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/- Copyright (c) 2020 Bhavik Mehta. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Bhavik Mehta, Jakob von Raumer -/ import Mathlib.Data.List.Chain import Mathlib.CategoryTheory.PUnit import Mathlib.CategoryTheory.Groupoid import Mathlib.CategoryTheory.Category.ULift /-! # Connected category Define a connected category as a _nonempty_ category for which every functor to a discrete category is isomorphic to the constant functor. NB. Some authors include the empty category as connected, we do not. We instead are interested in categories with exactly one 'connected component'. We give some equivalent definitions: - A nonempty category for which every functor to a discrete category is constant on objects. See `any_functor_const_on_obj` and `Connected.of_any_functor_const_on_obj`. - A nonempty category for which every function `F` for which the presence of a morphism `f : j₁ ⟶ j₂` implies `F j₁ = F j₂` must be constant everywhere. See `constant_of_preserves_morphisms` and `Connected.of_constant_of_preserves_morphisms`. - A nonempty category for which any subset of its elements containing the default and closed under morphisms is everything. See `induct_on_objects` and `Connected.of_induct`. - A nonempty category for which every object is related under the reflexive transitive closure of the relation "there is a morphism in some direction from `j₁` to `j₂`". See `connected_zigzag` and `zigzag_connected`. - A nonempty category for which for any two objects there is a sequence of morphisms (some reversed) from one to the other. See `exists_zigzag'` and `connected_of_zigzag`. We also prove the result that the functor given by `(X × -)` preserves any connected limit. That is, any limit of shape `J` where `J` is a connected category is preserved by the functor `(X × -)`. This appears in `CategoryTheory.Limits.Connected`. -/ universe w₁ w₂ v₁ v₂ u₁ u₂ noncomputable section open CategoryTheory.Category open Opposite namespace CategoryTheory /-- A possibly empty category for which every functor to a discrete category is constant. -/ class IsPreconnected (J : Type u₁) [Category.{v₁} J] : Prop where iso_constant : ∀ {α : Type u₁} (F : J ⥤ Discrete α) (j : J), Nonempty (F ≅ (Functor.const J).obj (F.obj j)) attribute [inherit_doc IsPreconnected] IsPreconnected.iso_constant /-- We define a connected category as a _nonempty_ category for which every functor to a discrete category is constant. NB. Some authors include the empty category as connected, we do not. We instead are interested in categories with exactly one 'connected component'. This allows us to show that the functor X ⨯ - preserves connected limits. -/ @[stacks 002S] class IsConnected (J : Type u₁) [Category.{v₁} J] : Prop extends IsPreconnected J where [is_nonempty : Nonempty J] attribute [instance 100] IsConnected.is_nonempty variable {J : Type u₁} [Category.{v₁} J] variable {K : Type u₂} [Category.{v₂} K] namespace IsPreconnected.IsoConstantAux /-- Implementation detail of `isoConstant`. -/ private def liftToDiscrete {α : Type u₂} (F : J ⥤ Discrete α) : J ⥤ Discrete J where obj j := have := Nonempty.intro j Discrete.mk (Function.invFun F.obj (F.obj j)) map {j _} f := have := Nonempty.intro j ⟨⟨congr_arg (Function.invFun F.obj) (Discrete.ext (Discrete.eq_of_hom (F.map f)))⟩⟩ /-- Implementation detail of `isoConstant`. -/ private def factorThroughDiscrete {α : Type u₂} (F : J ⥤ Discrete α) : liftToDiscrete F ⋙ Discrete.functor F.obj ≅ F := NatIso.ofComponents (fun _ => eqToIso Function.apply_invFun_apply) (by aesop_cat) end IsPreconnected.IsoConstantAux /-- If `J` is connected, any functor `F : J ⥤ Discrete α` is isomorphic to the constant functor with value `F.obj j` (for any choice of `j`). -/ def isoConstant [IsPreconnected J] {α : Type u₂} (F : J ⥤ Discrete α) (j : J) : F ≅ (Functor.const J).obj (F.obj j) := (IsPreconnected.IsoConstantAux.factorThroughDiscrete F).symm ≪≫ isoWhiskerRight (IsPreconnected.iso_constant _ j).some _ ≪≫ NatIso.ofComponents (fun _ => eqToIso Function.apply_invFun_apply) (by simp) /-- If `J` is connected, any functor to a discrete category is constant on objects. The converse is given in `IsConnected.of_any_functor_const_on_obj`. -/ theorem any_functor_const_on_obj [IsPreconnected J] {α : Type u₂} (F : J ⥤ Discrete α) (j j' : J) : F.obj j = F.obj j' := by ext; exact ((isoConstant F j').hom.app j).down.1 /-- If any functor to a discrete category is constant on objects, J is connected. The converse of `any_functor_const_on_obj`. -/ theorem IsPreconnected.of_any_functor_const_on_obj (h : ∀ {α : Type u₁} (F : J ⥤ Discrete α), ∀ j j' : J, F.obj j = F.obj j') : IsPreconnected J where iso_constant := fun F j' => ⟨NatIso.ofComponents fun j => eqToIso (h F j j')⟩ instance IsPreconnected.prod [IsPreconnected J] [IsPreconnected K] : IsPreconnected (J × K) := by refine .of_any_functor_const_on_obj (fun {a} F ⟨j, k⟩ ⟨j', k'⟩ => ?_) exact (any_functor_const_on_obj (Prod.sectL J k ⋙ F) j j').trans (any_functor_const_on_obj (Prod.sectR j' K ⋙ F) k k') instance IsConnected.prod [IsConnected J] [IsConnected K] : IsConnected (J × K) where /-- If any functor to a discrete category is constant on objects, J is connected. The converse of `any_functor_const_on_obj`. -/ theorem IsConnected.of_any_functor_const_on_obj [Nonempty J] (h : ∀ {α : Type u₁} (F : J ⥤ Discrete α), ∀ j j' : J, F.obj j = F.obj j') : IsConnected J := { IsPreconnected.of_any_functor_const_on_obj h with } /-- If `J` is connected, then given any function `F` such that the presence of a morphism `j₁ ⟶ j₂` implies `F j₁ = F j₂`, we have that `F` is constant. This can be thought of as a local-to-global property. The converse is shown in `IsConnected.of_constant_of_preserves_morphisms` -/ theorem constant_of_preserves_morphisms [IsPreconnected J] {α : Type u₂} (F : J → α) (h : ∀ (j₁ j₂ : J) (_ : j₁ ⟶ j₂), F j₁ = F j₂) (j j' : J) : F j = F j' := by simpa using any_functor_const_on_obj { obj := Discrete.mk ∘ F map := fun f => eqToHom (by ext; exact h _ _ f) } j j' /-- `J` is connected if: given any function `F : J → α` which is constant for any `j₁, j₂` for which there is a morphism `j₁ ⟶ j₂`, then `F` is constant. This can be thought of as a local-to-global property. The converse of `constant_of_preserves_morphisms`. -/ theorem IsPreconnected.of_constant_of_preserves_morphisms (h : ∀ {α : Type u₁} (F : J → α), (∀ {j₁ j₂ : J} (_ : j₁ ⟶ j₂), F j₁ = F j₂) → ∀ j j' : J, F j = F j') : IsPreconnected J := IsPreconnected.of_any_functor_const_on_obj fun F => h F.obj fun f => by ext; exact Discrete.eq_of_hom (F.map f) /-- `J` is connected if: given any function `F : J → α` which is constant for any `j₁, j₂` for which there is a morphism `j₁ ⟶ j₂`, then `F` is constant. This can be thought of as a local-to-global property. The converse of `constant_of_preserves_morphisms`. -/ theorem IsConnected.of_constant_of_preserves_morphisms [Nonempty J] (h : ∀ {α : Type u₁} (F : J → α), (∀ {j₁ j₂ : J} (_ : j₁ ⟶ j₂), F j₁ = F j₂) → ∀ j j' : J, F j = F j') : IsConnected J := { IsPreconnected.of_constant_of_preserves_morphisms h with } /-- An inductive-like property for the objects of a connected category. If the set `p` is nonempty, and `p` is closed under morphisms of `J`, then `p` contains all of `J`. The converse is given in `IsConnected.of_induct`. -/ theorem induct_on_objects [IsPreconnected J] (p : Set J) {j₀ : J} (h0 : j₀ ∈ p) (h1 : ∀ {j₁ j₂ : J} (_ : j₁ ⟶ j₂), j₁ ∈ p ↔ j₂ ∈ p) (j : J) : j ∈ p := by let aux (j₁ j₂ : J) (f : j₁ ⟶ j₂) := congrArg ULift.up <\| (h1 f).eq injection constant_of_preserves_morphisms (fun k => ULift.up.{u₁} (k ∈ p)) aux j j₀ with i rwa [i] /-- If any maximal connected component containing some element j₀ of J is all of J, then J is connected. The converse of `induct_on_objects`. -/ theorem IsConnected.of_induct {j₀ : J} (h : ∀ p : Set J, j₀ ∈ p → (∀ {j₁ j₂ : J} (_ : j₁ ⟶ j₂), j₁ ∈ p ↔ j₂ ∈ p) → ∀ j : J, j ∈ p) : IsConnected J := have := Nonempty.intro j₀ IsConnected.of_constant_of_preserves_morphisms fun {α} F a => by have w := h { j \| F j = F j₀ } rfl (fun {j₁} {j₂} f => by change F j₁ = F j₀ ↔ F j₂ = F j₀ simp [a f]) intro j j' rw [w j, w j'] /-- Lifting the universe level of morphisms and objects preserves connectedness. -/ instance [hc : IsConnected J] : IsConnected (ULiftHom.{v₂} (ULift.{u₂} J)) := by apply IsConnected.of_induct · rintro p hj₀ h ⟨j⟩ let p' : Set J := {j : J \| p ⟨j⟩} have hj₀' : Classical.choice hc.is_nonempty ∈ p' := by simp only [p', (eq_self p')] exact hj₀ apply induct_on_objects p' hj₀' fun f => h ((ULiftHomULiftCategory.equiv J).functor.map f) /-- Another induction principle for `IsPreconnected J`: given a type family `Z : J → Sort` and a rule for transporting in both* directions along a morphism in `J`, we can transport an `x : Z j₀` to a point in `Z j` for any `j`. -/ theorem isPreconnected_induction [IsPreconnected J] (Z : J → Sort*) (h₁ : ∀ {j₁ j₂ : J} (_ : j₁ ⟶ j₂), Z j₁ → Z j₂) (h₂ : ∀ {j₁ j₂ : J} (_ : j₁ ⟶ j₂), Z j₂ → Z j₁) {j₀ : J} (x : Z j₀) (j : J) : Nonempty (Z j) := (induct_on_objects { j \| Nonempty (Z j) } ⟨x⟩ (fun f => ⟨by rintro ⟨y⟩; exact ⟨h₁ f y⟩, by rintro ⟨y⟩; exact ⟨h₂ f y⟩⟩) j :)	/-- If `J` and `K` are equivalent, then if `J` is preconnected then `K` is as well. -/ theorem isPreconnected_of_equivalent {K : Type u₂} [Category.{v₂} K] [IsPreconnected J] (e : J ≌ K) : IsPreconnected K where iso_constant F k := ⟨calc	Mathlib/CategoryTheory/IsConnected.lean	222	227
/- 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.Set.Finite.Basic import Mathlib.Order.Atoms import Mathlib.Order.Grade import Mathlib.Order.Nat /-! # Finsets and multisets form a graded order This file characterises atoms, coatoms and the covering relation in finsets and multisets. It also proves that they form a `ℕ`-graded order. ## Main declarations * `Multiset.instGradeMinOrder_nat`: Multisets are `ℕ`-graded * `Finset.instGradeMinOrder_nat`: Finsets are `ℕ`-graded -/ open Order variable {α : Type} namespace Multiset variable {s t : Multiset α} {a : α} @[simp] lemma covBy_cons (s : Multiset α) (a : α) : s ⋖ a ::ₘ s := ⟨lt_cons_self _ _, fun t hst hts ↦ (covBy_succ _).2 (card_lt_card hst) <\| by simpa using card_lt_card hts⟩ lemma _root_.CovBy.exists_multiset_cons (h : s ⋖ t) : ∃ a, a ::ₘ s = t := (lt_iff_cons_le.1 h.lt).imp fun _a ha ↦ ha.eq_of_not_lt <\| h.2 <\| lt_cons_self _ _ lemma covBy_iff : s ⋖ t ↔ ∃ a, a ::ₘ s = t := ⟨CovBy.exists_multiset_cons, by rintro ⟨a, rfl⟩; exact covBy_cons _ _⟩ lemma _root_.CovBy.card_multiset (h : s ⋖ t) : card s ⋖ card t := by obtain ⟨a, rfl⟩ := h.exists_multiset_cons; rw [card_cons]; exact covBy_succ _ lemma isAtom_iff : IsAtom s ↔ ∃ a, s = {a} := by simp [← bot_covBy_iff, covBy_iff, eq_comm] @[simp] lemma isAtom_singleton (a : α) : IsAtom ({a} : Multiset α) := isAtom_iff.2 ⟨_, rfl⟩ instance instGradeMinOrder : GradeMinOrder ℕ (Multiset α) where grade := card grade_strictMono := card_strictMono covBy_grade _ _ := CovBy.card_multiset isMin_grade s hs := by rw [isMin_iff_eq_bot.1 hs]; exact isMin_bot @[simp] lemma grade_eq (m : Multiset α) : grade ℕ m = card m := rfl end Multiset namespace Finset variable {s t : Finset α} {a : α} /-- Finsets form an order-connected suborder of multisets. -/ lemma ordConnected_range_val : Set.OrdConnected (Set.range val : Set <\| Multiset α) := ⟨by rintro _ _ _ ⟨s, rfl⟩ t ht; exact ⟨⟨t, Multiset.nodup_of_le ht.2 s.2⟩, rfl⟩⟩ /-- Finsets form an order-connected suborder of sets. -/ lemma ordConnected_range_coe : Set.OrdConnected (Set.range ((↑) : Finset α → Set α)) := ⟨by rintro _ _ _ ⟨s, rfl⟩ t ht; exact ⟨_, (s.finite_toSet.subset ht.2).coe_toFinset⟩⟩ @[simp] lemma val_wcovBy_val : s.1 ⩿ t.1 ↔ s ⩿ t := ordConnected_range_val.apply_wcovBy_apply_iff ⟨⟨_, val_injective⟩, val_le_iff⟩ @[simp] lemma val_covBy_val : s.1 ⋖ t.1 ↔ s ⋖ t := ordConnected_range_val.apply_covBy_apply_iff ⟨⟨_, val_injective⟩, val_le_iff⟩ @[simp] lemma coe_wcovBy_coe : (s : Set α) ⩿ t ↔ s ⩿ t := ordConnected_range_coe.apply_wcovBy_apply_iff ⟨⟨_, coe_injective⟩, coe_subset⟩ @[simp] lemma coe_covBy_coe : (s : Set α) ⋖ t ↔ s ⋖ t := ordConnected_range_coe.apply_covBy_apply_iff ⟨⟨_, coe_injective⟩, coe_subset⟩ alias ⟨_, _root_.WCovBy.finset_val⟩ := val_wcovBy_val alias ⟨_, _root_.CovBy.finset_val⟩ := val_covBy_val alias ⟨_, _root_.WCovBy.finset_coe⟩ := coe_wcovBy_coe alias ⟨_, _root_.CovBy.finset_coe⟩ := coe_covBy_coe @[simp] lemma covBy_cons (ha : a ∉ s) : s ⋖ s.cons a ha := by simp [← val_covBy_val] lemma _root_.CovBy.exists_finset_cons (h : s ⋖ t) : ∃ a, ∃ ha : a ∉ s, s.cons a ha = t := let ⟨a, ha, hst⟩ := ssubset_iff_exists_cons_subset.1 h.lt ⟨a, ha, (hst.eq_of_not_ssuperset <\| h.2 <\| ssubset_cons _).symm⟩ lemma covBy_iff_exists_cons : s ⋖ t ↔ ∃ a, ∃ ha : a ∉ s, s.cons a ha = t := ⟨CovBy.exists_finset_cons, by rintro ⟨a, ha, rfl⟩; exact covBy_cons _⟩ lemma _root_.CovBy.card_finset (h : s ⋖ t) : s.card ⋖ t.card := (val_covBy_val.2 h).card_multiset section DecidableEq variable [DecidableEq α] @[simp] lemma wcovBy_insert (s : Finset α) (a : α) : s ⩿ insert a s := by simp [← coe_wcovBy_coe] @[simp] lemma erase_wcovBy (s : Finset α) (a : α) : s.erase a ⩿ s := by simp [← coe_wcovBy_coe] lemma covBy_insert (ha : a ∉ s) : s ⋖ insert a s := (wcovBy_insert _ _).covBy_of_lt <\| ssubset_insert ha @[simp] lemma erase_covBy (ha : a ∈ s) : s.erase a ⋖ s := ⟨erase_ssubset ha, (erase_wcovBy _ _).2⟩ lemma _root_.CovBy.exists_finset_insert (h : s ⋖ t) : ∃ a ∉ s, insert a s = t := by simpa using h.exists_finset_cons lemma _root_.CovBy.exists_finset_erase (h : s ⋖ t) : ∃ a ∈ t, t.erase a = s := by simpa only [← coe_inj, coe_erase] using h.finset_coe.exists_set_sdiff_singleton lemma covBy_iff_exists_insert : s ⋖ t ↔ ∃ a ∉ s, insert a s = t := by simp only [← coe_covBy_coe, Set.covBy_iff_exists_insert, ← coe_inj, coe_insert, mem_coe] lemma covBy_iff_card_sdiff_eq_one : t ⋖ s ↔ t ⊆ s ∧ (s \ t).card = 1 := by rw [covBy_iff_exists_insert] constructor · rintro ⟨a, ha, rfl⟩ simp [] · simp_rw [card_eq_one] rintro ⟨hts, a, ha⟩ refine ⟨a, (mem_sdiff.1 <\| superset_of_eq ha <\| mem_singleton_self _).2, ?_⟩ rw [insert_eq, ← ha, sdiff_union_of_subset hts] lemma covBy_iff_exists_erase : s ⋖ t ↔ ∃ a ∈ t, t.erase a = s := by simp only [← coe_covBy_coe, Set.covBy_iff_exists_sdiff_singleton, ← coe_inj, coe_erase, mem_coe] end DecidableEq @[simp] lemma isAtom_singleton (a : α) : IsAtom ({a} : Finset α) := ⟨singleton_ne_empty a, fun _ ↦ eq_empty_of_ssubset_singleton⟩	protected lemma isAtom_iff : IsAtom s ↔ ∃ a, s = {a} := by simp [← bot_covBy_iff, covBy_iff_exists_cons, eq_comm]	Mathlib/Data/Finset/Grade.lean	134	135
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Computability.Primrec import Mathlib.Data.Nat.PSub import Mathlib.Data.PFun /-! # The partial recursive functions The partial recursive functions are defined similarly to the primitive recursive functions, but now all functions are partial, implemented using the `Part` monad, and there is an additional operation, called μ-recursion, which performs unbounded minimization: `μ f` returns the least natural number `n` for which `f n = 0`, or diverges if such `n` doesn't exist. ## Main definitions - `Nat.Partrec f`: `f` is partial recursive, for functions `f : ℕ →. ℕ` - `Partrec f`: `f` is partial recursive, for partial functions between `Primcodable` types - `Computable f`: `f` is partial recursive, for total functions between `Primcodable` types ## References * [Mario Carneiro, Formalizing computability theory via partial recursive functions][carneiro2019] -/ open List (Vector) open Encodable Denumerable Part attribute [-simp] not_forall namespace Nat section Rfind variable (p : ℕ →. Bool) private def lbp (m n : ℕ) : Prop := m = n + 1 ∧ ∀ k ≤ n, false ∈ p k private def wf_lbp (H : ∃ n, true ∈ p n ∧ ∀ k < n, (p k).Dom) : WellFounded (lbp p) := ⟨by let ⟨n, pn⟩ := H suffices ∀ m k, n ≤ k + m → Acc (lbp p) k by exact fun a => this _ _ (Nat.le_add_left _ _) intro m k kn induction' m with m IH generalizing k <;> refine ⟨_, fun y r => ?_⟩ <;> rcases r with ⟨rfl, a⟩ · injection mem_unique pn.1 (a _ kn) · exact IH _ (by rw [Nat.add_right_comm]; exact kn)⟩ variable (H : ∃ n, true ∈ p n ∧ ∀ k < n, (p k).Dom) /-- Find the smallest `n` satisfying `p n`, where all `p k` for `k < n` are defined as false. Returns a subtype. -/ def rfindX : { n // true ∈ p n ∧ ∀ m < n, false ∈ p m } := suffices ∀ k, (∀ n < k, false ∈ p n) → { n // true ∈ p n ∧ ∀ m < n, false ∈ p m } from this 0 fun _ => (Nat.not_lt_zero _).elim @WellFounded.fix _ _ (lbp p) (wf_lbp p H) (by intro m IH al have pm : (p m).Dom := by rcases H with ⟨n, h₁, h₂⟩ rcases lt_trichotomy m n with (h₃ \| h₃ \| h₃) · exact h₂ _ h₃ · rw [h₃] exact h₁.fst · injection mem_unique h₁ (al _ h₃) cases e : (p m).get pm · suffices ∀ᵉ k ≤ m, false ∈ p k from IH _ ⟨rfl, this⟩ fun n h => this _ (le_of_lt_succ h) intro n h rcases h.lt_or_eq_dec with h \| h · exact al _ h · rw [h] exact ⟨_, e⟩ · exact ⟨m, ⟨_, e⟩, al⟩) end Rfind /-- Find the smallest `n` satisfying `p n`, where all `p k` for `k < n` are defined as false. Returns a `Part`. -/ def rfind (p : ℕ →. Bool) : Part ℕ := ⟨_, fun h => (rfindX p h).1⟩ theorem rfind_spec {p : ℕ →. Bool} {n : ℕ} (h : n ∈ rfind p) : true ∈ p n := h.snd ▸ (rfindX p h.fst).2.1 theorem rfind_min {p : ℕ →. Bool} {n : ℕ} (h : n ∈ rfind p) : ∀ {m : ℕ}, m < n → false ∈ p m := @(h.snd ▸ @((rfindX p h.fst).2.2)) @[simp] theorem rfind_dom {p : ℕ →. Bool} : (rfind p).Dom ↔ ∃ n, true ∈ p n ∧ ∀ {m : ℕ}, m < n → (p m).Dom := Iff.rfl theorem rfind_dom' {p : ℕ →. Bool} : (rfind p).Dom ↔ ∃ n, true ∈ p n ∧ ∀ {m : ℕ}, m ≤ n → (p m).Dom := exists_congr fun _ => and_congr_right fun pn => ⟨fun H _ h => (Decidable.eq_or_lt_of_le h).elim (fun e => e.symm ▸ pn.fst) (H _), fun H _ h => H (le_of_lt h)⟩ @[simp] theorem mem_rfind {p : ℕ →. Bool} {n : ℕ} : n ∈ rfind p ↔ true ∈ p n ∧ ∀ {m : ℕ}, m < n → false ∈ p m := ⟨fun h => ⟨rfind_spec h, @rfind_min _ _ h⟩, fun ⟨h₁, h₂⟩ => by let ⟨m, hm⟩ := dom_iff_mem.1 <\| (@rfind_dom p).2 ⟨_, h₁, fun {m} mn => (h₂ mn).fst⟩ rcases lt_trichotomy m n with (h \| h \| h) · injection mem_unique (h₂ h) (rfind_spec hm) · rwa [← h] · injection mem_unique h₁ (rfind_min hm h)⟩ theorem rfind_min' {p : ℕ → Bool} {m : ℕ} (pm : p m) : ∃ n ∈ rfind p, n ≤ m := have : true ∈ (p : ℕ →. Bool) m := ⟨trivial, pm⟩ let ⟨n, hn⟩ := dom_iff_mem.1 <\| (@rfind_dom p).2 ⟨m, this, fun {_} _ => ⟨⟩⟩ ⟨n, hn, not_lt.1 fun h => by injection mem_unique this (rfind_min hn h)⟩ theorem rfind_zero_none (p : ℕ →. Bool) (p0 : p 0 = Part.none) : rfind p = Part.none := eq_none_iff.2 fun _ h => let ⟨_, _, h₂⟩ := rfind_dom'.1 h.fst (p0 ▸ h₂ (zero_le _) : (@Part.none Bool).Dom) /-- Find the smallest `n` satisfying `f n`, where all `f k` for `k < n` are defined as false. Returns a `Part`. -/ def rfindOpt {α} (f : ℕ → Option α) : Part α := (rfind fun n => (f n).isSome).bind fun n => f n theorem rfindOpt_spec {α} {f : ℕ → Option α} {a} (h : a ∈ rfindOpt f) : ∃ n, a ∈ f n := let ⟨n, _, h₂⟩ := mem_bind_iff.1 h ⟨n, mem_coe.1 h₂⟩ theorem rfindOpt_dom {α} {f : ℕ → Option α} : (rfindOpt f).Dom ↔ ∃ n a, a ∈ f n := ⟨fun h => (rfindOpt_spec ⟨h, rfl⟩).imp fun _ h => ⟨_, h⟩, fun h => by have h' : ∃ n, (f n).isSome := h.imp fun n => Option.isSome_iff_exists.2 have s := Nat.find_spec h' have fd : (rfind fun n => (f n).isSome).Dom := ⟨Nat.find h', by simpa using s.symm, fun _ _ => trivial⟩ refine ⟨fd, ?