Algebra R ℍ[R, a, b]` : for any commutative ring `R`; * `Ring ℍ[R]`, `StarRing ℍ[R]`, and `Algebra R ℍ[R]` : for any commutative ring `R`; * `IsDomain ℍ[R]` : for a linear ordered commutative ring `R`; * `DivisionRing ℍ[R]` : for a linear ordered field `R`. ## Notation The following notation is available with `open Quaternion` or `open scoped Quaternion`. * `ℍ[R, c₁, c₂]` : `QuaternionAlgebra R c₁ c₂` * `ℍ[R]` : quaternions over `R`. ## Implementation notes We define quaternions over any ring `R`, not just `ℝ` to be able to deal with, e.g., integer or rational quaternions without using real numbers. In particular, all definitions in this file are computable. ## Tags quaternion -/ /-- Quaternion algebra over a type with fixed coefficients $a=i^2$ and $b=j^2$. Implemented as a structure with four fields: `re`, `imI`, `imJ`, and `imK`. -/ @[ext] structure QuaternionAlgebra (R : Type) (a b : R) where /-- Real part of a quaternion. -/ re : R imI : R imJ : R imK : R #align quaternion_algebra QuaternionAlgebra #align quaternion_algebra.re QuaternionAlgebra.re #align quaternion_algebra.im_i QuaternionAlgebra.imI #align quaternion_algebra.im_j QuaternionAlgebra.imJ #align quaternion_algebra.im_k QuaternionAlgebra.imK @[inherit_doc] scoped[Quaternion] notation "ℍ[" R "," a "," b "]" => QuaternionAlgebra R a b open Quaternion namespace QuaternionAlgebra /-- The equivalence between a quaternion algebra over `R` and `R × R × R × R`. -/ @[simps] def equivProd {R : Type} (c₁ c₂ : R) : ℍ[R,c₁,c₂] ≃ R × R × R × R where toFun a := ⟨a.1, a.2, a.3, a.4⟩ invFun a := ⟨a.1, a.2.1, a.2.2.1, a.2.2.2⟩ left_inv _ := rfl right_inv _ := rfl #align quaternion_algebra.equiv_prod QuaternionAlgebra.equivProd /-- The equivalence between a quaternion algebra over `R` and `Fin 4 → R`. -/ @[simps symm_apply] def equivTuple {R : Type} (c₁ c₂ : R) : ℍ[R,c₁,c₂] ≃ (Fin 4 → R) where toFun a := ![a.1, a.2, a.3, a.4] invFun a := ⟨a 0, a 1, a 2, a 3⟩ left_inv _ := rfl right_inv f := by ext ⟨_, _ \| _ \| _ \| _ \| _ \| ⟨⟩⟩ <;> rfl #align quaternion_algebra.equiv_tuple QuaternionAlgebra.equivTuple @[simp] theorem equivTuple_apply {R : Type} (c₁ c₂ : R) (x : ℍ[R,c₁,c₂]) : equivTuple c₁ c₂ x = ![x.re, x.imI, x.imJ, x.imK] := rfl #align quaternion_algebra.equiv_tuple_apply QuaternionAlgebra.equivTuple_apply @[simp] theorem mk.eta {R : Type} {c₁ c₂} (a : ℍ[R,c₁,c₂]) : mk a.1 a.2 a.3 a.4 = a := rfl #align quaternion_algebra.mk.eta QuaternionAlgebra.mk.eta variable {S T R : Type} [CommRing R] {c₁ c₂ : R} (r x y z : R) (a b c : ℍ[R,c₁,c₂]) instance [Subsingleton R] : Subsingleton ℍ[R, c₁, c₂] := (equivTuple c₁ c₂).subsingleton instance [Nontrivial R] : Nontrivial ℍ[R, c₁, c₂] := (equivTuple c₁ c₂).surjective.nontrivial /-- The imaginary part of a quaternion. -/ def im (x : ℍ[R,c₁,c₂]) : ℍ[R,c₁,c₂] := ⟨0, x.imI, x.imJ, x.imK⟩ #align quaternion_algebra.im QuaternionAlgebra.im @[simp] theorem im_re : a.im.re = 0 := rfl #align quaternion_algebra.im_re QuaternionAlgebra.im_re @[simp] theorem im_imI : a.im.imI = a.imI := rfl #align quaternion_algebra.im_im_i QuaternionAlgebra.im_imI @[simp] theorem im_imJ : a.im.imJ = a.imJ := rfl #align quaternion_algebra.im_im_j QuaternionAlgebra.im_imJ @[simp] theorem im_imK : a.im.imK = a.imK := rfl #align quaternion_algebra.im_im_k QuaternionAlgebra.im_imK @[simp] theorem im_idem : a.im.im = a.im := rfl #align quaternion_algebra.im_idem QuaternionAlgebra.im_idem /-- Coercion `R → ℍ[R,c₁,c₂]`. -/ @[coe] def coe (x : R) : ℍ[R,c₁,c₂] := ⟨x, 0, 0, 0⟩ instance : CoeTC R ℍ[R,c₁,c₂] := ⟨coe⟩ @[simp, norm_cast] theorem coe_re : (x : ℍ[R,c₁,c₂]).re = x := rfl #align quaternion_algebra.coe_re QuaternionAlgebra.coe_re @[simp, norm_cast] theorem coe_imI : (x : ℍ[R,c₁,c₂]).imI = 0 := rfl #align quaternion_algebra.coe_im_i QuaternionAlgebra.coe_imI @[simp, norm_cast] theorem coe_imJ : (x : ℍ[R,c₁,c₂]).imJ = 0 := rfl #align quaternion_algebra.coe_im_j QuaternionAlgebra.coe_imJ @[simp, norm_cast] theorem coe_imK : (x : ℍ[R,c₁,c₂]).imK = 0 := rfl #align quaternion_algebra.coe_im_k QuaternionAlgebra.coe_imK theorem coe_injective : Function.Injective (coe : R → ℍ[R,c₁,c₂]) := fun _ _ h => congr_arg re h #align quaternion_algebra.coe_injective QuaternionAlgebra.coe_injective @[simp] theorem coe_inj {x y : R} : (x : ℍ[R,c₁,c₂]) = y ↔ x = y := coe_injective.eq_iff #align quaternion_algebra.coe_inj QuaternionAlgebra.coe_inj -- Porting note: removed `simps`, added simp lemmas manually instance : Zero ℍ[R,c₁,c₂] := ⟨⟨0, 0, 0, 0⟩⟩ @[simp] theorem zero_re : (0 : ℍ[R,c₁,c₂]).re = 0 := rfl #align quaternion_algebra.has_zero_zero_re QuaternionAlgebra.zero_re @[simp] theorem zero_imI : (0 : ℍ[R,c₁,c₂]).imI = 0 := rfl #align quaternion_algebra.has_zero_zero_im_i QuaternionAlgebra.zero_imI @[simp] theorem zero_imJ : (0 : ℍ[R,c₁,c₂]).imJ = 0 := rfl #align quaternion_algebra.zero_zero_im_j QuaternionAlgebra.zero_imJ @[simp] theorem zero_imK : (0 : ℍ[R,c₁,c₂]).imK = 0 := rfl #align quaternion_algebra.zero_zero_im_k QuaternionAlgebra.zero_imK @[simp] theorem zero_im : (0 : ℍ[R,c₁,c₂]).im = 0 := rfl @[simp, norm_cast] theorem coe_zero : ((0 : R) : ℍ[R,c₁,c₂]) = 0 := rfl #align quaternion_algebra.coe_zero QuaternionAlgebra.coe_zero instance : Inhabited ℍ[R,c₁,c₂] := ⟨0⟩ -- Porting note: removed `simps`, added simp lemmas manually instance : One ℍ[R,c₁,c₂] := ⟨⟨1, 0, 0, 0⟩⟩ @[simp] theorem one_re : (1 : ℍ[R,c₁,c₂]).re = 1 := rfl #align quaternion_algebra.has_one_one_re QuaternionAlgebra.one_re @[simp] theorem one_imI : (1 : ℍ[R,c₁,c₂]).imI = 0 := rfl #align quaternion_algebra.has_one_one_im_i QuaternionAlgebra.one_imI @[simp] theorem one_imJ : (1 : ℍ[R,c₁,c₂]).imJ = 0 := rfl #align quaternion_algebra.one_one_im_j QuaternionAlgebra.one_imJ @[simp] theorem one_imK : (1 : ℍ[R,c₁,c₂]).imK = 0 := rfl #align quaternion_algebra.one_one_im_k QuaternionAlgebra.one_imK @[simp] theorem one_im : (1 : ℍ[R,c₁,c₂]).im = 0 := rfl @[simp, norm_cast] theorem coe_one : ((1 : R) : ℍ[R,c₁,c₂]) = 1 := rfl #align quaternion_algebra.coe_one QuaternionAlgebra.coe_one -- Porting note: removed `simps`, added simp lemmas manually instance : Add ℍ[R,c₁,c₂] := ⟨fun a b => ⟨a.1 + b.1, a.2 + b.2, a.3 + b.3, a.4 + b.4⟩⟩ @[simp] theorem add_re : (a + b).re = a.re + b.re := rfl #align quaternion_algebra.has_add_add_re QuaternionAlgebra.add_re @[simp] theorem add_imI : (a + b).imI = a.imI + b.imI := rfl #align quaternion_algebra.has_add_add_im_i QuaternionAlgebra.add_imI @[simp] theorem add_imJ : (a + b).imJ = a.imJ + b.imJ := rfl #align quaternion_algebra.has_add_add_im_j QuaternionAlgebra.add_imJ @[simp] theorem add_imK : (a + b).imK = a.imK + b.imK := rfl #align quaternion_algebra.has_add_add_im_k QuaternionAlgebra.add_imK @[simp] theorem add_im : (a + b).im = a.im + b.im := QuaternionAlgebra.ext _ _ (zero_add _).symm rfl rfl rfl @[simp] theorem mk_add_mk (a₁ a₂ a₃ a₄ b₁ b₂ b₃ b₄ : R) : (mk a₁ a₂ a₃ a₄ : ℍ[R,c₁,c₂]) + mk b₁ b₂ b₃ b₄ = mk (a₁ + b₁) (a₂ + b₂) (a₃ + b₃) (a₄ + b₄) := rfl #align quaternion_algebra.mk_add_mk QuaternionAlgebra.mk_add_mk @[simp, norm_cast] theorem coe_add : ((x + y : R) : ℍ[R,c₁,c₂]) = x + y := by ext <;> simp #align quaternion_algebra.coe_add QuaternionAlgebra.coe_add -- Porting note: removed `simps`, added simp lemmas manually instance : Neg ℍ[R,c₁,c₂] := ⟨fun a => ⟨-a.1, -a.2, -a.3, -a.4⟩⟩ @[simp] theorem neg_re : (-a).re = -a.re := rfl #align quaternion_algebra.has_neg_neg_re QuaternionAlgebra.neg_re @[simp] theorem neg_imI : (-a).imI = -a.imI := rfl #align quaternion_algebra.has_neg_neg_im_i QuaternionAlgebra.neg_imI @[simp] theorem neg_imJ : (-a).imJ = -a.imJ := rfl #align quaternion_algebra.has_neg_neg_im_j QuaternionAlgebra.neg_imJ @[simp] theorem neg_imK : (-a).imK = -a.imK := rfl #align quaternion_algebra.has_neg_neg_im_k QuaternionAlgebra.neg_imK @[simp] theorem neg_im : (-a).im = -a.im := QuaternionAlgebra.ext _ _ neg_zero.symm rfl rfl rfl @[simp] theorem neg_mk (a₁ a₂ a₃ a₄ : R) : -(mk a₁ a₂ a₃ a₄ : ℍ[R,c₁,c₂]) = ⟨-a₁, -a₂, -a₃, -a₄⟩ := rfl #align quaternion_algebra.neg_mk QuaternionAlgebra.neg_mk @[simp, norm_cast] theorem coe_neg : ((-x : R) : ℍ[R,c₁,c₂]) = -x := by ext <;> simp #align quaternion_algebra.coe_neg QuaternionAlgebra.coe_neg instance : Sub ℍ[R,c₁,c₂] := ⟨fun a b => ⟨a.1 - b.1, a.2 - b.2, a.3 - b.3, a.4 - b.4⟩⟩ @[simp] theorem sub_re : (a - b).re = a.re - b.re := rfl #align quaternion_algebra.has_sub_sub_re QuaternionAlgebra.sub_re @[simp] theorem sub_imI : (a - b).imI = a.imI - b.imI := rfl #align quaternion_algebra.has_sub_sub_im_i QuaternionAlgebra.sub_imI @[simp] theorem sub_imJ : (a - b).imJ = a.imJ - b.imJ := rfl #align quaternion_algebra.has_sub_sub_im_j QuaternionAlgebra.sub_imJ @[simp] theorem sub_imK : (a - b).imK = a.imK - b.imK := rfl #align quaternion_algebra.has_sub_sub_im_k QuaternionAlgebra.sub_imK @[simp] theorem sub_im : (a - b).im = a.im - b.im := QuaternionAlgebra.ext _ _ (sub_zero _).symm rfl rfl rfl @[simp] theorem mk_sub_mk (a₁ a₂ a₃ a₄ b₁ b₂ b₃ b₄ : R) : (mk a₁ a₂ a₃ a₄ : ℍ[R,c₁,c₂]) - mk b₁ b₂ b₃ b₄ = mk (a₁ - b₁) (a₂ - b₂) (a₃ - b₃) (a₄ - b₄) := rfl #align quaternion_algebra.mk_sub_mk QuaternionAlgebra.mk_sub_mk @[simp, norm_cast] theorem coe_im : (x : ℍ[R,c₁,c₂]).im = 0 := rfl #align quaternion_algebra.coe_im QuaternionAlgebra.coe_im @[simp] theorem re_add_im : ↑a.re + a.im = a := QuaternionAlgebra.ext _ _ (add_zero _) (zero_add _) (zero_add _) (zero_add _) #align quaternion_algebra.re_add_im QuaternionAlgebra.re_add_im @[simp] theorem sub_self_im : a - a.im = a.re := QuaternionAlgebra.ext _ _ (sub_zero _) (sub_self _) (sub_self _) (sub_self _) #align quaternion_algebra.sub_self_im QuaternionAlgebra.sub_self_im @[simp] theorem sub_self_re : a - a.re = a.im := QuaternionAlgebra.ext _ _ (sub_self _) (sub_zero _) (sub_zero _) (sub_zero _) #align quaternion_algebra.sub_self_re QuaternionAlgebra.sub_self_re /-- Multiplication is given by * `1 * x = x * 1 = x`; * `i * i = c₁`; * `j * j = c₂`; * `i * j = k`, `j * i = -k`; * `k * k = -c₁ * c₂`; * `i * k = c₁ * j`, `k * i = -c₁ * j`; * `j * k = -c₂ * i`, `k * j = c₂ * i`. -/ instance : Mul ℍ[R,c₁,c₂] := ⟨fun a b => ⟨a.1 * b.1 + c₁ * a.2 * b.2 + c₂ * a.3 * b.3 - c₁ * c₂ * a.4 * b.4, a.1 * b.2 + a.2 * b.1 - c₂ * a.3 * b.4 + c₂ * a.4 * b.3, a.1 * b.3 + c₁ * a.2 * b.4 + a.3 * b.1 - c₁ * a.4 * b.2, a.1 * b.4 + a.2 * b.3 - a.3 * b.2 + a.4 * b.1⟩⟩ @[simp] theorem mul_re : (a * b).re = a.1 * b.1 + c₁ * a.2 * b.2 + c₂ * a.3 * b.3 - c₁ * c₂ * a.4 * b.4 := rfl #align quaternion_algebra.has_mul_mul_re QuaternionAlgebra.mul_re @[simp] theorem mul_imI : (a * b).imI = a.1 * b.2 + a.2 * b.1 - c₂ * a.3 * b.4 + c₂ * a.4 * b.3 := rfl #align quaternion_algebra.has_mul_mul_im_i QuaternionAlgebra.mul_imI @[simp] theorem mul_imJ : (a * b).imJ = a.1 * b.3 + c₁ * a.2 * b.4 + a.3 * b.1 - c₁ * a.4 * b.2 := rfl #align quaternion_algebra.has_mul_mul_im_j QuaternionAlgebra.mul_imJ @[simp] theorem mul_imK : (a * b).imK = a.1 * b.4 + a.2 * b.3 - a.3 * b.2 + a.4 * b.1 := rfl #align quaternion_algebra.has_mul_mul_im_k QuaternionAlgebra.mul_imK @[simp] theorem mk_mul_mk (a₁ a₂ a₃ a₄ b₁ b₂ b₃ b₄ : R) : (mk a₁ a₂ a₃ a₄ : ℍ[R,c₁,c₂]) * mk b₁ b₂ b₃ b₄ = ⟨a₁ * b₁ + c₁ * a₂ * b₂ + c₂ * a₃ * b₃ - c₁ * c₂ * a₄ * b₄, a₁ * b₂ + a₂ * b₁ - c₂ * a₃ * b₄ + c₂ * a₄ * b₃, a₁ * b₃ + c₁ * a₂ * b₄ + a₃ * b₁ - c₁ * a₄ * b₂, a₁ * b₄ + a₂ * b₃ - a₃ * b₂ + a₄ * b₁⟩ := rfl #align quaternion_algebra.mk_mul_mk QuaternionAlgebra.mk_mul_mk section variable [SMul S R] [SMul T R] (s : S) -- Porting note: Lean 4 auto drops the unused `[Ring R]` argument instance : SMul S ℍ[R,c₁,c₂] where smul s a := ⟨s • a.1, s • a.2, s • a.3, s • a.4⟩ instance [SMul S T] [IsScalarTower S T R] : IsScalarTower S T ℍ[R,c₁,c₂] where smul_assoc s t x := by ext <;> exact smul_assoc _ _ _ instance [SMulCommClass S T R] : SMulCommClass S T ℍ[R,c₁,c₂] where smul_comm s t x := by ext <;> exact smul_comm _ _ _ @[simp] theorem smul_re : (s • a).re = s • a.re := rfl #align quaternion_algebra.smul_re QuaternionAlgebra.smul_re @[simp] theorem smul_imI : (s • a).imI = s • a.imI := rfl #align quaternion_algebra.smul_im_i QuaternionAlgebra.smul_imI @[simp] theorem smul_imJ : (s • a).imJ = s • a.imJ := rfl #align quaternion_algebra.smul_im_j QuaternionAlgebra.smul_imJ @[simp] theorem smul_imK : (s • a).imK = s • a.imK := rfl #align quaternion_algebra.smul_im_k QuaternionAlgebra.smul_imK @[simp] theorem smul_im {S} [SMulZeroClass S R] (s : S) : (s • a).im = s • a.im := QuaternionAlgebra.ext _ _ (smul_zero s).symm rfl rfl rfl @[simp] theorem smul_mk (re im_i im_j im_k : R) : s • (⟨re, im_i, im_j, im_k⟩ : ℍ[R,c₁,c₂]) = ⟨s • re, s • im_i, s • im_j, s • im_k⟩ := rfl #align quaternion_algebra.smul_mk QuaternionAlgebra.smul_mk end @[simp, norm_cast] theorem coe_smul [SMulZeroClass S R] (s : S) (r : R) : (↑(s • r) : ℍ[R,c₁,c₂]) = s • (r : ℍ[R,c₁,c₂]) := QuaternionAlgebra.ext _ _ rfl (smul_zero s).symm (smul_zero s).symm (smul_zero s).symm #align quaternion_algebra.coe_smul QuaternionAlgebra.coe_smul instance : AddCommGroup ℍ[R,c₁,c₂] := (equivProd c₁ c₂).injective.addCommGroup _ rfl (fun _ _ ↦ rfl) (fun _ ↦ rfl) (fun _ _ ↦ rfl) (fun _ _ ↦ rfl) (fun _ _ ↦ rfl) instance : AddCommGroupWithOne ℍ[R,c₁,c₂] where natCast n := ((n : R) : ℍ[R,c₁,c₂]) natCast_zero := by simp natCast_succ := by simp intCast n := ((n : R) : ℍ[R,c₁,c₂]) intCast_ofNat _ := congr_arg coe (Int.cast_natCast _) intCast_negSucc n := by change coe _ = -coe _ rw [Int.cast_negSucc, coe_neg] @[simp, norm_cast] theorem natCast_re (n : ℕ) : (n : ℍ[R,c₁,c₂]).re = n := rfl #align quaternion_algebra.nat_cast_re QuaternionAlgebra.natCast_re @[deprecated (since := "2024-04-17")] alias nat_cast_re := natCast_re @[simp, norm_cast] theorem natCast_imI (n : ℕ) : (n : ℍ[R,c₁,c₂]).imI = 0 := rfl #align quaternion_algebra.nat_cast_im_i QuaternionAlgebra.natCast_imI @[deprecated (since := "2024-04-17")] alias nat_cast_imI := natCast_imI @[simp, norm_cast] theorem natCast_imJ (n : ℕ) : (n : ℍ[R,c₁,c₂]).imJ = 0 := rfl #align quaternion_algebra.nat_cast_im_j QuaternionAlgebra.natCast_imJ @[deprecated (since := "2024-04-17")] alias nat_cast_imJ := natCast_imJ @[simp, norm_cast] theorem natCast_imK (n : ℕ) : (n : ℍ[R,c₁,c₂]).imK = 0 := rfl #align quaternion_algebra.nat_cast_im_k QuaternionAlgebra.natCast_imK @[deprecated (since := "2024-04-17")] alias nat_cast_imK := natCast_imK @[simp, norm_cast] theorem natCast_im (n : ℕ) : (n : ℍ[R,c₁,c₂]).im = 0 := rfl #align quaternion_algebra.nat_cast_im QuaternionAlgebra.natCast_im @[deprecated (since := "2024-04-17")] alias nat_cast_im := natCast_im @[norm_cast] theorem coe_natCast (n : ℕ) : ↑(n : R) = (n : ℍ[R,c₁,c₂]) := rfl #align quaternion_algebra.coe_nat_cast QuaternionAlgebra.coe_natCast @[deprecated (since := "2024-04-17")] alias coe_nat_cast := coe_natCast @[simp, norm_cast] theorem intCast_re (z : ℤ) : (z : ℍ[R,c₁,c₂]).re = z := rfl #align quaternion_algebra.int_cast_re QuaternionAlgebra.intCast_re @[deprecated (since := "2024-04-17")] alias int_cast_re := intCast_re @[simp, norm_cast] theorem intCast_imI (z : ℤ) : (z : ℍ[R,c₁,c₂]).imI = 0 := rfl #align quaternion_algebra.int_cast_im_i QuaternionAlgebra.intCast_imI @[deprecated (since := "2024-04-17")] alias int_cast_imI := intCast_imI @[simp, norm_cast] theorem intCast_imJ (z : ℤ) : (z : ℍ[R,c₁,c₂]).imJ = 0 := rfl #align quaternion_algebra.int_cast_im_j QuaternionAlgebra.intCast_imJ @[deprecated (since := "2024-04-17")] alias int_cast_imJ := intCast_imJ @[simp, norm_cast] theorem intCast_imK (z : ℤ) : (z : ℍ[R,c₁,c₂]).imK = 0 := rfl #align quaternion_algebra.int_cast_im_k QuaternionAlgebra.intCast_imK @[deprecated (since := "2024-04-17")] alias int_cast_imK := intCast_imK @[simp, norm_cast] theorem intCast_im (z : ℤ) : (z : ℍ[R,c₁,c₂]).im = 0 := rfl #align quaternion_algebra.int_cast_im QuaternionAlgebra.intCast_im @[deprecated (since := "2024-04-17")] alias int_cast_im := intCast_im @[norm_cast] theorem coe_intCast (z : ℤ) : ↑(z : R) = (z : ℍ[R,c₁,c₂]) := rfl #align quaternion_algebra.coe_int_cast QuaternionAlgebra.coe_intCast @[deprecated (since := "2024-04-17")] alias coe_int_cast := coe_intCast instance instRing : Ring ℍ[R,c₁,c₂] where __ := inferInstanceAs (AddCommGroupWithOne ℍ[R,c₁,c₂]) left_distrib _ _ _ := by ext <;> simp <;> ring right_distrib _ _ _ := by ext <;> simp <;> ring zero_mul _ := by ext <;> simp mul_zero _ := by ext <;> simp mul_assoc _ _ _ := by ext <;> simp <;> ring one_mul _ := by ext <;> simp mul_one _ := by ext <;> simp @[norm_cast, simp] theorem coe_mul : ((x * y : R) : ℍ[R,c₁,c₂]) = x * y := by ext <;> simp #align quaternion_algebra.coe_mul QuaternionAlgebra.coe_mul -- TODO: add weaker `MulAction`, `DistribMulAction`, and `Module` instances (and repeat them -- for `ℍ[R]`) instance [CommSemiring S] [Algebra S R] : Algebra S ℍ[R,c₁,c₂] where smul := (· • ·) toFun s := coe (algebraMap S R s) map_one' := by simp only [map_one, coe_one] map_zero' := by simp only [map_zero, coe_zero] map_mul' x y := by simp only [map_mul, coe_mul] map_add' x y := by simp only [map_add, coe_add] smul_def' s x := by ext <;> simp [Algebra.smul_def] commutes' s x := by ext <;> simp [Algebra.commutes] theorem algebraMap_eq (r : R) : algebraMap R ℍ[R,c₁,c₂] r = ⟨r, 0, 0, 0⟩ := rfl #align quaternion_algebra.algebra_map_eq QuaternionAlgebra.algebraMap_eq theorem algebraMap_injective : (algebraMap R ℍ[R,c₁,c₂] : _ → _).Injective := fun _ _ ↦ by simp [algebraMap_eq] instance [NoZeroDivisors R] : NoZeroSMulDivisors R ℍ[R,c₁,c₂] := ⟨by rintro t ⟨a, b, c, d⟩ h rw [or_iff_not_imp_left] intro ht simpa [QuaternionAlgebra.ext_iff, ht] using h⟩ section variable (c₁ c₂) /-- `QuaternionAlgebra.re` as a `LinearMap`-/ @[simps] def reₗ : ℍ[R,c₁,c₂] →ₗ[R] R where toFun := re map_add' _ _ := rfl map_smul' _ _ := rfl #align quaternion_algebra.re_lm QuaternionAlgebra.reₗ /-- `QuaternionAlgebra.imI` as a `LinearMap`-/ @[simps] def imIₗ : ℍ[R,c₁,c₂] →ₗ[R] R where toFun := imI map_add' _ _ := rfl map_smul' _ _ := rfl #align quaternion_algebra.im_i_lm QuaternionAlgebra.imIₗ /-- `QuaternionAlgebra.imJ` as a `LinearMap`-/ @[simps] def imJₗ : ℍ[R,c₁,c₂] →ₗ[R] R where toFun := imJ map_add' _ _ := rfl map_smul' _ _ := rfl #align quaternion_algebra.im_j_lm QuaternionAlgebra.imJₗ /-- `QuaternionAlgebra.imK` as a `LinearMap`-/ @[simps] def imKₗ : ℍ[R,c₁,c₂] →ₗ[R] R where toFun := imK map_add' _ _ := rfl map_smul' _ _ := rfl #align quaternion_algebra.im_k_lm QuaternionAlgebra.imKₗ /-- `QuaternionAlgebra.equivTuple` as a linear equivalence. -/ def linearEquivTuple : ℍ[R,c₁,c₂] ≃ₗ[R] Fin 4 → R := LinearEquiv.symm -- proofs are not `rfl` in the forward direction { (equivTuple c₁ c₂).symm with toFun := (equivTuple c₁ c₂).symm invFun := equivTuple c₁ c₂ map_add' := fun _ _ => rfl map_smul' := fun _ _ => rfl } #align quaternion_algebra.linear_equiv_tuple QuaternionAlgebra.linearEquivTuple @[simp] theorem coe_linearEquivTuple : ⇑(linearEquivTuple c₁ c₂) = equivTuple c₁ c₂ := rfl #align quaternion_algebra.coe_linear_equiv_tuple QuaternionAlgebra.coe_linearEquivTuple @[simp] theorem coe_linearEquivTuple_symm : ⇑(linearEquivTuple c₁ c₂).symm = (equivTuple c₁ c₂).symm := rfl #align quaternion_algebra.coe_linear_equiv_tuple_symm QuaternionAlgebra.coe_linearEquivTuple_symm /-- `ℍ[R, c₁, c₂]` has a basis over `R` given by `1`, `i`, `j`, and `k`. -/ noncomputable def basisOneIJK : Basis (Fin 4) R ℍ[R,c₁,c₂] := .ofEquivFun <\| linearEquivTuple c₁ c₂ #align quaternion_algebra.basis_one_i_j_k QuaternionAlgebra.basisOneIJK @[simp] theorem coe_basisOneIJK_repr (q : ℍ[R,c₁,c₂]) : ⇑((basisOneIJK c₁ c₂).repr q) = ![q.re, q.imI, q.imJ, q.imK] := rfl #align quaternion_algebra.coe_basis_one_i_j_k_repr QuaternionAlgebra.coe_basisOneIJK_repr instance : Module.Finite R ℍ[R,c₁,c₂] := .of_basis (basisOneIJK c₁ c₂) instance : Module.Free R ℍ[R,c₁,c₂] := .of_basis (basisOneIJK c₁ c₂) theorem rank_eq_four [StrongRankCondition R] : Module.rank R ℍ[R,c₁,c₂] = 4 := by rw [rank_eq_card_basis (basisOneIJK c₁ c₂), Fintype.card_fin] norm_num #align quaternion_algebra.rank_eq_four QuaternionAlgebra.rank_eq_four theorem finrank_eq_four [StrongRankCondition R] : FiniteDimensional.finrank R ℍ[R,c₁,c₂] = 4 := by rw [FiniteDimensional.finrank, rank_eq_four, Cardinal.toNat_ofNat] #align quaternion_algebra.finrank_eq_four QuaternionAlgebra.finrank_eq_four /-- There is a natural equivalence when swapping the coefficients of a quaternion algebra. -/ @[simps] def swapEquiv : ℍ[R,c₁,c₂] ≃ₐ[R] ℍ[R, c₂, c₁] where toFun t := ⟨t.1, t.3, t.2, -t.4⟩ invFun t := ⟨t.1, t.3, t.2, -t.4⟩ left_inv _ := by simp right_inv _ := by simp map_mul' _ _ := by ext <;> simp only [mul_re, mul_imJ, mul_imI, add_left_inj, mul_imK, neg_mul, neg_add_rev, neg_sub, mk_mul_mk, mul_neg, neg_neg, sub_neg_eq_add] <;> ring map_add' _ _ := by ext <;> simp [add_comm] commutes' _ := by simp [algebraMap_eq] end @[norm_cast, simp] theorem coe_sub : ((x - y : R) : ℍ[R,c₁,c₂]) = x - y := (algebraMap R ℍ[R,c₁,c₂]).map_sub x y #align quaternion_algebra.coe_sub QuaternionAlgebra.coe_sub @[norm_cast, simp] theorem coe_pow (n : ℕ) : (↑(x ^ n) : ℍ[R,c₁,c₂]) = (x : ℍ[R,c₁,c₂]) ^ n := (algebraMap R ℍ[R,c₁,c₂]).map_pow x n #align quaternion_algebra.coe_pow QuaternionAlgebra.coe_pow theorem coe_commutes : ↑r * a = a * r := Algebra.commutes r a #align quaternion_algebra.coe_commutes QuaternionAlgebra.coe_commutes theorem coe_commute : Commute (↑r) a := coe_commutes r a #align quaternion_algebra.coe_commute QuaternionAlgebra.coe_commute theorem coe_mul_eq_smul : ↑r * a = r • a := (Algebra.smul_def r a).symm #align quaternion_algebra.coe_mul_eq_smul QuaternionAlgebra.coe_mul_eq_smul theorem mul_coe_eq_smul : a * r = r • a := by rw [← coe_commutes, coe_mul_eq_smul] #align quaternion_algebra.mul_coe_eq_smul QuaternionAlgebra.mul_coe_eq_smul @[norm_cast, simp] theorem coe_algebraMap : ⇑(algebraMap R ℍ[R,c₁,c₂]) = coe := rfl #align quaternion_algebra.coe_algebra_map QuaternionAlgebra.coe_algebraMap theorem smul_coe : x • (y : ℍ[R,c₁,c₂]) = ↑(x * y) := by rw [coe_mul, coe_mul_eq_smul] #align quaternion_algebra.smul_coe QuaternionAlgebra.smul_coe /-- Quaternion conjugate. -/ instance instStarQuaternionAlgebra : Star ℍ[R,c₁,c₂] where star a := ⟨a.1, -a.2, -a.3, -a.4⟩ @[simp] theorem re_star : (star a).re = a.re := rfl #align quaternion_algebra.re_star QuaternionAlgebra.re_star @[simp] theorem imI_star : (star a).imI = -a.imI := rfl #align quaternion_algebra.im_i_star QuaternionAlgebra.imI_star @[simp] theorem imJ_star : (star a).imJ = -a.imJ := rfl #align quaternion_algebra.im_j_star QuaternionAlgebra.imJ_star @[simp] theorem imK_star : (star a).imK = -a.imK := rfl #align quaternion_algebra.im_k_star QuaternionAlgebra.imK_star @[simp] theorem im_star : (star a).im = -a.im := QuaternionAlgebra.ext _ _ neg_zero.symm rfl rfl rfl #align quaternion_algebra.im_star QuaternionAlgebra.im_star @[simp] theorem star_mk (a₁ a₂ a₃ a₄ : R) : star (mk a₁ a₂ a₃ a₄ : ℍ[R,c₁,c₂]) = ⟨a₁, -a₂, -a₃, -a₄⟩ := rfl #align quaternion_algebra.star_mk QuaternionAlgebra.star_mk instance instStarRing : StarRing ℍ[R,c₁,c₂] where star_involutive x := by simp [Star.star] star_add a b := by ext <;> simp [add_comm] star_mul a b := by ext <;> simp <;> ring theorem self_add_star' : a + star a = ↑(2 * a.re) := by ext <;> simp [two_mul] #align quaternion_algebra.self_add_star' QuaternionAlgebra.self_add_star' theorem self_add_star : a + star a = 2 * a.re := by simp only [self_add_star', two_mul, coe_add] #align quaternion_algebra.self_add_star QuaternionAlgebra.self_add_star theorem star_add_self' : star a + a = ↑(2 * a.re) := by rw [add_comm, self_add_star'] #align quaternion_algebra.star_add_self' QuaternionAlgebra.star_add_self' theorem star_add_self : star a + a = 2 * a.re := by rw [add_comm, self_add_star] #align quaternion_algebra.star_add_self QuaternionAlgebra.star_add_self theorem star_eq_two_re_sub : star a = ↑(2 * a.re) - a := eq_sub_iff_add_eq.2 a.star_add_self' #align quaternion_algebra.star_eq_two_re_sub QuaternionAlgebra.star_eq_two_re_sub instance : IsStarNormal a := ⟨by rw [a.star_eq_two_re_sub] exact (coe_commute (2 * a.re) a).sub_left (Commute.refl a)⟩ @[simp, norm_cast] theorem star_coe : star (x : ℍ[R,c₁,c₂]) = x := by ext <;> simp #align quaternion_algebra.star_coe QuaternionAlgebra.star_coe @[simp] theorem star_im : star a.im = -a.im := im_star _ #align quaternion_algebra.star_im QuaternionAlgebra.star_im @[simp] theorem star_smul [Monoid S] [DistribMulAction S R] (s : S) (a : ℍ[R,c₁,c₂]) : star (s • a) = s • star a := QuaternionAlgebra.ext _ _ rfl (smul_neg _ _).symm (smul_neg _ _).symm (smul_neg _ _).symm #align quaternion_algebra.star_smul QuaternionAlgebra.star_smul theorem eq_re_of_eq_coe {a : ℍ[R,c₁,c₂]} {x : R} (h : a = x) : a = a.re := by rw [h, coe_re] #align quaternion_algebra.eq_re_of_eq_coe QuaternionAlgebra.eq_re_of_eq_coe theorem eq_re_iff_mem_range_coe {a : ℍ[R,c₁,c₂]} : a = a.re ↔ a ∈ Set.range (coe : R → ℍ[R,c₁,c₂]) := ⟨fun h => ⟨a.re, h.symm⟩, fun ⟨_, h⟩ => eq_re_of_eq_coe h.symm⟩ #align quaternion_algebra.eq_re_iff_mem_range_coe QuaternionAlgebra.eq_re_iff_mem_range_coe section CharZero variable [NoZeroDivisors R] [CharZero R] @[simp] theorem star_eq_self {c₁ c₂ : R} {a : ℍ[R,c₁,c₂]} : star a = a ↔ a = a.re := by simp [QuaternionAlgebra.ext_iff, neg_eq_iff_add_eq_zero, add_self_eq_zero] #align quaternion_algebra.star_eq_self QuaternionAlgebra.star_eq_self theorem star_eq_neg {c₁ c₂ : R} {a : ℍ[R,c₁,c₂]} : star a = -a ↔ a.re = 0 := by simp [QuaternionAlgebra.ext_iff, eq_neg_iff_add_eq_zero] #align quaternion_algebra.star_eq_neg QuaternionAlgebra.star_eq_neg end CharZero -- Can't use `rw ← star_eq_self` in the proof without additional assumptions theorem star_mul_eq_coe : star a * a = (star a * a).re := by ext <;> simp <;> ring #align quaternion_algebra.star_mul_eq_coe QuaternionAlgebra.star_mul_eq_coe theorem mul_star_eq_coe : a * star a = (a * star a).re := by rw [← star_comm_self'] exact a.star_mul_eq_coe #align quaternion_algebra.mul_star_eq_coe QuaternionAlgebra.mul_star_eq_coe open MulOpposite /-- Quaternion conjugate as an `AlgEquiv` to the opposite ring. -/ def starAe : ℍ[R,c₁,c₂] ≃ₐ[R] ℍ[R,c₁,c₂]ᵐᵒᵖ := { starAddEquiv.trans opAddEquiv with toFun := op ∘ star invFun := star ∘ unop map_mul' := fun x y => by simp commutes' := fun r => by simp } #align quaternion_algebra.star_ae QuaternionAlgebra.starAe @[simp] theorem coe_starAe : ⇑(starAe : ℍ[R,c₁,c₂] ≃ₐ[R] _) = op ∘ star := rfl #align quaternion_algebra.coe_star_ae QuaternionAlgebra.coe_starAe end QuaternionAlgebra /-- Space of quaternions over a type. Implemented as a structure with four fields: `re`, `im_i`, `im_j`, and `im_k`. -/ def Quaternion (R : Type) [One R] [Neg R] := QuaternionAlgebra R (-1) (-1) #align quaternion Quaternion scoped[Quaternion] notation "ℍ[" R "]" => Quaternion R /-- The equivalence between the quaternions over `R` and `R × R × R × R`. -/ @[simps!] def Quaternion.equivProd (R : Type) [One R] [Neg R] : ℍ[R] ≃ R × R × R × R := QuaternionAlgebra.equivProd _ _ #align quaternion.equiv_prod Quaternion.equivProd /-- The equivalence between the quaternions over `R` and `Fin 4 → R`. -/ @[simps! symm_apply] def Quaternion.equivTuple (R : Type) [One R] [Neg R] : ℍ[R] ≃ (Fin 4 → R) := QuaternionAlgebra.equivTuple _ _ #align quaternion.equiv_tuple Quaternion.equivTuple @[simp] theorem Quaternion.equivTuple_apply (R : Type) [One R] [Neg R] (x : ℍ[R]) : Quaternion.equivTuple R x = ![x.re, x.imI, x.imJ, x.imK] := rfl #align quaternion.equiv_tuple_apply Quaternion.equivTuple_apply instance {R : Type} [One R] [Neg R] [Subsingleton R] : Subsingleton ℍ[R] := inferInstanceAs (Subsingleton <\| ℍ[R, -1, -1]) instance {R : Type} [One R] [Neg R] [Nontrivial R] : Nontrivial ℍ[R] := inferInstanceAs (Nontrivial <\| ℍ[R, -1, -1]) namespace Quaternion variable {S T R : Type} [CommRing R] (r x y z : R) (a b c : ℍ[R]) export QuaternionAlgebra (re imI imJ imK) /-- Coercion `R → ℍ[R]`. -/ @[coe] def coe : R → ℍ[R] := QuaternionAlgebra.coe instance : CoeTC R ℍ[R] := ⟨coe⟩ instance instRing : Ring ℍ[R] := QuaternionAlgebra.instRing instance : Inhabited ℍ[R] := inferInstanceAs <\| Inhabited ℍ[R,-1,-1] instance [SMul S R] : SMul S ℍ[R] := inferInstanceAs <\| SMul S ℍ[R,-1,-1] instance [SMul S T] [SMul S R] [SMul T R] [IsScalarTower S T R] : IsScalarTower S T ℍ[R] := inferInstanceAs <\| IsScalarTower S T ℍ[R,-1,-1] instance [SMul S R] [SMul T R] [SMulCommClass S T R] : SMulCommClass S T ℍ[R] := inferInstanceAs <\| SMulCommClass S T ℍ[R,-1,-1] protected instance algebra [CommSemiring S] [Algebra S R] : Algebra S ℍ[R] := inferInstanceAs <\| Algebra S ℍ[R,-1,-1] -- Porting note: added shortcut instance : Star ℍ[R] := QuaternionAlgebra.instStarQuaternionAlgebra instance : StarRing ℍ[R] := QuaternionAlgebra.instStarRing instance : IsStarNormal a := inferInstanceAs <\| IsStarNormal (R := ℍ[R,-1,-1]) a @[ext] theorem ext : a.re = b.re → a.imI = b.imI → a.imJ = b.imJ → a.imK = b.imK → a = b := QuaternionAlgebra.ext a b #align quaternion.ext Quaternion.ext theorem ext_iff {a b : ℍ[R]} : a = b ↔ a.re = b.re ∧ a.imI = b.imI ∧ a.imJ = b.imJ ∧ a.imK = b.imK := QuaternionAlgebra.ext_iff a b #align quaternion.ext_iff Quaternion.ext_iff /-- The imaginary part of a quaternion. -/ nonrec def im (x : ℍ[R]) : ℍ[R] := x.im #align quaternion.im Quaternion.im @[simp] theorem im_re : a.im.re = 0 := rfl #align quaternion.im_re Quaternion.im_re @[simp] theorem im_imI : a.im.imI = a.imI := rfl #align quaternion.im_im_i Quaternion.im_imI @[simp] theorem im_imJ : a.im.imJ = a.imJ := rfl #align quaternion.im_im_j Quaternion.im_imJ @[simp] theorem im_imK : a.im.imK = a.imK := rfl #align quaternion.im_im_k Quaternion.im_imK @[simp] theorem im_idem : a.im.im = a.im := rfl #align quaternion.im_idem Quaternion.im_idem @[simp] nonrec theorem re_add_im : ↑a.re + a.im = a := a.re_add_im #align quaternion.re_add_im Quaternion.re_add_im @[simp] nonrec theorem sub_self_im : a - a.im = a.re := a.sub_self_im #align quaternion.sub_self_im Quaternion.sub_self_im @[simp] nonrec theorem sub_self_re : a - ↑a.re = a.im := a.sub_self_re #align quaternion.sub_self_re Quaternion.sub_self_re @[simp, norm_cast] theorem coe_re : (x : ℍ[R]).re = x := rfl #align quaternion.coe_re Quaternion.coe_re @[simp, norm_cast] theorem coe_imI : (x : ℍ[R]).imI = 0 := rfl #align quaternion.coe_im_i Quaternion.coe_imI @[simp, norm_cast] theorem coe_imJ : (x : ℍ[R]).imJ = 0 := rfl #align quaternion.coe_im_j Quaternion.coe_imJ @[simp, norm_cast] theorem coe_imK : (x : ℍ[R]).imK = 0 := rfl #align quaternion.coe_im_k Quaternion.coe_imK @[simp, norm_cast] theorem coe_im : (x : ℍ[R]).im = 0 := rfl #align quaternion.coe_im Quaternion.coe_im @[simp] theorem zero_re : (0 : ℍ[R]).re = 0 := rfl #align quaternion.zero_re Quaternion.zero_re @[simp] theorem zero_imI : (0 : ℍ[R]).imI = 0 := rfl #align quaternion.zero_im_i Quaternion.zero_imI @[simp] theorem zero_imJ : (0 : ℍ[R]).imJ = 0 := rfl #align quaternion.zero_im_j Quaternion.zero_imJ @[simp] theorem zero_imK : (0 : ℍ[R]).imK = 0 := rfl #align quaternion.zero_im_k Quaternion.zero_imK @[simp] theorem zero_im : (0 : ℍ[R]).im = 0 := rfl #align quaternion.zero_im Quaternion.zero_im @[simp, norm_cast] theorem coe_zero : ((0 : R) : ℍ[R]) = 0 := rfl #align quaternion.coe_zero Quaternion.coe_zero @[simp] theorem one_re : (1 : ℍ[R]).re = 1 := rfl #align quaternion.one_re Quaternion.one_re @[simp] theorem one_imI : (1 : ℍ[R]).imI = 0 := rfl #align quaternion.one_im_i Quaternion.one_imI @[simp] theorem one_imJ : (1 : ℍ[R]).imJ = 0 := rfl #align quaternion.one_im_j Quaternion.one_imJ @[simp] theorem one_imK : (1 : ℍ[R]).imK = 0 := rfl #align quaternion.one_im_k Quaternion.one_imK @[simp] theorem one_im : (1 : ℍ[R]).im = 0 := rfl #align quaternion.one_im Quaternion.one_im @[simp, norm_cast] theorem coe_one : ((1 : R) : ℍ[R]) = 1 := rfl #align quaternion.coe_one Quaternion.coe_one @[simp] theorem add_re : (a + b).re = a.re + b.re := rfl #align quaternion.add_re Quaternion.add_re @[simp] theorem add_imI : (a + b).imI = a.imI + b.imI := rfl #align quaternion.add_im_i Quaternion.add_imI @[simp] theorem add_imJ : (a + b).imJ = a.imJ + b.imJ := rfl #align quaternion.add_im_j Quaternion.add_imJ @[simp] theorem add_imK : (a + b).imK = a.imK + b.imK := rfl #align quaternion.add_im_k Quaternion.add_imK @[simp] nonrec theorem add_im : (a + b).im = a.im + b.im := a.add_im b #align quaternion.add_im Quaternion.add_im @[simp, norm_cast] theorem coe_add : ((x + y : R) : ℍ[R]) = x + y := QuaternionAlgebra.coe_add x y #align quaternion.coe_add Quaternion.coe_add @[simp] theorem neg_re : (-a).re = -a.re := rfl #align quaternion.neg_re Quaternion.neg_re @[simp] theorem neg_imI : (-a).imI = -a.imI := rfl #align quaternion.neg_im_i Quaternion.neg_imI @[simp] theorem neg_imJ : (-a).imJ = -a.imJ := rfl #align quaternion.neg_im_j Quaternion.neg_imJ @[simp] theorem neg_imK : (-a).imK = -a.imK := rfl #align quaternion.neg_im_k Quaternion.neg_imK @[simp] nonrec theorem neg_im : (-a).im = -a.im := a.neg_im #align quaternion.neg_im Quaternion.neg_im @[simp, norm_cast] theorem coe_neg : ((-x : R) : ℍ[R]) = -x := QuaternionAlgebra.coe_neg x #align quaternion.coe_neg Quaternion.coe_neg @[simp] theorem sub_re : (a - b).re = a.re - b.re := rfl #align quaternion.sub_re Quaternion.sub_re @[simp] theorem sub_imI : (a - b).imI = a.imI - b.imI := rfl #align quaternion.sub_im_i Quaternion.sub_imI @[simp] theorem sub_imJ : (a - b).imJ = a.imJ - b.imJ := rfl #align quaternion.sub_im_j Quaternion.sub_imJ @[simp] theorem sub_imK : (a - b).imK = a.imK - b.imK := rfl #align quaternion.sub_im_k Quaternion.sub_imK @[simp] nonrec theorem sub_im : (a - b).im = a.im - b.im := a.sub_im b #align quaternion.sub_im Quaternion.sub_im @[simp, norm_cast] theorem coe_sub : ((x - y : R) : ℍ[R]) = x - y := QuaternionAlgebra.coe_sub x y #align quaternion.coe_sub Quaternion.coe_sub @[simp] theorem mul_re : (a b).re = a.re * b.re - a.imI * b.imI - a.imJ * b.imJ - a.imK * b.imK := (QuaternionAlgebra.mul_re a b).trans <\| by simp only [one_mul, neg_mul, sub_eq_add_neg, neg_neg] #align quaternion.mul_re Quaternion.mul_re @[simp] theorem mul_imI : (a * b).imI = a.re * b.imI + a.imI * b.re + a.imJ * b.imK - a.imK * b.imJ := (QuaternionAlgebra.mul_imI a b).trans <\| by simp only [one_mul, neg_mul, sub_eq_add_neg, neg_neg] #align quaternion.mul_im_i Quaternion.mul_imI @[simp] theorem mul_imJ : (a * b).imJ = a.re * b.imJ - a.imI * b.imK + a.imJ * b.re + a.imK * b.imI := (QuaternionAlgebra.mul_imJ a b).trans <\| by simp only [one_mul, neg_mul, sub_eq_add_neg, neg_neg] #align quaternion.mul_im_j Quaternion.mul_imJ @[simp] theorem mul_imK : (a * b).imK = a.re * b.imK + a.imI * b.imJ - a.imJ * b.imI + a.imK * b.re := (QuaternionAlgebra.mul_imK a b).trans <\| by simp only [one_mul, neg_mul, sub_eq_add_neg, neg_neg] #align quaternion.mul_im_k Quaternion.mul_imK @[simp, norm_cast] theorem coe_mul : ((x * y : R) : ℍ[R]) = x * y := QuaternionAlgebra.coe_mul x y #align quaternion.coe_mul Quaternion.coe_mul @[norm_cast, simp] theorem coe_pow (n : ℕ) : (↑(x ^ n) : ℍ[R]) = (x : ℍ[R]) ^ n := QuaternionAlgebra.coe_pow x n #align quaternion.coe_pow Quaternion.coe_pow @[simp, norm_cast] theorem natCast_re (n : ℕ) : (n : ℍ[R]).re = n := rfl #align quaternion.nat_cast_re Quaternion.natCast_re @[deprecated (since := "2024-04-17")] alias nat_cast_re := natCast_re @[simp, norm_cast] theorem natCast_imI (n : ℕ) : (n : ℍ[R]).imI = 0 := rfl #align quaternion.nat_cast_im_i Quaternion.natCast_imI @[deprecated (since := "2024-04-17")] alias nat_cast_imI := natCast_imI @[simp, norm_cast] theorem natCast_imJ (n : ℕ) : (n : ℍ[R]).imJ = 0 := rfl #align quaternion.nat_cast_im_j Quaternion.natCast_imJ @[deprecated (since := "2024-04-17")] alias nat_cast_imJ := natCast_imJ @[simp, norm_cast] theorem natCast_imK (n : ℕ) : (n : ℍ[R]).imK = 0 := rfl #align quaternion.nat_cast_im_k Quaternion.natCast_imK @[deprecated (since := "2024-04-17")] alias nat_cast_imK := natCast_imK @[simp, norm_cast] theorem natCast_im (n : ℕ) : (n : ℍ[R]).im = 0 := rfl #align quaternion.nat_cast_im Quaternion.natCast_im @[deprecated (since := "2024-04-17")] alias nat_cast_im := natCast_im @[norm_cast] theorem coe_natCast (n : ℕ) : ↑(n : R) = (n : ℍ[R]) := rfl #align quaternion.coe_nat_cast Quaternion.coe_natCast @[deprecated (since := "2024-04-17")] alias coe_nat_cast := coe_natCast @[simp, norm_cast] theorem intCast_re (z : ℤ) : (z : ℍ[R]).re = z := rfl #align quaternion.int_cast_re Quaternion.intCast_re @[deprecated (since := "2024-04-17")] alias int_cast_re := intCast_re @[simp, norm_cast] theorem intCast_imI (z : ℤ) : (z : ℍ[R]).imI = 0 := rfl #align quaternion.int_cast_im_i Quaternion.intCast_imI @[deprecated (since := "2024-04-17")] alias int_cast_imI := intCast_imI @[simp, norm_cast] theorem intCast_imJ (z : ℤ) : (z : ℍ[R]).imJ = 0 := rfl #align quaternion.int_cast_im_j Quaternion.intCast_imJ @[deprecated (since := "2024-04-17")] alias int_cast_imJ := intCast_imJ @[simp, norm_cast] theorem intCast_imK (z : ℤ) : (z : ℍ[R]).imK = 0 := rfl #align quaternion.int_cast_im_k Quaternion.intCast_imK @[deprecated (since := "2024-04-17")] alias int_cast_imK := intCast_imK @[simp, norm_cast] theorem intCast_im (z : ℤ) : (z : ℍ[R]).im = 0 := rfl #align quaternion.int_cast_im Quaternion.intCast_im @[deprecated (since := "2024-04-17")] alias int_cast_im := intCast_im @[norm_cast] theorem coe_intCast (z : ℤ) : ↑(z : R) = (z : ℍ[R]) := rfl #align quaternion.coe_int_cast Quaternion.coe_intCast @[deprecated (since := "2024-04-17")] alias coe_int_cast := coe_intCast theorem coe_injective : Function.Injective (coe : R → ℍ[R]) := QuaternionAlgebra.coe_injective #align quaternion.coe_injective Quaternion.coe_injective @[simp] theorem coe_inj {x y : R} : (x : ℍ[R]) = y ↔ x = y := coe_injective.eq_iff #align quaternion.coe_inj Quaternion.coe_inj @[simp] theorem smul_re [SMul S R] (s : S) : (s • a).re = s • a.re := rfl #align quaternion.smul_re Quaternion.smul_re @[simp] theorem smul_imI [SMul S R] (s : S) : (s • a).imI = s • a.imI := rfl #align quaternion.smul_im_i Quaternion.smul_imI @[simp] theorem smul_imJ [SMul S R] (s : S) : (s • a).imJ = s • a.imJ := rfl #align quaternion.smul_im_j Quaternion.smul_imJ @[simp] theorem smul_imK [SMul S R] (s : S) : (s • a).imK = s • a.imK := rfl #align quaternion.smul_im_k Quaternion.smul_imK @[simp] nonrec theorem smul_im [SMulZeroClass S R] (s : S) : (s • a).im = s • a.im := a.smul_im s #align quaternion.smul_im Quaternion.smul_im @[simp, norm_cast] theorem coe_smul [SMulZeroClass S R] (s : S) (r : R) : (↑(s • r) : ℍ[R]) = s • (r : ℍ[R]) := QuaternionAlgebra.coe_smul _ _ #align quaternion.coe_smul Quaternion.coe_smul theorem coe_commutes : ↑r * a = a * r := QuaternionAlgebra.coe_commutes r a #align quaternion.coe_commutes Quaternion.coe_commutes theorem coe_commute : Commute (↑r) a := QuaternionAlgebra.coe_commute r a #align quaternion.coe_commute Quaternion.coe_commute theorem coe_mul_eq_smul : ↑r * a = r • a := QuaternionAlgebra.coe_mul_eq_smul r a #align quaternion.coe_mul_eq_smul Quaternion.coe_mul_eq_smul theorem mul_coe_eq_smul : a * r = r • a := QuaternionAlgebra.mul_coe_eq_smul r a #align quaternion.mul_coe_eq_smul Quaternion.mul_coe_eq_smul @[simp] theorem algebraMap_def : ⇑(algebraMap R ℍ[R]) = coe := rfl #align quaternion.algebra_map_def Quaternion.algebraMap_def theorem algebraMap_injective : (algebraMap R ℍ[R] : _ → _).Injective := QuaternionAlgebra.algebraMap_injective theorem smul_coe : x • (y : ℍ[R]) = ↑(x * y) := QuaternionAlgebra.smul_coe x y #align quaternion.smul_coe Quaternion.smul_coe instance : Module.Finite R ℍ[R] := inferInstanceAs <\| Module.Finite R ℍ[R,-1,-1] instance : Module.Free R ℍ[R] := inferInstanceAs <\| Module.Free R ℍ[R,-1,-1] theorem rank_eq_four [StrongRankCondition R] : Module.rank R ℍ[R] = 4 := QuaternionAlgebra.rank_eq_four _ _ #align quaternion.rank_eq_four Quaternion.rank_eq_four theorem finrank_eq_four [StrongRankCondition R] : FiniteDimensional.finrank R ℍ[R] = 4 := QuaternionAlgebra.finrank_eq_four _ _ #align quaternion.finrank_eq_four Quaternion.finrank_eq_four @[simp] theorem star_re : (star a).re = a.re := rfl #align quaternion.star_re Quaternion.star_re @[simp] theorem star_imI : (star a).imI = -a.imI := rfl #align quaternion.star_im_i Quaternion.star_imI @[simp] theorem star_imJ : (star a).imJ = -a.imJ := rfl #align quaternion.star_im_j Quaternion.star_imJ @[simp] theorem star_imK : (star a).imK = -a.imK := rfl #align quaternion.star_im_k Quaternion.star_imK @[simp] theorem star_im : (star a).im = -a.im := a.im_star #align quaternion.star_im Quaternion.star_im nonrec theorem self_add_star' : a + star a = ↑(2 * a.re) := a.self_add_star' #align quaternion.self_add_star' Quaternion.self_add_star' nonrec theorem self_add_star : a + star a = 2 * a.re := a.self_add_star #align quaternion.self_add_star Quaternion.self_add_star nonrec theorem star_add_self' : star a + a = ↑(2 * a.re) := a.star_add_self' #align quaternion.star_add_self' Quaternion.star_add_self' nonrec theorem star_add_self : star a + a = 2 * a.re := a.star_add_self #align quaternion.star_add_self Quaternion.star_add_self nonrec theorem star_eq_two_re_sub : star a = ↑(2 * a.re) - a := a.star_eq_two_re_sub #align quaternion.star_eq_two_re_sub Quaternion.star_eq_two_re_sub @[simp, norm_cast] theorem star_coe : star (x : ℍ[R]) = x := QuaternionAlgebra.star_coe x #align quaternion.star_coe Quaternion.star_coe @[simp] theorem im_star : star a.im = -a.im := QuaternionAlgebra.im_star _ #align quaternion.im_star Quaternion.im_star @[simp] theorem star_smul [Monoid S] [DistribMulAction S R] (s : S) (a : ℍ[R]) : star (s • a) = s • star a := QuaternionAlgebra.star_smul _ _ #align quaternion.star_smul Quaternion.star_smul theorem eq_re_of_eq_coe {a : ℍ[R]} {x : R} (h : a = x) : a = a.re := QuaternionAlgebra.eq_re_of_eq_coe h #align quaternion.eq_re_of_eq_coe Quaternion.eq_re_of_eq_coe theorem eq_re_iff_mem_range_coe {a : ℍ[R]} : a = a.re ↔ a ∈ Set.range (coe : R → ℍ[R]) := QuaternionAlgebra.eq_re_iff_mem_range_coe #align quaternion.eq_re_iff_mem_range_coe Quaternion.eq_re_iff_mem_range_coe section CharZero variable [NoZeroDivisors R] [CharZero R] @[simp] theorem star_eq_self {a : ℍ[R]} : star a = a ↔ a = a.re := QuaternionAlgebra.star_eq_self #align quaternion.star_eq_self Quaternion.star_eq_self @[simp] theorem star_eq_neg {a : ℍ[R]} : star a = -a ↔ a.re = 0 := QuaternionAlgebra.star_eq_neg #align quaternion.star_eq_neg Quaternion.star_eq_neg end CharZero nonrec theorem star_mul_eq_coe : star a * a = (star a * a).re := a.star_mul_eq_coe #align quaternion.star_mul_eq_coe Quaternion.star_mul_eq_coe nonrec theorem mul_star_eq_coe : a * star a = (a * star a).re := a.mul_star_eq_coe #align quaternion.mul_star_eq_coe Quaternion.mul_star_eq_coe open MulOpposite /-- Quaternion conjugate as an `AlgEquiv` to the opposite ring. -/ def starAe : ℍ[R] ≃ₐ[R] ℍ[R]ᵐᵒᵖ := QuaternionAlgebra.starAe #align quaternion.star_ae Quaternion.starAe @[simp] theorem coe_starAe : ⇑(starAe : ℍ[R] ≃ₐ[R] ℍ[R]ᵐᵒᵖ) = op ∘ star := rfl #align quaternion.coe_star_ae Quaternion.coe_starAe /-- Square of the norm. -/ def normSq : ℍ[R] →₀ R where toFun a := (a star a).re map_zero' := by simp only [star_zero, zero_mul, zero_re] map_one' := by simp only [star_one, one_mul, one_re] map_mul' x y := coe_injective <\| by conv_lhs => rw [← mul_star_eq_coe, star_mul, mul_assoc, ← mul_assoc y, y.mul_star_eq_coe, coe_commutes, ← mul_assoc, x.mul_star_eq_coe, ← coe_mul] #align quaternion.norm_sq Quaternion.normSq theorem normSq_def : normSq a = (a * star a).re := rfl #align quaternion.norm_sq_def Quaternion.normSq_def theorem normSq_def' : normSq a = a.1 ^ 2 + a.2 ^ 2 + a.3 ^ 2 + a.4 ^ 2 := by simp only [normSq_def, sq, mul_neg, sub_neg_eq_add, mul_re, star_re, star_imI, star_imJ, star_imK] #align quaternion.norm_sq_def' Quaternion.normSq_def' theorem normSq_coe : normSq (x : ℍ[R]) = x ^ 2 := by rw [normSq_def, star_coe, ← coe_mul, coe_re, sq] #align quaternion.norm_sq_coe Quaternion.normSq_coe @[simp] theorem normSq_star : normSq (star a) = normSq a := by simp [normSq_def'] #align quaternion.norm_sq_star Quaternion.normSq_star @[norm_cast] theorem normSq_natCast (n : ℕ) : normSq (n : ℍ[R]) = (n : R) ^ 2 := by rw [← coe_natCast, normSq_coe] #align quaternion.norm_sq_nat_cast Quaternion.normSq_natCast @[deprecated (since := "2024-04-17")] alias normSq_nat_cast := normSq_natCast @[norm_cast] theorem normSq_intCast (z : ℤ) : normSq (z : ℍ[R]) = (z : R) ^ 2 := by rw [← coe_intCast, normSq_coe] #align quaternion.norm_sq_int_cast Quaternion.normSq_intCast @[deprecated (since := "2024-04-17")] alias normSq_int_cast := normSq_intCast @[simp] theorem normSq_neg : normSq (-a) = normSq a := by simp only [normSq_def, star_neg, neg_mul_neg] #align quaternion.norm_sq_neg Quaternion.normSq_neg theorem self_mul_star : a * star a = normSq a := by rw [mul_star_eq_coe, normSq_def] #align quaternion.self_mul_star Quaternion.self_mul_star theorem star_mul_self : star a * a = normSq a := by rw [star_comm_self, self_mul_star] #align quaternion.star_mul_self Quaternion.star_mul_self theorem im_sq : a.im ^ 2 = -normSq a.im := by simp_rw [sq, ← star_mul_self, im_star, neg_mul, neg_neg] #align quaternion.im_sq Quaternion.im_sq theorem coe_normSq_add : normSq (a + b) = normSq a + a * star b + b * star a + normSq b := by simp only [star_add, ← self_mul_star, mul_add, add_mul, add_assoc, add_left_comm] #align quaternion.coe_norm_sq_add Quaternion.coe_normSq_add theorem normSq_smul (r : R) (q : ℍ[R]) : normSq (r • q) = r ^ 2 * normSq q := by simp only [normSq_def', smul_re, smul_imI, smul_imJ, smul_imK, mul_pow, mul_add, smul_eq_mul] #align quaternion.norm_sq_smul Quaternion.normSq_smul theorem normSq_add (a b : ℍ[R]) : normSq (a + b) = normSq a + normSq b + 2 * (a * star b).re := calc normSq (a + b) = normSq a + (a * star b).re + ((b * star a).re + normSq b) := by simp_rw [normSq_def, star_add, add_mul, mul_add, add_re] _ = normSq a + normSq b + ((a * star b).re + (b * star a).re) := by abel _ = normSq a + normSq b + 2 * (a * star b).re := by rw [← add_re, ← star_mul_star a b, self_add_star', coe_re] #align quaternion.norm_sq_add Quaternion.normSq_add end Quaternion namespace Quaternion variable {R : Type*} section LinearOrderedCommRing variable [LinearOrderedCommRing R] {a : ℍ[R]} @[simp]	Mathlib/Algebra/Quaternion.lean	1,375	1,379	theorem normSq_eq_zero : normSq a = 0 ↔ a = 0 := by	refine ⟨fun h => ?_, fun h => h.symm ▸ normSq.map_zero⟩ rw [normSq_def', add_eq_zero_iff', add_eq_zero_iff', add_eq_zero_iff'] at h · exact ext a 0 (pow_eq_zero h.1.1.1) (pow_eq_zero h.1.1.2) (pow_eq_zero h.1.2) (pow_eq_zero h.2) all_goals apply_rules [sq_nonneg, add_nonneg]
/- Copyright (c) 2015, 2017 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Robert Y. Lewis, Johannes Hölzl, Mario Carneiro, Sébastien Gouëzel -/ import Mathlib.Topology.EMetricSpace.Basic import Mathlib.Topology.Bornology.Constructions import Mathlib.Data.Set.Pointwise.Interval import Mathlib.Topology.Order.DenselyOrdered /-! ## Pseudo-metric spaces This file defines pseudo-metric spaces: these differ from metric spaces by not imposing the condition `dist x y = 0 → x = y`. Many definitions and theorems expected on (pseudo-)metric spaces are already introduced on uniform spaces and topological spaces. For example: open and closed sets, compactness, completeness, continuity and uniform continuity. ## Main definitions * `Dist α`: Endows a space `α` with a function `dist a b`. * `PseudoMetricSpace α`: A space endowed with a distance function, which can be zero even if the two elements are non-equal. * `Metric.ball x ε`: The set of all points `y` with `dist y x < ε`. * `Metric.Bounded s`: Whether a subset of a `PseudoMetricSpace` is bounded. * `MetricSpace α`: A `PseudoMetricSpace` with the guarantee `dist x y = 0 → x = y`. Additional useful definitions: * `nndist a b`: `dist` as a function to the non-negative reals. * `Metric.closedBall x ε`: The set of all points `y` with `dist y x ≤ ε`. * `Metric.sphere x ε`: The set of all points `y` with `dist y x = ε`. TODO (anyone): Add "Main results" section. ## Tags pseudo_metric, dist -/ open Set Filter TopologicalSpace Bornology open scoped ENNReal NNReal Uniformity Topology universe u v w variable {α : Type u} {β : Type v} {X ι : Type} theorem UniformSpace.ofDist_aux (ε : ℝ) (hε : 0 < ε) : ∃ δ > (0 : ℝ), ∀ x < δ, ∀ y < δ, x + y < ε := ⟨ε / 2, half_pos hε, fun _x hx _y hy => add_halves ε ▸ add_lt_add hx hy⟩ /-- Construct a uniform structure from a distance function and metric space axioms -/ def UniformSpace.ofDist (dist : α → α → ℝ) (dist_self : ∀ x : α, dist x x = 0) (dist_comm : ∀ x y : α, dist x y = dist y x) (dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z) : UniformSpace α := .ofFun dist dist_self dist_comm dist_triangle ofDist_aux #align uniform_space_of_dist UniformSpace.ofDist -- Porting note: dropped the `dist_self` argument /-- Construct a bornology from a distance function and metric space axioms. -/ abbrev Bornology.ofDist {α : Type} (dist : α → α → ℝ) (dist_comm : ∀ x y, dist x y = dist y x) (dist_triangle : ∀ x y z, dist x z ≤ dist x y + dist y z) : Bornology α := Bornology.ofBounded { s : Set α \| ∃ C, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C } ⟨0, fun x hx y => hx.elim⟩ (fun s ⟨c, hc⟩ t h => ⟨c, fun x hx y hy => hc (h hx) (h hy)⟩) (fun s hs t ht => by rcases s.eq_empty_or_nonempty with rfl \| ⟨x, hx⟩ · rwa [empty_union] rcases t.eq_empty_or_nonempty with rfl \| ⟨y, hy⟩ · rwa [union_empty] rsuffices ⟨C, hC⟩ : ∃ C, ∀ z ∈ s ∪ t, dist x z ≤ C · refine ⟨C + C, fun a ha b hb => (dist_triangle a x b).trans ?_⟩ simpa only [dist_comm] using add_le_add (hC _ ha) (hC _ hb) rcases hs with ⟨Cs, hs⟩; rcases ht with ⟨Ct, ht⟩ refine ⟨max Cs (dist x y + Ct), fun z hz => hz.elim (fun hz => (hs hx hz).trans (le_max_left _ _)) (fun hz => (dist_triangle x y z).trans <\| (add_le_add le_rfl (ht hy hz)).trans (le_max_right _ _))⟩) fun z => ⟨dist z z, forall_eq.2 <\| forall_eq.2 le_rfl⟩ #align bornology.of_dist Bornology.ofDistₓ /-- The distance function (given an ambient metric space on `α`), which returns a nonnegative real number `dist x y` given `x y : α`. -/ @[ext] class Dist (α : Type) where dist : α → α → ℝ #align has_dist Dist export Dist (dist) -- the uniform structure and the emetric space structure are embedded in the metric space structure -- to avoid instance diamond issues. See Note [forgetful inheritance]. /-- This is an internal lemma used inside the default of `PseudoMetricSpace.edist`. -/ private theorem dist_nonneg' {α} {x y : α} (dist : α → α → ℝ) (dist_self : ∀ x : α, dist x x = 0) (dist_comm : ∀ x y : α, dist x y = dist y x) (dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z) : 0 ≤ dist x y := have : 0 ≤ 2 dist x y := calc 0 = dist x x := (dist_self _).symm _ ≤ dist x y + dist y x := dist_triangle _ _ _ _ = 2 * dist x y := by rw [two_mul, dist_comm] nonneg_of_mul_nonneg_right this two_pos #noalign pseudo_metric_space.edist_dist_tac -- Porting note (#11215): TODO: restore /-- Pseudo metric and Metric spaces A pseudo metric space is endowed with a distance for which the requirement `d(x,y)=0 → x = y` might not hold. A metric space is a pseudo metric space such that `d(x,y)=0 → x = y`. Each pseudo metric space induces a canonical `UniformSpace` and hence a canonical `TopologicalSpace` This is enforced in the type class definition, by extending the `UniformSpace` structure. When instantiating a `PseudoMetricSpace` structure, the uniformity fields are not necessary, they will be filled in by default. In the same way, each (pseudo) metric space induces a (pseudo) emetric space structure. It is included in the structure, but filled in by default. -/ class PseudoMetricSpace (α : Type u) extends Dist α : Type u where dist_self : ∀ x : α, dist x x = 0 dist_comm : ∀ x y : α, dist x y = dist y x dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z edist : α → α → ℝ≥0∞ := fun x y => ENNReal.ofNNReal ⟨dist x y, dist_nonneg' _ ‹_› ‹_› ‹_›⟩ edist_dist : ∀ x y : α, edist x y = ENNReal.ofReal (dist x y) -- Porting note (#11215): TODO: add := by _ toUniformSpace : UniformSpace α := .ofDist dist dist_self dist_comm dist_triangle uniformity_dist : 𝓤 α = ⨅ ε > 0, 𝓟 { p : α × α \| dist p.1 p.2 < ε } := by intros; rfl toBornology : Bornology α := Bornology.ofDist dist dist_comm dist_triangle cobounded_sets : (Bornology.cobounded α).sets = { s \| ∃ C : ℝ, ∀ x ∈ sᶜ, ∀ y ∈ sᶜ, dist x y ≤ C } := by intros; rfl #align pseudo_metric_space PseudoMetricSpace /-- Two pseudo metric space structures with the same distance function coincide. -/ @[ext] theorem PseudoMetricSpace.ext {α : Type} {m m' : PseudoMetricSpace α} (h : m.toDist = m'.toDist) : m = m' := by cases' m with d _ _ _ ed hed U hU B hB cases' m' with d' _ _ _ ed' hed' U' hU' B' hB' obtain rfl : d = d' := h congr · ext x y : 2 rw [hed, hed'] · exact UniformSpace.ext (hU.trans hU'.symm) · ext : 2 rw [← Filter.mem_sets, ← Filter.mem_sets, hB, hB'] #align pseudo_metric_space.ext PseudoMetricSpace.ext variable [PseudoMetricSpace α] attribute [instance] PseudoMetricSpace.toUniformSpace PseudoMetricSpace.toBornology -- see Note [lower instance priority] instance (priority := 200) PseudoMetricSpace.toEDist : EDist α := ⟨PseudoMetricSpace.edist⟩ #align pseudo_metric_space.to_has_edist PseudoMetricSpace.toEDist /-- Construct a pseudo-metric space structure whose underlying topological space structure (definitionally) agrees which a pre-existing topology which is compatible with a given distance function. -/ def PseudoMetricSpace.ofDistTopology {α : Type u} [TopologicalSpace α] (dist : α → α → ℝ) (dist_self : ∀ x : α, dist x x = 0) (dist_comm : ∀ x y : α, dist x y = dist y x) (dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z) (H : ∀ s : Set α, IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ∀ y, dist x y < ε → y ∈ s) : PseudoMetricSpace α := { dist := dist dist_self := dist_self dist_comm := dist_comm dist_triangle := dist_triangle edist_dist := fun x y => by exact ENNReal.coe_nnreal_eq _ toUniformSpace := (UniformSpace.ofDist dist dist_self dist_comm dist_triangle).replaceTopology <\| TopologicalSpace.ext_iff.2 fun s ↦ (H s).trans <\| forall₂_congr fun x _ ↦ ((UniformSpace.hasBasis_ofFun (exists_gt (0 : ℝ)) dist dist_self dist_comm dist_triangle UniformSpace.ofDist_aux).comap (Prod.mk x)).mem_iff.symm uniformity_dist := rfl toBornology := Bornology.ofDist dist dist_comm dist_triangle cobounded_sets := rfl } #align pseudo_metric_space.of_dist_topology PseudoMetricSpace.ofDistTopology @[simp] theorem dist_self (x : α) : dist x x = 0 := PseudoMetricSpace.dist_self x #align dist_self dist_self theorem dist_comm (x y : α) : dist x y = dist y x := PseudoMetricSpace.dist_comm x y #align dist_comm dist_comm theorem edist_dist (x y : α) : edist x y = ENNReal.ofReal (dist x y) := PseudoMetricSpace.edist_dist x y #align edist_dist edist_dist theorem dist_triangle (x y z : α) : dist x z ≤ dist x y + dist y z := PseudoMetricSpace.dist_triangle x y z #align dist_triangle dist_triangle theorem dist_triangle_left (x y z : α) : dist x y ≤ dist z x + dist z y := by rw [dist_comm z]; apply dist_triangle #align dist_triangle_left dist_triangle_left theorem dist_triangle_right (x y z : α) : dist x y ≤ dist x z + dist y z := by rw [dist_comm y]; apply dist_triangle #align dist_triangle_right dist_triangle_right theorem dist_triangle4 (x y z w : α) : dist x w ≤ dist x y + dist y z + dist z w := calc dist x w ≤ dist x z + dist z w := dist_triangle x z w _ ≤ dist x y + dist y z + dist z w := add_le_add_right (dist_triangle x y z) _ #align dist_triangle4 dist_triangle4 theorem dist_triangle4_left (x₁ y₁ x₂ y₂ : α) : dist x₂ y₂ ≤ dist x₁ y₁ + (dist x₁ x₂ + dist y₁ y₂) := by rw [add_left_comm, dist_comm x₁, ← add_assoc] apply dist_triangle4 #align dist_triangle4_left dist_triangle4_left theorem dist_triangle4_right (x₁ y₁ x₂ y₂ : α) : dist x₁ y₁ ≤ dist x₁ x₂ + dist y₁ y₂ + dist x₂ y₂ := by rw [add_right_comm, dist_comm y₁] apply dist_triangle4 #align dist_triangle4_right dist_triangle4_right /-- The triangle (polygon) inequality for sequences of points; `Finset.Ico` version. -/ theorem dist_le_Ico_sum_dist (f : ℕ → α) {m n} (h : m ≤ n) : dist (f m) (f n) ≤ ∑ i ∈ Finset.Ico m n, dist (f i) (f (i + 1)) := by induction n, h using Nat.le_induction with \| base => rw [Finset.Ico_self, Finset.sum_empty, dist_self] \| succ n hle ihn => calc dist (f m) (f (n + 1)) ≤ dist (f m) (f n) + dist (f n) (f (n + 1)) := dist_triangle _ _ _ _ ≤ (∑ i ∈ Finset.Ico m n, _) + _ := add_le_add ihn le_rfl _ = ∑ i ∈ Finset.Ico m (n + 1), _ := by { rw [Nat.Ico_succ_right_eq_insert_Ico hle, Finset.sum_insert, add_comm]; simp } #align dist_le_Ico_sum_dist dist_le_Ico_sum_dist /-- The triangle (polygon) inequality for sequences of points; `Finset.range` version. -/ theorem dist_le_range_sum_dist (f : ℕ → α) (n : ℕ) : dist (f 0) (f n) ≤ ∑ i ∈ Finset.range n, dist (f i) (f (i + 1)) := Nat.Ico_zero_eq_range ▸ dist_le_Ico_sum_dist f (Nat.zero_le n) #align dist_le_range_sum_dist dist_le_range_sum_dist /-- A version of `dist_le_Ico_sum_dist` with each intermediate distance replaced with an upper estimate. -/ theorem dist_le_Ico_sum_of_dist_le {f : ℕ → α} {m n} (hmn : m ≤ n) {d : ℕ → ℝ} (hd : ∀ {k}, m ≤ k → k < n → dist (f k) (f (k + 1)) ≤ d k) : dist (f m) (f n) ≤ ∑ i ∈ Finset.Ico m n, d i := le_trans (dist_le_Ico_sum_dist f hmn) <\| Finset.sum_le_sum fun _k hk => hd (Finset.mem_Ico.1 hk).1 (Finset.mem_Ico.1 hk).2 #align dist_le_Ico_sum_of_dist_le dist_le_Ico_sum_of_dist_le /-- A version of `dist_le_range_sum_dist` with each intermediate distance replaced with an upper estimate. -/ theorem dist_le_range_sum_of_dist_le {f : ℕ → α} (n : ℕ) {d : ℕ → ℝ} (hd : ∀ {k}, k < n → dist (f k) (f (k + 1)) ≤ d k) : dist (f 0) (f n) ≤ ∑ i ∈ Finset.range n, d i := Nat.Ico_zero_eq_range ▸ dist_le_Ico_sum_of_dist_le (zero_le n) fun _ => hd #align dist_le_range_sum_of_dist_le dist_le_range_sum_of_dist_le theorem swap_dist : Function.swap (@dist α _) = dist := by funext x y; exact dist_comm _ _ #align swap_dist swap_dist theorem abs_dist_sub_le (x y z : α) : \|dist x z - dist y z\| ≤ dist x y := abs_sub_le_iff.2 ⟨sub_le_iff_le_add.2 (dist_triangle _ _ _), sub_le_iff_le_add.2 (dist_triangle_left _ _ _)⟩ #align abs_dist_sub_le abs_dist_sub_le theorem dist_nonneg {x y : α} : 0 ≤ dist x y := dist_nonneg' dist dist_self dist_comm dist_triangle #align dist_nonneg dist_nonneg namespace Mathlib.Meta.Positivity open Lean Meta Qq Function /-- Extension for the `positivity` tactic: distances are nonnegative. -/ @[positivity Dist.dist _ _] def evalDist : PositivityExt where eval {u α} _zα _pα e := do match u, α, e with \| 0, ~q(ℝ), ~q(@Dist.dist $β $inst $a $b) => let _inst ← synthInstanceQ q(PseudoMetricSpace $β) assertInstancesCommute pure (.nonnegative q(dist_nonneg)) \| _, _, _ => throwError "not dist" end Mathlib.Meta.Positivity example {x y : α} : 0 ≤ dist x y := by positivity @[simp] theorem abs_dist {a b : α} : \|dist a b\| = dist a b := abs_of_nonneg dist_nonneg #align abs_dist abs_dist /-- A version of `Dist` that takes value in `ℝ≥0`. -/ class NNDist (α : Type) where nndist : α → α → ℝ≥0 #align has_nndist NNDist export NNDist (nndist) -- see Note [lower instance priority] /-- Distance as a nonnegative real number. -/ instance (priority := 100) PseudoMetricSpace.toNNDist : NNDist α := ⟨fun a b => ⟨dist a b, dist_nonneg⟩⟩ #align pseudo_metric_space.to_has_nndist PseudoMetricSpace.toNNDist /-- Express `dist` in terms of `nndist`-/ theorem dist_nndist (x y : α) : dist x y = nndist x y := rfl #align dist_nndist dist_nndist @[simp, norm_cast] theorem coe_nndist (x y : α) : ↑(nndist x y) = dist x y := rfl #align coe_nndist coe_nndist /-- Express `edist` in terms of `nndist`-/ theorem edist_nndist (x y : α) : edist x y = nndist x y := by rw [edist_dist, dist_nndist, ENNReal.ofReal_coe_nnreal] #align edist_nndist edist_nndist /-- Express `nndist` in terms of `edist`-/ theorem nndist_edist (x y : α) : nndist x y = (edist x y).toNNReal := by simp [edist_nndist] #align nndist_edist nndist_edist @[simp, norm_cast] theorem coe_nnreal_ennreal_nndist (x y : α) : ↑(nndist x y) = edist x y := (edist_nndist x y).symm #align coe_nnreal_ennreal_nndist coe_nnreal_ennreal_nndist @[simp, norm_cast] theorem edist_lt_coe {x y : α} {c : ℝ≥0} : edist x y < c ↔ nndist x y < c := by rw [edist_nndist, ENNReal.coe_lt_coe] #align edist_lt_coe edist_lt_coe @[simp, norm_cast] theorem edist_le_coe {x y : α} {c : ℝ≥0} : edist x y ≤ c ↔ nndist x y ≤ c := by rw [edist_nndist, ENNReal.coe_le_coe] #align edist_le_coe edist_le_coe /-- In a pseudometric space, the extended distance is always finite-/ theorem edist_lt_top {α : Type} [PseudoMetricSpace α] (x y : α) : edist x y < ⊤ := (edist_dist x y).symm ▸ ENNReal.ofReal_lt_top #align edist_lt_top edist_lt_top /-- In a pseudometric space, the extended distance is always finite-/ theorem edist_ne_top (x y : α) : edist x y ≠ ⊤ := (edist_lt_top x y).ne #align edist_ne_top edist_ne_top /-- `nndist x x` vanishes-/ @[simp] theorem nndist_self (a : α) : nndist a a = 0 := NNReal.coe_eq_zero.1 (dist_self a) #align nndist_self nndist_self -- Porting note: `dist_nndist` and `coe_nndist` moved up @[simp, norm_cast] theorem dist_lt_coe {x y : α} {c : ℝ≥0} : dist x y < c ↔ nndist x y < c := Iff.rfl #align dist_lt_coe dist_lt_coe @[simp, norm_cast] theorem dist_le_coe {x y : α} {c : ℝ≥0} : dist x y ≤ c ↔ nndist x y ≤ c := Iff.rfl #align dist_le_coe dist_le_coe @[simp] theorem edist_lt_ofReal {x y : α} {r : ℝ} : edist x y < ENNReal.ofReal r ↔ dist x y < r := by rw [edist_dist, ENNReal.ofReal_lt_ofReal_iff_of_nonneg dist_nonneg] #align edist_lt_of_real edist_lt_ofReal @[simp] theorem edist_le_ofReal {x y : α} {r : ℝ} (hr : 0 ≤ r) : edist x y ≤ ENNReal.ofReal r ↔ dist x y ≤ r := by rw [edist_dist, ENNReal.ofReal_le_ofReal_iff hr] #align edist_le_of_real edist_le_ofReal /-- Express `nndist` in terms of `dist`-/ theorem nndist_dist (x y : α) : nndist x y = Real.toNNReal (dist x y) := by rw [dist_nndist, Real.toNNReal_coe] #align nndist_dist nndist_dist theorem nndist_comm (x y : α) : nndist x y = nndist y x := NNReal.eq <\| dist_comm x y #align nndist_comm nndist_comm /-- Triangle inequality for the nonnegative distance-/ theorem nndist_triangle (x y z : α) : nndist x z ≤ nndist x y + nndist y z := dist_triangle _ _ _ #align nndist_triangle nndist_triangle theorem nndist_triangle_left (x y z : α) : nndist x y ≤ nndist z x + nndist z y := dist_triangle_left _ _ _ #align nndist_triangle_left nndist_triangle_left theorem nndist_triangle_right (x y z : α) : nndist x y ≤ nndist x z + nndist y z := dist_triangle_right _ _ _ #align nndist_triangle_right nndist_triangle_right /-- Express `dist` in terms of `edist`-/ theorem dist_edist (x y : α) : dist x y = (edist x y).toReal := by rw [edist_dist, ENNReal.toReal_ofReal dist_nonneg] #align dist_edist dist_edist namespace Metric -- instantiate pseudometric space as a topology variable {x y z : α} {δ ε ε₁ ε₂ : ℝ} {s : Set α} /-- `ball x ε` is the set of all points `y` with `dist y x < ε` -/ def ball (x : α) (ε : ℝ) : Set α := { y \| dist y x < ε } #align metric.ball Metric.ball @[simp] theorem mem_ball : y ∈ ball x ε ↔ dist y x < ε := Iff.rfl #align metric.mem_ball Metric.mem_ball theorem mem_ball' : y ∈ ball x ε ↔ dist x y < ε := by rw [dist_comm, mem_ball] #align metric.mem_ball' Metric.mem_ball' theorem pos_of_mem_ball (hy : y ∈ ball x ε) : 0 < ε := dist_nonneg.trans_lt hy #align metric.pos_of_mem_ball Metric.pos_of_mem_ball theorem mem_ball_self (h : 0 < ε) : x ∈ ball x ε := by rwa [mem_ball, dist_self] #align metric.mem_ball_self Metric.mem_ball_self @[simp] theorem nonempty_ball : (ball x ε).Nonempty ↔ 0 < ε := ⟨fun ⟨_x, hx⟩ => pos_of_mem_ball hx, fun h => ⟨x, mem_ball_self h⟩⟩ #align metric.nonempty_ball Metric.nonempty_ball @[simp] theorem ball_eq_empty : ball x ε = ∅ ↔ ε ≤ 0 := by rw [← not_nonempty_iff_eq_empty, nonempty_ball, not_lt] #align metric.ball_eq_empty Metric.ball_eq_empty @[simp] theorem ball_zero : ball x 0 = ∅ := by rw [ball_eq_empty] #align metric.ball_zero Metric.ball_zero /-- If a point belongs to an open ball, then there is a strictly smaller radius whose ball also contains it. See also `exists_lt_subset_ball`. -/ theorem exists_lt_mem_ball_of_mem_ball (h : x ∈ ball y ε) : ∃ ε' < ε, x ∈ ball y ε' := by simp only [mem_ball] at h ⊢ exact ⟨(dist x y + ε) / 2, by linarith, by linarith⟩ #align metric.exists_lt_mem_ball_of_mem_ball Metric.exists_lt_mem_ball_of_mem_ball theorem ball_eq_ball (ε : ℝ) (x : α) : UniformSpace.ball x { p \| dist p.2 p.1 < ε } = Metric.ball x ε := rfl #align metric.ball_eq_ball Metric.ball_eq_ball theorem ball_eq_ball' (ε : ℝ) (x : α) : UniformSpace.ball x { p \| dist p.1 p.2 < ε } = Metric.ball x ε := by ext simp [dist_comm, UniformSpace.ball] #align metric.ball_eq_ball' Metric.ball_eq_ball' @[simp] theorem iUnion_ball_nat (x : α) : ⋃ n : ℕ, ball x n = univ := iUnion_eq_univ_iff.2 fun y => exists_nat_gt (dist y x) #align metric.Union_ball_nat Metric.iUnion_ball_nat @[simp] theorem iUnion_ball_nat_succ (x : α) : ⋃ n : ℕ, ball x (n + 1) = univ := iUnion_eq_univ_iff.2 fun y => (exists_nat_gt (dist y x)).imp fun _ h => h.trans (lt_add_one _) #align metric.Union_ball_nat_succ Metric.iUnion_ball_nat_succ /-- `closedBall x ε` is the set of all points `y` with `dist y x ≤ ε` -/ def closedBall (x : α) (ε : ℝ) := { y \| dist y x ≤ ε } #align metric.closed_ball Metric.closedBall @[simp] theorem mem_closedBall : y ∈ closedBall x ε ↔ dist y x ≤ ε := Iff.rfl #align metric.mem_closed_ball Metric.mem_closedBall theorem mem_closedBall' : y ∈ closedBall x ε ↔ dist x y ≤ ε := by rw [dist_comm, mem_closedBall] #align metric.mem_closed_ball' Metric.mem_closedBall' /-- `sphere x ε` is the set of all points `y` with `dist y x = ε` -/ def sphere (x : α) (ε : ℝ) := { y \| dist y x = ε } #align metric.sphere Metric.sphere @[simp] theorem mem_sphere : y ∈ sphere x ε ↔ dist y x = ε := Iff.rfl #align metric.mem_sphere Metric.mem_sphere theorem mem_sphere' : y ∈ sphere x ε ↔ dist x y = ε := by rw [dist_comm, mem_sphere] #align metric.mem_sphere' Metric.mem_sphere' theorem ne_of_mem_sphere (h : y ∈ sphere x ε) (hε : ε ≠ 0) : y ≠ x := ne_of_mem_of_not_mem h <\| by simpa using hε.symm #align metric.ne_of_mem_sphere Metric.ne_of_mem_sphere theorem nonneg_of_mem_sphere (hy : y ∈ sphere x ε) : 0 ≤ ε := dist_nonneg.trans_eq hy #align metric.nonneg_of_mem_sphere Metric.nonneg_of_mem_sphere @[simp] theorem sphere_eq_empty_of_neg (hε : ε < 0) : sphere x ε = ∅ := Set.eq_empty_iff_forall_not_mem.mpr fun _y hy => (nonneg_of_mem_sphere hy).not_lt hε #align metric.sphere_eq_empty_of_neg Metric.sphere_eq_empty_of_neg theorem sphere_eq_empty_of_subsingleton [Subsingleton α] (hε : ε ≠ 0) : sphere x ε = ∅ := Set.eq_empty_iff_forall_not_mem.mpr fun _ h => ne_of_mem_sphere h hε (Subsingleton.elim _ _) #align metric.sphere_eq_empty_of_subsingleton Metric.sphere_eq_empty_of_subsingleton instance sphere_isEmpty_of_subsingleton [Subsingleton α] [NeZero ε] : IsEmpty (sphere x ε) := by rw [sphere_eq_empty_of_subsingleton (NeZero.ne ε)]; infer_instance #align metric.sphere_is_empty_of_subsingleton Metric.sphere_isEmpty_of_subsingleton theorem mem_closedBall_self (h : 0 ≤ ε) : x ∈ closedBall x ε := by rwa [mem_closedBall, dist_self] #align metric.mem_closed_ball_self Metric.mem_closedBall_self @[simp] theorem nonempty_closedBall : (closedBall x ε).Nonempty ↔ 0 ≤ ε := ⟨fun ⟨_x, hx⟩ => dist_nonneg.trans hx, fun h => ⟨x, mem_closedBall_self h⟩⟩ #align metric.nonempty_closed_ball Metric.nonempty_closedBall @[simp] theorem closedBall_eq_empty : closedBall x ε = ∅ ↔ ε < 0 := by rw [← not_nonempty_iff_eq_empty, nonempty_closedBall, not_le] #align metric.closed_ball_eq_empty Metric.closedBall_eq_empty /-- Closed balls and spheres coincide when the radius is non-positive -/ theorem closedBall_eq_sphere_of_nonpos (hε : ε ≤ 0) : closedBall x ε = sphere x ε := Set.ext fun _ => (hε.trans dist_nonneg).le_iff_eq #align metric.closed_ball_eq_sphere_of_nonpos Metric.closedBall_eq_sphere_of_nonpos theorem ball_subset_closedBall : ball x ε ⊆ closedBall x ε := fun _y hy => mem_closedBall.2 (le_of_lt hy) #align metric.ball_subset_closed_ball Metric.ball_subset_closedBall theorem sphere_subset_closedBall : sphere x ε ⊆ closedBall x ε := fun _ => le_of_eq #align metric.sphere_subset_closed_ball Metric.sphere_subset_closedBall lemma sphere_subset_ball {r R : ℝ} (h : r < R) : sphere x r ⊆ ball x R := fun _x hx ↦ (mem_sphere.1 hx).trans_lt h theorem closedBall_disjoint_ball (h : δ + ε ≤ dist x y) : Disjoint (closedBall x δ) (ball y ε) := Set.disjoint_left.mpr fun _a ha1 ha2 => (h.trans <\| dist_triangle_left _ _ _).not_lt <\| add_lt_add_of_le_of_lt ha1 ha2 #align metric.closed_ball_disjoint_ball Metric.closedBall_disjoint_ball theorem ball_disjoint_closedBall (h : δ + ε ≤ dist x y) : Disjoint (ball x δ) (closedBall y ε) := (closedBall_disjoint_ball <\| by rwa [add_comm, dist_comm]).symm #align metric.ball_disjoint_closed_ball Metric.ball_disjoint_closedBall theorem ball_disjoint_ball (h : δ + ε ≤ dist x y) : Disjoint (ball x δ) (ball y ε) := (closedBall_disjoint_ball h).mono_left ball_subset_closedBall #align metric.ball_disjoint_ball Metric.ball_disjoint_ball theorem closedBall_disjoint_closedBall (h : δ + ε < dist x y) : Disjoint (closedBall x δ) (closedBall y ε) := Set.disjoint_left.mpr fun _a ha1 ha2 => h.not_le <\| (dist_triangle_left _ _ _).trans <\| add_le_add ha1 ha2 #align metric.closed_ball_disjoint_closed_ball Metric.closedBall_disjoint_closedBall theorem sphere_disjoint_ball : Disjoint (sphere x ε) (ball x ε) := Set.disjoint_left.mpr fun _y hy₁ hy₂ => absurd hy₁ <\| ne_of_lt hy₂ #align metric.sphere_disjoint_ball Metric.sphere_disjoint_ball @[simp] theorem ball_union_sphere : ball x ε ∪ sphere x ε = closedBall x ε := Set.ext fun _y => (@le_iff_lt_or_eq ℝ _ _ _).symm #align metric.ball_union_sphere Metric.ball_union_sphere @[simp] theorem sphere_union_ball : sphere x ε ∪ ball x ε = closedBall x ε := by rw [union_comm, ball_union_sphere] #align metric.sphere_union_ball Metric.sphere_union_ball @[simp] theorem closedBall_diff_sphere : closedBall x ε \ sphere x ε = ball x ε := by rw [← ball_union_sphere, Set.union_diff_cancel_right sphere_disjoint_ball.symm.le_bot] #align metric.closed_ball_diff_sphere Metric.closedBall_diff_sphere @[simp] theorem closedBall_diff_ball : closedBall x ε \ ball x ε = sphere x ε := by rw [← ball_union_sphere, Set.union_diff_cancel_left sphere_disjoint_ball.symm.le_bot] #align metric.closed_ball_diff_ball Metric.closedBall_diff_ball theorem mem_ball_comm : x ∈ ball y ε ↔ y ∈ ball x ε := by rw [mem_ball', mem_ball] #align metric.mem_ball_comm Metric.mem_ball_comm theorem mem_closedBall_comm : x ∈ closedBall y ε ↔ y ∈ closedBall x ε := by rw [mem_closedBall', mem_closedBall] #align metric.mem_closed_ball_comm Metric.mem_closedBall_comm theorem mem_sphere_comm : x ∈ sphere y ε ↔ y ∈ sphere x ε := by rw [mem_sphere', mem_sphere] #align metric.mem_sphere_comm Metric.mem_sphere_comm @[gcongr] theorem ball_subset_ball (h : ε₁ ≤ ε₂) : ball x ε₁ ⊆ ball x ε₂ := fun _y yx => lt_of_lt_of_le (mem_ball.1 yx) h #align metric.ball_subset_ball Metric.ball_subset_ball theorem closedBall_eq_bInter_ball : closedBall x ε = ⋂ δ > ε, ball x δ := by ext y; rw [mem_closedBall, ← forall_lt_iff_le', mem_iInter₂]; rfl #align metric.closed_ball_eq_bInter_ball Metric.closedBall_eq_bInter_ball theorem ball_subset_ball' (h : ε₁ + dist x y ≤ ε₂) : ball x ε₁ ⊆ ball y ε₂ := fun z hz => calc dist z y ≤ dist z x + dist x y := dist_triangle _ _ _ _ < ε₁ + dist x y := add_lt_add_right (mem_ball.1 hz) _ _ ≤ ε₂ := h #align metric.ball_subset_ball' Metric.ball_subset_ball' @[gcongr] theorem closedBall_subset_closedBall (h : ε₁ ≤ ε₂) : closedBall x ε₁ ⊆ closedBall x ε₂ := fun _y (yx : _ ≤ ε₁) => le_trans yx h #align metric.closed_ball_subset_closed_ball Metric.closedBall_subset_closedBall theorem closedBall_subset_closedBall' (h : ε₁ + dist x y ≤ ε₂) : closedBall x ε₁ ⊆ closedBall y ε₂ := fun z hz => calc dist z y ≤ dist z x + dist x y := dist_triangle _ _ _ _ ≤ ε₁ + dist x y := add_le_add_right (mem_closedBall.1 hz) _ _ ≤ ε₂ := h #align metric.closed_ball_subset_closed_ball' Metric.closedBall_subset_closedBall' theorem closedBall_subset_ball (h : ε₁ < ε₂) : closedBall x ε₁ ⊆ ball x ε₂ := fun y (yh : dist y x ≤ ε₁) => lt_of_le_of_lt yh h #align metric.closed_ball_subset_ball Metric.closedBall_subset_ball theorem closedBall_subset_ball' (h : ε₁ + dist x y < ε₂) : closedBall x ε₁ ⊆ ball y ε₂ := fun z hz => calc dist z y ≤ dist z x + dist x y := dist_triangle _ _ _ _ ≤ ε₁ + dist x y := add_le_add_right (mem_closedBall.1 hz) _ _ < ε₂ := h #align metric.closed_ball_subset_ball' Metric.closedBall_subset_ball' theorem dist_le_add_of_nonempty_closedBall_inter_closedBall (h : (closedBall x ε₁ ∩ closedBall y ε₂).Nonempty) : dist x y ≤ ε₁ + ε₂ := let ⟨z, hz⟩ := h calc dist x y ≤ dist z x + dist z y := dist_triangle_left _ _ _ _ ≤ ε₁ + ε₂ := add_le_add hz.1 hz.2 #align metric.dist_le_add_of_nonempty_closed_ball_inter_closed_ball Metric.dist_le_add_of_nonempty_closedBall_inter_closedBall theorem dist_lt_add_of_nonempty_closedBall_inter_ball (h : (closedBall x ε₁ ∩ ball y ε₂).Nonempty) : dist x y < ε₁ + ε₂ := let ⟨z, hz⟩ := h calc dist x y ≤ dist z x + dist z y := dist_triangle_left _ _ _ _ < ε₁ + ε₂ := add_lt_add_of_le_of_lt hz.1 hz.2 #align metric.dist_lt_add_of_nonempty_closed_ball_inter_ball Metric.dist_lt_add_of_nonempty_closedBall_inter_ball theorem dist_lt_add_of_nonempty_ball_inter_closedBall (h : (ball x ε₁ ∩ closedBall y ε₂).Nonempty) : dist x y < ε₁ + ε₂ := by rw [inter_comm] at h rw [add_comm, dist_comm] exact dist_lt_add_of_nonempty_closedBall_inter_ball h #align metric.dist_lt_add_of_nonempty_ball_inter_closed_ball Metric.dist_lt_add_of_nonempty_ball_inter_closedBall theorem dist_lt_add_of_nonempty_ball_inter_ball (h : (ball x ε₁ ∩ ball y ε₂).Nonempty) : dist x y < ε₁ + ε₂ := dist_lt_add_of_nonempty_closedBall_inter_ball <\| h.mono (inter_subset_inter ball_subset_closedBall Subset.rfl) #align metric.dist_lt_add_of_nonempty_ball_inter_ball Metric.dist_lt_add_of_nonempty_ball_inter_ball @[simp] theorem iUnion_closedBall_nat (x : α) : ⋃ n : ℕ, closedBall x n = univ := iUnion_eq_univ_iff.2 fun y => exists_nat_ge (dist y x) #align metric.Union_closed_ball_nat Metric.iUnion_closedBall_nat theorem iUnion_inter_closedBall_nat (s : Set α) (x : α) : ⋃ n : ℕ, s ∩ closedBall x n = s := by rw [← inter_iUnion, iUnion_closedBall_nat, inter_univ] #align metric.Union_inter_closed_ball_nat Metric.iUnion_inter_closedBall_nat theorem ball_subset (h : dist x y ≤ ε₂ - ε₁) : ball x ε₁ ⊆ ball y ε₂ := fun z zx => by rw [← add_sub_cancel ε₁ ε₂] exact lt_of_le_of_lt (dist_triangle z x y) (add_lt_add_of_lt_of_le zx h) #align metric.ball_subset Metric.ball_subset theorem ball_half_subset (y) (h : y ∈ ball x (ε / 2)) : ball y (ε / 2) ⊆ ball x ε := ball_subset <\| by rw [sub_self_div_two]; exact le_of_lt h #align metric.ball_half_subset Metric.ball_half_subset theorem exists_ball_subset_ball (h : y ∈ ball x ε) : ∃ ε' > 0, ball y ε' ⊆ ball x ε := ⟨_, sub_pos.2 h, ball_subset <\| by rw [sub_sub_self]⟩ #align metric.exists_ball_subset_ball Metric.exists_ball_subset_ball /-- If a property holds for all points in closed balls of arbitrarily large radii, then it holds for all points. -/ theorem forall_of_forall_mem_closedBall (p : α → Prop) (x : α) (H : ∃ᶠ R : ℝ in atTop, ∀ y ∈ closedBall x R, p y) (y : α) : p y := by obtain ⟨R, hR, h⟩ : ∃ R ≥ dist y x, ∀ z : α, z ∈ closedBall x R → p z := frequently_iff.1 H (Ici_mem_atTop (dist y x)) exact h _ hR #align metric.forall_of_forall_mem_closed_ball Metric.forall_of_forall_mem_closedBall /-- If a property holds for all points in balls of arbitrarily large radii, then it holds for all points. -/ theorem forall_of_forall_mem_ball (p : α → Prop) (x : α) (H : ∃ᶠ R : ℝ in atTop, ∀ y ∈ ball x R, p y) (y : α) : p y := by obtain ⟨R, hR, h⟩ : ∃ R > dist y x, ∀ z : α, z ∈ ball x R → p z := frequently_iff.1 H (Ioi_mem_atTop (dist y x)) exact h _ hR #align metric.forall_of_forall_mem_ball Metric.forall_of_forall_mem_ball theorem isBounded_iff {s : Set α} : IsBounded s ↔ ∃ C : ℝ, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C := by rw [isBounded_def, ← Filter.mem_sets, @PseudoMetricSpace.cobounded_sets α, mem_setOf_eq, compl_compl] #align metric.is_bounded_iff Metric.isBounded_iff theorem isBounded_iff_eventually {s : Set α} : IsBounded s ↔ ∀ᶠ C in atTop, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C := isBounded_iff.trans ⟨fun ⟨C, h⟩ => eventually_atTop.2 ⟨C, fun _C' hC' _x hx _y hy => (h hx hy).trans hC'⟩, Eventually.exists⟩ #align metric.is_bounded_iff_eventually Metric.isBounded_iff_eventually theorem isBounded_iff_exists_ge {s : Set α} (c : ℝ) : IsBounded s ↔ ∃ C, c ≤ C ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C := ⟨fun h => ((eventually_ge_atTop c).and (isBounded_iff_eventually.1 h)).exists, fun h => isBounded_iff.2 <\| h.imp fun _ => And.right⟩ #align metric.is_bounded_iff_exists_ge Metric.isBounded_iff_exists_ge theorem isBounded_iff_nndist {s : Set α} : IsBounded s ↔ ∃ C : ℝ≥0, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → nndist x y ≤ C := by simp only [isBounded_iff_exists_ge 0, NNReal.exists, ← NNReal.coe_le_coe, ← dist_nndist, NNReal.coe_mk, exists_prop] #align metric.is_bounded_iff_nndist Metric.isBounded_iff_nndist theorem toUniformSpace_eq : ‹PseudoMetricSpace α›.toUniformSpace = .ofDist dist dist_self dist_comm dist_triangle := UniformSpace.ext PseudoMetricSpace.uniformity_dist #align metric.to_uniform_space_eq Metric.toUniformSpace_eq theorem uniformity_basis_dist : (𝓤 α).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { p : α × α \| dist p.1 p.2 < ε } := by rw [toUniformSpace_eq] exact UniformSpace.hasBasis_ofFun (exists_gt _) _ _ _ _ _ #align metric.uniformity_basis_dist Metric.uniformity_basis_dist /-- Given `f : β → ℝ`, if `f` sends `{i \| p i}` to a set of positive numbers accumulating to zero, then `f i`-neighborhoods of the diagonal form a basis of `𝓤 α`. For specific bases see `uniformity_basis_dist`, `uniformity_basis_dist_inv_nat_succ`, and `uniformity_basis_dist_inv_nat_pos`. -/ protected theorem mk_uniformity_basis {β : Type} {p : β → Prop} {f : β → ℝ} (hf₀ : ∀ i, p i → 0 < f i) (hf : ∀ ⦃ε⦄, 0 < ε → ∃ i, p i ∧ f i ≤ ε) : (𝓤 α).HasBasis p fun i => { p : α × α \| dist p.1 p.2 < f i } := by refine ⟨fun s => uniformity_basis_dist.mem_iff.trans ?_⟩ constructor · rintro ⟨ε, ε₀, hε⟩ rcases hf ε₀ with ⟨i, hi, H⟩ exact ⟨i, hi, fun x (hx : _ < _) => hε <\| lt_of_lt_of_le hx H⟩ · exact fun ⟨i, hi, H⟩ => ⟨f i, hf₀ i hi, H⟩ #align metric.mk_uniformity_basis Metric.mk_uniformity_basis theorem uniformity_basis_dist_rat : (𝓤 α).HasBasis (fun r : ℚ => 0 < r) fun r => { p : α × α \| dist p.1 p.2 < r } := Metric.mk_uniformity_basis (fun _ => Rat.cast_pos.2) fun _ε hε => let ⟨r, hr0, hrε⟩ := exists_rat_btwn hε ⟨r, Rat.cast_pos.1 hr0, hrε.le⟩ #align metric.uniformity_basis_dist_rat Metric.uniformity_basis_dist_rat theorem uniformity_basis_dist_inv_nat_succ : (𝓤 α).HasBasis (fun _ => True) fun n : ℕ => { p : α × α \| dist p.1 p.2 < 1 / (↑n + 1) } := Metric.mk_uniformity_basis (fun n _ => div_pos zero_lt_one <\| Nat.cast_add_one_pos n) fun _ε ε0 => (exists_nat_one_div_lt ε0).imp fun _n hn => ⟨trivial, le_of_lt hn⟩ #align metric.uniformity_basis_dist_inv_nat_succ Metric.uniformity_basis_dist_inv_nat_succ theorem uniformity_basis_dist_inv_nat_pos : (𝓤 α).HasBasis (fun n : ℕ => 0 < n) fun n : ℕ => { p : α × α \| dist p.1 p.2 < 1 / ↑n } := Metric.mk_uniformity_basis (fun _ hn => div_pos zero_lt_one <\| Nat.cast_pos.2 hn) fun _ ε0 => let ⟨n, hn⟩ := exists_nat_one_div_lt ε0 ⟨n + 1, Nat.succ_pos n, mod_cast hn.le⟩ #align metric.uniformity_basis_dist_inv_nat_pos Metric.uniformity_basis_dist_inv_nat_pos theorem uniformity_basis_dist_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) : (𝓤 α).HasBasis (fun _ : ℕ => True) fun n : ℕ => { p : α × α \| dist p.1 p.2 < r ^ n } := Metric.mk_uniformity_basis (fun _ _ => pow_pos h0 _) fun _ε ε0 => let ⟨n, hn⟩ := exists_pow_lt_of_lt_one ε0 h1 ⟨n, trivial, hn.le⟩ #align metric.uniformity_basis_dist_pow Metric.uniformity_basis_dist_pow theorem uniformity_basis_dist_lt {R : ℝ} (hR : 0 < R) : (𝓤 α).HasBasis (fun r : ℝ => 0 < r ∧ r < R) fun r => { p : α × α \| dist p.1 p.2 < r } := Metric.mk_uniformity_basis (fun _ => And.left) fun r hr => ⟨min r (R / 2), ⟨lt_min hr (half_pos hR), min_lt_iff.2 <\| Or.inr (half_lt_self hR)⟩, min_le_left _ _⟩ #align metric.uniformity_basis_dist_lt Metric.uniformity_basis_dist_lt /-- Given `f : β → ℝ`, if `f` sends `{i \| p i}` to a set of positive numbers accumulating to zero, then closed neighborhoods of the diagonal of sizes `{f i \| p i}` form a basis of `𝓤 α`. Currently we have only one specific basis `uniformity_basis_dist_le` based on this constructor. More can be easily added if needed in the future. -/ protected theorem mk_uniformity_basis_le {β : Type} {p : β → Prop} {f : β → ℝ} (hf₀ : ∀ x, p x → 0 < f x) (hf : ∀ ε, 0 < ε → ∃ x, p x ∧ f x ≤ ε) : (𝓤 α).HasBasis p fun x => { p : α × α \| dist p.1 p.2 ≤ f x } := by refine ⟨fun s => uniformity_basis_dist.mem_iff.trans ?_⟩ constructor · rintro ⟨ε, ε₀, hε⟩ rcases exists_between ε₀ with ⟨ε', hε'⟩ rcases hf ε' hε'.1 with ⟨i, hi, H⟩ exact ⟨i, hi, fun x (hx : _ ≤ _) => hε <\| lt_of_le_of_lt (le_trans hx H) hε'.2⟩ · exact fun ⟨i, hi, H⟩ => ⟨f i, hf₀ i hi, fun x (hx : _ < _) => H (mem_setOf.2 hx.le)⟩ #align metric.mk_uniformity_basis_le Metric.mk_uniformity_basis_le /-- Constant size closed neighborhoods of the diagonal form a basis of the uniformity filter. -/ theorem uniformity_basis_dist_le : (𝓤 α).HasBasis ((0 : ℝ) < ·) fun ε => { p : α × α \| dist p.1 p.2 ≤ ε } := Metric.mk_uniformity_basis_le (fun _ => id) fun ε ε₀ => ⟨ε, ε₀, le_refl ε⟩ #align metric.uniformity_basis_dist_le Metric.uniformity_basis_dist_le theorem uniformity_basis_dist_le_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) : (𝓤 α).HasBasis (fun _ : ℕ => True) fun n : ℕ => { p : α × α \| dist p.1 p.2 ≤ r ^ n } := Metric.mk_uniformity_basis_le (fun _ _ => pow_pos h0 _) fun _ε ε0 => let ⟨n, hn⟩ := exists_pow_lt_of_lt_one ε0 h1 ⟨n, trivial, hn.le⟩ #align metric.uniformity_basis_dist_le_pow Metric.uniformity_basis_dist_le_pow theorem mem_uniformity_dist {s : Set (α × α)} : s ∈ 𝓤 α ↔ ∃ ε > 0, ∀ {a b : α}, dist a b < ε → (a, b) ∈ s := uniformity_basis_dist.mem_uniformity_iff #align metric.mem_uniformity_dist Metric.mem_uniformity_dist /-- A constant size neighborhood of the diagonal is an entourage. -/ theorem dist_mem_uniformity {ε : ℝ} (ε0 : 0 < ε) : { p : α × α \| dist p.1 p.2 < ε } ∈ 𝓤 α := mem_uniformity_dist.2 ⟨ε, ε0, id⟩ #align metric.dist_mem_uniformity Metric.dist_mem_uniformity theorem uniformContinuous_iff [PseudoMetricSpace β] {f : α → β} : UniformContinuous f ↔ ∀ ε > 0, ∃ δ > 0, ∀ {a b : α}, dist a b < δ → dist (f a) (f b) < ε := uniformity_basis_dist.uniformContinuous_iff uniformity_basis_dist #align metric.uniform_continuous_iff Metric.uniformContinuous_iff theorem uniformContinuousOn_iff [PseudoMetricSpace β] {f : α → β} {s : Set α} : UniformContinuousOn f s ↔ ∀ ε > 0, ∃ δ > 0, ∀ x ∈ s, ∀ y ∈ s, dist x y < δ → dist (f x) (f y) < ε := Metric.uniformity_basis_dist.uniformContinuousOn_iff Metric.uniformity_basis_dist #align metric.uniform_continuous_on_iff Metric.uniformContinuousOn_iff theorem uniformContinuousOn_iff_le [PseudoMetricSpace β] {f : α → β} {s : Set α} : UniformContinuousOn f s ↔ ∀ ε > 0, ∃ δ > 0, ∀ x ∈ s, ∀ y ∈ s, dist x y ≤ δ → dist (f x) (f y) ≤ ε := Metric.uniformity_basis_dist_le.uniformContinuousOn_iff Metric.uniformity_basis_dist_le #align metric.uniform_continuous_on_iff_le Metric.uniformContinuousOn_iff_le nonrec theorem uniformInducing_iff [PseudoMetricSpace β] {f : α → β} : UniformInducing f ↔ UniformContinuous f ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, dist (f a) (f b) < ε → dist a b < δ := uniformInducing_iff'.trans <\| Iff.rfl.and <\| ((uniformity_basis_dist.comap _).le_basis_iff uniformity_basis_dist).trans <\| by simp only [subset_def, Prod.forall, gt_iff_lt, preimage_setOf_eq, Prod.map_apply, mem_setOf] nonrec theorem uniformEmbedding_iff [PseudoMetricSpace β] {f : α → β} : UniformEmbedding f ↔ Function.Injective f ∧ UniformContinuous f ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, dist (f a) (f b) < ε → dist a b < δ := by rw [uniformEmbedding_iff, and_comm, uniformInducing_iff] #align metric.uniform_embedding_iff Metric.uniformEmbedding_iff /-- If a map between pseudometric spaces is a uniform embedding then the distance between `f x` and `f y` is controlled in terms of the distance between `x` and `y`. -/ theorem controlled_of_uniformEmbedding [PseudoMetricSpace β] {f : α → β} (h : UniformEmbedding f) : (∀ ε > 0, ∃ δ > 0, ∀ {a b : α}, dist a b < δ → dist (f a) (f b) < ε) ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, dist (f a) (f b) < ε → dist a b < δ := ⟨uniformContinuous_iff.1 h.uniformContinuous, (uniformEmbedding_iff.1 h).2.2⟩ #align metric.controlled_of_uniform_embedding Metric.controlled_of_uniformEmbedding theorem totallyBounded_iff {s : Set α} : TotallyBounded s ↔ ∀ ε > 0, ∃ t : Set α, t.Finite ∧ s ⊆ ⋃ y ∈ t, ball y ε := uniformity_basis_dist.totallyBounded_iff #align metric.totally_bounded_iff Metric.totallyBounded_iff /-- A pseudometric space is totally bounded if one can reconstruct up to any ε>0 any element of the space from finitely many data. -/ theorem totallyBounded_of_finite_discretization {s : Set α} (H : ∀ ε > (0 : ℝ), ∃ (β : Type u) (_ : Fintype β) (F : s → β), ∀ x y, F x = F y → dist (x : α) y < ε) : TotallyBounded s := by rcases s.eq_empty_or_nonempty with hs \| hs · rw [hs] exact totallyBounded_empty rcases hs with ⟨x0, hx0⟩ haveI : Inhabited s := ⟨⟨x0, hx0⟩⟩ refine totallyBounded_iff.2 fun ε ε0 => ?_ rcases H ε ε0 with ⟨β, fβ, F, hF⟩ let Finv := Function.invFun F refine ⟨range (Subtype.val ∘ Finv), finite_range _, fun x xs => ?_⟩ let x' := Finv (F ⟨x, xs⟩) have : F x' = F ⟨x, xs⟩ := Function.invFun_eq ⟨⟨x, xs⟩, rfl⟩ simp only [Set.mem_iUnion, Set.mem_range] exact ⟨_, ⟨F ⟨x, xs⟩, rfl⟩, hF _ _ this.symm⟩ #align metric.totally_bounded_of_finite_discretization Metric.totallyBounded_of_finite_discretization theorem finite_approx_of_totallyBounded {s : Set α} (hs : TotallyBounded s) : ∀ ε > 0, ∃ t, t ⊆ s ∧ Set.Finite t ∧ s ⊆ ⋃ y ∈ t, ball y ε := by intro ε ε_pos rw [totallyBounded_iff_subset] at hs exact hs _ (dist_mem_uniformity ε_pos) #align metric.finite_approx_of_totally_bounded Metric.finite_approx_of_totallyBounded /-- Expressing uniform convergence using `dist` -/ theorem tendstoUniformlyOnFilter_iff {F : ι → β → α} {f : β → α} {p : Filter ι} {p' : Filter β} : TendstoUniformlyOnFilter F f p p' ↔ ∀ ε > 0, ∀ᶠ n : ι × β in p ×ˢ p', dist (f n.snd) (F n.fst n.snd) < ε := by refine ⟨fun H ε hε => H _ (dist_mem_uniformity hε), fun H u hu => ?_⟩ rcases mem_uniformity_dist.1 hu with ⟨ε, εpos, hε⟩ exact (H ε εpos).mono fun n hn => hε hn #align metric.tendsto_uniformly_on_filter_iff Metric.tendstoUniformlyOnFilter_iff /-- Expressing locally uniform convergence on a set using `dist`. -/ theorem tendstoLocallyUniformlyOn_iff [TopologicalSpace β] {F : ι → β → α} {f : β → α} {p : Filter ι} {s : Set β} : TendstoLocallyUniformlyOn F f p s ↔ ∀ ε > 0, ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, ∀ᶠ n in p, ∀ y ∈ t, dist (f y) (F n y) < ε := by refine ⟨fun H ε hε => H _ (dist_mem_uniformity hε), fun H u hu x hx => ?_⟩ rcases mem_uniformity_dist.1 hu with ⟨ε, εpos, hε⟩ rcases H ε εpos x hx with ⟨t, ht, Ht⟩ exact ⟨t, ht, Ht.mono fun n hs x hx => hε (hs x hx)⟩ #align metric.tendsto_locally_uniformly_on_iff Metric.tendstoLocallyUniformlyOn_iff /-- Expressing uniform convergence on a set using `dist`. -/ theorem tendstoUniformlyOn_iff {F : ι → β → α} {f : β → α} {p : Filter ι} {s : Set β} : TendstoUniformlyOn F f p s ↔ ∀ ε > 0, ∀ᶠ n in p, ∀ x ∈ s, dist (f x) (F n x) < ε := by refine ⟨fun H ε hε => H _ (dist_mem_uniformity hε), fun H u hu => ?_⟩ rcases mem_uniformity_dist.1 hu with ⟨ε, εpos, hε⟩ exact (H ε εpos).mono fun n hs x hx => hε (hs x hx) #align metric.tendsto_uniformly_on_iff Metric.tendstoUniformlyOn_iff /-- Expressing locally uniform convergence using `dist`. -/ theorem tendstoLocallyUniformly_iff [TopologicalSpace β] {F : ι → β → α} {f : β → α} {p : Filter ι} : TendstoLocallyUniformly F f p ↔ ∀ ε > 0, ∀ x : β, ∃ t ∈ 𝓝 x, ∀ᶠ n in p, ∀ y ∈ t, dist (f y) (F n y) < ε := by simp only [← tendstoLocallyUniformlyOn_univ, tendstoLocallyUniformlyOn_iff, nhdsWithin_univ, mem_univ, forall_const, exists_prop] #align metric.tendsto_locally_uniformly_iff Metric.tendstoLocallyUniformly_iff /-- Expressing uniform convergence using `dist`. -/ theorem tendstoUniformly_iff {F : ι → β → α} {f : β → α} {p : Filter ι} : TendstoUniformly F f p ↔ ∀ ε > 0, ∀ᶠ n in p, ∀ x, dist (f x) (F n x) < ε := by rw [← tendstoUniformlyOn_univ, tendstoUniformlyOn_iff] simp #align metric.tendsto_uniformly_iff Metric.tendstoUniformly_iff protected theorem cauchy_iff {f : Filter α} : Cauchy f ↔ NeBot f ∧ ∀ ε > 0, ∃ t ∈ f, ∀ x ∈ t, ∀ y ∈ t, dist x y < ε := uniformity_basis_dist.cauchy_iff #align metric.cauchy_iff Metric.cauchy_iff theorem nhds_basis_ball : (𝓝 x).HasBasis (0 < ·) (ball x) := nhds_basis_uniformity uniformity_basis_dist #align metric.nhds_basis_ball Metric.nhds_basis_ball theorem mem_nhds_iff : s ∈ 𝓝 x ↔ ∃ ε > 0, ball x ε ⊆ s := nhds_basis_ball.mem_iff #align metric.mem_nhds_iff Metric.mem_nhds_iff theorem eventually_nhds_iff {p : α → Prop} : (∀ᶠ y in 𝓝 x, p y) ↔ ∃ ε > 0, ∀ ⦃y⦄, dist y x < ε → p y := mem_nhds_iff #align metric.eventually_nhds_iff Metric.eventually_nhds_iff theorem eventually_nhds_iff_ball {p : α → Prop} : (∀ᶠ y in 𝓝 x, p y) ↔ ∃ ε > 0, ∀ y ∈ ball x ε, p y := mem_nhds_iff #align metric.eventually_nhds_iff_ball Metric.eventually_nhds_iff_ball /-- A version of `Filter.eventually_prod_iff` where the first filter consists of neighborhoods in a pseudo-metric space. -/ theorem eventually_nhds_prod_iff {f : Filter ι} {x₀ : α} {p : α × ι → Prop} : (∀ᶠ x in 𝓝 x₀ ×ˢ f, p x) ↔ ∃ ε > (0 : ℝ), ∃ pa : ι → Prop, (∀ᶠ i in f, pa i) ∧ ∀ {x}, dist x x₀ < ε → ∀ {i}, pa i → p (x, i) := by refine (nhds_basis_ball.prod f.basis_sets).eventually_iff.trans ?_ simp only [Prod.exists, forall_prod_set, id, mem_ball, and_assoc, exists_and_left, and_imp] rfl #align metric.eventually_nhds_prod_iff Metric.eventually_nhds_prod_iff /-- A version of `Filter.eventually_prod_iff` where the second filter consists of neighborhoods in a pseudo-metric space. -/ theorem eventually_prod_nhds_iff {f : Filter ι} {x₀ : α} {p : ι × α → Prop} : (∀ᶠ x in f ×ˢ 𝓝 x₀, p x) ↔ ∃ pa : ι → Prop, (∀ᶠ i in f, pa i) ∧ ∃ ε > 0, ∀ {i}, pa i → ∀ {x}, dist x x₀ < ε → p (i, x) := by rw [eventually_swap_iff, Metric.eventually_nhds_prod_iff] constructor <;> · rintro ⟨a1, a2, a3, a4, a5⟩ exact ⟨a3, a4, a1, a2, fun b1 b2 b3 => a5 b3 b1⟩ #align metric.eventually_prod_nhds_iff Metric.eventually_prod_nhds_iff theorem nhds_basis_closedBall : (𝓝 x).HasBasis (fun ε : ℝ => 0 < ε) (closedBall x) := nhds_basis_uniformity uniformity_basis_dist_le #align metric.nhds_basis_closed_ball Metric.nhds_basis_closedBall theorem nhds_basis_ball_inv_nat_succ : (𝓝 x).HasBasis (fun _ => True) fun n : ℕ => ball x (1 / (↑n + 1)) := nhds_basis_uniformity uniformity_basis_dist_inv_nat_succ #align metric.nhds_basis_ball_inv_nat_succ Metric.nhds_basis_ball_inv_nat_succ theorem nhds_basis_ball_inv_nat_pos : (𝓝 x).HasBasis (fun n => 0 < n) fun n : ℕ => ball x (1 / ↑n) := nhds_basis_uniformity uniformity_basis_dist_inv_nat_pos #align metric.nhds_basis_ball_inv_nat_pos Metric.nhds_basis_ball_inv_nat_pos theorem nhds_basis_ball_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) : (𝓝 x).HasBasis (fun _ => True) fun n : ℕ => ball x (r ^ n) := nhds_basis_uniformity (uniformity_basis_dist_pow h0 h1) #align metric.nhds_basis_ball_pow Metric.nhds_basis_ball_pow theorem nhds_basis_closedBall_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) : (𝓝 x).HasBasis (fun _ => True) fun n : ℕ => closedBall x (r ^ n) := nhds_basis_uniformity (uniformity_basis_dist_le_pow h0 h1) #align metric.nhds_basis_closed_ball_pow Metric.nhds_basis_closedBall_pow theorem isOpen_iff : IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ball x ε ⊆ s := by simp only [isOpen_iff_mem_nhds, mem_nhds_iff] #align metric.is_open_iff Metric.isOpen_iff theorem isOpen_ball : IsOpen (ball x ε) := isOpen_iff.2 fun _ => exists_ball_subset_ball #align metric.is_open_ball Metric.isOpen_ball theorem ball_mem_nhds (x : α) {ε : ℝ} (ε0 : 0 < ε) : ball x ε ∈ 𝓝 x := isOpen_ball.mem_nhds (mem_ball_self ε0) #align metric.ball_mem_nhds Metric.ball_mem_nhds theorem closedBall_mem_nhds (x : α) {ε : ℝ} (ε0 : 0 < ε) : closedBall x ε ∈ 𝓝 x := mem_of_superset (ball_mem_nhds x ε0) ball_subset_closedBall #align metric.closed_ball_mem_nhds Metric.closedBall_mem_nhds theorem closedBall_mem_nhds_of_mem {x c : α} {ε : ℝ} (h : x ∈ ball c ε) : closedBall c ε ∈ 𝓝 x := mem_of_superset (isOpen_ball.mem_nhds h) ball_subset_closedBall #align metric.closed_ball_mem_nhds_of_mem Metric.closedBall_mem_nhds_of_mem theorem nhdsWithin_basis_ball {s : Set α} : (𝓝[s] x).HasBasis (fun ε : ℝ => 0 < ε) fun ε => ball x ε ∩ s := nhdsWithin_hasBasis nhds_basis_ball s #align metric.nhds_within_basis_ball Metric.nhdsWithin_basis_ball theorem mem_nhdsWithin_iff {t : Set α} : s ∈ 𝓝[t] x ↔ ∃ ε > 0, ball x ε ∩ t ⊆ s := nhdsWithin_basis_ball.mem_iff #align metric.mem_nhds_within_iff Metric.mem_nhdsWithin_iff theorem tendsto_nhdsWithin_nhdsWithin [PseudoMetricSpace β] {t : Set β} {f : α → β} {a b} : Tendsto f (𝓝[s] a) (𝓝[t] b) ↔ ∀ ε > 0, ∃ δ > 0, ∀ {x : α}, x ∈ s → dist x a < δ → f x ∈ t ∧ dist (f x) b < ε := (nhdsWithin_basis_ball.tendsto_iff nhdsWithin_basis_ball).trans <\| by simp only [inter_comm _ s, inter_comm _ t, mem_inter_iff, and_imp, gt_iff_lt, mem_ball] #align metric.tendsto_nhds_within_nhds_within Metric.tendsto_nhdsWithin_nhdsWithin theorem tendsto_nhdsWithin_nhds [PseudoMetricSpace β] {f : α → β} {a b} : Tendsto f (𝓝[s] a) (𝓝 b) ↔ ∀ ε > 0, ∃ δ > 0, ∀ {x : α}, x ∈ s → dist x a < δ → dist (f x) b < ε := by rw [← nhdsWithin_univ b, tendsto_nhdsWithin_nhdsWithin] simp only [mem_univ, true_and_iff] #align metric.tendsto_nhds_within_nhds Metric.tendsto_nhdsWithin_nhds theorem tendsto_nhds_nhds [PseudoMetricSpace β] {f : α → β} {a b} : Tendsto f (𝓝 a) (𝓝 b) ↔ ∀ ε > 0, ∃ δ > 0, ∀ {x : α}, dist x a < δ → dist (f x) b < ε := nhds_basis_ball.tendsto_iff nhds_basis_ball #align metric.tendsto_nhds_nhds Metric.tendsto_nhds_nhds theorem continuousAt_iff [PseudoMetricSpace β] {f : α → β} {a : α} : ContinuousAt f a ↔ ∀ ε > 0, ∃ δ > 0, ∀ {x : α}, dist x a < δ → dist (f x) (f a) < ε := by rw [ContinuousAt, tendsto_nhds_nhds] #align metric.continuous_at_iff Metric.continuousAt_iff theorem continuousWithinAt_iff [PseudoMetricSpace β] {f : α → β} {a : α} {s : Set α} : ContinuousWithinAt f s a ↔ ∀ ε > 0, ∃ δ > 0, ∀ {x : α}, x ∈ s → dist x a < δ → dist (f x) (f a) < ε := by rw [ContinuousWithinAt, tendsto_nhdsWithin_nhds] #align metric.continuous_within_at_iff Metric.continuousWithinAt_iff theorem continuousOn_iff [PseudoMetricSpace β] {f : α → β} {s : Set α} : ContinuousOn f s ↔ ∀ b ∈ s, ∀ ε > 0, ∃ δ > 0, ∀ a ∈ s, dist a b < δ → dist (f a) (f b) < ε := by simp [ContinuousOn, continuousWithinAt_iff] #align metric.continuous_on_iff Metric.continuousOn_iff theorem continuous_iff [PseudoMetricSpace β] {f : α → β} : Continuous f ↔ ∀ b, ∀ ε > 0, ∃ δ > 0, ∀ a, dist a b < δ → dist (f a) (f b) < ε := continuous_iff_continuousAt.trans <\| forall_congr' fun _ => tendsto_nhds_nhds #align metric.continuous_iff Metric.continuous_iff theorem tendsto_nhds {f : Filter β} {u : β → α} {a : α} : Tendsto u f (𝓝 a) ↔ ∀ ε > 0, ∀ᶠ x in f, dist (u x) a < ε := nhds_basis_ball.tendsto_right_iff #align metric.tendsto_nhds Metric.tendsto_nhds theorem continuousAt_iff' [TopologicalSpace β] {f : β → α} {b : β} : ContinuousAt f b ↔ ∀ ε > 0, ∀ᶠ x in 𝓝 b, dist (f x) (f b) < ε := by rw [ContinuousAt, tendsto_nhds] #align metric.continuous_at_iff' Metric.continuousAt_iff' theorem continuousWithinAt_iff' [TopologicalSpace β] {f : β → α} {b : β} {s : Set β} : ContinuousWithinAt f s b ↔ ∀ ε > 0, ∀ᶠ x in 𝓝[s] b, dist (f x) (f b) < ε := by rw [ContinuousWithinAt, tendsto_nhds] #align metric.continuous_within_at_iff' Metric.continuousWithinAt_iff' theorem continuousOn_iff' [TopologicalSpace β] {f : β → α} {s : Set β} : ContinuousOn f s ↔ ∀ b ∈ s, ∀ ε > 0, ∀ᶠ x in 𝓝[s] b, dist (f x) (f b) < ε := by simp [ContinuousOn, continuousWithinAt_iff'] #align metric.continuous_on_iff' Metric.continuousOn_iff' theorem continuous_iff' [TopologicalSpace β] {f : β → α} : Continuous f ↔ ∀ (a), ∀ ε > 0, ∀ᶠ x in 𝓝 a, dist (f x) (f a) < ε := continuous_iff_continuousAt.trans <\| forall_congr' fun _ => tendsto_nhds #align metric.continuous_iff' Metric.continuous_iff' theorem tendsto_atTop [Nonempty β] [SemilatticeSup β] {u : β → α} {a : α} : Tendsto u atTop (𝓝 a) ↔ ∀ ε > 0, ∃ N, ∀ n ≥ N, dist (u n) a < ε := (atTop_basis.tendsto_iff nhds_basis_ball).trans <\| by simp only [true_and, mem_ball, mem_Ici] #align metric.tendsto_at_top Metric.tendsto_atTop /-- A variant of `tendsto_atTop` that uses `∃ N, ∀ n > N, ...` rather than `∃ N, ∀ n ≥ N, ...` -/ theorem tendsto_atTop' [Nonempty β] [SemilatticeSup β] [NoMaxOrder β] {u : β → α} {a : α} : Tendsto u atTop (𝓝 a) ↔ ∀ ε > 0, ∃ N, ∀ n > N, dist (u n) a < ε := (atTop_basis_Ioi.tendsto_iff nhds_basis_ball).trans <\| by simp only [true_and, gt_iff_lt, mem_Ioi, mem_ball] #align metric.tendsto_at_top' Metric.tendsto_atTop' theorem isOpen_singleton_iff {α : Type} [PseudoMetricSpace α] {x : α} : IsOpen ({x} : Set α) ↔ ∃ ε > 0, ∀ y, dist y x < ε → y = x := by simp [isOpen_iff, subset_singleton_iff, mem_ball] #align metric.is_open_singleton_iff Metric.isOpen_singleton_iff /-- Given a point `x` in a discrete subset `s` of a pseudometric space, there is an open ball centered at `x` and intersecting `s` only at `x`. -/ theorem exists_ball_inter_eq_singleton_of_mem_discrete [DiscreteTopology s] {x : α} (hx : x ∈ s) : ∃ ε > 0, Metric.ball x ε ∩ s = {x} := nhds_basis_ball.exists_inter_eq_singleton_of_mem_discrete hx #align metric.exists_ball_inter_eq_singleton_of_mem_discrete Metric.exists_ball_inter_eq_singleton_of_mem_discrete /-- Given a point `x` in a discrete subset `s` of a pseudometric space, there is a closed ball of positive radius centered at `x` and intersecting `s` only at `x`. -/ theorem exists_closedBall_inter_eq_singleton_of_discrete [DiscreteTopology s] {x : α} (hx : x ∈ s) : ∃ ε > 0, Metric.closedBall x ε ∩ s = {x} := nhds_basis_closedBall.exists_inter_eq_singleton_of_mem_discrete hx #align metric.exists_closed_ball_inter_eq_singleton_of_discrete Metric.exists_closedBall_inter_eq_singleton_of_discrete theorem _root_.Dense.exists_dist_lt {s : Set α} (hs : Dense s) (x : α) {ε : ℝ} (hε : 0 < ε) : ∃ y ∈ s, dist x y < ε := by have : (ball x ε).Nonempty := by simp [hε] simpa only [mem_ball'] using hs.exists_mem_open isOpen_ball this #align dense.exists_dist_lt Dense.exists_dist_lt nonrec theorem _root_.DenseRange.exists_dist_lt {β : Type*} {f : β → α} (hf : DenseRange f) (x : α) {ε : ℝ} (hε : 0 < ε) : ∃ y, dist x (f y) < ε := exists_range_iff.1 (hf.exists_dist_lt x hε) #align dense_range.exists_dist_lt DenseRange.exists_dist_lt end Metric open Metric /- Instantiate a pseudometric space as a pseudoemetric space. Before we can state the instance, we need to show that the uniform structure coming from the edistance and the distance coincide. -/ -- Porting note (#10756): new theorem theorem Metric.uniformity_edist_aux {α} (d : α → α → ℝ≥0) : ⨅ ε > (0 : ℝ), 𝓟 { p : α × α \| ↑(d p.1 p.2) < ε } = ⨅ ε > (0 : ℝ≥0∞), 𝓟 { p : α × α \| ↑(d p.1 p.2) < ε } := by simp only [le_antisymm_iff, le_iInf_iff, le_principal_iff] refine ⟨fun ε hε => ?_, fun ε hε => ?_⟩ · rcases ENNReal.lt_iff_exists_nnreal_btwn.1 hε with ⟨ε', ε'0, ε'ε⟩ refine mem_iInf_of_mem (ε' : ℝ) (mem_iInf_of_mem (ENNReal.coe_pos.1 ε'0) ?_) exact fun x hx => lt_trans (ENNReal.coe_lt_coe.2 hx) ε'ε · lift ε to ℝ≥0 using le_of_lt hε refine mem_iInf_of_mem (ε : ℝ≥0∞) (mem_iInf_of_mem (ENNReal.coe_pos.2 hε) ?_) exact fun _ => ENNReal.coe_lt_coe.1 theorem Metric.uniformity_edist : 𝓤 α = ⨅ ε > 0, 𝓟 { p : α × α \| edist p.1 p.2 < ε } := by simp only [PseudoMetricSpace.uniformity_dist, dist_nndist, edist_nndist, Metric.uniformity_edist_aux] #align metric.uniformity_edist Metric.uniformity_edist -- see Note [lower instance priority] /-- A pseudometric space induces a pseudoemetric space -/ instance (priority := 100) PseudoMetricSpace.toPseudoEMetricSpace : PseudoEMetricSpace α := { ‹PseudoMetricSpace α› with edist_self := by simp [edist_dist] edist_comm := fun _ _ => by simp only [edist_dist, dist_comm] edist_triangle := fun x y z => by simp only [edist_dist, ← ENNReal.ofReal_add, dist_nonneg] rw [ENNReal.ofReal_le_ofReal_iff _] · exact dist_triangle _ _ _ · simpa using add_le_add (dist_nonneg : 0 ≤ dist x y) dist_nonneg uniformity_edist := Metric.uniformity_edist } #align pseudo_metric_space.to_pseudo_emetric_space PseudoMetricSpace.toPseudoEMetricSpace /-- Expressing the uniformity in terms of `edist` -/ @[deprecated _root_.uniformity_basis_edist] protected theorem Metric.uniformity_basis_edist : (𝓤 α).HasBasis (fun ε : ℝ≥0∞ => 0 < ε) fun ε => { p \| edist p.1 p.2 < ε } := uniformity_basis_edist #align pseudo_metric.uniformity_basis_edist Metric.uniformity_basis_edist /-- In a pseudometric space, an open ball of infinite radius is the whole space -/ theorem Metric.eball_top_eq_univ (x : α) : EMetric.ball x ∞ = Set.univ := Set.eq_univ_iff_forall.mpr fun y => edist_lt_top y x #align metric.eball_top_eq_univ Metric.eball_top_eq_univ /-- Balls defined using the distance or the edistance coincide -/ @[simp] theorem Metric.emetric_ball {x : α} {ε : ℝ} : EMetric.ball x (ENNReal.ofReal ε) = ball x ε := by ext y simp only [EMetric.mem_ball, mem_ball, edist_dist] exact ENNReal.ofReal_lt_ofReal_iff_of_nonneg dist_nonneg #align metric.emetric_ball Metric.emetric_ball /-- Balls defined using the distance or the edistance coincide -/ @[simp] theorem Metric.emetric_ball_nnreal {x : α} {ε : ℝ≥0} : EMetric.ball x ε = ball x ε := by rw [← Metric.emetric_ball] simp #align metric.emetric_ball_nnreal Metric.emetric_ball_nnreal /-- Closed balls defined using the distance or the edistance coincide -/ theorem Metric.emetric_closedBall {x : α} {ε : ℝ} (h : 0 ≤ ε) : EMetric.closedBall x (ENNReal.ofReal ε) = closedBall x ε := by ext y; simp [edist_le_ofReal h] #align metric.emetric_closed_ball Metric.emetric_closedBall /-- Closed balls defined using the distance or the edistance coincide -/ @[simp] theorem Metric.emetric_closedBall_nnreal {x : α} {ε : ℝ≥0} : EMetric.closedBall x ε = closedBall x ε := by rw [← Metric.emetric_closedBall ε.coe_nonneg, ENNReal.ofReal_coe_nnreal] #align metric.emetric_closed_ball_nnreal Metric.emetric_closedBall_nnreal @[simp] theorem Metric.emetric_ball_top (x : α) : EMetric.ball x ⊤ = univ := eq_univ_of_forall fun _ => edist_lt_top _ _ #align metric.emetric_ball_top Metric.emetric_ball_top	Mathlib/Topology/MetricSpace/PseudoMetric.lean	1,235	1,236	theorem Metric.inseparable_iff {x y : α} : Inseparable x y ↔ dist x y = 0 := by	rw [EMetric.inseparable_iff, edist_nndist, dist_nndist, ENNReal.coe_eq_zero, NNReal.coe_eq_zero]
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Floris van Doorn, Violeta Hernández Palacios -/ import Mathlib.SetTheory.Cardinal.Ordinal import Mathlib.SetTheory.Ordinal.FixedPoint #align_import set_theory.cardinal.cofinality from "leanprover-community/mathlib"@"7c2ce0c2da15516b4e65d0c9e254bb6dc93abd1f" /-! # Cofinality This file contains the definition of cofinality of an ordinal number and regular cardinals ## Main Definitions * `Ordinal.cof o` is the cofinality of the ordinal `o`. If `o` is the order type of the relation `<` on `α`, then `o.cof` is the smallest cardinality of a subset `s` of α that is cofinal in `α`, i.e. `∀ x : α, ∃ y ∈ s, ¬ y < x`. * `Cardinal.IsStrongLimit c` means that `c` is a strong limit cardinal: `c ≠ 0 ∧ ∀ x < c, 2 ^ x < c`. * `Cardinal.IsRegular c` means that `c` is a regular cardinal: `ℵ₀ ≤ c ∧ c.ord.cof = c`. * `Cardinal.IsInaccessible c` means that `c` is strongly inaccessible: `ℵ₀ < c ∧ IsRegular c ∧ IsStrongLimit c`. ## Main Statements * `Ordinal.infinite_pigeonhole_card`: the infinite pigeonhole principle * `Cardinal.lt_power_cof`: A consequence of König's theorem stating that `c < c ^ c.ord.cof` for `c ≥ ℵ₀` * `Cardinal.univ_inaccessible`: The type of ordinals in `Type u` form an inaccessible cardinal (in `Type v` with `v > u`). This shows (externally) that in `Type u` there are at least `u` inaccessible cardinals. ## Implementation Notes * The cofinality is defined for ordinals. If `c` is a cardinal number, its cofinality is `c.ord.cof`. ## Tags cofinality, regular cardinals, limits cardinals, inaccessible cardinals, infinite pigeonhole principle -/ noncomputable section open Function Cardinal Set Order open scoped Classical open Cardinal Ordinal universe u v w variable {α : Type} {r : α → α → Prop} /-! ### Cofinality of orders -/ namespace Order /-- Cofinality of a reflexive order `≼`. This is the smallest cardinality of a subset `S : Set α` such that `∀ a, ∃ b ∈ S, a ≼ b`. -/ def cof (r : α → α → Prop) : Cardinal := sInf { c \| ∃ S : Set α, (∀ a, ∃ b ∈ S, r a b) ∧ #S = c } #align order.cof Order.cof /-- The set in the definition of `Order.cof` is nonempty. -/ theorem cof_nonempty (r : α → α → Prop) [IsRefl α r] : { c \| ∃ S : Set α, (∀ a, ∃ b ∈ S, r a b) ∧ #S = c }.Nonempty := ⟨_, Set.univ, fun a => ⟨a, ⟨⟩, refl _⟩, rfl⟩ #align order.cof_nonempty Order.cof_nonempty theorem cof_le (r : α → α → Prop) {S : Set α} (h : ∀ a, ∃ b ∈ S, r a b) : cof r ≤ #S := csInf_le' ⟨S, h, rfl⟩ #align order.cof_le Order.cof_le theorem le_cof {r : α → α → Prop} [IsRefl α r] (c : Cardinal) : c ≤ cof r ↔ ∀ {S : Set α}, (∀ a, ∃ b ∈ S, r a b) → c ≤ #S := by rw [cof, le_csInf_iff'' (cof_nonempty r)] use fun H S h => H _ ⟨S, h, rfl⟩ rintro H d ⟨S, h, rfl⟩ exact H h #align order.le_cof Order.le_cof end Order theorem RelIso.cof_le_lift {α : Type u} {β : Type v} {r : α → α → Prop} {s} [IsRefl β s] (f : r ≃r s) : Cardinal.lift.{max u v} (Order.cof r) ≤ Cardinal.lift.{max u v} (Order.cof s) := by rw [Order.cof, Order.cof, lift_sInf, lift_sInf, le_csInf_iff'' ((Order.cof_nonempty s).image _)] rintro - ⟨-, ⟨u, H, rfl⟩, rfl⟩ apply csInf_le' refine ⟨_, ⟨f.symm '' u, fun a => ?_, rfl⟩, lift_mk_eq.{u, v, max u v}.2 ⟨(f.symm.toEquiv.image u).symm⟩⟩ rcases H (f a) with ⟨b, hb, hb'⟩ refine ⟨f.symm b, mem_image_of_mem _ hb, f.map_rel_iff.1 ?_⟩ rwa [RelIso.apply_symm_apply] #align rel_iso.cof_le_lift RelIso.cof_le_lift theorem RelIso.cof_eq_lift {α : Type u} {β : Type v} {r s} [IsRefl α r] [IsRefl β s] (f : r ≃r s) : Cardinal.lift.{max u v} (Order.cof r) = Cardinal.lift.{max u v} (Order.cof s) := (RelIso.cof_le_lift f).antisymm (RelIso.cof_le_lift f.symm) #align rel_iso.cof_eq_lift RelIso.cof_eq_lift theorem RelIso.cof_le {α β : Type u} {r : α → α → Prop} {s} [IsRefl β s] (f : r ≃r s) : Order.cof r ≤ Order.cof s := lift_le.1 (RelIso.cof_le_lift f) #align rel_iso.cof_le RelIso.cof_le theorem RelIso.cof_eq {α β : Type u} {r s} [IsRefl α r] [IsRefl β s] (f : r ≃r s) : Order.cof r = Order.cof s := lift_inj.1 (RelIso.cof_eq_lift f) #align rel_iso.cof_eq RelIso.cof_eq /-- Cofinality of a strict order `≺`. This is the smallest cardinality of a set `S : Set α` such that `∀ a, ∃ b ∈ S, ¬ b ≺ a`. -/ def StrictOrder.cof (r : α → α → Prop) : Cardinal := Order.cof (swap rᶜ) #align strict_order.cof StrictOrder.cof /-- The set in the definition of `Order.StrictOrder.cof` is nonempty. -/ theorem StrictOrder.cof_nonempty (r : α → α → Prop) [IsIrrefl α r] : { c \| ∃ S : Set α, Unbounded r S ∧ #S = c }.Nonempty := @Order.cof_nonempty α _ (IsRefl.swap rᶜ) #align strict_order.cof_nonempty StrictOrder.cof_nonempty /-! ### Cofinality of ordinals -/ namespace Ordinal /-- Cofinality of an ordinal. This is the smallest cardinal of a subset `S` of the ordinal which is unbounded, in the sense `∀ a, ∃ b ∈ S, a ≤ b`. It is defined for all ordinals, but `cof 0 = 0` and `cof (succ o) = 1`, so it is only really interesting on limit ordinals (when it is an infinite cardinal). -/ def cof (o : Ordinal.{u}) : Cardinal.{u} := o.liftOn (fun a => StrictOrder.cof a.r) (by rintro ⟨α, r, wo₁⟩ ⟨β, s, wo₂⟩ ⟨⟨f, hf⟩⟩ haveI := wo₁; haveI := wo₂ dsimp only apply @RelIso.cof_eq _ _ _ _ ?_ ?_ · constructor exact @fun a b => not_iff_not.2 hf · dsimp only [swap] exact ⟨fun _ => irrefl _⟩ · dsimp only [swap] exact ⟨fun _ => irrefl _⟩) #align ordinal.cof Ordinal.cof theorem cof_type (r : α → α → Prop) [IsWellOrder α r] : (type r).cof = StrictOrder.cof r := rfl #align ordinal.cof_type Ordinal.cof_type theorem le_cof_type [IsWellOrder α r] {c} : c ≤ cof (type r) ↔ ∀ S, Unbounded r S → c ≤ #S := (le_csInf_iff'' (StrictOrder.cof_nonempty r)).trans ⟨fun H S h => H _ ⟨S, h, rfl⟩, by rintro H d ⟨S, h, rfl⟩ exact H _ h⟩ #align ordinal.le_cof_type Ordinal.le_cof_type theorem cof_type_le [IsWellOrder α r] {S : Set α} (h : Unbounded r S) : cof (type r) ≤ #S := le_cof_type.1 le_rfl S h #align ordinal.cof_type_le Ordinal.cof_type_le theorem lt_cof_type [IsWellOrder α r] {S : Set α} : #S < cof (type r) → Bounded r S := by simpa using not_imp_not.2 cof_type_le #align ordinal.lt_cof_type Ordinal.lt_cof_type theorem cof_eq (r : α → α → Prop) [IsWellOrder α r] : ∃ S, Unbounded r S ∧ #S = cof (type r) := csInf_mem (StrictOrder.cof_nonempty r) #align ordinal.cof_eq Ordinal.cof_eq theorem ord_cof_eq (r : α → α → Prop) [IsWellOrder α r] : ∃ S, Unbounded r S ∧ type (Subrel r S) = (cof (type r)).ord := by let ⟨S, hS, e⟩ := cof_eq r let ⟨s, _, e'⟩ := Cardinal.ord_eq S let T : Set α := { a \| ∃ aS : a ∈ S, ∀ b : S, s b ⟨_, aS⟩ → r b a } suffices Unbounded r T by refine ⟨T, this, le_antisymm ?_ (Cardinal.ord_le.2 <\| cof_type_le this)⟩ rw [← e, e'] refine (RelEmbedding.ofMonotone (fun a : T => (⟨a, let ⟨aS, _⟩ := a.2 aS⟩ : S)) fun a b h => ?_).ordinal_type_le rcases a with ⟨a, aS, ha⟩ rcases b with ⟨b, bS, hb⟩ change s ⟨a, _⟩ ⟨b, _⟩ refine ((trichotomous_of s _ _).resolve_left fun hn => ?_).resolve_left ?_ · exact asymm h (ha _ hn) · intro e injection e with e subst b exact irrefl _ h intro a have : { b : S \| ¬r b a }.Nonempty := let ⟨b, bS, ba⟩ := hS a ⟨⟨b, bS⟩, ba⟩ let b := (IsWellFounded.wf : WellFounded s).min _ this have ba : ¬r b a := IsWellFounded.wf.min_mem _ this refine ⟨b, ⟨b.2, fun c => not_imp_not.1 fun h => ?_⟩, ba⟩ rw [show ∀ b : S, (⟨b, b.2⟩ : S) = b by intro b; cases b; rfl] exact IsWellFounded.wf.not_lt_min _ this (IsOrderConnected.neg_trans h ba) #align ordinal.ord_cof_eq Ordinal.ord_cof_eq /-! ### Cofinality of suprema and least strict upper bounds -/ private theorem card_mem_cof {o} : ∃ (ι : _) (f : ι → Ordinal), lsub.{u, u} f = o ∧ #ι = o.card := ⟨_, _, lsub_typein o, mk_ordinal_out o⟩ /-- The set in the `lsub` characterization of `cof` is nonempty. -/ theorem cof_lsub_def_nonempty (o) : { a : Cardinal \| ∃ (ι : _) (f : ι → Ordinal), lsub.{u, u} f = o ∧ #ι = a }.Nonempty := ⟨_, card_mem_cof⟩ #align ordinal.cof_lsub_def_nonempty Ordinal.cof_lsub_def_nonempty theorem cof_eq_sInf_lsub (o : Ordinal.{u}) : cof o = sInf { a : Cardinal \| ∃ (ι : Type u) (f : ι → Ordinal), lsub.{u, u} f = o ∧ #ι = a } := by refine le_antisymm (le_csInf (cof_lsub_def_nonempty o) ?_) (csInf_le' ?_) · rintro a ⟨ι, f, hf, rfl⟩ rw [← type_lt o] refine (cof_type_le fun a => ?_).trans (@mk_le_of_injective _ _ (fun s : typein ((· < ·) : o.out.α → o.out.α → Prop) ⁻¹' Set.range f => Classical.choose s.prop) fun s t hst => by let H := congr_arg f hst rwa [Classical.choose_spec s.prop, Classical.choose_spec t.prop, typein_inj, Subtype.coe_inj] at H) have := typein_lt_self a simp_rw [← hf, lt_lsub_iff] at this cases' this with i hi refine ⟨enum (· < ·) (f i) ?_, ?_, ?_⟩ · rw [type_lt, ← hf] apply lt_lsub · rw [mem_preimage, typein_enum] exact mem_range_self i · rwa [← typein_le_typein, typein_enum] · rcases cof_eq (· < · : (Quotient.out o).α → (Quotient.out o).α → Prop) with ⟨S, hS, hS'⟩ let f : S → Ordinal := fun s => typein LT.lt s.val refine ⟨S, f, le_antisymm (lsub_le fun i => typein_lt_self (o := o) i) (le_of_forall_lt fun a ha => ?_), by rwa [type_lt o] at hS'⟩ rw [← type_lt o] at ha rcases hS (enum (· < ·) a ha) with ⟨b, hb, hb'⟩ rw [← typein_le_typein, typein_enum] at hb' exact hb'.trans_lt (lt_lsub.{u, u} f ⟨b, hb⟩) #align ordinal.cof_eq_Inf_lsub Ordinal.cof_eq_sInf_lsub @[simp] theorem lift_cof (o) : Cardinal.lift.{u, v} (cof o) = cof (Ordinal.lift.{u, v} o) := by refine inductionOn o ?_ intro α r _ apply le_antisymm · refine le_cof_type.2 fun S H => ?_ have : Cardinal.lift.{u, v} #(ULift.up ⁻¹' S) ≤ #(S : Type (max u v)) := by rw [← Cardinal.lift_umax.{v, u}, ← Cardinal.lift_id'.{v, u} #S] exact mk_preimage_of_injective_lift.{v, max u v} ULift.up S (ULift.up_injective.{u, v}) refine (Cardinal.lift_le.2 <\| cof_type_le ?_).trans this exact fun a => let ⟨⟨b⟩, bs, br⟩ := H ⟨a⟩ ⟨b, bs, br⟩ · rcases cof_eq r with ⟨S, H, e'⟩ have : #(ULift.down.{u, v} ⁻¹' S) ≤ Cardinal.lift.{u, v} #S := ⟨⟨fun ⟨⟨x⟩, h⟩ => ⟨⟨x, h⟩⟩, fun ⟨⟨x⟩, h₁⟩ ⟨⟨y⟩, h₂⟩ e => by simp at e; congr⟩⟩ rw [e'] at this refine (cof_type_le ?_).trans this exact fun ⟨a⟩ => let ⟨b, bs, br⟩ := H a ⟨⟨b⟩, bs, br⟩ #align ordinal.lift_cof Ordinal.lift_cof theorem cof_le_card (o) : cof o ≤ card o := by rw [cof_eq_sInf_lsub] exact csInf_le' card_mem_cof #align ordinal.cof_le_card Ordinal.cof_le_card theorem cof_ord_le (c : Cardinal) : c.ord.cof ≤ c := by simpa using cof_le_card c.ord #align ordinal.cof_ord_le Ordinal.cof_ord_le theorem ord_cof_le (o : Ordinal.{u}) : o.cof.ord ≤ o := (ord_le_ord.2 (cof_le_card o)).trans (ord_card_le o) #align ordinal.ord_cof_le Ordinal.ord_cof_le theorem exists_lsub_cof (o : Ordinal) : ∃ (ι : _) (f : ι → Ordinal), lsub.{u, u} f = o ∧ #ι = cof o := by rw [cof_eq_sInf_lsub] exact csInf_mem (cof_lsub_def_nonempty o) #align ordinal.exists_lsub_cof Ordinal.exists_lsub_cof theorem cof_lsub_le {ι} (f : ι → Ordinal) : cof (lsub.{u, u} f) ≤ #ι := by rw [cof_eq_sInf_lsub] exact csInf_le' ⟨ι, f, rfl, rfl⟩ #align ordinal.cof_lsub_le Ordinal.cof_lsub_le theorem cof_lsub_le_lift {ι} (f : ι → Ordinal) : cof (lsub.{u, v} f) ≤ Cardinal.lift.{v, u} #ι := by rw [← mk_uLift.{u, v}] convert cof_lsub_le.{max u v} fun i : ULift.{v, u} ι => f i.down exact lsub_eq_of_range_eq.{u, max u v, max u v} (Set.ext fun x => ⟨fun ⟨i, hi⟩ => ⟨ULift.up.{v, u} i, hi⟩, fun ⟨i, hi⟩ => ⟨_, hi⟩⟩) #align ordinal.cof_lsub_le_lift Ordinal.cof_lsub_le_lift theorem le_cof_iff_lsub {o : Ordinal} {a : Cardinal} : a ≤ cof o ↔ ∀ {ι} (f : ι → Ordinal), lsub.{u, u} f = o → a ≤ #ι := by rw [cof_eq_sInf_lsub] exact (le_csInf_iff'' (cof_lsub_def_nonempty o)).trans ⟨fun H ι f hf => H _ ⟨ι, f, hf, rfl⟩, fun H b ⟨ι, f, hf, hb⟩ => by rw [← hb] exact H _ hf⟩ #align ordinal.le_cof_iff_lsub Ordinal.le_cof_iff_lsub theorem lsub_lt_ord_lift {ι} {f : ι → Ordinal} {c : Ordinal} (hι : Cardinal.lift.{v, u} #ι < c.cof) (hf : ∀ i, f i < c) : lsub.{u, v} f < c := lt_of_le_of_ne (lsub_le.{v, u} hf) fun h => by subst h exact (cof_lsub_le_lift.{u, v} f).not_lt hι #align ordinal.lsub_lt_ord_lift Ordinal.lsub_lt_ord_lift theorem lsub_lt_ord {ι} {f : ι → Ordinal} {c : Ordinal} (hι : #ι < c.cof) : (∀ i, f i < c) → lsub.{u, u} f < c := lsub_lt_ord_lift (by rwa [(#ι).lift_id]) #align ordinal.lsub_lt_ord Ordinal.lsub_lt_ord theorem cof_sup_le_lift {ι} {f : ι → Ordinal} (H : ∀ i, f i < sup.{u, v} f) : cof (sup.{u, v} f) ≤ Cardinal.lift.{v, u} #ι := by rw [← sup_eq_lsub_iff_lt_sup.{u, v}] at H rw [H] exact cof_lsub_le_lift f #align ordinal.cof_sup_le_lift Ordinal.cof_sup_le_lift theorem cof_sup_le {ι} {f : ι → Ordinal} (H : ∀ i, f i < sup.{u, u} f) : cof (sup.{u, u} f) ≤ #ι := by rw [← (#ι).lift_id] exact cof_sup_le_lift H #align ordinal.cof_sup_le Ordinal.cof_sup_le theorem sup_lt_ord_lift {ι} {f : ι → Ordinal} {c : Ordinal} (hι : Cardinal.lift.{v, u} #ι < c.cof) (hf : ∀ i, f i < c) : sup.{u, v} f < c := (sup_le_lsub.{u, v} f).trans_lt (lsub_lt_ord_lift hι hf) #align ordinal.sup_lt_ord_lift Ordinal.sup_lt_ord_lift theorem sup_lt_ord {ι} {f : ι → Ordinal} {c : Ordinal} (hι : #ι < c.cof) : (∀ i, f i < c) → sup.{u, u} f < c := sup_lt_ord_lift (by rwa [(#ι).lift_id]) #align ordinal.sup_lt_ord Ordinal.sup_lt_ord theorem iSup_lt_lift {ι} {f : ι → Cardinal} {c : Cardinal} (hι : Cardinal.lift.{v, u} #ι < c.ord.cof) (hf : ∀ i, f i < c) : iSup.{max u v + 1, u + 1} f < c := by rw [← ord_lt_ord, iSup_ord (Cardinal.bddAbove_range.{u, v} _)] refine sup_lt_ord_lift hι fun i => ?_ rw [ord_lt_ord] apply hf #align ordinal.supr_lt_lift Ordinal.iSup_lt_lift theorem iSup_lt {ι} {f : ι → Cardinal} {c : Cardinal} (hι : #ι < c.ord.cof) : (∀ i, f i < c) → iSup f < c := iSup_lt_lift (by rwa [(#ι).lift_id]) #align ordinal.supr_lt Ordinal.iSup_lt theorem nfpFamily_lt_ord_lift {ι} {f : ι → Ordinal → Ordinal} {c} (hc : ℵ₀ < cof c) (hc' : Cardinal.lift.{v, u} #ι < cof c) (hf : ∀ (i), ∀ b < c, f i b < c) {a} (ha : a < c) : nfpFamily.{u, v} f a < c := by refine sup_lt_ord_lift ((Cardinal.lift_le.2 (mk_list_le_max ι)).trans_lt ?_) fun l => ?_ · rw [lift_max] apply max_lt _ hc' rwa [Cardinal.lift_aleph0] · induction' l with i l H · exact ha · exact hf _ _ H #align ordinal.nfp_family_lt_ord_lift Ordinal.nfpFamily_lt_ord_lift theorem nfpFamily_lt_ord {ι} {f : ι → Ordinal → Ordinal} {c} (hc : ℵ₀ < cof c) (hc' : #ι < cof c) (hf : ∀ (i), ∀ b < c, f i b < c) {a} : a < c → nfpFamily.{u, u} f a < c := nfpFamily_lt_ord_lift hc (by rwa [(#ι).lift_id]) hf #align ordinal.nfp_family_lt_ord Ordinal.nfpFamily_lt_ord theorem nfpBFamily_lt_ord_lift {o : Ordinal} {f : ∀ a < o, Ordinal → Ordinal} {c} (hc : ℵ₀ < cof c) (hc' : Cardinal.lift.{v, u} o.card < cof c) (hf : ∀ (i hi), ∀ b < c, f i hi b < c) {a} : a < c → nfpBFamily.{u, v} o f a < c := nfpFamily_lt_ord_lift hc (by rwa [mk_ordinal_out]) fun i => hf _ _ #align ordinal.nfp_bfamily_lt_ord_lift Ordinal.nfpBFamily_lt_ord_lift theorem nfpBFamily_lt_ord {o : Ordinal} {f : ∀ a < o, Ordinal → Ordinal} {c} (hc : ℵ₀ < cof c) (hc' : o.card < cof c) (hf : ∀ (i hi), ∀ b < c, f i hi b < c) {a} : a < c → nfpBFamily.{u, u} o f a < c := nfpBFamily_lt_ord_lift hc (by rwa [o.card.lift_id]) hf #align ordinal.nfp_bfamily_lt_ord Ordinal.nfpBFamily_lt_ord theorem nfp_lt_ord {f : Ordinal → Ordinal} {c} (hc : ℵ₀ < cof c) (hf : ∀ i < c, f i < c) {a} : a < c → nfp f a < c := nfpFamily_lt_ord_lift hc (by simpa using Cardinal.one_lt_aleph0.trans hc) fun _ => hf #align ordinal.nfp_lt_ord Ordinal.nfp_lt_ord theorem exists_blsub_cof (o : Ordinal) : ∃ f : ∀ a < (cof o).ord, Ordinal, blsub.{u, u} _ f = o := by rcases exists_lsub_cof o with ⟨ι, f, hf, hι⟩ rcases Cardinal.ord_eq ι with ⟨r, hr, hι'⟩ rw [← @blsub_eq_lsub' ι r hr] at hf rw [← hι, hι'] exact ⟨_, hf⟩ #align ordinal.exists_blsub_cof Ordinal.exists_blsub_cof theorem le_cof_iff_blsub {b : Ordinal} {a : Cardinal} : a ≤ cof b ↔ ∀ {o} (f : ∀ a < o, Ordinal), blsub.{u, u} o f = b → a ≤ o.card := le_cof_iff_lsub.trans ⟨fun H o f hf => by simpa using H _ hf, fun H ι f hf => by rcases Cardinal.ord_eq ι with ⟨r, hr, hι'⟩ rw [← @blsub_eq_lsub' ι r hr] at hf simpa using H _ hf⟩ #align ordinal.le_cof_iff_blsub Ordinal.le_cof_iff_blsub theorem cof_blsub_le_lift {o} (f : ∀ a < o, Ordinal) : cof (blsub.{u, v} o f) ≤ Cardinal.lift.{v, u} o.card := by rw [← mk_ordinal_out o] exact cof_lsub_le_lift _ #align ordinal.cof_blsub_le_lift Ordinal.cof_blsub_le_lift theorem cof_blsub_le {o} (f : ∀ a < o, Ordinal) : cof (blsub.{u, u} o f) ≤ o.card := by rw [← o.card.lift_id] exact cof_blsub_le_lift f #align ordinal.cof_blsub_le Ordinal.cof_blsub_le theorem blsub_lt_ord_lift {o : Ordinal.{u}} {f : ∀ a < o, Ordinal} {c : Ordinal} (ho : Cardinal.lift.{v, u} o.card < c.cof) (hf : ∀ i hi, f i hi < c) : blsub.{u, v} o f < c := lt_of_le_of_ne (blsub_le hf) fun h => ho.not_le (by simpa [← iSup_ord, hf, h] using cof_blsub_le_lift.{u, v} f) #align ordinal.blsub_lt_ord_lift Ordinal.blsub_lt_ord_lift theorem blsub_lt_ord {o : Ordinal} {f : ∀ a < o, Ordinal} {c : Ordinal} (ho : o.card < c.cof) (hf : ∀ i hi, f i hi < c) : blsub.{u, u} o f < c := blsub_lt_ord_lift (by rwa [o.card.lift_id]) hf #align ordinal.blsub_lt_ord Ordinal.blsub_lt_ord theorem cof_bsup_le_lift {o : Ordinal} {f : ∀ a < o, Ordinal} (H : ∀ i h, f i h < bsup.{u, v} o f) : cof (bsup.{u, v} o f) ≤ Cardinal.lift.{v, u} o.card := by rw [← bsup_eq_blsub_iff_lt_bsup.{u, v}] at H rw [H] exact cof_blsub_le_lift.{u, v} f #align ordinal.cof_bsup_le_lift Ordinal.cof_bsup_le_lift theorem cof_bsup_le {o : Ordinal} {f : ∀ a < o, Ordinal} : (∀ i h, f i h < bsup.{u, u} o f) → cof (bsup.{u, u} o f) ≤ o.card := by rw [← o.card.lift_id] exact cof_bsup_le_lift #align ordinal.cof_bsup_le Ordinal.cof_bsup_le theorem bsup_lt_ord_lift {o : Ordinal} {f : ∀ a < o, Ordinal} {c : Ordinal} (ho : Cardinal.lift.{v, u} o.card < c.cof) (hf : ∀ i hi, f i hi < c) : bsup.{u, v} o f < c := (bsup_le_blsub f).trans_lt (blsub_lt_ord_lift ho hf) #align ordinal.bsup_lt_ord_lift Ordinal.bsup_lt_ord_lift theorem bsup_lt_ord {o : Ordinal} {f : ∀ a < o, Ordinal} {c : Ordinal} (ho : o.card < c.cof) : (∀ i hi, f i hi < c) → bsup.{u, u} o f < c := bsup_lt_ord_lift (by rwa [o.card.lift_id]) #align ordinal.bsup_lt_ord Ordinal.bsup_lt_ord /-! ### Basic results -/ @[simp] theorem cof_zero : cof 0 = 0 := by refine LE.le.antisymm ?_ (Cardinal.zero_le _) rw [← card_zero] exact cof_le_card 0 #align ordinal.cof_zero Ordinal.cof_zero @[simp] theorem cof_eq_zero {o} : cof o = 0 ↔ o = 0 := ⟨inductionOn o fun α r _ z => let ⟨S, hl, e⟩ := cof_eq r type_eq_zero_iff_isEmpty.2 <\| ⟨fun a => let ⟨b, h, _⟩ := hl a (mk_eq_zero_iff.1 (e.trans z)).elim' ⟨_, h⟩⟩, fun e => by simp [e]⟩ #align ordinal.cof_eq_zero Ordinal.cof_eq_zero theorem cof_ne_zero {o} : cof o ≠ 0 ↔ o ≠ 0 := cof_eq_zero.not #align ordinal.cof_ne_zero Ordinal.cof_ne_zero @[simp] theorem cof_succ (o) : cof (succ o) = 1 := by apply le_antisymm · refine inductionOn o fun α r _ => ?_ change cof (type _) ≤ _ rw [← (_ : #_ = 1)] · apply cof_type_le refine fun a => ⟨Sum.inr PUnit.unit, Set.mem_singleton _, ?_⟩ rcases a with (a \| ⟨⟨⟨⟩⟩⟩) <;> simp [EmptyRelation] · rw [Cardinal.mk_fintype, Set.card_singleton] simp · rw [← Cardinal.succ_zero, succ_le_iff] simpa [lt_iff_le_and_ne, Cardinal.zero_le] using fun h => succ_ne_zero o (cof_eq_zero.1 (Eq.symm h)) #align ordinal.cof_succ Ordinal.cof_succ @[simp] theorem cof_eq_one_iff_is_succ {o} : cof.{u} o = 1 ↔ ∃ a, o = succ a := ⟨inductionOn o fun α r _ z => by rcases cof_eq r with ⟨S, hl, e⟩; rw [z] at e cases' mk_ne_zero_iff.1 (by rw [e]; exact one_ne_zero) with a refine ⟨typein r a, Eq.symm <\| Quotient.sound ⟨RelIso.ofSurjective (RelEmbedding.ofMonotone ?_ fun x y => ?_) fun x => ?_⟩⟩ · apply Sum.rec <;> [exact Subtype.val; exact fun _ => a] · rcases x with (x \| ⟨⟨⟨⟩⟩⟩) <;> rcases y with (y \| ⟨⟨⟨⟩⟩⟩) <;> simp [Subrel, Order.Preimage, EmptyRelation] exact x.2 · suffices r x a ∨ ∃ _ : PUnit.{u}, ↑a = x by convert this dsimp [RelEmbedding.ofMonotone]; simp rcases trichotomous_of r x a with (h \| h \| h) · exact Or.inl h · exact Or.inr ⟨PUnit.unit, h.symm⟩ · rcases hl x with ⟨a', aS, hn⟩ rw [(_ : ↑a = a')] at h · exact absurd h hn refine congr_arg Subtype.val (?_ : a = ⟨a', aS⟩) haveI := le_one_iff_subsingleton.1 (le_of_eq e) apply Subsingleton.elim, fun ⟨a, e⟩ => by simp [e]⟩ #align ordinal.cof_eq_one_iff_is_succ Ordinal.cof_eq_one_iff_is_succ /-- A fundamental sequence for `a` is an increasing sequence of length `o = cof a` that converges at `a`. We provide `o` explicitly in order to avoid type rewrites. -/ def IsFundamentalSequence (a o : Ordinal.{u}) (f : ∀ b < o, Ordinal.{u}) : Prop := o ≤ a.cof.ord ∧ (∀ {i j} (hi hj), i < j → f i hi < f j hj) ∧ blsub.{u, u} o f = a #align ordinal.is_fundamental_sequence Ordinal.IsFundamentalSequence namespace IsFundamentalSequence variable {a o : Ordinal.{u}} {f : ∀ b < o, Ordinal.{u}} protected theorem cof_eq (hf : IsFundamentalSequence a o f) : a.cof.ord = o := hf.1.antisymm' <\| by rw [← hf.2.2] exact (ord_le_ord.2 (cof_blsub_le f)).trans (ord_card_le o) #align ordinal.is_fundamental_sequence.cof_eq Ordinal.IsFundamentalSequence.cof_eq protected theorem strict_mono (hf : IsFundamentalSequence a o f) {i j} : ∀ hi hj, i < j → f i hi < f j hj := hf.2.1 #align ordinal.is_fundamental_sequence.strict_mono Ordinal.IsFundamentalSequence.strict_mono theorem blsub_eq (hf : IsFundamentalSequence a o f) : blsub.{u, u} o f = a := hf.2.2 #align ordinal.is_fundamental_sequence.blsub_eq Ordinal.IsFundamentalSequence.blsub_eq theorem ord_cof (hf : IsFundamentalSequence a o f) : IsFundamentalSequence a a.cof.ord fun i hi => f i (hi.trans_le (by rw [hf.cof_eq])) := by have H := hf.cof_eq subst H exact hf #align ordinal.is_fundamental_sequence.ord_cof Ordinal.IsFundamentalSequence.ord_cof theorem id_of_le_cof (h : o ≤ o.cof.ord) : IsFundamentalSequence o o fun a _ => a := ⟨h, @fun _ _ _ _ => id, blsub_id o⟩ #align ordinal.is_fundamental_sequence.id_of_le_cof Ordinal.IsFundamentalSequence.id_of_le_cof protected theorem zero {f : ∀ b < (0 : Ordinal), Ordinal} : IsFundamentalSequence 0 0 f := ⟨by rw [cof_zero, ord_zero], @fun i j hi => (Ordinal.not_lt_zero i hi).elim, blsub_zero f⟩ #align ordinal.is_fundamental_sequence.zero Ordinal.IsFundamentalSequence.zero protected theorem succ : IsFundamentalSequence (succ o) 1 fun _ _ => o := by refine ⟨?_, @fun i j hi hj h => ?_, blsub_const Ordinal.one_ne_zero o⟩ · rw [cof_succ, ord_one] · rw [lt_one_iff_zero] at hi hj rw [hi, hj] at h exact h.false.elim #align ordinal.is_fundamental_sequence.succ Ordinal.IsFundamentalSequence.succ protected theorem monotone (hf : IsFundamentalSequence a o f) {i j : Ordinal} (hi : i < o) (hj : j < o) (hij : i ≤ j) : f i hi ≤ f j hj := by rcases lt_or_eq_of_le hij with (hij \| rfl) · exact (hf.2.1 hi hj hij).le · rfl #align ordinal.is_fundamental_sequence.monotone Ordinal.IsFundamentalSequence.monotone theorem trans {a o o' : Ordinal.{u}} {f : ∀ b < o, Ordinal.{u}} (hf : IsFundamentalSequence a o f) {g : ∀ b < o', Ordinal.{u}} (hg : IsFundamentalSequence o o' g) : IsFundamentalSequence a o' fun i hi => f (g i hi) (by rw [← hg.2.2]; apply lt_blsub) := by refine ⟨?_, @fun i j _ _ h => hf.2.1 _ _ (hg.2.1 _ _ h), ?_⟩ · rw [hf.cof_eq] exact hg.1.trans (ord_cof_le o) · rw [@blsub_comp.{u, u, u} o _ f (@IsFundamentalSequence.monotone _ _ f hf)] · exact hf.2.2 · exact hg.2.2 #align ordinal.is_fundamental_sequence.trans Ordinal.IsFundamentalSequence.trans end IsFundamentalSequence /-- Every ordinal has a fundamental sequence. -/ theorem exists_fundamental_sequence (a : Ordinal.{u}) : ∃ f, IsFundamentalSequence a a.cof.ord f := by suffices h : ∃ o f, IsFundamentalSequence a o f by rcases h with ⟨o, f, hf⟩ exact ⟨_, hf.ord_cof⟩ rcases exists_lsub_cof a with ⟨ι, f, hf, hι⟩ rcases ord_eq ι with ⟨r, wo, hr⟩ haveI := wo let r' := Subrel r { i \| ∀ j, r j i → f j < f i } let hrr' : r' ↪r r := Subrel.relEmbedding _ _ haveI := hrr'.isWellOrder refine ⟨_, _, hrr'.ordinal_type_le.trans ?_, @fun i j _ h _ => (enum r' j h).prop _ ?_, le_antisymm (blsub_le fun i hi => lsub_le_iff.1 hf.le _) ?_⟩ · rw [← hι, hr] · change r (hrr'.1 _) (hrr'.1 _) rwa [hrr'.2, @enum_lt_enum _ r'] · rw [← hf, lsub_le_iff] intro i suffices h : ∃ i' hi', f i ≤ bfamilyOfFamily' r' (fun i => f i) i' hi' by rcases h with ⟨i', hi', hfg⟩ exact hfg.trans_lt (lt_blsub _ _ _) by_cases h : ∀ j, r j i → f j < f i · refine ⟨typein r' ⟨i, h⟩, typein_lt_type _ _, ?_⟩ rw [bfamilyOfFamily'_typein] · push_neg at h cases' wo.wf.min_mem _ h with hji hij refine ⟨typein r' ⟨_, fun k hkj => lt_of_lt_of_le ?_ hij⟩, typein_lt_type _ _, ?_⟩ · by_contra! H exact (wo.wf.not_lt_min _ h ⟨IsTrans.trans _ _ _ hkj hji, H⟩) hkj · rwa [bfamilyOfFamily'_typein] #align ordinal.exists_fundamental_sequence Ordinal.exists_fundamental_sequence @[simp] theorem cof_cof (a : Ordinal.{u}) : cof (cof a).ord = cof a := by cases' exists_fundamental_sequence a with f hf cases' exists_fundamental_sequence a.cof.ord with g hg exact ord_injective (hf.trans hg).cof_eq.symm #align ordinal.cof_cof Ordinal.cof_cof protected theorem IsNormal.isFundamentalSequence {f : Ordinal.{u} → Ordinal.{u}} (hf : IsNormal f) {a o} (ha : IsLimit a) {g} (hg : IsFundamentalSequence a o g) : IsFundamentalSequence (f a) o fun b hb => f (g b hb) := by refine ⟨?_, @fun i j _ _ h => hf.strictMono (hg.2.1 _ _ h), ?_⟩ · rcases exists_lsub_cof (f a) with ⟨ι, f', hf', hι⟩ rw [← hg.cof_eq, ord_le_ord, ← hι] suffices (lsub.{u, u} fun i => sInf { b : Ordinal \| f' i ≤ f b }) = a by rw [← this] apply cof_lsub_le have H : ∀ i, ∃ b < a, f' i ≤ f b := fun i => by have := lt_lsub.{u, u} f' i rw [hf', ← IsNormal.blsub_eq.{u, u} hf ha, lt_blsub_iff] at this simpa using this refine (lsub_le fun i => ?_).antisymm (le_of_forall_lt fun b hb => ?_) · rcases H i with ⟨b, hb, hb'⟩ exact lt_of_le_of_lt (csInf_le' hb') hb · have := hf.strictMono hb rw [← hf', lt_lsub_iff] at this cases' this with i hi rcases H i with ⟨b, _, hb⟩ exact ((le_csInf_iff'' ⟨b, by exact hb⟩).2 fun c hc => hf.strictMono.le_iff_le.1 (hi.trans hc)).trans_lt (lt_lsub _ i) · rw [@blsub_comp.{u, u, u} a _ (fun b _ => f b) (@fun i j _ _ h => hf.strictMono.monotone h) g hg.2.2] exact IsNormal.blsub_eq.{u, u} hf ha #align ordinal.is_normal.is_fundamental_sequence Ordinal.IsNormal.isFundamentalSequence theorem IsNormal.cof_eq {f} (hf : IsNormal f) {a} (ha : IsLimit a) : cof (f a) = cof a := let ⟨_, hg⟩ := exists_fundamental_sequence a ord_injective (hf.isFundamentalSequence ha hg).cof_eq #align ordinal.is_normal.cof_eq Ordinal.IsNormal.cof_eq theorem IsNormal.cof_le {f} (hf : IsNormal f) (a) : cof a ≤ cof (f a) := by rcases zero_or_succ_or_limit a with (rfl \| ⟨b, rfl⟩ \| ha) · rw [cof_zero] exact zero_le _ · rw [cof_succ, Cardinal.one_le_iff_ne_zero, cof_ne_zero, ← Ordinal.pos_iff_ne_zero] exact (Ordinal.zero_le (f b)).trans_lt (hf.1 b) · rw [hf.cof_eq ha] #align ordinal.is_normal.cof_le Ordinal.IsNormal.cof_le @[simp] theorem cof_add (a b : Ordinal) : b ≠ 0 → cof (a + b) = cof b := fun h => by rcases zero_or_succ_or_limit b with (rfl \| ⟨c, rfl⟩ \| hb) · contradiction · rw [add_succ, cof_succ, cof_succ] · exact (add_isNormal a).cof_eq hb #align ordinal.cof_add Ordinal.cof_add theorem aleph0_le_cof {o} : ℵ₀ ≤ cof o ↔ IsLimit o := by rcases zero_or_succ_or_limit o with (rfl \| ⟨o, rfl⟩ \| l) · simp [not_zero_isLimit, Cardinal.aleph0_ne_zero] · simp [not_succ_isLimit, Cardinal.one_lt_aleph0] · simp [l] refine le_of_not_lt fun h => ?_ cases' Cardinal.lt_aleph0.1 h with n e have := cof_cof o rw [e, ord_nat] at this cases n · simp at e simp [e, not_zero_isLimit] at l · rw [natCast_succ, cof_succ] at this rw [← this, cof_eq_one_iff_is_succ] at e rcases e with ⟨a, rfl⟩ exact not_succ_isLimit _ l #align ordinal.aleph_0_le_cof Ordinal.aleph0_le_cof @[simp] theorem aleph'_cof {o : Ordinal} (ho : o.IsLimit) : (aleph' o).ord.cof = o.cof := aleph'_isNormal.cof_eq ho #align ordinal.aleph'_cof Ordinal.aleph'_cof @[simp] theorem aleph_cof {o : Ordinal} (ho : o.IsLimit) : (aleph o).ord.cof = o.cof := aleph_isNormal.cof_eq ho #align ordinal.aleph_cof Ordinal.aleph_cof @[simp] theorem cof_omega : cof ω = ℵ₀ := (aleph0_le_cof.2 omega_isLimit).antisymm' <\| by rw [← card_omega] apply cof_le_card #align ordinal.cof_omega Ordinal.cof_omega theorem cof_eq' (r : α → α → Prop) [IsWellOrder α r] (h : IsLimit (type r)) : ∃ S : Set α, (∀ a, ∃ b ∈ S, r a b) ∧ #S = cof (type r) := let ⟨S, H, e⟩ := cof_eq r ⟨S, fun a => let a' := enum r _ (h.2 _ (typein_lt_type r a)) let ⟨b, h, ab⟩ := H a' ⟨b, h, (IsOrderConnected.conn a b a' <\| (typein_lt_typein r).1 (by rw [typein_enum] exact lt_succ (typein _ _))).resolve_right ab⟩, e⟩ #align ordinal.cof_eq' Ordinal.cof_eq' @[simp] theorem cof_univ : cof univ.{u, v} = Cardinal.univ.{u, v} := le_antisymm (cof_le_card _) (by refine le_of_forall_lt fun c h => ?_ rcases lt_univ'.1 h with ⟨c, rfl⟩ rcases @cof_eq Ordinal.{u} (· < ·) _ with ⟨S, H, Se⟩ rw [univ, ← lift_cof, ← Cardinal.lift_lift.{u+1, v, u}, Cardinal.lift_lt, ← Se] refine lt_of_not_ge fun h => ?_ cases' Cardinal.lift_down h with a e refine Quotient.inductionOn a (fun α e => ?_) e cases' Quotient.exact e with f have f := Equiv.ulift.symm.trans f let g a := (f a).1 let o := succ (sup.{u, u} g) rcases H o with ⟨b, h, l⟩ refine l (lt_succ_iff.2 ?_) rw [← show g (f.symm ⟨b, h⟩) = b by simp [g]] apply le_sup) #align ordinal.cof_univ Ordinal.cof_univ /-! ### Infinite pigeonhole principle -/ /-- If the union of s is unbounded and s is smaller than the cofinality, then s has an unbounded member -/ theorem unbounded_of_unbounded_sUnion (r : α → α → Prop) [wo : IsWellOrder α r] {s : Set (Set α)} (h₁ : Unbounded r <\| ⋃₀ s) (h₂ : #s < StrictOrder.cof r) : ∃ x ∈ s, Unbounded r x := by by_contra! h simp_rw [not_unbounded_iff] at h let f : s → α := fun x : s => wo.wf.sup x (h x.1 x.2) refine h₂.not_le (le_trans (csInf_le' ⟨range f, fun x => ?_, rfl⟩) mk_range_le) rcases h₁ x with ⟨y, ⟨c, hc, hy⟩, hxy⟩ exact ⟨f ⟨c, hc⟩, mem_range_self _, fun hxz => hxy (Trans.trans (wo.wf.lt_sup _ hy) hxz)⟩ #align ordinal.unbounded_of_unbounded_sUnion Ordinal.unbounded_of_unbounded_sUnion /-- If the union of s is unbounded and s is smaller than the cofinality, then s has an unbounded member -/ theorem unbounded_of_unbounded_iUnion {α β : Type u} (r : α → α → Prop) [wo : IsWellOrder α r] (s : β → Set α) (h₁ : Unbounded r <\| ⋃ x, s x) (h₂ : #β < StrictOrder.cof r) : ∃ x : β, Unbounded r (s x) := by rw [← sUnion_range] at h₁ rcases unbounded_of_unbounded_sUnion r h₁ (mk_range_le.trans_lt h₂) with ⟨_, ⟨x, rfl⟩, u⟩ exact ⟨x, u⟩ #align ordinal.unbounded_of_unbounded_Union Ordinal.unbounded_of_unbounded_iUnion /-- The infinite pigeonhole principle -/ theorem infinite_pigeonhole {β α : Type u} (f : β → α) (h₁ : ℵ₀ ≤ #β) (h₂ : #α < (#β).ord.cof) : ∃ a : α, #(f ⁻¹' {a}) = #β := by have : ∃ a, #β ≤ #(f ⁻¹' {a}) := by by_contra! h apply mk_univ.not_lt rw [← preimage_univ, ← iUnion_of_singleton, preimage_iUnion] exact mk_iUnion_le_sum_mk.trans_lt ((sum_le_iSup _).trans_lt <\| mul_lt_of_lt h₁ (h₂.trans_le <\| cof_ord_le _) (iSup_lt h₂ h)) cases' this with x h refine ⟨x, h.antisymm' ?_⟩ rw [le_mk_iff_exists_set] exact ⟨_, rfl⟩ #align ordinal.infinite_pigeonhole Ordinal.infinite_pigeonhole /-- Pigeonhole principle for a cardinality below the cardinality of the domain -/ theorem infinite_pigeonhole_card {β α : Type u} (f : β → α) (θ : Cardinal) (hθ : θ ≤ #β) (h₁ : ℵ₀ ≤ θ) (h₂ : #α < θ.ord.cof) : ∃ a : α, θ ≤ #(f ⁻¹' {a}) := by rcases le_mk_iff_exists_set.1 hθ with ⟨s, rfl⟩ cases' infinite_pigeonhole (f ∘ Subtype.val : s → α) h₁ h₂ with a ha use a; rw [← ha, @preimage_comp _ _ _ Subtype.val f] exact mk_preimage_of_injective _ _ Subtype.val_injective #align ordinal.infinite_pigeonhole_card Ordinal.infinite_pigeonhole_card theorem infinite_pigeonhole_set {β α : Type u} {s : Set β} (f : s → α) (θ : Cardinal) (hθ : θ ≤ #s) (h₁ : ℵ₀ ≤ θ) (h₂ : #α < θ.ord.cof) : ∃ (a : α) (t : Set β) (h : t ⊆ s), θ ≤ #t ∧ ∀ ⦃x⦄ (hx : x ∈ t), f ⟨x, h hx⟩ = a := by cases' infinite_pigeonhole_card f θ hθ h₁ h₂ with a ha refine ⟨a, { x \| ∃ h, f ⟨x, h⟩ = a }, ?_, ?_, ?_⟩ · rintro x ⟨hx, _⟩ exact hx · refine ha.trans (ge_of_eq <\| Quotient.sound ⟨Equiv.trans ?_ (Equiv.subtypeSubtypeEquivSubtypeExists _ _).symm⟩) simp only [coe_eq_subtype, mem_singleton_iff, mem_preimage, mem_setOf_eq] rfl rintro x ⟨_, hx'⟩; exact hx' #align ordinal.infinite_pigeonhole_set Ordinal.infinite_pigeonhole_set end Ordinal /-! ### Regular and inaccessible cardinals -/ namespace Cardinal open Ordinal /-- A cardinal is a strong limit if it is not zero and it is closed under powersets. Note that `ℵ₀` is a strong limit by this definition. -/ def IsStrongLimit (c : Cardinal) : Prop := c ≠ 0 ∧ ∀ x < c, (2^x) < c #align cardinal.is_strong_limit Cardinal.IsStrongLimit theorem IsStrongLimit.ne_zero {c} (h : IsStrongLimit c) : c ≠ 0 := h.1 #align cardinal.is_strong_limit.ne_zero Cardinal.IsStrongLimit.ne_zero theorem IsStrongLimit.two_power_lt {x c} (h : IsStrongLimit c) : x < c → (2^x) < c := h.2 x #align cardinal.is_strong_limit.two_power_lt Cardinal.IsStrongLimit.two_power_lt theorem isStrongLimit_aleph0 : IsStrongLimit ℵ₀ := ⟨aleph0_ne_zero, fun x hx => by rcases lt_aleph0.1 hx with ⟨n, rfl⟩ exact mod_cast nat_lt_aleph0 (2 ^ n)⟩ #align cardinal.is_strong_limit_aleph_0 Cardinal.isStrongLimit_aleph0 protected theorem IsStrongLimit.isSuccLimit {c} (H : IsStrongLimit c) : IsSuccLimit c := isSuccLimit_of_succ_lt fun x h => (succ_le_of_lt <\| cantor x).trans_lt (H.two_power_lt h) #align cardinal.is_strong_limit.is_succ_limit Cardinal.IsStrongLimit.isSuccLimit theorem IsStrongLimit.isLimit {c} (H : IsStrongLimit c) : IsLimit c := ⟨H.ne_zero, H.isSuccLimit⟩ #align cardinal.is_strong_limit.is_limit Cardinal.IsStrongLimit.isLimit theorem isStrongLimit_beth {o : Ordinal} (H : IsSuccLimit o) : IsStrongLimit (beth o) := by rcases eq_or_ne o 0 with (rfl \| h) · rw [beth_zero] exact isStrongLimit_aleph0 · refine ⟨beth_ne_zero o, fun a ha => ?_⟩ rw [beth_limit ⟨h, isSuccLimit_iff_succ_lt.1 H⟩] at ha rcases exists_lt_of_lt_ciSup' ha with ⟨⟨i, hi⟩, ha⟩ have := power_le_power_left two_ne_zero ha.le rw [← beth_succ] at this exact this.trans_lt (beth_lt.2 (H.succ_lt hi)) #align cardinal.is_strong_limit_beth Cardinal.isStrongLimit_beth theorem mk_bounded_subset {α : Type} (h : ∀ x < #α, (2^x) < #α) {r : α → α → Prop} [IsWellOrder α r] (hr : (#α).ord = type r) : #{ s : Set α // Bounded r s } = #α := by rcases eq_or_ne #α 0 with (ha \| ha) · rw [ha] haveI := mk_eq_zero_iff.1 ha rw [mk_eq_zero_iff] constructor rintro ⟨s, hs⟩ exact (not_unbounded_iff s).2 hs (unbounded_of_isEmpty s) have h' : IsStrongLimit #α := ⟨ha, h⟩ have ha := h'.isLimit.aleph0_le apply le_antisymm · have : { s : Set α \| Bounded r s } = ⋃ i, 𝒫{ j \| r j i } := setOf_exists _ rw [← coe_setOf, this] refine mk_iUnion_le_sum_mk.trans ((sum_le_iSup (fun i => #(𝒫{ j \| r j i }))).trans ((mul_le_max_of_aleph0_le_left ha).trans ?_)) rw [max_eq_left] apply ciSup_le' _ intro i rw [mk_powerset] apply (h'.two_power_lt _).le rw [coe_setOf, card_typein, ← lt_ord, hr] apply typein_lt_type · refine @mk_le_of_injective α _ (fun x => Subtype.mk {x} ?_) ?_ · apply bounded_singleton rw [← hr] apply ord_isLimit ha · intro a b hab simpa [singleton_eq_singleton_iff] using hab #align cardinal.mk_bounded_subset Cardinal.mk_bounded_subset theorem mk_subset_mk_lt_cof {α : Type*} (h : ∀ x < #α, (2^x) < #α) : #{ s : Set α // #s < cof (#α).ord } = #α := by rcases eq_or_ne #α 0 with (ha \| ha) · simp [ha] have h' : IsStrongLimit #α := ⟨ha, h⟩ rcases ord_eq α with ⟨r, wo, hr⟩ haveI := wo apply le_antisymm · conv_rhs => rw [← mk_bounded_subset h hr] apply mk_le_mk_of_subset intro s hs rw [hr] at hs exact lt_cof_type hs · refine @mk_le_of_injective α _ (fun x => Subtype.mk {x} ?_) ?_ · rw [mk_singleton] exact one_lt_aleph0.trans_le (aleph0_le_cof.2 (ord_isLimit h'.isLimit.aleph0_le)) · intro a b hab simpa [singleton_eq_singleton_iff] using hab #align cardinal.mk_subset_mk_lt_cof Cardinal.mk_subset_mk_lt_cof /-- A cardinal is regular if it is infinite and it equals its own cofinality. -/ def IsRegular (c : Cardinal) : Prop := ℵ₀ ≤ c ∧ c ≤ c.ord.cof #align cardinal.is_regular Cardinal.IsRegular theorem IsRegular.aleph0_le {c : Cardinal} (H : c.IsRegular) : ℵ₀ ≤ c := H.1 #align cardinal.is_regular.aleph_0_le Cardinal.IsRegular.aleph0_le theorem IsRegular.cof_eq {c : Cardinal} (H : c.IsRegular) : c.ord.cof = c := (cof_ord_le c).antisymm H.2 #align cardinal.is_regular.cof_eq Cardinal.IsRegular.cof_eq theorem IsRegular.pos {c : Cardinal} (H : c.IsRegular) : 0 < c := aleph0_pos.trans_le H.1 #align cardinal.is_regular.pos Cardinal.IsRegular.pos theorem IsRegular.nat_lt {c : Cardinal} (H : c.IsRegular) (n : ℕ) : n < c := lt_of_lt_of_le (nat_lt_aleph0 n) H.aleph0_le	Mathlib/SetTheory/Cardinal/Cofinality.lean	962	964	theorem IsRegular.ord_pos {c : Cardinal} (H : c.IsRegular) : 0 < c.ord := by	rw [Cardinal.lt_ord, card_zero] exact H.pos