_⟩ have := rfind_spec (get_mem fd) simpa using this⟩ theorem rfindOpt_mono {α} {f : ℕ → Option α} (H : ∀ {a m n}, m ≤ n → a ∈ f m → a ∈ f n) {a} : a ∈ rfindOpt f ↔ ∃ n, a ∈ f n := ⟨rfindOpt_spec, fun ⟨n, h⟩ => by have h' := rfindOpt_dom.2 ⟨_, _, h⟩ obtain ⟨k, hk⟩ := rfindOpt_spec ⟨h', rfl⟩ have := (H (le_max_left _ _) h).symm.trans (H (le_max_right _ _) hk) simp at this; simp [this, get_mem]⟩ /-- `Partrec f` means that the partial function `f : ℕ → ℕ` is partially recursive. -/ inductive Partrec : (ℕ →. ℕ) → Prop \| zero : Partrec (pure 0) \| succ : Partrec succ \| left : Partrec ↑fun n : ℕ => n.unpair.1 \| right : Partrec ↑fun n : ℕ => n.unpair.2 \| pair {f g} : Partrec f → Partrec g → Partrec fun n => pair <$> f n <> g n \| comp {f g} : Partrec f → Partrec g → Partrec fun n => g n >>= f \| prec {f g} : Partrec f → Partrec g → Partrec (unpaired fun a n => n.rec (f a) fun y IH => do let i ← IH; g (pair a (pair y i))) \| rfind {f} : Partrec f → Partrec fun a => rfind fun n => (fun m => m = 0) <$> f (pair a n) namespace Partrec theorem of_eq {f g : ℕ →. ℕ} (hf : Partrec f) (H : ∀ n, f n = g n) : Partrec g := (funext H : f = g) ▸ hf theorem of_eq_tot {f : ℕ →. ℕ} {g : ℕ → ℕ} (hf : Partrec f) (H : ∀ n, g n ∈ f n) : Partrec g := hf.of_eq fun n => eq_some_iff.2 (H n) theorem of_primrec {f : ℕ → ℕ} (hf : Nat.Primrec f) : Partrec f := by induction hf with \| zero => exact zero \| succ => exact succ \| left => exact left \| right => exact right \| pair _ _ pf pg => refine (pf.pair pg).of_eq_tot fun n => ?_ simp [Seq.seq] \| comp _ _ pf pg => refine (pf.comp pg).of_eq_tot fun n => (by simp) \| prec _ _ pf pg => refine (pf.prec pg).of_eq_tot fun n => ?_ simp only [unpaired, PFun.coe_val, bind_eq_bind] induction n.unpair.2 with \| zero => simp \| succ m IH => simp only [mem_bind_iff, mem_some_iff] exact ⟨_, IH, rfl⟩ protected theorem some : Partrec some := of_primrec Primrec.id theorem none : Partrec fun _ => none := (of_primrec (Nat.Primrec.const 1)).rfind.of_eq fun _ => eq_none_iff.2 fun _ ⟨h, _⟩ => by simp at h theorem prec' {f g h} (hf : Partrec f) (hg : Partrec g) (hh : Partrec h) : Partrec fun a => (f a).bind fun n => n.rec (g a) fun y IH => do {let i ← IH; h (Nat.pair a (Nat.pair y i))} := ((prec hg hh).comp (pair Partrec.some hf)).of_eq fun a => ext fun s => by simp [Seq.seq] theorem ppred : Partrec fun n => ppred n := have : Primrec₂ fun n m => if n = Nat.succ m then 0 else 1 := (Primrec.ite (@PrimrecRel.comp _ _ _ _ _ _ _ _ _ _ Primrec.eq Primrec.fst (_root_.Primrec.succ.comp Primrec.snd)) (_root_.Primrec.const 0) (_root_.Primrec.const 1)).to₂ (of_primrec (Primrec₂.unpaired'.2 this)).rfind.of_eq fun n => by cases n <;> simp · exact eq_none_iff.2 fun a ⟨⟨m, h, _⟩, _⟩ => by simp [show 0 ≠ m.succ by intro h; injection h] at h · refine eq_some_iff.2 ?_ simp only [mem_rfind, not_true, IsEmpty.forall_iff, decide_true, mem_some_iff, false_eq_decide_iff, true_and] intro m h simp [ne_of_gt h] end Partrec end Nat /-- Partially recursive partial functions `α → σ` between `Primcodable` types -/ def Partrec {α σ} [Primcodable α] [Primcodable σ] (f : α →. σ) := Nat.Partrec fun n => Part.bind (decode (α := α) n) fun a => (f a).map encode /-- Partially recursive partial functions `α → β → σ` between `Primcodable` types -/ def Partrec₂ {α β σ} [Primcodable α] [Primcodable β] [Primcodable σ] (f : α → β →. σ) := Partrec fun p : α × β => f p.1 p.2 /-- Computable functions `α → σ` between `Primcodable` types: a function is computable if and only if it is partially recursive (as a partial function) -/ def Computable {α σ} [Primcodable α] [Primcodable σ] (f : α → σ) := Partrec (f : α →. σ) /-- Computable functions `α → β → σ` between `Primcodable` types -/ def Computable₂ {α β σ} [Primcodable α] [Primcodable β] [Primcodable σ] (f : α → β → σ) := Computable fun p : α × β => f p.1 p.2 theorem Primrec.to_comp {α σ} [Primcodable α] [Primcodable σ] {f : α → σ} (hf : Primrec f) : Computable f := (Nat.Partrec.ppred.comp (Nat.Partrec.of_primrec hf)).of_eq fun n => by simp; cases decode (α := α) n <;> simp nonrec theorem Primrec₂.to_comp {α β σ} [Primcodable α] [Primcodable β] [Primcodable σ] {f : α → β → σ} (hf : Primrec₂ f) : Computable₂ f := hf.to_comp protected theorem Computable.partrec {α σ} [Primcodable α] [Primcodable σ] {f : α → σ} (hf : Computable f) : Partrec (f : α →. σ) := hf protected theorem Computable₂.partrec₂ {α β σ} [Primcodable α] [Primcodable β] [Primcodable σ] {f : α → β → σ} (hf : Computable₂ f) : Partrec₂ fun a => (f a : β →. σ) := hf namespace Computable variable {α : Type} {β : Type} {γ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable σ] theorem of_eq {f g : α → σ} (hf : Computable f) (H : ∀ n, f n = g n) : Computable g := (funext H : f = g) ▸ hf theorem const (s : σ) : Computable fun _ : α => s := (Primrec.const _).to_comp theorem ofOption {f : α → Option β} (hf : Computable f) : Partrec fun a => (f a : Part β) := (Nat.Partrec.ppred.comp hf).of_eq fun n => by rcases decode (α := α) n with - \| a <;> simp rcases f a with - \| b <;> simp theorem to₂ {f : α × β → σ} (hf : Computable f) : Computable₂ fun a b => f (a, b) := hf.of_eq fun ⟨_, _⟩ => rfl protected theorem id : Computable (@id α) := Primrec.id.to_comp theorem fst : Computable (@Prod.fst α β) := Primrec.fst.to_comp theorem snd : Computable (@Prod.snd α β) := Primrec.snd.to_comp nonrec theorem pair {f : α → β} {g : α → γ} (hf : Computable f) (hg : Computable g) : Computable fun a => (f a, g a) := (hf.pair hg).of_eq fun n => by cases decode (α := α) n <;> simp [Seq.seq] theorem unpair : Computable Nat.unpair := Primrec.unpair.to_comp theorem succ : Computable Nat.succ := Primrec.succ.to_comp theorem pred : Computable Nat.pred := Primrec.pred.to_comp theorem nat_bodd : Computable Nat.bodd := Primrec.nat_bodd.to_comp theorem nat_div2 : Computable Nat.div2 := Primrec.nat_div2.to_comp theorem sumInl : Computable (@Sum.inl α β) := Primrec.sumInl.to_comp theorem sumInr : Computable (@Sum.inr α β) := Primrec.sumInr.to_comp @[deprecated (since := "2025-02-21")] alias sum_inl := Computable.sumInl @[deprecated (since := "2025-02-21")] alias sum_inr := Computable.sumInr theorem list_cons : Computable₂ (@List.cons α) := Primrec.list_cons.to_comp theorem list_reverse : Computable (@List.reverse α) := Primrec.list_reverse.to_comp theorem list_getElem? : Computable₂ ((·[·]? : List α → ℕ → Option α)) := Primrec.list_getElem?.to_comp @[deprecated (since := "2025-02-14")] alias list_get? := list_getElem? theorem list_append : Computable₂ ((· ++ ·) : List α → List α → List α) := Primrec.list_append.to_comp theorem list_concat : Computable₂ fun l (a : α) => l ++ [a] := Primrec.list_concat.to_comp theorem list_length : Computable (@List.length α) := Primrec.list_length.to_comp theorem vector_cons {n} : Computable₂ (@List.Vector.cons α n) := Primrec.vector_cons.to_comp theorem vector_toList {n} : Computable (@List.Vector.toList α n) := Primrec.vector_toList.to_comp theorem vector_length {n} : Computable (@List.Vector.length α n) := Primrec.vector_length.to_comp theorem vector_head {n} : Computable (@List.Vector.head α n) := Primrec.vector_head.to_comp theorem vector_tail {n} : Computable (@List.Vector.tail α n) := Primrec.vector_tail.to_comp theorem vector_get {n} : Computable₂ (@List.Vector.get α n) := Primrec.vector_get.to_comp theorem vector_ofFn' {n} : Computable (@List.Vector.ofFn α n) := Primrec.vector_ofFn'.to_comp theorem fin_app {n} : Computable₂ (@id (Fin n → σ)) := Primrec.fin_app.to_comp protected theorem encode : Computable (@encode α _) := Primrec.encode.to_comp protected theorem decode : Computable (decode (α := α)) := Primrec.decode.to_comp protected theorem ofNat (α) [Denumerable α] : Computable (ofNat α) := (Primrec.ofNat _).to_comp theorem encode_iff {f : α → σ} : (Computable fun a => encode (f a)) ↔ Computable f := Iff.rfl theorem option_some : Computable (@Option.some α) := Primrec.option_some.to_comp end Computable namespace Partrec variable {α : Type} {β : Type} {σ : Type} [Primcodable α] [Primcodable β] [Primcodable σ] open Computable theorem of_eq {f g : α →. σ} (hf : Partrec f) (H : ∀ n, f n = g n) : Partrec g := (funext H : f = g) ▸ hf theorem of_eq_tot {f : α →. σ} {g : α → σ} (hf : Partrec f) (H : ∀ n, g n ∈ f n) : Computable g := hf.of_eq fun a => eq_some_iff.2 (H a) theorem none : Partrec fun _ : α => @Part.none σ := Nat.Partrec.none.of_eq fun n => by cases decode (α := α) n <;> simp protected theorem some : Partrec (@Part.some α) := Computable.id theorem _root_.Decidable.Partrec.const' (s : Part σ) [Decidable s.Dom] : Partrec fun _ : α => s := (Computable.ofOption (const (toOption s))).of_eq fun _ => of_toOption s theorem const' (s : Part σ) : Partrec fun _ : α => s := haveI := Classical.dec s.Dom Decidable.Partrec.const' s protected theorem bind {f : α →. β} {g : α → β →. σ} (hf : Partrec f) (hg : Partrec₂ g) : Partrec fun a => (f a).bind (g a) := (hg.comp (Nat.Partrec.some.pair hf)).of_eq fun n => by simp [Seq.seq]; rcases e : decode (α := α) n with - \| a <;> simp [e, encodek] theorem map {f : α →. β} {g : α → β → σ} (hf : Partrec f) (hg : Computable₂ g) : Partrec fun a => (f a).map (g a) := by simpa [bind_some_eq_map] using Partrec.bind (g := fun a x => some (g a x)) hf hg theorem to₂ {f : α × β →. σ} (hf : Partrec f) : Partrec₂ fun a b => f (a, b) := hf.of_eq fun ⟨_, _⟩ => rfl theorem nat_rec {f : α → ℕ} {g : α →. σ} {h : α → ℕ × σ →. σ} (hf : Computable f) (hg : Partrec g) (hh : Partrec₂ h) : Partrec fun a => (f a).rec (g a) fun y IH => IH.bind fun i => h a (y, i) := (Nat.Partrec.prec' hf hg hh).of_eq fun n => by rcases e : decode (α := α) n with - \| a <;> simp [e] induction' f a with m IH <;> simp rw [IH, Part.bind_map] congr; funext s simp [encodek] nonrec theorem comp {f : β →. σ} {g : α → β} (hf : Partrec f) (hg : Computable g) : Partrec fun a => f (g a) := (hf.comp hg).of_eq fun n => by simp; rcases e : decode (α := α) n with - \| a <;> simp [e, encodek] theorem nat_iff {f : ℕ →. ℕ} : Partrec f ↔ Nat.Partrec f := by simp [Partrec, map_id'] theorem map_encode_iff {f : α →. σ} : (Partrec fun a => (f a).map encode) ↔ Partrec f := Iff.rfl end Partrec namespace Partrec₂ variable {α : Type} {β : Type} {γ : Type} {δ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable δ] [Primcodable σ] theorem unpaired {f : ℕ → ℕ →. α} : Partrec (Nat.unpaired f) ↔ Partrec₂ f := ⟨fun h => by simpa using Partrec.comp (g := fun p : ℕ × ℕ => (p.1, p.2)) h Primrec₂.pair.to_comp, fun h => h.comp Primrec.unpair.to_comp⟩ theorem unpaired' {f : ℕ → ℕ →. ℕ} : Nat.Partrec (Nat.unpaired f) ↔ Partrec₂ f := Partrec.nat_iff.symm.trans unpaired nonrec theorem comp {f : β → γ →. σ} {g : α → β} {h : α → γ} (hf : Partrec₂ f) (hg : Computable g) (hh : Computable h) : Partrec fun a => f (g a) (h a) := hf.comp (hg.pair hh) theorem comp₂ {f : γ → δ →. σ} {g : α → β → γ} {h : α → β → δ} (hf : Partrec₂ f) (hg : Computable₂ g) (hh : Computable₂ h) : Partrec₂ fun a b => f (g a b) (h a b) := hf.comp hg hh end Partrec₂ namespace Computable variable {α : Type} {β : Type} {γ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable σ] nonrec theorem comp {f : β → σ} {g : α → β} (hf : Computable f) (hg : Computable g) : Computable fun a => f (g a) := hf.comp hg theorem comp₂ {f : γ → σ} {g : α → β → γ} (hf : Computable f) (hg : Computable₂ g) : Computable₂ fun a b => f (g a b) := hf.comp hg end Computable namespace Computable₂ variable {α : Type} {β : Type} {γ : Type} {δ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable δ] [Primcodable σ] theorem mk {f : α → β → σ} (hf : Computable fun p : α × β => f p.1 p.2) : Computable₂ f := hf nonrec theorem comp {f : β → γ → σ} {g : α → β} {h : α → γ} (hf : Computable₂ f) (hg : Computable g) (hh : Computable h) : Computable fun a => f (g a) (h a) := hf.comp (hg.pair hh) theorem comp₂ {f : γ → δ → σ} {g : α → β → γ} {h : α → β → δ} (hf : Computable₂ f) (hg : Computable₂ g) (hh : Computable₂ h) : Computable₂ fun a b => f (g a b) (h a b) := hf.comp hg hh end Computable₂ namespace Partrec variable {α : Type} {σ : Type} [Primcodable α] [Primcodable σ] open Computable theorem rfind {p : α → ℕ →. Bool} (hp : Partrec₂ p) : Partrec fun a => Nat.rfind (p a) := (Nat.Partrec.rfind <\| hp.map ((Primrec.dom_bool fun b => cond b 0 1).comp Primrec.snd).to₂.to_comp).of_eq fun n => by rcases e : decode (α := α) n with - \| a <;> simp [e, Nat.rfind_zero_none, map_id'] congr; funext n simp only [map_map, Function.comp] refine map_id' (fun b => ?_) _ cases b <;> rfl theorem rfindOpt {f : α → ℕ → Option σ} (hf : Computable₂ f) : Partrec fun a => Nat.rfindOpt (f a) := (rfind (Primrec.option_isSome.to_comp.comp hf).partrec.to₂).bind (ofOption hf) theorem nat_casesOn_right {f : α → ℕ} {g : α → σ} {h : α → ℕ →. σ} (hf : Computable f) (hg : Computable g) (hh : Partrec₂ h) : Partrec fun a => (f a).casesOn (some (g a)) (h a) := (nat_rec hf hg (hh.comp fst (pred.comp <\| hf.comp fst)).to₂).of_eq fun a => by simp only [PFun.coe_val, Nat.pred_eq_sub_one]; rcases f a with - \| n <;> simp refine ext fun b => ⟨fun H => ?_, fun H => ?_⟩ · rcases mem_bind_iff.1 H with ⟨c, _, h₂⟩ exact h₂ · have : ∀ m, (Nat.rec (motive := fun _ => Part σ) (Part.some (g a)) (fun y IH => IH.bind fun _ => h a n) m).Dom := by intro m induction m <;> simp [, H.fst] exact ⟨⟨this n, H.fst⟩, H.snd⟩ theorem bind_decode₂_iff {f : α →. σ} : Partrec f ↔ Nat.Partrec fun n => Part.bind (decode₂ α n) fun a => (f a).map encode := ⟨fun hf => nat_iff.1 <\| (Computable.ofOption Primrec.decode₂.to_comp).bind <\| (map hf (Computable.encode.comp snd).to₂).comp snd, fun h => map_encode_iff.1 <\| by simpa [encodek₂] using (nat_iff.2 h).comp (@Computable.encode α _)⟩ theorem vector_mOfFn : ∀ {n} {f : Fin n → α →. σ}, (∀ i, Partrec (f i)) → Partrec fun a : α => Vector.mOfFn fun i => f i a \| 0, _, _ => const _ \| n + 1, f, hf => by simp only [Vector.mOfFn, Nat.add_eq, Nat.add_zero, pure_eq_some, bind_eq_bind] exact (hf 0).bind (Partrec.bind ((vector_mOfFn fun i => hf i.succ).comp fst) (Primrec.vector_cons.to_comp.comp (snd.comp fst) snd)) end Partrec @[simp] theorem Vector.mOfFn_part_some {α n} : ∀ f : Fin n → α, (List.Vector.mOfFn fun i => Part.some (f i)) = Part.some (List.Vector.ofFn f) := Vector.mOfFn_pure namespace Computable variable {α : Type} {β : Type} {γ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable σ] theorem option_some_iff {f : α → σ} : (Computable fun a => Option.some (f a)) ↔ Computable f := ⟨fun h => encode_iff.1 <\| Primrec.pred.to_comp.comp <\| encode_iff.2 h, option_some.comp⟩ theorem bind_decode_iff {f : α → β → Option σ} : (Computable₂ fun a n => (decode (α := β) n).bind (f a)) ↔ Computable₂ f := ⟨fun hf => Nat.Partrec.of_eq (((Partrec.nat_iff.2 (Nat.Partrec.ppred.comp <\| Nat.Partrec.of_primrec <\| Primcodable.prim (α := β))).comp snd).bind (Computable.comp hf fst).to₂.partrec₂) fun n => by simp only [decode_prod_val, decode_nat, Option.map_some', PFun.coe_val, bind_eq_bind, bind_some, Part.map_bind, map_some] cases decode (α := α) n.unpair.1 <;> simp cases decode (α := β) n.unpair.2 <;> simp, fun hf => by have : Partrec fun a : α × ℕ => (encode (decode (α := β) a.2)).casesOn (some Option.none) fun n => Part.map (f a.1) (decode (α := β) n) := Partrec.nat_casesOn_right (h := fun (a : α × ℕ) (n : ℕ) ↦ map (fun b ↦ f a.1 b) (Part.ofOption (decode n))) (Primrec.encdec.to_comp.comp snd) (const Option.none) ((ofOption (Computable.decode.comp snd)).map (hf.comp (fst.comp <\| fst.comp fst) snd).to₂) refine this.of_eq fun a => ?_ simp; cases decode (α := β) a.2 <;> simp [encodek]⟩ theorem map_decode_iff {f : α → β → σ} : (Computable₂ fun a n => (decode (α := β) n).map (f a)) ↔ Computable₂ f := by convert (bind_decode_iff (f := fun a => Option.some ∘ f a)).trans option_some_iff apply Option.map_eq_bind theorem nat_rec {f : α → ℕ} {g : α → σ} {h : α → ℕ × σ → σ} (hf : Computable f) (hg : Computable g) (hh : Computable₂ h) : Computable fun a => Nat.rec (motive := fun _ => σ) (g a) (fun y IH => h a (y, IH)) (f a) := (Partrec.nat_rec hf hg hh.partrec₂).of_eq fun a => by simp; induction f a <;> simp [] theorem nat_casesOn {f : α → ℕ} {g : α → σ} {h : α → ℕ → σ} (hf : Computable f) (hg : Computable g) (hh : Computable₂ h) : Computable fun a => Nat.casesOn (motive := fun _ => σ) (f a) (g a) (h a) := nat_rec hf hg (hh.comp fst <\| fst.comp snd).to₂ theorem cond {c : α → Bool} {f : α → σ} {g : α → σ} (hc : Computable c) (hf : Computable f) (hg : Computable g) : Computable fun a => cond (c a) (f a) (g a) := (nat_casesOn (encode_iff.2 hc) hg (hf.comp fst).to₂).of_eq fun a => by cases c a <;> rfl theorem option_casesOn {o : α → Option β} {f : α → σ} {g : α → β → σ} (ho : Computable o) (hf : Computable f) (hg : Computable₂ g) : @Computable _ σ _ _ fun a => Option.casesOn (o a) (f a) (g a) := option_some_iff.1 <\| (nat_casesOn (encode_iff.2 ho) (option_some_iff.2 hf) (map_decode_iff.2 hg)).of_eq fun a => by cases o a <;> simp [encodek] theorem option_bind {f : α → Option β} {g : α → β → Option σ} (hf : Computable f) (hg : Computable₂ g) : Computable fun a => (f a).bind (g a) := (option_casesOn hf (const Option.none) hg).of_eq fun a => by cases f a <;> rfl theorem option_map {f : α → Option β} {g : α → β → σ} (hf : Computable f) (hg : Computable₂ g) : Computable fun a => (f a).map (g a) := by convert option_bind hf (option_some.comp₂ hg) apply Option.map_eq_bind theorem option_getD {f : α → Option β} {g : α → β} (hf : Computable f) (hg : Computable g) : Computable fun a => (f a).getD (g a) := (Computable.option_casesOn hf hg (show Computable₂ fun _ b => b from Computable.snd)).of_eq fun a => by cases f a <;> rfl theorem subtype_mk {f : α → β} {p : β → Prop} [DecidablePred p] {h : ∀ a, p (f a)} (hp : PrimrecPred p) (hf : Computable f) : @Computable _ _ _ (Primcodable.subtype hp) fun a => (⟨f a, h a⟩ : Subtype p) := hf theorem sumCasesOn {f : α → β ⊕ γ} {g : α → β → σ} {h : α → γ → σ} (hf : Computable f) (hg : Computable₂ g) (hh : Computable₂ h) : @Computable _ σ _ _ fun a => Sum.casesOn (f a) (g a) (h a) := option_some_iff.1 <\| (cond (nat_bodd.comp <\| encode_iff.2 hf) (option_map (Computable.decode.comp <\| nat_div2.comp <\| encode_iff.2 hf) hh) (option_map (Computable.decode.comp <\| nat_div2.comp <\| encode_iff.2 hf) hg)).of_eq fun a => by rcases f a with b \| c <;> simp [Nat.div2_val] @[deprecated (since := "2025-02-21")] alias sum_casesOn := sumCasesOn theorem nat_strong_rec (f : α → ℕ → σ) {g : α → List σ → Option σ} (hg : Computable₂ g) (H : ∀ a n, g a ((List.range n).map (f a)) = Option.some (f a n)) : Computable₂ f := suffices Computable₂ fun a n => (List.range n).map (f a) from option_some_iff.1 <\| (list_getElem?.comp (this.comp fst (succ.comp snd)) snd).to₂.of_eq fun a => by simp [List.getElem?_range (Nat.lt_succ_self a.2)] option_some_iff.1 <\| (nat_rec snd (const (Option.some [])) (to₂ <\| option_bind (snd.comp snd) <\| to₂ <\| option_map (hg.comp (fst.comp <\| fst.comp fst) snd) (to₂ <\| list_concat.comp (snd.comp fst) snd))).of_eq fun a => by induction' a.2 with n IH; · rfl simp [IH, H, List.range_succ] theorem list_ofFn : ∀ {n} {f : Fin n → α → σ}, (∀ i, Computable (f i)) → Computable fun a => List.ofFn fun i => f i a \| 0, _, _ => by simp only [List.ofFn_zero] exact const [] \| n + 1, f, hf => by simp only [List.ofFn_succ] exact list_cons.comp (hf 0) (list_ofFn fun i => hf i.succ) theorem vector_ofFn {n} {f : Fin n → α → σ} (hf : ∀ i, Computable (f i)) : Computable fun a => List.Vector.ofFn fun i => f i a := (Partrec.vector_mOfFn hf).of_eq fun a => by simp end Computable namespace Partrec variable {α : Type} {β : Type} {γ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable σ] open Computable theorem option_some_iff {f : α →. σ} : (Partrec fun a => (f a).map Option.some) ↔ Partrec f := ⟨fun h => (Nat.Partrec.ppred.comp h).of_eq fun n => by simp [Part.bind_assoc, bind_some_eq_map], fun hf => hf.map (option_some.comp snd).to₂⟩ theorem optionCasesOn_right {o : α → Option β} {f : α → σ} {g : α → β →. σ} (ho : Computable o) (hf : Computable f) (hg : Partrec₂ g) : @Partrec _ σ _ _ fun a => Option.casesOn (o a) (Part.some (f a)) (g a) := have : Partrec fun a : α => Nat.casesOn (encode (o a)) (Part.some (f a)) (fun n => Part.bind (decode (α := β) n) (g a)) := nat_casesOn_right (h := fun a n ↦ Part.bind (ofOption (decode n)) fun b ↦ g a b) (encode_iff.2 ho) hf.partrec <\| ((@Computable.decode β _).comp snd).ofOption.bind (hg.comp (fst.comp fst) snd).to₂ this.of_eq fun a => by rcases o a with - \| b <;> simp [encodek] @[deprecated (since := "2025-02-21")] alias option_casesOn_right := optionCasesOn_right theorem sumCasesOn_right {f : α → β ⊕ γ} {g : α → β → σ} {h : α → γ →. σ} (hf : Computable f) (hg : Computable₂ g) (hh : Partrec₂ h) : @Partrec _ σ _ _ fun a => Sum.casesOn (f a) (fun b => Part.some (g a b)) (h a) := have : Partrec fun a => (Option.casesOn (Sum.casesOn (f a) (fun _ => Option.none) Option.some : Option γ) (some (Sum.casesOn (f a) (fun b => some (g a b)) fun _ => Option.none)) fun c => (h a c).map Option.some : Part (Option σ)) := optionCasesOn_right (g := fun a n => Part.map Option.some (h a n)) (sumCasesOn hf (const Option.none).to₂ (option_some.comp snd).to₂) (sumCasesOn (g := fun a n => Option.some (g a n)) hf (option_some.comp hg) (const Option.none).to₂) (option_some_iff.2 hh) option_some_iff.1 <\| this.of_eq fun a => by cases f a <;> simp theorem sumCasesOn_left {f : α → β ⊕ γ} {g : α → β →. σ} {h : α → γ → σ} (hf : Computable f)	(hg : Partrec₂ g) (hh : Computable₂ h) : @Partrec _ σ _ _ fun a => Sum.casesOn (f a) (g a) fun c => Part.some (h a c) := (sumCasesOn_right (sumCasesOn hf (sumInr.comp snd).to₂ (sumInl.comp snd).to₂) hh hg).of_eq fun a => by cases f a <;> simp @[deprecated (since := "2025-02-21")] alias sum_casesOn_left := sumCasesOn_left @[deprecated (since := "2025-02-21")] alias sum_casesOn_right := sumCasesOn_right theorem fix_aux {α σ} (f : α →. σ ⊕ α) (a : α) (b : σ) :	Mathlib/Computability/Partrec.lean	712	720
/- Copyright (c) 2021 Martin Zinkevich. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Martin Zinkevich, Rémy Degenne -/ import Mathlib.Logic.Encodable.Lattice import Mathlib.MeasureTheory.MeasurableSpace.Defs import Mathlib.Order.Disjointed /-! # Induction principles for measurable sets, related to π-systems and λ-systems. ## Main statements * The main theorem of this file is Dynkin's π-λ theorem, which appears here as an induction principle `induction_on_inter`. Suppose `s` is a collection of subsets of `α` such that the intersection of two members of `s` belongs to `s` whenever it is nonempty. Let `m` be the σ-algebra generated by `s`. In order to check that a predicate `C` holds on every member of `m`, it suffices to check that `C` holds on the members of `s` and that `C` is preserved by complementation and disjoint countable unions. * The proof of this theorem relies on the notion of `IsPiSystem`, i.e., a collection of sets which is closed under binary non-empty intersections. Note that this is a small variation around the usual notion in the literature, which often requires that a π-system is non-empty, and closed also under disjoint intersections. This variation turns out to be convenient for the formalization. * The proof of Dynkin's π-λ theorem also requires the notion of `DynkinSystem`, i.e., a collection of sets which contains the empty set, is closed under complementation and under countable union of pairwise disjoint sets. The disjointness condition is the only difference with `σ`-algebras. * `generatePiSystem g` gives the minimal π-system containing `g`. This can be considered a Galois insertion into both measurable spaces and sets. * `generateFrom_generatePiSystem_eq` proves that if you start from a collection of sets `g`, take the generated π-system, and then the generated σ-algebra, you get the same result as the σ-algebra generated from `g`. This is useful because there are connections between independent sets that are π-systems and the generated independent spaces. * `mem_generatePiSystem_iUnion_elim` and `mem_generatePiSystem_iUnion_elim'` show that any element of the π-system generated from the union of a set of π-systems can be represented as the intersection of a finite number of elements from these sets. * `piiUnionInter` defines a new π-system from a family of π-systems `π : ι → Set (Set α)` and a set of indices `S : Set ι`. `piiUnionInter π S` is the set of sets that can be written as `⋂ x ∈ t, f x` for some finset `t ∈ S` and sets `f x ∈ π x`. ## Implementation details * `IsPiSystem` is a predicate, not a type. Thus, we don't explicitly define the galois insertion, nor do we define a complete lattice. In theory, we could define a complete lattice and galois insertion on the subtype corresponding to `IsPiSystem`. -/ open MeasurableSpace Set open MeasureTheory variable {α β : Type} /-- A π-system is a collection of subsets of `α` that is closed under binary intersection of non-disjoint sets. Usually it is also required that the collection is nonempty, but we don't do that here. -/ def IsPiSystem (C : Set (Set α)) : Prop := ∀ᵉ (s ∈ C) (t ∈ C), (s ∩ t : Set α).Nonempty → s ∩ t ∈ C namespace MeasurableSpace theorem isPiSystem_measurableSet {α : Type} [MeasurableSpace α] : IsPiSystem { s : Set α \| MeasurableSet s } := fun _ hs _ ht _ => hs.inter ht end MeasurableSpace theorem IsPiSystem.singleton (S : Set α) : IsPiSystem ({S} : Set (Set α)) := by intro s h_s t h_t _ rw [Set.mem_singleton_iff.1 h_s, Set.mem_singleton_iff.1 h_t, Set.inter_self, Set.mem_singleton_iff] theorem IsPiSystem.insert_empty {S : Set (Set α)} (h_pi : IsPiSystem S) : IsPiSystem (insert ∅ S) := by intro s hs t ht hst rcases hs with hs \| hs · simp [hs] · rcases ht with ht \| ht · simp [ht] · exact Set.mem_insert_of_mem _ (h_pi s hs t ht hst) theorem IsPiSystem.insert_univ {S : Set (Set α)} (h_pi : IsPiSystem S) : IsPiSystem (insert Set.univ S) := by intro s hs t ht hst rcases hs with hs \| hs · rcases ht with ht \| ht <;> simp [hs, ht] · rcases ht with ht \| ht · simp [hs, ht] · exact Set.mem_insert_of_mem _ (h_pi s hs t ht hst) theorem IsPiSystem.comap {α β} {S : Set (Set β)} (h_pi : IsPiSystem S) (f : α → β) : IsPiSystem { s : Set α \| ∃ t ∈ S, f ⁻¹' t = s } := by rintro _ ⟨s, hs_mem, rfl⟩ _ ⟨t, ht_mem, rfl⟩ hst rw [← Set.preimage_inter] at hst ⊢ exact ⟨s ∩ t, h_pi s hs_mem t ht_mem (nonempty_of_nonempty_preimage hst), rfl⟩ theorem isPiSystem_iUnion_of_directed_le {α ι} (p : ι → Set (Set α)) (hp_pi : ∀ n, IsPiSystem (p n)) (hp_directed : Directed (· ≤ ·) p) : IsPiSystem (⋃ n, p n) := by intro t1 ht1 t2 ht2 h rw [Set.mem_iUnion] at ht1 ht2 ⊢ obtain ⟨n, ht1⟩ := ht1 obtain ⟨m, ht2⟩ := ht2 obtain ⟨k, hpnk, hpmk⟩ : ∃ k, p n ≤ p k ∧ p m ≤ p k := hp_directed n m exact ⟨k, hp_pi k t1 (hpnk ht1) t2 (hpmk ht2) h⟩ theorem isPiSystem_iUnion_of_monotone {α ι} [SemilatticeSup ι] (p : ι → Set (Set α)) (hp_pi : ∀ n, IsPiSystem (p n)) (hp_mono : Monotone p) : IsPiSystem (⋃ n, p n) := isPiSystem_iUnion_of_directed_le p hp_pi (Monotone.directed_le hp_mono) /-- Rectangles formed by π-systems form a π-system. -/ lemma IsPiSystem.prod {C : Set (Set α)} {D : Set (Set β)} (hC : IsPiSystem C) (hD : IsPiSystem D) : IsPiSystem (image2 (· ×ˢ ·) C D) := by rintro _ ⟨s₁, hs₁, t₁, ht₁, rfl⟩ _ ⟨s₂, hs₂, t₂, ht₂, rfl⟩ hst rw [prod_inter_prod] at hst ⊢; rw [prod_nonempty_iff] at hst exact mem_image2_of_mem (hC _ hs₁ _ hs₂ hst.1) (hD _ ht₁ _ ht₂ hst.2) section Order variable {ι ι' : Sort*} [LinearOrder α] theorem isPiSystem_image_Iio (s : Set α) : IsPiSystem (Iio '' s) := by rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩ - exact ⟨a ⊓ b, inf_ind a b ha hb, Iio_inter_Iio.symm⟩ theorem isPiSystem_Iio : IsPiSystem (range Iio : Set (Set α)) := @image_univ α _ Iio ▸ isPiSystem_image_Iio univ theorem isPiSystem_image_Ioi (s : Set α) : IsPiSystem (Ioi '' s) := @isPiSystem_image_Iio αᵒᵈ _ s theorem isPiSystem_Ioi : IsPiSystem (range Ioi : Set (Set α)) := @image_univ α _ Ioi ▸ isPiSystem_image_Ioi univ theorem isPiSystem_image_Iic (s : Set α) : IsPiSystem (Iic '' s) := by rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩ - exact ⟨a ⊓ b, inf_ind a b ha hb, Iic_inter_Iic.symm⟩ theorem isPiSystem_Iic : IsPiSystem (range Iic : Set (Set α)) :=	@image_univ α _ Iic ▸ isPiSystem_image_Iic univ theorem isPiSystem_image_Ici (s : Set α) : IsPiSystem (Ici '' s) :=	Mathlib/MeasureTheory/PiSystem.lean	149	151
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura, Mario Carneiro -/ import Mathlib.Algebra.Group.Action.Defs import Mathlib.Algebra.Group.End import Mathlib.Logic.Equiv.Set import Mathlib.Tactic.Common /-! # Extra lemmas about permutations This file proves miscellaneous lemmas about `Equiv.Perm`. ## TODO Most of the content of this file was moved to `Algebra.Group.End` in https://github.com/leanprover-community/mathlib4/pull/22141. It would be good to merge the remaining lemmas with other files, eg `GroupTheory.Perm.ViaEmbedding` looks like it could benefit from such a treatment (splitting into the algebra and non-algebra parts) -/ universe u v namespace Equiv variable {α : Type u} {β : Type v} namespace Perm @[simp] lemma image_inv (f : Perm α) (s : Set α) : ↑f⁻¹ '' s = f ⁻¹' s := f⁻¹.image_eq_preimage _ @[simp] lemma preimage_inv (f : Perm α) (s : Set α) : ↑f⁻¹ ⁻¹' s = f '' s := (f.image_eq_preimage _).symm end Perm section Swap variable [DecidableEq α] @[simp] theorem swap_smul_self_smul [MulAction (Perm α) β] (i j : α) (x : β) : swap i j • swap i j • x = x := by simp [smul_smul] theorem swap_smul_involutive [MulAction (Perm α) β] (i j : α) : Function.Involutive (swap i j • · : β → β) := swap_smul_self_smul i j end Swap end Equiv open Equiv Function namespace Set variable {α : Type*} {f : Perm α} {s : Set α} lemma BijOn.perm_inv (hf : BijOn f s s) : BijOn ↑(f⁻¹) s s := hf.symm f.invOn lemma MapsTo.perm_pow : MapsTo f s s → ∀ n : ℕ, MapsTo (f ^ n) s s := by simp_rw [Equiv.Perm.coe_pow]; exact MapsTo.iterate lemma SurjOn.perm_pow : SurjOn f s s → ∀ n : ℕ, SurjOn (f ^ n) s s := by simp_rw [Equiv.Perm.coe_pow]; exact SurjOn.iterate lemma BijOn.perm_pow : BijOn f s s → ∀ n : ℕ, BijOn (f ^ n) s s := by simp_rw [Equiv.Perm.coe_pow]; exact BijOn.iterate lemma BijOn.perm_zpow (hf : BijOn f s s) : ∀ n : ℤ, BijOn (f ^ n) s s \| Int.ofNat n => hf.perm_pow n \| Int.negSucc n => (hf.perm_pow (n + 1)).perm_inv end Set		Mathlib/GroupTheory/Perm/Basic.lean	541	542
/- 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.Int.DivMod import Mathlib.Logic.Embedding.Basic import Mathlib.Logic.Equiv.Set import Mathlib.Tactic.Common import Mathlib.Tactic.Attr.Register /-! # 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`. Further definitions and eliminators can be found in `Init.Data.Fin.Lemmas` ### 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.divNat i` : divides `i : Fin (m * n)` by `n`; * `Fin.modNat i` : takes the mod of `i : Fin (m * n)` by `n`; -/ assert_not_exists Monoid Finset open Fin Nat Function attribute [simp] Fin.succ_ne_zero Fin.castSucc_lt_last /-- Elimination principle for the empty set `Fin 0`, dependent version. -/ def finZeroElim {α : Fin 0 → Sort} (x : Fin 0) : α x := x.elim0 namespace Fin @[simp] theorem mk_eq_one {n a : Nat} {ha : a < n + 2} : (⟨a, ha⟩ : Fin (n + 2)) = 1 ↔ a = 1 := mk.inj_iff @[simp] theorem one_eq_mk {n a : Nat} {ha : a < n + 2} : 1 = (⟨a, ha⟩ : Fin (n + 2)) ↔ a = 1 := by simp [eq_comm] 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 _) variable {n m : ℕ} --variable {a b : Fin n} -- this really breaks stuff theorem val_injective : Function.Injective (@Fin.val n) := @Fin.eq_of_val_eq n /-- 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 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 section coe /-! ### coercions and constructions -/ theorem val_eq_val (a b : Fin n) : (a : ℕ) = b ↔ a = b := Fin.ext_iff.symm theorem ne_iff_vne (a b : Fin n) : a ≠ b ↔ a.1 ≠ b.1 := Fin.ext_iff.not theorem mk_eq_mk {a h a' h'} : @mk n a h = @mk n a' h' ↔ a = a' := Fin.ext_iff -- syntactic tautologies now /-- 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 [funext_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 [funext_iff] /-- Two elements of `Fin k` and `Fin l` are heq iff their values in `ℕ` coincide. This requires `k = l`. For the left implication without this assumption, see `val_eq_val_of_heq`. -/ 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] end coe section Order /-! ### order -/ theorem le_iff_val_le_val {a b : Fin n} : a ≤ b ↔ (a : ℕ) ≤ b := Iff.rfl /-- `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 /-- `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 theorem min_val {a : Fin n} : min (a : ℕ) n = a := by simp theorem max_val {a : Fin n} : max (a : ℕ) n = n := by simp /-- The inclusion map `Fin n → ℕ` is an embedding. -/ @[simps -fullyApplied apply] def valEmbedding : Fin n ↪ ℕ := ⟨val, val_injective⟩ @[simp] theorem equivSubtype_symm_trans_valEmbedding : equivSubtype.symm.toEmbedding.trans valEmbedding = Embedding.subtype (· < n) := rfl /-- 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) @[deprecated (since := "2025-02-24")] alias val_zero' := val_zero /-- `Fin.mk_zero` in `Lean` only applies in `Fin (n + 1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem mk_zero' (n : ℕ) [NeZero n] : (⟨0, pos_of_neZero n⟩ : Fin n) = 0 := rfl /-- 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 @[simp, norm_cast] theorem val_eq_zero_iff [NeZero n] {a : Fin n} : a.val = 0 ↔ a = 0 := by rw [Fin.ext_iff, val_zero] theorem val_ne_zero_iff [NeZero n] {a : Fin n} : a.val ≠ 0 ↔ a ≠ 0 := val_eq_zero_iff.not @[simp, norm_cast] theorem val_pos_iff [NeZero n] {a : Fin n} : 0 < a.val ↔ 0 < a := by rw [← val_fin_lt, val_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_pos_iff, Nat.pos_iff_ne_zero, val_ne_zero_iff] @[simp] lemma cast_eq_self (a : Fin n) : a.cast rfl = a := rfl @[simp] theorem cast_eq_zero {k l : ℕ} [NeZero k] [NeZero l] (h : k = l) (x : Fin k) : Fin.cast h x = 0 ↔ x = 0 := by simp [← val_eq_zero_iff] lemma cast_injective {k l : ℕ} (h : k = l) : Injective (Fin.cast h) := fun a b hab ↦ by simpa [← val_eq_val] using hab theorem last_pos' [NeZero n] : 0 < last n := n.pos_of_neZero theorem one_lt_last [NeZero n] : 1 < last (n + 1) := by rw [lt_iff_val_lt_val, val_one, val_last, Nat.lt_add_left_iff_pos, Nat.pos_iff_ne_zero] exact NeZero.ne n end Order /-! ### Coercions to `ℤ` and the `fin_omega` tactic. -/ open Int theorem coe_int_sub_eq_ite {n : Nat} (u v : Fin n) : ((u - v : Fin n) : Int) = if v ≤ u then (u - v : Int) else (u - v : Int) + n := by rw [Fin.sub_def] split · rw [natCast_emod, Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega · rw [natCast_emod, Int.emod_eq_of_lt] <;> omega theorem coe_int_sub_eq_mod {n : Nat} (u v : Fin n) : ((u - v : Fin n) : Int) = ((u : Int) - (v : Int)) % n := by rw [coe_int_sub_eq_ite] split · rw [Int.emod_eq_of_lt] <;> omega · rw [Int.emod_eq_add_self_emod, Int.emod_eq_of_lt] <;> omega theorem coe_int_add_eq_ite {n : Nat} (u v : Fin n) : ((u + v : Fin n) : Int) = if (u + v : ℕ) < n then (u + v : Int) else (u + v : Int) - n := by rw [Fin.add_def] split · rw [natCast_emod, Int.emod_eq_of_lt] <;> omega · rw [natCast_emod, Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega theorem coe_int_add_eq_mod {n : Nat} (u v : Fin n) : ((u + v : Fin n) : Int) = ((u : Int) + (v : Int)) % n := by rw [coe_int_add_eq_ite] split · rw [Int.emod_eq_of_lt] <;> omega · rw [Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega -- Write `a + b` as `if (a + b : ℕ) < n then (a + b : ℤ) else (a + b : ℤ) - n` and -- similarly `a - b` as `if (b : ℕ) ≤ a then (a - b : ℤ) else (a - b : ℤ) + n`. attribute [fin_omega] coe_int_sub_eq_ite coe_int_add_eq_ite -- Rewrite inequalities in `Fin` to inequalities in `ℕ` attribute [fin_omega] Fin.lt_iff_val_lt_val Fin.le_iff_val_le_val -- Rewrite `1 : Fin (n + 2)` to `1 : ℤ` attribute [fin_omega] val_one /-- Preprocessor for `omega` to handle inequalities in `Fin`. Note that this involves a lot of case splitting, so may be slow. -/ -- Further adjustment to the simp set can probably make this more powerful. -- Please experiment and PR updates! macro "fin_omega" : tactic => `(tactic\| { try simp only [fin_omega, ← Int.ofNat_lt, ← Int.ofNat_le] at * omega }) section Add /-! ### addition, numerals, and coercion from Nat -/ @[simp] theorem val_one' (n : ℕ) [NeZero n] : ((1 : Fin n) : ℕ) = 1 % n := rfl @[deprecated val_one' (since := "2025-03-10")] theorem val_one'' {n : ℕ} : ((1 : Fin (n + 1)) : ℕ) = 1 % (n + 1) := rfl 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 [Fin.nontrivial, not_nontrivial, Nat.succ_le_iff] section Monoid 