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Yury Kudryashov -/ import Mathlib.Topology.GDelta import Mathlib.MeasureTheory.Group.Arithmetic import Mathlib.Topology.Instances.EReal import Mathlib.Analysis.Normed.Group.Basic #align_import measure_theory.constructions.borel_space.basic from "leanprover-community/mathlib"@"9f55d0d4363ae59948c33864cbc52e0b12e0e8ce" /-! # Borel (measurable) space ## Main definitions * `borel α` : the least `σ`-algebra that contains all open sets; * `class BorelSpace` : a space with `TopologicalSpace` and `MeasurableSpace` structures such that `‹MeasurableSpace α› = borel α`; * `class OpensMeasurableSpace` : a space with `TopologicalSpace` and `MeasurableSpace` structures such that all open sets are measurable; equivalently, `borel α ≤ ‹MeasurableSpace α›`. * `BorelSpace` instances on `Empty`, `Unit`, `Bool`, `Nat`, `Int`, `Rat`; * `MeasurableSpace` and `BorelSpace` instances on `ℝ`, `ℝ≥0`, `ℝ≥0∞`. ## Main statements * `IsOpen.measurableSet`, `IsClosed.measurableSet`: open and closed sets are measurable; * `Continuous.measurable` : a continuous function is measurable; * `Continuous.measurable2` : if `f : α → β` and `g : α → γ` are measurable and `op : β × γ → δ` is continuous, then `fun x => op (f x, g y)` is measurable; * `Measurable.add` etc : dot notation for arithmetic operations on `Measurable` predicates, and similarly for `dist` and `edist`; * `AEMeasurable.add` : similar dot notation for almost everywhere measurable functions; -/ noncomputable section open Set Filter MeasureTheory open scoped Classical Topology NNReal ENNReal MeasureTheory universe u v w x y variable {α β γ γ₂ δ : Type} {ι : Sort y} {s t u : Set α} open MeasurableSpace TopologicalSpace /-- `MeasurableSpace` structure generated by `TopologicalSpace`. -/ def borel (α : Type u) [TopologicalSpace α] : MeasurableSpace α := generateFrom { s : Set α \| IsOpen s } #align borel borel theorem borel_anti : Antitone (@borel α) := fun _ _ h => MeasurableSpace.generateFrom_le fun _ hs => .basic _ (h _ hs) #align borel_anti borel_anti theorem borel_eq_top_of_discrete [TopologicalSpace α] [DiscreteTopology α] : borel α = ⊤ := top_le_iff.1 fun s _ => GenerateMeasurable.basic s (isOpen_discrete s) #align borel_eq_top_of_discrete borel_eq_top_of_discrete theorem borel_eq_top_of_countable [TopologicalSpace α] [T1Space α] [Countable α] : borel α = ⊤ := by refine top_le_iff.1 fun s _ => biUnion_of_singleton s ▸ ?_ apply MeasurableSet.biUnion s.to_countable intro x _ apply MeasurableSet.of_compl apply GenerateMeasurable.basic exact isClosed_singleton.isOpen_compl #align borel_eq_top_of_countable borel_eq_top_of_countable theorem borel_eq_generateFrom_of_subbasis {s : Set (Set α)} [t : TopologicalSpace α] [SecondCountableTopology α] (hs : t = .generateFrom s) : borel α = .generateFrom s := le_antisymm (generateFrom_le fun u (hu : t.IsOpen u) => by rw [hs] at hu induction hu with \| basic u hu => exact GenerateMeasurable.basic u hu \| univ => exact @MeasurableSet.univ α (generateFrom s) \| inter s₁ s₂ _ _ hs₁ hs₂ => exact @MeasurableSet.inter α (generateFrom s) _ _ hs₁ hs₂ \| sUnion f hf ih => rcases isOpen_sUnion_countable f (by rwa [hs]) with ⟨v, hv, vf, vu⟩ rw [← vu] exact @MeasurableSet.sUnion α (generateFrom s) _ hv fun x xv => ih _ (vf xv)) (generateFrom_le fun u hu => GenerateMeasurable.basic _ <\| show t.IsOpen u by rw [hs]; exact GenerateOpen.basic _ hu) #align borel_eq_generate_from_of_subbasis borel_eq_generateFrom_of_subbasis theorem TopologicalSpace.IsTopologicalBasis.borel_eq_generateFrom [TopologicalSpace α] [SecondCountableTopology α] {s : Set (Set α)} (hs : IsTopologicalBasis s) : borel α = .generateFrom s := borel_eq_generateFrom_of_subbasis hs.eq_generateFrom #align topological_space.is_topological_basis.borel_eq_generate_from TopologicalSpace.IsTopologicalBasis.borel_eq_generateFrom theorem isPiSystem_isOpen [TopologicalSpace α] : IsPiSystem ({s : Set α \| IsOpen s}) := fun _s hs _t ht _ => IsOpen.inter hs ht #align is_pi_system_is_open isPiSystem_isOpen lemma isPiSystem_isClosed [TopologicalSpace α] : IsPiSystem ({s : Set α \| IsClosed s}) := fun _s hs _t ht _ ↦ IsClosed.inter hs ht theorem borel_eq_generateFrom_isClosed [TopologicalSpace α] : borel α = .generateFrom { s \| IsClosed s } := le_antisymm (generateFrom_le fun _t ht => @MeasurableSet.of_compl α _ (generateFrom { s \| IsClosed s }) (GenerateMeasurable.basic _ <\| isClosed_compl_iff.2 ht)) (generateFrom_le fun _t ht => @MeasurableSet.of_compl α _ (borel α) (GenerateMeasurable.basic _ <\| isOpen_compl_iff.2 ht)) #align borel_eq_generate_from_is_closed borel_eq_generateFrom_isClosed theorem borel_comap {f : α → β} {t : TopologicalSpace β} : @borel α (t.induced f) = (@borel β t).comap f := comap_generateFrom.symm #align borel_comap borel_comap theorem Continuous.borel_measurable [TopologicalSpace α] [TopologicalSpace β] {f : α → β} (hf : Continuous f) : @Measurable α β (borel α) (borel β) f := Measurable.of_le_map <\| generateFrom_le fun s hs => GenerateMeasurable.basic (f ⁻¹' s) (hs.preimage hf) #align continuous.borel_measurable Continuous.borel_measurable /-- A space with `MeasurableSpace` and `TopologicalSpace` structures such that all open sets are measurable. -/ class OpensMeasurableSpace (α : Type) [TopologicalSpace α] [h : MeasurableSpace α] : Prop where /-- Borel-measurable sets are measurable. -/ borel_le : borel α ≤ h #align opens_measurable_space OpensMeasurableSpace #align opens_measurable_space.borel_le OpensMeasurableSpace.borel_le /-- A space with `MeasurableSpace` and `TopologicalSpace` structures such that the `σ`-algebra of measurable sets is exactly the `σ`-algebra generated by open sets. -/ class BorelSpace (α : Type) [TopologicalSpace α] [MeasurableSpace α] : Prop where /-- The measurable sets are exactly the Borel-measurable sets. -/ measurable_eq : ‹MeasurableSpace α› = borel α #align borel_space BorelSpace #align borel_space.measurable_eq BorelSpace.measurable_eq namespace Mathlib.Tactic.Borelize open Lean Elab Term Tactic Meta /-- The behaviour of `borelize α` depends on the existing assumptions on `α`. - if `α` is a topological space with instances `[MeasurableSpace α] [BorelSpace α]`, then `borelize α` replaces the former instance by `borel α`; - otherwise, `borelize α` adds instances `borel α : MeasurableSpace α` and `⟨rfl⟩ : BorelSpace α`. Finally, `borelize α β γ` runs `borelize α; borelize β; borelize γ`. -/ syntax "borelize" (ppSpace colGt term:max) : tactic /-- Add instances `borel e : MeasurableSpace e` and `⟨rfl⟩ : BorelSpace e`. -/ def addBorelInstance (e : Expr) : TacticM Unit := do let t ← Lean.Elab.Term.exprToSyntax e evalTactic <\| ← `(tactic\| refine_lift letI : MeasurableSpace $t := borel $t haveI : BorelSpace $t := ⟨rfl⟩ ?_) /-- Given a type `e`, an assumption `i : MeasurableSpace e`, and an instance `[BorelSpace e]`, replace `i` with `borel e`. -/ def borelToRefl (e : Expr) (i : FVarId) : TacticM Unit := do let te ← Lean.Elab.Term.exprToSyntax e evalTactic <\| ← `(tactic\| have := @BorelSpace.measurable_eq $te _ _ _) try liftMetaTactic fun m => return [← subst m i] catch _ => let et ← synthInstance (← mkAppOptM ``TopologicalSpace #[e]) throwError m!"\ `‹TopologicalSpace {e}› := {et}\n\ depends on\n\ {Expr.fvar i} : MeasurableSpace {e}`\n\ so `borelize` isn't avaliable" evalTactic <\| ← `(tactic\| refine_lift letI : MeasurableSpace $te := borel $te ?_) /-- Given a type `$t`, if there is an assumption `[i : MeasurableSpace $t]`, then try to prove `[BorelSpace $t]` and replace `i` with `borel $t`. Otherwise, add instances `borel $t : MeasurableSpace $t` and `⟨rfl⟩ : BorelSpace $t`. -/ def borelize (t : Term) : TacticM Unit := withMainContext <\| do let u ← mkFreshLevelMVar let e ← withoutRecover <\| Tactic.elabTermEnsuringType t (mkSort (mkLevelSucc u)) let i? ← findLocalDeclWithType? (← mkAppOptM ``MeasurableSpace #[e]) i?.elim (addBorelInstance e) (borelToRefl e) elab_rules : tactic \| `(tactic\| borelize $[$t:term]) => t.forM borelize end Mathlib.Tactic.Borelize instance (priority := 100) OrderDual.opensMeasurableSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [h : OpensMeasurableSpace α] : OpensMeasurableSpace αᵒᵈ where borel_le := h.borel_le #align order_dual.opens_measurable_space OrderDual.opensMeasurableSpace instance (priority := 100) OrderDual.borelSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [h : BorelSpace α] : BorelSpace αᵒᵈ where measurable_eq := h.measurable_eq #align order_dual.borel_space OrderDual.borelSpace /-- In a `BorelSpace` all open sets are measurable. -/ instance (priority := 100) BorelSpace.opensMeasurable {α : Type} [TopologicalSpace α] [MeasurableSpace α] [BorelSpace α] : OpensMeasurableSpace α := ⟨ge_of_eq <\| BorelSpace.measurable_eq⟩ #align borel_space.opens_measurable BorelSpace.opensMeasurable instance Subtype.borelSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [hα : BorelSpace α] (s : Set α) : BorelSpace s := ⟨by borelize α; symm; apply borel_comap⟩ #align subtype.borel_space Subtype.borelSpace instance Countable.instBorelSpace [Countable α] [MeasurableSpace α] [MeasurableSingletonClass α] [TopologicalSpace α] [DiscreteTopology α] : BorelSpace α := by have : ∀ s, @MeasurableSet α inferInstance s := fun s ↦ s.to_countable.measurableSet have : ∀ s, @MeasurableSet α (borel α) s := fun s ↦ measurableSet_generateFrom (isOpen_discrete s) exact ⟨by aesop⟩ instance Subtype.opensMeasurableSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [h : OpensMeasurableSpace α] (s : Set α) : OpensMeasurableSpace s := ⟨by rw [borel_comap] exact comap_mono h.1⟩ #align subtype.opens_measurable_space Subtype.opensMeasurableSpace lemma opensMeasurableSpace_iff_forall_measurableSet [TopologicalSpace α] [MeasurableSpace α] : OpensMeasurableSpace α ↔ (∀ (s : Set α), IsOpen s → MeasurableSet s) := by refine ⟨fun h s hs ↦ ?_, fun h ↦ ⟨generateFrom_le h⟩⟩ exact OpensMeasurableSpace.borel_le _ <\| GenerateMeasurable.basic _ hs instance (priority := 100) BorelSpace.countablyGenerated {α : Type} [TopologicalSpace α] [MeasurableSpace α] [BorelSpace α] [SecondCountableTopology α] : CountablyGenerated α := by obtain ⟨b, bct, -, hb⟩ := exists_countable_basis α refine ⟨⟨b, bct, ?_⟩⟩ borelize α exact hb.borel_eq_generateFrom #align borel_space.countably_generated BorelSpace.countablyGenerated theorem MeasurableSet.induction_on_open [TopologicalSpace α] [MeasurableSpace α] [BorelSpace α] {C : Set α → Prop} (h_open : ∀ U, IsOpen U → C U) (h_compl : ∀ t, MeasurableSet t → C t → C tᶜ) (h_union : ∀ f : ℕ → Set α, Pairwise (Disjoint on f) → (∀ i, MeasurableSet (f i)) → (∀ i, C (f i)) → C (⋃ i, f i)) : ∀ ⦃t⦄, MeasurableSet t → C t := MeasurableSpace.induction_on_inter BorelSpace.measurable_eq isPiSystem_isOpen (h_open _ isOpen_empty) h_open h_compl h_union #align measurable_set.induction_on_open MeasurableSet.induction_on_open section variable [TopologicalSpace α] [MeasurableSpace α] [OpensMeasurableSpace α] [TopologicalSpace β] [MeasurableSpace β] [OpensMeasurableSpace β] [TopologicalSpace γ] [MeasurableSpace γ] [BorelSpace γ] [TopologicalSpace γ₂] [MeasurableSpace γ₂] [BorelSpace γ₂] [MeasurableSpace δ] theorem IsOpen.measurableSet (h : IsOpen s) : MeasurableSet s := OpensMeasurableSpace.borel_le _ <\| GenerateMeasurable.basic _ h #align is_open.measurable_set IsOpen.measurableSet instance (priority := 1000) {s : Set α} [h : HasCountableSeparatingOn α IsOpen s] : CountablySeparated s := by rw [CountablySeparated.subtype_iff] exact .mono (fun _ ↦ IsOpen.measurableSet) Subset.rfl @[measurability] theorem measurableSet_interior : MeasurableSet (interior s) := isOpen_interior.measurableSet #align measurable_set_interior measurableSet_interior theorem IsGδ.measurableSet (h : IsGδ s) : MeasurableSet s := by rcases h with ⟨S, hSo, hSc, rfl⟩ exact MeasurableSet.sInter hSc fun t ht => (hSo t ht).measurableSet set_option linter.uppercaseLean3 false in #align is_Gδ.measurable_set IsGδ.measurableSet theorem measurableSet_of_continuousAt {β} [EMetricSpace β] (f : α → β) : MeasurableSet { x \| ContinuousAt f x } := (IsGδ.setOf_continuousAt f).measurableSet #align measurable_set_of_continuous_at measurableSet_of_continuousAt theorem IsClosed.measurableSet (h : IsClosed s) : MeasurableSet s := h.isOpen_compl.measurableSet.of_compl #align is_closed.measurable_set IsClosed.measurableSet theorem IsCompact.measurableSet [T2Space α] (h : IsCompact s) : MeasurableSet s := h.isClosed.measurableSet #align is_compact.measurable_set IsCompact.measurableSet /-- If two points are topologically inseparable, then they can't be separated by a Borel measurable set. -/ theorem Inseparable.mem_measurableSet_iff {x y : γ} (h : Inseparable x y) {s : Set γ} (hs : MeasurableSet s) : x ∈ s ↔ y ∈ s := hs.induction_on_open (C := fun s ↦ (x ∈ s ↔ y ∈ s)) (fun _ ↦ h.mem_open_iff) (fun s _ hs ↦ hs.not) fun _ _ _ h ↦ by simp [h] /-- If `K` is a compact set in an R₁ space and `s ⊇ K` is a Borel measurable superset, then `s` includes the closure of `K` as well. -/ theorem IsCompact.closure_subset_measurableSet [R1Space γ] {K s : Set γ} (hK : IsCompact K) (hs : MeasurableSet s) (hKs : K ⊆ s) : closure K ⊆ s := by rw [hK.closure_eq_biUnion_inseparable, iUnion₂_subset_iff] exact fun x hx y hy ↦ (hy.mem_measurableSet_iff hs).1 (hKs hx) /-- In an R₁ topological space with Borel measure `μ`, the measure of the closure of a compact set `K` is equal to the measure of `K`. See also `MeasureTheory.Measure.OuterRegular.measure_closure_eq_of_isCompact` for a version that assumes `μ` to be outer regular but does not assume the `σ`-algebra to be Borel. -/ theorem IsCompact.measure_closure [R1Space γ] {K : Set γ} (hK : IsCompact K) (μ : Measure γ) : μ (closure K) = μ K := by refine le_antisymm ?_ (measure_mono subset_closure) calc μ (closure K) ≤ μ (toMeasurable μ K) := measure_mono <\| hK.closure_subset_measurableSet (measurableSet_toMeasurable ..) (subset_toMeasurable ..) _ = μ K := measure_toMeasurable .. @[measurability] theorem measurableSet_closure : MeasurableSet (closure s) := isClosed_closure.measurableSet #align measurable_set_closure measurableSet_closure theorem measurable_of_isOpen {f : δ → γ} (hf : ∀ s, IsOpen s → MeasurableSet (f ⁻¹' s)) : Measurable f := by rw [‹BorelSpace γ›.measurable_eq] exact measurable_generateFrom hf #align measurable_of_is_open measurable_of_isOpen theorem measurable_of_isClosed {f : δ → γ} (hf : ∀ s, IsClosed s → MeasurableSet (f ⁻¹' s)) : Measurable f := by apply measurable_of_isOpen; intro s hs rw [← MeasurableSet.compl_iff, ← preimage_compl]; apply hf; rw [isClosed_compl_iff]; exact hs #align measurable_of_is_closed measurable_of_isClosed theorem measurable_of_isClosed' {f : δ → γ} (hf : ∀ s, IsClosed s → s.Nonempty → s ≠ univ → MeasurableSet (f ⁻¹' s)) : Measurable f := by apply measurable_of_isClosed; intro s hs rcases eq_empty_or_nonempty s with h1 \| h1 · simp [h1] by_cases h2 : s = univ · simp [h2] exact hf s hs h1 h2 #align measurable_of_is_closed' measurable_of_isClosed' instance nhds_isMeasurablyGenerated (a : α) : (𝓝 a).IsMeasurablyGenerated := by rw [nhds, iInf_subtype'] refine @Filter.iInf_isMeasurablyGenerated α _ _ _ fun i => ?_ exact i.2.2.measurableSet.principal_isMeasurablyGenerated #align nhds_is_measurably_generated nhds_isMeasurablyGenerated /-- If `s` is a measurable set, then `𝓝[s] a` is a measurably generated filter for each `a`. This cannot be an `instance` because it depends on a non-instance `hs : MeasurableSet s`. -/ theorem MeasurableSet.nhdsWithin_isMeasurablyGenerated {s : Set α} (hs : MeasurableSet s) (a : α) : (𝓝[s] a).IsMeasurablyGenerated := haveI := hs.principal_isMeasurablyGenerated Filter.inf_isMeasurablyGenerated _ _ #align measurable_set.nhds_within_is_measurably_generated MeasurableSet.nhdsWithin_isMeasurablyGenerated instance (priority := 100) OpensMeasurableSpace.separatesPoints [T0Space α] : SeparatesPoints α := by rw [separatesPoints_iff] intro x y hxy apply Inseparable.eq rw [inseparable_iff_forall_open] exact fun s hs => hxy _ hs.measurableSet -- see Note [lower instance priority] instance (priority := 100) OpensMeasurableSpace.toMeasurableSingletonClass [T1Space α] : MeasurableSingletonClass α := ⟨fun _ => isClosed_singleton.measurableSet⟩ #align opens_measurable_space.to_measurable_singleton_class OpensMeasurableSpace.toMeasurableSingletonClass instance Pi.opensMeasurableSpace {ι : Type} {π : ι → Type} [Countable ι] [t' : ∀ i, TopologicalSpace (π i)] [∀ i, MeasurableSpace (π i)] [∀ i, SecondCountableTopology (π i)] [∀ i, OpensMeasurableSpace (π i)] : OpensMeasurableSpace (∀ i, π i) := by constructor have : Pi.topologicalSpace = .generateFrom { t \| ∃ (s : ∀ a, Set (π a)) (i : Finset ι), (∀ a ∈ i, s a ∈ countableBasis (π a)) ∧ t = pi (↑i) s } := by simp only [funext fun a => @eq_generateFrom_countableBasis (π a) _ _, pi_generateFrom_eq] rw [borel_eq_generateFrom_of_subbasis this] apply generateFrom_le rintro _ ⟨s, i, hi, rfl⟩ refine MeasurableSet.pi i.countable_toSet fun a ha => IsOpen.measurableSet ?_ rw [eq_generateFrom_countableBasis (π a)] exact .basic _ (hi a ha) #align pi.opens_measurable_space Pi.opensMeasurableSpace /-- The typeclass `SecondCountableTopologyEither α β` registers the fact that at least one of the two spaces has second countable topology. This is the right assumption to ensure that continuous maps from `α` to `β` are strongly measurable. -/ class SecondCountableTopologyEither (α β : Type) [TopologicalSpace α] [TopologicalSpace β] : Prop where /-- The projection out of `SecondCountableTopologyEither` -/ out : SecondCountableTopology α ∨ SecondCountableTopology β #align second_countable_topology_either SecondCountableTopologyEither instance (priority := 100) secondCountableTopologyEither_of_left (α β : Type) [TopologicalSpace α] [TopologicalSpace β] [SecondCountableTopology α] : SecondCountableTopologyEither α β where out := Or.inl (by infer_instance) #align second_countable_topology_either_of_left secondCountableTopologyEither_of_left instance (priority := 100) secondCountableTopologyEither_of_right (α β : Type) [TopologicalSpace α] [TopologicalSpace β] [SecondCountableTopology β] : SecondCountableTopologyEither α β where out := Or.inr (by infer_instance) #align second_countable_topology_either_of_right secondCountableTopologyEither_of_right /-- If either `α` or `β` has second-countable topology, then the open sets in `α × β` belong to the product sigma-algebra. -/ instance Prod.opensMeasurableSpace [h : SecondCountableTopologyEither α β] : OpensMeasurableSpace (α × β) := by apply opensMeasurableSpace_iff_forall_measurableSet.2 (fun s hs ↦ ?_) rcases h.out with hα\|hβ · let F : Set α → Set β := fun a ↦ {y \| ∃ b, IsOpen b ∧ y ∈ b ∧ a ×ˢ b ⊆ s} have A : ∀ a, IsOpen (F a) := by intro a apply isOpen_iff_forall_mem_open.2 rintro y ⟨b, b_open, yb, hb⟩ exact ⟨b, fun z zb ↦ ⟨b, b_open, zb, hb⟩, b_open, yb⟩ have : s = ⋃ a ∈ countableBasis α, a ×ˢ F a := by apply Subset.antisymm · rintro ⟨y1, y2⟩ hy rcases isOpen_prod_iff.1 hs y1 y2 hy with ⟨u, v, u_open, v_open, yu, yv, huv⟩ obtain ⟨a, ha, ya, au⟩ : ∃ a ∈ countableBasis α, y1 ∈ a ∧ a ⊆ u := IsTopologicalBasis.exists_subset_of_mem_open (isBasis_countableBasis α) yu u_open simp only [mem_iUnion, mem_prod, mem_setOf_eq, exists_and_left, exists_prop] exact ⟨a, ya, ha, v, v_open, yv, (Set.prod_mono_left au).trans huv⟩ · rintro ⟨y1, y2⟩ hy simp only [mem_iUnion, mem_prod, mem_setOf_eq, exists_and_left, exists_prop] at hy rcases hy with ⟨a, ya, -, b, -, yb, hb⟩ exact hb (mem_prod.2 ⟨ya, yb⟩) rw [this] apply MeasurableSet.biUnion (countable_countableBasis α) (fun a ha ↦ ?_) exact (isOpen_of_mem_countableBasis ha).measurableSet.prod (A a).measurableSet · let F : Set β → Set α := fun a ↦ {y \| ∃ b, IsOpen b ∧ y ∈ b ∧ b ×ˢ a ⊆ s} have A : ∀ a, IsOpen (F a) := by intro a apply isOpen_iff_forall_mem_open.2 rintro y ⟨b, b_open, yb, hb⟩ exact ⟨b, fun z zb ↦ ⟨b, b_open, zb, hb⟩, b_open, yb⟩ have : s = ⋃ a ∈ countableBasis β, F a ×ˢ a := by apply Subset.antisymm · rintro ⟨y1, y2⟩ hy rcases isOpen_prod_iff.1 hs y1 y2 hy with ⟨u, v, u_open, v_open, yu, yv, huv⟩ obtain ⟨a, ha, ya, au⟩ : ∃ a ∈ countableBasis β, y2 ∈ a ∧ a ⊆ v := IsTopologicalBasis.exists_subset_of_mem_open (isBasis_countableBasis β) yv v_open simp only [mem_iUnion, mem_prod, mem_setOf_eq, exists_and_left, exists_prop] exact ⟨a, ⟨u, u_open, yu, (Set.prod_mono_right au).trans huv⟩, ha, ya⟩ · rintro ⟨y1, y2⟩ hy simp only [mem_iUnion, mem_prod, mem_setOf_eq, exists_and_left, exists_prop] at hy rcases hy with ⟨a, ⟨b, -, yb, hb⟩, -, ya⟩ exact hb (mem_prod.2 ⟨yb, ya⟩) rw [this] apply MeasurableSet.biUnion (countable_countableBasis β) (fun a ha ↦ ?_) exact (A a).measurableSet.prod (isOpen_of_mem_countableBasis ha).measurableSet variable {α' : Type*} [TopologicalSpace α'] [MeasurableSpace α'] theorem interior_ae_eq_of_null_frontier {μ : Measure α'} {s : Set α'} (h : μ (frontier s) = 0) : interior s =ᵐ[μ] s := interior_subset.eventuallyLE.antisymm <\| subset_closure.eventuallyLE.trans (ae_le_set.2 h) #align interior_ae_eq_of_null_frontier interior_ae_eq_of_null_frontier theorem measure_interior_of_null_frontier {μ : Measure α'} {s : Set α'} (h : μ (frontier s) = 0) : μ (interior s) = μ s := measure_congr (interior_ae_eq_of_null_frontier h) #align measure_interior_of_null_frontier measure_interior_of_null_frontier theorem nullMeasurableSet_of_null_frontier {s : Set α} {μ : Measure α} (h : μ (frontier s) = 0) : NullMeasurableSet s μ := ⟨interior s, isOpen_interior.measurableSet, (interior_ae_eq_of_null_frontier h).symm⟩ #align null_measurable_set_of_null_frontier nullMeasurableSet_of_null_frontier theorem closure_ae_eq_of_null_frontier {μ : Measure α'} {s : Set α'} (h : μ (frontier s) = 0) : closure s =ᵐ[μ] s := ((ae_le_set.2 h).trans interior_subset.eventuallyLE).antisymm <\| subset_closure.eventuallyLE #align closure_ae_eq_of_null_frontier closure_ae_eq_of_null_frontier theorem measure_closure_of_null_frontier {μ : Measure α'} {s : Set α'} (h : μ (frontier s) = 0) : μ (closure s) = μ s := measure_congr (closure_ae_eq_of_null_frontier h) #align measure_closure_of_null_frontier measure_closure_of_null_frontier instance separatesPointsOfOpensMeasurableSpaceOfT0Space [T0Space α] : MeasurableSpace.SeparatesPoints α where separates x y := by contrapose! intro x_ne_y obtain ⟨U, U_open, mem_U⟩ := exists_isOpen_xor'_mem x_ne_y by_cases x_in_U : x ∈ U · refine ⟨U, U_open.measurableSet, x_in_U, ?_⟩ simp_all only [ne_eq, xor_true, not_false_eq_true] · refine ⟨Uᶜ, U_open.isClosed_compl.measurableSet, x_in_U, ?_⟩ simp_all only [ne_eq, xor_false, id_eq, mem_compl_iff, not_true_eq_false, not_false_eq_true] /-- A continuous function from an `OpensMeasurableSpace` to a `BorelSpace` is measurable. -/ theorem Continuous.measurable {f : α → γ} (hf : Continuous f) : Measurable f := hf.borel_measurable.mono OpensMeasurableSpace.borel_le (le_of_eq <\| BorelSpace.measurable_eq) #align continuous.measurable Continuous.measurable /-- A continuous function from an `OpensMeasurableSpace` to a `BorelSpace` is ae-measurable. -/ theorem Continuous.aemeasurable {f : α → γ} (h : Continuous f) {μ : Measure α} : AEMeasurable f μ := h.measurable.aemeasurable #align continuous.ae_measurable Continuous.aemeasurable theorem ClosedEmbedding.measurable {f : α → γ} (hf : ClosedEmbedding f) : Measurable f := hf.continuous.measurable #align closed_embedding.measurable ClosedEmbedding.measurable /-- If a function is defined piecewise in terms of functions which are continuous on their respective pieces, then it is measurable. -/	Mathlib/MeasureTheory/Constructions/BorelSpace/Basic.lean	520	531	theorem ContinuousOn.measurable_piecewise {f g : α → γ} {s : Set α} [∀ j : α, Decidable (j ∈ s)] (hf : ContinuousOn f s) (hg : ContinuousOn g sᶜ) (hs : MeasurableSet s) : Measurable (s.piecewise f g) := by	refine measurable_of_isOpen fun t ht => ?_ rw [piecewise_preimage, Set.ite] apply MeasurableSet.union · rcases _root_.continuousOn_iff'.1 hf t ht with ⟨u, u_open, hu⟩ rw [hu] exact u_open.measurableSet.inter hs · rcases _root_.continuousOn_iff'.1 hg t ht with ⟨u, u_open, hu⟩ rw [diff_eq_compl_inter, inter_comm, hu] exact u_open.measurableSet.inter hs.compl
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Group.Prod import Mathlib.Order.Cover #align_import algebra.support from "leanprover-community/mathlib"@"29cb56a7b35f72758b05a30490e1f10bd62c35c1" /-! # Support of a function In this file we define `Function.support f = {x \| f x ≠ 0}` and prove its basic properties. We also define `Function.mulSupport f = {x \| f x ≠ 1}`. -/ assert_not_exists MonoidWithZero open Set namespace Function variable {α β A B M N P G : Type} section One variable [One M] [One N] [One P] /-- `mulSupport` of a function is the set of points `x` such that `f x ≠ 1`. -/ @[to_additive "`support` of a function is the set of points `x` such that `f x ≠ 0`."] def mulSupport (f : α → M) : Set α := {x \| f x ≠ 1} #align function.mul_support Function.mulSupport #align function.support Function.support @[to_additive] theorem mulSupport_eq_preimage (f : α → M) : mulSupport f = f ⁻¹' {1}ᶜ := rfl #align function.mul_support_eq_preimage Function.mulSupport_eq_preimage #align function.support_eq_preimage Function.support_eq_preimage @[to_additive] theorem nmem_mulSupport {f : α → M} {x : α} : x ∉ mulSupport f ↔ f x = 1 := not_not #align function.nmem_mul_support Function.nmem_mulSupport #align function.nmem_support Function.nmem_support @[to_additive] theorem compl_mulSupport {f : α → M} : (mulSupport f)ᶜ = { x \| f x = 1 } := ext fun _ => nmem_mulSupport #align function.compl_mul_support Function.compl_mulSupport #align function.compl_support Function.compl_support @[to_additive (attr := simp)] theorem mem_mulSupport {f : α → M} {x : α} : x ∈ mulSupport f ↔ f x ≠ 1 := Iff.rfl #align function.mem_mul_support Function.mem_mulSupport #align function.mem_support Function.mem_support @[to_additive (attr := simp)] theorem mulSupport_subset_iff {f : α → M} {s : Set α} : mulSupport f ⊆ s ↔ ∀ x, f x ≠ 1 → x ∈ s := Iff.rfl #align function.mul_support_subset_iff Function.mulSupport_subset_iff #align function.support_subset_iff Function.support_subset_iff @[to_additive] theorem mulSupport_subset_iff' {f : α → M} {s : Set α} : mulSupport f ⊆ s ↔ ∀ x ∉ s, f x = 1 := forall_congr' fun _ => not_imp_comm #align function.mul_support_subset_iff' Function.mulSupport_subset_iff' #align function.support_subset_iff' Function.support_subset_iff' @[to_additive] theorem mulSupport_eq_iff {f : α → M} {s : Set α} : mulSupport f = s ↔ (∀ x, x ∈ s → f x ≠ 1) ∧ ∀ x, x ∉ s → f x = 1 := by simp (config := { contextual := true }) only [ext_iff, mem_mulSupport, ne_eq, iff_def, not_imp_comm, and_comm, forall_and] #align function.mul_support_eq_iff Function.mulSupport_eq_iff #align function.support_eq_iff Function.support_eq_iff @[to_additive] theorem ext_iff_mulSupport {f g : α → M} : f = g ↔ f.mulSupport = g.mulSupport ∧ ∀ x ∈ f.mulSupport, f x = g x := ⟨fun h ↦ h ▸ ⟨rfl, fun _ _ ↦ rfl⟩, fun ⟨h₁, h₂⟩ ↦ funext fun x ↦ by if hx : x ∈ f.mulSupport then exact h₂ x hx else rw [nmem_mulSupport.1 hx, nmem_mulSupport.1 (mt (Set.ext_iff.1 h₁ x).2 hx)]⟩ @[to_additive] theorem mulSupport_update_of_ne_one [DecidableEq α] (f : α → M) (x : α) {y : M} (hy : y ≠ 1) : mulSupport (update f x y) = insert x (mulSupport f) := by ext a; rcases eq_or_ne a x with rfl \| hne <;> simp [] @[to_additive] theorem mulSupport_update_one [DecidableEq α] (f : α → M) (x : α) : mulSupport (update f x 1) = mulSupport f \ {x} := by ext a; rcases eq_or_ne a x with rfl \| hne <;> simp [] @[to_additive] theorem mulSupport_update_eq_ite [DecidableEq α] [DecidableEq M] (f : α → M) (x : α) (y : M) : mulSupport (update f x y) = if y = 1 then mulSupport f \ {x} else insert x (mulSupport f) := by rcases eq_or_ne y 1 with rfl \| hy <;> simp [mulSupport_update_one, mulSupport_update_of_ne_one, ] @[to_additive] theorem mulSupport_extend_one_subset {f : α → M} {g : α → N} : mulSupport (f.extend g 1) ⊆ f '' mulSupport g := mulSupport_subset_iff'.mpr fun x hfg ↦ by by_cases hf : ∃ a, f a = x · rw [extend, dif_pos hf, ← nmem_mulSupport] rw [← Classical.choose_spec hf] at hfg exact fun hg ↦ hfg ⟨_, hg, rfl⟩ · rw [extend_apply' _ _ _ hf]; rfl @[to_additive] theorem mulSupport_extend_one {f : α → M} {g : α → N} (hf : f.Injective) : mulSupport (f.extend g 1) = f '' mulSupport g := mulSupport_extend_one_subset.antisymm <\| by rintro _ ⟨x, hx, rfl⟩; rwa [mem_mulSupport, hf.extend_apply] @[to_additive] theorem mulSupport_disjoint_iff {f : α → M} {s : Set α} : Disjoint (mulSupport f) s ↔ EqOn f 1 s := by simp_rw [← subset_compl_iff_disjoint_right, mulSupport_subset_iff', not_mem_compl_iff, EqOn, Pi.one_apply] #align function.mul_support_disjoint_iff Function.mulSupport_disjoint_iff #align function.support_disjoint_iff Function.support_disjoint_iff @[to_additive] theorem disjoint_mulSupport_iff {f : α → M} {s : Set α} : Disjoint s (mulSupport f) ↔ EqOn f 1 s := by rw [disjoint_comm, mulSupport_disjoint_iff] #align function.disjoint_mul_support_iff Function.disjoint_mulSupport_iff #align function.disjoint_support_iff Function.disjoint_support_iff @[to_additive (attr := simp)] theorem mulSupport_eq_empty_iff {f : α → M} : mulSupport f = ∅ ↔ f = 1 := by #adaptation_note /-- This used to be `simp_rw` rather than `rw`, but this broke `to_additive` as of `nightly-2024-03-07` -/ rw [← subset_empty_iff, mulSupport_subset_iff', funext_iff] simp #align function.mul_support_eq_empty_iff Function.mulSupport_eq_empty_iff #align function.support_eq_empty_iff Function.support_eq_empty_iff @[to_additive (attr := simp)] theorem mulSupport_nonempty_iff {f : α → M} : (mulSupport f).Nonempty ↔ f ≠ 1 := by rw [nonempty_iff_ne_empty, Ne, mulSupport_eq_empty_iff] #align function.mul_support_nonempty_iff Function.mulSupport_nonempty_iff #align function.support_nonempty_iff Function.support_nonempty_iff @[to_additive] theorem range_subset_insert_image_mulSupport (f : α → M) : range f ⊆ insert 1 (f '' mulSupport f) := by simpa only [range_subset_iff, mem_insert_iff, or_iff_not_imp_left] using fun x (hx : x ∈ mulSupport f) => mem_image_of_mem f hx #align function.range_subset_insert_image_mul_support Function.range_subset_insert_image_mulSupport #align function.range_subset_insert_image_support Function.range_subset_insert_image_support @[to_additive] lemma range_eq_image_or_of_mulSupport_subset {f : α → M} {k : Set α} (h : mulSupport f ⊆ k) : range f = f '' k ∨ range f = insert 1 (f '' k) := by apply (wcovBy_insert _ _).eq_or_eq (image_subset_range _ _) exact (range_subset_insert_image_mulSupport f).trans (insert_subset_insert (image_subset f h)) @[to_additive (attr := simp)] theorem mulSupport_one' : mulSupport (1 : α → M) = ∅ := mulSupport_eq_empty_iff.2 rfl #align function.mul_support_one' Function.mulSupport_one' #align function.support_zero' Function.support_zero' @[to_additive (attr := simp)] theorem mulSupport_one : (mulSupport fun _ : α => (1 : M)) = ∅ := mulSupport_one' #align function.mul_support_one Function.mulSupport_one #align function.support_zero Function.support_zero @[to_additive] theorem mulSupport_const {c : M} (hc : c ≠ 1) : (mulSupport fun _ : α => c) = Set.univ := by ext x simp [hc] #align function.mul_support_const Function.mulSupport_const #align function.support_const Function.support_const @[to_additive] theorem mulSupport_binop_subset (op : M → N → P) (op1 : op 1 1 = 1) (f : α → M) (g : α → N) : (mulSupport fun x => op (f x) (g x)) ⊆ mulSupport f ∪ mulSupport g := fun x hx => not_or_of_imp fun hf hg => hx <\| by simp only [hf, hg, op1] #align function.mul_support_binop_subset Function.mulSupport_binop_subset #align function.support_binop_subset Function.support_binop_subset @[to_additive] theorem mulSupport_comp_subset {g : M → N} (hg : g 1 = 1) (f : α → M) : mulSupport (g ∘ f) ⊆ mulSupport f := fun x => mt fun h => by simp only [(· ∘ ·), ] #align function.mul_support_comp_subset Function.mulSupport_comp_subset #align function.support_comp_subset Function.support_comp_subset @[to_additive] theorem mulSupport_subset_comp {g : M → N} (hg : ∀ {x}, g x = 1 → x = 1) (f : α → M) : mulSupport f ⊆ mulSupport (g ∘ f) := fun _ => mt hg #align function.mul_support_subset_comp Function.mulSupport_subset_comp #align function.support_subset_comp Function.support_subset_comp @[to_additive] theorem mulSupport_comp_eq (g : M → N) (hg : ∀ {x}, g x = 1 ↔ x = 1) (f : α → M) : mulSupport (g ∘ f) = mulSupport f := Set.ext fun _ => not_congr hg #align function.mul_support_comp_eq Function.mulSupport_comp_eq #align function.support_comp_eq Function.support_comp_eq @[to_additive] theorem mulSupport_comp_eq_of_range_subset {g : M → N} {f : α → M} (hg : ∀ {x}, x ∈ range f → (g x = 1 ↔ x = 1)) : mulSupport (g ∘ f) = mulSupport f := Set.ext fun x ↦ not_congr <\| by rw [Function.comp, hg (mem_range_self x)] @[to_additive] theorem mulSupport_comp_eq_preimage (g : β → M) (f : α → β) : mulSupport (g ∘ f) = f ⁻¹' mulSupport g := rfl #align function.mul_support_comp_eq_preimage Function.mulSupport_comp_eq_preimage #align function.support_comp_eq_preimage Function.support_comp_eq_preimage @[to_additive support_prod_mk] theorem mulSupport_prod_mk (f : α → M) (g : α → N) : (mulSupport fun x => (f x, g x)) = mulSupport f ∪ mulSupport g := Set.ext fun x => by simp only [mulSupport, not_and_or, mem_union, mem_setOf_eq, Prod.mk_eq_one, Ne] #align function.mul_support_prod_mk Function.mulSupport_prod_mk #align function.support_prod_mk Function.support_prod_mk @[to_additive support_prod_mk'] theorem mulSupport_prod_mk' (f : α → M × N) : mulSupport f = (mulSupport fun x => (f x).1) ∪ mulSupport fun x => (f x).2 := by simp only [← mulSupport_prod_mk] #align function.mul_support_prod_mk' Function.mulSupport_prod_mk' #align function.support_prod_mk' Function.support_prod_mk' @[to_additive] theorem mulSupport_along_fiber_subset (f : α × β → M) (a : α) : (mulSupport fun b => f (a, b)) ⊆ (mulSupport f).image Prod.snd := fun x hx => ⟨(a, x), by simpa using hx⟩ #align function.mul_support_along_fiber_subset Function.mulSupport_along_fiber_subset #align function.support_along_fiber_subset Function.support_along_fiber_subset @[to_additive] theorem mulSupport_curry (f : α × β → M) : (mulSupport f.curry) = (mulSupport f).image Prod.fst := by simp [mulSupport, funext_iff, image] @[to_additive] theorem mulSupport_curry' (f : α × β → M) : (mulSupport fun a b ↦ f (a, b)) = (mulSupport f).image Prod.fst := mulSupport_curry f end One @[to_additive] theorem mulSupport_mul [MulOneClass M] (f g : α → M) : (mulSupport fun x => f x g x) ⊆ mulSupport f ∪ mulSupport g := mulSupport_binop_subset (· * ·) (one_mul _) f g #align function.mul_support_mul Function.mulSupport_mul #align function.support_add Function.support_add @[to_additive] theorem mulSupport_pow [Monoid M] (f : α → M) (n : ℕ) : (mulSupport fun x => f x ^ n) ⊆ mulSupport f := by induction' n with n hfn · simp [pow_zero, mulSupport_one] · simpa only [pow_succ'] using (mulSupport_mul f _).trans (union_subset Subset.rfl hfn) #align function.mul_support_pow Function.mulSupport_pow #align function.support_nsmul Function.support_nsmul section DivisionMonoid variable [DivisionMonoid G] (f g : α → G) @[to_additive (attr := simp)] theorem mulSupport_inv : (mulSupport fun x => (f x)⁻¹) = mulSupport f := ext fun _ => inv_ne_one #align function.mul_support_inv Function.mulSupport_inv #align function.support_neg Function.support_neg @[to_additive (attr := simp)] theorem mulSupport_inv' : mulSupport f⁻¹ = mulSupport f := mulSupport_inv f #align function.mul_support_inv' Function.mulSupport_inv' #align function.support_neg' Function.support_neg' @[to_additive] theorem mulSupport_mul_inv : (mulSupport fun x => f x * (g x)⁻¹) ⊆ mulSupport f ∪ mulSupport g := mulSupport_binop_subset (fun a b => a * b⁻¹) (by simp) f g #align function.mul_support_mul_inv Function.mulSupport_mul_inv #align function.support_add_neg Function.support_add_neg @[to_additive] theorem mulSupport_div : (mulSupport fun x => f x / g x) ⊆ mulSupport f ∪ mulSupport g := mulSupport_binop_subset (· / ·) one_div_one f g #align function.mul_support_div Function.mulSupport_div #align function.support_sub Function.support_sub end DivisionMonoid end Function namespace Set open Function variable {α β M : Type} [One M] {f : α → M} @[to_additive] theorem image_inter_mulSupport_eq {s : Set β} {g : β → α} : g '' s ∩ mulSupport f = g '' (s ∩ mulSupport (f ∘ g)) := by rw [mulSupport_comp_eq_preimage f g, image_inter_preimage] #align set.image_inter_mul_support_eq Set.image_inter_mulSupport_eq #align set.image_inter_support_eq Set.image_inter_support_eq end Set namespace Pi variable {A : Type} {B : Type*} [DecidableEq A] [One B] {a : A} {b : B} open Function @[to_additive] theorem mulSupport_mulSingle_subset : mulSupport (mulSingle a b) ⊆ {a} := fun _ hx => by_contra fun hx' => hx <\| mulSingle_eq_of_ne hx' _ #align pi.mul_support_mul_single_subset Pi.mulSupport_mulSingle_subset #align pi.support_single_subset Pi.support_single_subset @[to_additive]	Mathlib/Algebra/Group/Support.lean	330	330	theorem mulSupport_mulSingle_one : mulSupport (mulSingle a (1 : B)) = ∅ := by	simp
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Benjamin Davidson -/ import Mathlib.Analysis.SpecialFunctions.Trigonometric.Angle import Mathlib.Analysis.SpecialFunctions.Trigonometric.Inverse #align_import analysis.special_functions.complex.arg from "leanprover-community/mathlib"@"2c1d8ca2812b64f88992a5294ea3dba144755cd1" /-! # The argument of a complex number. We define `arg : ℂ → ℝ`, returning a real number in the range (-π, π], such that for `x ≠ 0`, `sin (arg x) = x.im / x.abs` and `cos (arg x) = x.re / x.abs`, while `arg 0` defaults to `0` -/ open Filter Metric Set open scoped ComplexConjugate Real Topology namespace Complex variable {a x z : ℂ} /-- `arg` returns values in the range (-π, π], such that for `x ≠ 0`, `sin (arg x) = x.im / x.abs` and `cos (arg x) = x.re / x.abs`, `arg 0` defaults to `0` -/ noncomputable def arg (x : ℂ) : ℝ := if 0 ≤ x.re then Real.arcsin (x.im / abs x) else if 0 ≤ x.im then Real.arcsin ((-x).im / abs x) + π else Real.arcsin ((-x).im / abs x) - π #align complex.arg Complex.arg theorem sin_arg (x : ℂ) : Real.sin (arg x) = x.im / abs x := by unfold arg; split_ifs <;> simp [sub_eq_add_neg, arg, Real.sin_arcsin (abs_le.1 (abs_im_div_abs_le_one x)).1 (abs_le.1 (abs_im_div_abs_le_one x)).2, Real.sin_add, neg_div, Real.arcsin_neg, Real.sin_neg] #align complex.sin_arg Complex.sin_arg theorem cos_arg {x : ℂ} (hx : x ≠ 0) : Real.cos (arg x) = x.re / abs x := by rw [arg] split_ifs with h₁ h₂ · rw [Real.cos_arcsin] field_simp [Real.sqrt_sq, (abs.pos hx).le, ] · rw [Real.cos_add_pi, Real.cos_arcsin] field_simp [Real.sqrt_div (sq_nonneg _), Real.sqrt_sq_eq_abs, _root_.abs_of_neg (not_le.1 h₁), ] · rw [Real.cos_sub_pi, Real.cos_arcsin] field_simp [Real.sqrt_div (sq_nonneg _), Real.sqrt_sq_eq_abs, _root_.abs_of_neg (not_le.1 h₁), ] #align complex.cos_arg Complex.cos_arg @[simp] theorem abs_mul_exp_arg_mul_I (x : ℂ) : ↑(abs x) exp (arg x * I) = x := by rcases eq_or_ne x 0 with (rfl \| hx) · simp · have : abs x ≠ 0 := abs.ne_zero hx apply Complex.ext <;> field_simp [sin_arg, cos_arg hx, this, mul_comm (abs x)] set_option linter.uppercaseLean3 false in #align complex.abs_mul_exp_arg_mul_I Complex.abs_mul_exp_arg_mul_I @[simp] theorem abs_mul_cos_add_sin_mul_I (x : ℂ) : (abs x * (cos (arg x) + sin (arg x) * I) : ℂ) = x := by rw [← exp_mul_I, abs_mul_exp_arg_mul_I] set_option linter.uppercaseLean3 false in #align complex.abs_mul_cos_add_sin_mul_I Complex.abs_mul_cos_add_sin_mul_I @[simp] lemma abs_mul_cos_arg (x : ℂ) : abs x * Real.cos (arg x) = x.re := by simpa [-abs_mul_cos_add_sin_mul_I] using congr_arg re (abs_mul_cos_add_sin_mul_I x) @[simp] lemma abs_mul_sin_arg (x : ℂ) : abs x * Real.sin (arg x) = x.im := by simpa [-abs_mul_cos_add_sin_mul_I] using congr_arg im (abs_mul_cos_add_sin_mul_I x) theorem abs_eq_one_iff (z : ℂ) : abs z = 1 ↔ ∃ θ : ℝ, exp (θ * I) = z := by refine ⟨fun hz => ⟨arg z, ?_⟩, ?_⟩ · calc exp (arg z * I) = abs z * exp (arg z * I) := by rw [hz, ofReal_one, one_mul] _ = z := abs_mul_exp_arg_mul_I z · rintro ⟨θ, rfl⟩ exact Complex.abs_exp_ofReal_mul_I θ #align complex.abs_eq_one_iff Complex.abs_eq_one_iff @[simp] theorem range_exp_mul_I : (Set.range fun x : ℝ => exp (x * I)) = Metric.sphere 0 1 := by ext x simp only [mem_sphere_zero_iff_norm, norm_eq_abs, abs_eq_one_iff, Set.mem_range] set_option linter.uppercaseLean3 false in #align complex.range_exp_mul_I Complex.range_exp_mul_I theorem arg_mul_cos_add_sin_mul_I {r : ℝ} (hr : 0 < r) {θ : ℝ} (hθ : θ ∈ Set.Ioc (-π) π) : arg (r * (cos θ + sin θ * I)) = θ := by simp only [arg, map_mul, abs_cos_add_sin_mul_I, abs_of_nonneg hr.le, mul_one] simp only [re_ofReal_mul, im_ofReal_mul, neg_im, ← ofReal_cos, ← ofReal_sin, ← mk_eq_add_mul_I, neg_div, mul_div_cancel_left₀ _ hr.ne', mul_nonneg_iff_right_nonneg_of_pos hr] by_cases h₁ : θ ∈ Set.Icc (-(π / 2)) (π / 2) · rw [if_pos] exacts [Real.arcsin_sin' h₁, Real.cos_nonneg_of_mem_Icc h₁] · rw [Set.mem_Icc, not_and_or, not_le, not_le] at h₁ cases' h₁ with h₁ h₁ · replace hθ := hθ.1 have hcos : Real.cos θ < 0 := by rw [← neg_pos, ← Real.cos_add_pi] refine Real.cos_pos_of_mem_Ioo ⟨?_, ?_⟩ <;> linarith have hsin : Real.sin θ < 0 := Real.sin_neg_of_neg_of_neg_pi_lt (by linarith) hθ rw [if_neg, if_neg, ← Real.sin_add_pi, Real.arcsin_sin, add_sub_cancel_right] <;> [linarith; linarith; exact hsin.not_le; exact hcos.not_le] · replace hθ := hθ.2 have hcos : Real.cos θ < 0 := Real.cos_neg_of_pi_div_two_lt_of_lt h₁ (by linarith) have hsin : 0 ≤ Real.sin θ := Real.sin_nonneg_of_mem_Icc ⟨by linarith, hθ⟩ rw [if_neg, if_pos, ← Real.sin_sub_pi, Real.arcsin_sin, sub_add_cancel] <;> [linarith; linarith; exact hsin; exact hcos.not_le] set_option linter.uppercaseLean3 false in #align complex.arg_mul_cos_add_sin_mul_I Complex.arg_mul_cos_add_sin_mul_I theorem arg_cos_add_sin_mul_I {θ : ℝ} (hθ : θ ∈ Set.Ioc (-π) π) : arg (cos θ + sin θ * I) = θ := by rw [← one_mul (_ + _), ← ofReal_one, arg_mul_cos_add_sin_mul_I zero_lt_one hθ] set_option linter.uppercaseLean3 false in #align complex.arg_cos_add_sin_mul_I Complex.arg_cos_add_sin_mul_I lemma arg_exp_mul_I (θ : ℝ) : arg (exp (θ * I)) = toIocMod (mul_pos two_pos Real.pi_pos) (-π) θ := by convert arg_cos_add_sin_mul_I (θ := toIocMod (mul_pos two_pos Real.pi_pos) (-π) θ) _ using 2 · rw [← exp_mul_I, eq_sub_of_add_eq $ toIocMod_add_toIocDiv_zsmul _ _ θ, ofReal_sub, ofReal_zsmul, ofReal_mul, ofReal_ofNat, exp_mul_I_periodic.sub_zsmul_eq] · convert toIocMod_mem_Ioc _ _ _ ring @[simp] theorem arg_zero : arg 0 = 0 := by simp [arg, le_refl] #align complex.arg_zero Complex.arg_zero theorem ext_abs_arg {x y : ℂ} (h₁ : abs x = abs y) (h₂ : x.arg = y.arg) : x = y := by rw [← abs_mul_exp_arg_mul_I x, ← abs_mul_exp_arg_mul_I y, h₁, h₂] #align complex.ext_abs_arg Complex.ext_abs_arg theorem ext_abs_arg_iff {x y : ℂ} : x = y ↔ abs x = abs y ∧ arg x = arg y := ⟨fun h => h ▸ ⟨rfl, rfl⟩, and_imp.2 ext_abs_arg⟩ #align complex.ext_abs_arg_iff Complex.ext_abs_arg_iff theorem arg_mem_Ioc (z : ℂ) : arg z ∈ Set.Ioc (-π) π := by have hπ : 0 < π := Real.pi_pos rcases eq_or_ne z 0 with (rfl \| hz) · simp [hπ, hπ.le] rcases existsUnique_add_zsmul_mem_Ioc Real.two_pi_pos (arg z) (-π) with ⟨N, hN, -⟩ rw [two_mul, neg_add_cancel_left, ← two_mul, zsmul_eq_mul] at hN rw [← abs_mul_cos_add_sin_mul_I z, ← cos_add_int_mul_two_pi _ N, ← sin_add_int_mul_two_pi _ N] have := arg_mul_cos_add_sin_mul_I (abs.pos hz) hN push_cast at this rwa [this] #align complex.arg_mem_Ioc Complex.arg_mem_Ioc @[simp] theorem range_arg : Set.range arg = Set.Ioc (-π) π := (Set.range_subset_iff.2 arg_mem_Ioc).antisymm fun _ hx => ⟨_, arg_cos_add_sin_mul_I hx⟩ #align complex.range_arg Complex.range_arg theorem arg_le_pi (x : ℂ) : arg x ≤ π := (arg_mem_Ioc x).2 #align complex.arg_le_pi Complex.arg_le_pi theorem neg_pi_lt_arg (x : ℂ) : -π < arg x := (arg_mem_Ioc x).1 #align complex.neg_pi_lt_arg Complex.neg_pi_lt_arg theorem abs_arg_le_pi (z : ℂ) : \|arg z\| ≤ π := abs_le.2 ⟨(neg_pi_lt_arg z).le, arg_le_pi z⟩ #align complex.abs_arg_le_pi Complex.abs_arg_le_pi @[simp] theorem arg_nonneg_iff {z : ℂ} : 0 ≤ arg z ↔ 0 ≤ z.im := by rcases eq_or_ne z 0 with (rfl \| h₀); · simp calc 0 ≤ arg z ↔ 0 ≤ Real.sin (arg z) := ⟨fun h => Real.sin_nonneg_of_mem_Icc ⟨h, arg_le_pi z⟩, by contrapose! intro h exact Real.sin_neg_of_neg_of_neg_pi_lt h (neg_pi_lt_arg _)⟩ _ ↔ _ := by rw [sin_arg, le_div_iff (abs.pos h₀), zero_mul] #align complex.arg_nonneg_iff Complex.arg_nonneg_iff @[simp] theorem arg_neg_iff {z : ℂ} : arg z < 0 ↔ z.im < 0 := lt_iff_lt_of_le_iff_le arg_nonneg_iff #align complex.arg_neg_iff Complex.arg_neg_iff theorem arg_real_mul (x : ℂ) {r : ℝ} (hr : 0 < r) : arg (r * x) = arg x := by rcases eq_or_ne x 0 with (rfl \| hx); · rw [mul_zero] conv_lhs => rw [← abs_mul_cos_add_sin_mul_I x, ← mul_assoc, ← ofReal_mul, arg_mul_cos_add_sin_mul_I (mul_pos hr (abs.pos hx)) x.arg_mem_Ioc] #align complex.arg_real_mul Complex.arg_real_mul theorem arg_mul_real {r : ℝ} (hr : 0 < r) (x : ℂ) : arg (x * r) = arg x := mul_comm x r ▸ arg_real_mul x hr theorem arg_eq_arg_iff {x y : ℂ} (hx : x ≠ 0) (hy : y ≠ 0) : arg x = arg y ↔ (abs y / abs x : ℂ) * x = y := by simp only [ext_abs_arg_iff, map_mul, map_div₀, abs_ofReal, abs_abs, div_mul_cancel₀ _ (abs.ne_zero hx), eq_self_iff_true, true_and_iff] rw [← ofReal_div, arg_real_mul] exact div_pos (abs.pos hy) (abs.pos hx) #align complex.arg_eq_arg_iff Complex.arg_eq_arg_iff @[simp] theorem arg_one : arg 1 = 0 := by simp [arg, zero_le_one] #align complex.arg_one Complex.arg_one @[simp] theorem arg_neg_one : arg (-1) = π := by simp [arg, le_refl, not_le.2 (zero_lt_one' ℝ)] #align complex.arg_neg_one Complex.arg_neg_one @[simp] theorem arg_I : arg I = π / 2 := by simp [arg, le_refl] set_option linter.uppercaseLean3 false in #align complex.arg_I Complex.arg_I @[simp] theorem arg_neg_I : arg (-I) = -(π / 2) := by simp [arg, le_refl] set_option linter.uppercaseLean3 false in #align complex.arg_neg_I Complex.arg_neg_I @[simp] theorem tan_arg (x : ℂ) : Real.tan (arg x) = x.im / x.re := by by_cases h : x = 0 · simp only [h, zero_div, Complex.zero_im, Complex.arg_zero, Real.tan_zero, Complex.zero_re] rw [Real.tan_eq_sin_div_cos, sin_arg, cos_arg h, div_div_div_cancel_right _ (abs.ne_zero h)] #align complex.tan_arg Complex.tan_arg theorem arg_ofReal_of_nonneg {x : ℝ} (hx : 0 ≤ x) : arg x = 0 := by simp [arg, hx] #align complex.arg_of_real_of_nonneg Complex.arg_ofReal_of_nonneg @[simp, norm_cast] lemma natCast_arg {n : ℕ} : arg n = 0 := ofReal_natCast n ▸ arg_ofReal_of_nonneg n.cast_nonneg @[simp] lemma ofNat_arg {n : ℕ} [n.AtLeastTwo] : arg (no_index (OfNat.ofNat n)) = 0 := natCast_arg theorem arg_eq_zero_iff {z : ℂ} : arg z = 0 ↔ 0 ≤ z.re ∧ z.im = 0 := by refine ⟨fun h => ?_, ?_⟩ · rw [← abs_mul_cos_add_sin_mul_I z, h] simp [abs.nonneg] · cases' z with x y rintro ⟨h, rfl : y = 0⟩ exact arg_ofReal_of_nonneg h #align complex.arg_eq_zero_iff Complex.arg_eq_zero_iff open ComplexOrder in lemma arg_eq_zero_iff_zero_le {z : ℂ} : arg z = 0 ↔ 0 ≤ z := by rw [arg_eq_zero_iff, eq_comm, nonneg_iff] theorem arg_eq_pi_iff {z : ℂ} : arg z = π ↔ z.re < 0 ∧ z.im = 0 := by by_cases h₀ : z = 0 · simp [h₀, lt_irrefl, Real.pi_ne_zero.symm] constructor · intro h rw [← abs_mul_cos_add_sin_mul_I z, h] simp [h₀] · cases' z with x y rintro ⟨h : x < 0, rfl : y = 0⟩ rw [← arg_neg_one, ← arg_real_mul (-1) (neg_pos.2 h)] simp [← ofReal_def] #align complex.arg_eq_pi_iff Complex.arg_eq_pi_iff open ComplexOrder in lemma arg_eq_pi_iff_lt_zero {z : ℂ} : arg z = π ↔ z < 0 := arg_eq_pi_iff theorem arg_lt_pi_iff {z : ℂ} : arg z < π ↔ 0 ≤ z.re ∨ z.im ≠ 0 := by rw [(arg_le_pi z).lt_iff_ne, not_iff_comm, not_or, not_le, Classical.not_not, arg_eq_pi_iff] #align complex.arg_lt_pi_iff Complex.arg_lt_pi_iff theorem arg_ofReal_of_neg {x : ℝ} (hx : x < 0) : arg x = π := arg_eq_pi_iff.2 ⟨hx, rfl⟩ #align complex.arg_of_real_of_neg Complex.arg_ofReal_of_neg theorem arg_eq_pi_div_two_iff {z : ℂ} : arg z = π / 2 ↔ z.re = 0 ∧ 0 < z.im := by by_cases h₀ : z = 0; · simp [h₀, lt_irrefl, Real.pi_div_two_pos.ne] constructor · intro h rw [← abs_mul_cos_add_sin_mul_I z, h] simp [h₀] · cases' z with x y rintro ⟨rfl : x = 0, hy : 0 < y⟩ rw [← arg_I, ← arg_real_mul I hy, ofReal_mul', I_re, I_im, mul_zero, mul_one] #align complex.arg_eq_pi_div_two_iff Complex.arg_eq_pi_div_two_iff theorem arg_eq_neg_pi_div_two_iff {z : ℂ} : arg z = -(π / 2) ↔ z.re = 0 ∧ z.im < 0 := by by_cases h₀ : z = 0; · simp [h₀, lt_irrefl, Real.pi_ne_zero] constructor · intro h rw [← abs_mul_cos_add_sin_mul_I z, h] simp [h₀] · cases' z with x y rintro ⟨rfl : x = 0, hy : y < 0⟩ rw [← arg_neg_I, ← arg_real_mul (-I) (neg_pos.2 hy), mk_eq_add_mul_I] simp #align complex.arg_eq_neg_pi_div_two_iff Complex.arg_eq_neg_pi_div_two_iff theorem arg_of_re_nonneg {x : ℂ} (hx : 0 ≤ x.re) : arg x = Real.arcsin (x.im / abs x) := if_pos hx #align complex.arg_of_re_nonneg Complex.arg_of_re_nonneg theorem arg_of_re_neg_of_im_nonneg {x : ℂ} (hx_re : x.re < 0) (hx_im : 0 ≤ x.im) : arg x = Real.arcsin ((-x).im / abs x) + π := by simp only [arg, hx_re.not_le, hx_im, if_true, if_false] #align complex.arg_of_re_neg_of_im_nonneg Complex.arg_of_re_neg_of_im_nonneg theorem arg_of_re_neg_of_im_neg {x : ℂ} (hx_re : x.re < 0) (hx_im : x.im < 0) : arg x = Real.arcsin ((-x).im / abs x) - π := by simp only [arg, hx_re.not_le, hx_im.not_le, if_false] #align complex.arg_of_re_neg_of_im_neg Complex.arg_of_re_neg_of_im_neg theorem arg_of_im_nonneg_of_ne_zero {z : ℂ} (h₁ : 0 ≤ z.im) (h₂ : z ≠ 0) : arg z = Real.arccos (z.re / abs z) := by rw [← cos_arg h₂, Real.arccos_cos (arg_nonneg_iff.2 h₁) (arg_le_pi _)] #align complex.arg_of_im_nonneg_of_ne_zero Complex.arg_of_im_nonneg_of_ne_zero theorem arg_of_im_pos {z : ℂ} (hz : 0 < z.im) : arg z = Real.arccos (z.re / abs z) := arg_of_im_nonneg_of_ne_zero hz.le fun h => hz.ne' <\| h.symm ▸ rfl #align complex.arg_of_im_pos Complex.arg_of_im_pos theorem arg_of_im_neg {z : ℂ} (hz : z.im < 0) : arg z = -Real.arccos (z.re / abs z) := by have h₀ : z ≠ 0 := mt (congr_arg im) hz.ne rw [← cos_arg h₀, ← Real.cos_neg, Real.arccos_cos, neg_neg] exacts [neg_nonneg.2 (arg_neg_iff.2 hz).le, neg_le.2 (neg_pi_lt_arg z).le] #align complex.arg_of_im_neg Complex.arg_of_im_neg theorem arg_conj (x : ℂ) : arg (conj x) = if arg x = π then π else -arg x := by simp_rw [arg_eq_pi_iff, arg, neg_im, conj_im, conj_re, abs_conj, neg_div, neg_neg, Real.arcsin_neg] rcases lt_trichotomy x.re 0 with (hr \| hr \| hr) <;> rcases lt_trichotomy x.im 0 with (hi \| hi \| hi) · simp [hr, hr.not_le, hi.le, hi.ne, not_le.2 hi, add_comm] · simp [hr, hr.not_le, hi] · simp [hr, hr.not_le, hi.ne.symm, hi.le, not_le.2 hi, sub_eq_neg_add] · simp [hr] · simp [hr] · simp [hr] · simp [hr, hr.le, hi.ne] · simp [hr, hr.le, hr.le.not_lt] · simp [hr, hr.le, hr.le.not_lt] #align complex.arg_conj Complex.arg_conj theorem arg_inv (x : ℂ) : arg x⁻¹ = if arg x = π then π else -arg x := by rw [← arg_conj, inv_def, mul_comm] by_cases hx : x = 0 · simp [hx] · exact arg_real_mul (conj x) (by simp [hx]) #align complex.arg_inv Complex.arg_inv @[simp] lemma abs_arg_inv (x : ℂ) : \|x⁻¹.arg\| = \|x.arg\| := by rw [arg_inv]; split_ifs <;> simp [] -- TODO: Replace the next two lemmas by general facts about periodic functions lemma abs_eq_one_iff' : abs x = 1 ↔ ∃ θ ∈ Set.Ioc (-π) π, exp (θ I) = x := by rw [abs_eq_one_iff] constructor · rintro ⟨θ, rfl⟩ refine ⟨toIocMod (mul_pos two_pos Real.pi_pos) (-π) θ, ?_, ?_⟩ · convert toIocMod_mem_Ioc _ _ _ ring · rw [eq_sub_of_add_eq $ toIocMod_add_toIocDiv_zsmul _ _ θ, ofReal_sub, ofReal_zsmul, ofReal_mul, ofReal_ofNat, exp_mul_I_periodic.sub_zsmul_eq] · rintro ⟨θ, _, rfl⟩ exact ⟨θ, rfl⟩ lemma image_exp_Ioc_eq_sphere : (fun θ : ℝ ↦ exp (θ * I)) '' Set.Ioc (-π) π = sphere 0 1 := by ext; simpa using abs_eq_one_iff'.symm theorem arg_le_pi_div_two_iff {z : ℂ} : arg z ≤ π / 2 ↔ 0 ≤ re z ∨ im z < 0 := by rcases le_or_lt 0 (re z) with hre \| hre · simp only [hre, arg_of_re_nonneg hre, Real.arcsin_le_pi_div_two, true_or_iff] simp only [hre.not_le, false_or_iff] rcases le_or_lt 0 (im z) with him \| him · simp only [him.not_lt] rw [iff_false_iff, not_le, arg_of_re_neg_of_im_nonneg hre him, ← sub_lt_iff_lt_add, half_sub, Real.neg_pi_div_two_lt_arcsin, neg_im, neg_div, neg_lt_neg_iff, div_lt_one, ← _root_.abs_of_nonneg him, abs_im_lt_abs] exacts [hre.ne, abs.pos <\| ne_of_apply_ne re hre.ne] · simp only [him] rw [iff_true_iff, arg_of_re_neg_of_im_neg hre him] exact (sub_le_self _ Real.pi_pos.le).trans (Real.arcsin_le_pi_div_two _) #align complex.arg_le_pi_div_two_iff Complex.arg_le_pi_div_two_iff theorem neg_pi_div_two_le_arg_iff {z : ℂ} : -(π / 2) ≤ arg z ↔ 0 ≤ re z ∨ 0 ≤ im z := by rcases le_or_lt 0 (re z) with hre \| hre · simp only [hre, arg_of_re_nonneg hre, Real.neg_pi_div_two_le_arcsin, true_or_iff] simp only [hre.not_le, false_or_iff] rcases le_or_lt 0 (im z) with him \| him · simp only [him] rw [iff_true_iff, arg_of_re_neg_of_im_nonneg hre him] exact (Real.neg_pi_div_two_le_arcsin _).trans (le_add_of_nonneg_right Real.pi_pos.le) · simp only [him.not_le] rw [iff_false_iff, not_le, arg_of_re_neg_of_im_neg hre him, sub_lt_iff_lt_add', ← sub_eq_add_neg, sub_half, Real.arcsin_lt_pi_div_two, div_lt_one, neg_im, ← abs_of_neg him, abs_im_lt_abs] exacts [hre.ne, abs.pos <\| ne_of_apply_ne re hre.ne] #align complex.neg_pi_div_two_le_arg_iff Complex.neg_pi_div_two_le_arg_iff lemma neg_pi_div_two_lt_arg_iff {z : ℂ} : -(π / 2) < arg z ↔ 0 < re z ∨ 0 ≤ im z := by rw [lt_iff_le_and_ne, neg_pi_div_two_le_arg_iff, ne_comm, Ne, arg_eq_neg_pi_div_two_iff] rcases lt_trichotomy z.re 0 with hre \| hre \| hre · simp [hre.ne, hre.not_le, hre.not_lt] · simp [hre] · simp [hre, hre.le, hre.ne'] lemma arg_lt_pi_div_two_iff {z : ℂ} : arg z < π / 2 ↔ 0 < re z ∨ im z < 0 ∨ z = 0 := by rw [lt_iff_le_and_ne, arg_le_pi_div_two_iff, Ne, arg_eq_pi_div_two_iff] rcases lt_trichotomy z.re 0 with hre \| hre \| hre · have : z ≠ 0 := by simp [ext_iff, hre.ne] simp [hre.ne, hre.not_le, hre.not_lt, this] · have : z = 0 ↔ z.im = 0 := by simp [ext_iff, hre] simp [hre, this, or_comm, le_iff_eq_or_lt] · simp [hre, hre.le, hre.ne'] @[simp] theorem abs_arg_le_pi_div_two_iff {z : ℂ} : \|arg z\| ≤ π / 2 ↔ 0 ≤ re z := by rw [abs_le, arg_le_pi_div_two_iff, neg_pi_div_two_le_arg_iff, ← or_and_left, ← not_le, and_not_self_iff, or_false_iff] #align complex.abs_arg_le_pi_div_two_iff Complex.abs_arg_le_pi_div_two_iff @[simp] theorem abs_arg_lt_pi_div_two_iff {z : ℂ} : \|arg z\| < π / 2 ↔ 0 < re z ∨ z = 0 := by rw [abs_lt, arg_lt_pi_div_two_iff, neg_pi_div_two_lt_arg_iff, ← or_and_left] rcases eq_or_ne z 0 with hz \| hz · simp [hz] · simp_rw [hz, or_false, ← not_lt, not_and_self_iff, or_false] @[simp] theorem arg_conj_coe_angle (x : ℂ) : (arg (conj x) : Real.Angle) = -arg x := by by_cases h : arg x = π <;> simp [arg_conj, h] #align complex.arg_conj_coe_angle Complex.arg_conj_coe_angle @[simp] theorem arg_inv_coe_angle (x : ℂ) : (arg x⁻¹ : Real.Angle) = -arg x := by by_cases h : arg x = π <;> simp [arg_inv, h] #align complex.arg_inv_coe_angle Complex.arg_inv_coe_angle theorem arg_neg_eq_arg_sub_pi_of_im_pos {x : ℂ} (hi : 0 < x.im) : arg (-x) = arg x - π := by rw [arg_of_im_pos hi, arg_of_im_neg (show (-x).im < 0 from Left.neg_neg_iff.2 hi)] simp [neg_div, Real.arccos_neg] #align complex.arg_neg_eq_arg_sub_pi_of_im_pos Complex.arg_neg_eq_arg_sub_pi_of_im_pos theorem arg_neg_eq_arg_add_pi_of_im_neg {x : ℂ} (hi : x.im < 0) : arg (-x) = arg x + π := by rw [arg_of_im_neg hi, arg_of_im_pos (show 0 < (-x).im from Left.neg_pos_iff.2 hi)] simp [neg_div, Real.arccos_neg, add_comm, ← sub_eq_add_neg] #align complex.arg_neg_eq_arg_add_pi_of_im_neg Complex.arg_neg_eq_arg_add_pi_of_im_neg theorem arg_neg_eq_arg_sub_pi_iff {x : ℂ} : arg (-x) = arg x - π ↔ 0 < x.im ∨ x.im = 0 ∧ x.re < 0 := by rcases lt_trichotomy x.im 0 with (hi \| hi \| hi) · simp [hi, hi.ne, hi.not_lt, arg_neg_eq_arg_add_pi_of_im_neg, sub_eq_add_neg, ← add_eq_zero_iff_eq_neg, Real.pi_ne_zero] · rw [(ext rfl hi : x = x.re)] rcases lt_trichotomy x.re 0 with (hr \| hr \| hr) · rw [arg_ofReal_of_neg hr, ← ofReal_neg, arg_ofReal_of_nonneg (Left.neg_pos_iff.2 hr).le] simp [hr] · simp [hr, hi, Real.pi_ne_zero] · rw [arg_ofReal_of_nonneg hr.le, ← ofReal_neg, arg_ofReal_of_neg (Left.neg_neg_iff.2 hr)] simp [hr.not_lt, ← add_eq_zero_iff_eq_neg, Real.pi_ne_zero] · simp [hi, arg_neg_eq_arg_sub_pi_of_im_pos] #align complex.arg_neg_eq_arg_sub_pi_iff Complex.arg_neg_eq_arg_sub_pi_iff theorem arg_neg_eq_arg_add_pi_iff {x : ℂ} : arg (-x) = arg x + π ↔ x.im < 0 ∨ x.im = 0 ∧ 0 < x.re := by rcases lt_trichotomy x.im 0 with (hi \| hi \| hi) · simp [hi, arg_neg_eq_arg_add_pi_of_im_neg] · rw [(ext rfl hi : x = x.re)] rcases lt_trichotomy x.re 0 with (hr \| hr \| hr) · rw [arg_ofReal_of_neg hr, ← ofReal_neg, arg_ofReal_of_nonneg (Left.neg_pos_iff.2 hr).le] simp [hr.not_lt, ← two_mul, Real.pi_ne_zero] · simp [hr, hi, Real.pi_ne_zero.symm] · rw [arg_ofReal_of_nonneg hr.le, ← ofReal_neg, arg_ofReal_of_neg (Left.neg_neg_iff.2 hr)] simp [hr] · simp [hi, hi.ne.symm, hi.not_lt, arg_neg_eq_arg_sub_pi_of_im_pos, sub_eq_add_neg, ← add_eq_zero_iff_neg_eq, Real.pi_ne_zero] #align complex.arg_neg_eq_arg_add_pi_iff Complex.arg_neg_eq_arg_add_pi_iff theorem arg_neg_coe_angle {x : ℂ} (hx : x ≠ 0) : (arg (-x) : Real.Angle) = arg x + π := by rcases lt_trichotomy x.im 0 with (hi \| hi \| hi) · rw [arg_neg_eq_arg_add_pi_of_im_neg hi, Real.Angle.coe_add] · rw [(ext rfl hi : x = x.re)] rcases lt_trichotomy x.re 0 with (hr \| hr \| hr) · rw [arg_ofReal_of_neg hr, ← ofReal_neg, arg_ofReal_of_nonneg (Left.neg_pos_iff.2 hr).le, ← Real.Angle.coe_add, ← two_mul, Real.Angle.coe_two_pi, Real.Angle.coe_zero] · exact False.elim (hx (ext hr hi)) · rw [arg_ofReal_of_nonneg hr.le, ← ofReal_neg, arg_ofReal_of_neg (Left.neg_neg_iff.2 hr), Real.Angle.coe_zero, zero_add] · rw [arg_neg_eq_arg_sub_pi_of_im_pos hi, Real.Angle.coe_sub, Real.Angle.sub_coe_pi_eq_add_coe_pi] #align complex.arg_neg_coe_angle Complex.arg_neg_coe_angle theorem arg_mul_cos_add_sin_mul_I_eq_toIocMod {r : ℝ} (hr : 0 < r) (θ : ℝ) : arg (r * (cos θ + sin θ * I)) = toIocMod Real.two_pi_pos (-π) θ := by have hi : toIocMod Real.two_pi_pos (-π) θ ∈ Set.Ioc (-π) π := by convert toIocMod_mem_Ioc _ _ θ ring convert arg_mul_cos_add_sin_mul_I hr hi using 3 simp [toIocMod, cos_sub_int_mul_two_pi, sin_sub_int_mul_two_pi] set_option linter.uppercaseLean3 false in #align complex.arg_mul_cos_add_sin_mul_I_eq_to_Ioc_mod Complex.arg_mul_cos_add_sin_mul_I_eq_toIocMod	Mathlib/Analysis/SpecialFunctions/Complex/Arg.lean	506	508	theorem arg_cos_add_sin_mul_I_eq_toIocMod (θ : ℝ) : arg (cos θ + sin θ * I) = toIocMod Real.two_pi_pos (-π) θ := by	rw [← one_mul (_ + _), ← ofReal_one, arg_mul_cos_add_sin_mul_I_eq_toIocMod zero_lt_one]
/- Copyright (c) 2014 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Gabriel Ebner -/ import Mathlib.Algebra.Group.Defs import Mathlib.Tactic.SplitIfs #align_import data.nat.cast.defs from "leanprover-community/mathlib"@"a148d797a1094ab554ad4183a4ad6f130358ef64" /-! # Cast of natural numbers This file defines the canonical homomorphism from the natural numbers into an `AddMonoid` with a one. In additive monoids with one, there exists a unique such homomorphism and we store it in the `natCast : ℕ → R` field. Preferentially, the homomorphism is written as the coercion `Nat.cast`. ## Main declarations * `NatCast`: Type class for `Nat.cast`. * `AddMonoidWithOne`: Type class for which `Nat.cast` is a canonical monoid homomorphism from `ℕ`. * `Nat.cast`: Canonical homomorphism `ℕ → R`. -/ variable {R : Type} /-- The numeral `((0+1)+⋯)+1`. -/ protected def Nat.unaryCast [One R] [Zero R] [Add R] : ℕ → R \| 0 => 0 \| n + 1 => Nat.unaryCast n + 1 #align nat.unary_cast Nat.unaryCast #align has_nat_cast NatCast #align has_nat_cast.nat_cast NatCast.natCast #align nat.cast Nat.cast -- the following four declarations are not in mathlib3 and are relevant to the way numeric -- literals are handled in Lean 4. /-- A type class for natural numbers which are greater than or equal to `2`. -/ class Nat.AtLeastTwo (n : ℕ) : Prop where prop : n ≥ 2 instance instNatAtLeastTwo {n : ℕ} : Nat.AtLeastTwo (n + 2) where prop := Nat.succ_le_succ <\| Nat.succ_le_succ <\| Nat.zero_le _ namespace Nat.AtLeastTwo variable {n : ℕ} [n.AtLeastTwo] lemma one_lt : 1 < n := prop lemma ne_one : n ≠ 1 := Nat.ne_of_gt one_lt end Nat.AtLeastTwo /-- Recognize numeric literals which are at least `2` as terms of `R` via `Nat.cast`. This instance is what makes things like `37 : R` type check. Note that `0` and `1` are not needed because they are recognized as terms of `R` (at least when `R` is an `AddMonoidWithOne`) through `Zero` and `One`, respectively. -/ @[nolint unusedArguments] instance (priority := 100) instOfNatAtLeastTwo {n : ℕ} [NatCast R] [Nat.AtLeastTwo n] : OfNat R n where ofNat := n.cast library_note "no_index around OfNat.ofNat" /-- When writing lemmas about `OfNat.ofNat` that assume `Nat.AtLeastTwo`, the term needs to be wrapped in `no_index` so as not to confuse `simp`, as `no_index (OfNat.ofNat n)`. Some discussion is [on Zulip here](https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/.E2.9C.94.20Polynomial.2Ecoeff.20example/near/395438147). -/ @[simp, norm_cast] theorem Nat.cast_ofNat {n : ℕ} [NatCast R] [Nat.AtLeastTwo n] : (Nat.cast (no_index (OfNat.ofNat n)) : R) = OfNat.ofNat n := rfl theorem Nat.cast_eq_ofNat {n : ℕ} [NatCast R] [Nat.AtLeastTwo n] : (Nat.cast n : R) = OfNat.ofNat n := rfl /-! ### Additive monoids with one -/ /-- An `AddMonoidWithOne` is an `AddMonoid` with a `1`. It also contains data for the unique homomorphism `ℕ → R`. -/ class AddMonoidWithOne (R : Type) extends NatCast R, AddMonoid R, One R where natCast := Nat.unaryCast /-- The canonical map `ℕ → R` sends `0 : ℕ` to `0 : R`. -/ natCast_zero : natCast 0 = 0 := by intros; rfl /-- The canonical map `ℕ → R` is a homomorphism. -/ natCast_succ : ∀ n, natCast (n + 1) = natCast n + 1 := by intros; rfl #align add_monoid_with_one AddMonoidWithOne #align add_monoid_with_one.to_has_nat_cast AddMonoidWithOne.toNatCast #align add_monoid_with_one.to_add_monoid AddMonoidWithOne.toAddMonoid #align add_monoid_with_one.to_has_one AddMonoidWithOne.toOne #align add_monoid_with_one.nat_cast_zero AddMonoidWithOne.natCast_zero #align add_monoid_with_one.nat_cast_succ AddMonoidWithOne.natCast_succ /-- An `AddCommMonoidWithOne` is an `AddMonoidWithOne` satisfying `a + b = b + a`. -/ class AddCommMonoidWithOne (R : Type*) extends AddMonoidWithOne R, AddCommMonoid R #align add_comm_monoid_with_one AddCommMonoidWithOne #align add_comm_monoid_with_one.to_add_monoid_with_one AddCommMonoidWithOne.toAddMonoidWithOne #align add_comm_monoid_with_one.to_add_comm_monoid AddCommMonoidWithOne.toAddCommMonoid library_note "coercion into rings" /-- Coercions such as `Nat.castCoe` that go from a concrete structure such as `ℕ` to an arbitrary ring `R` should be set up as follows: ```lean instance : CoeTail ℕ R where coe := ... instance : CoeHTCT ℕ R where coe := ... ``` It needs to be `CoeTail` instead of `Coe` because otherwise type-class inference would loop when constructing the transitive coercion `ℕ → ℕ → ℕ → ...`. Sometimes we also need to declare the `CoeHTCT` instance if we need to shadow another coercion (e.g. `Nat.cast` should be used over `Int.ofNat`). -/ namespace Nat variable [AddMonoidWithOne R] @[simp, norm_cast] theorem cast_zero : ((0 : ℕ) : R) = 0 := AddMonoidWithOne.natCast_zero #align nat.cast_zero Nat.cast_zero -- Lemmas about `Nat.succ` need to get a low priority, so that they are tried last. -- This is because `Nat.succ _` matches `1`, `3`, `x+1`, etc. -- Rewriting would then produce really wrong terms. @[norm_cast 500] theorem cast_succ (n : ℕ) : ((succ n : ℕ) : R) = n + 1 := AddMonoidWithOne.natCast_succ _ #align nat.cast_succ Nat.cast_succ theorem cast_add_one (n : ℕ) : ((n + 1 : ℕ) : R) = n + 1 := cast_succ _ #align nat.cast_add_one Nat.cast_add_one @[simp, norm_cast] theorem cast_ite (P : Prop) [Decidable P] (m n : ℕ) : ((ite P m n : ℕ) : R) = ite P (m : R) (n : R) := by split_ifs <;> rfl #align nat.cast_ite Nat.cast_ite end Nat namespace Nat @[simp, norm_cast] theorem cast_one [AddMonoidWithOne R] : ((1 : ℕ) : R) = 1 := by rw [cast_succ, Nat.cast_zero, zero_add] #align nat.cast_one Nat.cast_oneₓ @[simp, norm_cast] theorem cast_add [AddMonoidWithOne R] (m n : ℕ) : ((m + n : ℕ) : R) = m + n := by induction n with \| zero => simp \| succ n ih => rw [add_succ, cast_succ, ih, cast_succ, add_assoc] #align nat.cast_add Nat.cast_addₓ /-- Computationally friendlier cast than `Nat.unaryCast`, using binary representation. -/ protected def binCast [Zero R] [One R] [Add R] : ℕ → R \| 0 => 0 \| n + 1 => if (n + 1) % 2 = 0 then (Nat.binCast ((n + 1) / 2)) + (Nat.binCast ((n + 1) / 2)) else (Nat.binCast ((n + 1) / 2)) + (Nat.binCast ((n + 1) / 2)) + 1 #align nat.bin_cast Nat.binCast @[simp] theorem binCast_eq [AddMonoidWithOne R] (n : ℕ) : (Nat.binCast n : R) = ((n : ℕ) : R) := by apply Nat.strongInductionOn n intros k hk cases k with \| zero => rw [Nat.binCast, Nat.cast_zero] \| succ k => rw [Nat.binCast] by_cases h : (k + 1) % 2 = 0 · conv => rhs; rw [← Nat.mod_add_div (k+1) 2] rw [if_pos h, hk _ <\| Nat.div_lt_self (Nat.succ_pos k) (Nat.le_refl 2), ← Nat.cast_add] rw [h, Nat.zero_add, Nat.succ_mul, Nat.one_mul] · conv => rhs; rw [← Nat.mod_add_div (k+1) 2] rw [if_neg h, hk _ <\| Nat.div_lt_self (Nat.succ_pos k) (Nat.le_refl 2), ← Nat.cast_add] have h1 := Or.resolve_left (Nat.mod_two_eq_zero_or_one (succ k)) h rw [h1, Nat.add_comm 1, Nat.succ_mul, Nat.one_mul] simp only [Nat.cast_add, Nat.cast_one] #align nat.bin_cast_eq Nat.binCast_eq section deprecated set_option linter.deprecated false @[norm_cast, deprecated] theorem cast_bit0 [AddMonoidWithOne R] (n : ℕ) : ((bit0 n : ℕ) : R) = bit0 (n : R) := Nat.cast_add _ _ #align nat.cast_bit0 Nat.cast_bit0 @[norm_cast, deprecated] theorem cast_bit1 [AddMonoidWithOne R] (n : ℕ) : ((bit1 n : ℕ) : R) = bit1 (n : R) := by rw [bit1, cast_add_one, cast_bit0]; rfl #align nat.cast_bit1 Nat.cast_bit1 end deprecated theorem cast_two [AddMonoidWithOne R] : ((2 : ℕ) : R) = (2 : R) := rfl #align nat.cast_two Nat.cast_two attribute [simp, norm_cast] Int.natAbs_ofNat end Nat /-- `AddMonoidWithOne` implementation using unary recursion. -/ protected abbrev AddMonoidWithOne.unary [AddMonoid R] [One R] : AddMonoidWithOne R := { ‹One R›, ‹AddMonoid R› with } #align add_monoid_with_one.unary AddMonoidWithOne.unary /-- `AddMonoidWithOne` implementation using binary recursion. -/ protected abbrev AddMonoidWithOne.binary [AddMonoid R] [One R] : AddMonoidWithOne R := { ‹One R›, ‹AddMonoid R› with natCast := Nat.binCast, natCast_zero := by simp only [Nat.binCast, Nat.cast], natCast_succ := fun n => by dsimp only [NatCast.natCast] letI : AddMonoidWithOne R := AddMonoidWithOne.unary rw [Nat.binCast_eq, Nat.binCast_eq, Nat.cast_succ] } #align add_monoid_with_one.binary AddMonoidWithOne.binary	Mathlib/Data/Nat/Cast/Defs.lean	231	234	theorem one_add_one_eq_two [AddMonoidWithOne R] : 1 + 1 = (2 : R) := by	rw [← Nat.cast_one, ← Nat.cast_add] apply congrArg decide
/- Copyright (c) 2016 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad -/ import Mathlib.Data.Int.Bitwise import Mathlib.Data.Int.Order.Lemmas import Mathlib.Data.Set.Function import Mathlib.Order.Interval.Set.Basic #align_import data.int.lemmas from "leanprover-community/mathlib"@"09597669f02422ed388036273d8848119699c22f" /-! # Miscellaneous lemmas about the integers This file contains lemmas about integers, which require further imports than `Data.Int.Basic` or `Data.Int.Order`. -/ open Nat namespace Int	Mathlib/Data/Int/Lemmas.lean	26	29	theorem le_natCast_sub (m n : ℕ) : (m - n : ℤ) ≤ ↑(m - n : ℕ) := by	by_cases h : m ≥ n · exact le_of_eq (Int.ofNat_sub h).symm · simp [le_of_not_ge h, ofNat_le]
/- Copyright (c) 2020 Yury G. Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury G. Kudryashov, Patrick Massot -/ import Mathlib.Order.Interval.Set.UnorderedInterval import Mathlib.Algebra.Order.Interval.Set.Monoid import Mathlib.Data.Set.Pointwise.Basic import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Group.MinMax #align_import data.set.pointwise.interval from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" /-! # (Pre)images of intervals In this file we prove a bunch of trivial lemmas like “if we add `a` to all points of `[b, c]`, then we get `[a + b, a + c]`”. For the functions `x ↦ x ± a`, `x ↦ a ± x`, and `x ↦ -x` we prove lemmas about preimages and images of all intervals. We also prove a few lemmas about images under `x ↦ a * x`, `x ↦ x * a` and `x ↦ x⁻¹`. -/ open Interval Pointwise variable {α : Type} namespace Set /-! ### Binary pointwise operations Note that the subset operations below only cover the cases with the largest possible intervals on the LHS: to conclude that `Ioo a b Ioo c d ⊆ Ioo (a * c) (c * d)`, you can use monotonicity of `` and `Set.Ico_mul_Ioc_subset`. TODO: repeat these lemmas for the generality of `mul_le_mul` (which assumes nonnegativity), which the unprimed names have been reserved for -/ section ContravariantLE variable [Mul α] [Preorder α] variable [CovariantClass α α (· ·) (· ≤ ·)] [CovariantClass α α (Function.swap HMul.hMul) LE.le] @[to_additive Icc_add_Icc_subset] theorem Icc_mul_Icc_subset' (a b c d : α) : Icc a b * Icc c d ⊆ Icc (a * c) (b * d) := by rintro x ⟨y, ⟨hya, hyb⟩, z, ⟨hzc, hzd⟩, rfl⟩ exact ⟨mul_le_mul' hya hzc, mul_le_mul' hyb hzd⟩ @[to_additive Iic_add_Iic_subset] theorem Iic_mul_Iic_subset' (a b : α) : Iic a * Iic b ⊆ Iic (a * b) := by rintro x ⟨y, hya, z, hzb, rfl⟩ exact mul_le_mul' hya hzb @[to_additive Ici_add_Ici_subset] theorem Ici_mul_Ici_subset' (a b : α) : Ici a * Ici b ⊆ Ici (a * b) := by rintro x ⟨y, hya, z, hzb, rfl⟩ exact mul_le_mul' hya hzb end ContravariantLE section ContravariantLT variable [Mul α] [PartialOrder α] variable [CovariantClass α α (· * ·) (· < ·)] [CovariantClass α α (Function.swap HMul.hMul) LT.lt] @[to_additive Icc_add_Ico_subset] theorem Icc_mul_Ico_subset' (a b c d : α) : Icc a b * Ico c d ⊆ Ico (a * c) (b * d) := by haveI := covariantClass_le_of_lt rintro x ⟨y, ⟨hya, hyb⟩, z, ⟨hzc, hzd⟩, rfl⟩ exact ⟨mul_le_mul' hya hzc, mul_lt_mul_of_le_of_lt hyb hzd⟩ @[to_additive Ico_add_Icc_subset] theorem Ico_mul_Icc_subset' (a b c d : α) : Ico a b * Icc c d ⊆ Ico (a * c) (b * d) := by haveI := covariantClass_le_of_lt rintro x ⟨y, ⟨hya, hyb⟩, z, ⟨hzc, hzd⟩, rfl⟩ exact ⟨mul_le_mul' hya hzc, mul_lt_mul_of_lt_of_le hyb hzd⟩ @[to_additive Ioc_add_Ico_subset] theorem Ioc_mul_Ico_subset' (a b c d : α) : Ioc a b * Ico c d ⊆ Ioo (a * c) (b * d) := by haveI := covariantClass_le_of_lt rintro x ⟨y, ⟨hya, hyb⟩, z, ⟨hzc, hzd⟩, rfl⟩ exact ⟨mul_lt_mul_of_lt_of_le hya hzc, mul_lt_mul_of_le_of_lt hyb hzd⟩ @[to_additive Ico_add_Ioc_subset] theorem Ico_mul_Ioc_subset' (a b c d : α) : Ico a b * Ioc c d ⊆ Ioo (a * c) (b * d) := by haveI := covariantClass_le_of_lt rintro x ⟨y, ⟨hya, hyb⟩, z, ⟨hzc, hzd⟩, rfl⟩ exact ⟨mul_lt_mul_of_le_of_lt hya hzc, mul_lt_mul_of_lt_of_le hyb hzd⟩ @[to_additive Iic_add_Iio_subset] theorem Iic_mul_Iio_subset' (a b : α) : Iic a * Iio b ⊆ Iio (a * b) := by haveI := covariantClass_le_of_lt rintro x ⟨y, hya, z, hzb, rfl⟩ exact mul_lt_mul_of_le_of_lt hya hzb @[to_additive Iio_add_Iic_subset] theorem Iio_mul_Iic_subset' (a b : α) : Iio a * Iic b ⊆ Iio (a * b) := by haveI := covariantClass_le_of_lt rintro x ⟨y, hya, z, hzb, rfl⟩ exact mul_lt_mul_of_lt_of_le hya hzb @[to_additive Ioi_add_Ici_subset] theorem Ioi_mul_Ici_subset' (a b : α) : Ioi a * Ici b ⊆ Ioi (a * b) := by haveI := covariantClass_le_of_lt rintro x ⟨y, hya, z, hzb, rfl⟩ exact mul_lt_mul_of_lt_of_le hya hzb @[to_additive Ici_add_Ioi_subset] theorem Ici_mul_Ioi_subset' (a b : α) : Ici a * Ioi b ⊆ Ioi (a * b) := by haveI := covariantClass_le_of_lt rintro x ⟨y, hya, z, hzb, rfl⟩ exact mul_lt_mul_of_le_of_lt hya hzb end ContravariantLT section OrderedAddCommGroup variable [OrderedAddCommGroup α] (a b c : α) /-! ### Preimages under `x ↦ a + x` -/ @[simp] theorem preimage_const_add_Ici : (fun x => a + x) ⁻¹' Ici b = Ici (b - a) := ext fun _x => sub_le_iff_le_add'.symm #align set.preimage_const_add_Ici Set.preimage_const_add_Ici @[simp] theorem preimage_const_add_Ioi : (fun x => a + x) ⁻¹' Ioi b = Ioi (b - a) := ext fun _x => sub_lt_iff_lt_add'.symm #align set.preimage_const_add_Ioi Set.preimage_const_add_Ioi @[simp] theorem preimage_const_add_Iic : (fun x => a + x) ⁻¹' Iic b = Iic (b - a) := ext fun _x => le_sub_iff_add_le'.symm #align set.preimage_const_add_Iic Set.preimage_const_add_Iic @[simp] theorem preimage_const_add_Iio : (fun x => a + x) ⁻¹' Iio b = Iio (b - a) := ext fun _x => lt_sub_iff_add_lt'.symm #align set.preimage_const_add_Iio Set.preimage_const_add_Iio @[simp] theorem preimage_const_add_Icc : (fun x => a + x) ⁻¹' Icc b c = Icc (b - a) (c - a) := by simp [← Ici_inter_Iic] #align set.preimage_const_add_Icc Set.preimage_const_add_Icc @[simp] theorem preimage_const_add_Ico : (fun x => a + x) ⁻¹' Ico b c = Ico (b - a) (c - a) := by simp [← Ici_inter_Iio] #align set.preimage_const_add_Ico Set.preimage_const_add_Ico @[simp] theorem preimage_const_add_Ioc : (fun x => a + x) ⁻¹' Ioc b c = Ioc (b - a) (c - a) := by simp [← Ioi_inter_Iic] #align set.preimage_const_add_Ioc Set.preimage_const_add_Ioc @[simp] theorem preimage_const_add_Ioo : (fun x => a + x) ⁻¹' Ioo b c = Ioo (b - a) (c - a) := by simp [← Ioi_inter_Iio] #align set.preimage_const_add_Ioo Set.preimage_const_add_Ioo /-! ### Preimages under `x ↦ x + a` -/ @[simp] theorem preimage_add_const_Ici : (fun x => x + a) ⁻¹' Ici b = Ici (b - a) := ext fun _x => sub_le_iff_le_add.symm #align set.preimage_add_const_Ici Set.preimage_add_const_Ici @[simp] theorem preimage_add_const_Ioi : (fun x => x + a) ⁻¹' Ioi b = Ioi (b - a) := ext fun _x => sub_lt_iff_lt_add.symm #align set.preimage_add_const_Ioi Set.preimage_add_const_Ioi @[simp] theorem preimage_add_const_Iic : (fun x => x + a) ⁻¹' Iic b = Iic (b - a) := ext fun _x => le_sub_iff_add_le.symm #align set.preimage_add_const_Iic Set.preimage_add_const_Iic @[simp] theorem preimage_add_const_Iio : (fun x => x + a) ⁻¹' Iio b = Iio (b - a) := ext fun _x => lt_sub_iff_add_lt.symm #align set.preimage_add_const_Iio Set.preimage_add_const_Iio @[simp] theorem preimage_add_const_Icc : (fun x => x + a) ⁻¹' Icc b c = Icc (b - a) (c - a) := by simp [← Ici_inter_Iic] #align set.preimage_add_const_Icc Set.preimage_add_const_Icc @[simp] theorem preimage_add_const_Ico : (fun x => x + a) ⁻¹' Ico b c = Ico (b - a) (c - a) := by simp [← Ici_inter_Iio] #align set.preimage_add_const_Ico Set.preimage_add_const_Ico @[simp] theorem preimage_add_const_Ioc : (fun x => x + a) ⁻¹' Ioc b c = Ioc (b - a) (c - a) := by simp [← Ioi_inter_Iic] #align set.preimage_add_const_Ioc Set.preimage_add_const_Ioc @[simp] theorem preimage_add_const_Ioo : (fun x => x + a) ⁻¹' Ioo b c = Ioo (b - a) (c - a) := by simp [← Ioi_inter_Iio] #align set.preimage_add_const_Ioo Set.preimage_add_const_Ioo /-! ### Preimages under `x ↦ -x` -/ @[simp] theorem preimage_neg_Ici : -Ici a = Iic (-a) := ext fun _x => le_neg #align set.preimage_neg_Ici Set.preimage_neg_Ici @[simp] theorem preimage_neg_Iic : -Iic a = Ici (-a) := ext fun _x => neg_le #align set.preimage_neg_Iic Set.preimage_neg_Iic @[simp] theorem preimage_neg_Ioi : -Ioi a = Iio (-a) := ext fun _x => lt_neg #align set.preimage_neg_Ioi Set.preimage_neg_Ioi @[simp] theorem preimage_neg_Iio : -Iio a = Ioi (-a) := ext fun _x => neg_lt #align set.preimage_neg_Iio Set.preimage_neg_Iio @[simp] theorem preimage_neg_Icc : -Icc a b = Icc (-b) (-a) := by simp [← Ici_inter_Iic, inter_comm] #align set.preimage_neg_Icc Set.preimage_neg_Icc @[simp] theorem preimage_neg_Ico : -Ico a b = Ioc (-b) (-a) := by simp [← Ici_inter_Iio, ← Ioi_inter_Iic, inter_comm] #align set.preimage_neg_Ico Set.preimage_neg_Ico @[simp] theorem preimage_neg_Ioc : -Ioc a b = Ico (-b) (-a) := by simp [← Ioi_inter_Iic, ← Ici_inter_Iio, inter_comm] #align set.preimage_neg_Ioc Set.preimage_neg_Ioc @[simp] theorem preimage_neg_Ioo : -Ioo a b = Ioo (-b) (-a) := by simp [← Ioi_inter_Iio, inter_comm] #align set.preimage_neg_Ioo Set.preimage_neg_Ioo /-! ### Preimages under `x ↦ x - a` -/ @[simp] theorem preimage_sub_const_Ici : (fun x => x - a) ⁻¹' Ici b = Ici (b + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Ici Set.preimage_sub_const_Ici @[simp] theorem preimage_sub_const_Ioi : (fun x => x - a) ⁻¹' Ioi b = Ioi (b + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Ioi Set.preimage_sub_const_Ioi @[simp] theorem preimage_sub_const_Iic : (fun x => x - a) ⁻¹' Iic b = Iic (b + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Iic Set.preimage_sub_const_Iic @[simp] theorem preimage_sub_const_Iio : (fun x => x - a) ⁻¹' Iio b = Iio (b + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Iio Set.preimage_sub_const_Iio @[simp] theorem preimage_sub_const_Icc : (fun x => x - a) ⁻¹' Icc b c = Icc (b + a) (c + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Icc Set.preimage_sub_const_Icc @[simp] theorem preimage_sub_const_Ico : (fun x => x - a) ⁻¹' Ico b c = Ico (b + a) (c + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Ico Set.preimage_sub_const_Ico @[simp] theorem preimage_sub_const_Ioc : (fun x => x - a) ⁻¹' Ioc b c = Ioc (b + a) (c + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Ioc Set.preimage_sub_const_Ioc @[simp] theorem preimage_sub_const_Ioo : (fun x => x - a) ⁻¹' Ioo b c = Ioo (b + a) (c + a) := by simp [sub_eq_add_neg] #align set.preimage_sub_const_Ioo Set.preimage_sub_const_Ioo /-! ### Preimages under `x ↦ a - x` -/ @[simp] theorem preimage_const_sub_Ici : (fun x => a - x) ⁻¹' Ici b = Iic (a - b) := ext fun _x => le_sub_comm #align set.preimage_const_sub_Ici Set.preimage_const_sub_Ici @[simp] theorem preimage_const_sub_Iic : (fun x => a - x) ⁻¹' Iic b = Ici (a - b) := ext fun _x => sub_le_comm #align set.preimage_const_sub_Iic Set.preimage_const_sub_Iic @[simp] theorem preimage_const_sub_Ioi : (fun x => a - x) ⁻¹' Ioi b = Iio (a - b) := ext fun _x => lt_sub_comm #align set.preimage_const_sub_Ioi Set.preimage_const_sub_Ioi @[simp] theorem preimage_const_sub_Iio : (fun x => a - x) ⁻¹' Iio b = Ioi (a - b) := ext fun _x => sub_lt_comm #align set.preimage_const_sub_Iio Set.preimage_const_sub_Iio @[simp] theorem preimage_const_sub_Icc : (fun x => a - x) ⁻¹' Icc b c = Icc (a - c) (a - b) := by simp [← Ici_inter_Iic, inter_comm] #align set.preimage_const_sub_Icc Set.preimage_const_sub_Icc @[simp] theorem preimage_const_sub_Ico : (fun x => a - x) ⁻¹' Ico b c = Ioc (a - c) (a - b) := by simp [← Ioi_inter_Iic, ← Ici_inter_Iio, inter_comm] #align set.preimage_const_sub_Ico Set.preimage_const_sub_Ico @[simp] theorem preimage_const_sub_Ioc : (fun x => a - x) ⁻¹' Ioc b c = Ico (a - c) (a - b) := by simp [← Ioi_inter_Iic, ← Ici_inter_Iio, inter_comm] #align set.preimage_const_sub_Ioc Set.preimage_const_sub_Ioc @[simp] theorem preimage_const_sub_Ioo : (fun x => a - x) ⁻¹' Ioo b c = Ioo (a - c) (a - b) := by simp [← Ioi_inter_Iio, inter_comm] #align set.preimage_const_sub_Ioo Set.preimage_const_sub_Ioo /-! ### Images under `x ↦ a + x` -/ -- @[simp] -- Porting note (#10618): simp can prove this modulo `add_comm` theorem image_const_add_Iic : (fun x => a + x) '' Iic b = Iic (a + b) := by simp [add_comm] #align set.image_const_add_Iic Set.image_const_add_Iic -- @[simp] -- Porting note (#10618): simp can prove this modulo `add_comm` theorem image_const_add_Iio : (fun x => a + x) '' Iio b = Iio (a + b) := by simp [add_comm] #align set.image_const_add_Iio Set.image_const_add_Iio /-! ### Images under `x ↦ x + a` -/ -- @[simp] -- Porting note (#10618): simp can prove this theorem image_add_const_Iic : (fun x => x + a) '' Iic b = Iic (b + a) := by simp #align set.image_add_const_Iic Set.image_add_const_Iic -- @[simp] -- Porting note (#10618): simp can prove this theorem image_add_const_Iio : (fun x => x + a) '' Iio b = Iio (b + a) := by simp #align set.image_add_const_Iio Set.image_add_const_Iio /-! ### Images under `x ↦ -x` -/ theorem image_neg_Ici : Neg.neg '' Ici a = Iic (-a) := by simp #align set.image_neg_Ici Set.image_neg_Ici theorem image_neg_Iic : Neg.neg '' Iic a = Ici (-a) := by simp #align set.image_neg_Iic Set.image_neg_Iic theorem image_neg_Ioi : Neg.neg '' Ioi a = Iio (-a) := by simp #align set.image_neg_Ioi Set.image_neg_Ioi theorem image_neg_Iio : Neg.neg '' Iio a = Ioi (-a) := by simp #align set.image_neg_Iio Set.image_neg_Iio theorem image_neg_Icc : Neg.neg '' Icc a b = Icc (-b) (-a) := by simp #align set.image_neg_Icc Set.image_neg_Icc theorem image_neg_Ico : Neg.neg '' Ico a b = Ioc (-b) (-a) := by simp #align set.image_neg_Ico Set.image_neg_Ico theorem image_neg_Ioc : Neg.neg '' Ioc a b = Ico (-b) (-a) := by simp #align set.image_neg_Ioc Set.image_neg_Ioc theorem image_neg_Ioo : Neg.neg '' Ioo a b = Ioo (-b) (-a) := by simp #align set.image_neg_Ioo Set.image_neg_Ioo /-! ### Images under `x ↦ a - x` -/ @[simp] theorem image_const_sub_Ici : (fun x => a - x) '' Ici b = Iic (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Ici Set.image_const_sub_Ici @[simp] theorem image_const_sub_Iic : (fun x => a - x) '' Iic b = Ici (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Iic Set.image_const_sub_Iic @[simp] theorem image_const_sub_Ioi : (fun x => a - x) '' Ioi b = Iio (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Ioi Set.image_const_sub_Ioi @[simp] theorem image_const_sub_Iio : (fun x => a - x) '' Iio b = Ioi (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Iio Set.image_const_sub_Iio @[simp] theorem image_const_sub_Icc : (fun x => a - x) '' Icc b c = Icc (a - c) (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Icc Set.image_const_sub_Icc @[simp] theorem image_const_sub_Ico : (fun x => a - x) '' Ico b c = Ioc (a - c) (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Ico Set.image_const_sub_Ico @[simp] theorem image_const_sub_Ioc : (fun x => a - x) '' Ioc b c = Ico (a - c) (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Ioc Set.image_const_sub_Ioc @[simp] theorem image_const_sub_Ioo : (fun x => a - x) '' Ioo b c = Ioo (a - c) (a - b) := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_Ioo Set.image_const_sub_Ioo /-! ### Images under `x ↦ x - a` -/ @[simp] theorem image_sub_const_Ici : (fun x => x - a) '' Ici b = Ici (b - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Ici Set.image_sub_const_Ici @[simp] theorem image_sub_const_Iic : (fun x => x - a) '' Iic b = Iic (b - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Iic Set.image_sub_const_Iic @[simp] theorem image_sub_const_Ioi : (fun x => x - a) '' Ioi b = Ioi (b - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Ioi Set.image_sub_const_Ioi @[simp] theorem image_sub_const_Iio : (fun x => x - a) '' Iio b = Iio (b - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Iio Set.image_sub_const_Iio @[simp] theorem image_sub_const_Icc : (fun x => x - a) '' Icc b c = Icc (b - a) (c - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Icc Set.image_sub_const_Icc @[simp] theorem image_sub_const_Ico : (fun x => x - a) '' Ico b c = Ico (b - a) (c - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Ico Set.image_sub_const_Ico @[simp] theorem image_sub_const_Ioc : (fun x => x - a) '' Ioc b c = Ioc (b - a) (c - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Ioc Set.image_sub_const_Ioc @[simp] theorem image_sub_const_Ioo : (fun x => x - a) '' Ioo b c = Ioo (b - a) (c - a) := by simp [sub_eq_neg_add] #align set.image_sub_const_Ioo Set.image_sub_const_Ioo /-! ### Bijections -/ theorem Iic_add_bij : BijOn (· + a) (Iic b) (Iic (b + a)) := image_add_const_Iic a b ▸ (add_left_injective _).injOn.bijOn_image #align set.Iic_add_bij Set.Iic_add_bij theorem Iio_add_bij : BijOn (· + a) (Iio b) (Iio (b + a)) := image_add_const_Iio a b ▸ (add_left_injective _).injOn.bijOn_image #align set.Iio_add_bij Set.Iio_add_bij end OrderedAddCommGroup section LinearOrderedAddCommGroup variable [LinearOrderedAddCommGroup α] (a b c d : α) @[simp] theorem preimage_const_add_uIcc : (fun x => a + x) ⁻¹' [[b, c]] = [[b - a, c - a]] := by simp only [← Icc_min_max, preimage_const_add_Icc, min_sub_sub_right, max_sub_sub_right] #align set.preimage_const_add_uIcc Set.preimage_const_add_uIcc @[simp] theorem preimage_add_const_uIcc : (fun x => x + a) ⁻¹' [[b, c]] = [[b - a, c - a]] := by simpa only [add_comm] using preimage_const_add_uIcc a b c #align set.preimage_add_const_uIcc Set.preimage_add_const_uIcc -- TODO: Why is the notation `-[[a, b]]` broken? @[simp] theorem preimage_neg_uIcc : @Neg.neg (Set α) Set.neg [[a, b]] = [[-a, -b]] := by simp only [← Icc_min_max, preimage_neg_Icc, min_neg_neg, max_neg_neg] #align set.preimage_neg_uIcc Set.preimage_neg_uIcc @[simp] theorem preimage_sub_const_uIcc : (fun x => x - a) ⁻¹' [[b, c]] = [[b + a, c + a]] := by simp [sub_eq_add_neg] #align set.preimage_sub_const_uIcc Set.preimage_sub_const_uIcc @[simp] theorem preimage_const_sub_uIcc : (fun x => a - x) ⁻¹' [[b, c]] = [[a - b, a - c]] := by simp_rw [← Icc_min_max, preimage_const_sub_Icc] simp only [sub_eq_add_neg, min_add_add_left, max_add_add_left, min_neg_neg, max_neg_neg] #align set.preimage_const_sub_uIcc Set.preimage_const_sub_uIcc -- @[simp] -- Porting note (#10618): simp can prove this module `add_comm` theorem image_const_add_uIcc : (fun x => a + x) '' [[b, c]] = [[a + b, a + c]] := by simp [add_comm] #align set.image_const_add_uIcc Set.image_const_add_uIcc -- @[simp] -- Porting note (#10618): simp can prove this theorem image_add_const_uIcc : (fun x => x + a) '' [[b, c]] = [[b + a, c + a]] := by simp #align set.image_add_const_uIcc Set.image_add_const_uIcc @[simp] theorem image_const_sub_uIcc : (fun x => a - x) '' [[b, c]] = [[a - b, a - c]] := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_uIcc Set.image_const_sub_uIcc @[simp] theorem image_sub_const_uIcc : (fun x => x - a) '' [[b, c]] = [[b - a, c - a]] := by simp [sub_eq_add_neg, add_comm] #align set.image_sub_const_uIcc Set.image_sub_const_uIcc theorem image_neg_uIcc : Neg.neg '' [[a, b]] = [[-a, -b]] := by simp #align set.image_neg_uIcc Set.image_neg_uIcc variable {a b c d} /-- If `[c, d]` is a subinterval of `[a, b]`, then the distance between `c` and `d` is less than or equal to that of `a` and `b` -/ theorem abs_sub_le_of_uIcc_subset_uIcc (h : [[c, d]] ⊆ [[a, b]]) : \|d - c\| ≤ \|b - a\| := by rw [← max_sub_min_eq_abs, ← max_sub_min_eq_abs] rw [uIcc_subset_uIcc_iff_le] at h exact sub_le_sub h.2 h.1 #align set.abs_sub_le_of_uIcc_subset_uIcc Set.abs_sub_le_of_uIcc_subset_uIcc /-- If `c ∈ [a, b]`, then the distance between `a` and `c` is less than or equal to that of `a` and `b` -/ theorem abs_sub_left_of_mem_uIcc (h : c ∈ [[a, b]]) : \|c - a\| ≤ \|b - a\| := abs_sub_le_of_uIcc_subset_uIcc <\| uIcc_subset_uIcc_left h #align set.abs_sub_left_of_mem_uIcc Set.abs_sub_left_of_mem_uIcc /-- If `x ∈ [a, b]`, then the distance between `c` and `b` is less than or equal to that of `a` and `b` -/ theorem abs_sub_right_of_mem_uIcc (h : c ∈ [[a, b]]) : \|b - c\| ≤ \|b - a\| := abs_sub_le_of_uIcc_subset_uIcc <\| uIcc_subset_uIcc_right h #align set.abs_sub_right_of_mem_uIcc Set.abs_sub_right_of_mem_uIcc end LinearOrderedAddCommGroup /-! ### Multiplication and inverse in a field -/ section LinearOrderedField variable [LinearOrderedField α] {a : α} @[simp] theorem preimage_mul_const_Iio (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Iio a = Iio (a / c) := ext fun _x => (lt_div_iff h).symm #align set.preimage_mul_const_Iio Set.preimage_mul_const_Iio @[simp] theorem preimage_mul_const_Ioi (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioi a = Ioi (a / c) := ext fun _x => (div_lt_iff h).symm #align set.preimage_mul_const_Ioi Set.preimage_mul_const_Ioi @[simp] theorem preimage_mul_const_Iic (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Iic a = Iic (a / c) := ext fun _x => (le_div_iff h).symm #align set.preimage_mul_const_Iic Set.preimage_mul_const_Iic @[simp] theorem preimage_mul_const_Ici (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ici a = Ici (a / c) := ext fun _x => (div_le_iff h).symm #align set.preimage_mul_const_Ici Set.preimage_mul_const_Ici @[simp] theorem preimage_mul_const_Ioo (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioo a b = Ioo (a / c) (b / c) := by simp [← Ioi_inter_Iio, h] #align set.preimage_mul_const_Ioo Set.preimage_mul_const_Ioo @[simp] theorem preimage_mul_const_Ioc (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioc a b = Ioc (a / c) (b / c) := by simp [← Ioi_inter_Iic, h] #align set.preimage_mul_const_Ioc Set.preimage_mul_const_Ioc @[simp] theorem preimage_mul_const_Ico (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ico a b = Ico (a / c) (b / c) := by simp [← Ici_inter_Iio, h] #align set.preimage_mul_const_Ico Set.preimage_mul_const_Ico @[simp] theorem preimage_mul_const_Icc (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Icc a b = Icc (a / c) (b / c) := by simp [← Ici_inter_Iic, h] #align set.preimage_mul_const_Icc Set.preimage_mul_const_Icc @[simp] theorem preimage_mul_const_Iio_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Iio a = Ioi (a / c) := ext fun _x => (div_lt_iff_of_neg h).symm #align set.preimage_mul_const_Iio_of_neg Set.preimage_mul_const_Iio_of_neg @[simp] theorem preimage_mul_const_Ioi_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ioi a = Iio (a / c) := ext fun _x => (lt_div_iff_of_neg h).symm #align set.preimage_mul_const_Ioi_of_neg Set.preimage_mul_const_Ioi_of_neg @[simp] theorem preimage_mul_const_Iic_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Iic a = Ici (a / c) := ext fun _x => (div_le_iff_of_neg h).symm #align set.preimage_mul_const_Iic_of_neg Set.preimage_mul_const_Iic_of_neg @[simp] theorem preimage_mul_const_Ici_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ici a = Iic (a / c) := ext fun _x => (le_div_iff_of_neg h).symm #align set.preimage_mul_const_Ici_of_neg Set.preimage_mul_const_Ici_of_neg @[simp] theorem preimage_mul_const_Ioo_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ioo a b = Ioo (b / c) (a / c) := by simp [← Ioi_inter_Iio, h, inter_comm] #align set.preimage_mul_const_Ioo_of_neg Set.preimage_mul_const_Ioo_of_neg @[simp] theorem preimage_mul_const_Ioc_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ioc a b = Ico (b / c) (a / c) := by simp [← Ioi_inter_Iic, ← Ici_inter_Iio, h, inter_comm] #align set.preimage_mul_const_Ioc_of_neg Set.preimage_mul_const_Ioc_of_neg @[simp] theorem preimage_mul_const_Ico_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ico a b = Ioc (b / c) (a / c) := by simp [← Ici_inter_Iio, ← Ioi_inter_Iic, h, inter_comm] #align set.preimage_mul_const_Ico_of_neg Set.preimage_mul_const_Ico_of_neg @[simp] theorem preimage_mul_const_Icc_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Icc a b = Icc (b / c) (a / c) := by simp [← Ici_inter_Iic, h, inter_comm] #align set.preimage_mul_const_Icc_of_neg Set.preimage_mul_const_Icc_of_neg @[simp] theorem preimage_const_mul_Iio (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Iio a = Iio (a / c) := ext fun _x => (lt_div_iff' h).symm #align set.preimage_const_mul_Iio Set.preimage_const_mul_Iio @[simp] theorem preimage_const_mul_Ioi (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ioi a = Ioi (a / c) := ext fun _x => (div_lt_iff' h).symm #align set.preimage_const_mul_Ioi Set.preimage_const_mul_Ioi @[simp] theorem preimage_const_mul_Iic (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Iic a = Iic (a / c) := ext fun _x => (le_div_iff' h).symm #align set.preimage_const_mul_Iic Set.preimage_const_mul_Iic @[simp] theorem preimage_const_mul_Ici (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ici a = Ici (a / c) := ext fun _x => (div_le_iff' h).symm #align set.preimage_const_mul_Ici Set.preimage_const_mul_Ici @[simp] theorem preimage_const_mul_Ioo (a b : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ioo a b = Ioo (a / c) (b / c) := by simp [← Ioi_inter_Iio, h] #align set.preimage_const_mul_Ioo Set.preimage_const_mul_Ioo @[simp] theorem preimage_const_mul_Ioc (a b : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ioc a b = Ioc (a / c) (b / c) := by simp [← Ioi_inter_Iic, h] #align set.preimage_const_mul_Ioc Set.preimage_const_mul_Ioc @[simp] theorem preimage_const_mul_Ico (a b : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ico a b = Ico (a / c) (b / c) := by simp [← Ici_inter_Iio, h] #align set.preimage_const_mul_Ico Set.preimage_const_mul_Ico @[simp] theorem preimage_const_mul_Icc (a b : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Icc a b = Icc (a / c) (b / c) := by simp [← Ici_inter_Iic, h] #align set.preimage_const_mul_Icc Set.preimage_const_mul_Icc @[simp] theorem preimage_const_mul_Iio_of_neg (a : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Iio a = Ioi (a / c) := by simpa only [mul_comm] using preimage_mul_const_Iio_of_neg a h #align set.preimage_const_mul_Iio_of_neg Set.preimage_const_mul_Iio_of_neg @[simp] theorem preimage_const_mul_Ioi_of_neg (a : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Ioi a = Iio (a / c) := by simpa only [mul_comm] using preimage_mul_const_Ioi_of_neg a h #align set.preimage_const_mul_Ioi_of_neg Set.preimage_const_mul_Ioi_of_neg @[simp] theorem preimage_const_mul_Iic_of_neg (a : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Iic a = Ici (a / c) := by simpa only [mul_comm] using preimage_mul_const_Iic_of_neg a h #align set.preimage_const_mul_Iic_of_neg Set.preimage_const_mul_Iic_of_neg @[simp] theorem preimage_const_mul_Ici_of_neg (a : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Ici a = Iic (a / c) := by simpa only [mul_comm] using preimage_mul_const_Ici_of_neg a h #align set.preimage_const_mul_Ici_of_neg Set.preimage_const_mul_Ici_of_neg @[simp] theorem preimage_const_mul_Ioo_of_neg (a b : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Ioo a b = Ioo (b / c) (a / c) := by simpa only [mul_comm] using preimage_mul_const_Ioo_of_neg a b h #align set.preimage_const_mul_Ioo_of_neg Set.preimage_const_mul_Ioo_of_neg @[simp] theorem preimage_const_mul_Ioc_of_neg (a b : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Ioc a b = Ico (b / c) (a / c) := by simpa only [mul_comm] using preimage_mul_const_Ioc_of_neg a b h #align set.preimage_const_mul_Ioc_of_neg Set.preimage_const_mul_Ioc_of_neg @[simp] theorem preimage_const_mul_Ico_of_neg (a b : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Ico a b = Ioc (b / c) (a / c) := by simpa only [mul_comm] using preimage_mul_const_Ico_of_neg a b h #align set.preimage_const_mul_Ico_of_neg Set.preimage_const_mul_Ico_of_neg @[simp] theorem preimage_const_mul_Icc_of_neg (a b : α) {c : α} (h : c < 0) : (c * ·) ⁻¹' Icc a b = Icc (b / c) (a / c) := by simpa only [mul_comm] using preimage_mul_const_Icc_of_neg a b h #align set.preimage_const_mul_Icc_of_neg Set.preimage_const_mul_Icc_of_neg @[simp] theorem preimage_mul_const_uIcc (ha : a ≠ 0) (b c : α) : (· * a) ⁻¹' [[b, c]] = [[b / a, c / a]] := (lt_or_gt_of_ne ha).elim (fun h => by simp [← Icc_min_max, h, h.le, min_div_div_right_of_nonpos, max_div_div_right_of_nonpos]) fun ha : 0 < a => by simp [← Icc_min_max, ha, ha.le, min_div_div_right, max_div_div_right] #align set.preimage_mul_const_uIcc Set.preimage_mul_const_uIcc @[simp] theorem preimage_const_mul_uIcc (ha : a ≠ 0) (b c : α) : (a * ·) ⁻¹' [[b, c]] = [[b / a, c / a]] := by simp only [← preimage_mul_const_uIcc ha, mul_comm] #align set.preimage_const_mul_uIcc Set.preimage_const_mul_uIcc @[simp] theorem preimage_div_const_uIcc (ha : a ≠ 0) (b c : α) : (fun x => x / a) ⁻¹' [[b, c]] = [[b * a, c * a]] := by simp only [div_eq_mul_inv, preimage_mul_const_uIcc (inv_ne_zero ha), inv_inv] #align set.preimage_div_const_uIcc Set.preimage_div_const_uIcc @[simp] theorem image_mul_const_uIcc (a b c : α) : (· * a) '' [[b, c]] = [[b * a, c * a]] := if ha : a = 0 then by simp [ha] else calc (fun x => x * a) '' [[b, c]] = (· * a⁻¹) ⁻¹' [[b, c]] := (Units.mk0 a ha).mulRight.image_eq_preimage _ _ = (fun x => x / a) ⁻¹' [[b, c]] := by simp only [div_eq_mul_inv] _ = [[b * a, c * a]] := preimage_div_const_uIcc ha _ _ #align set.image_mul_const_uIcc Set.image_mul_const_uIcc @[simp]	Mathlib/Data/Set/Pointwise/Interval.lean	804	805	theorem image_const_mul_uIcc (a b c : α) : (a * ·) '' [[b, c]] = [[a * b, a * c]] := by	simpa only [mul_comm] using image_mul_const_uIcc a b c
/- Copyright (c) 2019 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen, Wen Yang -/ import Mathlib.LinearAlgebra.Matrix.Transvection import Mathlib.LinearAlgebra.Matrix.NonsingularInverse import Mathlib.Tactic.FinCases #align_import linear_algebra.matrix.block from "leanprover-community/mathlib"@"6ca1a09bc9aa75824bf97388c9e3b441fc4ccf3f" /-! # Block matrices and their determinant This file defines a predicate `Matrix.BlockTriangular` saying a matrix is block triangular, and proves the value of the determinant for various matrices built out of blocks. ## Main definitions * `Matrix.BlockTriangular` expresses that an `o` by `o` matrix is block triangular, if the rows and columns are ordered according to some order `b : o → α` ## Main results * `Matrix.det_of_blockTriangular`: the determinant of a block triangular matrix is equal to the product of the determinants of all the blocks * `Matrix.det_of_upperTriangular` and `Matrix.det_of_lowerTriangular`: the determinant of a triangular matrix is the product of the entries along the diagonal ## Tags matrix, diagonal, det, block triangular -/ open Finset Function OrderDual open Matrix universe v variable {α β m n o : Type} {m' n' : α → Type} variable {R : Type v} [CommRing R] {M N : Matrix m m R} {b : m → α} namespace Matrix section LT variable [LT α] /-- Let `b` map rows and columns of a square matrix `M` to blocks indexed by `α`s. Then `BlockTriangular M n b` says the matrix is block triangular. -/ def BlockTriangular (M : Matrix m m R) (b : m → α) : Prop := ∀ ⦃i j⦄, b j < b i → M i j = 0 #align matrix.block_triangular Matrix.BlockTriangular @[simp] protected theorem BlockTriangular.submatrix {f : n → m} (h : M.BlockTriangular b) : (M.submatrix f f).BlockTriangular (b ∘ f) := fun _ _ hij => h hij #align matrix.block_triangular.submatrix Matrix.BlockTriangular.submatrix theorem blockTriangular_reindex_iff {b : n → α} {e : m ≃ n} : (reindex e e M).BlockTriangular b ↔ M.BlockTriangular (b ∘ e) := by refine ⟨fun h => ?_, fun h => ?_⟩ · convert h.submatrix simp only [reindex_apply, submatrix_submatrix, submatrix_id_id, Equiv.symm_comp_self] · convert h.submatrix simp only [comp.assoc b e e.symm, Equiv.self_comp_symm, comp_id] #align matrix.block_triangular_reindex_iff Matrix.blockTriangular_reindex_iff protected theorem BlockTriangular.transpose : M.BlockTriangular b → Mᵀ.BlockTriangular (toDual ∘ b) := swap #align matrix.block_triangular.transpose Matrix.BlockTriangular.transpose @[simp] protected theorem blockTriangular_transpose_iff {b : m → αᵒᵈ} : Mᵀ.BlockTriangular b ↔ M.BlockTriangular (ofDual ∘ b) := forall_swap #align matrix.block_triangular_transpose_iff Matrix.blockTriangular_transpose_iff @[simp] theorem blockTriangular_zero : BlockTriangular (0 : Matrix m m R) b := fun _ _ _ => rfl #align matrix.block_triangular_zero Matrix.blockTriangular_zero protected theorem BlockTriangular.neg (hM : BlockTriangular M b) : BlockTriangular (-M) b := fun _ _ h => neg_eq_zero.2 <\| hM h #align matrix.block_triangular.neg Matrix.BlockTriangular.neg theorem BlockTriangular.add (hM : BlockTriangular M b) (hN : BlockTriangular N b) : BlockTriangular (M + N) b := fun i j h => by simp_rw [Matrix.add_apply, hM h, hN h, zero_add] #align matrix.block_triangular.add Matrix.BlockTriangular.add theorem BlockTriangular.sub (hM : BlockTriangular M b) (hN : BlockTriangular N b) : BlockTriangular (M - N) b := fun i j h => by simp_rw [Matrix.sub_apply, hM h, hN h, sub_zero] #align matrix.block_triangular.sub Matrix.BlockTriangular.sub end LT section Preorder variable [Preorder α] theorem blockTriangular_diagonal [DecidableEq m] (d : m → R) : BlockTriangular (diagonal d) b := fun _ _ h => diagonal_apply_ne' d fun h' => ne_of_lt h (congr_arg _ h') #align matrix.block_triangular_diagonal Matrix.blockTriangular_diagonal theorem blockTriangular_blockDiagonal' [DecidableEq α] (d : ∀ i : α, Matrix (m' i) (m' i) R) : BlockTriangular (blockDiagonal' d) Sigma.fst := by rintro ⟨i, i'⟩ ⟨j, j'⟩ h apply blockDiagonal'_apply_ne d i' j' fun h' => ne_of_lt h h'.symm #align matrix.block_triangular_block_diagonal' Matrix.blockTriangular_blockDiagonal' theorem blockTriangular_blockDiagonal [DecidableEq α] (d : α → Matrix m m R) : BlockTriangular (blockDiagonal d) Prod.snd := by rintro ⟨i, i'⟩ ⟨j, j'⟩ h rw [blockDiagonal'_eq_blockDiagonal, blockTriangular_blockDiagonal'] exact h #align matrix.block_triangular_block_diagonal Matrix.blockTriangular_blockDiagonal variable [DecidableEq m] theorem blockTriangular_one : BlockTriangular (1 : Matrix m m R) b := blockTriangular_diagonal _ theorem blockTriangular_stdBasisMatrix {i j : m} (hij : b i ≤ b j) (c : R) : BlockTriangular (stdBasisMatrix i j c) b := by intro r s hrs apply StdBasisMatrix.apply_of_ne rintro ⟨rfl, rfl⟩ exact (hij.trans_lt hrs).false theorem blockTriangular_stdBasisMatrix' {i j : m} (hij : b j ≤ b i) (c : R) : BlockTriangular (stdBasisMatrix i j c) (toDual ∘ b) := blockTriangular_stdBasisMatrix (by exact toDual_le_toDual.mpr hij) _ theorem blockTriangular_transvection {i j : m} (hij : b i ≤ b j) (c : R) : BlockTriangular (transvection i j c) b := blockTriangular_one.add (blockTriangular_stdBasisMatrix hij c) theorem blockTriangular_transvection' {i j : m} (hij : b j ≤ b i) (c : R) : BlockTriangular (transvection i j c) (OrderDual.toDual ∘ b) := blockTriangular_one.add (blockTriangular_stdBasisMatrix' hij c) end Preorder section LinearOrder variable [LinearOrder α] theorem BlockTriangular.mul [Fintype m] {M N : Matrix m m R} (hM : BlockTriangular M b) (hN : BlockTriangular N b) : BlockTriangular (M * N) b := by intro i j hij apply Finset.sum_eq_zero intro k _ by_cases hki : b k < b i · simp_rw [hM hki, zero_mul] · simp_rw [hN (lt_of_lt_of_le hij (le_of_not_lt hki)), mul_zero] #align matrix.block_triangular.mul Matrix.BlockTriangular.mul end LinearOrder theorem upper_two_blockTriangular [Preorder α] (A : Matrix m m R) (B : Matrix m n R) (D : Matrix n n R) {a b : α} (hab : a < b) : BlockTriangular (fromBlocks A B 0 D) (Sum.elim (fun _ => a) fun _ => b) := by rintro (c \| c) (d \| d) hcd <;> first \| simp [hab.not_lt] at hcd ⊢ #align matrix.upper_two_block_triangular Matrix.upper_two_blockTriangular /-! ### Determinant -/ variable [DecidableEq m] [Fintype m] [DecidableEq n] [Fintype n] theorem equiv_block_det (M : Matrix m m R) {p q : m → Prop} [DecidablePred p] [DecidablePred q] (e : ∀ x, q x ↔ p x) : (toSquareBlockProp M p).det = (toSquareBlockProp M q).det := by convert Matrix.det_reindex_self (Equiv.subtypeEquivRight e) (toSquareBlockProp M q) #align matrix.equiv_block_det Matrix.equiv_block_det -- Removed `@[simp]` attribute, -- as the LHS simplifies already to `M.toSquareBlock id i ⟨i, ⋯⟩ ⟨i, ⋯⟩` theorem det_toSquareBlock_id (M : Matrix m m R) (i : m) : (M.toSquareBlock id i).det = M i i := letI : Unique { a // id a = i } := ⟨⟨⟨i, rfl⟩⟩, fun j => Subtype.ext j.property⟩ (det_unique _).trans rfl #align matrix.det_to_square_block_id Matrix.det_toSquareBlock_id theorem det_toBlock (M : Matrix m m R) (p : m → Prop) [DecidablePred p] : M.det = (fromBlocks (toBlock M p p) (toBlock M p fun j => ¬p j) (toBlock M (fun j => ¬p j) p) <\| toBlock M (fun j => ¬p j) fun j => ¬p j).det := by rw [← Matrix.det_reindex_self (Equiv.sumCompl p).symm M] rw [det_apply', det_apply'] congr; ext σ; congr; ext x generalize hy : σ x = y cases x <;> cases y <;> simp only [Matrix.reindex_apply, toBlock_apply, Equiv.symm_symm, Equiv.sumCompl_apply_inr, Equiv.sumCompl_apply_inl, fromBlocks_apply₁₁, fromBlocks_apply₁₂, fromBlocks_apply₂₁, fromBlocks_apply₂₂, Matrix.submatrix_apply] #align matrix.det_to_block Matrix.det_toBlock theorem twoBlockTriangular_det (M : Matrix m m R) (p : m → Prop) [DecidablePred p] (h : ∀ i, ¬p i → ∀ j, p j → M i j = 0) : M.det = (toSquareBlockProp M p).det * (toSquareBlockProp M fun i => ¬p i).det := by rw [det_toBlock M p] convert det_fromBlocks_zero₂₁ (toBlock M p p) (toBlock M p fun j => ¬p j) (toBlock M (fun j => ¬p j) fun j => ¬p j) ext i j exact h (↑i) i.2 (↑j) j.2 #align matrix.two_block_triangular_det Matrix.twoBlockTriangular_det	Mathlib/LinearAlgebra/Matrix/Block.lean	211	217	theorem twoBlockTriangular_det' (M : Matrix m m R) (p : m → Prop) [DecidablePred p] (h : ∀ i, p i → ∀ j, ¬p j → M i j = 0) : M.det = (toSquareBlockProp M p).det * (toSquareBlockProp M fun i => ¬p i).det := by	rw [M.twoBlockTriangular_det fun i => ¬p i, mul_comm] · congr 1 exact equiv_block_det _ fun _ => not_not.symm · simpa only [Classical.not_not] using h
/- Copyright (c) 2023 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne -/ import Mathlib.MeasureTheory.Constructions.Pi import Mathlib.Probability.Kernel.Basic /-! # Independence with respect to a kernel and a measure A family of sets of sets `π : ι → Set (Set Ω)` is independent with respect to a kernel `κ : kernel α Ω` and a measure `μ` on `α` if for any finite set of indices `s = {i_1, ..., i_n}`, for any sets `f i_1 ∈ π i_1, ..., f i_n ∈ π i_n`, then for `μ`-almost every `a : α`, `κ a (⋂ i in s, f i) = ∏ i ∈ s, κ a (f i)`. This notion of independence is a generalization of both independence and conditional independence. For conditional independence, `κ` is the conditional kernel `ProbabilityTheory.condexpKernel` and `μ` is the ambiant measure. For (non-conditional) independence, `κ = kernel.const Unit μ` and the measure is the Dirac measure on `Unit`. The main purpose of this file is to prove only once the properties that hold for both conditional and non-conditional independence. ## Main definitions * `ProbabilityTheory.kernel.iIndepSets`: independence of a family of sets of sets. Variant for two sets of sets: `ProbabilityTheory.kernel.IndepSets`. * `ProbabilityTheory.kernel.iIndep`: independence of a family of σ-algebras. Variant for two σ-algebras: `Indep`. * `ProbabilityTheory.kernel.iIndepSet`: independence of a family of sets. Variant for two sets: `ProbabilityTheory.kernel.IndepSet`. * `ProbabilityTheory.kernel.iIndepFun`: independence of a family of functions (random variables). Variant for two functions: `ProbabilityTheory.kernel.IndepFun`. See the file `Mathlib/Probability/Kernel/Basic.lean` for a more detailed discussion of these definitions in the particular case of the usual independence notion. ## Main statements * `ProbabilityTheory.kernel.iIndepSets.iIndep`: if π-systems are independent as sets of sets, then the measurable space structures they generate are independent. * `ProbabilityTheory.kernel.IndepSets.Indep`: variant with two π-systems. -/ open MeasureTheory MeasurableSpace open scoped MeasureTheory ENNReal namespace ProbabilityTheory.kernel variable {α Ω ι : Type} section Definitions variable {_mα : MeasurableSpace α} /-- A family of sets of sets `π : ι → Set (Set Ω)` is independent with respect to a kernel `κ` and a measure `μ` if for any finite set of indices `s = {i_1, ..., i_n}`, for any sets `f i_1 ∈ π i_1, ..., f i_n ∈ π i_n`, then `∀ᵐ a ∂μ, κ a (⋂ i in s, f i) = ∏ i ∈ s, κ a (f i)`. It will be used for families of pi_systems. -/ def iIndepSets {_mΩ : MeasurableSpace Ω} (π : ι → Set (Set Ω)) (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := ∀ (s : Finset ι) {f : ι → Set Ω} (_H : ∀ i, i ∈ s → f i ∈ π i), ∀ᵐ a ∂μ, κ a (⋂ i ∈ s, f i) = ∏ i ∈ s, κ a (f i) /-- Two sets of sets `s₁, s₂` are independent with respect to a kernel `κ` and a measure `μ` if for any sets `t₁ ∈ s₁, t₂ ∈ s₂`, then `∀ᵐ a ∂μ, κ a (t₁ ∩ t₂) = κ a (t₁) κ a (t₂)` -/ def IndepSets {_mΩ : MeasurableSpace Ω} (s1 s2 : Set (Set Ω)) (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := ∀ t1 t2 : Set Ω, t1 ∈ s1 → t2 ∈ s2 → (∀ᵐ a ∂μ, κ a (t1 ∩ t2) = κ a t1 * κ a t2) /-- A family of measurable space structures (i.e. of σ-algebras) is independent with respect to a kernel `κ` and a measure `μ` if the family of sets of measurable sets they define is independent. -/ def iIndep (m : ι → MeasurableSpace Ω) {_mΩ : MeasurableSpace Ω} (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := iIndepSets (fun x ↦ {s \| MeasurableSet[m x] s}) κ μ /-- Two measurable space structures (or σ-algebras) `m₁, m₂` are independent with respect to a kernel `κ` and a measure `μ` if for any sets `t₁ ∈ m₁, t₂ ∈ m₂`, `∀ᵐ a ∂μ, κ a (t₁ ∩ t₂) = κ a (t₁) * κ a (t₂)` -/ def Indep (m₁ m₂ : MeasurableSpace Ω) {_mΩ : MeasurableSpace Ω} (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := IndepSets {s \| MeasurableSet[m₁] s} {s \| MeasurableSet[m₂] s} κ μ /-- A family of sets is independent if the family of measurable space structures they generate is independent. For a set `s`, the generated measurable space has measurable sets `∅, s, sᶜ, univ`. -/ def iIndepSet {_mΩ : MeasurableSpace Ω} (s : ι → Set Ω) (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := iIndep (fun i ↦ generateFrom {s i}) κ μ /-- Two sets are independent if the two measurable space structures they generate are independent. For a set `s`, the generated measurable space structure has measurable sets `∅, s, sᶜ, univ`. -/ def IndepSet {_mΩ : MeasurableSpace Ω} (s t : Set Ω) (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := Indep (generateFrom {s}) (generateFrom {t}) κ μ /-- A family of functions defined on the same space `Ω` and taking values in possibly different spaces, each with a measurable space structure, is independent if the family of measurable space structures they generate on `Ω` is independent. For a function `g` with codomain having measurable space structure `m`, the generated measurable space structure is `MeasurableSpace.comap g m`. -/ def iIndepFun {_mΩ : MeasurableSpace Ω} {β : ι → Type} (m : ∀ x : ι, MeasurableSpace (β x)) (f : ∀ x : ι, Ω → β x) (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := iIndep (fun x ↦ MeasurableSpace.comap (f x) (m x)) κ μ /-- Two functions are independent if the two measurable space structures they generate are independent. For a function `f` with codomain having measurable space structure `m`, the generated measurable space structure is `MeasurableSpace.comap f m`. -/ def IndepFun {β γ} {_mΩ : MeasurableSpace Ω} [mβ : MeasurableSpace β] [mγ : MeasurableSpace γ] (f : Ω → β) (g : Ω → γ) (κ : kernel α Ω) (μ : Measure α := by volume_tac) : Prop := Indep (MeasurableSpace.comap f mβ) (MeasurableSpace.comap g mγ) κ μ end Definitions section ByDefinition variable {β : ι → Type} {mβ : ∀ i, MeasurableSpace (β i)} {_mα : MeasurableSpace α} {m : ι → MeasurableSpace Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {π : ι → Set (Set Ω)} {s : ι → Set Ω} {S : Finset ι} {f : ∀ x : ι, Ω → β x} lemma iIndepSets.meas_biInter (h : iIndepSets π κ μ) (s : Finset ι) {f : ι → Set Ω} (hf : ∀ i, i ∈ s → f i ∈ π i) : ∀ᵐ a ∂μ, κ a (⋂ i ∈ s, f i) = ∏ i ∈ s, κ a (f i) := h s hf lemma iIndepSets.meas_iInter [Fintype ι] (h : iIndepSets π κ μ) (hs : ∀ i, s i ∈ π i) : ∀ᵐ a ∂μ, κ a (⋂ i, s i) = ∏ i, κ a (s i) := by filter_upwards [h.meas_biInter Finset.univ (fun _i _ ↦ hs _)] with a ha using by simp [← ha] lemma iIndep.iIndepSets' (hμ : iIndep m κ μ) : iIndepSets (fun x ↦ {s \| MeasurableSet[m x] s}) κ μ := hμ lemma iIndep.meas_biInter (hμ : iIndep m κ μ) (hs : ∀ i, i ∈ S → MeasurableSet[m i] (s i)) : ∀ᵐ a ∂μ, κ a (⋂ i ∈ S, s i) = ∏ i ∈ S, κ a (s i) := hμ _ hs lemma iIndep.meas_iInter [Fintype ι] (h : iIndep m κ μ) (hs : ∀ i, MeasurableSet[m i] (s i)) : ∀ᵐ a ∂μ, κ a (⋂ i, s i) = ∏ i, κ a (s i) := by filter_upwards [h.meas_biInter (fun i (_ : i ∈ Finset.univ) ↦ hs _)] with a ha simp [← ha] protected lemma iIndepFun.iIndep (hf : iIndepFun mβ f κ μ) : iIndep (fun x ↦ (mβ x).comap (f x)) κ μ := hf lemma iIndepFun.meas_biInter (hf : iIndepFun mβ f κ μ) (hs : ∀ i, i ∈ S → MeasurableSet[(mβ i).comap (f i)] (s i)) : ∀ᵐ a ∂μ, κ a (⋂ i ∈ S, s i) = ∏ i ∈ S, κ a (s i) := hf.iIndep.meas_biInter hs lemma iIndepFun.meas_iInter [Fintype ι] (hf : iIndepFun mβ f κ μ) (hs : ∀ i, MeasurableSet[(mβ i).comap (f i)] (s i)) : ∀ᵐ a ∂μ, κ a (⋂ i, s i) = ∏ i, κ a (s i) := hf.iIndep.meas_iInter hs lemma IndepFun.meas_inter {β γ : Type} [mβ : MeasurableSpace β] [mγ : MeasurableSpace γ] {f : Ω → β} {g : Ω → γ} (hfg : IndepFun f g κ μ) {s t : Set Ω} (hs : MeasurableSet[mβ.comap f] s) (ht : MeasurableSet[mγ.comap g] t) : ∀ᵐ a ∂μ, κ a (s ∩ t) = κ a s κ a t := hfg _ _ hs ht end ByDefinition section Indep variable {_mα : MeasurableSpace α} @[symm] theorem IndepSets.symm {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {s₁ s₂ : Set (Set Ω)} (h : IndepSets s₁ s₂ κ μ) : IndepSets s₂ s₁ κ μ := by intros t1 t2 ht1 ht2 filter_upwards [h t2 t1 ht2 ht1] with a ha rwa [Set.inter_comm, mul_comm] @[symm] theorem Indep.symm {m₁ m₂ : MeasurableSpace Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h : Indep m₁ m₂ κ μ) : Indep m₂ m₁ κ μ := IndepSets.symm h theorem indep_bot_right (m' : MeasurableSpace Ω) {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] : Indep m' ⊥ κ μ := by intros s t _ ht rw [Set.mem_setOf_eq, MeasurableSpace.measurableSet_bot_iff] at ht refine Filter.eventually_of_forall (fun a ↦ ?_) cases' ht with ht ht · rw [ht, Set.inter_empty, measure_empty, mul_zero] · rw [ht, Set.inter_univ, measure_univ, mul_one] theorem indep_bot_left (m' : MeasurableSpace Ω) {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] : Indep ⊥ m' κ μ := (indep_bot_right m').symm theorem indepSet_empty_right {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] (s : Set Ω) : IndepSet s ∅ κ μ := by simp only [IndepSet, generateFrom_singleton_empty]; exact indep_bot_right _ theorem indepSet_empty_left {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] (s : Set Ω) : IndepSet ∅ s κ μ := (indepSet_empty_right s).symm theorem indepSets_of_indepSets_of_le_left {s₁ s₂ s₃ : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : IndepSets s₁ s₂ κ μ) (h31 : s₃ ⊆ s₁) : IndepSets s₃ s₂ κ μ := fun t1 t2 ht1 ht2 => h_indep t1 t2 (Set.mem_of_subset_of_mem h31 ht1) ht2 theorem indepSets_of_indepSets_of_le_right {s₁ s₂ s₃ : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : IndepSets s₁ s₂ κ μ) (h32 : s₃ ⊆ s₂) : IndepSets s₁ s₃ κ μ := fun t1 t2 ht1 ht2 => h_indep t1 t2 ht1 (Set.mem_of_subset_of_mem h32 ht2) theorem indep_of_indep_of_le_left {m₁ m₂ m₃ : MeasurableSpace Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : Indep m₁ m₂ κ μ) (h31 : m₃ ≤ m₁) : Indep m₃ m₂ κ μ := fun t1 t2 ht1 ht2 => h_indep t1 t2 (h31 _ ht1) ht2 theorem indep_of_indep_of_le_right {m₁ m₂ m₃ : MeasurableSpace Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : Indep m₁ m₂ κ μ) (h32 : m₃ ≤ m₂) : Indep m₁ m₃ κ μ := fun t1 t2 ht1 ht2 => h_indep t1 t2 ht1 (h32 _ ht2) theorem IndepSets.union {s₁ s₂ s' : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h₁ : IndepSets s₁ s' κ μ) (h₂ : IndepSets s₂ s' κ μ) : IndepSets (s₁ ∪ s₂) s' κ μ := by intro t1 t2 ht1 ht2 cases' (Set.mem_union _ _ _).mp ht1 with ht1₁ ht1₂ · exact h₁ t1 t2 ht1₁ ht2 · exact h₂ t1 t2 ht1₂ ht2 @[simp] theorem IndepSets.union_iff {s₁ s₂ s' : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} : IndepSets (s₁ ∪ s₂) s' κ μ ↔ IndepSets s₁ s' κ μ ∧ IndepSets s₂ s' κ μ := ⟨fun h => ⟨indepSets_of_indepSets_of_le_left h Set.subset_union_left, indepSets_of_indepSets_of_le_left h Set.subset_union_right⟩, fun h => IndepSets.union h.left h.right⟩ theorem IndepSets.iUnion {s : ι → Set (Set Ω)} {s' : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (hyp : ∀ n, IndepSets (s n) s' κ μ) : IndepSets (⋃ n, s n) s' κ μ := by intro t1 t2 ht1 ht2 rw [Set.mem_iUnion] at ht1 cases' ht1 with n ht1 exact hyp n t1 t2 ht1 ht2 theorem IndepSets.bUnion {s : ι → Set (Set Ω)} {s' : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {u : Set ι} (hyp : ∀ n ∈ u, IndepSets (s n) s' κ μ) : IndepSets (⋃ n ∈ u, s n) s' κ μ := by intro t1 t2 ht1 ht2 simp_rw [Set.mem_iUnion] at ht1 rcases ht1 with ⟨n, hpn, ht1⟩ exact hyp n hpn t1 t2 ht1 ht2 theorem IndepSets.inter {s₁ s' : Set (Set Ω)} (s₂ : Set (Set Ω)) {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h₁ : IndepSets s₁ s' κ μ) : IndepSets (s₁ ∩ s₂) s' κ μ := fun t1 t2 ht1 ht2 => h₁ t1 t2 ((Set.mem_inter_iff _ _ _).mp ht1).left ht2 theorem IndepSets.iInter {s : ι → Set (Set Ω)} {s' : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h : ∃ n, IndepSets (s n) s' κ μ) : IndepSets (⋂ n, s n) s' κ μ := by intro t1 t2 ht1 ht2; cases' h with n h; exact h t1 t2 (Set.mem_iInter.mp ht1 n) ht2 theorem IndepSets.bInter {s : ι → Set (Set Ω)} {s' : Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {u : Set ι} (h : ∃ n ∈ u, IndepSets (s n) s' κ μ) : IndepSets (⋂ n ∈ u, s n) s' κ μ := by intro t1 t2 ht1 ht2 rcases h with ⟨n, hn, h⟩ exact h t1 t2 (Set.biInter_subset_of_mem hn ht1) ht2 theorem iIndep_comap_mem_iff {f : ι → Set Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} : iIndep (fun i => MeasurableSpace.comap (· ∈ f i) ⊤) κ μ ↔ iIndepSet f κ μ := by simp_rw [← generateFrom_singleton, iIndepSet] theorem iIndepSets_singleton_iff {s : ι → Set Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} : iIndepSets (fun i ↦ {s i}) κ μ ↔ ∀ S : Finset ι, ∀ᵐ a ∂μ, κ a (⋂ i ∈ S, s i) = ∏ i ∈ S, κ a (s i) := by refine ⟨fun h S ↦ h S (fun i _ ↦ rfl), fun h S f hf ↦ ?_⟩ filter_upwards [h S] with a ha have : ∀ i ∈ S, κ a (f i) = κ a (s i) := fun i hi ↦ by rw [hf i hi] rwa [Finset.prod_congr rfl this, Set.iInter₂_congr hf] theorem indepSets_singleton_iff {s t : Set Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} : IndepSets {s} {t} κ μ ↔ ∀ᵐ a ∂μ, κ a (s ∩ t) = κ a s * κ a t := ⟨fun h ↦ h s t rfl rfl, fun h s1 t1 hs1 ht1 ↦ by rwa [Set.mem_singleton_iff.mp hs1, Set.mem_singleton_iff.mp ht1]⟩ end Indep /-! ### Deducing `Indep` from `iIndep` -/ section FromiIndepToIndep variable {_mα : MeasurableSpace α} theorem iIndepSets.indepSets {s : ι → Set (Set Ω)} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : iIndepSets s κ μ) {i j : ι} (hij : i ≠ j) : IndepSets (s i) (s j) κ μ := by classical intro t₁ t₂ ht₁ ht₂ have hf_m : ∀ x : ι, x ∈ ({i, j} : Finset ι) → ite (x = i) t₁ t₂ ∈ s x := by intro x hx cases' Finset.mem_insert.mp hx with hx hx · simp [hx, ht₁] · simp [Finset.mem_singleton.mp hx, hij.symm, ht₂] have h1 : t₁ = ite (i = i) t₁ t₂ := by simp only [if_true, eq_self_iff_true] have h2 : t₂ = ite (j = i) t₁ t₂ := by simp only [hij.symm, if_false] have h_inter : ⋂ (t : ι) (_ : t ∈ ({i, j} : Finset ι)), ite (t = i) t₁ t₂ = ite (i = i) t₁ t₂ ∩ ite (j = i) t₁ t₂ := by simp only [Finset.set_biInter_singleton, Finset.set_biInter_insert] filter_upwards [h_indep {i, j} hf_m] with a h_indep' have h_prod : (∏ t ∈ ({i, j} : Finset ι), κ a (ite (t = i) t₁ t₂)) = κ a (ite (i = i) t₁ t₂) * κ a (ite (j = i) t₁ t₂) := by simp only [hij, Finset.prod_singleton, Finset.prod_insert, not_false_iff, Finset.mem_singleton] rw [h1] nth_rw 2 [h2] nth_rw 4 [h2] rw [← h_inter, ← h_prod, h_indep'] theorem iIndep.indep {m : ι → MeasurableSpace Ω} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : iIndep m κ μ) {i j : ι} (hij : i ≠ j) : Indep (m i) (m j) κ μ := iIndepSets.indepSets h_indep hij theorem iIndepFun.indepFun {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {β : ι → Type} {m : ∀ x, MeasurableSpace (β x)} {f : ∀ i, Ω → β i} (hf_Indep : iIndepFun m f κ μ) {i j : ι} (hij : i ≠ j) : IndepFun (f i) (f j) κ μ := hf_Indep.indep hij end FromiIndepToIndep /-! ## π-system lemma Independence of measurable spaces is equivalent to independence of generating π-systems. -/ section FromMeasurableSpacesToSetsOfSets /-! ### Independence of measurable space structures implies independence of generating π-systems -/ variable {_mα : MeasurableSpace α} theorem iIndep.iIndepSets {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {m : ι → MeasurableSpace Ω} {s : ι → Set (Set Ω)} (hms : ∀ n, m n = generateFrom (s n)) (h_indep : iIndep m κ μ) : iIndepSets s κ μ := fun S f hfs => h_indep S fun x hxS => ((hms x).symm ▸ measurableSet_generateFrom (hfs x hxS) : MeasurableSet[m x] (f x)) theorem Indep.indepSets {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {s1 s2 : Set (Set Ω)} (h_indep : Indep (generateFrom s1) (generateFrom s2) κ μ) : IndepSets s1 s2 κ μ := fun t1 t2 ht1 ht2 => h_indep t1 t2 (measurableSet_generateFrom ht1) (measurableSet_generateFrom ht2) end FromMeasurableSpacesToSetsOfSets section FromPiSystemsToMeasurableSpaces /-! ### Independence of generating π-systems implies independence of measurable space structures -/ variable {_mα : MeasurableSpace α} theorem IndepSets.indep_aux {m₂ m : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] {p1 p2 : Set (Set Ω)} (h2 : m₂ ≤ m) (hp2 : IsPiSystem p2) (hpm2 : m₂ = generateFrom p2) (hyp : IndepSets p1 p2 κ μ) {t1 t2 : Set Ω} (ht1 : t1 ∈ p1) (ht1m : MeasurableSet[m] t1) (ht2m : MeasurableSet[m₂] t2) : ∀ᵐ a ∂μ, κ a (t1 ∩ t2) = κ a t1 κ a t2 := by refine @induction_on_inter _ (fun t ↦ ∀ᵐ a ∂μ, κ a (t1 ∩ t) = κ a t1 * κ a t) _ m₂ hpm2 hp2 ?_ ?_ ?_ ?_ t2 ht2m · simp only [Set.inter_empty, measure_empty, mul_zero, eq_self_iff_true, Filter.eventually_true] · exact fun t ht_mem_p2 ↦ hyp t1 t ht1 ht_mem_p2 · intros t ht h filter_upwards [h] with a ha have : t1 ∩ tᶜ = t1 \ (t1 ∩ t) := by rw [Set.diff_self_inter, Set.diff_eq_compl_inter, Set.inter_comm] rw [this, measure_diff Set.inter_subset_left (ht1m.inter (h2 _ ht)) (measure_ne_top (κ a) _), measure_compl (h2 _ ht) (measure_ne_top (κ a) t), measure_univ, ENNReal.mul_sub (fun _ _ ↦ measure_ne_top (κ a) _), mul_one, ha] · intros f hf_disj hf_meas h rw [← ae_all_iff] at h filter_upwards [h] with a ha rw [Set.inter_iUnion, measure_iUnion] · rw [measure_iUnion hf_disj (fun i ↦ h2 _ (hf_meas i))] rw [← ENNReal.tsum_mul_left] congr with i rw [ha i] · intros i j hij rw [Function.onFun, Set.inter_comm t1, Set.inter_comm t1] exact Disjoint.inter_left _ (Disjoint.inter_right _ (hf_disj hij)) · exact fun i ↦ ht1m.inter (h2 _ (hf_meas i)) /-- The measurable space structures generated by independent pi-systems are independent. -/ theorem IndepSets.indep {m1 m2 m : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] {p1 p2 : Set (Set Ω)} (h1 : m1 ≤ m) (h2 : m2 ≤ m) (hp1 : IsPiSystem p1) (hp2 : IsPiSystem p2) (hpm1 : m1 = generateFrom p1) (hpm2 : m2 = generateFrom p2) (hyp : IndepSets p1 p2 κ μ) : Indep m1 m2 κ μ := by intros t1 t2 ht1 ht2 refine @induction_on_inter _ (fun t ↦ ∀ᵐ (a : α) ∂μ, κ a (t ∩ t2) = κ a t * κ a t2) _ m1 hpm1 hp1 ?_ ?_ ?_ ?_ _ ht1 · simp only [Set.empty_inter, measure_empty, zero_mul, eq_self_iff_true, Filter.eventually_true] · intros t ht_mem_p1 have ht1 : MeasurableSet[m] t := by refine h1 _ ?_ rw [hpm1] exact measurableSet_generateFrom ht_mem_p1 exact IndepSets.indep_aux h2 hp2 hpm2 hyp ht_mem_p1 ht1 ht2 · intros t ht h filter_upwards [h] with a ha have : tᶜ ∩ t2 = t2 \ (t ∩ t2) := by rw [Set.inter_comm t, Set.diff_self_inter, Set.diff_eq_compl_inter] rw [this, Set.inter_comm t t2, measure_diff Set.inter_subset_left ((h2 _ ht2).inter (h1 _ ht)) (measure_ne_top (κ a) _), Set.inter_comm, ha, measure_compl (h1 _ ht) (measure_ne_top (κ a) t), measure_univ, mul_comm (1 - κ a t), ENNReal.mul_sub (fun _ _ ↦ measure_ne_top (κ a) _), mul_one, mul_comm] · intros f hf_disj hf_meas h rw [← ae_all_iff] at h filter_upwards [h] with a ha rw [Set.inter_comm, Set.inter_iUnion, measure_iUnion] · rw [measure_iUnion hf_disj (fun i ↦ h1 _ (hf_meas i))] rw [← ENNReal.tsum_mul_right] congr 1 with i rw [Set.inter_comm t2, ha i] · intros i j hij rw [Function.onFun, Set.inter_comm t2, Set.inter_comm t2] exact Disjoint.inter_left _ (Disjoint.inter_right _ (hf_disj hij)) · exact fun i ↦ (h2 _ ht2).inter (h1 _ (hf_meas i)) theorem IndepSets.indep' {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] {p1 p2 : Set (Set Ω)} (hp1m : ∀ s ∈ p1, MeasurableSet s) (hp2m : ∀ s ∈ p2, MeasurableSet s) (hp1 : IsPiSystem p1) (hp2 : IsPiSystem p2) (hyp : IndepSets p1 p2 κ μ) : Indep (generateFrom p1) (generateFrom p2) κ μ := hyp.indep (generateFrom_le hp1m) (generateFrom_le hp2m) hp1 hp2 rfl rfl variable {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} theorem indepSets_piiUnionInter_of_disjoint [IsMarkovKernel κ] {s : ι → Set (Set Ω)} {S T : Set ι} (h_indep : iIndepSets s κ μ) (hST : Disjoint S T) : IndepSets (piiUnionInter s S) (piiUnionInter s T) κ μ := by rintro t1 t2 ⟨p1, hp1, f1, ht1_m, ht1_eq⟩ ⟨p2, hp2, f2, ht2_m, ht2_eq⟩ classical let g i := ite (i ∈ p1) (f1 i) Set.univ ∩ ite (i ∈ p2) (f2 i) Set.univ have h_P_inter : ∀ᵐ a ∂μ, κ a (t1 ∩ t2) = ∏ n ∈ p1 ∪ p2, κ a (g n) := by have hgm : ∀ i ∈ p1 ∪ p2, g i ∈ s i := by intro i hi_mem_union rw [Finset.mem_union] at hi_mem_union cases' hi_mem_union with hi1 hi2 · have hi2 : i ∉ p2 := fun hip2 => Set.disjoint_left.mp hST (hp1 hi1) (hp2 hip2) simp_rw [g, if_pos hi1, if_neg hi2, Set.inter_univ] exact ht1_m i hi1 · have hi1 : i ∉ p1 := fun hip1 => Set.disjoint_right.mp hST (hp2 hi2) (hp1 hip1) simp_rw [g, if_neg hi1, if_pos hi2, Set.univ_inter] exact ht2_m i hi2 have h_p1_inter_p2 : ((⋂ x ∈ p1, f1 x) ∩ ⋂ x ∈ p2, f2 x) = ⋂ i ∈ p1 ∪ p2, ite (i ∈ p1) (f1 i) Set.univ ∩ ite (i ∈ p2) (f2 i) Set.univ := by ext1 x simp only [Set.mem_ite_univ_right, Set.mem_inter_iff, Set.mem_iInter, Finset.mem_union] exact ⟨fun h i _ => ⟨h.1 i, h.2 i⟩, fun h => ⟨fun i hi => (h i (Or.inl hi)).1 hi, fun i hi => (h i (Or.inr hi)).2 hi⟩⟩ filter_upwards [h_indep _ hgm] with a ha rw [ht1_eq, ht2_eq, h_p1_inter_p2, ← ha] filter_upwards [h_P_inter, h_indep p1 ht1_m, h_indep p2 ht2_m] with a h_P_inter ha1 ha2 have h_μg : ∀ n, κ a (g n) = (ite (n ∈ p1) (κ a (f1 n)) 1) * (ite (n ∈ p2) (κ a (f2 n)) 1) := by intro n dsimp only [g] split_ifs with h1 h2 · exact absurd rfl (Set.disjoint_iff_forall_ne.mp hST (hp1 h1) (hp2 h2)) all_goals simp only [measure_univ, one_mul, mul_one, Set.inter_univ, Set.univ_inter] simp_rw [h_P_inter, h_μg, Finset.prod_mul_distrib, Finset.prod_ite_mem (p1 ∪ p2) p1 (fun x ↦ κ a (f1 x)), Finset.union_inter_cancel_left, Finset.prod_ite_mem (p1 ∪ p2) p2 (fun x => κ a (f2 x)), Finset.union_inter_cancel_right, ht1_eq, ← ha1, ht2_eq, ← ha2] theorem iIndepSet.indep_generateFrom_of_disjoint [IsMarkovKernel κ] {s : ι → Set Ω} (hsm : ∀ n, MeasurableSet (s n)) (hs : iIndepSet s κ μ) (S T : Set ι) (hST : Disjoint S T) : Indep (generateFrom { t \| ∃ n ∈ S, s n = t }) (generateFrom { t \| ∃ k ∈ T, s k = t }) κ μ := by rw [← generateFrom_piiUnionInter_singleton_left, ← generateFrom_piiUnionInter_singleton_left] refine IndepSets.indep' (fun t ht => generateFrom_piiUnionInter_le _ ?_ _ _ (measurableSet_generateFrom ht)) (fun t ht => generateFrom_piiUnionInter_le _ ?_ _ _ (measurableSet_generateFrom ht)) ?_ ?_ ?_ · exact fun k => generateFrom_le fun t ht => (Set.mem_singleton_iff.1 ht).symm ▸ hsm k · exact fun k => generateFrom_le fun t ht => (Set.mem_singleton_iff.1 ht).symm ▸ hsm k · exact isPiSystem_piiUnionInter _ (fun k => IsPiSystem.singleton _) _ · exact isPiSystem_piiUnionInter _ (fun k => IsPiSystem.singleton _) _ · classical exact indepSets_piiUnionInter_of_disjoint (iIndep.iIndepSets (fun n => rfl) hs) hST theorem indep_iSup_of_disjoint [IsMarkovKernel κ] {m : ι → MeasurableSpace Ω} (h_le : ∀ i, m i ≤ _mΩ) (h_indep : iIndep m κ μ) {S T : Set ι} (hST : Disjoint S T) : Indep (⨆ i ∈ S, m i) (⨆ i ∈ T, m i) κ μ := by refine IndepSets.indep (iSup₂_le fun i _ => h_le i) (iSup₂_le fun i _ => h_le i) ?_ ?_ (generateFrom_piiUnionInter_measurableSet m S).symm (generateFrom_piiUnionInter_measurableSet m T).symm ?_ · exact isPiSystem_piiUnionInter _ (fun n => @isPiSystem_measurableSet Ω (m n)) _ · exact isPiSystem_piiUnionInter _ (fun n => @isPiSystem_measurableSet Ω (m n)) _ · classical exact indepSets_piiUnionInter_of_disjoint h_indep hST theorem indep_iSup_of_directed_le {Ω} {m : ι → MeasurableSpace Ω} {m' m0 : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] (h_indep : ∀ i, Indep (m i) m' κ μ) (h_le : ∀ i, m i ≤ m0) (h_le' : m' ≤ m0) (hm : Directed (· ≤ ·) m) : Indep (⨆ i, m i) m' κ μ := by let p : ι → Set (Set Ω) := fun n => { t \| MeasurableSet[m n] t } have hp : ∀ n, IsPiSystem (p n) := fun n => @isPiSystem_measurableSet Ω (m n) have h_gen_n : ∀ n, m n = generateFrom (p n) := fun n => (@generateFrom_measurableSet Ω (m n)).symm have hp_supr_pi : IsPiSystem (⋃ n, p n) := isPiSystem_iUnion_of_directed_le p hp hm let p' := { t : Set Ω \| MeasurableSet[m'] t } have hp'_pi : IsPiSystem p' := @isPiSystem_measurableSet Ω m' have h_gen' : m' = generateFrom p' := (@generateFrom_measurableSet Ω m').symm -- the π-systems defined are independent have h_pi_system_indep : IndepSets (⋃ n, p n) p' κ μ := by refine IndepSets.iUnion ?_ conv at h_indep => intro i rw [h_gen_n i, h_gen'] exact fun n => (h_indep n).indepSets -- now go from π-systems to σ-algebras refine IndepSets.indep (iSup_le h_le) h_le' hp_supr_pi hp'_pi ?_ h_gen' h_pi_system_indep exact (generateFrom_iUnion_measurableSet _).symm theorem iIndepSet.indep_generateFrom_lt [Preorder ι] [IsMarkovKernel κ] {s : ι → Set Ω} (hsm : ∀ n, MeasurableSet (s n)) (hs : iIndepSet s κ μ) (i : ι) : Indep (generateFrom {s i}) (generateFrom { t \| ∃ j < i, s j = t }) κ μ := by convert iIndepSet.indep_generateFrom_of_disjoint hsm hs {i} { j \| j < i } (Set.disjoint_singleton_left.mpr (lt_irrefl _)) simp only [Set.mem_singleton_iff, exists_prop, exists_eq_left, Set.setOf_eq_eq_singleton'] theorem iIndepSet.indep_generateFrom_le [LinearOrder ι] [IsMarkovKernel κ] {s : ι → Set Ω} (hsm : ∀ n, MeasurableSet (s n)) (hs : iIndepSet s κ μ) (i : ι) {k : ι} (hk : i < k) : Indep (generateFrom {s k}) (generateFrom { t \| ∃ j ≤ i, s j = t }) κ μ := by convert iIndepSet.indep_generateFrom_of_disjoint hsm hs {k} { j \| j ≤ i } (Set.disjoint_singleton_left.mpr hk.not_le) simp only [Set.mem_singleton_iff, exists_prop, exists_eq_left, Set.setOf_eq_eq_singleton'] theorem iIndepSet.indep_generateFrom_le_nat [IsMarkovKernel κ] {s : ℕ → Set Ω} (hsm : ∀ n, MeasurableSet (s n)) (hs : iIndepSet s κ μ) (n : ℕ) : Indep (generateFrom {s (n + 1)}) (generateFrom { t \| ∃ k ≤ n, s k = t }) κ μ := iIndepSet.indep_generateFrom_le hsm hs _ n.lt_succ_self theorem indep_iSup_of_monotone [SemilatticeSup ι] {Ω} {m : ι → MeasurableSpace Ω} {m' m0 : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] (h_indep : ∀ i, Indep (m i) m' κ μ) (h_le : ∀ i, m i ≤ m0) (h_le' : m' ≤ m0) (hm : Monotone m) : Indep (⨆ i, m i) m' κ μ := indep_iSup_of_directed_le h_indep h_le h_le' (Monotone.directed_le hm) theorem indep_iSup_of_antitone [SemilatticeInf ι] {Ω} {m : ι → MeasurableSpace Ω} {m' m0 : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} [IsMarkovKernel κ] (h_indep : ∀ i, Indep (m i) m' κ μ) (h_le : ∀ i, m i ≤ m0) (h_le' : m' ≤ m0) (hm : Antitone m) : Indep (⨆ i, m i) m' κ μ := indep_iSup_of_directed_le h_indep h_le h_le' hm.directed_le theorem iIndepSets.piiUnionInter_of_not_mem {π : ι → Set (Set Ω)} {a : ι} {S : Finset ι} (hp_ind : iIndepSets π κ μ) (haS : a ∉ S) : IndepSets (piiUnionInter π S) (π a) κ μ := by rintro t1 t2 ⟨s, hs_mem, ft1, hft1_mem, ht1_eq⟩ ht2_mem_pia rw [Finset.coe_subset] at hs_mem classical let f := fun n => ite (n = a) t2 (ite (n ∈ s) (ft1 n) Set.univ) have h_f_mem : ∀ n ∈ insert a s, f n ∈ π n := by intro n hn_mem_insert dsimp only [f] cases' Finset.mem_insert.mp hn_mem_insert with hn_mem hn_mem · simp [hn_mem, ht2_mem_pia] · have hn_ne_a : n ≠ a := by rintro rfl; exact haS (hs_mem hn_mem) simp [hn_ne_a, hn_mem, hft1_mem n hn_mem] have h_f_mem_pi : ∀ n ∈ s, f n ∈ π n := fun x hxS => h_f_mem x (by simp [hxS]) have h_t1 : t1 = ⋂ n ∈ s, f n := by suffices h_forall : ∀ n ∈ s, f n = ft1 n by rw [ht1_eq] ext x simp_rw [Set.mem_iInter] conv => lhs; intro i hns; rw [← h_forall i hns] intro n hnS have hn_ne_a : n ≠ a := by rintro rfl; exact haS (hs_mem hnS) simp_rw [f, if_pos hnS, if_neg hn_ne_a] have h_μ_t1 : ∀ᵐ a' ∂μ, κ a' t1 = ∏ n ∈ s, κ a' (f n) := by filter_upwards [hp_ind s h_f_mem_pi] with a' ha' rw [h_t1, ← ha'] have h_t2 : t2 = f a := by simp [f] have h_μ_inter : ∀ᵐ a' ∂μ, κ a' (t1 ∩ t2) = ∏ n ∈ insert a s, κ a' (f n) := by have h_t1_inter_t2 : t1 ∩ t2 = ⋂ n ∈ insert a s, f n := by rw [h_t1, h_t2, Finset.set_biInter_insert, Set.inter_comm] filter_upwards [hp_ind (insert a s) h_f_mem] with a' ha' rw [h_t1_inter_t2, ← ha'] have has : a ∉ s := fun has_mem => haS (hs_mem has_mem) filter_upwards [h_μ_t1, h_μ_inter] with a' ha1 ha2 rw [ha2, Finset.prod_insert has, h_t2, mul_comm, ha1] /-- The measurable space structures generated by independent pi-systems are independent. -/ theorem iIndepSets.iIndep [IsMarkovKernel κ] (m : ι → MeasurableSpace Ω) (h_le : ∀ i, m i ≤ _mΩ) (π : ι → Set (Set Ω)) (h_pi : ∀ n, IsPiSystem (π n)) (h_generate : ∀ i, m i = generateFrom (π i)) (h_ind : iIndepSets π κ μ) : iIndep m κ μ := by classical intro s f refine Finset.induction ?_ ?_ s · simp only [Finset.not_mem_empty, Set.mem_setOf_eq, IsEmpty.forall_iff, implies_true, Set.iInter_of_empty, Set.iInter_univ, measure_univ, Finset.prod_empty, Filter.eventually_true, forall_true_left] · intro a S ha_notin_S h_rec hf_m have hf_m_S : ∀ x ∈ S, MeasurableSet[m x] (f x) := fun x hx => hf_m x (by simp [hx]) let p := piiUnionInter π S set m_p := generateFrom p with hS_eq_generate have h_indep : Indep m_p (m a) κ μ := by have hp : IsPiSystem p := isPiSystem_piiUnionInter π h_pi S have h_le' : ∀ i, generateFrom (π i) ≤ _mΩ := fun i ↦ (h_generate i).symm.trans_le (h_le i) have hm_p : m_p ≤ _mΩ := generateFrom_piiUnionInter_le π h_le' S exact IndepSets.indep hm_p (h_le a) hp (h_pi a) hS_eq_generate (h_generate a) (iIndepSets.piiUnionInter_of_not_mem h_ind ha_notin_S) have h := h_indep.symm (f a) (⋂ n ∈ S, f n) (hf_m a (Finset.mem_insert_self a S)) ?_ · filter_upwards [h_rec hf_m_S, h] with a' ha' h' rwa [Finset.set_biInter_insert, Finset.prod_insert ha_notin_S, ← ha'] · have h_le_p : ∀ i ∈ S, m i ≤ m_p := by intros n hn rw [hS_eq_generate, h_generate n] exact le_generateFrom_piiUnionInter (S : Set ι) hn have h_S_f : ∀ i ∈ S, MeasurableSet[m_p] (f i) := fun i hi ↦ (h_le_p i hi) (f i) (hf_m_S i hi) exact S.measurableSet_biInter h_S_f end FromPiSystemsToMeasurableSpaces section IndepSet /-! ### Independence of measurable sets We prove the following equivalences on `IndepSet`, for measurable sets `s, t`. * `IndepSet s t κ μ ↔ ∀ᵐ a ∂μ, κ a (s ∩ t) = κ a s * κ a t`, * `IndepSet s t κ μ ↔ IndepSets {s} {t} κ μ`. -/ variable {_mα : MeasurableSpace α} theorem iIndepSet_iff_iIndepSets_singleton {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} [IsMarkovKernel κ] {μ : Measure α} {f : ι → Set Ω} (hf : ∀ i, MeasurableSet (f i)) : iIndepSet f κ μ ↔ iIndepSets (fun i ↦ {f i}) κ μ := ⟨iIndep.iIndepSets fun _ ↦ rfl, iIndepSets.iIndep _ (fun i ↦ generateFrom_le <\| by rintro t (rfl : t = _); exact hf _) _ (fun _ ↦ IsPiSystem.singleton _) fun _ ↦ rfl⟩ theorem iIndepSet_iff_meas_biInter {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} [IsMarkovKernel κ] {μ : Measure α} {f : ι → Set Ω} (hf : ∀ i, MeasurableSet (f i)) : iIndepSet f κ μ ↔ ∀ s, ∀ᵐ a ∂μ, κ a (⋂ i ∈ s, f i) = ∏ i ∈ s, κ a (f i) := (iIndepSet_iff_iIndepSets_singleton hf).trans iIndepSets_singleton_iff theorem iIndepSets.iIndepSet_of_mem {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} [IsMarkovKernel κ] {μ : Measure α} {π : ι → Set (Set Ω)} {f : ι → Set Ω} (hfπ : ∀ i, f i ∈ π i) (hf : ∀ i, MeasurableSet (f i)) (hπ : iIndepSets π κ μ) : iIndepSet f κ μ := (iIndepSet_iff_meas_biInter hf).2 fun _t ↦ hπ.meas_biInter _ fun _i _ ↦ hfπ _ variable {s t : Set Ω} (S T : Set (Set Ω)) theorem indepSet_iff_indepSets_singleton {m0 : MeasurableSpace Ω} (hs_meas : MeasurableSet s) (ht_meas : MeasurableSet t) (κ : kernel α Ω) (μ : Measure α) [IsMarkovKernel κ] : IndepSet s t κ μ ↔ IndepSets {s} {t} κ μ := ⟨Indep.indepSets, fun h => IndepSets.indep (generateFrom_le fun u hu => by rwa [Set.mem_singleton_iff.mp hu]) (generateFrom_le fun u hu => by rwa [Set.mem_singleton_iff.mp hu]) (IsPiSystem.singleton s) (IsPiSystem.singleton t) rfl rfl h⟩ theorem indepSet_iff_measure_inter_eq_mul {_m0 : MeasurableSpace Ω} (hs_meas : MeasurableSet s) (ht_meas : MeasurableSet t) (κ : kernel α Ω) (μ : Measure α) [IsMarkovKernel κ] : IndepSet s t κ μ ↔ ∀ᵐ a ∂μ, κ a (s ∩ t) = κ a s * κ a t := (indepSet_iff_indepSets_singleton hs_meas ht_meas κ μ).trans indepSets_singleton_iff theorem IndepSets.indepSet_of_mem {_m0 : MeasurableSpace Ω} (hs : s ∈ S) (ht : t ∈ T) (hs_meas : MeasurableSet s) (ht_meas : MeasurableSet t) (κ : kernel α Ω) (μ : Measure α) [IsMarkovKernel κ] (h_indep : IndepSets S T κ μ) : IndepSet s t κ μ := (indepSet_iff_measure_inter_eq_mul hs_meas ht_meas κ μ).mpr (h_indep s t hs ht) theorem Indep.indepSet_of_measurableSet {m₁ m₂ m0 : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} (h_indep : Indep m₁ m₂ κ μ) {s t : Set Ω} (hs : MeasurableSet[m₁] s) (ht : MeasurableSet[m₂] t) : IndepSet s t κ μ := by refine fun s' t' hs' ht' => h_indep s' t' ?_ ?_ · refine @generateFrom_induction _ (fun u => MeasurableSet[m₁] u) {s} ?_ ?_ ?_ ?_ _ hs' · simp only [Set.mem_singleton_iff, forall_eq, hs] · exact @MeasurableSet.empty _ m₁ · exact fun u hu => hu.compl · exact fun f hf => MeasurableSet.iUnion hf · refine @generateFrom_induction _ (fun u => MeasurableSet[m₂] u) {t} ?_ ?_ ?_ ?_ _ ht' · simp only [Set.mem_singleton_iff, forall_eq, ht] · exact @MeasurableSet.empty _ m₂ · exact fun u hu => hu.compl · exact fun f hf => MeasurableSet.iUnion hf theorem indep_iff_forall_indepSet (m₁ m₂ : MeasurableSpace Ω) {_m0 : MeasurableSpace Ω} (κ : kernel α Ω) (μ : Measure α) : Indep m₁ m₂ κ μ ↔ ∀ s t, MeasurableSet[m₁] s → MeasurableSet[m₂] t → IndepSet s t κ μ := ⟨fun h => fun _s _t hs ht => h.indepSet_of_measurableSet hs ht, fun h s t hs ht => h s t hs ht s t (measurableSet_generateFrom (Set.mem_singleton s)) (measurableSet_generateFrom (Set.mem_singleton t))⟩ end IndepSet section IndepFun /-! ### Independence of random variables -/ variable {β β' γ γ' : Type*} {_mα : MeasurableSpace α} {_mΩ : MeasurableSpace Ω} {κ : kernel α Ω} {μ : Measure α} {f : Ω → β} {g : Ω → β'}	Mathlib/Probability/Independence/Kernel.lean	740	747	theorem indepFun_iff_measure_inter_preimage_eq_mul {mβ : MeasurableSpace β} {mβ' : MeasurableSpace β'} : IndepFun f g κ μ ↔ ∀ s t, MeasurableSet s → MeasurableSet t → ∀ᵐ a ∂μ, κ a (f ⁻¹' s ∩ g ⁻¹' t) = κ a (f ⁻¹' s) * κ a (g ⁻¹' t) := by	constructor <;> intro h · refine fun s t hs ht => h (f ⁻¹' s) (g ⁻¹' t) ⟨s, hs, rfl⟩ ⟨t, ht, rfl⟩ · rintro _ _ ⟨s, hs, rfl⟩ ⟨t, ht, rfl⟩; exact h s t hs ht