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 instance instNatCast [NeZero n] : NatCast (Fin n) where natCast i := Fin.ofNat' n i lemma natCast_def [NeZero n] (a : ℕ) : (a : Fin n) = ⟨a % n, mod_lt _ n.pos_of_neZero⟩ := rfl end Monoid 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)] theorem val_add_eq_of_add_lt {n : ℕ} {a b : Fin n} (huv : a.val + b.val < n) : (a + b).val = a.val + b.val := by rw [val_add] simp [Nat.mod_eq_of_lt huv] lemma intCast_val_sub_eq_sub_add_ite {n : ℕ} (a b : Fin n) : ((a - b).val : ℤ) = a.val - b.val + if b ≤ a then 0 else n := by split <;> fin_omega lemma one_le_of_ne_zero {n : ℕ} [NeZero n] {k : Fin n} (hk : k ≠ 0) : 1 ≤ k := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (NeZero.ne n) cases n with \| zero => simp only [Nat.reduceAdd, Fin.isValue, Fin.zero_le] \| succ n => rwa [Fin.le_iff_val_le_val, Fin.val_one, Nat.one_le_iff_ne_zero, val_ne_zero_iff] lemma val_sub_one_of_ne_zero [NeZero n] {i : Fin n} (hi : i ≠ 0) : (i - 1).val = i - 1 := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (NeZero.ne n) rw [Fin.sub_val_of_le (one_le_of_ne_zero hi), Fin.val_one', Nat.mod_eq_of_lt (Nat.succ_le_iff.mpr (nontrivial_iff_two_le.mp <\| nontrivial_of_ne i 0 hi))] section OfNatCoe @[simp] theorem ofNat'_eq_cast (n : ℕ) [NeZero n] (a : ℕ) : Fin.ofNat' n a = a := rfl @[simp] lemma val_natCast (a n : ℕ) [NeZero n] : (a : Fin n).val = a % n := rfl /-- 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 /-- If `n` is non-zero, converting the value of a `Fin n` to `Fin n` results in the same value. -/ @[simp, norm_cast] theorem cast_val_eq_self {n : ℕ} [NeZero n] (a : Fin n) : (a.val : Fin n) = a := Fin.ext <\| val_cast_of_lt a.isLt -- This is a special case of `CharP.cast_eq_zero` that doesn't require typeclass search @[simp high] lemma natCast_self (n : ℕ) [NeZero n] : (n : Fin n) = 0 := by ext; simp @[simp] lemma natCast_eq_zero {a n : ℕ} [NeZero n] : (a : Fin n) = 0 ↔ n ∣ a := by simp [Fin.ext_iff, Nat.dvd_iff_mod_eq_zero] @[simp] theorem natCast_eq_last (n) : (n : Fin (n + 1)) = Fin.last n := by ext; simp theorem le_val_last (i : Fin (n + 1)) : i ≤ n := by rw [Fin.natCast_eq_last] exact Fin.le_last i 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 end Add section Succ /-! ### succ and casts into larger Fin types -/ lemma succ_injective (n : ℕ) : Injective (@Fin.succ n) := fun a b ↦ by simp [Fin.ext_iff] /-- `Fin.succ` as an `Embedding` -/ def succEmb (n : ℕ) : Fin n ↪ Fin (n + 1) where toFun := succ inj' := succ_injective _ @[simp] theorem coe_succEmb : ⇑(succEmb n) = Fin.succ := rfl @[deprecated (since := "2025-04-12")] alias val_succEmb := coe_succEmb @[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⟩)⟩ theorem exists_succ_eq_of_ne_zero {x : Fin (n + 1)} (h : x ≠ 0) : ∃ y, Fin.succ y = x := exists_succ_eq.mpr h @[simp] theorem succ_zero_eq_one' [NeZero n] : Fin.succ (0 : Fin n) = 1 := by cases n · exact (NeZero.ne 0 rfl).elim · rfl theorem one_pos' [NeZero n] : (0 : Fin (n + 1)) < 1 := succ_zero_eq_one' (n := n) ▸ succ_pos _ theorem zero_ne_one' [NeZero n] : (0 : Fin (n + 1)) ≠ 1 := Fin.ne_of_lt one_pos' /-- The `Fin.succ_one_eq_two` in `Lean` only applies in `Fin (n+2)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem succ_one_eq_two' [NeZero n] : Fin.succ (1 : Fin (n + 1)) = 2 := by cases n · exact (NeZero.ne 0 rfl).elim · rfl -- Version of `succ_one_eq_two` to be used by `dsimp`. -- Note the `'` swapped around due to a move to std4. /-- The `Fin.le_zero_iff` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem le_zero_iff' {n : ℕ} [NeZero n] {k : Fin n} : k ≤ 0 ↔ k = 0 := ⟨fun h => Fin.ext <\| by rw [Nat.eq_zero_of_le_zero h]; rfl, by rintro rfl; exact Nat.le_refl _⟩ -- TODO: Move to Batteries @[simp] lemma castLE_inj {hmn : m ≤ n} {a b : Fin m} : castLE hmn a = castLE hmn b ↔ a = b := by simp [Fin.ext_iff] @[simp] lemma castAdd_inj {a b : Fin m} : castAdd n a = castAdd n b ↔ a = b := by simp [Fin.ext_iff] attribute [simp] castSucc_inj lemma castLE_injective (hmn : m ≤ n) : Injective (castLE hmn) := fun _ _ hab ↦ Fin.ext (congr_arg val hab :) lemma castAdd_injective (m n : ℕ) : Injective (@Fin.castAdd m n) := castLE_injective _ lemma castSucc_injective (n : ℕ) : Injective (@Fin.castSucc n) := castAdd_injective _ _ /-- `Fin.castLE` as an `Embedding`, `castLEEmb h i` embeds `i` into a larger `Fin` type. -/ @[simps apply] def castLEEmb (h : n ≤ m) : Fin n ↪ Fin m where toFun := castLE h inj' := castLE_injective _ @[simp, norm_cast] lemma coe_castLEEmb {m n} (hmn : m ≤ n) : castLEEmb hmn = castLE hmn := rfl /- The next proof can be golfed a lot using `Fintype.card`. It is written this way to define `ENat.card` and `Nat.card` without a `Fintype` dependency (not done yet). -/ lemma nonempty_embedding_iff : Nonempty (Fin n ↪ Fin m) ↔ n ≤ m := by refine ⟨fun h ↦ ?_, fun h ↦ ⟨castLEEmb h⟩⟩ induction n generalizing m with \| zero => exact m.zero_le \| succ n ihn => obtain ⟨e⟩ := h rcases exists_eq_succ_of_ne_zero (pos_iff_nonempty.2 (Nonempty.map e inferInstance)).ne' with ⟨m, rfl⟩ refine Nat.succ_le_succ <\| ihn ⟨?_⟩ refine ⟨fun i ↦ (e.setValue 0 0 i.succ).pred (mt e.setValue_eq_iff.1 i.succ_ne_zero), fun i j h ↦ ?_⟩ simpa only [pred_inj, EmbeddingLike.apply_eq_iff_eq, succ_inj] using h lemma equiv_iff_eq : Nonempty (Fin m ≃ Fin n) ↔ m = n := ⟨fun ⟨e⟩ ↦ le_antisymm (nonempty_embedding_iff.1 ⟨e⟩) (nonempty_embedding_iff.1 ⟨e.symm⟩), fun h ↦ h ▸ ⟨.refl _⟩⟩ @[simp] lemma castLE_castSucc {n m} (i : Fin n) (h : n + 1 ≤ m) : i.castSucc.castLE h = i.castLE (Nat.le_of_succ_le h) := rfl @[simp] lemma castLE_comp_castSucc {n m} (h : n + 1 ≤ m) : Fin.castLE h ∘ Fin.castSucc = Fin.castLE (Nat.le_of_succ_le h) := rfl @[simp] lemma castLE_rfl (n : ℕ) : Fin.castLE (le_refl n) = id := rfl @[simp] theorem range_castLE {n k : ℕ} (h : n ≤ k) : Set.range (castLE h) = { i : Fin k \| (i : ℕ) < n } := Set.ext fun x => ⟨fun ⟨y, hy⟩ => hy ▸ y.2, fun hx => ⟨⟨x, hx⟩, rfl⟩⟩ @[simp] theorem coe_of_injective_castLE_symm {n k : ℕ} (h : n ≤ k) (i : Fin k) (hi) : ((Equiv.ofInjective _ (castLE_injective h)).symm ⟨i, hi⟩ : ℕ) = i := by rw [← coe_castLE h] exact congr_arg Fin.val (Equiv.apply_ofInjective_symm _ _) theorem leftInverse_cast (eq : n = m) : LeftInverse (Fin.cast eq.symm) (Fin.cast eq) := fun _ => rfl theorem rightInverse_cast (eq : n = m) : RightInverse (Fin.cast eq.symm) (Fin.cast eq) := fun _ => rfl @[simp] theorem cast_inj (eq : n = m) {a b : Fin n} : a.cast eq = b.cast eq ↔ a = b := by simp [← val_inj] @[simp] theorem cast_lt_cast (eq : n = m) {a b : Fin n} : a.cast eq < b.cast eq ↔ a < b := Iff.rfl @[simp] theorem cast_le_cast (eq : n = m) {a b : Fin n} : a.cast eq ≤ b.cast eq ↔ a ≤ b := Iff.rfl /-- The 'identity' equivalence between `Fin m` and `Fin n` when `m = n`. -/ @[simps] def _root_.finCongr (eq : n = m) : Fin n ≃ Fin m where toFun := Fin.cast eq invFun := Fin.cast eq.symm left_inv := leftInverse_cast eq right_inv := rightInverse_cast eq @[simp] lemma _root_.finCongr_apply_mk (h : m = n) (k : ℕ) (hk : k < m) : finCongr h ⟨k, hk⟩ = ⟨k, h ▸ hk⟩ := rfl @[simp] lemma _root_.finCongr_refl (h : n = n := rfl) : finCongr h = Equiv.refl (Fin n) := by ext; simp @[simp] lemma _root_.finCongr_symm (h : m = n) : (finCongr h).symm = finCongr h.symm := rfl @[simp] lemma _root_.finCongr_apply_coe (h : m = n) (k : Fin m) : (finCongr h k : ℕ) = k := rfl lemma _root_.finCongr_symm_apply_coe (h : m = n) (k : Fin n) : ((finCongr h).symm k : ℕ) = k := rfl /-- While in many cases `finCongr` is better than `Equiv.cast`/`cast`, sometimes we want to apply a generic theorem about `cast`. -/ lemma _root_.finCongr_eq_equivCast (h : n = m) : finCongr h = .cast (h ▸ rfl) := by subst h; simp /-- While in many cases `Fin.cast` is better than `Equiv.cast`/`cast`, sometimes we want to apply a generic theorem about `cast`. -/ theorem cast_eq_cast (h : n = m) : (Fin.cast h : Fin n → Fin m) = _root_.cast (h ▸ rfl) := by subst h ext rfl /-- `Fin.castAdd` as an `Embedding`, `castAddEmb m i` embeds `i : Fin n` in `Fin (n+m)`. See also `Fin.natAddEmb` and `Fin.addNatEmb`. -/ def castAddEmb (m) : Fin n ↪ Fin (n + m) := castLEEmb (le_add_right n m) @[simp] lemma coe_castAddEmb (m) : (castAddEmb m : Fin n → Fin (n + m)) = castAdd m := rfl lemma castAddEmb_apply (m) (i : Fin n) : castAddEmb m i = castAdd m i := rfl /-- `Fin.castSucc` as an `Embedding`, `castSuccEmb i` embeds `i : Fin n` in `Fin (n+1)`. -/ def castSuccEmb : Fin n ↪ Fin (n + 1) := castAddEmb _ @[simp, norm_cast] lemma coe_castSuccEmb : (castSuccEmb : Fin n → Fin (n + 1)) = Fin.castSucc := rfl lemma castSuccEmb_apply (i : Fin n) : castSuccEmb i = i.castSucc := rfl theorem castSucc_le_succ {n} (i : Fin n) : i.castSucc ≤ i.succ := Nat.le_succ i @[simp] theorem castSucc_le_castSucc_iff {a b : Fin n} : castSucc a ≤ castSucc b ↔ a ≤ b := .rfl @[simp] theorem succ_le_castSucc_iff {a b : Fin n} : succ a ≤ castSucc b ↔ a < b := by rw [le_castSucc_iff, succ_lt_succ_iff] @[simp] theorem castSucc_lt_succ_iff {a b : Fin n} : castSucc a < succ b ↔ a ≤ b := by rw [castSucc_lt_iff_succ_le, succ_le_succ_iff] theorem le_of_castSucc_lt_of_succ_lt {a b : Fin (n + 1)} {i : Fin n} (hl : castSucc i < a) (hu : b < succ i) : b < a := by simp [Fin.lt_def, -val_fin_lt] at *; omega theorem castSucc_lt_or_lt_succ (p : Fin (n + 1)) (i : Fin n) : castSucc i < p ∨ p < i.succ := by simp [Fin.lt_def, -val_fin_lt]; omega theorem succ_le_or_le_castSucc (p : Fin (n + 1)) (i : Fin n) : succ i ≤ p ∨ p ≤ i.castSucc := by rw [le_castSucc_iff, ← castSucc_lt_iff_succ_le] exact p.castSucc_lt_or_lt_succ i theorem eq_castSucc_of_ne_last {x : Fin (n + 1)} (h : x ≠ (last _)) : ∃ y, Fin.castSucc y = x := exists_castSucc_eq.mpr h @[deprecated (since := "2025-02-06")] alias exists_castSucc_eq_of_ne_last := eq_castSucc_of_ne_last theorem forall_fin_succ' {P : Fin (n + 1) → Prop} : (∀ i, P i) ↔ (∀ i : Fin n, P i.castSucc) ∧ P (.last _) := ⟨fun H => ⟨fun _ => H _, H _⟩, fun ⟨H0, H1⟩ i => Fin.lastCases H1 H0 i⟩ -- to match `Fin.eq_zero_or_eq_succ` theorem eq_castSucc_or_eq_last {n : Nat} (i : Fin (n + 1)) : (∃ j : Fin n, i = j.castSucc) ∨ i = last n := i.lastCases (Or.inr rfl) (Or.inl ⟨·, rfl⟩) @[simp] theorem castSucc_ne_last {n : ℕ} (i : Fin n) : i.castSucc ≠ .last n := Fin.ne_of_lt i.castSucc_lt_last theorem exists_fin_succ' {P : Fin (n + 1) → Prop} : (∃ i, P i) ↔ (∃ i : Fin n, P i.castSucc) ∨ P (.last _) := ⟨fun ⟨i, h⟩ => Fin.lastCases Or.inr (fun i hi => Or.inl ⟨i, hi⟩) i h, fun h => h.elim (fun ⟨i, hi⟩ => ⟨i.castSucc, hi⟩) (fun h => ⟨.last _, h⟩)⟩ /-- The `Fin.castSucc_zero` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem castSucc_zero' [NeZero n] : castSucc (0 : Fin n) = 0 := rfl @[simp] theorem castSucc_pos_iff [NeZero n] {i : Fin n} : 0 < castSucc i ↔ 0 < i := by simp [← val_pos_iff] /-- `castSucc i` is positive when `i` is positive. The `Fin.castSucc_pos` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ alias ⟨_, castSucc_pos'⟩ := castSucc_pos_iff /-- The `Fin.castSucc_eq_zero_iff` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem castSucc_eq_zero_iff' [NeZero n] (a : Fin n) : castSucc a = 0 ↔ a = 0 := Fin.ext_iff.trans <\| (Fin.ext_iff.trans <\| by simp).symm /-- The `Fin.castSucc_ne_zero_iff` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ theorem castSucc_ne_zero_iff' [NeZero n] (a : Fin n) : castSucc a ≠ 0 ↔ a ≠ 0 := not_iff_not.mpr <\| castSucc_eq_zero_iff' a theorem castSucc_ne_zero_of_lt {p i : Fin n} (h : p < i) : castSucc i ≠ 0 := by cases n · exact i.elim0 · rw [castSucc_ne_zero_iff', Ne, Fin.ext_iff] exact ((zero_le _).trans_lt h).ne' theorem succ_ne_last_iff (a : Fin (n + 1)) : succ a ≠ last (n + 1) ↔ a ≠ last n := not_iff_not.mpr <\| succ_eq_last_succ theorem succ_ne_last_of_lt {p i : Fin n} (h : i < p) : succ i ≠ last n := by cases n · exact i.elim0 · rw [succ_ne_last_iff, Ne, Fin.ext_iff] exact ((le_last _).trans_lt' h).ne @[norm_cast, simp] theorem coe_eq_castSucc {a : Fin n} : (a : Fin (n + 1)) = castSucc a := by ext exact val_cast_of_lt (Nat.lt.step a.is_lt) theorem coe_succ_lt_iff_lt {n : ℕ} {j k : Fin n} : (j : Fin <\| n + 1) < k ↔ j < k := by simp only [coe_eq_castSucc, castSucc_lt_castSucc_iff] @[simp] theorem range_castSucc {n : ℕ} : Set.range (castSucc : Fin n → Fin n.succ) = ({ i \| (i : ℕ) < n } : Set (Fin n.succ)) := range_castLE (by omega) @[simp] theorem coe_of_injective_castSucc_symm {n : ℕ} (i : Fin n.succ) (hi) : ((Equiv.ofInjective castSucc (castSucc_injective _)).symm ⟨i, hi⟩ : ℕ) = i := by rw [← coe_castSucc] exact congr_arg val (Equiv.apply_ofInjective_symm _ _) /-- `Fin.addNat` as an `Embedding`, `addNatEmb m i` adds `m` to `i`, generalizes `Fin.succ`. -/ @[simps! apply] def addNatEmb (m) : Fin n ↪ Fin (n + m) where toFun := (addNat · m) inj' a b := by simp [Fin.ext_iff] /-- `Fin.natAdd` as an `Embedding`, `natAddEmb n i` adds `n` to `i` "on the left". -/ @[simps! apply] def natAddEmb (n) {m} : Fin m ↪ Fin (n + m) where toFun := natAdd n inj' a b := by simp [Fin.ext_iff] theorem castSucc_castAdd (i : Fin n) : castSucc (castAdd m i) = castAdd (m + 1) i := rfl theorem castSucc_natAdd (i : Fin m) : castSucc (natAdd n i) = natAdd n (castSucc i) := rfl theorem succ_castAdd (i : Fin n) : succ (castAdd m i) = if h : i.succ = last _ then natAdd n (0 : Fin (m + 1)) else castAdd (m + 1) ⟨i.1 + 1, lt_of_le_of_ne i.2 (Fin.val_ne_iff.mpr h)⟩ := by split_ifs with h exacts [Fin.ext (congr_arg Fin.val h :), rfl] theorem succ_natAdd (i : Fin m) : succ (natAdd n i) = natAdd n (succ i) := rfl end Succ section Pred /-! ### pred -/ theorem pred_one' [NeZero n] (h := (zero_ne_one' (n := n)).symm) : Fin.pred (1 : Fin (n + 1)) h = 0 := by simp_rw [Fin.ext_iff, coe_pred, val_one', val_zero, Nat.sub_eq_zero_iff_le, Nat.mod_le] theorem pred_last (h := Fin.ext_iff.not.2 last_pos'.ne') : pred (last (n + 1)) h = last n := by simp_rw [← succ_last, pred_succ] theorem pred_lt_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : pred i hi < j ↔ i < succ j := by rw [← succ_lt_succ_iff, succ_pred] theorem lt_pred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : j < pred i hi ↔ succ j < i := by rw [← succ_lt_succ_iff, succ_pred] theorem pred_le_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : pred i hi ≤ j ↔ i ≤ succ j := by rw [← succ_le_succ_iff, succ_pred] theorem le_pred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : j ≤ pred i hi ↔ succ j ≤ i := by rw [← succ_le_succ_iff, succ_pred] theorem castSucc_pred_eq_pred_castSucc {a : Fin (n + 1)} (ha : a ≠ 0) (ha' := castSucc_ne_zero_iff.mpr ha) : (a.pred ha).castSucc = (castSucc a).pred ha' := rfl theorem castSucc_pred_add_one_eq {a : Fin (n + 1)} (ha : a ≠ 0) : (a.pred ha).castSucc + 1 = a := by cases a using cases · exact (ha rfl).elim · rw [pred_succ, coeSucc_eq_succ] theorem le_pred_castSucc_iff {a b : Fin (n + 1)} (ha : castSucc a ≠ 0) : b ≤ (castSucc a).pred ha ↔ b < a := by rw [le_pred_iff, succ_le_castSucc_iff] theorem pred_castSucc_lt_iff {a b : Fin (n + 1)} (ha : castSucc a ≠ 0) : (castSucc a).pred ha < b ↔ a ≤ b := by rw [pred_lt_iff, castSucc_lt_succ_iff] theorem pred_castSucc_lt {a : Fin (n + 1)} (ha : castSucc a ≠ 0) : (castSucc a).pred ha < a := by rw [pred_castSucc_lt_iff, le_def] theorem le_castSucc_pred_iff {a b : Fin (n + 1)} (ha : a ≠ 0) : b ≤ castSucc (a.pred ha) ↔ b < a := by rw [castSucc_pred_eq_pred_castSucc, le_pred_castSucc_iff] theorem castSucc_pred_lt_iff {a b : Fin (n + 1)} (ha : a ≠ 0) : castSucc (a.pred ha) < b ↔ a ≤ b := by rw [castSucc_pred_eq_pred_castSucc, pred_castSucc_lt_iff] theorem castSucc_pred_lt {a : Fin (n + 1)} (ha : a ≠ 0) : castSucc (a.pred ha) < a := by rw [castSucc_pred_lt_iff, le_def] end Pred section CastPred /-- `castPred i` sends `i : Fin (n + 1)` to `Fin n` as long as i ≠ last n. -/ @[inline] def castPred (i : Fin (n + 1)) (h : i ≠ last n) : Fin n := castLT i (val_lt_last h) @[simp] lemma castLT_eq_castPred (i : Fin (n + 1)) (h : i < last _) (h' := Fin.ext_iff.not.2 h.ne) : castLT i h = castPred i h' := rfl @[simp] lemma coe_castPred (i : Fin (n + 1)) (h : i ≠ last _) : (castPred i h : ℕ) = i := rfl @[simp] theorem castPred_castSucc {i : Fin n} (h' := Fin.ext_iff.not.2 (castSucc_lt_last i).ne) : castPred (castSucc i) h' = i := rfl @[simp] theorem castSucc_castPred (i : Fin (n + 1)) (h : i ≠ last n) : castSucc (i.castPred h) = i := by rcases exists_castSucc_eq.mpr h with ⟨y, rfl⟩ rw [castPred_castSucc] theorem castPred_eq_iff_eq_castSucc (i : Fin (n + 1)) (hi : i ≠ last _) (j : Fin n) : castPred i hi = j ↔ i = castSucc j := ⟨fun h => by rw [← h, castSucc_castPred], fun h => by simp_rw [h, castPred_castSucc]⟩ @[simp] theorem castPred_mk (i : ℕ) (h₁ : i < n) (h₂ := h₁.trans (Nat.lt_succ_self _)) (h₃ : ⟨i, h₂⟩ ≠ last _ := (ne_iff_vne _ _).mpr (val_last _ ▸ h₁.ne)) : castPred ⟨i, h₂⟩ h₃ = ⟨i, h₁⟩ := rfl @[simp] theorem castPred_le_castPred_iff {i j : Fin (n + 1)} {hi : i ≠ last n} {hj : j ≠ last n} : castPred i hi ≤ castPred j hj ↔ i ≤ j := Iff.rfl /-- A version of the right-to-left implication of `castPred_le_castPred_iff` that deduces `i ≠ last n` from `i ≤ j` and `j ≠ last n`. -/ @[gcongr] theorem castPred_le_castPred {i j : Fin (n + 1)} (h : i ≤ j) (hj : j ≠ last n) : castPred i (by rw [← lt_last_iff_ne_last] at hj ⊢; exact Fin.lt_of_le_of_lt h hj) ≤ castPred j hj := h @[simp] theorem castPred_lt_castPred_iff {i j : Fin (n + 1)} {hi : i ≠ last n} {hj : j ≠ last n} : castPred i hi < castPred j hj ↔ i < j := Iff.rfl /-- A version of the right-to-left implication of `castPred_lt_castPred_iff` that deduces `i ≠ last n` from `i < j`. -/ @[gcongr] theorem castPred_lt_castPred {i j : Fin (n + 1)} (h : i < j) (hj : j ≠ last n) : castPred i (ne_last_of_lt h) < castPred j hj := h theorem castPred_lt_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) : castPred i hi < j ↔ i < castSucc j := by rw [← castSucc_lt_castSucc_iff, castSucc_castPred] theorem lt_castPred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) : j < castPred i hi ↔ castSucc j < i := by rw [← castSucc_lt_castSucc_iff, castSucc_castPred] theorem castPred_le_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) : castPred i hi ≤ j ↔ i ≤ castSucc j := by rw [← castSucc_le_castSucc_iff, castSucc_castPred] theorem le_castPred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) : j ≤ castPred i hi ↔ castSucc j ≤ i := by rw [← castSucc_le_castSucc_iff, castSucc_castPred] @[simp] theorem castPred_inj {i j : Fin (n + 1)} {hi : i ≠ last n} {hj : j ≠ last n} : castPred i hi = castPred j hj ↔ i = j := by simp_rw [Fin.ext_iff, le_antisymm_iff, ← le_def, castPred_le_castPred_iff] theorem castPred_zero' [NeZero n] (h := Fin.ext_iff.not.2 last_pos'.ne) : castPred (0 : Fin (n + 1)) h = 0 := rfl theorem castPred_zero (h := Fin.ext_iff.not.2 last_pos.ne) : castPred (0 : Fin (n + 2)) h = 0 := rfl @[simp] theorem castPred_eq_zero [NeZero n] {i : Fin (n + 1)} (h : i ≠ last n) : Fin.castPred i h = 0 ↔ i = 0 := by rw [← castPred_zero', castPred_inj] @[simp] theorem castPred_one [NeZero n] (h := Fin.ext_iff.not.2 one_lt_last.ne) : castPred (1 : Fin (n + 2)) h = 1 := by cases n · exact subsingleton_one.elim _ 1 · rfl theorem succ_castPred_eq_castPred_succ {a : Fin (n + 1)} (ha : a ≠ last n) (ha' := a.succ_ne_last_iff.mpr ha) : (a.castPred ha).succ = (succ a).castPred ha' := rfl theorem succ_castPred_eq_add_one {a : Fin (n + 1)} (ha : a ≠ last n) : (a.castPred ha).succ = a + 1 := by cases a using lastCases · exact (ha rfl).elim · rw [castPred_castSucc, coeSucc_eq_succ] theorem castpred_succ_le_iff {a b : Fin (n + 1)} (ha : succ a ≠ last (n + 1)) : (succ a).castPred ha ≤ b ↔ a < b := by rw [castPred_le_iff, succ_le_castSucc_iff] theorem lt_castPred_succ_iff {a b : Fin (n + 1)} (ha : succ a ≠ last (n + 1)) : b < (succ a).castPred ha ↔ b ≤ a := by rw [lt_castPred_iff, castSucc_lt_succ_iff] theorem lt_castPred_succ {a : Fin (n + 1)} (ha : succ a ≠ last (n + 1)) : a < (succ a).castPred ha := by rw [lt_castPred_succ_iff, le_def] theorem succ_castPred_le_iff {a b : Fin (n + 1)} (ha : a ≠ last n) : succ (a.castPred ha) ≤ b ↔ a < b := by rw [succ_castPred_eq_castPred_succ ha, castpred_succ_le_iff] theorem lt_succ_castPred_iff {a b : Fin (n + 1)} (ha : a ≠ last n) : b < succ (a.castPred ha) ↔ b ≤ a := by rw [succ_castPred_eq_castPred_succ ha, lt_castPred_succ_iff] theorem lt_succ_castPred {a : Fin (n + 1)} (ha : a ≠ last n) : a < succ (a.castPred ha) := by rw [lt_succ_castPred_iff, le_def] theorem castPred_le_pred_iff {a b : Fin (n + 1)} (ha : a ≠ last n) (hb : b ≠ 0) : castPred a ha ≤ pred b hb ↔ a < b := by rw [le_pred_iff, succ_castPred_le_iff] theorem pred_lt_castPred_iff {a b : Fin (n + 1)} (ha : a ≠ 0) (hb : b ≠ last n) : pred a ha < castPred b hb ↔ a ≤ b := by rw [lt_castPred_iff, castSucc_pred_lt_iff ha] theorem pred_lt_castPred {a : Fin (n + 1)} (h₁ : a ≠ 0) (h₂ : a ≠ last n) : pred a h₁ < castPred a h₂ := by rw [pred_lt_castPred_iff, le_def] end CastPred section SuccAbove variable {p : Fin (n + 1)} {i j : Fin n} /-- `succAbove p i` embeds `Fin n` into `Fin (n + 1)` with a hole around `p`. -/ def succAbove (p : Fin (n + 1)) (i : Fin n) : Fin (n + 1) := if castSucc i < p then i.castSucc else i.succ /-- Embedding `i : Fin n` into `Fin (n + 1)` with a hole around `p : Fin (n + 1)` embeds `i` by `castSucc` when the resulting `i.castSucc < p`. -/ lemma succAbove_of_castSucc_lt (p : Fin (n + 1)) (i : Fin n) (h : castSucc i < p) : p.succAbove i = castSucc i := if_pos h lemma succAbove_of_succ_le (p : Fin (n + 1)) (i : Fin n) (h : succ i ≤ p) : p.succAbove i = castSucc i := succAbove_of_castSucc_lt _ _ (castSucc_lt_iff_succ_le.mpr h) /-- Embedding `i : Fin n` into `Fin (n + 1)` with a hole around `p : Fin (n + 1)` embeds `i` by `succ` when the resulting `p < i.succ`. -/ lemma succAbove_of_le_castSucc (p : Fin (n + 1)) (i : Fin n) (h : p ≤ castSucc i) : p.succAbove i = i.succ := if_neg (Fin.not_lt.2 h) lemma succAbove_of_lt_succ (p : Fin (n + 1)) (i : Fin n) (h : p < succ i) : p.succAbove i = succ i := succAbove_of_le_castSucc _ _ (le_castSucc_iff.mpr h) lemma succAbove_succ_of_lt (p i : Fin n) (h : p < i) : succAbove p.succ i = i.succ := succAbove_of_lt_succ _ _ (succ_lt_succ_iff.mpr h) lemma succAbove_succ_of_le (p i : Fin n) (h : i ≤ p) : succAbove p.succ i = i.castSucc := succAbove_of_succ_le _ _ (succ_le_succ_iff.mpr h) @[simp] lemma succAbove_succ_self (j : Fin n) : j.succ.succAbove j = j.castSucc := succAbove_succ_of_le _ _ Fin.le_rfl lemma succAbove_castSucc_of_lt (p i : Fin n) (h : i < p) : succAbove p.castSucc i = i.castSucc := succAbove_of_castSucc_lt _ _ (castSucc_lt_castSucc_iff.2 h) lemma succAbove_castSucc_of_le (p i : Fin n) (h : p ≤ i) : succAbove p.castSucc i = i.succ := succAbove_of_le_castSucc _ _ (castSucc_le_castSucc_iff.2 h) @[simp] lemma succAbove_castSucc_self (j : Fin n) : succAbove j.castSucc j = j.succ := succAbove_castSucc_of_le _ _ Fin.le_rfl lemma succAbove_pred_of_lt (p i : Fin (n + 1)) (h : p < i) (hi := Fin.ne_of_gt <\| Fin.lt_of_le_of_lt p.zero_le h) : succAbove p (i.pred hi) = i := by rw [succAbove_of_lt_succ _ _ (succ_pred _ _ ▸ h), succ_pred] lemma succAbove_pred_of_le (p i : Fin (n + 1)) (h : i ≤ p) (hi : i ≠ 0) : succAbove p (i.pred hi) = (i.pred hi).castSucc := succAbove_of_succ_le _ _ (succ_pred _ _ ▸ h) @[simp] lemma succAbove_pred_self (p : Fin (n + 1)) (h : p ≠ 0) : succAbove p (p.pred h) = (p.pred h).castSucc := succAbove_pred_of_le _ _ Fin.le_rfl h lemma succAbove_castPred_of_lt (p i : Fin (n + 1)) (h : i < p) (hi := Fin.ne_of_lt <\| Nat.lt_of_lt_of_le h p.le_last) : succAbove p (i.castPred hi) = i := by rw [succAbove_of_castSucc_lt _ _ (castSucc_castPred _ _ ▸ h), castSucc_castPred] lemma succAbove_castPred_of_le (p i : Fin (n + 1)) (h : p ≤ i) (hi : i ≠ last n) : succAbove p (i.castPred hi) = (i.castPred hi).succ := succAbove_of_le_castSucc _ _ (castSucc_castPred _ _ ▸ h) lemma succAbove_castPred_self (p : Fin (n + 1)) (h : p ≠ last n) : succAbove p (p.castPred h) = (p.castPred h).succ := succAbove_castPred_of_le _ _ Fin.le_rfl h /-- Embedding `i : Fin n` into `Fin (n + 1)` with a hole around `p : Fin (n + 1)` never results in `p` itself -/ @[simp] lemma succAbove_ne (p : Fin (n + 1)) (i : Fin n) : p.succAbove i ≠ p := by rcases p.castSucc_lt_or_lt_succ i with (h \| h) · rw [succAbove_of_castSucc_lt _ _ h] exact Fin.ne_of_lt h · rw [succAbove_of_lt_succ _ _ h] exact Fin.ne_of_gt h @[simp] lemma ne_succAbove (p : Fin (n + 1)) (i : Fin n) : p ≠ p.succAbove i := (succAbove_ne _ _).symm /-- Given a fixed pivot `p : Fin (n + 1)`, `p.succAbove` is injective. -/ lemma succAbove_right_injective : Injective p.succAbove := by rintro i j hij unfold succAbove at hij split_ifs at hij with hi hj hj · exact castSucc_injective _ hij · rw [hij] at hi cases hj <\| Nat.lt_trans j.castSucc_lt_succ hi · rw [← hij] at hj cases hi <\| Nat.lt_trans i.castSucc_lt_succ hj · exact succ_injective _ hij /-- Given a fixed pivot `p : Fin (n + 1)`, `p.succAbove` is injective. -/ lemma succAbove_right_inj : p.succAbove i = p.succAbove j ↔ i = j := succAbove_right_injective.eq_iff /-- `Fin.succAbove p` as an `Embedding`. -/ @[simps!] def succAboveEmb (p : Fin (n + 1)) : Fin n ↪ Fin (n + 1) := ⟨p.succAbove, succAbove_right_injective⟩ @[simp, norm_cast] lemma coe_succAboveEmb (p : Fin (n + 1)) : p.succAboveEmb = p.succAbove := rfl @[simp] lemma succAbove_ne_zero_zero [NeZero n] {a : Fin (n + 1)} (ha : a ≠ 0) : a.succAbove 0 = 0 := by rw [Fin.succAbove_of_castSucc_lt] · exact castSucc_zero' · exact Fin.pos_iff_ne_zero.2 ha lemma succAbove_eq_zero_iff [NeZero n] {a : Fin (n + 1)} {b : Fin n} (ha : a ≠ 0) : a.succAbove b = 0 ↔ b = 0 := by rw [← succAbove_ne_zero_zero ha, succAbove_right_inj] lemma succAbove_ne_zero [NeZero n] {a : Fin (n + 1)} {b : Fin n} (ha : a ≠ 0) (hb : b ≠ 0) : a.succAbove b ≠ 0 := mt (succAbove_eq_zero_iff ha).mp hb /-- Embedding `Fin n` into `Fin (n + 1)` with a hole around zero embeds by `succ`. -/ @[simp] lemma succAbove_zero : succAbove (0 : Fin (n + 1)) = Fin.succ := rfl lemma succAbove_zero_apply (i : Fin n) : succAbove 0 i = succ i := by rw [succAbove_zero] @[simp] lemma succAbove_ne_last_last {a : Fin (n + 2)} (h : a ≠ last (n + 1)) : a.succAbove (last n) = last (n + 1) := by rw [succAbove_of_lt_succ _ _ (succ_last _ ▸ lt_last_iff_ne_last.2 h), succ_last] lemma succAbove_eq_last_iff {a : Fin (n + 2)} {b : Fin (n + 1)} (ha : a ≠ last _) : a.succAbove b = last _ ↔ b = last _ := by rw [← succAbove_ne_last_last ha, succAbove_right_inj] lemma succAbove_ne_last {a : Fin (n + 2)} {b : Fin (n + 1)} (ha : a ≠ last _) (hb : b ≠ last _) : a.succAbove b ≠ last _ := mt (succAbove_eq_last_iff ha).mp hb /-- Embedding `Fin n` into `Fin (n + 1)` with a hole around `last n` embeds by `castSucc`. -/ @[simp] lemma succAbove_last : succAbove (last n) = castSucc := by ext; simp only [succAbove_of_castSucc_lt, castSucc_lt_last] lemma succAbove_last_apply (i : Fin n) : succAbove (last n) i = castSucc i := by rw [succAbove_last] /-- Embedding `i : Fin n` into `Fin (n + 1)` using a pivot `p` that is greater results in a value that is less than `p`. -/ lemma succAbove_lt_iff_castSucc_lt (p : Fin (n + 1)) (i : Fin n) : p.succAbove i < p ↔ castSucc i < p := by rcases castSucc_lt_or_lt_succ p i with H \| H · rwa [iff_true_right H, succAbove_of_castSucc_lt _ _ H] · rw [castSucc_lt_iff_succ_le, iff_false_right (Fin.not_le.2 H), succAbove_of_lt_succ _ _ H] exact Fin.not_lt.2 <\| Fin.le_of_lt H lemma succAbove_lt_iff_succ_le (p : Fin (n + 1)) (i : Fin n) : p.succAbove i < p ↔ succ i ≤ p := by rw [succAbove_lt_iff_castSucc_lt, castSucc_lt_iff_succ_le] /-- Embedding `i : Fin n` into `Fin (n + 1)` using a pivot `p` that is lesser results in a value that is greater than `p`. -/ lemma lt_succAbove_iff_le_castSucc (p : Fin (n + 1)) (i : Fin n) : p < p.succAbove i ↔ p ≤ castSucc i := by rcases castSucc_lt_or_lt_succ p i with H \| H · rw [iff_false_right (Fin.not_le.2 H), succAbove_of_castSucc_lt _ _ H] exact Fin.not_lt.2 <\| Fin.le_of_lt H · rwa [succAbove_of_lt_succ _ _ H, iff_true_left H, le_castSucc_iff] lemma lt_succAbove_iff_lt_castSucc (p : Fin (n + 1)) (i : Fin n) : p < p.succAbove i ↔ p < succ i := by rw [lt_succAbove_iff_le_castSucc, le_castSucc_iff] /-- Embedding a positive `Fin n` results in a positive `Fin (n + 1)` -/ lemma succAbove_pos [NeZero n] (p : Fin (n + 1)) (i : Fin n) (h : 0 < i) : 0 < p.succAbove i := by by_cases H : castSucc i < p · simpa [succAbove_of_castSucc_lt _ _ H] using castSucc_pos' h · simp [succAbove_of_le_castSucc _ _ (Fin.not_lt.1 H)] lemma castPred_succAbove (x : Fin n) (y : Fin (n + 1)) (h : castSucc x < y) (h' := Fin.ne_last_of_lt <\| (succAbove_lt_iff_castSucc_lt ..).2 h) : (y.succAbove x).castPred h' = x := by rw [castPred_eq_iff_eq_castSucc, succAbove_of_castSucc_lt _ _ h] lemma pred_succAbove (x : Fin n) (y : Fin (n + 1)) (h : y ≤ castSucc x) (h' := Fin.ne_zero_of_lt <\| (lt_succAbove_iff_le_castSucc ..).2 h) : (y.succAbove x).pred h' = x := by simp only [succAbove_of_le_castSucc _ _ h, pred_succ] lemma exists_succAbove_eq {x y : Fin (n + 1)} (h : x ≠ y) : ∃ z, y.succAbove z = x := by obtain hxy \| hyx := Fin.lt_or_lt_of_ne h exacts [⟨_, succAbove_castPred_of_lt _ _ hxy⟩, ⟨_, succAbove_pred_of_lt _ _ hyx⟩] @[simp] lemma exists_succAbove_eq_iff {x y : Fin (n + 1)} : (∃ z, x.succAbove z = y) ↔ y ≠ x := ⟨by rintro ⟨y, rfl⟩; exact succAbove_ne _ _, exists_succAbove_eq⟩ /-- The range of `p.succAbove` is everything except `p`. -/ @[simp] lemma range_succAbove (p : Fin (n + 1)) : Set.range p.succAbove = {p}ᶜ := Set.ext fun _ => exists_succAbove_eq_iff @[simp] lemma range_succ (n : ℕ) : Set.range (Fin.succ : Fin n → Fin (n + 1)) = {0}ᶜ := by rw [← succAbove_zero]; exact range_succAbove (0 : Fin (n + 1)) /-- `succAbove` is injective at the pivot -/ lemma succAbove_left_injective : Injective (@succAbove n) := fun _ _ h => by simpa [range_succAbove] using congr_arg (fun f : Fin n → Fin (n + 1) => (Set.range f)ᶜ) h /-- `succAbove` is injective at the pivot -/ @[simp] lemma succAbove_left_inj {x y : Fin (n + 1)} : x.succAbove = y.succAbove ↔ x = y := succAbove_left_injective.eq_iff @[simp] lemma zero_succAbove {n : ℕ} (i : Fin n) : (0 : Fin (n + 1)).succAbove i = i.succ := rfl lemma succ_succAbove_zero {n : ℕ} [NeZero n] (i : Fin n) : succAbove i.succ 0 = 0 := by simp /-- `succ` commutes with `succAbove`. -/ @[simp] lemma succ_succAbove_succ {n : ℕ} (i : Fin (n + 1)) (j : Fin n) : i.succ.succAbove j.succ = (i.succAbove j).succ := by obtain h \| h := i.lt_or_le (succ j) · rw [succAbove_of_lt_succ _ _ h, succAbove_succ_of_lt _ _ h] · rwa [succAbove_of_castSucc_lt _ _ h, succAbove_succ_of_le, succ_castSucc] /-- `castSucc` commutes with `succAbove`. -/ @[simp] lemma castSucc_succAbove_castSucc {n : ℕ} {i : Fin (n + 1)} {j : Fin n} : i.castSucc.succAbove j.castSucc = (i.succAbove j).castSucc := by rcases i.le_or_lt (castSucc j) with (h \| h) · rw [succAbove_of_le_castSucc _ _ h, succAbove_castSucc_of_le _ _ h, succ_castSucc] · rw [succAbove_of_castSucc_lt _ _ h, succAbove_castSucc_of_lt _ _ h] /-- `pred` commutes with `succAbove`. -/ lemma pred_succAbove_pred {a : Fin (n + 2)} {b : Fin (n + 1)} (ha : a ≠ 0) (hb : b ≠ 0) (hk := succAbove_ne_zero ha hb) : (a.pred ha).succAbove (b.pred hb) = (a.succAbove b).pred hk := by simp_rw [← succ_inj (b := pred (succAbove a b) hk), ← succ_succAbove_succ, succ_pred] /-- `castPred` commutes with `succAbove`. -/ lemma castPred_succAbove_castPred {a : Fin (n + 2)} {b : Fin (n + 1)} (ha : a ≠ last (n + 1)) (hb : b ≠ last n) (hk := succAbove_ne_last ha hb) : (a.castPred ha).succAbove (b.castPred hb) = (a.succAbove b).castPred hk := by simp_rw [← castSucc_inj (b := (a.succAbove b).castPred hk), ← castSucc_succAbove_castSucc, castSucc_castPred] lemma one_succAbove_zero {n : ℕ} : (1 : Fin (n + 2)).succAbove 0 = 0 := by rfl /-- By moving `succ` to the outside of this expression, we create opportunities for further simplification using `succAbove_zero` or `succ_succAbove_zero`. -/ @[simp] lemma succ_succAbove_one {n : ℕ} [NeZero n] (i : Fin (n + 1)) : i.succ.succAbove 1 = (i.succAbove 0).succ := by rw [← succ_zero_eq_one']; convert succ_succAbove_succ i 0 @[simp] lemma one_succAbove_succ {n : ℕ} (j : Fin n) : (1 : Fin (n + 2)).succAbove j.succ = j.succ.succ := by have := succ_succAbove_succ 0 j; rwa [succ_zero_eq_one, zero_succAbove] at this @[simp] lemma one_succAbove_one {n : ℕ} : (1 : Fin (n + 3)).succAbove 1 = 2 := by simpa only [succ_zero_eq_one, val_zero, zero_succAbove, succ_one_eq_two] using succ_succAbove_succ (0 : Fin (n + 2)) (0 : Fin (n + 2)) end SuccAbove section PredAbove /-- `predAbove p i` surjects `i : Fin (n+1)` into `Fin n` by subtracting one if `p < i`. -/ def predAbove (p : Fin n) (i : Fin (n + 1)) : Fin n := if h : castSucc p < i then pred i (Fin.ne_zero_of_lt h) else castPred i (Fin.ne_of_lt <\| Fin.lt_of_le_of_lt (Fin.not_lt.1 h) (castSucc_lt_last _)) lemma predAbove_of_le_castSucc (p : Fin n) (i : Fin (n + 1)) (h : i ≤ castSucc p) (hi := Fin.ne_of_lt <\| Fin.lt_of_le_of_lt h <\| castSucc_lt_last _) : p.predAbove i = i.castPred hi := dif_neg <\| Fin.not_lt.2 h lemma predAbove_of_lt_succ (p : Fin n) (i : Fin (n + 1)) (h : i < succ p) (hi := Fin.ne_last_of_lt h) : p.predAbove i = i.castPred hi := predAbove_of_le_castSucc _ _ (le_castSucc_iff.mpr h) lemma predAbove_of_castSucc_lt (p : Fin n) (i : Fin (n + 1)) (h : castSucc p < i) (hi := Fin.ne_zero_of_lt h) : p.predAbove i = i.pred hi := dif_pos h lemma predAbove_of_succ_le (p : Fin n) (i : Fin (n + 1)) (h : succ p ≤ i) (hi := Fin.ne_of_gt <\| Fin.lt_of_lt_of_le (succ_pos _) h) : p.predAbove i = i.pred hi := predAbove_of_castSucc_lt _ _ (castSucc_lt_iff_succ_le.mpr h) lemma predAbove_succ_of_lt (p i : Fin n) (h : i < p) (hi := succ_ne_last_of_lt h) : p.predAbove (succ i) = (i.succ).castPred hi := by rw [predAbove_of_lt_succ _ _ (succ_lt_succ_iff.mpr h)] lemma predAbove_succ_of_le (p i : Fin n) (h : p ≤ i) : p.predAbove (succ i) = i := by rw [predAbove_of_succ_le _ _ (succ_le_succ_iff.mpr h), pred_succ] @[simp] lemma predAbove_succ_self (p : Fin n) : p.predAbove (succ p) = p := predAbove_succ_of_le _ _ Fin.le_rfl lemma predAbove_castSucc_of_lt (p i : Fin n) (h : p < i) (hi := castSucc_ne_zero_of_lt h) : p.predAbove (castSucc i) = i.castSucc.pred hi := by rw [predAbove_of_castSucc_lt _ _ (castSucc_lt_castSucc_iff.2 h)] lemma predAbove_castSucc_of_le (p i : Fin n) (h : i ≤ p) : p.predAbove (castSucc i) = i := by rw [predAbove_of_le_castSucc _ _ (castSucc_le_castSucc_iff.mpr h), castPred_castSucc] @[simp] lemma predAbove_castSucc_self (p : Fin n) : p.predAbove (castSucc p) = p := predAbove_castSucc_of_le _ _ Fin.le_rfl lemma predAbove_pred_of_lt (p i : Fin (n + 1)) (h : i < p) (hp := Fin.ne_zero_of_lt h) (hi := Fin.ne_last_of_lt h) : (pred p hp).predAbove i = castPred i hi := by rw [predAbove_of_lt_succ _ _ (succ_pred _ _ ▸ h)] lemma predAbove_pred_of_le (p i : Fin (n + 1)) (h : p ≤ i) (hp : p ≠ 0) (hi := Fin.ne_of_gt <\| Fin.lt_of_lt_of_le (Fin.pos_iff_ne_zero.2 hp) h) : (pred p hp).predAbove i = pred i hi := by rw [predAbove_of_succ_le _ _ (succ_pred _ _ ▸ h)] lemma predAbove_pred_self (p : Fin (n + 1)) (hp : p ≠ 0) : (pred p hp).predAbove p = pred p hp := predAbove_pred_of_le _ _ Fin.le_rfl hp lemma predAbove_castPred_of_lt (p i : Fin (n + 1)) (h : p < i) (hp := Fin.ne_last_of_lt h) (hi := Fin.ne_zero_of_lt h) : (castPred p hp).predAbove i = pred i hi := by rw [predAbove_of_castSucc_lt _ _ (castSucc_castPred _ _ ▸ h)] lemma predAbove_castPred_of_le (p i : Fin (n + 1)) (h : i ≤ p) (hp : p ≠ last n) (hi := Fin.ne_of_lt <\| Fin.lt_of_le_of_lt h <\| Fin.lt_last_iff_ne_last.2 hp) : (castPred p hp).predAbove i = castPred i hi := by rw [predAbove_of_le_castSucc _ _ (castSucc_castPred _ _ ▸ h)] lemma predAbove_castPred_self (p : Fin (n + 1)) (hp : p ≠ last n) : (castPred p hp).predAbove p = castPred p hp := predAbove_castPred_of_le _ _ Fin.le_rfl hp @[simp] lemma predAbove_right_zero [NeZero n] {i : Fin n} : predAbove (i : Fin n) 0 = 0 := by cases n · exact i.elim0 · rw [predAbove_of_le_castSucc _ _ (zero_le _), castPred_zero] lemma predAbove_zero_succ [NeZero n] {i : Fin n} : predAbove 0 i.succ = i := by rw [predAbove_succ_of_le _ _ (Fin.zero_le' _)] @[simp] lemma succ_predAbove_zero [NeZero n] {j : Fin (n + 1)} (h : j ≠ 0) : succ (predAbove 0 j) = j := by rcases exists_succ_eq_of_ne_zero h with ⟨k, rfl⟩ rw [predAbove_zero_succ] @[simp] lemma predAbove_zero_of_ne_zero [NeZero n] {i : Fin (n + 1)} (hi : i ≠ 0) : predAbove 0 i = i.pred hi := by obtain ⟨y, rfl⟩ := exists_succ_eq.2 hi; exact predAbove_zero_succ lemma predAbove_zero [NeZero n] {i : Fin (n + 1)} : predAbove (0 : Fin n) i = if hi : i = 0 then 0 else i.pred hi := by split_ifs with hi · rw [hi, predAbove_right_zero] · rw [predAbove_zero_of_ne_zero hi] @[simp] lemma predAbove_right_last {i : Fin (n + 1)} : predAbove i (last (n + 1)) = last n := by rw [predAbove_of_castSucc_lt _ _ (castSucc_lt_last _), pred_last] lemma predAbove_last_castSucc {i : Fin (n + 1)} : predAbove (last n) (i.castSucc) = i := by rw [predAbove_of_le_castSucc _ _ (castSucc_le_castSucc_iff.mpr (le_last _)), castPred_castSucc] @[simp] lemma predAbove_last_of_ne_last {i : Fin (n + 2)} (hi : i ≠ last (n + 1)) : predAbove (last n) i = castPred i hi := by rw [← exists_castSucc_eq] at hi rcases hi with ⟨y, rfl⟩ exact predAbove_last_castSucc lemma predAbove_last_apply {i : Fin (n + 2)} :	predAbove (last n) i = if hi : i = last _ then last _ else i.castPred hi := by split_ifs with hi · rw [hi, predAbove_right_last]	Mathlib/Data/Fin/Basic.lean	1,273	1,275