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.MeasureTheory.Integral.IntervalIntegral import Mathlib.Analysis.Calculus.Deriv.ZPow import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.Analysis.SpecialFunctions.NonIntegrable import Mathlib.Analysis.Analytic.Basic #align_import measure_theory.integral.circle_integral from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" /-! # Integral over a circle in `ℂ` In this file we define `∮ z in C(c, R), f z` to be the integral $\oint_{\|z-c\|=\|R\|} f(z)\,dz$ and prove some properties of this integral. We give definition and prove most lemmas for a function `f : ℂ → E`, where `E` is a complex Banach space. For this reason, some lemmas use, e.g., `(z - c)⁻¹ • f z` instead of `f z / (z - c)`. ## Main definitions * `circleMap c R`: the exponential map $θ ↦ c + R e^{θi}$; * `CircleIntegrable f c R`: a function `f : ℂ → E` is integrable on the circle with center `c` and radius `R` if `f ∘ circleMap c R` is integrable on `[0, 2π]`; * `circleIntegral f c R`: the integral $\oint_{\|z-c\|=\|R\|} f(z)\,dz$, defined as $\int_{0}^{2π}(c + Re^{θ i})' f(c+Re^{θ i})\,dθ$; * `cauchyPowerSeries f c R`: the power series that is equal to $\sum_{n=0}^{\infty} \oint_{\|z-c\|=R} \left(\frac{w-c}{z - c}\right)^n \frac{1}{z-c}f(z)\,dz$ at `w - c`. The coefficients of this power series depend only on `f ∘ circleMap c R`, and the power series converges to `f w` if `f` is differentiable on the closed ball `Metric.closedBall c R` and `w` belongs to the corresponding open ball. ## Main statements * `hasFPowerSeriesOn_cauchy_integral`: for any circle integrable function `f`, the power series `cauchyPowerSeries f c R`, `R > 0`, converges to the Cauchy integral `(2 * π * I : ℂ)⁻¹ • ∮ z in C(c, R), (z - w)⁻¹ • f z` on the open disc `Metric.ball c R`; * `circleIntegral.integral_sub_zpow_of_undef`, `circleIntegral.integral_sub_zpow_of_ne`, and `circleIntegral.integral_sub_inv_of_mem_ball`: formulas for `∮ z in C(c, R), (z - w) ^ n`, `n : ℤ`. These lemmas cover the following cases: - `circleIntegral.integral_sub_zpow_of_undef`, `n < 0` and `\|w - c\| = \|R\|`: in this case the function is not integrable, so the integral is equal to its default value (zero); - `circleIntegral.integral_sub_zpow_of_ne`, `n ≠ -1`: in the cases not covered by the previous lemma, we have `(z - w) ^ n = ((z - w) ^ (n + 1) / (n + 1))'`, thus the integral equals zero; - `circleIntegral.integral_sub_inv_of_mem_ball`, `n = -1`, `\|w - c\| < R`: in this case the integral is equal to `2πi`. The case `n = -1`, `\|w -c\| > R` is not covered by these lemmas. While it is possible to construct an explicit primitive, it is easier to apply Cauchy theorem, so we postpone the proof till we have this theorem (see #10000). ## Notation - `∮ z in C(c, R), f z`: notation for the integral $\oint_{\|z-c\|=\|R\|} f(z)\,dz$, defined as $\int_{0}^{2π}(c + Re^{θ i})' f(c+Re^{θ i})\,dθ$. ## Tags integral, circle, Cauchy integral -/ variable {E : Type} [NormedAddCommGroup E] noncomputable section open scoped Real NNReal Interval Pointwise Topology open Complex MeasureTheory TopologicalSpace Metric Function Set Filter Asymptotics /-! ### `circleMap`, a parametrization of a circle -/ /-- The exponential map $θ ↦ c + R e^{θi}$. The range of this map is the circle in `ℂ` with center `c` and radius `\|R\|`. -/ def circleMap (c : ℂ) (R : ℝ) : ℝ → ℂ := fun θ => c + R exp (θ * I) #align circle_map circleMap /-- `circleMap` is `2π`-periodic. -/ theorem periodic_circleMap (c : ℂ) (R : ℝ) : Periodic (circleMap c R) (2 * π) := fun θ => by simp [circleMap, add_mul, exp_periodic _] #align periodic_circle_map periodic_circleMap theorem Set.Countable.preimage_circleMap {s : Set ℂ} (hs : s.Countable) (c : ℂ) {R : ℝ} (hR : R ≠ 0) : (circleMap c R ⁻¹' s).Countable := show (((↑) : ℝ → ℂ) ⁻¹' ((· * I) ⁻¹' (exp ⁻¹' ((R * ·) ⁻¹' ((c + ·) ⁻¹' s))))).Countable from (((hs.preimage (add_right_injective _)).preimage <\| mul_right_injective₀ <\| ofReal_ne_zero.2 hR).preimage_cexp.preimage <\| mul_left_injective₀ I_ne_zero).preimage ofReal_injective #align set.countable.preimage_circle_map Set.Countable.preimage_circleMap @[simp] theorem circleMap_sub_center (c : ℂ) (R : ℝ) (θ : ℝ) : circleMap c R θ - c = circleMap 0 R θ := by simp [circleMap] #align circle_map_sub_center circleMap_sub_center theorem circleMap_zero (R θ : ℝ) : circleMap 0 R θ = R * exp (θ * I) := zero_add _ #align circle_map_zero circleMap_zero @[simp] theorem abs_circleMap_zero (R : ℝ) (θ : ℝ) : abs (circleMap 0 R θ) = \|R\| := by simp [circleMap] #align abs_circle_map_zero abs_circleMap_zero theorem circleMap_mem_sphere' (c : ℂ) (R : ℝ) (θ : ℝ) : circleMap c R θ ∈ sphere c \|R\| := by simp #align circle_map_mem_sphere' circleMap_mem_sphere' theorem circleMap_mem_sphere (c : ℂ) {R : ℝ} (hR : 0 ≤ R) (θ : ℝ) : circleMap c R θ ∈ sphere c R := by simpa only [_root_.abs_of_nonneg hR] using circleMap_mem_sphere' c R θ #align circle_map_mem_sphere circleMap_mem_sphere theorem circleMap_mem_closedBall (c : ℂ) {R : ℝ} (hR : 0 ≤ R) (θ : ℝ) : circleMap c R θ ∈ closedBall c R := sphere_subset_closedBall (circleMap_mem_sphere c hR θ) #align circle_map_mem_closed_ball circleMap_mem_closedBall theorem circleMap_not_mem_ball (c : ℂ) (R : ℝ) (θ : ℝ) : circleMap c R θ ∉ ball c R := by simp [dist_eq, le_abs_self] #align circle_map_not_mem_ball circleMap_not_mem_ball theorem circleMap_ne_mem_ball {c : ℂ} {R : ℝ} {w : ℂ} (hw : w ∈ ball c R) (θ : ℝ) : circleMap c R θ ≠ w := (ne_of_mem_of_not_mem hw (circleMap_not_mem_ball _ _ _)).symm #align circle_map_ne_mem_ball circleMap_ne_mem_ball /-- The range of `circleMap c R` is the circle with center `c` and radius `\|R\|`. -/ @[simp] theorem range_circleMap (c : ℂ) (R : ℝ) : range (circleMap c R) = sphere c \|R\| := calc range (circleMap c R) = c +ᵥ R • range fun θ : ℝ => exp (θ * I) := by simp (config := { unfoldPartialApp := true }) only [← image_vadd, ← image_smul, ← range_comp, vadd_eq_add, circleMap, Function.comp_def, real_smul] _ = sphere c \|R\| := by rw [Complex.range_exp_mul_I, smul_sphere R 0 zero_le_one] simp #align range_circle_map range_circleMap /-- The image of `(0, 2π]` under `circleMap c R` is the circle with center `c` and radius `\|R\|`. -/ @[simp] theorem image_circleMap_Ioc (c : ℂ) (R : ℝ) : circleMap c R '' Ioc 0 (2 * π) = sphere c \|R\| := by rw [← range_circleMap, ← (periodic_circleMap c R).image_Ioc Real.two_pi_pos 0, zero_add] #align image_circle_map_Ioc image_circleMap_Ioc @[simp] theorem circleMap_eq_center_iff {c : ℂ} {R : ℝ} {θ : ℝ} : circleMap c R θ = c ↔ R = 0 := by simp [circleMap, exp_ne_zero] #align circle_map_eq_center_iff circleMap_eq_center_iff @[simp] theorem circleMap_zero_radius (c : ℂ) : circleMap c 0 = const ℝ c := funext fun _ => circleMap_eq_center_iff.2 rfl #align circle_map_zero_radius circleMap_zero_radius theorem circleMap_ne_center {c : ℂ} {R : ℝ} (hR : R ≠ 0) {θ : ℝ} : circleMap c R θ ≠ c := mt circleMap_eq_center_iff.1 hR #align circle_map_ne_center circleMap_ne_center theorem hasDerivAt_circleMap (c : ℂ) (R : ℝ) (θ : ℝ) : HasDerivAt (circleMap c R) (circleMap 0 R θ * I) θ := by simpa only [mul_assoc, one_mul, ofRealCLM_apply, circleMap, ofReal_one, zero_add] using (((ofRealCLM.hasDerivAt (x := θ)).mul_const I).cexp.const_mul (R : ℂ)).const_add c #align has_deriv_at_circle_map hasDerivAt_circleMap /- TODO: prove `ContDiff ℝ (circleMap c R)`. This needs a version of `ContDiff.mul` for multiplication in a normed algebra over the base field. -/ theorem differentiable_circleMap (c : ℂ) (R : ℝ) : Differentiable ℝ (circleMap c R) := fun θ => (hasDerivAt_circleMap c R θ).differentiableAt #align differentiable_circle_map differentiable_circleMap @[continuity] theorem continuous_circleMap (c : ℂ) (R : ℝ) : Continuous (circleMap c R) := (differentiable_circleMap c R).continuous #align continuous_circle_map continuous_circleMap @[measurability] theorem measurable_circleMap (c : ℂ) (R : ℝ) : Measurable (circleMap c R) := (continuous_circleMap c R).measurable #align measurable_circle_map measurable_circleMap @[simp] theorem deriv_circleMap (c : ℂ) (R : ℝ) (θ : ℝ) : deriv (circleMap c R) θ = circleMap 0 R θ * I := (hasDerivAt_circleMap _ _ _).deriv #align deriv_circle_map deriv_circleMap theorem deriv_circleMap_eq_zero_iff {c : ℂ} {R : ℝ} {θ : ℝ} : deriv (circleMap c R) θ = 0 ↔ R = 0 := by simp [I_ne_zero] #align deriv_circle_map_eq_zero_iff deriv_circleMap_eq_zero_iff theorem deriv_circleMap_ne_zero {c : ℂ} {R : ℝ} {θ : ℝ} (hR : R ≠ 0) : deriv (circleMap c R) θ ≠ 0 := mt deriv_circleMap_eq_zero_iff.1 hR #align deriv_circle_map_ne_zero deriv_circleMap_ne_zero theorem lipschitzWith_circleMap (c : ℂ) (R : ℝ) : LipschitzWith (Real.nnabs R) (circleMap c R) := lipschitzWith_of_nnnorm_deriv_le (differentiable_circleMap _ _) fun θ => NNReal.coe_le_coe.1 <\| by simp #align lipschitz_with_circle_map lipschitzWith_circleMap theorem continuous_circleMap_inv {R : ℝ} {z w : ℂ} (hw : w ∈ ball z R) : Continuous fun θ => (circleMap z R θ - w)⁻¹ := by have : ∀ θ, circleMap z R θ - w ≠ 0 := by simp_rw [sub_ne_zero] exact fun θ => circleMap_ne_mem_ball hw θ -- Porting note: was `continuity` exact Continuous.inv₀ (by continuity) this #align continuous_circle_map_inv continuous_circleMap_inv /-! ### Integrability of a function on a circle -/ /-- We say that a function `f : ℂ → E` is integrable on the circle with center `c` and radius `R` if the function `f ∘ circleMap c R` is integrable on `[0, 2π]`. Note that the actual function used in the definition of `circleIntegral` is `(deriv (circleMap c R) θ) • f (circleMap c R θ)`. Integrability of this function is equivalent to integrability of `f ∘ circleMap c R` whenever `R ≠ 0`. -/ def CircleIntegrable (f : ℂ → E) (c : ℂ) (R : ℝ) : Prop := IntervalIntegrable (fun θ : ℝ => f (circleMap c R θ)) volume 0 (2 * π) #align circle_integrable CircleIntegrable @[simp] theorem circleIntegrable_const (a : E) (c : ℂ) (R : ℝ) : CircleIntegrable (fun _ => a) c R := intervalIntegrable_const #align circle_integrable_const circleIntegrable_const namespace CircleIntegrable variable {f g : ℂ → E} {c : ℂ} {R : ℝ} nonrec theorem add (hf : CircleIntegrable f c R) (hg : CircleIntegrable g c R) : CircleIntegrable (f + g) c R := hf.add hg #align circle_integrable.add CircleIntegrable.add nonrec theorem neg (hf : CircleIntegrable f c R) : CircleIntegrable (-f) c R := hf.neg #align circle_integrable.neg CircleIntegrable.neg /-- The function we actually integrate over `[0, 2π]` in the definition of `circleIntegral` is integrable. -/ theorem out [NormedSpace ℂ E] (hf : CircleIntegrable f c R) : IntervalIntegrable (fun θ : ℝ => deriv (circleMap c R) θ • f (circleMap c R θ)) volume 0 (2 * π) := by simp only [CircleIntegrable, deriv_circleMap, intervalIntegrable_iff] at * refine (hf.norm.const_mul \|R\|).mono' ?_ ?_ · exact ((continuous_circleMap _ _).aestronglyMeasurable.mul_const I).smul hf.aestronglyMeasurable · simp [norm_smul] #align circle_integrable.out CircleIntegrable.out end CircleIntegrable @[simp] theorem circleIntegrable_zero_radius {f : ℂ → E} {c : ℂ} : CircleIntegrable f c 0 := by simp [CircleIntegrable] #align circle_integrable_zero_radius circleIntegrable_zero_radius theorem circleIntegrable_iff [NormedSpace ℂ E] {f : ℂ → E} {c : ℂ} (R : ℝ) : CircleIntegrable f c R ↔ IntervalIntegrable (fun θ : ℝ => deriv (circleMap c R) θ • f (circleMap c R θ)) volume 0 (2 * π) := by by_cases h₀ : R = 0 · simp (config := { unfoldPartialApp := true }) [h₀, const] refine ⟨fun h => h.out, fun h => ?_⟩ simp only [CircleIntegrable, intervalIntegrable_iff, deriv_circleMap] at h ⊢ refine (h.norm.const_mul \|R\|⁻¹).mono' ?_ ?_ · have H : ∀ {θ}, circleMap 0 R θ * I ≠ 0 := fun {θ} => by simp [h₀, I_ne_zero] simpa only [inv_smul_smul₀ H] using ((continuous_circleMap 0 R).aestronglyMeasurable.mul_const I).aemeasurable.inv.aestronglyMeasurable.smul h.aestronglyMeasurable · simp [norm_smul, h₀] #align circle_integrable_iff circleIntegrable_iff theorem ContinuousOn.circleIntegrable' {f : ℂ → E} {c : ℂ} {R : ℝ} (hf : ContinuousOn f (sphere c \|R\|)) : CircleIntegrable f c R := (hf.comp_continuous (continuous_circleMap _ _) (circleMap_mem_sphere' _ _)).intervalIntegrable _ _ #align continuous_on.circle_integrable' ContinuousOn.circleIntegrable' theorem ContinuousOn.circleIntegrable {f : ℂ → E} {c : ℂ} {R : ℝ} (hR : 0 ≤ R) (hf : ContinuousOn f (sphere c R)) : CircleIntegrable f c R := ContinuousOn.circleIntegrable' <\| (_root_.abs_of_nonneg hR).symm ▸ hf #align continuous_on.circle_integrable ContinuousOn.circleIntegrable #adaptation_note /-- nightly-2024-04-01: the simpNF linter now times out on this lemma. -/ /-- The function `fun z ↦ (z - w) ^ n`, `n : ℤ`, is circle integrable on the circle with center `c` and radius `\|R\|` if and only if `R = 0` or `0 ≤ n`, or `w` does not belong to this circle. -/ @[simp, nolint simpNF] theorem circleIntegrable_sub_zpow_iff {c w : ℂ} {R : ℝ} {n : ℤ} : CircleIntegrable (fun z => (z - w) ^ n) c R ↔ R = 0 ∨ 0 ≤ n ∨ w ∉ sphere c \|R\| := by constructor · intro h; contrapose! h; rcases h with ⟨hR, hn, hw⟩ simp only [circleIntegrable_iff R, deriv_circleMap] rw [← image_circleMap_Ioc] at hw; rcases hw with ⟨θ, hθ, rfl⟩ replace hθ : θ ∈ [[0, 2 * π]] := Icc_subset_uIcc (Ioc_subset_Icc_self hθ) refine not_intervalIntegrable_of_sub_inv_isBigO_punctured ?_ Real.two_pi_pos.ne hθ set f : ℝ → ℂ := fun θ' => circleMap c R θ' - circleMap c R θ have : ∀ᶠ θ' in 𝓝[≠] θ, f θ' ∈ ball (0 : ℂ) 1 \ {0} := by suffices ∀ᶠ z in 𝓝[≠] circleMap c R θ, z - circleMap c R θ ∈ ball (0 : ℂ) 1 \ {0} from ((differentiable_circleMap c R θ).hasDerivAt.tendsto_punctured_nhds (deriv_circleMap_ne_zero hR)).eventually this filter_upwards [self_mem_nhdsWithin, mem_nhdsWithin_of_mem_nhds (ball_mem_nhds _ zero_lt_one)] simp_all [dist_eq, sub_eq_zero] refine (((hasDerivAt_circleMap c R θ).isBigO_sub.mono inf_le_left).inv_rev (this.mono fun θ' h₁ h₂ => absurd h₂ h₁.2)).trans ?_ refine IsBigO.of_bound \|R\|⁻¹ (this.mono fun θ' hθ' => ?_) set x := abs (f θ') suffices x⁻¹ ≤ x ^ n by simpa only [inv_mul_cancel_left₀, abs_eq_zero.not.2 hR, norm_eq_abs, map_inv₀, Algebra.id.smul_eq_mul, map_mul, abs_circleMap_zero, abs_I, mul_one, abs_zpow, Ne, not_false_iff] using this have : x ∈ Ioo (0 : ℝ) 1 := by simpa [x, and_comm] using hθ' rw [← zpow_neg_one] refine (zpow_strictAnti this.1 this.2).le_iff_le.2 (Int.lt_add_one_iff.1 ?_); exact hn · rintro (rfl \| H) exacts [circleIntegrable_zero_radius, ((continuousOn_id.sub continuousOn_const).zpow₀ _ fun z hz => H.symm.imp_left fun (hw : w ∉ sphere c \|R\|) => sub_ne_zero.2 <\| ne_of_mem_of_not_mem hz hw).circleIntegrable'] #align circle_integrable_sub_zpow_iff circleIntegrable_sub_zpow_iff #adaptation_note /-- nightly-2024-04-01 The simpNF linter now times out on this lemma. -/ @[simp, nolint simpNF]	Mathlib/MeasureTheory/Integral/CircleIntegral.lean	337	339	theorem circleIntegrable_sub_inv_iff {c w : ℂ} {R : ℝ} : CircleIntegrable (fun z => (z - w)⁻¹) c R ↔ R = 0 ∨ w ∉ sphere c \|R\| := by	simp only [← zpow_neg_one, circleIntegrable_sub_zpow_iff]; norm_num
/- Copyright (c) 2014 Robert Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Lewis, Leonardo de Moura, Mario Carneiro, Floris van Doorn -/ import Mathlib.Algebra.CharZero.Lemmas import Mathlib.Algebra.GroupWithZero.Commute import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Ring.Pow import Mathlib.Algebra.Ring.Int #align_import algebra.order.field.power from "leanprover-community/mathlib"@"acb3d204d4ee883eb686f45d486a2a6811a01329" /-! # Lemmas about powers in ordered fields. -/ variable {α : Type*} open Function Int section LinearOrderedSemifield variable [LinearOrderedSemifield α] {a b c d e : α} {m n : ℤ} /-! ### Integer powers -/ @[gcongr]	Mathlib/Algebra/Order/Field/Power.lean	30	37	theorem zpow_le_of_le (ha : 1 ≤ a) (h : m ≤ n) : a ^ m ≤ a ^ n := by	have ha₀ : 0 < a := one_pos.trans_le ha lift n - m to ℕ using sub_nonneg.2 h with k hk calc a ^ m = a ^ m * 1 := (mul_one _).symm _ ≤ a ^ m * a ^ k := mul_le_mul_of_nonneg_left (one_le_pow_of_one_le ha _) (zpow_nonneg ha₀.le _) _ = a ^ n := by rw [← zpow_natCast, ← zpow_add₀ ha₀.ne', hk, add_sub_cancel]
/- Copyright (c) 2019 Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Zhouhang Zhou, Yury Kudryashov, Sébastien Gouëzel, Rémy Degenne -/ import Mathlib.MeasureTheory.Integral.SetToL1 #align_import measure_theory.integral.bochner from "leanprover-community/mathlib"@"48fb5b5280e7c81672afc9524185ae994553ebf4" /-! # Bochner integral The Bochner integral extends the definition of the Lebesgue integral to functions that map from a measure space into a Banach space (complete normed vector space). It is constructed here by extending the integral on simple functions. ## Main definitions The Bochner integral is defined through the extension process described in the file `SetToL1`, which follows these steps: 1. Define the integral of the indicator of a set. This is `weightedSMul μ s x = (μ s).toReal * x`. `weightedSMul μ` is shown to be linear in the value `x` and `DominatedFinMeasAdditive` (defined in the file `SetToL1`) with respect to the set `s`. 2. Define the integral on simple functions of the type `SimpleFunc α E` (notation : `α →ₛ E`) where `E` is a real normed space. (See `SimpleFunc.integral` for details.) 3. Transfer this definition to define the integral on `L1.simpleFunc α E` (notation : `α →₁ₛ[μ] E`), see `L1.simpleFunc.integral`. Show that this integral is a continuous linear map from `α →₁ₛ[μ] E` to `E`. 4. Define the Bochner integral on L1 functions by extending the integral on integrable simple functions `α →₁ₛ[μ] E` using `ContinuousLinearMap.extend` and the fact that the embedding of `α →₁ₛ[μ] E` into `α →₁[μ] E` is dense. 5. Define the Bochner integral on functions as the Bochner integral of its equivalence class in L1 space, if it is in L1, and 0 otherwise. The result of that construction is `∫ a, f a ∂μ`, which is definitionally equal to `setToFun (dominatedFinMeasAdditive_weightedSMul μ) f`. Some basic properties of the integral (like linearity) are particular cases of the properties of `setToFun` (which are described in the file `SetToL1`). ## Main statements 1. Basic properties of the Bochner integral on functions of type `α → E`, where `α` is a measure space and `E` is a real normed space. * `integral_zero` : `∫ 0 ∂μ = 0` * `integral_add` : `∫ x, f x + g x ∂μ = ∫ x, f ∂μ + ∫ x, g x ∂μ` * `integral_neg` : `∫ x, - f x ∂μ = - ∫ x, f x ∂μ` * `integral_sub` : `∫ x, f x - g x ∂μ = ∫ x, f x ∂μ - ∫ x, g x ∂μ` * `integral_smul` : `∫ x, r • f x ∂μ = r • ∫ x, f x ∂μ` * `integral_congr_ae` : `f =ᵐ[μ] g → ∫ x, f x ∂μ = ∫ x, g x ∂μ` * `norm_integral_le_integral_norm` : `‖∫ x, f x ∂μ‖ ≤ ∫ x, ‖f x‖ ∂μ` 2. Basic properties of the Bochner integral on functions of type `α → ℝ`, where `α` is a measure space. * `integral_nonneg_of_ae` : `0 ≤ᵐ[μ] f → 0 ≤ ∫ x, f x ∂μ` * `integral_nonpos_of_ae` : `f ≤ᵐ[μ] 0 → ∫ x, f x ∂μ ≤ 0` * `integral_mono_ae` : `f ≤ᵐ[μ] g → ∫ x, f x ∂μ ≤ ∫ x, g x ∂μ` * `integral_nonneg` : `0 ≤ f → 0 ≤ ∫ x, f x ∂μ` * `integral_nonpos` : `f ≤ 0 → ∫ x, f x ∂μ ≤ 0` * `integral_mono` : `f ≤ᵐ[μ] g → ∫ x, f x ∂μ ≤ ∫ x, g x ∂μ` 3. Propositions connecting the Bochner integral with the integral on `ℝ≥0∞`-valued functions, which is called `lintegral` and has the notation `∫⁻`. * `integral_eq_lintegral_pos_part_sub_lintegral_neg_part` : `∫ x, f x ∂μ = ∫⁻ x, f⁺ x ∂μ - ∫⁻ x, f⁻ x ∂μ`, where `f⁺` is the positive part of `f` and `f⁻` is the negative part of `f`. * `integral_eq_lintegral_of_nonneg_ae` : `0 ≤ᵐ[μ] f → ∫ x, f x ∂μ = ∫⁻ x, f x ∂μ` 4. (In the file `DominatedConvergence`) `tendsto_integral_of_dominated_convergence` : the Lebesgue dominated convergence theorem 5. (In the file `SetIntegral`) integration commutes with continuous linear maps. * `ContinuousLinearMap.integral_comp_comm` * `LinearIsometry.integral_comp_comm` ## Notes Some tips on how to prove a proposition if the API for the Bochner integral is not enough so that you need to unfold the definition of the Bochner integral and go back to simple functions. One method is to use the theorem `Integrable.induction` in the file `SimpleFuncDenseLp` (or one of the related results, like `Lp.induction` for functions in `Lp`), which allows you to prove something for an arbitrary integrable function. Another method is using the following steps. See `integral_eq_lintegral_pos_part_sub_lintegral_neg_part` for a complicated example, which proves that `∫ f = ∫⁻ f⁺ - ∫⁻ f⁻`, with the first integral sign being the Bochner integral of a real-valued function `f : α → ℝ`, and second and third integral sign being the integral on `ℝ≥0∞`-valued functions (called `lintegral`). The proof of `integral_eq_lintegral_pos_part_sub_lintegral_neg_part` is scattered in sections with the name `posPart`. Here are the usual steps of proving that a property `p`, say `∫ f = ∫⁻ f⁺ - ∫⁻ f⁻`, holds for all functions : 1. First go to the `L¹` space. For example, if you see `ENNReal.toReal (∫⁻ a, ENNReal.ofReal <\| ‖f a‖)`, that is the norm of `f` in `L¹` space. Rewrite using `L1.norm_of_fun_eq_lintegral_norm`. 2. Show that the set `{f ∈ L¹ \| ∫ f = ∫⁻ f⁺ - ∫⁻ f⁻}` is closed in `L¹` using `isClosed_eq`. 3. Show that the property holds for all simple functions `s` in `L¹` space. Typically, you need to convert various notions to their `SimpleFunc` counterpart, using lemmas like `L1.integral_coe_eq_integral`. 4. Since simple functions are dense in `L¹`, ``` univ = closure {s simple} = closure {s simple \| ∫ s = ∫⁻ s⁺ - ∫⁻ s⁻} : the property holds for all simple functions ⊆ closure {f \| ∫ f = ∫⁻ f⁺ - ∫⁻ f⁻} = {f \| ∫ f = ∫⁻ f⁺ - ∫⁻ f⁻} : closure of a closed set is itself ``` Use `isClosed_property` or `DenseRange.induction_on` for this argument. ## Notations * `α →ₛ E` : simple functions (defined in `MeasureTheory/Integration`) * `α →₁[μ] E` : functions in L1 space, i.e., equivalence classes of integrable functions (defined in `MeasureTheory/LpSpace`) * `α →₁ₛ[μ] E` : simple functions in L1 space, i.e., equivalence classes of integrable simple functions (defined in `MeasureTheory/SimpleFuncDense`) * `∫ a, f a ∂μ` : integral of `f` with respect to a measure `μ` * `∫ a, f a` : integral of `f` with respect to `volume`, the default measure on the ambient type We also define notations for integral on a set, which are described in the file `MeasureTheory/SetIntegral`. Note : `ₛ` is typed using `\_s`. Sometimes it shows as a box if the font is missing. ## Tags Bochner integral, simple function, function space, Lebesgue dominated convergence theorem -/ assert_not_exists Differentiable noncomputable section open scoped Topology NNReal ENNReal MeasureTheory open Set Filter TopologicalSpace ENNReal EMetric namespace MeasureTheory variable {α E F 𝕜 : Type} section WeightedSMul open ContinuousLinearMap variable [NormedAddCommGroup F] [NormedSpace ℝ F] {m : MeasurableSpace α} {μ : Measure α} /-- Given a set `s`, return the continuous linear map `fun x => (μ s).toReal • x`. The extension of that set function through `setToL1` gives the Bochner integral of L1 functions. -/ def weightedSMul {_ : MeasurableSpace α} (μ : Measure α) (s : Set α) : F →L[ℝ] F := (μ s).toReal • ContinuousLinearMap.id ℝ F #align measure_theory.weighted_smul MeasureTheory.weightedSMul theorem weightedSMul_apply {m : MeasurableSpace α} (μ : Measure α) (s : Set α) (x : F) : weightedSMul μ s x = (μ s).toReal • x := by simp [weightedSMul] #align measure_theory.weighted_smul_apply MeasureTheory.weightedSMul_apply @[simp] theorem weightedSMul_zero_measure {m : MeasurableSpace α} : weightedSMul (0 : Measure α) = (0 : Set α → F →L[ℝ] F) := by ext1; simp [weightedSMul] #align measure_theory.weighted_smul_zero_measure MeasureTheory.weightedSMul_zero_measure @[simp] theorem weightedSMul_empty {m : MeasurableSpace α} (μ : Measure α) : weightedSMul μ ∅ = (0 : F →L[ℝ] F) := by ext1 x; rw [weightedSMul_apply]; simp #align measure_theory.weighted_smul_empty MeasureTheory.weightedSMul_empty theorem weightedSMul_add_measure {m : MeasurableSpace α} (μ ν : Measure α) {s : Set α} (hμs : μ s ≠ ∞) (hνs : ν s ≠ ∞) : (weightedSMul (μ + ν) s : F →L[ℝ] F) = weightedSMul μ s + weightedSMul ν s := by ext1 x push_cast simp_rw [Pi.add_apply, weightedSMul_apply] push_cast rw [Pi.add_apply, ENNReal.toReal_add hμs hνs, add_smul] #align measure_theory.weighted_smul_add_measure MeasureTheory.weightedSMul_add_measure theorem weightedSMul_smul_measure {m : MeasurableSpace α} (μ : Measure α) (c : ℝ≥0∞) {s : Set α} : (weightedSMul (c • μ) s : F →L[ℝ] F) = c.toReal • weightedSMul μ s := by ext1 x push_cast simp_rw [Pi.smul_apply, weightedSMul_apply] push_cast simp_rw [Pi.smul_apply, smul_eq_mul, toReal_mul, smul_smul] #align measure_theory.weighted_smul_smul_measure MeasureTheory.weightedSMul_smul_measure theorem weightedSMul_congr (s t : Set α) (hst : μ s = μ t) : (weightedSMul μ s : F →L[ℝ] F) = weightedSMul μ t := by ext1 x; simp_rw [weightedSMul_apply]; congr 2 #align measure_theory.weighted_smul_congr MeasureTheory.weightedSMul_congr theorem weightedSMul_null {s : Set α} (h_zero : μ s = 0) : (weightedSMul μ s : F →L[ℝ] F) = 0 := by ext1 x; rw [weightedSMul_apply, h_zero]; simp #align measure_theory.weighted_smul_null MeasureTheory.weightedSMul_null theorem weightedSMul_union' (s t : Set α) (ht : MeasurableSet t) (hs_finite : μ s ≠ ∞) (ht_finite : μ t ≠ ∞) (h_inter : s ∩ t = ∅) : (weightedSMul μ (s ∪ t) : F →L[ℝ] F) = weightedSMul μ s + weightedSMul μ t := by ext1 x simp_rw [add_apply, weightedSMul_apply, measure_union (Set.disjoint_iff_inter_eq_empty.mpr h_inter) ht, ENNReal.toReal_add hs_finite ht_finite, add_smul] #align measure_theory.weighted_smul_union' MeasureTheory.weightedSMul_union' @[nolint unusedArguments] theorem weightedSMul_union (s t : Set α) (_hs : MeasurableSet s) (ht : MeasurableSet t) (hs_finite : μ s ≠ ∞) (ht_finite : μ t ≠ ∞) (h_inter : s ∩ t = ∅) : (weightedSMul μ (s ∪ t) : F →L[ℝ] F) = weightedSMul μ s + weightedSMul μ t := weightedSMul_union' s t ht hs_finite ht_finite h_inter #align measure_theory.weighted_smul_union MeasureTheory.weightedSMul_union theorem weightedSMul_smul [NormedField 𝕜] [NormedSpace 𝕜 F] [SMulCommClass ℝ 𝕜 F] (c : 𝕜) (s : Set α) (x : F) : weightedSMul μ s (c • x) = c • weightedSMul μ s x := by simp_rw [weightedSMul_apply, smul_comm] #align measure_theory.weighted_smul_smul MeasureTheory.weightedSMul_smul theorem norm_weightedSMul_le (s : Set α) : ‖(weightedSMul μ s : F →L[ℝ] F)‖ ≤ (μ s).toReal := calc ‖(weightedSMul μ s : F →L[ℝ] F)‖ = ‖(μ s).toReal‖ ‖ContinuousLinearMap.id ℝ F‖ := norm_smul (μ s).toReal (ContinuousLinearMap.id ℝ F) _ ≤ ‖(μ s).toReal‖ := ((mul_le_mul_of_nonneg_left norm_id_le (norm_nonneg _)).trans (mul_one _).le) _ = abs (μ s).toReal := Real.norm_eq_abs _ _ = (μ s).toReal := abs_eq_self.mpr ENNReal.toReal_nonneg #align measure_theory.norm_weighted_smul_le MeasureTheory.norm_weightedSMul_le theorem dominatedFinMeasAdditive_weightedSMul {_ : MeasurableSpace α} (μ : Measure α) : DominatedFinMeasAdditive μ (weightedSMul μ : Set α → F →L[ℝ] F) 1 := ⟨weightedSMul_union, fun s _ _ => (norm_weightedSMul_le s).trans (one_mul _).symm.le⟩ #align measure_theory.dominated_fin_meas_additive_weighted_smul MeasureTheory.dominatedFinMeasAdditive_weightedSMul theorem weightedSMul_nonneg (s : Set α) (x : ℝ) (hx : 0 ≤ x) : 0 ≤ weightedSMul μ s x := by simp only [weightedSMul, Algebra.id.smul_eq_mul, coe_smul', _root_.id, coe_id', Pi.smul_apply] exact mul_nonneg toReal_nonneg hx #align measure_theory.weighted_smul_nonneg MeasureTheory.weightedSMul_nonneg end WeightedSMul local infixr:25 " →ₛ " => SimpleFunc namespace SimpleFunc section PosPart variable [LinearOrder E] [Zero E] [MeasurableSpace α] /-- Positive part of a simple function. -/ def posPart (f : α →ₛ E) : α →ₛ E := f.map fun b => max b 0 #align measure_theory.simple_func.pos_part MeasureTheory.SimpleFunc.posPart /-- Negative part of a simple function. -/ def negPart [Neg E] (f : α →ₛ E) : α →ₛ E := posPart (-f) #align measure_theory.simple_func.neg_part MeasureTheory.SimpleFunc.negPart theorem posPart_map_norm (f : α →ₛ ℝ) : (posPart f).map norm = posPart f := by ext; rw [map_apply, Real.norm_eq_abs, abs_of_nonneg]; exact le_max_right _ _ #align measure_theory.simple_func.pos_part_map_norm MeasureTheory.SimpleFunc.posPart_map_norm theorem negPart_map_norm (f : α →ₛ ℝ) : (negPart f).map norm = negPart f := by rw [negPart]; exact posPart_map_norm _ #align measure_theory.simple_func.neg_part_map_norm MeasureTheory.SimpleFunc.negPart_map_norm theorem posPart_sub_negPart (f : α →ₛ ℝ) : f.posPart - f.negPart = f := by simp only [posPart, negPart] ext a rw [coe_sub] exact max_zero_sub_eq_self (f a) #align measure_theory.simple_func.pos_part_sub_neg_part MeasureTheory.SimpleFunc.posPart_sub_negPart end PosPart section Integral /-! ### The Bochner integral of simple functions Define the Bochner integral of simple functions of the type `α →ₛ β` where `β` is a normed group, and prove basic property of this integral. -/ open Finset variable [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedSpace ℝ F] {p : ℝ≥0∞} {G F' : Type} [NormedAddCommGroup G] [NormedAddCommGroup F'] [NormedSpace ℝ F'] {m : MeasurableSpace α} {μ : Measure α} /-- Bochner integral of simple functions whose codomain is a real `NormedSpace`. This is equal to `∑ x ∈ f.range, (μ (f ⁻¹' {x})).toReal • x` (see `integral_eq`). -/ def integral {_ : MeasurableSpace α} (μ : Measure α) (f : α →ₛ F) : F := f.setToSimpleFunc (weightedSMul μ) #align measure_theory.simple_func.integral MeasureTheory.SimpleFunc.integral theorem integral_def {_ : MeasurableSpace α} (μ : Measure α) (f : α →ₛ F) : f.integral μ = f.setToSimpleFunc (weightedSMul μ) := rfl #align measure_theory.simple_func.integral_def MeasureTheory.SimpleFunc.integral_def theorem integral_eq {m : MeasurableSpace α} (μ : Measure α) (f : α →ₛ F) : f.integral μ = ∑ x ∈ f.range, (μ (f ⁻¹' {x})).toReal • x := by simp [integral, setToSimpleFunc, weightedSMul_apply] #align measure_theory.simple_func.integral_eq MeasureTheory.SimpleFunc.integral_eq theorem integral_eq_sum_filter [DecidablePred fun x : F => x ≠ 0] {m : MeasurableSpace α} (f : α →ₛ F) (μ : Measure α) : f.integral μ = ∑ x ∈ f.range.filter fun x => x ≠ 0, (μ (f ⁻¹' {x})).toReal • x := by rw [integral_def, setToSimpleFunc_eq_sum_filter]; simp_rw [weightedSMul_apply]; congr #align measure_theory.simple_func.integral_eq_sum_filter MeasureTheory.SimpleFunc.integral_eq_sum_filter /-- The Bochner integral is equal to a sum over any set that includes `f.range` (except `0`). -/ theorem integral_eq_sum_of_subset [DecidablePred fun x : F => x ≠ 0] {f : α →ₛ F} {s : Finset F} (hs : (f.range.filter fun x => x ≠ 0) ⊆ s) : f.integral μ = ∑ x ∈ s, (μ (f ⁻¹' {x})).toReal • x := by rw [SimpleFunc.integral_eq_sum_filter, Finset.sum_subset hs] rintro x - hx; rw [Finset.mem_filter, not_and_or, Ne, Classical.not_not] at hx -- Porting note: reordered for clarity rcases hx.symm with (rfl \| hx) · simp rw [SimpleFunc.mem_range] at hx -- Porting note: added simp only [Set.mem_range, not_exists] at hx rw [preimage_eq_empty] <;> simp [Set.disjoint_singleton_left, hx] #align measure_theory.simple_func.integral_eq_sum_of_subset MeasureTheory.SimpleFunc.integral_eq_sum_of_subset @[simp] theorem integral_const {m : MeasurableSpace α} (μ : Measure α) (y : F) : (const α y).integral μ = (μ univ).toReal • y := by classical calc (const α y).integral μ = ∑ z ∈ {y}, (μ (const α y ⁻¹' {z})).toReal • z := integral_eq_sum_of_subset <\| (filter_subset _ _).trans (range_const_subset _ _) _ = (μ univ).toReal • y := by simp [Set.preimage] -- Porting note: added `Set.preimage` #align measure_theory.simple_func.integral_const MeasureTheory.SimpleFunc.integral_const @[simp] theorem integral_piecewise_zero {m : MeasurableSpace α} (f : α →ₛ F) (μ : Measure α) {s : Set α} (hs : MeasurableSet s) : (piecewise s hs f 0).integral μ = f.integral (μ.restrict s) := by classical refine (integral_eq_sum_of_subset ?_).trans ((sum_congr rfl fun y hy => ?_).trans (integral_eq_sum_filter _ _).symm) · intro y hy simp only [mem_filter, mem_range, coe_piecewise, coe_zero, piecewise_eq_indicator, mem_range_indicator] at rcases hy with ⟨⟨rfl, -⟩ \| ⟨x, -, rfl⟩, h₀⟩ exacts [(h₀ rfl).elim, ⟨Set.mem_range_self _, h₀⟩] · dsimp rw [Set.piecewise_eq_indicator, indicator_preimage_of_not_mem, Measure.restrict_apply (f.measurableSet_preimage _)] exact fun h₀ => (mem_filter.1 hy).2 (Eq.symm h₀) #align measure_theory.simple_func.integral_piecewise_zero MeasureTheory.SimpleFunc.integral_piecewise_zero /-- Calculate the integral of `g ∘ f : α →ₛ F`, where `f` is an integrable function from `α` to `E` and `g` is a function from `E` to `F`. We require `g 0 = 0` so that `g ∘ f` is integrable. -/ theorem map_integral (f : α →ₛ E) (g : E → F) (hf : Integrable f μ) (hg : g 0 = 0) : (f.map g).integral μ = ∑ x ∈ f.range, ENNReal.toReal (μ (f ⁻¹' {x})) • g x := map_setToSimpleFunc _ weightedSMul_union hf hg #align measure_theory.simple_func.map_integral MeasureTheory.SimpleFunc.map_integral /-- `SimpleFunc.integral` and `SimpleFunc.lintegral` agree when the integrand has type `α →ₛ ℝ≥0∞`. But since `ℝ≥0∞` is not a `NormedSpace`, we need some form of coercion. See `integral_eq_lintegral` for a simpler version. -/ theorem integral_eq_lintegral' {f : α →ₛ E} {g : E → ℝ≥0∞} (hf : Integrable f μ) (hg0 : g 0 = 0) (ht : ∀ b, g b ≠ ∞) : (f.map (ENNReal.toReal ∘ g)).integral μ = ENNReal.toReal (∫⁻ a, g (f a) ∂μ) := by have hf' : f.FinMeasSupp μ := integrable_iff_finMeasSupp.1 hf simp only [← map_apply g f, lintegral_eq_lintegral] rw [map_integral f _ hf, map_lintegral, ENNReal.toReal_sum] · refine Finset.sum_congr rfl fun b _ => ?_ -- Porting note: added `Function.comp_apply` rw [smul_eq_mul, toReal_mul, mul_comm, Function.comp_apply] · rintro a - by_cases a0 : a = 0 · rw [a0, hg0, zero_mul]; exact WithTop.zero_ne_top · apply mul_ne_top (ht a) (hf'.meas_preimage_singleton_ne_zero a0).ne · simp [hg0] #align measure_theory.simple_func.integral_eq_lintegral' MeasureTheory.SimpleFunc.integral_eq_lintegral' variable [NormedField 𝕜] [NormedSpace 𝕜 E] [NormedSpace ℝ E] [SMulCommClass ℝ 𝕜 E] theorem integral_congr {f g : α →ₛ E} (hf : Integrable f μ) (h : f =ᵐ[μ] g) : f.integral μ = g.integral μ := setToSimpleFunc_congr (weightedSMul μ) (fun _ _ => weightedSMul_null) weightedSMul_union hf h #align measure_theory.simple_func.integral_congr MeasureTheory.SimpleFunc.integral_congr /-- `SimpleFunc.bintegral` and `SimpleFunc.integral` agree when the integrand has type `α →ₛ ℝ≥0∞`. But since `ℝ≥0∞` is not a `NormedSpace`, we need some form of coercion. -/ theorem integral_eq_lintegral {f : α →ₛ ℝ} (hf : Integrable f μ) (h_pos : 0 ≤ᵐ[μ] f) : f.integral μ = ENNReal.toReal (∫⁻ a, ENNReal.ofReal (f a) ∂μ) := by have : f =ᵐ[μ] f.map (ENNReal.toReal ∘ ENNReal.ofReal) := h_pos.mono fun a h => (ENNReal.toReal_ofReal h).symm rw [← integral_eq_lintegral' hf] exacts [integral_congr hf this, ENNReal.ofReal_zero, fun b => ENNReal.ofReal_ne_top] #align measure_theory.simple_func.integral_eq_lintegral MeasureTheory.SimpleFunc.integral_eq_lintegral theorem integral_add {f g : α →ₛ E} (hf : Integrable f μ) (hg : Integrable g μ) : integral μ (f + g) = integral μ f + integral μ g := setToSimpleFunc_add _ weightedSMul_union hf hg #align measure_theory.simple_func.integral_add MeasureTheory.SimpleFunc.integral_add theorem integral_neg {f : α →ₛ E} (hf : Integrable f μ) : integral μ (-f) = -integral μ f := setToSimpleFunc_neg _ weightedSMul_union hf #align measure_theory.simple_func.integral_neg MeasureTheory.SimpleFunc.integral_neg theorem integral_sub {f g : α →ₛ E} (hf : Integrable f μ) (hg : Integrable g μ) : integral μ (f - g) = integral μ f - integral μ g := setToSimpleFunc_sub _ weightedSMul_union hf hg #align measure_theory.simple_func.integral_sub MeasureTheory.SimpleFunc.integral_sub theorem integral_smul (c : 𝕜) {f : α →ₛ E} (hf : Integrable f μ) : integral μ (c • f) = c • integral μ f := setToSimpleFunc_smul _ weightedSMul_union weightedSMul_smul c hf #align measure_theory.simple_func.integral_smul MeasureTheory.SimpleFunc.integral_smul theorem norm_setToSimpleFunc_le_integral_norm (T : Set α → E →L[ℝ] F) {C : ℝ} (hT_norm : ∀ s, MeasurableSet s → μ s < ∞ → ‖T s‖ ≤ C * (μ s).toReal) {f : α →ₛ E} (hf : Integrable f μ) : ‖f.setToSimpleFunc T‖ ≤ C * (f.map norm).integral μ := calc ‖f.setToSimpleFunc T‖ ≤ C * ∑ x ∈ f.range, ENNReal.toReal (μ (f ⁻¹' {x})) * ‖x‖ := norm_setToSimpleFunc_le_sum_mul_norm_of_integrable T hT_norm f hf _ = C * (f.map norm).integral μ := by rw [map_integral f norm hf norm_zero]; simp_rw [smul_eq_mul] #align measure_theory.simple_func.norm_set_to_simple_func_le_integral_norm MeasureTheory.SimpleFunc.norm_setToSimpleFunc_le_integral_norm theorem norm_integral_le_integral_norm (f : α →ₛ E) (hf : Integrable f μ) : ‖f.integral μ‖ ≤ (f.map norm).integral μ := by refine (norm_setToSimpleFunc_le_integral_norm _ (fun s _ _ => ?_) hf).trans (one_mul _).le exact (norm_weightedSMul_le s).trans (one_mul _).symm.le #align measure_theory.simple_func.norm_integral_le_integral_norm MeasureTheory.SimpleFunc.norm_integral_le_integral_norm theorem integral_add_measure {ν} (f : α →ₛ E) (hf : Integrable f (μ + ν)) : f.integral (μ + ν) = f.integral μ + f.integral ν := by simp_rw [integral_def] refine setToSimpleFunc_add_left' (weightedSMul μ) (weightedSMul ν) (weightedSMul (μ + ν)) (fun s _ hμνs => ?_) hf rw [lt_top_iff_ne_top, Measure.coe_add, Pi.add_apply, ENNReal.add_ne_top] at hμνs rw [weightedSMul_add_measure _ _ hμνs.1 hμνs.2] #align measure_theory.simple_func.integral_add_measure MeasureTheory.SimpleFunc.integral_add_measure end Integral end SimpleFunc namespace L1 set_option linter.uppercaseLean3 false -- `L1` open AEEqFun Lp.simpleFunc Lp variable [NormedAddCommGroup E] [NormedAddCommGroup F] {m : MeasurableSpace α} {μ : Measure α} namespace SimpleFunc theorem norm_eq_integral (f : α →₁ₛ[μ] E) : ‖f‖ = ((toSimpleFunc f).map norm).integral μ := by rw [norm_eq_sum_mul f, (toSimpleFunc f).map_integral norm (SimpleFunc.integrable f) norm_zero] simp_rw [smul_eq_mul] #align measure_theory.L1.simple_func.norm_eq_integral MeasureTheory.L1.SimpleFunc.norm_eq_integral section PosPart /-- Positive part of a simple function in L1 space. -/ nonrec def posPart (f : α →₁ₛ[μ] ℝ) : α →₁ₛ[μ] ℝ := ⟨Lp.posPart (f : α →₁[μ] ℝ), by rcases f with ⟨f, s, hsf⟩ use s.posPart simp only [Subtype.coe_mk, Lp.coe_posPart, ← hsf, AEEqFun.posPart_mk, SimpleFunc.coe_map, mk_eq_mk] -- Porting note: added simp [SimpleFunc.posPart, Function.comp, EventuallyEq.rfl] ⟩ #align measure_theory.L1.simple_func.pos_part MeasureTheory.L1.SimpleFunc.posPart /-- Negative part of a simple function in L1 space. -/ def negPart (f : α →₁ₛ[μ] ℝ) : α →₁ₛ[μ] ℝ := posPart (-f) #align measure_theory.L1.simple_func.neg_part MeasureTheory.L1.SimpleFunc.negPart @[norm_cast] theorem coe_posPart (f : α →₁ₛ[μ] ℝ) : (posPart f : α →₁[μ] ℝ) = Lp.posPart (f : α →₁[μ] ℝ) := rfl #align measure_theory.L1.simple_func.coe_pos_part MeasureTheory.L1.SimpleFunc.coe_posPart @[norm_cast] theorem coe_negPart (f : α →₁ₛ[μ] ℝ) : (negPart f : α →₁[μ] ℝ) = Lp.negPart (f : α →₁[μ] ℝ) := rfl #align measure_theory.L1.simple_func.coe_neg_part MeasureTheory.L1.SimpleFunc.coe_negPart end PosPart section SimpleFuncIntegral /-! ### The Bochner integral of `L1` Define the Bochner integral on `α →₁ₛ[μ] E` by extension from the simple functions `α →₁ₛ[μ] E`, and prove basic properties of this integral. -/ variable [NormedField 𝕜] [NormedSpace 𝕜 E] [NormedSpace ℝ E] [SMulCommClass ℝ 𝕜 E] {F' : Type} [NormedAddCommGroup F'] [NormedSpace ℝ F'] attribute [local instance] simpleFunc.normedSpace /-- The Bochner integral over simple functions in L1 space. -/ def integral (f : α →₁ₛ[μ] E) : E := (toSimpleFunc f).integral μ #align measure_theory.L1.simple_func.integral MeasureTheory.L1.SimpleFunc.integral theorem integral_eq_integral (f : α →₁ₛ[μ] E) : integral f = (toSimpleFunc f).integral μ := rfl #align measure_theory.L1.simple_func.integral_eq_integral MeasureTheory.L1.SimpleFunc.integral_eq_integral nonrec theorem integral_eq_lintegral {f : α →₁ₛ[μ] ℝ} (h_pos : 0 ≤ᵐ[μ] toSimpleFunc f) : integral f = ENNReal.toReal (∫⁻ a, ENNReal.ofReal ((toSimpleFunc f) a) ∂μ) := by rw [integral, SimpleFunc.integral_eq_lintegral (SimpleFunc.integrable f) h_pos] #align measure_theory.L1.simple_func.integral_eq_lintegral MeasureTheory.L1.SimpleFunc.integral_eq_lintegral theorem integral_eq_setToL1S (f : α →₁ₛ[μ] E) : integral f = setToL1S (weightedSMul μ) f := rfl #align measure_theory.L1.simple_func.integral_eq_set_to_L1s MeasureTheory.L1.SimpleFunc.integral_eq_setToL1S nonrec theorem integral_congr {f g : α →₁ₛ[μ] E} (h : toSimpleFunc f =ᵐ[μ] toSimpleFunc g) : integral f = integral g := SimpleFunc.integral_congr (SimpleFunc.integrable f) h #align measure_theory.L1.simple_func.integral_congr MeasureTheory.L1.SimpleFunc.integral_congr theorem integral_add (f g : α →₁ₛ[μ] E) : integral (f + g) = integral f + integral g := setToL1S_add _ (fun _ _ => weightedSMul_null) weightedSMul_union _ _ #align measure_theory.L1.simple_func.integral_add MeasureTheory.L1.SimpleFunc.integral_add theorem integral_smul (c : 𝕜) (f : α →₁ₛ[μ] E) : integral (c • f) = c • integral f := setToL1S_smul _ (fun _ _ => weightedSMul_null) weightedSMul_union weightedSMul_smul c f #align measure_theory.L1.simple_func.integral_smul MeasureTheory.L1.SimpleFunc.integral_smul theorem norm_integral_le_norm (f : α →₁ₛ[μ] E) : ‖integral f‖ ≤ ‖f‖ := by rw [integral, norm_eq_integral] exact (toSimpleFunc f).norm_integral_le_integral_norm (SimpleFunc.integrable f) #align measure_theory.L1.simple_func.norm_integral_le_norm MeasureTheory.L1.SimpleFunc.norm_integral_le_norm variable {E' : Type} [NormedAddCommGroup E'] [NormedSpace ℝ E'] [NormedSpace 𝕜 E'] variable (α E μ 𝕜) /-- The Bochner integral over simple functions in L1 space as a continuous linear map. -/ def integralCLM' : (α →₁ₛ[μ] E) →L[𝕜] E := LinearMap.mkContinuous ⟨⟨integral, integral_add⟩, integral_smul⟩ 1 fun f => le_trans (norm_integral_le_norm _) <\| by rw [one_mul] #align measure_theory.L1.simple_func.integral_clm' MeasureTheory.L1.SimpleFunc.integralCLM' /-- The Bochner integral over simple functions in L1 space as a continuous linear map over ℝ. -/ def integralCLM : (α →₁ₛ[μ] E) →L[ℝ] E := integralCLM' α E ℝ μ #align measure_theory.L1.simple_func.integral_clm MeasureTheory.L1.SimpleFunc.integralCLM variable {α E μ 𝕜} local notation "Integral" => integralCLM α E μ open ContinuousLinearMap theorem norm_Integral_le_one : ‖Integral‖ ≤ 1 := -- Porting note: Old proof was `LinearMap.mkContinuous_norm_le _ zero_le_one _` LinearMap.mkContinuous_norm_le _ zero_le_one (fun f => by rw [one_mul] exact norm_integral_le_norm f) #align measure_theory.L1.simple_func.norm_Integral_le_one MeasureTheory.L1.SimpleFunc.norm_Integral_le_one section PosPart theorem posPart_toSimpleFunc (f : α →₁ₛ[μ] ℝ) : toSimpleFunc (posPart f) =ᵐ[μ] (toSimpleFunc f).posPart := by have eq : ∀ a, (toSimpleFunc f).posPart a = max ((toSimpleFunc f) a) 0 := fun a => rfl have ae_eq : ∀ᵐ a ∂μ, toSimpleFunc (posPart f) a = max ((toSimpleFunc f) a) 0 := by filter_upwards [toSimpleFunc_eq_toFun (posPart f), Lp.coeFn_posPart (f : α →₁[μ] ℝ), toSimpleFunc_eq_toFun f] with _ _ h₂ h₃ convert h₂ using 1 -- Porting note: added rw [h₃] refine ae_eq.mono fun a h => ?_ rw [h, eq] #align measure_theory.L1.simple_func.pos_part_to_simple_func MeasureTheory.L1.SimpleFunc.posPart_toSimpleFunc theorem negPart_toSimpleFunc (f : α →₁ₛ[μ] ℝ) : toSimpleFunc (negPart f) =ᵐ[μ] (toSimpleFunc f).negPart := by rw [SimpleFunc.negPart, MeasureTheory.SimpleFunc.negPart] filter_upwards [posPart_toSimpleFunc (-f), neg_toSimpleFunc f] intro a h₁ h₂ rw [h₁] show max _ _ = max _ _ rw [h₂] rfl #align measure_theory.L1.simple_func.neg_part_to_simple_func MeasureTheory.L1.SimpleFunc.negPart_toSimpleFunc theorem integral_eq_norm_posPart_sub (f : α →₁ₛ[μ] ℝ) : integral f = ‖posPart f‖ - ‖negPart f‖ := by -- Convert things in `L¹` to their `SimpleFunc` counterpart have ae_eq₁ : (toSimpleFunc f).posPart =ᵐ[μ] (toSimpleFunc (posPart f)).map norm := by filter_upwards [posPart_toSimpleFunc f] with _ h rw [SimpleFunc.map_apply, h] conv_lhs => rw [← SimpleFunc.posPart_map_norm, SimpleFunc.map_apply] -- Convert things in `L¹` to their `SimpleFunc` counterpart have ae_eq₂ : (toSimpleFunc f).negPart =ᵐ[μ] (toSimpleFunc (negPart f)).map norm := by filter_upwards [negPart_toSimpleFunc f] with _ h rw [SimpleFunc.map_apply, h] conv_lhs => rw [← SimpleFunc.negPart_map_norm, SimpleFunc.map_apply] rw [integral, norm_eq_integral, norm_eq_integral, ← SimpleFunc.integral_sub] · show (toSimpleFunc f).integral μ = ((toSimpleFunc (posPart f)).map norm - (toSimpleFunc (negPart f)).map norm).integral μ apply MeasureTheory.SimpleFunc.integral_congr (SimpleFunc.integrable f) filter_upwards [ae_eq₁, ae_eq₂] with _ h₁ h₂ show _ = _ - _ rw [← h₁, ← h₂] have := (toSimpleFunc f).posPart_sub_negPart conv_lhs => rw [← this] rfl · exact (SimpleFunc.integrable f).pos_part.congr ae_eq₁ · exact (SimpleFunc.integrable f).neg_part.congr ae_eq₂ #align measure_theory.L1.simple_func.integral_eq_norm_pos_part_sub MeasureTheory.L1.SimpleFunc.integral_eq_norm_posPart_sub end PosPart end SimpleFuncIntegral end SimpleFunc open SimpleFunc local notation "Integral" => @integralCLM α E _ _ _ _ _ μ _ variable [NormedSpace ℝ E] [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℝ 𝕜 E] [NormedSpace ℝ F] [CompleteSpace E] section IntegrationInL1 attribute [local instance] simpleFunc.normedSpace open ContinuousLinearMap variable (𝕜) /-- The Bochner integral in L1 space as a continuous linear map. -/ nonrec def integralCLM' : (α →₁[μ] E) →L[𝕜] E := (integralCLM' α E 𝕜 μ).extend (coeToLp α E 𝕜) (simpleFunc.denseRange one_ne_top) simpleFunc.uniformInducing #align measure_theory.L1.integral_clm' MeasureTheory.L1.integralCLM' variable {𝕜} /-- The Bochner integral in L1 space as a continuous linear map over ℝ. -/ def integralCLM : (α →₁[μ] E) →L[ℝ] E := integralCLM' ℝ #align measure_theory.L1.integral_clm MeasureTheory.L1.integralCLM -- Porting note: added `(E := E)` in several places below. /-- The Bochner integral in L1 space -/ irreducible_def integral (f : α →₁[μ] E) : E := integralCLM (E := E) f #align measure_theory.L1.integral MeasureTheory.L1.integral theorem integral_eq (f : α →₁[μ] E) : integral f = integralCLM (E := E) f := by simp only [integral] #align measure_theory.L1.integral_eq MeasureTheory.L1.integral_eq theorem integral_eq_setToL1 (f : α →₁[μ] E) : integral f = setToL1 (E := E) (dominatedFinMeasAdditive_weightedSMul μ) f := by simp only [integral]; rfl #align measure_theory.L1.integral_eq_set_to_L1 MeasureTheory.L1.integral_eq_setToL1 @[norm_cast] theorem SimpleFunc.integral_L1_eq_integral (f : α →₁ₛ[μ] E) : L1.integral (f : α →₁[μ] E) = SimpleFunc.integral f := by simp only [integral, L1.integral] exact setToL1_eq_setToL1SCLM (dominatedFinMeasAdditive_weightedSMul μ) f #align measure_theory.L1.simple_func.integral_L1_eq_integral MeasureTheory.L1.SimpleFunc.integral_L1_eq_integral variable (α E) @[simp] theorem integral_zero : integral (0 : α →₁[μ] E) = 0 := by simp only [integral] exact map_zero integralCLM #align measure_theory.L1.integral_zero MeasureTheory.L1.integral_zero variable {α E} @[integral_simps] theorem integral_add (f g : α →₁[μ] E) : integral (f + g) = integral f + integral g := by simp only [integral] exact map_add integralCLM f g #align measure_theory.L1.integral_add MeasureTheory.L1.integral_add @[integral_simps] theorem integral_neg (f : α →₁[μ] E) : integral (-f) = -integral f := by simp only [integral] exact map_neg integralCLM f #align measure_theory.L1.integral_neg MeasureTheory.L1.integral_neg @[integral_simps] theorem integral_sub (f g : α →₁[μ] E) : integral (f - g) = integral f - integral g := by simp only [integral] exact map_sub integralCLM f g #align measure_theory.L1.integral_sub MeasureTheory.L1.integral_sub @[integral_simps] theorem integral_smul (c : 𝕜) (f : α →₁[μ] E) : integral (c • f) = c • integral f := by simp only [integral] show (integralCLM' (E := E) 𝕜) (c • f) = c • (integralCLM' (E := E) 𝕜) f exact map_smul (integralCLM' (E := E) 𝕜) c f #align measure_theory.L1.integral_smul MeasureTheory.L1.integral_smul local notation "Integral" => @integralCLM α E _ _ μ _ _ local notation "sIntegral" => @SimpleFunc.integralCLM α E _ _ μ _ theorem norm_Integral_le_one : ‖integralCLM (α := α) (E := E) (μ := μ)‖ ≤ 1 := norm_setToL1_le (dominatedFinMeasAdditive_weightedSMul μ) zero_le_one #align measure_theory.L1.norm_Integral_le_one MeasureTheory.L1.norm_Integral_le_one theorem nnnorm_Integral_le_one : ‖integralCLM (α := α) (E := E) (μ := μ)‖₊ ≤ 1 := norm_Integral_le_one theorem norm_integral_le (f : α →₁[μ] E) : ‖integral f‖ ≤ ‖f‖ := calc ‖integral f‖ = ‖integralCLM (E := E) f‖ := by simp only [integral] _ ≤ ‖integralCLM (α := α) (E := E) (μ := μ)‖ * ‖f‖ := le_opNorm _ _ _ ≤ 1 * ‖f‖ := mul_le_mul_of_nonneg_right norm_Integral_le_one <\| norm_nonneg _ _ = ‖f‖ := one_mul _ #align measure_theory.L1.norm_integral_le MeasureTheory.L1.norm_integral_le theorem nnnorm_integral_le (f : α →₁[μ] E) : ‖integral f‖₊ ≤ ‖f‖₊ := norm_integral_le f @[continuity] theorem continuous_integral : Continuous fun f : α →₁[μ] E => integral f := by simp only [integral] exact L1.integralCLM.continuous #align measure_theory.L1.continuous_integral MeasureTheory.L1.continuous_integral section PosPart theorem integral_eq_norm_posPart_sub (f : α →₁[μ] ℝ) : integral f = ‖Lp.posPart f‖ - ‖Lp.negPart f‖ := by -- Use `isClosed_property` and `isClosed_eq` refine @isClosed_property _ _ _ ((↑) : (α →₁ₛ[μ] ℝ) → α →₁[μ] ℝ) (fun f : α →₁[μ] ℝ => integral f = ‖Lp.posPart f‖ - ‖Lp.negPart f‖) (simpleFunc.denseRange one_ne_top) (isClosed_eq ?_ ?_) ?_ f · simp only [integral] exact cont _ · refine Continuous.sub (continuous_norm.comp Lp.continuous_posPart) (continuous_norm.comp Lp.continuous_negPart) -- Show that the property holds for all simple functions in the `L¹` space. · intro s norm_cast exact SimpleFunc.integral_eq_norm_posPart_sub _ #align measure_theory.L1.integral_eq_norm_pos_part_sub MeasureTheory.L1.integral_eq_norm_posPart_sub end PosPart end IntegrationInL1 end L1 /-! ## The Bochner integral on functions Define the Bochner integral on functions generally to be the `L1` Bochner integral, for integrable functions, and 0 otherwise; prove its basic properties. -/ variable [NormedAddCommGroup E] [NormedSpace ℝ E] [hE : CompleteSpace E] [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℝ 𝕜 E] [NormedAddCommGroup F] [NormedSpace ℝ F] [CompleteSpace F] {G : Type} [NormedAddCommGroup G] [NormedSpace ℝ G] section open scoped Classical /-- The Bochner integral -/ irreducible_def integral {_ : MeasurableSpace α} (μ : Measure α) (f : α → G) : G := if _ : CompleteSpace G then if hf : Integrable f μ then L1.integral (hf.toL1 f) else 0 else 0 #align measure_theory.integral MeasureTheory.integral end /-! In the notation for integrals, an expression like `∫ x, g ‖x‖ ∂μ` will not be parsed correctly, and needs parentheses. We do not set the binding power of `r` to `0`, because then `∫ x, f x = 0` will be parsed incorrectly. -/ @[inherit_doc MeasureTheory.integral] notation3 "∫ "(...)", "r:60:(scoped f => f)" ∂"μ:70 => integral μ r @[inherit_doc MeasureTheory.integral] notation3 "∫ "(...)", "r:60:(scoped f => integral volume f) => r @[inherit_doc MeasureTheory.integral] notation3 "∫ "(...)" in "s", "r:60:(scoped f => f)" ∂"μ:70 => integral (Measure.restrict μ s) r @[inherit_doc MeasureTheory.integral] notation3 "∫ "(...)" in "s", "r:60:(scoped f => integral (Measure.restrict volume s) f) => r section Properties open ContinuousLinearMap MeasureTheory.SimpleFunc variable {f g : α → E} {m : MeasurableSpace α} {μ : Measure α} theorem integral_eq (f : α → E) (hf : Integrable f μ) : ∫ a, f a ∂μ = L1.integral (hf.toL1 f) := by simp [integral, hE, hf] #align measure_theory.integral_eq MeasureTheory.integral_eq theorem integral_eq_setToFun (f : α → E) : ∫ a, f a ∂μ = setToFun μ (weightedSMul μ) (dominatedFinMeasAdditive_weightedSMul μ) f := by simp only [integral, hE, L1.integral]; rfl #align measure_theory.integral_eq_set_to_fun MeasureTheory.integral_eq_setToFun theorem L1.integral_eq_integral (f : α →₁[μ] E) : L1.integral f = ∫ a, f a ∂μ := by simp only [integral, L1.integral, integral_eq_setToFun] exact (L1.setToFun_eq_setToL1 (dominatedFinMeasAdditive_weightedSMul μ) f).symm set_option linter.uppercaseLean3 false in #align measure_theory.L1.integral_eq_integral MeasureTheory.L1.integral_eq_integral theorem integral_undef {f : α → G} (h : ¬Integrable f μ) : ∫ a, f a ∂μ = 0 := by by_cases hG : CompleteSpace G · simp [integral, hG, h] · simp [integral, hG] #align measure_theory.integral_undef MeasureTheory.integral_undef theorem Integrable.of_integral_ne_zero {f : α → G} (h : ∫ a, f a ∂μ ≠ 0) : Integrable f μ := Not.imp_symm integral_undef h theorem integral_non_aestronglyMeasurable {f : α → G} (h : ¬AEStronglyMeasurable f μ) : ∫ a, f a ∂μ = 0 := integral_undef <\| not_and_of_not_left _ h #align measure_theory.integral_non_ae_strongly_measurable MeasureTheory.integral_non_aestronglyMeasurable variable (α G) @[simp] theorem integral_zero : ∫ _ : α, (0 : G) ∂μ = 0 := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_zero (dominatedFinMeasAdditive_weightedSMul μ) · simp [integral, hG] #align measure_theory.integral_zero MeasureTheory.integral_zero @[simp] theorem integral_zero' : integral μ (0 : α → G) = 0 := integral_zero α G #align measure_theory.integral_zero' MeasureTheory.integral_zero' variable {α G} theorem integrable_of_integral_eq_one {f : α → ℝ} (h : ∫ x, f x ∂μ = 1) : Integrable f μ := .of_integral_ne_zero <\| h ▸ one_ne_zero #align measure_theory.integrable_of_integral_eq_one MeasureTheory.integrable_of_integral_eq_one theorem integral_add {f g : α → G} (hf : Integrable f μ) (hg : Integrable g μ) : ∫ a, f a + g a ∂μ = ∫ a, f a ∂μ + ∫ a, g a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_add (dominatedFinMeasAdditive_weightedSMul μ) hf hg · simp [integral, hG] #align measure_theory.integral_add MeasureTheory.integral_add theorem integral_add' {f g : α → G} (hf : Integrable f μ) (hg : Integrable g μ) : ∫ a, (f + g) a ∂μ = ∫ a, f a ∂μ + ∫ a, g a ∂μ := integral_add hf hg #align measure_theory.integral_add' MeasureTheory.integral_add' theorem integral_finset_sum {ι} (s : Finset ι) {f : ι → α → G} (hf : ∀ i ∈ s, Integrable (f i) μ) : ∫ a, ∑ i ∈ s, f i a ∂μ = ∑ i ∈ s, ∫ a, f i a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_finset_sum (dominatedFinMeasAdditive_weightedSMul _) s hf · simp [integral, hG] #align measure_theory.integral_finset_sum MeasureTheory.integral_finset_sum @[integral_simps] theorem integral_neg (f : α → G) : ∫ a, -f a ∂μ = -∫ a, f a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_neg (dominatedFinMeasAdditive_weightedSMul μ) f · simp [integral, hG] #align measure_theory.integral_neg MeasureTheory.integral_neg theorem integral_neg' (f : α → G) : ∫ a, (-f) a ∂μ = -∫ a, f a ∂μ := integral_neg f #align measure_theory.integral_neg' MeasureTheory.integral_neg' theorem integral_sub {f g : α → G} (hf : Integrable f μ) (hg : Integrable g μ) : ∫ a, f a - g a ∂μ = ∫ a, f a ∂μ - ∫ a, g a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_sub (dominatedFinMeasAdditive_weightedSMul μ) hf hg · simp [integral, hG] #align measure_theory.integral_sub MeasureTheory.integral_sub theorem integral_sub' {f g : α → G} (hf : Integrable f μ) (hg : Integrable g μ) : ∫ a, (f - g) a ∂μ = ∫ a, f a ∂μ - ∫ a, g a ∂μ := integral_sub hf hg #align measure_theory.integral_sub' MeasureTheory.integral_sub' @[integral_simps] theorem integral_smul [NormedSpace 𝕜 G] [SMulCommClass ℝ 𝕜 G] (c : 𝕜) (f : α → G) : ∫ a, c • f a ∂μ = c • ∫ a, f a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_smul (dominatedFinMeasAdditive_weightedSMul μ) weightedSMul_smul c f · simp [integral, hG] #align measure_theory.integral_smul MeasureTheory.integral_smul theorem integral_mul_left {L : Type} [RCLike L] (r : L) (f : α → L) : ∫ a, r * f a ∂μ = r * ∫ a, f a ∂μ := integral_smul r f #align measure_theory.integral_mul_left MeasureTheory.integral_mul_left theorem integral_mul_right {L : Type} [RCLike L] (r : L) (f : α → L) : ∫ a, f a r ∂μ = (∫ a, f a ∂μ) * r := by simp only [mul_comm]; exact integral_mul_left r f #align measure_theory.integral_mul_right MeasureTheory.integral_mul_right theorem integral_div {L : Type} [RCLike L] (r : L) (f : α → L) : ∫ a, f a / r ∂μ = (∫ a, f a ∂μ) / r := by simpa only [← div_eq_mul_inv] using integral_mul_right r⁻¹ f #align measure_theory.integral_div MeasureTheory.integral_div theorem integral_congr_ae {f g : α → G} (h : f =ᵐ[μ] g) : ∫ a, f a ∂μ = ∫ a, g a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact setToFun_congr_ae (dominatedFinMeasAdditive_weightedSMul μ) h · simp [integral, hG] #align measure_theory.integral_congr_ae MeasureTheory.integral_congr_ae -- Porting note: `nolint simpNF` added because simplify fails on left-hand side @[simp, nolint simpNF] theorem L1.integral_of_fun_eq_integral {f : α → G} (hf : Integrable f μ) : ∫ a, (hf.toL1 f) a ∂μ = ∫ a, f a ∂μ := by by_cases hG : CompleteSpace G · simp only [MeasureTheory.integral, hG, L1.integral] exact setToFun_toL1 (dominatedFinMeasAdditive_weightedSMul μ) hf · simp [MeasureTheory.integral, hG] set_option linter.uppercaseLean3 false in #align measure_theory.L1.integral_of_fun_eq_integral MeasureTheory.L1.integral_of_fun_eq_integral @[continuity] theorem continuous_integral : Continuous fun f : α →₁[μ] G => ∫ a, f a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact continuous_setToFun (dominatedFinMeasAdditive_weightedSMul μ) · simp [integral, hG, continuous_const] #align measure_theory.continuous_integral MeasureTheory.continuous_integral theorem norm_integral_le_lintegral_norm (f : α → G) : ‖∫ a, f a ∂μ‖ ≤ ENNReal.toReal (∫⁻ a, ENNReal.ofReal ‖f a‖ ∂μ) := by by_cases hG : CompleteSpace G · by_cases hf : Integrable f μ · rw [integral_eq f hf, ← Integrable.norm_toL1_eq_lintegral_norm f hf] exact L1.norm_integral_le _ · rw [integral_undef hf, norm_zero]; exact toReal_nonneg · simp [integral, hG] #align measure_theory.norm_integral_le_lintegral_norm MeasureTheory.norm_integral_le_lintegral_norm theorem ennnorm_integral_le_lintegral_ennnorm (f : α → G) : (‖∫ a, f a ∂μ‖₊ : ℝ≥0∞) ≤ ∫⁻ a, ‖f a‖₊ ∂μ := by simp_rw [← ofReal_norm_eq_coe_nnnorm] apply ENNReal.ofReal_le_of_le_toReal exact norm_integral_le_lintegral_norm f #align measure_theory.ennnorm_integral_le_lintegral_ennnorm MeasureTheory.ennnorm_integral_le_lintegral_ennnorm theorem integral_eq_zero_of_ae {f : α → G} (hf : f =ᵐ[μ] 0) : ∫ a, f a ∂μ = 0 := by simp [integral_congr_ae hf, integral_zero] #align measure_theory.integral_eq_zero_of_ae MeasureTheory.integral_eq_zero_of_ae /-- If `f` has finite integral, then `∫ x in s, f x ∂μ` is absolutely continuous in `s`: it tends to zero as `μ s` tends to zero. -/ theorem HasFiniteIntegral.tendsto_setIntegral_nhds_zero {ι} {f : α → G} (hf : HasFiniteIntegral f μ) {l : Filter ι} {s : ι → Set α} (hs : Tendsto (μ ∘ s) l (𝓝 0)) : Tendsto (fun i => ∫ x in s i, f x ∂μ) l (𝓝 0) := by rw [tendsto_zero_iff_norm_tendsto_zero] simp_rw [← coe_nnnorm, ← NNReal.coe_zero, NNReal.tendsto_coe, ← ENNReal.tendsto_coe, ENNReal.coe_zero] exact tendsto_of_tendsto_of_tendsto_of_le_of_le tendsto_const_nhds (tendsto_set_lintegral_zero (ne_of_lt hf) hs) (fun i => zero_le _) fun i => ennnorm_integral_le_lintegral_ennnorm _ #align measure_theory.has_finite_integral.tendsto_set_integral_nhds_zero MeasureTheory.HasFiniteIntegral.tendsto_setIntegral_nhds_zero @[deprecated (since := "2024-04-17")] alias HasFiniteIntegral.tendsto_set_integral_nhds_zero := HasFiniteIntegral.tendsto_setIntegral_nhds_zero /-- If `f` is integrable, then `∫ x in s, f x ∂μ` is absolutely continuous in `s`: it tends to zero as `μ s` tends to zero. -/ theorem Integrable.tendsto_setIntegral_nhds_zero {ι} {f : α → G} (hf : Integrable f μ) {l : Filter ι} {s : ι → Set α} (hs : Tendsto (μ ∘ s) l (𝓝 0)) : Tendsto (fun i => ∫ x in s i, f x ∂μ) l (𝓝 0) := hf.2.tendsto_setIntegral_nhds_zero hs #align measure_theory.integrable.tendsto_set_integral_nhds_zero MeasureTheory.Integrable.tendsto_setIntegral_nhds_zero @[deprecated (since := "2024-04-17")] alias Integrable.tendsto_set_integral_nhds_zero := Integrable.tendsto_setIntegral_nhds_zero /-- If `F i → f` in `L1`, then `∫ x, F i x ∂μ → ∫ x, f x ∂μ`. -/ theorem tendsto_integral_of_L1 {ι} (f : α → G) (hfi : Integrable f μ) {F : ι → α → G} {l : Filter ι} (hFi : ∀ᶠ i in l, Integrable (F i) μ) (hF : Tendsto (fun i => ∫⁻ x, ‖F i x - f x‖₊ ∂μ) l (𝓝 0)) : Tendsto (fun i => ∫ x, F i x ∂μ) l (𝓝 <\| ∫ x, f x ∂μ) := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact tendsto_setToFun_of_L1 (dominatedFinMeasAdditive_weightedSMul μ) f hfi hFi hF · simp [integral, hG, tendsto_const_nhds] set_option linter.uppercaseLean3 false in #align measure_theory.tendsto_integral_of_L1 MeasureTheory.tendsto_integral_of_L1 /-- If `F i → f` in `L1`, then `∫ x, F i x ∂μ → ∫ x, f x ∂μ`. -/ lemma tendsto_integral_of_L1' {ι} (f : α → G) (hfi : Integrable f μ) {F : ι → α → G} {l : Filter ι} (hFi : ∀ᶠ i in l, Integrable (F i) μ) (hF : Tendsto (fun i ↦ snorm (F i - f) 1 μ) l (𝓝 0)) : Tendsto (fun i ↦ ∫ x, F i x ∂μ) l (𝓝 (∫ x, f x ∂μ)) := by refine tendsto_integral_of_L1 f hfi hFi ?_ simp_rw [snorm_one_eq_lintegral_nnnorm, Pi.sub_apply] at hF exact hF /-- If `F i → f` in `L1`, then `∫ x in s, F i x ∂μ → ∫ x in s, f x ∂μ`. -/ lemma tendsto_setIntegral_of_L1 {ι} (f : α → G) (hfi : Integrable f μ) {F : ι → α → G} {l : Filter ι} (hFi : ∀ᶠ i in l, Integrable (F i) μ) (hF : Tendsto (fun i ↦ ∫⁻ x, ‖F i x - f x‖₊ ∂μ) l (𝓝 0)) (s : Set α) : Tendsto (fun i ↦ ∫ x in s, F i x ∂μ) l (𝓝 (∫ x in s, f x ∂μ)) := by refine tendsto_integral_of_L1 f hfi.restrict ?_ ?_ · filter_upwards [hFi] with i hi using hi.restrict · simp_rw [← snorm_one_eq_lintegral_nnnorm] at hF ⊢ exact tendsto_of_tendsto_of_tendsto_of_le_of_le tendsto_const_nhds hF (fun _ ↦ zero_le') (fun _ ↦ snorm_mono_measure _ Measure.restrict_le_self) @[deprecated (since := "2024-04-17")] alias tendsto_set_integral_of_L1 := tendsto_setIntegral_of_L1 /-- If `F i → f` in `L1`, then `∫ x in s, F i x ∂μ → ∫ x in s, f x ∂μ`. -/ lemma tendsto_setIntegral_of_L1' {ι} (f : α → G) (hfi : Integrable f μ) {F : ι → α → G} {l : Filter ι} (hFi : ∀ᶠ i in l, Integrable (F i) μ) (hF : Tendsto (fun i ↦ snorm (F i - f) 1 μ) l (𝓝 0)) (s : Set α) : Tendsto (fun i ↦ ∫ x in s, F i x ∂μ) l (𝓝 (∫ x in s, f x ∂μ)) := by refine tendsto_setIntegral_of_L1 f hfi hFi ?_ s simp_rw [snorm_one_eq_lintegral_nnnorm, Pi.sub_apply] at hF exact hF @[deprecated (since := "2024-04-17")] alias tendsto_set_integral_of_L1' := tendsto_setIntegral_of_L1' variable {X : Type} [TopologicalSpace X] [FirstCountableTopology X] theorem continuousWithinAt_of_dominated {F : X → α → G} {x₀ : X} {bound : α → ℝ} {s : Set X} (hF_meas : ∀ᶠ x in 𝓝[s] x₀, AEStronglyMeasurable (F x) μ) (h_bound : ∀ᶠ x in 𝓝[s] x₀, ∀ᵐ a ∂μ, ‖F x a‖ ≤ bound a) (bound_integrable : Integrable bound μ) (h_cont : ∀ᵐ a ∂μ, ContinuousWithinAt (fun x => F x a) s x₀) : ContinuousWithinAt (fun x => ∫ a, F x a ∂μ) s x₀ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact continuousWithinAt_setToFun_of_dominated (dominatedFinMeasAdditive_weightedSMul μ) hF_meas h_bound bound_integrable h_cont · simp [integral, hG, continuousWithinAt_const] #align measure_theory.continuous_within_at_of_dominated MeasureTheory.continuousWithinAt_of_dominated theorem continuousAt_of_dominated {F : X → α → G} {x₀ : X} {bound : α → ℝ} (hF_meas : ∀ᶠ x in 𝓝 x₀, AEStronglyMeasurable (F x) μ) (h_bound : ∀ᶠ x in 𝓝 x₀, ∀ᵐ a ∂μ, ‖F x a‖ ≤ bound a) (bound_integrable : Integrable bound μ) (h_cont : ∀ᵐ a ∂μ, ContinuousAt (fun x => F x a) x₀) : ContinuousAt (fun x => ∫ a, F x a ∂μ) x₀ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact continuousAt_setToFun_of_dominated (dominatedFinMeasAdditive_weightedSMul μ) hF_meas h_bound bound_integrable h_cont · simp [integral, hG, continuousAt_const] #align measure_theory.continuous_at_of_dominated MeasureTheory.continuousAt_of_dominated theorem continuousOn_of_dominated {F : X → α → G} {bound : α → ℝ} {s : Set X} (hF_meas : ∀ x ∈ s, AEStronglyMeasurable (F x) μ) (h_bound : ∀ x ∈ s, ∀ᵐ a ∂μ, ‖F x a‖ ≤ bound a) (bound_integrable : Integrable bound μ) (h_cont : ∀ᵐ a ∂μ, ContinuousOn (fun x => F x a) s) : ContinuousOn (fun x => ∫ a, F x a ∂μ) s := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact continuousOn_setToFun_of_dominated (dominatedFinMeasAdditive_weightedSMul μ) hF_meas h_bound bound_integrable h_cont · simp [integral, hG, continuousOn_const] #align measure_theory.continuous_on_of_dominated MeasureTheory.continuousOn_of_dominated theorem continuous_of_dominated {F : X → α → G} {bound : α → ℝ} (hF_meas : ∀ x, AEStronglyMeasurable (F x) μ) (h_bound : ∀ x, ∀ᵐ a ∂μ, ‖F x a‖ ≤ bound a) (bound_integrable : Integrable bound μ) (h_cont : ∀ᵐ a ∂μ, Continuous fun x => F x a) : Continuous fun x => ∫ a, F x a ∂μ := by by_cases hG : CompleteSpace G · simp only [integral, hG, L1.integral] exact continuous_setToFun_of_dominated (dominatedFinMeasAdditive_weightedSMul μ) hF_meas h_bound bound_integrable h_cont · simp [integral, hG, continuous_const] #align measure_theory.continuous_of_dominated MeasureTheory.continuous_of_dominated /-- The Bochner integral of a real-valued function `f : α → ℝ` is the difference between the integral of the positive part of `f` and the integral of the negative part of `f`. -/ theorem integral_eq_lintegral_pos_part_sub_lintegral_neg_part {f : α → ℝ} (hf : Integrable f μ) : ∫ a, f a ∂μ = ENNReal.toReal (∫⁻ a, .ofReal (f a) ∂μ) - ENNReal.toReal (∫⁻ a, .ofReal (-f a) ∂μ) := by let f₁ := hf.toL1 f -- Go to the `L¹` space have eq₁ : ENNReal.toReal (∫⁻ a, ENNReal.ofReal (f a) ∂μ) = ‖Lp.posPart f₁‖ := by rw [L1.norm_def] congr 1 apply lintegral_congr_ae filter_upwards [Lp.coeFn_posPart f₁, hf.coeFn_toL1] with _ h₁ h₂ rw [h₁, h₂, ENNReal.ofReal] congr 1 apply NNReal.eq rw [Real.nnnorm_of_nonneg (le_max_right _ _)] rw [Real.coe_toNNReal', NNReal.coe_mk] -- Go to the `L¹` space have eq₂ : ENNReal.toReal (∫⁻ a, ENNReal.ofReal (-f a) ∂μ) = ‖Lp.negPart f₁‖ := by rw [L1.norm_def] congr 1 apply lintegral_congr_ae filter_upwards [Lp.coeFn_negPart f₁, hf.coeFn_toL1] with _ h₁ h₂ rw [h₁, h₂, ENNReal.ofReal] congr 1 apply NNReal.eq simp only [Real.coe_toNNReal', coe_nnnorm, nnnorm_neg] rw [Real.norm_of_nonpos (min_le_right _ _), ← max_neg_neg, neg_zero] rw [eq₁, eq₂, integral, dif_pos, dif_pos] exact L1.integral_eq_norm_posPart_sub _ #align measure_theory.integral_eq_lintegral_pos_part_sub_lintegral_neg_part MeasureTheory.integral_eq_lintegral_pos_part_sub_lintegral_neg_part theorem integral_eq_lintegral_of_nonneg_ae {f : α → ℝ} (hf : 0 ≤ᵐ[μ] f) (hfm : AEStronglyMeasurable f μ) : ∫ a, f a ∂μ = ENNReal.toReal (∫⁻ a, ENNReal.ofReal (f a) ∂μ) := by by_cases hfi : Integrable f μ · rw [integral_eq_lintegral_pos_part_sub_lintegral_neg_part hfi] have h_min : ∫⁻ a, ENNReal.ofReal (-f a) ∂μ = 0 := by rw [lintegral_eq_zero_iff'] · refine hf.mono ?_ simp only [Pi.zero_apply] intro a h simp only [h, neg_nonpos, ofReal_eq_zero] · exact measurable_ofReal.comp_aemeasurable hfm.aemeasurable.neg rw [h_min, zero_toReal, _root_.sub_zero] · rw [integral_undef hfi] simp_rw [Integrable, hfm, hasFiniteIntegral_iff_norm, lt_top_iff_ne_top, Ne, true_and_iff, Classical.not_not] at hfi have : ∫⁻ a : α, ENNReal.ofReal (f a) ∂μ = ∫⁻ a, ENNReal.ofReal ‖f a‖ ∂μ := by refine lintegral_congr_ae (hf.mono fun a h => ?_) dsimp only rw [Real.norm_eq_abs, abs_of_nonneg h] rw [this, hfi]; rfl #align measure_theory.integral_eq_lintegral_of_nonneg_ae MeasureTheory.integral_eq_lintegral_of_nonneg_ae theorem integral_norm_eq_lintegral_nnnorm {P : Type} [NormedAddCommGroup P] {f : α → P} (hf : AEStronglyMeasurable f μ) : ∫ x, ‖f x‖ ∂μ = ENNReal.toReal (∫⁻ x, ‖f x‖₊ ∂μ) := by rw [integral_eq_lintegral_of_nonneg_ae _ hf.norm] · simp_rw [ofReal_norm_eq_coe_nnnorm] · filter_upwards; simp_rw [Pi.zero_apply, norm_nonneg, imp_true_iff] #align measure_theory.integral_norm_eq_lintegral_nnnorm MeasureTheory.integral_norm_eq_lintegral_nnnorm theorem ofReal_integral_norm_eq_lintegral_nnnorm {P : Type} [NormedAddCommGroup P] {f : α → P} (hf : Integrable f μ) : ENNReal.ofReal (∫ x, ‖f x‖ ∂μ) = ∫⁻ x, ‖f x‖₊ ∂μ := by rw [integral_norm_eq_lintegral_nnnorm hf.aestronglyMeasurable, ENNReal.ofReal_toReal (lt_top_iff_ne_top.mp hf.2)] #align measure_theory.of_real_integral_norm_eq_lintegral_nnnorm MeasureTheory.ofReal_integral_norm_eq_lintegral_nnnorm theorem integral_eq_integral_pos_part_sub_integral_neg_part {f : α → ℝ} (hf : Integrable f μ) : ∫ a, f a ∂μ = ∫ a, (Real.toNNReal (f a) : ℝ) ∂μ - ∫ a, (Real.toNNReal (-f a) : ℝ) ∂μ := by rw [← integral_sub hf.real_toNNReal] · simp · exact hf.neg.real_toNNReal #align measure_theory.integral_eq_integral_pos_part_sub_integral_neg_part MeasureTheory.integral_eq_integral_pos_part_sub_integral_neg_part theorem integral_nonneg_of_ae {f : α → ℝ} (hf : 0 ≤ᵐ[μ] f) : 0 ≤ ∫ a, f a ∂μ := by have A : CompleteSpace ℝ := by infer_instance simp only [integral_def, A, L1.integral_def, dite_true, ge_iff_le] exact setToFun_nonneg (dominatedFinMeasAdditive_weightedSMul μ) (fun s _ _ => weightedSMul_nonneg s) hf #align measure_theory.integral_nonneg_of_ae MeasureTheory.integral_nonneg_of_ae theorem lintegral_coe_eq_integral (f : α → ℝ≥0) (hfi : Integrable (fun x => (f x : ℝ)) μ) : ∫⁻ a, f a ∂μ = ENNReal.ofReal (∫ a, f a ∂μ) := by simp_rw [integral_eq_lintegral_of_nonneg_ae (eventually_of_forall fun x => (f x).coe_nonneg) hfi.aestronglyMeasurable, ← ENNReal.coe_nnreal_eq] rw [ENNReal.ofReal_toReal] rw [← lt_top_iff_ne_top] convert hfi.hasFiniteIntegral -- Porting note: `convert` no longer unfolds `HasFiniteIntegral` simp_rw [HasFiniteIntegral, NNReal.nnnorm_eq] #align measure_theory.lintegral_coe_eq_integral MeasureTheory.lintegral_coe_eq_integral theorem ofReal_integral_eq_lintegral_ofReal {f : α → ℝ} (hfi : Integrable f μ) (f_nn : 0 ≤ᵐ[μ] f) : ENNReal.ofReal (∫ x, f x ∂μ) = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := by have : f =ᵐ[μ] (‖f ·‖) := f_nn.mono fun _x hx ↦ (abs_of_nonneg hx).symm simp_rw [integral_congr_ae this, ofReal_integral_norm_eq_lintegral_nnnorm hfi, ← ofReal_norm_eq_coe_nnnorm] exact lintegral_congr_ae (this.symm.fun_comp ENNReal.ofReal) #align measure_theory.of_real_integral_eq_lintegral_of_real MeasureTheory.ofReal_integral_eq_lintegral_ofReal theorem integral_toReal {f : α → ℝ≥0∞} (hfm : AEMeasurable f μ) (hf : ∀ᵐ x ∂μ, f x < ∞) : ∫ a, (f a).toReal ∂μ = (∫⁻ a, f a ∂μ).toReal := by rw [integral_eq_lintegral_of_nonneg_ae _ hfm.ennreal_toReal.aestronglyMeasurable, lintegral_congr_ae (ofReal_toReal_ae_eq hf)] exact eventually_of_forall fun x => ENNReal.toReal_nonneg #align measure_theory.integral_to_real MeasureTheory.integral_toReal theorem lintegral_coe_le_coe_iff_integral_le {f : α → ℝ≥0} (hfi : Integrable (fun x => (f x : ℝ)) μ) {b : ℝ≥0} : ∫⁻ a, f a ∂μ ≤ b ↔ ∫ a, (f a : ℝ) ∂μ ≤ b := by rw [lintegral_coe_eq_integral f hfi, ENNReal.ofReal, ENNReal.coe_le_coe, Real.toNNReal_le_iff_le_coe] #align measure_theory.lintegral_coe_le_coe_iff_integral_le MeasureTheory.lintegral_coe_le_coe_iff_integral_le theorem integral_coe_le_of_lintegral_coe_le {f : α → ℝ≥0} {b : ℝ≥0} (h : ∫⁻ a, f a ∂μ ≤ b) : ∫ a, (f a : ℝ) ∂μ ≤ b := by by_cases hf : Integrable (fun a => (f a : ℝ)) μ · exact (lintegral_coe_le_coe_iff_integral_le hf).1 h · rw [integral_undef hf]; exact b.2 #align measure_theory.integral_coe_le_of_lintegral_coe_le MeasureTheory.integral_coe_le_of_lintegral_coe_le theorem integral_nonneg {f : α → ℝ} (hf : 0 ≤ f) : 0 ≤ ∫ a, f a ∂μ := integral_nonneg_of_ae <\| eventually_of_forall hf #align measure_theory.integral_nonneg MeasureTheory.integral_nonneg theorem integral_nonpos_of_ae {f : α → ℝ} (hf : f ≤ᵐ[μ] 0) : ∫ a, f a ∂μ ≤ 0 := by have hf : 0 ≤ᵐ[μ] -f := hf.mono fun a h => by rwa [Pi.neg_apply, Pi.zero_apply, neg_nonneg] have : 0 ≤ ∫ a, -f a ∂μ := integral_nonneg_of_ae hf rwa [integral_neg, neg_nonneg] at this #align measure_theory.integral_nonpos_of_ae MeasureTheory.integral_nonpos_of_ae theorem integral_nonpos {f : α → ℝ} (hf : f ≤ 0) : ∫ a, f a ∂μ ≤ 0 := integral_nonpos_of_ae <\| eventually_of_forall hf #align measure_theory.integral_nonpos MeasureTheory.integral_nonpos theorem integral_eq_zero_iff_of_nonneg_ae {f : α → ℝ} (hf : 0 ≤ᵐ[μ] f) (hfi : Integrable f μ) : ∫ x, f x ∂μ = 0 ↔ f =ᵐ[μ] 0 := by simp_rw [integral_eq_lintegral_of_nonneg_ae hf hfi.1, ENNReal.toReal_eq_zero_iff, ← ENNReal.not_lt_top, ← hasFiniteIntegral_iff_ofReal hf, hfi.2, not_true_eq_false, or_false_iff] -- Porting note: split into parts, to make `rw` and `simp` work rw [lintegral_eq_zero_iff'] · rw [← hf.le_iff_eq, Filter.EventuallyEq, Filter.EventuallyLE] simp only [Pi.zero_apply, ofReal_eq_zero] · exact (ENNReal.measurable_ofReal.comp_aemeasurable hfi.1.aemeasurable) #align measure_theory.integral_eq_zero_iff_of_nonneg_ae MeasureTheory.integral_eq_zero_iff_of_nonneg_ae theorem integral_eq_zero_iff_of_nonneg {f : α → ℝ} (hf : 0 ≤ f) (hfi : Integrable f μ) : ∫ x, f x ∂μ = 0 ↔ f =ᵐ[μ] 0 := integral_eq_zero_iff_of_nonneg_ae (eventually_of_forall hf) hfi #align measure_theory.integral_eq_zero_iff_of_nonneg MeasureTheory.integral_eq_zero_iff_of_nonneg lemma integral_eq_iff_of_ae_le {f g : α → ℝ} (hf : Integrable f μ) (hg : Integrable g μ) (hfg : f ≤ᵐ[μ] g) : ∫ a, f a ∂μ = ∫ a, g a ∂μ ↔ f =ᵐ[μ] g := by refine ⟨fun h_le ↦ EventuallyEq.symm ?_, fun h ↦ integral_congr_ae h⟩ rw [← sub_ae_eq_zero, ← integral_eq_zero_iff_of_nonneg_ae ((sub_nonneg_ae _ _).mpr hfg) (hg.sub hf)] simpa [Pi.sub_apply, integral_sub hg hf, sub_eq_zero, eq_comm] theorem integral_pos_iff_support_of_nonneg_ae {f : α → ℝ} (hf : 0 ≤ᵐ[μ] f) (hfi : Integrable f μ) : (0 < ∫ x, f x ∂μ) ↔ 0 < μ (Function.support f) := by simp_rw [(integral_nonneg_of_ae hf).lt_iff_ne, pos_iff_ne_zero, Ne, @eq_comm ℝ 0, integral_eq_zero_iff_of_nonneg_ae hf hfi, Filter.EventuallyEq, ae_iff, Pi.zero_apply, Function.support] #align measure_theory.integral_pos_iff_support_of_nonneg_ae MeasureTheory.integral_pos_iff_support_of_nonneg_ae theorem integral_pos_iff_support_of_nonneg {f : α → ℝ} (hf : 0 ≤ f) (hfi : Integrable f μ) : (0 < ∫ x, f x ∂μ) ↔ 0 < μ (Function.support f) := integral_pos_iff_support_of_nonneg_ae (eventually_of_forall hf) hfi #align measure_theory.integral_pos_iff_support_of_nonneg MeasureTheory.integral_pos_iff_support_of_nonneg lemma integral_exp_pos {μ : Measure α} {f : α → ℝ} [hμ : NeZero μ] (hf : Integrable (fun x ↦ Real.exp (f x)) μ) : 0 < ∫ x, Real.exp (f x) ∂μ := by rw [integral_pos_iff_support_of_nonneg (fun x ↦ (Real.exp_pos _).le) hf] suffices (Function.support fun x ↦ Real.exp (f x)) = Set.univ by simp [this, hμ.out] ext1 x simp only [Function.mem_support, ne_eq, (Real.exp_pos _).ne', not_false_eq_true, Set.mem_univ] /-- Monotone convergence theorem for real-valued functions and Bochner integrals -/ lemma integral_tendsto_of_tendsto_of_monotone {μ : Measure α} {f : ℕ → α → ℝ} {F : α → ℝ} (hf : ∀ n, Integrable (f n) μ) (hF : Integrable F μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n ↦ f n x) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n ↦ f n x) atTop (𝓝 (F x))) : Tendsto (fun n ↦ ∫ x, f n x ∂μ) atTop (𝓝 (∫ x, F x ∂μ)) := by -- switch from the Bochner to the Lebesgue integral let f' := fun n x ↦ f n x - f 0 x have hf'_nonneg : ∀ᵐ x ∂μ, ∀ n, 0 ≤ f' n x := by filter_upwards [h_mono] with a ha n simp [f', ha (zero_le n)] have hf'_meas : ∀ n, Integrable (f' n) μ := fun n ↦ (hf n).sub (hf 0) suffices Tendsto (fun n ↦ ∫ x, f' n x ∂μ) atTop (𝓝 (∫ x, (F - f 0) x ∂μ)) by simp_rw [integral_sub (hf _) (hf _), integral_sub' hF (hf 0), tendsto_sub_const_iff] at this exact this have hF_ge : 0 ≤ᵐ[μ] fun x ↦ (F - f 0) x := by filter_upwards [h_tendsto, h_mono] with x hx_tendsto hx_mono simp only [Pi.zero_apply, Pi.sub_apply, sub_nonneg] exact ge_of_tendsto' hx_tendsto (fun n ↦ hx_mono (zero_le _)) rw [ae_all_iff] at hf'_nonneg simp_rw [integral_eq_lintegral_of_nonneg_ae (hf'_nonneg _) (hf'_meas _).1] rw [integral_eq_lintegral_of_nonneg_ae hF_ge (hF.1.sub (hf 0).1)] have h_cont := ENNReal.continuousAt_toReal (x := ∫⁻ a, ENNReal.ofReal ((F - f 0) a) ∂μ) ?_ swap · rw [← ofReal_integral_eq_lintegral_ofReal (hF.sub (hf 0)) hF_ge] exact ENNReal.ofReal_ne_top refine h_cont.tendsto.comp ?_ -- use the result for the Lebesgue integral refine lintegral_tendsto_of_tendsto_of_monotone ?_ ?_ ?_ · exact fun n ↦ ((hf n).sub (hf 0)).aemeasurable.ennreal_ofReal · filter_upwards [h_mono] with x hx n m hnm refine ENNReal.ofReal_le_ofReal ?_ simp only [f', tsub_le_iff_right, sub_add_cancel] exact hx hnm · filter_upwards [h_tendsto] with x hx refine (ENNReal.continuous_ofReal.tendsto _).comp ?_ simp only [Pi.sub_apply] exact Tendsto.sub hx tendsto_const_nhds /-- Monotone convergence theorem for real-valued functions and Bochner integrals -/ lemma integral_tendsto_of_tendsto_of_antitone {μ : Measure α} {f : ℕ → α → ℝ} {F : α → ℝ} (hf : ∀ n, Integrable (f n) μ) (hF : Integrable F μ) (h_mono : ∀ᵐ x ∂μ, Antitone fun n ↦ f n x) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n ↦ f n x) atTop (𝓝 (F x))) : Tendsto (fun n ↦ ∫ x, f n x ∂μ) atTop (𝓝 (∫ x, F x ∂μ)) := by suffices Tendsto (fun n ↦ ∫ x, -f n x ∂μ) atTop (𝓝 (∫ x, -F x ∂μ)) by suffices Tendsto (fun n ↦ ∫ x, - -f n x ∂μ) atTop (𝓝 (∫ x, - -F x ∂μ)) by simpa [neg_neg] using this convert this.neg <;> rw [integral_neg] refine integral_tendsto_of_tendsto_of_monotone (fun n ↦ (hf n).neg) hF.neg ?_ ?_ · filter_upwards [h_mono] with x hx n m hnm using neg_le_neg_iff.mpr <\| hx hnm · filter_upwards [h_tendsto] with x hx using hx.neg /-- If a monotone sequence of functions has an upper bound and the sequence of integrals of these functions tends to the integral of the upper bound, then the sequence of functions converges almost everywhere to the upper bound. -/ lemma tendsto_of_integral_tendsto_of_monotone {μ : Measure α} {f : ℕ → α → ℝ} {F : α → ℝ} (hf_int : ∀ n, Integrable (f n) μ) (hF_int : Integrable F μ) (hf_tendsto : Tendsto (fun i ↦ ∫ a, f i a ∂μ) atTop (𝓝 (∫ a, F a ∂μ))) (hf_mono : ∀ᵐ a ∂μ, Monotone (fun i ↦ f i a)) (hf_bound : ∀ᵐ a ∂μ, ∀ i, f i a ≤ F a) : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F a)) := by -- reduce to the `ℝ≥0∞` case let f' : ℕ → α → ℝ≥0∞ := fun n a ↦ ENNReal.ofReal (f n a - f 0 a) let F' : α → ℝ≥0∞ := fun a ↦ ENNReal.ofReal (F a - f 0 a) have hf'_int_eq : ∀ i, ∫⁻ a, f' i a ∂μ = ENNReal.ofReal (∫ a, f i a ∂μ - ∫ a, f 0 a ∂μ) := by intro i unfold_let f' rw [← ofReal_integral_eq_lintegral_ofReal, integral_sub (hf_int i) (hf_int 0)] · exact (hf_int i).sub (hf_int 0) · filter_upwards [hf_mono] with a h_mono simp [h_mono (zero_le i)] have hF'_int_eq : ∫⁻ a, F' a ∂μ = ENNReal.ofReal (∫ a, F a ∂μ - ∫ a, f 0 a ∂μ) := by unfold_let F' rw [← ofReal_integral_eq_lintegral_ofReal, integral_sub hF_int (hf_int 0)] · exact hF_int.sub (hf_int 0) · filter_upwards [hf_bound] with a h_bound simp [h_bound 0] have h_tendsto : Tendsto (fun i ↦ ∫⁻ a, f' i a ∂μ) atTop (𝓝 (∫⁻ a, F' a ∂μ)) := by simp_rw [hf'_int_eq, hF'_int_eq] refine (ENNReal.continuous_ofReal.tendsto _).comp ?_ rwa [tendsto_sub_const_iff] have h_mono : ∀ᵐ a ∂μ, Monotone (fun i ↦ f' i a) := by filter_upwards [hf_mono] with a ha_mono i j hij refine ENNReal.ofReal_le_ofReal ?_ simp [ha_mono hij] have h_bound : ∀ᵐ a ∂μ, ∀ i, f' i a ≤ F' a := by filter_upwards [hf_bound] with a ha_bound i refine ENNReal.ofReal_le_ofReal ?_ simp only [tsub_le_iff_right, sub_add_cancel, ha_bound i] -- use the corresponding lemma for `ℝ≥0∞` have h := tendsto_of_lintegral_tendsto_of_monotone ?_ h_tendsto h_mono h_bound ?_ rotate_left · exact (hF_int.1.aemeasurable.sub (hf_int 0).1.aemeasurable).ennreal_ofReal · exact ((lintegral_ofReal_le_lintegral_nnnorm _).trans_lt (hF_int.sub (hf_int 0)).2).ne filter_upwards [h, hf_mono, hf_bound] with a ha ha_mono ha_bound have h1 : (fun i ↦ f i a) = fun i ↦ (f' i a).toReal + f 0 a := by unfold_let f' ext i rw [ENNReal.toReal_ofReal] · abel · simp [ha_mono (zero_le i)] have h2 : F a = (F' a).toReal + f 0 a := by unfold_let F' rw [ENNReal.toReal_ofReal] · abel · simp [ha_bound 0] rw [h1, h2] refine Filter.Tendsto.add ?_ tendsto_const_nhds exact (ENNReal.continuousAt_toReal ENNReal.ofReal_ne_top).tendsto.comp ha /-- If an antitone sequence of functions has a lower bound and the sequence of integrals of these functions tends to the integral of the lower bound, then the sequence of functions converges almost everywhere to the lower bound. -/ lemma tendsto_of_integral_tendsto_of_antitone {μ : Measure α} {f : ℕ → α → ℝ} {F : α → ℝ} (hf_int : ∀ n, Integrable (f n) μ) (hF_int : Integrable F μ) (hf_tendsto : Tendsto (fun i ↦ ∫ a, f i a ∂μ) atTop (𝓝 (∫ a, F a ∂μ))) (hf_mono : ∀ᵐ a ∂μ, Antitone (fun i ↦ f i a)) (hf_bound : ∀ᵐ a ∂μ, ∀ i, F a ≤ f i a) : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F a)) := by let f' : ℕ → α → ℝ := fun i a ↦ - f i a let F' : α → ℝ := fun a ↦ - F a suffices ∀ᵐ a ∂μ, Tendsto (fun i ↦ f' i a) atTop (𝓝 (F' a)) by filter_upwards [this] with a ha_tendsto convert ha_tendsto.neg · simp [f'] · simp [F'] refine tendsto_of_integral_tendsto_of_monotone (fun n ↦ (hf_int n).neg) hF_int.neg ?_ ?_ ?_ · convert hf_tendsto.neg · rw [integral_neg] · rw [integral_neg] · filter_upwards [hf_mono] with a ha i j hij simp [f', ha hij] · filter_upwards [hf_bound] with a ha i simp [f', F', ha i] section NormedAddCommGroup variable {H : Type*} [NormedAddCommGroup H] theorem L1.norm_eq_integral_norm (f : α →₁[μ] H) : ‖f‖ = ∫ a, ‖f a‖ ∂μ := by simp only [snorm, snorm', ENNReal.one_toReal, ENNReal.rpow_one, Lp.norm_def, if_false, ENNReal.one_ne_top, one_ne_zero, _root_.div_one] rw [integral_eq_lintegral_of_nonneg_ae (eventually_of_forall (by simp [norm_nonneg])) (Lp.aestronglyMeasurable f).norm] simp [ofReal_norm_eq_coe_nnnorm] set_option linter.uppercaseLean3 false in #align measure_theory.L1.norm_eq_integral_norm MeasureTheory.L1.norm_eq_integral_norm theorem L1.dist_eq_integral_dist (f g : α →₁[μ] H) : dist f g = ∫ a, dist (f a) (g a) ∂μ := by simp only [dist_eq_norm, L1.norm_eq_integral_norm] exact integral_congr_ae <\| (Lp.coeFn_sub _ _).fun_comp norm theorem L1.norm_of_fun_eq_integral_norm {f : α → H} (hf : Integrable f μ) : ‖hf.toL1 f‖ = ∫ a, ‖f a‖ ∂μ := by rw [L1.norm_eq_integral_norm] exact integral_congr_ae <\| hf.coeFn_toL1.fun_comp _ set_option linter.uppercaseLean3 false in #align measure_theory.L1.norm_of_fun_eq_integral_norm MeasureTheory.L1.norm_of_fun_eq_integral_norm theorem Memℒp.snorm_eq_integral_rpow_norm {f : α → H} {p : ℝ≥0∞} (hp1 : p ≠ 0) (hp2 : p ≠ ∞) (hf : Memℒp f p μ) : snorm f p μ = ENNReal.ofReal ((∫ a, ‖f a‖ ^ p.toReal ∂μ) ^ p.toReal⁻¹) := by have A : ∫⁻ a : α, ENNReal.ofReal (‖f a‖ ^ p.toReal) ∂μ = ∫⁻ a : α, ‖f a‖₊ ^ p.toReal ∂μ := by simp_rw [← ofReal_rpow_of_nonneg (norm_nonneg _) toReal_nonneg, ofReal_norm_eq_coe_nnnorm] simp only [snorm_eq_lintegral_rpow_nnnorm hp1 hp2, one_div] rw [integral_eq_lintegral_of_nonneg_ae]; rotate_left · exact ae_of_all _ fun x => by positivity · exact (hf.aestronglyMeasurable.norm.aemeasurable.pow_const _).aestronglyMeasurable rw [A, ← ofReal_rpow_of_nonneg toReal_nonneg (inv_nonneg.2 toReal_nonneg), ofReal_toReal] exact (lintegral_rpow_nnnorm_lt_top_of_snorm_lt_top hp1 hp2 hf.2).ne #align measure_theory.mem_ℒp.snorm_eq_integral_rpow_norm MeasureTheory.Memℒp.snorm_eq_integral_rpow_norm end NormedAddCommGroup theorem integral_mono_ae {f g : α → ℝ} (hf : Integrable f μ) (hg : Integrable g μ) (h : f ≤ᵐ[μ] g) : ∫ a, f a ∂μ ≤ ∫ a, g a ∂μ := by have A : CompleteSpace ℝ := by infer_instance simp only [integral, A, L1.integral] exact setToFun_mono (dominatedFinMeasAdditive_weightedSMul μ) (fun s _ _ => weightedSMul_nonneg s) hf hg h #align measure_theory.integral_mono_ae MeasureTheory.integral_mono_ae @[mono] theorem integral_mono {f g : α → ℝ} (hf : Integrable f μ) (hg : Integrable g μ) (h : f ≤ g) : ∫ a, f a ∂μ ≤ ∫ a, g a ∂μ := integral_mono_ae hf hg <\| eventually_of_forall h #align measure_theory.integral_mono MeasureTheory.integral_mono theorem integral_mono_of_nonneg {f g : α → ℝ} (hf : 0 ≤ᵐ[μ] f) (hgi : Integrable g μ) (h : f ≤ᵐ[μ] g) : ∫ a, f a ∂μ ≤ ∫ a, g a ∂μ := by by_cases hfm : AEStronglyMeasurable f μ · refine integral_mono_ae ⟨hfm, ?_⟩ hgi h refine hgi.hasFiniteIntegral.mono <\| h.mp <\| hf.mono fun x hf hfg => ?_ simpa [abs_of_nonneg hf, abs_of_nonneg (le_trans hf hfg)] · rw [integral_non_aestronglyMeasurable hfm] exact integral_nonneg_of_ae (hf.trans h) #align measure_theory.integral_mono_of_nonneg MeasureTheory.integral_mono_of_nonneg theorem integral_mono_measure {f : α → ℝ} {ν} (hle : μ ≤ ν) (hf : 0 ≤ᵐ[ν] f) (hfi : Integrable f ν) : ∫ a, f a ∂μ ≤ ∫ a, f a ∂ν := by have hfi' : Integrable f μ := hfi.mono_measure hle have hf' : 0 ≤ᵐ[μ] f := hle.absolutelyContinuous hf rw [integral_eq_lintegral_of_nonneg_ae hf' hfi'.1, integral_eq_lintegral_of_nonneg_ae hf hfi.1, ENNReal.toReal_le_toReal] exacts [lintegral_mono' hle le_rfl, ((hasFiniteIntegral_iff_ofReal hf').1 hfi'.2).ne, ((hasFiniteIntegral_iff_ofReal hf).1 hfi.2).ne] #align measure_theory.integral_mono_measure MeasureTheory.integral_mono_measure theorem norm_integral_le_integral_norm (f : α → G) : ‖∫ a, f a ∂μ‖ ≤ ∫ a, ‖f a‖ ∂μ := by have le_ae : ∀ᵐ a ∂μ, 0 ≤ ‖f a‖ := eventually_of_forall fun a => norm_nonneg _ by_cases h : AEStronglyMeasurable f μ · calc ‖∫ a, f a ∂μ‖ ≤ ENNReal.toReal (∫⁻ a, ENNReal.ofReal ‖f a‖ ∂μ) := norm_integral_le_lintegral_norm _ _ = ∫ a, ‖f a‖ ∂μ := (integral_eq_lintegral_of_nonneg_ae le_ae <\| h.norm).symm · rw [integral_non_aestronglyMeasurable h, norm_zero] exact integral_nonneg_of_ae le_ae #align measure_theory.norm_integral_le_integral_norm MeasureTheory.norm_integral_le_integral_norm theorem norm_integral_le_of_norm_le {f : α → G} {g : α → ℝ} (hg : Integrable g μ) (h : ∀ᵐ x ∂μ, ‖f x‖ ≤ g x) : ‖∫ x, f x ∂μ‖ ≤ ∫ x, g x ∂μ := calc ‖∫ x, f x ∂μ‖ ≤ ∫ x, ‖f x‖ ∂μ := norm_integral_le_integral_norm f _ ≤ ∫ x, g x ∂μ := integral_mono_of_nonneg (eventually_of_forall fun _ => norm_nonneg _) hg h #align measure_theory.norm_integral_le_of_norm_le MeasureTheory.norm_integral_le_of_norm_le theorem SimpleFunc.integral_eq_integral (f : α →ₛ E) (hfi : Integrable f μ) : f.integral μ = ∫ x, f x ∂μ := by rw [MeasureTheory.integral_eq f hfi, ← L1.SimpleFunc.toLp_one_eq_toL1, L1.SimpleFunc.integral_L1_eq_integral, L1.SimpleFunc.integral_eq_integral] exact SimpleFunc.integral_congr hfi (Lp.simpleFunc.toSimpleFunc_toLp _ _).symm #align measure_theory.simple_func.integral_eq_integral MeasureTheory.SimpleFunc.integral_eq_integral theorem SimpleFunc.integral_eq_sum (f : α →ₛ E) (hfi : Integrable f μ) : ∫ x, f x ∂μ = ∑ x ∈ f.range, ENNReal.toReal (μ (f ⁻¹' {x})) • x := by rw [← f.integral_eq_integral hfi, SimpleFunc.integral, ← SimpleFunc.integral_eq]; rfl #align measure_theory.simple_func.integral_eq_sum MeasureTheory.SimpleFunc.integral_eq_sum @[simp]	Mathlib/MeasureTheory/Integral/Bochner.lean	1,528	1,538	theorem integral_const (c : E) : ∫ _ : α, c ∂μ = (μ univ).toReal • c := by	cases' (@le_top _ _ _ (μ univ)).lt_or_eq with hμ hμ · haveI : IsFiniteMeasure μ := ⟨hμ⟩ simp only [integral, hE, L1.integral] exact setToFun_const (dominatedFinMeasAdditive_weightedSMul _) _ · by_cases hc : c = 0 · simp [hc, integral_zero] · have : ¬Integrable (fun _ : α => c) μ := by simp only [integrable_const_iff, not_or] exact ⟨hc, hμ.not_lt⟩ simp [integral_undef, *]
/- Copyright (c) 2022 Adam Topaz. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Adam Topaz, Amelia Livingston -/ import Mathlib.Algebra.Homology.Additive import Mathlib.CategoryTheory.Abelian.Pseudoelements import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Kernels import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Images #align_import category_theory.abelian.homology from "leanprover-community/mathlib"@"956af7c76589f444f2e1313911bad16366ea476d" /-! The object `homology' f g w`, where `w : f ≫ g = 0`, can be identified with either a cokernel or a kernel. The isomorphism with a cokernel is `homology'IsoCokernelLift`, which was obtained elsewhere. In the case of an abelian category, this file shows the isomorphism with a kernel as well. We use these isomorphisms to obtain the analogous api for `homology'`: - `homology'.ι` is the map from `homology' f g w` into the cokernel of `f`. - `homology'.π'` is the map from `kernel g` to `homology' f g w`. - `homology'.desc'` constructs a morphism from `homology' f g w`, when it is viewed as a cokernel. - `homology'.lift` constructs a morphism to `homology' f g w`, when it is viewed as a kernel. - Various small lemmas are proved as well, mimicking the API for (co)kernels. With these definitions and lemmas, the isomorphisms between homology and a (co)kernel need not be used directly. Note: As part of the homology refactor, it is planned to remove the definitions in this file, because it can be replaced by the content of `Algebra.Homology.ShortComplex.Homology`. -/ open CategoryTheory.Limits open CategoryTheory noncomputable section universe v u variable {A : Type u} [Category.{v} A] [Abelian A] variable {X Y Z : A} (f : X ⟶ Y) (g : Y ⟶ Z) (w : f ≫ g = 0) namespace CategoryTheory.Abelian /-- The cokernel of `kernel.lift g f w`. This is isomorphic to `homology f g w`. See `homologyIsoCokernelLift`. -/ abbrev homologyC : A := cokernel (kernel.lift g f w) #align category_theory.abelian.homology_c CategoryTheory.Abelian.homologyC /-- The kernel of `cokernel.desc f g w`. This is isomorphic to `homology f g w`. See `homologyIsoKernelDesc`. -/ abbrev homologyK : A := kernel (cokernel.desc f g w) #align category_theory.abelian.homology_k CategoryTheory.Abelian.homologyK /-- The canonical map from `homologyC` to `homologyK`. This is an isomorphism, and it is used in obtaining the API for `homology f g w` in the bottom of this file. -/ abbrev homologyCToK : homologyC f g w ⟶ homologyK f g w := cokernel.desc _ (kernel.lift _ (kernel.ι _ ≫ cokernel.π _) (by simp)) (by ext; simp) #align category_theory.abelian.homology_c_to_k CategoryTheory.Abelian.homologyCToK attribute [local instance] Pseudoelement.homToFun Pseudoelement.hasZero instance : Mono (homologyCToK f g w) := by apply Pseudoelement.mono_of_zero_of_map_zero intro a ha obtain ⟨a, rfl⟩ := Pseudoelement.pseudo_surjective_of_epi (cokernel.π (kernel.lift g f w)) a apply_fun kernel.ι (cokernel.desc f g w) at ha simp only [← Pseudoelement.comp_apply, cokernel.π_desc, kernel.lift_ι, Pseudoelement.apply_zero] at ha simp only [Pseudoelement.comp_apply] at ha obtain ⟨b, hb⟩ : ∃ b, f b = _ := (Pseudoelement.pseudo_exact_of_exact (exact_cokernel f)).2 _ ha rsuffices ⟨c, rfl⟩ : ∃ c, kernel.lift g f w c = a · simp [← Pseudoelement.comp_apply] use b apply_fun kernel.ι g swap; · apply Pseudoelement.pseudo_injective_of_mono simpa [← Pseudoelement.comp_apply] instance : Epi (homologyCToK f g w) := by apply Pseudoelement.epi_of_pseudo_surjective intro a let b := kernel.ι (cokernel.desc f g w) a obtain ⟨c, hc⟩ : ∃ c, cokernel.π f c = b := by apply Pseudoelement.pseudo_surjective_of_epi (cokernel.π f) have : g c = 0 := by rw [show g = cokernel.π f ≫ cokernel.desc f g w by simp, Pseudoelement.comp_apply, hc] simp [b, ← Pseudoelement.comp_apply] obtain ⟨d, hd⟩ : ∃ d, kernel.ι g d = c := by apply (Pseudoelement.pseudo_exact_of_exact exact_kernel_ι).2 _ this use cokernel.π (kernel.lift g f w) d apply_fun kernel.ι (cokernel.desc f g w) swap · apply Pseudoelement.pseudo_injective_of_mono simp only [← Pseudoelement.comp_apply, cokernel.π_desc, kernel.lift_ι] simp only [Pseudoelement.comp_apply, hd, hc] instance (w : f ≫ g = 0) : IsIso (homologyCToK f g w) := isIso_of_mono_of_epi _ end CategoryTheory.Abelian /-- The homology associated to `f` and `g` is isomorphic to a kernel. -/ def homology'IsoKernelDesc : homology' f g w ≅ kernel (cokernel.desc f g w) := homology'IsoCokernelLift _ _ _ ≪≫ asIso (CategoryTheory.Abelian.homologyCToK _ _ _) #align homology_iso_kernel_desc homology'IsoKernelDesc namespace homology' -- `homology'.π` is taken /-- The canonical map from the kernel of `g` to the homology of `f` and `g`. -/ def π' : kernel g ⟶ homology' f g w := cokernel.π _ ≫ (homology'IsoCokernelLift _ _ _).inv #align homology.π' homology'.π' /-- The canonical map from the homology of `f` and `g` to the cokernel of `f`. -/ def ι : homology' f g w ⟶ cokernel f := (homology'IsoKernelDesc _ _ _).hom ≫ kernel.ι _ #align homology.ι homology'.ι /-- Obtain a morphism from the homology, given a morphism from the kernel. -/ def desc' {W : A} (e : kernel g ⟶ W) (he : kernel.lift g f w ≫ e = 0) : homology' f g w ⟶ W := (homology'IsoCokernelLift _ _ _).hom ≫ cokernel.desc _ e he #align homology.desc' homology'.desc' /-- Obtain a morphism to the homology, given a morphism to the kernel. -/ def lift {W : A} (e : W ⟶ cokernel f) (he : e ≫ cokernel.desc f g w = 0) : W ⟶ homology' f g w := kernel.lift _ e he ≫ (homology'IsoKernelDesc _ _ _).inv #align homology.lift homology'.lift @[reassoc (attr := simp)] theorem π'_desc' {W : A} (e : kernel g ⟶ W) (he : kernel.lift g f w ≫ e = 0) : π' f g w ≫ desc' f g w e he = e := by dsimp [π', desc'] simp #align homology.π'_desc' homology'.π'_desc' @[reassoc (attr := simp)] theorem lift_ι {W : A} (e : W ⟶ cokernel f) (he : e ≫ cokernel.desc f g w = 0) : lift f g w e he ≫ ι _ _ _ = e := by dsimp [ι, lift] simp #align homology.lift_ι homology'.lift_ι @[reassoc (attr := simp)] theorem condition_π' : kernel.lift g f w ≫ π' f g w = 0 := by dsimp [π'] simp #align homology.condition_π' homology'.condition_π' @[reassoc (attr := simp)] theorem condition_ι : ι f g w ≫ cokernel.desc f g w = 0 := by dsimp [ι] simp #align homology.condition_ι homology'.condition_ι @[ext] theorem hom_from_ext {W : A} (a b : homology' f g w ⟶ W) (h : π' f g w ≫ a = π' f g w ≫ b) : a = b := by dsimp [π'] at h apply_fun fun e => (homology'IsoCokernelLift f g w).inv ≫ e swap · intro i j hh apply_fun fun e => (homology'IsoCokernelLift f g w).hom ≫ e at hh simpa using hh simp only [Category.assoc] at h exact coequalizer.hom_ext h #align homology.hom_from_ext homology'.hom_from_ext @[ext] theorem hom_to_ext {W : A} (a b : W ⟶ homology' f g w) (h : a ≫ ι f g w = b ≫ ι f g w) : a = b := by dsimp [ι] at h apply_fun fun e => e ≫ (homology'IsoKernelDesc f g w).hom swap · intro i j hh apply_fun fun e => e ≫ (homology'IsoKernelDesc f g w).inv at hh simpa using hh simp only [← Category.assoc] at h exact equalizer.hom_ext h #align homology.hom_to_ext homology'.hom_to_ext @[reassoc (attr := simp)] theorem π'_ι : π' f g w ≫ ι f g w = kernel.ι _ ≫ cokernel.π _ := by dsimp [π', ι, homology'IsoKernelDesc] simp #align homology.π'_ι homology'.π'_ι @[reassoc (attr := simp)] theorem π'_eq_π : (kernelSubobjectIso _).hom ≫ π' f g w = π _ _ _ := by dsimp [π', homology'IsoCokernelLift] simp only [← Category.assoc] rw [Iso.comp_inv_eq] dsimp [π, homology'IsoCokernelImageToKernel'] simp #align homology.π'_eq_π homology'.π'_eq_π section variable {X' Y' Z' : A} (f' : X' ⟶ Y') (g' : Y' ⟶ Z') (w' : f' ≫ g' = 0) @[reassoc (attr := simp)] theorem π'_map (α β h) : π' _ _ _ ≫ map w w' α β h = kernel.map _ _ α.right β.right (by simp [h, β.w.symm]) ≫ π' _ _ _ := by apply_fun fun e => (kernelSubobjectIso _).hom ≫ e swap · intro i j hh apply_fun fun e => (kernelSubobjectIso _).inv ≫ e at hh simpa using hh dsimp [map] simp only [π'_eq_π_assoc] dsimp [π] simp only [cokernel.π_desc] rw [← Iso.inv_comp_eq, ← Category.assoc] have : (kernelSubobjectIso g).inv ≫ kernelSubobjectMap β = kernel.map _ _ β.left β.right β.w.symm ≫ (kernelSubobjectIso _).inv := by rw [Iso.inv_comp_eq, ← Category.assoc, Iso.eq_comp_inv] ext dsimp simp rw [this] simp only [Category.assoc] dsimp [π', homology'IsoCokernelLift] simp only [cokernelIsoOfEq_inv_comp_desc, cokernel.π_desc_assoc] congr 1 · congr exact h.symm · rw [Iso.inv_comp_eq, ← Category.assoc, Iso.eq_comp_inv] dsimp [homology'IsoCokernelImageToKernel'] simp #align homology.π'_map homology'.π'_map -- Porting note: need to fill in f,g,f',g' in the next few results or time out theorem map_eq_desc'_lift_left (α β h) : map w w' α β h = homology'.desc' f g _ (homology'.lift f' g' _ (kernel.ι _ ≫ β.left ≫ cokernel.π _) (by simp)) (by ext simp only [← h, Category.assoc, zero_comp, lift_ι, kernel.lift_ι_assoc] erw [← reassoc_of% α.w] simp) := by apply homology'.hom_from_ext simp only [π'_map, π'_desc'] dsimp [π', lift] rw [Iso.eq_comp_inv] dsimp [homology'IsoKernelDesc] ext simp [h] #align homology.map_eq_desc'_lift_left homology'.map_eq_desc'_lift_left theorem map_eq_lift_desc'_left (α β h) : map w w' α β h = homology'.lift f' g' _ (homology'.desc' f g _ (kernel.ι _ ≫ β.left ≫ cokernel.π _) (by simp only [kernel.lift_ι_assoc, ← h] erw [← reassoc_of% α.w] simp)) (by -- Porting note: used to be ext apply homology'.hom_from_ext simp) := by rw [map_eq_desc'_lift_left] -- Porting note: once was known as ext apply homology'.hom_to_ext apply homology'.hom_from_ext simp #align homology.map_eq_lift_desc'_left homology'.map_eq_lift_desc'_left theorem map_eq_desc'_lift_right (α β h) : map w w' α β h = homology'.desc' f g _ (homology'.lift f' g' _ (kernel.ι _ ≫ α.right ≫ cokernel.π _) (by simp [h])) (by ext simp only [Category.assoc, zero_comp, lift_ι, kernel.lift_ι_assoc] erw [← reassoc_of% α.w] simp) := by rw [map_eq_desc'_lift_left] ext simp [h] #align homology.map_eq_desc'_lift_right homology'.map_eq_desc'_lift_right	Mathlib/CategoryTheory/Abelian/Homology.lean	289	305	theorem map_eq_lift_desc'_right (α β h) : map w w' α β h = homology'.lift f' g' _ (homology'.desc' f g _ (kernel.ι _ ≫ α.right ≫ cokernel.π _) (by simp only [kernel.lift_ι_assoc] erw [← reassoc_of% α.w] simp)) (by -- Porting note: once was known as ext apply homology'.hom_from_ext simp [h]) := by	rw [map_eq_desc'_lift_right] -- Porting note: once was known as ext apply homology'.hom_to_ext apply homology'.hom_from_ext simp
/- Copyright (c) 2021 Chris Birkbeck. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Birkbeck -/ import Mathlib.Algebra.Group.Subgroup.Pointwise import Mathlib.Data.Set.Basic import Mathlib.Data.Setoid.Basic import Mathlib.GroupTheory.Coset #align_import group_theory.double_coset from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" /-! # Double cosets This file defines double cosets for two subgroups `H K` of a group `G` and the quotient of `G` by the double coset relation, i.e. `H \ G / K`. We also prove that `G` can be written as a disjoint union of the double cosets and that if one of `H` or `K` is the trivial group (i.e. `⊥` ) then this is the usual left or right quotient of a group by a subgroup. ## Main definitions * `rel`: The double coset relation defined by two subgroups `H K` of `G`. * `Doset.quotient`: The quotient of `G` by the double coset relation, i.e, `H \ G / K`. -/ -- Porting note: removed import -- import Mathlib.Tactic.Group variable {G : Type} [Group G] {α : Type} [Mul α] (J : Subgroup G) (g : G) open MulOpposite open scoped Pointwise namespace Doset /-- The double coset as an element of `Set α` corresponding to `s a t` -/ def doset (a : α) (s t : Set α) : Set α := s * {a} * t #align doset Doset.doset lemma doset_eq_image2 (a : α) (s t : Set α) : doset a s t = Set.image2 (· * a * ·) s t := by simp_rw [doset, Set.mul_singleton, ← Set.image2_mul, Set.image2_image_left] theorem mem_doset {s t : Set α} {a b : α} : b ∈ doset a s t ↔ ∃ x ∈ s, ∃ y ∈ t, b = x * a * y := by simp only [doset_eq_image2, Set.mem_image2, eq_comm] #align doset.mem_doset Doset.mem_doset theorem mem_doset_self (H K : Subgroup G) (a : G) : a ∈ doset a H K := mem_doset.mpr ⟨1, H.one_mem, 1, K.one_mem, (one_mul a).symm.trans (mul_one (1 * a)).symm⟩ #align doset.mem_doset_self Doset.mem_doset_self theorem doset_eq_of_mem {H K : Subgroup G} {a b : G} (hb : b ∈ doset a H K) : doset b H K = doset a H K := by obtain ⟨h, hh, k, hk, rfl⟩ := mem_doset.1 hb rw [doset, doset, ← Set.singleton_mul_singleton, ← Set.singleton_mul_singleton, mul_assoc, mul_assoc, Subgroup.singleton_mul_subgroup hk, ← mul_assoc, ← mul_assoc, Subgroup.subgroup_mul_singleton hh] #align doset.doset_eq_of_mem Doset.doset_eq_of_mem	Mathlib/GroupTheory/DoubleCoset.lean	60	66	theorem mem_doset_of_not_disjoint {H K : Subgroup G} {a b : G} (h : ¬Disjoint (doset a H K) (doset b H K)) : b ∈ doset a H K := by	rw [Set.not_disjoint_iff] at h simp only [mem_doset] at * obtain ⟨x, ⟨l, hl, r, hr, hrx⟩, y, hy, ⟨r', hr', rfl⟩⟩ := h refine ⟨y⁻¹ * l, H.mul_mem (H.inv_mem hy) hl, r * r'⁻¹, K.mul_mem hr (K.inv_mem hr'), ?_⟩ rwa [mul_assoc, mul_assoc, eq_inv_mul_iff_mul_eq, ← mul_assoc, ← mul_assoc, eq_mul_inv_iff_mul_eq]
/- Copyright (c) 2020 Patrick Massot. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Patrick Massot, Yury Kudryashov -/ import Mathlib.Topology.UniformSpace.UniformConvergence import Mathlib.Topology.UniformSpace.Equicontinuity import Mathlib.Topology.Separation import Mathlib.Topology.Support #align_import topology.uniform_space.compact from "leanprover-community/mathlib"@"735b22f8f9ff9792cf4212d7cb051c4c994bc685" /-! # Compact separated uniform spaces ## Main statements * `compactSpace_uniformity`: On a compact uniform space, the topology determines the uniform structure, entourages are exactly the neighborhoods of the diagonal. * `uniformSpace_of_compact_t2`: every compact T2 topological structure is induced by a uniform structure. This uniform structure is described in the previous item. * Heine-Cantor theorem: continuous functions on compact uniform spaces with values in uniform spaces are automatically uniformly continuous. There are several variations, the main one is `CompactSpace.uniformContinuous_of_continuous`. ## Implementation notes The construction `uniformSpace_of_compact_t2` is not declared as an instance, as it would badly loop. ## Tags uniform space, uniform continuity, compact space -/ open scoped Classical open Uniformity Topology Filter UniformSpace Set variable {α β γ : Type} [UniformSpace α] [UniformSpace β] /-! ### Uniformity on compact spaces -/ /-- On a compact uniform space, the topology determines the uniform structure, entourages are exactly the neighborhoods of the diagonal. -/ theorem nhdsSet_diagonal_eq_uniformity [CompactSpace α] : 𝓝ˢ (diagonal α) = 𝓤 α := by refine nhdsSet_diagonal_le_uniformity.antisymm ?_ have : (𝓤 (α × α)).HasBasis (fun U => U ∈ 𝓤 α) fun U => (fun p : (α × α) × α × α => ((p.1.1, p.2.1), p.1.2, p.2.2)) ⁻¹' U ×ˢ U := by rw [uniformity_prod_eq_comap_prod] exact (𝓤 α).basis_sets.prod_self.comap _ refine (isCompact_diagonal.nhdsSet_basis_uniformity this).ge_iff.2 fun U hU => ?_ exact mem_of_superset hU fun ⟨x, y⟩ hxy => mem_iUnion₂.2 ⟨(x, x), rfl, refl_mem_uniformity hU, hxy⟩ #align nhds_set_diagonal_eq_uniformity nhdsSet_diagonal_eq_uniformity /-- On a compact uniform space, the topology determines the uniform structure, entourages are exactly the neighborhoods of the diagonal. -/ theorem compactSpace_uniformity [CompactSpace α] : 𝓤 α = ⨆ x, 𝓝 (x, x) := nhdsSet_diagonal_eq_uniformity.symm.trans (nhdsSet_diagonal _) #align compact_space_uniformity compactSpace_uniformity theorem unique_uniformity_of_compact [t : TopologicalSpace γ] [CompactSpace γ] {u u' : UniformSpace γ} (h : u.toTopologicalSpace = t) (h' : u'.toTopologicalSpace = t) : u = u' := by refine UniformSpace.ext ?_ have : @CompactSpace γ u.toTopologicalSpace := by rwa [h] have : @CompactSpace γ u'.toTopologicalSpace := by rwa [h'] rw [@compactSpace_uniformity _ u, compactSpace_uniformity, h, h'] #align unique_uniformity_of_compact unique_uniformity_of_compact /-- The unique uniform structure inducing a given compact topological structure. -/ def uniformSpaceOfCompactT2 [TopologicalSpace γ] [CompactSpace γ] [T2Space γ] : UniformSpace γ where uniformity := 𝓝ˢ (diagonal γ) symm := continuous_swap.tendsto_nhdsSet fun x => Eq.symm comp := by /- This is the difficult part of the proof. We need to prove that, for each neighborhood `W` of the diagonal `Δ`, there exists a smaller neighborhood `V` such that `V ○ V ⊆ W`. -/ set 𝓝Δ := 𝓝ˢ (diagonal γ) -- The filter of neighborhoods of Δ set F := 𝓝Δ.lift' fun s : Set (γ × γ) => s ○ s -- Compositions of neighborhoods of Δ -- If this weren't true, then there would be V ∈ 𝓝Δ such that F ⊓ 𝓟 Vᶜ ≠ ⊥ rw [le_iff_forall_inf_principal_compl] intro V V_in by_contra H haveI : NeBot (F ⊓ 𝓟 Vᶜ) := ⟨H⟩ -- Hence compactness would give us a cluster point (x, y) for F ⊓ 𝓟 Vᶜ obtain ⟨⟨x, y⟩, hxy⟩ : ∃ p : γ × γ, ClusterPt p (F ⊓ 𝓟 Vᶜ) := exists_clusterPt_of_compactSpace _ -- In particular (x, y) is a cluster point of 𝓟 Vᶜ, hence is not in the interior of V, -- and a fortiori not in Δ, so x ≠ y have clV : ClusterPt (x, y) (𝓟 <\| Vᶜ) := hxy.of_inf_right have : (x, y) ∉ interior V := by have : (x, y) ∈ closure Vᶜ := by rwa [mem_closure_iff_clusterPt] rwa [closure_compl] at this have diag_subset : diagonal γ ⊆ interior V := subset_interior_iff_mem_nhdsSet.2 V_in have x_ne_y : x ≠ y := mt (@diag_subset (x, y)) this -- Since γ is compact and Hausdorff, it is T₄, hence T₃. -- So there are closed neighborhoods V₁ and V₂ of x and y contained in -- disjoint open neighborhoods U₁ and U₂. obtain ⟨U₁, _, V₁, V₁_in, U₂, _, V₂, V₂_in, V₁_cl, V₂_cl, U₁_op, U₂_op, VU₁, VU₂, hU₁₂⟩ := disjoint_nested_nhds x_ne_y -- We set U₃ := (V₁ ∪ V₂)ᶜ so that W := U₁ ×ˢ U₁ ∪ U₂ ×ˢ U₂ ∪ U₃ ×ˢ U₃ is an open -- neighborhood of Δ. let U₃ := (V₁ ∪ V₂)ᶜ have U₃_op : IsOpen U₃ := (V₁_cl.union V₂_cl).isOpen_compl let W := U₁ ×ˢ U₁ ∪ U₂ ×ˢ U₂ ∪ U₃ ×ˢ U₃ have W_in : W ∈ 𝓝Δ := by rw [mem_nhdsSet_iff_forall] rintro ⟨z, z'⟩ (rfl : z = z') refine IsOpen.mem_nhds ?_ ?_ · apply_rules [IsOpen.union, IsOpen.prod] · simp only [W, mem_union, mem_prod, and_self_iff] exact (_root_.em _).imp_left fun h => union_subset_union VU₁ VU₂ h -- So W ○ W ∈ F by definition of F have : W ○ W ∈ F := @mem_lift' _ _ _ (fun s => s ○ s) _ W_in -- Porting note: was `by simpa only using mem_lift' W_in` -- And V₁ ×ˢ V₂ ∈ 𝓝 (x, y) have hV₁₂ : V₁ ×ˢ V₂ ∈ 𝓝 (x, y) := prod_mem_nhds V₁_in V₂_in -- But (x, y) is also a cluster point of F so (V₁ ×ˢ V₂) ∩ (W ○ W) ≠ ∅ -- However the construction of W implies (V₁ ×ˢ V₂) ∩ (W ○ W) = ∅. -- Indeed assume for contradiction there is some (u, v) in the intersection. obtain ⟨⟨u, v⟩, ⟨u_in, v_in⟩, w, huw, hwv⟩ := clusterPt_iff.mp hxy.of_inf_left hV₁₂ this -- So u ∈ V₁, v ∈ V₂, and there exists some w such that (u, w) ∈ W and (w ,v) ∈ W. -- Because u is in V₁ which is disjoint from U₂ and U₃, (u, w) ∈ W forces (u, w) ∈ U₁ ×ˢ U₁. have uw_in : (u, w) ∈ U₁ ×ˢ U₁ := (huw.resolve_right fun h => h.1 <\| Or.inl u_in).resolve_right fun h => hU₁₂.le_bot ⟨VU₁ u_in, h.1⟩ -- Similarly, because v ∈ V₂, (w ,v) ∈ W forces (w, v) ∈ U₂ ×ˢ U₂. have wv_in : (w, v) ∈ U₂ ×ˢ U₂ := (hwv.resolve_right fun h => h.2 <\| Or.inr v_in).resolve_left fun h => hU₁₂.le_bot ⟨h.2, VU₂ v_in⟩ -- Hence w ∈ U₁ ∩ U₂ which is empty. -- So we have a contradiction exact hU₁₂.le_bot ⟨uw_in.2, wv_in.1⟩ nhds_eq_comap_uniformity x := by simp_rw [nhdsSet_diagonal, comap_iSup, nhds_prod_eq, comap_prod, (· ∘ ·), comap_id'] rw [iSup_split_single _ x, comap_const_of_mem fun V => mem_of_mem_nhds] suffices ∀ y ≠ x, comap (fun _ : γ ↦ x) (𝓝 y) ⊓ 𝓝 y ≤ 𝓝 x by simpa intro y hxy simp [comap_const_of_not_mem (compl_singleton_mem_nhds hxy) (not_not_intro rfl)] #align uniform_space_of_compact_t2 uniformSpaceOfCompactT2 /-! ### Heine-Cantor theorem -/ /-- Heine-Cantor: a continuous function on a compact uniform space is uniformly continuous. -/ theorem CompactSpace.uniformContinuous_of_continuous [CompactSpace α] {f : α → β} (h : Continuous f) : UniformContinuous f := calc map (Prod.map f f) (𝓤 α) = map (Prod.map f f) (𝓝ˢ (diagonal α)) := by rw [nhdsSet_diagonal_eq_uniformity] _ ≤ 𝓝ˢ (diagonal β) := (h.prod_map h).tendsto_nhdsSet mapsTo_prod_map_diagonal _ ≤ 𝓤 β := nhdsSet_diagonal_le_uniformity #align compact_space.uniform_continuous_of_continuous CompactSpace.uniformContinuous_of_continuous /-- Heine-Cantor: a continuous function on a compact set of a uniform space is uniformly continuous. -/ theorem IsCompact.uniformContinuousOn_of_continuous {s : Set α} {f : α → β} (hs : IsCompact s) (hf : ContinuousOn f s) : UniformContinuousOn f s := by rw [uniformContinuousOn_iff_restrict] rw [isCompact_iff_compactSpace] at hs rw [continuousOn_iff_continuous_restrict] at hf exact CompactSpace.uniformContinuous_of_continuous hf #align is_compact.uniform_continuous_on_of_continuous IsCompact.uniformContinuousOn_of_continuous /-- If `s` is compact and `f` is continuous at all points of `s`, then `f` is "uniformly continuous at the set `s`", i.e. `f x` is close to `f y` whenever `x ∈ s` and `y` is close to `x` (even if `y` is not itself in `s`, so this is a stronger assertion than `UniformContinuousOn s`). -/ theorem IsCompact.uniformContinuousAt_of_continuousAt {r : Set (β × β)} {s : Set α} (hs : IsCompact s) (f : α → β) (hf : ∀ a ∈ s, ContinuousAt f a) (hr : r ∈ 𝓤 β) : { x : α × α \| x.1 ∈ s → (f x.1, f x.2) ∈ r } ∈ 𝓤 α := by obtain ⟨t, ht, htsymm, htr⟩ := comp_symm_mem_uniformity_sets hr choose U hU T hT hb using fun a ha => exists_mem_nhds_ball_subset_of_mem_nhds ((hf a ha).preimage_mem_nhds <\| mem_nhds_left _ ht) obtain ⟨fs, hsU⟩ := hs.elim_nhds_subcover' U hU apply mem_of_superset ((biInter_finset_mem fs).2 fun a _ => hT a a.2) rintro ⟨a₁, a₂⟩ h h₁ obtain ⟨a, ha, haU⟩ := Set.mem_iUnion₂.1 (hsU h₁) apply htr refine ⟨f a, htsymm.mk_mem_comm.1 (hb _ _ _ haU ?_), hb _ _ _ haU ?_⟩ exacts [mem_ball_self _ (hT a a.2), mem_iInter₂.1 h a ha] #align is_compact.uniform_continuous_at_of_continuous_at IsCompact.uniformContinuousAt_of_continuousAt theorem Continuous.uniformContinuous_of_tendsto_cocompact {f : α → β} {x : β} (h_cont : Continuous f) (hx : Tendsto f (cocompact α) (𝓝 x)) : UniformContinuous f := uniformContinuous_def.2 fun r hr => by obtain ⟨t, ht, htsymm, htr⟩ := comp_symm_mem_uniformity_sets hr obtain ⟨s, hs, hst⟩ := mem_cocompact.1 (hx <\| mem_nhds_left _ ht) apply mem_of_superset (symmetrize_mem_uniformity <\| (hs.uniformContinuousAt_of_continuousAt f fun _ _ => h_cont.continuousAt) <\| symmetrize_mem_uniformity hr) rintro ⟨b₁, b₂⟩ h by_cases h₁ : b₁ ∈ s; · exact (h.1 h₁).1 by_cases h₂ : b₂ ∈ s; · exact (h.2 h₂).2 apply htr exact ⟨x, htsymm.mk_mem_comm.1 (hst h₁), hst h₂⟩ #align continuous.uniform_continuous_of_tendsto_cocompact Continuous.uniformContinuous_of_tendsto_cocompact /-- If `f` has compact multiplicative support, then `f` tends to 1 at infinity. -/ @[to_additive "If `f` has compact support, then `f` tends to zero at infinity."] theorem HasCompactMulSupport.is_one_at_infty {f : α → γ} [TopologicalSpace γ] [One γ] (h : HasCompactMulSupport f) : Tendsto f (cocompact α) (𝓝 1) := by -- Porting note: move to src/topology/support.lean once the port is over intro N hN rw [mem_map, mem_cocompact'] refine ⟨mulTSupport f, h.isCompact, ?_⟩ rw [compl_subset_comm] intro v hv rw [mem_preimage, image_eq_one_of_nmem_mulTSupport hv] exact mem_of_mem_nhds hN #align has_compact_mul_support.is_one_at_infty HasCompactMulSupport.is_one_at_infty #align has_compact_support.is_zero_at_infty HasCompactSupport.is_zero_at_infty @[to_additive] theorem HasCompactMulSupport.uniformContinuous_of_continuous {f : α → β} [One β] (h1 : HasCompactMulSupport f) (h2 : Continuous f) : UniformContinuous f := h2.uniformContinuous_of_tendsto_cocompact h1.is_one_at_infty #align has_compact_mul_support.uniform_continuous_of_continuous HasCompactMulSupport.uniformContinuous_of_continuous #align has_compact_support.uniform_continuous_of_continuous HasCompactSupport.uniformContinuous_of_continuous /-- A family of functions `α → β → γ` tends uniformly to its value at `x` if `α` is locally compact, `β` is compact and `f` is continuous on `U × (univ : Set β)` for some neighborhood `U` of `x`. -/ theorem ContinuousOn.tendstoUniformly [LocallyCompactSpace α] [CompactSpace β] [UniformSpace γ] {f : α → β → γ} {x : α} {U : Set α} (hxU : U ∈ 𝓝 x) (h : ContinuousOn (↿f) (U ×ˢ univ)) : TendstoUniformly f (f x) (𝓝 x) := by rcases LocallyCompactSpace.local_compact_nhds _ _ hxU with ⟨K, hxK, hKU, hK⟩ have : UniformContinuousOn (↿f) (K ×ˢ univ) := IsCompact.uniformContinuousOn_of_continuous (hK.prod isCompact_univ) (h.mono <\| prod_mono hKU Subset.rfl) exact this.tendstoUniformly hxK #align continuous_on.tendsto_uniformly ContinuousOn.tendstoUniformly /-- A continuous family of functions `α → β → γ` tends uniformly to its value at `x` if `α` is weakly locally compact and `β` is compact. -/ theorem Continuous.tendstoUniformly [WeaklyLocallyCompactSpace α] [CompactSpace β] [UniformSpace γ] (f : α → β → γ) (h : Continuous ↿f) (x : α) : TendstoUniformly f (f x) (𝓝 x) := let ⟨K, hK, hxK⟩ := exists_compact_mem_nhds x have : UniformContinuousOn (↿f) (K ×ˢ univ) := IsCompact.uniformContinuousOn_of_continuous (hK.prod isCompact_univ) h.continuousOn this.tendstoUniformly hxK #align continuous.tendsto_uniformly Continuous.tendstoUniformly /-- In a product space `α × β`, assume that a function `f` is continuous on `s × k` where `k` is compact. Then, along the fiber above any `q ∈ s`, `f` is transversely uniformly continuous, i.e., if `p ∈ s` is close enough to `q`, then `f p x` is uniformly close to `f q x` for all `x ∈ k`. -/ lemma IsCompact.mem_uniformity_of_prod {α β E : Type} [TopologicalSpace α] [TopologicalSpace β] [UniformSpace E] {f : α → β → E} {s : Set α} {k : Set β} {q : α} {u : Set (E × E)} (hk : IsCompact k) (hf : ContinuousOn f.uncurry (s ×ˢ k)) (hq : q ∈ s) (hu : u ∈ 𝓤 E) : ∃ v ∈ 𝓝[s] q, ∀ p ∈ v, ∀ x ∈ k, (f p x, f q x) ∈ u := by apply hk.induction_on (p := fun t ↦ ∃ v ∈ 𝓝[s] q, ∀ p ∈ v, ∀ x ∈ t, (f p x, f q x) ∈ u) · exact ⟨univ, univ_mem, by simp⟩ · intro t' t ht't ⟨v, v_mem, hv⟩ exact ⟨v, v_mem, fun p hp x hx ↦ hv p hp x (ht't hx)⟩ · intro t t' ⟨v, v_mem, hv⟩ ⟨v', v'_mem, hv'⟩ refine ⟨v ∩ v', inter_mem v_mem v'_mem, fun p hp x hx ↦ ?_⟩ rcases hx with h'x\|h'x · exact hv p hp.1 x h'x · exact hv' p hp.2 x h'x · rcases comp_symm_of_uniformity hu with ⟨u', u'_mem, u'_symm, hu'⟩ intro x hx obtain ⟨v, hv, w, hw, hvw⟩ : ∃ v ∈ 𝓝[s] q, ∃ w ∈ 𝓝[k] x, v ×ˢ w ⊆ f.uncurry ⁻¹' {z \| (f q x, z) ∈ u'} := mem_nhdsWithin_prod_iff.1 (hf (q, x) ⟨hq, hx⟩ (mem_nhds_left (f q x) u'_mem)) refine ⟨w, hw, v, hv, fun p hp y hy ↦ ?_⟩ have A : (f q x, f p y) ∈ u' := hvw (⟨hp, hy⟩ : (p, y) ∈ v ×ˢ w) have B : (f q x, f q y) ∈ u' := hvw (⟨mem_of_mem_nhdsWithin hq hv, hy⟩ : (q, y) ∈ v ×ˢ w) exact hu' (prod_mk_mem_compRel (u'_symm A) B) section UniformConvergence /-- An equicontinuous family of functions defined on a compact uniform space is automatically uniformly equicontinuous. -/	Mathlib/Topology/UniformSpace/Compact.lean	288	292	theorem CompactSpace.uniformEquicontinuous_of_equicontinuous {ι : Type*} {F : ι → β → α} [CompactSpace β] (h : Equicontinuous F) : UniformEquicontinuous F := by	rw [equicontinuous_iff_continuous] at h rw [uniformEquicontinuous_iff_uniformContinuous] exact CompactSpace.uniformContinuous_of_continuous h
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Johannes Hölzl, Scott Morrison, Jens Wagemaker, Johan Commelin -/ import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.BigOperators import Mathlib.Algebra.Polynomial.Degree.Lemmas import Mathlib.Algebra.Polynomial.Div #align_import data.polynomial.ring_division from "leanprover-community/mathlib"@"8efcf8022aac8e01df8d302dcebdbc25d6a886c8" /-! # Theory of univariate polynomials We prove basic results about univariate polynomials. -/ noncomputable section open Polynomial open Finset namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section CommRing variable [CommRing R] {p q : R[X]} section variable [Semiring S] theorem natDegree_pos_of_aeval_root [Algebra R S] {p : R[X]} (hp : p ≠ 0) {z : S} (hz : aeval z p = 0) (inj : ∀ x : R, algebraMap R S x = 0 → x = 0) : 0 < p.natDegree := natDegree_pos_of_eval₂_root hp (algebraMap R S) hz inj #align polynomial.nat_degree_pos_of_aeval_root Polynomial.natDegree_pos_of_aeval_root theorem degree_pos_of_aeval_root [Algebra R S] {p : R[X]} (hp : p ≠ 0) {z : S} (hz : aeval z p = 0) (inj : ∀ x : R, algebraMap R S x = 0 → x = 0) : 0 < p.degree := natDegree_pos_iff_degree_pos.mp (natDegree_pos_of_aeval_root hp hz inj) #align polynomial.degree_pos_of_aeval_root Polynomial.degree_pos_of_aeval_root theorem modByMonic_eq_of_dvd_sub (hq : q.Monic) {p₁ p₂ : R[X]} (h : q ∣ p₁ - p₂) : p₁ %ₘ q = p₂ %ₘ q := by nontriviality R obtain ⟨f, sub_eq⟩ := h refine (div_modByMonic_unique (p₂ /ₘ q + f) _ hq ⟨?_, degree_modByMonic_lt _ hq⟩).2 rw [sub_eq_iff_eq_add.mp sub_eq, mul_add, ← add_assoc, modByMonic_add_div _ hq, add_comm] #align polynomial.mod_by_monic_eq_of_dvd_sub Polynomial.modByMonic_eq_of_dvd_sub theorem add_modByMonic (p₁ p₂ : R[X]) : (p₁ + p₂) %ₘ q = p₁ %ₘ q + p₂ %ₘ q := by by_cases hq : q.Monic · cases' subsingleton_or_nontrivial R with hR hR · simp only [eq_iff_true_of_subsingleton] · exact (div_modByMonic_unique (p₁ /ₘ q + p₂ /ₘ q) _ hq ⟨by rw [mul_add, add_left_comm, add_assoc, modByMonic_add_div _ hq, ← add_assoc, add_comm (q * _), modByMonic_add_div _ hq], (degree_add_le _ _).trans_lt (max_lt (degree_modByMonic_lt _ hq) (degree_modByMonic_lt _ hq))⟩).2 · simp_rw [modByMonic_eq_of_not_monic _ hq] #align polynomial.add_mod_by_monic Polynomial.add_modByMonic theorem smul_modByMonic (c : R) (p : R[X]) : c • p %ₘ q = c • (p %ₘ q) := by by_cases hq : q.Monic · cases' subsingleton_or_nontrivial R with hR hR · simp only [eq_iff_true_of_subsingleton] · exact (div_modByMonic_unique (c • (p /ₘ q)) (c • (p %ₘ q)) hq ⟨by rw [mul_smul_comm, ← smul_add, modByMonic_add_div p hq], (degree_smul_le _ _).trans_lt (degree_modByMonic_lt _ hq)⟩).2 · simp_rw [modByMonic_eq_of_not_monic _ hq] #align polynomial.smul_mod_by_monic Polynomial.smul_modByMonic /-- `_ %ₘ q` as an `R`-linear map. -/ @[simps] def modByMonicHom (q : R[X]) : R[X] →ₗ[R] R[X] where toFun p := p %ₘ q map_add' := add_modByMonic map_smul' := smul_modByMonic #align polynomial.mod_by_monic_hom Polynomial.modByMonicHom theorem neg_modByMonic (p mod : R[X]) : (-p) %ₘ mod = - (p %ₘ mod) := (modByMonicHom mod).map_neg p theorem sub_modByMonic (a b mod : R[X]) : (a - b) %ₘ mod = a %ₘ mod - b %ₘ mod := (modByMonicHom mod).map_sub a b end section variable [Ring S] theorem aeval_modByMonic_eq_self_of_root [Algebra R S] {p q : R[X]} (hq : q.Monic) {x : S} (hx : aeval x q = 0) : aeval x (p %ₘ q) = aeval x p := by --`eval₂_modByMonic_eq_self_of_root` doesn't work here as it needs commutativity rw [modByMonic_eq_sub_mul_div p hq, _root_.map_sub, _root_.map_mul, hx, zero_mul, sub_zero] #align polynomial.aeval_mod_by_monic_eq_self_of_root Polynomial.aeval_modByMonic_eq_self_of_root end end CommRing section NoZeroDivisors variable [Semiring R] [NoZeroDivisors R] {p q : R[X]} instance : NoZeroDivisors R[X] where eq_zero_or_eq_zero_of_mul_eq_zero h := by rw [← leadingCoeff_eq_zero, ← leadingCoeff_eq_zero] refine eq_zero_or_eq_zero_of_mul_eq_zero ?_ rw [← leadingCoeff_zero, ← leadingCoeff_mul, h] theorem natDegree_mul (hp : p ≠ 0) (hq : q ≠ 0) : (pq).natDegree = p.natDegree + q.natDegree := by rw [← Nat.cast_inj (R := WithBot ℕ), ← degree_eq_natDegree (mul_ne_zero hp hq), Nat.cast_add, ← degree_eq_natDegree hp, ← degree_eq_natDegree hq, degree_mul] #align polynomial.nat_degree_mul Polynomial.natDegree_mul theorem trailingDegree_mul : (p q).trailingDegree = p.trailingDegree + q.trailingDegree := by by_cases hp : p = 0 · rw [hp, zero_mul, trailingDegree_zero, top_add] by_cases hq : q = 0 · rw [hq, mul_zero, trailingDegree_zero, add_top] · rw [trailingDegree_eq_natTrailingDegree hp, trailingDegree_eq_natTrailingDegree hq, trailingDegree_eq_natTrailingDegree (mul_ne_zero hp hq), natTrailingDegree_mul hp hq] apply WithTop.coe_add #align polynomial.trailing_degree_mul Polynomial.trailingDegree_mul @[simp] theorem natDegree_pow (p : R[X]) (n : ℕ) : natDegree (p ^ n) = n * natDegree p := by classical obtain rfl \| hp := eq_or_ne p 0 · obtain rfl \| hn := eq_or_ne n 0 <;> simp [] exact natDegree_pow' $ by rw [← leadingCoeff_pow, Ne, leadingCoeff_eq_zero]; exact pow_ne_zero _ hp #align polynomial.nat_degree_pow Polynomial.natDegree_pow theorem degree_le_mul_left (p : R[X]) (hq : q ≠ 0) : degree p ≤ degree (p q) := by classical exact if hp : p = 0 then by simp only [hp, zero_mul, le_refl] else by rw [degree_mul, degree_eq_natDegree hp, degree_eq_natDegree hq]; exact WithBot.coe_le_coe.2 (Nat.le_add_right _ _) #align polynomial.degree_le_mul_left Polynomial.degree_le_mul_left theorem natDegree_le_of_dvd {p q : R[X]} (h1 : p ∣ q) (h2 : q ≠ 0) : p.natDegree ≤ q.natDegree := by rcases h1 with ⟨q, rfl⟩; rw [mul_ne_zero_iff] at h2 rw [natDegree_mul h2.1 h2.2]; exact Nat.le_add_right _ _ #align polynomial.nat_degree_le_of_dvd Polynomial.natDegree_le_of_dvd theorem degree_le_of_dvd {p q : R[X]} (h1 : p ∣ q) (h2 : q ≠ 0) : degree p ≤ degree q := by rcases h1 with ⟨q, rfl⟩; rw [mul_ne_zero_iff] at h2 exact degree_le_mul_left p h2.2 #align polynomial.degree_le_of_dvd Polynomial.degree_le_of_dvd theorem eq_zero_of_dvd_of_degree_lt {p q : R[X]} (h₁ : p ∣ q) (h₂ : degree q < degree p) : q = 0 := by by_contra hc exact (lt_iff_not_ge _ _).mp h₂ (degree_le_of_dvd h₁ hc) #align polynomial.eq_zero_of_dvd_of_degree_lt Polynomial.eq_zero_of_dvd_of_degree_lt theorem eq_zero_of_dvd_of_natDegree_lt {p q : R[X]} (h₁ : p ∣ q) (h₂ : natDegree q < natDegree p) : q = 0 := by by_contra hc exact (lt_iff_not_ge _ _).mp h₂ (natDegree_le_of_dvd h₁ hc) #align polynomial.eq_zero_of_dvd_of_nat_degree_lt Polynomial.eq_zero_of_dvd_of_natDegree_lt theorem not_dvd_of_degree_lt {p q : R[X]} (h0 : q ≠ 0) (hl : q.degree < p.degree) : ¬p ∣ q := by by_contra hcontra exact h0 (eq_zero_of_dvd_of_degree_lt hcontra hl) #align polynomial.not_dvd_of_degree_lt Polynomial.not_dvd_of_degree_lt theorem not_dvd_of_natDegree_lt {p q : R[X]} (h0 : q ≠ 0) (hl : q.natDegree < p.natDegree) : ¬p ∣ q := by by_contra hcontra exact h0 (eq_zero_of_dvd_of_natDegree_lt hcontra hl) #align polynomial.not_dvd_of_nat_degree_lt Polynomial.not_dvd_of_natDegree_lt /-- This lemma is useful for working with the `intDegree` of a rational function. -/ theorem natDegree_sub_eq_of_prod_eq {p₁ p₂ q₁ q₂ : R[X]} (hp₁ : p₁ ≠ 0) (hq₁ : q₁ ≠ 0) (hp₂ : p₂ ≠ 0) (hq₂ : q₂ ≠ 0) (h_eq : p₁ * q₂ = p₂ * q₁) : (p₁.natDegree : ℤ) - q₁.natDegree = (p₂.natDegree : ℤ) - q₂.natDegree := by rw [sub_eq_sub_iff_add_eq_add] norm_cast rw [← natDegree_mul hp₁ hq₂, ← natDegree_mul hp₂ hq₁, h_eq] #align polynomial.nat_degree_sub_eq_of_prod_eq Polynomial.natDegree_sub_eq_of_prod_eq theorem natDegree_eq_zero_of_isUnit (h : IsUnit p) : natDegree p = 0 := by nontriviality R obtain ⟨q, hq⟩ := h.exists_right_inv have := natDegree_mul (left_ne_zero_of_mul_eq_one hq) (right_ne_zero_of_mul_eq_one hq) rw [hq, natDegree_one, eq_comm, add_eq_zero_iff] at this exact this.1 #align polynomial.nat_degree_eq_zero_of_is_unit Polynomial.natDegree_eq_zero_of_isUnit theorem degree_eq_zero_of_isUnit [Nontrivial R] (h : IsUnit p) : degree p = 0 := (natDegree_eq_zero_iff_degree_le_zero.mp <\| natDegree_eq_zero_of_isUnit h).antisymm (zero_le_degree_iff.mpr h.ne_zero) #align polynomial.degree_eq_zero_of_is_unit Polynomial.degree_eq_zero_of_isUnit @[simp] theorem degree_coe_units [Nontrivial R] (u : R[X]ˣ) : degree (u : R[X]) = 0 := degree_eq_zero_of_isUnit ⟨u, rfl⟩ #align polynomial.degree_coe_units Polynomial.degree_coe_units /-- Characterization of a unit of a polynomial ring over an integral domain `R`. See `Polynomial.isUnit_iff_coeff_isUnit_isNilpotent` when `R` is a commutative ring. -/ theorem isUnit_iff : IsUnit p ↔ ∃ r : R, IsUnit r ∧ C r = p := ⟨fun hp => ⟨p.coeff 0, let h := eq_C_of_natDegree_eq_zero (natDegree_eq_zero_of_isUnit hp) ⟨isUnit_C.1 (h ▸ hp), h.symm⟩⟩, fun ⟨_, hr, hrp⟩ => hrp ▸ isUnit_C.2 hr⟩ #align polynomial.is_unit_iff Polynomial.isUnit_iff theorem not_isUnit_of_degree_pos (p : R[X]) (hpl : 0 < p.degree) : ¬ IsUnit p := by cases subsingleton_or_nontrivial R · simp [Subsingleton.elim p 0] at hpl intro h simp [degree_eq_zero_of_isUnit h] at hpl theorem not_isUnit_of_natDegree_pos (p : R[X]) (hpl : 0 < p.natDegree) : ¬ IsUnit p := not_isUnit_of_degree_pos _ (natDegree_pos_iff_degree_pos.mp hpl) variable [CharZero R] end NoZeroDivisors section NoZeroDivisors variable [CommSemiring R] [NoZeroDivisors R] {p q : R[X]} theorem irreducible_of_monic (hp : p.Monic) (hp1 : p ≠ 1) : Irreducible p ↔ ∀ f g : R[X], f.Monic → g.Monic → f * g = p → f = 1 ∨ g = 1 := by refine ⟨fun h f g hf hg hp => (h.2 f g hp.symm).imp hf.eq_one_of_isUnit hg.eq_one_of_isUnit, fun h => ⟨hp1 ∘ hp.eq_one_of_isUnit, fun f g hfg => (h (g * C f.leadingCoeff) (f * C g.leadingCoeff) ?_ ?_ ?_).symm.imp (isUnit_of_mul_eq_one f _) (isUnit_of_mul_eq_one g _)⟩⟩ · rwa [Monic, leadingCoeff_mul, leadingCoeff_C, ← leadingCoeff_mul, mul_comm, ← hfg, ← Monic] · rwa [Monic, leadingCoeff_mul, leadingCoeff_C, ← leadingCoeff_mul, ← hfg, ← Monic] · rw [mul_mul_mul_comm, ← C_mul, ← leadingCoeff_mul, ← hfg, hp.leadingCoeff, C_1, mul_one, mul_comm, ← hfg] #align polynomial.irreducible_of_monic Polynomial.irreducible_of_monic theorem Monic.irreducible_iff_natDegree (hp : p.Monic) : Irreducible p ↔ p ≠ 1 ∧ ∀ f g : R[X], f.Monic → g.Monic → f * g = p → f.natDegree = 0 ∨ g.natDegree = 0 := by by_cases hp1 : p = 1; · simp [hp1] rw [irreducible_of_monic hp hp1, and_iff_right hp1] refine forall₄_congr fun a b ha hb => ?_ rw [ha.natDegree_eq_zero_iff_eq_one, hb.natDegree_eq_zero_iff_eq_one] #align polynomial.monic.irreducible_iff_nat_degree Polynomial.Monic.irreducible_iff_natDegree theorem Monic.irreducible_iff_natDegree' (hp : p.Monic) : Irreducible p ↔ p ≠ 1 ∧ ∀ f g : R[X], f.Monic → g.Monic → f * g = p → g.natDegree ∉ Ioc 0 (p.natDegree / 2) := by simp_rw [hp.irreducible_iff_natDegree, mem_Ioc, Nat.le_div_iff_mul_le zero_lt_two, mul_two] apply and_congr_right' constructor <;> intro h f g hf hg he <;> subst he · rw [hf.natDegree_mul hg, add_le_add_iff_right] exact fun ha => (h f g hf hg rfl).elim (ha.1.trans_le ha.2).ne' ha.1.ne' · simp_rw [hf.natDegree_mul hg, pos_iff_ne_zero] at h contrapose! h obtain hl \| hl := le_total f.natDegree g.natDegree · exact ⟨g, f, hg, hf, mul_comm g f, h.1, add_le_add_left hl _⟩ · exact ⟨f, g, hf, hg, rfl, h.2, add_le_add_right hl _⟩ #align polynomial.monic.irreducible_iff_nat_degree' Polynomial.Monic.irreducible_iff_natDegree' /-- Alternate phrasing of `Polynomial.Monic.irreducible_iff_natDegree'` where we only have to check one divisor at a time. -/ theorem Monic.irreducible_iff_lt_natDegree_lt {p : R[X]} (hp : p.Monic) (hp1 : p ≠ 1) : Irreducible p ↔ ∀ q, Monic q → natDegree q ∈ Finset.Ioc 0 (natDegree p / 2) → ¬ q ∣ p := by rw [hp.irreducible_iff_natDegree', and_iff_right hp1] constructor · rintro h g hg hdg ⟨f, rfl⟩ exact h f g (hg.of_mul_monic_left hp) hg (mul_comm f g) hdg · rintro h f g - hg rfl hdg exact h g hg hdg (dvd_mul_left g f) theorem Monic.not_irreducible_iff_exists_add_mul_eq_coeff (hm : p.Monic) (hnd : p.natDegree = 2) : ¬Irreducible p ↔ ∃ c₁ c₂, p.coeff 0 = c₁ * c₂ ∧ p.coeff 1 = c₁ + c₂ := by cases subsingleton_or_nontrivial R · simp [natDegree_of_subsingleton] at hnd rw [hm.irreducible_iff_natDegree', and_iff_right, hnd] · push_neg constructor · rintro ⟨a, b, ha, hb, rfl, hdb⟩ simp only [zero_lt_two, Nat.div_self, ge_iff_le, Nat.Ioc_succ_singleton, zero_add, mem_singleton] at hdb have hda := hnd rw [ha.natDegree_mul hb, hdb] at hda use a.coeff 0, b.coeff 0, mul_coeff_zero a b simpa only [nextCoeff, hnd, add_right_cancel hda, hdb] using ha.nextCoeff_mul hb · rintro ⟨c₁, c₂, hmul, hadd⟩ refine ⟨X + C c₁, X + C c₂, monic_X_add_C _, monic_X_add_C _, ?_, ?_⟩ · rw [p.as_sum_range_C_mul_X_pow, hnd, Finset.sum_range_succ, Finset.sum_range_succ, Finset.sum_range_one, ← hnd, hm.coeff_natDegree, hnd, hmul, hadd, C_mul, C_add, C_1] ring · rw [mem_Ioc, natDegree_X_add_C _] simp · rintro rfl simp [natDegree_one] at hnd #align polynomial.monic.not_irreducible_iff_exists_add_mul_eq_coeff Polynomial.Monic.not_irreducible_iff_exists_add_mul_eq_coeff theorem root_mul : IsRoot (p * q) a ↔ IsRoot p a ∨ IsRoot q a := by simp_rw [IsRoot, eval_mul, mul_eq_zero] #align polynomial.root_mul Polynomial.root_mul theorem root_or_root_of_root_mul (h : IsRoot (p * q) a) : IsRoot p a ∨ IsRoot q a := root_mul.1 h #align polynomial.root_or_root_of_root_mul Polynomial.root_or_root_of_root_mul end NoZeroDivisors section Ring variable [Ring R] [IsDomain R] {p q : R[X]} instance : IsDomain R[X] := NoZeroDivisors.to_isDomain _ end Ring section CommSemiring variable [CommSemiring R] theorem Monic.C_dvd_iff_isUnit {p : R[X]} (hp : Monic p) {a : R} : C a ∣ p ↔ IsUnit a := ⟨fun h => isUnit_iff_dvd_one.mpr <\| hp.coeff_natDegree ▸ (C_dvd_iff_dvd_coeff _ _).mp h p.natDegree, fun ha => (ha.map C).dvd⟩ theorem degree_pos_of_not_isUnit_of_dvd_monic {a p : R[X]} (ha : ¬ IsUnit a) (hap : a ∣ p) (hp : Monic p) : 0 < degree a := lt_of_not_ge <\| fun h => ha <\| by rw [Polynomial.eq_C_of_degree_le_zero h] at hap ⊢ simpa [hp.C_dvd_iff_isUnit, isUnit_C] using hap theorem natDegree_pos_of_not_isUnit_of_dvd_monic {a p : R[X]} (ha : ¬ IsUnit a) (hap : a ∣ p) (hp : Monic p) : 0 < natDegree a := natDegree_pos_iff_degree_pos.mpr <\| degree_pos_of_not_isUnit_of_dvd_monic ha hap hp theorem degree_pos_of_monic_of_not_isUnit {a : R[X]} (hu : ¬ IsUnit a) (ha : Monic a) : 0 < degree a := degree_pos_of_not_isUnit_of_dvd_monic hu dvd_rfl ha theorem natDegree_pos_of_monic_of_not_isUnit {a : R[X]} (hu : ¬ IsUnit a) (ha : Monic a) : 0 < natDegree a := natDegree_pos_iff_degree_pos.mpr <\| degree_pos_of_monic_of_not_isUnit hu ha theorem eq_zero_of_mul_eq_zero_of_smul (P : R[X]) (h : ∀ r : R, r • P = 0 → r = 0) : ∀ (Q : R[X]), P * Q = 0 → Q = 0 := by intro Q hQ suffices ∀ i, P.coeff i • Q = 0 by rw [← leadingCoeff_eq_zero] apply h simpa [ext_iff, mul_comm Q.leadingCoeff] using fun i ↦ congr_arg (·.coeff Q.natDegree) (this i) apply Nat.strong_decreasing_induction · use P.natDegree intro i hi rw [coeff_eq_zero_of_natDegree_lt hi, zero_smul] intro l IH obtain _\|hl := (natDegree_smul_le (P.coeff l) Q).lt_or_eq · apply eq_zero_of_mul_eq_zero_of_smul _ h (P.coeff l • Q) rw [smul_eq_C_mul, mul_left_comm, hQ, mul_zero] suffices P.coeff l * Q.leadingCoeff = 0 by rwa [← leadingCoeff_eq_zero, ← coeff_natDegree, coeff_smul, hl, coeff_natDegree, smul_eq_mul] let m := Q.natDegree suffices (P * Q).coeff (l + m) = P.coeff l * Q.leadingCoeff by rw [← this, hQ, coeff_zero] rw [coeff_mul] apply Finset.sum_eq_single (l, m) _ (by simp) simp only [Finset.mem_antidiagonal, ne_eq, Prod.forall, Prod.mk.injEq, not_and] intro i j hij H obtain hi\|rfl\|hi := lt_trichotomy i l · have hj : m < j := by omega rw [coeff_eq_zero_of_natDegree_lt hj, mul_zero] · omega · rw [← coeff_C_mul, ← smul_eq_C_mul, IH _ hi, coeff_zero] termination_by Q => Q.natDegree open nonZeroDivisors in /-- McCoy theorem: a polynomial `P : R[X]` is a zerodivisor if and only if there is `a : R` such that `a ≠ 0` and `a • P = 0`. -/ theorem nmem_nonZeroDivisors_iff {P : R[X]} : P ∉ R[X]⁰ ↔ ∃ a : R, a ≠ 0 ∧ a • P = 0 := by refine ⟨fun hP ↦ ?_, fun ⟨a, ha, h⟩ h1 ↦ ha <\| C_eq_zero.1 <\| (h1 _) <\| smul_eq_C_mul a ▸ h⟩ by_contra! h obtain ⟨Q, hQ⟩ := _root_.nmem_nonZeroDivisors_iff.1 hP refine hQ.2 (eq_zero_of_mul_eq_zero_of_smul P (fun a ha ↦ ?_) Q (mul_comm P _ ▸ hQ.1)) contrapose! ha exact h a ha open nonZeroDivisors in protected lemma mem_nonZeroDivisors_iff {P : R[X]} : P ∈ R[X]⁰ ↔ ∀ a : R, a • P = 0 → a = 0 := by simpa [not_imp_not] using (nmem_nonZeroDivisors_iff (P := P)).not end CommSemiring section CommRing variable [CommRing R] /- Porting note: the ML3 proof no longer worked because of a conflict in the inferred type and synthesized type for `DecidableRel` when using `Nat.le_find_iff` from `Mathlib.Algebra.Polynomial.Div` After some discussion on [Zulip] (https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/decidability.20leakage) introduced `Polynomial.rootMultiplicity_eq_nat_find_of_nonzero` to contain the issue -/ /-- The multiplicity of `a` as root of a nonzero polynomial `p` is at least `n` iff `(X - a) ^ n` divides `p`. -/ theorem le_rootMultiplicity_iff {p : R[X]} (p0 : p ≠ 0) {a : R} {n : ℕ} : n ≤ rootMultiplicity a p ↔ (X - C a) ^ n ∣ p := by classical rw [rootMultiplicity_eq_nat_find_of_nonzero p0, @Nat.le_find_iff _ (_)] simp_rw [Classical.not_not] refine ⟨fun h => ?_, fun h m hm => (pow_dvd_pow _ hm).trans h⟩ cases' n with n; · rw [pow_zero] apply one_dvd; · exact h n n.lt_succ_self #align polynomial.le_root_multiplicity_iff Polynomial.le_rootMultiplicity_iff theorem rootMultiplicity_le_iff {p : R[X]} (p0 : p ≠ 0) (a : R) (n : ℕ) : rootMultiplicity a p ≤ n ↔ ¬(X - C a) ^ (n + 1) ∣ p := by rw [← (le_rootMultiplicity_iff p0).not, not_le, Nat.lt_add_one_iff] #align polynomial.root_multiplicity_le_iff Polynomial.rootMultiplicity_le_iff theorem pow_rootMultiplicity_not_dvd {p : R[X]} (p0 : p ≠ 0) (a : R) : ¬(X - C a) ^ (rootMultiplicity a p + 1) ∣ p := by rw [← rootMultiplicity_le_iff p0] #align polynomial.pow_root_multiplicity_not_dvd Polynomial.pow_rootMultiplicity_not_dvd theorem X_sub_C_pow_dvd_iff {p : R[X]} {t : R} {n : ℕ} : (X - C t) ^ n ∣ p ↔ X ^ n ∣ p.comp (X + C t) := by convert (map_dvd_iff <\| algEquivAevalXAddC t).symm using 2 simp [C_eq_algebraMap] theorem comp_X_add_C_eq_zero_iff {p : R[X]} (t : R) : p.comp (X + C t) = 0 ↔ p = 0 := AddEquivClass.map_eq_zero_iff (algEquivAevalXAddC t) theorem comp_X_add_C_ne_zero_iff {p : R[X]} (t : R) : p.comp (X + C t) ≠ 0 ↔ p ≠ 0 := Iff.not <\| comp_X_add_C_eq_zero_iff t theorem rootMultiplicity_eq_rootMultiplicity {p : R[X]} {t : R} : p.rootMultiplicity t = (p.comp (X + C t)).rootMultiplicity 0 := by classical simp_rw [rootMultiplicity_eq_multiplicity, comp_X_add_C_eq_zero_iff] congr; ext; congr 1 rw [C_0, sub_zero] convert (multiplicity.multiplicity_map_eq <\| algEquivAevalXAddC t).symm using 2 simp [C_eq_algebraMap] theorem rootMultiplicity_eq_natTrailingDegree' {p : R[X]} : p.rootMultiplicity 0 = p.natTrailingDegree := by by_cases h : p = 0 · simp only [h, rootMultiplicity_zero, natTrailingDegree_zero] refine le_antisymm ?_ ?_ · rw [rootMultiplicity_le_iff h, map_zero, sub_zero, X_pow_dvd_iff, not_forall] exact ⟨p.natTrailingDegree, fun h' ↦ trailingCoeff_nonzero_iff_nonzero.2 h <\| h' <\| Nat.lt.base _⟩ · rw [le_rootMultiplicity_iff h, map_zero, sub_zero, X_pow_dvd_iff] exact fun _ ↦ coeff_eq_zero_of_lt_natTrailingDegree theorem rootMultiplicity_eq_natTrailingDegree {p : R[X]} {t : R} : p.rootMultiplicity t = (p.comp (X + C t)).natTrailingDegree := rootMultiplicity_eq_rootMultiplicity.trans rootMultiplicity_eq_natTrailingDegree' theorem eval_divByMonic_eq_trailingCoeff_comp {p : R[X]} {t : R} : (p /ₘ (X - C t) ^ p.rootMultiplicity t).eval t = (p.comp (X + C t)).trailingCoeff := by obtain rfl \| hp := eq_or_ne p 0 · rw [zero_divByMonic, eval_zero, zero_comp, trailingCoeff_zero] have mul_eq := p.pow_mul_divByMonic_rootMultiplicity_eq t set m := p.rootMultiplicity t set g := p /ₘ (X - C t) ^ m have : (g.comp (X + C t)).coeff 0 = g.eval t := by rw [coeff_zero_eq_eval_zero, eval_comp, eval_add, eval_X, eval_C, zero_add] rw [← congr_arg (comp · <\| X + C t) mul_eq, mul_comp, pow_comp, sub_comp, X_comp, C_comp, add_sub_cancel_right, ← reverse_leadingCoeff, reverse_X_pow_mul, reverse_leadingCoeff, trailingCoeff, Nat.le_zero.1 (natTrailingDegree_le_of_ne_zero <\| this ▸ eval_divByMonic_pow_rootMultiplicity_ne_zero t hp), this] section nonZeroDivisors open scoped nonZeroDivisors theorem Monic.mem_nonZeroDivisors {p : R[X]} (h : p.Monic) : p ∈ R[X]⁰ := mem_nonZeroDivisors_iff.2 fun _ hx ↦ (mul_left_eq_zero_iff h).1 hx theorem mem_nonZeroDivisors_of_leadingCoeff {p : R[X]} (h : p.leadingCoeff ∈ R⁰) : p ∈ R[X]⁰ := by refine mem_nonZeroDivisors_iff.2 fun x hx ↦ leadingCoeff_eq_zero.1 ?_ by_contra hx' rw [← mul_right_mem_nonZeroDivisors_eq_zero_iff h] at hx' simp only [← leadingCoeff_mul' hx', hx, leadingCoeff_zero, not_true] at hx' end nonZeroDivisors theorem rootMultiplicity_mul_X_sub_C_pow {p : R[X]} {a : R} {n : ℕ} (h : p ≠ 0) : (p * (X - C a) ^ n).rootMultiplicity a = p.rootMultiplicity a + n := by have h2 := monic_X_sub_C a \|>.pow n \|>.mul_left_ne_zero h refine le_antisymm ?_ ?_ · rw [rootMultiplicity_le_iff h2, add_assoc, add_comm n, ← add_assoc, pow_add, dvd_cancel_right_mem_nonZeroDivisors (monic_X_sub_C a \|>.pow n \|>.mem_nonZeroDivisors)] exact pow_rootMultiplicity_not_dvd h a · rw [le_rootMultiplicity_iff h2, pow_add] exact mul_dvd_mul_right (pow_rootMultiplicity_dvd p a) _ /-- The multiplicity of `a` as root of `(X - a) ^ n` is `n`. -/	Mathlib/Algebra/Polynomial/RingDivision.lean	523	526	theorem rootMultiplicity_X_sub_C_pow [Nontrivial R] (a : R) (n : ℕ) : rootMultiplicity a ((X - C a) ^ n) = n := by	have := rootMultiplicity_mul_X_sub_C_pow (a := a) (n := n) C.map_one_ne_zero rwa [rootMultiplicity_C, map_one, one_mul, zero_add] at this
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura, Jeremy Avigad, Minchao Wu, Mario Carneiro -/ import Mathlib.Data.Finset.Attr import Mathlib.Data.Multiset.FinsetOps import Mathlib.Logic.Equiv.Set import Mathlib.Order.Directed import Mathlib.Order.Interval.Set.Basic #align_import data.finset.basic from "leanprover-community/mathlib"@"442a83d738cb208d3600056c489be16900ba701d" /-! # Finite sets Terms of type `Finset α` are one way of talking about finite subsets of `α` in mathlib. Below, `Finset α` is defined as a structure with 2 fields: 1. `val` is a `Multiset α` of elements; 2. `nodup` is a proof that `val` has no duplicates. Finsets in Lean are constructive in that they have an underlying `List` that enumerates their elements. In particular, any function that uses the data of the underlying list cannot depend on its ordering. This is handled on the `Multiset` level by multiset API, so in most cases one needn't worry about it explicitly. Finsets give a basic foundation for defining finite sums and products over types: 1. `∑ i ∈ (s : Finset α), f i`; 2. `∏ i ∈ (s : Finset α), f i`. Lean refers to these operations as big operators. More information can be found in `Mathlib.Algebra.BigOperators.Group.Finset`. Finsets are directly used to define fintypes in Lean. A `Fintype α` instance for a type `α` consists of a universal `Finset α` containing every term of `α`, called `univ`. See `Mathlib.Data.Fintype.Basic`. There is also `univ'`, the noncomputable partner to `univ`, which is defined to be `α` as a finset if `α` is finite, and the empty finset otherwise. See `Mathlib.Data.Fintype.Basic`. `Finset.card`, the size of a finset is defined in `Mathlib.Data.Finset.Card`. This is then used to define `Fintype.card`, the size of a type. ## Main declarations ### Main definitions * `Finset`: Defines a type for the finite subsets of `α`. Constructing a `Finset` requires two pieces of data: `val`, a `Multiset α` of elements, and `nodup`, a proof that `val` has no duplicates. * `Finset.instMembershipFinset`: Defines membership `a ∈ (s : Finset α)`. * `Finset.instCoeTCFinsetSet`: Provides a coercion `s : Finset α` to `s : Set α`. * `Finset.instCoeSortFinsetType`: Coerce `s : Finset α` to the type of all `x ∈ s`. * `Finset.induction_on`: Induction on finsets. To prove a proposition about an arbitrary `Finset α`, it suffices to prove it for the empty finset, and to show that if it holds for some `Finset α`, then it holds for the finset obtained by inserting a new element. * `Finset.choose`: Given a proof `h` of existence and uniqueness of a certain element satisfying a predicate, `choose s h` returns the element of `s` satisfying that predicate. ### Finset constructions * `Finset.instSingletonFinset`: Denoted by `{a}`; the finset consisting of one element. * `Finset.empty`: Denoted by `∅`. The finset associated to any type consisting of no elements. * `Finset.range`: For any `n : ℕ`, `range n` is equal to `{0, 1, ... , n - 1} ⊆ ℕ`. This convention is consistent with other languages and normalizes `card (range n) = n`. Beware, `n` is not in `range n`. * `Finset.attach`: Given `s : Finset α`, `attach s` forms a finset of elements of the subtype `{a // a ∈ s}`; in other words, it attaches elements to a proof of membership in the set. ### Finsets from functions * `Finset.filter`: Given a decidable predicate `p : α → Prop`, `s.filter p` is the finset consisting of those elements in `s` satisfying the predicate `p`. ### The lattice structure on subsets of finsets There is a natural lattice structure on the subsets of a set. In Lean, we use lattice notation to talk about things involving unions and intersections. See `Mathlib.Order.Lattice`. For the lattice structure on finsets, `⊥` is called `bot` with `⊥ = ∅` and `⊤` is called `top` with `⊤ = univ`. * `Finset.instHasSubsetFinset`: Lots of API about lattices, otherwise behaves as one would expect. * `Finset.instUnionFinset`: Defines `s ∪ t` (or `s ⊔ t`) as the union of `s` and `t`. See `Finset.sup`/`Finset.biUnion` for finite unions. * `Finset.instInterFinset`: Defines `s ∩ t` (or `s ⊓ t`) as the intersection of `s` and `t`. See `Finset.inf` for finite intersections. ### Operations on two or more finsets * `insert` and `Finset.cons`: For any `a : α`, `insert s a` returns `s ∪ {a}`. `cons s a h` returns the same except that it requires a hypothesis stating that `a` is not already in `s`. This does not require decidable equality on the type `α`. * `Finset.instUnionFinset`: see "The lattice structure on subsets of finsets" * `Finset.instInterFinset`: see "The lattice structure on subsets of finsets" * `Finset.erase`: For any `a : α`, `erase s a` returns `s` with the element `a` removed. * `Finset.instSDiffFinset`: Defines the set difference `s \ t` for finsets `s` and `t`. * `Finset.product`: Given finsets of `α` and `β`, defines finsets of `α × β`. For arbitrary dependent products, see `Mathlib.Data.Finset.Pi`. ### Predicates on finsets * `Disjoint`: defined via the lattice structure on finsets; two sets are disjoint if their intersection is empty. * `Finset.Nonempty`: A finset is nonempty if it has elements. This is equivalent to saying `s ≠ ∅`. ### Equivalences between finsets * The `Mathlib.Data.Equiv` files describe a general type of equivalence, so look in there for any lemmas. There is some API for rewriting sums and products from `s` to `t` given that `s ≃ t`. TODO: examples ## Tags finite sets, finset -/ -- Assert that we define `Finset` without the material on `List.sublists`. -- Note that we cannot use `List.sublists` itself as that is defined very early. assert_not_exists List.sublistsLen assert_not_exists Multiset.Powerset assert_not_exists CompleteLattice open Multiset Subtype Nat Function universe u variable {α : Type} {β : Type} {γ : Type} /-- `Finset α` is the type of finite sets of elements of `α`. It is implemented as a multiset (a list up to permutation) which has no duplicate elements. -/ structure Finset (α : Type) where /-- The underlying multiset -/ val : Multiset α /-- `val` contains no duplicates -/ nodup : Nodup val #align finset Finset instance Multiset.canLiftFinset {α} : CanLift (Multiset α) (Finset α) Finset.val Multiset.Nodup := ⟨fun m hm => ⟨⟨m, hm⟩, rfl⟩⟩ #align multiset.can_lift_finset Multiset.canLiftFinset namespace Finset theorem eq_of_veq : ∀ {s t : Finset α}, s.1 = t.1 → s = t \| ⟨s, _⟩, ⟨t, _⟩, h => by cases h; rfl #align finset.eq_of_veq Finset.eq_of_veq theorem val_injective : Injective (val : Finset α → Multiset α) := fun _ _ => eq_of_veq #align finset.val_injective Finset.val_injective @[simp] theorem val_inj {s t : Finset α} : s.1 = t.1 ↔ s = t := val_injective.eq_iff #align finset.val_inj Finset.val_inj @[simp] theorem dedup_eq_self [DecidableEq α] (s : Finset α) : dedup s.1 = s.1 := s.2.dedup #align finset.dedup_eq_self Finset.dedup_eq_self instance decidableEq [DecidableEq α] : DecidableEq (Finset α) \| _, _ => decidable_of_iff _ val_inj #align finset.has_decidable_eq Finset.decidableEq /-! ### membership -/ instance : Membership α (Finset α) := ⟨fun a s => a ∈ s.1⟩ theorem mem_def {a : α} {s : Finset α} : a ∈ s ↔ a ∈ s.1 := Iff.rfl #align finset.mem_def Finset.mem_def @[simp] theorem mem_val {a : α} {s : Finset α} : a ∈ s.1 ↔ a ∈ s := Iff.rfl #align finset.mem_val Finset.mem_val @[simp] theorem mem_mk {a : α} {s nd} : a ∈ @Finset.mk α s nd ↔ a ∈ s := Iff.rfl #align finset.mem_mk Finset.mem_mk instance decidableMem [_h : DecidableEq α] (a : α) (s : Finset α) : Decidable (a ∈ s) := Multiset.decidableMem _ _ #align finset.decidable_mem Finset.decidableMem @[simp] lemma forall_mem_not_eq {s : Finset α} {a : α} : (∀ b ∈ s, ¬ a = b) ↔ a ∉ s := by aesop @[simp] lemma forall_mem_not_eq' {s : Finset α} {a : α} : (∀ b ∈ s, ¬ b = a) ↔ a ∉ s := by aesop /-! ### set coercion -/ -- Porting note (#11445): new definition /-- Convert a finset to a set in the natural way. -/ @[coe] def toSet (s : Finset α) : Set α := { a \| a ∈ s } /-- Convert a finset to a set in the natural way. -/ instance : CoeTC (Finset α) (Set α) := ⟨toSet⟩ @[simp, norm_cast] theorem mem_coe {a : α} {s : Finset α} : a ∈ (s : Set α) ↔ a ∈ (s : Finset α) := Iff.rfl #align finset.mem_coe Finset.mem_coe @[simp] theorem setOf_mem {α} {s : Finset α} : { a \| a ∈ s } = s := rfl #align finset.set_of_mem Finset.setOf_mem @[simp] theorem coe_mem {s : Finset α} (x : (s : Set α)) : ↑x ∈ s := x.2 #align finset.coe_mem Finset.coe_mem -- Porting note (#10618): @[simp] can prove this theorem mk_coe {s : Finset α} (x : (s : Set α)) {h} : (⟨x, h⟩ : (s : Set α)) = x := Subtype.coe_eta _ _ #align finset.mk_coe Finset.mk_coe instance decidableMem' [DecidableEq α] (a : α) (s : Finset α) : Decidable (a ∈ (s : Set α)) := s.decidableMem _ #align finset.decidable_mem' Finset.decidableMem' /-! ### extensionality -/ theorem ext_iff {s₁ s₂ : Finset α} : s₁ = s₂ ↔ ∀ a, a ∈ s₁ ↔ a ∈ s₂ := val_inj.symm.trans <\| s₁.nodup.ext s₂.nodup #align finset.ext_iff Finset.ext_iff @[ext] theorem ext {s₁ s₂ : Finset α} : (∀ a, a ∈ s₁ ↔ a ∈ s₂) → s₁ = s₂ := ext_iff.2 #align finset.ext Finset.ext @[simp, norm_cast] theorem coe_inj {s₁ s₂ : Finset α} : (s₁ : Set α) = s₂ ↔ s₁ = s₂ := Set.ext_iff.trans ext_iff.symm #align finset.coe_inj Finset.coe_inj theorem coe_injective {α} : Injective ((↑) : Finset α → Set α) := fun _s _t => coe_inj.1 #align finset.coe_injective Finset.coe_injective /-! ### type coercion -/ /-- Coercion from a finset to the corresponding subtype. -/ instance {α : Type u} : CoeSort (Finset α) (Type u) := ⟨fun s => { x // x ∈ s }⟩ -- Porting note (#10618): @[simp] can prove this protected theorem forall_coe {α : Type} (s : Finset α) (p : s → Prop) : (∀ x : s, p x) ↔ ∀ (x : α) (h : x ∈ s), p ⟨x, h⟩ := Subtype.forall #align finset.forall_coe Finset.forall_coe -- Porting note (#10618): @[simp] can prove this protected theorem exists_coe {α : Type} (s : Finset α) (p : s → Prop) : (∃ x : s, p x) ↔ ∃ (x : α) (h : x ∈ s), p ⟨x, h⟩ := Subtype.exists #align finset.exists_coe Finset.exists_coe instance PiFinsetCoe.canLift (ι : Type) (α : ι → Type) [_ne : ∀ i, Nonempty (α i)] (s : Finset ι) : CanLift (∀ i : s, α i) (∀ i, α i) (fun f i => f i) fun _ => True := PiSubtype.canLift ι α (· ∈ s) #align finset.pi_finset_coe.can_lift Finset.PiFinsetCoe.canLift instance PiFinsetCoe.canLift' (ι α : Type) [_ne : Nonempty α] (s : Finset ι) : CanLift (s → α) (ι → α) (fun f i => f i) fun _ => True := PiFinsetCoe.canLift ι (fun _ => α) s #align finset.pi_finset_coe.can_lift' Finset.PiFinsetCoe.canLift' instance FinsetCoe.canLift (s : Finset α) : CanLift α s (↑) fun a => a ∈ s where prf a ha := ⟨⟨a, ha⟩, rfl⟩ #align finset.finset_coe.can_lift Finset.FinsetCoe.canLift @[simp, norm_cast] theorem coe_sort_coe (s : Finset α) : ((s : Set α) : Sort _) = s := rfl #align finset.coe_sort_coe Finset.coe_sort_coe /-! ### Subset and strict subset relations -/ section Subset variable {s t : Finset α} instance : HasSubset (Finset α) := ⟨fun s t => ∀ ⦃a⦄, a ∈ s → a ∈ t⟩ instance : HasSSubset (Finset α) := ⟨fun s t => s ⊆ t ∧ ¬t ⊆ s⟩ instance partialOrder : PartialOrder (Finset α) where le := (· ⊆ ·) lt := (· ⊂ ·) le_refl s a := id le_trans s t u hst htu a ha := htu <\| hst ha le_antisymm s t hst hts := ext fun a => ⟨@hst _, @hts _⟩ instance : IsRefl (Finset α) (· ⊆ ·) := show IsRefl (Finset α) (· ≤ ·) by infer_instance instance : IsTrans (Finset α) (· ⊆ ·) := show IsTrans (Finset α) (· ≤ ·) by infer_instance instance : IsAntisymm (Finset α) (· ⊆ ·) := show IsAntisymm (Finset α) (· ≤ ·) by infer_instance instance : IsIrrefl (Finset α) (· ⊂ ·) := show IsIrrefl (Finset α) (· < ·) by infer_instance instance : IsTrans (Finset α) (· ⊂ ·) := show IsTrans (Finset α) (· < ·) by infer_instance instance : IsAsymm (Finset α) (· ⊂ ·) := show IsAsymm (Finset α) (· < ·) by infer_instance instance : IsNonstrictStrictOrder (Finset α) (· ⊆ ·) (· ⊂ ·) := ⟨fun _ _ => Iff.rfl⟩ theorem subset_def : s ⊆ t ↔ s.1 ⊆ t.1 := Iff.rfl #align finset.subset_def Finset.subset_def theorem ssubset_def : s ⊂ t ↔ s ⊆ t ∧ ¬t ⊆ s := Iff.rfl #align finset.ssubset_def Finset.ssubset_def @[simp] theorem Subset.refl (s : Finset α) : s ⊆ s := Multiset.Subset.refl _ #align finset.subset.refl Finset.Subset.refl protected theorem Subset.rfl {s : Finset α} : s ⊆ s := Subset.refl _ #align finset.subset.rfl Finset.Subset.rfl protected theorem subset_of_eq {s t : Finset α} (h : s = t) : s ⊆ t := h ▸ Subset.refl _ #align finset.subset_of_eq Finset.subset_of_eq theorem Subset.trans {s₁ s₂ s₃ : Finset α} : s₁ ⊆ s₂ → s₂ ⊆ s₃ → s₁ ⊆ s₃ := Multiset.Subset.trans #align finset.subset.trans Finset.Subset.trans theorem Superset.trans {s₁ s₂ s₃ : Finset α} : s₁ ⊇ s₂ → s₂ ⊇ s₃ → s₁ ⊇ s₃ := fun h' h => Subset.trans h h' #align finset.superset.trans Finset.Superset.trans theorem mem_of_subset {s₁ s₂ : Finset α} {a : α} : s₁ ⊆ s₂ → a ∈ s₁ → a ∈ s₂ := Multiset.mem_of_subset #align finset.mem_of_subset Finset.mem_of_subset theorem not_mem_mono {s t : Finset α} (h : s ⊆ t) {a : α} : a ∉ t → a ∉ s := mt <\| @h _ #align finset.not_mem_mono Finset.not_mem_mono theorem Subset.antisymm {s₁ s₂ : Finset α} (H₁ : s₁ ⊆ s₂) (H₂ : s₂ ⊆ s₁) : s₁ = s₂ := ext fun a => ⟨@H₁ a, @H₂ a⟩ #align finset.subset.antisymm Finset.Subset.antisymm theorem subset_iff {s₁ s₂ : Finset α} : s₁ ⊆ s₂ ↔ ∀ ⦃x⦄, x ∈ s₁ → x ∈ s₂ := Iff.rfl #align finset.subset_iff Finset.subset_iff @[simp, norm_cast] theorem coe_subset {s₁ s₂ : Finset α} : (s₁ : Set α) ⊆ s₂ ↔ s₁ ⊆ s₂ := Iff.rfl #align finset.coe_subset Finset.coe_subset @[simp] theorem val_le_iff {s₁ s₂ : Finset α} : s₁.1 ≤ s₂.1 ↔ s₁ ⊆ s₂ := le_iff_subset s₁.2 #align finset.val_le_iff Finset.val_le_iff theorem Subset.antisymm_iff {s₁ s₂ : Finset α} : s₁ = s₂ ↔ s₁ ⊆ s₂ ∧ s₂ ⊆ s₁ := le_antisymm_iff #align finset.subset.antisymm_iff Finset.Subset.antisymm_iff theorem not_subset : ¬s ⊆ t ↔ ∃ x ∈ s, x ∉ t := by simp only [← coe_subset, Set.not_subset, mem_coe] #align finset.not_subset Finset.not_subset @[simp] theorem le_eq_subset : ((· ≤ ·) : Finset α → Finset α → Prop) = (· ⊆ ·) := rfl #align finset.le_eq_subset Finset.le_eq_subset @[simp] theorem lt_eq_subset : ((· < ·) : Finset α → Finset α → Prop) = (· ⊂ ·) := rfl #align finset.lt_eq_subset Finset.lt_eq_subset theorem le_iff_subset {s₁ s₂ : Finset α} : s₁ ≤ s₂ ↔ s₁ ⊆ s₂ := Iff.rfl #align finset.le_iff_subset Finset.le_iff_subset theorem lt_iff_ssubset {s₁ s₂ : Finset α} : s₁ < s₂ ↔ s₁ ⊂ s₂ := Iff.rfl #align finset.lt_iff_ssubset Finset.lt_iff_ssubset @[simp, norm_cast] theorem coe_ssubset {s₁ s₂ : Finset α} : (s₁ : Set α) ⊂ s₂ ↔ s₁ ⊂ s₂ := show (s₁ : Set α) ⊂ s₂ ↔ s₁ ⊆ s₂ ∧ ¬s₂ ⊆ s₁ by simp only [Set.ssubset_def, Finset.coe_subset] #align finset.coe_ssubset Finset.coe_ssubset @[simp] theorem val_lt_iff {s₁ s₂ : Finset α} : s₁.1 < s₂.1 ↔ s₁ ⊂ s₂ := and_congr val_le_iff <\| not_congr val_le_iff #align finset.val_lt_iff Finset.val_lt_iff lemma val_strictMono : StrictMono (val : Finset α → Multiset α) := fun _ _ ↦ val_lt_iff.2 theorem ssubset_iff_subset_ne {s t : Finset α} : s ⊂ t ↔ s ⊆ t ∧ s ≠ t := @lt_iff_le_and_ne _ _ s t #align finset.ssubset_iff_subset_ne Finset.ssubset_iff_subset_ne theorem ssubset_iff_of_subset {s₁ s₂ : Finset α} (h : s₁ ⊆ s₂) : s₁ ⊂ s₂ ↔ ∃ x ∈ s₂, x ∉ s₁ := Set.ssubset_iff_of_subset h #align finset.ssubset_iff_of_subset Finset.ssubset_iff_of_subset theorem ssubset_of_ssubset_of_subset {s₁ s₂ s₃ : Finset α} (hs₁s₂ : s₁ ⊂ s₂) (hs₂s₃ : s₂ ⊆ s₃) : s₁ ⊂ s₃ := Set.ssubset_of_ssubset_of_subset hs₁s₂ hs₂s₃ #align finset.ssubset_of_ssubset_of_subset Finset.ssubset_of_ssubset_of_subset theorem ssubset_of_subset_of_ssubset {s₁ s₂ s₃ : Finset α} (hs₁s₂ : s₁ ⊆ s₂) (hs₂s₃ : s₂ ⊂ s₃) : s₁ ⊂ s₃ := Set.ssubset_of_subset_of_ssubset hs₁s₂ hs₂s₃ #align finset.ssubset_of_subset_of_ssubset Finset.ssubset_of_subset_of_ssubset theorem exists_of_ssubset {s₁ s₂ : Finset α} (h : s₁ ⊂ s₂) : ∃ x ∈ s₂, x ∉ s₁ := Set.exists_of_ssubset h #align finset.exists_of_ssubset Finset.exists_of_ssubset instance isWellFounded_ssubset : IsWellFounded (Finset α) (· ⊂ ·) := Subrelation.isWellFounded (InvImage _ _) val_lt_iff.2 #align finset.is_well_founded_ssubset Finset.isWellFounded_ssubset instance wellFoundedLT : WellFoundedLT (Finset α) := Finset.isWellFounded_ssubset #align finset.is_well_founded_lt Finset.wellFoundedLT end Subset -- TODO: these should be global attributes, but this will require fixing other files attribute [local trans] Subset.trans Superset.trans /-! ### Order embedding from `Finset α` to `Set α` -/ /-- Coercion to `Set α` as an `OrderEmbedding`. -/ def coeEmb : Finset α ↪o Set α := ⟨⟨(↑), coe_injective⟩, coe_subset⟩ #align finset.coe_emb Finset.coeEmb @[simp] theorem coe_coeEmb : ⇑(coeEmb : Finset α ↪o Set α) = ((↑) : Finset α → Set α) := rfl #align finset.coe_coe_emb Finset.coe_coeEmb /-! ### Nonempty -/ /-- The property `s.Nonempty` expresses the fact that the finset `s` is not empty. It should be used in theorem assumptions instead of `∃ x, x ∈ s` or `s ≠ ∅` as it gives access to a nice API thanks to the dot notation. -/ protected def Nonempty (s : Finset α) : Prop := ∃ x : α, x ∈ s #align finset.nonempty Finset.Nonempty -- Porting note: Much longer than in Lean3 instance decidableNonempty {s : Finset α} : Decidable s.Nonempty := Quotient.recOnSubsingleton (motive := fun s : Multiset α => Decidable (∃ a, a ∈ s)) s.1 (fun l : List α => match l with \| [] => isFalse <\| by simp \| a::l => isTrue ⟨a, by simp⟩) #align finset.decidable_nonempty Finset.decidableNonempty @[simp, norm_cast] theorem coe_nonempty {s : Finset α} : (s : Set α).Nonempty ↔ s.Nonempty := Iff.rfl #align finset.coe_nonempty Finset.coe_nonempty -- Porting note: Left-hand side simplifies @[simp] theorem nonempty_coe_sort {s : Finset α} : Nonempty (s : Type _) ↔ s.Nonempty := nonempty_subtype #align finset.nonempty_coe_sort Finset.nonempty_coe_sort alias ⟨_, Nonempty.to_set⟩ := coe_nonempty #align finset.nonempty.to_set Finset.Nonempty.to_set alias ⟨_, Nonempty.coe_sort⟩ := nonempty_coe_sort #align finset.nonempty.coe_sort Finset.Nonempty.coe_sort theorem Nonempty.exists_mem {s : Finset α} (h : s.Nonempty) : ∃ x : α, x ∈ s := h #align finset.nonempty.bex Finset.Nonempty.exists_mem @[deprecated (since := "2024-03-23")] alias Nonempty.bex := Nonempty.exists_mem theorem Nonempty.mono {s t : Finset α} (hst : s ⊆ t) (hs : s.Nonempty) : t.Nonempty := Set.Nonempty.mono hst hs #align finset.nonempty.mono Finset.Nonempty.mono theorem Nonempty.forall_const {s : Finset α} (h : s.Nonempty) {p : Prop} : (∀ x ∈ s, p) ↔ p := let ⟨x, hx⟩ := h ⟨fun h => h x hx, fun h _ _ => h⟩ #align finset.nonempty.forall_const Finset.Nonempty.forall_const theorem Nonempty.to_subtype {s : Finset α} : s.Nonempty → Nonempty s := nonempty_coe_sort.2 #align finset.nonempty.to_subtype Finset.Nonempty.to_subtype theorem Nonempty.to_type {s : Finset α} : s.Nonempty → Nonempty α := fun ⟨x, _hx⟩ => ⟨x⟩ #align finset.nonempty.to_type Finset.Nonempty.to_type /-! ### empty -/ section Empty variable {s : Finset α} /-- The empty finset -/ protected def empty : Finset α := ⟨0, nodup_zero⟩ #align finset.empty Finset.empty instance : EmptyCollection (Finset α) := ⟨Finset.empty⟩ instance inhabitedFinset : Inhabited (Finset α) := ⟨∅⟩ #align finset.inhabited_finset Finset.inhabitedFinset @[simp] theorem empty_val : (∅ : Finset α).1 = 0 := rfl #align finset.empty_val Finset.empty_val @[simp] theorem not_mem_empty (a : α) : a ∉ (∅ : Finset α) := by -- Porting note: was `id`. `a ∈ List.nil` is no longer definitionally equal to `False` simp only [mem_def, empty_val, not_mem_zero, not_false_iff] #align finset.not_mem_empty Finset.not_mem_empty @[simp] theorem not_nonempty_empty : ¬(∅ : Finset α).Nonempty := fun ⟨x, hx⟩ => not_mem_empty x hx #align finset.not_nonempty_empty Finset.not_nonempty_empty @[simp] theorem mk_zero : (⟨0, nodup_zero⟩ : Finset α) = ∅ := rfl #align finset.mk_zero Finset.mk_zero theorem ne_empty_of_mem {a : α} {s : Finset α} (h : a ∈ s) : s ≠ ∅ := fun e => not_mem_empty a <\| e ▸ h #align finset.ne_empty_of_mem Finset.ne_empty_of_mem theorem Nonempty.ne_empty {s : Finset α} (h : s.Nonempty) : s ≠ ∅ := (Exists.elim h) fun _a => ne_empty_of_mem #align finset.nonempty.ne_empty Finset.Nonempty.ne_empty @[simp] theorem empty_subset (s : Finset α) : ∅ ⊆ s := zero_subset _ #align finset.empty_subset Finset.empty_subset theorem eq_empty_of_forall_not_mem {s : Finset α} (H : ∀ x, x ∉ s) : s = ∅ := eq_of_veq (eq_zero_of_forall_not_mem H) #align finset.eq_empty_of_forall_not_mem Finset.eq_empty_of_forall_not_mem theorem eq_empty_iff_forall_not_mem {s : Finset α} : s = ∅ ↔ ∀ x, x ∉ s := -- Porting note: used `id` ⟨by rintro rfl x; apply not_mem_empty, fun h => eq_empty_of_forall_not_mem h⟩ #align finset.eq_empty_iff_forall_not_mem Finset.eq_empty_iff_forall_not_mem @[simp] theorem val_eq_zero {s : Finset α} : s.1 = 0 ↔ s = ∅ := @val_inj _ s ∅ #align finset.val_eq_zero Finset.val_eq_zero theorem subset_empty {s : Finset α} : s ⊆ ∅ ↔ s = ∅ := subset_zero.trans val_eq_zero #align finset.subset_empty Finset.subset_empty @[simp] theorem not_ssubset_empty (s : Finset α) : ¬s ⊂ ∅ := fun h => let ⟨_, he, _⟩ := exists_of_ssubset h -- Porting note: was `he` not_mem_empty _ he #align finset.not_ssubset_empty Finset.not_ssubset_empty theorem nonempty_of_ne_empty {s : Finset α} (h : s ≠ ∅) : s.Nonempty := exists_mem_of_ne_zero (mt val_eq_zero.1 h) #align finset.nonempty_of_ne_empty Finset.nonempty_of_ne_empty theorem nonempty_iff_ne_empty {s : Finset α} : s.Nonempty ↔ s ≠ ∅ := ⟨Nonempty.ne_empty, nonempty_of_ne_empty⟩ #align finset.nonempty_iff_ne_empty Finset.nonempty_iff_ne_empty @[simp] theorem not_nonempty_iff_eq_empty {s : Finset α} : ¬s.Nonempty ↔ s = ∅ := nonempty_iff_ne_empty.not.trans not_not #align finset.not_nonempty_iff_eq_empty Finset.not_nonempty_iff_eq_empty theorem eq_empty_or_nonempty (s : Finset α) : s = ∅ ∨ s.Nonempty := by_cases Or.inl fun h => Or.inr (nonempty_of_ne_empty h) #align finset.eq_empty_or_nonempty Finset.eq_empty_or_nonempty @[simp, norm_cast] theorem coe_empty : ((∅ : Finset α) : Set α) = ∅ := Set.ext <\| by simp #align finset.coe_empty Finset.coe_empty @[simp, norm_cast] theorem coe_eq_empty {s : Finset α} : (s : Set α) = ∅ ↔ s = ∅ := by rw [← coe_empty, coe_inj] #align finset.coe_eq_empty Finset.coe_eq_empty -- Porting note: Left-hand side simplifies @[simp] theorem isEmpty_coe_sort {s : Finset α} : IsEmpty (s : Type _) ↔ s = ∅ := by simpa using @Set.isEmpty_coe_sort α s #align finset.is_empty_coe_sort Finset.isEmpty_coe_sort instance instIsEmpty : IsEmpty (∅ : Finset α) := isEmpty_coe_sort.2 rfl /-- A `Finset` for an empty type is empty. -/ theorem eq_empty_of_isEmpty [IsEmpty α] (s : Finset α) : s = ∅ := Finset.eq_empty_of_forall_not_mem isEmptyElim #align finset.eq_empty_of_is_empty Finset.eq_empty_of_isEmpty instance : OrderBot (Finset α) where bot := ∅ bot_le := empty_subset @[simp] theorem bot_eq_empty : (⊥ : Finset α) = ∅ := rfl #align finset.bot_eq_empty Finset.bot_eq_empty @[simp] theorem empty_ssubset : ∅ ⊂ s ↔ s.Nonempty := (@bot_lt_iff_ne_bot (Finset α) _ _ _).trans nonempty_iff_ne_empty.symm #align finset.empty_ssubset Finset.empty_ssubset alias ⟨_, Nonempty.empty_ssubset⟩ := empty_ssubset #align finset.nonempty.empty_ssubset Finset.Nonempty.empty_ssubset end Empty /-! ### singleton -/ section Singleton variable {s : Finset α} {a b : α} /-- `{a} : Finset a` is the set `{a}` containing `a` and nothing else. This differs from `insert a ∅` in that it does not require a `DecidableEq` instance for `α`. -/ instance : Singleton α (Finset α) := ⟨fun a => ⟨{a}, nodup_singleton a⟩⟩ @[simp] theorem singleton_val (a : α) : ({a} : Finset α).1 = {a} := rfl #align finset.singleton_val Finset.singleton_val @[simp] theorem mem_singleton {a b : α} : b ∈ ({a} : Finset α) ↔ b = a := Multiset.mem_singleton #align finset.mem_singleton Finset.mem_singleton theorem eq_of_mem_singleton {x y : α} (h : x ∈ ({y} : Finset α)) : x = y := mem_singleton.1 h #align finset.eq_of_mem_singleton Finset.eq_of_mem_singleton theorem not_mem_singleton {a b : α} : a ∉ ({b} : Finset α) ↔ a ≠ b := not_congr mem_singleton #align finset.not_mem_singleton Finset.not_mem_singleton theorem mem_singleton_self (a : α) : a ∈ ({a} : Finset α) := -- Porting note: was `Or.inl rfl` mem_singleton.mpr rfl #align finset.mem_singleton_self Finset.mem_singleton_self @[simp] theorem val_eq_singleton_iff {a : α} {s : Finset α} : s.val = {a} ↔ s = {a} := by rw [← val_inj] rfl #align finset.val_eq_singleton_iff Finset.val_eq_singleton_iff theorem singleton_injective : Injective (singleton : α → Finset α) := fun _a _b h => mem_singleton.1 (h ▸ mem_singleton_self _) #align finset.singleton_injective Finset.singleton_injective @[simp] theorem singleton_inj : ({a} : Finset α) = {b} ↔ a = b := singleton_injective.eq_iff #align finset.singleton_inj Finset.singleton_inj @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem singleton_nonempty (a : α) : ({a} : Finset α).Nonempty := ⟨a, mem_singleton_self a⟩ #align finset.singleton_nonempty Finset.singleton_nonempty @[simp] theorem singleton_ne_empty (a : α) : ({a} : Finset α) ≠ ∅ := (singleton_nonempty a).ne_empty #align finset.singleton_ne_empty Finset.singleton_ne_empty theorem empty_ssubset_singleton : (∅ : Finset α) ⊂ {a} := (singleton_nonempty _).empty_ssubset #align finset.empty_ssubset_singleton Finset.empty_ssubset_singleton @[simp, norm_cast] theorem coe_singleton (a : α) : (({a} : Finset α) : Set α) = {a} := by ext simp #align finset.coe_singleton Finset.coe_singleton @[simp, norm_cast] theorem coe_eq_singleton {s : Finset α} {a : α} : (s : Set α) = {a} ↔ s = {a} := by rw [← coe_singleton, coe_inj] #align finset.coe_eq_singleton Finset.coe_eq_singleton @[norm_cast] lemma coe_subset_singleton : (s : Set α) ⊆ {a} ↔ s ⊆ {a} := by rw [← coe_subset, coe_singleton] @[norm_cast] lemma singleton_subset_coe : {a} ⊆ (s : Set α) ↔ {a} ⊆ s := by rw [← coe_subset, coe_singleton] theorem eq_singleton_iff_unique_mem {s : Finset α} {a : α} : s = {a} ↔ a ∈ s ∧ ∀ x ∈ s, x = a := by constructor <;> intro t · rw [t] exact ⟨Finset.mem_singleton_self _, fun _ => Finset.mem_singleton.1⟩ · ext rw [Finset.mem_singleton] exact ⟨t.right _, fun r => r.symm ▸ t.left⟩ #align finset.eq_singleton_iff_unique_mem Finset.eq_singleton_iff_unique_mem theorem eq_singleton_iff_nonempty_unique_mem {s : Finset α} {a : α} : s = {a} ↔ s.Nonempty ∧ ∀ x ∈ s, x = a := by constructor · rintro rfl simp · rintro ⟨hne, h_uniq⟩ rw [eq_singleton_iff_unique_mem] refine ⟨?_, h_uniq⟩ rw [← h_uniq hne.choose hne.choose_spec] exact hne.choose_spec #align finset.eq_singleton_iff_nonempty_unique_mem Finset.eq_singleton_iff_nonempty_unique_mem theorem nonempty_iff_eq_singleton_default [Unique α] {s : Finset α} : s.Nonempty ↔ s = {default} := by simp [eq_singleton_iff_nonempty_unique_mem, eq_iff_true_of_subsingleton] #align finset.nonempty_iff_eq_singleton_default Finset.nonempty_iff_eq_singleton_default alias ⟨Nonempty.eq_singleton_default, _⟩ := nonempty_iff_eq_singleton_default #align finset.nonempty.eq_singleton_default Finset.Nonempty.eq_singleton_default theorem singleton_iff_unique_mem (s : Finset α) : (∃ a, s = {a}) ↔ ∃! a, a ∈ s := by simp only [eq_singleton_iff_unique_mem, ExistsUnique] #align finset.singleton_iff_unique_mem Finset.singleton_iff_unique_mem theorem singleton_subset_set_iff {s : Set α} {a : α} : ↑({a} : Finset α) ⊆ s ↔ a ∈ s := by rw [coe_singleton, Set.singleton_subset_iff] #align finset.singleton_subset_set_iff Finset.singleton_subset_set_iff @[simp] theorem singleton_subset_iff {s : Finset α} {a : α} : {a} ⊆ s ↔ a ∈ s := singleton_subset_set_iff #align finset.singleton_subset_iff Finset.singleton_subset_iff @[simp] theorem subset_singleton_iff {s : Finset α} {a : α} : s ⊆ {a} ↔ s = ∅ ∨ s = {a} := by rw [← coe_subset, coe_singleton, Set.subset_singleton_iff_eq, coe_eq_empty, coe_eq_singleton] #align finset.subset_singleton_iff Finset.subset_singleton_iff theorem singleton_subset_singleton : ({a} : Finset α) ⊆ {b} ↔ a = b := by simp #align finset.singleton_subset_singleton Finset.singleton_subset_singleton protected theorem Nonempty.subset_singleton_iff {s : Finset α} {a : α} (h : s.Nonempty) : s ⊆ {a} ↔ s = {a} := subset_singleton_iff.trans <\| or_iff_right h.ne_empty #align finset.nonempty.subset_singleton_iff Finset.Nonempty.subset_singleton_iff theorem subset_singleton_iff' {s : Finset α} {a : α} : s ⊆ {a} ↔ ∀ b ∈ s, b = a := forall₂_congr fun _ _ => mem_singleton #align finset.subset_singleton_iff' Finset.subset_singleton_iff' @[simp] theorem ssubset_singleton_iff {s : Finset α} {a : α} : s ⊂ {a} ↔ s = ∅ := by rw [← coe_ssubset, coe_singleton, Set.ssubset_singleton_iff, coe_eq_empty] #align finset.ssubset_singleton_iff Finset.ssubset_singleton_iff theorem eq_empty_of_ssubset_singleton {s : Finset α} {x : α} (hs : s ⊂ {x}) : s = ∅ := ssubset_singleton_iff.1 hs #align finset.eq_empty_of_ssubset_singleton Finset.eq_empty_of_ssubset_singleton /-- A finset is nontrivial if it has at least two elements. -/ protected abbrev Nontrivial (s : Finset α) : Prop := (s : Set α).Nontrivial #align finset.nontrivial Finset.Nontrivial @[simp] theorem not_nontrivial_empty : ¬ (∅ : Finset α).Nontrivial := by simp [Finset.Nontrivial] #align finset.not_nontrivial_empty Finset.not_nontrivial_empty @[simp] theorem not_nontrivial_singleton : ¬ ({a} : Finset α).Nontrivial := by simp [Finset.Nontrivial] #align finset.not_nontrivial_singleton Finset.not_nontrivial_singleton theorem Nontrivial.ne_singleton (hs : s.Nontrivial) : s ≠ {a} := by rintro rfl; exact not_nontrivial_singleton hs #align finset.nontrivial.ne_singleton Finset.Nontrivial.ne_singleton nonrec lemma Nontrivial.exists_ne (hs : s.Nontrivial) (a : α) : ∃ b ∈ s, b ≠ a := hs.exists_ne _ theorem eq_singleton_or_nontrivial (ha : a ∈ s) : s = {a} ∨ s.Nontrivial := by rw [← coe_eq_singleton]; exact Set.eq_singleton_or_nontrivial ha #align finset.eq_singleton_or_nontrivial Finset.eq_singleton_or_nontrivial theorem nontrivial_iff_ne_singleton (ha : a ∈ s) : s.Nontrivial ↔ s ≠ {a} := ⟨Nontrivial.ne_singleton, (eq_singleton_or_nontrivial ha).resolve_left⟩ #align finset.nontrivial_iff_ne_singleton Finset.nontrivial_iff_ne_singleton theorem Nonempty.exists_eq_singleton_or_nontrivial : s.Nonempty → (∃ a, s = {a}) ∨ s.Nontrivial := fun ⟨a, ha⟩ => (eq_singleton_or_nontrivial ha).imp_left <\| Exists.intro a #align finset.nonempty.exists_eq_singleton_or_nontrivial Finset.Nonempty.exists_eq_singleton_or_nontrivial instance instNontrivial [Nonempty α] : Nontrivial (Finset α) := ‹Nonempty α›.elim fun a => ⟨⟨{a}, ∅, singleton_ne_empty _⟩⟩ #align finset.nontrivial' Finset.instNontrivial instance [IsEmpty α] : Unique (Finset α) where default := ∅ uniq _ := eq_empty_of_forall_not_mem isEmptyElim instance (i : α) : Unique ({i} : Finset α) where default := ⟨i, mem_singleton_self i⟩ uniq j := Subtype.ext <\| mem_singleton.mp j.2 @[simp] lemma default_singleton (i : α) : ((default : ({i} : Finset α)) : α) = i := rfl end Singleton /-! ### cons -/ section Cons variable {s t : Finset α} {a b : α} /-- `cons a s h` is the set `{a} ∪ s` containing `a` and the elements of `s`. It is the same as `insert a s` when it is defined, but unlike `insert a s` it does not require `DecidableEq α`, and the union is guaranteed to be disjoint. -/ def cons (a : α) (s : Finset α) (h : a ∉ s) : Finset α := ⟨a ::ₘ s.1, nodup_cons.2 ⟨h, s.2⟩⟩ #align finset.cons Finset.cons @[simp] theorem mem_cons {h} : b ∈ s.cons a h ↔ b = a ∨ b ∈ s := Multiset.mem_cons #align finset.mem_cons Finset.mem_cons theorem mem_cons_of_mem {a b : α} {s : Finset α} {hb : b ∉ s} (ha : a ∈ s) : a ∈ cons b s hb := Multiset.mem_cons_of_mem ha -- Porting note (#10618): @[simp] can prove this theorem mem_cons_self (a : α) (s : Finset α) {h} : a ∈ cons a s h := Multiset.mem_cons_self _ _ #align finset.mem_cons_self Finset.mem_cons_self @[simp] theorem cons_val (h : a ∉ s) : (cons a s h).1 = a ::ₘ s.1 := rfl #align finset.cons_val Finset.cons_val theorem forall_mem_cons (h : a ∉ s) (p : α → Prop) : (∀ x, x ∈ cons a s h → p x) ↔ p a ∧ ∀ x, x ∈ s → p x := by simp only [mem_cons, or_imp, forall_and, forall_eq] #align finset.forall_mem_cons Finset.forall_mem_cons /-- Useful in proofs by induction. -/ theorem forall_of_forall_cons {p : α → Prop} {h : a ∉ s} (H : ∀ x, x ∈ cons a s h → p x) (x) (h : x ∈ s) : p x := H _ <\| mem_cons.2 <\| Or.inr h #align finset.forall_of_forall_cons Finset.forall_of_forall_cons @[simp] theorem mk_cons {s : Multiset α} (h : (a ::ₘ s).Nodup) : (⟨a ::ₘ s, h⟩ : Finset α) = cons a ⟨s, (nodup_cons.1 h).2⟩ (nodup_cons.1 h).1 := rfl #align finset.mk_cons Finset.mk_cons @[simp] theorem cons_empty (a : α) : cons a ∅ (not_mem_empty _) = {a} := rfl #align finset.cons_empty Finset.cons_empty @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem nonempty_cons (h : a ∉ s) : (cons a s h).Nonempty := ⟨a, mem_cons.2 <\| Or.inl rfl⟩ #align finset.nonempty_cons Finset.nonempty_cons @[simp] theorem nonempty_mk {m : Multiset α} {hm} : (⟨m, hm⟩ : Finset α).Nonempty ↔ m ≠ 0 := by induction m using Multiset.induction_on <;> simp #align finset.nonempty_mk Finset.nonempty_mk @[simp] theorem coe_cons {a s h} : (@cons α a s h : Set α) = insert a (s : Set α) := by ext simp #align finset.coe_cons Finset.coe_cons theorem subset_cons (h : a ∉ s) : s ⊆ s.cons a h := Multiset.subset_cons _ _ #align finset.subset_cons Finset.subset_cons theorem ssubset_cons (h : a ∉ s) : s ⊂ s.cons a h := Multiset.ssubset_cons h #align finset.ssubset_cons Finset.ssubset_cons theorem cons_subset {h : a ∉ s} : s.cons a h ⊆ t ↔ a ∈ t ∧ s ⊆ t := Multiset.cons_subset #align finset.cons_subset Finset.cons_subset @[simp] theorem cons_subset_cons {hs ht} : s.cons a hs ⊆ t.cons a ht ↔ s ⊆ t := by rwa [← coe_subset, coe_cons, coe_cons, Set.insert_subset_insert_iff, coe_subset] #align finset.cons_subset_cons Finset.cons_subset_cons theorem ssubset_iff_exists_cons_subset : s ⊂ t ↔ ∃ (a : _) (h : a ∉ s), s.cons a h ⊆ t := by refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_ssubset_of_subset (ssubset_cons _) h⟩ obtain ⟨a, hs, ht⟩ := not_subset.1 h.2 exact ⟨a, ht, cons_subset.2 ⟨hs, h.subset⟩⟩ #align finset.ssubset_iff_exists_cons_subset Finset.ssubset_iff_exists_cons_subset end Cons /-! ### disjoint -/ section Disjoint variable {f : α → β} {s t u : Finset α} {a b : α} theorem disjoint_left : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → a ∉ t := ⟨fun h a hs ht => not_mem_empty a <\| singleton_subset_iff.mp (h (singleton_subset_iff.mpr hs) (singleton_subset_iff.mpr ht)), fun h _ hs ht _ ha => (h (hs ha) (ht ha)).elim⟩ #align finset.disjoint_left Finset.disjoint_left theorem disjoint_right : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ t → a ∉ s := by rw [_root_.disjoint_comm, disjoint_left] #align finset.disjoint_right Finset.disjoint_right theorem disjoint_iff_ne : Disjoint s t ↔ ∀ a ∈ s, ∀ b ∈ t, a ≠ b := by simp only [disjoint_left, imp_not_comm, forall_eq'] #align finset.disjoint_iff_ne Finset.disjoint_iff_ne @[simp] theorem disjoint_val : s.1.Disjoint t.1 ↔ Disjoint s t := disjoint_left.symm #align finset.disjoint_val Finset.disjoint_val theorem _root_.Disjoint.forall_ne_finset (h : Disjoint s t) (ha : a ∈ s) (hb : b ∈ t) : a ≠ b := disjoint_iff_ne.1 h _ ha _ hb #align disjoint.forall_ne_finset Disjoint.forall_ne_finset theorem not_disjoint_iff : ¬Disjoint s t ↔ ∃ a, a ∈ s ∧ a ∈ t := disjoint_left.not.trans <\| not_forall.trans <\| exists_congr fun _ => by rw [Classical.not_imp, not_not] #align finset.not_disjoint_iff Finset.not_disjoint_iff theorem disjoint_of_subset_left (h : s ⊆ u) (d : Disjoint u t) : Disjoint s t := disjoint_left.2 fun _x m₁ => (disjoint_left.1 d) (h m₁) #align finset.disjoint_of_subset_left Finset.disjoint_of_subset_left theorem disjoint_of_subset_right (h : t ⊆ u) (d : Disjoint s u) : Disjoint s t := disjoint_right.2 fun _x m₁ => (disjoint_right.1 d) (h m₁) #align finset.disjoint_of_subset_right Finset.disjoint_of_subset_right @[simp] theorem disjoint_empty_left (s : Finset α) : Disjoint ∅ s := disjoint_bot_left #align finset.disjoint_empty_left Finset.disjoint_empty_left @[simp] theorem disjoint_empty_right (s : Finset α) : Disjoint s ∅ := disjoint_bot_right #align finset.disjoint_empty_right Finset.disjoint_empty_right @[simp] theorem disjoint_singleton_left : Disjoint (singleton a) s ↔ a ∉ s := by simp only [disjoint_left, mem_singleton, forall_eq] #align finset.disjoint_singleton_left Finset.disjoint_singleton_left @[simp] theorem disjoint_singleton_right : Disjoint s (singleton a) ↔ a ∉ s := disjoint_comm.trans disjoint_singleton_left #align finset.disjoint_singleton_right Finset.disjoint_singleton_right -- Porting note: Left-hand side simplifies @[simp] theorem disjoint_singleton : Disjoint ({a} : Finset α) {b} ↔ a ≠ b := by rw [disjoint_singleton_left, mem_singleton] #align finset.disjoint_singleton Finset.disjoint_singleton theorem disjoint_self_iff_empty (s : Finset α) : Disjoint s s ↔ s = ∅ := disjoint_self #align finset.disjoint_self_iff_empty Finset.disjoint_self_iff_empty @[simp, norm_cast] theorem disjoint_coe : Disjoint (s : Set α) t ↔ Disjoint s t := by simp only [Finset.disjoint_left, Set.disjoint_left, mem_coe] #align finset.disjoint_coe Finset.disjoint_coe @[simp, norm_cast] theorem pairwiseDisjoint_coe {ι : Type} {s : Set ι} {f : ι → Finset α} : s.PairwiseDisjoint (fun i => f i : ι → Set α) ↔ s.PairwiseDisjoint f := forall₅_congr fun _ _ _ _ _ => disjoint_coe #align finset.pairwise_disjoint_coe Finset.pairwiseDisjoint_coe end Disjoint /-! ### disjoint union -/ /-- `disjUnion s t h` is the set such that `a ∈ disjUnion s t h` iff `a ∈ s` or `a ∈ t`. It is the same as `s ∪ t`, but it does not require decidable equality on the type. The hypothesis ensures that the sets are disjoint. -/ def disjUnion (s t : Finset α) (h : Disjoint s t) : Finset α := ⟨s.1 + t.1, Multiset.nodup_add.2 ⟨s.2, t.2, disjoint_val.2 h⟩⟩ #align finset.disj_union Finset.disjUnion @[simp] theorem mem_disjUnion {α s t h a} : a ∈ @disjUnion α s t h ↔ a ∈ s ∨ a ∈ t := by rcases s with ⟨⟨s⟩⟩; rcases t with ⟨⟨t⟩⟩; apply List.mem_append #align finset.mem_disj_union Finset.mem_disjUnion @[simp, norm_cast] theorem coe_disjUnion {s t : Finset α} (h : Disjoint s t) : (disjUnion s t h : Set α) = (s : Set α) ∪ t := Set.ext <\| by simp theorem disjUnion_comm (s t : Finset α) (h : Disjoint s t) : disjUnion s t h = disjUnion t s h.symm := eq_of_veq <\| add_comm _ _ #align finset.disj_union_comm Finset.disjUnion_comm @[simp] theorem empty_disjUnion (t : Finset α) (h : Disjoint ∅ t := disjoint_bot_left) : disjUnion ∅ t h = t := eq_of_veq <\| zero_add _ #align finset.empty_disj_union Finset.empty_disjUnion @[simp] theorem disjUnion_empty (s : Finset α) (h : Disjoint s ∅ := disjoint_bot_right) : disjUnion s ∅ h = s := eq_of_veq <\| add_zero _ #align finset.disj_union_empty Finset.disjUnion_empty theorem singleton_disjUnion (a : α) (t : Finset α) (h : Disjoint {a} t) : disjUnion {a} t h = cons a t (disjoint_singleton_left.mp h) := eq_of_veq <\| Multiset.singleton_add _ _ #align finset.singleton_disj_union Finset.singleton_disjUnion theorem disjUnion_singleton (s : Finset α) (a : α) (h : Disjoint s {a}) : disjUnion s {a} h = cons a s (disjoint_singleton_right.mp h) := by rw [disjUnion_comm, singleton_disjUnion] #align finset.disj_union_singleton Finset.disjUnion_singleton /-! ### insert -/ section Insert variable [DecidableEq α] {s t u v : Finset α} {a b : α} /-- `insert a s` is the set `{a} ∪ s` containing `a` and the elements of `s`. -/ instance : Insert α (Finset α) := ⟨fun a s => ⟨_, s.2.ndinsert a⟩⟩ theorem insert_def (a : α) (s : Finset α) : insert a s = ⟨_, s.2.ndinsert a⟩ := rfl #align finset.insert_def Finset.insert_def @[simp] theorem insert_val (a : α) (s : Finset α) : (insert a s).1 = ndinsert a s.1 := rfl #align finset.insert_val Finset.insert_val theorem insert_val' (a : α) (s : Finset α) : (insert a s).1 = dedup (a ::ₘ s.1) := by rw [dedup_cons, dedup_eq_self]; rfl #align finset.insert_val' Finset.insert_val' theorem insert_val_of_not_mem {a : α} {s : Finset α} (h : a ∉ s) : (insert a s).1 = a ::ₘ s.1 := by rw [insert_val, ndinsert_of_not_mem h] #align finset.insert_val_of_not_mem Finset.insert_val_of_not_mem @[simp] theorem mem_insert : a ∈ insert b s ↔ a = b ∨ a ∈ s := mem_ndinsert #align finset.mem_insert Finset.mem_insert theorem mem_insert_self (a : α) (s : Finset α) : a ∈ insert a s := mem_ndinsert_self a s.1 #align finset.mem_insert_self Finset.mem_insert_self theorem mem_insert_of_mem (h : a ∈ s) : a ∈ insert b s := mem_ndinsert_of_mem h #align finset.mem_insert_of_mem Finset.mem_insert_of_mem theorem mem_of_mem_insert_of_ne (h : b ∈ insert a s) : b ≠ a → b ∈ s := (mem_insert.1 h).resolve_left #align finset.mem_of_mem_insert_of_ne Finset.mem_of_mem_insert_of_ne theorem eq_of_not_mem_of_mem_insert (ha : b ∈ insert a s) (hb : b ∉ s) : b = a := (mem_insert.1 ha).resolve_right hb #align finset.eq_of_not_mem_of_mem_insert Finset.eq_of_not_mem_of_mem_insert /-- A version of `LawfulSingleton.insert_emptyc_eq` that works with `dsimp`. -/ @[simp, nolint simpNF] lemma insert_empty : insert a (∅ : Finset α) = {a} := rfl @[simp] theorem cons_eq_insert (a s h) : @cons α a s h = insert a s := ext fun a => by simp #align finset.cons_eq_insert Finset.cons_eq_insert @[simp, norm_cast] theorem coe_insert (a : α) (s : Finset α) : ↑(insert a s) = (insert a s : Set α) := Set.ext fun x => by simp only [mem_coe, mem_insert, Set.mem_insert_iff] #align finset.coe_insert Finset.coe_insert theorem mem_insert_coe {s : Finset α} {x y : α} : x ∈ insert y s ↔ x ∈ insert y (s : Set α) := by simp #align finset.mem_insert_coe Finset.mem_insert_coe instance : LawfulSingleton α (Finset α) := ⟨fun a => by ext; simp⟩ @[simp] theorem insert_eq_of_mem (h : a ∈ s) : insert a s = s := eq_of_veq <\| ndinsert_of_mem h #align finset.insert_eq_of_mem Finset.insert_eq_of_mem @[simp] theorem insert_eq_self : insert a s = s ↔ a ∈ s := ⟨fun h => h ▸ mem_insert_self _ _, insert_eq_of_mem⟩ #align finset.insert_eq_self Finset.insert_eq_self theorem insert_ne_self : insert a s ≠ s ↔ a ∉ s := insert_eq_self.not #align finset.insert_ne_self Finset.insert_ne_self -- Porting note (#10618): @[simp] can prove this theorem pair_eq_singleton (a : α) : ({a, a} : Finset α) = {a} := insert_eq_of_mem <\| mem_singleton_self _ #align finset.pair_eq_singleton Finset.pair_eq_singleton theorem Insert.comm (a b : α) (s : Finset α) : insert a (insert b s) = insert b (insert a s) := ext fun x => by simp only [mem_insert, or_left_comm] #align finset.insert.comm Finset.Insert.comm -- Porting note (#10618): @[simp] can prove this @[norm_cast] theorem coe_pair {a b : α} : (({a, b} : Finset α) : Set α) = {a, b} := by ext simp #align finset.coe_pair Finset.coe_pair @[simp, norm_cast] theorem coe_eq_pair {s : Finset α} {a b : α} : (s : Set α) = {a, b} ↔ s = {a, b} := by rw [← coe_pair, coe_inj] #align finset.coe_eq_pair Finset.coe_eq_pair theorem pair_comm (a b : α) : ({a, b} : Finset α) = {b, a} := Insert.comm a b ∅ #align finset.pair_comm Finset.pair_comm -- Porting note (#10618): @[simp] can prove this theorem insert_idem (a : α) (s : Finset α) : insert a (insert a s) = insert a s := ext fun x => by simp only [mem_insert, ← or_assoc, or_self_iff] #align finset.insert_idem Finset.insert_idem @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem insert_nonempty (a : α) (s : Finset α) : (insert a s).Nonempty := ⟨a, mem_insert_self a s⟩ #align finset.insert_nonempty Finset.insert_nonempty @[simp] theorem insert_ne_empty (a : α) (s : Finset α) : insert a s ≠ ∅ := (insert_nonempty a s).ne_empty #align finset.insert_ne_empty Finset.insert_ne_empty -- Porting note: explicit universe annotation is no longer required. instance (i : α) (s : Finset α) : Nonempty ((insert i s : Finset α) : Set α) := (Finset.coe_nonempty.mpr (s.insert_nonempty i)).to_subtype theorem ne_insert_of_not_mem (s t : Finset α) {a : α} (h : a ∉ s) : s ≠ insert a t := by contrapose! h simp [h] #align finset.ne_insert_of_not_mem Finset.ne_insert_of_not_mem theorem insert_subset_iff : insert a s ⊆ t ↔ a ∈ t ∧ s ⊆ t := by simp only [subset_iff, mem_insert, forall_eq, or_imp, forall_and] #align finset.insert_subset Finset.insert_subset_iff theorem insert_subset (ha : a ∈ t) (hs : s ⊆ t) : insert a s ⊆ t := insert_subset_iff.mpr ⟨ha,hs⟩ @[simp] theorem subset_insert (a : α) (s : Finset α) : s ⊆ insert a s := fun _b => mem_insert_of_mem #align finset.subset_insert Finset.subset_insert @[gcongr] theorem insert_subset_insert (a : α) {s t : Finset α} (h : s ⊆ t) : insert a s ⊆ insert a t := insert_subset_iff.2 ⟨mem_insert_self _ _, Subset.trans h (subset_insert _ _)⟩ #align finset.insert_subset_insert Finset.insert_subset_insert @[simp] lemma insert_subset_insert_iff (ha : a ∉ s) : insert a s ⊆ insert a t ↔ s ⊆ t := by simp_rw [← coe_subset]; simp [-coe_subset, ha] theorem insert_inj (ha : a ∉ s) : insert a s = insert b s ↔ a = b := ⟨fun h => eq_of_not_mem_of_mem_insert (h.subst <\| mem_insert_self _ _) ha, congr_arg (insert · s)⟩ #align finset.insert_inj Finset.insert_inj theorem insert_inj_on (s : Finset α) : Set.InjOn (fun a => insert a s) sᶜ := fun _ h _ _ => (insert_inj h).1 #align finset.insert_inj_on Finset.insert_inj_on theorem ssubset_iff : s ⊂ t ↔ ∃ a ∉ s, insert a s ⊆ t := mod_cast @Set.ssubset_iff_insert α s t #align finset.ssubset_iff Finset.ssubset_iff theorem ssubset_insert (h : a ∉ s) : s ⊂ insert a s := ssubset_iff.mpr ⟨a, h, Subset.rfl⟩ #align finset.ssubset_insert Finset.ssubset_insert @[elab_as_elim] theorem cons_induction {α : Type} {p : Finset α → Prop} (empty : p ∅) (cons : ∀ (a : α) (s : Finset α) (h : a ∉ s), p s → p (cons a s h)) : ∀ s, p s \| ⟨s, nd⟩ => by induction s using Multiset.induction with \| empty => exact empty \| cons a s IH => rw [mk_cons nd] exact cons a _ _ (IH _) #align finset.cons_induction Finset.cons_induction @[elab_as_elim] theorem cons_induction_on {α : Type} {p : Finset α → Prop} (s : Finset α) (h₁ : p ∅) (h₂ : ∀ ⦃a : α⦄ {s : Finset α} (h : a ∉ s), p s → p (cons a s h)) : p s := cons_induction h₁ h₂ s #align finset.cons_induction_on Finset.cons_induction_on @[elab_as_elim] protected theorem induction {α : Type} {p : Finset α → Prop} [DecidableEq α] (empty : p ∅) (insert : ∀ ⦃a : α⦄ {s : Finset α}, a ∉ s → p s → p (insert a s)) : ∀ s, p s := cons_induction empty fun a s ha => (s.cons_eq_insert a ha).symm ▸ insert ha #align finset.induction Finset.induction /-- To prove a proposition about an arbitrary `Finset α`, it suffices to prove it for the empty `Finset`, and to show that if it holds for some `Finset α`, then it holds for the `Finset` obtained by inserting a new element. -/ @[elab_as_elim] protected theorem induction_on {α : Type} {p : Finset α → Prop} [DecidableEq α] (s : Finset α) (empty : p ∅) (insert : ∀ ⦃a : α⦄ {s : Finset α}, a ∉ s → p s → p (insert a s)) : p s := Finset.induction empty insert s #align finset.induction_on Finset.induction_on /-- To prove a proposition about `S : Finset α`, it suffices to prove it for the empty `Finset`, and to show that if it holds for some `Finset α ⊆ S`, then it holds for the `Finset` obtained by inserting a new element of `S`. -/ @[elab_as_elim] theorem induction_on' {α : Type} {p : Finset α → Prop} [DecidableEq α] (S : Finset α) (h₁ : p ∅) (h₂ : ∀ {a s}, a ∈ S → s ⊆ S → a ∉ s → p s → p (insert a s)) : p S := @Finset.induction_on α (fun T => T ⊆ S → p T) _ S (fun _ => h₁) (fun _ _ has hqs hs => let ⟨hS, sS⟩ := Finset.insert_subset_iff.1 hs h₂ hS sS has (hqs sS)) (Finset.Subset.refl S) #align finset.induction_on' Finset.induction_on' /-- To prove a proposition about a nonempty `s : Finset α`, it suffices to show it holds for all singletons and that if it holds for nonempty `t : Finset α`, then it also holds for the `Finset` obtained by inserting an element in `t`. -/ @[elab_as_elim] theorem Nonempty.cons_induction {α : Type} {p : ∀ s : Finset α, s.Nonempty → Prop} (singleton : ∀ a, p {a} (singleton_nonempty _)) (cons : ∀ a s (h : a ∉ s) (hs), p s hs → p (Finset.cons a s h) (nonempty_cons h)) {s : Finset α} (hs : s.Nonempty) : p s hs := by induction s using Finset.cons_induction with \| empty => exact (not_nonempty_empty hs).elim \| cons a t ha h => obtain rfl \| ht := t.eq_empty_or_nonempty · exact singleton a · exact cons a t ha ht (h ht) #align finset.nonempty.cons_induction Finset.Nonempty.cons_induction lemma Nonempty.exists_cons_eq (hs : s.Nonempty) : ∃ t a ha, cons a t ha = s := hs.cons_induction (fun a ↦ ⟨∅, a, _, cons_empty _⟩) fun _ _ _ _ _ ↦ ⟨_, _, _, rfl⟩ /-- Inserting an element to a finite set is equivalent to the option type. -/ def subtypeInsertEquivOption {t : Finset α} {x : α} (h : x ∉ t) : { i // i ∈ insert x t } ≃ Option { i // i ∈ t } where toFun y := if h : ↑y = x then none else some ⟨y, (mem_insert.mp y.2).resolve_left h⟩ invFun y := (y.elim ⟨x, mem_insert_self _ _⟩) fun z => ⟨z, mem_insert_of_mem z.2⟩ left_inv y := by by_cases h : ↑y = x · simp only [Subtype.ext_iff, h, Option.elim, dif_pos, Subtype.coe_mk] · simp only [h, Option.elim, dif_neg, not_false_iff, Subtype.coe_eta, Subtype.coe_mk] right_inv := by rintro (_ \| y) · simp only [Option.elim, dif_pos] · have : ↑y ≠ x := by rintro ⟨⟩ exact h y.2 simp only [this, Option.elim, Subtype.eta, dif_neg, not_false_iff, Subtype.coe_mk] #align finset.subtype_insert_equiv_option Finset.subtypeInsertEquivOption @[simp] theorem disjoint_insert_left : Disjoint (insert a s) t ↔ a ∉ t ∧ Disjoint s t := by simp only [disjoint_left, mem_insert, or_imp, forall_and, forall_eq] #align finset.disjoint_insert_left Finset.disjoint_insert_left @[simp] theorem disjoint_insert_right : Disjoint s (insert a t) ↔ a ∉ s ∧ Disjoint s t := disjoint_comm.trans <\| by rw [disjoint_insert_left, _root_.disjoint_comm] #align finset.disjoint_insert_right Finset.disjoint_insert_right end Insert /-! ### Lattice structure -/ section Lattice variable [DecidableEq α] {s s₁ s₂ t t₁ t₂ u v : Finset α} {a b : α} /-- `s ∪ t` is the set such that `a ∈ s ∪ t` iff `a ∈ s` or `a ∈ t`. -/ instance : Union (Finset α) := ⟨fun s t => ⟨_, t.2.ndunion s.1⟩⟩ /-- `s ∩ t` is the set such that `a ∈ s ∩ t` iff `a ∈ s` and `a ∈ t`. -/ instance : Inter (Finset α) := ⟨fun s t => ⟨_, s.2.ndinter t.1⟩⟩ instance : Lattice (Finset α) := { Finset.partialOrder with sup := (· ∪ ·) sup_le := fun _ _ _ hs ht _ ha => (mem_ndunion.1 ha).elim (fun h => hs h) fun h => ht h le_sup_left := fun _ _ _ h => mem_ndunion.2 <\| Or.inl h le_sup_right := fun _ _ _ h => mem_ndunion.2 <\| Or.inr h inf := (· ∩ ·) le_inf := fun _ _ _ ht hu _ h => mem_ndinter.2 ⟨ht h, hu h⟩ inf_le_left := fun _ _ _ h => (mem_ndinter.1 h).1 inf_le_right := fun _ _ _ h => (mem_ndinter.1 h).2 } @[simp] theorem sup_eq_union : (Sup.sup : Finset α → Finset α → Finset α) = Union.union := rfl #align finset.sup_eq_union Finset.sup_eq_union @[simp] theorem inf_eq_inter : (Inf.inf : Finset α → Finset α → Finset α) = Inter.inter := rfl #align finset.inf_eq_inter Finset.inf_eq_inter theorem disjoint_iff_inter_eq_empty : Disjoint s t ↔ s ∩ t = ∅ := disjoint_iff #align finset.disjoint_iff_inter_eq_empty Finset.disjoint_iff_inter_eq_empty instance decidableDisjoint (U V : Finset α) : Decidable (Disjoint U V) := decidable_of_iff _ disjoint_left.symm #align finset.decidable_disjoint Finset.decidableDisjoint /-! #### union -/ theorem union_val_nd (s t : Finset α) : (s ∪ t).1 = ndunion s.1 t.1 := rfl #align finset.union_val_nd Finset.union_val_nd @[simp] theorem union_val (s t : Finset α) : (s ∪ t).1 = s.1 ∪ t.1 := ndunion_eq_union s.2 #align finset.union_val Finset.union_val @[simp] theorem mem_union : a ∈ s ∪ t ↔ a ∈ s ∨ a ∈ t := mem_ndunion #align finset.mem_union Finset.mem_union @[simp] theorem disjUnion_eq_union (s t h) : @disjUnion α s t h = s ∪ t := ext fun a => by simp #align finset.disj_union_eq_union Finset.disjUnion_eq_union theorem mem_union_left (t : Finset α) (h : a ∈ s) : a ∈ s ∪ t := mem_union.2 <\| Or.inl h #align finset.mem_union_left Finset.mem_union_left theorem mem_union_right (s : Finset α) (h : a ∈ t) : a ∈ s ∪ t := mem_union.2 <\| Or.inr h #align finset.mem_union_right Finset.mem_union_right theorem forall_mem_union {p : α → Prop} : (∀ a ∈ s ∪ t, p a) ↔ (∀ a ∈ s, p a) ∧ ∀ a ∈ t, p a := ⟨fun h => ⟨fun a => h a ∘ mem_union_left _, fun b => h b ∘ mem_union_right _⟩, fun h _ab hab => (mem_union.mp hab).elim (h.1 _) (h.2 _)⟩ #align finset.forall_mem_union Finset.forall_mem_union theorem not_mem_union : a ∉ s ∪ t ↔ a ∉ s ∧ a ∉ t := by rw [mem_union, not_or] #align finset.not_mem_union Finset.not_mem_union @[simp, norm_cast] theorem coe_union (s₁ s₂ : Finset α) : ↑(s₁ ∪ s₂) = (s₁ ∪ s₂ : Set α) := Set.ext fun _ => mem_union #align finset.coe_union Finset.coe_union theorem union_subset (hs : s ⊆ u) : t ⊆ u → s ∪ t ⊆ u := sup_le <\| le_iff_subset.2 hs #align finset.union_subset Finset.union_subset theorem subset_union_left {s₁ s₂ : Finset α} : s₁ ⊆ s₁ ∪ s₂ := fun _x => mem_union_left _ #align finset.subset_union_left Finset.subset_union_left theorem subset_union_right {s₁ s₂ : Finset α} : s₂ ⊆ s₁ ∪ s₂ := fun _x => mem_union_right _ #align finset.subset_union_right Finset.subset_union_right @[gcongr] theorem union_subset_union (hsu : s ⊆ u) (htv : t ⊆ v) : s ∪ t ⊆ u ∪ v := sup_le_sup (le_iff_subset.2 hsu) htv #align finset.union_subset_union Finset.union_subset_union @[gcongr] theorem union_subset_union_left (h : s₁ ⊆ s₂) : s₁ ∪ t ⊆ s₂ ∪ t := union_subset_union h Subset.rfl #align finset.union_subset_union_left Finset.union_subset_union_left @[gcongr] theorem union_subset_union_right (h : t₁ ⊆ t₂) : s ∪ t₁ ⊆ s ∪ t₂ := union_subset_union Subset.rfl h #align finset.union_subset_union_right Finset.union_subset_union_right theorem union_comm (s₁ s₂ : Finset α) : s₁ ∪ s₂ = s₂ ∪ s₁ := sup_comm _ _ #align finset.union_comm Finset.union_comm instance : Std.Commutative (α := Finset α) (· ∪ ·) := ⟨union_comm⟩ @[simp] theorem union_assoc (s₁ s₂ s₃ : Finset α) : s₁ ∪ s₂ ∪ s₃ = s₁ ∪ (s₂ ∪ s₃) := sup_assoc _ _ _ #align finset.union_assoc Finset.union_assoc instance : Std.Associative (α := Finset α) (· ∪ ·) := ⟨union_assoc⟩ @[simp] theorem union_idempotent (s : Finset α) : s ∪ s = s := sup_idem _ #align finset.union_idempotent Finset.union_idempotent instance : Std.IdempotentOp (α := Finset α) (· ∪ ·) := ⟨union_idempotent⟩ theorem union_subset_left (h : s ∪ t ⊆ u) : s ⊆ u := subset_union_left.trans h #align finset.union_subset_left Finset.union_subset_left theorem union_subset_right {s t u : Finset α} (h : s ∪ t ⊆ u) : t ⊆ u := Subset.trans subset_union_right h #align finset.union_subset_right Finset.union_subset_right theorem union_left_comm (s t u : Finset α) : s ∪ (t ∪ u) = t ∪ (s ∪ u) := ext fun _ => by simp only [mem_union, or_left_comm] #align finset.union_left_comm Finset.union_left_comm theorem union_right_comm (s t u : Finset α) : s ∪ t ∪ u = s ∪ u ∪ t := ext fun x => by simp only [mem_union, or_assoc, @or_comm (x ∈ t)] #align finset.union_right_comm Finset.union_right_comm theorem union_self (s : Finset α) : s ∪ s = s := union_idempotent s #align finset.union_self Finset.union_self @[simp] theorem union_empty (s : Finset α) : s ∪ ∅ = s := ext fun x => mem_union.trans <\| by simp #align finset.union_empty Finset.union_empty @[simp] theorem empty_union (s : Finset α) : ∅ ∪ s = s := ext fun x => mem_union.trans <\| by simp #align finset.empty_union Finset.empty_union @[aesop unsafe apply (rule_sets := [finsetNonempty])] theorem Nonempty.inl {s t : Finset α} (h : s.Nonempty) : (s ∪ t).Nonempty := h.mono subset_union_left @[aesop unsafe apply (rule_sets := [finsetNonempty])] theorem Nonempty.inr {s t : Finset α} (h : t.Nonempty) : (s ∪ t).Nonempty := h.mono subset_union_right theorem insert_eq (a : α) (s : Finset α) : insert a s = {a} ∪ s := rfl #align finset.insert_eq Finset.insert_eq @[simp] theorem insert_union (a : α) (s t : Finset α) : insert a s ∪ t = insert a (s ∪ t) := by simp only [insert_eq, union_assoc] #align finset.insert_union Finset.insert_union @[simp] theorem union_insert (a : α) (s t : Finset α) : s ∪ insert a t = insert a (s ∪ t) := by simp only [insert_eq, union_left_comm] #align finset.union_insert Finset.union_insert theorem insert_union_distrib (a : α) (s t : Finset α) : insert a (s ∪ t) = insert a s ∪ insert a t := by simp only [insert_union, union_insert, insert_idem] #align finset.insert_union_distrib Finset.insert_union_distrib @[simp] lemma union_eq_left : s ∪ t = s ↔ t ⊆ s := sup_eq_left #align finset.union_eq_left_iff_subset Finset.union_eq_left @[simp] lemma left_eq_union : s = s ∪ t ↔ t ⊆ s := by rw [eq_comm, union_eq_left] #align finset.left_eq_union_iff_subset Finset.left_eq_union @[simp] lemma union_eq_right : s ∪ t = t ↔ s ⊆ t := sup_eq_right #align finset.union_eq_right_iff_subset Finset.union_eq_right @[simp] lemma right_eq_union : s = t ∪ s ↔ t ⊆ s := by rw [eq_comm, union_eq_right] #align finset.right_eq_union_iff_subset Finset.right_eq_union -- Porting note: replaced `⊔` in RHS theorem union_congr_left (ht : t ⊆ s ∪ u) (hu : u ⊆ s ∪ t) : s ∪ t = s ∪ u := sup_congr_left ht hu #align finset.union_congr_left Finset.union_congr_left theorem union_congr_right (hs : s ⊆ t ∪ u) (ht : t ⊆ s ∪ u) : s ∪ u = t ∪ u := sup_congr_right hs ht #align finset.union_congr_right Finset.union_congr_right theorem union_eq_union_iff_left : s ∪ t = s ∪ u ↔ t ⊆ s ∪ u ∧ u ⊆ s ∪ t := sup_eq_sup_iff_left #align finset.union_eq_union_iff_left Finset.union_eq_union_iff_left theorem union_eq_union_iff_right : s ∪ u = t ∪ u ↔ s ⊆ t ∪ u ∧ t ⊆ s ∪ u := sup_eq_sup_iff_right #align finset.union_eq_union_iff_right Finset.union_eq_union_iff_right @[simp] theorem disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := by simp only [disjoint_left, mem_union, or_imp, forall_and] #align finset.disjoint_union_left Finset.disjoint_union_left @[simp] theorem disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := by simp only [disjoint_right, mem_union, or_imp, forall_and] #align finset.disjoint_union_right Finset.disjoint_union_right /-- To prove a relation on pairs of `Finset X`, it suffices to show that it is * symmetric, * it holds when one of the `Finset`s is empty, * it holds for pairs of singletons, * if it holds for `[a, c]` and for `[b, c]`, then it holds for `[a ∪ b, c]`. -/ theorem induction_on_union (P : Finset α → Finset α → Prop) (symm : ∀ {a b}, P a b → P b a) (empty_right : ∀ {a}, P a ∅) (singletons : ∀ {a b}, P {a} {b}) (union_of : ∀ {a b c}, P a c → P b c → P (a ∪ b) c) : ∀ a b, P a b := by intro a b refine Finset.induction_on b empty_right fun x s _xs hi => symm ?_ rw [Finset.insert_eq] apply union_of _ (symm hi) refine Finset.induction_on a empty_right fun a t _ta hi => symm ?_ rw [Finset.insert_eq] exact union_of singletons (symm hi) #align finset.induction_on_union Finset.induction_on_union /-! #### inter -/ theorem inter_val_nd (s₁ s₂ : Finset α) : (s₁ ∩ s₂).1 = ndinter s₁.1 s₂.1 := rfl #align finset.inter_val_nd Finset.inter_val_nd @[simp] theorem inter_val (s₁ s₂ : Finset α) : (s₁ ∩ s₂).1 = s₁.1 ∩ s₂.1 := ndinter_eq_inter s₁.2 #align finset.inter_val Finset.inter_val @[simp] theorem mem_inter {a : α} {s₁ s₂ : Finset α} : a ∈ s₁ ∩ s₂ ↔ a ∈ s₁ ∧ a ∈ s₂ := mem_ndinter #align finset.mem_inter Finset.mem_inter theorem mem_of_mem_inter_left {a : α} {s₁ s₂ : Finset α} (h : a ∈ s₁ ∩ s₂) : a ∈ s₁ := (mem_inter.1 h).1 #align finset.mem_of_mem_inter_left Finset.mem_of_mem_inter_left theorem mem_of_mem_inter_right {a : α} {s₁ s₂ : Finset α} (h : a ∈ s₁ ∩ s₂) : a ∈ s₂ := (mem_inter.1 h).2 #align finset.mem_of_mem_inter_right Finset.mem_of_mem_inter_right theorem mem_inter_of_mem {a : α} {s₁ s₂ : Finset α} : a ∈ s₁ → a ∈ s₂ → a ∈ s₁ ∩ s₂ := and_imp.1 mem_inter.2 #align finset.mem_inter_of_mem Finset.mem_inter_of_mem theorem inter_subset_left {s₁ s₂ : Finset α} : s₁ ∩ s₂ ⊆ s₁ := fun _a => mem_of_mem_inter_left #align finset.inter_subset_left Finset.inter_subset_left theorem inter_subset_right {s₁ s₂ : Finset α} : s₁ ∩ s₂ ⊆ s₂ := fun _a => mem_of_mem_inter_right #align finset.inter_subset_right Finset.inter_subset_right theorem subset_inter {s₁ s₂ u : Finset α} : s₁ ⊆ s₂ → s₁ ⊆ u → s₁ ⊆ s₂ ∩ u := by simp (config := { contextual := true }) [subset_iff, mem_inter] #align finset.subset_inter Finset.subset_inter @[simp, norm_cast] theorem coe_inter (s₁ s₂ : Finset α) : ↑(s₁ ∩ s₂) = (s₁ ∩ s₂ : Set α) := Set.ext fun _ => mem_inter #align finset.coe_inter Finset.coe_inter @[simp] theorem union_inter_cancel_left {s t : Finset α} : (s ∪ t) ∩ s = s := by rw [← coe_inj, coe_inter, coe_union, Set.union_inter_cancel_left] #align finset.union_inter_cancel_left Finset.union_inter_cancel_left @[simp] theorem union_inter_cancel_right {s t : Finset α} : (s ∪ t) ∩ t = t := by rw [← coe_inj, coe_inter, coe_union, Set.union_inter_cancel_right] #align finset.union_inter_cancel_right Finset.union_inter_cancel_right theorem inter_comm (s₁ s₂ : Finset α) : s₁ ∩ s₂ = s₂ ∩ s₁ := ext fun _ => by simp only [mem_inter, and_comm] #align finset.inter_comm Finset.inter_comm @[simp] theorem inter_assoc (s₁ s₂ s₃ : Finset α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ (s₂ ∩ s₃) := ext fun _ => by simp only [mem_inter, and_assoc] #align finset.inter_assoc Finset.inter_assoc theorem inter_left_comm (s₁ s₂ s₃ : Finset α) : s₁ ∩ (s₂ ∩ s₃) = s₂ ∩ (s₁ ∩ s₃) := ext fun _ => by simp only [mem_inter, and_left_comm] #align finset.inter_left_comm Finset.inter_left_comm theorem inter_right_comm (s₁ s₂ s₃ : Finset α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ s₃ ∩ s₂ := ext fun _ => by simp only [mem_inter, and_right_comm] #align finset.inter_right_comm Finset.inter_right_comm @[simp] theorem inter_self (s : Finset α) : s ∩ s = s := ext fun _ => mem_inter.trans <\| and_self_iff #align finset.inter_self Finset.inter_self @[simp] theorem inter_empty (s : Finset α) : s ∩ ∅ = ∅ := ext fun _ => mem_inter.trans <\| by simp #align finset.inter_empty Finset.inter_empty @[simp] theorem empty_inter (s : Finset α) : ∅ ∩ s = ∅ := ext fun _ => mem_inter.trans <\| by simp #align finset.empty_inter Finset.empty_inter @[simp] theorem inter_union_self (s t : Finset α) : s ∩ (t ∪ s) = s := by rw [inter_comm, union_inter_cancel_right] #align finset.inter_union_self Finset.inter_union_self @[simp] theorem insert_inter_of_mem {s₁ s₂ : Finset α} {a : α} (h : a ∈ s₂) : insert a s₁ ∩ s₂ = insert a (s₁ ∩ s₂) := ext fun x => by have : x = a ∨ x ∈ s₂ ↔ x ∈ s₂ := or_iff_right_of_imp <\| by rintro rfl; exact h simp only [mem_inter, mem_insert, or_and_left, this] #align finset.insert_inter_of_mem Finset.insert_inter_of_mem @[simp] theorem inter_insert_of_mem {s₁ s₂ : Finset α} {a : α} (h : a ∈ s₁) : s₁ ∩ insert a s₂ = insert a (s₁ ∩ s₂) := by rw [inter_comm, insert_inter_of_mem h, inter_comm] #align finset.inter_insert_of_mem Finset.inter_insert_of_mem @[simp] theorem insert_inter_of_not_mem {s₁ s₂ : Finset α} {a : α} (h : a ∉ s₂) : insert a s₁ ∩ s₂ = s₁ ∩ s₂ := ext fun x => by have : ¬(x = a ∧ x ∈ s₂) := by rintro ⟨rfl, H⟩; exact h H simp only [mem_inter, mem_insert, or_and_right, this, false_or_iff] #align finset.insert_inter_of_not_mem Finset.insert_inter_of_not_mem @[simp] theorem inter_insert_of_not_mem {s₁ s₂ : Finset α} {a : α} (h : a ∉ s₁) : s₁ ∩ insert a s₂ = s₁ ∩ s₂ := by rw [inter_comm, insert_inter_of_not_mem h, inter_comm] #align finset.inter_insert_of_not_mem Finset.inter_insert_of_not_mem @[simp] theorem singleton_inter_of_mem {a : α} {s : Finset α} (H : a ∈ s) : {a} ∩ s = {a} := show insert a ∅ ∩ s = insert a ∅ by rw [insert_inter_of_mem H, empty_inter] #align finset.singleton_inter_of_mem Finset.singleton_inter_of_mem @[simp] theorem singleton_inter_of_not_mem {a : α} {s : Finset α} (H : a ∉ s) : {a} ∩ s = ∅ := eq_empty_of_forall_not_mem <\| by simp only [mem_inter, mem_singleton]; rintro x ⟨rfl, h⟩; exact H h #align finset.singleton_inter_of_not_mem Finset.singleton_inter_of_not_mem @[simp] theorem inter_singleton_of_mem {a : α} {s : Finset α} (h : a ∈ s) : s ∩ {a} = {a} := by rw [inter_comm, singleton_inter_of_mem h] #align finset.inter_singleton_of_mem Finset.inter_singleton_of_mem @[simp] theorem inter_singleton_of_not_mem {a : α} {s : Finset α} (h : a ∉ s) : s ∩ {a} = ∅ := by rw [inter_comm, singleton_inter_of_not_mem h] #align finset.inter_singleton_of_not_mem Finset.inter_singleton_of_not_mem @[mono, gcongr] theorem inter_subset_inter {x y s t : Finset α} (h : x ⊆ y) (h' : s ⊆ t) : x ∩ s ⊆ y ∩ t := by intro a a_in rw [Finset.mem_inter] at a_in ⊢ exact ⟨h a_in.1, h' a_in.2⟩ #align finset.inter_subset_inter Finset.inter_subset_inter @[gcongr] theorem inter_subset_inter_left (h : t ⊆ u) : s ∩ t ⊆ s ∩ u := inter_subset_inter Subset.rfl h #align finset.inter_subset_inter_left Finset.inter_subset_inter_left @[gcongr] theorem inter_subset_inter_right (h : s ⊆ t) : s ∩ u ⊆ t ∩ u := inter_subset_inter h Subset.rfl #align finset.inter_subset_inter_right Finset.inter_subset_inter_right theorem inter_subset_union : s ∩ t ⊆ s ∪ t := le_iff_subset.1 inf_le_sup #align finset.inter_subset_union Finset.inter_subset_union instance : DistribLattice (Finset α) := { le_sup_inf := fun a b c => by simp (config := { contextual := true }) only [sup_eq_union, inf_eq_inter, le_eq_subset, subset_iff, mem_inter, mem_union, and_imp, or_imp, true_or_iff, imp_true_iff, true_and_iff, or_true_iff] } @[simp] theorem union_left_idem (s t : Finset α) : s ∪ (s ∪ t) = s ∪ t := sup_left_idem _ _ #align finset.union_left_idem Finset.union_left_idem -- Porting note (#10618): @[simp] can prove this theorem union_right_idem (s t : Finset α) : s ∪ t ∪ t = s ∪ t := sup_right_idem _ _ #align finset.union_right_idem Finset.union_right_idem @[simp] theorem inter_left_idem (s t : Finset α) : s ∩ (s ∩ t) = s ∩ t := inf_left_idem _ _ #align finset.inter_left_idem Finset.inter_left_idem -- Porting note (#10618): @[simp] can prove this theorem inter_right_idem (s t : Finset α) : s ∩ t ∩ t = s ∩ t := inf_right_idem _ _ #align finset.inter_right_idem Finset.inter_right_idem theorem inter_union_distrib_left (s t u : Finset α) : s ∩ (t ∪ u) = s ∩ t ∪ s ∩ u := inf_sup_left _ _ _ #align finset.inter_distrib_left Finset.inter_union_distrib_left theorem union_inter_distrib_right (s t u : Finset α) : (s ∪ t) ∩ u = s ∩ u ∪ t ∩ u := inf_sup_right _ _ _ #align finset.inter_distrib_right Finset.union_inter_distrib_right theorem union_inter_distrib_left (s t u : Finset α) : s ∪ t ∩ u = (s ∪ t) ∩ (s ∪ u) := sup_inf_left _ _ _ #align finset.union_distrib_left Finset.union_inter_distrib_left theorem inter_union_distrib_right (s t u : Finset α) : s ∩ t ∪ u = (s ∪ u) ∩ (t ∪ u) := sup_inf_right _ _ _ #align finset.union_distrib_right Finset.inter_union_distrib_right -- 2024-03-22 @[deprecated] alias inter_distrib_left := inter_union_distrib_left @[deprecated] alias inter_distrib_right := union_inter_distrib_right @[deprecated] alias union_distrib_left := union_inter_distrib_left @[deprecated] alias union_distrib_right := inter_union_distrib_right theorem union_union_distrib_left (s t u : Finset α) : s ∪ (t ∪ u) = s ∪ t ∪ (s ∪ u) := sup_sup_distrib_left _ _ _ #align finset.union_union_distrib_left Finset.union_union_distrib_left theorem union_union_distrib_right (s t u : Finset α) : s ∪ t ∪ u = s ∪ u ∪ (t ∪ u) := sup_sup_distrib_right _ _ _ #align finset.union_union_distrib_right Finset.union_union_distrib_right theorem inter_inter_distrib_left (s t u : Finset α) : s ∩ (t ∩ u) = s ∩ t ∩ (s ∩ u) := inf_inf_distrib_left _ _ _ #align finset.inter_inter_distrib_left Finset.inter_inter_distrib_left theorem inter_inter_distrib_right (s t u : Finset α) : s ∩ t ∩ u = s ∩ u ∩ (t ∩ u) := inf_inf_distrib_right _ _ _ #align finset.inter_inter_distrib_right Finset.inter_inter_distrib_right theorem union_union_union_comm (s t u v : Finset α) : s ∪ t ∪ (u ∪ v) = s ∪ u ∪ (t ∪ v) := sup_sup_sup_comm _ _ _ _ #align finset.union_union_union_comm Finset.union_union_union_comm theorem inter_inter_inter_comm (s t u v : Finset α) : s ∩ t ∩ (u ∩ v) = s ∩ u ∩ (t ∩ v) := inf_inf_inf_comm _ _ _ _ #align finset.inter_inter_inter_comm Finset.inter_inter_inter_comm lemma union_eq_empty : s ∪ t = ∅ ↔ s = ∅ ∧ t = ∅ := sup_eq_bot_iff #align finset.union_eq_empty_iff Finset.union_eq_empty theorem union_subset_iff : s ∪ t ⊆ u ↔ s ⊆ u ∧ t ⊆ u := (sup_le_iff : s ⊔ t ≤ u ↔ s ≤ u ∧ t ≤ u) #align finset.union_subset_iff Finset.union_subset_iff theorem subset_inter_iff : s ⊆ t ∩ u ↔ s ⊆ t ∧ s ⊆ u := (le_inf_iff : s ≤ t ⊓ u ↔ s ≤ t ∧ s ≤ u) #align finset.subset_inter_iff Finset.subset_inter_iff @[simp] lemma inter_eq_left : s ∩ t = s ↔ s ⊆ t := inf_eq_left #align finset.inter_eq_left_iff_subset_iff_subset Finset.inter_eq_left @[simp] lemma inter_eq_right : t ∩ s = s ↔ s ⊆ t := inf_eq_right #align finset.inter_eq_right_iff_subset Finset.inter_eq_right theorem inter_congr_left (ht : s ∩ u ⊆ t) (hu : s ∩ t ⊆ u) : s ∩ t = s ∩ u := inf_congr_left ht hu #align finset.inter_congr_left Finset.inter_congr_left theorem inter_congr_right (hs : t ∩ u ⊆ s) (ht : s ∩ u ⊆ t) : s ∩ u = t ∩ u := inf_congr_right hs ht #align finset.inter_congr_right Finset.inter_congr_right theorem inter_eq_inter_iff_left : s ∩ t = s ∩ u ↔ s ∩ u ⊆ t ∧ s ∩ t ⊆ u := inf_eq_inf_iff_left #align finset.inter_eq_inter_iff_left Finset.inter_eq_inter_iff_left theorem inter_eq_inter_iff_right : s ∩ u = t ∩ u ↔ t ∩ u ⊆ s ∧ s ∩ u ⊆ t := inf_eq_inf_iff_right #align finset.inter_eq_inter_iff_right Finset.inter_eq_inter_iff_right theorem ite_subset_union (s s' : Finset α) (P : Prop) [Decidable P] : ite P s s' ⊆ s ∪ s' := ite_le_sup s s' P #align finset.ite_subset_union Finset.ite_subset_union theorem inter_subset_ite (s s' : Finset α) (P : Prop) [Decidable P] : s ∩ s' ⊆ ite P s s' := inf_le_ite s s' P #align finset.inter_subset_ite Finset.inter_subset_ite theorem not_disjoint_iff_nonempty_inter : ¬Disjoint s t ↔ (s ∩ t).Nonempty := not_disjoint_iff.trans <\| by simp [Finset.Nonempty] #align finset.not_disjoint_iff_nonempty_inter Finset.not_disjoint_iff_nonempty_inter alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter #align finset.nonempty.not_disjoint Finset.Nonempty.not_disjoint theorem disjoint_or_nonempty_inter (s t : Finset α) : Disjoint s t ∨ (s ∩ t).Nonempty := by rw [← not_disjoint_iff_nonempty_inter] exact em _ #align finset.disjoint_or_nonempty_inter Finset.disjoint_or_nonempty_inter end Lattice instance isDirected_le : IsDirected (Finset α) (· ≤ ·) := by classical infer_instance instance isDirected_subset : IsDirected (Finset α) (· ⊆ ·) := isDirected_le /-! ### erase -/ section Erase variable [DecidableEq α] {s t u v : Finset α} {a b : α} /-- `erase s a` is the set `s - {a}`, that is, the elements of `s` which are not equal to `a`. -/ def erase (s : Finset α) (a : α) : Finset α := ⟨_, s.2.erase a⟩ #align finset.erase Finset.erase @[simp] theorem erase_val (s : Finset α) (a : α) : (erase s a).1 = s.1.erase a := rfl #align finset.erase_val Finset.erase_val @[simp] theorem mem_erase {a b : α} {s : Finset α} : a ∈ erase s b ↔ a ≠ b ∧ a ∈ s := s.2.mem_erase_iff #align finset.mem_erase Finset.mem_erase theorem not_mem_erase (a : α) (s : Finset α) : a ∉ erase s a := s.2.not_mem_erase #align finset.not_mem_erase Finset.not_mem_erase -- While this can be solved by `simp`, this lemma is eligible for `dsimp` @[nolint simpNF, simp] theorem erase_empty (a : α) : erase ∅ a = ∅ := rfl #align finset.erase_empty Finset.erase_empty protected lemma Nontrivial.erase_nonempty (hs : s.Nontrivial) : (s.erase a).Nonempty := (hs.exists_ne a).imp $ by aesop @[simp] lemma erase_nonempty (ha : a ∈ s) : (s.erase a).Nonempty ↔ s.Nontrivial := by simp only [Finset.Nonempty, mem_erase, and_comm (b := _ ∈ _)] refine ⟨?_, fun hs ↦ hs.exists_ne a⟩ rintro ⟨b, hb, hba⟩ exact ⟨_, hb, _, ha, hba⟩ @[simp] theorem erase_singleton (a : α) : ({a} : Finset α).erase a = ∅ := by ext x simp #align finset.erase_singleton Finset.erase_singleton theorem ne_of_mem_erase : b ∈ erase s a → b ≠ a := fun h => (mem_erase.1 h).1 #align finset.ne_of_mem_erase Finset.ne_of_mem_erase theorem mem_of_mem_erase : b ∈ erase s a → b ∈ s := Multiset.mem_of_mem_erase #align finset.mem_of_mem_erase Finset.mem_of_mem_erase theorem mem_erase_of_ne_of_mem : a ≠ b → a ∈ s → a ∈ erase s b := by simp only [mem_erase]; exact And.intro #align finset.mem_erase_of_ne_of_mem Finset.mem_erase_of_ne_of_mem /-- An element of `s` that is not an element of `erase s a` must be`a`. -/ theorem eq_of_mem_of_not_mem_erase (hs : b ∈ s) (hsa : b ∉ s.erase a) : b = a := by rw [mem_erase, not_and] at hsa exact not_imp_not.mp hsa hs #align finset.eq_of_mem_of_not_mem_erase Finset.eq_of_mem_of_not_mem_erase @[simp] theorem erase_eq_of_not_mem {a : α} {s : Finset α} (h : a ∉ s) : erase s a = s := eq_of_veq <\| erase_of_not_mem h #align finset.erase_eq_of_not_mem Finset.erase_eq_of_not_mem @[simp] theorem erase_eq_self : s.erase a = s ↔ a ∉ s := ⟨fun h => h ▸ not_mem_erase _ _, erase_eq_of_not_mem⟩ #align finset.erase_eq_self Finset.erase_eq_self @[simp] theorem erase_insert_eq_erase (s : Finset α) (a : α) : (insert a s).erase a = s.erase a := ext fun x => by simp (config := { contextual := true }) only [mem_erase, mem_insert, and_congr_right_iff, false_or_iff, iff_self_iff, imp_true_iff] #align finset.erase_insert_eq_erase Finset.erase_insert_eq_erase theorem erase_insert {a : α} {s : Finset α} (h : a ∉ s) : erase (insert a s) a = s := by rw [erase_insert_eq_erase, erase_eq_of_not_mem h] #align finset.erase_insert Finset.erase_insert theorem erase_insert_of_ne {a b : α} {s : Finset α} (h : a ≠ b) : erase (insert a s) b = insert a (erase s b) := ext fun x => by have : x ≠ b ∧ x = a ↔ x = a := and_iff_right_of_imp fun hx => hx.symm ▸ h simp only [mem_erase, mem_insert, and_or_left, this] #align finset.erase_insert_of_ne Finset.erase_insert_of_ne theorem erase_cons_of_ne {a b : α} {s : Finset α} (ha : a ∉ s) (hb : a ≠ b) : erase (cons a s ha) b = cons a (erase s b) fun h => ha <\| erase_subset _ _ h := by simp only [cons_eq_insert, erase_insert_of_ne hb] #align finset.erase_cons_of_ne Finset.erase_cons_of_ne @[simp] theorem insert_erase (h : a ∈ s) : insert a (erase s a) = s := ext fun x => by simp only [mem_insert, mem_erase, or_and_left, dec_em, true_and_iff] apply or_iff_right_of_imp rintro rfl exact h #align finset.insert_erase Finset.insert_erase lemma erase_eq_iff_eq_insert (hs : a ∈ s) (ht : a ∉ t) : erase s a = t ↔ s = insert a t := by aesop lemma insert_erase_invOn : Set.InvOn (insert a) (fun s ↦ erase s a) {s : Finset α \| a ∈ s} {s : Finset α \| a ∉ s} := ⟨fun _s ↦ insert_erase, fun _s ↦ erase_insert⟩ theorem erase_subset_erase (a : α) {s t : Finset α} (h : s ⊆ t) : erase s a ⊆ erase t a := val_le_iff.1 <\| erase_le_erase _ <\| val_le_iff.2 h #align finset.erase_subset_erase Finset.erase_subset_erase theorem erase_subset (a : α) (s : Finset α) : erase s a ⊆ s := Multiset.erase_subset _ _ #align finset.erase_subset Finset.erase_subset theorem subset_erase {a : α} {s t : Finset α} : s ⊆ t.erase a ↔ s ⊆ t ∧ a ∉ s := ⟨fun h => ⟨h.trans (erase_subset _ _), fun ha => not_mem_erase _ _ (h ha)⟩, fun h _b hb => mem_erase.2 ⟨ne_of_mem_of_not_mem hb h.2, h.1 hb⟩⟩ #align finset.subset_erase Finset.subset_erase @[simp, norm_cast] theorem coe_erase (a : α) (s : Finset α) : ↑(erase s a) = (s \ {a} : Set α) := Set.ext fun _ => mem_erase.trans <\| by rw [and_comm, Set.mem_diff, Set.mem_singleton_iff, mem_coe] #align finset.coe_erase Finset.coe_erase theorem erase_ssubset {a : α} {s : Finset α} (h : a ∈ s) : s.erase a ⊂ s := calc s.erase a ⊂ insert a (s.erase a) := ssubset_insert <\| not_mem_erase _ _ _ = _ := insert_erase h #align finset.erase_ssubset Finset.erase_ssubset theorem ssubset_iff_exists_subset_erase {s t : Finset α} : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t.erase a := by refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_subset_of_ssubset h <\| erase_ssubset ha⟩ obtain ⟨a, ht, hs⟩ := not_subset.1 h.2 exact ⟨a, ht, subset_erase.2 ⟨h.1, hs⟩⟩ #align finset.ssubset_iff_exists_subset_erase Finset.ssubset_iff_exists_subset_erase theorem erase_ssubset_insert (s : Finset α) (a : α) : s.erase a ⊂ insert a s := ssubset_iff_exists_subset_erase.2 ⟨a, mem_insert_self _ _, erase_subset_erase _ <\| subset_insert _ _⟩ #align finset.erase_ssubset_insert Finset.erase_ssubset_insert theorem erase_ne_self : s.erase a ≠ s ↔ a ∈ s := erase_eq_self.not_left #align finset.erase_ne_self Finset.erase_ne_self theorem erase_cons {s : Finset α} {a : α} (h : a ∉ s) : (s.cons a h).erase a = s := by rw [cons_eq_insert, erase_insert_eq_erase, erase_eq_of_not_mem h] #align finset.erase_cons Finset.erase_cons theorem erase_idem {a : α} {s : Finset α} : erase (erase s a) a = erase s a := by simp #align finset.erase_idem Finset.erase_idem theorem erase_right_comm {a b : α} {s : Finset α} : erase (erase s a) b = erase (erase s b) a := by ext x simp only [mem_erase, ← and_assoc] rw [@and_comm (x ≠ a)] #align finset.erase_right_comm Finset.erase_right_comm theorem subset_insert_iff {a : α} {s t : Finset α} : s ⊆ insert a t ↔ erase s a ⊆ t := by simp only [subset_iff, or_iff_not_imp_left, mem_erase, mem_insert, and_imp] exact forall_congr' fun x => forall_swap #align finset.subset_insert_iff Finset.subset_insert_iff theorem erase_insert_subset (a : α) (s : Finset α) : erase (insert a s) a ⊆ s := subset_insert_iff.1 <\| Subset.rfl #align finset.erase_insert_subset Finset.erase_insert_subset theorem insert_erase_subset (a : α) (s : Finset α) : s ⊆ insert a (erase s a) := subset_insert_iff.2 <\| Subset.rfl #align finset.insert_erase_subset Finset.insert_erase_subset theorem subset_insert_iff_of_not_mem (h : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := by rw [subset_insert_iff, erase_eq_of_not_mem h] #align finset.subset_insert_iff_of_not_mem Finset.subset_insert_iff_of_not_mem theorem erase_subset_iff_of_mem (h : a ∈ t) : s.erase a ⊆ t ↔ s ⊆ t := by rw [← subset_insert_iff, insert_eq_of_mem h] #align finset.erase_subset_iff_of_mem Finset.erase_subset_iff_of_mem theorem erase_inj {x y : α} (s : Finset α) (hx : x ∈ s) : s.erase x = s.erase y ↔ x = y := by refine ⟨fun h => eq_of_mem_of_not_mem_erase hx ?_, congr_arg _⟩ rw [← h] simp #align finset.erase_inj Finset.erase_inj theorem erase_injOn (s : Finset α) : Set.InjOn s.erase s := fun _ _ _ _ => (erase_inj s ‹_›).mp #align finset.erase_inj_on Finset.erase_injOn theorem erase_injOn' (a : α) : { s : Finset α \| a ∈ s }.InjOn fun s => erase s a := fun s hs t ht (h : s.erase a = _) => by rw [← insert_erase hs, ← insert_erase ht, h] #align finset.erase_inj_on' Finset.erase_injOn' end Erase lemma Nontrivial.exists_cons_eq {s : Finset α} (hs : s.Nontrivial) : ∃ t a ha b hb hab, (cons b t hb).cons a (mem_cons.not.2 <\| not_or_intro hab ha) = s := by classical obtain ⟨a, ha, b, hb, hab⟩ := hs have : b ∈ s.erase a := mem_erase.2 ⟨hab.symm, hb⟩ refine ⟨(s.erase a).erase b, a, ?_, b, ?_, ?_, ?_⟩ <;> simp [insert_erase this, insert_erase ha, ] /-! ### sdiff -/ section Sdiff variable [DecidableEq α] {s t u v : Finset α} {a b : α} /-- `s \ t` is the set consisting of the elements of `s` that are not in `t`. -/ instance : SDiff (Finset α) := ⟨fun s₁ s₂ => ⟨s₁.1 - s₂.1, nodup_of_le tsub_le_self s₁.2⟩⟩ @[simp] theorem sdiff_val (s₁ s₂ : Finset α) : (s₁ \ s₂).val = s₁.val - s₂.val := rfl #align finset.sdiff_val Finset.sdiff_val @[simp] theorem mem_sdiff : a ∈ s \ t ↔ a ∈ s ∧ a ∉ t := mem_sub_of_nodup s.2 #align finset.mem_sdiff Finset.mem_sdiff @[simp] theorem inter_sdiff_self (s₁ s₂ : Finset α) : s₁ ∩ (s₂ \ s₁) = ∅ := eq_empty_of_forall_not_mem <\| by simp only [mem_inter, mem_sdiff]; rintro x ⟨h, _, hn⟩; exact hn h #align finset.inter_sdiff_self Finset.inter_sdiff_self instance : GeneralizedBooleanAlgebra (Finset α) := { sup_inf_sdiff := fun x y => by simp only [ext_iff, mem_union, mem_sdiff, inf_eq_inter, sup_eq_union, mem_inter, ← and_or_left, em, and_true, implies_true] inf_inf_sdiff := fun x y => by simp only [ext_iff, inter_sdiff_self, inter_empty, inter_assoc, false_iff_iff, inf_eq_inter, not_mem_empty, bot_eq_empty, not_false_iff, implies_true] } theorem not_mem_sdiff_of_mem_right (h : a ∈ t) : a ∉ s \ t := by simp only [mem_sdiff, h, not_true, not_false_iff, and_false_iff] #align finset.not_mem_sdiff_of_mem_right Finset.not_mem_sdiff_of_mem_right theorem not_mem_sdiff_of_not_mem_left (h : a ∉ s) : a ∉ s \ t := by simp [h] #align finset.not_mem_sdiff_of_not_mem_left Finset.not_mem_sdiff_of_not_mem_left theorem union_sdiff_of_subset (h : s ⊆ t) : s ∪ t \ s = t := sup_sdiff_cancel_right h #align finset.union_sdiff_of_subset Finset.union_sdiff_of_subset theorem sdiff_union_of_subset {s₁ s₂ : Finset α} (h : s₁ ⊆ s₂) : s₂ \ s₁ ∪ s₁ = s₂ := (union_comm _ _).trans (union_sdiff_of_subset h) #align finset.sdiff_union_of_subset Finset.sdiff_union_of_subset lemma inter_sdiff_assoc (s t u : Finset α) : (s ∩ t) \ u = s ∩ (t \ u) := by ext x; simp [and_assoc] @[deprecated inter_sdiff_assoc (since := "2024-05-01")] theorem inter_sdiff (s t u : Finset α) : s ∩ (t \ u) = (s ∩ t) \ u := (inter_sdiff_assoc _ _ _).symm #align finset.inter_sdiff Finset.inter_sdiff @[simp] theorem sdiff_inter_self (s₁ s₂ : Finset α) : s₂ \ s₁ ∩ s₁ = ∅ := inf_sdiff_self_left #align finset.sdiff_inter_self Finset.sdiff_inter_self -- Porting note (#10618): @[simp] can prove this protected theorem sdiff_self (s₁ : Finset α) : s₁ \ s₁ = ∅ := _root_.sdiff_self #align finset.sdiff_self Finset.sdiff_self theorem sdiff_inter_distrib_right (s t u : Finset α) : s \ (t ∩ u) = s \ t ∪ s \ u := sdiff_inf #align finset.sdiff_inter_distrib_right Finset.sdiff_inter_distrib_right @[simp] theorem sdiff_inter_self_left (s t : Finset α) : s \ (s ∩ t) = s \ t := sdiff_inf_self_left _ _ #align finset.sdiff_inter_self_left Finset.sdiff_inter_self_left @[simp] theorem sdiff_inter_self_right (s t : Finset α) : s \ (t ∩ s) = s \ t := sdiff_inf_self_right _ _ #align finset.sdiff_inter_self_right Finset.sdiff_inter_self_right @[simp] theorem sdiff_empty : s \ ∅ = s := sdiff_bot #align finset.sdiff_empty Finset.sdiff_empty @[mono, gcongr] theorem sdiff_subset_sdiff (hst : s ⊆ t) (hvu : v ⊆ u) : s \ u ⊆ t \ v := sdiff_le_sdiff hst hvu #align finset.sdiff_subset_sdiff Finset.sdiff_subset_sdiff @[simp, norm_cast] theorem coe_sdiff (s₁ s₂ : Finset α) : ↑(s₁ \ s₂) = (s₁ \ s₂ : Set α) := Set.ext fun _ => mem_sdiff #align finset.coe_sdiff Finset.coe_sdiff @[simp] theorem union_sdiff_self_eq_union : s ∪ t \ s = s ∪ t := sup_sdiff_self_right _ _ #align finset.union_sdiff_self_eq_union Finset.union_sdiff_self_eq_union @[simp] theorem sdiff_union_self_eq_union : s \ t ∪ t = s ∪ t := sup_sdiff_self_left _ _ #align finset.sdiff_union_self_eq_union Finset.sdiff_union_self_eq_union theorem union_sdiff_left (s t : Finset α) : (s ∪ t) \ s = t \ s := sup_sdiff_left_self #align finset.union_sdiff_left Finset.union_sdiff_left theorem union_sdiff_right (s t : Finset α) : (s ∪ t) \ t = s \ t := sup_sdiff_right_self #align finset.union_sdiff_right Finset.union_sdiff_right theorem union_sdiff_cancel_left (h : Disjoint s t) : (s ∪ t) \ s = t := h.sup_sdiff_cancel_left #align finset.union_sdiff_cancel_left Finset.union_sdiff_cancel_left theorem union_sdiff_cancel_right (h : Disjoint s t) : (s ∪ t) \ t = s := h.sup_sdiff_cancel_right #align finset.union_sdiff_cancel_right Finset.union_sdiff_cancel_right theorem union_sdiff_symm : s ∪ t \ s = t ∪ s \ t := by simp [union_comm] #align finset.union_sdiff_symm Finset.union_sdiff_symm theorem sdiff_union_inter (s t : Finset α) : s \ t ∪ s ∩ t = s := sup_sdiff_inf _ _ #align finset.sdiff_union_inter Finset.sdiff_union_inter -- Porting note (#10618): @[simp] can prove this theorem sdiff_idem (s t : Finset α) : (s \ t) \ t = s \ t := _root_.sdiff_idem #align finset.sdiff_idem Finset.sdiff_idem theorem subset_sdiff : s ⊆ t \ u ↔ s ⊆ t ∧ Disjoint s u := le_iff_subset.symm.trans le_sdiff #align finset.subset_sdiff Finset.subset_sdiff @[simp] theorem sdiff_eq_empty_iff_subset : s \ t = ∅ ↔ s ⊆ t := sdiff_eq_bot_iff #align finset.sdiff_eq_empty_iff_subset Finset.sdiff_eq_empty_iff_subset theorem sdiff_nonempty : (s \ t).Nonempty ↔ ¬s ⊆ t := nonempty_iff_ne_empty.trans sdiff_eq_empty_iff_subset.not #align finset.sdiff_nonempty Finset.sdiff_nonempty @[simp] theorem empty_sdiff (s : Finset α) : ∅ \ s = ∅ := bot_sdiff #align finset.empty_sdiff Finset.empty_sdiff theorem insert_sdiff_of_not_mem (s : Finset α) {t : Finset α} {x : α} (h : x ∉ t) : insert x s \ t = insert x (s \ t) := by rw [← coe_inj, coe_insert, coe_sdiff, coe_sdiff, coe_insert] exact Set.insert_diff_of_not_mem _ h #align finset.insert_sdiff_of_not_mem Finset.insert_sdiff_of_not_mem theorem insert_sdiff_of_mem (s : Finset α) {x : α} (h : x ∈ t) : insert x s \ t = s \ t := by rw [← coe_inj, coe_sdiff, coe_sdiff, coe_insert] exact Set.insert_diff_of_mem _ h #align finset.insert_sdiff_of_mem Finset.insert_sdiff_of_mem @[simp] lemma insert_sdiff_cancel (ha : a ∉ s) : insert a s \ s = {a} := by rw [insert_sdiff_of_not_mem _ ha, Finset.sdiff_self, insert_emptyc_eq] @[simp] theorem insert_sdiff_insert (s t : Finset α) (x : α) : insert x s \ insert x t = s \ insert x t := insert_sdiff_of_mem _ (mem_insert_self _ _) #align finset.insert_sdiff_insert Finset.insert_sdiff_insert lemma insert_sdiff_insert' (hab : a ≠ b) (ha : a ∉ s) : insert a s \ insert b s = {a} := by ext; aesop lemma erase_sdiff_erase (hab : a ≠ b) (hb : b ∈ s) : s.erase a \ s.erase b = {b} := by ext; aesop lemma cons_sdiff_cons (hab : a ≠ b) (ha hb) : s.cons a ha \ s.cons b hb = {a} := by rw [cons_eq_insert, cons_eq_insert, insert_sdiff_insert' hab ha] theorem sdiff_insert_of_not_mem {x : α} (h : x ∉ s) (t : Finset α) : s \ insert x t = s \ t := by refine Subset.antisymm (sdiff_subset_sdiff (Subset.refl _) (subset_insert _ _)) fun y hy => ?_ simp only [mem_sdiff, mem_insert, not_or] at hy ⊢ exact ⟨hy.1, fun hxy => h <\| hxy ▸ hy.1, hy.2⟩ #align finset.sdiff_insert_of_not_mem Finset.sdiff_insert_of_not_mem @[simp] theorem sdiff_subset {s t : Finset α} : s \ t ⊆ s := le_iff_subset.mp sdiff_le #align finset.sdiff_subset Finset.sdiff_subset theorem sdiff_ssubset (h : t ⊆ s) (ht : t.Nonempty) : s \ t ⊂ s := sdiff_lt (le_iff_subset.mpr h) ht.ne_empty #align finset.sdiff_ssubset Finset.sdiff_ssubset theorem union_sdiff_distrib (s₁ s₂ t : Finset α) : (s₁ ∪ s₂) \ t = s₁ \ t ∪ s₂ \ t := sup_sdiff #align finset.union_sdiff_distrib Finset.union_sdiff_distrib theorem sdiff_union_distrib (s t₁ t₂ : Finset α) : s \ (t₁ ∪ t₂) = s \ t₁ ∩ (s \ t₂) := sdiff_sup #align finset.sdiff_union_distrib Finset.sdiff_union_distrib theorem union_sdiff_self (s t : Finset α) : (s ∪ t) \ t = s \ t := sup_sdiff_right_self #align finset.union_sdiff_self Finset.union_sdiff_self -- TODO: Do we want to delete this lemma and `Finset.disjUnion_singleton`, -- or instead add `Finset.union_singleton`/`Finset.singleton_union`? theorem sdiff_singleton_eq_erase (a : α) (s : Finset α) : s \ singleton a = erase s a := by ext rw [mem_erase, mem_sdiff, mem_singleton, and_comm] #align finset.sdiff_singleton_eq_erase Finset.sdiff_singleton_eq_erase -- This lemma matches `Finset.insert_eq` in functionality. theorem erase_eq (s : Finset α) (a : α) : s.erase a = s \ {a} := (sdiff_singleton_eq_erase _ _).symm #align finset.erase_eq Finset.erase_eq theorem disjoint_erase_comm : Disjoint (s.erase a) t ↔ Disjoint s (t.erase a) := by simp_rw [erase_eq, disjoint_sdiff_comm] #align finset.disjoint_erase_comm Finset.disjoint_erase_comm lemma disjoint_insert_erase (ha : a ∉ t) : Disjoint (s.erase a) (insert a t) ↔ Disjoint s t := by rw [disjoint_erase_comm, erase_insert ha] lemma disjoint_erase_insert (ha : a ∉ s) : Disjoint (insert a s) (t.erase a) ↔ Disjoint s t := by rw [← disjoint_erase_comm, erase_insert ha] theorem disjoint_of_erase_left (ha : a ∉ t) (hst : Disjoint (s.erase a) t) : Disjoint s t := by rw [← erase_insert ha, ← disjoint_erase_comm, disjoint_insert_right] exact ⟨not_mem_erase _ _, hst⟩ #align finset.disjoint_of_erase_left Finset.disjoint_of_erase_left theorem disjoint_of_erase_right (ha : a ∉ s) (hst : Disjoint s (t.erase a)) : Disjoint s t := by rw [← erase_insert ha, disjoint_erase_comm, disjoint_insert_left] exact ⟨not_mem_erase _ _, hst⟩ #align finset.disjoint_of_erase_right Finset.disjoint_of_erase_right theorem inter_erase (a : α) (s t : Finset α) : s ∩ t.erase a = (s ∩ t).erase a := by simp only [erase_eq, inter_sdiff_assoc] #align finset.inter_erase Finset.inter_erase @[simp] theorem erase_inter (a : α) (s t : Finset α) : s.erase a ∩ t = (s ∩ t).erase a := by simpa only [inter_comm t] using inter_erase a t s #align finset.erase_inter Finset.erase_inter theorem erase_sdiff_comm (s t : Finset α) (a : α) : s.erase a \ t = (s \ t).erase a := by simp_rw [erase_eq, sdiff_right_comm] #align finset.erase_sdiff_comm Finset.erase_sdiff_comm theorem insert_union_comm (s t : Finset α) (a : α) : insert a s ∪ t = s ∪ insert a t := by rw [insert_union, union_insert] #align finset.insert_union_comm Finset.insert_union_comm theorem erase_inter_comm (s t : Finset α) (a : α) : s.erase a ∩ t = s ∩ t.erase a := by rw [erase_inter, inter_erase] #align finset.erase_inter_comm Finset.erase_inter_comm theorem erase_union_distrib (s t : Finset α) (a : α) : (s ∪ t).erase a = s.erase a ∪ t.erase a := by simp_rw [erase_eq, union_sdiff_distrib] #align finset.erase_union_distrib Finset.erase_union_distrib theorem insert_inter_distrib (s t : Finset α) (a : α) : insert a (s ∩ t) = insert a s ∩ insert a t := by simp_rw [insert_eq, union_inter_distrib_left] #align finset.insert_inter_distrib Finset.insert_inter_distrib theorem erase_sdiff_distrib (s t : Finset α) (a : α) : (s \ t).erase a = s.erase a \ t.erase a := by simp_rw [erase_eq, sdiff_sdiff, sup_sdiff_eq_sup le_rfl, sup_comm] #align finset.erase_sdiff_distrib Finset.erase_sdiff_distrib theorem erase_union_of_mem (ha : a ∈ t) (s : Finset α) : s.erase a ∪ t = s ∪ t := by rw [← insert_erase (mem_union_right s ha), erase_union_distrib, ← union_insert, insert_erase ha] #align finset.erase_union_of_mem Finset.erase_union_of_mem theorem union_erase_of_mem (ha : a ∈ s) (t : Finset α) : s ∪ t.erase a = s ∪ t := by rw [← insert_erase (mem_union_left t ha), erase_union_distrib, ← insert_union, insert_erase ha] #align finset.union_erase_of_mem Finset.union_erase_of_mem @[simp] theorem sdiff_singleton_eq_self (ha : a ∉ s) : s \ {a} = s := sdiff_eq_self_iff_disjoint.2 <\| by simp [ha] #align finset.sdiff_singleton_eq_self Finset.sdiff_singleton_eq_self theorem Nontrivial.sdiff_singleton_nonempty {c : α} {s : Finset α} (hS : s.Nontrivial) : (s \ {c}).Nonempty := by rw [Finset.sdiff_nonempty, Finset.subset_singleton_iff] push_neg exact ⟨by rintro rfl; exact Finset.not_nontrivial_empty hS, hS.ne_singleton⟩ theorem sdiff_sdiff_left' (s t u : Finset α) : (s \ t) \ u = s \ t ∩ (s \ u) := _root_.sdiff_sdiff_left' #align finset.sdiff_sdiff_left' Finset.sdiff_sdiff_left' theorem sdiff_union_sdiff_cancel (hts : t ⊆ s) (hut : u ⊆ t) : s \ t ∪ t \ u = s \ u := sdiff_sup_sdiff_cancel hts hut #align finset.sdiff_union_sdiff_cancel Finset.sdiff_union_sdiff_cancel theorem sdiff_union_erase_cancel (hts : t ⊆ s) (ha : a ∈ t) : s \ t ∪ t.erase a = s.erase a := by simp_rw [erase_eq, sdiff_union_sdiff_cancel hts (singleton_subset_iff.2 ha)] #align finset.sdiff_union_erase_cancel Finset.sdiff_union_erase_cancel theorem sdiff_sdiff_eq_sdiff_union (h : u ⊆ s) : s \ (t \ u) = s \ t ∪ u := sdiff_sdiff_eq_sdiff_sup h #align finset.sdiff_sdiff_eq_sdiff_union Finset.sdiff_sdiff_eq_sdiff_union theorem sdiff_insert (s t : Finset α) (x : α) : s \ insert x t = (s \ t).erase x := by simp_rw [← sdiff_singleton_eq_erase, insert_eq, sdiff_sdiff_left', sdiff_union_distrib, inter_comm] #align finset.sdiff_insert Finset.sdiff_insert theorem sdiff_insert_insert_of_mem_of_not_mem {s t : Finset α} {x : α} (hxs : x ∈ s) (hxt : x ∉ t) : insert x (s \ insert x t) = s \ t := by rw [sdiff_insert, insert_erase (mem_sdiff.mpr ⟨hxs, hxt⟩)] #align finset.sdiff_insert_insert_of_mem_of_not_mem Finset.sdiff_insert_insert_of_mem_of_not_mem theorem sdiff_erase (h : a ∈ s) : s \ t.erase a = insert a (s \ t) := by rw [← sdiff_singleton_eq_erase, sdiff_sdiff_eq_sdiff_union (singleton_subset_iff.2 h), insert_eq, union_comm] #align finset.sdiff_erase Finset.sdiff_erase theorem sdiff_erase_self (ha : a ∈ s) : s \ s.erase a = {a} := by rw [sdiff_erase ha, Finset.sdiff_self, insert_emptyc_eq] #align finset.sdiff_erase_self Finset.sdiff_erase_self theorem sdiff_sdiff_self_left (s t : Finset α) : s \ (s \ t) = s ∩ t := sdiff_sdiff_right_self #align finset.sdiff_sdiff_self_left Finset.sdiff_sdiff_self_left theorem sdiff_sdiff_eq_self (h : t ⊆ s) : s \ (s \ t) = t := _root_.sdiff_sdiff_eq_self h #align finset.sdiff_sdiff_eq_self Finset.sdiff_sdiff_eq_self theorem sdiff_eq_sdiff_iff_inter_eq_inter {s t₁ t₂ : Finset α} : s \ t₁ = s \ t₂ ↔ s ∩ t₁ = s ∩ t₂ := sdiff_eq_sdiff_iff_inf_eq_inf #align finset.sdiff_eq_sdiff_iff_inter_eq_inter Finset.sdiff_eq_sdiff_iff_inter_eq_inter theorem union_eq_sdiff_union_sdiff_union_inter (s t : Finset α) : s ∪ t = s \ t ∪ t \ s ∪ s ∩ t := sup_eq_sdiff_sup_sdiff_sup_inf #align finset.union_eq_sdiff_union_sdiff_union_inter Finset.union_eq_sdiff_union_sdiff_union_inter theorem erase_eq_empty_iff (s : Finset α) (a : α) : s.erase a = ∅ ↔ s = ∅ ∨ s = {a} := by rw [← sdiff_singleton_eq_erase, sdiff_eq_empty_iff_subset, subset_singleton_iff] #align finset.erase_eq_empty_iff Finset.erase_eq_empty_iff --TODO@Yaël: Kill lemmas duplicate with `BooleanAlgebra` theorem sdiff_disjoint : Disjoint (t \ s) s := disjoint_left.2 fun _a ha => (mem_sdiff.1 ha).2 #align finset.sdiff_disjoint Finset.sdiff_disjoint theorem disjoint_sdiff : Disjoint s (t \ s) := sdiff_disjoint.symm #align finset.disjoint_sdiff Finset.disjoint_sdiff theorem disjoint_sdiff_inter (s t : Finset α) : Disjoint (s \ t) (s ∩ t) := disjoint_of_subset_right inter_subset_right sdiff_disjoint #align finset.disjoint_sdiff_inter Finset.disjoint_sdiff_inter theorem sdiff_eq_self_iff_disjoint : s \ t = s ↔ Disjoint s t := sdiff_eq_self_iff_disjoint' #align finset.sdiff_eq_self_iff_disjoint Finset.sdiff_eq_self_iff_disjoint theorem sdiff_eq_self_of_disjoint (h : Disjoint s t) : s \ t = s := sdiff_eq_self_iff_disjoint.2 h #align finset.sdiff_eq_self_of_disjoint Finset.sdiff_eq_self_of_disjoint end Sdiff /-! ### Symmetric difference -/ section SymmDiff open scoped symmDiff variable [DecidableEq α] {s t : Finset α} {a b : α} theorem mem_symmDiff : a ∈ s ∆ t ↔ a ∈ s ∧ a ∉ t ∨ a ∈ t ∧ a ∉ s := by simp_rw [symmDiff, sup_eq_union, mem_union, mem_sdiff] #align finset.mem_symm_diff Finset.mem_symmDiff @[simp, norm_cast] theorem coe_symmDiff : (↑(s ∆ t) : Set α) = (s : Set α) ∆ t := Set.ext fun x => by simp [mem_symmDiff, Set.mem_symmDiff] #align finset.coe_symm_diff Finset.coe_symmDiff @[simp] lemma symmDiff_eq_empty : s ∆ t = ∅ ↔ s = t := symmDiff_eq_bot @[simp] lemma symmDiff_nonempty : (s ∆ t).Nonempty ↔ s ≠ t := nonempty_iff_ne_empty.trans symmDiff_eq_empty.not end SymmDiff /-! ### attach -/ /-- `attach s` takes the elements of `s` and forms a new set of elements of the subtype `{x // x ∈ s}`. -/ def attach (s : Finset α) : Finset { x // x ∈ s } := ⟨Multiset.attach s.1, nodup_attach.2 s.2⟩ #align finset.attach Finset.attach theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Finset α} (hx : x ∈ s) : SizeOf.sizeOf x < SizeOf.sizeOf s := by cases s dsimp [SizeOf.sizeOf, SizeOf.sizeOf, Multiset.sizeOf] rw [add_comm] refine lt_trans ?_ (Nat.lt_succ_self _) exact Multiset.sizeOf_lt_sizeOf_of_mem hx #align finset.sizeof_lt_sizeof_of_mem Finset.sizeOf_lt_sizeOf_of_mem @[simp] theorem attach_val (s : Finset α) : s.attach.1 = s.1.attach := rfl #align finset.attach_val Finset.attach_val @[simp] theorem mem_attach (s : Finset α) : ∀ x, x ∈ s.attach := Multiset.mem_attach _ #align finset.mem_attach Finset.mem_attach @[simp] theorem attach_empty : attach (∅ : Finset α) = ∅ := rfl #align finset.attach_empty Finset.attach_empty @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem attach_nonempty_iff {s : Finset α} : s.attach.Nonempty ↔ s.Nonempty := by simp [Finset.Nonempty] #align finset.attach_nonempty_iff Finset.attach_nonempty_iff protected alias ⟨_, Nonempty.attach⟩ := attach_nonempty_iff @[simp] theorem attach_eq_empty_iff {s : Finset α} : s.attach = ∅ ↔ s = ∅ := by simp [eq_empty_iff_forall_not_mem] #align finset.attach_eq_empty_iff Finset.attach_eq_empty_iff section DecidablePiExists variable {s : Finset α} instance decidableDforallFinset {p : ∀ a ∈ s, Prop} [_hp : ∀ (a) (h : a ∈ s), Decidable (p a h)] : Decidable (∀ (a) (h : a ∈ s), p a h) := Multiset.decidableDforallMultiset #align finset.decidable_dforall_finset Finset.decidableDforallFinset -- Porting note: In lean3, `decidableDforallFinset` was picked up when decidability of `s ⊆ t` was -- needed. In lean4 it seems this is not the case. instance instDecidableRelSubset [DecidableEq α] : @DecidableRel (Finset α) (· ⊆ ·) := fun _ _ ↦ decidableDforallFinset instance instDecidableRelSSubset [DecidableEq α] : @DecidableRel (Finset α) (· ⊂ ·) := fun _ _ ↦ instDecidableAnd instance instDecidableLE [DecidableEq α] : @DecidableRel (Finset α) (· ≤ ·) := instDecidableRelSubset instance instDecidableLT [DecidableEq α] : @DecidableRel (Finset α) (· < ·) := instDecidableRelSSubset instance decidableDExistsFinset {p : ∀ a ∈ s, Prop} [_hp : ∀ (a) (h : a ∈ s), Decidable (p a h)] : Decidable (∃ (a : _) (h : a ∈ s), p a h) := Multiset.decidableDexistsMultiset #align finset.decidable_dexists_finset Finset.decidableDExistsFinset instance decidableExistsAndFinset {p : α → Prop} [_hp : ∀ (a), Decidable (p a)] : Decidable (∃ a ∈ s, p a) := decidable_of_iff (∃ (a : _) (_ : a ∈ s), p a) (by simp) instance decidableExistsAndFinsetCoe {p : α → Prop} [DecidablePred p] : Decidable (∃ a ∈ (s : Set α), p a) := decidableExistsAndFinset /-- decidable equality for functions whose domain is bounded by finsets -/ instance decidableEqPiFinset {β : α → Type} [_h : ∀ a, DecidableEq (β a)] : DecidableEq (∀ a ∈ s, β a) := Multiset.decidableEqPiMultiset #align finset.decidable_eq_pi_finset Finset.decidableEqPiFinset end DecidablePiExists /-! ### filter -/ section Filter variable (p q : α → Prop) [DecidablePred p] [DecidablePred q] {s : Finset α} /-- `Finset.filter p s` is the set of elements of `s` that satisfy `p`. For example, one can use `s.filter (· ∈ t)` to get the intersection of `s` with `t : Set α` as a `Finset α` (when a `DecidablePred (· ∈ t)` instance is available). -/ def filter (s : Finset α) : Finset α := ⟨_, s.2.filter p⟩ #align finset.filter Finset.filter @[simp] theorem filter_val (s : Finset α) : (filter p s).1 = s.1.filter p := rfl #align finset.filter_val Finset.filter_val @[simp] theorem filter_subset (s : Finset α) : s.filter p ⊆ s := Multiset.filter_subset _ _ #align finset.filter_subset Finset.filter_subset variable {p} @[simp] theorem mem_filter {s : Finset α} {a : α} : a ∈ s.filter p ↔ a ∈ s ∧ p a := Multiset.mem_filter #align finset.mem_filter Finset.mem_filter theorem mem_of_mem_filter {s : Finset α} (x : α) (h : x ∈ s.filter p) : x ∈ s := Multiset.mem_of_mem_filter h #align finset.mem_of_mem_filter Finset.mem_of_mem_filter theorem filter_ssubset {s : Finset α} : s.filter p ⊂ s ↔ ∃ x ∈ s, ¬p x := ⟨fun h => let ⟨x, hs, hp⟩ := Set.exists_of_ssubset h ⟨x, hs, mt (fun hp => mem_filter.2 ⟨hs, hp⟩) hp⟩, fun ⟨_, hs, hp⟩ => ⟨s.filter_subset _, fun h => hp (mem_filter.1 (h hs)).2⟩⟩ #align finset.filter_ssubset Finset.filter_ssubset variable (p) theorem filter_filter (s : Finset α) : (s.filter p).filter q = s.filter fun a => p a ∧ q a := ext fun a => by simp only [mem_filter, and_assoc, Bool.decide_and, Bool.decide_coe, Bool.and_eq_true] #align finset.filter_filter Finset.filter_filter theorem filter_comm (s : Finset α) : (s.filter p).filter q = (s.filter q).filter p := by simp_rw [filter_filter, and_comm] #align finset.filter_comm Finset.filter_comm -- We can replace an application of filter where the decidability is inferred in "the wrong way". theorem filter_congr_decidable (s : Finset α) (p : α → Prop) (h : DecidablePred p) [DecidablePred p] : @filter α p h s = s.filter p := by congr #align finset.filter_congr_decidable Finset.filter_congr_decidable @[simp] theorem filter_True {h} (s : Finset α) : @filter _ (fun _ => True) h s = s := by ext; simp #align finset.filter_true Finset.filter_True @[simp] theorem filter_False {h} (s : Finset α) : @filter _ (fun _ => False) h s = ∅ := by ext; simp #align finset.filter_false Finset.filter_False variable {p q} lemma filter_eq_self : s.filter p = s ↔ ∀ x ∈ s, p x := by simp [Finset.ext_iff] #align finset.filter_eq_self Finset.filter_eq_self theorem filter_eq_empty_iff : s.filter p = ∅ ↔ ∀ ⦃x⦄, x ∈ s → ¬p x := by simp [Finset.ext_iff] #align finset.filter_eq_empty_iff Finset.filter_eq_empty_iff theorem filter_nonempty_iff : (s.filter p).Nonempty ↔ ∃ a ∈ s, p a := by simp only [nonempty_iff_ne_empty, Ne, filter_eq_empty_iff, Classical.not_not, not_forall, exists_prop] #align finset.filter_nonempty_iff Finset.filter_nonempty_iff /-- If all elements of a `Finset` satisfy the predicate `p`, `s.filter p` is `s`. -/ theorem filter_true_of_mem (h : ∀ x ∈ s, p x) : s.filter p = s := filter_eq_self.2 h #align finset.filter_true_of_mem Finset.filter_true_of_mem /-- If all elements of a `Finset` fail to satisfy the predicate `p`, `s.filter p` is `∅`. -/ theorem filter_false_of_mem (h : ∀ x ∈ s, ¬p x) : s.filter p = ∅ := filter_eq_empty_iff.2 h #align finset.filter_false_of_mem Finset.filter_false_of_mem @[simp] theorem filter_const (p : Prop) [Decidable p] (s : Finset α) : (s.filter fun _a => p) = if p then s else ∅ := by split_ifs <;> simp [*] #align finset.filter_const Finset.filter_const theorem filter_congr {s : Finset α} (H : ∀ x ∈ s, p x ↔ q x) : filter p s = filter q s := eq_of_veq <\| Multiset.filter_congr H #align finset.filter_congr Finset.filter_congr variable (p q) @[simp] theorem filter_empty : filter p ∅ = ∅ := subset_empty.1 <\| filter_subset _ _ #align finset.filter_empty Finset.filter_empty @[gcongr] theorem filter_subset_filter {s t : Finset α} (h : s ⊆ t) : s.filter p ⊆ t.filter p := fun _a ha => mem_filter.2 ⟨h (mem_filter.1 ha).1, (mem_filter.1 ha).2⟩ #align finset.filter_subset_filter Finset.filter_subset_filter theorem monotone_filter_left : Monotone (filter p) := fun _ _ => filter_subset_filter p #align finset.monotone_filter_left Finset.monotone_filter_left -- TODO: `@[gcongr]` doesn't accept this lemma because of the `DecidablePred` arguments theorem monotone_filter_right (s : Finset α) ⦃p q : α → Prop⦄ [DecidablePred p] [DecidablePred q] (h : p ≤ q) : s.filter p ⊆ s.filter q := Multiset.subset_of_le (Multiset.monotone_filter_right s.val h) #align finset.monotone_filter_right Finset.monotone_filter_right @[simp, norm_cast] theorem coe_filter (s : Finset α) : ↑(s.filter p) = ({ x ∈ ↑s \| p x } : Set α) := Set.ext fun _ => mem_filter #align finset.coe_filter Finset.coe_filter theorem subset_coe_filter_of_subset_forall (s : Finset α) {t : Set α} (h₁ : t ⊆ s) (h₂ : ∀ x ∈ t, p x) : t ⊆ s.filter p := fun x hx => (s.coe_filter p).symm ▸ ⟨h₁ hx, h₂ x hx⟩ #align finset.subset_coe_filter_of_subset_forall Finset.subset_coe_filter_of_subset_forall	Mathlib/Data/Finset/Basic.lean	2,693	2,697	theorem filter_singleton (a : α) : filter p {a} = if p a then {a} else ∅ := by	classical ext x simp only [mem_singleton, forall_eq, mem_filter] split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
/- Copyright (c) 2020 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Deprecated.Group #align_import deprecated.ring from "leanprover-community/mathlib"@"5a3e819569b0f12cbec59d740a2613018e7b8eec" /-! # Unbundled semiring and ring homomorphisms (deprecated) This file is deprecated, and is no longer imported by anything in mathlib other than other deprecated files, and test files. You should not need to import it. This file defines predicates for unbundled semiring and ring homomorphisms. Instead of using this file, please use `RingHom`, defined in `Algebra.Hom.Ring`, with notation `→+`, for morphisms between semirings or rings. For example use `φ : A →+ B` to represent a ring homomorphism. ## Main Definitions `IsSemiringHom` (deprecated), `IsRingHom` (deprecated) ## Tags IsSemiringHom, IsRingHom -/ universe u v w variable {α : Type u} /-- Predicate for semiring homomorphisms (deprecated -- use the bundled `RingHom` version). -/ structure IsSemiringHom {α : Type u} {β : Type v} [Semiring α] [Semiring β] (f : α → β) : Prop where /-- The proposition that `f` preserves the additive identity. -/ map_zero : f 0 = 0 /-- The proposition that `f` preserves the multiplicative identity. -/ map_one : f 1 = 1 /-- The proposition that `f` preserves addition. -/ map_add : ∀ x y, f (x + y) = f x + f y /-- The proposition that `f` preserves multiplication. -/ map_mul : ∀ x y, f (x * y) = f x * f y #align is_semiring_hom IsSemiringHom namespace IsSemiringHom variable {β : Type v} [Semiring α] [Semiring β] variable {f : α → β} (hf : IsSemiringHom f) {x y : α} /-- The identity map is a semiring homomorphism. -/ theorem id : IsSemiringHom (@id α) := by constructor <;> intros <;> rfl #align is_semiring_hom.id IsSemiringHom.id /-- The composition of two semiring homomorphisms is a semiring homomorphism. -/ theorem comp (hf : IsSemiringHom f) {γ} [Semiring γ] {g : β → γ} (hg : IsSemiringHom g) : IsSemiringHom (g ∘ f) := { map_zero := by simpa [map_zero hf] using map_zero hg map_one := by simpa [map_one hf] using map_one hg map_add := fun {x y} => by simp [map_add hf, map_add hg] map_mul := fun {x y} => by simp [map_mul hf, map_mul hg] } #align is_semiring_hom.comp IsSemiringHom.comp /-- A semiring homomorphism is an additive monoid homomorphism. -/	Mathlib/Deprecated/Ring.lean	67	68	theorem to_isAddMonoidHom (hf : IsSemiringHom f) : IsAddMonoidHom f := { ‹IsSemiringHom f› with map_add := by	apply @‹IsSemiringHom f›.map_add }
/- Copyright (c) 2019 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Sébastien Gouëzel, Yury Kudryashov -/ import Mathlib.Analysis.Calculus.FDeriv.Linear import Mathlib.Analysis.Calculus.FDeriv.Comp #align_import analysis.calculus.fderiv.add from "leanprover-community/mathlib"@"e3fb84046afd187b710170887195d50bada934ee" /-! # Additive operations on derivatives For detailed documentation of the Fréchet derivative, see the module docstring of `Analysis/Calculus/FDeriv/Basic.lean`. This file contains the usual formulas (and existence assertions) for the derivative of * sum of finitely many functions * multiplication of a function by a scalar constant * negative of a function * subtraction of two functions -/ open Filter Asymptotics ContinuousLinearMap Set Metric open scoped Classical open Topology NNReal Filter Asymptotics ENNReal noncomputable section section variable {𝕜 : Type} [NontriviallyNormedField 𝕜] variable {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] variable {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜 F] variable {G : Type} [NormedAddCommGroup G] [NormedSpace 𝕜 G] variable {G' : Type} [NormedAddCommGroup G'] [NormedSpace 𝕜 G'] variable {f f₀ f₁ g : E → F} variable {f' f₀' f₁' g' : E →L[𝕜] F} variable (e : E →L[𝕜] F) variable {x : E} variable {s t : Set E} variable {L L₁ L₂ : Filter E} section ConstSMul variable {R : Type} [Semiring R] [Module R F] [SMulCommClass 𝕜 R F] [ContinuousConstSMul R F] /-! ### Derivative of a function multiplied by a constant -/ @[fun_prop] theorem HasStrictFDerivAt.const_smul (h : HasStrictFDerivAt f f' x) (c : R) : HasStrictFDerivAt (fun x => c • f x) (c • f') x := (c • (1 : F →L[𝕜] F)).hasStrictFDerivAt.comp x h #align has_strict_fderiv_at.const_smul HasStrictFDerivAt.const_smul theorem HasFDerivAtFilter.const_smul (h : HasFDerivAtFilter f f' x L) (c : R) : HasFDerivAtFilter (fun x => c • f x) (c • f') x L := (c • (1 : F →L[𝕜] F)).hasFDerivAtFilter.comp x h tendsto_map #align has_fderiv_at_filter.const_smul HasFDerivAtFilter.const_smul @[fun_prop] nonrec theorem HasFDerivWithinAt.const_smul (h : HasFDerivWithinAt f f' s x) (c : R) : HasFDerivWithinAt (fun x => c • f x) (c • f') s x := h.const_smul c #align has_fderiv_within_at.const_smul HasFDerivWithinAt.const_smul @[fun_prop] nonrec theorem HasFDerivAt.const_smul (h : HasFDerivAt f f' x) (c : R) : HasFDerivAt (fun x => c • f x) (c • f') x := h.const_smul c #align has_fderiv_at.const_smul HasFDerivAt.const_smul @[fun_prop] theorem DifferentiableWithinAt.const_smul (h : DifferentiableWithinAt 𝕜 f s x) (c : R) : DifferentiableWithinAt 𝕜 (fun y => c • f y) s x := (h.hasFDerivWithinAt.const_smul c).differentiableWithinAt #align differentiable_within_at.const_smul DifferentiableWithinAt.const_smul @[fun_prop] theorem DifferentiableAt.const_smul (h : DifferentiableAt 𝕜 f x) (c : R) : DifferentiableAt 𝕜 (fun y => c • f y) x := (h.hasFDerivAt.const_smul c).differentiableAt #align differentiable_at.const_smul DifferentiableAt.const_smul @[fun_prop] theorem DifferentiableOn.const_smul (h : DifferentiableOn 𝕜 f s) (c : R) : DifferentiableOn 𝕜 (fun y => c • f y) s := fun x hx => (h x hx).const_smul c #align differentiable_on.const_smul DifferentiableOn.const_smul @[fun_prop] theorem Differentiable.const_smul (h : Differentiable 𝕜 f) (c : R) : Differentiable 𝕜 fun y => c • f y := fun x => (h x).const_smul c #align differentiable.const_smul Differentiable.const_smul theorem fderivWithin_const_smul (hxs : UniqueDiffWithinAt 𝕜 s x) (h : DifferentiableWithinAt 𝕜 f s x) (c : R) : fderivWithin 𝕜 (fun y => c • f y) s x = c • fderivWithin 𝕜 f s x := (h.hasFDerivWithinAt.const_smul c).fderivWithin hxs #align fderiv_within_const_smul fderivWithin_const_smul theorem fderiv_const_smul (h : DifferentiableAt 𝕜 f x) (c : R) : fderiv 𝕜 (fun y => c • f y) x = c • fderiv 𝕜 f x := (h.hasFDerivAt.const_smul c).fderiv #align fderiv_const_smul fderiv_const_smul end ConstSMul section Add /-! ### Derivative of the sum of two functions -/ @[fun_prop] nonrec theorem HasStrictFDerivAt.add (hf : HasStrictFDerivAt f f' x) (hg : HasStrictFDerivAt g g' x) : HasStrictFDerivAt (fun y => f y + g y) (f' + g') x := (hf.add hg).congr_left fun y => by simp only [LinearMap.sub_apply, LinearMap.add_apply, map_sub, map_add, add_apply] abel #align has_strict_fderiv_at.add HasStrictFDerivAt.add theorem HasFDerivAtFilter.add (hf : HasFDerivAtFilter f f' x L) (hg : HasFDerivAtFilter g g' x L) : HasFDerivAtFilter (fun y => f y + g y) (f' + g') x L := .of_isLittleO <\| (hf.isLittleO.add hg.isLittleO).congr_left fun _ => by simp only [LinearMap.sub_apply, LinearMap.add_apply, map_sub, map_add, add_apply] abel #align has_fderiv_at_filter.add HasFDerivAtFilter.add @[fun_prop] nonrec theorem HasFDerivWithinAt.add (hf : HasFDerivWithinAt f f' s x) (hg : HasFDerivWithinAt g g' s x) : HasFDerivWithinAt (fun y => f y + g y) (f' + g') s x := hf.add hg #align has_fderiv_within_at.add HasFDerivWithinAt.add @[fun_prop] nonrec theorem HasFDerivAt.add (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) : HasFDerivAt (fun x => f x + g x) (f' + g') x := hf.add hg #align has_fderiv_at.add HasFDerivAt.add @[fun_prop] theorem DifferentiableWithinAt.add (hf : DifferentiableWithinAt 𝕜 f s x) (hg : DifferentiableWithinAt 𝕜 g s x) : DifferentiableWithinAt 𝕜 (fun y => f y + g y) s x := (hf.hasFDerivWithinAt.add hg.hasFDerivWithinAt).differentiableWithinAt #align differentiable_within_at.add DifferentiableWithinAt.add @[simp, fun_prop] theorem DifferentiableAt.add (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) : DifferentiableAt 𝕜 (fun y => f y + g y) x := (hf.hasFDerivAt.add hg.hasFDerivAt).differentiableAt #align differentiable_at.add DifferentiableAt.add @[fun_prop] theorem DifferentiableOn.add (hf : DifferentiableOn 𝕜 f s) (hg : DifferentiableOn 𝕜 g s) : DifferentiableOn 𝕜 (fun y => f y + g y) s := fun x hx => (hf x hx).add (hg x hx) #align differentiable_on.add DifferentiableOn.add @[simp, fun_prop] theorem Differentiable.add (hf : Differentiable 𝕜 f) (hg : Differentiable 𝕜 g) : Differentiable 𝕜 fun y => f y + g y := fun x => (hf x).add (hg x) #align differentiable.add Differentiable.add theorem fderivWithin_add (hxs : UniqueDiffWithinAt 𝕜 s x) (hf : DifferentiableWithinAt 𝕜 f s x) (hg : DifferentiableWithinAt 𝕜 g s x) : fderivWithin 𝕜 (fun y => f y + g y) s x = fderivWithin 𝕜 f s x + fderivWithin 𝕜 g s x := (hf.hasFDerivWithinAt.add hg.hasFDerivWithinAt).fderivWithin hxs #align fderiv_within_add fderivWithin_add theorem fderiv_add (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) : fderiv 𝕜 (fun y => f y + g y) x = fderiv 𝕜 f x + fderiv 𝕜 g x := (hf.hasFDerivAt.add hg.hasFDerivAt).fderiv #align fderiv_add fderiv_add @[fun_prop] theorem HasStrictFDerivAt.add_const (hf : HasStrictFDerivAt f f' x) (c : F) : HasStrictFDerivAt (fun y => f y + c) f' x := add_zero f' ▸ hf.add (hasStrictFDerivAt_const _ _) #align has_strict_fderiv_at.add_const HasStrictFDerivAt.add_const theorem HasFDerivAtFilter.add_const (hf : HasFDerivAtFilter f f' x L) (c : F) : HasFDerivAtFilter (fun y => f y + c) f' x L := add_zero f' ▸ hf.add (hasFDerivAtFilter_const _ _ _) #align has_fderiv_at_filter.add_const HasFDerivAtFilter.add_const @[fun_prop] nonrec theorem HasFDerivWithinAt.add_const (hf : HasFDerivWithinAt f f' s x) (c : F) : HasFDerivWithinAt (fun y => f y + c) f' s x := hf.add_const c #align has_fderiv_within_at.add_const HasFDerivWithinAt.add_const @[fun_prop] nonrec theorem HasFDerivAt.add_const (hf : HasFDerivAt f f' x) (c : F) : HasFDerivAt (fun x => f x + c) f' x := hf.add_const c #align has_fderiv_at.add_const HasFDerivAt.add_const @[fun_prop] theorem DifferentiableWithinAt.add_const (hf : DifferentiableWithinAt 𝕜 f s x) (c : F) : DifferentiableWithinAt 𝕜 (fun y => f y + c) s x := (hf.hasFDerivWithinAt.add_const c).differentiableWithinAt #align differentiable_within_at.add_const DifferentiableWithinAt.add_const @[simp] theorem differentiableWithinAt_add_const_iff (c : F) : DifferentiableWithinAt 𝕜 (fun y => f y + c) s x ↔ DifferentiableWithinAt 𝕜 f s x := ⟨fun h => by simpa using h.add_const (-c), fun h => h.add_const c⟩ #align differentiable_within_at_add_const_iff differentiableWithinAt_add_const_iff @[fun_prop] theorem DifferentiableAt.add_const (hf : DifferentiableAt 𝕜 f x) (c : F) : DifferentiableAt 𝕜 (fun y => f y + c) x := (hf.hasFDerivAt.add_const c).differentiableAt #align differentiable_at.add_const DifferentiableAt.add_const @[simp] theorem differentiableAt_add_const_iff (c : F) : DifferentiableAt 𝕜 (fun y => f y + c) x ↔ DifferentiableAt 𝕜 f x := ⟨fun h => by simpa using h.add_const (-c), fun h => h.add_const c⟩ #align differentiable_at_add_const_iff differentiableAt_add_const_iff @[fun_prop] theorem DifferentiableOn.add_const (hf : DifferentiableOn 𝕜 f s) (c : F) : DifferentiableOn 𝕜 (fun y => f y + c) s := fun x hx => (hf x hx).add_const c #align differentiable_on.add_const DifferentiableOn.add_const @[simp] theorem differentiableOn_add_const_iff (c : F) : DifferentiableOn 𝕜 (fun y => f y + c) s ↔ DifferentiableOn 𝕜 f s := ⟨fun h => by simpa using h.add_const (-c), fun h => h.add_const c⟩ #align differentiable_on_add_const_iff differentiableOn_add_const_iff @[fun_prop] theorem Differentiable.add_const (hf : Differentiable 𝕜 f) (c : F) : Differentiable 𝕜 fun y => f y + c := fun x => (hf x).add_const c #align differentiable.add_const Differentiable.add_const @[simp] theorem differentiable_add_const_iff (c : F) : (Differentiable 𝕜 fun y => f y + c) ↔ Differentiable 𝕜 f := ⟨fun h => by simpa using h.add_const (-c), fun h => h.add_const c⟩ #align differentiable_add_const_iff differentiable_add_const_iff theorem fderivWithin_add_const (hxs : UniqueDiffWithinAt 𝕜 s x) (c : F) : fderivWithin 𝕜 (fun y => f y + c) s x = fderivWithin 𝕜 f s x := if hf : DifferentiableWithinAt 𝕜 f s x then (hf.hasFDerivWithinAt.add_const c).fderivWithin hxs else by rw [fderivWithin_zero_of_not_differentiableWithinAt hf, fderivWithin_zero_of_not_differentiableWithinAt] simpa #align fderiv_within_add_const fderivWithin_add_const theorem fderiv_add_const (c : F) : fderiv 𝕜 (fun y => f y + c) x = fderiv 𝕜 f x := by simp only [← fderivWithin_univ, fderivWithin_add_const uniqueDiffWithinAt_univ] #align fderiv_add_const fderiv_add_const @[fun_prop] theorem HasStrictFDerivAt.const_add (hf : HasStrictFDerivAt f f' x) (c : F) : HasStrictFDerivAt (fun y => c + f y) f' x := zero_add f' ▸ (hasStrictFDerivAt_const _ _).add hf #align has_strict_fderiv_at.const_add HasStrictFDerivAt.const_add theorem HasFDerivAtFilter.const_add (hf : HasFDerivAtFilter f f' x L) (c : F) : HasFDerivAtFilter (fun y => c + f y) f' x L := zero_add f' ▸ (hasFDerivAtFilter_const _ _ _).add hf #align has_fderiv_at_filter.const_add HasFDerivAtFilter.const_add @[fun_prop] nonrec theorem HasFDerivWithinAt.const_add (hf : HasFDerivWithinAt f f' s x) (c : F) : HasFDerivWithinAt (fun y => c + f y) f' s x := hf.const_add c #align has_fderiv_within_at.const_add HasFDerivWithinAt.const_add @[fun_prop] nonrec theorem HasFDerivAt.const_add (hf : HasFDerivAt f f' x) (c : F) : HasFDerivAt (fun x => c + f x) f' x := hf.const_add c #align has_fderiv_at.const_add HasFDerivAt.const_add @[fun_prop] theorem DifferentiableWithinAt.const_add (hf : DifferentiableWithinAt 𝕜 f s x) (c : F) : DifferentiableWithinAt 𝕜 (fun y => c + f y) s x := (hf.hasFDerivWithinAt.const_add c).differentiableWithinAt #align differentiable_within_at.const_add DifferentiableWithinAt.const_add @[simp] theorem differentiableWithinAt_const_add_iff (c : F) : DifferentiableWithinAt 𝕜 (fun y => c + f y) s x ↔ DifferentiableWithinAt 𝕜 f s x := ⟨fun h => by simpa using h.const_add (-c), fun h => h.const_add c⟩ #align differentiable_within_at_const_add_iff differentiableWithinAt_const_add_iff @[fun_prop] theorem DifferentiableAt.const_add (hf : DifferentiableAt 𝕜 f x) (c : F) : DifferentiableAt 𝕜 (fun y => c + f y) x := (hf.hasFDerivAt.const_add c).differentiableAt #align differentiable_at.const_add DifferentiableAt.const_add @[simp] theorem differentiableAt_const_add_iff (c : F) : DifferentiableAt 𝕜 (fun y => c + f y) x ↔ DifferentiableAt 𝕜 f x := ⟨fun h => by simpa using h.const_add (-c), fun h => h.const_add c⟩ #align differentiable_at_const_add_iff differentiableAt_const_add_iff @[fun_prop] theorem DifferentiableOn.const_add (hf : DifferentiableOn 𝕜 f s) (c : F) : DifferentiableOn 𝕜 (fun y => c + f y) s := fun x hx => (hf x hx).const_add c #align differentiable_on.const_add DifferentiableOn.const_add @[simp] theorem differentiableOn_const_add_iff (c : F) : DifferentiableOn 𝕜 (fun y => c + f y) s ↔ DifferentiableOn 𝕜 f s := ⟨fun h => by simpa using h.const_add (-c), fun h => h.const_add c⟩ #align differentiable_on_const_add_iff differentiableOn_const_add_iff @[fun_prop] theorem Differentiable.const_add (hf : Differentiable 𝕜 f) (c : F) : Differentiable 𝕜 fun y => c + f y := fun x => (hf x).const_add c #align differentiable.const_add Differentiable.const_add @[simp] theorem differentiable_const_add_iff (c : F) : (Differentiable 𝕜 fun y => c + f y) ↔ Differentiable 𝕜 f := ⟨fun h => by simpa using h.const_add (-c), fun h => h.const_add c⟩ #align differentiable_const_add_iff differentiable_const_add_iff theorem fderivWithin_const_add (hxs : UniqueDiffWithinAt 𝕜 s x) (c : F) : fderivWithin 𝕜 (fun y => c + f y) s x = fderivWithin 𝕜 f s x := by simpa only [add_comm] using fderivWithin_add_const hxs c #align fderiv_within_const_add fderivWithin_const_add theorem fderiv_const_add (c : F) : fderiv 𝕜 (fun y => c + f y) x = fderiv 𝕜 f x := by simp only [add_comm c, fderiv_add_const] #align fderiv_const_add fderiv_const_add end Add section Sum /-! ### Derivative of a finite sum of functions -/ variable {ι : Type} {u : Finset ι} {A : ι → E → F} {A' : ι → E →L[𝕜] F} @[fun_prop] theorem HasStrictFDerivAt.sum (h : ∀ i ∈ u, HasStrictFDerivAt (A i) (A' i) x) : HasStrictFDerivAt (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) x := by dsimp [HasStrictFDerivAt] at convert IsLittleO.sum h simp [Finset.sum_sub_distrib, ContinuousLinearMap.sum_apply] #align has_strict_fderiv_at.sum HasStrictFDerivAt.sum theorem HasFDerivAtFilter.sum (h : ∀ i ∈ u, HasFDerivAtFilter (A i) (A' i) x L) : HasFDerivAtFilter (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) x L := by simp only [hasFDerivAtFilter_iff_isLittleO] at * convert IsLittleO.sum h simp [ContinuousLinearMap.sum_apply] #align has_fderiv_at_filter.sum HasFDerivAtFilter.sum @[fun_prop] theorem HasFDerivWithinAt.sum (h : ∀ i ∈ u, HasFDerivWithinAt (A i) (A' i) s x) : HasFDerivWithinAt (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) s x := HasFDerivAtFilter.sum h #align has_fderiv_within_at.sum HasFDerivWithinAt.sum @[fun_prop] theorem HasFDerivAt.sum (h : ∀ i ∈ u, HasFDerivAt (A i) (A' i) x) : HasFDerivAt (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) x := HasFDerivAtFilter.sum h #align has_fderiv_at.sum HasFDerivAt.sum @[fun_prop] theorem DifferentiableWithinAt.sum (h : ∀ i ∈ u, DifferentiableWithinAt 𝕜 (A i) s x) : DifferentiableWithinAt 𝕜 (fun y => ∑ i ∈ u, A i y) s x := HasFDerivWithinAt.differentiableWithinAt <\| HasFDerivWithinAt.sum fun i hi => (h i hi).hasFDerivWithinAt #align differentiable_within_at.sum DifferentiableWithinAt.sum @[simp, fun_prop] theorem DifferentiableAt.sum (h : ∀ i ∈ u, DifferentiableAt 𝕜 (A i) x) : DifferentiableAt 𝕜 (fun y => ∑ i ∈ u, A i y) x := HasFDerivAt.differentiableAt <\| HasFDerivAt.sum fun i hi => (h i hi).hasFDerivAt #align differentiable_at.sum DifferentiableAt.sum @[fun_prop] theorem DifferentiableOn.sum (h : ∀ i ∈ u, DifferentiableOn 𝕜 (A i) s) : DifferentiableOn 𝕜 (fun y => ∑ i ∈ u, A i y) s := fun x hx => DifferentiableWithinAt.sum fun i hi => h i hi x hx #align differentiable_on.sum DifferentiableOn.sum @[simp, fun_prop] theorem Differentiable.sum (h : ∀ i ∈ u, Differentiable 𝕜 (A i)) : Differentiable 𝕜 fun y => ∑ i ∈ u, A i y := fun x => DifferentiableAt.sum fun i hi => h i hi x #align differentiable.sum Differentiable.sum theorem fderivWithin_sum (hxs : UniqueDiffWithinAt 𝕜 s x) (h : ∀ i ∈ u, DifferentiableWithinAt 𝕜 (A i) s x) : fderivWithin 𝕜 (fun y => ∑ i ∈ u, A i y) s x = ∑ i ∈ u, fderivWithin 𝕜 (A i) s x := (HasFDerivWithinAt.sum fun i hi => (h i hi).hasFDerivWithinAt).fderivWithin hxs #align fderiv_within_sum fderivWithin_sum theorem fderiv_sum (h : ∀ i ∈ u, DifferentiableAt 𝕜 (A i) x) : fderiv 𝕜 (fun y => ∑ i ∈ u, A i y) x = ∑ i ∈ u, fderiv 𝕜 (A i) x := (HasFDerivAt.sum fun i hi => (h i hi).hasFDerivAt).fderiv #align fderiv_sum fderiv_sum end Sum section Neg /-! ### Derivative of the negative of a function -/ @[fun_prop] theorem HasStrictFDerivAt.neg (h : HasStrictFDerivAt f f' x) : HasStrictFDerivAt (fun x => -f x) (-f') x := (-1 : F →L[𝕜] F).hasStrictFDerivAt.comp x h #align has_strict_fderiv_at.neg HasStrictFDerivAt.neg theorem HasFDerivAtFilter.neg (h : HasFDerivAtFilter f f' x L) : HasFDerivAtFilter (fun x => -f x) (-f') x L := (-1 : F →L[𝕜] F).hasFDerivAtFilter.comp x h tendsto_map #align has_fderiv_at_filter.neg HasFDerivAtFilter.neg @[fun_prop] nonrec theorem HasFDerivWithinAt.neg (h : HasFDerivWithinAt f f' s x) : HasFDerivWithinAt (fun x => -f x) (-f') s x := h.neg #align has_fderiv_within_at.neg HasFDerivWithinAt.neg @[fun_prop] nonrec theorem HasFDerivAt.neg (h : HasFDerivAt f f' x) : HasFDerivAt (fun x => -f x) (-f') x := h.neg #align has_fderiv_at.neg HasFDerivAt.neg @[fun_prop] theorem DifferentiableWithinAt.neg (h : DifferentiableWithinAt 𝕜 f s x) : DifferentiableWithinAt 𝕜 (fun y => -f y) s x := h.hasFDerivWithinAt.neg.differentiableWithinAt #align differentiable_within_at.neg DifferentiableWithinAt.neg @[simp] theorem differentiableWithinAt_neg_iff : DifferentiableWithinAt 𝕜 (fun y => -f y) s x ↔ DifferentiableWithinAt 𝕜 f s x := ⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩ #align differentiable_within_at_neg_iff differentiableWithinAt_neg_iff @[fun_prop] theorem DifferentiableAt.neg (h : DifferentiableAt 𝕜 f x) : DifferentiableAt 𝕜 (fun y => -f y) x := h.hasFDerivAt.neg.differentiableAt #align differentiable_at.neg DifferentiableAt.neg @[simp] theorem differentiableAt_neg_iff : DifferentiableAt 𝕜 (fun y => -f y) x ↔ DifferentiableAt 𝕜 f x := ⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩ #align differentiable_at_neg_iff differentiableAt_neg_iff @[fun_prop] theorem DifferentiableOn.neg (h : DifferentiableOn 𝕜 f s) : DifferentiableOn 𝕜 (fun y => -f y) s := fun x hx => (h x hx).neg #align differentiable_on.neg DifferentiableOn.neg @[simp] theorem differentiableOn_neg_iff : DifferentiableOn 𝕜 (fun y => -f y) s ↔ DifferentiableOn 𝕜 f s := ⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩ #align differentiable_on_neg_iff differentiableOn_neg_iff @[fun_prop] theorem Differentiable.neg (h : Differentiable 𝕜 f) : Differentiable 𝕜 fun y => -f y := fun x => (h x).neg #align differentiable.neg Differentiable.neg @[simp] theorem differentiable_neg_iff : (Differentiable 𝕜 fun y => -f y) ↔ Differentiable 𝕜 f := ⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩ #align differentiable_neg_iff differentiable_neg_iff theorem fderivWithin_neg (hxs : UniqueDiffWithinAt 𝕜 s x) : fderivWithin 𝕜 (fun y => -f y) s x = -fderivWithin 𝕜 f s x := if h : DifferentiableWithinAt 𝕜 f s x then h.hasFDerivWithinAt.neg.fderivWithin hxs else by rw [fderivWithin_zero_of_not_differentiableWithinAt h, fderivWithin_zero_of_not_differentiableWithinAt, neg_zero] simpa #align fderiv_within_neg fderivWithin_neg @[simp] theorem fderiv_neg : fderiv 𝕜 (fun y => -f y) x = -fderiv 𝕜 f x := by simp only [← fderivWithin_univ, fderivWithin_neg uniqueDiffWithinAt_univ] #align fderiv_neg fderiv_neg end Neg section Sub /-! ### Derivative of the difference of two functions -/ @[fun_prop] theorem HasStrictFDerivAt.sub (hf : HasStrictFDerivAt f f' x) (hg : HasStrictFDerivAt g g' x) : HasStrictFDerivAt (fun x => f x - g x) (f' - g') x := by simpa only [sub_eq_add_neg] using hf.add hg.neg #align has_strict_fderiv_at.sub HasStrictFDerivAt.sub theorem HasFDerivAtFilter.sub (hf : HasFDerivAtFilter f f' x L) (hg : HasFDerivAtFilter g g' x L) : HasFDerivAtFilter (fun x => f x - g x) (f' - g') x L := by simpa only [sub_eq_add_neg] using hf.add hg.neg #align has_fderiv_at_filter.sub HasFDerivAtFilter.sub @[fun_prop] nonrec theorem HasFDerivWithinAt.sub (hf : HasFDerivWithinAt f f' s x) (hg : HasFDerivWithinAt g g' s x) : HasFDerivWithinAt (fun x => f x - g x) (f' - g') s x := hf.sub hg #align has_fderiv_within_at.sub HasFDerivWithinAt.sub @[fun_prop] nonrec theorem HasFDerivAt.sub (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) : HasFDerivAt (fun x => f x - g x) (f' - g') x := hf.sub hg #align has_fderiv_at.sub HasFDerivAt.sub @[fun_prop] theorem DifferentiableWithinAt.sub (hf : DifferentiableWithinAt 𝕜 f s x) (hg : DifferentiableWithinAt 𝕜 g s x) : DifferentiableWithinAt 𝕜 (fun y => f y - g y) s x := (hf.hasFDerivWithinAt.sub hg.hasFDerivWithinAt).differentiableWithinAt #align differentiable_within_at.sub DifferentiableWithinAt.sub @[simp, fun_prop] theorem DifferentiableAt.sub (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) : DifferentiableAt 𝕜 (fun y => f y - g y) x := (hf.hasFDerivAt.sub hg.hasFDerivAt).differentiableAt #align differentiable_at.sub DifferentiableAt.sub @[fun_prop] theorem DifferentiableOn.sub (hf : DifferentiableOn 𝕜 f s) (hg : DifferentiableOn 𝕜 g s) : DifferentiableOn 𝕜 (fun y => f y - g y) s := fun x hx => (hf x hx).sub (hg x hx) #align differentiable_on.sub DifferentiableOn.sub @[simp, fun_prop] theorem Differentiable.sub (hf : Differentiable 𝕜 f) (hg : Differentiable 𝕜 g) : Differentiable 𝕜 fun y => f y - g y := fun x => (hf x).sub (hg x) #align differentiable.sub Differentiable.sub theorem fderivWithin_sub (hxs : UniqueDiffWithinAt 𝕜 s x) (hf : DifferentiableWithinAt 𝕜 f s x) (hg : DifferentiableWithinAt 𝕜 g s x) : fderivWithin 𝕜 (fun y => f y - g y) s x = fderivWithin 𝕜 f s x - fderivWithin 𝕜 g s x := (hf.hasFDerivWithinAt.sub hg.hasFDerivWithinAt).fderivWithin hxs #align fderiv_within_sub fderivWithin_sub theorem fderiv_sub (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) : fderiv 𝕜 (fun y => f y - g y) x = fderiv 𝕜 f x - fderiv 𝕜 g x := (hf.hasFDerivAt.sub hg.hasFDerivAt).fderiv #align fderiv_sub fderiv_sub @[fun_prop] theorem HasStrictFDerivAt.sub_const (hf : HasStrictFDerivAt f f' x) (c : F) : HasStrictFDerivAt (fun x => f x - c) f' x := by simpa only [sub_eq_add_neg] using hf.add_const (-c) #align has_strict_fderiv_at.sub_const HasStrictFDerivAt.sub_const theorem HasFDerivAtFilter.sub_const (hf : HasFDerivAtFilter f f' x L) (c : F) : HasFDerivAtFilter (fun x => f x - c) f' x L := by simpa only [sub_eq_add_neg] using hf.add_const (-c) #align has_fderiv_at_filter.sub_const HasFDerivAtFilter.sub_const @[fun_prop] nonrec theorem HasFDerivWithinAt.sub_const (hf : HasFDerivWithinAt f f' s x) (c : F) : HasFDerivWithinAt (fun x => f x - c) f' s x := hf.sub_const c #align has_fderiv_within_at.sub_const HasFDerivWithinAt.sub_const @[fun_prop] nonrec theorem HasFDerivAt.sub_const (hf : HasFDerivAt f f' x) (c : F) : HasFDerivAt (fun x => f x - c) f' x := hf.sub_const c #align has_fderiv_at.sub_const HasFDerivAt.sub_const @[fun_prop] theorem hasStrictFDerivAt_sub_const {x : F} (c : F) : HasStrictFDerivAt (· - c) (id 𝕜 F) x := (hasStrictFDerivAt_id x).sub_const c @[fun_prop] theorem hasFDerivAt_sub_const {x : F} (c : F) : HasFDerivAt (· - c) (id 𝕜 F) x := (hasFDerivAt_id x).sub_const c @[fun_prop] theorem DifferentiableWithinAt.sub_const (hf : DifferentiableWithinAt 𝕜 f s x) (c : F) : DifferentiableWithinAt 𝕜 (fun y => f y - c) s x := (hf.hasFDerivWithinAt.sub_const c).differentiableWithinAt #align differentiable_within_at.sub_const DifferentiableWithinAt.sub_const @[simp] theorem differentiableWithinAt_sub_const_iff (c : F) : DifferentiableWithinAt 𝕜 (fun y => f y - c) s x ↔ DifferentiableWithinAt 𝕜 f s x := by simp only [sub_eq_add_neg, differentiableWithinAt_add_const_iff] #align differentiable_within_at_sub_const_iff differentiableWithinAt_sub_const_iff @[fun_prop] theorem DifferentiableAt.sub_const (hf : DifferentiableAt 𝕜 f x) (c : F) : DifferentiableAt 𝕜 (fun y => f y - c) x := (hf.hasFDerivAt.sub_const c).differentiableAt #align differentiable_at.sub_const DifferentiableAt.sub_const @[simp]	Mathlib/Analysis/Calculus/FDeriv/Add.lean	605	607	theorem differentiableAt_sub_const_iff (c : F) : DifferentiableAt 𝕜 (fun y => f y - c) x ↔ DifferentiableAt 𝕜 f x := by	simp only [sub_eq_add_neg, differentiableAt_add_const_iff]
/- Copyright (c) 2023 Xavier Roblot. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Xavier Roblot -/ import Mathlib.Data.Real.Pi.Bounds import Mathlib.NumberTheory.NumberField.CanonicalEmbedding.ConvexBody /-! # Number field discriminant This file defines the discriminant of a number field. ## Main definitions * `NumberField.discr`: the absolute discriminant of a number field. ## Main result * `NumberField.abs_discr_gt_two`: Hermite-Minkowski Theorem. A nontrivial number field has discriminant greater than `2`. * `NumberField.finite_of_discr_bdd`: Hermite Theorem. Let `N` be an integer. There are only finitely many number fields (in some fixed extension of `ℚ`) of discriminant bounded by `N`. ## Tags number field, discriminant -/ -- TODO. Rewrite some of the FLT results on the disciminant using the definitions and results of -- this file namespace NumberField open FiniteDimensional NumberField NumberField.InfinitePlace Matrix open scoped Classical Real nonZeroDivisors variable (K : Type) [Field K] [NumberField K] /-- The absolute discriminant of a number field. -/ noncomputable abbrev discr : ℤ := Algebra.discr ℤ (RingOfIntegers.basis K) theorem coe_discr : (discr K : ℚ) = Algebra.discr ℚ (integralBasis K) := (Algebra.discr_localizationLocalization ℤ _ K (RingOfIntegers.basis K)).symm theorem discr_ne_zero : discr K ≠ 0 := by rw [← (Int.cast_injective (α := ℚ)).ne_iff, coe_discr] exact Algebra.discr_not_zero_of_basis ℚ (integralBasis K) theorem discr_eq_discr {ι : Type} [Fintype ι] [DecidableEq ι] (b : Basis ι ℤ (𝓞 K)) : Algebra.discr ℤ b = discr K := by let b₀ := Basis.reindex (RingOfIntegers.basis K) (Basis.indexEquiv (RingOfIntegers.basis K) b) rw [Algebra.discr_eq_discr (𝓞 K) b b₀, Basis.coe_reindex, Algebra.discr_reindex]	Mathlib/NumberTheory/NumberField/Discriminant.lean	55	66	theorem discr_eq_discr_of_algEquiv {L : Type*} [Field L] [NumberField L] (f : K ≃ₐ[ℚ] L) : discr K = discr L := by	let f₀ : 𝓞 K ≃ₗ[ℤ] 𝓞 L := (f.restrictScalars ℤ).mapIntegralClosure.toLinearEquiv rw [← Rat.intCast_inj, coe_discr, Algebra.discr_eq_discr_of_algEquiv (integralBasis K) f, ← discr_eq_discr L ((RingOfIntegers.basis K).map f₀)] change _ = algebraMap ℤ ℚ _ rw [← Algebra.discr_localizationLocalization ℤ (nonZeroDivisors ℤ) L] congr ext simp only [Function.comp_apply, integralBasis_apply, Basis.localizationLocalization_apply, Basis.map_apply] rfl
/- Copyright (c) 2023 Chris Birkbeck. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Birkbeck, Ruben Van de Velde -/ import Mathlib.Analysis.Calculus.ContDiff.Basic import Mathlib.Analysis.Calculus.Deriv.Mul import Mathlib.Analysis.Calculus.Deriv.Shift import Mathlib.Analysis.Calculus.IteratedDeriv.Defs /-! # One-dimensional iterated derivatives This file contains a number of further results on `iteratedDerivWithin` that need more imports than are available in `Mathlib/Analysis/Calculus/IteratedDeriv/Defs.lean`. -/ variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {R : Type} [Semiring R] [Module R F] [SMulCommClass 𝕜 R F] [ContinuousConstSMul R F] {n : ℕ} {x : 𝕜} {s : Set 𝕜} (hx : x ∈ s) (h : UniqueDiffOn 𝕜 s) {f g : 𝕜 → F} theorem iteratedDerivWithin_add (hf : ContDiffOn 𝕜 n f s) (hg : ContDiffOn 𝕜 n g s) : iteratedDerivWithin n (f + g) s x = iteratedDerivWithin n f s x + iteratedDerivWithin n g s x := by simp_rw [iteratedDerivWithin, iteratedFDerivWithin_add_apply hf hg h hx, ContinuousMultilinearMap.add_apply] theorem iteratedDerivWithin_congr (hfg : Set.EqOn f g s) : Set.EqOn (iteratedDerivWithin n f s) (iteratedDerivWithin n g s) s := by induction n generalizing f g with \| zero => rwa [iteratedDerivWithin_zero] \| succ n IH => intro y hy have : UniqueDiffWithinAt 𝕜 s y := h.uniqueDiffWithinAt hy rw [iteratedDerivWithin_succ this, iteratedDerivWithin_succ this] exact derivWithin_congr (IH hfg) (IH hfg hy) theorem iteratedDerivWithin_const_add (hn : 0 < n) (c : F) : iteratedDerivWithin n (fun z => c + f z) s x = iteratedDerivWithin n f s x := by obtain ⟨n, rfl⟩ := n.exists_eq_succ_of_ne_zero hn.ne' rw [iteratedDerivWithin_succ' h hx, iteratedDerivWithin_succ' h hx] refine iteratedDerivWithin_congr h ?_ hx intro y hy exact derivWithin_const_add (h.uniqueDiffWithinAt hy) _ theorem iteratedDerivWithin_const_neg (hn : 0 < n) (c : F) : iteratedDerivWithin n (fun z => c - f z) s x = iteratedDerivWithin n (fun z => -f z) s x := by obtain ⟨n, rfl⟩ := n.exists_eq_succ_of_ne_zero hn.ne' rw [iteratedDerivWithin_succ' h hx, iteratedDerivWithin_succ' h hx] refine iteratedDerivWithin_congr h ?_ hx intro y hy have : UniqueDiffWithinAt 𝕜 s y := h.uniqueDiffWithinAt hy rw [derivWithin.neg this] exact derivWithin_const_sub this _ theorem iteratedDerivWithin_const_smul (c : R) (hf : ContDiffOn 𝕜 n f s) : iteratedDerivWithin n (c • f) s x = c • iteratedDerivWithin n f s x := by simp_rw [iteratedDerivWithin] rw [iteratedFDerivWithin_const_smul_apply hf h hx] simp only [ContinuousMultilinearMap.smul_apply] theorem iteratedDerivWithin_const_mul (c : 𝕜) {f : 𝕜 → 𝕜} (hf : ContDiffOn 𝕜 n f s) : iteratedDerivWithin n (fun z => c f z) s x = c * iteratedDerivWithin n f s x := by simpa using iteratedDerivWithin_const_smul (F := 𝕜) hx h c hf variable (f) in	Mathlib/Analysis/Calculus/IteratedDeriv/Lemmas.lean	69	72	theorem iteratedDerivWithin_neg : iteratedDerivWithin n (-f) s x = -iteratedDerivWithin n f s x := by	rw [iteratedDerivWithin, iteratedDerivWithin, iteratedFDerivWithin_neg_apply h hx, ContinuousMultilinearMap.neg_apply]
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Fintype.Basic import Mathlib.Data.Finset.Card import Mathlib.Data.List.NodupEquivFin import Mathlib.Data.Set.Image #align_import data.fintype.card from "leanprover-community/mathlib"@"bf2428c9486c407ca38b5b3fb10b87dad0bc99fa" /-! # Cardinalities of finite types ## Main declarations * `Fintype.card α`: Cardinality of a fintype. Equal to `Finset.univ.card`. * `Fintype.truncEquivFin`: A fintype `α` is computably equivalent to `Fin (card α)`. The `Trunc`-free, noncomputable version is `Fintype.equivFin`. * `Fintype.truncEquivOfCardEq` `Fintype.equivOfCardEq`: Two fintypes of same cardinality are equivalent. See above. * `Fin.equiv_iff_eq`: `Fin m ≃ Fin n` iff `m = n`. * `Infinite.natEmbedding`: An embedding of `ℕ` into an infinite type. We also provide the following versions of the pigeonholes principle. * `Fintype.exists_ne_map_eq_of_card_lt` and `isEmpty_of_card_lt`: Finitely many pigeons and pigeonholes. Weak formulation. * `Finite.exists_ne_map_eq_of_infinite`: Infinitely many pigeons in finitely many pigeonholes. Weak formulation. * `Finite.exists_infinite_fiber`: Infinitely many pigeons in finitely many pigeonholes. Strong formulation. Some more pigeonhole-like statements can be found in `Data.Fintype.CardEmbedding`. Types which have an injection from/a surjection to an `Infinite` type are themselves `Infinite`. See `Infinite.of_injective` and `Infinite.of_surjective`. ## Instances We provide `Infinite` instances for * specific types: `ℕ`, `ℤ`, `String` * type constructors: `Multiset α`, `List α` -/ assert_not_exists MonoidWithZero assert_not_exists MulAction open Function open Nat universe u v variable {α β γ : Type} open Finset Function namespace Fintype /-- `card α` is the number of elements in `α`, defined when `α` is a fintype. -/ def card (α) [Fintype α] : ℕ := (@univ α _).card #align fintype.card Fintype.card /-- There is (computably) an equivalence between `α` and `Fin (card α)`. Since it is not unique and depends on which permutation of the universe list is used, the equivalence is wrapped in `Trunc` to preserve computability. See `Fintype.equivFin` for the noncomputable version, and `Fintype.truncEquivFinOfCardEq` and `Fintype.equivFinOfCardEq` for an equiv `α ≃ Fin n` given `Fintype.card α = n`. See `Fintype.truncFinBijection` for a version without `[DecidableEq α]`. -/ def truncEquivFin (α) [DecidableEq α] [Fintype α] : Trunc (α ≃ Fin (card α)) := by unfold card Finset.card exact Quot.recOnSubsingleton' (motive := fun s : Multiset α => (∀ x : α, x ∈ s) → s.Nodup → Trunc (α ≃ Fin (Multiset.card s))) univ.val (fun l (h : ∀ x : α, x ∈ l) (nd : l.Nodup) => Trunc.mk (nd.getEquivOfForallMemList _ h).symm) mem_univ_val univ.2 #align fintype.trunc_equiv_fin Fintype.truncEquivFin /-- There is (noncomputably) an equivalence between `α` and `Fin (card α)`. See `Fintype.truncEquivFin` for the computable version, and `Fintype.truncEquivFinOfCardEq` and `Fintype.equivFinOfCardEq` for an equiv `α ≃ Fin n` given `Fintype.card α = n`. -/ noncomputable def equivFin (α) [Fintype α] : α ≃ Fin (card α) := letI := Classical.decEq α (truncEquivFin α).out #align fintype.equiv_fin Fintype.equivFin /-- There is (computably) a bijection between `Fin (card α)` and `α`. Since it is not unique and depends on which permutation of the universe list is used, the bijection is wrapped in `Trunc` to preserve computability. See `Fintype.truncEquivFin` for a version that gives an equivalence given `[DecidableEq α]`. -/ def truncFinBijection (α) [Fintype α] : Trunc { f : Fin (card α) → α // Bijective f } := by unfold card Finset.card refine Quot.recOnSubsingleton' (motive := fun s : Multiset α => (∀ x : α, x ∈ s) → s.Nodup → Trunc {f : Fin (Multiset.card s) → α // Bijective f}) univ.val (fun l (h : ∀ x : α, x ∈ l) (nd : l.Nodup) => Trunc.mk (nd.getBijectionOfForallMemList _ h)) mem_univ_val univ.2 #align fintype.trunc_fin_bijection Fintype.truncFinBijection theorem subtype_card {p : α → Prop} (s : Finset α) (H : ∀ x : α, x ∈ s ↔ p x) : @card { x // p x } (Fintype.subtype s H) = s.card := Multiset.card_pmap _ _ _ #align fintype.subtype_card Fintype.subtype_card theorem card_of_subtype {p : α → Prop} (s : Finset α) (H : ∀ x : α, x ∈ s ↔ p x) [Fintype { x // p x }] : card { x // p x } = s.card := by rw [← subtype_card s H] congr apply Subsingleton.elim #align fintype.card_of_subtype Fintype.card_of_subtype @[simp] theorem card_ofFinset {p : Set α} (s : Finset α) (H : ∀ x, x ∈ s ↔ x ∈ p) : @Fintype.card p (ofFinset s H) = s.card := Fintype.subtype_card s H #align fintype.card_of_finset Fintype.card_ofFinset theorem card_of_finset' {p : Set α} (s : Finset α) (H : ∀ x, x ∈ s ↔ x ∈ p) [Fintype p] : Fintype.card p = s.card := by rw [← card_ofFinset s H]; congr; apply Subsingleton.elim #align fintype.card_of_finset' Fintype.card_of_finset' end Fintype namespace Fintype theorem ofEquiv_card [Fintype α] (f : α ≃ β) : @card β (ofEquiv α f) = card α := Multiset.card_map _ _ #align fintype.of_equiv_card Fintype.ofEquiv_card theorem card_congr {α β} [Fintype α] [Fintype β] (f : α ≃ β) : card α = card β := by rw [← ofEquiv_card f]; congr; apply Subsingleton.elim #align fintype.card_congr Fintype.card_congr @[congr] theorem card_congr' {α β} [Fintype α] [Fintype β] (h : α = β) : card α = card β := card_congr (by rw [h]) #align fintype.card_congr' Fintype.card_congr' section variable [Fintype α] [Fintype β] /-- If the cardinality of `α` is `n`, there is computably a bijection between `α` and `Fin n`. See `Fintype.equivFinOfCardEq` for the noncomputable definition, and `Fintype.truncEquivFin` and `Fintype.equivFin` for the bijection `α ≃ Fin (card α)`. -/ def truncEquivFinOfCardEq [DecidableEq α] {n : ℕ} (h : Fintype.card α = n) : Trunc (α ≃ Fin n) := (truncEquivFin α).map fun e => e.trans (finCongr h) #align fintype.trunc_equiv_fin_of_card_eq Fintype.truncEquivFinOfCardEq /-- If the cardinality of `α` is `n`, there is noncomputably a bijection between `α` and `Fin n`. See `Fintype.truncEquivFinOfCardEq` for the computable definition, and `Fintype.truncEquivFin` and `Fintype.equivFin` for the bijection `α ≃ Fin (card α)`. -/ noncomputable def equivFinOfCardEq {n : ℕ} (h : Fintype.card α = n) : α ≃ Fin n := letI := Classical.decEq α (truncEquivFinOfCardEq h).out #align fintype.equiv_fin_of_card_eq Fintype.equivFinOfCardEq /-- Two `Fintype`s with the same cardinality are (computably) in bijection. See `Fintype.equivOfCardEq` for the noncomputable version, and `Fintype.truncEquivFinOfCardEq` and `Fintype.equivFinOfCardEq` for the specialization to `Fin`. -/ def truncEquivOfCardEq [DecidableEq α] [DecidableEq β] (h : card α = card β) : Trunc (α ≃ β) := (truncEquivFinOfCardEq h).bind fun e => (truncEquivFin β).map fun e' => e.trans e'.symm #align fintype.trunc_equiv_of_card_eq Fintype.truncEquivOfCardEq /-- Two `Fintype`s with the same cardinality are (noncomputably) in bijection. See `Fintype.truncEquivOfCardEq` for the computable version, and `Fintype.truncEquivFinOfCardEq` and `Fintype.equivFinOfCardEq` for the specialization to `Fin`. -/ noncomputable def equivOfCardEq (h : card α = card β) : α ≃ β := by letI := Classical.decEq α letI := Classical.decEq β exact (truncEquivOfCardEq h).out #align fintype.equiv_of_card_eq Fintype.equivOfCardEq end theorem card_eq {α β} [_F : Fintype α] [_G : Fintype β] : card α = card β ↔ Nonempty (α ≃ β) := ⟨fun h => haveI := Classical.propDecidable (truncEquivOfCardEq h).nonempty, fun ⟨f⟩ => card_congr f⟩ #align fintype.card_eq Fintype.card_eq /-- Note: this lemma is specifically about `Fintype.ofSubsingleton`. For a statement about arbitrary `Fintype` instances, use either `Fintype.card_le_one_iff_subsingleton` or `Fintype.card_unique`. -/ @[simp] theorem card_ofSubsingleton (a : α) [Subsingleton α] : @Fintype.card _ (ofSubsingleton a) = 1 := rfl #align fintype.card_of_subsingleton Fintype.card_ofSubsingleton @[simp] theorem card_unique [Unique α] [h : Fintype α] : Fintype.card α = 1 := Subsingleton.elim (ofSubsingleton default) h ▸ card_ofSubsingleton _ #align fintype.card_unique Fintype.card_unique /-- Note: this lemma is specifically about `Fintype.ofIsEmpty`. For a statement about arbitrary `Fintype` instances, use `Fintype.card_eq_zero`. -/ @[simp] theorem card_ofIsEmpty [IsEmpty α] : @Fintype.card α Fintype.ofIsEmpty = 0 := rfl #align fintype.card_of_is_empty Fintype.card_ofIsEmpty end Fintype namespace Set variable {s t : Set α} -- We use an arbitrary `[Fintype s]` instance here, -- not necessarily coming from a `[Fintype α]`. @[simp] theorem toFinset_card {α : Type} (s : Set α) [Fintype s] : s.toFinset.card = Fintype.card s := Multiset.card_map Subtype.val Finset.univ.val #align set.to_finset_card Set.toFinset_card end Set @[simp] theorem Finset.card_univ [Fintype α] : (Finset.univ : Finset α).card = Fintype.card α := rfl #align finset.card_univ Finset.card_univ theorem Finset.eq_univ_of_card [Fintype α] (s : Finset α) (hs : s.card = Fintype.card α) : s = univ := eq_of_subset_of_card_le (subset_univ _) <\| by rw [hs, Finset.card_univ] #align finset.eq_univ_of_card Finset.eq_univ_of_card theorem Finset.card_eq_iff_eq_univ [Fintype α] (s : Finset α) : s.card = Fintype.card α ↔ s = Finset.univ := ⟨s.eq_univ_of_card, by rintro rfl exact Finset.card_univ⟩ #align finset.card_eq_iff_eq_univ Finset.card_eq_iff_eq_univ theorem Finset.card_le_univ [Fintype α] (s : Finset α) : s.card ≤ Fintype.card α := card_le_card (subset_univ s) #align finset.card_le_univ Finset.card_le_univ theorem Finset.card_lt_univ_of_not_mem [Fintype α] {s : Finset α} {x : α} (hx : x ∉ s) : s.card < Fintype.card α := card_lt_card ⟨subset_univ s, not_forall.2 ⟨x, fun hx' => hx (hx' <\| mem_univ x)⟩⟩ #align finset.card_lt_univ_of_not_mem Finset.card_lt_univ_of_not_mem theorem Finset.card_lt_iff_ne_univ [Fintype α] (s : Finset α) : s.card < Fintype.card α ↔ s ≠ Finset.univ := s.card_le_univ.lt_iff_ne.trans (not_congr s.card_eq_iff_eq_univ) #align finset.card_lt_iff_ne_univ Finset.card_lt_iff_ne_univ theorem Finset.card_compl_lt_iff_nonempty [Fintype α] [DecidableEq α] (s : Finset α) : sᶜ.card < Fintype.card α ↔ s.Nonempty := sᶜ.card_lt_iff_ne_univ.trans s.compl_ne_univ_iff_nonempty #align finset.card_compl_lt_iff_nonempty Finset.card_compl_lt_iff_nonempty theorem Finset.card_univ_diff [DecidableEq α] [Fintype α] (s : Finset α) : (Finset.univ \ s).card = Fintype.card α - s.card := Finset.card_sdiff (subset_univ s) #align finset.card_univ_diff Finset.card_univ_diff theorem Finset.card_compl [DecidableEq α] [Fintype α] (s : Finset α) : sᶜ.card = Fintype.card α - s.card := Finset.card_univ_diff s #align finset.card_compl Finset.card_compl @[simp] theorem Finset.card_add_card_compl [DecidableEq α] [Fintype α] (s : Finset α) : s.card + sᶜ.card = Fintype.card α := by rw [Finset.card_compl, ← Nat.add_sub_assoc (card_le_univ s), Nat.add_sub_cancel_left] @[simp] theorem Finset.card_compl_add_card [DecidableEq α] [Fintype α] (s : Finset α) : sᶜ.card + s.card = Fintype.card α := by rw [add_comm, card_add_card_compl] theorem Fintype.card_compl_set [Fintype α] (s : Set α) [Fintype s] [Fintype (↥sᶜ : Sort _)] : Fintype.card (↥sᶜ : Sort _) = Fintype.card α - Fintype.card s := by classical rw [← Set.toFinset_card, ← Set.toFinset_card, ← Finset.card_compl, Set.toFinset_compl] #align fintype.card_compl_set Fintype.card_compl_set @[simp] theorem Fintype.card_fin (n : ℕ) : Fintype.card (Fin n) = n := List.length_finRange n #align fintype.card_fin Fintype.card_fin theorem Fintype.card_fin_lt_of_le {m n : ℕ} (h : m ≤ n) : Fintype.card {i : Fin n // i < m} = m := by conv_rhs => rw [← Fintype.card_fin m] apply Fintype.card_congr exact { toFun := fun ⟨⟨i, _⟩, hi⟩ ↦ ⟨i, hi⟩ invFun := fun ⟨i, hi⟩ ↦ ⟨⟨i, lt_of_lt_of_le hi h⟩, hi⟩ left_inv := fun i ↦ rfl right_inv := fun i ↦ rfl } theorem Finset.card_fin (n : ℕ) : Finset.card (Finset.univ : Finset (Fin n)) = n := by simp #align finset.card_fin Finset.card_fin /-- `Fin` as a map from `ℕ` to `Type` is injective. Note that since this is a statement about equality of types, using it should be avoided if possible. -/ theorem fin_injective : Function.Injective Fin := fun m n h => (Fintype.card_fin m).symm.trans <\| (Fintype.card_congr <\| Equiv.cast h).trans (Fintype.card_fin n) #align fin_injective fin_injective /-- A reversed version of `Fin.cast_eq_cast` that is easier to rewrite with. -/ theorem Fin.cast_eq_cast' {n m : ℕ} (h : Fin n = Fin m) : _root_.cast h = Fin.cast (fin_injective h) := by cases fin_injective h rfl #align fin.cast_eq_cast' Fin.cast_eq_cast' theorem card_finset_fin_le {n : ℕ} (s : Finset (Fin n)) : s.card ≤ n := by simpa only [Fintype.card_fin] using s.card_le_univ #align card_finset_fin_le card_finset_fin_le --@[simp] Porting note (#10618): simp can prove it theorem Fintype.card_subtype_eq (y : α) [Fintype { x // x = y }] : Fintype.card { x // x = y } = 1 := Fintype.card_unique #align fintype.card_subtype_eq Fintype.card_subtype_eq --@[simp] Porting note (#10618): simp can prove it theorem Fintype.card_subtype_eq' (y : α) [Fintype { x // y = x }] : Fintype.card { x // y = x } = 1 := Fintype.card_unique #align fintype.card_subtype_eq' Fintype.card_subtype_eq' theorem Fintype.card_empty : Fintype.card Empty = 0 := rfl #align fintype.card_empty Fintype.card_empty theorem Fintype.card_pempty : Fintype.card PEmpty = 0 := rfl #align fintype.card_pempty Fintype.card_pempty theorem Fintype.card_unit : Fintype.card Unit = 1 := rfl #align fintype.card_unit Fintype.card_unit @[simp] theorem Fintype.card_punit : Fintype.card PUnit = 1 := rfl #align fintype.card_punit Fintype.card_punit @[simp] theorem Fintype.card_bool : Fintype.card Bool = 2 := rfl #align fintype.card_bool Fintype.card_bool @[simp] theorem Fintype.card_ulift (α : Type) [Fintype α] : Fintype.card (ULift α) = Fintype.card α := Fintype.ofEquiv_card _ #align fintype.card_ulift Fintype.card_ulift @[simp] theorem Fintype.card_plift (α : Type) [Fintype α] : Fintype.card (PLift α) = Fintype.card α := Fintype.ofEquiv_card _ #align fintype.card_plift Fintype.card_plift @[simp] theorem Fintype.card_orderDual (α : Type) [Fintype α] : Fintype.card αᵒᵈ = Fintype.card α := rfl #align fintype.card_order_dual Fintype.card_orderDual @[simp] theorem Fintype.card_lex (α : Type) [Fintype α] : Fintype.card (Lex α) = Fintype.card α := rfl #align fintype.card_lex Fintype.card_lex @[simp] lemma Fintype.card_multiplicative (α : Type) [Fintype α] : card (Multiplicative α) = card α := Finset.card_map _ @[simp] lemma Fintype.card_additive (α : Type) [Fintype α] : card (Additive α) = card α := Finset.card_map _ /-- Given that `α ⊕ β` is a fintype, `α` is also a fintype. This is non-computable as it uses that `Sum.inl` is an injection, but there's no clear inverse if `α` is empty. -/ noncomputable def Fintype.sumLeft {α β} [Fintype (Sum α β)] : Fintype α := Fintype.ofInjective (Sum.inl : α → Sum α β) Sum.inl_injective #align fintype.sum_left Fintype.sumLeft /-- Given that `α ⊕ β` is a fintype, `β` is also a fintype. This is non-computable as it uses that `Sum.inr` is an injection, but there's no clear inverse if `β` is empty. -/ noncomputable def Fintype.sumRight {α β} [Fintype (Sum α β)] : Fintype β := Fintype.ofInjective (Sum.inr : β → Sum α β) Sum.inr_injective #align fintype.sum_right Fintype.sumRight /-! ### Relation to `Finite` In this section we prove that `α : Type` is `Finite` if and only if `Fintype α` is nonempty. -/ -- @[nolint fintype_finite] -- Porting note: do we need this protected theorem Fintype.finite {α : Type} (_inst : Fintype α) : Finite α := ⟨Fintype.equivFin α⟩ #align fintype.finite Fintype.finite /-- For efficiency reasons, we want `Finite` instances to have higher priority than ones coming from `Fintype` instances. -/ -- @[nolint fintype_finite] -- Porting note: do we need this instance (priority := 900) Finite.of_fintype (α : Type) [Fintype α] : Finite α := Fintype.finite ‹_› #align finite.of_fintype Finite.of_fintype theorem finite_iff_nonempty_fintype (α : Type) : Finite α ↔ Nonempty (Fintype α) := ⟨fun h => let ⟨_k, ⟨e⟩⟩ := @Finite.exists_equiv_fin α h ⟨Fintype.ofEquiv _ e.symm⟩, fun ⟨_⟩ => inferInstance⟩ #align finite_iff_nonempty_fintype finite_iff_nonempty_fintype /-- See also `nonempty_encodable`, `nonempty_denumerable`. -/ theorem nonempty_fintype (α : Type) [Finite α] : Nonempty (Fintype α) := (finite_iff_nonempty_fintype α).mp ‹_› #align nonempty_fintype nonempty_fintype /-- Noncomputably get a `Fintype` instance from a `Finite` instance. This is not an instance because we want `Fintype` instances to be useful for computations. -/ noncomputable def Fintype.ofFinite (α : Type) [Finite α] : Fintype α := (nonempty_fintype α).some #align fintype.of_finite Fintype.ofFinite theorem Finite.of_injective {α β : Sort} [Finite β] (f : α → β) (H : Injective f) : Finite α := by rcases Finite.exists_equiv_fin β with ⟨n, ⟨e⟩⟩ classical exact .of_equiv (Set.range (e ∘ f)) (Equiv.ofInjective _ (e.injective.comp H)).symm #align finite.of_injective Finite.of_injective /-- This instance also provides `[Finite s]` for `s : Set α`. -/ instance Subtype.finite {α : Sort} [Finite α] {p : α → Prop} : Finite { x // p x } := Finite.of_injective (↑) Subtype.coe_injective #align subtype.finite Subtype.finite theorem Finite.of_surjective {α β : Sort} [Finite α] (f : α → β) (H : Surjective f) : Finite β := Finite.of_injective _ <\| injective_surjInv H #align finite.of_surjective Finite.of_surjective theorem Finite.exists_univ_list (α) [Finite α] : ∃ l : List α, l.Nodup ∧ ∀ x : α, x ∈ l := by cases nonempty_fintype α obtain ⟨l, e⟩ := Quotient.exists_rep (@univ α _).1 have := And.intro (@univ α _).2 (@mem_univ_val α _) exact ⟨_, by rwa [← e] at this⟩ #align finite.exists_univ_list Finite.exists_univ_list theorem List.Nodup.length_le_card {α : Type} [Fintype α] {l : List α} (h : l.Nodup) : l.length ≤ Fintype.card α := by classical exact List.toFinset_card_of_nodup h ▸ l.toFinset.card_le_univ #align list.nodup.length_le_card List.Nodup.length_le_card namespace Fintype variable [Fintype α] [Fintype β] theorem card_le_of_injective (f : α → β) (hf : Function.Injective f) : card α ≤ card β := Finset.card_le_card_of_inj_on f (fun _ _ => Finset.mem_univ _) fun _ _ _ _ h => hf h #align fintype.card_le_of_injective Fintype.card_le_of_injective theorem card_le_of_embedding (f : α ↪ β) : card α ≤ card β := card_le_of_injective f f.2 #align fintype.card_le_of_embedding Fintype.card_le_of_embedding theorem card_lt_of_injective_of_not_mem (f : α → β) (h : Function.Injective f) {b : β} (w : b ∉ Set.range f) : card α < card β := calc card α = (univ.map ⟨f, h⟩).card := (card_map _).symm _ < card β := Finset.card_lt_univ_of_not_mem <\| by rwa [← mem_coe, coe_map, coe_univ, Set.image_univ] #align fintype.card_lt_of_injective_of_not_mem Fintype.card_lt_of_injective_of_not_mem theorem card_lt_of_injective_not_surjective (f : α → β) (h : Function.Injective f) (h' : ¬Function.Surjective f) : card α < card β := let ⟨_y, hy⟩ := not_forall.1 h' card_lt_of_injective_of_not_mem f h hy #align fintype.card_lt_of_injective_not_surjective Fintype.card_lt_of_injective_not_surjective theorem card_le_of_surjective (f : α → β) (h : Function.Surjective f) : card β ≤ card α := card_le_of_injective _ (Function.injective_surjInv h) #align fintype.card_le_of_surjective Fintype.card_le_of_surjective theorem card_range_le {α β : Type} (f : α → β) [Fintype α] [Fintype (Set.range f)] : Fintype.card (Set.range f) ≤ Fintype.card α := Fintype.card_le_of_surjective (fun a => ⟨f a, by simp⟩) fun ⟨_, a, ha⟩ => ⟨a, by simpa using ha⟩ #align fintype.card_range_le Fintype.card_range_le theorem card_range {α β F : Type} [FunLike F α β] [EmbeddingLike F α β] (f : F) [Fintype α] [Fintype (Set.range f)] : Fintype.card (Set.range f) = Fintype.card α := Eq.symm <\| Fintype.card_congr <\| Equiv.ofInjective _ <\| EmbeddingLike.injective f #align fintype.card_range Fintype.card_range /-- The pigeonhole principle for finitely many pigeons and pigeonholes. This is the `Fintype` version of `Finset.exists_ne_map_eq_of_card_lt_of_maps_to`. -/ theorem exists_ne_map_eq_of_card_lt (f : α → β) (h : Fintype.card β < Fintype.card α) : ∃ x y, x ≠ y ∧ f x = f y := let ⟨x, _, y, _, h⟩ := Finset.exists_ne_map_eq_of_card_lt_of_maps_to h fun x _ => mem_univ (f x) ⟨x, y, h⟩ #align fintype.exists_ne_map_eq_of_card_lt Fintype.exists_ne_map_eq_of_card_lt theorem card_eq_one_iff : card α = 1 ↔ ∃ x : α, ∀ y, y = x := by rw [← card_unit, card_eq] exact ⟨fun ⟨a⟩ => ⟨a.symm (), fun y => a.injective (Subsingleton.elim _ _)⟩, fun ⟨x, hx⟩ => ⟨⟨fun _ => (), fun _ => x, fun _ => (hx _).trans (hx _).symm, fun _ => Subsingleton.elim _ _⟩⟩⟩ #align fintype.card_eq_one_iff Fintype.card_eq_one_iff theorem card_eq_zero_iff : card α = 0 ↔ IsEmpty α := by rw [card, Finset.card_eq_zero, univ_eq_empty_iff] #align fintype.card_eq_zero_iff Fintype.card_eq_zero_iff @[simp] theorem card_eq_zero [IsEmpty α] : card α = 0 := card_eq_zero_iff.2 ‹_› #align fintype.card_eq_zero Fintype.card_eq_zero alias card_of_isEmpty := card_eq_zero theorem card_eq_one_iff_nonempty_unique : card α = 1 ↔ Nonempty (Unique α) := ⟨fun h => let ⟨d, h⟩ := Fintype.card_eq_one_iff.mp h ⟨{ default := d uniq := h }⟩, fun ⟨_h⟩ => Fintype.card_unique⟩ #align fintype.card_eq_one_iff_nonempty_unique Fintype.card_eq_one_iff_nonempty_unique /-- A `Fintype` with cardinality zero is equivalent to `Empty`. -/ def cardEqZeroEquivEquivEmpty : card α = 0 ≃ (α ≃ Empty) := (Equiv.ofIff card_eq_zero_iff).trans (Equiv.equivEmptyEquiv α).symm #align fintype.card_eq_zero_equiv_equiv_empty Fintype.cardEqZeroEquivEquivEmpty theorem card_pos_iff : 0 < card α ↔ Nonempty α := Nat.pos_iff_ne_zero.trans <\| not_iff_comm.mp <\| not_nonempty_iff.trans card_eq_zero_iff.symm #align fintype.card_pos_iff Fintype.card_pos_iff theorem card_pos [h : Nonempty α] : 0 < card α := card_pos_iff.mpr h #align fintype.card_pos Fintype.card_pos @[simp] theorem card_ne_zero [Nonempty α] : card α ≠ 0 := _root_.ne_of_gt card_pos #align fintype.card_ne_zero Fintype.card_ne_zero instance [Nonempty α] : NeZero (card α) := ⟨card_ne_zero⟩ theorem card_le_one_iff : card α ≤ 1 ↔ ∀ a b : α, a = b := let n := card α have hn : n = card α := rfl match n, hn with \| 0, ha => ⟨fun _h => fun a => (card_eq_zero_iff.1 ha.symm).elim a, fun _ => ha ▸ Nat.le_succ _⟩ \| 1, ha => ⟨fun _h => fun a b => by let ⟨x, hx⟩ := card_eq_one_iff.1 ha.symm rw [hx a, hx b], fun _ => ha ▸ le_rfl⟩ \| n + 2, ha => ⟨fun h => False.elim <\| by rw [← ha] at h; cases h with \| step h => cases h; , fun h => card_unit ▸ card_le_of_injective (fun _ => ()) fun _ _ _ => h _ _⟩ #align fintype.card_le_one_iff Fintype.card_le_one_iff theorem card_le_one_iff_subsingleton : card α ≤ 1 ↔ Subsingleton α := card_le_one_iff.trans subsingleton_iff.symm #align fintype.card_le_one_iff_subsingleton Fintype.card_le_one_iff_subsingleton	Mathlib/Data/Fintype/Card.lean	594	595	theorem one_lt_card_iff_nontrivial : 1 < card α ↔ Nontrivial α := by	rw [← not_iff_not, not_lt, not_nontrivial_iff_subsingleton, card_le_one_iff_subsingleton]