/- Copyright (c) 2023 Frédéric Dupuis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Frédéric Dupuis -/ import Mathlib.Computability.AkraBazzi.GrowsPolynomially import Mathlib.Analysis.Calculus.Deriv.Inv import Mathlib.Analysis.SpecialFunctions.Pow.Deriv /-! # Divide-and-conquer recurrences and the Akra-Bazzi theorem A divide-and-conquer recurrence is a function `T : ℕ → ℝ` that satisfies a recurrence relation of the form `T(n) = ∑_{i=0}^{k-1} a_i T(r_i(n)) + g(n)` for large enough `n`, where `r_i(n)` is some function where `‖r_i(n) - b_i n‖ ∈ o(n / (log n)^2)` for every `i`, the `a_i`'s are some positive coefficients, and the `b_i`'s are reals `∈ (0,1)`. (Note that this can be improved to `O(n / (log n)^(1+ε))`, this is left as future work.) These recurrences arise mainly in the analysis of divide-and-conquer algorithms such as mergesort or Strassen's algorithm for matrix multiplication. This class of algorithms works by dividing an instance of the problem of size `n`, into `k` smaller instances, where the `i`'th instance is of size roughly `b_i n`, and calling itself recursively on those smaller instances. `T(n)` then represents the running time of the algorithm, and `g(n)` represents the running time required to actually divide up the instance and process the answers that come out of the recursive calls. Since virtually all such algorithms produce instances that are only approximately of size `b_i n` (they have to round up or down at the very least), we allow the instance sizes to be given by some function `r_i(n)` that approximates `b_i n`. The Akra-Bazzi theorem gives the asymptotic order of such a recurrence: it states that `T(n) ∈ Θ(n^p (1 + ∑_{u=0}^{n-1} g(n) / u^{p+1}))`, where `p` is the unique real number such that `∑ a_i b_i^p = 1`. ## Main definitions and results * `AkraBazziRecurrence T g a b r`: the predicate stating that `T : ℕ → ℝ` satisfies an Akra-Bazzi recurrence with parameters `g`, `a`, `b` and `r` as above. * `GrowsPolynomially`: The growth condition that `g` must satisfy for the theorem to apply. It roughly states that `c₁ g(n) ≤ g(u) ≤ c₂ g(n)`, for u between bn and n for any constant `b ∈ (0,1)`. `sumTransform`: The transformation which turns a function `g` into `n^p * ∑ u ∈ Finset.Ico n₀ n, g u / u^(p+1)`. * `asympBound`: The asymptotic bound satisfied by an Akra-Bazzi recurrence, namely `n^p (1 + ∑ g(u) / u^(p+1))` * `isTheta_asympBound`: The main result stating that `T(n) ∈ Θ(n^p (1 + ∑_{u=0}^{n-1} g(n) / u^{p+1}))` ## Implementation Note that the original version of the theorem has an integral rather than a sum in the above expression, and first considers the `T : ℝ → ℝ` case before moving on to `ℕ → ℝ`. We prove the above version with a sum, as it is simpler and more relevant for algorithms. ## TODO * Specialize this theorem to the very common case where the recurrence is of the form `T(n) = ℓT(r_i(n)) + g(n)` where `g(n) ∈ Θ(n^t)` for some `t`. (This is often called the "master theorem" in the literature.) * Add the original version of the theorem with an integral instead of a sum. ## References * Mohamad Akra and Louay Bazzi, On the solution of linear recurrence equations * Tom Leighton, Notes on better master theorems for divide-and-conquer recurrences * Manuel Eberl, Asymptotic reasoning in a proof assistant -/ open Finset Real Filter Asymptotics open scoped Topology /-! #### Definition of Akra-Bazzi recurrences This section defines the predicate `AkraBazziRecurrence T g a b r` which states that `T` satisfies the recurrence `T(n) = ∑_{i=0}^{k-1} a_i T(r_i(n)) + g(n)` with appropriate conditions on the various parameters. -/ /-- An Akra-Bazzi recurrence is a function that satisfies the recurrence `T n = (∑ i, a i * T (r i n)) + g n`. -/ structure AkraBazziRecurrence {α : Type} [Fintype α] [Nonempty α] (T : ℕ → ℝ) (g : ℝ → ℝ) (a : α → ℝ) (b : α → ℝ) (r : α → ℕ → ℕ) where /-- Point below which the recurrence is in the base case -/ n₀ : ℕ /-- `n₀` is always `> 0` -/ n₀_gt_zero : 0 < n₀ /-- The `a`'s are nonzero -/ a_pos : ∀ i, 0 < a i /-- The `b`'s are nonzero -/ b_pos : ∀ i, 0 < b i /-- The b's are less than 1 -/ b_lt_one : ∀ i, b i < 1 /-- `g` is nonnegative -/ g_nonneg : ∀ x ≥ 0, 0 ≤ g x /-- `g` grows polynomially -/ g_grows_poly : AkraBazziRecurrence.GrowsPolynomially g /-- The actual recurrence -/ h_rec (n : ℕ) (hn₀ : n₀ ≤ n) : T n = (∑ i, a i T (r i n)) + g n /-- Base case: `T(n) > 0` whenever `n < n₀` -/ T_gt_zero' (n : ℕ) (hn : n < n₀) : 0 < T n /-- The `r`'s always reduce `n` -/ r_lt_n : ∀ i n, n₀ ≤ n → r i n < n /-- The `r`'s approximate the `b`'s -/ dist_r_b : ∀ i, (fun n => (r i n : ℝ) - b i * n) =o[atTop] fun n => n / (log n) ^ 2 namespace AkraBazziRecurrence section min_max variable {α : Type} [Finite α] [Nonempty α] /-- Smallest `b i` -/ noncomputable def min_bi (b : α → ℝ) : α := Classical.choose <\| Finite.exists_min b /-- Largest `b i` -/ noncomputable def max_bi (b : α → ℝ) : α := Classical.choose <\| Finite.exists_max b @[aesop safe apply] lemma min_bi_le {b : α → ℝ} (i : α) : b (min_bi b) ≤ b i := Classical.choose_spec (Finite.exists_min b) i @[aesop safe apply] lemma max_bi_le {b : α → ℝ} (i : α) : b i ≤ b (max_bi b) := Classical.choose_spec (Finite.exists_max b) i end min_max lemma isLittleO_self_div_log_id : (fun (n : ℕ) => n / log n ^ 2) =o[atTop] (fun (n : ℕ) => (n : ℝ)) := by calc (fun (n : ℕ) => (n : ℝ) / log n ^ 2) = fun (n : ℕ) => (n : ℝ) ((log n) ^ 2)⁻¹ := by simp_rw [div_eq_mul_inv] _ =o[atTop] fun (n : ℕ) => (n : ℝ) * 1⁻¹ := by refine IsBigO.mul_isLittleO (isBigO_refl _ _) ?_ refine IsLittleO.inv_rev ?main ?zero case zero => simp case main => calc _ = (fun (_ : ℕ) => ((1 : ℝ) ^ 2)) := by simp _ =o[atTop] (fun (n : ℕ) => (log n)^2) := IsLittleO.pow (IsLittleO.natCast_atTop <\| isLittleO_const_log_atTop) (by norm_num) _ = (fun (n : ℕ) => (n : ℝ)) := by ext; simp variable {α : Type} [Fintype α] {T : ℕ → ℝ} {g : ℝ → ℝ} {a b : α → ℝ} {r : α → ℕ → ℕ} variable [Nonempty α] (R : AkraBazziRecurrence T g a b r) section include R lemma dist_r_b' : ∀ᶠ n in atTop, ∀ i, ‖(r i n : ℝ) - b i n‖ ≤ n / log n ^ 2 := by rw [Filter.eventually_all] intro i simpa using IsLittleO.eventuallyLE (R.dist_r_b i) lemma eventually_b_le_r : ∀ᶠ (n : ℕ) in atTop, ∀ i, (b i : ℝ) * n - (n / log n ^ 2) ≤ r i n := by filter_upwards [R.dist_r_b'] with n hn intro i have h₁ : 0 ≤ b i := le_of_lt <\| R.b_pos _ rw [sub_le_iff_le_add, add_comm, ← sub_le_iff_le_add] calc (b i : ℝ) * n - r i n = ‖b i * n‖ - ‖(r i n : ℝ)‖ := by simp only [norm_mul, RCLike.norm_natCast, sub_left_inj, Nat.cast_eq_zero, Real.norm_of_nonneg h₁] _ ≤ ‖(b i * n : ℝ) - r i n‖ := norm_sub_norm_le _ _ _ = ‖(r i n : ℝ) - b i * n‖ := norm_sub_rev _ _ _ ≤ n / log n ^ 2 := hn i lemma eventually_r_le_b : ∀ᶠ (n : ℕ) in atTop, ∀ i, r i n ≤ (b i : ℝ) * n + (n / log n ^ 2) := by filter_upwards [R.dist_r_b'] with n hn intro i calc r i n = b i * n + (r i n - b i * n) := by ring _ ≤ b i * n + ‖r i n - b i * n‖ := by gcongr; exact Real.le_norm_self _ _ ≤ b i * n + n / log n ^ 2 := by gcongr; exact hn i lemma eventually_r_lt_n : ∀ᶠ (n : ℕ) in atTop, ∀ i, r i n < n := by filter_upwards [eventually_ge_atTop R.n₀] with n hn exact fun i => R.r_lt_n i n hn lemma eventually_bi_mul_le_r : ∀ᶠ (n : ℕ) in atTop, ∀ i, (b (min_bi b) / 2) * n ≤ r i n := by have gt_zero : 0 < b (min_bi b) := R.b_pos (min_bi b) have hlo := isLittleO_self_div_log_id rw [Asymptotics.isLittleO_iff] at hlo have hlo' := hlo (by positivity : 0 < b (min_bi b) / 2) filter_upwards [hlo', R.eventually_b_le_r] with n hn hn' intro i simp only [Real.norm_of_nonneg (by positivity : 0 ≤ (n : ℝ))] at hn calc b (min_bi b) / 2 * n = b (min_bi b) * n - b (min_bi b) / 2 * n := by ring _ ≤ b (min_bi b) * n - ‖n / log n ^ 2‖ := by gcongr _ ≤ b i * n - ‖n / log n ^ 2‖ := by gcongr; aesop _ = b i * n - n / log n ^ 2 := by congr exact Real.norm_of_nonneg <\| by positivity _ ≤ r i n := hn' i lemma bi_min_div_two_lt_one : b (min_bi b) / 2 < 1 := by have gt_zero : 0 < b (min_bi b) := R.b_pos (min_bi b) calc b (min_bi b) / 2 < b (min_bi b) := by aesop (add safe apply div_two_lt_of_pos) _ < 1 := R.b_lt_one _ lemma bi_min_div_two_pos : 0 < b (min_bi b) / 2 := div_pos (R.b_pos _) (by norm_num) lemma exists_eventually_const_mul_le_r : ∃ c ∈ Set.Ioo (0 : ℝ) 1, ∀ᶠ (n : ℕ) in atTop, ∀ i, c * n ≤ r i n := by have gt_zero : 0 < b (min_bi b) := R.b_pos (min_bi b) exact ⟨b (min_bi b) / 2, ⟨⟨by positivity, R.bi_min_div_two_lt_one⟩, R.eventually_bi_mul_le_r⟩⟩ lemma eventually_r_ge (C : ℝ) : ∀ᶠ (n : ℕ) in atTop, ∀ i, C ≤ r i n := by obtain ⟨c, hc_mem, hc⟩ := R.exists_eventually_const_mul_le_r filter_upwards [eventually_ge_atTop ⌈C / c⌉₊, hc] with n hn₁ hn₂ have h₁ := hc_mem.1 intro i calc C = c * (C / c) := by rw [← mul_div_assoc] exact (mul_div_cancel_left₀ _ (by positivity)).symm _ ≤ c * ⌈C / c⌉₊ := by gcongr; simp [Nat.le_ceil] _ ≤ c * n := by gcongr _ ≤ r i n := hn₂ i lemma tendsto_atTop_r (i : α) : Tendsto (r i) atTop atTop := by rw [tendsto_atTop] intro b have := R.eventually_r_ge b rw [Filter.eventually_all] at this exact_mod_cast this i lemma tendsto_atTop_r_real (i : α) : Tendsto (fun n => (r i n : ℝ)) atTop atTop := Tendsto.comp tendsto_natCast_atTop_atTop (R.tendsto_atTop_r i) lemma exists_eventually_r_le_const_mul : ∃ c ∈ Set.Ioo (0 : ℝ) 1, ∀ᶠ (n : ℕ) in atTop, ∀ i, r i n ≤ c * n := by let c := b (max_bi b) + (1 - b (max_bi b)) / 2 have h_max_bi_pos : 0 < b (max_bi b) := R.b_pos _ have h_max_bi_lt_one : 0 < 1 - b (max_bi b) := by have : b (max_bi b) < 1 := R.b_lt_one _ linarith have hc_pos : 0 < c := by positivity have h₁ : 0 < (1 - b (max_bi b)) / 2 := by positivity have hc_lt_one : c < 1 := calc b (max_bi b) + (1 - b (max_bi b)) / 2 = b (max_bi b) * (1 / 2) + 1 / 2 := by ring _ < 1 * (1 / 2) + 1 / 2 := by gcongr exact R.b_lt_one _ _ = 1 := by norm_num refine ⟨c, ⟨hc_pos, hc_lt_one⟩, ?_⟩ have hlo := isLittleO_self_div_log_id rw [Asymptotics.isLittleO_iff] at hlo have hlo' := hlo h₁ filter_upwards [hlo', R.eventually_r_le_b] with n hn hn' intro i rw [Real.norm_of_nonneg (by positivity)] at hn simp only [Real.norm_of_nonneg (by positivity : 0 ≤ (n : ℝ))] at hn calc r i n ≤ b i * n + n / log n ^ 2 := by exact hn' i _ ≤ b i * n + (1 - b (max_bi b)) / 2 * n := by gcongr _ = (b i + (1 - b (max_bi b)) / 2) * n := by ring _ ≤ (b (max_bi b) + (1 - b (max_bi b)) / 2) * n := by gcongr; exact max_bi_le _ lemma eventually_r_pos : ∀ᶠ (n : ℕ) in atTop, ∀ i, 0 < r i n := by rw [Filter.eventually_all] exact fun i => (R.tendsto_atTop_r i).eventually_gt_atTop 0 lemma eventually_log_b_mul_pos : ∀ᶠ (n : ℕ) in atTop, ∀ i, 0 < log (b i * n) := by rw [Filter.eventually_all] intro i have h : Tendsto (fun (n : ℕ) => log (b i * n)) atTop atTop := Tendsto.comp tendsto_log_atTop	<\| Tendsto.const_mul_atTop (b_pos R i) tendsto_natCast_atTop_atTop exact h.eventually_gt_atTop 0 @[aesop safe apply] lemma T_pos (n : ℕ) : 0 < T n := by induction n using Nat.strongRecOn with \| ind n h_ind => cases lt_or_le n R.n₀ with \| inl hn => exact R.T_gt_zero' n hn -- n < R.n₀ \| inr hn => -- R.n₀ ≤ n rw [R.h_rec n hn]	Mathlib/Computability/AkraBazzi/AkraBazzi.lean	265	274
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.ShortComplex.QuasiIso import Mathlib.CategoryTheory.Limits.Preserves.Finite import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Kernels /-! # Functors which preserves homology If `F : C ⥤ D` is a functor between categories with zero morphisms, we shall say that `F` preserves homology when `F` preserves both kernels and cokernels. This typeclass is named `[F.PreservesHomology]`, and is automatically satisfied when `F` preserves both finite limits and finite colimits. If `S : ShortComplex C` and `[F.PreservesHomology]`, then there is an isomorphism `S.mapHomologyIso F : (S.map F).homology ≅ F.obj S.homology`, which is part of the natural isomorphism `homologyFunctorIso F` between the functors `F.mapShortComplex ⋙ homologyFunctor D` and `homologyFunctor C ⋙ F`. -/ namespace CategoryTheory open Category Limits variable {C D : Type*} [Category C] [Category D] [HasZeroMorphisms C] [HasZeroMorphisms D] namespace Functor variable (F : C ⥤ D) /-- A functor preserves homology when it preserves both kernels and cokernels. -/ class PreservesHomology (F : C ⥤ D) [PreservesZeroMorphisms F] : Prop where /-- the functor preserves kernels -/ preservesKernels ⦃X Y : C⦄ (f : X ⟶ Y) : PreservesLimit (parallelPair f 0) F := by infer_instance /-- the functor preserves cokernels -/ preservesCokernels ⦃X Y : C⦄ (f : X ⟶ Y) : PreservesColimit (parallelPair f 0) F := by infer_instance variable [PreservesZeroMorphisms F] /-- A functor which preserves homology preserves kernels. -/ lemma PreservesHomology.preservesKernel [F.PreservesHomology] {X Y : C} (f : X ⟶ Y) : PreservesLimit (parallelPair f 0) F := PreservesHomology.preservesKernels _ /-- A functor which preserves homology preserves cokernels. -/ lemma PreservesHomology.preservesCokernel [F.PreservesHomology] {X Y : C} (f : X ⟶ Y) : PreservesColimit (parallelPair f 0) F := PreservesHomology.preservesCokernels _ noncomputable instance preservesHomologyOfExact [PreservesFiniteLimits F] [PreservesFiniteColimits F] : F.PreservesHomology where end Functor namespace ShortComplex variable {S S₁ S₂ : ShortComplex C} namespace LeftHomologyData variable (h : S.LeftHomologyData) (F : C ⥤ D) /-- A left homology data `h` of a short complex `S` is preserved by a functor `F` is `F` preserves the kernel of `S.g : S.X₂ ⟶ S.X₃` and the cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ class IsPreservedBy [F.PreservesZeroMorphisms] : Prop where /-- the functor preserves the kernel of `S.g : S.X₂ ⟶ S.X₃`. -/ g : PreservesLimit (parallelPair S.g 0) F /-- the functor preserves the cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ f' : PreservesColimit (parallelPair h.f' 0) F variable [F.PreservesZeroMorphisms] noncomputable instance isPreservedBy_of_preservesHomology [F.PreservesHomology] : h.IsPreservedBy F where g := Functor.PreservesHomology.preservesKernel _ _ f' := Functor.PreservesHomology.preservesCokernel _ _ variable [h.IsPreservedBy F] include h in /-- When a left homology data is preserved by a functor `F`, this functor preserves the kernel of `S.g : S.X₂ ⟶ S.X₃`. -/ lemma IsPreservedBy.hg : PreservesLimit (parallelPair S.g 0) F := @IsPreservedBy.g _ _ _ _ _ _ _ h F _ _ /-- When a left homology data `h` is preserved by a functor `F`, this functor preserves the cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ lemma IsPreservedBy.hf' : PreservesColimit (parallelPair h.f' 0) F := IsPreservedBy.f' /-- When a left homology data `h` of a short complex `S` is preserved by a functor `F`, this is the induced left homology data `h.map F` for the short complex `S.map F`. -/ @[simps] noncomputable def map : (S.map F).LeftHomologyData := by have := IsPreservedBy.hg h F have := IsPreservedBy.hf' h F have wi : F.map h.i ≫ F.map S.g = 0 := by rw [← F.map_comp, h.wi, F.map_zero] have hi := KernelFork.mapIsLimit _ h.hi F let f' : F.obj S.X₁ ⟶ F.obj h.K := hi.lift (KernelFork.ofι (S.map F).f (S.map F).zero) have hf' : f' = F.map h.f' := Fork.IsLimit.hom_ext hi (by rw [Fork.IsLimit.lift_ι hi] simp only [KernelFork.map_ι, Fork.ι_ofι, map_f, ← F.map_comp, f'_i]) have wπ : f' ≫ F.map h.π = 0 := by rw [hf', ← F.map_comp, f'_π, F.map_zero] have hπ : IsColimit (CokernelCofork.ofπ (F.map h.π) wπ) := by let e : parallelPair f' 0 ≅ parallelPair (F.map h.f') 0 := parallelPair.ext (Iso.refl _) (Iso.refl _) (by simpa using hf') (by simp) refine IsColimit.precomposeInvEquiv e _ (IsColimit.ofIsoColimit (CokernelCofork.mapIsColimit _ h.hπ' F) ?_) exact Cofork.ext (Iso.refl _) (by simp [e]) exact { K := F.obj h.K H := F.obj h.H i := F.map h.i π := F.map h.π wi := wi hi := hi wπ := wπ hπ := hπ } @[simp] lemma map_f' : (h.map F).f' = F.map h.f' := by rw [← cancel_mono (h.map F).i, f'_i, map_f, map_i, ← F.map_comp, f'_i] end LeftHomologyData /-- Given a left homology map data `ψ : LeftHomologyMapData φ h₁ h₂` such that both left homology data `h₁` and `h₂` are preserved by a functor `F`, this is the induced left homology map data for the morphism `F.mapShortComplex.map φ`. -/ @[simps] def LeftHomologyMapData.map {φ : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (ψ : LeftHomologyMapData φ h₁ h₂) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h₁.IsPreservedBy F] [h₂.IsPreservedBy F] : LeftHomologyMapData (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) where φK := F.map ψ.φK φH := F.map ψ.φH commi := by simpa only [F.map_comp] using F.congr_map ψ.commi commf' := by simpa only [LeftHomologyData.map_f', F.map_comp] using F.congr_map ψ.commf' commπ := by simpa only [F.map_comp] using F.congr_map ψ.commπ namespace RightHomologyData variable (h : S.RightHomologyData) (F : C ⥤ D) /-- A right homology data `h` of a short complex `S` is preserved by a functor `F` is `F` preserves the cokernel of `S.f : S.X₁ ⟶ S.X₂` and the kernel of `h.g' : h.Q ⟶ S.X₃`. -/ class IsPreservedBy [F.PreservesZeroMorphisms] : Prop where /-- the functor preserves the cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ f : PreservesColimit (parallelPair S.f 0) F /-- the functor preserves the kernel of `h.g' : h.Q ⟶ S.X₃`. -/ g' : PreservesLimit (parallelPair h.g' 0) F variable [F.PreservesZeroMorphisms] noncomputable instance isPreservedBy_of_preservesHomology [F.PreservesHomology] : h.IsPreservedBy F where f := Functor.PreservesHomology.preservesCokernel F _ g' := Functor.PreservesHomology.preservesKernel F _ variable [h.IsPreservedBy F] include h in /-- When a right homology data is preserved by a functor `F`, this functor preserves the cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ lemma IsPreservedBy.hf : PreservesColimit (parallelPair S.f 0) F := @IsPreservedBy.f _ _ _ _ _ _ _ h F _ _ /-- When a right homology data `h` is preserved by a functor `F`, this functor preserves the kernel of `h.g' : h.Q ⟶ S.X₃`. -/ lemma IsPreservedBy.hg' : PreservesLimit (parallelPair h.g' 0) F := @IsPreservedBy.g' _ _ _ _ _ _ _ h F _ _ /-- When a right homology data `h` of a short complex `S` is preserved by a functor `F`, this is the induced right homology data `h.map F` for the short complex `S.map F`. -/ @[simps] noncomputable def map : (S.map F).RightHomologyData := by have := IsPreservedBy.hf h F have := IsPreservedBy.hg' h F have wp : F.map S.f ≫ F.map h.p = 0 := by rw [← F.map_comp, h.wp, F.map_zero] have hp := CokernelCofork.mapIsColimit _ h.hp F let g' : F.obj h.Q ⟶ F.obj S.X₃ := hp.desc (CokernelCofork.ofπ (S.map F).g (S.map F).zero) have hg' : g' = F.map h.g' := by apply Cofork.IsColimit.hom_ext hp rw [Cofork.IsColimit.