/- Copyright (c) 2022 Yury G. Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury G. Kudryashov, Yaël Dillies -/ import Mathlib.MeasureTheory.Integral.SetIntegral #align_import measure_theory.integral.average from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" /-! # Integral average of a function In this file we define `MeasureTheory.average μ f` (notation: `⨍ x, f x ∂μ`) to be the average value of `f` with respect to measure `μ`. It is defined as `∫ x, f x ∂((μ univ)⁻¹ • μ)`, so it is equal to zero if `f` is not integrable or if `μ` is an infinite measure. If `μ` is a probability measure, then the average of any function is equal to its integral. For the average on a set, we use `⨍ x in s, f x ∂μ` (notation for `⨍ x, f x ∂(μ.restrict s)`). For average w.r.t. the volume, one can omit `∂volume`. Both have a version for the Lebesgue integral rather than Bochner. We prove several version of the first moment method: An integrable function is below/above its average on a set of positive measure. ## Implementation notes The average is defined as an integral over `(μ univ)⁻¹ • μ` so that all theorems about Bochner integrals work for the average without modifications. For theorems that require integrability of a function, we provide a convenience lemma `MeasureTheory.Integrable.to_average`. ## TODO Provide the first moment method for the Lebesgue integral as well. A draft is available on branch `first_moment_lintegral` in mathlib3 repository. ## Tags integral, center mass, average value -/ open ENNReal MeasureTheory MeasureTheory.Measure Metric Set Filter TopologicalSpace Function open scoped Topology ENNReal Convex variable {α E F : Type} {m0 : MeasurableSpace α} [NormedAddCommGroup E] [NormedSpace ℝ E] [CompleteSpace E] [NormedAddCommGroup F] [NormedSpace ℝ F] [CompleteSpace F] {μ ν : Measure α} {s t : Set α} /-! ### Average value of a function w.r.t. a measure The (Bochner, Lebesgue) average value of a function `f` w.r.t. a measure `μ` (notation: `⨍ x, f x ∂μ`, `⨍⁻ x, f x ∂μ`) is defined as the (Bochner, Lebesgue) integral divided by the total measure, so it is equal to zero if `μ` is an infinite measure, and (typically) equal to infinity if `f` is not integrable. If `μ` is a probability measure, then the average of any function is equal to its integral. -/ namespace MeasureTheory section ENNReal variable (μ) {f g : α → ℝ≥0∞} /-- Average value of an `ℝ≥0∞`-valued function `f` w.r.t. a measure `μ`, denoted `⨍⁻ x, f x ∂μ`. It is equal to `(μ univ)⁻¹ ∫⁻ x, f x ∂μ`, so it takes value zero if `μ` is an infinite measure. If `μ` is a probability measure, then the average of any function is equal to its integral. For the average on a set, use `⨍⁻ x in s, f x ∂μ`, defined as `⨍⁻ x, f x ∂(μ.restrict s)`. For the average w.r.t. the volume, one can omit `∂volume`. -/ noncomputable def laverage (f : α → ℝ≥0∞) := ∫⁻ x, f x ∂(μ univ)⁻¹ • μ #align measure_theory.laverage MeasureTheory.laverage /-- Average value of an `ℝ≥0∞`-valued function `f` w.r.t. a measure `μ`. It is equal to `(μ univ)⁻¹ * ∫⁻ x, f x ∂μ`, so it takes value zero if `μ` is an infinite measure. If `μ` is a probability measure, then the average of any function is equal to its integral. For the average on a set, use `⨍⁻ x in s, f x ∂μ`, defined as `⨍⁻ x, f x ∂(μ.restrict s)`. For the average w.r.t. the volume, one can omit `∂volume`. -/ notation3 "⨍⁻ "(...)", "r:60:(scoped f => f)" ∂"μ:70 => laverage μ r /-- Average value of an `ℝ≥0∞`-valued function `f` w.r.t. to the standard measure. It is equal to `(volume univ)⁻¹ * ∫⁻ x, f x`, so it takes value zero if the space has infinite measure. In a probability space, the average of any function is equal to its integral. For the average on a set, use `⨍⁻ x in s, f x`, defined as `⨍⁻ x, f x ∂(volume.restrict s)`. -/ notation3 "⨍⁻ "(...)", "r:60:(scoped f => laverage volume f) => r /-- Average value of an `ℝ≥0∞`-valued function `f` w.r.t. a measure `μ` on a set `s`. It is equal to `(μ s)⁻¹ * ∫⁻ x, f x ∂μ`, so it takes value zero if `s` has infinite measure. If `s` has measure `1`, then the average of any function is equal to its integral. For the average w.r.t. the volume, one can omit `∂volume`. -/ notation3 "⨍⁻ "(...)" in "s", "r:60:(scoped f => f)" ∂"μ:70 => laverage (Measure.restrict μ s) r /-- Average value of an `ℝ≥0∞`-valued function `f` w.r.t. to the standard measure on a set `s`. It is equal to `(volume s)⁻¹ * ∫⁻ x, f x`, so it takes value zero if `s` has infinite measure. If `s` has measure `1`, then the average of any function is equal to its integral. -/ notation3 (prettyPrint := false) "⨍⁻ "(...)" in "s", "r:60:(scoped f => laverage Measure.restrict volume s f) => r @[simp] theorem laverage_zero : ⨍⁻ _x, (0 : ℝ≥0∞) ∂μ = 0 := by rw [laverage, lintegral_zero] #align measure_theory.laverage_zero MeasureTheory.laverage_zero @[simp] theorem laverage_zero_measure (f : α → ℝ≥0∞) : ⨍⁻ x, f x ∂(0 : Measure α) = 0 := by simp [laverage] #align measure_theory.laverage_zero_measure MeasureTheory.laverage_zero_measure theorem laverage_eq' (f : α → ℝ≥0∞) : ⨍⁻ x, f x ∂μ = ∫⁻ x, f x ∂(μ univ)⁻¹ • μ := rfl #align measure_theory.laverage_eq' MeasureTheory.laverage_eq' theorem laverage_eq (f : α → ℝ≥0∞) : ⨍⁻ x, f x ∂μ = (∫⁻ x, f x ∂μ) / μ univ := by rw [laverage_eq', lintegral_smul_measure, ENNReal.div_eq_inv_mul] #align measure_theory.laverage_eq MeasureTheory.laverage_eq theorem laverage_eq_lintegral [IsProbabilityMeasure μ] (f : α → ℝ≥0∞) : ⨍⁻ x, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [laverage, measure_univ, inv_one, one_smul] #align measure_theory.laverage_eq_lintegral MeasureTheory.laverage_eq_lintegral @[simp] theorem measure_mul_laverage [IsFiniteMeasure μ] (f : α → ℝ≥0∞) : μ univ * ⨍⁻ x, f x ∂μ = ∫⁻ x, f x ∂μ := by rcases eq_or_ne μ 0 with hμ \| hμ · rw [hμ, lintegral_zero_measure, laverage_zero_measure, mul_zero] · rw [laverage_eq, ENNReal.mul_div_cancel' (measure_univ_ne_zero.2 hμ) (measure_ne_top _ _)] #align measure_theory.measure_mul_laverage MeasureTheory.measure_mul_laverage theorem setLaverage_eq (f : α → ℝ≥0∞) (s : Set α) : ⨍⁻ x in s, f x ∂μ = (∫⁻ x in s, f x ∂μ) / μ s := by rw [laverage_eq, restrict_apply_univ] #align measure_theory.set_laverage_eq MeasureTheory.setLaverage_eq theorem setLaverage_eq' (f : α → ℝ≥0∞) (s : Set α) : ⨍⁻ x in s, f x ∂μ = ∫⁻ x, f x ∂(μ s)⁻¹ • μ.restrict s := by simp only [laverage_eq', restrict_apply_univ] #align measure_theory.set_laverage_eq' MeasureTheory.setLaverage_eq' variable {μ} theorem laverage_congr {f g : α → ℝ≥0∞} (h : f =ᵐ[μ] g) : ⨍⁻ x, f x ∂μ = ⨍⁻ x, g x ∂μ := by simp only [laverage_eq, lintegral_congr_ae h] #align measure_theory.laverage_congr MeasureTheory.laverage_congr theorem setLaverage_congr (h : s =ᵐ[μ] t) : ⨍⁻ x in s, f x ∂μ = ⨍⁻ x in t, f x ∂μ := by simp only [setLaverage_eq, set_lintegral_congr h, measure_congr h] #align measure_theory.set_laverage_congr MeasureTheory.setLaverage_congr theorem setLaverage_congr_fun (hs : MeasurableSet s) (h : ∀ᵐ x ∂μ, x ∈ s → f x = g x) : ⨍⁻ x in s, f x ∂μ = ⨍⁻ x in s, g x ∂μ := by simp only [laverage_eq, set_lintegral_congr_fun hs h] #align measure_theory.set_laverage_congr_fun MeasureTheory.setLaverage_congr_fun theorem laverage_lt_top (hf : ∫⁻ x, f x ∂μ ≠ ∞) : ⨍⁻ x, f x ∂μ < ∞ := by obtain rfl \| hμ := eq_or_ne μ 0 · simp · rw [laverage_eq] exact div_lt_top hf (measure_univ_ne_zero.2 hμ) #align measure_theory.laverage_lt_top MeasureTheory.laverage_lt_top theorem setLaverage_lt_top : ∫⁻ x in s, f x ∂μ ≠ ∞ → ⨍⁻ x in s, f x ∂μ < ∞ := laverage_lt_top #align measure_theory.set_laverage_lt_top MeasureTheory.setLaverage_lt_top theorem laverage_add_measure : ⨍⁻ x, f x ∂(μ + ν) = μ univ / (μ univ + ν univ) * ⨍⁻ x, f x ∂μ + ν univ / (μ univ + ν univ) * ⨍⁻ x, f x ∂ν := by by_cases hμ : IsFiniteMeasure μ; swap · rw [not_isFiniteMeasure_iff] at hμ simp [laverage_eq, hμ] by_cases hν : IsFiniteMeasure ν; swap · rw [not_isFiniteMeasure_iff] at hν simp [laverage_eq, hν] haveI := hμ; haveI := hν simp only [← ENNReal.mul_div_right_comm, measure_mul_laverage, ← ENNReal.add_div, ← lintegral_add_measure, ← Measure.add_apply, ← laverage_eq] #align measure_theory.laverage_add_measure MeasureTheory.laverage_add_measure theorem measure_mul_setLaverage (f : α → ℝ≥0∞) (h : μ s ≠ ∞) : μ s * ⨍⁻ x in s, f x ∂μ = ∫⁻ x in s, f x ∂μ := by have := Fact.mk h.lt_top rw [← measure_mul_laverage, restrict_apply_univ] #align measure_theory.measure_mul_set_laverage MeasureTheory.measure_mul_setLaverage theorem laverage_union (hd : AEDisjoint μ s t) (ht : NullMeasurableSet t μ) : ⨍⁻ x in s ∪ t, f x ∂μ = μ s / (μ s + μ t) * ⨍⁻ x in s, f x ∂μ + μ t / (μ s + μ t) * ⨍⁻ x in t, f x ∂μ := by rw [restrict_union₀ hd ht, laverage_add_measure, restrict_apply_univ, restrict_apply_univ] #align measure_theory.laverage_union MeasureTheory.laverage_union	Mathlib/MeasureTheory/Integral/Average.lean	195	202	theorem laverage_union_mem_openSegment (hd : AEDisjoint μ s t) (ht : NullMeasurableSet t μ) (hs₀ : μ s ≠ 0) (ht₀ : μ t ≠ 0) (hsμ : μ s ≠ ∞) (htμ : μ t ≠ ∞) : ⨍⁻ x in s ∪ t, f x ∂μ ∈ openSegment ℝ≥0∞ (⨍⁻ x in s, f x ∂μ) (⨍⁻ x in t, f x ∂μ) := by	refine ⟨μ s / (μ s + μ t), μ t / (μ s + μ t), ENNReal.div_pos hs₀ <\| add_ne_top.2 ⟨hsμ, htμ⟩, ENNReal.div_pos ht₀ <\| add_ne_top.2 ⟨hsμ, htμ⟩, ?_, (laverage_union hd ht).symm⟩ rw [← ENNReal.add_div, ENNReal.div_self (add_eq_zero.not.2 fun h => hs₀ h.1) (add_ne_top.2 ⟨hsμ, htμ⟩)]
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Joey van Langen, Casper Putz -/ import Mathlib.FieldTheory.Separable import Mathlib.RingTheory.IntegralDomain import Mathlib.Algebra.CharP.Reduced import Mathlib.Tactic.ApplyFun #align_import field_theory.finite.basic from "leanprover-community/mathlib"@"12a85fac627bea918960da036049d611b1a3ee43" /-! # Finite fields This file contains basic results about finite fields. Throughout most of this file, `K` denotes a finite field and `q` is notation for the cardinality of `K`. See `RingTheory.IntegralDomain` for the fact that the unit group of a finite field is a cyclic group, as well as the fact that every finite integral domain is a field (`Fintype.fieldOfDomain`). ## Main results 1. `Fintype.card_units`: The unit group of a finite field has cardinality `q - 1`. 2. `sum_pow_units`: The sum of `x^i`, where `x` ranges over the units of `K`, is - `q-1` if `q-1 ∣ i` - `0` otherwise 3. `FiniteField.card`: The cardinality `q` is a power of the characteristic of `K`. See `FiniteField.card'` for a variant. ## Notation Throughout most of this file, `K` denotes a finite field and `q` is notation for the cardinality of `K`. ## Implementation notes While `Fintype Kˣ` can be inferred from `Fintype K` in the presence of `DecidableEq K`, in this file we take the `Fintype Kˣ` argument directly to reduce the chance of typeclass diamonds, as `Fintype` carries data. -/ variable {K : Type} {R : Type} local notation "q" => Fintype.card K open Finset open scoped Polynomial namespace FiniteField section Polynomial variable [CommRing R] [IsDomain R] open Polynomial /-- The cardinality of a field is at most `n` times the cardinality of the image of a degree `n` polynomial -/ theorem card_image_polynomial_eval [DecidableEq R] [Fintype R] {p : R[X]} (hp : 0 < p.degree) : Fintype.card R ≤ natDegree p * (univ.image fun x => eval x p).card := Finset.card_le_mul_card_image _ _ (fun a _ => calc _ = (p - C a).roots.toFinset.card := congr_arg card (by simp [Finset.ext_iff, ← mem_roots_sub_C hp]) _ ≤ Multiset.card (p - C a).roots := Multiset.toFinset_card_le _ _ ≤ _ := card_roots_sub_C' hp) #align finite_field.card_image_polynomial_eval FiniteField.card_image_polynomial_eval /-- If `f` and `g` are quadratic polynomials, then the `f.eval a + g.eval b = 0` has a solution. -/ theorem exists_root_sum_quadratic [Fintype R] {f g : R[X]} (hf2 : degree f = 2) (hg2 : degree g = 2) (hR : Fintype.card R % 2 = 1) : ∃ a b, f.eval a + g.eval b = 0 := letI := Classical.decEq R suffices ¬Disjoint (univ.image fun x : R => eval x f) (univ.image fun x : R => eval x (-g)) by simp only [disjoint_left, mem_image] at this push_neg at this rcases this with ⟨x, ⟨a, _, ha⟩, ⟨b, _, hb⟩⟩ exact ⟨a, b, by rw [ha, ← hb, eval_neg, neg_add_self]⟩ fun hd : Disjoint _ _ => lt_irrefl (2 * ((univ.image fun x : R => eval x f) ∪ univ.image fun x : R => eval x (-g)).card) <\| calc 2 * ((univ.image fun x : R => eval x f) ∪ univ.image fun x : R => eval x (-g)).card ≤ 2 * Fintype.card R := Nat.mul_le_mul_left _ (Finset.card_le_univ _) _ = Fintype.card R + Fintype.card R := two_mul _ _ < natDegree f * (univ.image fun x : R => eval x f).card + natDegree (-g) * (univ.image fun x : R => eval x (-g)).card := (add_lt_add_of_lt_of_le (lt_of_le_of_ne (card_image_polynomial_eval (by rw [hf2]; decide)) (mt (congr_arg (· % 2)) (by simp [natDegree_eq_of_degree_eq_some hf2, hR]))) (card_image_polynomial_eval (by rw [degree_neg, hg2]; decide))) _ = 2 * ((univ.image fun x : R => eval x f) ∪ univ.image fun x : R => eval x (-g)).card := by rw [card_union_of_disjoint hd]; simp [natDegree_eq_of_degree_eq_some hf2, natDegree_eq_of_degree_eq_some hg2, mul_add] #align finite_field.exists_root_sum_quadratic FiniteField.exists_root_sum_quadratic end Polynomial theorem prod_univ_units_id_eq_neg_one [CommRing K] [IsDomain K] [Fintype Kˣ] : ∏ x : Kˣ, x = (-1 : Kˣ) := by classical have : (∏ x ∈ (@univ Kˣ _).erase (-1), x) = 1 := prod_involution (fun x _ => x⁻¹) (by simp) (fun a => by simp (config := { contextual := true }) [Units.inv_eq_self_iff]) (fun a => by simp [@inv_eq_iff_eq_inv _ _ a]) (by simp) rw [← insert_erase (mem_univ (-1 : Kˣ)), prod_insert (not_mem_erase _ _), this, mul_one] #align finite_field.prod_univ_units_id_eq_neg_one FiniteField.prod_univ_units_id_eq_neg_one set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532 theorem card_cast_subgroup_card_ne_zero [Ring K] [NoZeroDivisors K] [Nontrivial K] (G : Subgroup Kˣ) [Fintype G] : (Fintype.card G : K) ≠ 0 := by let n := Fintype.card G intro nzero have ⟨p, char_p⟩ := CharP.exists K have hd : p ∣ n := (CharP.cast_eq_zero_iff K p n).mp nzero cases CharP.char_is_prime_or_zero K p with \| inr pzero => exact (Fintype.card_pos).ne' <\| Nat.eq_zero_of_zero_dvd <\| pzero ▸ hd \| inl pprime => have fact_pprime := Fact.mk pprime -- G has an element x of order p by Cauchy's theorem have ⟨x, hx⟩ := exists_prime_orderOf_dvd_card p hd -- F has an element u (= ↑↑x) of order p let u := ((x : Kˣ) : K) have hu : orderOf u = p := by rwa [orderOf_units, Subgroup.orderOf_coe] -- u ^ p = 1 implies (u - 1) ^ p = 0 and hence u = 1 ... have h : u = 1 := by rw [← sub_left_inj, sub_self 1] apply pow_eq_zero (n := p) rw [sub_pow_char_of_commute, one_pow, ← hu, pow_orderOf_eq_one, sub_self] exact Commute.one_right u -- ... meaning x didn't have order p after all, contradiction apply pprime.one_lt.ne rw [← hu, h, orderOf_one] /-- The sum of a nontrivial subgroup of the units of a field is zero. -/ theorem sum_subgroup_units_eq_zero [Ring K] [NoZeroDivisors K] {G : Subgroup Kˣ} [Fintype G] (hg : G ≠ ⊥) : ∑ x : G, (x.val : K) = 0 := by rw [Subgroup.ne_bot_iff_exists_ne_one] at hg rcases hg with ⟨a, ha⟩ -- The action of a on G as an embedding let a_mul_emb : G ↪ G := mulLeftEmbedding a -- ... and leaves G unchanged have h_unchanged : Finset.univ.map a_mul_emb = Finset.univ := by simp -- Therefore the sum of x over a G is the sum of a x over G have h_sum_map := Finset.univ.sum_map a_mul_emb fun x => ((x : Kˣ) : K) -- ... and the former is the sum of x over G. -- By algebraic manipulation, we have Σ G, x = ∑ G, a x = a ∑ G, x simp only [a_mul_emb, h_unchanged, Function.Embedding.coeFn_mk, Function.Embedding.toFun_eq_coe, mulLeftEmbedding_apply, Submonoid.coe_mul, Subgroup.coe_toSubmonoid, Units.val_mul, ← Finset.mul_sum] at h_sum_map -- thus one of (a - 1) or ∑ G, x is zero have hzero : (((a : Kˣ) : K) - 1) = 0 ∨ ∑ x : ↥G, ((x : Kˣ) : K) = 0 := by rw [← mul_eq_zero, sub_mul, ← h_sum_map, one_mul, sub_self] apply Or.resolve_left hzero contrapose! ha ext rwa [← sub_eq_zero] /-- The sum of a subgroup of the units of a field is 1 if the subgroup is trivial and 1 otherwise -/ @[simp] theorem sum_subgroup_units [Ring K] [NoZeroDivisors K] {G : Subgroup Kˣ} [Fintype G] [Decidable (G = ⊥)] : ∑ x : G, (x.val : K) = if G = ⊥ then 1 else 0 := by by_cases G_bot : G = ⊥ · subst G_bot simp only [ite_true, Subgroup.mem_bot, Fintype.card_ofSubsingleton, Nat.cast_ite, Nat.cast_one, Nat.cast_zero, univ_unique, Set.default_coe_singleton, sum_singleton, Units.val_one] · simp only [G_bot, ite_false] exact sum_subgroup_units_eq_zero G_bot @[simp] theorem sum_subgroup_pow_eq_zero [CommRing K] [NoZeroDivisors K] {G : Subgroup Kˣ} [Fintype G] {k : ℕ} (k_pos : k ≠ 0) (k_lt_card_G : k < Fintype.card G) : ∑ x : G, ((x : Kˣ) : K) ^ k = 0 := by nontriviality K have := NoZeroDivisors.to_isDomain K rcases (exists_pow_ne_one_of_isCyclic k_pos k_lt_card_G) with ⟨a, ha⟩ rw [Finset.sum_eq_multiset_sum] have h_multiset_map : Finset.univ.val.map (fun x : G => ((x : Kˣ) : K) ^ k) = Finset.univ.val.map (fun x : G => ((x : Kˣ) : K) ^ k * ((a : Kˣ) : K) ^ k) := by simp_rw [← mul_pow] have as_comp : (fun x : ↥G => (((x : Kˣ) : K) * ((a : Kˣ) : K)) ^ k) = (fun x : ↥G => ((x : Kˣ) : K) ^ k) ∘ fun x : ↥G => x * a := by funext x simp only [Function.comp_apply, Submonoid.coe_mul, Subgroup.coe_toSubmonoid, Units.val_mul] rw [as_comp, ← Multiset.map_map] congr rw [eq_comm] exact Multiset.map_univ_val_equiv (Equiv.mulRight a) have h_multiset_map_sum : (Multiset.map (fun x : G => ((x : Kˣ) : K) ^ k) Finset.univ.val).sum = (Multiset.map (fun x : G => ((x : Kˣ) : K) ^ k * ((a : Kˣ) : K) ^ k) Finset.univ.val).sum := by rw [h_multiset_map] rw [Multiset.sum_map_mul_right] at h_multiset_map_sum have hzero : (((a : Kˣ) : K) ^ k - 1 : K) * (Multiset.map (fun i : G => (i.val : K) ^ k) Finset.univ.val).sum = 0 := by rw [sub_mul, mul_comm, ← h_multiset_map_sum, one_mul, sub_self] rw [mul_eq_zero] at hzero refine hzero.resolve_left fun h => ha ?_ ext rw [← sub_eq_zero] simp_rw [SubmonoidClass.coe_pow, Units.val_pow_eq_pow_val, OneMemClass.coe_one, Units.val_one, h] section variable [GroupWithZero K] [Fintype K] theorem pow_card_sub_one_eq_one (a : K) (ha : a ≠ 0) : a ^ (q - 1) = 1 := by calc a ^ (Fintype.card K - 1) = (Units.mk0 a ha ^ (Fintype.card K - 1) : Kˣ).1 := by rw [Units.val_pow_eq_pow_val, Units.val_mk0] _ = 1 := by classical rw [← Fintype.card_units, pow_card_eq_one] rfl #align finite_field.pow_card_sub_one_eq_one FiniteField.pow_card_sub_one_eq_one theorem pow_card (a : K) : a ^ q = a := by by_cases h : a = 0; · rw [h]; apply zero_pow Fintype.card_ne_zero rw [← Nat.succ_pred_eq_of_pos Fintype.card_pos, pow_succ, Nat.pred_eq_sub_one, pow_card_sub_one_eq_one a h, one_mul] #align finite_field.pow_card FiniteField.pow_card theorem pow_card_pow (n : ℕ) (a : K) : a ^ q ^ n = a := by induction' n with n ih · simp · simp [pow_succ, pow_mul, ih, pow_card] #align finite_field.pow_card_pow FiniteField.pow_card_pow end variable (K) [Field K] [Fintype K] theorem card (p : ℕ) [CharP K p] : ∃ n : ℕ+, Nat.Prime p ∧ q = p ^ (n : ℕ) := by haveI hp : Fact p.Prime := ⟨CharP.char_is_prime K p⟩ letI : Module (ZMod p) K := { (ZMod.castHom dvd_rfl K : ZMod p →+* _).toModule with } obtain ⟨n, h⟩ := VectorSpace.card_fintype (ZMod p) K rw [ZMod.card] at h refine ⟨⟨n, ?_⟩, hp.1, h⟩ apply Or.resolve_left (Nat.eq_zero_or_pos n) rintro rfl rw [pow_zero] at h have : (0 : K) = 1 := by apply Fintype.card_le_one_iff.mp (le_of_eq h) exact absurd this zero_ne_one #align finite_field.card FiniteField.card -- this statement doesn't use `q` because we want `K` to be an explicit parameter theorem card' : ∃ (p : ℕ) (n : ℕ+), Nat.Prime p ∧ Fintype.card K = p ^ (n : ℕ) := let ⟨p, hc⟩ := CharP.exists K ⟨p, @FiniteField.card K _ _ p hc⟩ #align finite_field.card' FiniteField.card' -- Porting note: this was a `simp` lemma with a 5 lines proof. theorem cast_card_eq_zero : (q : K) = 0 := by simp #align finite_field.cast_card_eq_zero FiniteField.cast_card_eq_zero theorem forall_pow_eq_one_iff (i : ℕ) : (∀ x : Kˣ, x ^ i = 1) ↔ q - 1 ∣ i := by classical obtain ⟨x, hx⟩ := IsCyclic.exists_generator (α := Kˣ) rw [← Fintype.card_units, ← orderOf_eq_card_of_forall_mem_zpowers hx, orderOf_dvd_iff_pow_eq_one] constructor · intro h; apply h · intro h y simp_rw [← mem_powers_iff_mem_zpowers] at hx rcases hx y with ⟨j, rfl⟩ rw [← pow_mul, mul_comm, pow_mul, h, one_pow] #align finite_field.forall_pow_eq_one_iff FiniteField.forall_pow_eq_one_iff /-- The sum of `x ^ i` as `x` ranges over the units of a finite field of cardinality `q` is equal to `0` unless `(q - 1) ∣ i`, in which case the sum is `q - 1`. -/ theorem sum_pow_units [DecidableEq K] (i : ℕ) : (∑ x : Kˣ, (x ^ i : K)) = if q - 1 ∣ i then -1 else 0 := by let φ : Kˣ →* K := { toFun := fun x => x ^ i map_one' := by simp map_mul' := by intros; simp [mul_pow] } have : Decidable (φ = 1) := by classical infer_instance calc (∑ x : Kˣ, φ x) = if φ = 1 then Fintype.card Kˣ else 0 := sum_hom_units φ _ = if q - 1 ∣ i then -1 else 0 := by suffices q - 1 ∣ i ↔ φ = 1 by simp only [this] split_ifs; swap · exact Nat.cast_zero · rw [Fintype.card_units, Nat.cast_sub, cast_card_eq_zero, Nat.cast_one, zero_sub] show 1 ≤ q; exact Fintype.card_pos_iff.mpr ⟨0⟩ rw [← forall_pow_eq_one_iff, DFunLike.ext_iff] apply forall_congr'; intro x; simp [φ, Units.ext_iff] #align finite_field.sum_pow_units FiniteField.sum_pow_units /-- The sum of `x ^ i` as `x` ranges over a finite field of cardinality `q` is equal to `0` if `i < q - 1`. -/ theorem sum_pow_lt_card_sub_one (i : ℕ) (h : i < q - 1) : ∑ x : K, x ^ i = 0 := by by_cases hi : i = 0 · simp only [hi, nsmul_one, sum_const, pow_zero, card_univ, cast_card_eq_zero] classical have hiq : ¬q - 1 ∣ i := by contrapose! h; exact Nat.le_of_dvd (Nat.pos_of_ne_zero hi) h let φ : Kˣ ↪ K := ⟨fun x ↦ x, Units.ext⟩ have : univ.map φ = univ \ {0} := by ext x simpa only [mem_map, mem_univ, Function.Embedding.coeFn_mk, true_and_iff, mem_sdiff, mem_singleton, φ] using isUnit_iff_ne_zero calc ∑ x : K, x ^ i = ∑ x ∈ univ \ {(0 : K)}, x ^ i := by rw [← sum_sdiff ({0} : Finset K).subset_univ, sum_singleton, zero_pow hi, add_zero] _ = ∑ x : Kˣ, (x ^ i : K) := by simp [φ, ← this, univ.sum_map φ] _ = 0 := by rw [sum_pow_units K i, if_neg]; exact hiq #align finite_field.sum_pow_lt_card_sub_one FiniteField.sum_pow_lt_card_sub_one open Polynomial section variable (K' : Type) [Field K'] {p n : ℕ} theorem X_pow_card_sub_X_natDegree_eq (hp : 1 < p) : (X ^ p - X : K'[X]).natDegree = p := by have h1 : (X : K'[X]).degree < (X ^ p : K'[X]).degree := by rw [degree_X_pow, degree_X] exact mod_cast hp rw [natDegree_eq_of_degree_eq (degree_sub_eq_left_of_degree_lt h1), natDegree_X_pow] set_option linter.uppercaseLean3 false in #align finite_field.X_pow_card_sub_X_nat_degree_eq FiniteField.X_pow_card_sub_X_natDegree_eq theorem X_pow_card_pow_sub_X_natDegree_eq (hn : n ≠ 0) (hp : 1 < p) : (X ^ p ^ n - X : K'[X]).natDegree = p ^ n := X_pow_card_sub_X_natDegree_eq K' <\| Nat.one_lt_pow hn hp set_option linter.uppercaseLean3 false in #align finite_field.X_pow_card_pow_sub_X_nat_degree_eq FiniteField.X_pow_card_pow_sub_X_natDegree_eq theorem X_pow_card_sub_X_ne_zero (hp : 1 < p) : (X ^ p - X : K'[X]) ≠ 0 := ne_zero_of_natDegree_gt <\| calc 1 < _ := hp _ = _ := (X_pow_card_sub_X_natDegree_eq K' hp).symm set_option linter.uppercaseLean3 false in #align finite_field.X_pow_card_sub_X_ne_zero FiniteField.X_pow_card_sub_X_ne_zero theorem X_pow_card_pow_sub_X_ne_zero (hn : n ≠ 0) (hp : 1 < p) : (X ^ p ^ n - X : K'[X]) ≠ 0 := X_pow_card_sub_X_ne_zero K' <\| Nat.one_lt_pow hn hp set_option linter.uppercaseLean3 false in #align finite_field.X_pow_card_pow_sub_X_ne_zero FiniteField.X_pow_card_pow_sub_X_ne_zero end variable (p : ℕ) [Fact p.Prime] [Algebra (ZMod p) K] theorem roots_X_pow_card_sub_X : roots (X ^ q - X : K[X]) = Finset.univ.val := by classical have aux : (X ^ q - X : K[X]) ≠ 0 := X_pow_card_sub_X_ne_zero K Fintype.one_lt_card have : (roots (X ^ q - X : K[X])).toFinset = Finset.univ := by rw [eq_univ_iff_forall] intro x rw [Multiset.mem_toFinset, mem_roots aux, IsRoot.def, eval_sub, eval_pow, eval_X, sub_eq_zero, pow_card] rw [← this, Multiset.toFinset_val, eq_comm, Multiset.dedup_eq_self] apply nodup_roots rw [separable_def] convert isCoprime_one_right.neg_right (R := K[X]) using 1 rw [derivative_sub, derivative_X, derivative_X_pow, Nat.cast_card_eq_zero K, C_0, zero_mul, zero_sub] set_option linter.uppercaseLean3 false in #align finite_field.roots_X_pow_card_sub_X FiniteField.roots_X_pow_card_sub_X variable {K} theorem frobenius_pow {p : ℕ} [Fact p.Prime] [CharP K p] {n : ℕ} (hcard : q = p ^ n) : frobenius K p ^ n = 1 := by ext x; conv_rhs => rw [RingHom.one_def, RingHom.id_apply, ← pow_card x, hcard] clear hcard induction' n with n hn · simp · rw [pow_succ', pow_succ, pow_mul, RingHom.mul_def, RingHom.comp_apply, frobenius_def, hn] #align finite_field.frobenius_pow FiniteField.frobenius_pow open Polynomial theorem expand_card (f : K[X]) : expand K q f = f ^ q := by cases' CharP.exists K with p hp letI := hp rcases FiniteField.card K p with ⟨⟨n, npos⟩, ⟨hp, hn⟩⟩ haveI : Fact p.Prime := ⟨hp⟩ dsimp at hn rw [hn, ← map_expand_pow_char, frobenius_pow hn, RingHom.one_def, map_id] #align finite_field.expand_card FiniteField.expand_card end FiniteField namespace ZMod open FiniteField Polynomial theorem sq_add_sq (p : ℕ) [hp : Fact p.Prime] (x : ZMod p) : ∃ a b : ZMod p, a ^ 2 + b ^ 2 = x := by cases' hp.1.eq_two_or_odd with hp2 hp_odd · subst p change Fin 2 at x fin_cases x · use 0; simp · use 0, 1; simp let f : (ZMod p)[X] := X ^ 2 let g : (ZMod p)[X] := X ^ 2 - C x obtain ⟨a, b, hab⟩ : ∃ a b, f.eval a + g.eval b = 0 := @exists_root_sum_quadratic _ _ _ _ f g (degree_X_pow 2) (degree_X_pow_sub_C (by decide) _) (by rw [ZMod.card, hp_odd]) refine ⟨a, b, ?_⟩ rw [← sub_eq_zero] simpa only [f, g, eval_C, eval_X, eval_pow, eval_sub, ← add_sub_assoc] using hab #align zmod.sq_add_sq ZMod.sq_add_sq end ZMod /-- If `p` is a prime natural number and `x` is an integer number, then there exist natural numbers `a ≤ p / 2` and `b ≤ p / 2` such that `a ^ 2 + b ^ 2 ≡ x [ZMOD p]`. This is a version of `ZMod.sq_add_sq` with estimates on `a` and `b`. -/ theorem Nat.sq_add_sq_zmodEq (p : ℕ) [Fact p.Prime] (x : ℤ) : ∃ a b : ℕ, a ≤ p / 2 ∧ b ≤ p / 2 ∧ (a : ℤ) ^ 2 + (b : ℤ) ^ 2 ≡ x [ZMOD p] := by rcases ZMod.sq_add_sq p x with ⟨a, b, hx⟩ refine ⟨a.valMinAbs.natAbs, b.valMinAbs.natAbs, ZMod.natAbs_valMinAbs_le _, ZMod.natAbs_valMinAbs_le _, ?_⟩ rw [← a.coe_valMinAbs, ← b.coe_valMinAbs] at hx push_cast rw [sq_abs, sq_abs, ← ZMod.intCast_eq_intCast_iff] exact mod_cast hx /-- If `p` is a prime natural number and `x` is a natural number, then there exist natural numbers `a ≤ p / 2` and `b ≤ p / 2` such that `a ^ 2 + b ^ 2 ≡ x [MOD p]`. This is a version of `ZMod.sq_add_sq` with estimates on `a` and `b`. -/ theorem Nat.sq_add_sq_modEq (p : ℕ) [Fact p.Prime] (x : ℕ) : ∃ a b : ℕ, a ≤ p / 2 ∧ b ≤ p / 2 ∧ a ^ 2 + b ^ 2 ≡ x [MOD p] := by simpa only [← Int.natCast_modEq_iff] using Nat.sq_add_sq_zmodEq p x namespace CharP theorem sq_add_sq (R : Type) [CommRing R] [IsDomain R] (p : ℕ) [NeZero p] [CharP R p] (x : ℤ) : ∃ a b : ℕ, ((a : R) ^ 2 + (b : R) ^ 2) = x := by haveI := char_is_prime_of_pos R p obtain ⟨a, b, hab⟩ := ZMod.sq_add_sq p x refine ⟨a.val, b.val, ?_⟩ simpa using congr_arg (ZMod.castHom dvd_rfl R) hab #align char_p.sq_add_sq CharP.sq_add_sq end CharP open scoped Nat open ZMod /-- The Fermat-Euler totient theorem. `Nat.ModEq.pow_totient` is an alternative statement of the same theorem. -/ @[simp] theorem ZMod.pow_totient {n : ℕ} (x : (ZMod n)ˣ) : x ^ φ n = 1 := by cases n · rw [Nat.totient_zero, pow_zero] · rw [← card_units_eq_totient, pow_card_eq_one] #align zmod.pow_totient ZMod.pow_totient /-- The Fermat-Euler totient theorem. `ZMod.pow_totient` is an alternative statement of the same theorem. -/ theorem Nat.ModEq.pow_totient {x n : ℕ} (h : Nat.Coprime x n) : x ^ φ n ≡ 1 [MOD n] := by rw [← ZMod.eq_iff_modEq_nat] let x' : Units (ZMod n) := ZMod.unitOfCoprime _ h have := ZMod.pow_totient x' apply_fun ((fun (x : Units (ZMod n)) => (x : ZMod n)) : Units (ZMod n) → ZMod n) at this simpa only [Nat.succ_eq_add_one, Nat.cast_pow, Units.val_one, Nat.cast_one, coe_unitOfCoprime, Units.val_pow_eq_pow_val] #align nat.modeq.pow_totient Nat.ModEq.pow_totient /-- For each `n ≥ 0`, the unit group of `ZMod n` is finite. -/ instance instFiniteZModUnits : (n : ℕ) → Finite (ZMod n)ˣ \| 0 => Finite.of_fintype ℤˣ \| _ + 1 => inferInstance section variable {V : Type} [Fintype K] [DivisionRing K] [AddCommGroup V] [Module K V] -- should this go in a namespace? -- finite_dimensional would be natural, -- but we don't assume it... theorem card_eq_pow_finrank [Fintype V] : Fintype.card V = q ^ FiniteDimensional.finrank K V := by let b := IsNoetherian.finsetBasis K V rw [Module.card_fintype b, ← FiniteDimensional.finrank_eq_card_basis b] #align card_eq_pow_finrank card_eq_pow_finrank end open FiniteField namespace ZMod /-- A variation on Fermat's little theorem. See `ZMod.pow_card_sub_one_eq_one` -/ @[simp] theorem pow_card {p : ℕ} [Fact p.Prime] (x : ZMod p) : x ^ p = x := by have h := FiniteField.pow_card x; rwa [ZMod.card p] at h #align zmod.pow_card ZMod.pow_card @[simp] theorem pow_card_pow {n p : ℕ} [Fact p.Prime] (x : ZMod p) : x ^ p ^ n = x := by induction' n with n ih · simp · simp [pow_succ, pow_mul, ih, pow_card] #align zmod.pow_card_pow ZMod.pow_card_pow @[simp] theorem frobenius_zmod (p : ℕ) [Fact p.Prime] : frobenius (ZMod p) p = RingHom.id _ := by ext a rw [frobenius_def, ZMod.pow_card, RingHom.id_apply] #align zmod.frobenius_zmod ZMod.frobenius_zmod -- Porting note: this was a `simp` lemma, but now the LHS simplify to `φ p`. theorem card_units (p : ℕ) [Fact p.Prime] : Fintype.card (ZMod p)ˣ = p - 1 := by rw [Fintype.card_units, card] #align zmod.card_units ZMod.card_units /-- Fermat's Little Theorem: for every unit `a` of `ZMod p`, we have `a ^ (p - 1) = 1`. -/ theorem units_pow_card_sub_one_eq_one (p : ℕ) [Fact p.Prime] (a : (ZMod p)ˣ) : a ^ (p - 1) = 1 := by rw [← card_units p, pow_card_eq_one] #align zmod.units_pow_card_sub_one_eq_one ZMod.units_pow_card_sub_one_eq_one /-- Fermat's Little Theorem*: for all nonzero `a : ZMod p`, we have `a ^ (p - 1) = 1`. -/ theorem pow_card_sub_one_eq_one {p : ℕ} [Fact p.Prime] {a : ZMod p} (ha : a ≠ 0) : a ^ (p - 1) = 1 := by have h := FiniteField.pow_card_sub_one_eq_one a ha rwa [ZMod.card p] at h #align zmod.pow_card_sub_one_eq_one ZMod.pow_card_sub_one_eq_one theorem orderOf_units_dvd_card_sub_one {p : ℕ} [Fact p.Prime] (u : (ZMod p)ˣ) : orderOf u ∣ p - 1 := orderOf_dvd_of_pow_eq_one <\| units_pow_card_sub_one_eq_one _ _ #align zmod.order_of_units_dvd_card_sub_one ZMod.orderOf_units_dvd_card_sub_one theorem orderOf_dvd_card_sub_one {p : ℕ} [Fact p.Prime] {a : ZMod p} (ha : a ≠ 0) : orderOf a ∣ p - 1 := orderOf_dvd_of_pow_eq_one <\| pow_card_sub_one_eq_one ha #align zmod.order_of_dvd_card_sub_one ZMod.orderOf_dvd_card_sub_one open Polynomial	Mathlib/FieldTheory/Finite/Basic.lean	547	548	theorem expand_card {p : ℕ} [Fact p.Prime] (f : Polynomial (ZMod p)) : expand (ZMod p) p f = f ^ p := by	have h := FiniteField.expand_card f; rwa [ZMod.card p] at h
/- Copyright (c) 2021 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Algebra.GroupWithZero.Indicator import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Instances.ENNReal #align_import topology.semicontinuous from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" /-! # Semicontinuous maps A function `f` from a topological space `α` to an ordered space `β` is lower semicontinuous at a point `x` if, for any `y < f x`, for any `x'` close enough to `x`, one has `f x' > y`. In other words, `f` can jump up, but it can not jump down. Upper semicontinuous functions are defined similarly. This file introduces these notions, and a basic API around them mimicking the API for continuous functions. ## Main definitions and results We introduce 4 definitions related to lower semicontinuity: * `LowerSemicontinuousWithinAt f s x` * `LowerSemicontinuousAt f x` * `LowerSemicontinuousOn f s` * `LowerSemicontinuous f` We build a basic API using dot notation around these notions, and we prove that * constant functions are lower semicontinuous; * `indicator s (fun _ ↦ y)` is lower semicontinuous when `s` is open and `0 ≤ y`, or when `s` is closed and `y ≤ 0`; * continuous functions are lower semicontinuous; * left composition with a continuous monotone functions maps lower semicontinuous functions to lower semicontinuous functions. If the function is anti-monotone, it instead maps lower semicontinuous functions to upper semicontinuous functions; * right composition with continuous functions preserves lower and upper semicontinuity; * a sum of two (or finitely many) lower semicontinuous functions is lower semicontinuous; * a supremum of a family of lower semicontinuous functions is lower semicontinuous; * An infinite sum of `ℝ≥0∞`-valued lower semicontinuous functions is lower semicontinuous. Similar results are stated and proved for upper semicontinuity. We also prove that a function is continuous if and only if it is both lower and upper semicontinuous. We have some equivalent definitions of lower- and upper-semicontinuity (under certain restrictions on the order on the codomain): * `lowerSemicontinuous_iff_isOpen_preimage` in a linear order; * `lowerSemicontinuous_iff_isClosed_preimage` in a linear order; * `lowerSemicontinuousAt_iff_le_liminf` in a dense complete linear order; * `lowerSemicontinuous_iff_isClosed_epigraph` in a dense complete linear order with the order topology. ## Implementation details All the nontrivial results for upper semicontinuous functions are deduced from the corresponding ones for lower semicontinuous functions using `OrderDual`. ## References * <https://en.wikipedia.org/wiki/Closed_convex_function> * <https://en.wikipedia.org/wiki/Semi-continuity> -/ open Topology ENNReal open Set Function Filter variable {α : Type} [TopologicalSpace α] {β : Type} [Preorder β] {f g : α → β} {x : α} {s t : Set α} {y z : β} /-! ### Main definitions -/ /-- A real function `f` is lower semicontinuous at `x` within a set `s` if, for any `ε > 0`, for all `x'` close enough to `x` in `s`, then `f x'` is at least `f x - ε`. We formulate this in a general preordered space, using an arbitrary `y < f x` instead of `f x - ε`. -/ def LowerSemicontinuousWithinAt (f : α → β) (s : Set α) (x : α) := ∀ y < f x, ∀ᶠ x' in 𝓝[s] x, y < f x' #align lower_semicontinuous_within_at LowerSemicontinuousWithinAt /-- A real function `f` is lower semicontinuous on a set `s` if, for any `ε > 0`, for any `x ∈ s`, for all `x'` close enough to `x` in `s`, then `f x'` is at least `f x - ε`. We formulate this in a general preordered space, using an arbitrary `y < f x` instead of `f x - ε`. -/ def LowerSemicontinuousOn (f : α → β) (s : Set α) := ∀ x ∈ s, LowerSemicontinuousWithinAt f s x #align lower_semicontinuous_on LowerSemicontinuousOn /-- A real function `f` is lower semicontinuous at `x` if, for any `ε > 0`, for all `x'` close enough to `x`, then `f x'` is at least `f x - ε`. We formulate this in a general preordered space, using an arbitrary `y < f x` instead of `f x - ε`. -/ def LowerSemicontinuousAt (f : α → β) (x : α) := ∀ y < f x, ∀ᶠ x' in 𝓝 x, y < f x' #align lower_semicontinuous_at LowerSemicontinuousAt /-- A real function `f` is lower semicontinuous if, for any `ε > 0`, for any `x`, for all `x'` close enough to `x`, then `f x'` is at least `f x - ε`. We formulate this in a general preordered space, using an arbitrary `y < f x` instead of `f x - ε`. -/ def LowerSemicontinuous (f : α → β) := ∀ x, LowerSemicontinuousAt f x #align lower_semicontinuous LowerSemicontinuous /-- A real function `f` is upper semicontinuous at `x` within a set `s` if, for any `ε > 0`, for all `x'` close enough to `x` in `s`, then `f x'` is at most `f x + ε`. We formulate this in a general preordered space, using an arbitrary `y > f x` instead of `f x + ε`. -/ def UpperSemicontinuousWithinAt (f : α → β) (s : Set α) (x : α) := ∀ y, f x < y → ∀ᶠ x' in 𝓝[s] x, f x' < y #align upper_semicontinuous_within_at UpperSemicontinuousWithinAt /-- A real function `f` is upper semicontinuous on a set `s` if, for any `ε > 0`, for any `x ∈ s`, for all `x'` close enough to `x` in `s`, then `f x'` is at most `f x + ε`. We formulate this in a general preordered space, using an arbitrary `y > f x` instead of `f x + ε`. -/ def UpperSemicontinuousOn (f : α → β) (s : Set α) := ∀ x ∈ s, UpperSemicontinuousWithinAt f s x #align upper_semicontinuous_on UpperSemicontinuousOn /-- A real function `f` is upper semicontinuous at `x` if, for any `ε > 0`, for all `x'` close enough to `x`, then `f x'` is at most `f x + ε`. We formulate this in a general preordered space, using an arbitrary `y > f x` instead of `f x + ε`. -/ def UpperSemicontinuousAt (f : α → β) (x : α) := ∀ y, f x < y → ∀ᶠ x' in 𝓝 x, f x' < y #align upper_semicontinuous_at UpperSemicontinuousAt /-- A real function `f` is upper semicontinuous if, for any `ε > 0`, for any `x`, for all `x'` close enough to `x`, then `f x'` is at most `f x + ε`. We formulate this in a general preordered space, using an arbitrary `y > f x` instead of `f x + ε`. -/ def UpperSemicontinuous (f : α → β) := ∀ x, UpperSemicontinuousAt f x #align upper_semicontinuous UpperSemicontinuous /-! ### Lower semicontinuous functions -/ /-! #### Basic dot notation interface for lower semicontinuity -/ theorem LowerSemicontinuousWithinAt.mono (h : LowerSemicontinuousWithinAt f s x) (hst : t ⊆ s) : LowerSemicontinuousWithinAt f t x := fun y hy => Filter.Eventually.filter_mono (nhdsWithin_mono _ hst) (h y hy) #align lower_semicontinuous_within_at.mono LowerSemicontinuousWithinAt.mono theorem lowerSemicontinuousWithinAt_univ_iff : LowerSemicontinuousWithinAt f univ x ↔ LowerSemicontinuousAt f x := by simp [LowerSemicontinuousWithinAt, LowerSemicontinuousAt, nhdsWithin_univ] #align lower_semicontinuous_within_at_univ_iff lowerSemicontinuousWithinAt_univ_iff theorem LowerSemicontinuousAt.lowerSemicontinuousWithinAt (s : Set α) (h : LowerSemicontinuousAt f x) : LowerSemicontinuousWithinAt f s x := fun y hy => Filter.Eventually.filter_mono nhdsWithin_le_nhds (h y hy) #align lower_semicontinuous_at.lower_semicontinuous_within_at LowerSemicontinuousAt.lowerSemicontinuousWithinAt theorem LowerSemicontinuousOn.lowerSemicontinuousWithinAt (h : LowerSemicontinuousOn f s) (hx : x ∈ s) : LowerSemicontinuousWithinAt f s x := h x hx #align lower_semicontinuous_on.lower_semicontinuous_within_at LowerSemicontinuousOn.lowerSemicontinuousWithinAt theorem LowerSemicontinuousOn.mono (h : LowerSemicontinuousOn f s) (hst : t ⊆ s) : LowerSemicontinuousOn f t := fun x hx => (h x (hst hx)).mono hst #align lower_semicontinuous_on.mono LowerSemicontinuousOn.mono theorem lowerSemicontinuousOn_univ_iff : LowerSemicontinuousOn f univ ↔ LowerSemicontinuous f := by simp [LowerSemicontinuousOn, LowerSemicontinuous, lowerSemicontinuousWithinAt_univ_iff] #align lower_semicontinuous_on_univ_iff lowerSemicontinuousOn_univ_iff theorem LowerSemicontinuous.lowerSemicontinuousAt (h : LowerSemicontinuous f) (x : α) : LowerSemicontinuousAt f x := h x #align lower_semicontinuous.lower_semicontinuous_at LowerSemicontinuous.lowerSemicontinuousAt theorem LowerSemicontinuous.lowerSemicontinuousWithinAt (h : LowerSemicontinuous f) (s : Set α) (x : α) : LowerSemicontinuousWithinAt f s x := (h x).lowerSemicontinuousWithinAt s #align lower_semicontinuous.lower_semicontinuous_within_at LowerSemicontinuous.lowerSemicontinuousWithinAt theorem LowerSemicontinuous.lowerSemicontinuousOn (h : LowerSemicontinuous f) (s : Set α) : LowerSemicontinuousOn f s := fun x _hx => h.lowerSemicontinuousWithinAt s x #align lower_semicontinuous.lower_semicontinuous_on LowerSemicontinuous.lowerSemicontinuousOn /-! #### Constants -/ theorem lowerSemicontinuousWithinAt_const : LowerSemicontinuousWithinAt (fun _x => z) s x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align lower_semicontinuous_within_at_const lowerSemicontinuousWithinAt_const theorem lowerSemicontinuousAt_const : LowerSemicontinuousAt (fun _x => z) x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align lower_semicontinuous_at_const lowerSemicontinuousAt_const theorem lowerSemicontinuousOn_const : LowerSemicontinuousOn (fun _x => z) s := fun _x _hx => lowerSemicontinuousWithinAt_const #align lower_semicontinuous_on_const lowerSemicontinuousOn_const theorem lowerSemicontinuous_const : LowerSemicontinuous fun _x : α => z := fun _x => lowerSemicontinuousAt_const #align lower_semicontinuous_const lowerSemicontinuous_const /-! #### Indicators -/ section variable [Zero β] theorem IsOpen.lowerSemicontinuous_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuous (indicator s fun _x => y) := by intro x z hz by_cases h : x ∈ s <;> simp [h] at hz · filter_upwards [hs.mem_nhds h] simp (config := { contextual := true }) [hz] · refine Filter.eventually_of_forall fun x' => ?_ by_cases h' : x' ∈ s <;> simp [h', hz.trans_le hy, hz] #align is_open.lower_semicontinuous_indicator IsOpen.lowerSemicontinuous_indicator theorem IsOpen.lowerSemicontinuousOn_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousOn (indicator s fun _x => y) t := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousOn t #align is_open.lower_semicontinuous_on_indicator IsOpen.lowerSemicontinuousOn_indicator theorem IsOpen.lowerSemicontinuousAt_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousAt (indicator s fun _x => y) x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousAt x #align is_open.lower_semicontinuous_at_indicator IsOpen.lowerSemicontinuousAt_indicator theorem IsOpen.lowerSemicontinuousWithinAt_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousWithinAt t x #align is_open.lower_semicontinuous_within_at_indicator IsOpen.lowerSemicontinuousWithinAt_indicator theorem IsClosed.lowerSemicontinuous_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuous (indicator s fun _x => y) := by intro x z hz by_cases h : x ∈ s <;> simp [h] at hz · refine Filter.eventually_of_forall fun x' => ?_ by_cases h' : x' ∈ s <;> simp [h', hz, hz.trans_le hy] · filter_upwards [hs.isOpen_compl.mem_nhds h] simp (config := { contextual := true }) [hz] #align is_closed.lower_semicontinuous_indicator IsClosed.lowerSemicontinuous_indicator theorem IsClosed.lowerSemicontinuousOn_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousOn (indicator s fun _x => y) t := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousOn t #align is_closed.lower_semicontinuous_on_indicator IsClosed.lowerSemicontinuousOn_indicator theorem IsClosed.lowerSemicontinuousAt_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousAt (indicator s fun _x => y) x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousAt x #align is_closed.lower_semicontinuous_at_indicator IsClosed.lowerSemicontinuousAt_indicator theorem IsClosed.lowerSemicontinuousWithinAt_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousWithinAt t x #align is_closed.lower_semicontinuous_within_at_indicator IsClosed.lowerSemicontinuousWithinAt_indicator end /-! #### Relationship with continuity -/ theorem lowerSemicontinuous_iff_isOpen_preimage : LowerSemicontinuous f ↔ ∀ y, IsOpen (f ⁻¹' Ioi y) := ⟨fun H y => isOpen_iff_mem_nhds.2 fun x hx => H x y hx, fun H _x y y_lt => IsOpen.mem_nhds (H y) y_lt⟩ #align lower_semicontinuous_iff_is_open_preimage lowerSemicontinuous_iff_isOpen_preimage theorem LowerSemicontinuous.isOpen_preimage (hf : LowerSemicontinuous f) (y : β) : IsOpen (f ⁻¹' Ioi y) := lowerSemicontinuous_iff_isOpen_preimage.1 hf y #align lower_semicontinuous.is_open_preimage LowerSemicontinuous.isOpen_preimage section variable {γ : Type*} [LinearOrder γ]	Mathlib/Topology/Semicontinuous.lean	283	286	theorem lowerSemicontinuous_iff_isClosed_preimage {f : α → γ} : LowerSemicontinuous f ↔ ∀ y, IsClosed (f ⁻¹' Iic y) := by	rw [lowerSemicontinuous_iff_isOpen_preimage] simp only [← isOpen_compl_iff, ← preimage_compl, compl_Iic]
/- Copyright (c) 2023 Michael Stoll. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Michael Geißer, Michael Stoll -/ import Mathlib.Tactic.Qify import Mathlib.Data.ZMod.Basic import Mathlib.NumberTheory.DiophantineApproximation import Mathlib.NumberTheory.Zsqrtd.Basic #align_import number_theory.pell from "leanprover-community/mathlib"@"7ad820c4997738e2f542f8a20f32911f52020e26" /-! # Pell's Equation Pell's Equation is the equation $x^2 - d y^2 = 1$, where $d$ is a positive integer that is not a square, and one is interested in solutions in integers $x$ and $y$. In this file, we aim at providing all of the essential theory of Pell's Equation for general $d$ (as opposed to the contents of `NumberTheory.PellMatiyasevic`, which is specific to the case $d = a^2 - 1$ for some $a > 1$). We begin by defining a type `Pell.Solution₁ d` for solutions of the equation, show that it has a natural structure as an abelian group, and prove some basic properties. We then prove the following Theorem. Let $d$ be a positive integer that is not a square. Then the equation $x^2 - d y^2 = 1$ has a nontrivial (i.e., with $y \ne 0$) solution in integers. See `Pell.exists_of_not_isSquare` and `Pell.Solution₁.exists_nontrivial_of_not_isSquare`. We then define the fundamental solution to be the solution with smallest $x$ among all solutions satisfying $x > 1$ and $y > 0$. We show that every solution is a power (in the sense of the group structure mentioned above) of the fundamental solution up to a (common) sign, see `Pell.IsFundamental.eq_zpow_or_neg_zpow`, and that a (positive) solution has this property if and only if it is fundamental, see `Pell.pos_generator_iff_fundamental`. ## References * [K. Ireland, M. Rosen, A classical introduction to modern number theory (Section 17.5)][IrelandRosen1990] ## Tags Pell's equation ## TODO * Extend to `x ^ 2 - d * y ^ 2 = -1` and further generalizations. * Connect solutions to the continued fraction expansion of `√d`. -/ namespace Pell /-! ### Group structure of the solution set We define a structure of a commutative multiplicative group with distributive negation on the set of all solutions to the Pell equation `x^2 - dy^2 = 1`. The type of such solutions is `Pell.Solution₁ d`. It corresponds to a pair of integers `x` and `y` and a proof that `(x, y)` is indeed a solution. The multiplication is given by `(x, y) (x', y') = (xy' + dyy', xy' + yx')`. This is obtained by mapping `(x, y)` to `x + y√d` and multiplying the results. In fact, we define `Pell.Solution₁ d` to be `↥(unitary (ℤ√d))` and transport the "commutative group with distributive negation" structure from `↥(unitary (ℤ√d))`. We then set up an API for `Pell.Solution₁ d`. -/ open Zsqrtd /-- An element of `ℤ√d` has norm one (i.e., `a.re^2 - da.im^2 = 1`) if and only if it is contained in the submonoid of unitary elements. TODO: merge this result with `Pell.isPell_iff_mem_unitary`. -/ theorem is_pell_solution_iff_mem_unitary {d : ℤ} {a : ℤ√d} : a.re ^ 2 - d a.im ^ 2 = 1 ↔ a ∈ unitary (ℤ√d) := by rw [← norm_eq_one_iff_mem_unitary, norm_def, sq, sq, ← mul_assoc] #align pell.is_pell_solution_iff_mem_unitary Pell.is_pell_solution_iff_mem_unitary -- We use `solution₁ d` to allow for a more general structure `solution d m` that -- encodes solutions to `x^2 - dy^2 = m` to be added later. /-- `Pell.Solution₁ d` is the type of solutions to the Pell equation `x^2 - dy^2 = 1`. We define this in terms of elements of `ℤ√d` of norm one. -/ def Solution₁ (d : ℤ) : Type := ↥(unitary (ℤ√d)) #align pell.solution₁ Pell.Solution₁ namespace Solution₁ variable {d : ℤ} -- Porting note(https://github.com/leanprover-community/mathlib4/issues/5020): manual deriving instance instCommGroup : CommGroup (Solution₁ d) := inferInstanceAs (CommGroup (unitary (ℤ√d))) #align pell.solution₁.comm_group Pell.Solution₁.instCommGroup instance instHasDistribNeg : HasDistribNeg (Solution₁ d) := inferInstanceAs (HasDistribNeg (unitary (ℤ√d))) #align pell.solution₁.has_distrib_neg Pell.Solution₁.instHasDistribNeg instance instInhabited : Inhabited (Solution₁ d) := inferInstanceAs (Inhabited (unitary (ℤ√d))) #align pell.solution₁.inhabited Pell.Solution₁.instInhabited instance : Coe (Solution₁ d) (ℤ√d) where coe := Subtype.val /-- The `x` component of a solution to the Pell equation `x^2 - dy^2 = 1` -/ protected def x (a : Solution₁ d) : ℤ := (a : ℤ√d).re #align pell.solution₁.x Pell.Solution₁.x /-- The `y` component of a solution to the Pell equation `x^2 - dy^2 = 1` -/ protected def y (a : Solution₁ d) : ℤ := (a : ℤ√d).im #align pell.solution₁.y Pell.Solution₁.y /-- The proof that `a` is a solution to the Pell equation `x^2 - dy^2 = 1` -/ theorem prop (a : Solution₁ d) : a.x ^ 2 - d a.y ^ 2 = 1 := is_pell_solution_iff_mem_unitary.mpr a.property #align pell.solution₁.prop Pell.Solution₁.prop /-- An alternative form of the equation, suitable for rewriting `x^2`. -/ theorem prop_x (a : Solution₁ d) : a.x ^ 2 = 1 + d * a.y ^ 2 := by rw [← a.prop]; ring #align pell.solution₁.prop_x Pell.Solution₁.prop_x /-- An alternative form of the equation, suitable for rewriting `d * y^2`. -/ theorem prop_y (a : Solution₁ d) : d * a.y ^ 2 = a.x ^ 2 - 1 := by rw [← a.prop]; ring #align pell.solution₁.prop_y Pell.Solution₁.prop_y /-- Two solutions are equal if their `x` and `y` components are equal. -/ @[ext] theorem ext {a b : Solution₁ d} (hx : a.x = b.x) (hy : a.y = b.y) : a = b := Subtype.ext <\| Zsqrtd.ext _ _ hx hy #align pell.solution₁.ext Pell.Solution₁.ext /-- Construct a solution from `x`, `y` and a proof that the equation is satisfied. -/ def mk (x y : ℤ) (prop : x ^ 2 - d * y ^ 2 = 1) : Solution₁ d where val := ⟨x, y⟩ property := is_pell_solution_iff_mem_unitary.mp prop #align pell.solution₁.mk Pell.Solution₁.mk @[simp] theorem x_mk (x y : ℤ) (prop : x ^ 2 - d * y ^ 2 = 1) : (mk x y prop).x = x := rfl #align pell.solution₁.x_mk Pell.Solution₁.x_mk @[simp] theorem y_mk (x y : ℤ) (prop : x ^ 2 - d * y ^ 2 = 1) : (mk x y prop).y = y := rfl #align pell.solution₁.y_mk Pell.Solution₁.y_mk @[simp] theorem coe_mk (x y : ℤ) (prop : x ^ 2 - d * y ^ 2 = 1) : (↑(mk x y prop) : ℤ√d) = ⟨x, y⟩ := Zsqrtd.ext _ _ (x_mk x y prop) (y_mk x y prop) #align pell.solution₁.coe_mk Pell.Solution₁.coe_mk @[simp] theorem x_one : (1 : Solution₁ d).x = 1 := rfl #align pell.solution₁.x_one Pell.Solution₁.x_one @[simp] theorem y_one : (1 : Solution₁ d).y = 0 := rfl #align pell.solution₁.y_one Pell.Solution₁.y_one @[simp] theorem x_mul (a b : Solution₁ d) : (a * b).x = a.x * b.x + d * (a.y * b.y) := by rw [← mul_assoc] rfl #align pell.solution₁.x_mul Pell.Solution₁.x_mul @[simp] theorem y_mul (a b : Solution₁ d) : (a * b).y = a.x * b.y + a.y * b.x := rfl #align pell.solution₁.y_mul Pell.Solution₁.y_mul @[simp] theorem x_inv (a : Solution₁ d) : a⁻¹.x = a.x := rfl #align pell.solution₁.x_inv Pell.Solution₁.x_inv @[simp] theorem y_inv (a : Solution₁ d) : a⁻¹.y = -a.y := rfl #align pell.solution₁.y_inv Pell.Solution₁.y_inv @[simp] theorem x_neg (a : Solution₁ d) : (-a).x = -a.x := rfl #align pell.solution₁.x_neg Pell.Solution₁.x_neg @[simp] theorem y_neg (a : Solution₁ d) : (-a).y = -a.y := rfl #align pell.solution₁.y_neg Pell.Solution₁.y_neg /-- When `d` is negative, then `x` or `y` must be zero in a solution. -/ theorem eq_zero_of_d_neg (h₀ : d < 0) (a : Solution₁ d) : a.x = 0 ∨ a.y = 0 := by have h := a.prop contrapose! h have h1 := sq_pos_of_ne_zero h.1 have h2 := sq_pos_of_ne_zero h.2 nlinarith #align pell.solution₁.eq_zero_of_d_neg Pell.Solution₁.eq_zero_of_d_neg /-- A solution has `x ≠ 0`. -/ theorem x_ne_zero (h₀ : 0 ≤ d) (a : Solution₁ d) : a.x ≠ 0 := by intro hx have h : 0 ≤ d * a.y ^ 2 := mul_nonneg h₀ (sq_nonneg _) rw [a.prop_y, hx, sq, zero_mul, zero_sub] at h exact not_le.mpr (neg_one_lt_zero : (-1 : ℤ) < 0) h #align pell.solution₁.x_ne_zero Pell.Solution₁.x_ne_zero /-- A solution with `x > 1` must have `y ≠ 0`. -/ theorem y_ne_zero_of_one_lt_x {a : Solution₁ d} (ha : 1 < a.x) : a.y ≠ 0 := by intro hy have prop := a.prop rw [hy, sq (0 : ℤ), zero_mul, mul_zero, sub_zero] at prop exact lt_irrefl _ (((one_lt_sq_iff <\| zero_le_one.trans ha.le).mpr ha).trans_eq prop) #align pell.solution₁.y_ne_zero_of_one_lt_x Pell.Solution₁.y_ne_zero_of_one_lt_x /-- If a solution has `x > 1`, then `d` is positive. -/ theorem d_pos_of_one_lt_x {a : Solution₁ d} (ha : 1 < a.x) : 0 < d := by refine pos_of_mul_pos_left ?_ (sq_nonneg a.y) rw [a.prop_y, sub_pos] exact one_lt_pow ha two_ne_zero #align pell.solution₁.d_pos_of_one_lt_x Pell.Solution₁.d_pos_of_one_lt_x /-- If a solution has `x > 1`, then `d` is not a square. -/ theorem d_nonsquare_of_one_lt_x {a : Solution₁ d} (ha : 1 < a.x) : ¬IsSquare d := by have hp := a.prop rintro ⟨b, rfl⟩ simp_rw [← sq, ← mul_pow, sq_sub_sq, Int.mul_eq_one_iff_eq_one_or_neg_one] at hp rcases hp with (⟨hp₁, hp₂⟩ \| ⟨hp₁, hp₂⟩) <;> omega #align pell.solution₁.d_nonsquare_of_one_lt_x Pell.Solution₁.d_nonsquare_of_one_lt_x /-- A solution with `x = 1` is trivial. -/ theorem eq_one_of_x_eq_one (h₀ : d ≠ 0) {a : Solution₁ d} (ha : a.x = 1) : a = 1 := by have prop := a.prop_y rw [ha, one_pow, sub_self, mul_eq_zero, or_iff_right h₀, sq_eq_zero_iff] at prop exact ext ha prop #align pell.solution₁.eq_one_of_x_eq_one Pell.Solution₁.eq_one_of_x_eq_one /-- A solution is `1` or `-1` if and only if `y = 0`. -/ theorem eq_one_or_neg_one_iff_y_eq_zero {a : Solution₁ d} : a = 1 ∨ a = -1 ↔ a.y = 0 := by refine ⟨fun H => H.elim (fun h => by simp [h]) fun h => by simp [h], fun H => ?_⟩ have prop := a.prop rw [H, sq (0 : ℤ), mul_zero, mul_zero, sub_zero, sq_eq_one_iff] at prop exact prop.imp (fun h => ext h H) fun h => ext h H #align pell.solution₁.eq_one_or_neg_one_iff_y_eq_zero Pell.Solution₁.eq_one_or_neg_one_iff_y_eq_zero /-- The set of solutions with `x > 0` is closed under multiplication. -/ theorem x_mul_pos {a b : Solution₁ d} (ha : 0 < a.x) (hb : 0 < b.x) : 0 < (a * b).x := by simp only [x_mul] refine neg_lt_iff_pos_add'.mp (abs_lt.mp ?_).1 rw [← abs_of_pos ha, ← abs_of_pos hb, ← abs_mul, ← sq_lt_sq, mul_pow a.x, a.prop_x, b.prop_x, ← sub_pos] ring_nf rcases le_or_lt 0 d with h \| h · positivity · rw [(eq_zero_of_d_neg h a).resolve_left ha.ne', (eq_zero_of_d_neg h b).resolve_left hb.ne'] -- Porting note: was -- rw [zero_pow two_ne_zero, zero_add, zero_mul, zero_add] -- exact one_pos -- but this relied on the exact output of `ring_nf` simp #align pell.solution₁.x_mul_pos Pell.Solution₁.x_mul_pos /-- The set of solutions with `x` and `y` positive is closed under multiplication. -/ theorem y_mul_pos {a b : Solution₁ d} (hax : 0 < a.x) (hay : 0 < a.y) (hbx : 0 < b.x) (hby : 0 < b.y) : 0 < (a * b).y := by simp only [y_mul] positivity #align pell.solution₁.y_mul_pos Pell.Solution₁.y_mul_pos /-- If `(x, y)` is a solution with `x` positive, then all its powers with natural exponents have positive `x`. -/ theorem x_pow_pos {a : Solution₁ d} (hax : 0 < a.x) (n : ℕ) : 0 < (a ^ n).x := by induction' n with n ih · simp only [Nat.zero_eq, pow_zero, x_one, zero_lt_one] · rw [pow_succ] exact x_mul_pos ih hax #align pell.solution₁.x_pow_pos Pell.Solution₁.x_pow_pos /-- If `(x, y)` is a solution with `x` and `y` positive, then all its powers with positive natural exponents have positive `y`. -/ theorem y_pow_succ_pos {a : Solution₁ d} (hax : 0 < a.x) (hay : 0 < a.y) (n : ℕ) : 0 < (a ^ n.succ).y := by induction' n with n ih · simp only [Nat.zero_eq, ← Nat.one_eq_succ_zero, hay, pow_one] · rw [pow_succ'] exact y_mul_pos hax hay (x_pow_pos hax _) ih #align pell.solution₁.y_pow_succ_pos Pell.Solution₁.y_pow_succ_pos /-- If `(x, y)` is a solution with `x` and `y` positive, then all its powers with positive exponents have positive `y`. -/ theorem y_zpow_pos {a : Solution₁ d} (hax : 0 < a.x) (hay : 0 < a.y) {n : ℤ} (hn : 0 < n) : 0 < (a ^ n).y := by lift n to ℕ using hn.le norm_cast at hn ⊢ rw [← Nat.succ_pred_eq_of_pos hn] exact y_pow_succ_pos hax hay _ #align pell.solution₁.y_zpow_pos Pell.Solution₁.y_zpow_pos /-- If `(x, y)` is a solution with `x` positive, then all its powers have positive `x`. -/ theorem x_zpow_pos {a : Solution₁ d} (hax : 0 < a.x) (n : ℤ) : 0 < (a ^ n).x := by cases n with \| ofNat n => rw [Int.ofNat_eq_coe, zpow_natCast] exact x_pow_pos hax n \| negSucc n => rw [zpow_negSucc] exact x_pow_pos hax (n + 1) #align pell.solution₁.x_zpow_pos Pell.Solution₁.x_zpow_pos /-- If `(x, y)` is a solution with `x` and `y` positive, then the `y` component of any power has the same sign as the exponent. -/ theorem sign_y_zpow_eq_sign_of_x_pos_of_y_pos {a : Solution₁ d} (hax : 0 < a.x) (hay : 0 < a.y) (n : ℤ) : (a ^ n).y.sign = n.sign := by rcases n with ((_ \| n) \| n) · rfl · rw [Int.ofNat_eq_coe, zpow_natCast] exact Int.sign_eq_one_of_pos (y_pow_succ_pos hax hay n) · rw [zpow_negSucc] exact Int.sign_eq_neg_one_of_neg (neg_neg_of_pos (y_pow_succ_pos hax hay n)) #align pell.solution₁.sign_y_zpow_eq_sign_of_x_pos_of_y_pos Pell.Solution₁.sign_y_zpow_eq_sign_of_x_pos_of_y_pos /-- If `a` is any solution, then one of `a`, `a⁻¹`, `-a`, `-a⁻¹` has positive `x` and nonnegative `y`. -/ theorem exists_pos_variant (h₀ : 0 < d) (a : Solution₁ d) : ∃ b : Solution₁ d, 0 < b.x ∧ 0 ≤ b.y ∧ a ∈ ({b, b⁻¹, -b, -b⁻¹} : Set (Solution₁ d)) := by refine (lt_or_gt_of_ne (a.x_ne_zero h₀.le)).elim ((le_total 0 a.y).elim (fun hy hx => ⟨-a⁻¹, ?_, ?_, ?_⟩) fun hy hx => ⟨-a, ?_, ?_, ?_⟩) ((le_total 0 a.y).elim (fun hy hx => ⟨a, hx, hy, ?_⟩) fun hy hx => ⟨a⁻¹, hx, ?_, ?_⟩) <;> simp only [neg_neg, inv_inv, neg_inv, Set.mem_insert_iff, Set.mem_singleton_iff, true_or_iff, eq_self_iff_true, x_neg, x_inv, y_neg, y_inv, neg_pos, neg_nonneg, or_true_iff] <;> assumption #align pell.solution₁.exists_pos_variant Pell.Solution₁.exists_pos_variant end Solution₁ section Existence /-! ### Existence of nontrivial solutions -/ variable {d : ℤ} open Set Real /-- If `d` is a positive integer that is not a square, then there is a nontrivial solution to the Pell equation `x^2 - dy^2 = 1`. -/ theorem exists_of_not_isSquare (h₀ : 0 < d) (hd : ¬IsSquare d) : ∃ x y : ℤ, x ^ 2 - d y ^ 2 = 1 ∧ y ≠ 0 := by let ξ : ℝ := √d have hξ : Irrational ξ := by refine irrational_nrt_of_notint_nrt 2 d (sq_sqrt <\| Int.cast_nonneg.mpr h₀.le) ?_ two_pos rintro ⟨x, hx⟩ refine hd ⟨x, @Int.cast_injective ℝ _ _ d (x * x) ?_⟩ rw [← sq_sqrt <\| Int.cast_nonneg.mpr h₀.le, Int.cast_mul, ← hx, sq] obtain ⟨M, hM₁⟩ := exists_int_gt (2 * \|ξ\| + 1) have hM : {q : ℚ \| \|q.1 ^ 2 - d * (q.2 : ℤ) ^ 2\| < M}.Infinite := by refine Infinite.mono (fun q h => ?_) (infinite_rat_abs_sub_lt_one_div_den_sq_of_irrational hξ) have h0 : 0 < (q.2 : ℝ) ^ 2 := pow_pos (Nat.cast_pos.mpr q.pos) 2 have h1 : (q.num : ℝ) / (q.den : ℝ) = q := mod_cast q.num_div_den rw [mem_setOf, abs_sub_comm, ← @Int.cast_lt ℝ, ← div_lt_div_right (abs_pos_of_pos h0)] push_cast rw [← abs_div, abs_sq, sub_div, mul_div_cancel_right₀ _ h0.ne', ← div_pow, h1, ← sq_sqrt (Int.cast_pos.mpr h₀).le, sq_sub_sq, abs_mul, ← mul_one_div] refine mul_lt_mul'' (((abs_add ξ q).trans ?_).trans_lt hM₁) h (abs_nonneg _) (abs_nonneg _) rw [two_mul, add_assoc, add_le_add_iff_left, ← sub_le_iff_le_add'] rw [mem_setOf, abs_sub_comm] at h refine (abs_sub_abs_le_abs_sub (q : ℝ) ξ).trans (h.le.trans ?_) rw [div_le_one h0, one_le_sq_iff_one_le_abs, Nat.abs_cast, Nat.one_le_cast] exact q.pos obtain ⟨m, hm⟩ : ∃ m : ℤ, {q : ℚ \| q.1 ^ 2 - d * (q.den : ℤ) ^ 2 = m}.Infinite := by contrapose! hM simp only [not_infinite] at hM ⊢ refine (congr_arg _ (ext fun x => ?_)).mp (Finite.biUnion (finite_Ioo (-M) M) fun m _ => hM m) simp only [abs_lt, mem_setOf, mem_Ioo, mem_iUnion, exists_prop, exists_eq_right'] have hm₀ : m ≠ 0 := by rintro rfl obtain ⟨q, hq⟩ := hm.nonempty rw [mem_setOf, sub_eq_zero, mul_comm] at hq obtain ⟨a, ha⟩ := (Int.pow_dvd_pow_iff two_ne_zero).mp ⟨d, hq⟩ rw [ha, mul_pow, mul_right_inj' (pow_pos (Int.natCast_pos.mpr q.pos) 2).ne'] at hq exact hd ⟨a, sq a ▸ hq.symm⟩ haveI := neZero_iff.mpr (Int.natAbs_ne_zero.mpr hm₀) let f : ℚ → ZMod m.natAbs × ZMod m.natAbs := fun q => (q.num, q.den) obtain ⟨q₁, h₁ : q₁.num ^ 2 - d * (q₁.den : ℤ) ^ 2 = m, q₂, h₂ : q₂.num ^ 2 - d * (q₂.den : ℤ) ^ 2 = m, hne, hqf⟩ := hm.exists_ne_map_eq_of_mapsTo (mapsTo_univ f _) finite_univ obtain ⟨hq1 : (q₁.num : ZMod m.natAbs) = q₂.num, hq2 : (q₁.den : ZMod m.natAbs) = q₂.den⟩ := Prod.ext_iff.mp hqf have hd₁ : m ∣ q₁.num * q₂.num - d * (q₁.den * q₂.den) := by rw [← Int.natAbs_dvd, ← ZMod.intCast_zmod_eq_zero_iff_dvd] push_cast rw [hq1, hq2, ← sq, ← sq] norm_cast rw [ZMod.intCast_zmod_eq_zero_iff_dvd, Int.natAbs_dvd, Nat.cast_pow, ← h₂] have hd₂ : m ∣ q₁.num * q₂.den - q₂.num * q₁.den := by rw [← Int.natAbs_dvd, ← ZMod.intCast_eq_intCast_iff_dvd_sub] push_cast rw [hq1, hq2] replace hm₀ : (m : ℚ) ≠ 0 := Int.cast_ne_zero.mpr hm₀ refine ⟨(q₁.num * q₂.num - d * (q₁.den * q₂.den)) / m, (q₁.num * q₂.den - q₂.num * q₁.den) / m, ?_, ?_⟩ · qify [hd₁, hd₂] field_simp [hm₀] norm_cast conv_rhs => rw [sq] congr · rw [← h₁] · rw [← h₂] push_cast ring · qify [hd₂] refine div_ne_zero_iff.mpr ⟨?_, hm₀⟩ exact mod_cast mt sub_eq_zero.mp (mt Rat.eq_iff_mul_eq_mul.mpr hne) #align pell.exists_of_not_is_square Pell.exists_of_not_isSquare /-- If `d` is a positive integer, then there is a nontrivial solution to the Pell equation `x^2 - d*y^2 = 1` if and only if `d` is not a square. -/	Mathlib/NumberTheory/Pell.lean	439	444	theorem exists_iff_not_isSquare (h₀ : 0 < d) : (∃ x y : ℤ, x ^ 2 - d * y ^ 2 = 1 ∧ y ≠ 0) ↔ ¬IsSquare d := by	refine ⟨?_, exists_of_not_isSquare h₀⟩ rintro ⟨x, y, hxy, hy⟩ ⟨a, rfl⟩ rw [← sq, ← mul_pow, sq_sub_sq] at hxy simpa [hy, mul_self_pos.mp h₀, sub_eq_add_neg, eq_neg_self_iff] using Int.eq_of_mul_eq_one hxy
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Scott Morrison -/ import Mathlib.Algebra.BigOperators.Finsupp import Mathlib.Algebra.Module.Basic import Mathlib.Algebra.Regular.SMul import Mathlib.Data.Finset.Preimage import Mathlib.Data.Rat.BigOperators import Mathlib.GroupTheory.GroupAction.Hom import Mathlib.Data.Set.Subsingleton #align_import data.finsupp.basic from "leanprover-community/mathlib"@"f69db8cecc668e2d5894d7e9bfc491da60db3b9f" /-! # Miscellaneous definitions, lemmas, and constructions using finsupp ## Main declarations * `Finsupp.graph`: the finset of input and output pairs with non-zero outputs. * `Finsupp.mapRange.equiv`: `Finsupp.mapRange` as an equiv. * `Finsupp.mapDomain`: maps the domain of a `Finsupp` by a function and by summing. * `Finsupp.comapDomain`: postcomposition of a `Finsupp` with a function injective on the preimage of its support. * `Finsupp.some`: restrict a finitely supported function on `Option α` to a finitely supported function on `α`. * `Finsupp.filter`: `filter p f` is the finitely supported function that is `f a` if `p a` is true and 0 otherwise. * `Finsupp.frange`: the image of a finitely supported function on its support. * `Finsupp.subtype_domain`: the restriction of a finitely supported function `f` to a subtype. ## Implementation notes This file is a `noncomputable theory` and uses classical logic throughout. ## TODO * This file is currently ~1600 lines long and is quite a miscellany of definitions and lemmas, so it should be divided into smaller pieces. * Expand the list of definitions and important lemmas to the module docstring. -/ noncomputable section open Finset Function variable {α β γ ι M M' N P G H R S : Type} namespace Finsupp /-! ### Declarations about `graph` -/ section Graph variable [Zero M] /-- The graph of a finitely supported function over its support, i.e. the finset of input and output pairs with non-zero outputs. -/ def graph (f : α →₀ M) : Finset (α × M) := f.support.map ⟨fun a => Prod.mk a (f a), fun _ _ h => (Prod.mk.inj h).1⟩ #align finsupp.graph Finsupp.graph theorem mk_mem_graph_iff {a : α} {m : M} {f : α →₀ M} : (a, m) ∈ f.graph ↔ f a = m ∧ m ≠ 0 := by simp_rw [graph, mem_map, mem_support_iff] constructor · rintro ⟨b, ha, rfl, -⟩ exact ⟨rfl, ha⟩ · rintro ⟨rfl, ha⟩ exact ⟨a, ha, rfl⟩ #align finsupp.mk_mem_graph_iff Finsupp.mk_mem_graph_iff @[simp] theorem mem_graph_iff {c : α × M} {f : α →₀ M} : c ∈ f.graph ↔ f c.1 = c.2 ∧ c.2 ≠ 0 := by cases c exact mk_mem_graph_iff #align finsupp.mem_graph_iff Finsupp.mem_graph_iff theorem mk_mem_graph (f : α →₀ M) {a : α} (ha : a ∈ f.support) : (a, f a) ∈ f.graph := mk_mem_graph_iff.2 ⟨rfl, mem_support_iff.1 ha⟩ #align finsupp.mk_mem_graph Finsupp.mk_mem_graph theorem apply_eq_of_mem_graph {a : α} {m : M} {f : α →₀ M} (h : (a, m) ∈ f.graph) : f a = m := (mem_graph_iff.1 h).1 #align finsupp.apply_eq_of_mem_graph Finsupp.apply_eq_of_mem_graph @[simp 1100] -- Porting note: change priority to appease `simpNF` theorem not_mem_graph_snd_zero (a : α) (f : α →₀ M) : (a, (0 : M)) ∉ f.graph := fun h => (mem_graph_iff.1 h).2.irrefl #align finsupp.not_mem_graph_snd_zero Finsupp.not_mem_graph_snd_zero @[simp] theorem image_fst_graph [DecidableEq α] (f : α →₀ M) : f.graph.image Prod.fst = f.support := by classical simp only [graph, map_eq_image, image_image, Embedding.coeFn_mk, (· ∘ ·), image_id'] #align finsupp.image_fst_graph Finsupp.image_fst_graph theorem graph_injective (α M) [Zero M] : Injective (@graph α M _) := by intro f g h classical have hsup : f.support = g.support := by rw [← image_fst_graph, h, image_fst_graph] refine ext_iff'.2 ⟨hsup, fun x hx => apply_eq_of_mem_graph <\| h.symm ▸ ?_⟩ exact mk_mem_graph _ (hsup ▸ hx) #align finsupp.graph_injective Finsupp.graph_injective @[simp] theorem graph_inj {f g : α →₀ M} : f.graph = g.graph ↔ f = g := (graph_injective α M).eq_iff #align finsupp.graph_inj Finsupp.graph_inj @[simp] theorem graph_zero : graph (0 : α →₀ M) = ∅ := by simp [graph] #align finsupp.graph_zero Finsupp.graph_zero @[simp] theorem graph_eq_empty {f : α →₀ M} : f.graph = ∅ ↔ f = 0 := (graph_injective α M).eq_iff' graph_zero #align finsupp.graph_eq_empty Finsupp.graph_eq_empty end Graph end Finsupp /-! ### Declarations about `mapRange` -/ section MapRange namespace Finsupp section Equiv variable [Zero M] [Zero N] [Zero P] /-- `Finsupp.mapRange` as an equiv. -/ @[simps apply] def mapRange.equiv (f : M ≃ N) (hf : f 0 = 0) (hf' : f.symm 0 = 0) : (α →₀ M) ≃ (α →₀ N) where toFun := (mapRange f hf : (α →₀ M) → α →₀ N) invFun := (mapRange f.symm hf' : (α →₀ N) → α →₀ M) left_inv x := by rw [← mapRange_comp _ _ _ _] <;> simp_rw [Equiv.symm_comp_self] · exact mapRange_id _ · rfl right_inv x := by rw [← mapRange_comp _ _ _ _] <;> simp_rw [Equiv.self_comp_symm] · exact mapRange_id _ · rfl #align finsupp.map_range.equiv Finsupp.mapRange.equiv @[simp] theorem mapRange.equiv_refl : mapRange.equiv (Equiv.refl M) rfl rfl = Equiv.refl (α →₀ M) := Equiv.ext mapRange_id #align finsupp.map_range.equiv_refl Finsupp.mapRange.equiv_refl theorem mapRange.equiv_trans (f : M ≃ N) (hf : f 0 = 0) (hf') (f₂ : N ≃ P) (hf₂ : f₂ 0 = 0) (hf₂') : (mapRange.equiv (f.trans f₂) (by rw [Equiv.trans_apply, hf, hf₂]) (by rw [Equiv.symm_trans_apply, hf₂', hf']) : (α →₀ _) ≃ _) = (mapRange.equiv f hf hf').trans (mapRange.equiv f₂ hf₂ hf₂') := Equiv.ext <\| mapRange_comp f₂ hf₂ f hf ((congrArg f₂ hf).trans hf₂) #align finsupp.map_range.equiv_trans Finsupp.mapRange.equiv_trans @[simp] theorem mapRange.equiv_symm (f : M ≃ N) (hf hf') : ((mapRange.equiv f hf hf').symm : (α →₀ _) ≃ _) = mapRange.equiv f.symm hf' hf := Equiv.ext fun _ => rfl #align finsupp.map_range.equiv_symm Finsupp.mapRange.equiv_symm end Equiv section ZeroHom variable [Zero M] [Zero N] [Zero P] /-- Composition with a fixed zero-preserving homomorphism is itself a zero-preserving homomorphism on functions. -/ @[simps] def mapRange.zeroHom (f : ZeroHom M N) : ZeroHom (α →₀ M) (α →₀ N) where toFun := (mapRange f f.map_zero : (α →₀ M) → α →₀ N) map_zero' := mapRange_zero #align finsupp.map_range.zero_hom Finsupp.mapRange.zeroHom @[simp] theorem mapRange.zeroHom_id : mapRange.zeroHom (ZeroHom.id M) = ZeroHom.id (α →₀ M) := ZeroHom.ext mapRange_id #align finsupp.map_range.zero_hom_id Finsupp.mapRange.zeroHom_id theorem mapRange.zeroHom_comp (f : ZeroHom N P) (f₂ : ZeroHom M N) : (mapRange.zeroHom (f.comp f₂) : ZeroHom (α →₀ _) _) = (mapRange.zeroHom f).comp (mapRange.zeroHom f₂) := ZeroHom.ext <\| mapRange_comp f (map_zero f) f₂ (map_zero f₂) (by simp only [comp_apply, map_zero]) #align finsupp.map_range.zero_hom_comp Finsupp.mapRange.zeroHom_comp end ZeroHom section AddMonoidHom variable [AddCommMonoid M] [AddCommMonoid N] [AddCommMonoid P] variable {F : Type} [FunLike F M N] [AddMonoidHomClass F M N] /-- Composition with a fixed additive homomorphism is itself an additive homomorphism on functions. -/ @[simps] def mapRange.addMonoidHom (f : M →+ N) : (α →₀ M) →+ α →₀ N where toFun := (mapRange f f.map_zero : (α →₀ M) → α →₀ N) map_zero' := mapRange_zero map_add' a b := by dsimp only; exact mapRange_add f.map_add _ _; -- Porting note: `dsimp` needed #align finsupp.map_range.add_monoid_hom Finsupp.mapRange.addMonoidHom @[simp] theorem mapRange.addMonoidHom_id : mapRange.addMonoidHom (AddMonoidHom.id M) = AddMonoidHom.id (α →₀ M) := AddMonoidHom.ext mapRange_id #align finsupp.map_range.add_monoid_hom_id Finsupp.mapRange.addMonoidHom_id theorem mapRange.addMonoidHom_comp (f : N →+ P) (f₂ : M →+ N) : (mapRange.addMonoidHom (f.comp f₂) : (α →₀ _) →+ _) = (mapRange.addMonoidHom f).comp (mapRange.addMonoidHom f₂) := AddMonoidHom.ext <\| mapRange_comp f (map_zero f) f₂ (map_zero f₂) (by simp only [comp_apply, map_zero]) #align finsupp.map_range.add_monoid_hom_comp Finsupp.mapRange.addMonoidHom_comp @[simp] theorem mapRange.addMonoidHom_toZeroHom (f : M →+ N) : (mapRange.addMonoidHom f).toZeroHom = (mapRange.zeroHom f.toZeroHom : ZeroHom (α →₀ _) _) := ZeroHom.ext fun _ => rfl #align finsupp.map_range.add_monoid_hom_to_zero_hom Finsupp.mapRange.addMonoidHom_toZeroHom theorem mapRange_multiset_sum (f : F) (m : Multiset (α →₀ M)) : mapRange f (map_zero f) m.sum = (m.map fun x => mapRange f (map_zero f) x).sum := (mapRange.addMonoidHom (f : M →+ N) : (α →₀ _) →+ _).map_multiset_sum _ #align finsupp.map_range_multiset_sum Finsupp.mapRange_multiset_sum theorem mapRange_finset_sum (f : F) (s : Finset ι) (g : ι → α →₀ M) : mapRange f (map_zero f) (∑ x ∈ s, g x) = ∑ x ∈ s, mapRange f (map_zero f) (g x) := map_sum (mapRange.addMonoidHom (f : M →+ N)) _ _ #align finsupp.map_range_finset_sum Finsupp.mapRange_finset_sum /-- `Finsupp.mapRange.AddMonoidHom` as an equiv. -/ @[simps apply] def mapRange.addEquiv (f : M ≃+ N) : (α →₀ M) ≃+ (α →₀ N) := { mapRange.addMonoidHom f.toAddMonoidHom with toFun := (mapRange f f.map_zero : (α →₀ M) → α →₀ N) invFun := (mapRange f.symm f.symm.map_zero : (α →₀ N) → α →₀ M) left_inv := fun x => by rw [← mapRange_comp _ _ _ _] <;> simp_rw [AddEquiv.symm_comp_self] · exact mapRange_id _ · rfl right_inv := fun x => by rw [← mapRange_comp _ _ _ _] <;> simp_rw [AddEquiv.self_comp_symm] · exact mapRange_id _ · rfl } #align finsupp.map_range.add_equiv Finsupp.mapRange.addEquiv @[simp] theorem mapRange.addEquiv_refl : mapRange.addEquiv (AddEquiv.refl M) = AddEquiv.refl (α →₀ M) := AddEquiv.ext mapRange_id #align finsupp.map_range.add_equiv_refl Finsupp.mapRange.addEquiv_refl theorem mapRange.addEquiv_trans (f : M ≃+ N) (f₂ : N ≃+ P) : (mapRange.addEquiv (f.trans f₂) : (α →₀ M) ≃+ (α →₀ P)) = (mapRange.addEquiv f).trans (mapRange.addEquiv f₂) := AddEquiv.ext (mapRange_comp _ f₂.map_zero _ f.map_zero (by simp)) #align finsupp.map_range.add_equiv_trans Finsupp.mapRange.addEquiv_trans @[simp] theorem mapRange.addEquiv_symm (f : M ≃+ N) : ((mapRange.addEquiv f).symm : (α →₀ _) ≃+ _) = mapRange.addEquiv f.symm := AddEquiv.ext fun _ => rfl #align finsupp.map_range.add_equiv_symm Finsupp.mapRange.addEquiv_symm @[simp] theorem mapRange.addEquiv_toAddMonoidHom (f : M ≃+ N) : ((mapRange.addEquiv f : (α →₀ _) ≃+ _) : _ →+ _) = (mapRange.addMonoidHom f.toAddMonoidHom : (α →₀ _) →+ _) := AddMonoidHom.ext fun _ => rfl #align finsupp.map_range.add_equiv_to_add_monoid_hom Finsupp.mapRange.addEquiv_toAddMonoidHom @[simp] theorem mapRange.addEquiv_toEquiv (f : M ≃+ N) : ↑(mapRange.addEquiv f : (α →₀ _) ≃+ _) = (mapRange.equiv (f : M ≃ N) f.map_zero f.symm.map_zero : (α →₀ _) ≃ _) := Equiv.ext fun _ => rfl #align finsupp.map_range.add_equiv_to_equiv Finsupp.mapRange.addEquiv_toEquiv end AddMonoidHom end Finsupp end MapRange /-! ### Declarations about `equivCongrLeft` -/ section EquivCongrLeft variable [Zero M] namespace Finsupp /-- Given `f : α ≃ β`, we can map `l : α →₀ M` to `equivMapDomain f l : β →₀ M` (computably) by mapping the support forwards and the function backwards. -/ def equivMapDomain (f : α ≃ β) (l : α →₀ M) : β →₀ M where support := l.support.map f.toEmbedding toFun a := l (f.symm a) mem_support_toFun a := by simp only [Finset.mem_map_equiv, mem_support_toFun]; rfl #align finsupp.equiv_map_domain Finsupp.equivMapDomain @[simp] theorem equivMapDomain_apply (f : α ≃ β) (l : α →₀ M) (b : β) : equivMapDomain f l b = l (f.symm b) := rfl #align finsupp.equiv_map_domain_apply Finsupp.equivMapDomain_apply theorem equivMapDomain_symm_apply (f : α ≃ β) (l : β →₀ M) (a : α) : equivMapDomain f.symm l a = l (f a) := rfl #align finsupp.equiv_map_domain_symm_apply Finsupp.equivMapDomain_symm_apply @[simp] theorem equivMapDomain_refl (l : α →₀ M) : equivMapDomain (Equiv.refl _) l = l := by ext x; rfl #align finsupp.equiv_map_domain_refl Finsupp.equivMapDomain_refl theorem equivMapDomain_refl' : equivMapDomain (Equiv.refl _) = @id (α →₀ M) := by ext x; rfl #align finsupp.equiv_map_domain_refl' Finsupp.equivMapDomain_refl' theorem equivMapDomain_trans (f : α ≃ β) (g : β ≃ γ) (l : α →₀ M) : equivMapDomain (f.trans g) l = equivMapDomain g (equivMapDomain f l) := by ext x; rfl #align finsupp.equiv_map_domain_trans Finsupp.equivMapDomain_trans theorem equivMapDomain_trans' (f : α ≃ β) (g : β ≃ γ) : @equivMapDomain _ _ M _ (f.trans g) = equivMapDomain g ∘ equivMapDomain f := by ext x; rfl #align finsupp.equiv_map_domain_trans' Finsupp.equivMapDomain_trans' @[simp] theorem equivMapDomain_single (f : α ≃ β) (a : α) (b : M) : equivMapDomain f (single a b) = single (f a) b := by classical ext x simp only [single_apply, Equiv.apply_eq_iff_eq_symm_apply, equivMapDomain_apply] #align finsupp.equiv_map_domain_single Finsupp.equivMapDomain_single @[simp] theorem equivMapDomain_zero {f : α ≃ β} : equivMapDomain f (0 : α →₀ M) = (0 : β →₀ M) := by ext; simp only [equivMapDomain_apply, coe_zero, Pi.zero_apply] #align finsupp.equiv_map_domain_zero Finsupp.equivMapDomain_zero @[to_additive (attr := simp)] theorem prod_equivMapDomain [CommMonoid N] (f : α ≃ β) (l : α →₀ M) (g : β → M → N): prod (equivMapDomain f l) g = prod l (fun a m => g (f a) m) := by simp [prod, equivMapDomain] /-- Given `f : α ≃ β`, the finitely supported function spaces are also in bijection: `(α →₀ M) ≃ (β →₀ M)`. This is the finitely-supported version of `Equiv.piCongrLeft`. -/ def equivCongrLeft (f : α ≃ β) : (α →₀ M) ≃ (β →₀ M) := by refine ⟨equivMapDomain f, equivMapDomain f.symm, fun f => ?_, fun f => ?_⟩ <;> ext x <;> simp only [equivMapDomain_apply, Equiv.symm_symm, Equiv.symm_apply_apply, Equiv.apply_symm_apply] #align finsupp.equiv_congr_left Finsupp.equivCongrLeft @[simp] theorem equivCongrLeft_apply (f : α ≃ β) (l : α →₀ M) : equivCongrLeft f l = equivMapDomain f l := rfl #align finsupp.equiv_congr_left_apply Finsupp.equivCongrLeft_apply @[simp] theorem equivCongrLeft_symm (f : α ≃ β) : (@equivCongrLeft _ _ M _ f).symm = equivCongrLeft f.symm := rfl #align finsupp.equiv_congr_left_symm Finsupp.equivCongrLeft_symm end Finsupp end EquivCongrLeft section CastFinsupp variable [Zero M] (f : α →₀ M) namespace Nat @[simp, norm_cast] theorem cast_finsupp_prod [CommSemiring R] (g : α → M → ℕ) : (↑(f.prod g) : R) = f.prod fun a b => ↑(g a b) := Nat.cast_prod _ _ #align nat.cast_finsupp_prod Nat.cast_finsupp_prod @[simp, norm_cast] theorem cast_finsupp_sum [CommSemiring R] (g : α → M → ℕ) : (↑(f.sum g) : R) = f.sum fun a b => ↑(g a b) := Nat.cast_sum _ _ #align nat.cast_finsupp_sum Nat.cast_finsupp_sum end Nat namespace Int @[simp, norm_cast] theorem cast_finsupp_prod [CommRing R] (g : α → M → ℤ) : (↑(f.prod g) : R) = f.prod fun a b => ↑(g a b) := Int.cast_prod _ _ #align int.cast_finsupp_prod Int.cast_finsupp_prod @[simp, norm_cast] theorem cast_finsupp_sum [CommRing R] (g : α → M → ℤ) : (↑(f.sum g) : R) = f.sum fun a b => ↑(g a b) := Int.cast_sum _ _ #align int.cast_finsupp_sum Int.cast_finsupp_sum end Int namespace Rat @[simp, norm_cast] theorem cast_finsupp_sum [DivisionRing R] [CharZero R] (g : α → M → ℚ) : (↑(f.sum g) : R) = f.sum fun a b => ↑(g a b) := cast_sum _ _ #align rat.cast_finsupp_sum Rat.cast_finsupp_sum @[simp, norm_cast] theorem cast_finsupp_prod [Field R] [CharZero R] (g : α → M → ℚ) : (↑(f.prod g) : R) = f.prod fun a b => ↑(g a b) := cast_prod _ _ #align rat.cast_finsupp_prod Rat.cast_finsupp_prod end Rat end CastFinsupp /-! ### Declarations about `mapDomain` -/ namespace Finsupp section MapDomain variable [AddCommMonoid M] {v v₁ v₂ : α →₀ M} /-- Given `f : α → β` and `v : α →₀ M`, `mapDomain f v : β →₀ M` is the finitely supported function whose value at `a : β` is the sum of `v x` over all `x` such that `f x = a`. -/ def mapDomain (f : α → β) (v : α →₀ M) : β →₀ M := v.sum fun a => single (f a) #align finsupp.map_domain Finsupp.mapDomain theorem mapDomain_apply {f : α → β} (hf : Function.Injective f) (x : α →₀ M) (a : α) : mapDomain f x (f a) = x a := by rw [mapDomain, sum_apply, sum_eq_single a, single_eq_same] · intro b _ hba exact single_eq_of_ne (hf.ne hba) · intro _ rw [single_zero, coe_zero, Pi.zero_apply] #align finsupp.map_domain_apply Finsupp.mapDomain_apply theorem mapDomain_notin_range {f : α → β} (x : α →₀ M) (a : β) (h : a ∉ Set.range f) : mapDomain f x a = 0 := by rw [mapDomain, sum_apply, sum] exact Finset.sum_eq_zero fun a' _ => single_eq_of_ne fun eq => h <\| eq ▸ Set.mem_range_self _ #align finsupp.map_domain_notin_range Finsupp.mapDomain_notin_range @[simp] theorem mapDomain_id : mapDomain id v = v := sum_single _ #align finsupp.map_domain_id Finsupp.mapDomain_id	Mathlib/Data/Finsupp/Basic.lean	471	479	theorem mapDomain_comp {f : α → β} {g : β → γ} : mapDomain (g ∘ f) v = mapDomain g (mapDomain f v) := by	refine ((sum_sum_index ?_ ?_).trans ?_).symm · intro exact single_zero _ · intro exact single_add _ refine sum_congr fun _ _ => sum_single_index ?_ exact single_zero _
/- Copyright (c) 2020 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne, Sébastien Gouëzel -/ import Mathlib.Analysis.NormedSpace.IndicatorFunction import Mathlib.MeasureTheory.Function.EssSup import Mathlib.MeasureTheory.Function.AEEqFun import Mathlib.MeasureTheory.Function.SpecialFunctions.Basic #align_import measure_theory.function.lp_seminorm from "leanprover-community/mathlib"@"c4015acc0a223449d44061e27ddac1835a3852b9" /-! # ℒp space This file describes properties of almost everywhere strongly measurable functions with finite `p`-seminorm, denoted by `snorm f p μ` and defined for `p:ℝ≥0∞` as `0` if `p=0`, `(∫ ‖f a‖^p ∂μ) ^ (1/p)` for `0 < p < ∞` and `essSup ‖f‖ μ` for `p=∞`. The Prop-valued `Memℒp f p μ` states that a function `f : α → E` has finite `p`-seminorm and is almost everywhere strongly measurable. ## Main definitions * `snorm' f p μ` : `(∫ ‖f a‖^p ∂μ) ^ (1/p)` for `f : α → F` and `p : ℝ`, where `α` is a measurable space and `F` is a normed group. * `snormEssSup f μ` : seminorm in `ℒ∞`, equal to the essential supremum `ess_sup ‖f‖ μ`. * `snorm f p μ` : for `p : ℝ≥0∞`, seminorm in `ℒp`, equal to `0` for `p=0`, to `snorm' f p μ` for `0 < p < ∞` and to `snormEssSup f μ` for `p = ∞`. * `Memℒp f p μ` : property that the function `f` is almost everywhere strongly measurable and has finite `p`-seminorm for the measure `μ` (`snorm f p μ < ∞`) -/ noncomputable section set_option linter.uppercaseLean3 false open TopologicalSpace MeasureTheory Filter open scoped NNReal ENNReal Topology variable {α E F G : Type} {m m0 : MeasurableSpace α} {p : ℝ≥0∞} {q : ℝ} {μ ν : Measure α} [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedAddCommGroup G] namespace MeasureTheory section ℒp /-! ### ℒp seminorm We define the ℒp seminorm, denoted by `snorm f p μ`. For real `p`, it is given by an integral formula (for which we use the notation `snorm' f p μ`), and for `p = ∞` it is the essential supremum (for which we use the notation `snormEssSup f μ`). We also define a predicate `Memℒp f p μ`, requesting that a function is almost everywhere measurable and has finite `snorm f p μ`. This paragraph is devoted to the basic properties of these definitions. It is constructed as follows: for a given property, we prove it for `snorm'` and `snormEssSup` when it makes sense, deduce it for `snorm`, and translate it in terms of `Memℒp`. -/ section ℒpSpaceDefinition /-- `(∫ ‖f a‖^q ∂μ) ^ (1/q)`, which is a seminorm on the space of measurable functions for which this quantity is finite -/ def snorm' {_ : MeasurableSpace α} (f : α → F) (q : ℝ) (μ : Measure α) : ℝ≥0∞ := (∫⁻ a, (‖f a‖₊ : ℝ≥0∞) ^ q ∂μ) ^ (1 / q) #align measure_theory.snorm' MeasureTheory.snorm' /-- seminorm for `ℒ∞`, equal to the essential supremum of `‖f‖`. -/ def snormEssSup {_ : MeasurableSpace α} (f : α → F) (μ : Measure α) := essSup (fun x => (‖f x‖₊ : ℝ≥0∞)) μ #align measure_theory.snorm_ess_sup MeasureTheory.snormEssSup /-- `ℒp` seminorm, equal to `0` for `p=0`, to `(∫ ‖f a‖^p ∂μ) ^ (1/p)` for `0 < p < ∞` and to `essSup ‖f‖ μ` for `p = ∞`. -/ def snorm {_ : MeasurableSpace α} (f : α → F) (p : ℝ≥0∞) (μ : Measure α) : ℝ≥0∞ := if p = 0 then 0 else if p = ∞ then snormEssSup f μ else snorm' f (ENNReal.toReal p) μ #align measure_theory.snorm MeasureTheory.snorm theorem snorm_eq_snorm' (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) {f : α → F} : snorm f p μ = snorm' f (ENNReal.toReal p) μ := by simp [snorm, hp_ne_zero, hp_ne_top] #align measure_theory.snorm_eq_snorm' MeasureTheory.snorm_eq_snorm' theorem snorm_eq_lintegral_rpow_nnnorm (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) {f : α → F} : snorm f p μ = (∫⁻ x, (‖f x‖₊ : ℝ≥0∞) ^ p.toReal ∂μ) ^ (1 / p.toReal) := by rw [snorm_eq_snorm' hp_ne_zero hp_ne_top, snorm'] #align measure_theory.snorm_eq_lintegral_rpow_nnnorm MeasureTheory.snorm_eq_lintegral_rpow_nnnorm theorem snorm_one_eq_lintegral_nnnorm {f : α → F} : snorm f 1 μ = ∫⁻ x, ‖f x‖₊ ∂μ := by simp_rw [snorm_eq_lintegral_rpow_nnnorm one_ne_zero ENNReal.coe_ne_top, ENNReal.one_toReal, one_div_one, ENNReal.rpow_one] #align measure_theory.snorm_one_eq_lintegral_nnnorm MeasureTheory.snorm_one_eq_lintegral_nnnorm @[simp] theorem snorm_exponent_top {f : α → F} : snorm f ∞ μ = snormEssSup f μ := by simp [snorm] #align measure_theory.snorm_exponent_top MeasureTheory.snorm_exponent_top /-- The property that `f:α→E` is ae strongly measurable and `(∫ ‖f a‖^p ∂μ)^(1/p)` is finite if `p < ∞`, or `essSup f < ∞` if `p = ∞`. -/ def Memℒp {α} {_ : MeasurableSpace α} (f : α → E) (p : ℝ≥0∞) (μ : Measure α := by volume_tac) : Prop := AEStronglyMeasurable f μ ∧ snorm f p μ < ∞ #align measure_theory.mem_ℒp MeasureTheory.Memℒp theorem Memℒp.aestronglyMeasurable {f : α → E} {p : ℝ≥0∞} (h : Memℒp f p μ) : AEStronglyMeasurable f μ := h.1 #align measure_theory.mem_ℒp.ae_strongly_measurable MeasureTheory.Memℒp.aestronglyMeasurable theorem lintegral_rpow_nnnorm_eq_rpow_snorm' {f : α → F} (hq0_lt : 0 < q) : (∫⁻ a, (‖f a‖₊ : ℝ≥0∞) ^ q ∂μ) = snorm' f q μ ^ q := by rw [snorm', ← ENNReal.rpow_mul, one_div, inv_mul_cancel, ENNReal.rpow_one] exact (ne_of_lt hq0_lt).symm #align measure_theory.lintegral_rpow_nnnorm_eq_rpow_snorm' MeasureTheory.lintegral_rpow_nnnorm_eq_rpow_snorm' end ℒpSpaceDefinition section Top theorem Memℒp.snorm_lt_top {f : α → E} (hfp : Memℒp f p μ) : snorm f p μ < ∞ := hfp.2 #align measure_theory.mem_ℒp.snorm_lt_top MeasureTheory.Memℒp.snorm_lt_top theorem Memℒp.snorm_ne_top {f : α → E} (hfp : Memℒp f p μ) : snorm f p μ ≠ ∞ := ne_of_lt hfp.2 #align measure_theory.mem_ℒp.snorm_ne_top MeasureTheory.Memℒp.snorm_ne_top theorem lintegral_rpow_nnnorm_lt_top_of_snorm'_lt_top {f : α → F} (hq0_lt : 0 < q) (hfq : snorm' f q μ < ∞) : (∫⁻ a, (‖f a‖₊ : ℝ≥0∞) ^ q ∂μ) < ∞ := by rw [lintegral_rpow_nnnorm_eq_rpow_snorm' hq0_lt] exact ENNReal.rpow_lt_top_of_nonneg (le_of_lt hq0_lt) (ne_of_lt hfq) #align measure_theory.lintegral_rpow_nnnorm_lt_top_of_snorm'_lt_top MeasureTheory.lintegral_rpow_nnnorm_lt_top_of_snorm'_lt_top theorem lintegral_rpow_nnnorm_lt_top_of_snorm_lt_top {f : α → F} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) (hfp : snorm f p μ < ∞) : (∫⁻ a, (‖f a‖₊ : ℝ≥0∞) ^ p.toReal ∂μ) < ∞ := by apply lintegral_rpow_nnnorm_lt_top_of_snorm'_lt_top · exact ENNReal.toReal_pos hp_ne_zero hp_ne_top · simpa [snorm_eq_snorm' hp_ne_zero hp_ne_top] using hfp #align measure_theory.lintegral_rpow_nnnorm_lt_top_of_snorm_lt_top MeasureTheory.lintegral_rpow_nnnorm_lt_top_of_snorm_lt_top theorem snorm_lt_top_iff_lintegral_rpow_nnnorm_lt_top {f : α → F} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : snorm f p μ < ∞ ↔ (∫⁻ a, (‖f a‖₊ : ℝ≥0∞) ^ p.toReal ∂μ) < ∞ := ⟨lintegral_rpow_nnnorm_lt_top_of_snorm_lt_top hp_ne_zero hp_ne_top, by intro h have hp' := ENNReal.toReal_pos hp_ne_zero hp_ne_top have : 0 < 1 / p.toReal := div_pos zero_lt_one hp' simpa [snorm_eq_lintegral_rpow_nnnorm hp_ne_zero hp_ne_top] using ENNReal.rpow_lt_top_of_nonneg (le_of_lt this) (ne_of_lt h)⟩ #align measure_theory.snorm_lt_top_iff_lintegral_rpow_nnnorm_lt_top MeasureTheory.snorm_lt_top_iff_lintegral_rpow_nnnorm_lt_top end Top section Zero @[simp] theorem snorm'_exponent_zero {f : α → F} : snorm' f 0 μ = 1 := by rw [snorm', div_zero, ENNReal.rpow_zero] #align measure_theory.snorm'_exponent_zero MeasureTheory.snorm'_exponent_zero @[simp] theorem snorm_exponent_zero {f : α → F} : snorm f 0 μ = 0 := by simp [snorm] #align measure_theory.snorm_exponent_zero MeasureTheory.snorm_exponent_zero @[simp] theorem memℒp_zero_iff_aestronglyMeasurable {f : α → E} : Memℒp f 0 μ ↔ AEStronglyMeasurable f μ := by simp [Memℒp, snorm_exponent_zero] #align measure_theory.mem_ℒp_zero_iff_ae_strongly_measurable MeasureTheory.memℒp_zero_iff_aestronglyMeasurable @[simp] theorem snorm'_zero (hp0_lt : 0 < q) : snorm' (0 : α → F) q μ = 0 := by simp [snorm', hp0_lt] #align measure_theory.snorm'_zero MeasureTheory.snorm'_zero @[simp] theorem snorm'_zero' (hq0_ne : q ≠ 0) (hμ : μ ≠ 0) : snorm' (0 : α → F) q μ = 0 := by rcases le_or_lt 0 q with hq0 \| hq_neg · exact snorm'_zero (lt_of_le_of_ne hq0 hq0_ne.symm) · simp [snorm', ENNReal.rpow_eq_zero_iff, hμ, hq_neg] #align measure_theory.snorm'_zero' MeasureTheory.snorm'_zero' @[simp] theorem snormEssSup_zero : snormEssSup (0 : α → F) μ = 0 := by simp_rw [snormEssSup, Pi.zero_apply, nnnorm_zero, ENNReal.coe_zero, ← ENNReal.bot_eq_zero] exact essSup_const_bot #align measure_theory.snorm_ess_sup_zero MeasureTheory.snormEssSup_zero @[simp] theorem snorm_zero : snorm (0 : α → F) p μ = 0 := by by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp only [h_top, snorm_exponent_top, snormEssSup_zero] rw [← Ne] at h0 simp [snorm_eq_snorm' h0 h_top, ENNReal.toReal_pos h0 h_top] #align measure_theory.snorm_zero MeasureTheory.snorm_zero @[simp] theorem snorm_zero' : snorm (fun _ : α => (0 : F)) p μ = 0 := by convert snorm_zero (F := F) #align measure_theory.snorm_zero' MeasureTheory.snorm_zero' theorem zero_memℒp : Memℒp (0 : α → E) p μ := ⟨aestronglyMeasurable_zero, by rw [snorm_zero] exact ENNReal.coe_lt_top⟩ #align measure_theory.zero_mem_ℒp MeasureTheory.zero_memℒp theorem zero_mem_ℒp' : Memℒp (fun _ : α => (0 : E)) p μ := zero_memℒp (E := E) #align measure_theory.zero_mem_ℒp' MeasureTheory.zero_mem_ℒp' variable [MeasurableSpace α] theorem snorm'_measure_zero_of_pos {f : α → F} (hq_pos : 0 < q) : snorm' f q (0 : Measure α) = 0 := by simp [snorm', hq_pos] #align measure_theory.snorm'_measure_zero_of_pos MeasureTheory.snorm'_measure_zero_of_pos theorem snorm'_measure_zero_of_exponent_zero {f : α → F} : snorm' f 0 (0 : Measure α) = 1 := by simp [snorm'] #align measure_theory.snorm'_measure_zero_of_exponent_zero MeasureTheory.snorm'_measure_zero_of_exponent_zero theorem snorm'_measure_zero_of_neg {f : α → F} (hq_neg : q < 0) : snorm' f q (0 : Measure α) = ∞ := by simp [snorm', hq_neg] #align measure_theory.snorm'_measure_zero_of_neg MeasureTheory.snorm'_measure_zero_of_neg @[simp] theorem snormEssSup_measure_zero {f : α → F} : snormEssSup f (0 : Measure α) = 0 := by simp [snormEssSup] #align measure_theory.snorm_ess_sup_measure_zero MeasureTheory.snormEssSup_measure_zero @[simp] theorem snorm_measure_zero {f : α → F} : snorm f p (0 : Measure α) = 0 := by by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp [h_top] rw [← Ne] at h0 simp [snorm_eq_snorm' h0 h_top, snorm', ENNReal.toReal_pos h0 h_top] #align measure_theory.snorm_measure_zero MeasureTheory.snorm_measure_zero end Zero section Neg @[simp] theorem snorm'_neg {f : α → F} : snorm' (-f) q μ = snorm' f q μ := by simp [snorm'] #align measure_theory.snorm'_neg MeasureTheory.snorm'_neg @[simp] theorem snorm_neg {f : α → F} : snorm (-f) p μ = snorm f p μ := by by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp [h_top, snormEssSup] simp [snorm_eq_snorm' h0 h_top] #align measure_theory.snorm_neg MeasureTheory.snorm_neg theorem Memℒp.neg {f : α → E} (hf : Memℒp f p μ) : Memℒp (-f) p μ := ⟨AEStronglyMeasurable.neg hf.1, by simp [hf.right]⟩ #align measure_theory.mem_ℒp.neg MeasureTheory.Memℒp.neg theorem memℒp_neg_iff {f : α → E} : Memℒp (-f) p μ ↔ Memℒp f p μ := ⟨fun h => neg_neg f ▸ h.neg, Memℒp.neg⟩ #align measure_theory.mem_ℒp_neg_iff MeasureTheory.memℒp_neg_iff end Neg section Const theorem snorm'_const (c : F) (hq_pos : 0 < q) : snorm' (fun _ : α => c) q μ = (‖c‖₊ : ℝ≥0∞) μ Set.univ ^ (1 / q) := by rw [snorm', lintegral_const, ENNReal.mul_rpow_of_nonneg _ _ (by simp [hq_pos.le] : 0 ≤ 1 / q)] congr rw [← ENNReal.rpow_mul] suffices hq_cancel : q * (1 / q) = 1 by rw [hq_cancel, ENNReal.rpow_one] rw [one_div, mul_inv_cancel (ne_of_lt hq_pos).symm] #align measure_theory.snorm'_const MeasureTheory.snorm'_const theorem snorm'_const' [IsFiniteMeasure μ] (c : F) (hc_ne_zero : c ≠ 0) (hq_ne_zero : q ≠ 0) : snorm' (fun _ : α => c) q μ = (‖c‖₊ : ℝ≥0∞) * μ Set.univ ^ (1 / q) := by rw [snorm', lintegral_const, ENNReal.mul_rpow_of_ne_top _ (measure_ne_top μ Set.univ)] · congr rw [← ENNReal.rpow_mul] suffices hp_cancel : q * (1 / q) = 1 by rw [hp_cancel, ENNReal.rpow_one] rw [one_div, mul_inv_cancel hq_ne_zero] · rw [Ne, ENNReal.rpow_eq_top_iff, not_or, not_and_or, not_and_or] constructor · left rwa [ENNReal.coe_eq_zero, nnnorm_eq_zero] · exact Or.inl ENNReal.coe_ne_top #align measure_theory.snorm'_const' MeasureTheory.snorm'_const' theorem snormEssSup_const (c : F) (hμ : μ ≠ 0) : snormEssSup (fun _ : α => c) μ = (‖c‖₊ : ℝ≥0∞) := by rw [snormEssSup, essSup_const _ hμ] #align measure_theory.snorm_ess_sup_const MeasureTheory.snormEssSup_const theorem snorm'_const_of_isProbabilityMeasure (c : F) (hq_pos : 0 < q) [IsProbabilityMeasure μ] : snorm' (fun _ : α => c) q μ = (‖c‖₊ : ℝ≥0∞) := by simp [snorm'_const c hq_pos, measure_univ] #align measure_theory.snorm'_const_of_is_probability_measure MeasureTheory.snorm'_const_of_isProbabilityMeasure theorem snorm_const (c : F) (h0 : p ≠ 0) (hμ : μ ≠ 0) : snorm (fun _ : α => c) p μ = (‖c‖₊ : ℝ≥0∞) * μ Set.univ ^ (1 / ENNReal.toReal p) := by by_cases h_top : p = ∞ · simp [h_top, snormEssSup_const c hμ] simp [snorm_eq_snorm' h0 h_top, snorm'_const, ENNReal.toReal_pos h0 h_top] #align measure_theory.snorm_const MeasureTheory.snorm_const theorem snorm_const' (c : F) (h0 : p ≠ 0) (h_top : p ≠ ∞) : snorm (fun _ : α => c) p μ = (‖c‖₊ : ℝ≥0∞) * μ Set.univ ^ (1 / ENNReal.toReal p) := by simp [snorm_eq_snorm' h0 h_top, snorm'_const, ENNReal.toReal_pos h0 h_top] #align measure_theory.snorm_const' MeasureTheory.snorm_const' theorem snorm_const_lt_top_iff {p : ℝ≥0∞} {c : F} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : snorm (fun _ : α => c) p μ < ∞ ↔ c = 0 ∨ μ Set.univ < ∞ := by have hp : 0 < p.toReal := ENNReal.toReal_pos hp_ne_zero hp_ne_top by_cases hμ : μ = 0 · simp only [hμ, Measure.coe_zero, Pi.zero_apply, or_true_iff, ENNReal.zero_lt_top, snorm_measure_zero] by_cases hc : c = 0 · simp only [hc, true_or_iff, eq_self_iff_true, ENNReal.zero_lt_top, snorm_zero'] rw [snorm_const' c hp_ne_zero hp_ne_top] by_cases hμ_top : μ Set.univ = ∞ · simp [hc, hμ_top, hp] rw [ENNReal.mul_lt_top_iff] simp only [true_and_iff, one_div, ENNReal.rpow_eq_zero_iff, hμ, false_or_iff, or_false_iff, ENNReal.coe_lt_top, nnnorm_eq_zero, ENNReal.coe_eq_zero, MeasureTheory.Measure.measure_univ_eq_zero, hp, inv_lt_zero, hc, and_false_iff, false_and_iff, inv_pos, or_self_iff, hμ_top, Ne.lt_top hμ_top, iff_true_iff] exact ENNReal.rpow_lt_top_of_nonneg (inv_nonneg.mpr hp.le) hμ_top #align measure_theory.snorm_const_lt_top_iff MeasureTheory.snorm_const_lt_top_iff theorem memℒp_const (c : E) [IsFiniteMeasure μ] : Memℒp (fun _ : α => c) p μ := by refine ⟨aestronglyMeasurable_const, ?_⟩ by_cases h0 : p = 0 · simp [h0] by_cases hμ : μ = 0 · simp [hμ] rw [snorm_const c h0 hμ] refine ENNReal.mul_lt_top ENNReal.coe_ne_top ?_ refine (ENNReal.rpow_lt_top_of_nonneg ?_ (measure_ne_top μ Set.univ)).ne simp #align measure_theory.mem_ℒp_const MeasureTheory.memℒp_const theorem memℒp_top_const (c : E) : Memℒp (fun _ : α => c) ∞ μ := by refine ⟨aestronglyMeasurable_const, ?_⟩ by_cases h : μ = 0 · simp only [h, snorm_measure_zero, ENNReal.zero_lt_top] · rw [snorm_const _ ENNReal.top_ne_zero h] simp only [ENNReal.top_toReal, div_zero, ENNReal.rpow_zero, mul_one, ENNReal.coe_lt_top] #align measure_theory.mem_ℒp_top_const MeasureTheory.memℒp_top_const theorem memℒp_const_iff {p : ℝ≥0∞} {c : E} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : Memℒp (fun _ : α => c) p μ ↔ c = 0 ∨ μ Set.univ < ∞ := by rw [← snorm_const_lt_top_iff hp_ne_zero hp_ne_top] exact ⟨fun h => h.2, fun h => ⟨aestronglyMeasurable_const, h⟩⟩ #align measure_theory.mem_ℒp_const_iff MeasureTheory.memℒp_const_iff end Const	Mathlib/MeasureTheory/Function/LpSeminorm/Basic.lean	364	369	theorem snorm'_mono_nnnorm_ae {f : α → F} {g : α → G} (hq : 0 ≤ q) (h : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ ‖g x‖₊) : snorm' f q μ ≤ snorm' g q μ := by	simp only [snorm'] gcongr ?_ ^ (1/q) refine lintegral_mono_ae (h.mono fun x hx => ?_) gcongr
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Johannes Hölzl -/ import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Function.SimpleFunc import Mathlib.MeasureTheory.Measure.MutuallySingular import Mathlib.MeasureTheory.Measure.Count import Mathlib.Topology.IndicatorConstPointwise import Mathlib.MeasureTheory.Constructions.BorelSpace.Real #align_import measure_theory.integral.lebesgue from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" /-! # Lower Lebesgue integral for `ℝ≥0∞`-valued functions We define the lower Lebesgue integral of an `ℝ≥0∞`-valued function. ## Notation We introduce the following notation for the lower Lebesgue integral of a function `f : α → ℝ≥0∞`. * `∫⁻ x, f x ∂μ`: integral of a function `f : α → ℝ≥0∞` with respect to a measure `μ`; * `∫⁻ x, f x`: integral of a function `f : α → ℝ≥0∞` with respect to the canonical measure `volume` on `α`; * `∫⁻ x in s, f x ∂μ`: integral of a function `f : α → ℝ≥0∞` over a set `s` with respect to a measure `μ`, defined as `∫⁻ x, f x ∂(μ.restrict s)`; * `∫⁻ x in s, f x`: integral of a function `f : α → ℝ≥0∞` over a set `s` with respect to the canonical measure `volume`, defined as `∫⁻ x, f x ∂(volume.restrict s)`. -/ assert_not_exists NormedSpace set_option autoImplicit true noncomputable section open Set hiding restrict restrict_apply open Filter ENNReal open Function (support) open scoped Classical open Topology NNReal ENNReal MeasureTheory namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc variable {α β γ δ : Type} section Lintegral open SimpleFunc variable {m : MeasurableSpace α} {μ ν : Measure α} /-- The lower Lebesgue integral* of a function `f` with respect to a measure `μ`. -/ irreducible_def lintegral {_ : MeasurableSpace α} (μ : Measure α) (f : α → ℝ≥0∞) : ℝ≥0∞ := ⨆ (g : α →ₛ ℝ≥0∞) (_ : ⇑g ≤ f), g.lintegral μ #align measure_theory.lintegral MeasureTheory.lintegral /-! In the notation for integrals, an expression like `∫⁻ x, g ‖x‖ ∂μ` will not be parsed correctly, and needs parentheses. We do not set the binding power of `r` to `0`, because then `∫⁻ x, f x = 0` will be parsed incorrectly. -/ @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => f)" ∂"μ:70 => lintegral μ r @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => lintegral volume f) => r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => f)" ∂"μ:70 => lintegral (Measure.restrict μ s) r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => lintegral (Measure.restrict volume s) f) => r theorem SimpleFunc.lintegral_eq_lintegral {m : MeasurableSpace α} (f : α →ₛ ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = f.lintegral μ := by rw [MeasureTheory.lintegral] exact le_antisymm (iSup₂_le fun g hg => lintegral_mono hg <\| le_rfl) (le_iSup₂_of_le f le_rfl le_rfl) #align measure_theory.simple_func.lintegral_eq_lintegral MeasureTheory.SimpleFunc.lintegral_eq_lintegral @[mono] theorem lintegral_mono' {m : MeasurableSpace α} ⦃μ ν : Measure α⦄ (hμν : μ ≤ ν) ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂ν := by rw [lintegral, lintegral] exact iSup_mono fun φ => iSup_mono' fun hφ => ⟨le_trans hφ hfg, lintegral_mono (le_refl φ) hμν⟩ #align measure_theory.lintegral_mono' MeasureTheory.lintegral_mono' -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn' ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) (h2 : μ ≤ ν) : lintegral μ f ≤ lintegral ν g := lintegral_mono' h2 hfg theorem lintegral_mono ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono' (le_refl μ) hfg #align measure_theory.lintegral_mono MeasureTheory.lintegral_mono -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) : lintegral μ f ≤ lintegral μ g := lintegral_mono hfg theorem lintegral_mono_nnreal {f g : α → ℝ≥0} (h : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono fun a => ENNReal.coe_le_coe.2 (h a) #align measure_theory.lintegral_mono_nnreal MeasureTheory.lintegral_mono_nnreal theorem iSup_lintegral_measurable_le_eq_lintegral (f : α → ℝ≥0∞) : ⨆ (g : α → ℝ≥0∞) (_ : Measurable g) (_ : g ≤ f), ∫⁻ a, g a ∂μ = ∫⁻ a, f a ∂μ := by apply le_antisymm · exact iSup_le fun i => iSup_le fun _ => iSup_le fun h'i => lintegral_mono h'i · rw [lintegral] refine iSup₂_le fun i hi => le_iSup₂_of_le i i.measurable <\| le_iSup_of_le hi ?_ exact le_of_eq (i.lintegral_eq_lintegral _).symm #align measure_theory.supr_lintegral_measurable_le_eq_lintegral MeasureTheory.iSup_lintegral_measurable_le_eq_lintegral theorem lintegral_mono_set {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ⊆ t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set MeasureTheory.lintegral_mono_set theorem lintegral_mono_set' {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ≤ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono' hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set' MeasureTheory.lintegral_mono_set' theorem monotone_lintegral {_ : MeasurableSpace α} (μ : Measure α) : Monotone (lintegral μ) := lintegral_mono #align measure_theory.monotone_lintegral MeasureTheory.monotone_lintegral @[simp] theorem lintegral_const (c : ℝ≥0∞) : ∫⁻ _, c ∂μ = c * μ univ := by rw [← SimpleFunc.const_lintegral, ← SimpleFunc.lintegral_eq_lintegral, SimpleFunc.coe_const] rfl #align measure_theory.lintegral_const MeasureTheory.lintegral_const theorem lintegral_zero : ∫⁻ _ : α, 0 ∂μ = 0 := by simp #align measure_theory.lintegral_zero MeasureTheory.lintegral_zero theorem lintegral_zero_fun : lintegral μ (0 : α → ℝ≥0∞) = 0 := lintegral_zero #align measure_theory.lintegral_zero_fun MeasureTheory.lintegral_zero_fun -- @[simp] -- Porting note (#10618): simp can prove this theorem lintegral_one : ∫⁻ _, (1 : ℝ≥0∞) ∂μ = μ univ := by rw [lintegral_const, one_mul] #align measure_theory.lintegral_one MeasureTheory.lintegral_one theorem set_lintegral_const (s : Set α) (c : ℝ≥0∞) : ∫⁻ _ in s, c ∂μ = c * μ s := by rw [lintegral_const, Measure.restrict_apply_univ] #align measure_theory.set_lintegral_const MeasureTheory.set_lintegral_const theorem set_lintegral_one (s) : ∫⁻ _ in s, 1 ∂μ = μ s := by rw [set_lintegral_const, one_mul] #align measure_theory.set_lintegral_one MeasureTheory.set_lintegral_one theorem set_lintegral_const_lt_top [IsFiniteMeasure μ] (s : Set α) {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _ in s, c ∂μ < ∞ := by rw [lintegral_const] exact ENNReal.mul_lt_top hc (measure_ne_top (μ.restrict s) univ) #align measure_theory.set_lintegral_const_lt_top MeasureTheory.set_lintegral_const_lt_top theorem lintegral_const_lt_top [IsFiniteMeasure μ] {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _, c ∂μ < ∞ := by simpa only [Measure.restrict_univ] using set_lintegral_const_lt_top (univ : Set α) hc #align measure_theory.lintegral_const_lt_top MeasureTheory.lintegral_const_lt_top section variable (μ) /-- For any function `f : α → ℝ≥0∞`, there exists a measurable function `g ≤ f` with the same integral. -/ theorem exists_measurable_le_lintegral_eq (f : α → ℝ≥0∞) : ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by rcases eq_or_ne (∫⁻ a, f a ∂μ) 0 with h₀ \| h₀ · exact ⟨0, measurable_zero, zero_le f, h₀.trans lintegral_zero.symm⟩ rcases exists_seq_strictMono_tendsto' h₀.bot_lt with ⟨L, _, hLf, hL_tendsto⟩ have : ∀ n, ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ L n < ∫⁻ a, g a ∂μ := by intro n simpa only [← iSup_lintegral_measurable_le_eq_lintegral f, lt_iSup_iff, exists_prop] using (hLf n).2 choose g hgm hgf hLg using this refine ⟨fun x => ⨆ n, g n x, measurable_iSup hgm, fun x => iSup_le fun n => hgf n x, le_antisymm ?_ ?_⟩ · refine le_of_tendsto' hL_tendsto fun n => (hLg n).le.trans <\| lintegral_mono fun x => ?_ exact le_iSup (fun n => g n x) n · exact lintegral_mono fun x => iSup_le fun n => hgf n x #align measure_theory.exists_measurable_le_lintegral_eq MeasureTheory.exists_measurable_le_lintegral_eq end /-- `∫⁻ a in s, f a ∂μ` is defined as the supremum of integrals of simple functions `φ : α →ₛ ℝ≥0∞` such that `φ ≤ f`. This lemma says that it suffices to take functions `φ : α →ₛ ℝ≥0`. -/ theorem lintegral_eq_nnreal {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = ⨆ (φ : α →ₛ ℝ≥0) (_ : ∀ x, ↑(φ x) ≤ f x), (φ.map ((↑) : ℝ≥0 → ℝ≥0∞)).lintegral μ := by rw [lintegral] refine le_antisymm (iSup₂_le fun φ hφ => ?_) (iSup_mono' fun φ => ⟨φ.map ((↑) : ℝ≥0 → ℝ≥0∞), le_rfl⟩) by_cases h : ∀ᵐ a ∂μ, φ a ≠ ∞ · let ψ := φ.map ENNReal.toNNReal replace h : ψ.map ((↑) : ℝ≥0 → ℝ≥0∞) =ᵐ[μ] φ := h.mono fun a => ENNReal.coe_toNNReal have : ∀ x, ↑(ψ x) ≤ f x := fun x => le_trans ENNReal.coe_toNNReal_le_self (hφ x) exact le_iSup_of_le (φ.map ENNReal.toNNReal) (le_iSup_of_le this (ge_of_eq <\| lintegral_congr h)) · have h_meas : μ (φ ⁻¹' {∞}) ≠ 0 := mt measure_zero_iff_ae_nmem.1 h refine le_trans le_top (ge_of_eq <\| (iSup_eq_top _).2 fun b hb => ?_) obtain ⟨n, hn⟩ : ∃ n : ℕ, b < n * μ (φ ⁻¹' {∞}) := exists_nat_mul_gt h_meas (ne_of_lt hb) use (const α (n : ℝ≥0)).restrict (φ ⁻¹' {∞}) simp only [lt_iSup_iff, exists_prop, coe_restrict, φ.measurableSet_preimage, coe_const, ENNReal.coe_indicator, map_coe_ennreal_restrict, SimpleFunc.map_const, ENNReal.coe_natCast, restrict_const_lintegral] refine ⟨indicator_le fun x hx => le_trans ?_ (hφ _), hn⟩ simp only [mem_preimage, mem_singleton_iff] at hx simp only [hx, le_top] #align measure_theory.lintegral_eq_nnreal MeasureTheory.lintegral_eq_nnreal theorem exists_simpleFunc_forall_lintegral_sub_lt_of_pos {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) : ∃ φ : α →ₛ ℝ≥0, (∀ x, ↑(φ x) ≤ f x) ∧ ∀ ψ : α →ₛ ℝ≥0, (∀ x, ↑(ψ x) ≤ f x) → (map (↑) (ψ - φ)).lintegral μ < ε := by rw [lintegral_eq_nnreal] at h have := ENNReal.lt_add_right h hε erw [ENNReal.biSup_add] at this <;> [skip; exact ⟨0, fun x => zero_le _⟩] simp_rw [lt_iSup_iff, iSup_lt_iff, iSup_le_iff] at this rcases this with ⟨φ, hle : ∀ x, ↑(φ x) ≤ f x, b, hbφ, hb⟩ refine ⟨φ, hle, fun ψ hψ => ?_⟩ have : (map (↑) φ).lintegral μ ≠ ∞ := ne_top_of_le_ne_top h (by exact le_iSup₂ (α := ℝ≥0∞) φ hle) rw [← ENNReal.add_lt_add_iff_left this, ← add_lintegral, ← SimpleFunc.map_add @ENNReal.coe_add] refine (hb _ fun x => le_trans ?_ (max_le (hle x) (hψ x))).trans_lt hbφ norm_cast simp only [add_apply, sub_apply, add_tsub_eq_max] rfl #align measure_theory.exists_simple_func_forall_lintegral_sub_lt_of_pos MeasureTheory.exists_simpleFunc_forall_lintegral_sub_lt_of_pos theorem iSup_lintegral_le {ι : Sort} (f : ι → α → ℝ≥0∞) : ⨆ i, ∫⁻ a, f i a ∂μ ≤ ∫⁻ a, ⨆ i, f i a ∂μ := by simp only [← iSup_apply] exact (monotone_lintegral μ).le_map_iSup #align measure_theory.supr_lintegral_le MeasureTheory.iSup_lintegral_le theorem iSup₂_lintegral_le {ι : Sort} {ι' : ι → Sort} (f : ∀ i, ι' i → α → ℝ≥0∞) : ⨆ (i) (j), ∫⁻ a, f i j a ∂μ ≤ ∫⁻ a, ⨆ (i) (j), f i j a ∂μ := by convert (monotone_lintegral μ).le_map_iSup₂ f with a simp only [iSup_apply] #align measure_theory.supr₂_lintegral_le MeasureTheory.iSup₂_lintegral_le theorem le_iInf_lintegral {ι : Sort} (f : ι → α → ℝ≥0∞) : ∫⁻ a, ⨅ i, f i a ∂μ ≤ ⨅ i, ∫⁻ a, f i a ∂μ := by simp only [← iInf_apply] exact (monotone_lintegral μ).map_iInf_le #align measure_theory.le_infi_lintegral MeasureTheory.le_iInf_lintegral theorem le_iInf₂_lintegral {ι : Sort} {ι' : ι → Sort} (f : ∀ i, ι' i → α → ℝ≥0∞) : ∫⁻ a, ⨅ (i) (h : ι' i), f i h a ∂μ ≤ ⨅ (i) (h : ι' i), ∫⁻ a, f i h a ∂μ := by convert (monotone_lintegral μ).map_iInf₂_le f with a simp only [iInf_apply] #align measure_theory.le_infi₂_lintegral MeasureTheory.le_iInf₂_lintegral theorem lintegral_mono_ae {f g : α → ℝ≥0∞} (h : ∀ᵐ a ∂μ, f a ≤ g a) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := by rcases exists_measurable_superset_of_null h with ⟨t, hts, ht, ht0⟩ have : ∀ᵐ x ∂μ, x ∉ t := measure_zero_iff_ae_nmem.1 ht0 rw [lintegral, lintegral] refine iSup_le fun s => iSup_le fun hfs => le_iSup_of_le (s.restrict tᶜ) <\| le_iSup_of_le ?_ ?_ · intro a by_cases h : a ∈ t <;> simp only [restrict_apply s ht.compl, mem_compl_iff, h, not_true, not_false_eq_true, indicator_of_not_mem, zero_le, not_false_eq_true, indicator_of_mem] exact le_trans (hfs a) (_root_.by_contradiction fun hnfg => h (hts hnfg)) · refine le_of_eq (SimpleFunc.lintegral_congr <\| this.mono fun a hnt => ?_) by_cases hat : a ∈ t <;> simp only [restrict_apply s ht.compl, mem_compl_iff, hat, not_true, not_false_eq_true, indicator_of_not_mem, not_false_eq_true, indicator_of_mem] exact (hnt hat).elim #align measure_theory.lintegral_mono_ae MeasureTheory.lintegral_mono_ae theorem set_lintegral_mono_ae {s : Set α} {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := lintegral_mono_ae <\| (ae_restrict_iff <\| measurableSet_le hf hg).2 hfg #align measure_theory.set_lintegral_mono_ae MeasureTheory.set_lintegral_mono_ae theorem set_lintegral_mono {s : Set α} {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (hfg : ∀ x ∈ s, f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := set_lintegral_mono_ae hf hg (ae_of_all _ hfg) #align measure_theory.set_lintegral_mono MeasureTheory.set_lintegral_mono theorem set_lintegral_mono_ae' {s : Set α} {f g : α → ℝ≥0∞} (hs : MeasurableSet s) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := lintegral_mono_ae <\| (ae_restrict_iff' hs).2 hfg theorem set_lintegral_mono' {s : Set α} {f g : α → ℝ≥0∞} (hs : MeasurableSet s) (hfg : ∀ x ∈ s, f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := set_lintegral_mono_ae' hs (ae_of_all _ hfg) theorem set_lintegral_le_lintegral (s : Set α) (f : α → ℝ≥0∞) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x, f x ∂μ := lintegral_mono' Measure.restrict_le_self le_rfl theorem lintegral_congr_ae {f g : α → ℝ≥0∞} (h : f =ᵐ[μ] g) : ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := le_antisymm (lintegral_mono_ae <\| h.le) (lintegral_mono_ae <\| h.symm.le) #align measure_theory.lintegral_congr_ae MeasureTheory.lintegral_congr_ae theorem lintegral_congr {f g : α → ℝ≥0∞} (h : ∀ a, f a = g a) : ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by simp only [h] #align measure_theory.lintegral_congr MeasureTheory.lintegral_congr theorem set_lintegral_congr {f : α → ℝ≥0∞} {s t : Set α} (h : s =ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ = ∫⁻ x in t, f x ∂μ := by rw [Measure.restrict_congr_set h] #align measure_theory.set_lintegral_congr MeasureTheory.set_lintegral_congr theorem set_lintegral_congr_fun {f g : α → ℝ≥0∞} {s : Set α} (hs : MeasurableSet s) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x = g x) : ∫⁻ x in s, f x ∂μ = ∫⁻ x in s, g x ∂μ := by rw [lintegral_congr_ae] rw [EventuallyEq] rwa [ae_restrict_iff' hs] #align measure_theory.set_lintegral_congr_fun MeasureTheory.set_lintegral_congr_fun theorem lintegral_ofReal_le_lintegral_nnnorm (f : α → ℝ) : ∫⁻ x, ENNReal.ofReal (f x) ∂μ ≤ ∫⁻ x, ‖f x‖₊ ∂μ := by simp_rw [← ofReal_norm_eq_coe_nnnorm] refine lintegral_mono fun x => ENNReal.ofReal_le_ofReal ?_ rw [Real.norm_eq_abs] exact le_abs_self (f x) #align measure_theory.lintegral_of_real_le_lintegral_nnnorm MeasureTheory.lintegral_ofReal_le_lintegral_nnnorm theorem lintegral_nnnorm_eq_of_ae_nonneg {f : α → ℝ} (h_nonneg : 0 ≤ᵐ[μ] f) : ∫⁻ x, ‖f x‖₊ ∂μ = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := by apply lintegral_congr_ae filter_upwards [h_nonneg] with x hx rw [Real.nnnorm_of_nonneg hx, ENNReal.ofReal_eq_coe_nnreal hx] #align measure_theory.lintegral_nnnorm_eq_of_ae_nonneg MeasureTheory.lintegral_nnnorm_eq_of_ae_nonneg theorem lintegral_nnnorm_eq_of_nonneg {f : α → ℝ} (h_nonneg : 0 ≤ f) : ∫⁻ x, ‖f x‖₊ ∂μ = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := lintegral_nnnorm_eq_of_ae_nonneg (Filter.eventually_of_forall h_nonneg) #align measure_theory.lintegral_nnnorm_eq_of_nonneg MeasureTheory.lintegral_nnnorm_eq_of_nonneg /-- Monotone convergence theorem -- sometimes called Beppo-Levi convergence. See `lintegral_iSup_directed` for a more general form. -/ theorem lintegral_iSup {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, Measurable (f n)) (h_mono : Monotone f) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by set c : ℝ≥0 → ℝ≥0∞ := (↑) set F := fun a : α => ⨆ n, f n a refine le_antisymm ?_ (iSup_lintegral_le _) rw [lintegral_eq_nnreal] refine iSup_le fun s => iSup_le fun hsf => ?_ refine ENNReal.le_of_forall_lt_one_mul_le fun a ha => ?_ rcases ENNReal.lt_iff_exists_coe.1 ha with ⟨r, rfl, _⟩ have ha : r < 1 := ENNReal.coe_lt_coe.1 ha let rs := s.map fun a => r * a have eq_rs : rs.map c = (const α r : α →ₛ ℝ≥0∞) * map c s := rfl have eq : ∀ p, rs.map c ⁻¹' {p} = ⋃ n, rs.map c ⁻¹' {p} ∩ { a \| p ≤ f n a } := by intro p rw [← inter_iUnion]; nth_rw 1 [← inter_univ (map c rs ⁻¹' {p})] refine Set.ext fun x => and_congr_right fun hx => true_iff_iff.2 ?_ by_cases p_eq : p = 0 · simp [p_eq] simp only [coe_map, mem_preimage, Function.comp_apply, mem_singleton_iff] at hx subst hx have : r * s x ≠ 0 := by rwa [Ne, ← ENNReal.coe_eq_zero] have : s x ≠ 0 := right_ne_zero_of_mul this have : (rs.map c) x < ⨆ n : ℕ, f n x := by refine lt_of_lt_of_le (ENNReal.coe_lt_coe.2 ?_) (hsf x) suffices r * s x < 1 * s x by simpa exact mul_lt_mul_of_pos_right ha (pos_iff_ne_zero.2 this) rcases lt_iSup_iff.1 this with ⟨i, hi⟩ exact mem_iUnion.2 ⟨i, le_of_lt hi⟩ have mono : ∀ r : ℝ≥0∞, Monotone fun n => rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a } := by intro r i j h refine inter_subset_inter_right _ ?_ simp_rw [subset_def, mem_setOf] intro x hx exact le_trans hx (h_mono h x) have h_meas : ∀ n, MeasurableSet {a : α \| map c rs a ≤ f n a} := fun n => measurableSet_le (SimpleFunc.measurable _) (hf n) calc (r : ℝ≥0∞) * (s.map c).lintegral μ = ∑ r ∈ (rs.map c).range, r * μ (rs.map c ⁻¹' {r}) := by rw [← const_mul_lintegral, eq_rs, SimpleFunc.lintegral] _ = ∑ r ∈ (rs.map c).range, r * μ (⋃ n, rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := by simp only [(eq _).symm] _ = ∑ r ∈ (rs.map c).range, ⨆ n, r * μ (rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := (Finset.sum_congr rfl fun x _ => by rw [measure_iUnion_eq_iSup (mono x).directed_le, ENNReal.mul_iSup]) _ = ⨆ n, ∑ r ∈ (rs.map c).range, r * μ (rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := by refine ENNReal.finset_sum_iSup_nat fun p i j h ↦ ?_ gcongr _ * μ ?_ exact mono p h _ ≤ ⨆ n : ℕ, ((rs.map c).restrict { a \| (rs.map c) a ≤ f n a }).lintegral μ := by gcongr with n rw [restrict_lintegral _ (h_meas n)] refine le_of_eq (Finset.sum_congr rfl fun r _ => ?_) congr 2 with a refine and_congr_right ?_ simp (config := { contextual := true }) _ ≤ ⨆ n, ∫⁻ a, f n a ∂μ := by simp only [← SimpleFunc.lintegral_eq_lintegral] gcongr with n a simp only [map_apply] at h_meas simp only [coe_map, restrict_apply _ (h_meas _), (· ∘ ·)] exact indicator_apply_le id #align measure_theory.lintegral_supr MeasureTheory.lintegral_iSup /-- Monotone convergence theorem -- sometimes called Beppo-Levi convergence. Version with ae_measurable functions. -/ theorem lintegral_iSup' {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n => f n x) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iSup_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Monotone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_mono have h_ae_seq_mono : Monotone (aeSeq hf p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet hf p · exact aeSeq.prop_of_mem_aeSeqSet hf hx hnm · simp only [aeSeq, hx, if_false, le_rfl] rw [lintegral_congr_ae (aeSeq.iSup hf hp).symm] simp_rw [iSup_apply] rw [lintegral_iSup (aeSeq.measurable hf p) h_ae_seq_mono] congr with n exact lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae hf hp n) #align measure_theory.lintegral_supr' MeasureTheory.lintegral_iSup' /-- Monotone convergence theorem expressed with limits -/ theorem lintegral_tendsto_of_tendsto_of_monotone {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n => f n x) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n => f n x) atTop (𝓝 <\| F x)) : Tendsto (fun n => ∫⁻ x, f n x ∂μ) atTop (𝓝 <\| ∫⁻ x, F x ∂μ) := by have : Monotone fun n => ∫⁻ x, f n x ∂μ := fun i j hij => lintegral_mono_ae (h_mono.mono fun x hx => hx hij) suffices key : ∫⁻ x, F x ∂μ = ⨆ n, ∫⁻ x, f n x ∂μ by rw [key] exact tendsto_atTop_iSup this rw [← lintegral_iSup' hf h_mono] refine lintegral_congr_ae ?_ filter_upwards [h_mono, h_tendsto] with _ hx_mono hx_tendsto using tendsto_nhds_unique hx_tendsto (tendsto_atTop_iSup hx_mono) #align measure_theory.lintegral_tendsto_of_tendsto_of_monotone MeasureTheory.lintegral_tendsto_of_tendsto_of_monotone theorem lintegral_eq_iSup_eapprox_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂μ = ⨆ n, (eapprox f n).lintegral μ := calc ∫⁻ a, f a ∂μ = ∫⁻ a, ⨆ n, (eapprox f n : α → ℝ≥0∞) a ∂μ := by congr; ext a; rw [iSup_eapprox_apply f hf] _ = ⨆ n, ∫⁻ a, (eapprox f n : α → ℝ≥0∞) a ∂μ := by apply lintegral_iSup · measurability · intro i j h exact monotone_eapprox f h _ = ⨆ n, (eapprox f n).lintegral μ := by congr; ext n; rw [(eapprox f n).lintegral_eq_lintegral] #align measure_theory.lintegral_eq_supr_eapprox_lintegral MeasureTheory.lintegral_eq_iSup_eapprox_lintegral /-- If `f` has finite integral, then `∫⁻ x in s, f x ∂μ` is absolutely continuous in `s`: it tends to zero as `μ s` tends to zero. This lemma states this fact in terms of `ε` and `δ`. -/ theorem exists_pos_set_lintegral_lt_of_measure_lt {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) : ∃ δ > 0, ∀ s, μ s < δ → ∫⁻ x in s, f x ∂μ < ε := by rcases exists_between (pos_iff_ne_zero.mpr hε) with ⟨ε₂, hε₂0, hε₂ε⟩ rcases exists_between hε₂0 with ⟨ε₁, hε₁0, hε₁₂⟩ rcases exists_simpleFunc_forall_lintegral_sub_lt_of_pos h hε₁0.ne' with ⟨φ, _, hφ⟩ rcases φ.exists_forall_le with ⟨C, hC⟩ use (ε₂ - ε₁) / C, ENNReal.div_pos_iff.2 ⟨(tsub_pos_iff_lt.2 hε₁₂).ne', ENNReal.coe_ne_top⟩ refine fun s hs => lt_of_le_of_lt ?_ hε₂ε simp only [lintegral_eq_nnreal, iSup_le_iff] intro ψ hψ calc (map (↑) ψ).lintegral (μ.restrict s) ≤ (map (↑) φ).lintegral (μ.restrict s) + (map (↑) (ψ - φ)).lintegral (μ.restrict s) := by rw [← SimpleFunc.add_lintegral, ← SimpleFunc.map_add @ENNReal.coe_add] refine SimpleFunc.lintegral_mono (fun x => ?_) le_rfl simp only [add_tsub_eq_max, le_max_right, coe_map, Function.comp_apply, SimpleFunc.coe_add, SimpleFunc.coe_sub, Pi.add_apply, Pi.sub_apply, ENNReal.coe_max (φ x) (ψ x)] _ ≤ (map (↑) φ).lintegral (μ.restrict s) + ε₁ := by gcongr refine le_trans ?_ (hφ _ hψ).le exact SimpleFunc.lintegral_mono le_rfl Measure.restrict_le_self _ ≤ (SimpleFunc.const α (C : ℝ≥0∞)).lintegral (μ.restrict s) + ε₁ := by gcongr exact SimpleFunc.lintegral_mono (fun x ↦ ENNReal.coe_le_coe.2 (hC x)) le_rfl _ = C * μ s + ε₁ := by simp only [← SimpleFunc.lintegral_eq_lintegral, coe_const, lintegral_const, Measure.restrict_apply, MeasurableSet.univ, univ_inter, Function.const] _ ≤ C * ((ε₂ - ε₁) / C) + ε₁ := by gcongr _ ≤ ε₂ - ε₁ + ε₁ := by gcongr; apply mul_div_le _ = ε₂ := tsub_add_cancel_of_le hε₁₂.le #align measure_theory.exists_pos_set_lintegral_lt_of_measure_lt MeasureTheory.exists_pos_set_lintegral_lt_of_measure_lt /-- If `f` has finite integral, then `∫⁻ x in s, f x ∂μ` is absolutely continuous in `s`: it tends to zero as `μ s` tends to zero. -/ theorem tendsto_set_lintegral_zero {ι} {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {l : Filter ι} {s : ι → Set α} (hl : Tendsto (μ ∘ s) l (𝓝 0)) : Tendsto (fun i => ∫⁻ x in s i, f x ∂μ) l (𝓝 0) := by simp only [ENNReal.nhds_zero, tendsto_iInf, tendsto_principal, mem_Iio, ← pos_iff_ne_zero] at hl ⊢ intro ε ε0 rcases exists_pos_set_lintegral_lt_of_measure_lt h ε0.ne' with ⟨δ, δ0, hδ⟩ exact (hl δ δ0).mono fun i => hδ _ #align measure_theory.tendsto_set_lintegral_zero MeasureTheory.tendsto_set_lintegral_zero /-- The sum of the lower Lebesgue integrals of two functions is less than or equal to the integral of their sum. The other inequality needs one of these functions to be (a.e.-)measurable. -/ theorem le_lintegral_add (f g : α → ℝ≥0∞) : ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ ≤ ∫⁻ a, f a + g a ∂μ := by simp only [lintegral] refine ENNReal.biSup_add_biSup_le' (p := fun h : α →ₛ ℝ≥0∞ => h ≤ f) (q := fun h : α →ₛ ℝ≥0∞ => h ≤ g) ⟨0, zero_le f⟩ ⟨0, zero_le g⟩ fun f' hf' g' hg' => ?_ exact le_iSup₂_of_le (f' + g') (add_le_add hf' hg') (add_lintegral _ _).ge #align measure_theory.le_lintegral_add MeasureTheory.le_lintegral_add -- Use stronger lemmas `lintegral_add_left`/`lintegral_add_right` instead theorem lintegral_add_aux {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := calc ∫⁻ a, f a + g a ∂μ = ∫⁻ a, (⨆ n, (eapprox f n : α → ℝ≥0∞) a) + ⨆ n, (eapprox g n : α → ℝ≥0∞) a ∂μ := by simp only [iSup_eapprox_apply, hf, hg] _ = ∫⁻ a, ⨆ n, (eapprox f n + eapprox g n : α → ℝ≥0∞) a ∂μ := by congr; funext a rw [ENNReal.iSup_add_iSup_of_monotone] · simp only [Pi.add_apply] · intro i j h exact monotone_eapprox _ h a · intro i j h exact monotone_eapprox _ h a _ = ⨆ n, (eapprox f n).lintegral μ + (eapprox g n).lintegral μ := by rw [lintegral_iSup] · congr funext n rw [← SimpleFunc.add_lintegral, ← SimpleFunc.lintegral_eq_lintegral] simp only [Pi.add_apply, SimpleFunc.coe_add] · measurability · intro i j h a dsimp gcongr <;> exact monotone_eapprox _ h _ _ = (⨆ n, (eapprox f n).lintegral μ) + ⨆ n, (eapprox g n).lintegral μ := by refine (ENNReal.iSup_add_iSup_of_monotone ?_ ?_).symm <;> · intro i j h exact SimpleFunc.lintegral_mono (monotone_eapprox _ h) le_rfl _ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by rw [lintegral_eq_iSup_eapprox_lintegral hf, lintegral_eq_iSup_eapprox_lintegral hg] #align measure_theory.lintegral_add_aux MeasureTheory.lintegral_add_aux /-- If `f g : α → ℝ≥0∞` are two functions and one of them is (a.e.) measurable, then the Lebesgue integral of `f + g` equals the sum of integrals. This lemma assumes that `f` is integrable, see also `MeasureTheory.lintegral_add_right` and primed versions of these lemmas. -/ @[simp] theorem lintegral_add_left {f : α → ℝ≥0∞} (hf : Measurable f) (g : α → ℝ≥0∞) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by refine le_antisymm ?_ (le_lintegral_add _ _) rcases exists_measurable_le_lintegral_eq μ fun a => f a + g a with ⟨φ, hφm, hφ_le, hφ_eq⟩ calc ∫⁻ a, f a + g a ∂μ = ∫⁻ a, φ a ∂μ := hφ_eq _ ≤ ∫⁻ a, f a + (φ a - f a) ∂μ := lintegral_mono fun a => le_add_tsub _ = ∫⁻ a, f a ∂μ + ∫⁻ a, φ a - f a ∂μ := lintegral_add_aux hf (hφm.sub hf) _ ≤ ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := add_le_add_left (lintegral_mono fun a => tsub_le_iff_left.2 <\| hφ_le a) _ #align measure_theory.lintegral_add_left MeasureTheory.lintegral_add_left theorem lintegral_add_left' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (g : α → ℝ≥0∞) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by rw [lintegral_congr_ae hf.ae_eq_mk, ← lintegral_add_left hf.measurable_mk, lintegral_congr_ae (hf.ae_eq_mk.add (ae_eq_refl g))] #align measure_theory.lintegral_add_left' MeasureTheory.lintegral_add_left' theorem lintegral_add_right' (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : AEMeasurable g μ) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by simpa only [add_comm] using lintegral_add_left' hg f #align measure_theory.lintegral_add_right' MeasureTheory.lintegral_add_right' /-- If `f g : α → ℝ≥0∞` are two functions and one of them is (a.e.) measurable, then the Lebesgue integral of `f + g` equals the sum of integrals. This lemma assumes that `g` is integrable, see also `MeasureTheory.lintegral_add_left` and primed versions of these lemmas. -/ @[simp] theorem lintegral_add_right (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : Measurable g) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := lintegral_add_right' f hg.aemeasurable #align measure_theory.lintegral_add_right MeasureTheory.lintegral_add_right @[simp] theorem lintegral_smul_measure (c : ℝ≥0∞) (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂c • μ = c * ∫⁻ a, f a ∂μ := by simp only [lintegral, iSup_subtype', SimpleFunc.lintegral_smul, ENNReal.mul_iSup, smul_eq_mul] #align measure_theory.lintegral_smul_measure MeasureTheory.lintegral_smul_measure lemma set_lintegral_smul_measure (c : ℝ≥0∞) (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a in s, f a ∂(c • μ) = c * ∫⁻ a in s, f a ∂μ := by rw [Measure.restrict_smul, lintegral_smul_measure] @[simp] theorem lintegral_sum_measure {m : MeasurableSpace α} {ι} (f : α → ℝ≥0∞) (μ : ι → Measure α) : ∫⁻ a, f a ∂Measure.sum μ = ∑' i, ∫⁻ a, f a ∂μ i := by simp only [lintegral, iSup_subtype', SimpleFunc.lintegral_sum, ENNReal.tsum_eq_iSup_sum] rw [iSup_comm] congr; funext s induction' s using Finset.induction_on with i s hi hs · simp simp only [Finset.sum_insert hi, ← hs] refine (ENNReal.iSup_add_iSup ?_).symm intro φ ψ exact ⟨⟨φ ⊔ ψ, fun x => sup_le (φ.2 x) (ψ.2 x)⟩, add_le_add (SimpleFunc.lintegral_mono le_sup_left le_rfl) (Finset.sum_le_sum fun j _ => SimpleFunc.lintegral_mono le_sup_right le_rfl)⟩ #align measure_theory.lintegral_sum_measure MeasureTheory.lintegral_sum_measure theorem hasSum_lintegral_measure {ι} {_ : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : ι → Measure α) : HasSum (fun i => ∫⁻ a, f a ∂μ i) (∫⁻ a, f a ∂Measure.sum μ) := (lintegral_sum_measure f μ).symm ▸ ENNReal.summable.hasSum #align measure_theory.has_sum_lintegral_measure MeasureTheory.hasSum_lintegral_measure @[simp] theorem lintegral_add_measure {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ ν : Measure α) : ∫⁻ a, f a ∂(μ + ν) = ∫⁻ a, f a ∂μ + ∫⁻ a, f a ∂ν := by simpa [tsum_fintype] using lintegral_sum_measure f fun b => cond b μ ν #align measure_theory.lintegral_add_measure MeasureTheory.lintegral_add_measure @[simp] theorem lintegral_finset_sum_measure {ι} {m : MeasurableSpace α} (s : Finset ι) (f : α → ℝ≥0∞) (μ : ι → Measure α) : ∫⁻ a, f a ∂(∑ i ∈ s, μ i) = ∑ i ∈ s, ∫⁻ a, f a ∂μ i := by rw [← Measure.sum_coe_finset, lintegral_sum_measure, ← Finset.tsum_subtype'] simp only [Finset.coe_sort_coe] #align measure_theory.lintegral_finset_sum_measure MeasureTheory.lintegral_finset_sum_measure @[simp] theorem lintegral_zero_measure {m : MeasurableSpace α} (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂(0 : Measure α) = 0 := by simp [lintegral] #align measure_theory.lintegral_zero_measure MeasureTheory.lintegral_zero_measure @[simp] theorem lintegral_of_isEmpty {α} [MeasurableSpace α] [IsEmpty α] (μ : Measure α) (f : α → ℝ≥0∞) : ∫⁻ x, f x ∂μ = 0 := by have : Subsingleton (Measure α) := inferInstance convert lintegral_zero_measure f theorem set_lintegral_empty (f : α → ℝ≥0∞) : ∫⁻ x in ∅, f x ∂μ = 0 := by rw [Measure.restrict_empty, lintegral_zero_measure] #align measure_theory.set_lintegral_empty MeasureTheory.set_lintegral_empty theorem set_lintegral_univ (f : α → ℝ≥0∞) : ∫⁻ x in univ, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [Measure.restrict_univ] #align measure_theory.set_lintegral_univ MeasureTheory.set_lintegral_univ theorem set_lintegral_measure_zero (s : Set α) (f : α → ℝ≥0∞) (hs' : μ s = 0) : ∫⁻ x in s, f x ∂μ = 0 := by convert lintegral_zero_measure _ exact Measure.restrict_eq_zero.2 hs' #align measure_theory.set_lintegral_measure_zero MeasureTheory.set_lintegral_measure_zero theorem lintegral_finset_sum' (s : Finset β) {f : β → α → ℝ≥0∞} (hf : ∀ b ∈ s, AEMeasurable (f b) μ) : ∫⁻ a, ∑ b ∈ s, f b a ∂μ = ∑ b ∈ s, ∫⁻ a, f b a ∂μ := by induction' s using Finset.induction_on with a s has ih · simp · simp only [Finset.sum_insert has] rw [Finset.forall_mem_insert] at hf rw [lintegral_add_left' hf.1, ih hf.2] #align measure_theory.lintegral_finset_sum' MeasureTheory.lintegral_finset_sum' theorem lintegral_finset_sum (s : Finset β) {f : β → α → ℝ≥0∞} (hf : ∀ b ∈ s, Measurable (f b)) : ∫⁻ a, ∑ b ∈ s, f b a ∂μ = ∑ b ∈ s, ∫⁻ a, f b a ∂μ := lintegral_finset_sum' s fun b hb => (hf b hb).aemeasurable #align measure_theory.lintegral_finset_sum MeasureTheory.lintegral_finset_sum @[simp] theorem lintegral_const_mul (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := calc ∫⁻ a, r * f a ∂μ = ∫⁻ a, ⨆ n, (const α r * eapprox f n) a ∂μ := by congr funext a rw [← iSup_eapprox_apply f hf, ENNReal.mul_iSup] simp _ = ⨆ n, r * (eapprox f n).lintegral μ := by rw [lintegral_iSup] · congr funext n rw [← SimpleFunc.const_mul_lintegral, ← SimpleFunc.lintegral_eq_lintegral] · intro n exact SimpleFunc.measurable _ · intro i j h a exact mul_le_mul_left' (monotone_eapprox _ h _) _ _ = r * ∫⁻ a, f a ∂μ := by rw [← ENNReal.mul_iSup, lintegral_eq_iSup_eapprox_lintegral hf] #align measure_theory.lintegral_const_mul MeasureTheory.lintegral_const_mul theorem lintegral_const_mul'' (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := by have A : ∫⁻ a, f a ∂μ = ∫⁻ a, hf.mk f a ∂μ := lintegral_congr_ae hf.ae_eq_mk have B : ∫⁻ a, r * f a ∂μ = ∫⁻ a, r * hf.mk f a ∂μ := lintegral_congr_ae (EventuallyEq.fun_comp hf.ae_eq_mk _) rw [A, B, lintegral_const_mul _ hf.measurable_mk] #align measure_theory.lintegral_const_mul'' MeasureTheory.lintegral_const_mul'' theorem lintegral_const_mul_le (r : ℝ≥0∞) (f : α → ℝ≥0∞) : r * ∫⁻ a, f a ∂μ ≤ ∫⁻ a, r * f a ∂μ := by rw [lintegral, ENNReal.mul_iSup] refine iSup_le fun s => ?_ rw [ENNReal.mul_iSup, iSup_le_iff] intro hs rw [← SimpleFunc.const_mul_lintegral, lintegral] refine le_iSup_of_le (const α r * s) (le_iSup_of_le (fun x => ?_) le_rfl) exact mul_le_mul_left' (hs x) _ #align measure_theory.lintegral_const_mul_le MeasureTheory.lintegral_const_mul_le theorem lintegral_const_mul' (r : ℝ≥0∞) (f : α → ℝ≥0∞) (hr : r ≠ ∞) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := by by_cases h : r = 0 · simp [h] apply le_antisymm _ (lintegral_const_mul_le r f) have rinv : r * r⁻¹ = 1 := ENNReal.mul_inv_cancel h hr have rinv' : r⁻¹ * r = 1 := by rw [mul_comm] exact rinv have := lintegral_const_mul_le (μ := μ) r⁻¹ fun x => r * f x simp? [(mul_assoc _ _ _).symm, rinv'] at this says simp only [(mul_assoc _ _ _).symm, rinv', one_mul] at this simpa [(mul_assoc _ _ _).symm, rinv] using mul_le_mul_left' this r #align measure_theory.lintegral_const_mul' MeasureTheory.lintegral_const_mul' theorem lintegral_mul_const (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul r hf] #align measure_theory.lintegral_mul_const MeasureTheory.lintegral_mul_const theorem lintegral_mul_const'' (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul'' r hf] #align measure_theory.lintegral_mul_const'' MeasureTheory.lintegral_mul_const'' theorem lintegral_mul_const_le (r : ℝ≥0∞) (f : α → ℝ≥0∞) : (∫⁻ a, f a ∂μ) * r ≤ ∫⁻ a, f a * r ∂μ := by simp_rw [mul_comm, lintegral_const_mul_le r f] #align measure_theory.lintegral_mul_const_le MeasureTheory.lintegral_mul_const_le theorem lintegral_mul_const' (r : ℝ≥0∞) (f : α → ℝ≥0∞) (hr : r ≠ ∞) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul' r f hr] #align measure_theory.lintegral_mul_const' MeasureTheory.lintegral_mul_const' /- A double integral of a product where each factor contains only one variable is a product of integrals -/ theorem lintegral_lintegral_mul {β} [MeasurableSpace β] {ν : Measure β} {f : α → ℝ≥0∞} {g : β → ℝ≥0∞} (hf : AEMeasurable f μ) (hg : AEMeasurable g ν) : ∫⁻ x, ∫⁻ y, f x * g y ∂ν ∂μ = (∫⁻ x, f x ∂μ) * ∫⁻ y, g y ∂ν := by simp [lintegral_const_mul'' _ hg, lintegral_mul_const'' _ hf] #align measure_theory.lintegral_lintegral_mul MeasureTheory.lintegral_lintegral_mul -- TODO: Need a better way of rewriting inside of an integral theorem lintegral_rw₁ {f f' : α → β} (h : f =ᵐ[μ] f') (g : β → ℝ≥0∞) : ∫⁻ a, g (f a) ∂μ = ∫⁻ a, g (f' a) ∂μ := lintegral_congr_ae <\| h.mono fun a h => by dsimp only; rw [h] #align measure_theory.lintegral_rw₁ MeasureTheory.lintegral_rw₁ -- TODO: Need a better way of rewriting inside of an integral theorem lintegral_rw₂ {f₁ f₁' : α → β} {f₂ f₂' : α → γ} (h₁ : f₁ =ᵐ[μ] f₁') (h₂ : f₂ =ᵐ[μ] f₂') (g : β → γ → ℝ≥0∞) : ∫⁻ a, g (f₁ a) (f₂ a) ∂μ = ∫⁻ a, g (f₁' a) (f₂' a) ∂μ := lintegral_congr_ae <\| h₁.mp <\| h₂.mono fun _ h₂ h₁ => by dsimp only; rw [h₁, h₂] #align measure_theory.lintegral_rw₂ MeasureTheory.lintegral_rw₂ theorem lintegral_indicator_le (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a, s.indicator f a ∂μ ≤ ∫⁻ a in s, f a ∂μ := by simp only [lintegral] apply iSup_le (fun g ↦ (iSup_le (fun hg ↦ ?_))) have : g ≤ f := hg.trans (indicator_le_self s f) refine le_iSup_of_le g (le_iSup_of_le this (le_of_eq ?_)) rw [lintegral_restrict, SimpleFunc.lintegral] congr with t by_cases H : t = 0 · simp [H] congr with x simp only [mem_preimage, mem_singleton_iff, mem_inter_iff, iff_self_and] rintro rfl contrapose! H simpa [H] using hg x @[simp] theorem lintegral_indicator (f : α → ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : ∫⁻ a, s.indicator f a ∂μ = ∫⁻ a in s, f a ∂μ := by apply le_antisymm (lintegral_indicator_le f s) simp only [lintegral, ← restrict_lintegral_eq_lintegral_restrict _ hs, iSup_subtype'] refine iSup_mono' (Subtype.forall.2 fun φ hφ => ?_) refine ⟨⟨φ.restrict s, fun x => ?