π_desc hp] simp only [Cofork.π_ofπ, CokernelCofork.map_π, map_g, ← F.map_comp, p_g'] have wι : F.map h.ι ≫ g' = 0 := by rw [hg', ← F.map_comp, ι_g', F.map_zero] have hι : IsLimit (KernelFork.ofι (F.map h.ι) wι) := by let e : parallelPair g' 0 ≅ parallelPair (F.map h.g') 0 := parallelPair.ext (Iso.refl _) (Iso.refl _) (by simpa using hg') (by simp) refine IsLimit.postcomposeHomEquiv e _ (IsLimit.ofIsoLimit (KernelFork.mapIsLimit _ h.hι' F) ?_) exact Fork.ext (Iso.refl _) (by simp [e]) exact { Q := F.obj h.Q H := F.obj h.H p := F.map h.p ι := F.map h.ι wp := wp hp := hp wι := wι hι := hι } @[simp] lemma map_g' : (h.map F).g' = F.map h.g' := by rw [← cancel_epi (h.map F).p, p_g', map_g, map_p, ← F.map_comp, p_g'] end RightHomologyData /-- Given a right homology map data `ψ : RightHomologyMapData φ h₁ h₂` such that both right homology data `h₁` and `h₂` are preserved by a functor `F`, this is the induced right homology map data for the morphism `F.mapShortComplex.map φ`. -/ @[simps] def RightHomologyMapData.map {φ : S₁ ⟶ S₂} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (ψ : RightHomologyMapData φ h₁ h₂) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h₁.IsPreservedBy F] [h₂.IsPreservedBy F] : RightHomologyMapData (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) where φQ := F.map ψ.φQ φH := F.map ψ.φH commp := by simpa only [F.map_comp] using F.congr_map ψ.commp commg' := by simpa only [RightHomologyData.map_g', F.map_comp] using F.congr_map ψ.commg' commι := by simpa only [F.map_comp] using F.congr_map ψ.commι /-- When a homology data `h` of a short complex `S` is such that both `h.left` and `h.right` are preserved by a functor `F`, this is the induced homology data `h.map F` for the short complex `S.map F`. -/ @[simps] noncomputable def HomologyData.map (h : S.HomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h.left.IsPreservedBy F] [h.right.IsPreservedBy F] : (S.map F).HomologyData where left := h.left.map F right := h.right.map F iso := F.mapIso h.iso comm := by simpa only [F.map_comp] using F.congr_map h.comm /-- Given a homology map data `ψ : HomologyMapData φ h₁ h₂` such that `h₁.left`, `h₁.right`, `h₂.left` and `h₂.right` are all preserved by a functor `F`, this is the induced homology map data for the morphism `F.mapShortComplex.map φ`. -/ @[simps] def HomologyMapData.map {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (ψ : HomologyMapData φ h₁ h₂) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h₁.left.IsPreservedBy F] [h₁.right.IsPreservedBy F] [h₂.left.IsPreservedBy F] [h₂.right.IsPreservedBy F] : HomologyMapData (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) where left := ψ.left.map F right := ψ.right.map F end ShortComplex namespace Functor variable (F : C ⥤ D) [PreservesZeroMorphisms F] (S : ShortComplex C) {S₁ S₂ : ShortComplex C} /-- A functor preserves the left homology of a short complex `S` if it preserves all the left homology data of `S`. -/ class PreservesLeftHomologyOf : Prop where /-- the functor preserves all the left homology data of the short complex -/ isPreservedBy : ∀ (h : S.LeftHomologyData), h.IsPreservedBy F /-- A functor preserves the right homology of a short complex `S` if it preserves all the right homology data of `S`. -/ class PreservesRightHomologyOf : Prop where /-- the functor preserves all the right homology data of the short complex -/ isPreservedBy : ∀ (h : S.RightHomologyData), h.IsPreservedBy F instance PreservesHomology.preservesLeftHomologyOf [F.PreservesHomology] : F.PreservesLeftHomologyOf S := ⟨inferInstance⟩ instance PreservesHomology.preservesRightHomologyOf [F.PreservesHomology] : F.PreservesRightHomologyOf S := ⟨inferInstance⟩ variable {S} /-- If a functor preserves a certain left homology data of a short complex `S`, then it preserves the left homology of `S`. -/ lemma PreservesLeftHomologyOf.mk' (h : S.LeftHomologyData) [h.IsPreservedBy F] : F.PreservesLeftHomologyOf S where isPreservedBy h' := { g := ShortComplex.LeftHomologyData.IsPreservedBy.hg h F f' := by have := ShortComplex.LeftHomologyData.IsPreservedBy.hf' h F let e : parallelPair h.f' 0 ≅ parallelPair h'.f' 0 := parallelPair.ext (Iso.refl _) (ShortComplex.cyclesMapIso' (Iso.refl S) h h') (by simp) (by simp) exact preservesColimit_of_iso_diagram F e } /-- If a functor preserves a certain right homology data of a short complex `S`, then it preserves the right homology of `S`. -/ lemma PreservesRightHomologyOf.mk' (h : S.RightHomologyData) [h.IsPreservedBy F] : F.PreservesRightHomologyOf S where isPreservedBy h' := { f := ShortComplex.RightHomologyData.IsPreservedBy.hf h F g' := by have := ShortComplex.RightHomologyData.IsPreservedBy.hg' h F let e : parallelPair h.g' 0 ≅ parallelPair h'.g' 0 := parallelPair.ext (ShortComplex.opcyclesMapIso' (Iso.refl S) h h') (Iso.refl _) (by simp) (by simp) exact preservesLimit_of_iso_diagram F e } end Functor namespace ShortComplex variable {S : ShortComplex C} (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] instance LeftHomologyData.isPreservedBy_of_preserves [F.PreservesLeftHomologyOf S] : h₁.IsPreservedBy F := Functor.PreservesLeftHomologyOf.isPreservedBy _ instance RightHomologyData.isPreservedBy_of_preserves [F.PreservesRightHomologyOf S] : h₂.IsPreservedBy F := Functor.PreservesRightHomologyOf.isPreservedBy _ variable (S) instance hasLeftHomology_of_preserves [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.map F).HasLeftHomology := HasLeftHomology.mk' (S.leftHomologyData.map F) instance hasLeftHomology_of_preserves' [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (F.mapShortComplex.obj S).HasLeftHomology := by dsimp; infer_instance instance hasRightHomology_of_preserves [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (S.map F).HasRightHomology := HasRightHomology.mk' (S.rightHomologyData.map F) instance hasRightHomology_of_preserves' [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (F.mapShortComplex.obj S).HasRightHomology := by dsimp; infer_instance instance hasHomology_of_preserves [S.HasHomology] [F.PreservesLeftHomologyOf S] [F.PreservesRightHomologyOf S] : (S.map F).HasHomology := HasHomology.mk' (S.homologyData.map F) instance hasHomology_of_preserves' [S.HasHomology] [F.PreservesLeftHomologyOf S] [F.PreservesRightHomologyOf S] : (F.mapShortComplex.obj S).HasHomology := by dsimp; infer_instance section variable (hl : S.LeftHomologyData) (hr : S.RightHomologyData) {S₁ S₂ : ShortComplex C} (φ : S₁ ⟶ S₂) (hl₁ : S₁.LeftHomologyData) (hr₁ : S₁.RightHomologyData) (hl₂ : S₂.LeftHomologyData) (hr₂ : S₂.RightHomologyData) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] namespace LeftHomologyData variable [hl₁.IsPreservedBy F] [hl₂.IsPreservedBy F] lemma map_cyclesMap' : F.map (ShortComplex.cyclesMap' φ hl₁ hl₂) = ShortComplex.cyclesMap' (F.mapShortComplex.map φ) (hl₁.map F) (hl₂.map F) := by have γ : ShortComplex.LeftHomologyMapData φ hl₁ hl₂ := default rw [γ.cyclesMap'_eq, (γ.map F).cyclesMap'_eq, ShortComplex.LeftHomologyMapData.map_φK] lemma map_leftHomologyMap' : F.map (ShortComplex.leftHomologyMap' φ hl₁ hl₂) = ShortComplex.leftHomologyMap' (F.mapShortComplex.map φ) (hl₁.map F) (hl₂.map F) := by have γ : ShortComplex.LeftHomologyMapData φ hl₁ hl₂ := default rw [γ.leftHomologyMap'_eq, (γ.map F).leftHomologyMap'_eq, ShortComplex.LeftHomologyMapData.map_φH] end LeftHomologyData namespace RightHomologyData variable [hr₁.IsPreservedBy F] [hr₂.IsPreservedBy F] lemma map_opcyclesMap' : F.map (ShortComplex.opcyclesMap' φ hr₁ hr₂) = ShortComplex.opcyclesMap' (F.mapShortComplex.map φ) (hr₁.map F) (hr₂.map F) := by have γ : ShortComplex.RightHomologyMapData φ hr₁ hr₂ := default rw [γ.opcyclesMap'_eq, (γ.map F).opcyclesMap'_eq, ShortComplex.RightHomologyMapData.map_φQ] lemma map_rightHomologyMap' : F.map (ShortComplex.rightHomologyMap' φ hr₁ hr₂) = ShortComplex.rightHomologyMap' (F.mapShortComplex.map φ) (hr₁.map F) (hr₂.map F) := by have γ : ShortComplex.RightHomologyMapData φ hr₁ hr₂ := default rw [γ.rightHomologyMap'_eq, (γ.map F).rightHomologyMap'_eq, ShortComplex.RightHomologyMapData.map_φH] end RightHomologyData lemma HomologyData.map_homologyMap' [h₁.left.IsPreservedBy F] [h₁.right.IsPreservedBy F] [h₂.left.IsPreservedBy F] [h₂.right.IsPreservedBy F] : F.map (ShortComplex.homologyMap' φ h₁ h₂) = ShortComplex.homologyMap' (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) := LeftHomologyData.map_leftHomologyMap' _ _ _ _ /-- When a functor `F` preserves the left homology of a short complex `S`, this is the canonical isomorphism `(S.map F).cycles ≅ F.obj S.cycles`. -/ noncomputable def mapCyclesIso [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.map F).cycles ≅ F.obj S.cycles := (S.leftHomologyData.map F).cyclesIso @[reassoc (attr := simp)] lemma mapCyclesIso_hom_iCycles [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.mapCyclesIso F).hom ≫ F.map S.iCycles = (S.map F).iCycles := by apply LeftHomologyData.cyclesIso_hom_comp_i /-- When a functor `F` preserves the left homology of a short complex `S`, this is the canonical isomorphism `(S.map F).leftHomology ≅ F.obj S.leftHomology`. -/ noncomputable def mapLeftHomologyIso [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.map F).leftHomology ≅ F.obj S.leftHomology := (S.leftHomologyData.map F).leftHomologyIso /-- When a functor `F` preserves the right homology of a short complex `S`, this is the canonical isomorphism `(S.map F).opcycles ≅ F.obj S.opcycles`. -/ noncomputable def mapOpcyclesIso [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (S.map F).opcycles ≅ F.obj S.opcycles := (S.rightHomologyData.map F).opcyclesIso /-- When a functor `F` preserves the right homology of a short complex `S`, this is the canonical isomorphism `(S.map F).rightHomology ≅ F.obj S.rightHomology`. -/ noncomputable def mapRightHomologyIso [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (S.map F).rightHomology ≅ F.obj S.rightHomology := (S.rightHomologyData.map F).rightHomologyIso /-- When a functor `F` preserves the left homology of a short complex `S`, this is the canonical isomorphism `(S.map F).homology ≅ F.obj S.homology`. -/ noncomputable def mapHomologyIso [S.HasHomology] [(S.map F).HasHomology] [F.PreservesLeftHomologyOf S] : (S.map F).homology ≅ F.obj S.homology := (S.homologyData.left.map F).homologyIso /-- When a functor `F` preserves the right homology of a short complex `S`, this is the canonical isomorphism `(S.map F).homology ≅ F.obj S.homology`. -/ noncomputable def mapHomologyIso' [S.HasHomology] [(S.map F).HasHomology] [F.PreservesRightHomologyOf S] : (S.map F).homology ≅ F.obj S.homology := (S.homologyData.right.map F).homologyIso ≪≫ F.mapIso S.homologyData.right.homologyIso.symm variable {S} lemma LeftHomologyData.mapCyclesIso_eq [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : S.mapCyclesIso F = (hl.map F).cyclesIso ≪≫ F.mapIso hl.cyclesIso.symm := by ext dsimp [mapCyclesIso, cyclesIso] simp only [map_cyclesMap', ← cyclesMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma LeftHomologyData.mapLeftHomologyIso_eq [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : S.mapLeftHomologyIso F = (hl.map F).leftHomologyIso ≪≫ F.mapIso hl.leftHomologyIso.symm := by ext dsimp [mapLeftHomologyIso, leftHomologyIso] simp only [map_leftHomologyMap', ← leftHomologyMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma RightHomologyData.mapOpcyclesIso_eq [S.HasRightHomology] [F.PreservesRightHomologyOf S] : S.mapOpcyclesIso F = (hr.map F).opcyclesIso ≪≫ F.mapIso hr.opcyclesIso.symm := by ext dsimp [mapOpcyclesIso, opcyclesIso] simp only [map_opcyclesMap', ← opcyclesMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma RightHomologyData.mapRightHomologyIso_eq [S.HasRightHomology] [F.PreservesRightHomologyOf S] : S.mapRightHomologyIso F = (hr.map F).rightHomologyIso ≪≫ F.mapIso hr.rightHomologyIso.symm := by ext dsimp [mapRightHomologyIso, rightHomologyIso] simp only [map_rightHomologyMap', ← rightHomologyMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma LeftHomologyData.mapHomologyIso_eq [S.HasHomology] [(S.map F).HasHomology] [F.PreservesLeftHomologyOf S] : S.mapHomologyIso F = (hl.map F).homologyIso ≪≫ F.mapIso hl.homologyIso.symm := by ext dsimp only [mapHomologyIso, homologyIso, ShortComplex.leftHomologyIso, leftHomologyMapIso', leftHomologyIso, Functor.mapIso, Iso.symm, Iso.trans, Iso.refl] simp only [F.map_comp, map_leftHomologyMap', ← leftHomologyMap'_comp, comp_id, Functor.map_id, Functor.mapShortComplex_obj] lemma RightHomologyData.mapHomologyIso'_eq [S.HasHomology] [(S.map F).HasHomology] [F.PreservesRightHomologyOf S] : S.mapHomologyIso' F = (hr.map F).homologyIso ≪≫ F.mapIso hr.homologyIso.symm := by ext dsimp only [Iso.trans, Iso.symm, Iso.refl, Functor.mapIso, mapHomologyIso', homologyIso, rightHomologyIso, rightHomologyMapIso', ShortComplex.rightHomologyIso] simp only [assoc, F.map_comp, map_rightHomologyMap', ← rightHomologyMap'_comp_assoc] @[reassoc] lemma mapCyclesIso_hom_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : cyclesMap (F.mapShortComplex.map φ) ≫ (S₂.mapCyclesIso F).hom = (S₁.mapCyclesIso F).hom ≫ F.map (cyclesMap φ) := by dsimp only [cyclesMap, mapCyclesIso, LeftHomologyData.cyclesIso, cyclesMapIso', Iso.refl] simp only [LeftHomologyData.map_cyclesMap', Functor.mapShortComplex_obj, ← cyclesMap'_comp, comp_id, id_comp] @[reassoc] lemma mapCyclesIso_inv_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : F.map (cyclesMap φ) ≫ (S₂.mapCyclesIso F).inv = (S₁.mapCyclesIso F).inv ≫ cyclesMap (F.mapShortComplex.map φ) := by rw [← cancel_epi (S₁.mapCyclesIso F).hom, ← mapCyclesIso_hom_naturality_assoc, Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc] @[reassoc] lemma mapLeftHomologyIso_hom_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : leftHomologyMap (F.mapShortComplex.map φ) ≫ (S₂.mapLeftHomologyIso F).hom = (S₁.mapLeftHomologyIso F).hom ≫ F.map (leftHomologyMap φ) := by dsimp only [leftHomologyMap, mapLeftHomologyIso, LeftHomologyData.leftHomologyIso, leftHomologyMapIso', Iso.refl] simp only [LeftHomologyData.map_leftHomologyMap', Functor.mapShortComplex_obj,	← leftHomologyMap'_comp, comp_id, id_comp] @[reassoc] lemma mapLeftHomologyIso_inv_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : F.map (leftHomologyMap φ) ≫ (S₂.mapLeftHomologyIso F).inv = (S₁.mapLeftHomologyIso F).inv ≫ leftHomologyMap (F.mapShortComplex.map φ) := by	Mathlib/Algebra/Homology/ShortComplex/PreservesHomology.lean	520	526
/- Copyright (c) 2022 Jireh Loreaux. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jireh Loreaux -/ import Mathlib.Algebra.Group.Subsemigroup.Basic /-! # Subsemigroups: membership criteria In this file we prove various facts about membership in a subsemigroup. The intent is to mimic `GroupTheory/Submonoid/Membership`, but currently this file is mostly a stub and only provides rudimentary support. * `mem_iSup_of_directed`, `coe_iSup_of_directed`, `mem_sSup_of_directed_on`, `coe_sSup_of_directed_on`: the supremum of a directed collection of subsemigroup is their union. ## TODO * Define the `FreeSemigroup` generated by a set. This might require some rather substantial additions to low-level API. For example, developing the subtype of nonempty lists, then defining a product on nonempty lists, powers where the exponent is a positive natural, et cetera. Another option would be to define the `FreeSemigroup` as the subsemigroup (pushed to be a semigroup) of the `FreeMonoid` consisting of non-identity elements. ## Tags subsemigroup -/ assert_not_exists MonoidWithZero variable {ι : Sort} {M : Type} section NonAssoc variable [Mul M] open Set namespace Subsemigroup -- TODO: this section can be generalized to `[MulMemClass B M] [CompleteLattice B]` -- such that `complete_lattice.le` coincides with `set_like.le` @[to_additive] theorem mem_iSup_of_directed {S : ι → Subsemigroup M} (hS : Directed (· ≤ ·) S) {x : M} : (x ∈ ⨆ i, S i) ↔ ∃ i, x ∈ S i := by refine ⟨?_, fun ⟨i, hi⟩ ↦ le_iSup S i hi⟩ suffices x ∈ closure (⋃ i, (S i : Set M)) → ∃ i, x ∈ S i by simpa only [closure_iUnion, closure_eq (S _)] using this refine fun hx ↦ closure_induction (fun y hy ↦ mem_iUnion.mp hy) ?_ hx rintro x y - - ⟨i, hi⟩ ⟨j, hj⟩ rcases hS i j with ⟨k, hki, hkj⟩ exact ⟨k, (S k).mul_mem (hki hi) (hkj hj)⟩ @[to_additive] theorem coe_iSup_of_directed {S : ι → Subsemigroup M} (hS : Directed (· ≤ ·) S) : ((⨆ i, S i : Subsemigroup M) : Set M) = ⋃ i, S i := Set.ext fun x => by simp [mem_iSup_of_directed hS] @[to_additive] theorem mem_sSup_of_directed_on {S : Set (Subsemigroup M)} (hS : DirectedOn (· ≤ ·) S) {x : M} : x ∈ sSup S ↔ ∃ s ∈ S, x ∈ s := by simp only [sSup_eq_iSup', mem_iSup_of_directed hS.directed_val, SetCoe.exists, Subtype.coe_mk, exists_prop] @[to_additive] theorem coe_sSup_of_directed_on {S : Set (Subsemigroup M)} (hS : DirectedOn (· ≤ ·) S) : (↑(sSup S) : Set M) = ⋃ s ∈ S, ↑s := Set.ext fun x => by simp [mem_sSup_of_directed_on hS] @[to_additive] theorem mem_sup_left {S T : Subsemigroup M} : ∀ {x : M}, x ∈ S → x ∈ S ⊔ T := by have : S ≤ S ⊔ T := le_sup_left tauto	@[to_additive] theorem mem_sup_right {S T : Subsemigroup M} : ∀ {x : M}, x ∈ T → x ∈ S ⊔ T := by	Mathlib/Algebra/Group/Subsemigroup/Membership.lean	75	77