_⟩, le_rfl⟩ simp [hφ x, hs, indicator_le_indicator] #align measure_theory.lintegral_indicator MeasureTheory.lintegral_indicator theorem lintegral_indicator₀ (f : α → ℝ≥0∞) {s : Set α} (hs : NullMeasurableSet s μ) : ∫⁻ a, s.indicator f a ∂μ = ∫⁻ a in s, f a ∂μ := by rw [← lintegral_congr_ae (indicator_ae_eq_of_ae_eq_set hs.toMeasurable_ae_eq), lintegral_indicator _ (measurableSet_toMeasurable _ _), Measure.restrict_congr_set hs.toMeasurable_ae_eq] #align measure_theory.lintegral_indicator₀ MeasureTheory.lintegral_indicator₀ theorem lintegral_indicator_const_le (s : Set α) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ ≤ c * μ s := (lintegral_indicator_le _ _).trans (set_lintegral_const s c).le theorem lintegral_indicator_const₀ {s : Set α} (hs : NullMeasurableSet s μ) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ = c * μ s := by rw [lintegral_indicator₀ _ hs, set_lintegral_const] theorem lintegral_indicator_const {s : Set α} (hs : MeasurableSet s) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ = c * μ s := lintegral_indicator_const₀ hs.nullMeasurableSet c #align measure_theory.lintegral_indicator_const MeasureTheory.lintegral_indicator_const theorem set_lintegral_eq_const {f : α → ℝ≥0∞} (hf : Measurable f) (r : ℝ≥0∞) : ∫⁻ x in { x \| f x = r }, f x ∂μ = r * μ { x \| f x = r } := by have : ∀ᵐ x ∂μ, x ∈ { x \| f x = r } → f x = r := ae_of_all μ fun _ hx => hx rw [set_lintegral_congr_fun _ this] · rw [lintegral_const, Measure.restrict_apply MeasurableSet.univ, Set.univ_inter] · exact hf (measurableSet_singleton r) #align measure_theory.set_lintegral_eq_const MeasureTheory.set_lintegral_eq_const theorem lintegral_indicator_one_le (s : Set α) : ∫⁻ a, s.indicator 1 a ∂μ ≤ μ s := (lintegral_indicator_const_le _ _).trans <\| (one_mul _).le @[simp] theorem lintegral_indicator_one₀ (hs : NullMeasurableSet s μ) : ∫⁻ a, s.indicator 1 a ∂μ = μ s := (lintegral_indicator_const₀ hs _).trans <\| one_mul _ @[simp] theorem lintegral_indicator_one (hs : MeasurableSet s) : ∫⁻ a, s.indicator 1 a ∂μ = μ s := (lintegral_indicator_const hs _).trans <\| one_mul _ #align measure_theory.lintegral_indicator_one MeasureTheory.lintegral_indicator_one /-- A version of Markov's inequality for two functions. It doesn't follow from the standard Markov's inequality because we only assume measurability of `g`, not `f`. -/ theorem lintegral_add_mul_meas_add_le_le_lintegral {f g : α → ℝ≥0∞} (hle : f ≤ᵐ[μ] g) (hg : AEMeasurable g μ) (ε : ℝ≥0∞) : ∫⁻ a, f a ∂μ + ε * μ { x \| f x + ε ≤ g x } ≤ ∫⁻ a, g a ∂μ := by rcases exists_measurable_le_lintegral_eq μ f with ⟨φ, hφm, hφ_le, hφ_eq⟩ calc ∫⁻ x, f x ∂μ + ε * μ { x \| f x + ε ≤ g x } = ∫⁻ x, φ x ∂μ + ε * μ { x \| f x + ε ≤ g x } := by rw [hφ_eq] _ ≤ ∫⁻ x, φ x ∂μ + ε * μ { x \| φ x + ε ≤ g x } := by gcongr exact fun x => (add_le_add_right (hφ_le _) _).trans _ = ∫⁻ x, φ x + indicator { x \| φ x + ε ≤ g x } (fun _ => ε) x ∂μ := by rw [lintegral_add_left hφm, lintegral_indicator₀, set_lintegral_const] exact measurableSet_le (hφm.nullMeasurable.measurable'.add_const _) hg.nullMeasurable _ ≤ ∫⁻ x, g x ∂μ := lintegral_mono_ae (hle.mono fun x hx₁ => ?_) simp only [indicator_apply]; split_ifs with hx₂ exacts [hx₂, (add_zero _).trans_le <\| (hφ_le x).trans hx₁] #align measure_theory.lintegral_add_mul_meas_add_le_le_lintegral MeasureTheory.lintegral_add_mul_meas_add_le_le_lintegral /-- Markov's inequality also known as Chebyshev's first inequality. -/ theorem mul_meas_ge_le_lintegral₀ {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (ε : ℝ≥0∞) : ε * μ { x \| ε ≤ f x } ≤ ∫⁻ a, f a ∂μ := by simpa only [lintegral_zero, zero_add] using lintegral_add_mul_meas_add_le_le_lintegral (ae_of_all _ fun x => zero_le (f x)) hf ε #align measure_theory.mul_meas_ge_le_lintegral₀ MeasureTheory.mul_meas_ge_le_lintegral₀ /-- Markov's inequality also known as Chebyshev's first inequality. For a version assuming `AEMeasurable`, see `mul_meas_ge_le_lintegral₀`. -/ theorem mul_meas_ge_le_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) (ε : ℝ≥0∞) : ε * μ { x \| ε ≤ f x } ≤ ∫⁻ a, f a ∂μ := mul_meas_ge_le_lintegral₀ hf.aemeasurable ε #align measure_theory.mul_meas_ge_le_lintegral MeasureTheory.mul_meas_ge_le_lintegral lemma meas_le_lintegral₀ {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) {s : Set α} (hs : ∀ x ∈ s, 1 ≤ f x) : μ s ≤ ∫⁻ a, f a ∂μ := by apply le_trans _ (mul_meas_ge_le_lintegral₀ hf 1) rw [one_mul] exact measure_mono hs lemma lintegral_le_meas {s : Set α} {f : α → ℝ≥0∞} (hf : ∀ a, f a ≤ 1) (h'f : ∀ a ∈ sᶜ, f a = 0) : ∫⁻ a, f a ∂μ ≤ μ s := by apply (lintegral_mono (fun x ↦ ?_)).trans (lintegral_indicator_one_le s) by_cases hx : x ∈ s · simpa [hx] using hf x · simpa [hx] using h'f x hx theorem lintegral_eq_top_of_measure_eq_top_ne_zero {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (hμf : μ {x \| f x = ∞} ≠ 0) : ∫⁻ x, f x ∂μ = ∞ := eq_top_iff.mpr <\| calc ∞ = ∞ * μ { x \| ∞ ≤ f x } := by simp [mul_eq_top, hμf] _ ≤ ∫⁻ x, f x ∂μ := mul_meas_ge_le_lintegral₀ hf ∞ #align measure_theory.lintegral_eq_top_of_measure_eq_top_ne_zero MeasureTheory.lintegral_eq_top_of_measure_eq_top_ne_zero theorem setLintegral_eq_top_of_measure_eq_top_ne_zero (hf : AEMeasurable f (μ.restrict s)) (hμf : μ ({x ∈ s \| f x = ∞}) ≠ 0) : ∫⁻ x in s, f x ∂μ = ∞ := lintegral_eq_top_of_measure_eq_top_ne_zero hf <\| mt (eq_bot_mono <\| by rw [← setOf_inter_eq_sep]; exact Measure.le_restrict_apply _ _) hμf #align measure_theory.set_lintegral_eq_top_of_measure_eq_top_ne_zero MeasureTheory.setLintegral_eq_top_of_measure_eq_top_ne_zero theorem measure_eq_top_of_lintegral_ne_top (hf : AEMeasurable f μ) (hμf : ∫⁻ x, f x ∂μ ≠ ∞) : μ {x \| f x = ∞} = 0 := of_not_not fun h => hμf <\| lintegral_eq_top_of_measure_eq_top_ne_zero hf h #align measure_theory.measure_eq_top_of_lintegral_ne_top MeasureTheory.measure_eq_top_of_lintegral_ne_top theorem measure_eq_top_of_setLintegral_ne_top (hf : AEMeasurable f (μ.restrict s)) (hμf : ∫⁻ x in s, f x ∂μ ≠ ∞) : μ ({x ∈ s \| f x = ∞}) = 0 := of_not_not fun h => hμf <\| setLintegral_eq_top_of_measure_eq_top_ne_zero hf h #align measure_theory.measure_eq_top_of_set_lintegral_ne_top MeasureTheory.measure_eq_top_of_setLintegral_ne_top /-- Markov's inequality also known as Chebyshev's first inequality. -/ theorem meas_ge_le_lintegral_div {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) {ε : ℝ≥0∞} (hε : ε ≠ 0) (hε' : ε ≠ ∞) : μ { x \| ε ≤ f x } ≤ (∫⁻ a, f a ∂μ) / ε := (ENNReal.le_div_iff_mul_le (Or.inl hε) (Or.inl hε')).2 <\| by rw [mul_comm] exact mul_meas_ge_le_lintegral₀ hf ε #align measure_theory.meas_ge_le_lintegral_div MeasureTheory.meas_ge_le_lintegral_div theorem ae_eq_of_ae_le_of_lintegral_le {f g : α → ℝ≥0∞} (hfg : f ≤ᵐ[μ] g) (hf : ∫⁻ x, f x ∂μ ≠ ∞) (hg : AEMeasurable g μ) (hgf : ∫⁻ x, g x ∂μ ≤ ∫⁻ x, f x ∂μ) : f =ᵐ[μ] g := by have : ∀ n : ℕ, ∀ᵐ x ∂μ, g x < f x + (n : ℝ≥0∞)⁻¹ := by intro n simp only [ae_iff, not_lt] have : ∫⁻ x, f x ∂μ + (↑n)⁻¹ * μ { x : α \| f x + (n : ℝ≥0∞)⁻¹ ≤ g x } ≤ ∫⁻ x, f x ∂μ := (lintegral_add_mul_meas_add_le_le_lintegral hfg hg n⁻¹).trans hgf rw [(ENNReal.cancel_of_ne hf).add_le_iff_nonpos_right, nonpos_iff_eq_zero, mul_eq_zero] at this exact this.resolve_left (ENNReal.inv_ne_zero.2 (ENNReal.natCast_ne_top _)) refine hfg.mp ((ae_all_iff.2 this).mono fun x hlt hle => hle.antisymm ?_) suffices Tendsto (fun n : ℕ => f x + (n : ℝ≥0∞)⁻¹) atTop (𝓝 (f x)) from ge_of_tendsto' this fun i => (hlt i).le simpa only [inv_top, add_zero] using tendsto_const_nhds.add (ENNReal.tendsto_inv_iff.2 ENNReal.tendsto_nat_nhds_top) #align measure_theory.ae_eq_of_ae_le_of_lintegral_le MeasureTheory.ae_eq_of_ae_le_of_lintegral_le @[simp] theorem lintegral_eq_zero_iff' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, f a ∂μ = 0 ↔ f =ᵐ[μ] 0 := have : ∫⁻ _ : α, 0 ∂μ ≠ ∞ := by simp [lintegral_zero, zero_ne_top] ⟨fun h => (ae_eq_of_ae_le_of_lintegral_le (ae_of_all _ <\| zero_le f) this hf (h.trans lintegral_zero.symm).le).symm, fun h => (lintegral_congr_ae h).trans lintegral_zero⟩ #align measure_theory.lintegral_eq_zero_iff' MeasureTheory.lintegral_eq_zero_iff' @[simp] theorem lintegral_eq_zero_iff {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂μ = 0 ↔ f =ᵐ[μ] 0 := lintegral_eq_zero_iff' hf.aemeasurable #align measure_theory.lintegral_eq_zero_iff MeasureTheory.lintegral_eq_zero_iff theorem lintegral_pos_iff_support {f : α → ℝ≥0∞} (hf : Measurable f) : (0 < ∫⁻ a, f a ∂μ) ↔ 0 < μ (Function.support f) := by simp [pos_iff_ne_zero, hf, Filter.EventuallyEq, ae_iff, Function.support] #align measure_theory.lintegral_pos_iff_support MeasureTheory.lintegral_pos_iff_support theorem setLintegral_pos_iff {f : α → ℝ≥0∞} (hf : Measurable f) {s : Set α} : 0 < ∫⁻ a in s, f a ∂μ ↔ 0 < μ (Function.support f ∩ s) := by rw [lintegral_pos_iff_support hf, Measure.restrict_apply (measurableSet_support hf)] /-- Weaker version of the monotone convergence theorem-/ theorem lintegral_iSup_ae {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, Measurable (f n)) (h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f n.succ a) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by let ⟨s, hs⟩ := exists_measurable_superset_of_null (ae_iff.1 (ae_all_iff.2 h_mono)) let g n a := if a ∈ s then 0 else f n a have g_eq_f : ∀ᵐ a ∂μ, ∀ n, g n a = f n a := (measure_zero_iff_ae_nmem.1 hs.2.2).mono fun a ha n => if_neg ha calc ∫⁻ a, ⨆ n, f n a ∂μ = ∫⁻ a, ⨆ n, g n a ∂μ := lintegral_congr_ae <\| g_eq_f.mono fun a ha => by simp only [ha] _ = ⨆ n, ∫⁻ a, g n a ∂μ := (lintegral_iSup (fun n => measurable_const.piecewise hs.2.1 (hf n)) (monotone_nat_of_le_succ fun n a => ?_)) _ = ⨆ n, ∫⁻ a, f n a ∂μ := by simp only [lintegral_congr_ae (g_eq_f.mono fun _a ha => ha _)] simp only [g] split_ifs with h · rfl · have := Set.not_mem_subset hs.1 h simp only [not_forall, not_le, mem_setOf_eq, not_exists, not_lt] at this exact this n #align measure_theory.lintegral_supr_ae MeasureTheory.lintegral_iSup_ae theorem lintegral_sub' {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := by refine ENNReal.eq_sub_of_add_eq hg_fin ?_ rw [← lintegral_add_right' _ hg] exact lintegral_congr_ae (h_le.mono fun x hx => tsub_add_cancel_of_le hx) #align measure_theory.lintegral_sub' MeasureTheory.lintegral_sub' theorem lintegral_sub {f g : α → ℝ≥0∞} (hg : Measurable g) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := lintegral_sub' hg.aemeasurable hg_fin h_le #align measure_theory.lintegral_sub MeasureTheory.lintegral_sub theorem lintegral_sub_le' (f g : α → ℝ≥0∞) (hf : AEMeasurable f μ) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := by rw [tsub_le_iff_right] by_cases hfi : ∫⁻ x, f x ∂μ = ∞ · rw [hfi, add_top] exact le_top · rw [← lintegral_add_right' _ hf] gcongr exact le_tsub_add #align measure_theory.lintegral_sub_le' MeasureTheory.lintegral_sub_le' theorem lintegral_sub_le (f g : α → ℝ≥0∞) (hf : Measurable f) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := lintegral_sub_le' f g hf.aemeasurable #align measure_theory.lintegral_sub_le MeasureTheory.lintegral_sub_le theorem lintegral_strict_mono_of_ae_le_of_frequently_ae_lt {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) (h : ∃ᵐ x ∂μ, f x ≠ g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by contrapose! h simp only [not_frequently, Ne, Classical.not_not] exact ae_eq_of_ae_le_of_lintegral_le h_le hfi hg h #align measure_theory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt MeasureTheory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt theorem lintegral_strict_mono_of_ae_le_of_ae_lt_on {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) {s : Set α} (hμs : μ s ≠ 0) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := lintegral_strict_mono_of_ae_le_of_frequently_ae_lt hg hfi h_le <\| ((frequently_ae_mem_iff.2 hμs).and_eventually h).mono fun _x hx => (hx.2 hx.1).ne #align measure_theory.lintegral_strict_mono_of_ae_le_of_ae_lt_on MeasureTheory.lintegral_strict_mono_of_ae_le_of_ae_lt_on theorem lintegral_strict_mono {f g : α → ℝ≥0∞} (hμ : μ ≠ 0) (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by rw [Ne, ← Measure.measure_univ_eq_zero] at hμ refine lintegral_strict_mono_of_ae_le_of_ae_lt_on hg hfi (ae_le_of_ae_lt h) hμ ?_ simpa using h #align measure_theory.lintegral_strict_mono MeasureTheory.lintegral_strict_mono theorem set_lintegral_strict_mono {f g : α → ℝ≥0∞} {s : Set α} (hsm : MeasurableSet s) (hs : μ s ≠ 0) (hg : Measurable g) (hfi : ∫⁻ x in s, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x in s, f x ∂μ < ∫⁻ x in s, g x ∂μ := lintegral_strict_mono (by simp [hs]) hg.aemeasurable hfi ((ae_restrict_iff' hsm).mpr h) #align measure_theory.set_lintegral_strict_mono MeasureTheory.set_lintegral_strict_mono /-- Monotone convergence theorem for nonincreasing sequences of functions -/ theorem lintegral_iInf_ae {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_mono : ∀ n : ℕ, f n.succ ≤ᵐ[μ] f n) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := have fn_le_f0 : ∫⁻ a, ⨅ n, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := lintegral_mono fun a => iInf_le_of_le 0 le_rfl have fn_le_f0' : ⨅ n, ∫⁻ a, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := iInf_le_of_le 0 le_rfl (ENNReal.sub_right_inj h_fin fn_le_f0 fn_le_f0').1 <\| show ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ from calc ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a - ⨅ n, f n a ∂μ := (lintegral_sub (measurable_iInf h_meas) (ne_top_of_le_ne_top h_fin <\| lintegral_mono fun a => iInf_le _ _) (ae_of_all _ fun a => iInf_le _ _)).symm _ = ∫⁻ a, ⨆ n, f 0 a - f n a ∂μ := congr rfl (funext fun a => ENNReal.sub_iInf) _ = ⨆ n, ∫⁻ a, f 0 a - f n a ∂μ := (lintegral_iSup_ae (fun n => (h_meas 0).sub (h_meas n)) fun n => (h_mono n).mono fun a ha => tsub_le_tsub le_rfl ha) _ = ⨆ n, ∫⁻ a, f 0 a ∂μ - ∫⁻ a, f n a ∂μ := (have h_mono : ∀ᵐ a ∂μ, ∀ n : ℕ, f n.succ a ≤ f n a := ae_all_iff.2 h_mono have h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f 0 a := fun n => h_mono.mono fun a h => by induction' n with n ih · exact le_rfl · exact le_trans (h n) ih congr_arg iSup <\| funext fun n => lintegral_sub (h_meas _) (ne_top_of_le_ne_top h_fin <\| lintegral_mono_ae <\| h_mono n) (h_mono n)) _ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ := ENNReal.sub_iInf.symm #align measure_theory.lintegral_infi_ae MeasureTheory.lintegral_iInf_ae /-- Monotone convergence theorem for nonincreasing sequences of functions -/ theorem lintegral_iInf {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_anti : Antitone f) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := lintegral_iInf_ae h_meas (fun n => ae_of_all _ <\| h_anti n.le_succ) h_fin #align measure_theory.lintegral_infi MeasureTheory.lintegral_iInf theorem lintegral_iInf' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ a ∂μ, Antitone (fun i ↦ f i a)) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iInf_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Antitone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_anti have h_ae_seq_mono : Antitone (aeSeq h_meas p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet h_meas p · exact aeSeq.prop_of_mem_aeSeqSet h_meas hx hnm · simp only [aeSeq, hx, if_false] exact le_rfl rw [lintegral_congr_ae (aeSeq.iInf h_meas hp).symm] simp_rw [iInf_apply] rw [lintegral_iInf (aeSeq.measurable h_meas p) h_ae_seq_mono] · congr exact funext fun n ↦ lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp n) · rwa [lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp 0)] /-- Monotone convergence for an infimum over a directed family and indexed by a countable type -/ theorem lintegral_iInf_directed_of_measurable {mα : MeasurableSpace α} [Countable β] {f : β → α → ℝ≥0∞} {μ : Measure α} (hμ : μ ≠ 0) (hf : ∀ b, Measurable (f b)) (hf_int : ∀ b, ∫⁻ a, f b a ∂μ ≠ ∞) (h_directed : Directed (· ≥ ·) f) : ∫⁻ a, ⨅ b, f b a ∂μ = ⨅ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp only [iInf_of_empty, lintegral_const, ENNReal.top_mul (Measure.measure_univ_ne_zero.mpr hμ)] inhabit β have : ∀ a, ⨅ b, f b a = ⨅ n, f (h_directed.sequence f n) a := by refine fun a => le_antisymm (le_iInf fun n => iInf_le _ _) (le_iInf fun b => iInf_le_of_le (Encodable.encode b + 1) ?_) exact h_directed.sequence_le b a -- Porting note: used `∘` below to deal with its reduced reducibility calc ∫⁻ a, ⨅ b, f b a ∂μ _ = ∫⁻ a, ⨅ n, (f ∘ h_directed.sequence f) n a ∂μ := by simp only [this, Function.comp_apply] _ = ⨅ n, ∫⁻ a, (f ∘ h_directed.sequence f) n a ∂μ := by rw [lintegral_iInf ?_ h_directed.sequence_anti] · exact hf_int _ · exact fun n => hf _ _ = ⨅ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (le_iInf fun b => ?_) (le_iInf fun n => ?_) · exact iInf_le_of_le (Encodable.encode b + 1) (lintegral_mono <\| h_directed.sequence_le b) · exact iInf_le (fun b => ∫⁻ a, f b a ∂μ) _ #align lintegral_infi_directed_of_measurable MeasureTheory.lintegral_iInf_directed_of_measurable /-- Known as Fatou's lemma, version with `AEMeasurable` functions -/ theorem lintegral_liminf_le' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := calc ∫⁻ a, liminf (fun n => f n a) atTop ∂μ = ∫⁻ a, ⨆ n : ℕ, ⨅ i ≥ n, f i a ∂μ := by simp only [liminf_eq_iSup_iInf_of_nat] _ = ⨆ n : ℕ, ∫⁻ a, ⨅ i ≥ n, f i a ∂μ := (lintegral_iSup' (fun n => aemeasurable_biInf _ (to_countable _) (fun i _ ↦ h_meas i)) (ae_of_all μ fun a n m hnm => iInf_le_iInf_of_subset fun i hi => le_trans hnm hi)) _ ≤ ⨆ n : ℕ, ⨅ i ≥ n, ∫⁻ a, f i a ∂μ := iSup_mono fun n => le_iInf₂_lintegral _ _ = atTop.liminf fun n => ∫⁻ a, f n a ∂μ := Filter.liminf_eq_iSup_iInf_of_nat.symm #align measure_theory.lintegral_liminf_le' MeasureTheory.lintegral_liminf_le' /-- Known as Fatou's lemma -/ theorem lintegral_liminf_le {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := lintegral_liminf_le' fun n => (h_meas n).aemeasurable #align measure_theory.lintegral_liminf_le MeasureTheory.lintegral_liminf_le theorem limsup_lintegral_le {f : ℕ → α → ℝ≥0∞} {g : α → ℝ≥0∞} (hf_meas : ∀ n, Measurable (f n)) (h_bound : ∀ n, f n ≤ᵐ[μ] g) (h_fin : ∫⁻ a, g a ∂μ ≠ ∞) : limsup (fun n => ∫⁻ a, f n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := calc limsup (fun n => ∫⁻ a, f n a ∂μ) atTop = ⨅ n : ℕ, ⨆ i ≥ n, ∫⁻ a, f i a ∂μ := limsup_eq_iInf_iSup_of_nat _ ≤ ⨅ n : ℕ, ∫⁻ a, ⨆ i ≥ n, f i a ∂μ := iInf_mono fun n => iSup₂_lintegral_le _ _ = ∫⁻ a, ⨅ n : ℕ, ⨆ i ≥ n, f i a ∂μ := by refine (lintegral_iInf ?_ ?_ ?_).symm · intro n exact measurable_biSup _ (to_countable _) (fun i _ ↦ hf_meas i) · intro n m hnm a exact iSup_le_iSup_of_subset fun i hi => le_trans hnm hi · refine ne_top_of_le_ne_top h_fin (lintegral_mono_ae ?_) refine (ae_all_iff.2 h_bound).mono fun n hn => ?_ exact iSup_le fun i => iSup_le fun _ => hn i _ = ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := by simp only [limsup_eq_iInf_iSup_of_nat] #align measure_theory.limsup_lintegral_le MeasureTheory.limsup_lintegral_le /-- Dominated convergence theorem for nonnegative functions -/ theorem tendsto_lintegral_of_dominated_convergence {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, Measurable (F n)) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := tendsto_of_le_liminf_of_limsup_le (calc ∫⁻ a, f a ∂μ = ∫⁻ a, liminf (fun n : ℕ => F n a) atTop ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.liminf_eq.symm _ ≤ liminf (fun n => ∫⁻ a, F n a ∂μ) atTop := lintegral_liminf_le hF_meas ) (calc limsup (fun n : ℕ => ∫⁻ a, F n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => F n a) atTop ∂μ := limsup_lintegral_le hF_meas h_bound h_fin _ = ∫⁻ a, f a ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.limsup_eq ) #align measure_theory.tendsto_lintegral_of_dominated_convergence MeasureTheory.tendsto_lintegral_of_dominated_convergence /-- Dominated convergence theorem for nonnegative functions which are just almost everywhere measurable. -/ theorem tendsto_lintegral_of_dominated_convergence' {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, AEMeasurable (F n) μ) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := by have : ∀ n, ∫⁻ a, F n a ∂μ = ∫⁻ a, (hF_meas n).mk (F n) a ∂μ := fun n => lintegral_congr_ae (hF_meas n).ae_eq_mk simp_rw [this] apply tendsto_lintegral_of_dominated_convergence bound (fun n => (hF_meas n).measurable_mk) _ h_fin · have : ∀ n, ∀ᵐ a ∂μ, (hF_meas n).mk (F n) a = F n a := fun n => (hF_meas n).ae_eq_mk.symm have : ∀ᵐ a ∂μ, ∀ n, (hF_meas n).mk (F n) a = F n a := ae_all_iff.mpr this filter_upwards [this, h_lim] with a H H' simp_rw [H] exact H' · intro n filter_upwards [h_bound n, (hF_meas n).ae_eq_mk] with a H H' rwa [H'] at H #align measure_theory.tendsto_lintegral_of_dominated_convergence' MeasureTheory.tendsto_lintegral_of_dominated_convergence' /-- Dominated convergence theorem for filters with a countable basis -/ theorem tendsto_lintegral_filter_of_dominated_convergence {ι} {l : Filter ι} [l.IsCountablyGenerated] {F : ι → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ᶠ n in l, Measurable (F n)) (h_bound : ∀ᶠ n in l, ∀ᵐ a ∂μ, F n a ≤ bound a) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) l (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) l (𝓝 <\| ∫⁻ a, f a ∂μ) := by rw [tendsto_iff_seq_tendsto] intro x xl have hxl := by rw [tendsto_atTop'] at xl exact xl have h := inter_mem hF_meas h_bound replace h := hxl _ h rcases h with ⟨k, h⟩ rw [← tendsto_add_atTop_iff_nat k] refine tendsto_lintegral_of_dominated_convergence ?_ ?_ ?_ ?_ ?_ · exact bound · intro refine (h _ ?_).1 exact Nat.le_add_left _ _ · intro refine (h _ ?_).2 exact Nat.le_add_left _ _ · assumption · refine h_lim.mono fun a h_lim => ?_ apply @Tendsto.comp _ _ _ (fun n => x (n + k)) fun n => F n a · assumption rw [tendsto_add_atTop_iff_nat] assumption #align measure_theory.tendsto_lintegral_filter_of_dominated_convergence MeasureTheory.tendsto_lintegral_filter_of_dominated_convergence theorem lintegral_tendsto_of_tendsto_of_antitone {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ x ∂μ, Antitone fun n ↦ f n x) (h0 : ∫⁻ a, f 0 a ∂μ ≠ ∞) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n ↦ f n x) atTop (𝓝 (F x))) : Tendsto (fun n ↦ ∫⁻ x, f n x ∂μ) atTop (𝓝 (∫⁻ x, F x ∂μ)) := by have : Antitone fun n ↦ ∫⁻ x, f n x ∂μ := fun i j hij ↦ lintegral_mono_ae (h_anti.mono fun x hx ↦ hx hij) suffices key : ∫⁻ x, F x ∂μ = ⨅ n, ∫⁻ x, f n x ∂μ by rw [key] exact tendsto_atTop_iInf this rw [← lintegral_iInf' hf h_anti h0] refine lintegral_congr_ae ?_ filter_upwards [h_anti, h_tendsto] with _ hx_anti hx_tendsto using tendsto_nhds_unique hx_tendsto (tendsto_atTop_iInf hx_anti) section open Encodable /-- Monotone convergence for a supremum over a directed family and indexed by a countable type -/ theorem lintegral_iSup_directed_of_measurable [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ b, Measurable (f b)) (h_directed : Directed (· ≤ ·) f) : ∫⁻ a, ⨆ b, f b a ∂μ = ⨆ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp [iSup_of_empty] inhabit β have : ∀ a, ⨆ b, f b a = ⨆ n, f (h_directed.sequence f n) a := by intro a refine le_antisymm (iSup_le fun b => ?_) (iSup_le fun n => le_iSup (fun n => f n a) _) exact le_iSup_of_le (encode b + 1) (h_directed.le_sequence b a) calc ∫⁻ a, ⨆ b, f b a ∂μ = ∫⁻ a, ⨆ n, f (h_directed.sequence f n) a ∂μ := by simp only [this] _ = ⨆ n, ∫⁻ a, f (h_directed.sequence f n) a ∂μ := (lintegral_iSup (fun n => hf _) h_directed.sequence_mono) _ = ⨆ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (iSup_le fun n => ?_) (iSup_le fun b => ?_) · exact le_iSup (fun b => ∫⁻ a, f b a ∂μ) _ · exact le_iSup_of_le (encode b + 1) (lintegral_mono <\| h_directed.le_sequence b) #align measure_theory.lintegral_supr_directed_of_measurable MeasureTheory.lintegral_iSup_directed_of_measurable /-- Monotone convergence for a supremum over a directed family and indexed by a countable type. -/ theorem lintegral_iSup_directed [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ b, AEMeasurable (f b) μ) (h_directed : Directed (· ≤ ·) f) : ∫⁻ a, ⨆ b, f b a ∂μ = ⨆ b, ∫⁻ a, f b a ∂μ := by simp_rw [← iSup_apply] let p : α → (β → ENNReal) → Prop := fun x f' => Directed LE.le f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := by filter_upwards [] with x i j obtain ⟨z, hz₁, hz₂⟩ := h_directed i j exact ⟨z, hz₁ x, hz₂ x⟩ have h_ae_seq_directed : Directed LE.le (aeSeq hf p) := by intro b₁ b₂ obtain ⟨z, hz₁, hz₂⟩ := h_directed b₁ b₂ refine ⟨z, ?_, ?_⟩ <;> · intro x by_cases hx : x ∈ aeSeqSet hf p · repeat rw [aeSeq.aeSeq_eq_fun_of_mem_aeSeqSet hf hx] apply_rules [hz₁, hz₂] · simp only [aeSeq, hx, if_false] exact le_rfl convert lintegral_iSup_directed_of_measurable (aeSeq.measurable hf p) h_ae_seq_directed using 1 · simp_rw [← iSup_apply] rw [lintegral_congr_ae (aeSeq.iSup hf hp).symm] · congr 1 ext1 b rw [lintegral_congr_ae] apply EventuallyEq.symm exact aeSeq.aeSeq_n_eq_fun_n_ae hf hp _ #align measure_theory.lintegral_supr_directed MeasureTheory.lintegral_iSup_directed end theorem lintegral_tsum [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ i, AEMeasurable (f i) μ) : ∫⁻ a, ∑' i, f i a ∂μ = ∑' i, ∫⁻ a, f i a ∂μ := by simp only [ENNReal.tsum_eq_iSup_sum] rw [lintegral_iSup_directed] · simp [lintegral_finset_sum' _ fun i _ => hf i] · intro b exact Finset.aemeasurable_sum _ fun i _ => hf i · intro s t use s ∪ t constructor · exact fun a => Finset.sum_le_sum_of_subset Finset.subset_union_left · exact fun a => Finset.sum_le_sum_of_subset Finset.subset_union_right #align measure_theory.lintegral_tsum MeasureTheory.lintegral_tsum open Measure theorem lintegral_iUnion₀ [Countable β] {s : β → Set α} (hm : ∀ i, NullMeasurableSet (s i) μ) (hd : Pairwise (AEDisjoint μ on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ = ∑' i, ∫⁻ a in s i, f a ∂μ := by simp only [Measure.restrict_iUnion_ae hd hm, lintegral_sum_measure] #align measure_theory.lintegral_Union₀ MeasureTheory.lintegral_iUnion₀ theorem lintegral_iUnion [Countable β] {s : β → Set α} (hm : ∀ i, MeasurableSet (s i)) (hd : Pairwise (Disjoint on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ = ∑' i, ∫⁻ a in s i, f a ∂μ := lintegral_iUnion₀ (fun i => (hm i).nullMeasurableSet) hd.aedisjoint f #align measure_theory.lintegral_Union MeasureTheory.lintegral_iUnion theorem lintegral_biUnion₀ {t : Set β} {s : β → Set α} (ht : t.Countable) (hm : ∀ i ∈ t, NullMeasurableSet (s i) μ) (hd : t.Pairwise (AEDisjoint μ on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i ∈ t, s i, f a ∂μ = ∑' i : t, ∫⁻ a in s i, f a ∂μ := by haveI := ht.toEncodable rw [biUnion_eq_iUnion, lintegral_iUnion₀ (SetCoe.forall'.1 hm) (hd.subtype _ _)] #align measure_theory.lintegral_bUnion₀ MeasureTheory.lintegral_biUnion₀ theorem lintegral_biUnion {t : Set β} {s : β → Set α} (ht : t.Countable) (hm : ∀ i ∈ t, MeasurableSet (s i)) (hd : t.PairwiseDisjoint s) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i ∈ t, s i, f a ∂μ = ∑' i : t, ∫⁻ a in s i, f a ∂μ := lintegral_biUnion₀ ht (fun i hi => (hm i hi).nullMeasurableSet) hd.aedisjoint f #align measure_theory.lintegral_bUnion MeasureTheory.lintegral_biUnion theorem lintegral_biUnion_finset₀ {s : Finset β} {t : β → Set α} (hd : Set.Pairwise (↑s) (AEDisjoint μ on t)) (hm : ∀ b ∈ s, NullMeasurableSet (t b) μ) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ b ∈ s, t b, f a ∂μ = ∑ b ∈ s, ∫⁻ a in t b, f a ∂μ := by simp only [← Finset.mem_coe, lintegral_biUnion₀ s.countable_toSet hm hd, ← Finset.tsum_subtype'] #align measure_theory.lintegral_bUnion_finset₀ MeasureTheory.lintegral_biUnion_finset₀ theorem lintegral_biUnion_finset {s : Finset β} {t : β → Set α} (hd : Set.PairwiseDisjoint (↑s) t) (hm : ∀ b ∈ s, MeasurableSet (t b)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ b ∈ s, t b, f a ∂μ = ∑ b ∈ s, ∫⁻ a in t b, f a ∂μ := lintegral_biUnion_finset₀ hd.aedisjoint (fun b hb => (hm b hb).nullMeasurableSet) f #align measure_theory.lintegral_bUnion_finset MeasureTheory.lintegral_biUnion_finset theorem lintegral_iUnion_le [Countable β] (s : β → Set α) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ ≤ ∑' i, ∫⁻ a in s i, f a ∂μ := by rw [← lintegral_sum_measure] exact lintegral_mono' restrict_iUnion_le le_rfl #align measure_theory.lintegral_Union_le MeasureTheory.lintegral_iUnion_le theorem lintegral_union {f : α → ℝ≥0∞} {A B : Set α} (hB : MeasurableSet B) (hAB : Disjoint A B) : ∫⁻ a in A ∪ B, f a ∂μ = ∫⁻ a in A, f a ∂μ + ∫⁻ a in B, f a ∂μ := by rw [restrict_union hAB hB, lintegral_add_measure] #align measure_theory.lintegral_union MeasureTheory.lintegral_union theorem lintegral_union_le (f : α → ℝ≥0∞) (s t : Set α) : ∫⁻ a in s ∪ t, f a ∂μ ≤ ∫⁻ a in s, f a ∂μ + ∫⁻ a in t, f a ∂μ := by rw [← lintegral_add_measure] exact lintegral_mono' (restrict_union_le _ _) le_rfl theorem lintegral_inter_add_diff {B : Set α} (f : α → ℝ≥0∞) (A : Set α) (hB : MeasurableSet B) : ∫⁻ x in A ∩ B, f x ∂μ + ∫⁻ x in A \ B, f x ∂μ = ∫⁻ x in A, f x ∂μ := by rw [← lintegral_add_measure, restrict_inter_add_diff _ hB] #align measure_theory.lintegral_inter_add_diff MeasureTheory.lintegral_inter_add_diff theorem lintegral_add_compl (f : α → ℝ≥0∞) {A : Set α} (hA : MeasurableSet A) : ∫⁻ x in A, f x ∂μ + ∫⁻ x in Aᶜ, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [← lintegral_add_measure, Measure.restrict_add_restrict_compl hA] #align measure_theory.lintegral_add_compl MeasureTheory.lintegral_add_compl theorem lintegral_max {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) : ∫⁻ x, max (f x) (g x) ∂μ = ∫⁻ x in { x \| f x ≤ g x }, g x ∂μ + ∫⁻ x in { x \| g x < f x }, f x ∂μ := by have hm : MeasurableSet { x \| f x ≤ g x } := measurableSet_le hf hg rw [← lintegral_add_compl (fun x => max (f x) (g x)) hm] simp only [← compl_setOf, ← not_le] refine congr_arg₂ (· + ·) (set_lintegral_congr_fun hm ?_) (set_lintegral_congr_fun hm.compl ?_) exacts [ae_of_all _ fun x => max_eq_right (a := f x) (b := g x), ae_of_all _ fun x (hx : ¬ f x ≤ g x) => max_eq_left (not_le.1 hx).le] #align measure_theory.lintegral_max MeasureTheory.lintegral_max theorem set_lintegral_max {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (s : Set α) : ∫⁻ x in s, max (f x) (g x) ∂μ = ∫⁻ x in s ∩ { x \| f x ≤ g x }, g x ∂μ + ∫⁻ x in s ∩ { x \| g x < f x }, f x ∂μ := by rw [lintegral_max hf hg, restrict_restrict, restrict_restrict, inter_comm s, inter_comm s] exacts [measurableSet_lt hg hf, measurableSet_le hf hg] #align measure_theory.set_lintegral_max MeasureTheory.set_lintegral_max theorem lintegral_map {mβ : MeasurableSpace β} {f : β → ℝ≥0∞} {g : α → β} (hf : Measurable f) (hg : Measurable g) : ∫⁻ a, f a ∂map g μ = ∫⁻ a, f (g a) ∂μ := by erw [lintegral_eq_iSup_eapprox_lintegral hf, lintegral_eq_iSup_eapprox_lintegral (hf.comp hg)] congr with n : 1 convert SimpleFunc.lintegral_map _ hg ext1 x; simp only [eapprox_comp hf hg, coe_comp] #align measure_theory.lintegral_map MeasureTheory.lintegral_map theorem lintegral_map' {mβ : MeasurableSpace β} {f : β → ℝ≥0∞} {g : α → β} (hf : AEMeasurable f (Measure.map g μ)) (hg : AEMeasurable g μ) : ∫⁻ a, f a ∂Measure.map g μ = ∫⁻ a, f (g a) ∂μ := calc ∫⁻ a, f a ∂Measure.map g μ = ∫⁻ a, hf.mk f a ∂Measure.map g μ := lintegral_congr_ae hf.ae_eq_mk _ = ∫⁻ a, hf.mk f a ∂Measure.map (hg.mk g) μ := by congr 1 exact Measure.map_congr hg.ae_eq_mk _ = ∫⁻ a, hf.mk f (hg.mk g a) ∂μ := lintegral_map hf.measurable_mk hg.measurable_mk _ = ∫⁻ a, hf.mk f (g a) ∂μ := lintegral_congr_ae <\| hg.ae_eq_mk.symm.fun_comp _ _ = ∫⁻ a, f (g a) ∂μ := lintegral_congr_ae (ae_eq_comp hg hf.ae_eq_mk.symm) #align measure_theory.lintegral_map' MeasureTheory.lintegral_map' theorem lintegral_map_le {mβ : MeasurableSpace β} (f : β → ℝ≥0∞) {g : α → β} (hg : Measurable g) : ∫⁻ a, f a ∂Measure.map g μ ≤ ∫⁻ a, f (g a) ∂μ := by rw [← iSup_lintegral_measurable_le_eq_lintegral, ← iSup_lintegral_measurable_le_eq_lintegral] refine iSup₂_le fun i hi => iSup_le fun h'i => ?_ refine le_iSup₂_of_le (i ∘ g) (hi.comp hg) ?_ exact le_iSup_of_le (fun x => h'i (g x)) (le_of_eq (lintegral_map hi hg)) #align measure_theory.lintegral_map_le MeasureTheory.lintegral_map_le theorem lintegral_comp [MeasurableSpace β] {f : β → ℝ≥0∞} {g : α → β} (hf : Measurable f) (hg : Measurable g) : lintegral μ (f ∘ g) = ∫⁻ a, f a ∂map g μ := (lintegral_map hf hg).symm #align measure_theory.lintegral_comp MeasureTheory.lintegral_comp theorem set_lintegral_map [MeasurableSpace β] {f : β → ℝ≥0∞} {g : α → β} {s : Set β} (hs : MeasurableSet s) (hf : Measurable f) (hg : Measurable g) : ∫⁻ y in s, f y ∂map g μ = ∫⁻ x in g ⁻¹' s, f (g x) ∂μ := by rw [restrict_map hg hs, lintegral_map hf hg] #align measure_theory.set_lintegral_map MeasureTheory.set_lintegral_map theorem lintegral_indicator_const_comp {mβ : MeasurableSpace β} {f : α → β} {s : Set β} (hf : Measurable f) (hs : MeasurableSet s) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) (f a) ∂μ = c * μ (f ⁻¹' s) := by erw [lintegral_comp (measurable_const.indicator hs) hf, lintegral_indicator_const hs, Measure.map_apply hf hs] #align measure_theory.lintegral_indicator_const_comp MeasureTheory.lintegral_indicator_const_comp /-- If `g : α → β` is a measurable embedding and `f : β → ℝ≥0∞` is any function (not necessarily measurable), then `∫⁻ a, f a ∂(map g μ) = ∫⁻ a, f (g a) ∂μ`. Compare with `lintegral_map` which applies to any measurable `g : α → β` but requires that `f` is measurable as well. -/ theorem _root_.MeasurableEmbedding.lintegral_map [MeasurableSpace β] {g : α → β} (hg : MeasurableEmbedding g) (f : β → ℝ≥0∞) : ∫⁻ a, f a ∂map g μ = ∫⁻ a, f (g a) ∂μ := by rw [lintegral, lintegral] refine le_antisymm (iSup₂_le fun f₀ hf₀ => ?_) (iSup₂_le fun f₀ hf₀ => ?_) · rw [SimpleFunc.lintegral_map _ hg.measurable] have : (f₀.comp g hg.measurable : α → ℝ≥0∞) ≤ f ∘ g := fun x => hf₀ (g x) exact le_iSup_of_le (comp f₀ g hg.measurable) (by exact le_iSup (α := ℝ≥0∞) _ this) · rw [← f₀.extend_comp_eq hg (const _ 0), ← SimpleFunc.lintegral_map, ← SimpleFunc.lintegral_eq_lintegral, ← lintegral] refine lintegral_mono_ae (hg.ae_map_iff.2 <\| eventually_of_forall fun x => ?_) exact (extend_apply _ _ _ _).trans_le (hf₀ _) #align measurable_embedding.lintegral_map MeasurableEmbedding.lintegral_map /-- The `lintegral` transforms appropriately under a measurable equivalence `g : α ≃ᵐ β`. (Compare `lintegral_map`, which applies to a wider class of functions `g : α → β`, but requires measurability of the function being integrated.) -/ theorem lintegral_map_equiv [MeasurableSpace β] (f : β → ℝ≥0∞) (g : α ≃ᵐ β) : ∫⁻ a, f a ∂map g μ = ∫⁻ a, f (g a) ∂μ := g.measurableEmbedding.lintegral_map f #align measure_theory.lintegral_map_equiv MeasureTheory.lintegral_map_equiv protected theorem MeasurePreserving.lintegral_map_equiv [MeasurableSpace β] {ν : Measure β} (f : β → ℝ≥0∞) (g : α ≃ᵐ β) (hg : MeasurePreserving g μ ν) : ∫⁻ a, f a ∂ν = ∫⁻ a, f (g a) ∂μ := by rw [← MeasureTheory.lintegral_map_equiv f g, hg.map_eq] theorem MeasurePreserving.lintegral_comp {mb : MeasurableSpace β} {ν : Measure β} {g : α → β} (hg : MeasurePreserving g μ ν) {f : β → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f (g a) ∂μ = ∫⁻ b, f b ∂ν := by rw [← hg.map_eq, lintegral_map hf hg.measurable] #align measure_theory.measure_preserving.lintegral_comp MeasureTheory.MeasurePreserving.lintegral_comp theorem MeasurePreserving.lintegral_comp_emb {mb : MeasurableSpace β} {ν : Measure β} {g : α → β} (hg : MeasurePreserving g μ ν) (hge : MeasurableEmbedding g) (f : β → ℝ≥0∞) : ∫⁻ a, f (g a) ∂μ = ∫⁻ b, f b ∂ν := by rw [← hg.map_eq, hge.lintegral_map] #align measure_theory.measure_preserving.lintegral_comp_emb MeasureTheory.MeasurePreserving.lintegral_comp_emb theorem MeasurePreserving.set_lintegral_comp_preimage {mb : MeasurableSpace β} {ν : Measure β} {g : α → β} (hg : MeasurePreserving g μ ν) {s : Set β} (hs : MeasurableSet s) {f : β → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a in g ⁻¹' s, f (g a) ∂μ = ∫⁻ b in s, f b ∂ν := by rw [← hg.map_eq, set_lintegral_map hs hf hg.measurable] #align measure_theory.measure_preserving.set_lintegral_comp_preimage MeasureTheory.MeasurePreserving.set_lintegral_comp_preimage theorem MeasurePreserving.set_lintegral_comp_preimage_emb {mb : MeasurableSpace β} {ν : Measure β} {g : α → β} (hg : MeasurePreserving g μ ν) (hge : MeasurableEmbedding g) (f : β → ℝ≥0∞) (s : Set β) : ∫⁻ a in g ⁻¹' s, f (g a) ∂μ = ∫⁻ b in s, f b ∂ν := by rw [← hg.map_eq, hge.restrict_map, hge.lintegral_map] #align measure_theory.measure_preserving.set_lintegral_comp_preimage_emb MeasureTheory.MeasurePreserving.set_lintegral_comp_preimage_emb theorem MeasurePreserving.set_lintegral_comp_emb {mb : MeasurableSpace β} {ν : Measure β} {g : α → β} (hg : MeasurePreserving g μ ν) (hge : MeasurableEmbedding g) (f : β → ℝ≥0∞) (s : Set α) : ∫⁻ a in s, f (g a) ∂μ = ∫⁻ b in g '' s, f b ∂ν := by rw [← hg.set_lintegral_comp_preimage_emb hge, preimage_image_eq _ hge.injective] #align measure_theory.measure_preserving.set_lintegral_comp_emb MeasureTheory.MeasurePreserving.set_lintegral_comp_emb theorem lintegral_subtype_comap {s : Set α} (hs : MeasurableSet s) (f : α → ℝ≥0∞) : ∫⁻ x : s, f x ∂(μ.comap (↑)) = ∫⁻ x in s, f x ∂μ := by rw [← (MeasurableEmbedding.subtype_coe hs).lintegral_map, map_comap_subtype_coe hs] theorem set_lintegral_subtype {s : Set α} (hs : MeasurableSet s) (t : Set s) (f : α → ℝ≥0∞) : ∫⁻ x in t, f x ∂(μ.comap (↑)) = ∫⁻ x in (↑) '' t, f x ∂μ := by rw [(MeasurableEmbedding.subtype_coe hs).restrict_comap, lintegral_subtype_comap hs, restrict_restrict hs, inter_eq_right.2 (Subtype.coe_image_subset _ _)] section DiracAndCount variable [MeasurableSpace α] theorem lintegral_dirac' (a : α) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂dirac a = f a := by simp [lintegral_congr_ae (ae_eq_dirac' hf)] #align measure_theory.lintegral_dirac' MeasureTheory.lintegral_dirac' theorem lintegral_dirac [MeasurableSingletonClass α] (a : α) (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂dirac a = f a := by simp [lintegral_congr_ae (ae_eq_dirac f)] #align measure_theory.lintegral_dirac MeasureTheory.lintegral_dirac theorem set_lintegral_dirac' {a : α} {f : α → ℝ≥0∞} (hf : Measurable f) {s : Set α} (hs : MeasurableSet s) [Decidable (a ∈ s)] : ∫⁻ x in s, f x ∂Measure.dirac a = if a ∈ s then f a else 0 := by rw [restrict_dirac' hs] split_ifs · exact lintegral_dirac' _ hf · exact lintegral_zero_measure _ #align measure_theory.set_lintegral_dirac' MeasureTheory.set_lintegral_dirac' theorem set_lintegral_dirac {a : α} (f : α → ℝ≥0∞) (s : Set α) [MeasurableSingletonClass α] [Decidable (a ∈ s)] : ∫⁻ x in s, f x ∂Measure.dirac a = if a ∈ s then f a else 0 := by rw [restrict_dirac] split_ifs · exact lintegral_dirac _ _ · exact lintegral_zero_measure _ #align measure_theory.set_lintegral_dirac MeasureTheory.set_lintegral_dirac theorem lintegral_count' {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂count = ∑' a, f a := by rw [count, lintegral_sum_measure] congr exact funext fun a => lintegral_dirac' a hf #align measure_theory.lintegral_count' MeasureTheory.lintegral_count' theorem lintegral_count [MeasurableSingletonClass α] (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂count = ∑' a, f a := by rw [count, lintegral_sum_measure] congr exact funext fun a => lintegral_dirac a f #align measure_theory.lintegral_count MeasureTheory.lintegral_count theorem _root_.ENNReal.tsum_const_eq [MeasurableSingletonClass α] (c : ℝ≥0∞) : ∑' _ : α, c = c * Measure.count (univ : Set α) := by rw [← lintegral_count, lintegral_const] #align ennreal.tsum_const_eq ENNReal.tsum_const_eq /-- Markov's inequality for the counting measure with hypothesis using `tsum` in `ℝ≥0∞`. -/ theorem _root_.ENNReal.count_const_le_le_of_tsum_le [MeasurableSingletonClass α] {a : α → ℝ≥0∞} (a_mble : Measurable a) {c : ℝ≥0∞} (tsum_le_c : ∑' i, a i ≤ c) {ε : ℝ≥0∞} (ε_ne_zero : ε ≠ 0) (ε_ne_top : ε ≠ ∞) : Measure.count { i : α \| ε ≤ a i } ≤ c / ε := by rw [← lintegral_count] at tsum_le_c apply (MeasureTheory.meas_ge_le_lintegral_div a_mble.aemeasurable ε_ne_zero ε_ne_top).trans exact ENNReal.div_le_div tsum_le_c rfl.le #align ennreal.count_const_le_le_of_tsum_le ENNReal.count_const_le_le_of_tsum_le /-- Markov's inequality for counting measure with hypothesis using `tsum` in `ℝ≥0`. -/ theorem _root_.NNReal.count_const_le_le_of_tsum_le [MeasurableSingletonClass α] {a : α → ℝ≥0} (a_mble : Measurable a) (a_summable : Summable a) {c : ℝ≥0} (tsum_le_c : ∑' i, a i ≤ c) {ε : ℝ≥0} (ε_ne_zero : ε ≠ 0) : Measure.count { i : α \| ε ≤ a i } ≤ c / ε := by rw [show (fun i => ε ≤ a i) = fun i => (ε : ℝ≥0∞) ≤ ((↑) ∘ a) i by funext i simp only [ENNReal.coe_le_coe, Function.comp]] apply ENNReal.count_const_le_le_of_tsum_le (measurable_coe_nnreal_ennreal.comp a_mble) _ (mod_cast ε_ne_zero) (@ENNReal.coe_ne_top ε) convert ENNReal.coe_le_coe.mpr tsum_le_c simp_rw [Function.comp_apply] rw [ENNReal.tsum_coe_eq a_summable.hasSum] #align nnreal.count_const_le_le_of_tsum_le NNReal.count_const_le_le_of_tsum_le end DiracAndCount section Countable /-! ### Lebesgue integral over finite and countable types and sets -/ theorem lintegral_countable' [Countable α] [MeasurableSingletonClass α] (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂μ = ∑' a, f a * μ {a} := by conv_lhs => rw [← sum_smul_dirac μ, lintegral_sum_measure] congr 1 with a : 1 rw [lintegral_smul_measure, lintegral_dirac, mul_comm] #align measure_theory.lintegral_countable' MeasureTheory.lintegral_countable' theorem lintegral_singleton' {f : α → ℝ≥0∞} (hf : Measurable f) (a : α) : ∫⁻ x in {a}, f x ∂μ = f a * μ {a} := by simp only [restrict_singleton, lintegral_smul_measure, lintegral_dirac' _ hf, mul_comm] #align measure_theory.lintegral_singleton' MeasureTheory.lintegral_singleton' theorem lintegral_singleton [MeasurableSingletonClass α] (f : α → ℝ≥0∞) (a : α) : ∫⁻ x in {a}, f x ∂μ = f a * μ {a} := by simp only [restrict_singleton, lintegral_smul_measure, lintegral_dirac, mul_comm] #align measure_theory.lintegral_singleton MeasureTheory.lintegral_singleton theorem lintegral_countable [MeasurableSingletonClass α] (f : α → ℝ≥0∞) {s : Set α} (hs : s.Countable) : ∫⁻ a in s, f a ∂μ = ∑' a : s, f a * μ {(a : α)} := calc ∫⁻ a in s, f a ∂μ = ∫⁻ a in ⋃ x ∈ s, {x}, f a ∂μ := by rw [biUnion_of_singleton] _ = ∑' a : s, ∫⁻ x in {(a : α)}, f x ∂μ := (lintegral_biUnion hs (fun _ _ => measurableSet_singleton _) (pairwiseDisjoint_fiber id s) _) _ = ∑' a : s, f a * μ {(a : α)} := by simp only [lintegral_singleton] #align measure_theory.lintegral_countable MeasureTheory.lintegral_countable theorem lintegral_insert [MeasurableSingletonClass α] {a : α} {s : Set α} (h : a ∉ s) (f : α → ℝ≥0∞) : ∫⁻ x in insert a s, f x ∂μ = f a * μ {a} + ∫⁻ x in s, f x ∂μ := by rw [← union_singleton, lintegral_union (measurableSet_singleton a), lintegral_singleton, add_comm] rwa [disjoint_singleton_right] #align measure_theory.lintegral_insert MeasureTheory.lintegral_insert theorem lintegral_finset [MeasurableSingletonClass α] (s : Finset α) (f : α → ℝ≥0∞) : ∫⁻ x in s, f x ∂μ = ∑ x ∈ s, f x * μ {x} := by simp only [lintegral_countable _ s.countable_toSet, ← Finset.tsum_subtype'] #align measure_theory.lintegral_finset MeasureTheory.lintegral_finset theorem lintegral_fintype [MeasurableSingletonClass α] [Fintype α] (f : α → ℝ≥0∞) : ∫⁻ x, f x ∂μ = ∑ x, f x * μ {x} := by rw [← lintegral_finset, Finset.coe_univ, Measure.restrict_univ] #align measure_theory.lintegral_fintype MeasureTheory.lintegral_fintype theorem lintegral_unique [Unique α] (f : α → ℝ≥0∞) : ∫⁻ x, f x ∂μ = f default * μ univ := calc ∫⁻ x, f x ∂μ = ∫⁻ _, f default ∂μ := lintegral_congr <\| Unique.forall_iff.2 rfl _ = f default * μ univ := lintegral_const _ #align measure_theory.lintegral_unique MeasureTheory.lintegral_unique end Countable theorem ae_lt_top {f : α → ℝ≥0∞} (hf : Measurable f) (h2f : ∫⁻ x, f x ∂μ ≠ ∞) : ∀ᵐ x ∂μ, f x < ∞ := by simp_rw [ae_iff, ENNReal.not_lt_top] by_contra h apply h2f.lt_top.not_le have : (f ⁻¹' {∞}).indicator ⊤ ≤ f := by intro x by_cases hx : x ∈ f ⁻¹' {∞} <;> [simpa [indicator_of_mem hx]; simp [indicator_of_not_mem hx]] convert lintegral_mono this rw [lintegral_indicator _ (hf (measurableSet_singleton ∞))] simp [ENNReal.top_mul', preimage, h] #align measure_theory.ae_lt_top MeasureTheory.ae_lt_top theorem ae_lt_top' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (h2f : ∫⁻ x, f x ∂μ ≠ ∞) : ∀ᵐ x ∂μ, f x < ∞ := haveI h2f_meas : ∫⁻ x, hf.mk f x ∂μ ≠ ∞ := by rwa [← lintegral_congr_ae hf.ae_eq_mk] (ae_lt_top hf.measurable_mk h2f_meas).mp (hf.ae_eq_mk.mono fun x hx h => by rwa [hx]) #align measure_theory.ae_lt_top' MeasureTheory.ae_lt_top' theorem set_lintegral_lt_top_of_bddAbove {s : Set α} (hs : μ s ≠ ∞) {f : α → ℝ≥0} (hf : Measurable f) (hbdd : BddAbove (f '' s)) : ∫⁻ x in s, f x ∂μ < ∞ := by obtain ⟨M, hM⟩ := hbdd rw [mem_upperBounds] at hM refine lt_of_le_of_lt (set_lintegral_mono hf.coe_nnreal_ennreal (@measurable_const _ _ _ _ ↑M) ?_) ?_ · simpa using hM · rw [lintegral_const] refine ENNReal.mul_lt_top ENNReal.coe_lt_top.ne ?_ simp [hs] #align measure_theory.set_lintegral_lt_top_of_bdd_above MeasureTheory.set_lintegral_lt_top_of_bddAbove theorem set_lintegral_lt_top_of_isCompact [TopologicalSpace α] [OpensMeasurableSpace α] {s : Set α} (hs : μ s ≠ ∞) (hsc : IsCompact s) {f : α → ℝ≥0} (hf : Continuous f) : ∫⁻ x in s, f x ∂μ < ∞ := set_lintegral_lt_top_of_bddAbove hs hf.measurable (hsc.image hf).bddAbove #align measure_theory.set_lintegral_lt_top_of_is_compact MeasureTheory.set_lintegral_lt_top_of_isCompact theorem _root_.IsFiniteMeasure.lintegral_lt_top_of_bounded_to_ennreal {α : Type} [MeasurableSpace α] (μ : Measure α) [μ_fin : IsFiniteMeasure μ] {f : α → ℝ≥0∞} (f_bdd : ∃ c : ℝ≥0, ∀ x, f x ≤ c) : ∫⁻ x, f x ∂μ < ∞ := by cases' f_bdd with c hc apply lt_of_le_of_lt (@lintegral_mono _ _ μ _ _ hc) rw [lintegral_const] exact ENNReal.mul_lt_top ENNReal.coe_lt_top.ne μ_fin.measure_univ_lt_top.ne #align is_finite_measure.lintegral_lt_top_of_bounded_to_ennreal IsFiniteMeasure.lintegral_lt_top_of_bounded_to_ennreal /-- If a monotone sequence of functions has an upper bound and the sequence of integrals of these functions tends to the integral of the upper bound, then the sequence of functions converges almost everywhere to the upper bound. Auxiliary version assuming moreover that the functions in the sequence are ae measurable. -/ lemma tendsto_of_lintegral_tendsto_of_monotone_aux {α : Type} {mα : MeasurableSpace α} {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} {μ : Measure α} (hf_meas : ∀ n, AEMeasurable (f n) μ) (hF_meas : AEMeasurable F μ) (hf_tendsto : Tendsto (fun i ↦ ∫⁻ a, f i a ∂μ) atTop (𝓝 (∫⁻ a, F a ∂μ))) (hf_mono : ∀ᵐ a ∂μ, Monotone (fun i ↦ f i a)) (h_bound : ∀ᵐ a ∂μ, ∀ i, f i a ≤ F a) (h_int_finite : ∫⁻ a, F a ∂μ ≠ ∞) : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F a)) := by have h_bound_finite : ∀ᵐ a ∂μ, F a ≠ ∞ := by filter_upwards [ae_lt_top' hF_meas h_int_finite] with a ha using ha.ne have h_exists : ∀ᵐ a ∂μ, ∃ l, Tendsto (fun i ↦ f i a) atTop (𝓝 l) := by filter_upwards [h_bound, h_bound_finite, hf_mono] with a h_le h_fin h_mono have h_tendsto : Tendsto (fun i ↦ f i a) atTop atTop ∨ ∃ l, Tendsto (fun i ↦ f i a) atTop (𝓝 l) := tendsto_of_monotone h_mono cases' h_tendsto with h_absurd h_tendsto · rw [tendsto_atTop_atTop_iff_of_monotone h_mono] at h_absurd obtain ⟨i, hi⟩ := h_absurd (F a + 1) refine absurd (hi.trans (h_le _)) (not_le.mpr ?_) exact ENNReal.lt_add_right h_fin one_ne_zero · exact h_tendsto classical let F' : α → ℝ≥0∞ := fun a ↦ if h : ∃ l, Tendsto (fun i ↦ f i a) atTop (𝓝 l) then h.choose else ∞ have hF'_tendsto : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F' a)) := by filter_upwards [h_exists] with a ha simp_rw [F', dif_pos ha] exact ha.choose_spec suffices F' =ᵐ[μ] F by filter_upwards [this, hF'_tendsto] with a h_eq h_tendsto using h_eq ▸ h_tendsto have hF'_le : F' ≤ᵐ[μ] F := by filter_upwards [h_bound, hF'_tendsto] with a h_le h_tendsto exact le_of_tendsto' h_tendsto (fun m ↦ h_le _) suffices ∫⁻ a, F' a ∂μ = ∫⁻ a, F a ∂μ from ae_eq_of_ae_le_of_lintegral_le hF'_le (this ▸ h_int_finite) hF_meas this.symm.le refine tendsto_nhds_unique ?_ hf_tendsto exact lintegral_tendsto_of_tendsto_of_monotone hf_meas hf_mono hF'_tendsto /-- If a monotone sequence of functions has an upper bound and the sequence of integrals of these functions tends to the integral of the upper bound, then the sequence of functions converges almost everywhere to the upper bound. -/ lemma tendsto_of_lintegral_tendsto_of_monotone {α : Type} {mα : MeasurableSpace α} {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} {μ : Measure α} (hF_meas : AEMeasurable F μ) (hf_tendsto : Tendsto (fun i ↦ ∫⁻ a, f i a ∂μ) atTop (𝓝 (∫⁻ a, F a ∂μ))) (hf_mono : ∀ᵐ a ∂μ, Monotone (fun i ↦ f i a)) (h_bound : ∀ᵐ a ∂μ, ∀ i, f i a ≤ F a) (h_int_finite : ∫⁻ a, F a ∂μ ≠ ∞) : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F a)) := by have : ∀ n, ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f n ∧ ∫⁻ a, f n a ∂μ = ∫⁻ a, g a ∂μ := fun n ↦ exists_measurable_le_lintegral_eq _ _ choose g gmeas gf hg using this let g' : ℕ → α → ℝ≥0∞ := Nat.rec (g 0) (fun n I x ↦ max (g (n+1) x) (I x)) have M n : Measurable (g' n) := by induction n with \| zero => simp [g', gmeas 0] \| succ n ih => exact Measurable.max (gmeas (n+1)) ih have I : ∀ n x, g n x ≤ g' n x := by intro n x cases n with \| zero \| succ => simp [g'] have I' : ∀ᵐ x ∂μ, ∀ n, g' n x ≤ f n x := by filter_upwards [hf_mono] with x hx n induction n with \| zero => simpa [g'] using gf 0 x \| succ n ih => exact max_le (gf (n+1) x) (ih.trans (hx (Nat.le_succ n))) have Int_eq n : ∫⁻ x, g' n x ∂μ = ∫⁻ x, f n x ∂μ := by apply le_antisymm · apply lintegral_mono_ae filter_upwards [I'] with x hx using hx n · rw [hg n] exact lintegral_mono (I n) have : ∀ᵐ a ∂μ, Tendsto (fun i ↦ g' i a) atTop (𝓝 (F a)) := by apply tendsto_of_lintegral_tendsto_of_monotone_aux _ hF_meas _ _ _ h_int_finite · exact fun n ↦ (M n).aemeasurable · simp_rw [Int_eq] exact hf_tendsto · exact eventually_of_forall (fun x ↦ monotone_nat_of_le_succ (fun n ↦ le_max_right _ _)) · filter_upwards [h_bound, I'] with x h'x hx n using (hx n).trans (h'x n) filter_upwards [this, I', h_bound] with x hx h'x h''x exact tendsto_of_tendsto_of_tendsto_of_le_of_le hx tendsto_const_nhds h'x h''x /-- If an antitone sequence of functions has a lower bound and the sequence of integrals of these functions tends to the integral of the lower bound, then the sequence of functions converges almost everywhere to the lower bound. -/ lemma tendsto_of_lintegral_tendsto_of_antitone {α : Type} {mα : MeasurableSpace α} {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} {μ : Measure α} (hf_meas : ∀ n, AEMeasurable (f n) μ) (hf_tendsto : Tendsto (fun i ↦ ∫⁻ a, f i a ∂μ) atTop (𝓝 (∫⁻ a, F a ∂μ))) (hf_mono : ∀ᵐ a ∂μ, Antitone (fun i ↦ f i a)) (h_bound : ∀ᵐ a ∂μ, ∀ i, F a ≤ f i a) (h0 : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F a)) := by have h_int_finite : ∫⁻ a, F a ∂μ ≠ ∞ := by refine ((lintegral_mono_ae ?_).trans_lt h0.lt_top).ne filter_upwards [h_bound] with a ha using ha 0 have h_exists : ∀ᵐ a ∂μ, ∃ l, Tendsto (fun i ↦ f i a) atTop (𝓝 l) := by filter_upwards [hf_mono] with a h_mono rcases _root_.tendsto_of_antitone h_mono with h \| h · refine ⟨0, h.mono_right ?_⟩ rw [OrderBot.atBot_eq] exact pure_le_nhds _ · exact h classical let F' : α → ℝ≥0∞ := fun a ↦ if h : ∃ l, Tendsto (fun i ↦ f i a) atTop (𝓝 l) then h.choose else ∞ have hF'_tendsto : ∀ᵐ a ∂μ, Tendsto (fun i ↦ f i a) atTop (𝓝 (F' a)) := by filter_upwards [h_exists] with a ha simp_rw [F', dif_pos ha] exact ha.choose_spec suffices F' =ᵐ[μ] F by filter_upwards [this, hF'_tendsto] with a h_eq h_tendsto using h_eq ▸ h_tendsto have hF'_le : F ≤ᵐ[μ] F' := by filter_upwards [h_bound, hF'_tendsto] with a h_le h_tendsto exact ge_of_tendsto' h_tendsto (fun m ↦ h_le _) suffices ∫⁻ a, F' a ∂μ = ∫⁻ a, F a ∂μ by refine (ae_eq_of_ae_le_of_lintegral_le hF'_le h_int_finite ?_ this.le).symm exact ENNReal.aemeasurable_of_tendsto hf_meas hF'_tendsto refine tendsto_nhds_unique ?_ hf_tendsto exact lintegral_tendsto_of_tendsto_of_antitone hf_meas hf_mono h0 hF'_tendsto end Lintegral open MeasureTheory.SimpleFunc variable {m m0 : MeasurableSpace α} /-- In a sigma-finite measure space, there exists an integrable function which is positive everywhere (and with an arbitrarily small integral). -/	Mathlib/MeasureTheory/Integral/Lebesgue.lean	1,803	1,818	theorem exists_pos_lintegral_lt_of_sigmaFinite (μ : Measure α) [SigmaFinite μ] {ε : ℝ≥0∞} (ε0 : ε ≠ 0) : ∃ g : α → ℝ≥0, (∀ x, 0 < g x) ∧ Measurable g ∧ ∫⁻ x, g x ∂μ < ε := by	/- Let `s` be a covering of `α` by pairwise disjoint measurable sets of finite measure. Let `δ : ℕ → ℝ≥0` be a positive function such that `∑' i, μ (s i) * δ i < ε`. Then the function that is equal to `δ n` on `s n` is a positive function with integral less than `ε`. -/ set s : ℕ → Set α := disjointed (spanningSets μ) have : ∀ n, μ (s n) < ∞ := fun n => (measure_mono <\| disjointed_subset _ _).trans_lt (measure_spanningSets_lt_top μ n) obtain ⟨δ, δpos, δsum⟩ : ∃ δ : ℕ → ℝ≥0, (∀ i, 0 < δ i) ∧ (∑' i, μ (s i) * δ i) < ε := ENNReal.exists_pos_tsum_mul_lt_of_countable ε0 _ fun n => (this n).ne set N : α → ℕ := spanningSetsIndex μ have hN_meas : Measurable N := measurable_spanningSetsIndex μ have hNs : ∀ n, N ⁻¹' {n} = s n := preimage_spanningSetsIndex_singleton μ refine ⟨δ ∘ N, fun x => δpos _, measurable_from_nat.comp hN_meas, ?_⟩ erw [lintegral_comp measurable_from_nat.coe_nnreal_ennreal hN_meas] simpa [N, hNs, lintegral_countable', measurable_spanningSetsIndex, mul_comm] using δsum
/- Copyright (c) 2019 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn, Yury Kudryashov -/ import Mathlib.Data.Set.Lattice #align_import data.set.intervals.disjoint from "leanprover-community/mathlib"@"207cfac9fcd06138865b5d04f7091e46d9320432" /-! # Extra lemmas about intervals This file contains lemmas about intervals that cannot be included into `Order.Interval.Set.Basic` because this would create an `import` cycle. Namely, lemmas in this file can use definitions from `Data.Set.Lattice`, including `Disjoint`. We consider various intersections and unions of half infinite intervals. -/ universe u v w variable {ι : Sort u} {α : Type v} {β : Type w} open Set open OrderDual (toDual) namespace Set section Preorder variable [Preorder α] {a b c : α} @[simp] theorem Iic_disjoint_Ioi (h : a ≤ b) : Disjoint (Iic a) (Ioi b) := disjoint_left.mpr fun _ ha hb => (h.trans_lt hb).not_le ha #align set.Iic_disjoint_Ioi Set.Iic_disjoint_Ioi @[simp] theorem Iio_disjoint_Ici (h : a ≤ b) : Disjoint (Iio a) (Ici b) := disjoint_left.mpr fun _ ha hb => (h.trans_lt' ha).not_le hb @[simp] theorem Iic_disjoint_Ioc (h : a ≤ b) : Disjoint (Iic a) (Ioc b c) := (Iic_disjoint_Ioi h).mono le_rfl Ioc_subset_Ioi_self #align set.Iic_disjoint_Ioc Set.Iic_disjoint_Ioc @[simp] theorem Ioc_disjoint_Ioc_same : Disjoint (Ioc a b) (Ioc b c) := (Iic_disjoint_Ioc le_rfl).mono Ioc_subset_Iic_self le_rfl #align set.Ioc_disjoint_Ioc_same Set.Ioc_disjoint_Ioc_same @[simp] theorem Ico_disjoint_Ico_same : Disjoint (Ico a b) (Ico b c) := disjoint_left.mpr fun _ hab hbc => hab.2.not_le hbc.1 #align set.Ico_disjoint_Ico_same Set.Ico_disjoint_Ico_same @[simp] theorem Ici_disjoint_Iic : Disjoint (Ici a) (Iic b) ↔ ¬a ≤ b := by rw [Set.disjoint_iff_inter_eq_empty, Ici_inter_Iic, Icc_eq_empty_iff] #align set.Ici_disjoint_Iic Set.Ici_disjoint_Iic @[simp] theorem Iic_disjoint_Ici : Disjoint (Iic a) (Ici b) ↔ ¬b ≤ a := disjoint_comm.trans Ici_disjoint_Iic #align set.Iic_disjoint_Ici Set.Iic_disjoint_Ici @[simp] theorem Ioc_disjoint_Ioi (h : b ≤ c) : Disjoint (Ioc a b) (Ioi c) := disjoint_left.mpr (fun _ hx hy ↦ (hx.2.trans h).not_lt hy) theorem Ioc_disjoint_Ioi_same : Disjoint (Ioc a b) (Ioi b) := Ioc_disjoint_Ioi le_rfl @[simp] theorem iUnion_Iic : ⋃ a : α, Iic a = univ := iUnion_eq_univ_iff.2 fun x => ⟨x, right_mem_Iic⟩ #align set.Union_Iic Set.iUnion_Iic @[simp] theorem iUnion_Ici : ⋃ a : α, Ici a = univ := iUnion_eq_univ_iff.2 fun x => ⟨x, left_mem_Ici⟩ #align set.Union_Ici Set.iUnion_Ici @[simp] theorem iUnion_Icc_right (a : α) : ⋃ b, Icc a b = Ici a := by simp only [← Ici_inter_Iic, ← inter_iUnion, iUnion_Iic, inter_univ] #align set.Union_Icc_right Set.iUnion_Icc_right @[simp] theorem iUnion_Ioc_right (a : α) : ⋃ b, Ioc a b = Ioi a := by simp only [← Ioi_inter_Iic, ← inter_iUnion, iUnion_Iic, inter_univ] #align set.Union_Ioc_right Set.iUnion_Ioc_right @[simp] theorem iUnion_Icc_left (b : α) : ⋃ a, Icc a b = Iic b := by simp only [← Ici_inter_Iic, ← iUnion_inter, iUnion_Ici, univ_inter] #align set.Union_Icc_left Set.iUnion_Icc_left @[simp] theorem iUnion_Ico_left (b : α) : ⋃ a, Ico a b = Iio b := by simp only [← Ici_inter_Iio, ← iUnion_inter, iUnion_Ici, univ_inter] #align set.Union_Ico_left Set.iUnion_Ico_left @[simp] theorem iUnion_Iio [NoMaxOrder α] : ⋃ a : α, Iio a = univ := iUnion_eq_univ_iff.2 exists_gt #align set.Union_Iio Set.iUnion_Iio @[simp] theorem iUnion_Ioi [NoMinOrder α] : ⋃ a : α, Ioi a = univ := iUnion_eq_univ_iff.2 exists_lt #align set.Union_Ioi Set.iUnion_Ioi @[simp] theorem iUnion_Ico_right [NoMaxOrder α] (a : α) : ⋃ b, Ico a b = Ici a := by simp only [← Ici_inter_Iio, ← inter_iUnion, iUnion_Iio, inter_univ] #align set.Union_Ico_right Set.iUnion_Ico_right @[simp] theorem iUnion_Ioo_right [NoMaxOrder α] (a : α) : ⋃ b, Ioo a b = Ioi a := by simp only [← Ioi_inter_Iio, ← inter_iUnion, iUnion_Iio, inter_univ] #align set.Union_Ioo_right Set.iUnion_Ioo_right @[simp] theorem iUnion_Ioc_left [NoMinOrder α] (b : α) : ⋃ a, Ioc a b = Iic b := by simp only [← Ioi_inter_Iic, ← iUnion_inter, iUnion_Ioi, univ_inter] #align set.Union_Ioc_left Set.iUnion_Ioc_left @[simp] theorem iUnion_Ioo_left [NoMinOrder α] (b : α) : ⋃ a, Ioo a b = Iio b := by simp only [← Ioi_inter_Iio, ← iUnion_inter, iUnion_Ioi, univ_inter] #align set.Union_Ioo_left Set.iUnion_Ioo_left end Preorder section LinearOrder variable [LinearOrder α] {a₁ a₂ b₁ b₂ : α} @[simp] theorem Ico_disjoint_Ico : Disjoint (Ico a₁ a₂) (Ico b₁ b₂) ↔ min a₂ b₂ ≤ max a₁ b₁ := by simp_rw [Set.disjoint_iff_inter_eq_empty, Ico_inter_Ico, Ico_eq_empty_iff, inf_eq_min, sup_eq_max, not_lt] #align set.Ico_disjoint_Ico Set.Ico_disjoint_Ico @[simp] theorem Ioc_disjoint_Ioc : Disjoint (Ioc a₁ a₂) (Ioc b₁ b₂) ↔ min a₂ b₂ ≤ max a₁ b₁ := by have h : _ ↔ min (toDual a₁) (toDual b₁) ≤ max (toDual a₂) (toDual b₂) := Ico_disjoint_Ico simpa only [dual_Ico] using h #align set.Ioc_disjoint_Ioc Set.Ioc_disjoint_Ioc @[simp] theorem Ioo_disjoint_Ioo [DenselyOrdered α] : Disjoint (Set.Ioo a₁ a₂) (Set.Ioo b₁ b₂) ↔ min a₂ b₂ ≤ max a₁ b₁ := by simp_rw [Set.disjoint_iff_inter_eq_empty, Ioo_inter_Ioo, Ioo_eq_empty_iff, inf_eq_min, sup_eq_max, not_lt] /-- If two half-open intervals are disjoint and the endpoint of one lies in the other, then it must be equal to the endpoint of the other. -/ theorem eq_of_Ico_disjoint {x₁ x₂ y₁ y₂ : α} (h : Disjoint (Ico x₁ x₂) (Ico y₁ y₂)) (hx : x₁ < x₂) (h2 : x₂ ∈ Ico y₁ y₂) : y₁ = x₂ := by rw [Ico_disjoint_Ico, min_eq_left (le_of_lt h2.2), le_max_iff] at h apply le_antisymm h2.1 exact h.elim (fun h => absurd hx (not_lt_of_le h)) id #align set.eq_of_Ico_disjoint Set.eq_of_Ico_disjoint @[simp] theorem iUnion_Ico_eq_Iio_self_iff {f : ι → α} {a : α} : ⋃ i, Ico (f i) a = Iio a ↔ ∀ x < a, ∃ i, f i ≤ x := by simp [← Ici_inter_Iio, ← iUnion_inter, subset_def] #align set.Union_Ico_eq_Iio_self_iff Set.iUnion_Ico_eq_Iio_self_iff @[simp] theorem iUnion_Ioc_eq_Ioi_self_iff {f : ι → α} {a : α} : ⋃ i, Ioc a (f i) = Ioi a ↔ ∀ x, a < x → ∃ i, x ≤ f i := by simp [← Ioi_inter_Iic, ← inter_iUnion, subset_def] #align set.Union_Ioc_eq_Ioi_self_iff Set.iUnion_Ioc_eq_Ioi_self_iff @[simp] theorem biUnion_Ico_eq_Iio_self_iff {p : ι → Prop} {f : ∀ i, p i → α} {a : α} : ⋃ (i) (hi : p i), Ico (f i hi) a = Iio a ↔ ∀ x < a, ∃ i hi, f i hi ≤ x := by simp [← Ici_inter_Iio, ← iUnion_inter, subset_def] #align set.bUnion_Ico_eq_Iio_self_iff Set.biUnion_Ico_eq_Iio_self_iff @[simp] theorem biUnion_Ioc_eq_Ioi_self_iff {p : ι → Prop} {f : ∀ i, p i → α} {a : α} : ⋃ (i) (hi : p i), Ioc a (f i hi) = Ioi a ↔ ∀ x, a < x → ∃ i hi, x ≤ f i hi := by simp [← Ioi_inter_Iic, ← inter_iUnion, subset_def] #align set.bUnion_Ioc_eq_Ioi_self_iff Set.biUnion_Ioc_eq_Ioi_self_iff end LinearOrder end Set section UnionIxx variable [LinearOrder α] {s : Set α} {a : α} {f : ι → α} theorem IsGLB.biUnion_Ioi_eq (h : IsGLB s a) : ⋃ x ∈ s, Ioi x = Ioi a := by refine (iUnion₂_subset fun x hx => ?_).antisymm fun x hx => ?_ · exact Ioi_subset_Ioi (h.1 hx) · rcases h.exists_between hx with ⟨y, hys, _, hyx⟩ exact mem_biUnion hys hyx #align is_glb.bUnion_Ioi_eq IsGLB.biUnion_Ioi_eq theorem IsGLB.iUnion_Ioi_eq (h : IsGLB (range f) a) : ⋃ x, Ioi (f x) = Ioi a := biUnion_range.symm.trans h.biUnion_Ioi_eq #align is_glb.Union_Ioi_eq IsGLB.iUnion_Ioi_eq theorem IsLUB.biUnion_Iio_eq (h : IsLUB s a) : ⋃ x ∈ s, Iio x = Iio a := h.dual.biUnion_Ioi_eq #align is_lub.bUnion_Iio_eq IsLUB.biUnion_Iio_eq theorem IsLUB.iUnion_Iio_eq (h : IsLUB (range f) a) : ⋃ x, Iio (f x) = Iio a := h.dual.iUnion_Ioi_eq #align is_lub.Union_Iio_eq IsLUB.iUnion_Iio_eq theorem IsGLB.biUnion_Ici_eq_Ioi (a_glb : IsGLB s a) (a_not_mem : a ∉ s) : ⋃ x ∈ s, Ici x = Ioi a := by refine (iUnion₂_subset fun x hx => ?_).antisymm fun x hx => ?_ · exact Ici_subset_Ioi.mpr (lt_of_le_of_ne (a_glb.1 hx) fun h => (h ▸ a_not_mem) hx) · rcases a_glb.exists_between hx with ⟨y, hys, _, hyx⟩ rw [mem_iUnion₂] exact ⟨y, hys, hyx.le⟩ #align is_glb.bUnion_Ici_eq_Ioi IsGLB.biUnion_Ici_eq_Ioi	Mathlib/Order/Interval/Set/Disjoint.lean	229	233	theorem IsGLB.biUnion_Ici_eq_Ici (a_glb : IsGLB s a) (a_mem : a ∈ s) : ⋃ x ∈ s, Ici x = Ici a := by	refine (iUnion₂_subset fun x hx => ?_).antisymm fun x hx => ?_ · exact Ici_subset_Ici.mpr (mem_lowerBounds.mp a_glb.1 x hx) · exact mem_iUnion₂.mpr ⟨a, a_mem, hx⟩
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Johannes Hölzl, Scott Morrison, Jens Wagemaker -/ import Mathlib.Algebra.Polynomial.Derivative import Mathlib.Algebra.Polynomial.Roots import Mathlib.RingTheory.EuclideanDomain #align_import data.polynomial.field_division from "leanprover-community/mathlib"@"bbeb185db4ccee8ed07dc48449414ebfa39cb821" /-! # Theory of univariate polynomials This file starts looking like the ring theory of $R[X]$ -/ noncomputable section open Polynomial namespace Polynomial universe u v w y z variable {R : Type u} {S : Type v} {k : Type y} {A : Type z} {a b : R} {n : ℕ} section CommRing variable [CommRing R] theorem rootMultiplicity_sub_one_le_derivative_rootMultiplicity_of_ne_zero (p : R[X]) (t : R) (hnezero : derivative p ≠ 0) : p.rootMultiplicity t - 1 ≤ p.derivative.rootMultiplicity t := (le_rootMultiplicity_iff hnezero).2 <\| pow_sub_one_dvd_derivative_of_pow_dvd (p.pow_rootMultiplicity_dvd t) theorem derivative_rootMultiplicity_of_root_of_mem_nonZeroDivisors {p : R[X]} {t : R} (hpt : Polynomial.IsRoot p t) (hnzd : (p.rootMultiplicity t : R) ∈ nonZeroDivisors R) : (derivative p).rootMultiplicity t = p.rootMultiplicity t - 1 := by by_cases h : p = 0 · simp only [h, map_zero, rootMultiplicity_zero] obtain ⟨g, hp, hndvd⟩ := p.exists_eq_pow_rootMultiplicity_mul_and_not_dvd h t set m := p.rootMultiplicity t have hm : m - 1 + 1 = m := Nat.sub_add_cancel <\| (rootMultiplicity_pos h).2 hpt have hndvd : ¬(X - C t) ^ m ∣ derivative p := by rw [hp, derivative_mul, dvd_add_left (dvd_mul_right _ _), derivative_X_sub_C_pow, ← hm, pow_succ, hm, mul_comm (C _), mul_assoc, dvd_cancel_left_mem_nonZeroDivisors (monic_X_sub_C t \|>.pow _ \|>.mem_nonZeroDivisors)] rw [dvd_iff_isRoot, IsRoot] at hndvd ⊢ rwa [eval_mul, eval_C, mul_left_mem_nonZeroDivisors_eq_zero_iff hnzd] have hnezero : derivative p ≠ 0 := fun h ↦ hndvd (by rw [h]; exact dvd_zero _) exact le_antisymm (by rwa [rootMultiplicity_le_iff hnezero, hm]) (rootMultiplicity_sub_one_le_derivative_rootMultiplicity_of_ne_zero _ t hnezero) theorem isRoot_iterate_derivative_of_lt_rootMultiplicity {p : R[X]} {t : R} {n : ℕ} (hn : n < p.rootMultiplicity t) : (derivative^[n] p).IsRoot t := dvd_iff_isRoot.mp <\| (dvd_pow_self _ <\| Nat.sub_ne_zero_of_lt hn).trans (pow_sub_dvd_iterate_derivative_of_pow_dvd _ <\| p.pow_rootMultiplicity_dvd t) open Finset in theorem eval_iterate_derivative_rootMultiplicity {p : R[X]} {t : R} : (derivative^[p.rootMultiplicity t] p).eval t = (p.rootMultiplicity t).factorial • (p /ₘ (X - C t) ^ p.rootMultiplicity t).eval t := by set m := p.rootMultiplicity t with hm conv_lhs => rw [← p.pow_mul_divByMonic_rootMultiplicity_eq t, ← hm] rw [iterate_derivative_mul, eval_finset_sum, sum_eq_single_of_mem _ (mem_range.mpr m.succ_pos)] · rw [m.choose_zero_right, one_smul, eval_mul, m.sub_zero, iterate_derivative_X_sub_pow_self, eval_natCast, nsmul_eq_mul]; rfl · intro b hb hb0 rw [iterate_derivative_X_sub_pow, eval_smul, eval_mul, eval_smul, eval_pow, Nat.sub_sub_self (mem_range_succ_iff.mp hb), eval_sub, eval_X, eval_C, sub_self, zero_pow hb0, smul_zero, zero_mul, smul_zero] theorem lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) (hroot : ∀ m ≤ n, (derivative^[m] p).IsRoot t) (hnzd : (n.factorial : R) ∈ nonZeroDivisors R) : n < p.rootMultiplicity t := by by_contra! h' replace hroot := hroot _ h' simp only [IsRoot, eval_iterate_derivative_rootMultiplicity] at hroot obtain ⟨q, hq⟩ := Nat.cast_dvd_cast (α := R) <\| Nat.factorial_dvd_factorial h' rw [hq, mul_mem_nonZeroDivisors] at hnzd rw [nsmul_eq_mul, mul_left_mem_nonZeroDivisors_eq_zero_iff hnzd.1] at hroot exact eval_divByMonic_pow_rootMultiplicity_ne_zero t h hroot theorem lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors' {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) (hroot : ∀ m ≤ n, (derivative^[m] p).IsRoot t) (hnzd : ∀ m ≤ n, m ≠ 0 → (m : R) ∈ nonZeroDivisors R) : n < p.rootMultiplicity t := by apply lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors h hroot clear hroot induction' n with n ih · simp only [Nat.zero_eq, Nat.factorial_zero, Nat.cast_one] exact Submonoid.one_mem _ · rw [Nat.factorial_succ, Nat.cast_mul, mul_mem_nonZeroDivisors] exact ⟨hnzd _ le_rfl n.succ_ne_zero, ih fun m h ↦ hnzd m (h.trans n.le_succ)⟩ theorem lt_rootMultiplicity_iff_isRoot_iterate_derivative_of_mem_nonZeroDivisors {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) (hnzd : (n.factorial : R) ∈ nonZeroDivisors R) : n < p.rootMultiplicity t ↔ ∀ m ≤ n, (derivative^[m] p).IsRoot t := ⟨fun hn _ hm ↦ isRoot_iterate_derivative_of_lt_rootMultiplicity <\| hm.trans_lt hn, fun hr ↦ lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors h hr hnzd⟩ theorem lt_rootMultiplicity_iff_isRoot_iterate_derivative_of_mem_nonZeroDivisors' {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) (hnzd : ∀ m ≤ n, m ≠ 0 → (m : R) ∈ nonZeroDivisors R) : n < p.rootMultiplicity t ↔ ∀ m ≤ n, (derivative^[m] p).IsRoot t := ⟨fun hn _ hm ↦ isRoot_iterate_derivative_of_lt_rootMultiplicity <\| Nat.lt_of_le_of_lt hm hn, fun hr ↦ lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors' h hr hnzd⟩ theorem one_lt_rootMultiplicity_iff_isRoot_iterate_derivative {p : R[X]} {t : R} (h : p ≠ 0) : 1 < p.rootMultiplicity t ↔ ∀ m ≤ 1, (derivative^[m] p).IsRoot t := lt_rootMultiplicity_iff_isRoot_iterate_derivative_of_mem_nonZeroDivisors h (by rw [Nat.factorial_one, Nat.cast_one]; exact Submonoid.one_mem _) theorem one_lt_rootMultiplicity_iff_isRoot {p : R[X]} {t : R} (h : p ≠ 0) : 1 < p.rootMultiplicity t ↔ p.IsRoot t ∧ (derivative p).IsRoot t := by rw [one_lt_rootMultiplicity_iff_isRoot_iterate_derivative h] refine ⟨fun h ↦ ⟨h 0 (by norm_num), h 1 (by norm_num)⟩, fun ⟨h0, h1⟩ m hm ↦ ?_⟩ obtain (_\|_\|m) := m exacts [h0, h1, by omega] end CommRing section IsDomain variable [CommRing R] [IsDomain R] theorem one_lt_rootMultiplicity_iff_isRoot_gcd [GCDMonoid R[X]] {p : R[X]} {t : R} (h : p ≠ 0) : 1 < p.rootMultiplicity t ↔ (gcd p (derivative p)).IsRoot t := by simp_rw [one_lt_rootMultiplicity_iff_isRoot h, ← dvd_iff_isRoot, dvd_gcd_iff] theorem derivative_rootMultiplicity_of_root [CharZero R] {p : R[X]} {t : R} (hpt : p.IsRoot t) : p.derivative.rootMultiplicity t = p.rootMultiplicity t - 1 := by by_cases h : p = 0 · rw [h, map_zero, rootMultiplicity_zero] exact derivative_rootMultiplicity_of_root_of_mem_nonZeroDivisors hpt <\| mem_nonZeroDivisors_of_ne_zero <\| Nat.cast_ne_zero.2 ((rootMultiplicity_pos h).2 hpt).ne' #align polynomial.derivative_root_multiplicity_of_root Polynomial.derivative_rootMultiplicity_of_root theorem rootMultiplicity_sub_one_le_derivative_rootMultiplicity [CharZero R] (p : R[X]) (t : R) : p.rootMultiplicity t - 1 ≤ p.derivative.rootMultiplicity t := by by_cases h : p.IsRoot t · exact (derivative_rootMultiplicity_of_root h).symm.le · rw [rootMultiplicity_eq_zero h, zero_tsub] exact zero_le _ #align polynomial.root_multiplicity_sub_one_le_derivative_root_multiplicity Polynomial.rootMultiplicity_sub_one_le_derivative_rootMultiplicity theorem lt_rootMultiplicity_of_isRoot_iterate_derivative [CharZero R] {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) (hroot : ∀ m ≤ n, (derivative^[m] p).IsRoot t) : n < p.rootMultiplicity t := lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors h hroot <\| mem_nonZeroDivisors_of_ne_zero <\| Nat.cast_ne_zero.2 <\| Nat.factorial_ne_zero n theorem lt_rootMultiplicity_iff_isRoot_iterate_derivative [CharZero R] {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) : n < p.rootMultiplicity t ↔ ∀ m ≤ n, (derivative^[m] p).IsRoot t := ⟨fun hn _ hm ↦ isRoot_iterate_derivative_of_lt_rootMultiplicity <\| Nat.lt_of_le_of_lt hm hn, fun hr ↦ lt_rootMultiplicity_of_isRoot_iterate_derivative h hr⟩ section NormalizationMonoid variable [NormalizationMonoid R] instance instNormalizationMonoid : NormalizationMonoid R[X] where normUnit p := ⟨C ↑(normUnit p.leadingCoeff), C ↑(normUnit p.leadingCoeff)⁻¹, by rw [← RingHom.map_mul, Units.mul_inv, C_1], by rw [← RingHom.map_mul, Units.inv_mul, C_1]⟩ normUnit_zero := Units.ext (by simp) normUnit_mul hp0 hq0 := Units.ext (by dsimp rw [Ne, ← leadingCoeff_eq_zero] at * rw [leadingCoeff_mul, normUnit_mul hp0 hq0, Units.val_mul, C_mul]) normUnit_coe_units u := Units.ext (by dsimp rw [← mul_one u⁻¹, Units.val_mul, Units.eq_inv_mul_iff_mul_eq] rcases Polynomial.isUnit_iff.1 ⟨u, rfl⟩ with ⟨_, ⟨w, rfl⟩, h2⟩ rw [← h2, leadingCoeff_C, normUnit_coe_units, ← C_mul, Units.mul_inv, C_1] rfl) @[simp] theorem coe_normUnit {p : R[X]} : (normUnit p : R[X]) = C ↑(normUnit p.leadingCoeff) := by simp [normUnit] #align polynomial.coe_norm_unit Polynomial.coe_normUnit theorem leadingCoeff_normalize (p : R[X]) : leadingCoeff (normalize p) = normalize (leadingCoeff p) := by simp #align polynomial.leading_coeff_normalize Polynomial.leadingCoeff_normalize theorem Monic.normalize_eq_self {p : R[X]} (hp : p.Monic) : normalize p = p := by simp only [Polynomial.coe_normUnit, normalize_apply, hp.leadingCoeff, normUnit_one, Units.val_one, Polynomial.C.map_one, mul_one] #align polynomial.monic.normalize_eq_self Polynomial.Monic.normalize_eq_self theorem roots_normalize {p : R[X]} : (normalize p).roots = p.roots := by rw [normalize_apply, mul_comm, coe_normUnit, roots_C_mul _ (normUnit (leadingCoeff p)).ne_zero] #align polynomial.roots_normalize Polynomial.roots_normalize theorem normUnit_X : normUnit (X : Polynomial R) = 1 := by have := coe_normUnit (R := R) (p := X) rwa [leadingCoeff_X, normUnit_one, Units.val_one, map_one, Units.val_eq_one] at this theorem X_eq_normalize : (X : Polynomial R) = normalize X := by simp only [normalize_apply, normUnit_X, Units.val_one, mul_one] end NormalizationMonoid end IsDomain section DivisionRing variable [DivisionRing R] {p q : R[X]} theorem degree_pos_of_ne_zero_of_nonunit (hp0 : p ≠ 0) (hp : ¬IsUnit p) : 0 < degree p := lt_of_not_ge fun h => by rw [eq_C_of_degree_le_zero h] at hp0 hp exact hp (IsUnit.map C (IsUnit.mk0 (coeff p 0) (mt C_inj.2 (by simpa using hp0)))) #align polynomial.degree_pos_of_ne_zero_of_nonunit Polynomial.degree_pos_of_ne_zero_of_nonunit @[simp] theorem map_eq_zero [Semiring S] [Nontrivial S] (f : R →+* S) : p.map f = 0 ↔ p = 0 := by simp only [Polynomial.ext_iff] congr! simp [map_eq_zero, coeff_map, coeff_zero] #align polynomial.map_eq_zero Polynomial.map_eq_zero theorem map_ne_zero [Semiring S] [Nontrivial S] {f : R →+* S} (hp : p ≠ 0) : p.map f ≠ 0 := mt (map_eq_zero f).1 hp #align polynomial.map_ne_zero Polynomial.map_ne_zero @[simp] theorem degree_map [Semiring S] [Nontrivial S] (p : R[X]) (f : R →+* S) : degree (p.map f) = degree p := p.degree_map_eq_of_injective f.injective #align polynomial.degree_map Polynomial.degree_map @[simp] theorem natDegree_map [Semiring S] [Nontrivial S] (f : R →+* S) : natDegree (p.map f) = natDegree p := natDegree_eq_of_degree_eq (degree_map _ f) #align polynomial.nat_degree_map Polynomial.natDegree_map @[simp] theorem leadingCoeff_map [Semiring S] [Nontrivial S] (f : R →+* S) : leadingCoeff (p.map f) = f (leadingCoeff p) := by simp only [← coeff_natDegree, coeff_map f, natDegree_map] #align polynomial.leading_coeff_map Polynomial.leadingCoeff_map theorem monic_map_iff [Semiring S] [Nontrivial S] {f : R →+* S} {p : R[X]} : (p.map f).Monic ↔ p.Monic := by rw [Monic, leadingCoeff_map, ← f.map_one, Function.Injective.eq_iff f.injective, Monic] #align polynomial.monic_map_iff Polynomial.monic_map_iff end DivisionRing section Field variable [Field R] {p q : R[X]} theorem isUnit_iff_degree_eq_zero : IsUnit p ↔ degree p = 0 := ⟨degree_eq_zero_of_isUnit, fun h => have : degree p ≤ 0 := by simp [, le_refl] have hc : coeff p 0 ≠ 0 := fun hc => by rw [eq_C_of_degree_le_zero this, hc] at h; simp only [map_zero] at h; contradiction isUnit_iff_dvd_one.2 ⟨C (coeff p 0)⁻¹, by conv in p => rw [eq_C_of_degree_le_zero this] rw [← C_mul, _root_.mul_inv_cancel hc, C_1]⟩⟩ #align polynomial.is_unit_iff_degree_eq_zero Polynomial.isUnit_iff_degree_eq_zero /-- Division of polynomials. See `Polynomial.divByMonic` for more details. -/ def div (p q : R[X]) := C (leadingCoeff q)⁻¹ (p /ₘ (q * C (leadingCoeff q)⁻¹)) #align polynomial.div Polynomial.div /-- Remainder of polynomial division. See `Polynomial.modByMonic` for more details. -/ def mod (p q : R[X]) := p %ₘ (q * C (leadingCoeff q)⁻¹) #align polynomial.mod Polynomial.mod private theorem quotient_mul_add_remainder_eq_aux (p q : R[X]) : q * div p q + mod p q = p := by by_cases h : q = 0 · simp only [h, zero_mul, mod, modByMonic_zero, zero_add] · conv => rhs rw [← modByMonic_add_div p (monic_mul_leadingCoeff_inv h)] rw [div, mod, add_comm, mul_assoc] private theorem remainder_lt_aux (p : R[X]) (hq : q ≠ 0) : degree (mod p q) < degree q := by rw [← degree_mul_leadingCoeff_inv q hq] exact degree_modByMonic_lt p (monic_mul_leadingCoeff_inv hq) instance : Div R[X] := ⟨div⟩ instance : Mod R[X] := ⟨mod⟩ theorem div_def : p / q = C (leadingCoeff q)⁻¹ * (p /ₘ (q * C (leadingCoeff q)⁻¹)) := rfl #align polynomial.div_def Polynomial.div_def theorem mod_def : p % q = p %ₘ (q * C (leadingCoeff q)⁻¹) := rfl #align polynomial.mod_def Polynomial.mod_def theorem modByMonic_eq_mod (p : R[X]) (hq : Monic q) : p %ₘ q = p % q := show p %ₘ q = p %ₘ (q * C (leadingCoeff q)⁻¹) by simp only [Monic.def.1 hq, inv_one, mul_one, C_1] #align polynomial.mod_by_monic_eq_mod Polynomial.modByMonic_eq_mod theorem divByMonic_eq_div (p : R[X]) (hq : Monic q) : p /ₘ q = p / q := show p /ₘ q = C (leadingCoeff q)⁻¹ * (p /ₘ (q * C (leadingCoeff q)⁻¹)) by simp only [Monic.def.1 hq, inv_one, C_1, one_mul, mul_one] #align polynomial.div_by_monic_eq_div Polynomial.divByMonic_eq_div theorem mod_X_sub_C_eq_C_eval (p : R[X]) (a : R) : p % (X - C a) = C (p.eval a) := modByMonic_eq_mod p (monic_X_sub_C a) ▸ modByMonic_X_sub_C_eq_C_eval _ _ set_option linter.uppercaseLean3 false in #align polynomial.mod_X_sub_C_eq_C_eval Polynomial.mod_X_sub_C_eq_C_eval theorem mul_div_eq_iff_isRoot : (X - C a) * (p / (X - C a)) = p ↔ IsRoot p a := divByMonic_eq_div p (monic_X_sub_C a) ▸ mul_divByMonic_eq_iff_isRoot #align polynomial.mul_div_eq_iff_is_root Polynomial.mul_div_eq_iff_isRoot instance instEuclideanDomain : EuclideanDomain R[X] := { Polynomial.commRing, Polynomial.nontrivial with quotient := (· / ·) quotient_zero := by simp [div_def] remainder := (· % ·) r := _ r_wellFounded := degree_lt_wf quotient_mul_add_remainder_eq := quotient_mul_add_remainder_eq_aux remainder_lt := fun p q hq => remainder_lt_aux _ hq mul_left_not_lt := fun p q hq => not_lt_of_ge (degree_le_mul_left _ hq) } theorem mod_eq_self_iff (hq0 : q ≠ 0) : p % q = p ↔ degree p < degree q := ⟨fun h => h ▸ EuclideanDomain.mod_lt _ hq0, fun h => by classical have : ¬degree (q * C (leadingCoeff q)⁻¹) ≤ degree p := not_le_of_gt <\| by rwa [degree_mul_leadingCoeff_inv q hq0] rw [mod_def, modByMonic, dif_pos (monic_mul_leadingCoeff_inv hq0)] unfold divModByMonicAux dsimp simp only [this, false_and_iff, if_false]⟩ #align polynomial.mod_eq_self_iff Polynomial.mod_eq_self_iff theorem div_eq_zero_iff (hq0 : q ≠ 0) : p / q = 0 ↔ degree p < degree q := ⟨fun h => by have := EuclideanDomain.div_add_mod p q; rwa [h, mul_zero, zero_add, mod_eq_self_iff hq0] at this, fun h => by have hlt : degree p < degree (q * C (leadingCoeff q)⁻¹) := by rwa [degree_mul_leadingCoeff_inv q hq0] have hm : Monic (q * C (leadingCoeff q)⁻¹) := monic_mul_leadingCoeff_inv hq0 rw [div_def, (divByMonic_eq_zero_iff hm).2 hlt, mul_zero]⟩ #align polynomial.div_eq_zero_iff Polynomial.div_eq_zero_iff theorem degree_add_div (hq0 : q ≠ 0) (hpq : degree q ≤ degree p) : degree q + degree (p / q) = degree p := by have : degree (p % q) < degree (q * (p / q)) := calc degree (p % q) < degree q := EuclideanDomain.mod_lt _ hq0 _ ≤ _ := degree_le_mul_left _ (mt (div_eq_zero_iff hq0).1 (not_lt_of_ge hpq)) conv_rhs => rw [← EuclideanDomain.div_add_mod p q, degree_add_eq_left_of_degree_lt this, degree_mul] #align polynomial.degree_add_div Polynomial.degree_add_div theorem degree_div_le (p q : R[X]) : degree (p / q) ≤ degree p := by by_cases hq : q = 0 · simp [hq] · rw [div_def, mul_comm, degree_mul_leadingCoeff_inv _ hq]; exact degree_divByMonic_le _ _ #align polynomial.degree_div_le Polynomial.degree_div_le theorem degree_div_lt (hp : p ≠ 0) (hq : 0 < degree q) : degree (p / q) < degree p := by have hq0 : q ≠ 0 := fun hq0 => by simp [hq0] at hq rw [div_def, mul_comm, degree_mul_leadingCoeff_inv _ hq0]; exact degree_divByMonic_lt _ (monic_mul_leadingCoeff_inv hq0) hp (by rw [degree_mul_leadingCoeff_inv _ hq0]; exact hq) #align polynomial.degree_div_lt Polynomial.degree_div_lt theorem isUnit_map [Field k] (f : R →+* k) : IsUnit (p.map f) ↔ IsUnit p := by simp_rw [isUnit_iff_degree_eq_zero, degree_map] #align polynomial.is_unit_map Polynomial.isUnit_map theorem map_div [Field k] (f : R →+* k) : (p / q).map f = p.map f / q.map f := by if hq0 : q = 0 then simp [hq0] else rw [div_def, div_def, Polynomial.map_mul, map_divByMonic f (monic_mul_leadingCoeff_inv hq0), Polynomial.map_mul, map_C, leadingCoeff_map, map_inv₀] #align polynomial.map_div Polynomial.map_div theorem map_mod [Field k] (f : R →+* k) : (p % q).map f = p.map f % q.map f := by by_cases hq0 : q = 0 · simp [hq0] · rw [mod_def, mod_def, leadingCoeff_map f, ← map_inv₀ f, ← map_C f, ← Polynomial.map_mul f, map_modByMonic f (monic_mul_leadingCoeff_inv hq0)] #align polynomial.map_mod Polynomial.map_mod section open EuclideanDomain theorem gcd_map [Field k] [DecidableEq R] [DecidableEq k] (f : R →+* k) : gcd (p.map f) (q.map f) = (gcd p q).map f := GCD.induction p q (fun x => by simp_rw [Polynomial.map_zero, EuclideanDomain.gcd_zero_left]) fun x y _ ih => by rw [gcd_val, ← map_mod, ih, ← gcd_val] #align polynomial.gcd_map Polynomial.gcd_map end theorem eval₂_gcd_eq_zero [CommSemiring k] [DecidableEq R] {ϕ : R →+* k} {f g : R[X]} {α : k} (hf : f.eval₂ ϕ α = 0) (hg : g.eval₂ ϕ α = 0) : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0 := by rw [EuclideanDomain.gcd_eq_gcd_ab f g, Polynomial.eval₂_add, Polynomial.eval₂_mul, Polynomial.eval₂_mul, hf, hg, zero_mul, zero_mul, zero_add] #align polynomial.eval₂_gcd_eq_zero Polynomial.eval₂_gcd_eq_zero theorem eval_gcd_eq_zero [DecidableEq R] {f g : R[X]} {α : R} (hf : f.eval α = 0) (hg : g.eval α = 0) : (EuclideanDomain.gcd f g).eval α = 0 := eval₂_gcd_eq_zero hf hg #align polynomial.eval_gcd_eq_zero Polynomial.eval_gcd_eq_zero theorem root_left_of_root_gcd [CommSemiring k] [DecidableEq R] {ϕ : R →+* k} {f g : R[X]} {α : k} (hα : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0) : f.eval₂ ϕ α = 0 := by cases' EuclideanDomain.gcd_dvd_left f g with p hp rw [hp, Polynomial.eval₂_mul, hα, zero_mul] #align polynomial.root_left_of_root_gcd Polynomial.root_left_of_root_gcd theorem root_right_of_root_gcd [CommSemiring k] [DecidableEq R] {ϕ : R →+* k} {f g : R[X]} {α : k} (hα : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0) : g.eval₂ ϕ α = 0 := by cases' EuclideanDomain.gcd_dvd_right f g with p hp rw [hp, Polynomial.eval₂_mul, hα, zero_mul] #align polynomial.root_right_of_root_gcd Polynomial.root_right_of_root_gcd theorem root_gcd_iff_root_left_right [CommSemiring k] [DecidableEq R] {ϕ : R →+* k} {f g : R[X]} {α : k} : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0 ↔ f.eval₂ ϕ α = 0 ∧ g.eval₂ ϕ α = 0 := ⟨fun h => ⟨root_left_of_root_gcd h, root_right_of_root_gcd h⟩, fun h => eval₂_gcd_eq_zero h.1 h.2⟩ #align polynomial.root_gcd_iff_root_left_right Polynomial.root_gcd_iff_root_left_right theorem isRoot_gcd_iff_isRoot_left_right [DecidableEq R] {f g : R[X]} {α : R} : (EuclideanDomain.gcd f g).IsRoot α ↔ f.IsRoot α ∧ g.IsRoot α := root_gcd_iff_root_left_right #align polynomial.is_root_gcd_iff_is_root_left_right Polynomial.isRoot_gcd_iff_isRoot_left_right theorem isCoprime_map [Field k] (f : R →+* k) : IsCoprime (p.map f) (q.map f) ↔ IsCoprime p q := by classical rw [← EuclideanDomain.gcd_isUnit_iff, ← EuclideanDomain.gcd_isUnit_iff, gcd_map, isUnit_map] #align polynomial.is_coprime_map Polynomial.isCoprime_map theorem mem_roots_map [CommRing k] [IsDomain k] {f : R →+* k} {x : k} (hp : p ≠ 0) : x ∈ (p.map f).roots ↔ p.eval₂ f x = 0 := by rw [mem_roots (map_ne_zero hp), IsRoot, Polynomial.eval_map] #align polynomial.mem_roots_map Polynomial.mem_roots_map theorem rootSet_monomial [CommRing S] [IsDomain S] [Algebra R S] {n : ℕ} (hn : n ≠ 0) {a : R} (ha : a ≠ 0) : (monomial n a).rootSet S = {0} := by classical rw [rootSet, aroots_monomial ha, Multiset.toFinset_nsmul _ _ hn, Multiset.toFinset_singleton, Finset.coe_singleton] #align polynomial.root_set_monomial Polynomial.rootSet_monomial theorem rootSet_C_mul_X_pow [CommRing S] [IsDomain S] [Algebra R S] {n : ℕ} (hn : n ≠ 0) {a : R} (ha : a ≠ 0) : rootSet (C a * X ^ n) S = {0} := by rw [C_mul_X_pow_eq_monomial, rootSet_monomial hn ha] set_option linter.uppercaseLean3 false in #align polynomial.root_set_C_mul_X_pow Polynomial.rootSet_C_mul_X_pow theorem rootSet_X_pow [CommRing S] [IsDomain S] [Algebra R S] {n : ℕ} (hn : n ≠ 0) : (X ^ n : R[X]).rootSet S = {0} := by rw [← one_mul (X ^ n : R[X]), ← C_1, rootSet_C_mul_X_pow hn] exact one_ne_zero set_option linter.uppercaseLean3 false in #align polynomial.root_set_X_pow Polynomial.rootSet_X_pow theorem rootSet_prod [CommRing S] [IsDomain S] [Algebra R S] {ι : Type} (f : ι → R[X]) (s : Finset ι) (h : s.prod f ≠ 0) : (s.prod f).rootSet S = ⋃ i ∈ s, (f i).rootSet S := by classical simp only [rootSet, aroots, ← Finset.mem_coe] rw [Polynomial.map_prod, roots_prod, Finset.bind_toFinset, s.val_toFinset, Finset.coe_biUnion] rwa [← Polynomial.map_prod, Ne, map_eq_zero] #align polynomial.root_set_prod Polynomial.rootSet_prod theorem exists_root_of_degree_eq_one (h : degree p = 1) : ∃ x, IsRoot p x := ⟨-(p.coeff 0 / p.coeff 1), by have : p.coeff 1 ≠ 0 := by have h' := natDegree_eq_of_degree_eq_some h change natDegree p = 1 at h'; rw [← h'] exact mt leadingCoeff_eq_zero.1 fun h0 => by simp [h0] at h conv in p => rw [eq_X_add_C_of_degree_le_one (show degree p ≤ 1 by rw [h])] simp [IsRoot, mul_div_cancel₀ _ this]⟩ #align polynomial.exists_root_of_degree_eq_one Polynomial.exists_root_of_degree_eq_one theorem coeff_inv_units (u : R[X]ˣ) (n : ℕ) : ((↑u : R[X]).coeff n)⁻¹ = (↑u⁻¹ : R[X]).coeff n := by rw [eq_C_of_degree_eq_zero (degree_coe_units u), eq_C_of_degree_eq_zero (degree_coe_units u⁻¹), coeff_C, coeff_C, inv_eq_one_div] split_ifs · rw [div_eq_iff_mul_eq (coeff_coe_units_zero_ne_zero u), coeff_zero_eq_eval_zero, coeff_zero_eq_eval_zero, ← eval_mul, ← Units.val_mul, inv_mul_self] simp · simp #align polynomial.coeff_inv_units Polynomial.coeff_inv_units theorem monic_normalize [DecidableEq R] (hp0 : p ≠ 0) : Monic (normalize p) := by rw [Ne, ← leadingCoeff_eq_zero, ← Ne, ← isUnit_iff_ne_zero] at hp0 rw [Monic, leadingCoeff_normalize, normalize_eq_one] apply hp0 #align polynomial.monic_normalize Polynomial.monic_normalize theorem leadingCoeff_div (hpq : q.degree ≤ p.degree) : (p / q).leadingCoeff = p.leadingCoeff / q.leadingCoeff := by by_cases hq : q = 0 · simp [hq] rw [div_def, leadingCoeff_mul, leadingCoeff_C, leadingCoeff_divByMonic_of_monic (monic_mul_leadingCoeff_inv hq) _, mul_comm, div_eq_mul_inv] rwa [degree_mul_leadingCoeff_inv q hq] #align polynomial.leading_coeff_div Polynomial.leadingCoeff_div theorem div_C_mul : p / (C a q) = C a⁻¹ * (p / q) := by by_cases ha : a = 0 · simp [ha] simp only [div_def, leadingCoeff_mul, mul_inv, leadingCoeff_C, C.map_mul, mul_assoc] congr 3 rw [mul_left_comm q, ← mul_assoc, ← C.map_mul, mul_inv_cancel ha, C.map_one, one_mul] set_option linter.uppercaseLean3 false in #align polynomial.div_C_mul Polynomial.div_C_mul theorem C_mul_dvd (ha : a ≠ 0) : C a * p ∣ q ↔ p ∣ q := ⟨fun h => dvd_trans (dvd_mul_left _ _) h, fun ⟨r, hr⟩ => ⟨C a⁻¹ * r, by rw [mul_assoc, mul_left_comm p, ← mul_assoc, ← C.map_mul, _root_.mul_inv_cancel ha, C.map_one, one_mul, hr]⟩⟩ set_option linter.uppercaseLean3 false in #align polynomial.C_mul_dvd Polynomial.C_mul_dvd theorem dvd_C_mul (ha : a ≠ 0) : p ∣ Polynomial.C a * q ↔ p ∣ q := ⟨fun ⟨r, hr⟩ => ⟨C a⁻¹ * r, by rw [mul_left_comm p, ← hr, ← mul_assoc, ← C.map_mul, _root_.inv_mul_cancel ha, C.map_one, one_mul]⟩, fun h => dvd_trans h (dvd_mul_left _ _)⟩ set_option linter.uppercaseLean3 false in #align polynomial.dvd_C_mul Polynomial.dvd_C_mul theorem coe_normUnit_of_ne_zero [DecidableEq R] (hp : p ≠ 0) : (normUnit p : R[X]) = C p.leadingCoeff⁻¹ := by have : p.leadingCoeff ≠ 0 := mt leadingCoeff_eq_zero.mp hp simp [CommGroupWithZero.coe_normUnit _ this] #align polynomial.coe_norm_unit_of_ne_zero Polynomial.coe_normUnit_of_ne_zero theorem normalize_monic [DecidableEq R] (h : Monic p) : normalize p = p := by simp [h] #align polynomial.normalize_monic Polynomial.normalize_monic theorem map_dvd_map' [Field k] (f : R →+* k) {x y : R[X]} : x.map f ∣ y.map f ↔ x ∣ y := by by_cases H : x = 0 · rw [H, Polynomial.map_zero, zero_dvd_iff, zero_dvd_iff, map_eq_zero] · classical rw [← normalize_dvd_iff, ← @normalize_dvd_iff R[X], normalize_apply, normalize_apply, coe_normUnit_of_ne_zero H, coe_normUnit_of_ne_zero (mt (map_eq_zero f).1 H), leadingCoeff_map, ← map_inv₀ f, ← map_C, ← Polynomial.map_mul, map_dvd_map _ f.injective (monic_mul_leadingCoeff_inv H)] #align polynomial.map_dvd_map' Polynomial.map_dvd_map' theorem degree_normalize [DecidableEq R] : degree (normalize p) = degree p := by simp #align polynomial.degree_normalize Polynomial.degree_normalize theorem prime_of_degree_eq_one (hp1 : degree p = 1) : Prime p := by classical have : Prime (normalize p) := Monic.prime_of_degree_eq_one (hp1 ▸ degree_normalize) (monic_normalize fun hp0 => absurd hp1 (hp0.symm ▸ by simp [degree_zero])) exact (normalize_associated _).prime this #align polynomial.prime_of_degree_eq_one Polynomial.prime_of_degree_eq_one theorem irreducible_of_degree_eq_one (hp1 : degree p = 1) : Irreducible p := (prime_of_degree_eq_one hp1).irreducible #align polynomial.irreducible_of_degree_eq_one Polynomial.irreducible_of_degree_eq_one theorem not_irreducible_C (x : R) : ¬Irreducible (C x) := by by_cases H : x = 0 · rw [H, C_0] exact not_irreducible_zero · exact fun hx => Irreducible.not_unit hx <\| isUnit_C.2 <\| isUnit_iff_ne_zero.2 H set_option linter.uppercaseLean3 false in #align polynomial.not_irreducible_C Polynomial.not_irreducible_C theorem degree_pos_of_irreducible (hp : Irreducible p) : 0 < p.degree := lt_of_not_ge fun hp0 => have := eq_C_of_degree_le_zero hp0 not_irreducible_C (p.coeff 0) <\| this ▸ hp #align polynomial.degree_pos_of_irreducible Polynomial.degree_pos_of_irreducible /- Porting note: factored out a have statement from isCoprime_of_is_root_of_eval_derivative_ne_zero into multiple decls because the original proof was timing out -/ theorem X_sub_C_mul_divByMonic_eq_sub_modByMonic {K : Type} [Field K] (f : K[X]) (a : K) : (X - C a) (f /ₘ (X - C a)) = f - f %ₘ (X - C a) := by rw [eq_sub_iff_add_eq, ← eq_sub_iff_add_eq', modByMonic_eq_sub_mul_div] exact monic_X_sub_C a /- Porting note: factored out a have statement from isCoprime_of_is_root_of_eval_derivative_ne_zero because the original proof was timing out -/	Mathlib/Algebra/Polynomial/FieldDivision.lean	621	629	theorem divByMonic_add_X_sub_C_mul_derivate_divByMonic_eq_derivative {K : Type} [Field K] (f : K[X]) (a : K) : f /ₘ (X - C a) + (X - C a) derivative (f /ₘ (X - C a)) = derivative f := by	have key := by apply congrArg derivative <\| X_sub_C_mul_divByMonic_eq_sub_modByMonic f a rw [modByMonic_X_sub_C_eq_C_eval] at key rw [derivative_mul,derivative_sub,derivative_X,derivative_sub] at key rw [derivative_C,sub_zero,one_mul] at key rw [derivative_C,sub_zero] at key assumption
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl -/ import Mathlib.Topology.Order.MonotoneContinuity import Mathlib.Topology.Algebra.Order.LiminfLimsup import Mathlib.Topology.Instances.NNReal import Mathlib.Topology.EMetricSpace.Lipschitz import Mathlib.Topology.Metrizable.Basic import Mathlib.Topology.Order.T5 #align_import topology.instances.ennreal from "leanprover-community/mathlib"@"ec4b2eeb50364487f80421c0b4c41328a611f30d" /-! # Topology on extended non-negative reals -/ noncomputable section open Set Filter Metric Function open scoped Classical Topology ENNReal NNReal Filter variable {α : Type} {β : Type} {γ : Type} namespace ENNReal variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} {x y z : ℝ≥0∞} {ε ε₁ ε₂ : ℝ≥0∞} {s : Set ℝ≥0∞} section TopologicalSpace open TopologicalSpace /-- Topology on `ℝ≥0∞`. Note: this is different from the `EMetricSpace` topology. The `EMetricSpace` topology has `IsOpen {∞}`, while this topology doesn't have singleton elements. -/ instance : TopologicalSpace ℝ≥0∞ := Preorder.topology ℝ≥0∞ instance : OrderTopology ℝ≥0∞ := ⟨rfl⟩ -- short-circuit type class inference instance : T2Space ℝ≥0∞ := inferInstance instance : T5Space ℝ≥0∞ := inferInstance instance : T4Space ℝ≥0∞ := inferInstance instance : SecondCountableTopology ℝ≥0∞ := orderIsoUnitIntervalBirational.toHomeomorph.embedding.secondCountableTopology instance : MetrizableSpace ENNReal := orderIsoUnitIntervalBirational.toHomeomorph.embedding.metrizableSpace theorem embedding_coe : Embedding ((↑) : ℝ≥0 → ℝ≥0∞) := coe_strictMono.embedding_of_ordConnected <\| by rw [range_coe']; exact ordConnected_Iio #align ennreal.embedding_coe ENNReal.embedding_coe theorem isOpen_ne_top : IsOpen { a : ℝ≥0∞ \| a ≠ ∞ } := isOpen_ne #align ennreal.is_open_ne_top ENNReal.isOpen_ne_top theorem isOpen_Ico_zero : IsOpen (Ico 0 b) := by rw [ENNReal.Ico_eq_Iio] exact isOpen_Iio #align ennreal.is_open_Ico_zero ENNReal.isOpen_Ico_zero theorem openEmbedding_coe : OpenEmbedding ((↑) : ℝ≥0 → ℝ≥0∞) := ⟨embedding_coe, by rw [range_coe']; exact isOpen_Iio⟩ #align ennreal.open_embedding_coe ENNReal.openEmbedding_coe theorem coe_range_mem_nhds : range ((↑) : ℝ≥0 → ℝ≥0∞) ∈ 𝓝 (r : ℝ≥0∞) := IsOpen.mem_nhds openEmbedding_coe.isOpen_range <\| mem_range_self _ #align ennreal.coe_range_mem_nhds ENNReal.coe_range_mem_nhds @[norm_cast] theorem tendsto_coe {f : Filter α} {m : α → ℝ≥0} {a : ℝ≥0} : Tendsto (fun a => (m a : ℝ≥0∞)) f (𝓝 ↑a) ↔ Tendsto m f (𝓝 a) := embedding_coe.tendsto_nhds_iff.symm #align ennreal.tendsto_coe ENNReal.tendsto_coe theorem continuous_coe : Continuous ((↑) : ℝ≥0 → ℝ≥0∞) := embedding_coe.continuous #align ennreal.continuous_coe ENNReal.continuous_coe theorem continuous_coe_iff {α} [TopologicalSpace α] {f : α → ℝ≥0} : (Continuous fun a => (f a : ℝ≥0∞)) ↔ Continuous f := embedding_coe.continuous_iff.symm #align ennreal.continuous_coe_iff ENNReal.continuous_coe_iff theorem nhds_coe {r : ℝ≥0} : 𝓝 (r : ℝ≥0∞) = (𝓝 r).map (↑) := (openEmbedding_coe.map_nhds_eq r).symm #align ennreal.nhds_coe ENNReal.nhds_coe theorem tendsto_nhds_coe_iff {α : Type} {l : Filter α} {x : ℝ≥0} {f : ℝ≥0∞ → α} : Tendsto f (𝓝 ↑x) l ↔ Tendsto (f ∘ (↑) : ℝ≥0 → α) (𝓝 x) l := by rw [nhds_coe, tendsto_map'_iff] #align ennreal.tendsto_nhds_coe_iff ENNReal.tendsto_nhds_coe_iff theorem continuousAt_coe_iff {α : Type} [TopologicalSpace α] {x : ℝ≥0} {f : ℝ≥0∞ → α} : ContinuousAt f ↑x ↔ ContinuousAt (f ∘ (↑) : ℝ≥0 → α) x := tendsto_nhds_coe_iff #align ennreal.continuous_at_coe_iff ENNReal.continuousAt_coe_iff theorem nhds_coe_coe {r p : ℝ≥0} : 𝓝 ((r : ℝ≥0∞), (p : ℝ≥0∞)) = (𝓝 (r, p)).map fun p : ℝ≥0 × ℝ≥0 => (↑p.1, ↑p.2) := ((openEmbedding_coe.prod openEmbedding_coe).map_nhds_eq (r, p)).symm #align ennreal.nhds_coe_coe ENNReal.nhds_coe_coe theorem continuous_ofReal : Continuous ENNReal.ofReal := (continuous_coe_iff.2 continuous_id).comp continuous_real_toNNReal #align ennreal.continuous_of_real ENNReal.continuous_ofReal theorem tendsto_ofReal {f : Filter α} {m : α → ℝ} {a : ℝ} (h : Tendsto m f (𝓝 a)) : Tendsto (fun a => ENNReal.ofReal (m a)) f (𝓝 (ENNReal.ofReal a)) := (continuous_ofReal.tendsto a).comp h #align ennreal.tendsto_of_real ENNReal.tendsto_ofReal theorem tendsto_toNNReal {a : ℝ≥0∞} (ha : a ≠ ∞) : Tendsto ENNReal.toNNReal (𝓝 a) (𝓝 a.toNNReal) := by lift a to ℝ≥0 using ha rw [nhds_coe, tendsto_map'_iff] exact tendsto_id #align ennreal.tendsto_to_nnreal ENNReal.tendsto_toNNReal theorem eventuallyEq_of_toReal_eventuallyEq {l : Filter α} {f g : α → ℝ≥0∞} (hfi : ∀ᶠ x in l, f x ≠ ∞) (hgi : ∀ᶠ x in l, g x ≠ ∞) (hfg : (fun x => (f x).toReal) =ᶠ[l] fun x => (g x).toReal) : f =ᶠ[l] g := by filter_upwards [hfi, hgi, hfg] with _ hfx hgx _ rwa [← ENNReal.toReal_eq_toReal hfx hgx] #align ennreal.eventually_eq_of_to_real_eventually_eq ENNReal.eventuallyEq_of_toReal_eventuallyEq theorem continuousOn_toNNReal : ContinuousOn ENNReal.toNNReal { a \| a ≠ ∞ } := fun _a ha => ContinuousAt.continuousWithinAt (tendsto_toNNReal ha) #align ennreal.continuous_on_to_nnreal ENNReal.continuousOn_toNNReal theorem tendsto_toReal {a : ℝ≥0∞} (ha : a ≠ ∞) : Tendsto ENNReal.toReal (𝓝 a) (𝓝 a.toReal) := NNReal.tendsto_coe.2 <\| tendsto_toNNReal ha #align ennreal.tendsto_to_real ENNReal.tendsto_toReal lemma continuousOn_toReal : ContinuousOn ENNReal.toReal { a \| a ≠ ∞ } := NNReal.continuous_coe.comp_continuousOn continuousOn_toNNReal lemma continuousAt_toReal (hx : x ≠ ∞) : ContinuousAt ENNReal.toReal x := continuousOn_toReal.continuousAt (isOpen_ne_top.mem_nhds_iff.mpr hx) /-- The set of finite `ℝ≥0∞` numbers is homeomorphic to `ℝ≥0`. -/ def neTopHomeomorphNNReal : { a \| a ≠ ∞ } ≃ₜ ℝ≥0 where toEquiv := neTopEquivNNReal continuous_toFun := continuousOn_iff_continuous_restrict.1 continuousOn_toNNReal continuous_invFun := continuous_coe.subtype_mk _ #align ennreal.ne_top_homeomorph_nnreal ENNReal.neTopHomeomorphNNReal /-- The set of finite `ℝ≥0∞` numbers is homeomorphic to `ℝ≥0`. -/ def ltTopHomeomorphNNReal : { a \| a < ∞ } ≃ₜ ℝ≥0 := by refine (Homeomorph.setCongr ?_).trans neTopHomeomorphNNReal simp only [mem_setOf_eq, lt_top_iff_ne_top] #align ennreal.lt_top_homeomorph_nnreal ENNReal.ltTopHomeomorphNNReal theorem nhds_top : 𝓝 ∞ = ⨅ (a) (_ : a ≠ ∞), 𝓟 (Ioi a) := nhds_top_order.trans <\| by simp [lt_top_iff_ne_top, Ioi] #align ennreal.nhds_top ENNReal.nhds_top theorem nhds_top' : 𝓝 ∞ = ⨅ r : ℝ≥0, 𝓟 (Ioi ↑r) := nhds_top.trans <\| iInf_ne_top _ #align ennreal.nhds_top' ENNReal.nhds_top' theorem nhds_top_basis : (𝓝 ∞).HasBasis (fun a => a < ∞) fun a => Ioi a := _root_.nhds_top_basis #align ennreal.nhds_top_basis ENNReal.nhds_top_basis theorem tendsto_nhds_top_iff_nnreal {m : α → ℝ≥0∞} {f : Filter α} : Tendsto m f (𝓝 ∞) ↔ ∀ x : ℝ≥0, ∀ᶠ a in f, ↑x < m a := by simp only [nhds_top', tendsto_iInf, tendsto_principal, mem_Ioi] #align ennreal.tendsto_nhds_top_iff_nnreal ENNReal.tendsto_nhds_top_iff_nnreal theorem tendsto_nhds_top_iff_nat {m : α → ℝ≥0∞} {f : Filter α} : Tendsto m f (𝓝 ∞) ↔ ∀ n : ℕ, ∀ᶠ a in f, ↑n < m a := tendsto_nhds_top_iff_nnreal.trans ⟨fun h n => by simpa only [ENNReal.coe_natCast] using h n, fun h x => let ⟨n, hn⟩ := exists_nat_gt x (h n).mono fun y => lt_trans <\| by rwa [← ENNReal.coe_natCast, coe_lt_coe]⟩ #align ennreal.tendsto_nhds_top_iff_nat ENNReal.tendsto_nhds_top_iff_nat theorem tendsto_nhds_top {m : α → ℝ≥0∞} {f : Filter α} (h : ∀ n : ℕ, ∀ᶠ a in f, ↑n < m a) : Tendsto m f (𝓝 ∞) := tendsto_nhds_top_iff_nat.2 h #align ennreal.tendsto_nhds_top ENNReal.tendsto_nhds_top theorem tendsto_nat_nhds_top : Tendsto (fun n : ℕ => ↑n) atTop (𝓝 ∞) := tendsto_nhds_top fun n => mem_atTop_sets.2 ⟨n + 1, fun _m hm => mem_setOf.2 <\| Nat.cast_lt.2 <\| Nat.lt_of_succ_le hm⟩ #align ennreal.tendsto_nat_nhds_top ENNReal.tendsto_nat_nhds_top @[simp, norm_cast] theorem tendsto_coe_nhds_top {f : α → ℝ≥0} {l : Filter α} : Tendsto (fun x => (f x : ℝ≥0∞)) l (𝓝 ∞) ↔ Tendsto f l atTop := by rw [tendsto_nhds_top_iff_nnreal, atTop_basis_Ioi.tendsto_right_iff]; simp #align ennreal.tendsto_coe_nhds_top ENNReal.tendsto_coe_nhds_top theorem tendsto_ofReal_atTop : Tendsto ENNReal.ofReal atTop (𝓝 ∞) := tendsto_coe_nhds_top.2 tendsto_real_toNNReal_atTop #align ennreal.tendsto_of_real_at_top ENNReal.tendsto_ofReal_atTop theorem nhds_zero : 𝓝 (0 : ℝ≥0∞) = ⨅ (a) (_ : a ≠ 0), 𝓟 (Iio a) := nhds_bot_order.trans <\| by simp [pos_iff_ne_zero, Iio] #align ennreal.nhds_zero ENNReal.nhds_zero theorem nhds_zero_basis : (𝓝 (0 : ℝ≥0∞)).HasBasis (fun a : ℝ≥0∞ => 0 < a) fun a => Iio a := nhds_bot_basis #align ennreal.nhds_zero_basis ENNReal.nhds_zero_basis theorem nhds_zero_basis_Iic : (𝓝 (0 : ℝ≥0∞)).HasBasis (fun a : ℝ≥0∞ => 0 < a) Iic := nhds_bot_basis_Iic #align ennreal.nhds_zero_basis_Iic ENNReal.nhds_zero_basis_Iic -- Porting note (#11215): TODO: add a TC for `≠ ∞`? @[instance] theorem nhdsWithin_Ioi_coe_neBot {r : ℝ≥0} : (𝓝[>] (r : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_self_neBot' ⟨∞, ENNReal.coe_lt_top⟩ #align ennreal.nhds_within_Ioi_coe_ne_bot ENNReal.nhdsWithin_Ioi_coe_neBot @[instance] theorem nhdsWithin_Ioi_zero_neBot : (𝓝[>] (0 : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot #align ennreal.nhds_within_Ioi_zero_ne_bot ENNReal.nhdsWithin_Ioi_zero_neBot @[instance] theorem nhdsWithin_Ioi_one_neBot : (𝓝[>] (1 : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot @[instance] theorem nhdsWithin_Ioi_nat_neBot (n : ℕ) : (𝓝[>] (n : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot @[instance] theorem nhdsWithin_Ioi_ofNat_nebot (n : ℕ) [n.AtLeastTwo] : (𝓝[>] (OfNat.ofNat n : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot @[instance] theorem nhdsWithin_Iio_neBot [NeZero x] : (𝓝[<] x).NeBot := nhdsWithin_Iio_self_neBot' ⟨0, NeZero.pos x⟩ /-- Closed intervals `Set.Icc (x - ε) (x + ε)`, `ε ≠ 0`, form a basis of neighborhoods of an extended nonnegative real number `x ≠ ∞`. We use `Set.Icc` instead of `Set.Ioo` because this way the statement works for `x = 0`. -/ theorem hasBasis_nhds_of_ne_top' (xt : x ≠ ∞) : (𝓝 x).HasBasis (· ≠ 0) (fun ε => Icc (x - ε) (x + ε)) := by rcases (zero_le x).eq_or_gt with rfl \| x0 · simp_rw [zero_tsub, zero_add, ← bot_eq_zero, Icc_bot, ← bot_lt_iff_ne_bot] exact nhds_bot_basis_Iic · refine (nhds_basis_Ioo' ⟨_, x0⟩ ⟨_, xt.lt_top⟩).to_hasBasis ?_ fun ε ε0 => ?_ · rintro ⟨a, b⟩ ⟨ha, hb⟩ rcases exists_between (tsub_pos_of_lt ha) with ⟨ε, ε0, hε⟩ rcases lt_iff_exists_add_pos_lt.1 hb with ⟨δ, δ0, hδ⟩ refine ⟨min ε δ, (lt_min ε0 (coe_pos.2 δ0)).ne', Icc_subset_Ioo ?_ ?_⟩ · exact lt_tsub_comm.2 ((min_le_left _ _).trans_lt hε) · exact (add_le_add_left (min_le_right _ _) _).trans_lt hδ · exact ⟨(x - ε, x + ε), ⟨ENNReal.sub_lt_self xt x0.ne' ε0, lt_add_right xt ε0⟩, Ioo_subset_Icc_self⟩ theorem hasBasis_nhds_of_ne_top (xt : x ≠ ∞) : (𝓝 x).HasBasis (0 < ·) (fun ε => Icc (x - ε) (x + ε)) := by simpa only [pos_iff_ne_zero] using hasBasis_nhds_of_ne_top' xt theorem Icc_mem_nhds (xt : x ≠ ∞) (ε0 : ε ≠ 0) : Icc (x - ε) (x + ε) ∈ 𝓝 x := (hasBasis_nhds_of_ne_top' xt).mem_of_mem ε0 #align ennreal.Icc_mem_nhds ENNReal.Icc_mem_nhds theorem nhds_of_ne_top (xt : x ≠ ∞) : 𝓝 x = ⨅ ε > 0, 𝓟 (Icc (x - ε) (x + ε)) := (hasBasis_nhds_of_ne_top xt).eq_biInf #align ennreal.nhds_of_ne_top ENNReal.nhds_of_ne_top theorem biInf_le_nhds : ∀ x : ℝ≥0∞, ⨅ ε > 0, 𝓟 (Icc (x - ε) (x + ε)) ≤ 𝓝 x \| ∞ => iInf₂_le_of_le 1 one_pos <\| by simpa only [← coe_one, top_sub_coe, top_add, Icc_self, principal_singleton] using pure_le_nhds _ \| (x : ℝ≥0) => (nhds_of_ne_top coe_ne_top).ge -- Porting note (#10756): new lemma protected theorem tendsto_nhds_of_Icc {f : Filter α} {u : α → ℝ≥0∞} {a : ℝ≥0∞} (h : ∀ ε > 0, ∀ᶠ x in f, u x ∈ Icc (a - ε) (a + ε)) : Tendsto u f (𝓝 a) := by refine Tendsto.mono_right ?_ (biInf_le_nhds _) simpa only [tendsto_iInf, tendsto_principal] /-- Characterization of neighborhoods for `ℝ≥0∞` numbers. See also `tendsto_order` for a version with strict inequalities. -/ protected theorem tendsto_nhds {f : Filter α} {u : α → ℝ≥0∞} {a : ℝ≥0∞} (ha : a ≠ ∞) : Tendsto u f (𝓝 a) ↔ ∀ ε > 0, ∀ᶠ x in f, u x ∈ Icc (a - ε) (a + ε) := by simp only [nhds_of_ne_top ha, tendsto_iInf, tendsto_principal] #align ennreal.tendsto_nhds ENNReal.tendsto_nhds protected theorem tendsto_nhds_zero {f : Filter α} {u : α → ℝ≥0∞} : Tendsto u f (𝓝 0) ↔ ∀ ε > 0, ∀ᶠ x in f, u x ≤ ε := nhds_zero_basis_Iic.tendsto_right_iff #align ennreal.tendsto_nhds_zero ENNReal.tendsto_nhds_zero protected theorem tendsto_atTop [Nonempty β] [SemilatticeSup β] {f : β → ℝ≥0∞} {a : ℝ≥0∞} (ha : a ≠ ∞) : Tendsto f atTop (𝓝 a) ↔ ∀ ε > 0, ∃ N, ∀ n ≥ N, f n ∈ Icc (a - ε) (a + ε) := .trans (atTop_basis.tendsto_iff (hasBasis_nhds_of_ne_top ha)) (by simp only [true_and]; rfl) #align ennreal.tendsto_at_top ENNReal.tendsto_atTop instance : ContinuousAdd ℝ≥0∞ := by refine ⟨continuous_iff_continuousAt.2 ?_⟩ rintro ⟨_ \| a, b⟩ · exact tendsto_nhds_top_mono' continuousAt_fst fun p => le_add_right le_rfl rcases b with (_ \| b) · exact tendsto_nhds_top_mono' continuousAt_snd fun p => le_add_left le_rfl simp only [ContinuousAt, some_eq_coe, nhds_coe_coe, ← coe_add, tendsto_map'_iff, (· ∘ ·), tendsto_coe, tendsto_add] protected theorem tendsto_atTop_zero [Nonempty β] [SemilatticeSup β] {f : β → ℝ≥0∞} : Tendsto f atTop (𝓝 0) ↔ ∀ ε > 0, ∃ N, ∀ n ≥ N, f n ≤ ε := .trans (atTop_basis.tendsto_iff nhds_zero_basis_Iic) (by simp only [true_and]; rfl) #align ennreal.tendsto_at_top_zero ENNReal.tendsto_atTop_zero theorem tendsto_sub : ∀ {a b : ℝ≥0∞}, (a ≠ ∞ ∨ b ≠ ∞) → Tendsto (fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 - p.2) (𝓝 (a, b)) (𝓝 (a - b)) \| ∞, ∞, h => by simp only [ne_eq, not_true_eq_false, or_self] at h \| ∞, (b : ℝ≥0), _ => by rw [top_sub_coe, tendsto_nhds_top_iff_nnreal] refine fun x => ((lt_mem_nhds <\| @coe_lt_top (b + 1 + x)).prod_nhds (ge_mem_nhds <\| coe_lt_coe.2 <\| lt_add_one b)).mono fun y hy => ?_ rw [lt_tsub_iff_left] calc y.2 + x ≤ ↑(b + 1) + x := add_le_add_right hy.2 _ _ < y.1 := hy.1 \| (a : ℝ≥0), ∞, _ => by rw [sub_top] refine (tendsto_pure.2 ?_).mono_right (pure_le_nhds _) exact ((gt_mem_nhds <\| coe_lt_coe.2 <\| lt_add_one a).prod_nhds (lt_mem_nhds <\| @coe_lt_top (a + 1))).mono fun x hx => tsub_eq_zero_iff_le.2 (hx.1.trans hx.2).le \| (a : ℝ≥0), (b : ℝ≥0), _ => by simp only [nhds_coe_coe, tendsto_map'_iff, ← ENNReal.coe_sub, (· ∘ ·), tendsto_coe] exact continuous_sub.tendsto (a, b) #align ennreal.tendsto_sub ENNReal.tendsto_sub protected theorem Tendsto.sub {f : Filter α} {ma : α → ℝ≥0∞} {mb : α → ℝ≥0∞} {a b : ℝ≥0∞} (hma : Tendsto ma f (𝓝 a)) (hmb : Tendsto mb f (𝓝 b)) (h : a ≠ ∞ ∨ b ≠ ∞) : Tendsto (fun a => ma a - mb a) f (𝓝 (a - b)) := show Tendsto ((fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 - p.2) ∘ fun a => (ma a, mb a)) f (𝓝 (a - b)) from Tendsto.comp (ENNReal.tendsto_sub h) (hma.prod_mk_nhds hmb) #align ennreal.tendsto.sub ENNReal.Tendsto.sub protected theorem tendsto_mul (ha : a ≠ 0 ∨ b ≠ ∞) (hb : b ≠ 0 ∨ a ≠ ∞) : Tendsto (fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 p.2) (𝓝 (a, b)) (𝓝 (a * b)) := by have ht : ∀ b : ℝ≥0∞, b ≠ 0 → Tendsto (fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 * p.2) (𝓝 (∞, b)) (𝓝 ∞) := fun b hb => by refine tendsto_nhds_top_iff_nnreal.2 fun n => ?_ rcases lt_iff_exists_nnreal_btwn.1 (pos_iff_ne_zero.2 hb) with ⟨ε, hε, hεb⟩ have : ∀ᶠ c : ℝ≥0∞ × ℝ≥0∞ in 𝓝 (∞, b), ↑n / ↑ε < c.1 ∧ ↑ε < c.2 := (lt_mem_nhds <\| div_lt_top coe_ne_top hε.ne').prod_nhds (lt_mem_nhds hεb) refine this.mono fun c hc => ?_ exact (ENNReal.div_mul_cancel hε.ne' coe_ne_top).symm.trans_lt (mul_lt_mul hc.1 hc.2) induction a with \| top => simp only [ne_eq, or_false, not_true_eq_false] at hb; simp [ht b hb, top_mul hb] \| coe a => induction b with \| top => simp only [ne_eq, or_false, not_true_eq_false] at ha simpa [(· ∘ ·), mul_comm, mul_top ha] using (ht a ha).comp (continuous_swap.tendsto (ofNNReal a, ∞)) \| coe b => simp only [nhds_coe_coe, ← coe_mul, tendsto_coe, tendsto_map'_iff, (· ∘ ·), tendsto_mul] #align ennreal.tendsto_mul ENNReal.tendsto_mul protected theorem Tendsto.mul {f : Filter α} {ma : α → ℝ≥0∞} {mb : α → ℝ≥0∞} {a b : ℝ≥0∞} (hma : Tendsto ma f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ ∞) (hmb : Tendsto mb f (𝓝 b)) (hb : b ≠ 0 ∨ a ≠ ∞) : Tendsto (fun a => ma a * mb a) f (𝓝 (a * b)) := show Tendsto ((fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 * p.2) ∘ fun a => (ma a, mb a)) f (𝓝 (a * b)) from Tendsto.comp (ENNReal.tendsto_mul ha hb) (hma.prod_mk_nhds hmb) #align ennreal.tendsto.mul ENNReal.Tendsto.mul theorem _root_.ContinuousOn.ennreal_mul [TopologicalSpace α] {f g : α → ℝ≥0∞} {s : Set α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (h₁ : ∀ x ∈ s, f x ≠ 0 ∨ g x ≠ ∞) (h₂ : ∀ x ∈ s, g x ≠ 0 ∨ f x ≠ ∞) : ContinuousOn (fun x => f x * g x) s := fun x hx => ENNReal.Tendsto.mul (hf x hx) (h₁ x hx) (hg x hx) (h₂ x hx) #align continuous_on.ennreal_mul ContinuousOn.ennreal_mul theorem _root_.Continuous.ennreal_mul [TopologicalSpace α] {f g : α → ℝ≥0∞} (hf : Continuous f) (hg : Continuous g) (h₁ : ∀ x, f x ≠ 0 ∨ g x ≠ ∞) (h₂ : ∀ x, g x ≠ 0 ∨ f x ≠ ∞) : Continuous fun x => f x * g x := continuous_iff_continuousAt.2 fun x => ENNReal.Tendsto.mul hf.continuousAt (h₁ x) hg.continuousAt (h₂ x) #align continuous.ennreal_mul Continuous.ennreal_mul protected theorem Tendsto.const_mul {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞} (hm : Tendsto m f (𝓝 b)) (hb : b ≠ 0 ∨ a ≠ ∞) : Tendsto (fun b => a * m b) f (𝓝 (a * b)) := by_cases (fun (this : a = 0) => by simp [this, tendsto_const_nhds]) fun ha : a ≠ 0 => ENNReal.Tendsto.mul tendsto_const_nhds (Or.inl ha) hm hb #align ennreal.tendsto.const_mul ENNReal.Tendsto.const_mul protected theorem Tendsto.mul_const {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞} (hm : Tendsto m f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ ∞) : Tendsto (fun x => m x * b) f (𝓝 (a * b)) := by simpa only [mul_comm] using ENNReal.Tendsto.const_mul hm ha #align ennreal.tendsto.mul_const ENNReal.Tendsto.mul_const theorem tendsto_finset_prod_of_ne_top {ι : Type} {f : ι → α → ℝ≥0∞} {x : Filter α} {a : ι → ℝ≥0∞} (s : Finset ι) (h : ∀ i ∈ s, Tendsto (f i) x (𝓝 (a i))) (h' : ∀ i ∈ s, a i ≠ ∞) : Tendsto (fun b => ∏ c ∈ s, f c b) x (𝓝 (∏ c ∈ s, a c)) := by induction' s using Finset.induction with a s has IH · simp [tendsto_const_nhds] simp only [Finset.prod_insert has] apply Tendsto.mul (h _ (Finset.mem_insert_self _ _)) · right exact (prod_lt_top fun i hi => h' _ (Finset.mem_insert_of_mem hi)).ne · exact IH (fun i hi => h _ (Finset.mem_insert_of_mem hi)) fun i hi => h' _ (Finset.mem_insert_of_mem hi) · exact Or.inr (h' _ (Finset.mem_insert_self _ _)) #align ennreal.tendsto_finset_prod_of_ne_top ENNReal.tendsto_finset_prod_of_ne_top protected theorem continuousAt_const_mul {a b : ℝ≥0∞} (h : a ≠ ∞ ∨ b ≠ 0) : ContinuousAt (a ·) b := Tendsto.const_mul tendsto_id h.symm #align ennreal.continuous_at_const_mul ENNReal.continuousAt_const_mul protected theorem continuousAt_mul_const {a b : ℝ≥0∞} (h : a ≠ ∞ ∨ b ≠ 0) : ContinuousAt (fun x => x * a) b := Tendsto.mul_const tendsto_id h.symm #align ennreal.continuous_at_mul_const ENNReal.continuousAt_mul_const protected theorem continuous_const_mul {a : ℝ≥0∞} (ha : a ≠ ∞) : Continuous (a * ·) := continuous_iff_continuousAt.2 fun _ => ENNReal.continuousAt_const_mul (Or.inl ha) #align ennreal.continuous_const_mul ENNReal.continuous_const_mul protected theorem continuous_mul_const {a : ℝ≥0∞} (ha : a ≠ ∞) : Continuous fun x => x * a := continuous_iff_continuousAt.2 fun _ => ENNReal.continuousAt_mul_const (Or.inl ha) #align ennreal.continuous_mul_const ENNReal.continuous_mul_const protected theorem continuous_div_const (c : ℝ≥0∞) (c_ne_zero : c ≠ 0) : Continuous fun x : ℝ≥0∞ => x / c := by simp_rw [div_eq_mul_inv, continuous_iff_continuousAt] intro x exact ENNReal.continuousAt_mul_const (Or.intro_left _ (inv_ne_top.mpr c_ne_zero)) #align ennreal.continuous_div_const ENNReal.continuous_div_const @[continuity] theorem continuous_pow (n : ℕ) : Continuous fun a : ℝ≥0∞ => a ^ n := by induction' n with n IH · simp [continuous_const] simp_rw [pow_add, pow_one, continuous_iff_continuousAt] intro x refine ENNReal.Tendsto.mul (IH.tendsto _) ?_ tendsto_id ?_ <;> by_cases H : x = 0 · simp only [H, zero_ne_top, Ne, or_true_iff, not_false_iff] · exact Or.inl fun h => H (pow_eq_zero h) · simp only [H, pow_eq_top_iff, zero_ne_top, false_or_iff, eq_self_iff_true, not_true, Ne, not_false_iff, false_and_iff] · simp only [H, true_or_iff, Ne, not_false_iff] #align ennreal.continuous_pow ENNReal.continuous_pow theorem continuousOn_sub : ContinuousOn (fun p : ℝ≥0∞ × ℝ≥0∞ => p.fst - p.snd) { p : ℝ≥0∞ × ℝ≥0∞ \| p ≠ ⟨∞, ∞⟩ } := by rw [ContinuousOn] rintro ⟨x, y⟩ hp simp only [Ne, Set.mem_setOf_eq, Prod.mk.inj_iff] at hp exact tendsto_nhdsWithin_of_tendsto_nhds (tendsto_sub (not_and_or.mp hp)) #align ennreal.continuous_on_sub ENNReal.continuousOn_sub theorem continuous_sub_left {a : ℝ≥0∞} (a_ne_top : a ≠ ∞) : Continuous (a - ·) := by change Continuous (Function.uncurry Sub.sub ∘ (a, ·)) refine continuousOn_sub.comp_continuous (Continuous.Prod.mk a) fun x => ?_ simp only [a_ne_top, Ne, mem_setOf_eq, Prod.mk.inj_iff, false_and_iff, not_false_iff] #align ennreal.continuous_sub_left ENNReal.continuous_sub_left theorem continuous_nnreal_sub {a : ℝ≥0} : Continuous fun x : ℝ≥0∞ => (a : ℝ≥0∞) - x := continuous_sub_left coe_ne_top #align ennreal.continuous_nnreal_sub ENNReal.continuous_nnreal_sub theorem continuousOn_sub_left (a : ℝ≥0∞) : ContinuousOn (a - ·) { x : ℝ≥0∞ \| x ≠ ∞ } := by rw [show (fun x => a - x) = (fun p : ℝ≥0∞ × ℝ≥0∞ => p.fst - p.snd) ∘ fun x => ⟨a, x⟩ by rfl] apply ContinuousOn.comp continuousOn_sub (Continuous.continuousOn (Continuous.Prod.mk a)) rintro _ h (_ \| _) exact h none_eq_top #align ennreal.continuous_on_sub_left ENNReal.continuousOn_sub_left theorem continuous_sub_right (a : ℝ≥0∞) : Continuous fun x : ℝ≥0∞ => x - a := by by_cases a_infty : a = ∞ · simp [a_infty, continuous_const] · rw [show (fun x => x - a) = (fun p : ℝ≥0∞ × ℝ≥0∞ => p.fst - p.snd) ∘ fun x => ⟨x, a⟩ by rfl] apply ContinuousOn.comp_continuous continuousOn_sub (continuous_id'.prod_mk continuous_const) intro x simp only [a_infty, Ne, mem_setOf_eq, Prod.mk.inj_iff, and_false_iff, not_false_iff] #align ennreal.continuous_sub_right ENNReal.continuous_sub_right protected theorem Tendsto.pow {f : Filter α} {m : α → ℝ≥0∞} {a : ℝ≥0∞} {n : ℕ} (hm : Tendsto m f (𝓝 a)) : Tendsto (fun x => m x ^ n) f (𝓝 (a ^ n)) := ((continuous_pow n).tendsto a).comp hm #align ennreal.tendsto.pow ENNReal.Tendsto.pow theorem le_of_forall_lt_one_mul_le {x y : ℝ≥0∞} (h : ∀ a < 1, a * x ≤ y) : x ≤ y := by have : Tendsto (· * x) (𝓝[<] 1) (𝓝 (1 * x)) := (ENNReal.continuousAt_mul_const (Or.inr one_ne_zero)).mono_left inf_le_left rw [one_mul] at this exact le_of_tendsto this (eventually_nhdsWithin_iff.2 <\| eventually_of_forall h) #align ennreal.le_of_forall_lt_one_mul_le ENNReal.le_of_forall_lt_one_mul_le theorem iInf_mul_left' {ι} {f : ι → ℝ≥0∞} {a : ℝ≥0∞} (h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0) (h0 : a = 0 → Nonempty ι) : ⨅ i, a * f i = a * ⨅ i, f i := by by_cases H : a = ∞ ∧ ⨅ i, f i = 0 · rcases h H.1 H.2 with ⟨i, hi⟩ rw [H.2, mul_zero, ← bot_eq_zero, iInf_eq_bot] exact fun b hb => ⟨i, by rwa [hi, mul_zero, ← bot_eq_zero]⟩ · rw [not_and_or] at H cases isEmpty_or_nonempty ι · rw [iInf_of_empty, iInf_of_empty, mul_top] exact mt h0 (not_nonempty_iff.2 ‹_›) · exact (ENNReal.mul_left_mono.map_iInf_of_continuousAt' (ENNReal.continuousAt_const_mul H)).symm #align ennreal.infi_mul_left' ENNReal.iInf_mul_left' theorem iInf_mul_left {ι} [Nonempty ι] {f : ι → ℝ≥0∞} {a : ℝ≥0∞} (h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0) : ⨅ i, a * f i = a * ⨅ i, f i := iInf_mul_left' h fun _ => ‹Nonempty ι› #align ennreal.infi_mul_left ENNReal.iInf_mul_left theorem iInf_mul_right' {ι} {f : ι → ℝ≥0∞} {a : ℝ≥0∞} (h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0) (h0 : a = 0 → Nonempty ι) : ⨅ i, f i * a = (⨅ i, f i) * a := by simpa only [mul_comm a] using iInf_mul_left' h h0 #align ennreal.infi_mul_right' ENNReal.iInf_mul_right' theorem iInf_mul_right {ι} [Nonempty ι] {f : ι → ℝ≥0∞} {a : ℝ≥0∞} (h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0) : ⨅ i, f i * a = (⨅ i, f i) * a := iInf_mul_right' h fun _ => ‹Nonempty ι› #align ennreal.infi_mul_right ENNReal.iInf_mul_right theorem inv_map_iInf {ι : Sort} {x : ι → ℝ≥0∞} : (iInf x)⁻¹ = ⨆ i, (x i)⁻¹ := OrderIso.invENNReal.map_iInf x #align ennreal.inv_map_infi ENNReal.inv_map_iInf theorem inv_map_iSup {ι : Sort} {x : ι → ℝ≥0∞} : (iSup x)⁻¹ = ⨅ i, (x i)⁻¹ := OrderIso.invENNReal.map_iSup x #align ennreal.inv_map_supr ENNReal.inv_map_iSup theorem inv_limsup {ι : Sort _} {x : ι → ℝ≥0∞} {l : Filter ι} : (limsup x l)⁻¹ = liminf (fun i => (x i)⁻¹) l := OrderIso.invENNReal.limsup_apply #align ennreal.inv_limsup ENNReal.inv_limsup theorem inv_liminf {ι : Sort _} {x : ι → ℝ≥0∞} {l : Filter ι} : (liminf x l)⁻¹ = limsup (fun i => (x i)⁻¹) l := OrderIso.invENNReal.liminf_apply #align ennreal.inv_liminf ENNReal.inv_liminf instance : ContinuousInv ℝ≥0∞ := ⟨OrderIso.invENNReal.continuous⟩ @[simp] -- Porting note (#11215): TODO: generalize to `[InvolutiveInv _] [ContinuousInv _]` protected theorem tendsto_inv_iff {f : Filter α} {m : α → ℝ≥0∞} {a : ℝ≥0∞} : Tendsto (fun x => (m x)⁻¹) f (𝓝 a⁻¹) ↔ Tendsto m f (𝓝 a) := ⟨fun h => by simpa only [inv_inv] using Tendsto.inv h, Tendsto.inv⟩ #align ennreal.tendsto_inv_iff ENNReal.tendsto_inv_iff protected theorem Tendsto.div {f : Filter α} {ma : α → ℝ≥0∞} {mb : α → ℝ≥0∞} {a b : ℝ≥0∞} (hma : Tendsto ma f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ 0) (hmb : Tendsto mb f (𝓝 b)) (hb : b ≠ ∞ ∨ a ≠ ∞) : Tendsto (fun a => ma a / mb a) f (𝓝 (a / b)) := by apply Tendsto.mul hma _ (ENNReal.tendsto_inv_iff.2 hmb) _ <;> simp [ha, hb] #align ennreal.tendsto.div ENNReal.Tendsto.div protected theorem Tendsto.const_div {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞} (hm : Tendsto m f (𝓝 b)) (hb : b ≠ ∞ ∨ a ≠ ∞) : Tendsto (fun b => a / m b) f (𝓝 (a / b)) := by apply Tendsto.const_mul (ENNReal.tendsto_inv_iff.2 hm) simp [hb] #align ennreal.tendsto.const_div ENNReal.Tendsto.const_div protected theorem Tendsto.div_const {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞} (hm : Tendsto m f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ 0) : Tendsto (fun x => m x / b) f (𝓝 (a / b)) := by apply Tendsto.mul_const hm simp [ha] #align ennreal.tendsto.div_const ENNReal.Tendsto.div_const protected theorem tendsto_inv_nat_nhds_zero : Tendsto (fun n : ℕ => (n : ℝ≥0∞)⁻¹) atTop (𝓝 0) := ENNReal.inv_top ▸ ENNReal.tendsto_inv_iff.2 tendsto_nat_nhds_top #align ennreal.tendsto_inv_nat_nhds_zero ENNReal.tendsto_inv_nat_nhds_zero theorem iSup_add {ι : Sort} {s : ι → ℝ≥0∞} [Nonempty ι] : iSup s + a = ⨆ b, s b + a := Monotone.map_iSup_of_continuousAt' (continuousAt_id.add continuousAt_const) <\| monotone_id.add monotone_const #align ennreal.supr_add ENNReal.iSup_add theorem biSup_add' {ι : Sort} {p : ι → Prop} (h : ∃ i, p i) {f : ι → ℝ≥0∞} : (⨆ (i) (_ : p i), f i) + a = ⨆ (i) (_ : p i), f i + a := by haveI : Nonempty { i // p i } := nonempty_subtype.2 h simp only [iSup_subtype', iSup_add] #align ennreal.bsupr_add' ENNReal.biSup_add' theorem add_biSup' {ι : Sort*} {p : ι → Prop} (h : ∃ i, p i) {f : ι → ℝ≥0∞} : (a + ⨆ (i) (_ : p i), f i) = ⨆ (i) (_ : p i), a + f i := by simp only [add_comm a, biSup_add' h] #align ennreal.add_bsupr' ENNReal.add_biSup' theorem biSup_add {ι} {s : Set ι} (hs : s.Nonempty) {f : ι → ℝ≥0∞} : (⨆ i ∈ s, f i) + a = ⨆ i ∈ s, f i + a := biSup_add' hs #align ennreal.bsupr_add ENNReal.biSup_add theorem add_biSup {ι} {s : Set ι} (hs : s.Nonempty) {f : ι → ℝ≥0∞} : (a + ⨆ i ∈ s, f i) = ⨆ i ∈ s, a + f i := add_biSup' hs #align ennreal.add_bsupr ENNReal.add_biSup theorem sSup_add {s : Set ℝ≥0∞} (hs : s.Nonempty) : sSup s + a = ⨆ b ∈ s, b + a := by rw [sSup_eq_iSup, biSup_add hs] #align ennreal.Sup_add ENNReal.sSup_add	Mathlib/Topology/Instances/ENNReal.lean	599	600	theorem add_iSup {ι : Sort*} {s : ι → ℝ≥0∞} [Nonempty ι] : a + iSup s = ⨆ b, a + s b := by	rw [add_comm, iSup_add]; simp [add_comm]
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Kenny Lau -/ import Mathlib.Data.List.Forall2 #align_import data.list.zip from "leanprover-community/mathlib"@"134625f523e737f650a6ea7f0c82a6177e45e622" /-! # zip & unzip This file provides results about `List.zipWith`, `List.zip` and `List.unzip` (definitions are in core Lean). `zipWith f l₁ l₂` applies `f : α → β → γ` pointwise to a list `l₁ : List α` and `l₂ : List β`. It applies, until one of the lists is exhausted. For example, `zipWith f [0, 1, 2] [6.28, 31] = [f 0 6.28, f 1 31]`. `zip` is `zipWith` applied to `Prod.mk`. For example, `zip [a₁, a₂] [b₁, b₂, b₃] = [(a₁, b₁), (a₂, b₂)]`. `unzip` undoes `zip`. For example, `unzip [(a₁, b₁), (a₂, b₂)] = ([a₁, a₂], [b₁, b₂])`. -/ -- Make sure we don't import algebra assert_not_exists Monoid universe u open Nat namespace List variable {α : Type u} {β γ δ ε : Type*} #align list.zip_with_cons_cons List.zipWith_cons_cons #align list.zip_cons_cons List.zip_cons_cons #align list.zip_with_nil_left List.zipWith_nil_left #align list.zip_with_nil_right List.zipWith_nil_right #align list.zip_with_eq_nil_iff List.zipWith_eq_nil_iff #align list.zip_nil_left List.zip_nil_left #align list.zip_nil_right List.zip_nil_right @[simp] theorem zip_swap : ∀ (l₁ : List α) (l₂ : List β), (zip l₁ l₂).map Prod.swap = zip l₂ l₁ \| [], l₂ => zip_nil_right.symm \| l₁, [] => by rw [zip_nil_right]; rfl \| a :: l₁, b :: l₂ => by simp only [zip_cons_cons, map_cons, zip_swap l₁ l₂, Prod.swap_prod_mk] #align list.zip_swap List.zip_swap #align list.length_zip_with List.length_zipWith #align list.length_zip List.length_zip theorem forall_zipWith {f : α → β → γ} {p : γ → Prop} : ∀ {l₁ : List α} {l₂ : List β}, length l₁ = length l₂ → (Forall p (zipWith f l₁ l₂) ↔ Forall₂ (fun x y => p (f x y)) l₁ l₂) \| [], [], _ => by simp \| a :: l₁, b :: l₂, h => by simp only [length_cons, succ_inj'] at h simp [forall_zipWith h] #align list.all₂_zip_with List.forall_zipWith theorem lt_length_left_of_zipWith {f : α → β → γ} {i : ℕ} {l : List α} {l' : List β} (h : i < (zipWith f l l').length) : i < l.length := by rw [length_zipWith] at h; omega #align list.lt_length_left_of_zip_with List.lt_length_left_of_zipWith theorem lt_length_right_of_zipWith {f : α → β → γ} {i : ℕ} {l : List α} {l' : List β} (h : i < (zipWith f l l').length) : i < l'.length := by rw [length_zipWith] at h; omega #align list.lt_length_right_of_zip_with List.lt_length_right_of_zipWith theorem lt_length_left_of_zip {i : ℕ} {l : List α} {l' : List β} (h : i < (zip l l').length) : i < l.length := lt_length_left_of_zipWith h #align list.lt_length_left_of_zip List.lt_length_left_of_zip theorem lt_length_right_of_zip {i : ℕ} {l : List α} {l' : List β} (h : i < (zip l l').length) : i < l'.length := lt_length_right_of_zipWith h #align list.lt_length_right_of_zip List.lt_length_right_of_zip #align list.zip_append List.zip_append #align list.zip_map List.zip_map #align list.zip_map_left List.zip_map_left #align list.zip_map_right List.zip_map_right #align list.zip_with_map List.zipWith_map #align list.zip_with_map_left List.zipWith_map_left #align list.zip_with_map_right List.zipWith_map_right #align list.zip_map' List.zip_map' #align list.map_zip_with List.map_zipWith theorem mem_zip {a b} : ∀ {l₁ : List α} {l₂ : List β}, (a, b) ∈ zip l₁ l₂ → a ∈ l₁ ∧ b ∈ l₂ \| _ :: l₁, _ :: l₂, h => by cases' h with _ _ _ h · simp · have := mem_zip h exact ⟨Mem.tail _ this.1, Mem.tail _ this.2⟩ #align list.mem_zip List.mem_zip #align list.map_fst_zip List.map_fst_zip #align list.map_snd_zip List.map_snd_zip #align list.unzip_nil List.unzip_nil #align list.unzip_cons List.unzip_cons theorem unzip_eq_map : ∀ l : List (α × β), unzip l = (l.map Prod.fst, l.map Prod.snd) \| [] => rfl \| (a, b) :: l => by simp only [unzip_cons, map_cons, unzip_eq_map l] #align list.unzip_eq_map List.unzip_eq_map theorem unzip_left (l : List (α × β)) : (unzip l).1 = l.map Prod.fst := by simp only [unzip_eq_map] #align list.unzip_left List.unzip_left theorem unzip_right (l : List (α × β)) : (unzip l).2 = l.map Prod.snd := by simp only [unzip_eq_map] #align list.unzip_right List.unzip_right	Mathlib/Data/List/Zip.lean	115	117	theorem unzip_swap (l : List (α × β)) : unzip (l.map Prod.swap) = (unzip l).swap := by	simp only [unzip_eq_map, map_map] rfl
/- Copyright (c) 2022 Scott Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Scott Morrison, Oleksandr Manzyuk -/ import Mathlib.CategoryTheory.Bicategory.Basic import Mathlib.CategoryTheory.Monoidal.Mon_ import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Equalizers #align_import category_theory.monoidal.Bimod from "leanprover-community/mathlib"@"4698e35ca56a0d4fa53aa5639c3364e0a77f4eba" /-! # The category of bimodule objects over a pair of monoid objects. -/ universe v₁ v₂ u₁ u₂ open CategoryTheory open CategoryTheory.MonoidalCategory variable {C : Type u₁} [Category.{v₁} C] [MonoidalCategory.{v₁} C] section open CategoryTheory.Limits variable [HasCoequalizers C] section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] theorem id_tensor_π_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Z ⊗ Y ⟶ W) (wh : (Z ◁ f) ≫ h = (Z ◁ g) ≫ h) : (Z ◁ coequalizer.π f g) ≫ (PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ coequalizer.desc h wh = h := map_π_preserves_coequalizer_inv_desc (tensorLeft Z) f g h wh #align id_tensor_π_preserves_coequalizer_inv_desc id_tensor_π_preserves_coequalizer_inv_desc theorem id_tensor_π_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : Z ⊗ X ⟶ X') (q : Z ⊗ Y ⟶ Y') (wf : (Z ◁ f) ≫ q = p ≫ f') (wg : (Z ◁ g) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) : (Z ◁ coequalizer.π f g) ≫ (PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ colimMap (parallelPairHom (Z ◁ f) (Z ◁ g) f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := map_π_preserves_coequalizer_inv_colimMap_desc (tensorLeft Z) f g f' g' p q wf wg h wh #align id_tensor_π_preserves_coequalizer_inv_colim_map_desc id_tensor_π_preserves_coequalizer_inv_colimMap_desc end section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] theorem π_tensor_id_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Y ⊗ Z ⟶ W) (wh : (f ▷ Z) ≫ h = (g ▷ Z) ≫ h) : (coequalizer.π f g ▷ Z) ≫ (PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ coequalizer.desc h wh = h := map_π_preserves_coequalizer_inv_desc (tensorRight Z) f g h wh #align π_tensor_id_preserves_coequalizer_inv_desc π_tensor_id_preserves_coequalizer_inv_desc theorem π_tensor_id_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⊗ Z ⟶ X') (q : Y ⊗ Z ⟶ Y') (wf : (f ▷ Z) ≫ q = p ≫ f') (wg : (g ▷ Z) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) : (coequalizer.π f g ▷ Z) ≫ (PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ colimMap (parallelPairHom (f ▷ Z) (g ▷ Z) f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := map_π_preserves_coequalizer_inv_colimMap_desc (tensorRight Z) f g f' g' p q wf wg h wh #align π_tensor_id_preserves_coequalizer_inv_colim_map_desc π_tensor_id_preserves_coequalizer_inv_colimMap_desc end end /-- A bimodule object for a pair of monoid objects, all internal to some monoidal category. -/ structure Bimod (A B : Mon_ C) where X : C actLeft : A.X ⊗ X ⟶ X one_actLeft : (A.one ▷ X) ≫ actLeft = (λ_ X).hom := by aesop_cat left_assoc : (A.mul ▷ X) ≫ actLeft = (α_ A.X A.X X).hom ≫ (A.X ◁ actLeft) ≫ actLeft := by aesop_cat actRight : X ⊗ B.X ⟶ X actRight_one : (X ◁ B.one) ≫ actRight = (ρ_ X).hom := by aesop_cat right_assoc : (X ◁ B.mul) ≫ actRight = (α_ X B.X B.X).inv ≫ (actRight ▷ B.X) ≫ actRight := by aesop_cat middle_assoc : (actLeft ▷ B.X) ≫ actRight = (α_ A.X X B.X).hom ≫ (A.X ◁ actRight) ≫ actLeft := by aesop_cat set_option linter.uppercaseLean3 false in #align Bimod Bimod attribute [reassoc (attr := simp)] Bimod.one_actLeft Bimod.actRight_one Bimod.left_assoc Bimod.right_assoc Bimod.middle_assoc namespace Bimod variable {A B : Mon_ C} (M : Bimod A B) /-- A morphism of bimodule objects. -/ @[ext] structure Hom (M N : Bimod A B) where hom : M.X ⟶ N.X left_act_hom : M.actLeft ≫ hom = (A.X ◁ hom) ≫ N.actLeft := by aesop_cat right_act_hom : M.actRight ≫ hom = (hom ▷ B.X) ≫ N.actRight := by aesop_cat set_option linter.uppercaseLean3 false in #align Bimod.hom Bimod.Hom attribute [reassoc (attr := simp)] Hom.left_act_hom Hom.right_act_hom /-- The identity morphism on a bimodule object. -/ @[simps] def id' (M : Bimod A B) : Hom M M where hom := 𝟙 M.X set_option linter.uppercaseLean3 false in #align Bimod.id' Bimod.id' instance homInhabited (M : Bimod A B) : Inhabited (Hom M M) := ⟨id' M⟩ set_option linter.uppercaseLean3 false in #align Bimod.hom_inhabited Bimod.homInhabited /-- Composition of bimodule object morphisms. -/ @[simps] def comp {M N O : Bimod A B} (f : Hom M N) (g : Hom N O) : Hom M O where hom := f.hom ≫ g.hom set_option linter.uppercaseLean3 false in #align Bimod.comp Bimod.comp instance : Category (Bimod A B) where Hom M N := Hom M N id := id' comp f g := comp f g -- Porting note: added because `Hom.ext` is not triggered automatically @[ext] lemma hom_ext {M N : Bimod A B} (f g : M ⟶ N) (h : f.hom = g.hom) : f = g := Hom.ext _ _ h @[simp] theorem id_hom' (M : Bimod A B) : (𝟙 M : Hom M M).hom = 𝟙 M.X := rfl set_option linter.uppercaseLean3 false in #align Bimod.id_hom' Bimod.id_hom' @[simp] theorem comp_hom' {M N K : Bimod A B} (f : M ⟶ N) (g : N ⟶ K) : (f ≫ g : Hom M K).hom = f.hom ≫ g.hom := rfl set_option linter.uppercaseLean3 false in #align Bimod.comp_hom' Bimod.comp_hom' /-- Construct an isomorphism of bimodules by giving an isomorphism between the underlying objects and checking compatibility with left and right actions only in the forward direction. -/ @[simps] def isoOfIso {X Y : Mon_ C} {P Q : Bimod X Y} (f : P.X ≅ Q.X) (f_left_act_hom : P.actLeft ≫ f.hom = (X.X ◁ f.hom) ≫ Q.actLeft) (f_right_act_hom : P.actRight ≫ f.hom = (f.hom ▷ Y.X) ≫ Q.actRight) : P ≅ Q where hom := { hom := f.hom } inv := { hom := f.inv left_act_hom := by rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id, f_left_act_hom, ← Category.assoc, ← MonoidalCategory.whiskerLeft_comp, Iso.inv_hom_id, MonoidalCategory.whiskerLeft_id, Category.id_comp] right_act_hom := by rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id, f_right_act_hom, ← Category.assoc, ← comp_whiskerRight, Iso.inv_hom_id, MonoidalCategory.id_whiskerRight, Category.id_comp] } hom_inv_id := by ext; dsimp; rw [Iso.hom_inv_id] inv_hom_id := by ext; dsimp; rw [Iso.inv_hom_id] set_option linter.uppercaseLean3 false in #align Bimod.iso_of_iso Bimod.isoOfIso variable (A) /-- A monoid object as a bimodule over itself. -/ @[simps] def regular : Bimod A A where X := A.X actLeft := A.mul actRight := A.mul set_option linter.uppercaseLean3 false in #align Bimod.regular Bimod.regular instance : Inhabited (Bimod A A) := ⟨regular A⟩ /-- The forgetful functor from bimodule objects to the ambient category. -/ def forget : Bimod A B ⥤ C where obj A := A.X map f := f.hom set_option linter.uppercaseLean3 false in #align Bimod.forget Bimod.forget open CategoryTheory.Limits variable [HasCoequalizers C] namespace TensorBimod variable {R S T : Mon_ C} (P : Bimod R S) (Q : Bimod S T) /-- The underlying object of the tensor product of two bimodules. -/ noncomputable def X : C := coequalizer (P.actRight ▷ Q.X) ((α_ _ _ _).hom ≫ (P.X ◁ Q.actLeft)) set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.X Bimod.TensorBimod.X section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] /-- Left action for the tensor product of two bimodules. -/ noncomputable def actLeft : R.X ⊗ X P Q ⟶ X P Q := (PreservesCoequalizer.iso (tensorLeft R.X) _ _).inv ≫ colimMap (parallelPairHom _ _ _ _ ((α_ _ _ _).inv ≫ ((α_ _ _ _).inv ▷ _) ≫ (P.actLeft ▷ S.X ▷ Q.X)) ((α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X)) (by dsimp simp only [Category.assoc] slice_lhs 1 2 => rw [associator_inv_naturality_middle] slice_rhs 3 4 => rw [← comp_whiskerRight, middle_assoc, comp_whiskerRight] coherence) (by dsimp slice_lhs 1 1 => rw [MonoidalCategory.whiskerLeft_comp] slice_lhs 2 3 => rw [associator_inv_naturality_right] slice_lhs 3 4 => rw [whisker_exchange] coherence)) set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.act_left Bimod.TensorBimod.actLeft theorem whiskerLeft_π_actLeft : (R.X ◁ coequalizer.π _ _) ≫ actLeft P Q = (α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X) ≫ coequalizer.π _ _ := by erw [map_π_preserves_coequalizer_inv_colimMap (tensorLeft _)] simp only [Category.assoc] set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.id_tensor_π_act_left Bimod.TensorBimod.whiskerLeft_π_actLeft theorem one_act_left' : (R.one ▷ _) ≫ actLeft P Q = (λ_ _).hom := by refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp [X] -- Porting note: had to replace `rw` by `erw` slice_lhs 1 2 => erw [whisker_exchange] slice_lhs 2 3 => rw [whiskerLeft_π_actLeft] slice_lhs 1 2 => rw [associator_inv_naturality_left] slice_lhs 2 3 => rw [← comp_whiskerRight, one_actLeft] slice_rhs 1 2 => rw [leftUnitor_naturality] coherence set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.one_act_left' Bimod.TensorBimod.one_act_left' theorem left_assoc' : (R.mul ▷ _) ≫ actLeft P Q = (α_ R.X R.X _).hom ≫ (R.X ◁ actLeft P Q) ≫ actLeft P Q := by refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp [X] slice_lhs 1 2 => rw [whisker_exchange] slice_lhs 2 3 => rw [whiskerLeft_π_actLeft] slice_lhs 1 2 => rw [associator_inv_naturality_left] slice_lhs 2 3 => rw [← comp_whiskerRight, left_assoc, comp_whiskerRight, comp_whiskerRight] slice_rhs 1 2 => rw [associator_naturality_right] slice_rhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, whiskerLeft_π_actLeft, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 4 5 => rw [whiskerLeft_π_actLeft] slice_rhs 3 4 => rw [associator_inv_naturality_middle] coherence set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.left_assoc' Bimod.TensorBimod.left_assoc' end section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] /-- Right action for the tensor product of two bimodules. -/ noncomputable def actRight : X P Q ⊗ T.X ⟶ X P Q := (PreservesCoequalizer.iso (tensorRight T.X) _ _).inv ≫ colimMap (parallelPairHom _ _ _ _ ((α_ _ _ _).hom ≫ (α_ _ _ _).hom ≫ (P.X ◁ S.X ◁ Q.actRight) ≫ (α_ _ _ _).inv) ((α_ _ _ _).hom ≫ (P.X ◁ Q.actRight)) (by dsimp slice_lhs 1 2 => rw [associator_naturality_left] slice_lhs 2 3 => rw [← whisker_exchange] simp) (by dsimp simp only [comp_whiskerRight, whisker_assoc, Category.assoc, Iso.inv_hom_id_assoc] slice_lhs 3 4 => rw [← MonoidalCategory.whiskerLeft_comp, middle_assoc, MonoidalCategory.whiskerLeft_comp] simp)) set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.act_right Bimod.TensorBimod.actRight theorem π_tensor_id_actRight : (coequalizer.π _ _ ▷ T.X) ≫ actRight P Q = (α_ _ _ _).hom ≫ (P.X ◁ Q.actRight) ≫ coequalizer.π _ _ := by erw [map_π_preserves_coequalizer_inv_colimMap (tensorRight _)] simp only [Category.assoc] set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.π_tensor_id_act_right Bimod.TensorBimod.π_tensor_id_actRight theorem actRight_one' : (_ ◁ T.one) ≫ actRight P Q = (ρ_ _).hom := by refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp [X] -- Porting note: had to replace `rw` by `erw` slice_lhs 1 2 =>erw [← whisker_exchange] slice_lhs 2 3 => rw [π_tensor_id_actRight] slice_lhs 1 2 => rw [associator_naturality_right] slice_lhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, actRight_one] simp set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.act_right_one' Bimod.TensorBimod.actRight_one' theorem right_assoc' : (_ ◁ T.mul) ≫ actRight P Q = (α_ _ T.X T.X).inv ≫ (actRight P Q ▷ T.X) ≫ actRight P Q := by refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp [X] -- Porting note: had to replace some `rw` by `erw` slice_lhs 1 2 => rw [← whisker_exchange] slice_lhs 2 3 => rw [π_tensor_id_actRight] slice_lhs 1 2 => rw [associator_naturality_right] slice_lhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, right_assoc, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 1 2 => rw [associator_inv_naturality_left] slice_rhs 2 3 => rw [← comp_whiskerRight, π_tensor_id_actRight, comp_whiskerRight, comp_whiskerRight] slice_rhs 4 5 => rw [π_tensor_id_actRight] simp set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.right_assoc' Bimod.TensorBimod.right_assoc' end section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] theorem middle_assoc' : (actLeft P Q ▷ T.X) ≫ actRight P Q = (α_ R.X _ T.X).hom ≫ (R.X ◁ actRight P Q) ≫ actLeft P Q := by refine (cancel_epi ((tensorLeft _ ⋙ tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp [X] slice_lhs 1 2 => rw [← comp_whiskerRight, whiskerLeft_π_actLeft, comp_whiskerRight, comp_whiskerRight] slice_lhs 3 4 => rw [π_tensor_id_actRight] slice_lhs 2 3 => rw [associator_naturality_left] -- Porting note: had to replace `rw` by `erw` slice_rhs 1 2 => rw [associator_naturality_middle] slice_rhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, π_tensor_id_actRight, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 4 5 => rw [whiskerLeft_π_actLeft] slice_rhs 3 4 => rw [associator_inv_naturality_right] slice_rhs 4 5 => rw [whisker_exchange] simp set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.middle_assoc' Bimod.TensorBimod.middle_assoc' end end TensorBimod section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] /-- Tensor product of two bimodule objects as a bimodule object. -/ @[simps] noncomputable def tensorBimod {X Y Z : Mon_ C} (M : Bimod X Y) (N : Bimod Y Z) : Bimod X Z where X := TensorBimod.X M N actLeft := TensorBimod.actLeft M N actRight := TensorBimod.actRight M N one_actLeft := TensorBimod.one_act_left' M N actRight_one := TensorBimod.actRight_one' M N left_assoc := TensorBimod.left_assoc' M N right_assoc := TensorBimod.right_assoc' M N middle_assoc := TensorBimod.middle_assoc' M N set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod Bimod.tensorBimod /-- Left whiskering for morphisms of bimodule objects. -/ @[simps] noncomputable def whiskerLeft {X Y Z : Mon_ C} (M : Bimod X Y) {N₁ N₂ : Bimod Y Z} (f : N₁ ⟶ N₂) : M.tensorBimod N₁ ⟶ M.tensorBimod N₂ where hom := colimMap (parallelPairHom _ _ _ _ (_ ◁ f.hom) (_ ◁ f.hom) (by rw [whisker_exchange]) (by simp only [Category.assoc, tensor_whiskerLeft, Iso.inv_hom_id_assoc, Iso.cancel_iso_hom_left] slice_lhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, Hom.left_act_hom] simp)) left_act_hom := by refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp slice_lhs 1 2 => rw [TensorBimod.whiskerLeft_π_actLeft] slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one] slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, ι_colimMap, parallelPairHom_app_one, MonoidalCategory.whiskerLeft_comp] slice_rhs 2 3 => rw [TensorBimod.whiskerLeft_π_actLeft] slice_rhs 1 2 => rw [associator_inv_naturality_right] slice_rhs 2 3 => rw [whisker_exchange] simp right_act_hom := by refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp slice_lhs 1 2 => rw [TensorBimod.π_tensor_id_actRight] slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one] slice_lhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, Hom.right_act_hom] slice_rhs 1 2 => rw [← comp_whiskerRight, ι_colimMap, parallelPairHom_app_one, comp_whiskerRight] slice_rhs 2 3 => rw [TensorBimod.π_tensor_id_actRight] simp /-- Right whiskering for morphisms of bimodule objects. -/ @[simps] noncomputable def whiskerRight {X Y Z : Mon_ C} {M₁ M₂ : Bimod X Y} (f : M₁ ⟶ M₂) (N : Bimod Y Z) : M₁.tensorBimod N ⟶ M₂.tensorBimod N where hom := colimMap (parallelPairHom _ _ _ _ (f.hom ▷ _ ▷ _) (f.hom ▷ _) (by rw [← comp_whiskerRight, Hom.right_act_hom, comp_whiskerRight]) (by slice_lhs 2 3 => rw [whisker_exchange] simp)) left_act_hom := by refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp slice_lhs 1 2 => rw [TensorBimod.whiskerLeft_π_actLeft] slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one] slice_lhs 2 3 => rw [← comp_whiskerRight, Hom.left_act_hom] slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, ι_colimMap, parallelPairHom_app_one, MonoidalCategory.whiskerLeft_comp] slice_rhs 2 3 => rw [TensorBimod.whiskerLeft_π_actLeft] slice_rhs 1 2 => rw [associator_inv_naturality_middle] simp right_act_hom := by refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp slice_lhs 1 2 => rw [TensorBimod.π_tensor_id_actRight] slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one] slice_lhs 2 3 => rw [whisker_exchange] slice_rhs 1 2 => rw [← comp_whiskerRight, ι_colimMap, parallelPairHom_app_one, comp_whiskerRight] slice_rhs 2 3 => rw [TensorBimod.π_tensor_id_actRight] simp end namespace AssociatorBimod variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] variable {R S T U : Mon_ C} (P : Bimod R S) (Q : Bimod S T) (L : Bimod T U) /-- An auxiliary morphism for the definition of the underlying morphism of the forward component of the associator isomorphism. -/ noncomputable def homAux : (P.tensorBimod Q).X ⊗ L.X ⟶ (P.tensorBimod (Q.tensorBimod L)).X := (PreservesCoequalizer.iso (tensorRight L.X) _ _).inv ≫ coequalizer.desc ((α_ _ _ _).hom ≫ (P.X ◁ coequalizer.π _ _) ≫ coequalizer.π _ _) (by dsimp; dsimp [TensorBimod.X] slice_lhs 1 2 => rw [associator_naturality_left] slice_lhs 2 3 => rw [← whisker_exchange] slice_lhs 3 4 => rw [coequalizer.condition] slice_lhs 2 3 => rw [associator_naturality_right] slice_lhs 3 4 => rw [← MonoidalCategory.whiskerLeft_comp, TensorBimod.whiskerLeft_π_actLeft, MonoidalCategory.whiskerLeft_comp] simp) set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.hom_aux Bimod.AssociatorBimod.homAux /-- The underlying morphism of the forward component of the associator isomorphism. -/ noncomputable def hom : ((P.tensorBimod Q).tensorBimod L).X ⟶ (P.tensorBimod (Q.tensorBimod L)).X := coequalizer.desc (homAux P Q L) (by dsimp [homAux] refine (cancel_epi ((tensorRight _ ⋙ tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp [TensorBimod.X] slice_lhs 1 2 => rw [← comp_whiskerRight, TensorBimod.π_tensor_id_actRight, comp_whiskerRight, comp_whiskerRight] slice_lhs 3 5 => rw [π_tensor_id_preserves_coequalizer_inv_desc] slice_lhs 2 3 => rw [associator_naturality_middle] slice_lhs 3 4 => rw [← MonoidalCategory.whiskerLeft_comp, coequalizer.condition, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 1 2 => rw [associator_naturality_left] slice_rhs 2 3 => rw [← whisker_exchange] slice_rhs 3 5 => rw [π_tensor_id_preserves_coequalizer_inv_desc] simp) set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.hom Bimod.AssociatorBimod.hom theorem hom_left_act_hom' : ((P.tensorBimod Q).tensorBimod L).actLeft ≫ hom P Q L = (R.X ◁ hom P Q L) ≫ (P.tensorBimod (Q.tensorBimod L)).actLeft := by dsimp; dsimp [hom, homAux] refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ rw [tensorLeft_map] slice_lhs 1 2 => rw [TensorBimod.whiskerLeft_π_actLeft] slice_lhs 3 4 => rw [coequalizer.π_desc] slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, coequalizer.π_desc, MonoidalCategory.whiskerLeft_comp] refine (cancel_epi ((tensorRight _ ⋙ tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp; dsimp [TensorBimod.X] slice_lhs 1 2 => rw [associator_inv_naturality_middle] slice_lhs 2 3 => rw [← comp_whiskerRight, TensorBimod.whiskerLeft_π_actLeft, comp_whiskerRight, comp_whiskerRight] slice_lhs 4 6 => rw [π_tensor_id_preserves_coequalizer_inv_desc] slice_lhs 3 4 => rw [associator_naturality_left] slice_rhs 1 3 => rw [← MonoidalCategory.whiskerLeft_comp, ← MonoidalCategory.whiskerLeft_comp, π_tensor_id_preserves_coequalizer_inv_desc, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 3 4 => erw [TensorBimod.whiskerLeft_π_actLeft P (Q.tensorBimod L)] slice_rhs 2 3 => erw [associator_inv_naturality_right] slice_rhs 3 4 => erw [whisker_exchange] coherence set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.hom_left_act_hom' Bimod.AssociatorBimod.hom_left_act_hom' theorem hom_right_act_hom' : ((P.tensorBimod Q).tensorBimod L).actRight ≫ hom P Q L = (hom P Q L ▷ U.X) ≫ (P.tensorBimod (Q.tensorBimod L)).actRight := by dsimp; dsimp [hom, homAux] refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_ rw [tensorRight_map] slice_lhs 1 2 => rw [TensorBimod.π_tensor_id_actRight] slice_lhs 3 4 => rw [coequalizer.π_desc] slice_rhs 1 2 => rw [← comp_whiskerRight, coequalizer.π_desc, comp_whiskerRight] refine (cancel_epi ((tensorRight _ ⋙ tensorRight _).map (coequalizer.π _ _))).1 ?_ dsimp; dsimp [TensorBimod.X] slice_lhs 1 2 => rw [associator_naturality_left] slice_lhs 2 3 => rw [← whisker_exchange] slice_lhs 3 5 => rw [π_tensor_id_preserves_coequalizer_inv_desc] slice_lhs 2 3 => rw [associator_naturality_right] slice_rhs 1 3 => rw [← comp_whiskerRight, ← comp_whiskerRight, π_tensor_id_preserves_coequalizer_inv_desc, comp_whiskerRight, comp_whiskerRight] slice_rhs 3 4 => erw [TensorBimod.π_tensor_id_actRight P (Q.tensorBimod L)] slice_rhs 2 3 => erw [associator_naturality_middle] dsimp slice_rhs 3 4 => rw [← MonoidalCategory.whiskerLeft_comp, TensorBimod.π_tensor_id_actRight, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] coherence set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.hom_right_act_hom' Bimod.AssociatorBimod.hom_right_act_hom' /-- An auxiliary morphism for the definition of the underlying morphism of the inverse component of the associator isomorphism. -/ noncomputable def invAux : P.X ⊗ (Q.tensorBimod L).X ⟶ ((P.tensorBimod Q).tensorBimod L).X := (PreservesCoequalizer.iso (tensorLeft P.X) _ _).inv ≫ coequalizer.desc ((α_ _ _ _).inv ≫ (coequalizer.π _ _ ▷ L.X) ≫ coequalizer.π _ _) (by dsimp; dsimp [TensorBimod.X] slice_lhs 1 2 => rw [associator_inv_naturality_middle] rw [← Iso.inv_hom_id_assoc (α_ _ _ _) (P.X ◁ Q.actRight), comp_whiskerRight] slice_lhs 3 4 => rw [← comp_whiskerRight, Category.assoc, ← TensorBimod.π_tensor_id_actRight, comp_whiskerRight] slice_lhs 4 5 => rw [coequalizer.condition] slice_lhs 3 4 => rw [associator_naturality_left] slice_rhs 1 2 => rw [MonoidalCategory.whiskerLeft_comp] slice_rhs 2 3 => rw [associator_inv_naturality_right] slice_rhs 3 4 => rw [whisker_exchange] coherence) set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.inv_aux Bimod.AssociatorBimod.invAux /-- The underlying morphism of the inverse component of the associator isomorphism. -/ noncomputable def inv : (P.tensorBimod (Q.tensorBimod L)).X ⟶ ((P.tensorBimod Q).tensorBimod L).X := coequalizer.desc (invAux P Q L) (by dsimp [invAux] refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp [TensorBimod.X] slice_lhs 1 2 => rw [whisker_exchange] slice_lhs 2 4 => rw [id_tensor_π_preserves_coequalizer_inv_desc] slice_lhs 1 2 => rw [associator_inv_naturality_left] slice_lhs 2 3 => rw [← comp_whiskerRight, coequalizer.condition, comp_whiskerRight, comp_whiskerRight] slice_rhs 1 2 => rw [associator_naturality_right] slice_rhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, TensorBimod.whiskerLeft_π_actLeft, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 4 6 => rw [id_tensor_π_preserves_coequalizer_inv_desc] slice_rhs 3 4 => rw [associator_inv_naturality_middle] coherence) set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.inv Bimod.AssociatorBimod.inv theorem hom_inv_id : hom P Q L ≫ inv P Q L = 𝟙 _ := by dsimp [hom, homAux, inv, invAux] apply coequalizer.hom_ext slice_lhs 1 2 => rw [coequalizer.π_desc] refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_ rw [tensorRight_map] slice_lhs 1 3 => rw [π_tensor_id_preserves_coequalizer_inv_desc] slice_lhs 3 4 => rw [coequalizer.π_desc] slice_lhs 2 4 => rw [id_tensor_π_preserves_coequalizer_inv_desc] slice_lhs 1 3 => rw [Iso.hom_inv_id_assoc] dsimp only [TensorBimod.X] slice_rhs 2 3 => rw [Category.comp_id] rfl set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.hom_inv_id Bimod.AssociatorBimod.hom_inv_id theorem inv_hom_id : inv P Q L ≫ hom P Q L = 𝟙 _ := by dsimp [hom, homAux, inv, invAux] apply coequalizer.hom_ext slice_lhs 1 2 => rw [coequalizer.π_desc] refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ rw [tensorLeft_map] slice_lhs 1 3 => rw [id_tensor_π_preserves_coequalizer_inv_desc] slice_lhs 3 4 => rw [coequalizer.π_desc] slice_lhs 2 4 => rw [π_tensor_id_preserves_coequalizer_inv_desc] slice_lhs 1 3 => rw [Iso.inv_hom_id_assoc] dsimp only [TensorBimod.X] slice_rhs 2 3 => rw [Category.comp_id] rfl set_option linter.uppercaseLean3 false in #align Bimod.associator_Bimod.inv_hom_id Bimod.AssociatorBimod.inv_hom_id end AssociatorBimod namespace LeftUnitorBimod variable {R S : Mon_ C} (P : Bimod R S) /-- The underlying morphism of the forward component of the left unitor isomorphism. -/ noncomputable def hom : TensorBimod.X (regular R) P ⟶ P.X := coequalizer.desc P.actLeft (by dsimp; rw [Category.assoc, left_assoc]) set_option linter.uppercaseLean3 false in #align Bimod.left_unitor_Bimod.hom Bimod.LeftUnitorBimod.hom /-- The underlying morphism of the inverse component of the left unitor isomorphism. -/ noncomputable def inv : P.X ⟶ TensorBimod.X (regular R) P := (λ_ P.X).inv ≫ (R.one ▷ _) ≫ coequalizer.π _ _ set_option linter.uppercaseLean3 false in #align Bimod.left_unitor_Bimod.inv Bimod.LeftUnitorBimod.inv theorem hom_inv_id : hom P ≫ inv P = 𝟙 _ := by dsimp only [hom, inv, TensorBimod.X] ext; dsimp slice_lhs 1 2 => rw [coequalizer.π_desc] slice_lhs 1 2 => rw [leftUnitor_inv_naturality] slice_lhs 2 3 => rw [whisker_exchange] slice_lhs 3 3 => rw [← Iso.inv_hom_id_assoc (α_ R.X R.X P.X) (R.X ◁ P.actLeft)] slice_lhs 4 6 => rw [← Category.assoc, ← coequalizer.condition] slice_lhs 2 3 => rw [associator_inv_naturality_left] slice_lhs 3 4 => rw [← comp_whiskerRight, Mon_.one_mul] slice_rhs 1 2 => rw [Category.comp_id] coherence set_option linter.uppercaseLean3 false in #align Bimod.left_unitor_Bimod.hom_inv_id Bimod.LeftUnitorBimod.hom_inv_id theorem inv_hom_id : inv P ≫ hom P = 𝟙 _ := by dsimp [hom, inv] slice_lhs 3 4 => rw [coequalizer.π_desc] rw [one_actLeft, Iso.inv_hom_id] set_option linter.uppercaseLean3 false in #align Bimod.left_unitor_Bimod.inv_hom_id Bimod.LeftUnitorBimod.inv_hom_id variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]	Mathlib/CategoryTheory/Monoidal/Bimod.lean	690	698	theorem hom_left_act_hom' : ((regular R).tensorBimod P).actLeft ≫ hom P = (R.X ◁ hom P) ≫ P.actLeft := by	dsimp; dsimp [hom, TensorBimod.actLeft, regular] refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp slice_lhs 1 4 => rw [id_tensor_π_preserves_coequalizer_inv_colimMap_desc] slice_lhs 2 3 => rw [left_assoc] slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, coequalizer.π_desc] rw [Iso.inv_hom_id_assoc]
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Yaël Dillies -/ import Mathlib.Order.CompleteLattice import Mathlib.Order.Directed import Mathlib.Logic.Equiv.Set #align_import order.complete_boolean_algebra from "leanprover-community/mathlib"@"71b36b6f3bbe3b44e6538673819324d3ee9fcc96" /-! # Frames, completely distributive lattices and complete Boolean algebras In this file we define and provide API for (co)frames, completely distributive lattices and complete Boolean algebras. We distinguish two different distributivity properties: 1. `inf_iSup_eq : (a ⊓ ⨆ i, f i) = ⨆ i, a ⊓ f i` (finite `⊓` distributes over infinite `⨆`). This is required by `Frame`, `CompleteDistribLattice`, and `CompleteBooleanAlgebra` (`Coframe`, etc., require the dual property). 2. `iInf_iSup_eq : (⨅ i, ⨆ j, f i j) = ⨆ s, ⨅ i, f i (s i)` (infinite `⨅` distributes over infinite `⨆`). This stronger property is called "completely distributive", and is required by `CompletelyDistribLattice` and `CompleteAtomicBooleanAlgebra`. ## Typeclasses * `Order.Frame`: Frame: A complete lattice whose `⊓` distributes over `⨆`. * `Order.Coframe`: Coframe: A complete lattice whose `⊔` distributes over `⨅`. * `CompleteDistribLattice`: Complete distributive lattices: A complete lattice whose `⊓` and `⊔` distribute over `⨆` and `⨅` respectively. * `CompleteBooleanAlgebra`: Complete Boolean algebra: A Boolean algebra whose `⊓` and `⊔` distribute over `⨆` and `⨅` respectively. * `CompletelyDistribLattice`: Completely distributive lattices: A complete lattice whose `⨅` and `⨆` satisfy `iInf_iSup_eq`. * `CompleteBooleanAlgebra`: Complete Boolean algebra: A Boolean algebra whose `⊓` and `⊔` distribute over `⨆` and `⨅` respectively. * `CompleteAtomicBooleanAlgebra`: Complete atomic Boolean algebra: A complete Boolean algebra which is additionally completely distributive. (This implies that it's (co)atom(ist)ic.) A set of opens gives rise to a topological space precisely if it forms a frame. Such a frame is also completely distributive, but not all frames are. `Filter` is a coframe but not a completely distributive lattice. ## References * [Wikipedia, Complete Heyting algebra](https://en.wikipedia.org/wiki/Complete_Heyting_algebra) * [Francis Borceux, Handbook of Categorical Algebra III][borceux-vol3] -/ set_option autoImplicit true open Function Set universe u v w variable {α : Type u} {β : Type v} {ι : Sort w} {κ : ι → Sort w'} /-- A frame, aka complete Heyting algebra, is a complete lattice whose `⊓` distributes over `⨆`. -/ class Order.Frame (α : Type) extends CompleteLattice α where /-- `⊓` distributes over `⨆`. -/ inf_sSup_le_iSup_inf (a : α) (s : Set α) : a ⊓ sSup s ≤ ⨆ b ∈ s, a ⊓ b #align order.frame Order.Frame /-- A coframe, aka complete Brouwer algebra or complete co-Heyting algebra, is a complete lattice whose `⊔` distributes over `⨅`. -/ class Order.Coframe (α : Type) extends CompleteLattice α where /-- `⊔` distributes over `⨅`. -/ iInf_sup_le_sup_sInf (a : α) (s : Set α) : ⨅ b ∈ s, a ⊔ b ≤ a ⊔ sInf s #align order.coframe Order.Coframe open Order /-- A complete distributive lattice is a complete lattice whose `⊔` and `⊓` respectively distribute over `⨅` and `⨆`. -/ class CompleteDistribLattice (α : Type*) extends Frame α, Coframe α #align complete_distrib_lattice CompleteDistribLattice /-- In a complete distributive lattice, `⊔` distributes over `⨅`. -/ add_decl_doc CompleteDistribLattice.iInf_sup_le_sup_sInf /-- A completely distributive lattice is a complete lattice whose `⨅` and `⨆` distribute over each other. -/ class CompletelyDistribLattice (α : Type u) extends CompleteLattice α where protected iInf_iSup_eq {ι : Type u} {κ : ι → Type u} (f : ∀ a, κ a → α) : (⨅ a, ⨆ b, f a b) = ⨆ g : ∀ a, κ a, ⨅ a, f a (g a) theorem le_iInf_iSup [CompleteLattice α] {f : ∀ a, κ a → α} : (⨆ g : ∀ a, κ a, ⨅ a, f a (g a)) ≤ ⨅ a, ⨆ b, f a b := iSup_le fun _ => le_iInf fun a => le_trans (iInf_le _ a) (le_iSup _ _)	Mathlib/Order/CompleteBooleanAlgebra.lean	95	104	theorem iInf_iSup_eq [CompletelyDistribLattice α] {f : ∀ a, κ a → α} : (⨅ a, ⨆ b, f a b) = ⨆ g : ∀ a, κ a, ⨅ a, f a (g a) := (le_antisymm · le_iInf_iSup) <\| calc _ = ⨅ a : range (range <\| f ·), ⨆ b : a.1, b.1 := by	simp_rw [iInf_subtype, iInf_range, iSup_subtype, iSup_range] _ = _ := CompletelyDistribLattice.iInf_iSup_eq _ _ ≤ _ := iSup_le fun g => by refine le_trans ?_ <\| le_iSup _ fun a => Classical.choose (g ⟨_, a, rfl⟩).2 refine le_iInf fun a => le_trans (iInf_le _ ⟨range (f a), a, rfl⟩) ?_ rw [← Classical.choose_spec (g ⟨_, a, rfl⟩).2]
/- Copyright (c) 2021 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.Algebra.MvPolynomial.Equiv import Mathlib.Algebra.MvPolynomial.Supported import Mathlib.LinearAlgebra.LinearIndependent import Mathlib.RingTheory.Adjoin.Basic import Mathlib.RingTheory.Algebraic import Mathlib.RingTheory.MvPolynomial.Basic #align_import ring_theory.algebraic_independent from "leanprover-community/mathlib"@"949dc57e616a621462062668c9f39e4e17b64b69" /-! # Algebraic Independence This file defines algebraic independence of a family of element of an `R` algebra. ## Main definitions * `AlgebraicIndependent` - `AlgebraicIndependent R x` states the family of elements `x` is algebraically independent over `R`, meaning that the canonical map out of the multivariable polynomial ring is injective. * `AlgebraicIndependent.repr` - The canonical map from the subalgebra generated by an algebraic independent family into the polynomial ring. ## References * [Stacks: Transcendence](https://stacks.math.columbia.edu/tag/030D) ## TODO Define the transcendence degree and show it is independent of the choice of a transcendence basis. ## Tags transcendence basis, transcendence degree, transcendence -/ noncomputable section open Function Set Subalgebra MvPolynomial Algebra open scoped Classical universe x u v w variable {ι : Type} {ι' : Type} (R : Type) {K : Type} variable {A : Type} {A' A'' : Type} {V : Type u} {V' : Type*} variable (x : ι → A) variable [CommRing R] [CommRing A] [CommRing A'] [CommRing A''] variable [Algebra R A] [Algebra R A'] [Algebra R A''] variable {a b : R} /-- `AlgebraicIndependent R x` states the family of elements `x` is algebraically independent over `R`, meaning that the canonical map out of the multivariable polynomial ring is injective. -/ def AlgebraicIndependent : Prop := Injective (MvPolynomial.aeval x : MvPolynomial ι R →ₐ[R] A) #align algebraic_independent AlgebraicIndependent variable {R} {x} theorem algebraicIndependent_iff_ker_eq_bot : AlgebraicIndependent R x ↔ RingHom.ker (MvPolynomial.aeval x : MvPolynomial ι R →ₐ[R] A).toRingHom = ⊥ := RingHom.injective_iff_ker_eq_bot _ #align algebraic_independent_iff_ker_eq_bot algebraicIndependent_iff_ker_eq_bot theorem algebraicIndependent_iff : AlgebraicIndependent R x ↔ ∀ p : MvPolynomial ι R, MvPolynomial.aeval (x : ι → A) p = 0 → p = 0 := injective_iff_map_eq_zero _ #align algebraic_independent_iff algebraicIndependent_iff theorem AlgebraicIndependent.eq_zero_of_aeval_eq_zero (h : AlgebraicIndependent R x) : ∀ p : MvPolynomial ι R, MvPolynomial.aeval (x : ι → A) p = 0 → p = 0 := algebraicIndependent_iff.1 h #align algebraic_independent.eq_zero_of_aeval_eq_zero AlgebraicIndependent.eq_zero_of_aeval_eq_zero theorem algebraicIndependent_iff_injective_aeval : AlgebraicIndependent R x ↔ Injective (MvPolynomial.aeval x : MvPolynomial ι R →ₐ[R] A) := Iff.rfl #align algebraic_independent_iff_injective_aeval algebraicIndependent_iff_injective_aeval @[simp] theorem algebraicIndependent_empty_type_iff [IsEmpty ι] : AlgebraicIndependent R x ↔ Injective (algebraMap R A) := by have : aeval x = (Algebra.ofId R A).comp (@isEmptyAlgEquiv R ι _ _).toAlgHom := by ext i exact IsEmpty.elim' ‹IsEmpty ι› i rw [AlgebraicIndependent, this, ← Injective.of_comp_iff' _ (@isEmptyAlgEquiv R ι _ _).bijective] rfl #align algebraic_independent_empty_type_iff algebraicIndependent_empty_type_iff namespace AlgebraicIndependent variable (hx : AlgebraicIndependent R x) theorem algebraMap_injective : Injective (algebraMap R A) := by simpa [Function.comp] using (Injective.of_comp_iff (algebraicIndependent_iff_injective_aeval.1 hx) MvPolynomial.C).2 (MvPolynomial.C_injective _ _) #align algebraic_independent.algebra_map_injective AlgebraicIndependent.algebraMap_injective theorem linearIndependent : LinearIndependent R x := by rw [linearIndependent_iff_injective_total] have : Finsupp.total ι A R x = (MvPolynomial.aeval x).toLinearMap.comp (Finsupp.total ι _ R X) := by ext simp rw [this] refine hx.comp ?_ rw [← linearIndependent_iff_injective_total] exact linearIndependent_X _ _ #align algebraic_independent.linear_independent AlgebraicIndependent.linearIndependent protected theorem injective [Nontrivial R] : Injective x := hx.linearIndependent.injective #align algebraic_independent.injective AlgebraicIndependent.injective theorem ne_zero [Nontrivial R] (i : ι) : x i ≠ 0 := hx.linearIndependent.ne_zero i #align algebraic_independent.ne_zero AlgebraicIndependent.ne_zero	Mathlib/RingTheory/AlgebraicIndependent.lean	129	131	theorem comp (f : ι' → ι) (hf : Function.Injective f) : AlgebraicIndependent R (x ∘ f) := by	intro p q simpa [aeval_rename, (rename_injective f hf).eq_iff] using @hx (rename f p) (rename f q)
/- Copyright (c) 2023 Alex Keizer. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alex Keizer -/ import Mathlib.Data.Vector.Basic import Mathlib.Data.Vector.Snoc /-! This file establishes a set of normalization lemmas for `map`/`mapAccumr` operations on vectors -/ set_option autoImplicit true namespace Vector /-! ## Fold nested `mapAccumr`s into one -/ section Fold section Unary variable (xs : Vector α n) (f₁ : β → σ₁ → σ₁ × γ) (f₂ : α → σ₂ → σ₂ × β) @[simp] theorem mapAccumr_mapAccumr : mapAccumr f₁ (mapAccumr f₂ xs s₂).snd s₁ = let m := (mapAccumr (fun x s => let r₂ := f₂ x s.snd let r₁ := f₁ r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs using Vector.revInductionOn generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr_map (f₂ : α → β) : (mapAccumr f₁ (map f₂ xs) s) = (mapAccumr (fun x s => f₁ (f₂ x) s) xs s) := by induction xs using Vector.revInductionOn generalizing s <;> simp_all @[simp] theorem map_mapAccumr (f₁ : β → γ) : (map f₁ (mapAccumr f₂ xs s).snd) = (mapAccumr (fun x s => let r := (f₂ x s); (r.fst, f₁ r.snd) ) xs s).snd := by induction xs using Vector.revInductionOn generalizing s <;> simp_all @[simp] theorem map_map (f₁ : β → γ) (f₂ : α → β) : map f₁ (map f₂ xs) = map (fun x => f₁ <\| f₂ x) xs := by induction xs <;> simp_all end Unary section Binary variable (xs : Vector α n) (ys : Vector β n) @[simp] theorem mapAccumr₂_mapAccumr_left (f₁ : γ → β → σ₁ → σ₁ × ζ) (f₂ : α → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr f₂ xs s₂).snd ys s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ x s.snd let r₁ := f₁ r₂.snd y s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_left (f₁ : γ → β → ζ) (f₂ : α → γ) : map₂ f₁ (map f₂ xs) ys = map₂ (fun x y => f₁ (f₂ x) y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr_right (f₁ : α → γ → σ₁ → σ₁ × ζ) (f₂ : β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ xs (mapAccumr f₂ ys s₂).snd s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ y s.snd let r₁ := f₁ x r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_right (f₁ : α → γ → ζ) (f₂ : β → γ) : map₂ f₁ xs (map f₂ ys) = map₂ (fun x y => f₁ x (f₂ y)) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr_mapAccumr₂ (f₁ : γ → σ₁ → σ₁ × ζ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr f₁ (mapAccumr₂ f₂ xs ys s₂).snd s₁) = let m := mapAccumr₂ (fun x y s => let r₂ := f₂ x y s.snd let r₁ := f₁ r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map_map₂ (f₁ : γ → ζ) (f₂ : α → β → γ) : map f₁ (map₂ f₂ xs ys) = map₂ (fun x y => f₁ <\| f₂ x y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_left_left (f₁ : γ → α → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr₂ f₂ xs ys s₂).snd xs s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) => let r₂ := f₂ x y s₂ let r₁ := f₁ r₂.snd x s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_left_right (f₁ : γ → β → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr₂ f₂ xs ys s₂).snd ys s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) => let r₂ := f₂ x y s₂ let r₁ := f₁ r₂.snd y s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_right_left (f₁ : α → γ → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ xs (mapAccumr₂ f₂ xs ys s₂).snd s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) => let r₂ := f₂ x y s₂ let r₁ := f₁ x r₂.snd s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_right_right (f₁ : β → γ → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ ys (mapAccumr₂ f₂ xs ys s₂).snd s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) => let r₂ := f₂ x y s₂ let r₁ := f₁ y r₂.snd s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all end Binary end Fold /-! ## Bisimulations We can prove two applications of `mapAccumr` equal by providing a bisimulation relation that relates the initial states. That is, by providing a relation `R : σ₁ → σ₁ → Prop` such that `R s₁ s₂` implies that `R` also relates any pair of states reachable by applying `f₁` to `s₁` and `f₂` to `s₂`, with any possible input values. -/ section Bisim variable {xs : Vector α n} theorem mapAccumr_bisim {f₁ : α → σ₁ → σ₁ × β} {f₂ : α → σ₂ → σ₂ × β} {s₁ : σ₁} {s₂ : σ₂} (R : σ₁ → σ₂ → Prop) (h₀ : R s₁ s₂) (hR : ∀ {s q} a, R s q → R (f₁ a s).1 (f₂ a q).1 ∧ (f₁ a s).2 = (f₂ a q).2) : R (mapAccumr f₁ xs s₁).fst (mapAccumr f₂ xs s₂).fst ∧ (mapAccumr f₁ xs s₁).snd = (mapAccumr f₂ xs s₂).snd := by induction xs using Vector.revInductionOn generalizing s₁ s₂ next => exact ⟨h₀, rfl⟩ next xs x ih => rcases (hR x h₀) with ⟨hR, _⟩ simp only [mapAccumr_snoc, ih hR, true_and] congr 1	Mathlib/Data/Vector/MapLemmas.lean	185	190	theorem mapAccumr_bisim_tail {f₁ : α → σ₁ → σ₁ × β} {f₂ : α → σ₂ → σ₂ × β} {s₁ : σ₁} {s₂ : σ₂} (h : ∃ R : σ₁ → σ₂ → Prop, R s₁ s₂ ∧ ∀ {s q} a, R s q → R (f₁ a s).1 (f₂ a q).1 ∧ (f₁ a s).2 = (f₂ a q).2) : (mapAccumr f₁ xs s₁).snd = (mapAccumr f₂ xs s₂).snd := by	rcases h with ⟨R, h₀, hR⟩ exact (mapAccumr_bisim R h₀ hR).2
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.Algebra.Ring.Prod import Mathlib.GroupTheory.OrderOfElement import Mathlib.Tactic.FinCases #align_import data.zmod.basic from "leanprover-community/mathlib"@"74ad1c88c77e799d2fea62801d1dbbd698cff1b7" /-! # Integers mod `n` Definition of the integers mod n, and the field structure on the integers mod p. ## Definitions * `ZMod n`, which is for integers modulo a nat `n : ℕ` * `val a` is defined as a natural number: - for `a : ZMod 0` it is the absolute value of `a` - for `a : ZMod n` with `0 < n` it is the least natural number in the equivalence class * `valMinAbs` returns the integer closest to zero in the equivalence class. * A coercion `cast` is defined from `ZMod n` into any ring. This is a ring hom if the ring has characteristic dividing `n` -/ assert_not_exists Submodule open Function namespace ZMod instance charZero : CharZero (ZMod 0) := inferInstanceAs (CharZero ℤ) /-- `val a` is a natural number defined as: - for `a : ZMod 0` it is the absolute value of `a` - for `a : ZMod n` with `0 < n` it is the least natural number in the equivalence class See `ZMod.valMinAbs` for a variant that takes values in the integers. -/ def val : ∀ {n : ℕ}, ZMod n → ℕ \| 0 => Int.natAbs \| n + 1 => ((↑) : Fin (n + 1) → ℕ) #align zmod.val ZMod.val theorem val_lt {n : ℕ} [NeZero n] (a : ZMod n) : a.val < n := by cases n · cases NeZero.ne 0 rfl exact Fin.is_lt a #align zmod.val_lt ZMod.val_lt theorem val_le {n : ℕ} [NeZero n] (a : ZMod n) : a.val ≤ n := a.val_lt.le #align zmod.val_le ZMod.val_le @[simp] theorem val_zero : ∀ {n}, (0 : ZMod n).val = 0 \| 0 => rfl \| _ + 1 => rfl #align zmod.val_zero ZMod.val_zero @[simp] theorem val_one' : (1 : ZMod 0).val = 1 := rfl #align zmod.val_one' ZMod.val_one' @[simp] theorem val_neg' {n : ZMod 0} : (-n).val = n.val := Int.natAbs_neg n #align zmod.val_neg' ZMod.val_neg' @[simp] theorem val_mul' {m n : ZMod 0} : (m * n).val = m.val * n.val := Int.natAbs_mul m n #align zmod.val_mul' ZMod.val_mul' @[simp] theorem val_natCast {n : ℕ} (a : ℕ) : (a : ZMod n).val = a % n := by cases n · rw [Nat.mod_zero] exact Int.natAbs_ofNat a · apply Fin.val_natCast #align zmod.val_nat_cast ZMod.val_natCast @[deprecated (since := "2024-04-17")] alias val_nat_cast := val_natCast theorem val_unit' {n : ZMod 0} : IsUnit n ↔ n.val = 1 := by simp only [val] rw [Int.isUnit_iff, Int.natAbs_eq_iff, Nat.cast_one] lemma eq_one_of_isUnit_natCast {n : ℕ} (h : IsUnit (n : ZMod 0)) : n = 1 := by rw [← Nat.mod_zero n, ← val_natCast, val_unit'.mp h] theorem val_natCast_of_lt {n a : ℕ} (h : a < n) : (a : ZMod n).val = a := by rwa [val_natCast, Nat.mod_eq_of_lt] @[deprecated (since := "2024-04-17")] alias val_nat_cast_of_lt := val_natCast_of_lt instance charP (n : ℕ) : CharP (ZMod n) n where cast_eq_zero_iff' := by intro k cases' n with n · simp [zero_dvd_iff, Int.natCast_eq_zero, Nat.zero_eq] · exact Fin.natCast_eq_zero @[simp] theorem addOrderOf_one (n : ℕ) : addOrderOf (1 : ZMod n) = n := CharP.eq _ (CharP.addOrderOf_one _) (ZMod.charP n) #align zmod.add_order_of_one ZMod.addOrderOf_one /-- This lemma works in the case in which `ZMod n` is not infinite, i.e. `n ≠ 0`. The version where `a ≠ 0` is `addOrderOf_coe'`. -/ @[simp] theorem addOrderOf_coe (a : ℕ) {n : ℕ} (n0 : n ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by cases' a with a · simp only [Nat.zero_eq, Nat.cast_zero, addOrderOf_zero, Nat.gcd_zero_right, Nat.pos_of_ne_zero n0, Nat.div_self] rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a.succ_ne_zero, ZMod.addOrderOf_one] #align zmod.add_order_of_coe ZMod.addOrderOf_coe /-- This lemma works in the case in which `a ≠ 0`. The version where `ZMod n` is not infinite, i.e. `n ≠ 0`, is `addOrderOf_coe`. -/ @[simp] theorem addOrderOf_coe' {a : ℕ} (n : ℕ) (a0 : a ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a0, ZMod.addOrderOf_one] #align zmod.add_order_of_coe' ZMod.addOrderOf_coe' /-- We have that `ringChar (ZMod n) = n`. -/ theorem ringChar_zmod_n (n : ℕ) : ringChar (ZMod n) = n := by rw [ringChar.eq_iff] exact ZMod.charP n #align zmod.ring_char_zmod_n ZMod.ringChar_zmod_n -- @[simp] -- Porting note (#10618): simp can prove this theorem natCast_self (n : ℕ) : (n : ZMod n) = 0 := CharP.cast_eq_zero (ZMod n) n #align zmod.nat_cast_self ZMod.natCast_self @[deprecated (since := "2024-04-17")] alias nat_cast_self := natCast_self @[simp] theorem natCast_self' (n : ℕ) : (n + 1 : ZMod (n + 1)) = 0 := by rw [← Nat.cast_add_one, natCast_self (n + 1)] #align zmod.nat_cast_self' ZMod.natCast_self' @[deprecated (since := "2024-04-17")] alias nat_cast_self' := natCast_self' section UniversalProperty variable {n : ℕ} {R : Type} section variable [AddGroupWithOne R] /-- Cast an integer modulo `n` to another semiring. This function is a morphism if the characteristic of `R` divides `n`. See `ZMod.castHom` for a bundled version. -/ def cast : ∀ {n : ℕ}, ZMod n → R \| 0 => Int.cast \| _ + 1 => fun i => i.val #align zmod.cast ZMod.cast @[simp] theorem cast_zero : (cast (0 : ZMod n) : R) = 0 := by delta ZMod.cast cases n · exact Int.cast_zero · simp #align zmod.cast_zero ZMod.cast_zero theorem cast_eq_val [NeZero n] (a : ZMod n) : (cast a : R) = a.val := by cases n · cases NeZero.ne 0 rfl rfl #align zmod.cast_eq_val ZMod.cast_eq_val variable {S : Type} [AddGroupWithOne S] @[simp] theorem _root_.Prod.fst_zmod_cast (a : ZMod n) : (cast a : R × S).fst = cast a := by cases n · rfl · simp [ZMod.cast] #align prod.fst_zmod_cast Prod.fst_zmod_cast @[simp] theorem _root_.Prod.snd_zmod_cast (a : ZMod n) : (cast a : R × S).snd = cast a := by cases n · rfl · simp [ZMod.cast] #align prod.snd_zmod_cast Prod.snd_zmod_cast end /-- So-named because the coercion is `Nat.cast` into `ZMod`. For `Nat.cast` into an arbitrary ring, see `ZMod.natCast_val`. -/ theorem natCast_zmod_val {n : ℕ} [NeZero n] (a : ZMod n) : (a.val : ZMod n) = a := by cases n · cases NeZero.ne 0 rfl · apply Fin.cast_val_eq_self #align zmod.nat_cast_zmod_val ZMod.natCast_zmod_val @[deprecated (since := "2024-04-17")] alias nat_cast_zmod_val := natCast_zmod_val theorem natCast_rightInverse [NeZero n] : Function.RightInverse val ((↑) : ℕ → ZMod n) := natCast_zmod_val #align zmod.nat_cast_right_inverse ZMod.natCast_rightInverse @[deprecated (since := "2024-04-17")] alias nat_cast_rightInverse := natCast_rightInverse theorem natCast_zmod_surjective [NeZero n] : Function.Surjective ((↑) : ℕ → ZMod n) := natCast_rightInverse.surjective #align zmod.nat_cast_zmod_surjective ZMod.natCast_zmod_surjective @[deprecated (since := "2024-04-17")] alias nat_cast_zmod_surjective := natCast_zmod_surjective /-- So-named because the outer coercion is `Int.cast` into `ZMod`. For `Int.cast` into an arbitrary ring, see `ZMod.intCast_cast`. -/ @[norm_cast] theorem intCast_zmod_cast (a : ZMod n) : ((cast a : ℤ) : ZMod n) = a := by cases n · simp [ZMod.cast, ZMod] · dsimp [ZMod.cast, ZMod] erw [Int.cast_natCast, Fin.cast_val_eq_self] #align zmod.int_cast_zmod_cast ZMod.intCast_zmod_cast @[deprecated (since := "2024-04-17")] alias int_cast_zmod_cast := intCast_zmod_cast theorem intCast_rightInverse : Function.RightInverse (cast : ZMod n → ℤ) ((↑) : ℤ → ZMod n) := intCast_zmod_cast #align zmod.int_cast_right_inverse ZMod.intCast_rightInverse @[deprecated (since := "2024-04-17")] alias int_cast_rightInverse := intCast_rightInverse theorem intCast_surjective : Function.Surjective ((↑) : ℤ → ZMod n) := intCast_rightInverse.surjective #align zmod.int_cast_surjective ZMod.intCast_surjective @[deprecated (since := "2024-04-17")] alias int_cast_surjective := intCast_surjective theorem cast_id : ∀ (n) (i : ZMod n), (ZMod.cast i : ZMod n) = i \| 0, _ => Int.cast_id \| _ + 1, i => natCast_zmod_val i #align zmod.cast_id ZMod.cast_id @[simp] theorem cast_id' : (ZMod.cast : ZMod n → ZMod n) = id := funext (cast_id n) #align zmod.cast_id' ZMod.cast_id' variable (R) [Ring R] /-- The coercions are respectively `Nat.cast` and `ZMod.cast`. -/ @[simp] theorem natCast_comp_val [NeZero n] : ((↑) : ℕ → R) ∘ (val : ZMod n → ℕ) = cast := by cases n · cases NeZero.ne 0 rfl rfl #align zmod.nat_cast_comp_val ZMod.natCast_comp_val @[deprecated (since := "2024-04-17")] alias nat_cast_comp_val := natCast_comp_val /-- The coercions are respectively `Int.cast`, `ZMod.cast`, and `ZMod.cast`. -/ @[simp] theorem intCast_comp_cast : ((↑) : ℤ → R) ∘ (cast : ZMod n → ℤ) = cast := by cases n · exact congr_arg (Int.cast ∘ ·) ZMod.cast_id' · ext simp [ZMod, ZMod.cast] #align zmod.int_cast_comp_cast ZMod.intCast_comp_cast @[deprecated (since := "2024-04-17")] alias int_cast_comp_cast := intCast_comp_cast variable {R} @[simp] theorem natCast_val [NeZero n] (i : ZMod n) : (i.val : R) = cast i := congr_fun (natCast_comp_val R) i #align zmod.nat_cast_val ZMod.natCast_val @[deprecated (since := "2024-04-17")] alias nat_cast_val := natCast_val @[simp] theorem intCast_cast (i : ZMod n) : ((cast i : ℤ) : R) = cast i := congr_fun (intCast_comp_cast R) i #align zmod.int_cast_cast ZMod.intCast_cast @[deprecated (since := "2024-04-17")] alias int_cast_cast := intCast_cast theorem cast_add_eq_ite {n : ℕ} (a b : ZMod n) : (cast (a + b) : ℤ) = if (n : ℤ) ≤ cast a + cast b then (cast a + cast b - n : ℤ) else cast a + cast b := by cases' n with n · simp; rfl change Fin (n + 1) at a b change ((((a + b) : Fin (n + 1)) : ℕ) : ℤ) = if ((n + 1 : ℕ) : ℤ) ≤ (a : ℕ) + b then _ else _ simp only [Fin.val_add_eq_ite, Int.ofNat_succ, Int.ofNat_le] norm_cast split_ifs with h · rw [Nat.cast_sub h] congr · rfl #align zmod.coe_add_eq_ite ZMod.cast_add_eq_ite section CharDvd /-! If the characteristic of `R` divides `n`, then `cast` is a homomorphism. -/ variable {m : ℕ} [CharP R m] @[simp] theorem cast_one (h : m ∣ n) : (cast (1 : ZMod n) : R) = 1 := by cases' n with n · exact Int.cast_one show ((1 % (n + 1) : ℕ) : R) = 1 cases n; · rw [Nat.dvd_one] at h subst m have : Subsingleton R := CharP.CharOne.subsingleton apply Subsingleton.elim rw [Nat.mod_eq_of_lt] · exact Nat.cast_one exact Nat.lt_of_sub_eq_succ rfl #align zmod.cast_one ZMod.cast_one theorem cast_add (h : m ∣ n) (a b : ZMod n) : (cast (a + b : ZMod n) : R) = cast a + cast b := by cases n · apply Int.cast_add symm dsimp [ZMod, ZMod.cast] erw [← Nat.cast_add, ← sub_eq_zero, ← Nat.cast_sub (Nat.mod_le _ _), @CharP.cast_eq_zero_iff R _ m] exact h.trans (Nat.dvd_sub_mod _) #align zmod.cast_add ZMod.cast_add theorem cast_mul (h : m ∣ n) (a b : ZMod n) : (cast (a * b : ZMod n) : R) = cast a * cast b := by cases n · apply Int.cast_mul symm dsimp [ZMod, ZMod.cast] erw [← Nat.cast_mul, ← sub_eq_zero, ← Nat.cast_sub (Nat.mod_le _ _), @CharP.cast_eq_zero_iff R _ m] exact h.trans (Nat.dvd_sub_mod _) #align zmod.cast_mul ZMod.cast_mul /-- The canonical ring homomorphism from `ZMod n` to a ring of characteristic dividing `n`. See also `ZMod.lift` for a generalized version working in `AddGroup`s. -/ def castHom (h : m ∣ n) (R : Type) [Ring R] [CharP R m] : ZMod n →+ R where toFun := cast map_zero' := cast_zero map_one' := cast_one h map_add' := cast_add h map_mul' := cast_mul h #align zmod.cast_hom ZMod.castHom @[simp] theorem castHom_apply {h : m ∣ n} (i : ZMod n) : castHom h R i = cast i := rfl #align zmod.cast_hom_apply ZMod.castHom_apply @[simp] theorem cast_sub (h : m ∣ n) (a b : ZMod n) : (cast (a - b : ZMod n) : R) = cast a - cast b := (castHom h R).map_sub a b #align zmod.cast_sub ZMod.cast_sub @[simp] theorem cast_neg (h : m ∣ n) (a : ZMod n) : (cast (-a : ZMod n) : R) = -(cast a) := (castHom h R).map_neg a #align zmod.cast_neg ZMod.cast_neg @[simp] theorem cast_pow (h : m ∣ n) (a : ZMod n) (k : ℕ) : (cast (a ^ k : ZMod n) : R) = (cast a) ^ k := (castHom h R).map_pow a k #align zmod.cast_pow ZMod.cast_pow @[simp, norm_cast] theorem cast_natCast (h : m ∣ n) (k : ℕ) : (cast (k : ZMod n) : R) = k := map_natCast (castHom h R) k #align zmod.cast_nat_cast ZMod.cast_natCast @[deprecated (since := "2024-04-17")] alias cast_nat_cast := cast_natCast @[simp, norm_cast] theorem cast_intCast (h : m ∣ n) (k : ℤ) : (cast (k : ZMod n) : R) = k := map_intCast (castHom h R) k #align zmod.cast_int_cast ZMod.cast_intCast @[deprecated (since := "2024-04-17")] alias cast_int_cast := cast_intCast end CharDvd section CharEq /-! Some specialised simp lemmas which apply when `R` has characteristic `n`. -/ variable [CharP R n] @[simp] theorem cast_one' : (cast (1 : ZMod n) : R) = 1 := cast_one dvd_rfl #align zmod.cast_one' ZMod.cast_one' @[simp] theorem cast_add' (a b : ZMod n) : (cast (a + b : ZMod n) : R) = cast a + cast b := cast_add dvd_rfl a b #align zmod.cast_add' ZMod.cast_add' @[simp] theorem cast_mul' (a b : ZMod n) : (cast (a * b : ZMod n) : R) = cast a * cast b := cast_mul dvd_rfl a b #align zmod.cast_mul' ZMod.cast_mul' @[simp] theorem cast_sub' (a b : ZMod n) : (cast (a - b : ZMod n) : R) = cast a - cast b := cast_sub dvd_rfl a b #align zmod.cast_sub' ZMod.cast_sub' @[simp] theorem cast_pow' (a : ZMod n) (k : ℕ) : (cast (a ^ k : ZMod n) : R) = (cast a : R) ^ k := cast_pow dvd_rfl a k #align zmod.cast_pow' ZMod.cast_pow' @[simp, norm_cast] theorem cast_natCast' (k : ℕ) : (cast (k : ZMod n) : R) = k := cast_natCast dvd_rfl k #align zmod.cast_nat_cast' ZMod.cast_natCast' @[deprecated (since := "2024-04-17")] alias cast_nat_cast' := cast_natCast' @[simp, norm_cast] theorem cast_intCast' (k : ℤ) : (cast (k : ZMod n) : R) = k := cast_intCast dvd_rfl k #align zmod.cast_int_cast' ZMod.cast_intCast' @[deprecated (since := "2024-04-17")] alias cast_int_cast' := cast_intCast' variable (R) theorem castHom_injective : Function.Injective (ZMod.castHom (dvd_refl n) R) := by rw [injective_iff_map_eq_zero] intro x obtain ⟨k, rfl⟩ := ZMod.intCast_surjective x rw [map_intCast, CharP.intCast_eq_zero_iff R n, CharP.intCast_eq_zero_iff (ZMod n) n] exact id #align zmod.cast_hom_injective ZMod.castHom_injective theorem castHom_bijective [Fintype R] (h : Fintype.card R = n) : Function.Bijective (ZMod.castHom (dvd_refl n) R) := by haveI : NeZero n := ⟨by intro hn rw [hn] at h exact (Fintype.card_eq_zero_iff.mp h).elim' 0⟩ rw [Fintype.bijective_iff_injective_and_card, ZMod.card, h, eq_self_iff_true, and_true_iff] apply ZMod.castHom_injective #align zmod.cast_hom_bijective ZMod.castHom_bijective /-- The unique ring isomorphism between `ZMod n` and a ring `R` of characteristic `n` and cardinality `n`. -/ noncomputable def ringEquiv [Fintype R] (h : Fintype.card R = n) : ZMod n ≃+* R := RingEquiv.ofBijective _ (ZMod.castHom_bijective R h) #align zmod.ring_equiv ZMod.ringEquiv /-- The identity between `ZMod m` and `ZMod n` when `m = n`, as a ring isomorphism. -/ def ringEquivCongr {m n : ℕ} (h : m = n) : ZMod m ≃+* ZMod n := by cases' m with m <;> cases' n with n · exact RingEquiv.refl _ · exfalso exact n.succ_ne_zero h.symm · exfalso exact m.succ_ne_zero h · exact { finCongr h with map_mul' := fun a b => by dsimp [ZMod] ext rw [Fin.coe_cast, Fin.coe_mul, Fin.coe_mul, Fin.coe_cast, Fin.coe_cast, ← h] map_add' := fun a b => by dsimp [ZMod] ext rw [Fin.coe_cast, Fin.val_add, Fin.val_add, Fin.coe_cast, Fin.coe_cast, ← h] } #align zmod.ring_equiv_congr ZMod.ringEquivCongr @[simp] lemma ringEquivCongr_refl (a : ℕ) : ringEquivCongr (rfl : a = a) = .refl _ := by cases a <;> rfl lemma ringEquivCongr_refl_apply {a : ℕ} (x : ZMod a) : ringEquivCongr rfl x = x := by rw [ringEquivCongr_refl] rfl lemma ringEquivCongr_symm {a b : ℕ} (hab : a = b) : (ringEquivCongr hab).symm = ringEquivCongr hab.symm := by subst hab cases a <;> rfl lemma ringEquivCongr_trans {a b c : ℕ} (hab : a = b) (hbc : b = c) : (ringEquivCongr hab).trans (ringEquivCongr hbc) = ringEquivCongr (hab.trans hbc) := by subst hab hbc cases a <;> rfl lemma ringEquivCongr_ringEquivCongr_apply {a b c : ℕ} (hab : a = b) (hbc : b = c) (x : ZMod a) : ringEquivCongr hbc (ringEquivCongr hab x) = ringEquivCongr (hab.trans hbc) x := by rw [← ringEquivCongr_trans hab hbc] rfl lemma ringEquivCongr_val {a b : ℕ} (h : a = b) (x : ZMod a) : ZMod.val ((ZMod.ringEquivCongr h) x) = ZMod.val x := by subst h cases a <;> rfl lemma ringEquivCongr_intCast {a b : ℕ} (h : a = b) (z : ℤ) : ZMod.ringEquivCongr h z = z := by subst h cases a <;> rfl @[deprecated (since := "2024-05-25")] alias int_coe_ringEquivCongr := ringEquivCongr_intCast end CharEq end UniversalProperty theorem intCast_eq_intCast_iff (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [ZMOD c] := CharP.intCast_eq_intCast (ZMod c) c #align zmod.int_coe_eq_int_coe_iff ZMod.intCast_eq_intCast_iff @[deprecated (since := "2024-04-17")] alias int_cast_eq_int_cast_iff := intCast_eq_intCast_iff theorem intCast_eq_intCast_iff' (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c := ZMod.intCast_eq_intCast_iff a b c #align zmod.int_coe_eq_int_coe_iff' ZMod.intCast_eq_intCast_iff' @[deprecated (since := "2024-04-17")] alias int_cast_eq_int_cast_iff' := intCast_eq_intCast_iff' theorem natCast_eq_natCast_iff (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [MOD c] := by simpa [Int.natCast_modEq_iff] using ZMod.intCast_eq_intCast_iff a b c #align zmod.nat_coe_eq_nat_coe_iff ZMod.natCast_eq_natCast_iff @[deprecated (since := "2024-04-17")] alias nat_cast_eq_nat_cast_iff := natCast_eq_natCast_iff theorem natCast_eq_natCast_iff' (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c := ZMod.natCast_eq_natCast_iff a b c #align zmod.nat_coe_eq_nat_coe_iff' ZMod.natCast_eq_natCast_iff' @[deprecated (since := "2024-04-17")] alias nat_cast_eq_nat_cast_iff' := natCast_eq_natCast_iff' theorem intCast_zmod_eq_zero_iff_dvd (a : ℤ) (b : ℕ) : (a : ZMod b) = 0 ↔ (b : ℤ) ∣ a := by rw [← Int.cast_zero, ZMod.intCast_eq_intCast_iff, Int.modEq_zero_iff_dvd] #align zmod.int_coe_zmod_eq_zero_iff_dvd ZMod.intCast_zmod_eq_zero_iff_dvd @[deprecated (since := "2024-04-17")] alias int_cast_zmod_eq_zero_iff_dvd := intCast_zmod_eq_zero_iff_dvd theorem intCast_eq_intCast_iff_dvd_sub (a b : ℤ) (c : ℕ) : (a : ZMod c) = ↑b ↔ ↑c ∣ b - a := by rw [ZMod.intCast_eq_intCast_iff, Int.modEq_iff_dvd] #align zmod.int_coe_eq_int_coe_iff_dvd_sub ZMod.intCast_eq_intCast_iff_dvd_sub @[deprecated (since := "2024-04-17")] alias int_cast_eq_int_cast_iff_dvd_sub := intCast_eq_intCast_iff_dvd_sub theorem natCast_zmod_eq_zero_iff_dvd (a b : ℕ) : (a : ZMod b) = 0 ↔ b ∣ a := by rw [← Nat.cast_zero, ZMod.natCast_eq_natCast_iff, Nat.modEq_zero_iff_dvd] #align zmod.nat_coe_zmod_eq_zero_iff_dvd ZMod.natCast_zmod_eq_zero_iff_dvd @[deprecated (since := "2024-04-17")] alias nat_cast_zmod_eq_zero_iff_dvd := natCast_zmod_eq_zero_iff_dvd theorem val_intCast {n : ℕ} (a : ℤ) [NeZero n] : ↑(a : ZMod n).val = a % n := by have hle : (0 : ℤ) ≤ ↑(a : ZMod n).val := Int.natCast_nonneg _ have hlt : ↑(a : ZMod n).val < (n : ℤ) := Int.ofNat_lt.mpr (ZMod.val_lt a) refine (Int.emod_eq_of_lt hle hlt).symm.trans ?_ rw [← ZMod.intCast_eq_intCast_iff', Int.cast_natCast, ZMod.natCast_val, ZMod.cast_id] #align zmod.val_int_cast ZMod.val_intCast @[deprecated (since := "2024-04-17")] alias val_int_cast := val_intCast theorem coe_intCast {n : ℕ} (a : ℤ) : cast (a : ZMod n) = a % n := by cases n · rw [Int.ofNat_zero, Int.emod_zero, Int.cast_id]; rfl · rw [← val_intCast, val]; rfl #align zmod.coe_int_cast ZMod.coe_intCast @[deprecated (since := "2024-04-17")] alias coe_int_cast := coe_intCast @[simp] theorem val_neg_one (n : ℕ) : (-1 : ZMod n.succ).val = n := by dsimp [val, Fin.coe_neg] cases n · simp [Nat.mod_one] · dsimp [ZMod, ZMod.cast] rw [Fin.coe_neg_one] #align zmod.val_neg_one ZMod.val_neg_one /-- `-1 : ZMod n` lifts to `n - 1 : R`. This avoids the characteristic assumption in `cast_neg`. -/ theorem cast_neg_one {R : Type} [Ring R] (n : ℕ) : cast (-1 : ZMod n) = (n - 1 : R) := by cases' n with n · dsimp [ZMod, ZMod.cast]; simp · rw [← natCast_val, val_neg_one, Nat.cast_succ, add_sub_cancel_right] #align zmod.cast_neg_one ZMod.cast_neg_one theorem cast_sub_one {R : Type} [Ring R] {n : ℕ} (k : ZMod n) : (cast (k - 1 : ZMod n) : R) = (if k = 0 then (n : R) else cast k) - 1 := by split_ifs with hk · rw [hk, zero_sub, ZMod.cast_neg_one] · cases n · dsimp [ZMod, ZMod.cast] rw [Int.cast_sub, Int.cast_one] · dsimp [ZMod, ZMod.cast, ZMod.val] rw [Fin.coe_sub_one, if_neg] · rw [Nat.cast_sub, Nat.cast_one] rwa [Fin.ext_iff, Fin.val_zero, ← Ne, ← Nat.one_le_iff_ne_zero] at hk · exact hk #align zmod.cast_sub_one ZMod.cast_sub_one theorem natCast_eq_iff (p : ℕ) (n : ℕ) (z : ZMod p) [NeZero p] : ↑n = z ↔ ∃ k, n = z.val + p * k := by constructor · rintro rfl refine ⟨n / p, ?_⟩ rw [val_natCast, Nat.mod_add_div] · rintro ⟨k, rfl⟩ rw [Nat.cast_add, natCast_zmod_val, Nat.cast_mul, natCast_self, zero_mul, add_zero] #align zmod.nat_coe_zmod_eq_iff ZMod.natCast_eq_iff theorem intCast_eq_iff (p : ℕ) (n : ℤ) (z : ZMod p) [NeZero p] : ↑n = z ↔ ∃ k, n = z.val + p * k := by constructor · rintro rfl refine ⟨n / p, ?_⟩ rw [val_intCast, Int.emod_add_ediv] · rintro ⟨k, rfl⟩ rw [Int.cast_add, Int.cast_mul, Int.cast_natCast, Int.cast_natCast, natCast_val, ZMod.natCast_self, zero_mul, add_zero, cast_id] #align zmod.int_coe_zmod_eq_iff ZMod.intCast_eq_iff @[deprecated (since := "2024-05-25")] alias nat_coe_zmod_eq_iff := natCast_eq_iff @[deprecated (since := "2024-05-25")] alias int_coe_zmod_eq_iff := intCast_eq_iff @[push_cast, simp] theorem intCast_mod (a : ℤ) (b : ℕ) : ((a % b : ℤ) : ZMod b) = (a : ZMod b) := by rw [ZMod.intCast_eq_intCast_iff] apply Int.mod_modEq #align zmod.int_cast_mod ZMod.intCast_mod @[deprecated (since := "2024-04-17")] alias int_cast_mod := intCast_mod theorem ker_intCastAddHom (n : ℕ) : (Int.castAddHom (ZMod n)).ker = AddSubgroup.zmultiples (n : ℤ) := by ext rw [Int.mem_zmultiples_iff, AddMonoidHom.mem_ker, Int.coe_castAddHom, intCast_zmod_eq_zero_iff_dvd] #align zmod.ker_int_cast_add_hom ZMod.ker_intCastAddHom @[deprecated (since := "2024-04-17")] alias ker_int_castAddHom := ker_intCastAddHom theorem cast_injective_of_le {m n : ℕ} [nzm : NeZero m] (h : m ≤ n) : Function.Injective (@cast (ZMod n) _ m) := by cases m with \| zero => cases nzm; simp_all \| succ m => rintro ⟨x, hx⟩ ⟨y, hy⟩ f simp only [cast, val, natCast_eq_natCast_iff', Nat.mod_eq_of_lt (hx.trans_le h), Nat.mod_eq_of_lt (hy.trans_le h)] at f apply Fin.ext exact f theorem cast_zmod_eq_zero_iff_of_le {m n : ℕ} [NeZero m] (h : m ≤ n) (a : ZMod m) : (cast a : ZMod n) = 0 ↔ a = 0 := by rw [← ZMod.cast_zero (n := m)] exact Injective.eq_iff' (cast_injective_of_le h) rfl -- Porting note: commented -- unseal Int.NonNeg @[simp] theorem natCast_toNat (p : ℕ) : ∀ {z : ℤ} (_h : 0 ≤ z), (z.toNat : ZMod p) = z \| (n : ℕ), _h => by simp only [Int.cast_natCast, Int.toNat_natCast] \| Int.negSucc n, h => by simp at h #align zmod.nat_cast_to_nat ZMod.natCast_toNat @[deprecated (since := "2024-04-17")] alias nat_cast_toNat := natCast_toNat theorem val_injective (n : ℕ) [NeZero n] : Function.Injective (val : ZMod n → ℕ) := by cases n · cases NeZero.ne 0 rfl intro a b h dsimp [ZMod] ext exact h #align zmod.val_injective ZMod.val_injective theorem val_one_eq_one_mod (n : ℕ) : (1 : ZMod n).val = 1 % n := by rw [← Nat.cast_one, val_natCast] #align zmod.val_one_eq_one_mod ZMod.val_one_eq_one_mod theorem val_one (n : ℕ) [Fact (1 < n)] : (1 : ZMod n).val = 1 := by rw [val_one_eq_one_mod] exact Nat.mod_eq_of_lt Fact.out #align zmod.val_one ZMod.val_one	Mathlib/Data/ZMod/Basic.lean	740	743	theorem val_add {n : ℕ} [NeZero n] (a b : ZMod n) : (a + b).val = (a.val + b.val) % n := by	cases n · cases NeZero.ne 0 rfl · apply Fin.val_add
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Floris van Doorn -/ import Mathlib.Data.Finsupp.Multiset import Mathlib.Order.Bounded import Mathlib.SetTheory.Cardinal.PartENat import Mathlib.SetTheory.Ordinal.Principal import Mathlib.Tactic.Linarith #align_import set_theory.cardinal.ordinal from "leanprover-community/mathlib"@"7c2ce0c2da15516b4e65d0c9e254bb6dc93abd1f" /-! # Cardinals and ordinals Relationships between cardinals and ordinals, properties of cardinals that are proved using ordinals. ## Main definitions * The function `Cardinal.aleph'` gives the cardinals listed by their ordinal index, and is the inverse of `Cardinal.aleph/idx`. `aleph' n = n`, `aleph' ω = ℵ₀`, `aleph' (ω + 1) = succ ℵ₀`, etc. It is an order isomorphism between ordinals and cardinals. * The function `Cardinal.aleph` gives the infinite cardinals listed by their ordinal index. `aleph 0 = ℵ₀`, `aleph 1 = succ ℵ₀` is the first uncountable cardinal, and so on. The notation `ω_` combines the latter with `Cardinal.ord`, giving an enumeration of (infinite) initial ordinals. Thus `ω_ 0 = ω` and `ω₁ = ω_ 1` is the first uncountable ordinal. * The function `Cardinal.beth` enumerates the Beth cardinals. `beth 0 = ℵ₀`, `beth (succ o) = 2 ^ beth o`, and for a limit ordinal `o`, `beth o` is the supremum of `beth a` for `a < o`. ## Main Statements * `Cardinal.mul_eq_max` and `Cardinal.add_eq_max` state that the product (resp. sum) of two infinite cardinals is just their maximum. Several variations around this fact are also given. * `Cardinal.mk_list_eq_mk` : when `α` is infinite, `α` and `List α` have the same cardinality. * simp lemmas for inequalities between `bit0 a` and `bit1 b` are registered, making `simp` able to prove inequalities about numeral cardinals. ## Tags cardinal arithmetic (for infinite cardinals) -/ noncomputable section open Function Set Cardinal Equiv Order Ordinal open scoped Classical universe u v w namespace Cardinal section UsingOrdinals theorem ord_isLimit {c} (co : ℵ₀ ≤ c) : (ord c).IsLimit := by refine ⟨fun h => aleph0_ne_zero ?_, fun a => lt_imp_lt_of_le_imp_le fun h => ?_⟩ · rw [← Ordinal.le_zero, ord_le] at h simpa only [card_zero, nonpos_iff_eq_zero] using co.trans h · rw [ord_le] at h ⊢ rwa [← @add_one_of_aleph0_le (card a), ← card_succ] rw [← ord_le, ← le_succ_of_isLimit, ord_le] · exact co.trans h · rw [ord_aleph0] exact omega_isLimit #align cardinal.ord_is_limit Cardinal.ord_isLimit theorem noMaxOrder {c} (h : ℵ₀ ≤ c) : NoMaxOrder c.ord.out.α := Ordinal.out_no_max_of_succ_lt (ord_isLimit h).2 /-! ### Aleph cardinals -/ section aleph /-- The `aleph'` index function, which gives the ordinal index of a cardinal. (The `aleph'` part is because unlike `aleph` this counts also the finite stages. So `alephIdx n = n`, `alephIdx ω = ω`, `alephIdx ℵ₁ = ω + 1` and so on.) In this definition, we register additionally that this function is an initial segment, i.e., it is order preserving and its range is an initial segment of the ordinals. For the basic function version, see `alephIdx`. For an upgraded version stating that the range is everything, see `AlephIdx.rel_iso`. -/ def alephIdx.initialSeg : @InitialSeg Cardinal Ordinal (· < ·) (· < ·) := @RelEmbedding.collapse Cardinal Ordinal (· < ·) (· < ·) _ Cardinal.ord.orderEmbedding.ltEmbedding #align cardinal.aleph_idx.initial_seg Cardinal.alephIdx.initialSeg /-- The `aleph'` index function, which gives the ordinal index of a cardinal. (The `aleph'` part is because unlike `aleph` this counts also the finite stages. So `alephIdx n = n`, `alephIdx ω = ω`, `alephIdx ℵ₁ = ω + 1` and so on.) For an upgraded version stating that the range is everything, see `AlephIdx.rel_iso`. -/ def alephIdx : Cardinal → Ordinal := alephIdx.initialSeg #align cardinal.aleph_idx Cardinal.alephIdx @[simp] theorem alephIdx.initialSeg_coe : (alephIdx.initialSeg : Cardinal → Ordinal) = alephIdx := rfl #align cardinal.aleph_idx.initial_seg_coe Cardinal.alephIdx.initialSeg_coe @[simp] theorem alephIdx_lt {a b} : alephIdx a < alephIdx b ↔ a < b := alephIdx.initialSeg.toRelEmbedding.map_rel_iff #align cardinal.aleph_idx_lt Cardinal.alephIdx_lt @[simp] theorem alephIdx_le {a b} : alephIdx a ≤ alephIdx b ↔ a ≤ b := by rw [← not_lt, ← not_lt, alephIdx_lt] #align cardinal.aleph_idx_le Cardinal.alephIdx_le theorem alephIdx.init {a b} : b < alephIdx a → ∃ c, alephIdx c = b := alephIdx.initialSeg.init #align cardinal.aleph_idx.init Cardinal.alephIdx.init /-- The `aleph'` index function, which gives the ordinal index of a cardinal. (The `aleph'` part is because unlike `aleph` this counts also the finite stages. So `alephIdx n = n`, `alephIdx ℵ₀ = ω`, `alephIdx ℵ₁ = ω + 1` and so on.) In this version, we register additionally that this function is an order isomorphism between cardinals and ordinals. For the basic function version, see `alephIdx`. -/ def alephIdx.relIso : @RelIso Cardinal.{u} Ordinal.{u} (· < ·) (· < ·) := @RelIso.ofSurjective Cardinal.{u} Ordinal.{u} (· < ·) (· < ·) alephIdx.initialSeg.{u} <\| (InitialSeg.eq_or_principal alephIdx.initialSeg.{u}).resolve_right fun ⟨o, e⟩ => by have : ∀ c, alephIdx c < o := fun c => (e _).2 ⟨_, rfl⟩ refine Ordinal.inductionOn o ?_ this; intro α r _ h let s := ⨆ a, invFun alephIdx (Ordinal.typein r a) apply (lt_succ s).not_le have I : Injective.{u+2, u+2} alephIdx := alephIdx.initialSeg.toEmbedding.injective simpa only [typein_enum, leftInverse_invFun I (succ s)] using le_ciSup (Cardinal.bddAbove_range.{u, u} fun a : α => invFun alephIdx (Ordinal.typein r a)) (Ordinal.enum r _ (h (succ s))) #align cardinal.aleph_idx.rel_iso Cardinal.alephIdx.relIso @[simp] theorem alephIdx.relIso_coe : (alephIdx.relIso : Cardinal → Ordinal) = alephIdx := rfl #align cardinal.aleph_idx.rel_iso_coe Cardinal.alephIdx.relIso_coe @[simp] theorem type_cardinal : @type Cardinal (· < ·) _ = Ordinal.univ.{u, u + 1} := by rw [Ordinal.univ_id]; exact Quotient.sound ⟨alephIdx.relIso⟩ #align cardinal.type_cardinal Cardinal.type_cardinal @[simp] theorem mk_cardinal : #Cardinal = univ.{u, u + 1} := by simpa only [card_type, card_univ] using congr_arg card type_cardinal #align cardinal.mk_cardinal Cardinal.mk_cardinal /-- The `aleph'` function gives the cardinals listed by their ordinal index, and is the inverse of `aleph_idx`. `aleph' n = n`, `aleph' ω = ω`, `aleph' (ω + 1) = succ ℵ₀`, etc. In this version, we register additionally that this function is an order isomorphism between ordinals and cardinals. For the basic function version, see `aleph'`. -/ def Aleph'.relIso := Cardinal.alephIdx.relIso.symm #align cardinal.aleph'.rel_iso Cardinal.Aleph'.relIso /-- The `aleph'` function gives the cardinals listed by their ordinal index, and is the inverse of `aleph_idx`. `aleph' n = n`, `aleph' ω = ω`, `aleph' (ω + 1) = succ ℵ₀`, etc. -/ def aleph' : Ordinal → Cardinal := Aleph'.relIso #align cardinal.aleph' Cardinal.aleph' @[simp] theorem aleph'.relIso_coe : (Aleph'.relIso : Ordinal → Cardinal) = aleph' := rfl #align cardinal.aleph'.rel_iso_coe Cardinal.aleph'.relIso_coe @[simp] theorem aleph'_lt {o₁ o₂ : Ordinal} : aleph' o₁ < aleph' o₂ ↔ o₁ < o₂ := Aleph'.relIso.map_rel_iff #align cardinal.aleph'_lt Cardinal.aleph'_lt @[simp] theorem aleph'_le {o₁ o₂ : Ordinal} : aleph' o₁ ≤ aleph' o₂ ↔ o₁ ≤ o₂ := le_iff_le_iff_lt_iff_lt.2 aleph'_lt #align cardinal.aleph'_le Cardinal.aleph'_le @[simp] theorem aleph'_alephIdx (c : Cardinal) : aleph' c.alephIdx = c := Cardinal.alephIdx.relIso.toEquiv.symm_apply_apply c #align cardinal.aleph'_aleph_idx Cardinal.aleph'_alephIdx @[simp] theorem alephIdx_aleph' (o : Ordinal) : (aleph' o).alephIdx = o := Cardinal.alephIdx.relIso.toEquiv.apply_symm_apply o #align cardinal.aleph_idx_aleph' Cardinal.alephIdx_aleph' @[simp] theorem aleph'_zero : aleph' 0 = 0 := by rw [← nonpos_iff_eq_zero, ← aleph'_alephIdx 0, aleph'_le] apply Ordinal.zero_le #align cardinal.aleph'_zero Cardinal.aleph'_zero @[simp] theorem aleph'_succ {o : Ordinal} : aleph' (succ o) = succ (aleph' o) := by apply (succ_le_of_lt <\| aleph'_lt.2 <\| lt_succ o).antisymm' (Cardinal.alephIdx_le.1 <\| _) rw [alephIdx_aleph', succ_le_iff, ← aleph'_lt, aleph'_alephIdx] apply lt_succ #align cardinal.aleph'_succ Cardinal.aleph'_succ @[simp] theorem aleph'_nat : ∀ n : ℕ, aleph' n = n \| 0 => aleph'_zero \| n + 1 => show aleph' (succ n) = n.succ by rw [aleph'_succ, aleph'_nat n, nat_succ] #align cardinal.aleph'_nat Cardinal.aleph'_nat theorem aleph'_le_of_limit {o : Ordinal} (l : o.IsLimit) {c} : aleph' o ≤ c ↔ ∀ o' < o, aleph' o' ≤ c := ⟨fun h o' h' => (aleph'_le.2 <\| h'.le).trans h, fun h => by rw [← aleph'_alephIdx c, aleph'_le, limit_le l] intro x h' rw [← aleph'_le, aleph'_alephIdx] exact h _ h'⟩ #align cardinal.aleph'_le_of_limit Cardinal.aleph'_le_of_limit theorem aleph'_limit {o : Ordinal} (ho : o.IsLimit) : aleph' o = ⨆ a : Iio o, aleph' a := by refine le_antisymm ?_ (ciSup_le' fun i => aleph'_le.2 (le_of_lt i.2)) rw [aleph'_le_of_limit ho] exact fun a ha => le_ciSup (bddAbove_of_small _) (⟨a, ha⟩ : Iio o) #align cardinal.aleph'_limit Cardinal.aleph'_limit @[simp] theorem aleph'_omega : aleph' ω = ℵ₀ := eq_of_forall_ge_iff fun c => by simp only [aleph'_le_of_limit omega_isLimit, lt_omega, exists_imp, aleph0_le] exact forall_swap.trans (forall_congr' fun n => by simp only [forall_eq, aleph'_nat]) #align cardinal.aleph'_omega Cardinal.aleph'_omega /-- `aleph'` and `aleph_idx` form an equivalence between `Ordinal` and `Cardinal` -/ @[simp] def aleph'Equiv : Ordinal ≃ Cardinal := ⟨aleph', alephIdx, alephIdx_aleph', aleph'_alephIdx⟩ #align cardinal.aleph'_equiv Cardinal.aleph'Equiv /-- The `aleph` function gives the infinite cardinals listed by their ordinal index. `aleph 0 = ℵ₀`, `aleph 1 = succ ℵ₀` is the first uncountable cardinal, and so on. -/ def aleph (o : Ordinal) : Cardinal := aleph' (ω + o) #align cardinal.aleph Cardinal.aleph @[simp] theorem aleph_lt {o₁ o₂ : Ordinal} : aleph o₁ < aleph o₂ ↔ o₁ < o₂ := aleph'_lt.trans (add_lt_add_iff_left _) #align cardinal.aleph_lt Cardinal.aleph_lt @[simp] theorem aleph_le {o₁ o₂ : Ordinal} : aleph o₁ ≤ aleph o₂ ↔ o₁ ≤ o₂ := le_iff_le_iff_lt_iff_lt.2 aleph_lt #align cardinal.aleph_le Cardinal.aleph_le @[simp] theorem max_aleph_eq (o₁ o₂ : Ordinal) : max (aleph o₁) (aleph o₂) = aleph (max o₁ o₂) := by rcases le_total (aleph o₁) (aleph o₂) with h \| h · rw [max_eq_right h, max_eq_right (aleph_le.1 h)] · rw [max_eq_left h, max_eq_left (aleph_le.1 h)] #align cardinal.max_aleph_eq Cardinal.max_aleph_eq @[simp] theorem aleph_succ {o : Ordinal} : aleph (succ o) = succ (aleph o) := by rw [aleph, add_succ, aleph'_succ, aleph] #align cardinal.aleph_succ Cardinal.aleph_succ @[simp] theorem aleph_zero : aleph 0 = ℵ₀ := by rw [aleph, add_zero, aleph'_omega] #align cardinal.aleph_zero Cardinal.aleph_zero theorem aleph_limit {o : Ordinal} (ho : o.IsLimit) : aleph o = ⨆ a : Iio o, aleph a := by apply le_antisymm _ (ciSup_le' _) · rw [aleph, aleph'_limit (ho.add _)] refine ciSup_mono' (bddAbove_of_small _) ?_ rintro ⟨i, hi⟩ cases' lt_or_le i ω with h h · rcases lt_omega.1 h with ⟨n, rfl⟩ use ⟨0, ho.pos⟩ simpa using (nat_lt_aleph0 n).le · exact ⟨⟨_, (sub_lt_of_le h).2 hi⟩, aleph'_le.2 (le_add_sub _ _)⟩ · exact fun i => aleph_le.2 (le_of_lt i.2) #align cardinal.aleph_limit Cardinal.aleph_limit theorem aleph0_le_aleph' {o : Ordinal} : ℵ₀ ≤ aleph' o ↔ ω ≤ o := by rw [← aleph'_omega, aleph'_le] #align cardinal.aleph_0_le_aleph' Cardinal.aleph0_le_aleph' theorem aleph0_le_aleph (o : Ordinal) : ℵ₀ ≤ aleph o := by rw [aleph, aleph0_le_aleph'] apply Ordinal.le_add_right #align cardinal.aleph_0_le_aleph Cardinal.aleph0_le_aleph theorem aleph'_pos {o : Ordinal} (ho : 0 < o) : 0 < aleph' o := by rwa [← aleph'_zero, aleph'_lt] #align cardinal.aleph'_pos Cardinal.aleph'_pos theorem aleph_pos (o : Ordinal) : 0 < aleph o := aleph0_pos.trans_le (aleph0_le_aleph o) #align cardinal.aleph_pos Cardinal.aleph_pos @[simp] theorem aleph_toNat (o : Ordinal) : toNat (aleph o) = 0 := toNat_apply_of_aleph0_le <\| aleph0_le_aleph o #align cardinal.aleph_to_nat Cardinal.aleph_toNat @[simp] theorem aleph_toPartENat (o : Ordinal) : toPartENat (aleph o) = ⊤ := toPartENat_apply_of_aleph0_le <\| aleph0_le_aleph o #align cardinal.aleph_to_part_enat Cardinal.aleph_toPartENat instance nonempty_out_aleph (o : Ordinal) : Nonempty (aleph o).ord.out.α := by rw [out_nonempty_iff_ne_zero, ← ord_zero] exact fun h => (ord_injective h).not_gt (aleph_pos o) #align cardinal.nonempty_out_aleph Cardinal.nonempty_out_aleph theorem ord_aleph_isLimit (o : Ordinal) : (aleph o).ord.IsLimit := ord_isLimit <\| aleph0_le_aleph _ #align cardinal.ord_aleph_is_limit Cardinal.ord_aleph_isLimit instance (o : Ordinal) : NoMaxOrder (aleph o).ord.out.α := out_no_max_of_succ_lt (ord_aleph_isLimit o).2 theorem exists_aleph {c : Cardinal} : ℵ₀ ≤ c ↔ ∃ o, c = aleph o := ⟨fun h => ⟨alephIdx c - ω, by rw [aleph, Ordinal.add_sub_cancel_of_le, aleph'_alephIdx] rwa [← aleph0_le_aleph', aleph'_alephIdx]⟩, fun ⟨o, e⟩ => e.symm ▸ aleph0_le_aleph _⟩ #align cardinal.exists_aleph Cardinal.exists_aleph theorem aleph'_isNormal : IsNormal (ord ∘ aleph') := ⟨fun o => ord_lt_ord.2 <\| aleph'_lt.2 <\| lt_succ o, fun o l a => by simp [ord_le, aleph'_le_of_limit l]⟩ #align cardinal.aleph'_is_normal Cardinal.aleph'_isNormal theorem aleph_isNormal : IsNormal (ord ∘ aleph) := aleph'_isNormal.trans <\| add_isNormal ω #align cardinal.aleph_is_normal Cardinal.aleph_isNormal theorem succ_aleph0 : succ ℵ₀ = aleph 1 := by rw [← aleph_zero, ← aleph_succ, Ordinal.succ_zero] #align cardinal.succ_aleph_0 Cardinal.succ_aleph0 theorem aleph0_lt_aleph_one : ℵ₀ < aleph 1 := by rw [← succ_aleph0] apply lt_succ #align cardinal.aleph_0_lt_aleph_one Cardinal.aleph0_lt_aleph_one theorem countable_iff_lt_aleph_one {α : Type} (s : Set α) : s.Countable ↔ #s < aleph 1 := by rw [← succ_aleph0, lt_succ_iff, le_aleph0_iff_set_countable] #align cardinal.countable_iff_lt_aleph_one Cardinal.countable_iff_lt_aleph_one /-- Ordinals that are cardinals are unbounded. -/ theorem ord_card_unbounded : Unbounded (· < ·) { b : Ordinal \| b.card.ord = b } := unbounded_lt_iff.2 fun a => ⟨_, ⟨by dsimp rw [card_ord], (lt_ord_succ_card a).le⟩⟩ #align cardinal.ord_card_unbounded Cardinal.ord_card_unbounded theorem eq_aleph'_of_eq_card_ord {o : Ordinal} (ho : o.card.ord = o) : ∃ a, (aleph' a).ord = o := ⟨Cardinal.alephIdx.relIso o.card, by simpa using ho⟩ #align cardinal.eq_aleph'_of_eq_card_ord Cardinal.eq_aleph'_of_eq_card_ord /-- `ord ∘ aleph'` enumerates the ordinals that are cardinals. -/ theorem ord_aleph'_eq_enum_card : ord ∘ aleph' = enumOrd { b : Ordinal \| b.card.ord = b } := by rw [← eq_enumOrd _ ord_card_unbounded, range_eq_iff] exact ⟨aleph'_isNormal.strictMono, ⟨fun a => by dsimp rw [card_ord], fun b hb => eq_aleph'_of_eq_card_ord hb⟩⟩ #align cardinal.ord_aleph'_eq_enum_card Cardinal.ord_aleph'_eq_enum_card /-- Infinite ordinals that are cardinals are unbounded. -/ theorem ord_card_unbounded' : Unbounded (· < ·) { b : Ordinal \| b.card.ord = b ∧ ω ≤ b } := (unbounded_lt_inter_le ω).2 ord_card_unbounded #align cardinal.ord_card_unbounded' Cardinal.ord_card_unbounded' theorem eq_aleph_of_eq_card_ord {o : Ordinal} (ho : o.card.ord = o) (ho' : ω ≤ o) : ∃ a, (aleph a).ord = o := by cases' eq_aleph'_of_eq_card_ord ho with a ha use a - ω unfold aleph rwa [Ordinal.add_sub_cancel_of_le] rwa [← aleph0_le_aleph', ← ord_le_ord, ha, ord_aleph0] #align cardinal.eq_aleph_of_eq_card_ord Cardinal.eq_aleph_of_eq_card_ord /-- `ord ∘ aleph` enumerates the infinite ordinals that are cardinals. -/ theorem ord_aleph_eq_enum_card : ord ∘ aleph = enumOrd { b : Ordinal \| b.card.ord = b ∧ ω ≤ b } := by rw [← eq_enumOrd _ ord_card_unbounded'] use aleph_isNormal.strictMono rw [range_eq_iff] refine ⟨fun a => ⟨?_, ?_⟩, fun b hb => eq_aleph_of_eq_card_ord hb.1 hb.2⟩ · rw [Function.comp_apply, card_ord] · rw [← ord_aleph0, Function.comp_apply, ord_le_ord] exact aleph0_le_aleph _ #align cardinal.ord_aleph_eq_enum_card Cardinal.ord_aleph_eq_enum_card end aleph /-! ### Beth cardinals -/ section beth /-- Beth numbers are defined so that `beth 0 = ℵ₀`, `beth (succ o) = 2 ^ (beth o)`, and when `o` is a limit ordinal, `beth o` is the supremum of `beth o'` for `o' < o`. Assuming the generalized continuum hypothesis, which is undecidable in ZFC, `beth o = aleph o` for every `o`. -/ def beth (o : Ordinal.{u}) : Cardinal.{u} := limitRecOn o aleph0 (fun _ x => (2 : Cardinal) ^ x) fun a _ IH => ⨆ b : Iio a, IH b.1 b.2 #align cardinal.beth Cardinal.beth @[simp] theorem beth_zero : beth 0 = aleph0 := limitRecOn_zero _ _ _ #align cardinal.beth_zero Cardinal.beth_zero @[simp] theorem beth_succ (o : Ordinal) : beth (succ o) = 2 ^ beth o := limitRecOn_succ _ _ _ _ #align cardinal.beth_succ Cardinal.beth_succ theorem beth_limit {o : Ordinal} : o.IsLimit → beth o = ⨆ a : Iio o, beth a := limitRecOn_limit _ _ _ _ #align cardinal.beth_limit Cardinal.beth_limit theorem beth_strictMono : StrictMono beth := by intro a b induction' b using Ordinal.induction with b IH generalizing a intro h rcases zero_or_succ_or_limit b with (rfl \| ⟨c, rfl⟩ \| hb) · exact (Ordinal.not_lt_zero a h).elim · rw [lt_succ_iff] at h rw [beth_succ] apply lt_of_le_of_lt _ (cantor _) rcases eq_or_lt_of_le h with (rfl \| h) · rfl exact (IH c (lt_succ c) h).le · apply (cantor _).trans_le rw [beth_limit hb, ← beth_succ] exact le_ciSup (bddAbove_of_small _) (⟨_, hb.succ_lt h⟩ : Iio b) #align cardinal.beth_strict_mono Cardinal.beth_strictMono theorem beth_mono : Monotone beth := beth_strictMono.monotone #align cardinal.beth_mono Cardinal.beth_mono @[simp] theorem beth_lt {o₁ o₂ : Ordinal} : beth o₁ < beth o₂ ↔ o₁ < o₂ := beth_strictMono.lt_iff_lt #align cardinal.beth_lt Cardinal.beth_lt @[simp] theorem beth_le {o₁ o₂ : Ordinal} : beth o₁ ≤ beth o₂ ↔ o₁ ≤ o₂ := beth_strictMono.le_iff_le #align cardinal.beth_le Cardinal.beth_le theorem aleph_le_beth (o : Ordinal) : aleph o ≤ beth o := by induction o using limitRecOn with \| H₁ => simp \| H₂ o h => rw [aleph_succ, beth_succ, succ_le_iff] exact (cantor _).trans_le (power_le_power_left two_ne_zero h) \| H₃ o ho IH => rw [aleph_limit ho, beth_limit ho] exact ciSup_mono (bddAbove_of_small _) fun x => IH x.1 x.2 #align cardinal.aleph_le_beth Cardinal.aleph_le_beth theorem aleph0_le_beth (o : Ordinal) : ℵ₀ ≤ beth o := (aleph0_le_aleph o).trans <\| aleph_le_beth o #align cardinal.aleph_0_le_beth Cardinal.aleph0_le_beth theorem beth_pos (o : Ordinal) : 0 < beth o := aleph0_pos.trans_le <\| aleph0_le_beth o #align cardinal.beth_pos Cardinal.beth_pos theorem beth_ne_zero (o : Ordinal) : beth o ≠ 0 := (beth_pos o).ne' #align cardinal.beth_ne_zero Cardinal.beth_ne_zero theorem beth_normal : IsNormal.{u} fun o => (beth o).ord := (isNormal_iff_strictMono_limit _).2 ⟨ord_strictMono.comp beth_strictMono, fun o ho a ha => by rw [beth_limit ho, ord_le] exact ciSup_le' fun b => ord_le.1 (ha _ b.2)⟩ #align cardinal.beth_normal Cardinal.beth_normal end beth /-! ### Properties of `mul` -/ section mulOrdinals /-- If `α` is an infinite type, then `α × α` and `α` have the same cardinality. -/ theorem mul_eq_self {c : Cardinal} (h : ℵ₀ ≤ c) : c c = c := by refine le_antisymm ?_ (by simpa only [mul_one] using mul_le_mul_left' (one_le_aleph0.trans h) c) -- the only nontrivial part is `c * c ≤ c`. We prove it inductively. refine Acc.recOn (Cardinal.lt_wf.apply c) (fun c _ => Quotient.inductionOn c fun α IH ol => ?_) h -- consider the minimal well-order `r` on `α` (a type with cardinality `c`). rcases ord_eq α with ⟨r, wo, e⟩ letI := linearOrderOfSTO r haveI : IsWellOrder α (· < ·) := wo -- Define an order `s` on `α × α` by writing `(a, b) < (c, d)` if `max a b < max c d`, or -- the max are equal and `a < c`, or the max are equal and `a = c` and `b < d`. let g : α × α → α := fun p => max p.1 p.2 let f : α × α ↪ Ordinal × α × α := ⟨fun p : α × α => (typein (· < ·) (g p), p), fun p q => congr_arg Prod.snd⟩ let s := f ⁻¹'o Prod.Lex (· < ·) (Prod.Lex (· < ·) (· < ·)) -- this is a well order on `α × α`. haveI : IsWellOrder _ s := (RelEmbedding.preimage _ _).isWellOrder /- it suffices to show that this well order is smaller than `r` if it were larger, then `r` would be a strict prefix of `s`. It would be contained in `β × β` for some `β` of cardinality `< c`. By the inductive assumption, this set has the same cardinality as `β` (or it is finite if `β` is finite), so it is `< c`, which is a contradiction. -/ suffices type s ≤ type r by exact card_le_card this refine le_of_forall_lt fun o h => ?_ rcases typein_surj s h with ⟨p, rfl⟩ rw [← e, lt_ord] refine lt_of_le_of_lt (?_ : _ ≤ card (succ (typein (· < ·) (g p))) * card (succ (typein (· < ·) (g p)))) ?_ · have : { q \| s q p } ⊆ insert (g p) { x \| x < g p } ×ˢ insert (g p) { x \| x < g p } := by intro q h simp only [s, f, Preimage, ge_iff_le, Embedding.coeFn_mk, Prod.lex_def, typein_lt_typein, typein_inj, mem_setOf_eq] at h exact max_le_iff.1 (le_iff_lt_or_eq.2 <\| h.imp_right And.left) suffices H : (insert (g p) { x \| r x (g p) } : Set α) ≃ Sum { x \| r x (g p) } PUnit from ⟨(Set.embeddingOfSubset _ _ this).trans ((Equiv.Set.prod _ _).trans (H.prodCongr H)).toEmbedding⟩ refine (Equiv.Set.insert ?_).trans ((Equiv.refl _).sumCongr punitEquivPUnit) apply @irrefl _ r cases' lt_or_le (card (succ (typein (· < ·) (g p)))) ℵ₀ with qo qo · exact (mul_lt_aleph0 qo qo).trans_le ol · suffices (succ (typein LT.lt (g p))).card < ⟦α⟧ from (IH _ this qo).trans_lt this rw [← lt_ord] apply (ord_isLimit ol).2 rw [mk'_def, e] apply typein_lt_type #align cardinal.mul_eq_self Cardinal.mul_eq_self end mulOrdinals end UsingOrdinals /-! Properties of `mul`, not requiring ordinals -/ section mul /-- If `α` and `β` are infinite types, then the cardinality of `α × β` is the maximum of the cardinalities of `α` and `β`. -/ theorem mul_eq_max {a b : Cardinal} (ha : ℵ₀ ≤ a) (hb : ℵ₀ ≤ b) : a * b = max a b := le_antisymm (mul_eq_self (ha.trans (le_max_left a b)) ▸ mul_le_mul' (le_max_left _ _) (le_max_right _ _)) <\| max_le (by simpa only [mul_one] using mul_le_mul_left' (one_le_aleph0.trans hb) a) (by simpa only [one_mul] using mul_le_mul_right' (one_le_aleph0.trans ha) b) #align cardinal.mul_eq_max Cardinal.mul_eq_max @[simp] theorem mul_mk_eq_max {α β : Type u} [Infinite α] [Infinite β] : #α * #β = max #α #β := mul_eq_max (aleph0_le_mk α) (aleph0_le_mk β) #align cardinal.mul_mk_eq_max Cardinal.mul_mk_eq_max @[simp] theorem aleph_mul_aleph (o₁ o₂ : Ordinal) : aleph o₁ * aleph o₂ = aleph (max o₁ o₂) := by rw [Cardinal.mul_eq_max (aleph0_le_aleph o₁) (aleph0_le_aleph o₂), max_aleph_eq] #align cardinal.aleph_mul_aleph Cardinal.aleph_mul_aleph @[simp] theorem aleph0_mul_eq {a : Cardinal} (ha : ℵ₀ ≤ a) : ℵ₀ * a = a := (mul_eq_max le_rfl ha).trans (max_eq_right ha) #align cardinal.aleph_0_mul_eq Cardinal.aleph0_mul_eq @[simp] theorem mul_aleph0_eq {a : Cardinal} (ha : ℵ₀ ≤ a) : a * ℵ₀ = a := (mul_eq_max ha le_rfl).trans (max_eq_left ha) #align cardinal.mul_aleph_0_eq Cardinal.mul_aleph0_eq -- Porting note (#10618): removed `simp`, `simp` can prove it theorem aleph0_mul_mk_eq {α : Type} [Infinite α] : ℵ₀ #α = #α := aleph0_mul_eq (aleph0_le_mk α) #align cardinal.aleph_0_mul_mk_eq Cardinal.aleph0_mul_mk_eq -- Porting note (#10618): removed `simp`, `simp` can prove it theorem mk_mul_aleph0_eq {α : Type} [Infinite α] : #α ℵ₀ = #α := mul_aleph0_eq (aleph0_le_mk α) #align cardinal.mk_mul_aleph_0_eq Cardinal.mk_mul_aleph0_eq @[simp] theorem aleph0_mul_aleph (o : Ordinal) : ℵ₀ * aleph o = aleph o := aleph0_mul_eq (aleph0_le_aleph o) #align cardinal.aleph_0_mul_aleph Cardinal.aleph0_mul_aleph @[simp] theorem aleph_mul_aleph0 (o : Ordinal) : aleph o * ℵ₀ = aleph o := mul_aleph0_eq (aleph0_le_aleph o) #align cardinal.aleph_mul_aleph_0 Cardinal.aleph_mul_aleph0 theorem mul_lt_of_lt {a b c : Cardinal} (hc : ℵ₀ ≤ c) (h1 : a < c) (h2 : b < c) : a * b < c := (mul_le_mul' (le_max_left a b) (le_max_right a b)).trans_lt <\| (lt_or_le (max a b) ℵ₀).elim (fun h => (mul_lt_aleph0 h h).trans_le hc) fun h => by rw [mul_eq_self h] exact max_lt h1 h2 #align cardinal.mul_lt_of_lt Cardinal.mul_lt_of_lt	Mathlib/SetTheory/Cardinal/Ordinal.lean	610	613	theorem mul_le_max_of_aleph0_le_left {a b : Cardinal} (h : ℵ₀ ≤ a) : a * b ≤ max a b := by	convert mul_le_mul' (le_max_left a b) (le_max_right a b) using 1 rw [mul_eq_self] exact h.trans (le_max_left a b)
/- Copyright (c) 2022 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Topology.ContinuousOn import Mathlib.Order.Filter.SmallSets #align_import topology.locally_finite from "leanprover-community/mathlib"@"55d771df074d0dd020139ee1cd4b95521422df9f" /-! ### Locally finite families of sets We say that a family of sets in a topological space is locally finite if at every point `x : X`, there is a neighborhood of `x` which meets only finitely many sets in the family. In this file we give the definition and prove basic properties of locally finite families of sets. -/ -- locally finite family [General Topology (Bourbaki, 1995)] open Set Function Filter Topology variable {ι ι' α X Y : Type} [TopologicalSpace X] [TopologicalSpace Y] {f g : ι → Set X} /-- A family of sets in `Set X` is locally finite if at every point `x : X`, there is a neighborhood of `x` which meets only finitely many sets in the family. -/ def LocallyFinite (f : ι → Set X) := ∀ x : X, ∃ t ∈ 𝓝 x, { i \| (f i ∩ t).Nonempty }.Finite #align locally_finite LocallyFinite theorem locallyFinite_of_finite [Finite ι] (f : ι → Set X) : LocallyFinite f := fun _ => ⟨univ, univ_mem, toFinite _⟩ #align locally_finite_of_finite locallyFinite_of_finite namespace LocallyFinite theorem point_finite (hf : LocallyFinite f) (x : X) : { b \| x ∈ f b }.Finite := let ⟨_t, hxt, ht⟩ := hf x ht.subset fun _b hb => ⟨x, hb, mem_of_mem_nhds hxt⟩ #align locally_finite.point_finite LocallyFinite.point_finite protected theorem subset (hf : LocallyFinite f) (hg : ∀ i, g i ⊆ f i) : LocallyFinite g := fun a => let ⟨t, ht₁, ht₂⟩ := hf a ⟨t, ht₁, ht₂.subset fun i hi => hi.mono <\| inter_subset_inter (hg i) Subset.rfl⟩ #align locally_finite.subset LocallyFinite.subset theorem comp_injOn {g : ι' → ι} (hf : LocallyFinite f) (hg : InjOn g { i \| (f (g i)).Nonempty }) : LocallyFinite (f ∘ g) := fun x => by let ⟨t, htx, htf⟩ := hf x refine ⟨t, htx, htf.preimage <\| ?_⟩ exact hg.mono fun i (hi : Set.Nonempty _) => hi.left #align locally_finite.comp_inj_on LocallyFinite.comp_injOn theorem comp_injective {g : ι' → ι} (hf : LocallyFinite f) (hg : Injective g) : LocallyFinite (f ∘ g) := hf.comp_injOn hg.injOn #align locally_finite.comp_injective LocallyFinite.comp_injective theorem _root_.locallyFinite_iff_smallSets : LocallyFinite f ↔ ∀ x, ∀ᶠ s in (𝓝 x).smallSets, { i \| (f i ∩ s).Nonempty }.Finite := forall_congr' fun _ => Iff.symm <\| eventually_smallSets' fun _s _t hst ht => ht.subset fun _i hi => hi.mono <\| inter_subset_inter_right _ hst #align locally_finite_iff_small_sets locallyFinite_iff_smallSets protected theorem eventually_smallSets (hf : LocallyFinite f) (x : X) : ∀ᶠ s in (𝓝 x).smallSets, { i \| (f i ∩ s).Nonempty }.Finite := locallyFinite_iff_smallSets.mp hf x #align locally_finite.eventually_small_sets LocallyFinite.eventually_smallSets theorem exists_mem_basis {ι' : Sort} (hf : LocallyFinite f) {p : ι' → Prop} {s : ι' → Set X} {x : X} (hb : (𝓝 x).HasBasis p s) : ∃ i, p i ∧ { j \| (f j ∩ s i).Nonempty }.Finite := let ⟨i, hpi, hi⟩ := hb.smallSets.eventually_iff.mp (hf.eventually_smallSets x) ⟨i, hpi, hi Subset.rfl⟩ #align locally_finite.exists_mem_basis LocallyFinite.exists_mem_basis protected theorem nhdsWithin_iUnion (hf : LocallyFinite f) (a : X) : 𝓝[⋃ i, f i] a = ⨆ i, 𝓝[f i] a := by rcases hf a with ⟨U, haU, hfin⟩ refine le_antisymm ?_ (Monotone.le_map_iSup fun _ _ ↦ nhdsWithin_mono _) calc 𝓝[⋃ i, f i] a = 𝓝[⋃ i, f i ∩ U] a := by rw [← iUnion_inter, ← nhdsWithin_inter_of_mem' (nhdsWithin_le_nhds haU)] _ = 𝓝[⋃ i ∈ {j \| (f j ∩ U).Nonempty}, (f i ∩ U)] a := by simp only [mem_setOf_eq, iUnion_nonempty_self] _ = ⨆ i ∈ {j \| (f j ∩ U).Nonempty}, 𝓝[f i ∩ U] a := nhdsWithin_biUnion hfin _ _ _ ≤ ⨆ i, 𝓝[f i ∩ U] a := iSup₂_le_iSup _ _ _ ≤ ⨆ i, 𝓝[f i] a := iSup_mono fun i ↦ nhdsWithin_mono _ inter_subset_left #align locally_finite.nhds_within_Union LocallyFinite.nhdsWithin_iUnion theorem continuousOn_iUnion' {g : X → Y} (hf : LocallyFinite f) (hc : ∀ i x, x ∈ closure (f i) → ContinuousWithinAt g (f i) x) : ContinuousOn g (⋃ i, f i) := by rintro x - rw [ContinuousWithinAt, hf.nhdsWithin_iUnion, tendsto_iSup] intro i by_cases hx : x ∈ closure (f i) · exact hc i _ hx · rw [mem_closure_iff_nhdsWithin_neBot, not_neBot] at hx rw [hx] exact tendsto_bot #align locally_finite.continuous_on_Union' LocallyFinite.continuousOn_iUnion' theorem continuousOn_iUnion {g : X → Y} (hf : LocallyFinite f) (h_cl : ∀ i, IsClosed (f i)) (h_cont : ∀ i, ContinuousOn g (f i)) : ContinuousOn g (⋃ i, f i) := hf.continuousOn_iUnion' fun i x hx ↦ h_cont i x <\| (h_cl i).closure_subset hx #align locally_finite.continuous_on_Union LocallyFinite.continuousOn_iUnion protected theorem continuous' {g : X → Y} (hf : LocallyFinite f) (h_cov : ⋃ i, f i = univ) (hc : ∀ i x, x ∈ closure (f i) → ContinuousWithinAt g (f i) x) : Continuous g := continuous_iff_continuousOn_univ.2 <\| h_cov ▸ hf.continuousOn_iUnion' hc #align locally_finite.continuous' LocallyFinite.continuous' protected theorem continuous {g : X → Y} (hf : LocallyFinite f) (h_cov : ⋃ i, f i = univ) (h_cl : ∀ i, IsClosed (f i)) (h_cont : ∀ i, ContinuousOn g (f i)) : Continuous g := continuous_iff_continuousOn_univ.2 <\| h_cov ▸ hf.continuousOn_iUnion h_cl h_cont #align locally_finite.continuous LocallyFinite.continuous protected theorem closure (hf : LocallyFinite f) : LocallyFinite fun i => closure (f i) := by intro x rcases hf x with ⟨s, hsx, hsf⟩ refine ⟨interior s, interior_mem_nhds.2 hsx, hsf.subset fun i hi => ?_⟩ exact (hi.mono isOpen_interior.closure_inter).of_closure.mono (inter_subset_inter_right _ interior_subset) #align locally_finite.closure LocallyFinite.closure theorem closure_iUnion (h : LocallyFinite f) : closure (⋃ i, f i) = ⋃ i, closure (f i) := by ext x simp only [mem_closure_iff_nhdsWithin_neBot, h.nhdsWithin_iUnion, iSup_neBot, mem_iUnion] #align locally_finite.closure_Union LocallyFinite.closure_iUnion theorem isClosed_iUnion (hf : LocallyFinite f) (hc : ∀ i, IsClosed (f i)) : IsClosed (⋃ i, f i) := by simp only [← closure_eq_iff_isClosed, hf.closure_iUnion, (hc _).closure_eq] #align locally_finite.is_closed_Union LocallyFinite.isClosed_iUnion /-- If `f : β → Set α` is a locally finite family of closed sets, then for any `x : α`, the intersection of the complements to `f i`, `x ∉ f i`, is a neighbourhood of `x`. -/	Mathlib/Topology/LocallyFinite.lean	141	146	theorem iInter_compl_mem_nhds (hf : LocallyFinite f) (hc : ∀ i, IsClosed (f i)) (x : X) : (⋂ (i) (_ : x ∉ f i), (f i)ᶜ) ∈ 𝓝 x := by	refine IsOpen.mem_nhds ?_ (mem_iInter₂.2 fun i => id) suffices IsClosed (⋃ i : { i // x ∉ f i }, f i) by rwa [← isOpen_compl_iff, compl_iUnion, iInter_subtype] at this exact (hf.comp_injective Subtype.val_injective).isClosed_iUnion fun i => hc _
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Analysis.BoxIntegral.Partition.Basic #align_import analysis.box_integral.partition.split from "leanprover-community/mathlib"@"6ca1a09bc9aa75824bf97388c9e3b441fc4ccf3f" /-! # Split a box along one or more hyperplanes ## Main definitions A hyperplane `{x : ι → ℝ \| x i = a}` splits a rectangular box `I : BoxIntegral.Box ι` into two smaller boxes. If `a ∉ Ioo (I.lower i, I.upper i)`, then one of these boxes is empty, so it is not a box in the sense of `BoxIntegral.Box`. We introduce the following definitions. * `BoxIntegral.Box.splitLower I i a` and `BoxIntegral.Box.splitUpper I i a` are these boxes (as `WithBot (BoxIntegral.Box ι)`); * `BoxIntegral.Prepartition.split I i a` is the partition of `I` made of these two boxes (or of one box `I` if one of these boxes is empty); * `BoxIntegral.Prepartition.splitMany I s`, where `s : Finset (ι × ℝ)` is a finite set of hyperplanes `{x : ι → ℝ \| x i = a}` encoded as pairs `(i, a)`, is the partition of `I` made by cutting it along all the hyperplanes in `s`. ## Main results The main result `BoxIntegral.Prepartition.exists_iUnion_eq_diff` says that any prepartition `π` of `I` admits a prepartition `π'` of `I` that covers exactly `I \ π.iUnion`. One of these prepartitions is available as `BoxIntegral.Prepartition.compl`. ## Tags rectangular box, partition, hyperplane -/ noncomputable section open scoped Classical open Filter open Function Set Filter namespace BoxIntegral variable {ι M : Type*} {n : ℕ} namespace Box variable {I : Box ι} {i : ι} {x : ℝ} {y : ι → ℝ} /-- Given a box `I` and `x ∈ (I.lower i, I.upper i)`, the hyperplane `{y : ι → ℝ \| y i = x}` splits `I` into two boxes. `BoxIntegral.Box.splitLower I i x` is the box `I ∩ {y \| y i ≤ x}` (if it is nonempty). As usual, we represent a box that may be empty as `WithBot (BoxIntegral.Box ι)`. -/ def splitLower (I : Box ι) (i : ι) (x : ℝ) : WithBot (Box ι) := mk' I.lower (update I.upper i (min x (I.upper i))) #align box_integral.box.split_lower BoxIntegral.Box.splitLower @[simp] theorem coe_splitLower : (splitLower I i x : Set (ι → ℝ)) = ↑I ∩ { y \| y i ≤ x } := by rw [splitLower, coe_mk'] ext y simp only [mem_univ_pi, mem_Ioc, mem_inter_iff, mem_coe, mem_setOf_eq, forall_and, ← Pi.le_def, le_update_iff, le_min_iff, and_assoc, and_forall_ne (p := fun j => y j ≤ upper I j) i, mem_def] rw [and_comm (a := y i ≤ x)] #align box_integral.box.coe_split_lower BoxIntegral.Box.coe_splitLower theorem splitLower_le : I.splitLower i x ≤ I := withBotCoe_subset_iff.1 <\| by simp #align box_integral.box.split_lower_le BoxIntegral.Box.splitLower_le @[simp]	Mathlib/Analysis/BoxIntegral/Partition/Split.lean	78	80	theorem splitLower_eq_bot {i x} : I.splitLower i x = ⊥ ↔ x ≤ I.lower i := by	rw [splitLower, mk'_eq_bot, exists_update_iff I.upper fun j y => y ≤ I.lower j] simp [(I.lower_lt_upper _).not_le]
/- Copyright (c) 2020 Patrick Stevens. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Patrick Stevens, Bolton Bailey -/ import Mathlib.Data.Nat.Choose.Factorization import Mathlib.NumberTheory.Primorial import Mathlib.Analysis.Convex.SpecificFunctions.Basic import Mathlib.Analysis.Convex.SpecificFunctions.Deriv import Mathlib.Tactic.NormNum.Prime #align_import number_theory.bertrand from "leanprover-community/mathlib"@"a16665637b378379689c566204817ae792ac8b39" /-! # Bertrand's Postulate This file contains a proof of Bertrand's postulate: That between any positive number and its double there is a prime. The proof follows the outline of the Erdős proof presented in "Proofs from THE BOOK": One considers the prime factorization of `(2 * n).choose n`, and splits the constituent primes up into various groups, then upper bounds the contribution of each group. This upper bounds the central binomial coefficient, and if the postulate does not hold, this upper bound conflicts with a simple lower bound for large enough `n`. This proves the result holds for large enough `n`, and for smaller `n` an explicit list of primes is provided which covers the remaining cases. As in the [Metamath implementation](carneiro2015arithmetic), we rely on some optimizations from [Shigenori Tochiori](tochiori_bertrand). In particular we use the cleaner bound on the central binomial coefficient given in `Nat.four_pow_lt_mul_centralBinom`. ## References * [M. Aigner and G. M. Ziegler _Proofs from THE BOOK_][aigner1999proofs] * [S. Tochiori, _Considering the Proof of “There is a Prime between n and 2n”_][tochiori_bertrand] * [M. Carneiro, _Arithmetic in Metamath, Case Study: Bertrand's Postulate_][carneiro2015arithmetic] ## Tags Bertrand, prime, binomial coefficients -/ section Real open Real namespace Bertrand /-- A reified version of the `Bertrand.main_inequality` below. This is not best possible: it actually holds for 464 ≤ x. -/ theorem real_main_inequality {x : ℝ} (x_large : (512 : ℝ) ≤ x) : x * (2 * x) ^ √(2 * x) * 4 ^ (2 * x / 3) ≤ 4 ^ x := by let f : ℝ → ℝ := fun x => log x + √(2 * x) * log (2 * x) - log 4 / 3 * x have hf' : ∀ x, 0 < x → 0 < x * (2 * x) ^ √(2 * x) / 4 ^ (x / 3) := fun x h => div_pos (mul_pos h (rpow_pos_of_pos (mul_pos two_pos h) _)) (rpow_pos_of_pos four_pos _) have hf : ∀ x, 0 < x → f x = log (x * (2 * x) ^ √(2 * x) / 4 ^ (x / 3)) := by intro x h5 have h6 := mul_pos (zero_lt_two' ℝ) h5 have h7 := rpow_pos_of_pos h6 (√(2 * x)) rw [log_div (mul_pos h5 h7).ne' (rpow_pos_of_pos four_pos _).ne', log_mul h5.ne' h7.ne', log_rpow h6, log_rpow zero_lt_four, ← mul_div_right_comm, ← mul_div, mul_comm x] have h5 : 0 < x := lt_of_lt_of_le (by norm_num1) x_large rw [← div_le_one (rpow_pos_of_pos four_pos x), ← div_div_eq_mul_div, ← rpow_sub four_pos, ← mul_div 2 x, mul_div_left_comm, ← mul_one_sub, (by norm_num1 : (1 : ℝ) - 2 / 3 = 1 / 3), mul_one_div, ← log_nonpos_iff (hf' x h5), ← hf x h5] -- porting note (#11083): the proof was rewritten, because it was too slow have h : ConcaveOn ℝ (Set.Ioi 0.5) f := by apply ConcaveOn.sub · apply ConcaveOn.add · exact strictConcaveOn_log_Ioi.concaveOn.subset (Set.Ioi_subset_Ioi (by norm_num)) (convex_Ioi 0.5) convert ((strictConcaveOn_sqrt_mul_log_Ioi.concaveOn.comp_linearMap ((2 : ℝ) • LinearMap.id))) using 1 ext x simp only [Set.mem_Ioi, Set.mem_preimage, LinearMap.smul_apply, LinearMap.id_coe, id_eq, smul_eq_mul] rw [← mul_lt_mul_left (two_pos)] norm_num1 rfl apply ConvexOn.smul · refine div_nonneg (log_nonneg (by norm_num1)) (by norm_num1) · exact convexOn_id (convex_Ioi (0.5 : ℝ)) suffices ∃ x1 x2, 0.5 < x1 ∧ x1 < x2 ∧ x2 ≤ x ∧ 0 ≤ f x1 ∧ f x2 ≤ 0 by obtain ⟨x1, x2, h1, h2, h0, h3, h4⟩ := this exact (h.right_le_of_le_left'' h1 ((h1.trans h2).trans_le h0) h2 h0 (h4.trans h3)).trans h4 refine ⟨18, 512, by norm_num1, by norm_num1, x_large, ?_, ?_⟩ · have : √(2 * 18 : ℝ) = 6 := (sqrt_eq_iff_mul_self_eq_of_pos (by norm_num1)).mpr (by norm_num1) rw [hf _ (by norm_num1), log_nonneg_iff (by positivity), this, one_le_div (by norm_num1)] norm_num1 · have : √(2 * 512) = 32 := (sqrt_eq_iff_mul_self_eq_of_pos (by norm_num1)).mpr (by norm_num1) rw [hf _ (by norm_num1), log_nonpos_iff (hf' _ (by norm_num1)), this, div_le_one (by positivity)] conv in 512 => equals 2 ^ 9 => norm_num1 conv in 2 * 512 => equals 2 ^ 10 => norm_num1 conv in 32 => rw [← Nat.cast_ofNat] rw [rpow_natCast, ← pow_mul, ← pow_add] conv in 4 => equals 2 ^ (2 : ℝ) => rw [rpow_two]; norm_num1 rw [← rpow_mul, ← rpow_natCast] on_goal 1 => apply rpow_le_rpow_of_exponent_le all_goals norm_num1 #align bertrand.real_main_inequality Bertrand.real_main_inequality end Bertrand end Real section Nat open Nat /-- The inequality which contradicts Bertrand's postulate, for large enough `n`. -/ theorem bertrand_main_inequality {n : ℕ} (n_large : 512 ≤ n) : n * (2 * n) ^ sqrt (2 * n) * 4 ^ (2 * n / 3) ≤ 4 ^ n := by rw [← @cast_le ℝ] simp only [cast_add, cast_one, cast_mul, cast_pow, ← Real.rpow_natCast] refine _root_.trans ?_ (Bertrand.real_main_inequality (by exact_mod_cast n_large)) gcongr · have n2_pos : 0 < 2 * n := by positivity exact mod_cast n2_pos · exact_mod_cast Real.nat_sqrt_le_real_sqrt · norm_num1 · exact cast_div_le.trans (by norm_cast) #align bertrand_main_inequality bertrand_main_inequality /-- A lemma that tells us that, in the case where Bertrand's postulate does not hold, the prime factorization of the central binomial coefficent only has factors at most `2 * n / 3 + 1`. -/	Mathlib/NumberTheory/Bertrand.lean	131	144	theorem centralBinom_factorization_small (n : ℕ) (n_large : 2 < n) (no_prime : ¬∃ p : ℕ, p.Prime ∧ n < p ∧ p ≤ 2 * n) : centralBinom n = ∏ p ∈ Finset.range (2 * n / 3 + 1), p ^ (centralBinom n).factorization p := by	refine (Eq.trans ?_ n.prod_pow_factorization_centralBinom).symm apply Finset.prod_subset · exact Finset.range_subset.2 (add_le_add_right (Nat.div_le_self _ _) _) intro x hx h2x rw [Finset.mem_range, Nat.lt_succ_iff] at hx h2x rw [not_le, div_lt_iff_lt_mul' three_pos, mul_comm x] at h2x replace no_prime := not_exists.mp no_prime x rw [← and_assoc, not_and', not_and_or, not_lt] at no_prime cases' no_prime hx with h h · rw [factorization_eq_zero_of_non_prime n.centralBinom h, Nat.pow_zero] · rw [factorization_centralBinom_of_two_mul_self_lt_three_mul n_large h h2x, Nat.pow_zero]
/- Copyright (c) 2022 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Order.Filter.Prod #align_import order.filter.n_ary from "leanprover-community/mathlib"@"78f647f8517f021d839a7553d5dc97e79b508dea" /-! # N-ary maps of filter This file defines the binary and ternary maps of filters. This is mostly useful to define pointwise operations on filters. ## Main declarations * `Filter.map₂`: Binary map of filters. ## Notes This file is very similar to `Data.Set.NAry`, `Data.Finset.NAry` and `Data.Option.NAry`. Please keep them in sync. -/ open Function Set open Filter namespace Filter variable {α α' β β' γ γ' δ δ' ε ε' : Type*} {m : α → β → γ} {f f₁ f₂ : Filter α} {g g₁ g₂ : Filter β} {h h₁ h₂ : Filter γ} {s s₁ s₂ : Set α} {t t₁ t₂ : Set β} {u : Set γ} {v : Set δ} {a : α} {b : β} {c : γ} /-- The image of a binary function `m : α → β → γ` as a function `Filter α → Filter β → Filter γ`. Mathematically this should be thought of as the image of the corresponding function `α × β → γ`. -/ def map₂ (m : α → β → γ) (f : Filter α) (g : Filter β) : Filter γ := ((f ×ˢ g).map (uncurry m)).copy { s \| ∃ u ∈ f, ∃ v ∈ g, image2 m u v ⊆ s } fun _ ↦ by simp only [mem_map, mem_prod_iff, image2_subset_iff, prod_subset_iff]; rfl #align filter.map₂ Filter.map₂ @[simp 900] theorem mem_map₂_iff : u ∈ map₂ m f g ↔ ∃ s ∈ f, ∃ t ∈ g, image2 m s t ⊆ u := Iff.rfl #align filter.mem_map₂_iff Filter.mem_map₂_iff theorem image2_mem_map₂ (hs : s ∈ f) (ht : t ∈ g) : image2 m s t ∈ map₂ m f g := ⟨_, hs, _, ht, Subset.rfl⟩ #align filter.image2_mem_map₂ Filter.image2_mem_map₂ theorem map_prod_eq_map₂ (m : α → β → γ) (f : Filter α) (g : Filter β) : Filter.map (fun p : α × β => m p.1 p.2) (f ×ˢ g) = map₂ m f g := by rw [map₂, copy_eq, uncurry_def] #align filter.map_prod_eq_map₂ Filter.map_prod_eq_map₂ theorem map_prod_eq_map₂' (m : α × β → γ) (f : Filter α) (g : Filter β) : Filter.map m (f ×ˢ g) = map₂ (fun a b => m (a, b)) f g := map_prod_eq_map₂ (curry m) f g #align filter.map_prod_eq_map₂' Filter.map_prod_eq_map₂' @[simp] theorem map₂_mk_eq_prod (f : Filter α) (g : Filter β) : map₂ Prod.mk f g = f ×ˢ g := by simp only [← map_prod_eq_map₂, map_id'] #align filter.map₂_mk_eq_prod Filter.map₂_mk_eq_prod -- lemma image2_mem_map₂_iff (hm : injective2 m) : image2 m s t ∈ map₂ m f g ↔ s ∈ f ∧ t ∈ g := -- ⟨by { rintro ⟨u, v, hu, hv, h⟩, rw image2_subset_image2_iff hm at h, -- exact ⟨mem_of_superset hu h.1, mem_of_superset hv h.2⟩ }, λ h, image2_mem_map₂ h.1 h.2⟩ theorem map₂_mono (hf : f₁ ≤ f₂) (hg : g₁ ≤ g₂) : map₂ m f₁ g₁ ≤ map₂ m f₂ g₂ := fun _ ⟨s, hs, t, ht, hst⟩ => ⟨s, hf hs, t, hg ht, hst⟩ #align filter.map₂_mono Filter.map₂_mono theorem map₂_mono_left (h : g₁ ≤ g₂) : map₂ m f g₁ ≤ map₂ m f g₂ := map₂_mono Subset.rfl h #align filter.map₂_mono_left Filter.map₂_mono_left theorem map₂_mono_right (h : f₁ ≤ f₂) : map₂ m f₁ g ≤ map₂ m f₂ g := map₂_mono h Subset.rfl #align filter.map₂_mono_right Filter.map₂_mono_right @[simp] theorem le_map₂_iff {h : Filter γ} : h ≤ map₂ m f g ↔ ∀ ⦃s⦄, s ∈ f → ∀ ⦃t⦄, t ∈ g → image2 m s t ∈ h := ⟨fun H _ hs _ ht => H <\| image2_mem_map₂ hs ht, fun H _ ⟨_, hs, _, ht, hu⟩ => mem_of_superset (H hs ht) hu⟩ #align filter.le_map₂_iff Filter.le_map₂_iff @[simp] theorem map₂_eq_bot_iff : map₂ m f g = ⊥ ↔ f = ⊥ ∨ g = ⊥ := by simp [← map_prod_eq_map₂] #align filter.map₂_eq_bot_iff Filter.map₂_eq_bot_iff @[simp] theorem map₂_bot_left : map₂ m ⊥ g = ⊥ := map₂_eq_bot_iff.2 <\| .inl rfl #align filter.map₂_bot_left Filter.map₂_bot_left @[simp] theorem map₂_bot_right : map₂ m f ⊥ = ⊥ := map₂_eq_bot_iff.2 <\| .inr rfl #align filter.map₂_bot_right Filter.map₂_bot_right @[simp] theorem map₂_neBot_iff : (map₂ m f g).NeBot ↔ f.NeBot ∧ g.NeBot := by simp [neBot_iff, not_or] #align filter.map₂_ne_bot_iff Filter.map₂_neBot_iff protected theorem NeBot.map₂ (hf : f.NeBot) (hg : g.NeBot) : (map₂ m f g).NeBot := map₂_neBot_iff.2 ⟨hf, hg⟩ #align filter.ne_bot.map₂ Filter.NeBot.map₂ instance map₂.neBot [NeBot f] [NeBot g] : NeBot (map₂ m f g) := .map₂ ‹_› ‹_› theorem NeBot.of_map₂_left (h : (map₂ m f g).NeBot) : f.NeBot := (map₂_neBot_iff.1 h).1 #align filter.ne_bot.of_map₂_left Filter.NeBot.of_map₂_left theorem NeBot.of_map₂_right (h : (map₂ m f g).NeBot) : g.NeBot := (map₂_neBot_iff.1 h).2 #align filter.ne_bot.of_map₂_right Filter.NeBot.of_map₂_right	Mathlib/Order/Filter/NAry.lean	120	121	theorem map₂_sup_left : map₂ m (f₁ ⊔ f₂) g = map₂ m f₁ g ⊔ map₂ m f₂ g := by	simp_rw [← map_prod_eq_map₂, sup_prod, map_sup]
/- Copyright (c) 2022 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Topology.MetricSpace.HausdorffDistance #align_import topology.metric_space.pi_nat from "leanprover-community/mathlib"@"49b7f94aab3a3bdca1f9f34c5d818afb253b3993" /-! # Topological study of spaces `Π (n : ℕ), E n` When `E n` are topological spaces, the space `Π (n : ℕ), E n` is naturally a topological space (with the product topology). When `E n` are uniform spaces, it also inherits a uniform structure. However, it does not inherit a canonical metric space structure of the `E n`. Nevertheless, one can put a noncanonical metric space structure (or rather, several of them). This is done in this file. ## Main definitions and results One can define a combinatorial distance on `Π (n : ℕ), E n`, as follows: * `PiNat.cylinder x n` is the set of points `y` with `x i = y i` for `i < n`. * `PiNat.firstDiff x y` is the first index at which `x i ≠ y i`. * `PiNat.dist x y` is equal to `(1/2) ^ (firstDiff x y)`. It defines a distance on `Π (n : ℕ), E n`, compatible with the topology when the `E n` have the discrete topology. * `PiNat.metricSpace`: the metric space structure, given by this distance. Not registered as an instance. This space is a complete metric space. * `PiNat.metricSpaceOfDiscreteUniformity`: the same metric space structure, but adjusting the uniformity defeqness when the `E n` already have the discrete uniformity. Not registered as an instance * `PiNat.metricSpaceNatNat`: the particular case of `ℕ → ℕ`, not registered as an instance. These results are used to construct continuous functions on `Π n, E n`: * `PiNat.exists_retraction_of_isClosed`: given a nonempty closed subset `s` of `Π (n : ℕ), E n`, there exists a retraction onto `s`, i.e., a continuous map from the whole space to `s` restricting to the identity on `s`. * `exists_nat_nat_continuous_surjective_of_completeSpace`: given any nonempty complete metric space with second-countable topology, there exists a continuous surjection from `ℕ → ℕ` onto this space. One can also put distances on `Π (i : ι), E i` when the spaces `E i` are metric spaces (not discrete in general), and `ι` is countable. * `PiCountable.dist` is the distance on `Π i, E i` given by `dist x y = ∑' i, min (1/2)^(encode i) (dist (x i) (y i))`. * `PiCountable.metricSpace` is the corresponding metric space structure, adjusted so that the uniformity is definitionally the product uniformity. Not registered as an instance. -/ noncomputable section open scoped Classical open Topology Filter open TopologicalSpace Set Metric Filter Function attribute [local simp] pow_le_pow_iff_right one_lt_two inv_le_inv zero_le_two zero_lt_two variable {E : ℕ → Type} namespace PiNat /-! ### The firstDiff function -/ /-- In a product space `Π n, E n`, then `firstDiff x y` is the first index at which `x` and `y` differ. If `x = y`, then by convention we set `firstDiff x x = 0`. -/ irreducible_def firstDiff (x y : ∀ n, E n) : ℕ := if h : x ≠ y then Nat.find (ne_iff.1 h) else 0 #align pi_nat.first_diff PiNat.firstDiff theorem apply_firstDiff_ne {x y : ∀ n, E n} (h : x ≠ y) : x (firstDiff x y) ≠ y (firstDiff x y) := by rw [firstDiff_def, dif_pos h] exact Nat.find_spec (ne_iff.1 h) #align pi_nat.apply_first_diff_ne PiNat.apply_firstDiff_ne theorem apply_eq_of_lt_firstDiff {x y : ∀ n, E n} {n : ℕ} (hn : n < firstDiff x y) : x n = y n := by rw [firstDiff_def] at hn split_ifs at hn with h · convert Nat.find_min (ne_iff.1 h) hn simp · exact (not_lt_zero' hn).elim #align pi_nat.apply_eq_of_lt_first_diff PiNat.apply_eq_of_lt_firstDiff theorem firstDiff_comm (x y : ∀ n, E n) : firstDiff x y = firstDiff y x := by simp only [firstDiff_def, ne_comm] #align pi_nat.first_diff_comm PiNat.firstDiff_comm theorem min_firstDiff_le (x y z : ∀ n, E n) (h : x ≠ z) : min (firstDiff x y) (firstDiff y z) ≤ firstDiff x z := by by_contra! H rw [lt_min_iff] at H refine apply_firstDiff_ne h ?_ calc x (firstDiff x z) = y (firstDiff x z) := apply_eq_of_lt_firstDiff H.1 _ = z (firstDiff x z) := apply_eq_of_lt_firstDiff H.2 #align pi_nat.min_first_diff_le PiNat.min_firstDiff_le /-! ### Cylinders -/ /-- In a product space `Π n, E n`, the cylinder set of length `n` around `x`, denoted `cylinder x n`, is the set of sequences `y` that coincide with `x` on the first `n` symbols, i.e., such that `y i = x i` for all `i < n`. -/ def cylinder (x : ∀ n, E n) (n : ℕ) : Set (∀ n, E n) := { y \| ∀ i, i < n → y i = x i } #align pi_nat.cylinder PiNat.cylinder theorem cylinder_eq_pi (x : ∀ n, E n) (n : ℕ) : cylinder x n = Set.pi (Finset.range n : Set ℕ) fun i : ℕ => {x i} := by ext y simp [cylinder] #align pi_nat.cylinder_eq_pi PiNat.cylinder_eq_pi @[simp] theorem cylinder_zero (x : ∀ n, E n) : cylinder x 0 = univ := by simp [cylinder_eq_pi] #align pi_nat.cylinder_zero PiNat.cylinder_zero theorem cylinder_anti (x : ∀ n, E n) {m n : ℕ} (h : m ≤ n) : cylinder x n ⊆ cylinder x m := fun _y hy i hi => hy i (hi.trans_le h) #align pi_nat.cylinder_anti PiNat.cylinder_anti @[simp] theorem mem_cylinder_iff {x y : ∀ n, E n} {n : ℕ} : y ∈ cylinder x n ↔ ∀ i < n, y i = x i := Iff.rfl #align pi_nat.mem_cylinder_iff PiNat.mem_cylinder_iff theorem self_mem_cylinder (x : ∀ n, E n) (n : ℕ) : x ∈ cylinder x n := by simp #align pi_nat.self_mem_cylinder PiNat.self_mem_cylinder theorem mem_cylinder_iff_eq {x y : ∀ n, E n} {n : ℕ} : y ∈ cylinder x n ↔ cylinder y n = cylinder x n := by constructor · intro hy apply Subset.antisymm · intro z hz i hi rw [← hy i hi] exact hz i hi · intro z hz i hi rw [hy i hi] exact hz i hi · intro h rw [← h] exact self_mem_cylinder _ _ #align pi_nat.mem_cylinder_iff_eq PiNat.mem_cylinder_iff_eq theorem mem_cylinder_comm (x y : ∀ n, E n) (n : ℕ) : y ∈ cylinder x n ↔ x ∈ cylinder y n := by simp [mem_cylinder_iff_eq, eq_comm] #align pi_nat.mem_cylinder_comm PiNat.mem_cylinder_comm theorem mem_cylinder_iff_le_firstDiff {x y : ∀ n, E n} (hne : x ≠ y) (i : ℕ) : x ∈ cylinder y i ↔ i ≤ firstDiff x y := by constructor · intro h by_contra! exact apply_firstDiff_ne hne (h _ this) · intro hi j hj exact apply_eq_of_lt_firstDiff (hj.trans_le hi) #align pi_nat.mem_cylinder_iff_le_first_diff PiNat.mem_cylinder_iff_le_firstDiff theorem mem_cylinder_firstDiff (x y : ∀ n, E n) : x ∈ cylinder y (firstDiff x y) := fun _i hi => apply_eq_of_lt_firstDiff hi #align pi_nat.mem_cylinder_first_diff PiNat.mem_cylinder_firstDiff theorem cylinder_eq_cylinder_of_le_firstDiff (x y : ∀ n, E n) {n : ℕ} (hn : n ≤ firstDiff x y) : cylinder x n = cylinder y n := by rw [← mem_cylinder_iff_eq] intro i hi exact apply_eq_of_lt_firstDiff (hi.trans_le hn) #align pi_nat.cylinder_eq_cylinder_of_le_first_diff PiNat.cylinder_eq_cylinder_of_le_firstDiff theorem iUnion_cylinder_update (x : ∀ n, E n) (n : ℕ) : ⋃ k, cylinder (update x n k) (n + 1) = cylinder x n := by ext y simp only [mem_cylinder_iff, mem_iUnion] constructor · rintro ⟨k, hk⟩ i hi simpa [hi.ne] using hk i (Nat.lt_succ_of_lt hi) · intro H refine ⟨y n, fun i hi => ?_⟩ rcases Nat.lt_succ_iff_lt_or_eq.1 hi with (h'i \| rfl) · simp [H i h'i, h'i.ne] · simp #align pi_nat.Union_cylinder_update PiNat.iUnion_cylinder_update theorem update_mem_cylinder (x : ∀ n, E n) (n : ℕ) (y : E n) : update x n y ∈ cylinder x n := mem_cylinder_iff.2 fun i hi => by simp [hi.ne] #align pi_nat.update_mem_cylinder PiNat.update_mem_cylinder section Res variable {α : Type} open List /-- In the case where `E` has constant value `α`, the cylinder `cylinder x n` can be identified with the element of `List α` consisting of the first `n` entries of `x`. See `cylinder_eq_res`. We call this list `res x n`, the restriction of `x` to `n`. -/ def res (x : ℕ → α) : ℕ → List α \| 0 => nil \| Nat.succ n => x n :: res x n #align pi_nat.res PiNat.res @[simp] theorem res_zero (x : ℕ → α) : res x 0 = @nil α := rfl #align pi_nat.res_zero PiNat.res_zero @[simp] theorem res_succ (x : ℕ → α) (n : ℕ) : res x n.succ = x n :: res x n := rfl #align pi_nat.res_succ PiNat.res_succ @[simp] theorem res_length (x : ℕ → α) (n : ℕ) : (res x n).length = n := by induction n <;> simp [] #align pi_nat.res_length PiNat.res_length /-- The restrictions of `x` and `y` to `n` are equal if and only if `x m = y m` for all `m < n`. -/ theorem res_eq_res {x y : ℕ → α} {n : ℕ} : res x n = res y n ↔ ∀ ⦃m⦄, m < n → x m = y m := by constructor <;> intro h <;> induction' n with n ih; · simp · intro m hm rw [Nat.lt_succ_iff_lt_or_eq] at hm simp only [res_succ, cons.injEq] at h cases' hm with hm hm · exact ih h.2 hm rw [hm] exact h.1 · simp simp only [res_succ, cons.injEq] refine ⟨h (Nat.lt_succ_self _), ih fun m hm => ?_⟩ exact h (hm.trans (Nat.lt_succ_self _)) #align pi_nat.res_eq_res PiNat.res_eq_res theorem res_injective : Injective (@res α) := by intro x y h ext n apply res_eq_res.mp _ (Nat.lt_succ_self _) rw [h] #align pi_nat.res_injective PiNat.res_injective /-- `cylinder x n` is equal to the set of sequences `y` with the same restriction to `n` as `x`. -/ theorem cylinder_eq_res (x : ℕ → α) (n : ℕ) : cylinder x n = { y \| res y n = res x n } := by ext y dsimp [cylinder] rw [res_eq_res] #align pi_nat.cylinder_eq_res PiNat.cylinder_eq_res end Res /-! ### A distance function on `Π n, E n` We define a distance function on `Π n, E n`, given by `dist x y = (1/2)^n` where `n` is the first index at which `x` and `y` differ. When each `E n` has the discrete topology, this distance will define the right topology on the product space. We do not record a global `Dist` instance nor a `MetricSpace` instance, as other distances may be used on these spaces, but we register them as local instances in this section. -/ /-- The distance function on a product space `Π n, E n`, given by `dist x y = (1/2)^n` where `n` is the first index at which `x` and `y` differ. -/ protected def dist : Dist (∀ n, E n) := ⟨fun x y => if x ≠ y then (1 / 2 : ℝ) ^ firstDiff x y else 0⟩ #align pi_nat.has_dist PiNat.dist attribute [local instance] PiNat.dist theorem dist_eq_of_ne {x y : ∀ n, E n} (h : x ≠ y) : dist x y = (1 / 2 : ℝ) ^ firstDiff x y := by simp [dist, h] #align pi_nat.dist_eq_of_ne PiNat.dist_eq_of_ne protected theorem dist_self (x : ∀ n, E n) : dist x x = 0 := by simp [dist] #align pi_nat.dist_self PiNat.dist_self protected theorem dist_comm (x y : ∀ n, E n) : dist x y = dist y x := by simp [dist, @eq_comm _ x y, firstDiff_comm] #align pi_nat.dist_comm PiNat.dist_comm protected theorem dist_nonneg (x y : ∀ n, E n) : 0 ≤ dist x y := by rcases eq_or_ne x y with (rfl \| h) · simp [dist] · simp [dist, h, zero_le_two] #align pi_nat.dist_nonneg PiNat.dist_nonneg theorem dist_triangle_nonarch (x y z : ∀ n, E n) : dist x z ≤ max (dist x y) (dist y z) := by rcases eq_or_ne x z with (rfl \| hxz) · simp [PiNat.dist_self x, PiNat.dist_nonneg] rcases eq_or_ne x y with (rfl \| hxy) · simp rcases eq_or_ne y z with (rfl \| hyz) · simp simp only [dist_eq_of_ne, hxz, hxy, hyz, inv_le_inv, one_div, inv_pow, zero_lt_two, Ne, not_false_iff, le_max_iff, pow_le_pow_iff_right, one_lt_two, pow_pos, min_le_iff.1 (min_firstDiff_le x y z hxz)] #align pi_nat.dist_triangle_nonarch PiNat.dist_triangle_nonarch protected theorem dist_triangle (x y z : ∀ n, E n) : dist x z ≤ dist x y + dist y z := calc dist x z ≤ max (dist x y) (dist y z) := dist_triangle_nonarch x y z _ ≤ dist x y + dist y z := max_le_add_of_nonneg (PiNat.dist_nonneg _ _) (PiNat.dist_nonneg _ _) #align pi_nat.dist_triangle PiNat.dist_triangle protected theorem eq_of_dist_eq_zero (x y : ∀ n, E n) (hxy : dist x y = 0) : x = y := by rcases eq_or_ne x y with (rfl \| h); · rfl simp [dist_eq_of_ne h] at hxy #align pi_nat.eq_of_dist_eq_zero PiNat.eq_of_dist_eq_zero theorem mem_cylinder_iff_dist_le {x y : ∀ n, E n} {n : ℕ} : y ∈ cylinder x n ↔ dist y x ≤ (1 / 2) ^ n := by rcases eq_or_ne y x with (rfl \| hne) · simp [PiNat.dist_self] suffices (∀ i : ℕ, i < n → y i = x i) ↔ n ≤ firstDiff y x by simpa [dist_eq_of_ne hne] constructor · intro hy by_contra! H exact apply_firstDiff_ne hne (hy _ H) · intro h i hi exact apply_eq_of_lt_firstDiff (hi.trans_le h) #align pi_nat.mem_cylinder_iff_dist_le PiNat.mem_cylinder_iff_dist_le theorem apply_eq_of_dist_lt {x y : ∀ n, E n} {n : ℕ} (h : dist x y < (1 / 2) ^ n) {i : ℕ} (hi : i ≤ n) : x i = y i := by rcases eq_or_ne x y with (rfl \| hne) · rfl have : n < firstDiff x y := by simpa [dist_eq_of_ne hne, inv_lt_inv, pow_lt_pow_iff_right, one_lt_two] using h exact apply_eq_of_lt_firstDiff (hi.trans_lt this) #align pi_nat.apply_eq_of_dist_lt PiNat.apply_eq_of_dist_lt /-- A function to a pseudo-metric-space is `1`-Lipschitz if and only if points in the same cylinder of length `n` are sent to points within distance `(1/2)^n`. Not expressed using `LipschitzWith` as we don't have a metric space structure -/ theorem lipschitz_with_one_iff_forall_dist_image_le_of_mem_cylinder {α : Type} [PseudoMetricSpace α] {f : (∀ n, E n) → α} : (∀ x y : ∀ n, E n, dist (f x) (f y) ≤ dist x y) ↔ ∀ x y n, y ∈ cylinder x n → dist (f x) (f y) ≤ (1 / 2) ^ n := by constructor · intro H x y n hxy apply (H x y).trans rw [PiNat.dist_comm] exact mem_cylinder_iff_dist_le.1 hxy · intro H x y rcases eq_or_ne x y with (rfl \| hne) · simp [PiNat.dist_nonneg] rw [dist_eq_of_ne hne] apply H x y (firstDiff x y) rw [firstDiff_comm] exact mem_cylinder_firstDiff _ _ #align pi_nat.lipschitz_with_one_iff_forall_dist_image_le_of_mem_cylinder PiNat.lipschitz_with_one_iff_forall_dist_image_le_of_mem_cylinder variable (E) variable [∀ n, TopologicalSpace (E n)] [∀ n, DiscreteTopology (E n)] theorem isOpen_cylinder (x : ∀ n, E n) (n : ℕ) : IsOpen (cylinder x n) := by rw [PiNat.cylinder_eq_pi] exact isOpen_set_pi (Finset.range n).finite_toSet fun a _ => isOpen_discrete _ #align pi_nat.is_open_cylinder PiNat.isOpen_cylinder theorem isTopologicalBasis_cylinders : IsTopologicalBasis { s : Set (∀ n, E n) \| ∃ (x : ∀ n, E n) (n : ℕ), s = cylinder x n } := by apply isTopologicalBasis_of_isOpen_of_nhds · rintro u ⟨x, n, rfl⟩ apply isOpen_cylinder · intro x u hx u_open obtain ⟨v, ⟨U, F, -, rfl⟩, xU, Uu⟩ : ∃ v ∈ { S : Set (∀ i : ℕ, E i) \| ∃ (U : ∀ i : ℕ, Set (E i)) (F : Finset ℕ), (∀ i : ℕ, i ∈ F → U i ∈ { s : Set (E i) \| IsOpen s }) ∧ S = (F : Set ℕ).pi U }, x ∈ v ∧ v ⊆ u := (isTopologicalBasis_pi fun n : ℕ => isTopologicalBasis_opens).exists_subset_of_mem_open hx u_open rcases Finset.bddAbove F with ⟨n, hn⟩ refine ⟨cylinder x (n + 1), ⟨x, n + 1, rfl⟩, self_mem_cylinder _ _, Subset.trans ?_ Uu⟩ intro y hy suffices ∀ i : ℕ, i ∈ F → y i ∈ U i by simpa intro i hi have : y i = x i := mem_cylinder_iff.1 hy i ((hn hi).trans_lt (lt_add_one n)) rw [this] simp only [Set.mem_pi, Finset.mem_coe] at xU exact xU i hi #align pi_nat.is_topological_basis_cylinders PiNat.isTopologicalBasis_cylinders variable {E} theorem isOpen_iff_dist (s : Set (∀ n, E n)) : IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ∀ y, dist x y < ε → y ∈ s := by constructor · intro hs x hx obtain ⟨v, ⟨y, n, rfl⟩, h'x, h's⟩ : ∃ v ∈ { s \| ∃ (x : ∀ n : ℕ, E n) (n : ℕ), s = cylinder x n }, x ∈ v ∧ v ⊆ s := (isTopologicalBasis_cylinders E).exists_subset_of_mem_open hx hs rw [← mem_cylinder_iff_eq.1 h'x] at h's exact ⟨(1 / 2 : ℝ) ^ n, by simp, fun y hy => h's fun i hi => (apply_eq_of_dist_lt hy hi.le).symm⟩ · intro h refine (isTopologicalBasis_cylinders E).isOpen_iff.2 fun x hx => ?_ rcases h x hx with ⟨ε, εpos, hε⟩ obtain ⟨n, hn⟩ : ∃ n : ℕ, (1 / 2 : ℝ) ^ n < ε := exists_pow_lt_of_lt_one εpos one_half_lt_one refine ⟨cylinder x n, ⟨x, n, rfl⟩, self_mem_cylinder x n, fun y hy => hε y ?_⟩ rw [PiNat.dist_comm] exact (mem_cylinder_iff_dist_le.1 hy).trans_lt hn #align pi_nat.is_open_iff_dist PiNat.isOpen_iff_dist /-- Metric space structure on `Π (n : ℕ), E n` when the spaces `E n` have the discrete topology, where the distance is given by `dist x y = (1/2)^n`, where `n` is the smallest index where `x` and `y` differ. Not registered as a global instance by default. Warning: this definition makes sure that the topology is defeq to the original product topology, but it does not take care of a possible uniformity. If the `E n` have a uniform structure, then there will be two non-defeq uniform structures on `Π n, E n`, the product one and the one coming from the metric structure. In this case, use `metricSpaceOfDiscreteUniformity` instead. -/ protected def metricSpace : MetricSpace (∀ n, E n) := MetricSpace.ofDistTopology dist PiNat.dist_self PiNat.dist_comm PiNat.dist_triangle isOpen_iff_dist PiNat.eq_of_dist_eq_zero #align pi_nat.metric_space PiNat.metricSpace /-- Metric space structure on `Π (n : ℕ), E n` when the spaces `E n` have the discrete uniformity, where the distance is given by `dist x y = (1/2)^n`, where `n` is the smallest index where `x` and `y` differ. Not registered as a global instance by default. -/ protected def metricSpaceOfDiscreteUniformity {E : ℕ → Type} [∀ n, UniformSpace (E n)] (h : ∀ n, uniformity (E n) = 𝓟 idRel) : MetricSpace (∀ n, E n) := haveI : ∀ n, DiscreteTopology (E n) := fun n => discreteTopology_of_discrete_uniformity (h n) { dist_triangle := PiNat.dist_triangle dist_comm := PiNat.dist_comm dist_self := PiNat.dist_self eq_of_dist_eq_zero := PiNat.eq_of_dist_eq_zero _ _ edist_dist := fun _ _ ↦ by exact ENNReal.coe_nnreal_eq _ toUniformSpace := Pi.uniformSpace _ uniformity_dist := by simp [Pi.uniformity, comap_iInf, gt_iff_lt, preimage_setOf_eq, comap_principal, PseudoMetricSpace.uniformity_dist, h, idRel] apply le_antisymm · simp only [le_iInf_iff, le_principal_iff] intro ε εpos obtain ⟨n, hn⟩ : ∃ n, (1 / 2 : ℝ) ^ n < ε := exists_pow_lt_of_lt_one εpos (by norm_num) apply @mem_iInf_of_iInter _ _ _ _ _ (Finset.range n).finite_toSet fun i => { p : (∀ n : ℕ, E n) × ∀ n : ℕ, E n \| p.fst i = p.snd i } · simp only [mem_principal, setOf_subset_setOf, imp_self, imp_true_iff] · rintro ⟨x, y⟩ hxy simp only [Finset.mem_coe, Finset.mem_range, iInter_coe_set, mem_iInter, mem_setOf_eq] at hxy apply lt_of_le_of_lt _ hn rw [← mem_cylinder_iff_dist_le, mem_cylinder_iff] exact hxy · simp only [le_iInf_iff, le_principal_iff] intro n refine mem_iInf_of_mem ((1 / 2) ^ n : ℝ) ?_ refine mem_iInf_of_mem (by positivity) ?_ simp only [mem_principal, setOf_subset_setOf, Prod.forall] intro x y hxy exact apply_eq_of_dist_lt hxy le_rfl } #align pi_nat.metric_space_of_discrete_uniformity PiNat.metricSpaceOfDiscreteUniformity /-- Metric space structure on `ℕ → ℕ` where the distance is given by `dist x y = (1/2)^n`, where `n` is the smallest index where `x` and `y` differ. Not registered as a global instance by default. -/ def metricSpaceNatNat : MetricSpace (ℕ → ℕ) := PiNat.metricSpaceOfDiscreteUniformity fun _ => rfl #align pi_nat.metric_space_nat_nat PiNat.metricSpaceNatNat attribute [local instance] PiNat.metricSpace protected theorem completeSpace : CompleteSpace (∀ n, E n) := by refine Metric.complete_of_convergent_controlled_sequences (fun n => (1 / 2) ^ n) (by simp) ?_ intro u hu refine ⟨fun n => u n n, tendsto_pi_nhds.2 fun i => ?_⟩ refine tendsto_const_nhds.congr' ?_ filter_upwards [Filter.Ici_mem_atTop i] with n hn exact apply_eq_of_dist_lt (hu i i n le_rfl hn) le_rfl #align pi_nat.complete_space PiNat.completeSpace /-! ### Retractions inside product spaces We show that, in a space `Π (n : ℕ), E n` where each `E n` is discrete, there is a retraction on any closed nonempty subset `s`, i.e., a continuous map `f` from the whole space to `s` restricting to the identity on `s`. The map `f` is defined as follows. For `x ∈ s`, let `f x = x`. Otherwise, consider the longest prefix `w` that `x` shares with an element of `s`, and let `f x = z_w` where `z_w` is an element of `s` starting with `w`. -/ theorem exists_disjoint_cylinder {s : Set (∀ n, E n)} (hs : IsClosed s) {x : ∀ n, E n} (hx : x ∉ s) : ∃ n, Disjoint s (cylinder x n) := by rcases eq_empty_or_nonempty s with (rfl \| hne) · exact ⟨0, by simp⟩ have A : 0 < infDist x s := (hs.not_mem_iff_infDist_pos hne).1 hx obtain ⟨n, hn⟩ : ∃ n, (1 / 2 : ℝ) ^ n < infDist x s := exists_pow_lt_of_lt_one A one_half_lt_one refine ⟨n, disjoint_left.2 fun y ys hy => ?_⟩ apply lt_irrefl (infDist x s) calc infDist x s ≤ dist x y := infDist_le_dist_of_mem ys _ ≤ (1 / 2) ^ n := by rw [mem_cylinder_comm] at hy exact mem_cylinder_iff_dist_le.1 hy _ < infDist x s := hn #align pi_nat.exists_disjoint_cylinder PiNat.exists_disjoint_cylinder /-- Given a point `x` in a product space `Π (n : ℕ), E n`, and `s` a subset of this space, then `shortestPrefixDiff x s` if the smallest `n` for which there is no element of `s` having the same prefix of length `n` as `x`. If there is no such `n`, then use `0` by convention. -/ def shortestPrefixDiff {E : ℕ → Type} (x : ∀ n, E n) (s : Set (∀ n, E n)) : ℕ := if h : ∃ n, Disjoint s (cylinder x n) then Nat.find h else 0 #align pi_nat.shortest_prefix_diff PiNat.shortestPrefixDiff theorem firstDiff_lt_shortestPrefixDiff {s : Set (∀ n, E n)} (hs : IsClosed s) {x y : ∀ n, E n} (hx : x ∉ s) (hy : y ∈ s) : firstDiff x y < shortestPrefixDiff x s := by have A := exists_disjoint_cylinder hs hx rw [shortestPrefixDiff, dif_pos A] have B := Nat.find_spec A contrapose! B rw [not_disjoint_iff_nonempty_inter] refine ⟨y, hy, ?_⟩ rw [mem_cylinder_comm] exact cylinder_anti y B (mem_cylinder_firstDiff x y) #align pi_nat.first_diff_lt_shortest_prefix_diff PiNat.firstDiff_lt_shortestPrefixDiff theorem shortestPrefixDiff_pos {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) {x : ∀ n, E n} (hx : x ∉ s) : 0 < shortestPrefixDiff x s := by rcases hne with ⟨y, hy⟩ exact (zero_le _).trans_lt (firstDiff_lt_shortestPrefixDiff hs hx hy) #align pi_nat.shortest_prefix_diff_pos PiNat.shortestPrefixDiff_pos /-- Given a point `x` in a product space `Π (n : ℕ), E n`, and `s` a subset of this space, then `longestPrefix x s` if the largest `n` for which there is an element of `s` having the same prefix of length `n` as `x`. If there is no such `n`, use `0` by convention. -/ def longestPrefix {E : ℕ → Type} (x : ∀ n, E n) (s : Set (∀ n, E n)) : ℕ := shortestPrefixDiff x s - 1 #align pi_nat.longest_prefix PiNat.longestPrefix theorem firstDiff_le_longestPrefix {s : Set (∀ n, E n)} (hs : IsClosed s) {x y : ∀ n, E n} (hx : x ∉ s) (hy : y ∈ s) : firstDiff x y ≤ longestPrefix x s := by rw [longestPrefix, le_tsub_iff_right] · exact firstDiff_lt_shortestPrefixDiff hs hx hy · exact shortestPrefixDiff_pos hs ⟨y, hy⟩ hx #align pi_nat.first_diff_le_longest_prefix PiNat.firstDiff_le_longestPrefix theorem inter_cylinder_longestPrefix_nonempty {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) (x : ∀ n, E n) : (s ∩ cylinder x (longestPrefix x s)).Nonempty := by by_cases hx : x ∈ s · exact ⟨x, hx, self_mem_cylinder _ _⟩ have A := exists_disjoint_cylinder hs hx have B : longestPrefix x s < shortestPrefixDiff x s := Nat.pred_lt (shortestPrefixDiff_pos hs hne hx).ne' rw [longestPrefix, shortestPrefixDiff, dif_pos A] at B ⊢ obtain ⟨y, ys, hy⟩ : ∃ y : ∀ n : ℕ, E n, y ∈ s ∧ x ∈ cylinder y (Nat.find A - 1) := by simpa only [not_disjoint_iff, mem_cylinder_comm] using Nat.find_min A B refine ⟨y, ys, ?_⟩ rw [mem_cylinder_iff_eq] at hy ⊢ rw [hy] #align pi_nat.inter_cylinder_longest_prefix_nonempty PiNat.inter_cylinder_longestPrefix_nonempty theorem disjoint_cylinder_of_longestPrefix_lt {s : Set (∀ n, E n)} (hs : IsClosed s) {x : ∀ n, E n} (hx : x ∉ s) {n : ℕ} (hn : longestPrefix x s < n) : Disjoint s (cylinder x n) := by contrapose! hn rcases not_disjoint_iff_nonempty_inter.1 hn with ⟨y, ys, hy⟩ apply le_trans _ (firstDiff_le_longestPrefix hs hx ys) apply (mem_cylinder_iff_le_firstDiff (ne_of_mem_of_not_mem ys hx).symm _).1 rwa [mem_cylinder_comm] #align pi_nat.disjoint_cylinder_of_longest_prefix_lt PiNat.disjoint_cylinder_of_longestPrefix_lt /-- If two points `x, y` coincide up to length `n`, and the longest common prefix of `x` with `s` is strictly shorter than `n`, then the longest common prefix of `y` with `s` is the same, and both cylinders of this length based at `x` and `y` coincide. -/ theorem cylinder_longestPrefix_eq_of_longestPrefix_lt_firstDiff {x y : ∀ n, E n} {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) (H : longestPrefix x s < firstDiff x y) (xs : x ∉ s) (ys : y ∉ s) : cylinder x (longestPrefix x s) = cylinder y (longestPrefix y s) := by have l_eq : longestPrefix y s = longestPrefix x s := by rcases lt_trichotomy (longestPrefix y s) (longestPrefix x s) with (L \| L \| L) · have Ax : (s ∩ cylinder x (longestPrefix x s)).Nonempty := inter_cylinder_longestPrefix_nonempty hs hne x have Z := disjoint_cylinder_of_longestPrefix_lt hs ys L rw [firstDiff_comm] at H rw [cylinder_eq_cylinder_of_le_firstDiff _ _ H.le] at Z exact (Ax.not_disjoint Z).elim · exact L · have Ay : (s ∩ cylinder y (longestPrefix y s)).Nonempty := inter_cylinder_longestPrefix_nonempty hs hne y have A'y : (s ∩ cylinder y (longestPrefix x s).succ).Nonempty := Ay.mono (inter_subset_inter_right s (cylinder_anti _ L)) have Z := disjoint_cylinder_of_longestPrefix_lt hs xs (Nat.lt_succ_self _) rw [cylinder_eq_cylinder_of_le_firstDiff _ _ H] at Z exact (A'y.not_disjoint Z).elim rw [l_eq, ← mem_cylinder_iff_eq] exact cylinder_anti y H.le (mem_cylinder_firstDiff x y) #align pi_nat.cylinder_longest_prefix_eq_of_longest_prefix_lt_first_diff PiNat.cylinder_longestPrefix_eq_of_longestPrefix_lt_firstDiff /-- Given a closed nonempty subset `s` of `Π (n : ℕ), E n`, there exists a Lipschitz retraction onto this set, i.e., a Lipschitz map with range equal to `s`, equal to the identity on `s`. -/ theorem exists_lipschitz_retraction_of_isClosed {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) : ∃ f : (∀ n, E n) → ∀ n, E n, (∀ x ∈ s, f x = x) ∧ range f = s ∧ LipschitzWith 1 f := by /- The map `f` is defined as follows. For `x ∈ s`, let `f x = x`. Otherwise, consider the longest prefix `w` that `x` shares with an element of `s`, and let `f x = z_w` where `z_w` is an element of `s` starting with `w`. All the desired properties are clear, except the fact that `f` is `1`-Lipschitz: if two points `x, y` belong to a common cylinder of length `n`, one should show that their images also belong to a common cylinder of length `n`. This is a case analysis: if both `x, y ∈ s`, then this is clear. * if `x ∈ s` but `y ∉ s`, then the longest prefix `w` of `y` shared by an element of `s` is of length at least `n` (because of `x`), and then `f y` starts with `w` and therefore stays in the same length `n` cylinder. * if `x ∉ s`, `y ∉ s`, let `w` be the longest prefix of `x` shared by an element of `s`. If its length is `< n`, then it is also the longest prefix of `y`, and we get `f x = f y = z_w`. Otherwise, `f x` remains in the same `n`-cylinder as `x`. Similarly for `y`. Finally, `f x` and `f y` are again in the same `n`-cylinder, as desired. -/ set f := fun x => if x ∈ s then x else (inter_cylinder_longestPrefix_nonempty hs hne x).some have fs : ∀ x ∈ s, f x = x := fun x xs => by simp [f, xs] refine ⟨f, fs, ?_, ?_⟩ -- check that the range of `f` is `s`. · apply Subset.antisymm · rintro x ⟨y, rfl⟩ by_cases hy : y ∈ s · rwa [fs y hy] simpa [f, if_neg hy] using (inter_cylinder_longestPrefix_nonempty hs hne y).choose_spec.1 · intro x hx rw [← fs x hx] exact mem_range_self _ -- check that `f` is `1`-Lipschitz, by a case analysis. · refine LipschitzWith.mk_one fun x y => ?_ -- exclude the trivial cases where `x = y`, or `f x = f y`. rcases eq_or_ne x y with (rfl \| hxy) · simp rcases eq_or_ne (f x) (f y) with (h' \| hfxfy) · simp [h', dist_nonneg] have I2 : cylinder x (firstDiff x y) = cylinder y (firstDiff x y) := by rw [← mem_cylinder_iff_eq] apply mem_cylinder_firstDiff suffices firstDiff x y ≤ firstDiff (f x) (f y) by simpa [dist_eq_of_ne hxy, dist_eq_of_ne hfxfy] -- case where `x ∈ s` by_cases xs : x ∈ s · rw [fs x xs] at hfxfy ⊢ -- case where `y ∈ s`, trivial by_cases ys : y ∈ s · rw [fs y ys] -- case where `y ∉ s` have A : (s ∩ cylinder y (longestPrefix y s)).Nonempty := inter_cylinder_longestPrefix_nonempty hs hne y have fy : f y = A.some := by simp_rw [f, if_neg ys] have I : cylinder A.some (firstDiff x y) = cylinder y (firstDiff x y) := by rw [← mem_cylinder_iff_eq, firstDiff_comm] apply cylinder_anti y _ A.some_mem.2 exact firstDiff_le_longestPrefix hs ys xs rwa [← fy, ← I2, ← mem_cylinder_iff_eq, mem_cylinder_iff_le_firstDiff hfxfy.symm, firstDiff_comm _ x] at I -- case where `x ∉ s` · by_cases ys : y ∈ s -- case where `y ∈ s` (similar to the above) · have A : (s ∩ cylinder x (longestPrefix x s)).Nonempty := inter_cylinder_longestPrefix_nonempty hs hne x have fx : f x = A.some := by simp_rw [f, if_neg xs] have I : cylinder A.some (firstDiff x y) = cylinder x (firstDiff x y) := by rw [← mem_cylinder_iff_eq] apply cylinder_anti x _ A.some_mem.2 apply firstDiff_le_longestPrefix hs xs ys rw [fs y ys] at hfxfy ⊢ rwa [← fx, I2, ← mem_cylinder_iff_eq, mem_cylinder_iff_le_firstDiff hfxfy] at I -- case where `y ∉ s` · have Ax : (s ∩ cylinder x (longestPrefix x s)).Nonempty := inter_cylinder_longestPrefix_nonempty hs hne x have fx : f x = Ax.some := by simp_rw [f, if_neg xs] have Ay : (s ∩ cylinder y (longestPrefix y s)).Nonempty := inter_cylinder_longestPrefix_nonempty hs hne y have fy : f y = Ay.some := by simp_rw [f, if_neg ys] -- case where the common prefix to `x` and `s`, or `y` and `s`, is shorter than the -- common part to `x` and `y` -- then `f x = f y`. by_cases H : longestPrefix x s < firstDiff x y ∨ longestPrefix y s < firstDiff x y · have : cylinder x (longestPrefix x s) = cylinder y (longestPrefix y s) := by cases' H with H H · exact cylinder_longestPrefix_eq_of_longestPrefix_lt_firstDiff hs hne H xs ys · symm rw [firstDiff_comm] at H exact cylinder_longestPrefix_eq_of_longestPrefix_lt_firstDiff hs hne H ys xs rw [fx, fy] at hfxfy apply (hfxfy _).elim congr -- case where the common prefix to `x` and `s` is long, as well as the common prefix to -- `y` and `s`. Then all points remain in the same cylinders. · push_neg at H have I1 : cylinder Ax.some (firstDiff x y) = cylinder x (firstDiff x y) := by rw [← mem_cylinder_iff_eq] exact cylinder_anti x H.1 Ax.some_mem.2 have I3 : cylinder y (firstDiff x y) = cylinder Ay.some (firstDiff x y) := by rw [eq_comm, ← mem_cylinder_iff_eq] exact cylinder_anti y H.2 Ay.some_mem.2 have : cylinder Ax.some (firstDiff x y) = cylinder Ay.some (firstDiff x y) := by rw [I1, I2, I3] rw [← fx, ← fy, ← mem_cylinder_iff_eq, mem_cylinder_iff_le_firstDiff hfxfy] at this exact this #align pi_nat.exists_lipschitz_retraction_of_is_closed PiNat.exists_lipschitz_retraction_of_isClosed /-- Given a closed nonempty subset `s` of `Π (n : ℕ), E n`, there exists a retraction onto this set, i.e., a continuous map with range equal to `s`, equal to the identity on `s`. -/ theorem exists_retraction_of_isClosed {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) : ∃ f : (∀ n, E n) → ∀ n, E n, (∀ x ∈ s, f x = x) ∧ range f = s ∧ Continuous f := by rcases exists_lipschitz_retraction_of_isClosed hs hne with ⟨f, fs, frange, hf⟩ exact ⟨f, fs, frange, hf.continuous⟩ #align pi_nat.exists_retraction_of_is_closed PiNat.exists_retraction_of_isClosed theorem exists_retraction_subtype_of_isClosed {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) : ∃ f : (∀ n, E n) → s, (∀ x : s, f x = x) ∧ Surjective f ∧ Continuous f := by obtain ⟨f, fs, rfl, f_cont⟩ : ∃ f : (∀ n, E n) → ∀ n, E n, (∀ x ∈ s, f x = x) ∧ range f = s ∧ Continuous f := exists_retraction_of_isClosed hs hne have A : ∀ x : range f, rangeFactorization f x = x := fun x ↦ Subtype.eq <\| fs x x.2 exact ⟨rangeFactorization f, A, fun x => ⟨x, A x⟩, f_cont.subtype_mk _⟩ #align pi_nat.exists_retraction_subtype_of_is_closed PiNat.exists_retraction_subtype_of_isClosed end PiNat open PiNat /-- Any nonempty complete second countable metric space is the continuous image of the fundamental space `ℕ → ℕ`. For a version of this theorem in the context of Polish spaces, see `exists_nat_nat_continuous_surjective_of_polishSpace`. -/ theorem exists_nat_nat_continuous_surjective_of_completeSpace (α : Type) [MetricSpace α] [CompleteSpace α] [SecondCountableTopology α] [Nonempty α] : ∃ f : (ℕ → ℕ) → α, Continuous f ∧ Surjective f := by /- First, we define a surjective map from a closed subset `s` of `ℕ → ℕ`. Then, we compose this map with a retraction of `ℕ → ℕ` onto `s` to obtain the desired map. Let us consider a dense sequence `u` in `α`. Then `s` is the set of sequences `xₙ` such that the balls `closedBall (u xₙ) (1/2^n)` have a nonempty intersection. This set is closed, and we define `f x` there to be the unique point in the intersection. This function is continuous and surjective by design. -/ letI : MetricSpace (ℕ → ℕ) := PiNat.metricSpaceNatNat have I0 : (0 : ℝ) < 1 / 2 := by norm_num have I1 : (1 / 2 : ℝ) < 1 := by norm_num rcases exists_dense_seq α with ⟨u, hu⟩ let s : Set (ℕ → ℕ) := { x \| (⋂ n : ℕ, closedBall (u (x n)) ((1 / 2) ^ n)).Nonempty } let g : s → α := fun x => x.2.some have A : ∀ (x : s) (n : ℕ), dist (g x) (u ((x : ℕ → ℕ) n)) ≤ (1 / 2) ^ n := fun x n => (mem_iInter.1 x.2.some_mem n : _) have g_cont : Continuous g := by refine continuous_iff_continuousAt.2 fun y => ?_ refine continuousAt_of_locally_lipschitz zero_lt_one 4 fun x hxy => ?_ rcases eq_or_ne x y with (rfl \| hne) · simp have hne' : x.1 ≠ y.1 := Subtype.coe_injective.ne hne have dist' : dist x y = dist x.1 y.1 := rfl let n := firstDiff x.1 y.1 - 1 have diff_pos : 0 < firstDiff x.1 y.1 := by by_contra! h apply apply_firstDiff_ne hne' rw [Nat.le_zero.1 h] apply apply_eq_of_dist_lt _ le_rfl rw [pow_zero] exact hxy have hn : firstDiff x.1 y.1 = n + 1 := (Nat.succ_pred_eq_of_pos diff_pos).symm rw [dist', dist_eq_of_ne hne', hn] have B : x.1 n = y.1 n := mem_cylinder_firstDiff x.1 y.1 n (Nat.pred_lt diff_pos.ne') calc dist (g x) (g y) ≤ dist (g x) (u (x.1 n)) + dist (g y) (u (x.1 n)) := dist_triangle_right _ _ _ _ = dist (g x) (u (x.1 n)) + dist (g y) (u (y.1 n)) := by rw [← B] _ ≤ (1 / 2) ^ n + (1 / 2) ^ n := add_le_add (A x n) (A y n) _ = 4 (1 / 2) ^ (n + 1) := by ring have g_surj : Surjective g := fun y ↦ by have : ∀ n : ℕ, ∃ j, y ∈ closedBall (u j) ((1 / 2) ^ n) := fun n ↦ by rcases hu.exists_dist_lt y (by simp : (0 : ℝ) < (1 / 2) ^ n) with ⟨j, hj⟩ exact ⟨j, hj.le⟩ choose x hx using this have I : (⋂ n : ℕ, closedBall (u (x n)) ((1 / 2) ^ n)).Nonempty := ⟨y, mem_iInter.2 hx⟩ refine ⟨⟨x, I⟩, ?_⟩ refine dist_le_zero.1 ?_ have J : ∀ n : ℕ, dist (g ⟨x, I⟩) y ≤ (1 / 2) ^ n + (1 / 2) ^ n := fun n => calc dist (g ⟨x, I⟩) y ≤ dist (g ⟨x, I⟩) (u (x n)) + dist y (u (x n)) := dist_triangle_right _ _ _ _ ≤ (1 / 2) ^ n + (1 / 2) ^ n := add_le_add (A ⟨x, I⟩ n) (hx n) have L : Tendsto (fun n : ℕ => (1 / 2 : ℝ) ^ n + (1 / 2) ^ n) atTop (𝓝 (0 + 0)) := (tendsto_pow_atTop_nhds_zero_of_lt_one I0.le I1).add (tendsto_pow_atTop_nhds_zero_of_lt_one I0.le I1) rw [add_zero] at L exact ge_of_tendsto' L J have s_closed : IsClosed s := by refine isClosed_iff_clusterPt.mpr fun x hx ↦ ?_ have L : Tendsto (fun n : ℕ => diam (closedBall (u (x n)) ((1 / 2) ^ n))) atTop (𝓝 0) := by have : Tendsto (fun n : ℕ => (2 : ℝ) * (1 / 2) ^ n) atTop (𝓝 (2 * 0)) := (tendsto_pow_atTop_nhds_zero_of_lt_one I0.le I1).const_mul _ rw [mul_zero] at this exact squeeze_zero (fun n => diam_nonneg) (fun n => diam_closedBall (pow_nonneg I0.le _)) this refine nonempty_iInter_of_nonempty_biInter (fun n => isClosed_ball) (fun n => isBounded_closedBall) (fun N ↦ ?_) L obtain ⟨y, hxy, ys⟩ : ∃ y, y ∈ ball x ((1 / 2) ^ N) ∩ s := clusterPt_principal_iff.1 hx _ (ball_mem_nhds x (pow_pos I0 N)) have E : ⋂ (n : ℕ) (H : n ≤ N), closedBall (u (x n)) ((1 / 2) ^ n) = ⋂ (n : ℕ) (H : n ≤ N), closedBall (u (y n)) ((1 / 2) ^ n) := by refine iInter_congr fun n ↦ iInter_congr fun hn ↦ ?_ have : x n = y n := apply_eq_of_dist_lt (mem_ball'.1 hxy) hn rw [this] rw [E] apply Nonempty.mono _ ys apply iInter_subset_iInter₂ obtain ⟨f, -, f_surj, f_cont⟩ : ∃ f : (ℕ → ℕ) → s, (∀ x : s, f x = x) ∧ Surjective f ∧ Continuous f := by apply exists_retraction_subtype_of_isClosed s_closed simpa only [nonempty_coe_sort] using g_surj.nonempty exact ⟨g ∘ f, g_cont.comp f_cont, g_surj.comp f_surj⟩ #align exists_nat_nat_continuous_surjective_of_complete_space exists_nat_nat_continuous_surjective_of_completeSpace namespace PiCountable /-! ### Products of (possibly non-discrete) metric spaces -/ variable {ι : Type} [Encodable ι] {F : ι → Type} [∀ i, MetricSpace (F i)] open Encodable /-- Given a countable family of metric spaces, one may put a distance on their product `Π i, E i`. It is highly non-canonical, though, and therefore not registered as a global instance. The distance we use here is `dist x y = ∑' i, min (1/2)^(encode i) (dist (x i) (y i))`. -/ protected def dist : Dist (∀ i, F i) := ⟨fun x y => ∑' i : ι, min ((1 / 2) ^ encode i) (dist (x i) (y i))⟩ #align pi_countable.has_dist PiCountable.dist attribute [local instance] PiCountable.dist theorem dist_eq_tsum (x y : ∀ i, F i) : dist x y = ∑' i : ι, min ((1 / 2) ^ encode i : ℝ) (dist (x i) (y i)) := rfl #align pi_countable.dist_eq_tsum PiCountable.dist_eq_tsum theorem dist_summable (x y : ∀ i, F i) : Summable fun i : ι => min ((1 / 2) ^ encode i : ℝ) (dist (x i) (y i)) := by refine .of_nonneg_of_le (fun i => ?_) (fun i => min_le_left _ _) summable_geometric_two_encode exact le_min (pow_nonneg (by norm_num) _) dist_nonneg #align pi_countable.dist_summable PiCountable.dist_summable theorem min_dist_le_dist_pi (x y : ∀ i, F i) (i : ι) : min ((1 / 2) ^ encode i : ℝ) (dist (x i) (y i)) ≤ dist x y := le_tsum (dist_summable x y) i fun j _ => le_min (by simp) dist_nonneg #align pi_countable.min_dist_le_dist_pi PiCountable.min_dist_le_dist_pi	Mathlib/Topology/MetricSpace/PiNat.lean	846	848	theorem dist_le_dist_pi_of_dist_lt {x y : ∀ i, F i} {i : ι} (h : dist x y < (1 / 2) ^ encode i) : dist (x i) (y i) ≤ dist x y := by	simpa only [not_le.2 h, false_or_iff] using min_le_iff.1 (min_dist_le_dist_pi x y i)
/- Copyright (c) 2021 Heather Macbeth. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Heather Macbeth -/ import Mathlib.Analysis.InnerProductSpace.Rayleigh import Mathlib.Analysis.InnerProductSpace.PiL2 import Mathlib.Algebra.DirectSum.Decomposition import Mathlib.LinearAlgebra.Eigenspace.Minpoly #align_import analysis.inner_product_space.spectrum from "leanprover-community/mathlib"@"6b0169218d01f2837d79ea2784882009a0da1aa1" /-! # Spectral theory of self-adjoint operators This file covers the spectral theory of self-adjoint operators on an inner product space. The first part of the file covers general properties, true without any condition on boundedness or compactness of the operator or finite-dimensionality of the underlying space, notably: * `LinearMap.IsSymmetric.conj_eigenvalue_eq_self`: the eigenvalues are real * `LinearMap.IsSymmetric.orthogonalFamily_eigenspaces`: the eigenspaces are orthogonal * `LinearMap.IsSymmetric.orthogonalComplement_iSup_eigenspaces`: the restriction of the operator to the mutual orthogonal complement of the eigenspaces has, itself, no eigenvectors The second part of the file covers properties of self-adjoint operators in finite dimension. Letting `T` be a self-adjoint operator on a finite-dimensional inner product space `T`, * The definition `LinearMap.IsSymmetric.diagonalization` provides a linear isometry equivalence `E` to the direct sum of the eigenspaces of `T`. The theorem `LinearMap.IsSymmetric.diagonalization_apply_self_apply` states that, when `T` is transferred via this equivalence to an operator on the direct sum, it acts diagonally. * The definition `LinearMap.IsSymmetric.eigenvectorBasis` provides an orthonormal basis for `E` consisting of eigenvectors of `T`, with `LinearMap.IsSymmetric.eigenvalues` giving the corresponding list of eigenvalues, as real numbers. The definition `LinearMap.IsSymmetric.eigenvectorBasis` gives the associated linear isometry equivalence from `E` to Euclidean space, and the theorem `LinearMap.IsSymmetric.eigenvectorBasis_apply_self_apply` states that, when `T` is transferred via this equivalence to an operator on Euclidean space, it acts diagonally. These are forms of the diagonalization theorem for self-adjoint operators on finite-dimensional inner product spaces. ## TODO Spectral theory for compact self-adjoint operators, bounded self-adjoint operators. ## Tags self-adjoint operator, spectral theorem, diagonalization theorem -/ variable {𝕜 : Type} [RCLike 𝕜] variable {E : Type} [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] local notation "⟪" x ", " y "⟫" => @inner 𝕜 E _ x y open scoped ComplexConjugate open Module.End namespace LinearMap namespace IsSymmetric variable {T : E →ₗ[𝕜] E} (hT : T.IsSymmetric) /-- A self-adjoint operator preserves orthogonal complements of its eigenspaces. -/ theorem invariant_orthogonalComplement_eigenspace (μ : 𝕜) (v : E) (hv : v ∈ (eigenspace T μ)ᗮ) : T v ∈ (eigenspace T μ)ᗮ := by intro w hw have : T w = (μ : 𝕜) • w := by rwa [mem_eigenspace_iff] at hw simp [← hT w, this, inner_smul_left, hv w hw] #align linear_map.is_symmetric.invariant_orthogonal_eigenspace LinearMap.IsSymmetric.invariant_orthogonalComplement_eigenspace /-- The eigenvalues of a self-adjoint operator are real. -/ theorem conj_eigenvalue_eq_self {μ : 𝕜} (hμ : HasEigenvalue T μ) : conj μ = μ := by obtain ⟨v, hv₁, hv₂⟩ := hμ.exists_hasEigenvector rw [mem_eigenspace_iff] at hv₁ simpa [hv₂, inner_smul_left, inner_smul_right, hv₁] using hT v v #align linear_map.is_symmetric.conj_eigenvalue_eq_self LinearMap.IsSymmetric.conj_eigenvalue_eq_self /-- The eigenspaces of a self-adjoint operator are mutually orthogonal. -/ theorem orthogonalFamily_eigenspaces : OrthogonalFamily 𝕜 (fun μ => eigenspace T μ) fun μ => (eigenspace T μ).subtypeₗᵢ := by rintro μ ν hμν ⟨v, hv⟩ ⟨w, hw⟩ by_cases hv' : v = 0 · simp [hv'] have H := hT.conj_eigenvalue_eq_self (hasEigenvalue_of_hasEigenvector ⟨hv, hv'⟩) rw [mem_eigenspace_iff] at hv hw refine Or.resolve_left ?_ hμν.symm simpa [inner_smul_left, inner_smul_right, hv, hw, H] using (hT v w).symm #align linear_map.is_symmetric.orthogonal_family_eigenspaces LinearMap.IsSymmetric.orthogonalFamily_eigenspaces theorem orthogonalFamily_eigenspaces' : OrthogonalFamily 𝕜 (fun μ : Eigenvalues T => eigenspace T μ) fun μ => (eigenspace T μ).subtypeₗᵢ := hT.orthogonalFamily_eigenspaces.comp Subtype.coe_injective #align linear_map.is_symmetric.orthogonal_family_eigenspaces' LinearMap.IsSymmetric.orthogonalFamily_eigenspaces' /-- The mutual orthogonal complement of the eigenspaces of a self-adjoint operator on an inner product space is an invariant subspace of the operator. -/ theorem orthogonalComplement_iSup_eigenspaces_invariant ⦃v : E⦄ (hv : v ∈ (⨆ μ, eigenspace T μ)ᗮ) : T v ∈ (⨆ μ, eigenspace T μ)ᗮ := by rw [← Submodule.iInf_orthogonal] at hv ⊢ exact T.iInf_invariant hT.invariant_orthogonalComplement_eigenspace v hv #align linear_map.is_symmetric.orthogonal_supr_eigenspaces_invariant LinearMap.IsSymmetric.orthogonalComplement_iSup_eigenspaces_invariant /-- The mutual orthogonal complement of the eigenspaces of a self-adjoint operator on an inner product space has no eigenvalues. -/ theorem orthogonalComplement_iSup_eigenspaces (μ : 𝕜) : eigenspace (T.restrict hT.orthogonalComplement_iSup_eigenspaces_invariant) μ = ⊥ := by set p : Submodule 𝕜 E := (⨆ μ, eigenspace T μ)ᗮ refine eigenspace_restrict_eq_bot hT.orthogonalComplement_iSup_eigenspaces_invariant ?_ have H₂ : eigenspace T μ ⟂ p := (Submodule.isOrtho_orthogonal_right _).mono_left (le_iSup _ _) exact H₂.disjoint #align linear_map.is_symmetric.orthogonal_supr_eigenspaces LinearMap.IsSymmetric.orthogonalComplement_iSup_eigenspaces /-! ### Finite-dimensional theory -/ variable [FiniteDimensional 𝕜 E] /-- The mutual orthogonal complement of the eigenspaces of a self-adjoint operator on a finite-dimensional inner product space is trivial. -/	Mathlib/Analysis/InnerProductSpace/Spectrum.lean	125	131	theorem orthogonalComplement_iSup_eigenspaces_eq_bot : (⨆ μ, eigenspace T μ)ᗮ = ⊥ := by	have hT' : IsSymmetric _ := hT.restrict_invariant hT.orthogonalComplement_iSup_eigenspaces_invariant -- a self-adjoint operator on a nontrivial inner product space has an eigenvalue haveI := hT'.subsingleton_of_no_eigenvalue_finiteDimensional hT.orthogonalComplement_iSup_eigenspaces exact Submodule.eq_bot_of_subsingleton
/- Copyright (c) 2019 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Yaël Dillies -/ import Mathlib.Algebra.Module.BigOperators import Mathlib.Data.Fintype.Perm import Mathlib.GroupTheory.Perm.Finite import Mathlib.GroupTheory.Perm.List #align_import group_theory.perm.cycle.basic from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3" /-! # Cycles of a permutation This file starts the theory of cycles in permutations. ## Main definitions In the following, `f : Equiv.Perm β`. * `Equiv.Perm.SameCycle`: `f.SameCycle x y` when `x` and `y` are in the same cycle of `f`. * `Equiv.Perm.IsCycle`: `f` is a cycle if any two nonfixed points of `f` are related by repeated applications of `f`, and `f` is not the identity. * `Equiv.Perm.IsCycleOn`: `f` is a cycle on a set `s` when any two points of `s` are related by repeated applications of `f`. ## Notes `Equiv.Perm.IsCycle` and `Equiv.Perm.IsCycleOn` are different in three ways: * `IsCycle` is about the entire type while `IsCycleOn` is restricted to a set. * `IsCycle` forbids the identity while `IsCycleOn` allows it (if `s` is a subsingleton). * `IsCycleOn` forbids fixed points on `s` (if `s` is nontrivial), while `IsCycle` allows them. -/ open Equiv Function Finset variable {ι α β : Type} namespace Equiv.Perm /-! ### `SameCycle` -/ section SameCycle variable {f g : Perm α} {p : α → Prop} {x y z : α} /-- The equivalence relation indicating that two points are in the same cycle of a permutation. -/ def SameCycle (f : Perm α) (x y : α) : Prop := ∃ i : ℤ, (f ^ i) x = y #align equiv.perm.same_cycle Equiv.Perm.SameCycle @[refl] theorem SameCycle.refl (f : Perm α) (x : α) : SameCycle f x x := ⟨0, rfl⟩ #align equiv.perm.same_cycle.refl Equiv.Perm.SameCycle.refl theorem SameCycle.rfl : SameCycle f x x := SameCycle.refl _ _ #align equiv.perm.same_cycle.rfl Equiv.Perm.SameCycle.rfl protected theorem _root_.Eq.sameCycle (h : x = y) (f : Perm α) : f.SameCycle x y := by rw [h] #align eq.same_cycle Eq.sameCycle @[symm] theorem SameCycle.symm : SameCycle f x y → SameCycle f y x := fun ⟨i, hi⟩ => ⟨-i, by rw [zpow_neg, ← hi, inv_apply_self]⟩ #align equiv.perm.same_cycle.symm Equiv.Perm.SameCycle.symm theorem sameCycle_comm : SameCycle f x y ↔ SameCycle f y x := ⟨SameCycle.symm, SameCycle.symm⟩ #align equiv.perm.same_cycle_comm Equiv.Perm.sameCycle_comm @[trans] theorem SameCycle.trans : SameCycle f x y → SameCycle f y z → SameCycle f x z := fun ⟨i, hi⟩ ⟨j, hj⟩ => ⟨j + i, by rw [zpow_add, mul_apply, hi, hj]⟩ #align equiv.perm.same_cycle.trans Equiv.Perm.SameCycle.trans variable (f) in theorem SameCycle.equivalence : Equivalence (SameCycle f) := ⟨SameCycle.refl f, SameCycle.symm, SameCycle.trans⟩ /-- The setoid defined by the `SameCycle` relation. -/ def SameCycle.setoid (f : Perm α) : Setoid α where iseqv := SameCycle.equivalence f @[simp] theorem sameCycle_one : SameCycle 1 x y ↔ x = y := by simp [SameCycle] #align equiv.perm.same_cycle_one Equiv.Perm.sameCycle_one @[simp] theorem sameCycle_inv : SameCycle f⁻¹ x y ↔ SameCycle f x y := (Equiv.neg _).exists_congr_left.trans <\| by simp [SameCycle] #align equiv.perm.same_cycle_inv Equiv.Perm.sameCycle_inv alias ⟨SameCycle.of_inv, SameCycle.inv⟩ := sameCycle_inv #align equiv.perm.same_cycle.of_inv Equiv.Perm.SameCycle.of_inv #align equiv.perm.same_cycle.inv Equiv.Perm.SameCycle.inv @[simp] theorem sameCycle_conj : SameCycle (g f * g⁻¹) x y ↔ SameCycle f (g⁻¹ x) (g⁻¹ y) := exists_congr fun i => by simp [conj_zpow, eq_inv_iff_eq] #align equiv.perm.same_cycle_conj Equiv.Perm.sameCycle_conj	Mathlib/GroupTheory/Perm/Cycle/Basic.lean	107	108	theorem SameCycle.conj : SameCycle f x y → SameCycle (g * f * g⁻¹) (g x) (g y) := by	simp [sameCycle_conj]
/- Copyright (c) 2021 Kyle Miller. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kyle Miller -/ import Mathlib.Combinatorics.SimpleGraph.Subgraph import Mathlib.Data.List.Rotate #align_import combinatorics.simple_graph.connectivity from "leanprover-community/mathlib"@"b99e2d58a5e6861833fa8de11e51a81144258db4" /-! # Graph connectivity In a simple graph, * A walk is a finite sequence of adjacent vertices, and can be thought of equally well as a sequence of directed edges. * A trail is a walk whose edges each appear no more than once. * A path is a trail whose vertices appear no more than once. * A cycle is a nonempty trail whose first and last vertices are the same and whose vertices except for the first appear no more than once. Warning: graph theorists mean something different by "path" than do homotopy theorists. A "walk" in graph theory is a "path" in homotopy theory. Another warning: some graph theorists use "path" and "simple path" for "walk" and "path." Some definitions and theorems have inspiration from multigraph counterparts in [Chou1994]. ## Main definitions * `SimpleGraph.Walk` (with accompanying pattern definitions `SimpleGraph.Walk.nil'` and `SimpleGraph.Walk.cons'`) * `SimpleGraph.Walk.IsTrail`, `SimpleGraph.Walk.IsPath`, and `SimpleGraph.Walk.IsCycle`. * `SimpleGraph.Path` * `SimpleGraph.Walk.map` and `SimpleGraph.Path.map` for the induced map on walks, given an (injective) graph homomorphism. * `SimpleGraph.Reachable` for the relation of whether there exists a walk between a given pair of vertices * `SimpleGraph.Preconnected` and `SimpleGraph.Connected` are predicates on simple graphs for whether every vertex can be reached from every other, and in the latter case, whether the vertex type is nonempty. * `SimpleGraph.ConnectedComponent` is the type of connected components of a given graph. * `SimpleGraph.IsBridge` for whether an edge is a bridge edge ## Main statements * `SimpleGraph.isBridge_iff_mem_and_forall_cycle_not_mem` characterizes bridge edges in terms of there being no cycle containing them. ## Tags walks, trails, paths, circuits, cycles, bridge edges -/ open Function universe u v w namespace SimpleGraph variable {V : Type u} {V' : Type v} {V'' : Type w} variable (G : SimpleGraph V) (G' : SimpleGraph V') (G'' : SimpleGraph V'') /-- A walk is a sequence of adjacent vertices. For vertices `u v : V`, the type `walk u v` consists of all walks starting at `u` and ending at `v`. We say that a walk visits the vertices it contains. The set of vertices a walk visits is `SimpleGraph.Walk.support`. See `SimpleGraph.Walk.nil'` and `SimpleGraph.Walk.cons'` for patterns that can be useful in definitions since they make the vertices explicit. -/ inductive Walk : V → V → Type u \| nil {u : V} : Walk u u \| cons {u v w : V} (h : G.Adj u v) (p : Walk v w) : Walk u w deriving DecidableEq #align simple_graph.walk SimpleGraph.Walk attribute [refl] Walk.nil @[simps] instance Walk.instInhabited (v : V) : Inhabited (G.Walk v v) := ⟨Walk.nil⟩ #align simple_graph.walk.inhabited SimpleGraph.Walk.instInhabited /-- The one-edge walk associated to a pair of adjacent vertices. -/ @[match_pattern, reducible] def Adj.toWalk {G : SimpleGraph V} {u v : V} (h : G.Adj u v) : G.Walk u v := Walk.cons h Walk.nil #align simple_graph.adj.to_walk SimpleGraph.Adj.toWalk namespace Walk variable {G} /-- Pattern to get `Walk.nil` with the vertex as an explicit argument. -/ @[match_pattern] abbrev nil' (u : V) : G.Walk u u := Walk.nil #align simple_graph.walk.nil' SimpleGraph.Walk.nil' /-- Pattern to get `Walk.cons` with the vertices as explicit arguments. -/ @[match_pattern] abbrev cons' (u v w : V) (h : G.Adj u v) (p : G.Walk v w) : G.Walk u w := Walk.cons h p #align simple_graph.walk.cons' SimpleGraph.Walk.cons' /-- Change the endpoints of a walk using equalities. This is helpful for relaxing definitional equality constraints and to be able to state otherwise difficult-to-state lemmas. While this is a simple wrapper around `Eq.rec`, it gives a canonical way to write it. The simp-normal form is for the `copy` to be pushed outward. That way calculations can occur within the "copy context." -/ protected def copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : G.Walk u' v' := hu ▸ hv ▸ p #align simple_graph.walk.copy SimpleGraph.Walk.copy @[simp] theorem copy_rfl_rfl {u v} (p : G.Walk u v) : p.copy rfl rfl = p := rfl #align simple_graph.walk.copy_rfl_rfl SimpleGraph.Walk.copy_rfl_rfl @[simp] theorem copy_copy {u v u' v' u'' v''} (p : G.Walk u v) (hu : u = u') (hv : v = v') (hu' : u' = u'') (hv' : v' = v'') : (p.copy hu hv).copy hu' hv' = p.copy (hu.trans hu') (hv.trans hv') := by subst_vars rfl #align simple_graph.walk.copy_copy SimpleGraph.Walk.copy_copy @[simp] theorem copy_nil {u u'} (hu : u = u') : (Walk.nil : G.Walk u u).copy hu hu = Walk.nil := by subst_vars rfl #align simple_graph.walk.copy_nil SimpleGraph.Walk.copy_nil theorem copy_cons {u v w u' w'} (h : G.Adj u v) (p : G.Walk v w) (hu : u = u') (hw : w = w') : (Walk.cons h p).copy hu hw = Walk.cons (hu ▸ h) (p.copy rfl hw) := by subst_vars rfl #align simple_graph.walk.copy_cons SimpleGraph.Walk.copy_cons @[simp] theorem cons_copy {u v w v' w'} (h : G.Adj u v) (p : G.Walk v' w') (hv : v' = v) (hw : w' = w) : Walk.cons h (p.copy hv hw) = (Walk.cons (hv ▸ h) p).copy rfl hw := by subst_vars rfl #align simple_graph.walk.cons_copy SimpleGraph.Walk.cons_copy theorem exists_eq_cons_of_ne {u v : V} (hne : u ≠ v) : ∀ (p : G.Walk u v), ∃ (w : V) (h : G.Adj u w) (p' : G.Walk w v), p = cons h p' \| nil => (hne rfl).elim \| cons h p' => ⟨_, h, p', rfl⟩ #align simple_graph.walk.exists_eq_cons_of_ne SimpleGraph.Walk.exists_eq_cons_of_ne /-- The length of a walk is the number of edges/darts along it. -/ def length {u v : V} : G.Walk u v → ℕ \| nil => 0 \| cons _ q => q.length.succ #align simple_graph.walk.length SimpleGraph.Walk.length /-- The concatenation of two compatible walks. -/ @[trans] def append {u v w : V} : G.Walk u v → G.Walk v w → G.Walk u w \| nil, q => q \| cons h p, q => cons h (p.append q) #align simple_graph.walk.append SimpleGraph.Walk.append /-- The reversed version of `SimpleGraph.Walk.cons`, concatenating an edge to the end of a walk. -/ def concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : G.Walk u w := p.append (cons h nil) #align simple_graph.walk.concat SimpleGraph.Walk.concat theorem concat_eq_append {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : p.concat h = p.append (cons h nil) := rfl #align simple_graph.walk.concat_eq_append SimpleGraph.Walk.concat_eq_append /-- The concatenation of the reverse of the first walk with the second walk. -/ protected def reverseAux {u v w : V} : G.Walk u v → G.Walk u w → G.Walk v w \| nil, q => q \| cons h p, q => Walk.reverseAux p (cons (G.symm h) q) #align simple_graph.walk.reverse_aux SimpleGraph.Walk.reverseAux /-- The walk in reverse. -/ @[symm] def reverse {u v : V} (w : G.Walk u v) : G.Walk v u := w.reverseAux nil #align simple_graph.walk.reverse SimpleGraph.Walk.reverse /-- Get the `n`th vertex from a walk, where `n` is generally expected to be between `0` and `p.length`, inclusive. If `n` is greater than or equal to `p.length`, the result is the path's endpoint. -/ def getVert {u v : V} : G.Walk u v → ℕ → V \| nil, _ => u \| cons _ _, 0 => u \| cons _ q, n + 1 => q.getVert n #align simple_graph.walk.get_vert SimpleGraph.Walk.getVert @[simp] theorem getVert_zero {u v} (w : G.Walk u v) : w.getVert 0 = u := by cases w <;> rfl #align simple_graph.walk.get_vert_zero SimpleGraph.Walk.getVert_zero theorem getVert_of_length_le {u v} (w : G.Walk u v) {i : ℕ} (hi : w.length ≤ i) : w.getVert i = v := by induction w generalizing i with \| nil => rfl \| cons _ _ ih => cases i · cases hi · exact ih (Nat.succ_le_succ_iff.1 hi) #align simple_graph.walk.get_vert_of_length_le SimpleGraph.Walk.getVert_of_length_le @[simp] theorem getVert_length {u v} (w : G.Walk u v) : w.getVert w.length = v := w.getVert_of_length_le rfl.le #align simple_graph.walk.get_vert_length SimpleGraph.Walk.getVert_length theorem adj_getVert_succ {u v} (w : G.Walk u v) {i : ℕ} (hi : i < w.length) : G.Adj (w.getVert i) (w.getVert (i + 1)) := by induction w generalizing i with \| nil => cases hi \| cons hxy _ ih => cases i · simp [getVert, hxy] · exact ih (Nat.succ_lt_succ_iff.1 hi) #align simple_graph.walk.adj_get_vert_succ SimpleGraph.Walk.adj_getVert_succ @[simp] theorem cons_append {u v w x : V} (h : G.Adj u v) (p : G.Walk v w) (q : G.Walk w x) : (cons h p).append q = cons h (p.append q) := rfl #align simple_graph.walk.cons_append SimpleGraph.Walk.cons_append @[simp] theorem cons_nil_append {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h nil).append p = cons h p := rfl #align simple_graph.walk.cons_nil_append SimpleGraph.Walk.cons_nil_append @[simp] theorem append_nil {u v : V} (p : G.Walk u v) : p.append nil = p := by induction p with \| nil => rfl \| cons _ _ ih => rw [cons_append, ih] #align simple_graph.walk.append_nil SimpleGraph.Walk.append_nil @[simp] theorem nil_append {u v : V} (p : G.Walk u v) : nil.append p = p := rfl #align simple_graph.walk.nil_append SimpleGraph.Walk.nil_append theorem append_assoc {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (r : G.Walk w x) : p.append (q.append r) = (p.append q).append r := by induction p with \| nil => rfl \| cons h p' ih => dsimp only [append] rw [ih] #align simple_graph.walk.append_assoc SimpleGraph.Walk.append_assoc @[simp] theorem append_copy_copy {u v w u' v' w'} (p : G.Walk u v) (q : G.Walk v w) (hu : u = u') (hv : v = v') (hw : w = w') : (p.copy hu hv).append (q.copy hv hw) = (p.append q).copy hu hw := by subst_vars rfl #align simple_graph.walk.append_copy_copy SimpleGraph.Walk.append_copy_copy theorem concat_nil {u v : V} (h : G.Adj u v) : nil.concat h = cons h nil := rfl #align simple_graph.walk.concat_nil SimpleGraph.Walk.concat_nil @[simp] theorem concat_cons {u v w x : V} (h : G.Adj u v) (p : G.Walk v w) (h' : G.Adj w x) : (cons h p).concat h' = cons h (p.concat h') := rfl #align simple_graph.walk.concat_cons SimpleGraph.Walk.concat_cons theorem append_concat {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (h : G.Adj w x) : p.append (q.concat h) = (p.append q).concat h := append_assoc _ _ _ #align simple_graph.walk.append_concat SimpleGraph.Walk.append_concat theorem concat_append {u v w x : V} (p : G.Walk u v) (h : G.Adj v w) (q : G.Walk w x) : (p.concat h).append q = p.append (cons h q) := by rw [concat_eq_append, ← append_assoc, cons_nil_append] #align simple_graph.walk.concat_append SimpleGraph.Walk.concat_append /-- A non-trivial `cons` walk is representable as a `concat` walk. -/ theorem exists_cons_eq_concat {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : ∃ (x : V) (q : G.Walk u x) (h' : G.Adj x w), cons h p = q.concat h' := by induction p generalizing u with \| nil => exact ⟨_, nil, h, rfl⟩ \| cons h' p ih => obtain ⟨y, q, h'', hc⟩ := ih h' refine ⟨y, cons h q, h'', ?_⟩ rw [concat_cons, hc] #align simple_graph.walk.exists_cons_eq_concat SimpleGraph.Walk.exists_cons_eq_concat /-- A non-trivial `concat` walk is representable as a `cons` walk. -/ theorem exists_concat_eq_cons {u v w : V} : ∀ (p : G.Walk u v) (h : G.Adj v w), ∃ (x : V) (h' : G.Adj u x) (q : G.Walk x w), p.concat h = cons h' q \| nil, h => ⟨_, h, nil, rfl⟩ \| cons h' p, h => ⟨_, h', Walk.concat p h, concat_cons _ _ _⟩ #align simple_graph.walk.exists_concat_eq_cons SimpleGraph.Walk.exists_concat_eq_cons @[simp] theorem reverse_nil {u : V} : (nil : G.Walk u u).reverse = nil := rfl #align simple_graph.walk.reverse_nil SimpleGraph.Walk.reverse_nil theorem reverse_singleton {u v : V} (h : G.Adj u v) : (cons h nil).reverse = cons (G.symm h) nil := rfl #align simple_graph.walk.reverse_singleton SimpleGraph.Walk.reverse_singleton @[simp] theorem cons_reverseAux {u v w x : V} (p : G.Walk u v) (q : G.Walk w x) (h : G.Adj w u) : (cons h p).reverseAux q = p.reverseAux (cons (G.symm h) q) := rfl #align simple_graph.walk.cons_reverse_aux SimpleGraph.Walk.cons_reverseAux @[simp] protected theorem append_reverseAux {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (r : G.Walk u x) : (p.append q).reverseAux r = q.reverseAux (p.reverseAux r) := by induction p with \| nil => rfl \| cons h _ ih => exact ih q (cons (G.symm h) r) #align simple_graph.walk.append_reverse_aux SimpleGraph.Walk.append_reverseAux @[simp] protected theorem reverseAux_append {u v w x : V} (p : G.Walk u v) (q : G.Walk u w) (r : G.Walk w x) : (p.reverseAux q).append r = p.reverseAux (q.append r) := by induction p with \| nil => rfl \| cons h _ ih => simp [ih (cons (G.symm h) q)] #align simple_graph.walk.reverse_aux_append SimpleGraph.Walk.reverseAux_append protected theorem reverseAux_eq_reverse_append {u v w : V} (p : G.Walk u v) (q : G.Walk u w) : p.reverseAux q = p.reverse.append q := by simp [reverse] #align simple_graph.walk.reverse_aux_eq_reverse_append SimpleGraph.Walk.reverseAux_eq_reverse_append @[simp] theorem reverse_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).reverse = p.reverse.append (cons (G.symm h) nil) := by simp [reverse] #align simple_graph.walk.reverse_cons SimpleGraph.Walk.reverse_cons @[simp] theorem reverse_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).reverse = p.reverse.copy hv hu := by subst_vars rfl #align simple_graph.walk.reverse_copy SimpleGraph.Walk.reverse_copy @[simp] theorem reverse_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : (p.append q).reverse = q.reverse.append p.reverse := by simp [reverse] #align simple_graph.walk.reverse_append SimpleGraph.Walk.reverse_append @[simp] theorem reverse_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).reverse = cons (G.symm h) p.reverse := by simp [concat_eq_append] #align simple_graph.walk.reverse_concat SimpleGraph.Walk.reverse_concat @[simp] theorem reverse_reverse {u v : V} (p : G.Walk u v) : p.reverse.reverse = p := by induction p with \| nil => rfl \| cons _ _ ih => simp [ih] #align simple_graph.walk.reverse_reverse SimpleGraph.Walk.reverse_reverse @[simp] theorem length_nil {u : V} : (nil : G.Walk u u).length = 0 := rfl #align simple_graph.walk.length_nil SimpleGraph.Walk.length_nil @[simp] theorem length_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).length = p.length + 1 := rfl #align simple_graph.walk.length_cons SimpleGraph.Walk.length_cons @[simp] theorem length_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).length = p.length := by subst_vars rfl #align simple_graph.walk.length_copy SimpleGraph.Walk.length_copy @[simp] theorem length_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : (p.append q).length = p.length + q.length := by induction p with \| nil => simp \| cons _ _ ih => simp [ih, add_comm, add_left_comm, add_assoc] #align simple_graph.walk.length_append SimpleGraph.Walk.length_append @[simp] theorem length_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).length = p.length + 1 := length_append _ _ #align simple_graph.walk.length_concat SimpleGraph.Walk.length_concat @[simp] protected theorem length_reverseAux {u v w : V} (p : G.Walk u v) (q : G.Walk u w) : (p.reverseAux q).length = p.length + q.length := by induction p with \| nil => simp! \| cons _ _ ih => simp [ih, Nat.succ_add, Nat.add_assoc] #align simple_graph.walk.length_reverse_aux SimpleGraph.Walk.length_reverseAux @[simp] theorem length_reverse {u v : V} (p : G.Walk u v) : p.reverse.length = p.length := by simp [reverse] #align simple_graph.walk.length_reverse SimpleGraph.Walk.length_reverse theorem eq_of_length_eq_zero {u v : V} : ∀ {p : G.Walk u v}, p.length = 0 → u = v \| nil, _ => rfl #align simple_graph.walk.eq_of_length_eq_zero SimpleGraph.Walk.eq_of_length_eq_zero theorem adj_of_length_eq_one {u v : V} : ∀ {p : G.Walk u v}, p.length = 1 → G.Adj u v \| cons h nil, _ => h @[simp] theorem exists_length_eq_zero_iff {u v : V} : (∃ p : G.Walk u v, p.length = 0) ↔ u = v := by constructor · rintro ⟨p, hp⟩ exact eq_of_length_eq_zero hp · rintro rfl exact ⟨nil, rfl⟩ #align simple_graph.walk.exists_length_eq_zero_iff SimpleGraph.Walk.exists_length_eq_zero_iff @[simp] theorem length_eq_zero_iff {u : V} {p : G.Walk u u} : p.length = 0 ↔ p = nil := by cases p <;> simp #align simple_graph.walk.length_eq_zero_iff SimpleGraph.Walk.length_eq_zero_iff theorem getVert_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) (i : ℕ) : (p.append q).getVert i = if i < p.length then p.getVert i else q.getVert (i - p.length) := by induction p generalizing i with \| nil => simp \| cons h p ih => cases i <;> simp [getVert, ih, Nat.succ_lt_succ_iff] theorem getVert_reverse {u v : V} (p : G.Walk u v) (i : ℕ) : p.reverse.getVert i = p.getVert (p.length - i) := by induction p with \| nil => rfl \| cons h p ih => simp only [reverse_cons, getVert_append, length_reverse, ih, length_cons] split_ifs next hi => rw [Nat.succ_sub hi.le] simp [getVert] next hi => obtain rfl \| hi' := Nat.eq_or_lt_of_not_lt hi · simp [getVert] · rw [Nat.eq_add_of_sub_eq (Nat.sub_pos_of_lt hi') rfl, Nat.sub_eq_zero_of_le hi'] simp [getVert] section ConcatRec variable {motive : ∀ u v : V, G.Walk u v → Sort} (Hnil : ∀ {u : V}, motive u u nil) (Hconcat : ∀ {u v w : V} (p : G.Walk u v) (h : G.Adj v w), motive u v p → motive u w (p.concat h)) /-- Auxiliary definition for `SimpleGraph.Walk.concatRec` -/ def concatRecAux {u v : V} : (p : G.Walk u v) → motive v u p.reverse \| nil => Hnil \| cons h p => reverse_cons h p ▸ Hconcat p.reverse h.symm (concatRecAux p) #align simple_graph.walk.concat_rec_aux SimpleGraph.Walk.concatRecAux /-- Recursor on walks by inducting on `SimpleGraph.Walk.concat`. This is inducting from the opposite end of the walk compared to `SimpleGraph.Walk.rec`, which inducts on `SimpleGraph.Walk.cons`. -/ @[elab_as_elim] def concatRec {u v : V} (p : G.Walk u v) : motive u v p := reverse_reverse p ▸ concatRecAux @Hnil @Hconcat p.reverse #align simple_graph.walk.concat_rec SimpleGraph.Walk.concatRec @[simp] theorem concatRec_nil (u : V) : @concatRec _ _ motive @Hnil @Hconcat _ _ (nil : G.Walk u u) = Hnil := rfl #align simple_graph.walk.concat_rec_nil SimpleGraph.Walk.concatRec_nil @[simp] theorem concatRec_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : @concatRec _ _ motive @Hnil @Hconcat _ _ (p.concat h) = Hconcat p h (concatRec @Hnil @Hconcat p) := by simp only [concatRec] apply eq_of_heq apply rec_heq_of_heq trans concatRecAux @Hnil @Hconcat (cons h.symm p.reverse) · congr simp · rw [concatRecAux, rec_heq_iff_heq] congr <;> simp [heq_rec_iff_heq] #align simple_graph.walk.concat_rec_concat SimpleGraph.Walk.concatRec_concat end ConcatRec theorem concat_ne_nil {u v : V} (p : G.Walk u v) (h : G.Adj v u) : p.concat h ≠ nil := by cases p <;> simp [concat] #align simple_graph.walk.concat_ne_nil SimpleGraph.Walk.concat_ne_nil theorem concat_inj {u v v' w : V} {p : G.Walk u v} {h : G.Adj v w} {p' : G.Walk u v'} {h' : G.Adj v' w} (he : p.concat h = p'.concat h') : ∃ hv : v = v', p.copy rfl hv = p' := by induction p with \| nil => cases p' · exact ⟨rfl, rfl⟩ · exfalso simp only [concat_nil, concat_cons, cons.injEq] at he obtain ⟨rfl, he⟩ := he simp only [heq_iff_eq] at he exact concat_ne_nil _ _ he.symm \| cons _ _ ih => rw [concat_cons] at he cases p' · exfalso simp only [concat_nil, cons.injEq] at he obtain ⟨rfl, he⟩ := he rw [heq_iff_eq] at he exact concat_ne_nil _ _ he · rw [concat_cons, cons.injEq] at he obtain ⟨rfl, he⟩ := he rw [heq_iff_eq] at he obtain ⟨rfl, rfl⟩ := ih he exact ⟨rfl, rfl⟩ #align simple_graph.walk.concat_inj SimpleGraph.Walk.concat_inj /-- The `support` of a walk is the list of vertices it visits in order. -/ def support {u v : V} : G.Walk u v → List V \| nil => [u] \| cons _ p => u :: p.support #align simple_graph.walk.support SimpleGraph.Walk.support /-- The `darts` of a walk is the list of darts it visits in order. -/ def darts {u v : V} : G.Walk u v → List G.Dart \| nil => [] \| cons h p => ⟨(u, _), h⟩ :: p.darts #align simple_graph.walk.darts SimpleGraph.Walk.darts /-- The `edges` of a walk is the list of edges it visits in order. This is defined to be the list of edges underlying `SimpleGraph.Walk.darts`. -/ def edges {u v : V} (p : G.Walk u v) : List (Sym2 V) := p.darts.map Dart.edge #align simple_graph.walk.edges SimpleGraph.Walk.edges @[simp] theorem support_nil {u : V} : (nil : G.Walk u u).support = [u] := rfl #align simple_graph.walk.support_nil SimpleGraph.Walk.support_nil @[simp] theorem support_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).support = u :: p.support := rfl #align simple_graph.walk.support_cons SimpleGraph.Walk.support_cons @[simp] theorem support_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).support = p.support.concat w := by induction p <;> simp [, concat_nil] #align simple_graph.walk.support_concat SimpleGraph.Walk.support_concat @[simp] theorem support_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).support = p.support := by subst_vars rfl #align simple_graph.walk.support_copy SimpleGraph.Walk.support_copy theorem support_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').support = p.support ++ p'.support.tail := by induction p <;> cases p' <;> simp [] #align simple_graph.walk.support_append SimpleGraph.Walk.support_append @[simp] theorem support_reverse {u v : V} (p : G.Walk u v) : p.reverse.support = p.support.reverse := by induction p <;> simp [support_append, ] #align simple_graph.walk.support_reverse SimpleGraph.Walk.support_reverse @[simp] theorem support_ne_nil {u v : V} (p : G.Walk u v) : p.support ≠ [] := by cases p <;> simp #align simple_graph.walk.support_ne_nil SimpleGraph.Walk.support_ne_nil theorem tail_support_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').support.tail = p.support.tail ++ p'.support.tail := by rw [support_append, List.tail_append_of_ne_nil _ _ (support_ne_nil _)] #align simple_graph.walk.tail_support_append SimpleGraph.Walk.tail_support_append theorem support_eq_cons {u v : V} (p : G.Walk u v) : p.support = u :: p.support.tail := by cases p <;> simp #align simple_graph.walk.support_eq_cons SimpleGraph.Walk.support_eq_cons @[simp] theorem start_mem_support {u v : V} (p : G.Walk u v) : u ∈ p.support := by cases p <;> simp #align simple_graph.walk.start_mem_support SimpleGraph.Walk.start_mem_support @[simp] theorem end_mem_support {u v : V} (p : G.Walk u v) : v ∈ p.support := by induction p <;> simp [] #align simple_graph.walk.end_mem_support SimpleGraph.Walk.end_mem_support @[simp] theorem support_nonempty {u v : V} (p : G.Walk u v) : { w \| w ∈ p.support }.Nonempty := ⟨u, by simp⟩ #align simple_graph.walk.support_nonempty SimpleGraph.Walk.support_nonempty theorem mem_support_iff {u v w : V} (p : G.Walk u v) : w ∈ p.support ↔ w = u ∨ w ∈ p.support.tail := by cases p <;> simp #align simple_graph.walk.mem_support_iff SimpleGraph.Walk.mem_support_iff theorem mem_support_nil_iff {u v : V} : u ∈ (nil : G.Walk v v).support ↔ u = v := by simp #align simple_graph.walk.mem_support_nil_iff SimpleGraph.Walk.mem_support_nil_iff @[simp] theorem mem_tail_support_append_iff {t u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : t ∈ (p.append p').support.tail ↔ t ∈ p.support.tail ∨ t ∈ p'.support.tail := by rw [tail_support_append, List.mem_append] #align simple_graph.walk.mem_tail_support_append_iff SimpleGraph.Walk.mem_tail_support_append_iff @[simp] theorem end_mem_tail_support_of_ne {u v : V} (h : u ≠ v) (p : G.Walk u v) : v ∈ p.support.tail := by obtain ⟨_, _, _, rfl⟩ := exists_eq_cons_of_ne h p simp #align simple_graph.walk.end_mem_tail_support_of_ne SimpleGraph.Walk.end_mem_tail_support_of_ne @[simp, nolint unusedHavesSuffices] theorem mem_support_append_iff {t u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : t ∈ (p.append p').support ↔ t ∈ p.support ∨ t ∈ p'.support := by simp only [mem_support_iff, mem_tail_support_append_iff] obtain rfl \| h := eq_or_ne t v <;> obtain rfl \| h' := eq_or_ne t u <;> -- this `have` triggers the unusedHavesSuffices linter: (try have := h'.symm) <;> simp [] #align simple_graph.walk.mem_support_append_iff SimpleGraph.Walk.mem_support_append_iff @[simp] theorem subset_support_append_left {V : Type u} {G : SimpleGraph V} {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : p.support ⊆ (p.append q).support := by simp only [Walk.support_append, List.subset_append_left] #align simple_graph.walk.subset_support_append_left SimpleGraph.Walk.subset_support_append_left @[simp] theorem subset_support_append_right {V : Type u} {G : SimpleGraph V} {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : q.support ⊆ (p.append q).support := by intro h simp (config := { contextual := true }) only [mem_support_append_iff, or_true_iff, imp_true_iff] #align simple_graph.walk.subset_support_append_right SimpleGraph.Walk.subset_support_append_right theorem coe_support {u v : V} (p : G.Walk u v) : (p.support : Multiset V) = {u} + p.support.tail := by cases p <;> rfl #align simple_graph.walk.coe_support SimpleGraph.Walk.coe_support theorem coe_support_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : ((p.append p').support : Multiset V) = {u} + p.support.tail + p'.support.tail := by rw [support_append, ← Multiset.coe_add, coe_support] #align simple_graph.walk.coe_support_append SimpleGraph.Walk.coe_support_append theorem coe_support_append' [DecidableEq V] {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : ((p.append p').support : Multiset V) = p.support + p'.support - {v} := by rw [support_append, ← Multiset.coe_add] simp only [coe_support] rw [add_comm ({v} : Multiset V)] simp only [← add_assoc, add_tsub_cancel_right] #align simple_graph.walk.coe_support_append' SimpleGraph.Walk.coe_support_append' theorem chain_adj_support {u v w : V} (h : G.Adj u v) : ∀ (p : G.Walk v w), List.Chain G.Adj u p.support \| nil => List.Chain.cons h List.Chain.nil \| cons h' p => List.Chain.cons h (chain_adj_support h' p) #align simple_graph.walk.chain_adj_support SimpleGraph.Walk.chain_adj_support theorem chain'_adj_support {u v : V} : ∀ (p : G.Walk u v), List.Chain' G.Adj p.support \| nil => List.Chain.nil \| cons h p => chain_adj_support h p #align simple_graph.walk.chain'_adj_support SimpleGraph.Walk.chain'_adj_support theorem chain_dartAdj_darts {d : G.Dart} {v w : V} (h : d.snd = v) (p : G.Walk v w) : List.Chain G.DartAdj d p.darts := by induction p generalizing d with \| nil => exact List.Chain.nil -- Porting note: needed to defer `h` and `rfl` to help elaboration \| cons h' p ih => exact List.Chain.cons (by exact h) (ih (by rfl)) #align simple_graph.walk.chain_dart_adj_darts SimpleGraph.Walk.chain_dartAdj_darts theorem chain'_dartAdj_darts {u v : V} : ∀ (p : G.Walk u v), List.Chain' G.DartAdj p.darts \| nil => trivial -- Porting note: needed to defer `rfl` to help elaboration \| cons h p => chain_dartAdj_darts (by rfl) p #align simple_graph.walk.chain'_dart_adj_darts SimpleGraph.Walk.chain'_dartAdj_darts /-- Every edge in a walk's edge list is an edge of the graph. It is written in this form (rather than using `⊆`) to avoid unsightly coercions. -/ theorem edges_subset_edgeSet {u v : V} : ∀ (p : G.Walk u v) ⦃e : Sym2 V⦄, e ∈ p.edges → e ∈ G.edgeSet \| cons h' p', e, h => by cases h · exact h' next h' => exact edges_subset_edgeSet p' h' #align simple_graph.walk.edges_subset_edge_set SimpleGraph.Walk.edges_subset_edgeSet theorem adj_of_mem_edges {u v x y : V} (p : G.Walk u v) (h : s(x, y) ∈ p.edges) : G.Adj x y := edges_subset_edgeSet p h #align simple_graph.walk.adj_of_mem_edges SimpleGraph.Walk.adj_of_mem_edges @[simp] theorem darts_nil {u : V} : (nil : G.Walk u u).darts = [] := rfl #align simple_graph.walk.darts_nil SimpleGraph.Walk.darts_nil @[simp] theorem darts_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).darts = ⟨(u, v), h⟩ :: p.darts := rfl #align simple_graph.walk.darts_cons SimpleGraph.Walk.darts_cons @[simp] theorem darts_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).darts = p.darts.concat ⟨(v, w), h⟩ := by induction p <;> simp [, concat_nil] #align simple_graph.walk.darts_concat SimpleGraph.Walk.darts_concat @[simp] theorem darts_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).darts = p.darts := by subst_vars rfl #align simple_graph.walk.darts_copy SimpleGraph.Walk.darts_copy @[simp] theorem darts_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').darts = p.darts ++ p'.darts := by induction p <;> simp [] #align simple_graph.walk.darts_append SimpleGraph.Walk.darts_append @[simp] theorem darts_reverse {u v : V} (p : G.Walk u v) : p.reverse.darts = (p.darts.map Dart.symm).reverse := by induction p <;> simp [, Sym2.eq_swap] #align simple_graph.walk.darts_reverse SimpleGraph.Walk.darts_reverse theorem mem_darts_reverse {u v : V} {d : G.Dart} {p : G.Walk u v} : d ∈ p.reverse.darts ↔ d.symm ∈ p.darts := by simp #align simple_graph.walk.mem_darts_reverse SimpleGraph.Walk.mem_darts_reverse theorem cons_map_snd_darts {u v : V} (p : G.Walk u v) : (u :: p.darts.map (·.snd)) = p.support := by induction p <;> simp! [] #align simple_graph.walk.cons_map_snd_darts SimpleGraph.Walk.cons_map_snd_darts theorem map_snd_darts {u v : V} (p : G.Walk u v) : p.darts.map (·.snd) = p.support.tail := by simpa using congr_arg List.tail (cons_map_snd_darts p) #align simple_graph.walk.map_snd_darts SimpleGraph.Walk.map_snd_darts theorem map_fst_darts_append {u v : V} (p : G.Walk u v) : p.darts.map (·.fst) ++ [v] = p.support := by induction p <;> simp! [] #align simple_graph.walk.map_fst_darts_append SimpleGraph.Walk.map_fst_darts_append theorem map_fst_darts {u v : V} (p : G.Walk u v) : p.darts.map (·.fst) = p.support.dropLast := by simpa! using congr_arg List.dropLast (map_fst_darts_append p) #align simple_graph.walk.map_fst_darts SimpleGraph.Walk.map_fst_darts @[simp] theorem edges_nil {u : V} : (nil : G.Walk u u).edges = [] := rfl #align simple_graph.walk.edges_nil SimpleGraph.Walk.edges_nil @[simp] theorem edges_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).edges = s(u, v) :: p.edges := rfl #align simple_graph.walk.edges_cons SimpleGraph.Walk.edges_cons @[simp] theorem edges_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).edges = p.edges.concat s(v, w) := by simp [edges] #align simple_graph.walk.edges_concat SimpleGraph.Walk.edges_concat @[simp] theorem edges_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).edges = p.edges := by subst_vars rfl #align simple_graph.walk.edges_copy SimpleGraph.Walk.edges_copy @[simp] theorem edges_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').edges = p.edges ++ p'.edges := by simp [edges] #align simple_graph.walk.edges_append SimpleGraph.Walk.edges_append @[simp] theorem edges_reverse {u v : V} (p : G.Walk u v) : p.reverse.edges = p.edges.reverse := by simp [edges, List.map_reverse] #align simple_graph.walk.edges_reverse SimpleGraph.Walk.edges_reverse @[simp] theorem length_support {u v : V} (p : G.Walk u v) : p.support.length = p.length + 1 := by induction p <;> simp [] #align simple_graph.walk.length_support SimpleGraph.Walk.length_support @[simp] theorem length_darts {u v : V} (p : G.Walk u v) : p.darts.length = p.length := by induction p <;> simp [] #align simple_graph.walk.length_darts SimpleGraph.Walk.length_darts @[simp] theorem length_edges {u v : V} (p : G.Walk u v) : p.edges.length = p.length := by simp [edges] #align simple_graph.walk.length_edges SimpleGraph.Walk.length_edges theorem dart_fst_mem_support_of_mem_darts {u v : V} : ∀ (p : G.Walk u v) {d : G.Dart}, d ∈ p.darts → d.fst ∈ p.support \| cons h p', d, hd => by simp only [support_cons, darts_cons, List.mem_cons] at hd ⊢ rcases hd with (rfl \| hd) · exact Or.inl rfl · exact Or.inr (dart_fst_mem_support_of_mem_darts _ hd) #align simple_graph.walk.dart_fst_mem_support_of_mem_darts SimpleGraph.Walk.dart_fst_mem_support_of_mem_darts theorem dart_snd_mem_support_of_mem_darts {u v : V} (p : G.Walk u v) {d : G.Dart} (h : d ∈ p.darts) : d.snd ∈ p.support := by simpa using p.reverse.dart_fst_mem_support_of_mem_darts (by simp [h] : d.symm ∈ p.reverse.darts) #align simple_graph.walk.dart_snd_mem_support_of_mem_darts SimpleGraph.Walk.dart_snd_mem_support_of_mem_darts theorem fst_mem_support_of_mem_edges {t u v w : V} (p : G.Walk v w) (he : s(t, u) ∈ p.edges) : t ∈ p.support := by obtain ⟨d, hd, he⟩ := List.mem_map.mp he rw [dart_edge_eq_mk'_iff'] at he rcases he with (⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩) · exact dart_fst_mem_support_of_mem_darts _ hd · exact dart_snd_mem_support_of_mem_darts _ hd #align simple_graph.walk.fst_mem_support_of_mem_edges SimpleGraph.Walk.fst_mem_support_of_mem_edges theorem snd_mem_support_of_mem_edges {t u v w : V} (p : G.Walk v w) (he : s(t, u) ∈ p.edges) : u ∈ p.support := by rw [Sym2.eq_swap] at he exact p.fst_mem_support_of_mem_edges he #align simple_graph.walk.snd_mem_support_of_mem_edges SimpleGraph.Walk.snd_mem_support_of_mem_edges theorem darts_nodup_of_support_nodup {u v : V} {p : G.Walk u v} (h : p.support.Nodup) : p.darts.Nodup := by induction p with \| nil => simp \| cons _ p' ih => simp only [darts_cons, support_cons, List.nodup_cons] at h ⊢ exact ⟨fun h' => h.1 (dart_fst_mem_support_of_mem_darts p' h'), ih h.2⟩ #align simple_graph.walk.darts_nodup_of_support_nodup SimpleGraph.Walk.darts_nodup_of_support_nodup theorem edges_nodup_of_support_nodup {u v : V} {p : G.Walk u v} (h : p.support.Nodup) : p.edges.Nodup := by induction p with \| nil => simp \| cons _ p' ih => simp only [edges_cons, support_cons, List.nodup_cons] at h ⊢ exact ⟨fun h' => h.1 (fst_mem_support_of_mem_edges p' h'), ih h.2⟩ #align simple_graph.walk.edges_nodup_of_support_nodup SimpleGraph.Walk.edges_nodup_of_support_nodup /-- Predicate for the empty walk. Solves the dependent type problem where `p = G.Walk.nil` typechecks only if `p` has defeq endpoints. -/ inductive Nil : {v w : V} → G.Walk v w → Prop \| nil {u : V} : Nil (nil : G.Walk u u) variable {u v w : V} @[simp] lemma nil_nil : (nil : G.Walk u u).Nil := Nil.nil @[simp] lemma not_nil_cons {h : G.Adj u v} {p : G.Walk v w} : ¬ (cons h p).Nil := nofun instance (p : G.Walk v w) : Decidable p.Nil := match p with \| nil => isTrue .nil \| cons _ _ => isFalse nofun protected lemma Nil.eq {p : G.Walk v w} : p.Nil → v = w \| .nil => rfl lemma not_nil_of_ne {p : G.Walk v w} : v ≠ w → ¬ p.Nil := mt Nil.eq lemma nil_iff_support_eq {p : G.Walk v w} : p.Nil ↔ p.support = [v] := by cases p <;> simp lemma nil_iff_length_eq {p : G.Walk v w} : p.Nil ↔ p.length = 0 := by cases p <;> simp lemma not_nil_iff {p : G.Walk v w} : ¬ p.Nil ↔ ∃ (u : V) (h : G.Adj v u) (q : G.Walk u w), p = cons h q := by cases p <;> simp [] /-- A walk with its endpoints defeq is `Nil` if and only if it is equal to `nil`. -/ lemma nil_iff_eq_nil : ∀ {p : G.Walk v v}, p.Nil ↔ p = nil \| .nil \| .cons _ _ => by simp alias ⟨Nil.eq_nil, _⟩ := nil_iff_eq_nil @[elab_as_elim] def notNilRec {motive : {u w : V} → (p : G.Walk u w) → (h : ¬ p.Nil) → Sort} (cons : {u v w : V} → (h : G.Adj u v) → (q : G.Walk v w) → motive (cons h q) not_nil_cons) (p : G.Walk u w) : (hp : ¬ p.Nil) → motive p hp := match p with \| nil => fun hp => absurd .nil hp \| .cons h q => fun _ => cons h q /-- The second vertex along a non-nil walk. -/ def sndOfNotNil (p : G.Walk v w) (hp : ¬ p.Nil) : V := p.notNilRec (@fun _ u _ _ _ => u) hp @[simp] lemma adj_sndOfNotNil {p : G.Walk v w} (hp : ¬ p.Nil) : G.Adj v (p.sndOfNotNil hp) := p.notNilRec (fun h _ => h) hp /-- The walk obtained by removing the first dart of a non-nil walk. -/ def tail (p : G.Walk u v) (hp : ¬ p.Nil) : G.Walk (p.sndOfNotNil hp) v := p.notNilRec (fun _ q => q) hp /-- The first dart of a walk. -/ @[simps] def firstDart (p : G.Walk v w) (hp : ¬ p.Nil) : G.Dart where fst := v snd := p.sndOfNotNil hp adj := p.adj_sndOfNotNil hp lemma edge_firstDart (p : G.Walk v w) (hp : ¬ p.Nil) : (p.firstDart hp).edge = s(v, p.sndOfNotNil hp) := rfl variable {x y : V} -- TODO: rename to u, v, w instead? @[simp] lemma cons_tail_eq (p : G.Walk x y) (hp : ¬ p.Nil) : cons (p.adj_sndOfNotNil hp) (p.tail hp) = p := p.notNilRec (fun _ _ => rfl) hp @[simp] lemma cons_support_tail (p : G.Walk x y) (hp : ¬p.Nil) : x :: (p.tail hp).support = p.support := by rw [← support_cons, cons_tail_eq] @[simp] lemma length_tail_add_one {p : G.Walk x y} (hp : ¬ p.Nil) : (p.tail hp).length + 1 = p.length := by rw [← length_cons, cons_tail_eq] @[simp] lemma nil_copy {x' y' : V} {p : G.Walk x y} (hx : x = x') (hy : y = y') : (p.copy hx hy).Nil = p.Nil := by subst_vars; rfl @[simp] lemma support_tail (p : G.Walk v v) (hp) : (p.tail hp).support = p.support.tail := by rw [← cons_support_tail p hp, List.tail_cons] /-! ### Trails, paths, circuits, cycles -/ /-- A trail* is a walk with no repeating edges. -/ @[mk_iff isTrail_def] structure IsTrail {u v : V} (p : G.Walk u v) : Prop where edges_nodup : p.edges.Nodup #align simple_graph.walk.is_trail SimpleGraph.Walk.IsTrail #align simple_graph.walk.is_trail_def SimpleGraph.Walk.isTrail_def /-- A path is a walk with no repeating vertices. Use `SimpleGraph.Walk.IsPath.mk'` for a simpler constructor. -/ structure IsPath {u v : V} (p : G.Walk u v) extends IsTrail p : Prop where support_nodup : p.support.Nodup #align simple_graph.walk.is_path SimpleGraph.Walk.IsPath -- Porting note: used to use `extends to_trail : is_trail p` in structure protected lemma IsPath.isTrail {p : Walk G u v}(h : IsPath p) : IsTrail p := h.toIsTrail #align simple_graph.walk.is_path.to_trail SimpleGraph.Walk.IsPath.isTrail /-- A circuit at `u : V` is a nonempty trail beginning and ending at `u`. -/ @[mk_iff isCircuit_def] structure IsCircuit {u : V} (p : G.Walk u u) extends IsTrail p : Prop where ne_nil : p ≠ nil #align simple_graph.walk.is_circuit SimpleGraph.Walk.IsCircuit #align simple_graph.walk.is_circuit_def SimpleGraph.Walk.isCircuit_def -- Porting note: used to use `extends to_trail : is_trail p` in structure protected lemma IsCircuit.isTrail {p : Walk G u u} (h : IsCircuit p) : IsTrail p := h.toIsTrail #align simple_graph.walk.is_circuit.to_trail SimpleGraph.Walk.IsCircuit.isTrail /-- A cycle at `u : V` is a circuit at `u` whose only repeating vertex is `u` (which appears exactly twice). -/ structure IsCycle {u : V} (p : G.Walk u u) extends IsCircuit p : Prop where support_nodup : p.support.tail.Nodup #align simple_graph.walk.is_cycle SimpleGraph.Walk.IsCycle -- Porting note: used to use `extends to_circuit : is_circuit p` in structure protected lemma IsCycle.isCircuit {p : Walk G u u} (h : IsCycle p) : IsCircuit p := h.toIsCircuit #align simple_graph.walk.is_cycle.to_circuit SimpleGraph.Walk.IsCycle.isCircuit @[simp] theorem isTrail_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).IsTrail ↔ p.IsTrail := by subst_vars rfl #align simple_graph.walk.is_trail_copy SimpleGraph.Walk.isTrail_copy theorem IsPath.mk' {u v : V} {p : G.Walk u v} (h : p.support.Nodup) : p.IsPath := ⟨⟨edges_nodup_of_support_nodup h⟩, h⟩ #align simple_graph.walk.is_path.mk' SimpleGraph.Walk.IsPath.mk' theorem isPath_def {u v : V} (p : G.Walk u v) : p.IsPath ↔ p.support.Nodup := ⟨IsPath.support_nodup, IsPath.mk'⟩ #align simple_graph.walk.is_path_def SimpleGraph.Walk.isPath_def @[simp] theorem isPath_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).IsPath ↔ p.IsPath := by subst_vars rfl #align simple_graph.walk.is_path_copy SimpleGraph.Walk.isPath_copy @[simp] theorem isCircuit_copy {u u'} (p : G.Walk u u) (hu : u = u') : (p.copy hu hu).IsCircuit ↔ p.IsCircuit := by subst_vars rfl #align simple_graph.walk.is_circuit_copy SimpleGraph.Walk.isCircuit_copy lemma IsCircuit.not_nil {p : G.Walk v v} (hp : IsCircuit p) : ¬ p.Nil := (hp.ne_nil ·.eq_nil) theorem isCycle_def {u : V} (p : G.Walk u u) : p.IsCycle ↔ p.IsTrail ∧ p ≠ nil ∧ p.support.tail.Nodup := Iff.intro (fun h => ⟨h.1.1, h.1.2, h.2⟩) fun h => ⟨⟨h.1, h.2.1⟩, h.2.2⟩ #align simple_graph.walk.is_cycle_def SimpleGraph.Walk.isCycle_def @[simp] theorem isCycle_copy {u u'} (p : G.Walk u u) (hu : u = u') : (p.copy hu hu).IsCycle ↔ p.IsCycle := by subst_vars rfl #align simple_graph.walk.is_cycle_copy SimpleGraph.Walk.isCycle_copy lemma IsCycle.not_nil {p : G.Walk v v} (hp : IsCycle p) : ¬ p.Nil := (hp.ne_nil ·.eq_nil) @[simp] theorem IsTrail.nil {u : V} : (nil : G.Walk u u).IsTrail := ⟨by simp [edges]⟩ #align simple_graph.walk.is_trail.nil SimpleGraph.Walk.IsTrail.nil theorem IsTrail.of_cons {u v w : V} {h : G.Adj u v} {p : G.Walk v w} : (cons h p).IsTrail → p.IsTrail := by simp [isTrail_def] #align simple_graph.walk.is_trail.of_cons SimpleGraph.Walk.IsTrail.of_cons @[simp] theorem cons_isTrail_iff {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).IsTrail ↔ p.IsTrail ∧ s(u, v) ∉ p.edges := by simp [isTrail_def, and_comm] #align simple_graph.walk.cons_is_trail_iff SimpleGraph.Walk.cons_isTrail_iff theorem IsTrail.reverse {u v : V} (p : G.Walk u v) (h : p.IsTrail) : p.reverse.IsTrail := by simpa [isTrail_def] using h #align simple_graph.walk.is_trail.reverse SimpleGraph.Walk.IsTrail.reverse @[simp] theorem reverse_isTrail_iff {u v : V} (p : G.Walk u v) : p.reverse.IsTrail ↔ p.IsTrail := by constructor <;> · intro h convert h.reverse _ try rw [reverse_reverse] #align simple_graph.walk.reverse_is_trail_iff SimpleGraph.Walk.reverse_isTrail_iff	Mathlib/Combinatorics/SimpleGraph/Connectivity.lean	1,049	1,052	theorem IsTrail.of_append_left {u v w : V} {p : G.Walk u v} {q : G.Walk v w} (h : (p.append q).IsTrail) : p.IsTrail := by	rw [isTrail_def, edges_append, List.nodup_append] at h exact ⟨h.1⟩
/- Copyright (c) 2020 Yury Kudryashov, Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov, Anne Baanen -/ import Mathlib.Algebra.BigOperators.Ring import Mathlib.Data.Fintype.BigOperators import Mathlib.Data.Fintype.Fin import Mathlib.GroupTheory.GroupAction.Pi import Mathlib.Logic.Equiv.Fin #align_import algebra.big_operators.fin from "leanprover-community/mathlib"@"cc5dd6244981976cc9da7afc4eee5682b037a013" /-! # Big operators and `Fin` Some results about products and sums over the type `Fin`. The most important results are the induction formulas `Fin.prod_univ_castSucc` and `Fin.prod_univ_succ`, and the formula `Fin.prod_const` for the product of a constant function. These results have variants for sums instead of products. ## Main declarations * `finFunctionFinEquiv`: An explicit equivalence between `Fin n → Fin m` and `Fin (m ^ n)`. -/ open Finset variable {α : Type} {β : Type} namespace Finset @[to_additive] theorem prod_range [CommMonoid β] {n : ℕ} (f : ℕ → β) : ∏ i ∈ Finset.range n, f i = ∏ i : Fin n, f i := (Fin.prod_univ_eq_prod_range _ _).symm #align finset.prod_range Finset.prod_range #align finset.sum_range Finset.sum_range end Finset namespace Fin @[to_additive] theorem prod_ofFn [CommMonoid β] {n : ℕ} (f : Fin n → β) : (List.ofFn f).prod = ∏ i, f i := by simp [prod_eq_multiset_prod] #align fin.prod_of_fn Fin.prod_ofFn #align fin.sum_of_fn Fin.sum_ofFn @[to_additive] theorem prod_univ_def [CommMonoid β] {n : ℕ} (f : Fin n → β) : ∏ i, f i = ((List.finRange n).map f).prod := by rw [← List.ofFn_eq_map, prod_ofFn] #align fin.prod_univ_def Fin.prod_univ_def #align fin.sum_univ_def Fin.sum_univ_def /-- A product of a function `f : Fin 0 → β` is `1` because `Fin 0` is empty -/ @[to_additive "A sum of a function `f : Fin 0 → β` is `0` because `Fin 0` is empty"] theorem prod_univ_zero [CommMonoid β] (f : Fin 0 → β) : ∏ i, f i = 1 := rfl #align fin.prod_univ_zero Fin.prod_univ_zero #align fin.sum_univ_zero Fin.sum_univ_zero /-- A product of a function `f : Fin (n + 1) → β` over all `Fin (n + 1)` is the product of `f x`, for some `x : Fin (n + 1)` times the remaining product -/ @[to_additive "A sum of a function `f : Fin (n + 1) → β` over all `Fin (n + 1)` is the sum of `f x`, for some `x : Fin (n + 1)` plus the remaining product"] theorem prod_univ_succAbove [CommMonoid β] {n : ℕ} (f : Fin (n + 1) → β) (x : Fin (n + 1)) : ∏ i, f i = f x * ∏ i : Fin n, f (x.succAbove i) := by rw [univ_succAbove, prod_cons, Finset.prod_map _ x.succAboveEmb] rfl #align fin.prod_univ_succ_above Fin.prod_univ_succAbove #align fin.sum_univ_succ_above Fin.sum_univ_succAbove /-- A product of a function `f : Fin (n + 1) → β` over all `Fin (n + 1)` is the product of `f 0` plus the remaining product -/ @[to_additive "A sum of a function `f : Fin (n + 1) → β` over all `Fin (n + 1)` is the sum of `f 0` plus the remaining product"] theorem prod_univ_succ [CommMonoid β] {n : ℕ} (f : Fin (n + 1) → β) : ∏ i, f i = f 0 * ∏ i : Fin n, f i.succ := prod_univ_succAbove f 0 #align fin.prod_univ_succ Fin.prod_univ_succ #align fin.sum_univ_succ Fin.sum_univ_succ /-- A product of a function `f : Fin (n + 1) → β` over all `Fin (n + 1)` is the product of `f (Fin.last n)` plus the remaining product -/ @[to_additive "A sum of a function `f : Fin (n + 1) → β` over all `Fin (n + 1)` is the sum of `f (Fin.last n)` plus the remaining sum"] theorem prod_univ_castSucc [CommMonoid β] {n : ℕ} (f : Fin (n + 1) → β) : ∏ i, f i = (∏ i : Fin n, f (Fin.castSucc i)) * f (last n) := by simpa [mul_comm] using prod_univ_succAbove f (last n) #align fin.prod_univ_cast_succ Fin.prod_univ_castSucc #align fin.sum_univ_cast_succ Fin.sum_univ_castSucc @[to_additive (attr := simp)] theorem prod_univ_get [CommMonoid α] (l : List α) : ∏ i, l.get i = l.prod := by simp [Finset.prod_eq_multiset_prod] @[to_additive (attr := simp)] theorem prod_univ_get' [CommMonoid β] (l : List α) (f : α → β) : ∏ i, f (l.get i) = (l.map f).prod := by simp [Finset.prod_eq_multiset_prod] @[to_additive] theorem prod_cons [CommMonoid β] {n : ℕ} (x : β) (f : Fin n → β) : (∏ i : Fin n.succ, (cons x f : Fin n.succ → β) i) = x * ∏ i : Fin n, f i := by simp_rw [prod_univ_succ, cons_zero, cons_succ] #align fin.prod_cons Fin.prod_cons #align fin.sum_cons Fin.sum_cons @[to_additive sum_univ_one] theorem prod_univ_one [CommMonoid β] (f : Fin 1 → β) : ∏ i, f i = f 0 := by simp #align fin.prod_univ_one Fin.prod_univ_one #align fin.sum_univ_one Fin.sum_univ_one @[to_additive (attr := simp)] theorem prod_univ_two [CommMonoid β] (f : Fin 2 → β) : ∏ i, f i = f 0 * f 1 := by simp [prod_univ_succ] #align fin.prod_univ_two Fin.prod_univ_two #align fin.sum_univ_two Fin.sum_univ_two @[to_additive] theorem prod_univ_two' [CommMonoid β] (f : α → β) (a b : α) : ∏ i, f (![a, b] i) = f a * f b := prod_univ_two _ @[to_additive] theorem prod_univ_three [CommMonoid β] (f : Fin 3 → β) : ∏ i, f i = f 0 * f 1 * f 2 := by rw [prod_univ_castSucc, prod_univ_two] rfl #align fin.prod_univ_three Fin.prod_univ_three #align fin.sum_univ_three Fin.sum_univ_three @[to_additive] theorem prod_univ_four [CommMonoid β] (f : Fin 4 → β) : ∏ i, f i = f 0 * f 1 * f 2 * f 3 := by rw [prod_univ_castSucc, prod_univ_three] rfl #align fin.prod_univ_four Fin.prod_univ_four #align fin.sum_univ_four Fin.sum_univ_four @[to_additive] theorem prod_univ_five [CommMonoid β] (f : Fin 5 → β) : ∏ i, f i = f 0 * f 1 * f 2 * f 3 * f 4 := by rw [prod_univ_castSucc, prod_univ_four] rfl #align fin.prod_univ_five Fin.prod_univ_five #align fin.sum_univ_five Fin.sum_univ_five @[to_additive] theorem prod_univ_six [CommMonoid β] (f : Fin 6 → β) : ∏ i, f i = f 0 * f 1 * f 2 * f 3 * f 4 * f 5 := by rw [prod_univ_castSucc, prod_univ_five] rfl #align fin.prod_univ_six Fin.prod_univ_six #align fin.sum_univ_six Fin.sum_univ_six @[to_additive]	Mathlib/Algebra/BigOperators/Fin.lean	159	162	theorem prod_univ_seven [CommMonoid β] (f : Fin 7 → β) : ∏ i, f i = f 0 * f 1 * f 2 * f 3 * f 4 * f 5 * f 6 := by	rw [prod_univ_castSucc, prod_univ_six] rfl
/- Copyright (c) 2018 Scott Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Reid Barton, Mario Carneiro, Scott Morrison, Floris van Doorn -/ import Mathlib.CategoryTheory.Limits.IsLimit import Mathlib.CategoryTheory.Category.ULift import Mathlib.CategoryTheory.EssentiallySmall import Mathlib.Logic.Equiv.Basic #align_import category_theory.limits.has_limits from "leanprover-community/mathlib"@"2738d2ca56cbc63be80c3bd48e9ed90ad94e947d" /-! # Existence of limits and colimits In `CategoryTheory.Limits.IsLimit` we defined `IsLimit c`, the data showing that a cone `c` is a limit cone. The two main structures defined in this file are: * `LimitCone F`, which consists of a choice of cone for `F` and the fact it is a limit cone, and * `HasLimit F`, asserting the mere existence of some limit cone for `F`. `HasLimit` is a propositional typeclass (it's important that it is a proposition merely asserting the existence of a limit, as otherwise we would have non-defeq problems from incompatible instances). While `HasLimit` only asserts the existence of a limit cone, we happily use the axiom of choice in mathlib, so there are convenience functions all depending on `HasLimit F`: * `limit F : C`, producing some limit object (of course all such are isomorphic) * `limit.π F j : limit F ⟶ F.obj j`, the morphisms out of the limit, * `limit.lift F c : c.pt ⟶ limit F`, the universal morphism from any other `c : Cone F`, etc. Key to using the `HasLimit` interface is that there is an `@[ext]` lemma stating that to check `f = g`, for `f g : Z ⟶ limit F`, it suffices to check `f ≫ limit.π F j = g ≫ limit.π F j` for every `j`. This, combined with `@[simp]` lemmas, makes it possible to prove many easy facts about limits using automation (e.g. `tidy`). There are abbreviations `HasLimitsOfShape J C` and `HasLimits C` asserting the existence of classes of limits. Later more are introduced, for finite limits, special shapes of limits, etc. Ideally, many results about limits should be stated first in terms of `IsLimit`, and then a result in terms of `HasLimit` derived from this. At this point, however, this is far from uniformly achieved in mathlib --- often statements are only written in terms of `HasLimit`. ## Implementation At present we simply say everything twice, in order to handle both limits and colimits. It would be highly desirable to have some automation support, e.g. a `@[dualize]` attribute that behaves similarly to `@[to_additive]`. ## References * [Stacks: Limits and colimits](https://stacks.math.columbia.edu/tag/002D) -/ noncomputable section open CategoryTheory CategoryTheory.Category CategoryTheory.Functor Opposite namespace CategoryTheory.Limits -- morphism levels before object levels. See note [CategoryTheory universes]. universe v₁ u₁ v₂ u₂ v₃ u₃ v v' v'' u u' u'' variable {J : Type u₁} [Category.{v₁} J] {K : Type u₂} [Category.{v₂} K] variable {C : Type u} [Category.{v} C] variable {F : J ⥤ C} section Limit /-- `LimitCone F` contains a cone over `F` together with the information that it is a limit. -/ -- @[nolint has_nonempty_instance] -- Porting note(#5171): removed; linter not ported yet structure LimitCone (F : J ⥤ C) where /-- The cone itself -/ cone : Cone F /-- The proof that is the limit cone -/ isLimit : IsLimit cone #align category_theory.limits.limit_cone CategoryTheory.Limits.LimitCone #align category_theory.limits.limit_cone.is_limit CategoryTheory.Limits.LimitCone.isLimit /-- `HasLimit F` represents the mere existence of a limit for `F`. -/ class HasLimit (F : J ⥤ C) : Prop where mk' :: /-- There is some limit cone for `F` -/ exists_limit : Nonempty (LimitCone F) #align category_theory.limits.has_limit CategoryTheory.Limits.HasLimit theorem HasLimit.mk {F : J ⥤ C} (d : LimitCone F) : HasLimit F := ⟨Nonempty.intro d⟩ #align category_theory.limits.has_limit.mk CategoryTheory.Limits.HasLimit.mk /-- Use the axiom of choice to extract explicit `LimitCone F` from `HasLimit F`. -/ def getLimitCone (F : J ⥤ C) [HasLimit F] : LimitCone F := Classical.choice <\| HasLimit.exists_limit #align category_theory.limits.get_limit_cone CategoryTheory.Limits.getLimitCone variable (J C) /-- `C` has limits of shape `J` if there exists a limit for every functor `F : J ⥤ C`. -/ class HasLimitsOfShape : Prop where /-- All functors `F : J ⥤ C` from `J` have limits -/ has_limit : ∀ F : J ⥤ C, HasLimit F := by infer_instance #align category_theory.limits.has_limits_of_shape CategoryTheory.Limits.HasLimitsOfShape /-- `C` has all limits of size `v₁ u₁` (`HasLimitsOfSize.{v₁ u₁} C`) if it has limits of every shape `J : Type u₁` with `[Category.{v₁} J]`. -/ @[pp_with_univ] class HasLimitsOfSize (C : Type u) [Category.{v} C] : Prop where /-- All functors `F : J ⥤ C` from all small `J` have limits -/ has_limits_of_shape : ∀ (J : Type u₁) [Category.{v₁} J], HasLimitsOfShape J C := by infer_instance #align category_theory.limits.has_limits_of_size CategoryTheory.Limits.HasLimitsOfSize /-- `C` has all (small) limits if it has limits of every shape that is as big as its hom-sets. -/ abbrev HasLimits (C : Type u) [Category.{v} C] : Prop := HasLimitsOfSize.{v, v} C #align category_theory.limits.has_limits CategoryTheory.Limits.HasLimits theorem HasLimits.has_limits_of_shape {C : Type u} [Category.{v} C] [HasLimits C] (J : Type v) [Category.{v} J] : HasLimitsOfShape J C := HasLimitsOfSize.has_limits_of_shape J #align category_theory.limits.has_limits.has_limits_of_shape CategoryTheory.Limits.HasLimits.has_limits_of_shape variable {J C} -- see Note [lower instance priority] instance (priority := 100) hasLimitOfHasLimitsOfShape {J : Type u₁} [Category.{v₁} J] [HasLimitsOfShape J C] (F : J ⥤ C) : HasLimit F := HasLimitsOfShape.has_limit F #align category_theory.limits.has_limit_of_has_limits_of_shape CategoryTheory.Limits.hasLimitOfHasLimitsOfShape -- see Note [lower instance priority] instance (priority := 100) hasLimitsOfShapeOfHasLimits {J : Type u₁} [Category.{v₁} J] [HasLimitsOfSize.{v₁, u₁} C] : HasLimitsOfShape J C := HasLimitsOfSize.has_limits_of_shape J #align category_theory.limits.has_limits_of_shape_of_has_limits CategoryTheory.Limits.hasLimitsOfShapeOfHasLimits -- Interface to the `HasLimit` class. /-- An arbitrary choice of limit cone for a functor. -/ def limit.cone (F : J ⥤ C) [HasLimit F] : Cone F := (getLimitCone F).cone #align category_theory.limits.limit.cone CategoryTheory.Limits.limit.cone /-- An arbitrary choice of limit object of a functor. -/ def limit (F : J ⥤ C) [HasLimit F] := (limit.cone F).pt #align category_theory.limits.limit CategoryTheory.Limits.limit /-- The projection from the limit object to a value of the functor. -/ def limit.π (F : J ⥤ C) [HasLimit F] (j : J) : limit F ⟶ F.obj j := (limit.cone F).π.app j #align category_theory.limits.limit.π CategoryTheory.Limits.limit.π @[simp] theorem limit.cone_x {F : J ⥤ C} [HasLimit F] : (limit.cone F).pt = limit F := rfl set_option linter.uppercaseLean3 false in #align category_theory.limits.limit.cone_X CategoryTheory.Limits.limit.cone_x @[simp] theorem limit.cone_π {F : J ⥤ C} [HasLimit F] : (limit.cone F).π.app = limit.π _ := rfl #align category_theory.limits.limit.cone_π CategoryTheory.Limits.limit.cone_π @[reassoc (attr := simp)] theorem limit.w (F : J ⥤ C) [HasLimit F] {j j' : J} (f : j ⟶ j') : limit.π F j ≫ F.map f = limit.π F j' := (limit.cone F).w f #align category_theory.limits.limit.w CategoryTheory.Limits.limit.w /-- Evidence that the arbitrary choice of cone provided by `limit.cone F` is a limit cone. -/ def limit.isLimit (F : J ⥤ C) [HasLimit F] : IsLimit (limit.cone F) := (getLimitCone F).isLimit #align category_theory.limits.limit.is_limit CategoryTheory.Limits.limit.isLimit /-- The morphism from the cone point of any other cone to the limit object. -/ def limit.lift (F : J ⥤ C) [HasLimit F] (c : Cone F) : c.pt ⟶ limit F := (limit.isLimit F).lift c #align category_theory.limits.limit.lift CategoryTheory.Limits.limit.lift @[simp] theorem limit.isLimit_lift {F : J ⥤ C} [HasLimit F] (c : Cone F) : (limit.isLimit F).lift c = limit.lift F c := rfl #align category_theory.limits.limit.is_limit_lift CategoryTheory.Limits.limit.isLimit_lift @[reassoc (attr := simp)] theorem limit.lift_π {F : J ⥤ C} [HasLimit F] (c : Cone F) (j : J) : limit.lift F c ≫ limit.π F j = c.π.app j := IsLimit.fac _ c j #align category_theory.limits.limit.lift_π CategoryTheory.Limits.limit.lift_π /-- Functoriality of limits. Usually this morphism should be accessed through `lim.map`, but may be needed separately when you have specified limits for the source and target functors, but not necessarily for all functors of shape `J`. -/ def limMap {F G : J ⥤ C} [HasLimit F] [HasLimit G] (α : F ⟶ G) : limit F ⟶ limit G := IsLimit.map _ (limit.isLimit G) α #align category_theory.limits.lim_map CategoryTheory.Limits.limMap @[reassoc (attr := simp)] theorem limMap_π {F G : J ⥤ C} [HasLimit F] [HasLimit G] (α : F ⟶ G) (j : J) : limMap α ≫ limit.π G j = limit.π F j ≫ α.app j := limit.lift_π _ j #align category_theory.limits.lim_map_π CategoryTheory.Limits.limMap_π /-- The cone morphism from any cone to the arbitrary choice of limit cone. -/ def limit.coneMorphism {F : J ⥤ C} [HasLimit F] (c : Cone F) : c ⟶ limit.cone F := (limit.isLimit F).liftConeMorphism c #align category_theory.limits.limit.cone_morphism CategoryTheory.Limits.limit.coneMorphism @[simp] theorem limit.coneMorphism_hom {F : J ⥤ C} [HasLimit F] (c : Cone F) : (limit.coneMorphism c).hom = limit.lift F c := rfl #align category_theory.limits.limit.cone_morphism_hom CategoryTheory.Limits.limit.coneMorphism_hom theorem limit.coneMorphism_π {F : J ⥤ C} [HasLimit F] (c : Cone F) (j : J) : (limit.coneMorphism c).hom ≫ limit.π F j = c.π.app j := by simp #align category_theory.limits.limit.cone_morphism_π CategoryTheory.Limits.limit.coneMorphism_π @[reassoc (attr := simp)] theorem limit.conePointUniqueUpToIso_hom_comp {F : J ⥤ C} [HasLimit F] {c : Cone F} (hc : IsLimit c) (j : J) : (IsLimit.conePointUniqueUpToIso hc (limit.isLimit _)).hom ≫ limit.π F j = c.π.app j := IsLimit.conePointUniqueUpToIso_hom_comp _ _ _ #align category_theory.limits.limit.cone_point_unique_up_to_iso_hom_comp CategoryTheory.Limits.limit.conePointUniqueUpToIso_hom_comp @[reassoc (attr := simp)] theorem limit.conePointUniqueUpToIso_inv_comp {F : J ⥤ C} [HasLimit F] {c : Cone F} (hc : IsLimit c) (j : J) : (IsLimit.conePointUniqueUpToIso (limit.isLimit _) hc).inv ≫ limit.π F j = c.π.app j := IsLimit.conePointUniqueUpToIso_inv_comp _ _ _ #align category_theory.limits.limit.cone_point_unique_up_to_iso_inv_comp CategoryTheory.Limits.limit.conePointUniqueUpToIso_inv_comp theorem limit.existsUnique {F : J ⥤ C} [HasLimit F] (t : Cone F) : ∃! l : t.pt ⟶ limit F, ∀ j, l ≫ limit.π F j = t.π.app j := (limit.isLimit F).existsUnique _ #align category_theory.limits.limit.exists_unique CategoryTheory.Limits.limit.existsUnique /-- Given any other limit cone for `F`, the chosen `limit F` is isomorphic to the cone point. -/ def limit.isoLimitCone {F : J ⥤ C} [HasLimit F] (t : LimitCone F) : limit F ≅ t.cone.pt := IsLimit.conePointUniqueUpToIso (limit.isLimit F) t.isLimit #align category_theory.limits.limit.iso_limit_cone CategoryTheory.Limits.limit.isoLimitCone @[reassoc (attr := simp)] theorem limit.isoLimitCone_hom_π {F : J ⥤ C} [HasLimit F] (t : LimitCone F) (j : J) : (limit.isoLimitCone t).hom ≫ t.cone.π.app j = limit.π F j := by dsimp [limit.isoLimitCone, IsLimit.conePointUniqueUpToIso] aesop_cat #align category_theory.limits.limit.iso_limit_cone_hom_π CategoryTheory.Limits.limit.isoLimitCone_hom_π @[reassoc (attr := simp)] theorem limit.isoLimitCone_inv_π {F : J ⥤ C} [HasLimit F] (t : LimitCone F) (j : J) : (limit.isoLimitCone t).inv ≫ limit.π F j = t.cone.π.app j := by dsimp [limit.isoLimitCone, IsLimit.conePointUniqueUpToIso] aesop_cat #align category_theory.limits.limit.iso_limit_cone_inv_π CategoryTheory.Limits.limit.isoLimitCone_inv_π @[ext] theorem limit.hom_ext {F : J ⥤ C} [HasLimit F] {X : C} {f f' : X ⟶ limit F} (w : ∀ j, f ≫ limit.π F j = f' ≫ limit.π F j) : f = f' := (limit.isLimit F).hom_ext w #align category_theory.limits.limit.hom_ext CategoryTheory.Limits.limit.hom_ext @[simp] theorem limit.lift_map {F G : J ⥤ C} [HasLimit F] [HasLimit G] (c : Cone F) (α : F ⟶ G) : limit.lift F c ≫ limMap α = limit.lift G ((Cones.postcompose α).obj c) := by ext rw [assoc, limMap_π, limit.lift_π_assoc, limit.lift_π] rfl #align category_theory.limits.limit.lift_map CategoryTheory.Limits.limit.lift_map @[simp] theorem limit.lift_cone {F : J ⥤ C} [HasLimit F] : limit.lift F (limit.cone F) = 𝟙 (limit F) := (limit.isLimit _).lift_self #align category_theory.limits.limit.lift_cone CategoryTheory.Limits.limit.lift_cone /-- The isomorphism (in `Type`) between morphisms from a specified object `W` to the limit object, and cones with cone point `W`. -/ def limit.homIso (F : J ⥤ C) [HasLimit F] (W : C) : ULift.{u₁} (W ⟶ limit F : Type v) ≅ F.cones.obj (op W) := (limit.isLimit F).homIso W #align category_theory.limits.limit.hom_iso CategoryTheory.Limits.limit.homIso @[simp] theorem limit.homIso_hom (F : J ⥤ C) [HasLimit F] {W : C} (f : ULift (W ⟶ limit F)) : (limit.homIso F W).hom f = (const J).map f.down ≫ (limit.cone F).π := (limit.isLimit F).homIso_hom f #align category_theory.limits.limit.hom_iso_hom CategoryTheory.Limits.limit.homIso_hom /-- The isomorphism (in `Type`) between morphisms from a specified object `W` to the limit object, and an explicit componentwise description of cones with cone point `W`. -/ def limit.homIso' (F : J ⥤ C) [HasLimit F] (W : C) : ULift.{u₁} (W ⟶ limit F : Type v) ≅ { p : ∀ j, W ⟶ F.obj j // ∀ {j j' : J} (f : j ⟶ j'), p j ≫ F.map f = p j' } := (limit.isLimit F).homIso' W #align category_theory.limits.limit.hom_iso' CategoryTheory.Limits.limit.homIso' theorem limit.lift_extend {F : J ⥤ C} [HasLimit F] (c : Cone F) {X : C} (f : X ⟶ c.pt) : limit.lift F (c.extend f) = f ≫ limit.lift F c := by aesop_cat #align category_theory.limits.limit.lift_extend CategoryTheory.Limits.limit.lift_extend /-- If a functor `F` has a limit, so does any naturally isomorphic functor. -/ theorem hasLimitOfIso {F G : J ⥤ C} [HasLimit F] (α : F ≅ G) : HasLimit G := HasLimit.mk { cone := (Cones.postcompose α.hom).obj (limit.cone F) isLimit := (IsLimit.postcomposeHomEquiv _ _).symm (limit.isLimit F) } #align category_theory.limits.has_limit_of_iso CategoryTheory.Limits.hasLimitOfIso -- See the construction of limits from products and equalizers -- for an example usage. /-- If a functor `G` has the same collection of cones as a functor `F` which has a limit, then `G` also has a limit. -/ theorem HasLimit.ofConesIso {J K : Type u₁} [Category.{v₁} J] [Category.{v₂} K] (F : J ⥤ C) (G : K ⥤ C) (h : F.cones ≅ G.cones) [HasLimit F] : HasLimit G := HasLimit.mk ⟨_, IsLimit.ofNatIso (IsLimit.natIso (limit.isLimit F) ≪≫ h)⟩ #align category_theory.limits.has_limit.of_cones_iso CategoryTheory.Limits.HasLimit.ofConesIso /-- The limits of `F : J ⥤ C` and `G : J ⥤ C` are isomorphic, if the functors are naturally isomorphic. -/ def HasLimit.isoOfNatIso {F G : J ⥤ C} [HasLimit F] [HasLimit G] (w : F ≅ G) : limit F ≅ limit G := IsLimit.conePointsIsoOfNatIso (limit.isLimit F) (limit.isLimit G) w #align category_theory.limits.has_limit.iso_of_nat_iso CategoryTheory.Limits.HasLimit.isoOfNatIso @[reassoc (attr := simp)] theorem HasLimit.isoOfNatIso_hom_π {F G : J ⥤ C} [HasLimit F] [HasLimit G] (w : F ≅ G) (j : J) : (HasLimit.isoOfNatIso w).hom ≫ limit.π G j = limit.π F j ≫ w.hom.app j := IsLimit.conePointsIsoOfNatIso_hom_comp _ _ _ _ #align category_theory.limits.has_limit.iso_of_nat_iso_hom_π CategoryTheory.Limits.HasLimit.isoOfNatIso_hom_π @[reassoc (attr := simp)] theorem HasLimit.isoOfNatIso_inv_π {F G : J ⥤ C} [HasLimit F] [HasLimit G] (w : F ≅ G) (j : J) : (HasLimit.isoOfNatIso w).inv ≫ limit.π F j = limit.π G j ≫ w.inv.app j := IsLimit.conePointsIsoOfNatIso_inv_comp _ _ _ _ #align category_theory.limits.has_limit.iso_of_nat_iso_inv_π CategoryTheory.Limits.HasLimit.isoOfNatIso_inv_π @[reassoc (attr := simp)] theorem HasLimit.lift_isoOfNatIso_hom {F G : J ⥤ C} [HasLimit F] [HasLimit G] (t : Cone F) (w : F ≅ G) : limit.lift F t ≫ (HasLimit.isoOfNatIso w).hom = limit.lift G ((Cones.postcompose w.hom).obj _) := IsLimit.lift_comp_conePointsIsoOfNatIso_hom _ _ _ #align category_theory.limits.has_limit.lift_iso_of_nat_iso_hom CategoryTheory.Limits.HasLimit.lift_isoOfNatIso_hom @[reassoc (attr := simp)] theorem HasLimit.lift_isoOfNatIso_inv {F G : J ⥤ C} [HasLimit F] [HasLimit G] (t : Cone G) (w : F ≅ G) : limit.lift G t ≫ (HasLimit.isoOfNatIso w).inv = limit.lift F ((Cones.postcompose w.inv).obj _) := IsLimit.lift_comp_conePointsIsoOfNatIso_inv _ _ _ #align category_theory.limits.has_limit.lift_iso_of_nat_iso_inv CategoryTheory.Limits.HasLimit.lift_isoOfNatIso_inv /-- The limits of `F : J ⥤ C` and `G : K ⥤ C` are isomorphic, if there is an equivalence `e : J ≌ K` making the triangle commute up to natural isomorphism. -/ def HasLimit.isoOfEquivalence {F : J ⥤ C} [HasLimit F] {G : K ⥤ C} [HasLimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) : limit F ≅ limit G := IsLimit.conePointsIsoOfEquivalence (limit.isLimit F) (limit.isLimit G) e w #align category_theory.limits.has_limit.iso_of_equivalence CategoryTheory.Limits.HasLimit.isoOfEquivalence @[simp] theorem HasLimit.isoOfEquivalence_hom_π {F : J ⥤ C} [HasLimit F] {G : K ⥤ C} [HasLimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) (k : K) : (HasLimit.isoOfEquivalence e w).hom ≫ limit.π G k = limit.π F (e.inverse.obj k) ≫ w.inv.app (e.inverse.obj k) ≫ G.map (e.counit.app k) := by simp only [HasLimit.isoOfEquivalence, IsLimit.conePointsIsoOfEquivalence_hom] dsimp simp #align category_theory.limits.has_limit.iso_of_equivalence_hom_π CategoryTheory.Limits.HasLimit.isoOfEquivalence_hom_π @[simp] theorem HasLimit.isoOfEquivalence_inv_π {F : J ⥤ C} [HasLimit F] {G : K ⥤ C} [HasLimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) (j : J) : (HasLimit.isoOfEquivalence e w).inv ≫ limit.π F j = limit.π G (e.functor.obj j) ≫ w.hom.app j := by simp only [HasLimit.isoOfEquivalence, IsLimit.conePointsIsoOfEquivalence_hom] dsimp simp #align category_theory.limits.has_limit.iso_of_equivalence_inv_π CategoryTheory.Limits.HasLimit.isoOfEquivalence_inv_π section Pre variable (F) [HasLimit F] (E : K ⥤ J) [HasLimit (E ⋙ F)] /-- The canonical morphism from the limit of `F` to the limit of `E ⋙ F`. -/ def limit.pre : limit F ⟶ limit (E ⋙ F) := limit.lift (E ⋙ F) ((limit.cone F).whisker E) #align category_theory.limits.limit.pre CategoryTheory.Limits.limit.pre @[reassoc (attr := simp)] theorem limit.pre_π (k : K) : limit.pre F E ≫ limit.π (E ⋙ F) k = limit.π F (E.obj k) := by erw [IsLimit.fac] rfl #align category_theory.limits.limit.pre_π CategoryTheory.Limits.limit.pre_π @[simp] theorem limit.lift_pre (c : Cone F) : limit.lift F c ≫ limit.pre F E = limit.lift (E ⋙ F) (c.whisker E) := by ext; simp #align category_theory.limits.limit.lift_pre CategoryTheory.Limits.limit.lift_pre variable {L : Type u₃} [Category.{v₃} L] variable (D : L ⥤ K) [HasLimit (D ⋙ E ⋙ F)] @[simp] theorem limit.pre_pre [h : HasLimit (D ⋙ E ⋙ F)] : haveI : HasLimit ((D ⋙ E) ⋙ F) := h; limit.pre F E ≫ limit.pre (E ⋙ F) D = limit.pre F (D ⋙ E) := by haveI : HasLimit ((D ⋙ E) ⋙ F) := h ext j; erw [assoc, limit.pre_π, limit.pre_π, limit.pre_π]; rfl #align category_theory.limits.limit.pre_pre CategoryTheory.Limits.limit.pre_pre variable {E F} /-- - If we have particular limit cones available for `E ⋙ F` and for `F`, we obtain a formula for `limit.pre F E`. -/ theorem limit.pre_eq (s : LimitCone (E ⋙ F)) (t : LimitCone F) : limit.pre F E = (limit.isoLimitCone t).hom ≫ s.isLimit.lift (t.cone.whisker E) ≫ (limit.isoLimitCone s).inv := by aesop_cat #align category_theory.limits.limit.pre_eq CategoryTheory.Limits.limit.pre_eq end Pre section Post variable {D : Type u'} [Category.{v'} D] variable (F) [HasLimit F] (G : C ⥤ D) [HasLimit (F ⋙ G)] /-- The canonical morphism from `G` applied to the limit of `F` to the limit of `F ⋙ G`. -/ def limit.post : G.obj (limit F) ⟶ limit (F ⋙ G) := limit.lift (F ⋙ G) (G.mapCone (limit.cone F)) #align category_theory.limits.limit.post CategoryTheory.Limits.limit.post @[reassoc (attr := simp)] theorem limit.post_π (j : J) : limit.post F G ≫ limit.π (F ⋙ G) j = G.map (limit.π F j) := by erw [IsLimit.fac] rfl #align category_theory.limits.limit.post_π CategoryTheory.Limits.limit.post_π @[simp] theorem limit.lift_post (c : Cone F) : G.map (limit.lift F c) ≫ limit.post F G = limit.lift (F ⋙ G) (G.mapCone c) := by ext rw [assoc, limit.post_π, ← G.map_comp, limit.lift_π, limit.lift_π] rfl #align category_theory.limits.limit.lift_post CategoryTheory.Limits.limit.lift_post @[simp] theorem limit.post_post {E : Type u''} [Category.{v''} E] (H : D ⥤ E) [h : HasLimit ((F ⋙ G) ⋙ H)] : -- H G (limit F) ⟶ H (limit (F ⋙ G)) ⟶ limit ((F ⋙ G) ⋙ H) equals -- H G (limit F) ⟶ limit (F ⋙ (G ⋙ H)) haveI : HasLimit (F ⋙ G ⋙ H) := h H.map (limit.post F G) ≫ limit.post (F ⋙ G) H = limit.post F (G ⋙ H) := by haveI : HasLimit (F ⋙ G ⋙ H) := h ext; erw [assoc, limit.post_π, ← H.map_comp, limit.post_π, limit.post_π]; rfl #align category_theory.limits.limit.post_post CategoryTheory.Limits.limit.post_post end Post theorem limit.pre_post {D : Type u'} [Category.{v'} D] (E : K ⥤ J) (F : J ⥤ C) (G : C ⥤ D) [HasLimit F] [HasLimit (E ⋙ F)] [HasLimit (F ⋙ G)] [h : HasLimit ((E ⋙ F) ⋙ G)] :-- G (limit F) ⟶ G (limit (E ⋙ F)) ⟶ limit ((E ⋙ F) ⋙ G) vs -- G (limit F) ⟶ limit F ⋙ G ⟶ limit (E ⋙ (F ⋙ G)) or haveI : HasLimit (E ⋙ F ⋙ G) := h G.map (limit.pre F E) ≫ limit.post (E ⋙ F) G = limit.post F G ≫ limit.pre (F ⋙ G) E := by haveI : HasLimit (E ⋙ F ⋙ G) := h ext; erw [assoc, limit.post_π, ← G.map_comp, limit.pre_π, assoc, limit.pre_π, limit.post_π] #align category_theory.limits.limit.pre_post CategoryTheory.Limits.limit.pre_post open CategoryTheory.Equivalence instance hasLimitEquivalenceComp (e : K ≌ J) [HasLimit F] : HasLimit (e.functor ⋙ F) := HasLimit.mk { cone := Cone.whisker e.functor (limit.cone F) isLimit := IsLimit.whiskerEquivalence (limit.isLimit F) e } #align category_theory.limits.has_limit_equivalence_comp CategoryTheory.Limits.hasLimitEquivalenceComp -- Porting note: testing whether this still needed -- attribute [local elab_without_expected_type] inv_fun_id_assoc -- not entirely sure why this is needed /-- If a `E ⋙ F` has a limit, and `E` is an equivalence, we can construct a limit of `F`. -/ theorem hasLimitOfEquivalenceComp (e : K ≌ J) [HasLimit (e.functor ⋙ F)] : HasLimit F := by haveI : HasLimit (e.inverse ⋙ e.functor ⋙ F) := Limits.hasLimitEquivalenceComp e.symm apply hasLimitOfIso (e.invFunIdAssoc F) #align category_theory.limits.has_limit_of_equivalence_comp CategoryTheory.Limits.hasLimitOfEquivalenceComp -- `hasLimitCompEquivalence` and `hasLimitOfCompEquivalence` -- are proved in `CategoryTheory/Adjunction/Limits.lean`. section LimFunctor variable [HasLimitsOfShape J C] section /-- `limit F` is functorial in `F`, when `C` has all limits of shape `J`. -/ @[simps] def lim : (J ⥤ C) ⥤ C where obj F := limit F map α := limMap α map_id F := by apply Limits.limit.hom_ext; intro j erw [limMap_π, Category.id_comp, Category.comp_id] map_comp α β := by apply Limits.limit.hom_ext; intro j erw [assoc, IsLimit.fac, IsLimit.fac, ← assoc, IsLimit.fac, assoc]; rfl #align category_theory.limits.lim CategoryTheory.Limits.lim #align category_theory.limits.lim_map_eq_lim_map CategoryTheory.Limits.lim_map end variable {G : J ⥤ C} (α : F ⟶ G) theorem limit.map_pre [HasLimitsOfShape K C] (E : K ⥤ J) : lim.map α ≫ limit.pre G E = limit.pre F E ≫ lim.map (whiskerLeft E α) := by ext simp #align category_theory.limits.limit.map_pre CategoryTheory.Limits.limit.map_pre theorem limit.map_pre' [HasLimitsOfShape K C] (F : J ⥤ C) {E₁ E₂ : K ⥤ J} (α : E₁ ⟶ E₂) : limit.pre F E₂ = limit.pre F E₁ ≫ lim.map (whiskerRight α F) := by ext1; simp [← category.assoc] #align category_theory.limits.limit.map_pre' CategoryTheory.Limits.limit.map_pre' theorem limit.id_pre (F : J ⥤ C) : limit.pre F (𝟭 _) = lim.map (Functor.leftUnitor F).inv := by aesop_cat #align category_theory.limits.limit.id_pre CategoryTheory.Limits.limit.id_pre theorem limit.map_post {D : Type u'} [Category.{v'} D] [HasLimitsOfShape J D] (H : C ⥤ D) : /- H (limit F) ⟶ H (limit G) ⟶ limit (G ⋙ H) vs H (limit F) ⟶ limit (F ⋙ H) ⟶ limit (G ⋙ H) -/ H.map (limMap α) ≫ limit.post G H = limit.post F H ≫ limMap (whiskerRight α H) := by ext simp only [whiskerRight_app, limMap_π, assoc, limit.post_π_assoc, limit.post_π, ← H.map_comp] #align category_theory.limits.limit.map_post CategoryTheory.Limits.limit.map_post /-- The isomorphism between morphisms from `W` to the cone point of the limit cone for `F` and cones over `F` with cone point `W` is natural in `F`. -/ def limYoneda : lim ⋙ yoneda ⋙ (whiskeringRight _ _ _).obj uliftFunctor.{u₁} ≅ CategoryTheory.cones J C := NatIso.ofComponents fun F => NatIso.ofComponents fun W => limit.homIso F (unop W) #align category_theory.limits.lim_yoneda CategoryTheory.Limits.limYoneda /-- The constant functor and limit functor are adjoint to each other-/ def constLimAdj : (const J : C ⥤ J ⥤ C) ⊣ lim where homEquiv c g := { toFun := fun f => limit.lift _ ⟨c, f⟩ invFun := fun f => { app := fun j => f ≫ limit.π _ _ } left_inv := by aesop_cat right_inv := by aesop_cat } unit := { app := fun c => limit.lift _ ⟨_, 𝟙 _⟩ } counit := { app := fun g => { app := limit.π _ } } -- This used to be automatic before leanprover/lean4#2644 homEquiv_unit := by -- Sad that aesop can no longer do this! intros dsimp ext simp #align category_theory.limits.const_lim_adj CategoryTheory.Limits.constLimAdj instance : IsRightAdjoint (lim : (J ⥤ C) ⥤ C) := ⟨_, ⟨constLimAdj⟩⟩ end LimFunctor instance limMap_mono' {F G : J ⥤ C} [HasLimitsOfShape J C] (α : F ⟶ G) [Mono α] : Mono (limMap α) := (lim : (J ⥤ C) ⥤ C).map_mono α #align category_theory.limits.lim_map_mono' CategoryTheory.Limits.limMap_mono' instance limMap_mono {F G : J ⥤ C} [HasLimit F] [HasLimit G] (α : F ⟶ G) [∀ j, Mono (α.app j)] : Mono (limMap α) := ⟨fun {Z} u v h => limit.hom_ext fun j => (cancel_mono (α.app j)).1 <\| by simpa using h =≫ limit.π _ j⟩ #align category_theory.limits.lim_map_mono CategoryTheory.Limits.limMap_mono section Adjunction variable {L : (J ⥤ C) ⥤ C} (adj : Functor.const _ ⊣ L) /- The fact that the existence of limits of shape `J` is equivalent to the existence of a right adjoint to the constant functor `C ⥤ (J ⥤ C)` is obtained in the file `Mathlib.CategoryTheory.Limits.ConeCategory`: see the lemma `hasLimitsOfShape_iff_isLeftAdjoint_const`. In the definitions below, given an adjunction `adj : Functor.const _ ⊣ (L : (J ⥤ C) ⥤ C)`, we directly construct a limit cone for any `F : J ⥤ C`. -/ /-- The limit cone obtained from a right adjoint of the constant functor. -/ @[simps] noncomputable def coneOfAdj (F : J ⥤ C) : Cone F where pt := L.obj F π := adj.counit.app F /-- The cones defined by `coneOfAdj` are limit cones. -/ @[simps] def isLimitConeOfAdj (F : J ⥤ C) : IsLimit (coneOfAdj adj F) where lift s := adj.homEquiv _ _ s.π fac s j := by have eq := NatTrans.congr_app (adj.counit.naturality s.π) j have eq' := NatTrans.congr_app (adj.left_triangle_components s.pt) j dsimp at eq eq' ⊢ rw [Adjunction.homEquiv_unit, assoc, eq, reassoc_of% eq'] uniq s m hm := (adj.homEquiv _ _).symm.injective (by ext j; simpa using hm j) end Adjunction /-- We can transport limits of shape `J` along an equivalence `J ≌ J'`. -/ theorem hasLimitsOfShape_of_equivalence {J' : Type u₂} [Category.{v₂} J'] (e : J ≌ J') [HasLimitsOfShape J C] : HasLimitsOfShape J' C := by constructor intro F apply hasLimitOfEquivalenceComp e #align category_theory.limits.has_limits_of_shape_of_equivalence CategoryTheory.Limits.hasLimitsOfShape_of_equivalence variable (C) /-- A category that has larger limits also has smaller limits. -/ theorem hasLimitsOfSizeOfUnivLE [UnivLE.{v₂, v₁}] [UnivLE.{u₂, u₁}] [HasLimitsOfSize.{v₁, u₁} C] : HasLimitsOfSize.{v₂, u₂} C where has_limits_of_shape J {_} := hasLimitsOfShape_of_equivalence ((ShrinkHoms.equivalence J).trans <\| Shrink.equivalence _).symm /-- `hasLimitsOfSizeShrink.{v u} C` tries to obtain `HasLimitsOfSize.{v u} C` from some other `HasLimitsOfSize C`. -/ theorem hasLimitsOfSizeShrink [HasLimitsOfSize.{max v₁ v₂, max u₁ u₂} C] : HasLimitsOfSize.{v₁, u₁} C := hasLimitsOfSizeOfUnivLE.{max v₁ v₂, max u₁ u₂} C #align category_theory.limits.has_limits_of_size_shrink CategoryTheory.Limits.hasLimitsOfSizeShrink instance (priority := 100) hasSmallestLimitsOfHasLimits [HasLimits C] : HasLimitsOfSize.{0, 0} C := hasLimitsOfSizeShrink.{0, 0} C #align category_theory.limits.has_smallest_limits_of_has_limits CategoryTheory.Limits.hasSmallestLimitsOfHasLimits end Limit section Colimit /-- `ColimitCocone F` contains a cocone over `F` together with the information that it is a colimit. -/ -- @[nolint has_nonempty_instance] -- Porting note(#5171): removed; linter not ported yet structure ColimitCocone (F : J ⥤ C) where /-- The cocone itself -/ cocone : Cocone F /-- The proof that it is the colimit cocone -/ isColimit : IsColimit cocone #align category_theory.limits.colimit_cocone CategoryTheory.Limits.ColimitCocone #align category_theory.limits.colimit_cocone.is_colimit CategoryTheory.Limits.ColimitCocone.isColimit /-- `HasColimit F` represents the mere existence of a colimit for `F`. -/ class HasColimit (F : J ⥤ C) : Prop where mk' :: /-- There exists a colimit for `F` -/ exists_colimit : Nonempty (ColimitCocone F) #align category_theory.limits.has_colimit CategoryTheory.Limits.HasColimit theorem HasColimit.mk {F : J ⥤ C} (d : ColimitCocone F) : HasColimit F := ⟨Nonempty.intro d⟩ #align category_theory.limits.has_colimit.mk CategoryTheory.Limits.HasColimit.mk /-- Use the axiom of choice to extract explicit `ColimitCocone F` from `HasColimit F`. -/ def getColimitCocone (F : J ⥤ C) [HasColimit F] : ColimitCocone F := Classical.choice <\| HasColimit.exists_colimit #align category_theory.limits.get_colimit_cocone CategoryTheory.Limits.getColimitCocone variable (J C) /-- `C` has colimits of shape `J` if there exists a colimit for every functor `F : J ⥤ C`. -/ class HasColimitsOfShape : Prop where /-- All `F : J ⥤ C` have colimits for a fixed `J` -/ has_colimit : ∀ F : J ⥤ C, HasColimit F := by infer_instance #align category_theory.limits.has_colimits_of_shape CategoryTheory.Limits.HasColimitsOfShape /-- `C` has all colimits of size `v₁ u₁` (`HasColimitsOfSize.{v₁ u₁} C`) if it has colimits of every shape `J : Type u₁` with `[Category.{v₁} J]`. -/ @[pp_with_univ] class HasColimitsOfSize (C : Type u) [Category.{v} C] : Prop where /-- All `F : J ⥤ C` have colimits for all small `J` -/ has_colimits_of_shape : ∀ (J : Type u₁) [Category.{v₁} J], HasColimitsOfShape J C := by infer_instance #align category_theory.limits.has_colimits_of_size CategoryTheory.Limits.HasColimitsOfSize /-- `C` has all (small) colimits if it has colimits of every shape that is as big as its hom-sets. -/ abbrev HasColimits (C : Type u) [Category.{v} C] : Prop := HasColimitsOfSize.{v, v} C #align category_theory.limits.has_colimits CategoryTheory.Limits.HasColimits theorem HasColimits.hasColimitsOfShape {C : Type u} [Category.{v} C] [HasColimits C] (J : Type v) [Category.{v} J] : HasColimitsOfShape J C := HasColimitsOfSize.has_colimits_of_shape J #align category_theory.limits.has_colimits.has_colimits_of_shape CategoryTheory.Limits.HasColimits.hasColimitsOfShape variable {J C} -- see Note [lower instance priority] instance (priority := 100) hasColimitOfHasColimitsOfShape {J : Type u₁} [Category.{v₁} J] [HasColimitsOfShape J C] (F : J ⥤ C) : HasColimit F := HasColimitsOfShape.has_colimit F #align category_theory.limits.has_colimit_of_has_colimits_of_shape CategoryTheory.Limits.hasColimitOfHasColimitsOfShape -- see Note [lower instance priority] instance (priority := 100) hasColimitsOfShapeOfHasColimitsOfSize {J : Type u₁} [Category.{v₁} J] [HasColimitsOfSize.{v₁, u₁} C] : HasColimitsOfShape J C := HasColimitsOfSize.has_colimits_of_shape J #align category_theory.limits.has_colimits_of_shape_of_has_colimits_of_size CategoryTheory.Limits.hasColimitsOfShapeOfHasColimitsOfSize -- Interface to the `HasColimit` class. /-- An arbitrary choice of colimit cocone of a functor. -/ def colimit.cocone (F : J ⥤ C) [HasColimit F] : Cocone F := (getColimitCocone F).cocone #align category_theory.limits.colimit.cocone CategoryTheory.Limits.colimit.cocone /-- An arbitrary choice of colimit object of a functor. -/ def colimit (F : J ⥤ C) [HasColimit F] := (colimit.cocone F).pt #align category_theory.limits.colimit CategoryTheory.Limits.colimit /-- The coprojection from a value of the functor to the colimit object. -/ def colimit.ι (F : J ⥤ C) [HasColimit F] (j : J) : F.obj j ⟶ colimit F := (colimit.cocone F).ι.app j #align category_theory.limits.colimit.ι CategoryTheory.Limits.colimit.ι @[simp] theorem colimit.cocone_ι {F : J ⥤ C} [HasColimit F] (j : J) : (colimit.cocone F).ι.app j = colimit.ι _ j := rfl #align category_theory.limits.colimit.cocone_ι CategoryTheory.Limits.colimit.cocone_ι @[simp] theorem colimit.cocone_x {F : J ⥤ C} [HasColimit F] : (colimit.cocone F).pt = colimit F := rfl set_option linter.uppercaseLean3 false in #align category_theory.limits.colimit.cocone_X CategoryTheory.Limits.colimit.cocone_x @[reassoc (attr := simp)] theorem colimit.w (F : J ⥤ C) [HasColimit F] {j j' : J} (f : j ⟶ j') : F.map f ≫ colimit.ι F j' = colimit.ι F j := (colimit.cocone F).w f #align category_theory.limits.colimit.w CategoryTheory.Limits.colimit.w /-- Evidence that the arbitrary choice of cocone is a colimit cocone. -/ def colimit.isColimit (F : J ⥤ C) [HasColimit F] : IsColimit (colimit.cocone F) := (getColimitCocone F).isColimit #align category_theory.limits.colimit.is_colimit CategoryTheory.Limits.colimit.isColimit /-- The morphism from the colimit object to the cone point of any other cocone. -/ def colimit.desc (F : J ⥤ C) [HasColimit F] (c : Cocone F) : colimit F ⟶ c.pt := (colimit.isColimit F).desc c #align category_theory.limits.colimit.desc CategoryTheory.Limits.colimit.desc @[simp] theorem colimit.isColimit_desc {F : J ⥤ C} [HasColimit F] (c : Cocone F) : (colimit.isColimit F).desc c = colimit.desc F c := rfl #align category_theory.limits.colimit.is_colimit_desc CategoryTheory.Limits.colimit.isColimit_desc /-- We have lots of lemmas describing how to simplify `colimit.ι F j ≫ _`, and combined with `colimit.ext` we rely on these lemmas for many calculations. However, since `Category.assoc` is a `@[simp]` lemma, often expressions are right associated, and it's hard to apply these lemmas about `colimit.ι`. We thus use `reassoc` to define additional `@[simp]` lemmas, with an arbitrary extra morphism. (see `Tactic/reassoc_axiom.lean`) -/ @[reassoc (attr := simp)] theorem colimit.ι_desc {F : J ⥤ C} [HasColimit F] (c : Cocone F) (j : J) : colimit.ι F j ≫ colimit.desc F c = c.ι.app j := IsColimit.fac _ c j #align category_theory.limits.colimit.ι_desc CategoryTheory.Limits.colimit.ι_desc /-- Functoriality of colimits. Usually this morphism should be accessed through `colim.map`, but may be needed separately when you have specified colimits for the source and target functors, but not necessarily for all functors of shape `J`. -/ def colimMap {F G : J ⥤ C} [HasColimit F] [HasColimit G] (α : F ⟶ G) : colimit F ⟶ colimit G := IsColimit.map (colimit.isColimit F) _ α #align category_theory.limits.colim_map CategoryTheory.Limits.colimMap @[reassoc (attr := simp)] theorem ι_colimMap {F G : J ⥤ C} [HasColimit F] [HasColimit G] (α : F ⟶ G) (j : J) : colimit.ι F j ≫ colimMap α = α.app j ≫ colimit.ι G j := colimit.ι_desc _ j #align category_theory.limits.ι_colim_map CategoryTheory.Limits.ι_colimMap /-- The cocone morphism from the arbitrary choice of colimit cocone to any cocone. -/ def colimit.coconeMorphism {F : J ⥤ C} [HasColimit F] (c : Cocone F) : colimit.cocone F ⟶ c := (colimit.isColimit F).descCoconeMorphism c #align category_theory.limits.colimit.cocone_morphism CategoryTheory.Limits.colimit.coconeMorphism @[simp] theorem colimit.coconeMorphism_hom {F : J ⥤ C} [HasColimit F] (c : Cocone F) : (colimit.coconeMorphism c).hom = colimit.desc F c := rfl #align category_theory.limits.colimit.cocone_morphism_hom CategoryTheory.Limits.colimit.coconeMorphism_hom theorem colimit.ι_coconeMorphism {F : J ⥤ C} [HasColimit F] (c : Cocone F) (j : J) : colimit.ι F j ≫ (colimit.coconeMorphism c).hom = c.ι.app j := by simp #align category_theory.limits.colimit.ι_cocone_morphism CategoryTheory.Limits.colimit.ι_coconeMorphism @[reassoc (attr := simp)] theorem colimit.comp_coconePointUniqueUpToIso_hom {F : J ⥤ C} [HasColimit F] {c : Cocone F} (hc : IsColimit c) (j : J) : colimit.ι F j ≫ (IsColimit.coconePointUniqueUpToIso (colimit.isColimit _) hc).hom = c.ι.app j := IsColimit.comp_coconePointUniqueUpToIso_hom _ _ _ #align category_theory.limits.colimit.comp_cocone_point_unique_up_to_iso_hom CategoryTheory.Limits.colimit.comp_coconePointUniqueUpToIso_hom @[reassoc (attr := simp)] theorem colimit.comp_coconePointUniqueUpToIso_inv {F : J ⥤ C} [HasColimit F] {c : Cocone F} (hc : IsColimit c) (j : J) : colimit.ι F j ≫ (IsColimit.coconePointUniqueUpToIso hc (colimit.isColimit _)).inv = c.ι.app j := IsColimit.comp_coconePointUniqueUpToIso_inv _ _ _ #align category_theory.limits.colimit.comp_cocone_point_unique_up_to_iso_inv CategoryTheory.Limits.colimit.comp_coconePointUniqueUpToIso_inv theorem colimit.existsUnique {F : J ⥤ C} [HasColimit F] (t : Cocone F) : ∃! d : colimit F ⟶ t.pt, ∀ j, colimit.ι F j ≫ d = t.ι.app j := (colimit.isColimit F).existsUnique _ #align category_theory.limits.colimit.exists_unique CategoryTheory.Limits.colimit.existsUnique /-- Given any other colimit cocone for `F`, the chosen `colimit F` is isomorphic to the cocone point. -/ def colimit.isoColimitCocone {F : J ⥤ C} [HasColimit F] (t : ColimitCocone F) : colimit F ≅ t.cocone.pt := IsColimit.coconePointUniqueUpToIso (colimit.isColimit F) t.isColimit #align category_theory.limits.colimit.iso_colimit_cocone CategoryTheory.Limits.colimit.isoColimitCocone @[reassoc (attr := simp)]	Mathlib/CategoryTheory/Limits/HasLimits.lean	852	855	theorem colimit.isoColimitCocone_ι_hom {F : J ⥤ C} [HasColimit F] (t : ColimitCocone F) (j : J) : colimit.ι F j ≫ (colimit.isoColimitCocone t).hom = t.cocone.ι.app j := by	dsimp [colimit.isoColimitCocone, IsColimit.coconePointUniqueUpToIso] aesop_cat
/- Copyright (c) 2023 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Data.Int.ModEq import Mathlib.GroupTheory.QuotientGroup #align_import algebra.modeq from "leanprover-community/mathlib"@"a07d750983b94c530ab69a726862c2ab6802b38c" /-! # Equality modulo an element This file defines equality modulo an element in a commutative group. ## Main definitions * `a ≡ b [PMOD p]`: `a` and `b` are congruent modulo `p`. ## See also `SModEq` is a generalisation to arbitrary submodules. ## TODO Delete `Int.ModEq` in favour of `AddCommGroup.ModEq`. Generalise `SModEq` to `AddSubgroup` and redefine `AddCommGroup.ModEq` using it. Once this is done, we can rename `AddCommGroup.ModEq` to `AddSubgroup.ModEq` and multiplicativise it. Longer term, we could generalise to submonoids and also unify with `Nat.ModEq`. -/ namespace AddCommGroup variable {α : Type} section AddCommGroup variable [AddCommGroup α] {p a a₁ a₂ b b₁ b₂ c : α} {n : ℕ} {z : ℤ} /-- `a ≡ b [PMOD p]` means that `b` is congruent to `a` modulo `p`. Equivalently (as shown in `Algebra.Order.ToIntervalMod`), `b` does not lie in the open interval `(a, a + p)` modulo `p`, or `toIcoMod hp a` disagrees with `toIocMod hp a` at `b`, or `toIcoDiv hp a` disagrees with `toIocDiv hp a` at `b`. -/ def ModEq (p a b : α) : Prop := ∃ z : ℤ, b - a = z • p #align add_comm_group.modeq AddCommGroup.ModEq @[inherit_doc] notation:50 a " ≡ " b " [PMOD " p "]" => ModEq p a b @[refl, simp] theorem modEq_refl (a : α) : a ≡ a [PMOD p] := ⟨0, by simp⟩ #align add_comm_group.modeq_refl AddCommGroup.modEq_refl theorem modEq_rfl : a ≡ a [PMOD p] := modEq_refl _ #align add_comm_group.modeq_rfl AddCommGroup.modEq_rfl theorem modEq_comm : a ≡ b [PMOD p] ↔ b ≡ a [PMOD p] := (Equiv.neg _).exists_congr_left.trans <\| by simp [ModEq, ← neg_eq_iff_eq_neg] #align add_comm_group.modeq_comm AddCommGroup.modEq_comm alias ⟨ModEq.symm, _⟩ := modEq_comm #align add_comm_group.modeq.symm AddCommGroup.ModEq.symm attribute [symm] ModEq.symm @[trans] theorem ModEq.trans : a ≡ b [PMOD p] → b ≡ c [PMOD p] → a ≡ c [PMOD p] := fun ⟨m, hm⟩ ⟨n, hn⟩ => ⟨m + n, by simp [add_smul, ← hm, ← hn]⟩ #align add_comm_group.modeq.trans AddCommGroup.ModEq.trans instance : IsRefl _ (ModEq p) := ⟨modEq_refl⟩ @[simp] theorem neg_modEq_neg : -a ≡ -b [PMOD p] ↔ a ≡ b [PMOD p] := modEq_comm.trans <\| by simp [ModEq, neg_add_eq_sub] #align add_comm_group.neg_modeq_neg AddCommGroup.neg_modEq_neg alias ⟨ModEq.of_neg, ModEq.neg⟩ := neg_modEq_neg #align add_comm_group.modeq.of_neg AddCommGroup.ModEq.of_neg #align add_comm_group.modeq.neg AddCommGroup.ModEq.neg @[simp] theorem modEq_neg : a ≡ b [PMOD -p] ↔ a ≡ b [PMOD p] := modEq_comm.trans <\| by simp [ModEq, ← neg_eq_iff_eq_neg] #align add_comm_group.modeq_neg AddCommGroup.modEq_neg alias ⟨ModEq.of_neg', ModEq.neg'⟩ := modEq_neg #align add_comm_group.modeq.of_neg' AddCommGroup.ModEq.of_neg' #align add_comm_group.modeq.neg' AddCommGroup.ModEq.neg' theorem modEq_sub (a b : α) : a ≡ b [PMOD b - a] := ⟨1, (one_smul _ _).symm⟩ #align add_comm_group.modeq_sub AddCommGroup.modEq_sub @[simp] theorem modEq_zero : a ≡ b [PMOD 0] ↔ a = b := by simp [ModEq, sub_eq_zero, eq_comm] #align add_comm_group.modeq_zero AddCommGroup.modEq_zero @[simp] theorem self_modEq_zero : p ≡ 0 [PMOD p] := ⟨-1, by simp⟩ #align add_comm_group.self_modeq_zero AddCommGroup.self_modEq_zero @[simp] theorem zsmul_modEq_zero (z : ℤ) : z • p ≡ 0 [PMOD p] := ⟨-z, by simp⟩ #align add_comm_group.zsmul_modeq_zero AddCommGroup.zsmul_modEq_zero theorem add_zsmul_modEq (z : ℤ) : a + z • p ≡ a [PMOD p] := ⟨-z, by simp⟩ #align add_comm_group.add_zsmul_modeq AddCommGroup.add_zsmul_modEq theorem zsmul_add_modEq (z : ℤ) : z • p + a ≡ a [PMOD p] := ⟨-z, by simp [← sub_sub]⟩ #align add_comm_group.zsmul_add_modeq AddCommGroup.zsmul_add_modEq theorem add_nsmul_modEq (n : ℕ) : a + n • p ≡ a [PMOD p] := ⟨-n, by simp⟩ #align add_comm_group.add_nsmul_modeq AddCommGroup.add_nsmul_modEq theorem nsmul_add_modEq (n : ℕ) : n • p + a ≡ a [PMOD p] := ⟨-n, by simp [← sub_sub]⟩ #align add_comm_group.nsmul_add_modeq AddCommGroup.nsmul_add_modEq namespace ModEq protected theorem add_zsmul (z : ℤ) : a ≡ b [PMOD p] → a + z • p ≡ b [PMOD p] := (add_zsmul_modEq _).trans #align add_comm_group.modeq.add_zsmul AddCommGroup.ModEq.add_zsmul protected theorem zsmul_add (z : ℤ) : a ≡ b [PMOD p] → z • p + a ≡ b [PMOD p] := (zsmul_add_modEq _).trans #align add_comm_group.modeq.zsmul_add AddCommGroup.ModEq.zsmul_add protected theorem add_nsmul (n : ℕ) : a ≡ b [PMOD p] → a + n • p ≡ b [PMOD p] := (add_nsmul_modEq _).trans #align add_comm_group.modeq.add_nsmul AddCommGroup.ModEq.add_nsmul protected theorem nsmul_add (n : ℕ) : a ≡ b [PMOD p] → n • p + a ≡ b [PMOD p] := (nsmul_add_modEq _).trans #align add_comm_group.modeq.nsmul_add AddCommGroup.ModEq.nsmul_add protected theorem of_zsmul : a ≡ b [PMOD z • p] → a ≡ b [PMOD p] := fun ⟨m, hm⟩ => ⟨m z, by rwa [mul_smul]⟩ #align add_comm_group.modeq.of_zsmul AddCommGroup.ModEq.of_zsmul protected theorem of_nsmul : a ≡ b [PMOD n • p] → a ≡ b [PMOD p] := fun ⟨m, hm⟩ => ⟨m * n, by rwa [mul_smul, natCast_zsmul]⟩ #align add_comm_group.modeq.of_nsmul AddCommGroup.ModEq.of_nsmul protected theorem zsmul : a ≡ b [PMOD p] → z • a ≡ z • b [PMOD z • p] := Exists.imp fun m hm => by rw [← smul_sub, hm, smul_comm] #align add_comm_group.modeq.zsmul AddCommGroup.ModEq.zsmul protected theorem nsmul : a ≡ b [PMOD p] → n • a ≡ n • b [PMOD n • p] := Exists.imp fun m hm => by rw [← smul_sub, hm, smul_comm] #align add_comm_group.modeq.nsmul AddCommGroup.ModEq.nsmul end ModEq @[simp] theorem zsmul_modEq_zsmul [NoZeroSMulDivisors ℤ α] (hn : z ≠ 0) : z • a ≡ z • b [PMOD z • p] ↔ a ≡ b [PMOD p] := exists_congr fun m => by rw [← smul_sub, smul_comm, smul_right_inj hn] #align add_comm_group.zsmul_modeq_zsmul AddCommGroup.zsmul_modEq_zsmul @[simp] theorem nsmul_modEq_nsmul [NoZeroSMulDivisors ℕ α] (hn : n ≠ 0) : n • a ≡ n • b [PMOD n • p] ↔ a ≡ b [PMOD p] := exists_congr fun m => by rw [← smul_sub, smul_comm, smul_right_inj hn] #align add_comm_group.nsmul_modeq_nsmul AddCommGroup.nsmul_modEq_nsmul alias ⟨ModEq.zsmul_cancel, _⟩ := zsmul_modEq_zsmul #align add_comm_group.modeq.zsmul_cancel AddCommGroup.ModEq.zsmul_cancel alias ⟨ModEq.nsmul_cancel, _⟩ := nsmul_modEq_nsmul #align add_comm_group.modeq.nsmul_cancel AddCommGroup.ModEq.nsmul_cancel namespace ModEq @[simp] protected theorem add_iff_left : a₁ ≡ b₁ [PMOD p] → (a₁ + a₂ ≡ b₁ + b₂ [PMOD p] ↔ a₂ ≡ b₂ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.addLeft m).symm.exists_congr_left.trans <\| by simp [add_sub_add_comm, hm, add_smul, ModEq] #align add_comm_group.modeq.add_iff_left AddCommGroup.ModEq.add_iff_left @[simp] protected theorem add_iff_right : a₂ ≡ b₂ [PMOD p] → (a₁ + a₂ ≡ b₁ + b₂ [PMOD p] ↔ a₁ ≡ b₁ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.addRight m).symm.exists_congr_left.trans <\| by simp [add_sub_add_comm, hm, add_smul, ModEq] #align add_comm_group.modeq.add_iff_right AddCommGroup.ModEq.add_iff_right @[simp] protected theorem sub_iff_left : a₁ ≡ b₁ [PMOD p] → (a₁ - a₂ ≡ b₁ - b₂ [PMOD p] ↔ a₂ ≡ b₂ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.subLeft m).symm.exists_congr_left.trans <\| by simp [sub_sub_sub_comm, hm, sub_smul, ModEq] #align add_comm_group.modeq.sub_iff_left AddCommGroup.ModEq.sub_iff_left @[simp] protected theorem sub_iff_right : a₂ ≡ b₂ [PMOD p] → (a₁ - a₂ ≡ b₁ - b₂ [PMOD p] ↔ a₁ ≡ b₁ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.subRight m).symm.exists_congr_left.trans <\| by simp [sub_sub_sub_comm, hm, sub_smul, ModEq] #align add_comm_group.modeq.sub_iff_right AddCommGroup.ModEq.sub_iff_right alias ⟨add_left_cancel, add⟩ := ModEq.add_iff_left #align add_comm_group.modeq.add_left_cancel AddCommGroup.ModEq.add_left_cancel #align add_comm_group.modeq.add AddCommGroup.ModEq.add alias ⟨add_right_cancel, _⟩ := ModEq.add_iff_right #align add_comm_group.modeq.add_right_cancel AddCommGroup.ModEq.add_right_cancel alias ⟨sub_left_cancel, sub⟩ := ModEq.sub_iff_left #align add_comm_group.modeq.sub_left_cancel AddCommGroup.ModEq.sub_left_cancel #align add_comm_group.modeq.sub AddCommGroup.ModEq.sub alias ⟨sub_right_cancel, _⟩ := ModEq.sub_iff_right #align add_comm_group.modeq.sub_right_cancel AddCommGroup.ModEq.sub_right_cancel -- Porting note: doesn't work -- attribute [protected] add_left_cancel add_right_cancel add sub_left_cancel sub_right_cancel sub protected theorem add_left (c : α) (h : a ≡ b [PMOD p]) : c + a ≡ c + b [PMOD p] := modEq_rfl.add h #align add_comm_group.modeq.add_left AddCommGroup.ModEq.add_left protected theorem sub_left (c : α) (h : a ≡ b [PMOD p]) : c - a ≡ c - b [PMOD p] := modEq_rfl.sub h #align add_comm_group.modeq.sub_left AddCommGroup.ModEq.sub_left protected theorem add_right (c : α) (h : a ≡ b [PMOD p]) : a + c ≡ b + c [PMOD p] := h.add modEq_rfl #align add_comm_group.modeq.add_right AddCommGroup.ModEq.add_right protected theorem sub_right (c : α) (h : a ≡ b [PMOD p]) : a - c ≡ b - c [PMOD p] := h.sub modEq_rfl #align add_comm_group.modeq.sub_right AddCommGroup.ModEq.sub_right protected theorem add_left_cancel' (c : α) : c + a ≡ c + b [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.add_left_cancel #align add_comm_group.modeq.add_left_cancel' AddCommGroup.ModEq.add_left_cancel' protected theorem add_right_cancel' (c : α) : a + c ≡ b + c [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.add_right_cancel #align add_comm_group.modeq.add_right_cancel' AddCommGroup.ModEq.add_right_cancel' protected theorem sub_left_cancel' (c : α) : c - a ≡ c - b [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.sub_left_cancel #align add_comm_group.modeq.sub_left_cancel' AddCommGroup.ModEq.sub_left_cancel' protected theorem sub_right_cancel' (c : α) : a - c ≡ b - c [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.sub_right_cancel #align add_comm_group.modeq.sub_right_cancel' AddCommGroup.ModEq.sub_right_cancel' end ModEq theorem modEq_sub_iff_add_modEq' : a ≡ b - c [PMOD p] ↔ c + a ≡ b [PMOD p] := by simp [ModEq, sub_sub] #align add_comm_group.modeq_sub_iff_add_modeq' AddCommGroup.modEq_sub_iff_add_modEq' theorem modEq_sub_iff_add_modEq : a ≡ b - c [PMOD p] ↔ a + c ≡ b [PMOD p] := modEq_sub_iff_add_modEq'.trans <\| by rw [add_comm] #align add_comm_group.modeq_sub_iff_add_modeq AddCommGroup.modEq_sub_iff_add_modEq theorem sub_modEq_iff_modEq_add' : a - b ≡ c [PMOD p] ↔ a ≡ b + c [PMOD p] := modEq_comm.trans <\| modEq_sub_iff_add_modEq'.trans modEq_comm #align add_comm_group.sub_modeq_iff_modeq_add' AddCommGroup.sub_modEq_iff_modEq_add' theorem sub_modEq_iff_modEq_add : a - b ≡ c [PMOD p] ↔ a ≡ c + b [PMOD p] := modEq_comm.trans <\| modEq_sub_iff_add_modEq.trans modEq_comm #align add_comm_group.sub_modeq_iff_modeq_add AddCommGroup.sub_modEq_iff_modEq_add @[simp] theorem sub_modEq_zero : a - b ≡ 0 [PMOD p] ↔ a ≡ b [PMOD p] := by simp [sub_modEq_iff_modEq_add] #align add_comm_group.sub_modeq_zero AddCommGroup.sub_modEq_zero @[simp] theorem add_modEq_left : a + b ≡ a [PMOD p] ↔ b ≡ 0 [PMOD p] := by simp [← modEq_sub_iff_add_modEq'] #align add_comm_group.add_modeq_left AddCommGroup.add_modEq_left @[simp] theorem add_modEq_right : a + b ≡ b [PMOD p] ↔ a ≡ 0 [PMOD p] := by simp [← modEq_sub_iff_add_modEq] #align add_comm_group.add_modeq_right AddCommGroup.add_modEq_right theorem modEq_iff_eq_add_zsmul : a ≡ b [PMOD p] ↔ ∃ z : ℤ, b = a + z • p := by simp_rw [ModEq, sub_eq_iff_eq_add'] #align add_comm_group.modeq_iff_eq_add_zsmul AddCommGroup.modEq_iff_eq_add_zsmul theorem not_modEq_iff_ne_add_zsmul : ¬a ≡ b [PMOD p] ↔ ∀ z : ℤ, b ≠ a + z • p := by rw [modEq_iff_eq_add_zsmul, not_exists] #align add_comm_group.not_modeq_iff_ne_add_zsmul AddCommGroup.not_modEq_iff_ne_add_zsmul	Mathlib/Algebra/ModEq.lean	298	300	theorem modEq_iff_eq_mod_zmultiples : a ≡ b [PMOD p] ↔ (b : α ⧸ AddSubgroup.zmultiples p) = a := by	simp_rw [modEq_iff_eq_add_zsmul, QuotientAddGroup.eq_iff_sub_mem, AddSubgroup.mem_zmultiples_iff, eq_sub_iff_add_eq', eq_comm]
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Johannes Hölzl, Mario Carneiro -/ import Mathlib.Logic.Pairwise import Mathlib.Order.CompleteBooleanAlgebra import Mathlib.Order.Directed import Mathlib.Order.GaloisConnection #align_import data.set.lattice from "leanprover-community/mathlib"@"b86832321b586c6ac23ef8cdef6a7a27e42b13bd" /-! # The set lattice This file provides usual set notation for unions and intersections, a `CompleteLattice` instance for `Set α`, and some more set constructions. ## Main declarations * `Set.iUnion`: indexed union. Union of an indexed family of sets. * `Set.iInter`: indexed intersection. Intersection of an indexed family of sets. * `Set.sInter`: set intersection. Intersection of sets belonging to a set of sets. * `Set.sUnion`: set union. Union of sets belonging to a set of sets. * `Set.sInter_eq_biInter`, `Set.sUnion_eq_biInter`: Shows that `⋂₀ s = ⋂ x ∈ s, x` and `⋃₀ s = ⋃ x ∈ s, x`. * `Set.completeAtomicBooleanAlgebra`: `Set α` is a `CompleteAtomicBooleanAlgebra` with `≤ = ⊆`, `< = ⊂`, `⊓ = ∩`, `⊔ = ∪`, `⨅ = ⋂`, `⨆ = ⋃` and `\` as the set difference. See `Set.BooleanAlgebra`. * `Set.kernImage`: For a function `f : α → β`, `s.kernImage f` is the set of `y` such that `f ⁻¹ y ⊆ s`. * `Set.seq`: Union of the image of a set under a sequence of functions. `seq s t` is the union of `f '' t` over all `f ∈ s`, where `t : Set α` and `s : Set (α → β)`. * `Set.unionEqSigmaOfDisjoint`: Equivalence between `⋃ i, t i` and `Σ i, t i`, where `t` is an indexed family of disjoint sets. ## Naming convention In lemma names, * `⋃ i, s i` is called `iUnion` * `⋂ i, s i` is called `iInter` * `⋃ i j, s i j` is called `iUnion₂`. This is an `iUnion` inside an `iUnion`. * `⋂ i j, s i j` is called `iInter₂`. This is an `iInter` inside an `iInter`. * `⋃ i ∈ s, t i` is called `biUnion` for "bounded `iUnion`". This is the special case of `iUnion₂` where `j : i ∈ s`. * `⋂ i ∈ s, t i` is called `biInter` for "bounded `iInter`". This is the special case of `iInter₂` where `j : i ∈ s`. ## Notation * `⋃`: `Set.iUnion` * `⋂`: `Set.iInter` * `⋃₀`: `Set.sUnion` * `⋂₀`: `Set.sInter` -/ open Function Set universe u variable {α β γ : Type} {ι ι' ι₂ : Sort} {κ κ₁ κ₂ : ι → Sort} {κ' : ι' → Sort} namespace Set /-! ### Complete lattice and complete Boolean algebra instances -/ theorem mem_iUnion₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋃ (i) (j), s i j) ↔ ∃ i j, x ∈ s i j := by simp_rw [mem_iUnion] #align set.mem_Union₂ Set.mem_iUnion₂ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem mem_iInter₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋂ (i) (j), s i j) ↔ ∀ i j, x ∈ s i j := by simp_rw [mem_iInter] #align set.mem_Inter₂ Set.mem_iInter₂ theorem mem_iUnion_of_mem {s : ι → Set α} {a : α} (i : ι) (ha : a ∈ s i) : a ∈ ⋃ i, s i := mem_iUnion.2 ⟨i, ha⟩ #align set.mem_Union_of_mem Set.mem_iUnion_of_mem /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem mem_iUnion₂_of_mem {s : ∀ i, κ i → Set α} {a : α} {i : ι} (j : κ i) (ha : a ∈ s i j) : a ∈ ⋃ (i) (j), s i j := mem_iUnion₂.2 ⟨i, j, ha⟩ #align set.mem_Union₂_of_mem Set.mem_iUnion₂_of_mem theorem mem_iInter_of_mem {s : ι → Set α} {a : α} (h : ∀ i, a ∈ s i) : a ∈ ⋂ i, s i := mem_iInter.2 h #align set.mem_Inter_of_mem Set.mem_iInter_of_mem /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem mem_iInter₂_of_mem {s : ∀ i, κ i → Set α} {a : α} (h : ∀ i j, a ∈ s i j) : a ∈ ⋂ (i) (j), s i j := mem_iInter₂.2 h #align set.mem_Inter₂_of_mem Set.mem_iInter₂_of_mem instance completeAtomicBooleanAlgebra : CompleteAtomicBooleanAlgebra (Set α) := { instBooleanAlgebraSet with le_sSup := fun s t t_in a a_in => ⟨t, t_in, a_in⟩ sSup_le := fun s t h a ⟨t', ⟨t'_in, a_in⟩⟩ => h t' t'_in a_in le_sInf := fun s t h a a_in t' t'_in => h t' t'_in a_in sInf_le := fun s t t_in a h => h _ t_in iInf_iSup_eq := by intros; ext; simp [Classical.skolem] } section GaloisConnection variable {f : α → β} protected theorem image_preimage : GaloisConnection (image f) (preimage f) := fun _ _ => image_subset_iff #align set.image_preimage Set.image_preimage protected theorem preimage_kernImage : GaloisConnection (preimage f) (kernImage f) := fun _ _ => subset_kernImage_iff.symm #align set.preimage_kern_image Set.preimage_kernImage end GaloisConnection section kernImage variable {f : α → β} lemma kernImage_mono : Monotone (kernImage f) := Set.preimage_kernImage.monotone_u lemma kernImage_eq_compl {s : Set α} : kernImage f s = (f '' sᶜ)ᶜ := Set.preimage_kernImage.u_unique (Set.image_preimage.compl) (fun t ↦ compl_compl (f ⁻¹' t) ▸ Set.preimage_compl) lemma kernImage_compl {s : Set α} : kernImage f (sᶜ) = (f '' s)ᶜ := by rw [kernImage_eq_compl, compl_compl] lemma kernImage_empty : kernImage f ∅ = (range f)ᶜ := by rw [kernImage_eq_compl, compl_empty, image_univ] lemma kernImage_preimage_eq_iff {s : Set β} : kernImage f (f ⁻¹' s) = s ↔ (range f)ᶜ ⊆ s := by rw [kernImage_eq_compl, ← preimage_compl, compl_eq_comm, eq_comm, image_preimage_eq_iff, compl_subset_comm] lemma compl_range_subset_kernImage {s : Set α} : (range f)ᶜ ⊆ kernImage f s := by rw [← kernImage_empty] exact kernImage_mono (empty_subset _) lemma kernImage_union_preimage {s : Set α} {t : Set β} : kernImage f (s ∪ f ⁻¹' t) = kernImage f s ∪ t := by rw [kernImage_eq_compl, kernImage_eq_compl, compl_union, ← preimage_compl, image_inter_preimage, compl_inter, compl_compl] lemma kernImage_preimage_union {s : Set α} {t : Set β} : kernImage f (f ⁻¹' t ∪ s) = t ∪ kernImage f s := by rw [union_comm, kernImage_union_preimage, union_comm] end kernImage /-! ### Union and intersection over an indexed family of sets -/ instance : OrderTop (Set α) where top := univ le_top := by simp @[congr] theorem iUnion_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q) (f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iUnion f₁ = iUnion f₂ := iSup_congr_Prop pq f #align set.Union_congr_Prop Set.iUnion_congr_Prop @[congr] theorem iInter_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q) (f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iInter f₁ = iInter f₂ := iInf_congr_Prop pq f #align set.Inter_congr_Prop Set.iInter_congr_Prop theorem iUnion_plift_up (f : PLift ι → Set α) : ⋃ i, f (PLift.up i) = ⋃ i, f i := iSup_plift_up _ #align set.Union_plift_up Set.iUnion_plift_up theorem iUnion_plift_down (f : ι → Set α) : ⋃ i, f (PLift.down i) = ⋃ i, f i := iSup_plift_down _ #align set.Union_plift_down Set.iUnion_plift_down theorem iInter_plift_up (f : PLift ι → Set α) : ⋂ i, f (PLift.up i) = ⋂ i, f i := iInf_plift_up _ #align set.Inter_plift_up Set.iInter_plift_up theorem iInter_plift_down (f : ι → Set α) : ⋂ i, f (PLift.down i) = ⋂ i, f i := iInf_plift_down _ #align set.Inter_plift_down Set.iInter_plift_down theorem iUnion_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋃ _ : p, s = if p then s else ∅ := iSup_eq_if _ #align set.Union_eq_if Set.iUnion_eq_if theorem iUnion_eq_dif {p : Prop} [Decidable p] (s : p → Set α) : ⋃ h : p, s h = if h : p then s h else ∅ := iSup_eq_dif _ #align set.Union_eq_dif Set.iUnion_eq_dif theorem iInter_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋂ _ : p, s = if p then s else univ := iInf_eq_if _ #align set.Inter_eq_if Set.iInter_eq_if theorem iInf_eq_dif {p : Prop} [Decidable p] (s : p → Set α) : ⋂ h : p, s h = if h : p then s h else univ := _root_.iInf_eq_dif _ #align set.Infi_eq_dif Set.iInf_eq_dif theorem exists_set_mem_of_union_eq_top {ι : Type} (t : Set ι) (s : ι → Set β) (w : ⋃ i ∈ t, s i = ⊤) (x : β) : ∃ i ∈ t, x ∈ s i := by have p : x ∈ ⊤ := Set.mem_univ x rw [← w, Set.mem_iUnion] at p simpa using p #align set.exists_set_mem_of_union_eq_top Set.exists_set_mem_of_union_eq_top theorem nonempty_of_union_eq_top_of_nonempty {ι : Type} (t : Set ι) (s : ι → Set α) (H : Nonempty α) (w : ⋃ i ∈ t, s i = ⊤) : t.Nonempty := by obtain ⟨x, m, -⟩ := exists_set_mem_of_union_eq_top t s w H.some exact ⟨x, m⟩ #align set.nonempty_of_union_eq_top_of_nonempty Set.nonempty_of_union_eq_top_of_nonempty theorem nonempty_of_nonempty_iUnion {s : ι → Set α} (h_Union : (⋃ i, s i).Nonempty) : Nonempty ι := by obtain ⟨x, hx⟩ := h_Union exact ⟨Classical.choose <\| mem_iUnion.mp hx⟩ theorem nonempty_of_nonempty_iUnion_eq_univ {s : ι → Set α} [Nonempty α] (h_Union : ⋃ i, s i = univ) : Nonempty ι := nonempty_of_nonempty_iUnion (s := s) (by simpa only [h_Union] using univ_nonempty) theorem setOf_exists (p : ι → β → Prop) : { x \| ∃ i, p i x } = ⋃ i, { x \| p i x } := ext fun _ => mem_iUnion.symm #align set.set_of_exists Set.setOf_exists theorem setOf_forall (p : ι → β → Prop) : { x \| ∀ i, p i x } = ⋂ i, { x \| p i x } := ext fun _ => mem_iInter.symm #align set.set_of_forall Set.setOf_forall theorem iUnion_subset {s : ι → Set α} {t : Set α} (h : ∀ i, s i ⊆ t) : ⋃ i, s i ⊆ t := iSup_le h #align set.Union_subset Set.iUnion_subset /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iUnion₂_subset {s : ∀ i, κ i → Set α} {t : Set α} (h : ∀ i j, s i j ⊆ t) : ⋃ (i) (j), s i j ⊆ t := iUnion_subset fun x => iUnion_subset (h x) #align set.Union₂_subset Set.iUnion₂_subset theorem subset_iInter {t : Set β} {s : ι → Set β} (h : ∀ i, t ⊆ s i) : t ⊆ ⋂ i, s i := le_iInf h #align set.subset_Inter Set.subset_iInter /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem subset_iInter₂ {s : Set α} {t : ∀ i, κ i → Set α} (h : ∀ i j, s ⊆ t i j) : s ⊆ ⋂ (i) (j), t i j := subset_iInter fun x => subset_iInter <\| h x #align set.subset_Inter₂ Set.subset_iInter₂ @[simp] theorem iUnion_subset_iff {s : ι → Set α} {t : Set α} : ⋃ i, s i ⊆ t ↔ ∀ i, s i ⊆ t := ⟨fun h _ => Subset.trans (le_iSup s _) h, iUnion_subset⟩ #align set.Union_subset_iff Set.iUnion_subset_iff /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iUnion₂_subset_iff {s : ∀ i, κ i → Set α} {t : Set α} : ⋃ (i) (j), s i j ⊆ t ↔ ∀ i j, s i j ⊆ t := by simp_rw [iUnion_subset_iff] #align set.Union₂_subset_iff Set.iUnion₂_subset_iff @[simp] theorem subset_iInter_iff {s : Set α} {t : ι → Set α} : (s ⊆ ⋂ i, t i) ↔ ∀ i, s ⊆ t i := le_iInf_iff #align set.subset_Inter_iff Set.subset_iInter_iff /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ -- Porting note (#10618): removing `simp`. `simp` can prove it theorem subset_iInter₂_iff {s : Set α} {t : ∀ i, κ i → Set α} : (s ⊆ ⋂ (i) (j), t i j) ↔ ∀ i j, s ⊆ t i j := by simp_rw [subset_iInter_iff] #align set.subset_Inter₂_iff Set.subset_iInter₂_iff theorem subset_iUnion : ∀ (s : ι → Set β) (i : ι), s i ⊆ ⋃ i, s i := le_iSup #align set.subset_Union Set.subset_iUnion theorem iInter_subset : ∀ (s : ι → Set β) (i : ι), ⋂ i, s i ⊆ s i := iInf_le #align set.Inter_subset Set.iInter_subset /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem subset_iUnion₂ {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : s i j ⊆ ⋃ (i') (j'), s i' j' := le_iSup₂ i j #align set.subset_Union₂ Set.subset_iUnion₂ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iInter₂_subset {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : ⋂ (i) (j), s i j ⊆ s i j := iInf₂_le i j #align set.Inter₂_subset Set.iInter₂_subset /-- This rather trivial consequence of `subset_iUnion`is convenient with `apply`, and has `i` explicit for this purpose. -/ theorem subset_iUnion_of_subset {s : Set α} {t : ι → Set α} (i : ι) (h : s ⊆ t i) : s ⊆ ⋃ i, t i := le_iSup_of_le i h #align set.subset_Union_of_subset Set.subset_iUnion_of_subset /-- This rather trivial consequence of `iInter_subset`is convenient with `apply`, and has `i` explicit for this purpose. -/ theorem iInter_subset_of_subset {s : ι → Set α} {t : Set α} (i : ι) (h : s i ⊆ t) : ⋂ i, s i ⊆ t := iInf_le_of_le i h #align set.Inter_subset_of_subset Set.iInter_subset_of_subset /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /-- This rather trivial consequence of `subset_iUnion₂` is convenient with `apply`, and has `i` and `j` explicit for this purpose. -/ theorem subset_iUnion₂_of_subset {s : Set α} {t : ∀ i, κ i → Set α} (i : ι) (j : κ i) (h : s ⊆ t i j) : s ⊆ ⋃ (i) (j), t i j := le_iSup₂_of_le i j h #align set.subset_Union₂_of_subset Set.subset_iUnion₂_of_subset /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /-- This rather trivial consequence of `iInter₂_subset` is convenient with `apply`, and has `i` and `j` explicit for this purpose. -/ theorem iInter₂_subset_of_subset {s : ∀ i, κ i → Set α} {t : Set α} (i : ι) (j : κ i) (h : s i j ⊆ t) : ⋂ (i) (j), s i j ⊆ t := iInf₂_le_of_le i j h #align set.Inter₂_subset_of_subset Set.iInter₂_subset_of_subset theorem iUnion_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋃ i, s i ⊆ ⋃ i, t i := iSup_mono h #align set.Union_mono Set.iUnion_mono @[gcongr] theorem iUnion_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iUnion s ⊆ iUnion t := iSup_mono h /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iUnion₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) : ⋃ (i) (j), s i j ⊆ ⋃ (i) (j), t i j := iSup₂_mono h #align set.Union₂_mono Set.iUnion₂_mono theorem iInter_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋂ i, s i ⊆ ⋂ i, t i := iInf_mono h #align set.Inter_mono Set.iInter_mono @[gcongr] theorem iInter_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iInter s ⊆ iInter t := iInf_mono h /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iInter₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) : ⋂ (i) (j), s i j ⊆ ⋂ (i) (j), t i j := iInf₂_mono h #align set.Inter₂_mono Set.iInter₂_mono theorem iUnion_mono' {s : ι → Set α} {t : ι₂ → Set α} (h : ∀ i, ∃ j, s i ⊆ t j) : ⋃ i, s i ⊆ ⋃ i, t i := iSup_mono' h #align set.Union_mono' Set.iUnion_mono' /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i' j') -/ theorem iUnion₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α} (h : ∀ i j, ∃ i' j', s i j ⊆ t i' j') : ⋃ (i) (j), s i j ⊆ ⋃ (i') (j'), t i' j' := iSup₂_mono' h #align set.Union₂_mono' Set.iUnion₂_mono' theorem iInter_mono' {s : ι → Set α} {t : ι' → Set α} (h : ∀ j, ∃ i, s i ⊆ t j) : ⋂ i, s i ⊆ ⋂ j, t j := Set.subset_iInter fun j => let ⟨i, hi⟩ := h j iInter_subset_of_subset i hi #align set.Inter_mono' Set.iInter_mono' /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i' j') -/ theorem iInter₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α} (h : ∀ i' j', ∃ i j, s i j ⊆ t i' j') : ⋂ (i) (j), s i j ⊆ ⋂ (i') (j'), t i' j' := subset_iInter₂_iff.2 fun i' j' => let ⟨_, _, hst⟩ := h i' j' (iInter₂_subset _ _).trans hst #align set.Inter₂_mono' Set.iInter₂_mono' theorem iUnion₂_subset_iUnion (κ : ι → Sort) (s : ι → Set α) : ⋃ (i) (_ : κ i), s i ⊆ ⋃ i, s i := iUnion_mono fun _ => iUnion_subset fun _ => Subset.rfl #align set.Union₂_subset_Union Set.iUnion₂_subset_iUnion theorem iInter_subset_iInter₂ (κ : ι → Sort) (s : ι → Set α) : ⋂ i, s i ⊆ ⋂ (i) (_ : κ i), s i := iInter_mono fun _ => subset_iInter fun _ => Subset.rfl #align set.Inter_subset_Inter₂ Set.iInter_subset_iInter₂ theorem iUnion_setOf (P : ι → α → Prop) : ⋃ i, { x : α \| P i x } = { x : α \| ∃ i, P i x } := by ext exact mem_iUnion #align set.Union_set_of Set.iUnion_setOf theorem iInter_setOf (P : ι → α → Prop) : ⋂ i, { x : α \| P i x } = { x : α \| ∀ i, P i x } := by ext exact mem_iInter #align set.Inter_set_of Set.iInter_setOf theorem iUnion_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h) (h2 : ∀ x, g (h x) = f x) : ⋃ x, f x = ⋃ y, g y := h1.iSup_congr h h2 #align set.Union_congr_of_surjective Set.iUnion_congr_of_surjective theorem iInter_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h) (h2 : ∀ x, g (h x) = f x) : ⋂ x, f x = ⋂ y, g y := h1.iInf_congr h h2 #align set.Inter_congr_of_surjective Set.iInter_congr_of_surjective lemma iUnion_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋃ i, s i = ⋃ i, t i := iSup_congr h #align set.Union_congr Set.iUnion_congr lemma iInter_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋂ i, s i = ⋂ i, t i := iInf_congr h #align set.Inter_congr Set.iInter_congr /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ lemma iUnion₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) : ⋃ (i) (j), s i j = ⋃ (i) (j), t i j := iUnion_congr fun i => iUnion_congr <\| h i #align set.Union₂_congr Set.iUnion₂_congr /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ lemma iInter₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) : ⋂ (i) (j), s i j = ⋂ (i) (j), t i j := iInter_congr fun i => iInter_congr <\| h i #align set.Inter₂_congr Set.iInter₂_congr section Nonempty variable [Nonempty ι] {f : ι → Set α} {s : Set α} lemma iUnion_const (s : Set β) : ⋃ _ : ι, s = s := iSup_const #align set.Union_const Set.iUnion_const lemma iInter_const (s : Set β) : ⋂ _ : ι, s = s := iInf_const #align set.Inter_const Set.iInter_const lemma iUnion_eq_const (hf : ∀ i, f i = s) : ⋃ i, f i = s := (iUnion_congr hf).trans <\| iUnion_const _ #align set.Union_eq_const Set.iUnion_eq_const lemma iInter_eq_const (hf : ∀ i, f i = s) : ⋂ i, f i = s := (iInter_congr hf).trans <\| iInter_const _ #align set.Inter_eq_const Set.iInter_eq_const end Nonempty @[simp] theorem compl_iUnion (s : ι → Set β) : (⋃ i, s i)ᶜ = ⋂ i, (s i)ᶜ := compl_iSup #align set.compl_Union Set.compl_iUnion /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem compl_iUnion₂ (s : ∀ i, κ i → Set α) : (⋃ (i) (j), s i j)ᶜ = ⋂ (i) (j), (s i j)ᶜ := by simp_rw [compl_iUnion] #align set.compl_Union₂ Set.compl_iUnion₂ @[simp] theorem compl_iInter (s : ι → Set β) : (⋂ i, s i)ᶜ = ⋃ i, (s i)ᶜ := compl_iInf #align set.compl_Inter Set.compl_iInter /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem compl_iInter₂ (s : ∀ i, κ i → Set α) : (⋂ (i) (j), s i j)ᶜ = ⋃ (i) (j), (s i j)ᶜ := by simp_rw [compl_iInter] #align set.compl_Inter₂ Set.compl_iInter₂ -- classical -- complete_boolean_algebra theorem iUnion_eq_compl_iInter_compl (s : ι → Set β) : ⋃ i, s i = (⋂ i, (s i)ᶜ)ᶜ := by simp only [compl_iInter, compl_compl] #align set.Union_eq_compl_Inter_compl Set.iUnion_eq_compl_iInter_compl -- classical -- complete_boolean_algebra theorem iInter_eq_compl_iUnion_compl (s : ι → Set β) : ⋂ i, s i = (⋃ i, (s i)ᶜ)ᶜ := by simp only [compl_iUnion, compl_compl] #align set.Inter_eq_compl_Union_compl Set.iInter_eq_compl_iUnion_compl theorem inter_iUnion (s : Set β) (t : ι → Set β) : (s ∩ ⋃ i, t i) = ⋃ i, s ∩ t i := inf_iSup_eq _ _ #align set.inter_Union Set.inter_iUnion theorem iUnion_inter (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∩ s = ⋃ i, t i ∩ s := iSup_inf_eq _ _ #align set.Union_inter Set.iUnion_inter theorem iUnion_union_distrib (s : ι → Set β) (t : ι → Set β) : ⋃ i, s i ∪ t i = (⋃ i, s i) ∪ ⋃ i, t i := iSup_sup_eq #align set.Union_union_distrib Set.iUnion_union_distrib theorem iInter_inter_distrib (s : ι → Set β) (t : ι → Set β) : ⋂ i, s i ∩ t i = (⋂ i, s i) ∩ ⋂ i, t i := iInf_inf_eq #align set.Inter_inter_distrib Set.iInter_inter_distrib theorem union_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∪ ⋃ i, t i) = ⋃ i, s ∪ t i := sup_iSup #align set.union_Union Set.union_iUnion theorem iUnion_union [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∪ s = ⋃ i, t i ∪ s := iSup_sup #align set.Union_union Set.iUnion_union theorem inter_iInter [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∩ ⋂ i, t i) = ⋂ i, s ∩ t i := inf_iInf #align set.inter_Inter Set.inter_iInter theorem iInter_inter [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋂ i, t i) ∩ s = ⋂ i, t i ∩ s := iInf_inf #align set.Inter_inter Set.iInter_inter -- classical theorem union_iInter (s : Set β) (t : ι → Set β) : (s ∪ ⋂ i, t i) = ⋂ i, s ∪ t i := sup_iInf_eq _ _ #align set.union_Inter Set.union_iInter theorem iInter_union (s : ι → Set β) (t : Set β) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t := iInf_sup_eq _ _ #align set.Inter_union Set.iInter_union theorem iUnion_diff (s : Set β) (t : ι → Set β) : (⋃ i, t i) \ s = ⋃ i, t i \ s := iUnion_inter _ _ #align set.Union_diff Set.iUnion_diff theorem diff_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s \ ⋃ i, t i) = ⋂ i, s \ t i := by rw [diff_eq, compl_iUnion, inter_iInter]; rfl #align set.diff_Union Set.diff_iUnion theorem diff_iInter (s : Set β) (t : ι → Set β) : (s \ ⋂ i, t i) = ⋃ i, s \ t i := by rw [diff_eq, compl_iInter, inter_iUnion]; rfl #align set.diff_Inter Set.diff_iInter theorem iUnion_inter_subset {ι α} {s t : ι → Set α} : ⋃ i, s i ∩ t i ⊆ (⋃ i, s i) ∩ ⋃ i, t i := le_iSup_inf_iSup s t #align set.Union_inter_subset Set.iUnion_inter_subset theorem iUnion_inter_of_monotone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α} (hs : Monotone s) (ht : Monotone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i := iSup_inf_of_monotone hs ht #align set.Union_inter_of_monotone Set.iUnion_inter_of_monotone theorem iUnion_inter_of_antitone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α} (hs : Antitone s) (ht : Antitone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i := iSup_inf_of_antitone hs ht #align set.Union_inter_of_antitone Set.iUnion_inter_of_antitone theorem iInter_union_of_monotone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α} (hs : Monotone s) (ht : Monotone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i := iInf_sup_of_monotone hs ht #align set.Inter_union_of_monotone Set.iInter_union_of_monotone theorem iInter_union_of_antitone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α} (hs : Antitone s) (ht : Antitone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i := iInf_sup_of_antitone hs ht #align set.Inter_union_of_antitone Set.iInter_union_of_antitone /-- An equality version of this lemma is `iUnion_iInter_of_monotone` in `Data.Set.Finite`. -/ theorem iUnion_iInter_subset {s : ι → ι' → Set α} : (⋃ j, ⋂ i, s i j) ⊆ ⋂ i, ⋃ j, s i j := iSup_iInf_le_iInf_iSup (flip s) #align set.Union_Inter_subset Set.iUnion_iInter_subset theorem iUnion_option {ι} (s : Option ι → Set α) : ⋃ o, s o = s none ∪ ⋃ i, s (some i) := iSup_option s #align set.Union_option Set.iUnion_option theorem iInter_option {ι} (s : Option ι → Set α) : ⋂ o, s o = s none ∩ ⋂ i, s (some i) := iInf_option s #align set.Inter_option Set.iInter_option section variable (p : ι → Prop) [DecidablePred p] theorem iUnion_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) : ⋃ i, (if h : p i then f i h else g i h) = (⋃ (i) (h : p i), f i h) ∪ ⋃ (i) (h : ¬p i), g i h := iSup_dite _ _ _ #align set.Union_dite Set.iUnion_dite theorem iUnion_ite (f g : ι → Set α) : ⋃ i, (if p i then f i else g i) = (⋃ (i) (_ : p i), f i) ∪ ⋃ (i) (_ : ¬p i), g i := iUnion_dite _ _ _ #align set.Union_ite Set.iUnion_ite theorem iInter_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) : ⋂ i, (if h : p i then f i h else g i h) = (⋂ (i) (h : p i), f i h) ∩ ⋂ (i) (h : ¬p i), g i h := iInf_dite _ _ _ #align set.Inter_dite Set.iInter_dite theorem iInter_ite (f g : ι → Set α) : ⋂ i, (if p i then f i else g i) = (⋂ (i) (_ : p i), f i) ∩ ⋂ (i) (_ : ¬p i), g i := iInter_dite _ _ _ #align set.Inter_ite Set.iInter_ite end theorem image_projection_prod {ι : Type} {α : ι → Type} {v : ∀ i : ι, Set (α i)} (hv : (pi univ v).Nonempty) (i : ι) : ((fun x : ∀ i : ι, α i => x i) '' ⋂ k, (fun x : ∀ j : ι, α j => x k) ⁻¹' v k) = v i := by classical apply Subset.antisymm · simp [iInter_subset] · intro y y_in simp only [mem_image, mem_iInter, mem_preimage] rcases hv with ⟨z, hz⟩ refine ⟨Function.update z i y, ?_, update_same i y z⟩ rw [@forall_update_iff ι α _ z i y fun i t => t ∈ v i] exact ⟨y_in, fun j _ => by simpa using hz j⟩ #align set.image_projection_prod Set.image_projection_prod /-! ### Unions and intersections indexed by `Prop` -/ theorem iInter_false {s : False → Set α} : iInter s = univ := iInf_false #align set.Inter_false Set.iInter_false theorem iUnion_false {s : False → Set α} : iUnion s = ∅ := iSup_false #align set.Union_false Set.iUnion_false @[simp] theorem iInter_true {s : True → Set α} : iInter s = s trivial := iInf_true #align set.Inter_true Set.iInter_true @[simp] theorem iUnion_true {s : True → Set α} : iUnion s = s trivial := iSup_true #align set.Union_true Set.iUnion_true @[simp] theorem iInter_exists {p : ι → Prop} {f : Exists p → Set α} : ⋂ x, f x = ⋂ (i) (h : p i), f ⟨i, h⟩ := iInf_exists #align set.Inter_exists Set.iInter_exists @[simp] theorem iUnion_exists {p : ι → Prop} {f : Exists p → Set α} : ⋃ x, f x = ⋃ (i) (h : p i), f ⟨i, h⟩ := iSup_exists #align set.Union_exists Set.iUnion_exists @[simp] theorem iUnion_empty : (⋃ _ : ι, ∅ : Set α) = ∅ := iSup_bot #align set.Union_empty Set.iUnion_empty @[simp] theorem iInter_univ : (⋂ _ : ι, univ : Set α) = univ := iInf_top #align set.Inter_univ Set.iInter_univ section variable {s : ι → Set α} @[simp] theorem iUnion_eq_empty : ⋃ i, s i = ∅ ↔ ∀ i, s i = ∅ := iSup_eq_bot #align set.Union_eq_empty Set.iUnion_eq_empty @[simp] theorem iInter_eq_univ : ⋂ i, s i = univ ↔ ∀ i, s i = univ := iInf_eq_top #align set.Inter_eq_univ Set.iInter_eq_univ @[simp] theorem nonempty_iUnion : (⋃ i, s i).Nonempty ↔ ∃ i, (s i).Nonempty := by simp [nonempty_iff_ne_empty] #align set.nonempty_Union Set.nonempty_iUnion -- Porting note (#10618): removing `simp`. `simp` can prove it theorem nonempty_biUnion {t : Set α} {s : α → Set β} : (⋃ i ∈ t, s i).Nonempty ↔ ∃ i ∈ t, (s i).Nonempty := by simp #align set.nonempty_bUnion Set.nonempty_biUnion theorem iUnion_nonempty_index (s : Set α) (t : s.Nonempty → Set β) : ⋃ h, t h = ⋃ x ∈ s, t ⟨x, ‹_›⟩ := iSup_exists #align set.Union_nonempty_index Set.iUnion_nonempty_index end @[simp] theorem iInter_iInter_eq_left {b : β} {s : ∀ x : β, x = b → Set α} : ⋂ (x) (h : x = b), s x h = s b rfl := iInf_iInf_eq_left #align set.Inter_Inter_eq_left Set.iInter_iInter_eq_left @[simp] theorem iInter_iInter_eq_right {b : β} {s : ∀ x : β, b = x → Set α} : ⋂ (x) (h : b = x), s x h = s b rfl := iInf_iInf_eq_right #align set.Inter_Inter_eq_right Set.iInter_iInter_eq_right @[simp] theorem iUnion_iUnion_eq_left {b : β} {s : ∀ x : β, x = b → Set α} : ⋃ (x) (h : x = b), s x h = s b rfl := iSup_iSup_eq_left #align set.Union_Union_eq_left Set.iUnion_iUnion_eq_left @[simp] theorem iUnion_iUnion_eq_right {b : β} {s : ∀ x : β, b = x → Set α} : ⋃ (x) (h : b = x), s x h = s b rfl := iSup_iSup_eq_right #align set.Union_Union_eq_right Set.iUnion_iUnion_eq_right theorem iInter_or {p q : Prop} (s : p ∨ q → Set α) : ⋂ h, s h = (⋂ h : p, s (Or.inl h)) ∩ ⋂ h : q, s (Or.inr h) := iInf_or #align set.Inter_or Set.iInter_or theorem iUnion_or {p q : Prop} (s : p ∨ q → Set α) : ⋃ h, s h = (⋃ i, s (Or.inl i)) ∪ ⋃ j, s (Or.inr j) := iSup_or #align set.Union_or Set.iUnion_or /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (hp hq) -/ theorem iUnion_and {p q : Prop} (s : p ∧ q → Set α) : ⋃ h, s h = ⋃ (hp) (hq), s ⟨hp, hq⟩ := iSup_and #align set.Union_and Set.iUnion_and /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (hp hq) -/ theorem iInter_and {p q : Prop} (s : p ∧ q → Set α) : ⋂ h, s h = ⋂ (hp) (hq), s ⟨hp, hq⟩ := iInf_and #align set.Inter_and Set.iInter_and /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i i') -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i' i) -/ theorem iUnion_comm (s : ι → ι' → Set α) : ⋃ (i) (i'), s i i' = ⋃ (i') (i), s i i' := iSup_comm #align set.Union_comm Set.iUnion_comm /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i i') -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i' i) -/ theorem iInter_comm (s : ι → ι' → Set α) : ⋂ (i) (i'), s i i' = ⋂ (i') (i), s i i' := iInf_comm #align set.Inter_comm Set.iInter_comm theorem iUnion_sigma {γ : α → Type} (s : Sigma γ → Set β) : ⋃ ia, s ia = ⋃ i, ⋃ a, s ⟨i, a⟩ := iSup_sigma theorem iUnion_sigma' {γ : α → Type} (s : ∀ i, γ i → Set β) : ⋃ i, ⋃ a, s i a = ⋃ ia : Sigma γ, s ia.1 ia.2 := iSup_sigma' _ theorem iInter_sigma {γ : α → Type} (s : Sigma γ → Set β) : ⋂ ia, s ia = ⋂ i, ⋂ a, s ⟨i, a⟩ := iInf_sigma theorem iInter_sigma' {γ : α → Type} (s : ∀ i, γ i → Set β) : ⋂ i, ⋂ a, s i a = ⋂ ia : Sigma γ, s ia.1 ia.2 := iInf_sigma' _ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i₁ j₁ i₂ j₂) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i₂ j₂ i₁ j₁) -/ theorem iUnion₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) : ⋃ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋃ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ := iSup₂_comm _ #align set.Union₂_comm Set.iUnion₂_comm /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i₁ j₁ i₂ j₂) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i₂ j₂ i₁ j₁) -/ theorem iInter₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) : ⋂ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋂ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ := iInf₂_comm _ #align set.Inter₂_comm Set.iInter₂_comm @[simp] theorem biUnion_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) : ⋃ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h = ⋃ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by simp only [iUnion_and, @iUnion_comm _ ι'] #align set.bUnion_and Set.biUnion_and @[simp] theorem biUnion_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) : ⋃ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h = ⋃ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by simp only [iUnion_and, @iUnion_comm _ ι] #align set.bUnion_and' Set.biUnion_and' @[simp] theorem biInter_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) : ⋂ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h = ⋂ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by simp only [iInter_and, @iInter_comm _ ι'] #align set.bInter_and Set.biInter_and @[simp] theorem biInter_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) : ⋂ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h = ⋂ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by simp only [iInter_and, @iInter_comm _ ι] #align set.bInter_and' Set.biInter_and' /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (x h) -/ @[simp] theorem iUnion_iUnion_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} : ⋃ (x) (h), s x h = s b (Or.inl rfl) ∪ ⋃ (x) (h : p x), s x (Or.inr h) := by simp only [iUnion_or, iUnion_union_distrib, iUnion_iUnion_eq_left] #align set.Union_Union_eq_or_left Set.iUnion_iUnion_eq_or_left /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (x h) -/ @[simp] theorem iInter_iInter_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} : ⋂ (x) (h), s x h = s b (Or.inl rfl) ∩ ⋂ (x) (h : p x), s x (Or.inr h) := by simp only [iInter_or, iInter_inter_distrib, iInter_iInter_eq_left] #align set.Inter_Inter_eq_or_left Set.iInter_iInter_eq_or_left /-! ### Bounded unions and intersections -/ /-- A specialization of `mem_iUnion₂`. -/ theorem mem_biUnion {s : Set α} {t : α → Set β} {x : α} {y : β} (xs : x ∈ s) (ytx : y ∈ t x) : y ∈ ⋃ x ∈ s, t x := mem_iUnion₂_of_mem xs ytx #align set.mem_bUnion Set.mem_biUnion /-- A specialization of `mem_iInter₂`. -/ theorem mem_biInter {s : Set α} {t : α → Set β} {y : β} (h : ∀ x ∈ s, y ∈ t x) : y ∈ ⋂ x ∈ s, t x := mem_iInter₂_of_mem h #align set.mem_bInter Set.mem_biInter /-- A specialization of `subset_iUnion₂`. -/ theorem subset_biUnion_of_mem {s : Set α} {u : α → Set β} {x : α} (xs : x ∈ s) : u x ⊆ ⋃ x ∈ s, u x := -- Porting note: Why is this not just `subset_iUnion₂ x xs`? @subset_iUnion₂ β α (· ∈ s) (fun i _ => u i) x xs #align set.subset_bUnion_of_mem Set.subset_biUnion_of_mem /-- A specialization of `iInter₂_subset`. -/ theorem biInter_subset_of_mem {s : Set α} {t : α → Set β} {x : α} (xs : x ∈ s) : ⋂ x ∈ s, t x ⊆ t x := iInter₂_subset x xs #align set.bInter_subset_of_mem Set.biInter_subset_of_mem theorem biUnion_subset_biUnion_left {s s' : Set α} {t : α → Set β} (h : s ⊆ s') : ⋃ x ∈ s, t x ⊆ ⋃ x ∈ s', t x := iUnion₂_subset fun _ hx => subset_biUnion_of_mem <\| h hx #align set.bUnion_subset_bUnion_left Set.biUnion_subset_biUnion_left theorem biInter_subset_biInter_left {s s' : Set α} {t : α → Set β} (h : s' ⊆ s) : ⋂ x ∈ s, t x ⊆ ⋂ x ∈ s', t x := subset_iInter₂ fun _ hx => biInter_subset_of_mem <\| h hx #align set.bInter_subset_bInter_left Set.biInter_subset_biInter_left theorem biUnion_mono {s s' : Set α} {t t' : α → Set β} (hs : s' ⊆ s) (h : ∀ x ∈ s, t x ⊆ t' x) : ⋃ x ∈ s', t x ⊆ ⋃ x ∈ s, t' x := (biUnion_subset_biUnion_left hs).trans <\| iUnion₂_mono h #align set.bUnion_mono Set.biUnion_mono theorem biInter_mono {s s' : Set α} {t t' : α → Set β} (hs : s ⊆ s') (h : ∀ x ∈ s, t x ⊆ t' x) : ⋂ x ∈ s', t x ⊆ ⋂ x ∈ s, t' x := (biInter_subset_biInter_left hs).trans <\| iInter₂_mono h #align set.bInter_mono Set.biInter_mono theorem biUnion_eq_iUnion (s : Set α) (t : ∀ x ∈ s, Set β) : ⋃ x ∈ s, t x ‹_› = ⋃ x : s, t x x.2 := iSup_subtype' #align set.bUnion_eq_Union Set.biUnion_eq_iUnion theorem biInter_eq_iInter (s : Set α) (t : ∀ x ∈ s, Set β) : ⋂ x ∈ s, t x ‹_› = ⋂ x : s, t x x.2 := iInf_subtype' #align set.bInter_eq_Inter Set.biInter_eq_iInter theorem iUnion_subtype (p : α → Prop) (s : { x // p x } → Set β) : ⋃ x : { x // p x }, s x = ⋃ (x) (hx : p x), s ⟨x, hx⟩ := iSup_subtype #align set.Union_subtype Set.iUnion_subtype theorem iInter_subtype (p : α → Prop) (s : { x // p x } → Set β) : ⋂ x : { x // p x }, s x = ⋂ (x) (hx : p x), s ⟨x, hx⟩ := iInf_subtype #align set.Inter_subtype Set.iInter_subtype theorem biInter_empty (u : α → Set β) : ⋂ x ∈ (∅ : Set α), u x = univ := iInf_emptyset #align set.bInter_empty Set.biInter_empty theorem biInter_univ (u : α → Set β) : ⋂ x ∈ @univ α, u x = ⋂ x, u x := iInf_univ #align set.bInter_univ Set.biInter_univ @[simp] theorem biUnion_self (s : Set α) : ⋃ x ∈ s, s = s := Subset.antisymm (iUnion₂_subset fun _ _ => Subset.refl s) fun _ hx => mem_biUnion hx hx #align set.bUnion_self Set.biUnion_self @[simp] theorem iUnion_nonempty_self (s : Set α) : ⋃ _ : s.Nonempty, s = s := by rw [iUnion_nonempty_index, biUnion_self] #align set.Union_nonempty_self Set.iUnion_nonempty_self theorem biInter_singleton (a : α) (s : α → Set β) : ⋂ x ∈ ({a} : Set α), s x = s a := iInf_singleton #align set.bInter_singleton Set.biInter_singleton theorem biInter_union (s t : Set α) (u : α → Set β) : ⋂ x ∈ s ∪ t, u x = (⋂ x ∈ s, u x) ∩ ⋂ x ∈ t, u x := iInf_union #align set.bInter_union Set.biInter_union theorem biInter_insert (a : α) (s : Set α) (t : α → Set β) : ⋂ x ∈ insert a s, t x = t a ∩ ⋂ x ∈ s, t x := by simp #align set.bInter_insert Set.biInter_insert theorem biInter_pair (a b : α) (s : α → Set β) : ⋂ x ∈ ({a, b} : Set α), s x = s a ∩ s b := by rw [biInter_insert, biInter_singleton] #align set.bInter_pair Set.biInter_pair theorem biInter_inter {ι α : Type} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) : ⋂ i ∈ s, f i ∩ t = (⋂ i ∈ s, f i) ∩ t := by haveI : Nonempty s := hs.to_subtype simp [biInter_eq_iInter, ← iInter_inter] #align set.bInter_inter Set.biInter_inter theorem inter_biInter {ι α : Type} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) : ⋂ i ∈ s, t ∩ f i = t ∩ ⋂ i ∈ s, f i := by rw [inter_comm, ← biInter_inter hs] simp [inter_comm] #align set.inter_bInter Set.inter_biInter theorem biUnion_empty (s : α → Set β) : ⋃ x ∈ (∅ : Set α), s x = ∅ := iSup_emptyset #align set.bUnion_empty Set.biUnion_empty theorem biUnion_univ (s : α → Set β) : ⋃ x ∈ @univ α, s x = ⋃ x, s x := iSup_univ #align set.bUnion_univ Set.biUnion_univ theorem biUnion_singleton (a : α) (s : α → Set β) : ⋃ x ∈ ({a} : Set α), s x = s a := iSup_singleton #align set.bUnion_singleton Set.biUnion_singleton @[simp] theorem biUnion_of_singleton (s : Set α) : ⋃ x ∈ s, {x} = s := ext <\| by simp #align set.bUnion_of_singleton Set.biUnion_of_singleton theorem biUnion_union (s t : Set α) (u : α → Set β) : ⋃ x ∈ s ∪ t, u x = (⋃ x ∈ s, u x) ∪ ⋃ x ∈ t, u x := iSup_union #align set.bUnion_union Set.biUnion_union @[simp] theorem iUnion_coe_set {α β : Type} (s : Set α) (f : s → Set β) : ⋃ i, f i = ⋃ i ∈ s, f ⟨i, ‹i ∈ s›⟩ := iUnion_subtype _ _ #align set.Union_coe_set Set.iUnion_coe_set @[simp] theorem iInter_coe_set {α β : Type} (s : Set α) (f : s → Set β) : ⋂ i, f i = ⋂ i ∈ s, f ⟨i, ‹i ∈ s›⟩ := iInter_subtype _ _ #align set.Inter_coe_set Set.iInter_coe_set theorem biUnion_insert (a : α) (s : Set α) (t : α → Set β) : ⋃ x ∈ insert a s, t x = t a ∪ ⋃ x ∈ s, t x := by simp #align set.bUnion_insert Set.biUnion_insert theorem biUnion_pair (a b : α) (s : α → Set β) : ⋃ x ∈ ({a, b} : Set α), s x = s a ∪ s b := by simp #align set.bUnion_pair Set.biUnion_pair /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem inter_iUnion₂ (s : Set α) (t : ∀ i, κ i → Set α) : (s ∩ ⋃ (i) (j), t i j) = ⋃ (i) (j), s ∩ t i j := by simp only [inter_iUnion] #align set.inter_Union₂ Set.inter_iUnion₂ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iUnion₂_inter (s : ∀ i, κ i → Set α) (t : Set α) : (⋃ (i) (j), s i j) ∩ t = ⋃ (i) (j), s i j ∩ t := by simp_rw [iUnion_inter] #align set.Union₂_inter Set.iUnion₂_inter /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem union_iInter₂ (s : Set α) (t : ∀ i, κ i → Set α) : (s ∪ ⋂ (i) (j), t i j) = ⋂ (i) (j), s ∪ t i j := by simp_rw [union_iInter] #align set.union_Inter₂ Set.union_iInter₂ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iInter₂_union (s : ∀ i, κ i → Set α) (t : Set α) : (⋂ (i) (j), s i j) ∪ t = ⋂ (i) (j), s i j ∪ t := by simp_rw [iInter_union] #align set.Inter₂_union Set.iInter₂_union theorem mem_sUnion_of_mem {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∈ t) (ht : t ∈ S) : x ∈ ⋃₀S := ⟨t, ht, hx⟩ #align set.mem_sUnion_of_mem Set.mem_sUnion_of_mem -- is this theorem really necessary? theorem not_mem_of_not_mem_sUnion {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∉ ⋃₀S) (ht : t ∈ S) : x ∉ t := fun h => hx ⟨t, ht, h⟩ #align set.not_mem_of_not_mem_sUnion Set.not_mem_of_not_mem_sUnion theorem sInter_subset_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : ⋂₀ S ⊆ t := sInf_le tS #align set.sInter_subset_of_mem Set.sInter_subset_of_mem theorem subset_sUnion_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : t ⊆ ⋃₀S := le_sSup tS #align set.subset_sUnion_of_mem Set.subset_sUnion_of_mem theorem subset_sUnion_of_subset {s : Set α} (t : Set (Set α)) (u : Set α) (h₁ : s ⊆ u) (h₂ : u ∈ t) : s ⊆ ⋃₀t := Subset.trans h₁ (subset_sUnion_of_mem h₂) #align set.subset_sUnion_of_subset Set.subset_sUnion_of_subset theorem sUnion_subset {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t' ⊆ t) : ⋃₀S ⊆ t := sSup_le h #align set.sUnion_subset Set.sUnion_subset @[simp] theorem sUnion_subset_iff {s : Set (Set α)} {t : Set α} : ⋃₀s ⊆ t ↔ ∀ t' ∈ s, t' ⊆ t := sSup_le_iff #align set.sUnion_subset_iff Set.sUnion_subset_iff /-- `sUnion` is monotone under taking a subset of each set. -/ lemma sUnion_mono_subsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, t ⊆ f t) : ⋃₀ s ⊆ ⋃₀ (f '' s) := fun _ ⟨t, htx, hxt⟩ ↦ ⟨f t, mem_image_of_mem f htx, hf t hxt⟩ /-- `sUnion` is monotone under taking a superset of each set. -/ lemma sUnion_mono_supsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, f t ⊆ t) : ⋃₀ (f '' s) ⊆ ⋃₀ s := -- If t ∈ f '' s is arbitrary; t = f u for some u : Set α. fun _ ⟨_, ⟨u, hus, hut⟩, hxt⟩ ↦ ⟨u, hus, (hut ▸ hf u) hxt⟩ theorem subset_sInter {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t ⊆ t') : t ⊆ ⋂₀ S := le_sInf h #align set.subset_sInter Set.subset_sInter @[simp] theorem subset_sInter_iff {S : Set (Set α)} {t : Set α} : t ⊆ ⋂₀ S ↔ ∀ t' ∈ S, t ⊆ t' := le_sInf_iff #align set.subset_sInter_iff Set.subset_sInter_iff @[gcongr] theorem sUnion_subset_sUnion {S T : Set (Set α)} (h : S ⊆ T) : ⋃₀S ⊆ ⋃₀T := sUnion_subset fun _ hs => subset_sUnion_of_mem (h hs) #align set.sUnion_subset_sUnion Set.sUnion_subset_sUnion @[gcongr] theorem sInter_subset_sInter {S T : Set (Set α)} (h : S ⊆ T) : ⋂₀ T ⊆ ⋂₀ S := subset_sInter fun _ hs => sInter_subset_of_mem (h hs) #align set.sInter_subset_sInter Set.sInter_subset_sInter @[simp] theorem sUnion_empty : ⋃₀∅ = (∅ : Set α) := sSup_empty #align set.sUnion_empty Set.sUnion_empty @[simp] theorem sInter_empty : ⋂₀ ∅ = (univ : Set α) := sInf_empty #align set.sInter_empty Set.sInter_empty @[simp] theorem sUnion_singleton (s : Set α) : ⋃₀{s} = s := sSup_singleton #align set.sUnion_singleton Set.sUnion_singleton @[simp] theorem sInter_singleton (s : Set α) : ⋂₀ {s} = s := sInf_singleton #align set.sInter_singleton Set.sInter_singleton @[simp] theorem sUnion_eq_empty {S : Set (Set α)} : ⋃₀S = ∅ ↔ ∀ s ∈ S, s = ∅ := sSup_eq_bot #align set.sUnion_eq_empty Set.sUnion_eq_empty @[simp] theorem sInter_eq_univ {S : Set (Set α)} : ⋂₀ S = univ ↔ ∀ s ∈ S, s = univ := sInf_eq_top #align set.sInter_eq_univ Set.sInter_eq_univ theorem subset_powerset_iff {s : Set (Set α)} {t : Set α} : s ⊆ 𝒫 t ↔ ⋃₀ s ⊆ t := sUnion_subset_iff.symm /-- `⋃₀` and `𝒫` form a Galois connection. -/ theorem sUnion_powerset_gc : GaloisConnection (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) := gc_sSup_Iic /-- `⋃₀` and `𝒫` form a Galois insertion. -/ def sUnion_powerset_gi : GaloisInsertion (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) := gi_sSup_Iic /-- If all sets in a collection are either `∅` or `Set.univ`, then so is their union. -/ theorem sUnion_mem_empty_univ {S : Set (Set α)} (h : S ⊆ {∅, univ}) : ⋃₀ S ∈ ({∅, univ} : Set (Set α)) := by simp only [mem_insert_iff, mem_singleton_iff, or_iff_not_imp_left, sUnion_eq_empty, not_forall] rintro ⟨s, hs, hne⟩ obtain rfl : s = univ := (h hs).resolve_left hne exact univ_subset_iff.1 <\| subset_sUnion_of_mem hs @[simp] theorem nonempty_sUnion {S : Set (Set α)} : (⋃₀S).Nonempty ↔ ∃ s ∈ S, Set.Nonempty s := by simp [nonempty_iff_ne_empty] #align set.nonempty_sUnion Set.nonempty_sUnion theorem Nonempty.of_sUnion {s : Set (Set α)} (h : (⋃₀s).Nonempty) : s.Nonempty := let ⟨s, hs, _⟩ := nonempty_sUnion.1 h ⟨s, hs⟩ #align set.nonempty.of_sUnion Set.Nonempty.of_sUnion theorem Nonempty.of_sUnion_eq_univ [Nonempty α] {s : Set (Set α)} (h : ⋃₀s = univ) : s.Nonempty := Nonempty.of_sUnion <\| h.symm ▸ univ_nonempty #align set.nonempty.of_sUnion_eq_univ Set.Nonempty.of_sUnion_eq_univ theorem sUnion_union (S T : Set (Set α)) : ⋃₀(S ∪ T) = ⋃₀S ∪ ⋃₀T := sSup_union #align set.sUnion_union Set.sUnion_union theorem sInter_union (S T : Set (Set α)) : ⋂₀ (S ∪ T) = ⋂₀ S ∩ ⋂₀ T := sInf_union #align set.sInter_union Set.sInter_union @[simp] theorem sUnion_insert (s : Set α) (T : Set (Set α)) : ⋃₀insert s T = s ∪ ⋃₀T := sSup_insert #align set.sUnion_insert Set.sUnion_insert @[simp] theorem sInter_insert (s : Set α) (T : Set (Set α)) : ⋂₀ insert s T = s ∩ ⋂₀ T := sInf_insert #align set.sInter_insert Set.sInter_insert @[simp] theorem sUnion_diff_singleton_empty (s : Set (Set α)) : ⋃₀(s \ {∅}) = ⋃₀s := sSup_diff_singleton_bot s #align set.sUnion_diff_singleton_empty Set.sUnion_diff_singleton_empty @[simp] theorem sInter_diff_singleton_univ (s : Set (Set α)) : ⋂₀ (s \ {univ}) = ⋂₀ s := sInf_diff_singleton_top s #align set.sInter_diff_singleton_univ Set.sInter_diff_singleton_univ theorem sUnion_pair (s t : Set α) : ⋃₀{s, t} = s ∪ t := sSup_pair #align set.sUnion_pair Set.sUnion_pair theorem sInter_pair (s t : Set α) : ⋂₀ {s, t} = s ∩ t := sInf_pair #align set.sInter_pair Set.sInter_pair @[simp] theorem sUnion_image (f : α → Set β) (s : Set α) : ⋃₀(f '' s) = ⋃ x ∈ s, f x := sSup_image #align set.sUnion_image Set.sUnion_image @[simp] theorem sInter_image (f : α → Set β) (s : Set α) : ⋂₀ (f '' s) = ⋂ x ∈ s, f x := sInf_image #align set.sInter_image Set.sInter_image @[simp] theorem sUnion_range (f : ι → Set β) : ⋃₀range f = ⋃ x, f x := rfl #align set.sUnion_range Set.sUnion_range @[simp] theorem sInter_range (f : ι → Set β) : ⋂₀ range f = ⋂ x, f x := rfl #align set.sInter_range Set.sInter_range theorem iUnion_eq_univ_iff {f : ι → Set α} : ⋃ i, f i = univ ↔ ∀ x, ∃ i, x ∈ f i := by simp only [eq_univ_iff_forall, mem_iUnion] #align set.Union_eq_univ_iff Set.iUnion_eq_univ_iff /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ theorem iUnion₂_eq_univ_iff {s : ∀ i, κ i → Set α} : ⋃ (i) (j), s i j = univ ↔ ∀ a, ∃ i j, a ∈ s i j := by simp only [iUnion_eq_univ_iff, mem_iUnion] #align set.Union₂_eq_univ_iff Set.iUnion₂_eq_univ_iff theorem sUnion_eq_univ_iff {c : Set (Set α)} : ⋃₀c = univ ↔ ∀ a, ∃ b ∈ c, a ∈ b := by simp only [eq_univ_iff_forall, mem_sUnion] #align set.sUnion_eq_univ_iff Set.sUnion_eq_univ_iff -- classical theorem iInter_eq_empty_iff {f : ι → Set α} : ⋂ i, f i = ∅ ↔ ∀ x, ∃ i, x ∉ f i := by simp [Set.eq_empty_iff_forall_not_mem] #align set.Inter_eq_empty_iff Set.iInter_eq_empty_iff /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ -- classical theorem iInter₂_eq_empty_iff {s : ∀ i, κ i → Set α} : ⋂ (i) (j), s i j = ∅ ↔ ∀ a, ∃ i j, a ∉ s i j := by simp only [eq_empty_iff_forall_not_mem, mem_iInter, not_forall] #align set.Inter₂_eq_empty_iff Set.iInter₂_eq_empty_iff -- classical theorem sInter_eq_empty_iff {c : Set (Set α)} : ⋂₀ c = ∅ ↔ ∀ a, ∃ b ∈ c, a ∉ b := by simp [Set.eq_empty_iff_forall_not_mem] #align set.sInter_eq_empty_iff Set.sInter_eq_empty_iff -- classical @[simp] theorem nonempty_iInter {f : ι → Set α} : (⋂ i, f i).Nonempty ↔ ∃ x, ∀ i, x ∈ f i := by simp [nonempty_iff_ne_empty, iInter_eq_empty_iff] #align set.nonempty_Inter Set.nonempty_iInter /- ./././Mathport/Syntax/Translate/Expr.lean:107:6: warning: expanding binder group (i j) -/ -- classical -- Porting note (#10618): removing `simp`. `simp` can prove it theorem nonempty_iInter₂ {s : ∀ i, κ i → Set α} : (⋂ (i) (j), s i j).Nonempty ↔ ∃ a, ∀ i j, a ∈ s i j := by simp #align set.nonempty_Inter₂ Set.nonempty_iInter₂ -- classical @[simp] theorem nonempty_sInter {c : Set (Set α)} : (⋂₀ c).Nonempty ↔ ∃ a, ∀ b ∈ c, a ∈ b := by simp [nonempty_iff_ne_empty, sInter_eq_empty_iff] #align set.nonempty_sInter Set.nonempty_sInter -- classical theorem compl_sUnion (S : Set (Set α)) : (⋃₀S)ᶜ = ⋂₀ (compl '' S) := ext fun x => by simp #align set.compl_sUnion Set.compl_sUnion -- classical theorem sUnion_eq_compl_sInter_compl (S : Set (Set α)) : ⋃₀S = (⋂₀ (compl '' S))ᶜ := by rw [← compl_compl (⋃₀S), compl_sUnion] #align set.sUnion_eq_compl_sInter_compl Set.sUnion_eq_compl_sInter_compl -- classical theorem compl_sInter (S : Set (Set α)) : (⋂₀ S)ᶜ = ⋃₀(compl '' S) := by rw [sUnion_eq_compl_sInter_compl, compl_compl_image] #align set.compl_sInter Set.compl_sInter -- classical theorem sInter_eq_compl_sUnion_compl (S : Set (Set α)) : ⋂₀ S = (⋃₀(compl '' S))ᶜ := by rw [← compl_compl (⋂₀ S), compl_sInter] #align set.sInter_eq_compl_sUnion_compl Set.sInter_eq_compl_sUnion_compl theorem inter_empty_of_inter_sUnion_empty {s t : Set α} {S : Set (Set α)} (hs : t ∈ S) (h : s ∩ ⋃₀S = ∅) : s ∩ t = ∅ := eq_empty_of_subset_empty <\| by rw [← h]; exact inter_subset_inter_right _ (subset_sUnion_of_mem hs) #align set.inter_empty_of_inter_sUnion_empty Set.inter_empty_of_inter_sUnion_empty theorem range_sigma_eq_iUnion_range {γ : α → Type} (f : Sigma γ → β) : range f = ⋃ a, range fun b => f ⟨a, b⟩ := Set.ext <\| by simp #align set.range_sigma_eq_Union_range Set.range_sigma_eq_iUnion_range theorem iUnion_eq_range_sigma (s : α → Set β) : ⋃ i, s i = range fun a : Σi, s i => a.2 := by simp [Set.ext_iff] #align set.Union_eq_range_sigma Set.iUnion_eq_range_sigma theorem iUnion_eq_range_psigma (s : ι → Set β) : ⋃ i, s i = range fun a : Σ'i, s i => a.2 := by simp [Set.ext_iff] #align set.Union_eq_range_psigma Set.iUnion_eq_range_psigma theorem iUnion_image_preimage_sigma_mk_eq_self {ι : Type} {σ : ι → Type} (s : Set (Sigma σ)) : ⋃ i, Sigma.mk i '' (Sigma.mk i ⁻¹' s) = s := by ext x simp only [mem_iUnion, mem_image, mem_preimage] constructor · rintro ⟨i, a, h, rfl⟩ exact h · intro h cases' x with i a exact ⟨i, a, h, rfl⟩ #align set.Union_image_preimage_sigma_mk_eq_self Set.iUnion_image_preimage_sigma_mk_eq_self theorem Sigma.univ (X : α → Type) : (Set.univ : Set (Σa, X a)) = ⋃ a, range (Sigma.mk a) := Set.ext fun x => iff_of_true trivial ⟨range (Sigma.mk x.1), Set.mem_range_self _, x.2, Sigma.eta x⟩ #align set.sigma.univ Set.Sigma.univ alias sUnion_mono := sUnion_subset_sUnion #align set.sUnion_mono Set.sUnion_mono theorem iUnion_subset_iUnion_const {s : Set α} (h : ι → ι₂) : ⋃ _ : ι, s ⊆ ⋃ _ : ι₂, s := iSup_const_mono (α := Set α) h #align set.Union_subset_Union_const Set.iUnion_subset_iUnion_const @[simp] theorem iUnion_singleton_eq_range {α β : Type} (f : α → β) : ⋃ x : α, {f x} = range f := by ext x simp [@eq_comm _ x] #align set.Union_singleton_eq_range Set.iUnion_singleton_eq_range theorem iUnion_of_singleton (α : Type) : (⋃ x, {x} : Set α) = univ := by simp [Set.ext_iff] #align set.Union_of_singleton Set.iUnion_of_singleton theorem iUnion_of_singleton_coe (s : Set α) : ⋃ i : s, ({(i : α)} : Set α) = s := by simp #align set.Union_of_singleton_coe Set.iUnion_of_singleton_coe	Mathlib/Data/Set/Lattice.lean	1,304	1,305	theorem sUnion_eq_biUnion {s : Set (Set α)} : ⋃₀s = ⋃ (i : Set α) (_ : i ∈ s), i := by	rw [← sUnion_image, image_id']
/- Copyright (c) 2019 Kevin Kappelmann. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kevin Kappelmann -/ import Mathlib.Algebra.ContinuedFractions.Basic import Mathlib.Algebra.GroupWithZero.Basic #align_import algebra.continued_fractions.translations from "leanprover-community/mathlib"@"a7e36e48519ab281320c4d192da6a7b348ce40ad" /-! # Basic Translation Lemmas Between Functions Defined for Continued Fractions ## Summary Some simple translation lemmas between the different definitions of functions defined in `Algebra.ContinuedFractions.Basic`. -/ namespace GeneralizedContinuedFraction section General /-! ### Translations Between General Access Functions Here we give some basic translations that hold by definition between the various methods that allow us to access the numerators and denominators of a continued fraction. -/ variable {α : Type*} {g : GeneralizedContinuedFraction α} {n : ℕ}	Mathlib/Algebra/ContinuedFractions/Translations.lean	35	35	theorem terminatedAt_iff_s_terminatedAt : g.TerminatedAt n ↔ g.s.TerminatedAt n := by	rfl

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