/- 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.CharP.Defs import Mathlib.Algebra.Order.CauSeq.BigOperators import Mathlib.Algebra.Order.Star.Basic import Mathlib.Data.Complex.BigOperators import Mathlib.Data.Complex.Norm import Mathlib.Data.Nat.Choose.Sum /-! # Exponential Function This file contains the definitions of the real and complex exponential function. ## Main definitions * `Complex.exp`: The complex exponential function, defined via its Taylor series * `Real.exp`: The real exponential function, defined as the real part of the complex exponential -/ open CauSeq Finset IsAbsoluteValue open scoped ComplexConjugate namespace Complex theorem isCauSeq_norm_exp (z : ℂ) : IsCauSeq abs fun n => ∑ m ∈ range n, ‖z ^ m / m.factorial‖ := let ⟨n, hn⟩ := exists_nat_gt ‖z‖ have hn0 : (0 : ℝ) < n := lt_of_le_of_lt (norm_nonneg _) hn IsCauSeq.series_ratio_test n (‖z‖ / n) (div_nonneg (norm_nonneg _) (le_of_lt hn0)) (by rwa [div_lt_iff₀ hn0, one_mul]) fun m hm => by rw [abs_norm, abs_norm, Nat.factorial_succ, pow_succ', mul_comm m.succ, Nat.cast_mul, ← div_div, mul_div_assoc, mul_div_right_comm, Complex.norm_mul, Complex.norm_div, norm_natCast] gcongr exact le_trans hm (Nat.le_succ _) @[deprecated (since := "2025-02-16")] alias isCauSeq_abs_exp := isCauSeq_norm_exp noncomputable section theorem isCauSeq_exp (z : ℂ) : IsCauSeq (‖·‖) fun n => ∑ m ∈ range n, z ^ m / m.factorial := (isCauSeq_norm_exp z).of_abv /-- The Cauchy sequence consisting of partial sums of the Taylor series of the complex exponential function -/ @[pp_nodot] def exp' (z : ℂ) : CauSeq ℂ (‖·‖) := ⟨fun n => ∑ m ∈ range n, z ^ m / m.factorial, isCauSeq_exp z⟩ /-- The complex exponential function, defined via its Taylor series -/ @[pp_nodot] def exp (z : ℂ) : ℂ := CauSeq.lim (exp' z) /-- 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 -/ @[pp_nodot] nonrec def exp (x : ℝ) : ℝ := (exp x).re /-- 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 -- ε0 : ε > 0 but goal is _ < ε rcases j with - \| 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 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_cancel₀ 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_norm_exp x) (isCauSeq_exp y) /-- the exponential function as a monoid hom from `Multiplicative ℂ` to `ℂ` -/ @[simps] noncomputable def expMonoidHom : MonoidHom (Multiplicative ℂ) ℂ := { toFun := fun z => exp z.toAdd, 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 theorem exp_multiset_sum (s : Multiset ℂ) : exp s.sum = (s.map exp).prod := @MonoidHom.map_multiset_prod (Multiplicative ℂ) ℂ _ _ expMonoidHom s 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 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] @[simp] theorem exp_ne_zero : exp x ≠ 0 := fun h => zero_ne_one (α := ℂ) <\| by rw [← exp_zero, ← add_neg_cancel x, exp_add, h]; simp theorem exp_neg : exp (-x) = (exp x)⁻¹ := by rw [← mul_right_inj' (exp_ne_zero x), ← exp_add]; simp [mul_inv_cancel₀ (exp_ne_zero x)] theorem exp_sub : exp (x - y) = exp x / exp y := by simp [sub_eq_add_neg, exp_add, exp_neg, div_eq_mul_inv] 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] @[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] @[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] @[simp, norm_cast] theorem ofReal_exp (x : ℝ) : (Real.exp x : ℂ) = exp x := ofReal_exp_ofReal_re _ @[simp] theorem exp_ofReal_im (x : ℝ) : (exp x).im = 0 := by rw [← ofReal_exp_ofReal_re, ofReal_im] theorem exp_ofReal_re (x : ℝ) : (exp x).re = Real.exp x := rfl end Complex namespace Real open Complex variable (x y : ℝ) @[simp] theorem exp_zero : exp 0 = 1 := by simp [Real.exp] nonrec theorem exp_add : exp (x + y) = exp x * exp y := by simp [exp_add, exp] /-- the exponential function as a monoid hom from `Multiplicative ℝ` to `ℝ` -/ @[simps] noncomputable def expMonoidHom : MonoidHom (Multiplicative ℝ) ℝ := { toFun := fun x => exp x.toAdd, 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 theorem exp_multiset_sum (s : Multiset ℝ) : exp s.sum = (s.map exp).prod := @MonoidHom.map_multiset_prod (Multiplicative ℝ) ℝ _ _ expMonoidHom s 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 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]) @[simp] nonrec theorem exp_ne_zero : exp x ≠ 0 := fun h => exp_ne_zero x <\| by rw [exp, ← ofReal_inj] at h; simp_all nonrec theorem exp_neg : exp (-x) = (exp x)⁻¹ := ofReal_injective <\| by simp [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] 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] 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 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] @[bound] 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))) @[bound] 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 _) lemma exp_abs_le (x : ℝ) : exp \|x\| ≤ exp x + exp (-x) := by cases le_total x 0 <;> simp [abs_of_nonpos, 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))) @[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 @[gcongr, bound] 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 @[simp] theorem exp_le_exp {x y : ℝ} : exp x ≤ exp y ↔ x ≤ y := exp_strictMono.le_iff_le theorem exp_injective : Function.Injective exp := exp_strictMono.injective @[simp] theorem exp_eq_exp {x y : ℝ} : exp x = exp y ↔ x = y := exp_injective.eq_iff @[simp] theorem exp_eq_one_iff : exp x = 1 ↔ x = 0 := exp_injective.eq_iff' exp_zero @[simp] theorem one_lt_exp_iff {x : ℝ} : 1 < exp x ↔ 0 < x := by rw [← exp_zero, exp_lt_exp] @[bound] private alias ⟨_, Bound.one_lt_exp_of_pos⟩ := one_lt_exp_iff @[simp] theorem exp_lt_one_iff {x : ℝ} : exp x < 1 ↔ x < 0 := by rw [← exp_zero, exp_lt_exp] @[simp] theorem exp_le_one_iff {x : ℝ} : exp x ≤ 1 ↔ x ≤ 0 := exp_zero ▸ exp_le_exp @[simp] theorem one_le_exp_iff {x : ℝ} : 1 ≤ exp x ↔ 0 ≤ x := exp_zero ▸ exp_le_exp end Real namespace Complex theorem sum_div_factorial_le {α : Type} [Field α] [LinearOrder α] [IsStrictOrderedRing α] (n j : ℕ) (hn : 0 < n) : (∑ m ∈ range j with n ≤ m, (1 / m.factorial : α)) ≤ n.succ / (n.factorial * n) := calc (∑ m ∈ range j with n ≤ m, (1 / m.factorial : α)) = ∑ m ∈ range (j - n), (1 / ((m + n).factorial : α)) := by refine sum_nbij' (· - n) (· + n) ?_ ?_ ?_ ?_ ?_ <;> simp +contextual [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_cancel₀ h₃, one_mul, mul_comm] _ ≤ n.succ / (n.factorial * n : α) := by gcongr; apply sub_le_self; positivity theorem exp_bound {x : ℂ} (hx : ‖x‖ ≤ 1) {n : ℕ} (hn : 0 < n) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * ((n.succ : ℝ) * (n.factorial * n : ℝ)⁻¹) := by rw [← lim_const (abv := norm) (∑ m ∈ range n, _), exp, sub_eq_add_neg, ← lim_neg, lim_add, ← lim_norm] refine lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * ((n.succ : ℝ) * (n.factorial * n : ℝ)⁻¹) rw [sum_range_sub_sum_range hj] calc ‖∑ m ∈ range j with n ≤ m, (x ^ m / m.factorial : ℂ)‖ = ‖∑ m ∈ range j with n ≤ m, (x ^ n * (x ^ (m - n) / m.factorial) : ℂ)‖ := by refine congr_arg norm (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 ∈ range j with n ≤ m, ‖x ^ n * (x ^ (m - n) / m.factorial)‖ := IsAbsoluteValue.abv_sum norm .. _ ≤ ∑ m ∈ range j with n ≤ m, ‖x‖ ^ n * (1 / m.factorial) := by simp_rw [Complex.norm_mul, Complex.norm_pow, Complex.norm_div, norm_natCast] gcongr rw [Complex.norm_pow] exact pow_le_one₀ (norm_nonneg _) hx _ = ‖x‖ ^ n * ∑ m ∈ range j with n ≤ m, (1 / m.factorial : ℝ) := by simp [abs_mul, abv_pow abs, abs_div, ← mul_sum] _ ≤ ‖x‖ ^ n * (n.succ * (n.factorial * n : ℝ)⁻¹) := by gcongr exact sum_div_factorial_le _ _ hn theorem exp_bound' {x : ℂ} {n : ℕ} (hx : ‖x‖ / n.succ ≤ 1 / 2) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n / n.factorial * 2 := by rw [← lim_const (abv := norm) (∑ m ∈ range n, _), exp, sub_eq_add_neg, ← lim_neg, lim_add, ← lim_norm] refine lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖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 ‖∑ i ∈ range k, x ^ (n + i) / ((n + i).factorial : ℂ)‖ ≤ ∑ i ∈ range k, ‖x ^ (n + i) / ((n + i).factorial : ℂ)‖ := IsAbsoluteValue.abv_sum _ _ _ _ ≤ ∑ i ∈ range k, ‖x‖ ^ (n + i) / (n + i).factorial := by simp [norm_natCast, Complex.norm_pow] _ ≤ ∑ i ∈ range k, ‖x‖ ^ (n + i) / ((n.factorial : ℝ) * (n.succ : ℝ) ^ i) := ?_ _ = ∑ i ∈ range k, ‖x‖ ^ n / n.factorial * (‖x‖ ^ i / (n.succ : ℝ) ^ i) := ?_ _ ≤ ‖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 theorem norm_exp_sub_one_le {x : ℂ} (hx : ‖x‖ ≤ 1) : ‖exp x - 1‖ ≤ 2 * ‖x‖ := calc ‖exp x - 1‖ = ‖exp x - ∑ m ∈ range 1, x ^ m / m.factorial‖ := by simp [sum_range_succ] _ ≤ ‖x‖ ^ 1 * ((Nat.succ 1 : ℝ) * ((Nat.factorial 1) * (1 : ℕ) : ℝ)⁻¹) := (exp_bound hx (by decide)) _ = 2 * ‖x‖ := by simp [two_mul, mul_two, mul_add, mul_comm, add_mul, Nat.factorial] theorem norm_exp_sub_one_sub_id_le {x : ℂ} (hx : ‖x‖ ≤ 1) : ‖exp x - 1 - x‖ ≤ ‖x‖ ^ 2 := calc ‖exp x - 1 - x‖ = ‖exp x - ∑ m ∈ range 2, x ^ m / m.factorial‖ := by simp [sub_eq_add_neg, sum_range_succ_comm, add_assoc, Nat.factorial] _ ≤ ‖x‖ ^ 2 * ((Nat.succ 2 : ℝ) * (Nat.factorial 2 * (2 : ℕ) : ℝ)⁻¹) := (exp_bound hx (by decide)) _ ≤ ‖x‖ ^ 2 * 1 := by gcongr; norm_num [Nat.factorial] _ = ‖x‖ ^ 2 := by rw [mul_one] lemma norm_exp_sub_sum_le_exp_norm_sub_sum (x : ℂ) (n : ℕ) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ Real.exp ‖x‖ - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by rw [← CauSeq.lim_const (abv := norm) (∑ m ∈ range n, _), Complex.exp, sub_eq_add_neg, ← CauSeq.lim_neg, CauSeq.lim_add, ← lim_norm] refine CauSeq.lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] calc ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ _ ≤ (∑ m ∈ range j, ‖x‖ ^ m / m.factorial) - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by rw [sum_range_sub_sum_range hj, sum_range_sub_sum_range hj]	refine (IsAbsoluteValue.abv_sum norm ..).trans_eq ?_	Mathlib/Data/Complex/Exponential.lean	459	459
/- Copyright (c) 2020 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn -/ import Mathlib.MeasureTheory.Measure.Content import Mathlib.MeasureTheory.Group.Prod import Mathlib.Topology.Algebra.Group.Compact /-! # Haar measure In this file we prove the existence of Haar measure for a locally compact Hausdorff topological group. We follow the write-up by Jonathan Gleason, Existence and Uniqueness of Haar Measure. This is essentially the same argument as in https://en.wikipedia.org/wiki/Haar_measure#A_construction_using_compact_subsets. We construct the Haar measure first on compact sets. For this we define `(K : U)` as the (smallest) number of left-translates of `U` that are needed to cover `K` (`index` in the formalization). Then we define a function `h` on compact sets as `lim_U (K : U) / (K₀ : U)`, where `U` becomes a smaller and smaller open neighborhood of `1`, and `K₀` is a fixed compact set with nonempty interior. This function is `chaar` in the formalization, and we define the limit formally using Tychonoff's theorem. This function `h` forms a content, which we can extend to an outer measure and then a measure (`haarMeasure`). We normalize the Haar measure so that the measure of `K₀` is `1`. Note that `μ` need not coincide with `h` on compact sets, according to [halmos1950measure, ch. X, §53 p.233]. However, we know that `h(K)` lies between `μ(Kᵒ)` and `μ(K)`, where `ᵒ` denotes the interior. We also give a form of uniqueness of Haar measure, for σ-finite measures on second-countable locally compact groups. For more involved statements not assuming second-countability, see the file `Mathlib/MeasureTheory/Measure/Haar/Unique.lean`. ## Main Declarations * `haarMeasure`: the Haar measure on a locally compact Hausdorff group. This is a left invariant regular measure. It takes as argument a compact set of the group (with non-empty interior), and is normalized so that the measure of the given set is 1. * `haarMeasure_self`: the Haar measure is normalized. * `isMulLeftInvariant_haarMeasure`: the Haar measure is left invariant. * `regular_haarMeasure`: the Haar measure is a regular measure. * `isHaarMeasure_haarMeasure`: the Haar measure satisfies the `IsHaarMeasure` typeclass, i.e., it is invariant and gives finite mass to compact sets and positive mass to nonempty open sets. * `haar` : some choice of a Haar measure, on a locally compact Hausdorff group, constructed as `haarMeasure K` where `K` is some arbitrary choice of a compact set with nonempty interior. * `haarMeasure_unique`: Every σ-finite left invariant measure on a second-countable locally compact Hausdorff group is a scalar multiple of the Haar measure. ## References * Paul Halmos (1950), Measure Theory, §53 * Jonathan Gleason, Existence and Uniqueness of Haar Measure - Note: step 9, page 8 contains a mistake: the last defined `μ` does not extend the `μ` on compact sets, see Halmos (1950) p. 233, bottom of the page. This makes some other steps (like step 11) invalid. * https://en.wikipedia.org/wiki/Haar_measure -/ noncomputable section open Set Inv Function TopologicalSpace MeasurableSpace open scoped NNReal ENNReal Pointwise Topology namespace MeasureTheory namespace Measure section Group variable {G : Type} [Group G] /-! We put the internal functions in the construction of the Haar measure in a namespace, so that the chosen names don't clash with other declarations. We first define a couple of the functions before proving the properties (that require that `G` is a topological group). -/ namespace haar /-- The index or Haar covering number or ratio of `K` w.r.t. `V`, denoted `(K : V)`: it is the smallest number of (left) translates of `V` that is necessary to cover `K`. It is defined to be 0 if no finite number of translates cover `K`. -/ @[to_additive addIndex "additive version of `MeasureTheory.Measure.haar.index`"] noncomputable def index (K V : Set G) : ℕ := sInf <\| Finset.card '' { t : Finset G \| K ⊆ ⋃ g ∈ t, (fun h => g h) ⁻¹' V } @[to_additive addIndex_empty] theorem index_empty {V : Set G} : index ∅ V = 0 := by simp [index] variable [TopologicalSpace G] /-- `prehaar K₀ U K` is a weighted version of the index, defined as `(K : U)/(K₀ : U)`. In the applications `K₀` is compact with non-empty interior, `U` is open containing `1`, and `K` is any compact set. The argument `K` is a (bundled) compact set, so that we can consider `prehaar K₀ U` as an element of `haarProduct` (below). -/ @[to_additive "additive version of `MeasureTheory.Measure.haar.prehaar`"] noncomputable def prehaar (K₀ U : Set G) (K : Compacts G) : ℝ := (index (K : Set G) U : ℝ) / index K₀ U @[to_additive] theorem prehaar_empty (K₀ : PositiveCompacts G) {U : Set G} : prehaar (K₀ : Set G) U ⊥ = 0 := by rw [prehaar, Compacts.coe_bot, index_empty, Nat.cast_zero, zero_div] @[to_additive] theorem prehaar_nonneg (K₀ : PositiveCompacts G) {U : Set G} (K : Compacts G) : 0 ≤ prehaar (K₀ : Set G) U K := by apply div_nonneg <;> norm_cast <;> apply zero_le /-- `haarProduct K₀` is the product of intervals `[0, (K : K₀)]`, for all compact sets `K`. For all `U`, we can show that `prehaar K₀ U ∈ haarProduct K₀`. -/ @[to_additive "additive version of `MeasureTheory.Measure.haar.haarProduct`"] def haarProduct (K₀ : Set G) : Set (Compacts G → ℝ) := pi univ fun K => Icc 0 <\| index (K : Set G) K₀ @[to_additive (attr := simp)] theorem mem_prehaar_empty {K₀ : Set G} {f : Compacts G → ℝ} : f ∈ haarProduct K₀ ↔ ∀ K : Compacts G, f K ∈ Icc (0 : ℝ) (index (K : Set G) K₀) := by simp only [haarProduct, Set.pi, forall_prop_of_true, mem_univ, mem_setOf_eq] /-- The closure of the collection of elements of the form `prehaar K₀ U`, for `U` open neighbourhoods of `1`, contained in `V`. The closure is taken in the space `compacts G → ℝ`, with the topology of pointwise convergence. We show that the intersection of all these sets is nonempty, and the Haar measure on compact sets is defined to be an element in the closure of this intersection. -/ @[to_additive "additive version of `MeasureTheory.Measure.haar.clPrehaar`"] def clPrehaar (K₀ : Set G) (V : OpenNhdsOf (1 : G)) : Set (Compacts G → ℝ) := closure <\| prehaar K₀ '' { U : Set G \| U ⊆ V.1 ∧ IsOpen U ∧ (1 : G) ∈ U } variable [IsTopologicalGroup G] /-! ### Lemmas about `index` -/ /-- If `K` is compact and `V` has nonempty interior, then the index `(K : V)` is well-defined, there is a finite set `t` satisfying the desired properties. -/ @[to_additive addIndex_defined "If `K` is compact and `V` has nonempty interior, then the index `(K : V)` is well-defined, there is a finite set `t` satisfying the desired properties."] theorem index_defined {K V : Set G} (hK : IsCompact K) (hV : (interior V).Nonempty) : ∃ n : ℕ, n ∈ Finset.card '' { t : Finset G \| K ⊆ ⋃ g ∈ t, (fun h => g * h) ⁻¹' V } := by rcases compact_covered_by_mul_left_translates hK hV with ⟨t, ht⟩; exact ⟨t.card, t, ht, rfl⟩ @[to_additive addIndex_elim] theorem index_elim {K V : Set G} (hK : IsCompact K) (hV : (interior V).Nonempty) : ∃ t : Finset G, (K ⊆ ⋃ g ∈ t, (fun h => g * h) ⁻¹' V) ∧ Finset.card t = index K V := by have := Nat.sInf_mem (index_defined hK hV); rwa [mem_image] at this @[to_additive le_addIndex_mul] theorem le_index_mul (K₀ : PositiveCompacts G) (K : Compacts G) {V : Set G} (hV : (interior V).Nonempty) : index (K : Set G) V ≤ index (K : Set G) K₀ * index (K₀ : Set G) V := by classical obtain ⟨s, h1s, h2s⟩ := index_elim K.isCompact K₀.interior_nonempty obtain ⟨t, h1t, h2t⟩ := index_elim K₀.isCompact hV rw [← h2s, ← h2t, mul_comm] refine le_trans ?_ Finset.card_mul_le apply Nat.sInf_le; refine ⟨_, ?_, rfl⟩; rw [mem_setOf_eq]; refine Subset.trans h1s ?_ apply iUnion₂_subset; intro g₁ hg₁; rw [preimage_subset_iff]; intro g₂ hg₂ have := h1t hg₂ rcases this with ⟨_, ⟨g₃, rfl⟩, A, ⟨hg₃, rfl⟩, h2V⟩; rw [mem_preimage, ← mul_assoc] at h2V exact mem_biUnion (Finset.mul_mem_mul hg₃ hg₁) h2V @[to_additive addIndex_pos] theorem index_pos (K : PositiveCompacts G) {V : Set G} (hV : (interior V).Nonempty) : 0 < index (K : Set G) V := by classical rw [index, Nat.sInf_def, Nat.find_pos, mem_image] · rintro ⟨t, h1t, h2t⟩; rw [Finset.card_eq_zero] at h2t; subst h2t obtain ⟨g, hg⟩ := K.interior_nonempty show g ∈ (∅ : Set G) convert h1t (interior_subset hg); symm simp only [Finset.not_mem_empty, iUnion_of_empty, iUnion_empty] · exact index_defined K.isCompact hV @[to_additive addIndex_mono] theorem index_mono {K K' V : Set G} (hK' : IsCompact K') (h : K ⊆ K') (hV : (interior V).Nonempty) : index K V ≤ index K' V := by rcases index_elim hK' hV with ⟨s, h1s, h2s⟩ apply Nat.sInf_le; rw [mem_image]; exact ⟨s, Subset.trans h h1s, h2s⟩ @[to_additive addIndex_union_le] theorem index_union_le (K₁ K₂ : Compacts G) {V : Set G} (hV : (interior V).Nonempty) : index (K₁.1 ∪ K₂.1) V ≤ index K₁.1 V + index K₂.1 V := by classical rcases index_elim K₁.2 hV with ⟨s, h1s, h2s⟩ rcases index_elim K₂.2 hV with ⟨t, h1t, h2t⟩ rw [← h2s, ← h2t] refine le_trans ?_ (Finset.card_union_le _ _) apply Nat.sInf_le; refine ⟨_, ?_, rfl⟩; rw [mem_setOf_eq] apply union_subset <;> refine Subset.trans (by assumption) ?_ <;> apply biUnion_subset_biUnion_left <;> intro g hg <;> simp only [mem_def] at hg <;> simp only [mem_def, Multiset.mem_union, Finset.union_val, hg, or_true, true_or] @[to_additive addIndex_union_eq] theorem index_union_eq (K₁ K₂ : Compacts G) {V : Set G} (hV : (interior V).Nonempty) (h : Disjoint (K₁.1 * V⁻¹) (K₂.1 * V⁻¹)) : index (K₁.1 ∪ K₂.1) V = index K₁.1 V + index K₂.1 V := by classical apply le_antisymm (index_union_le K₁ K₂ hV) rcases index_elim (K₁.2.union K₂.2) hV with ⟨s, h1s, h2s⟩; rw [← h2s] have (K : Set G) (hK : K ⊆ ⋃ g ∈ s, (g * ·) ⁻¹' V) : index K V ≤ {g ∈ s \| ((g * ·) ⁻¹' V ∩ K).Nonempty}.card := by apply Nat.sInf_le; refine ⟨_, ?_, rfl⟩; rw [mem_setOf_eq] intro g hg; rcases hK hg with ⟨_, ⟨g₀, rfl⟩, _, ⟨h1g₀, rfl⟩, h2g₀⟩ simp only [mem_preimage] at h2g₀ simp only [mem_iUnion]; use g₀; constructor; swap · simp only [Finset.mem_filter, h1g₀, true_and]; use g simp [hg, h2g₀] exact h2g₀ refine le_trans (add_le_add (this K₁.1 <\| Subset.trans subset_union_left h1s) (this K₂.1 <\| Subset.trans subset_union_right h1s)) ?_ rw [← Finset.card_union_of_disjoint, Finset.filter_union_right] · exact s.card_filter_le _ apply Finset.disjoint_filter.mpr rintro g₁ _ ⟨g₂, h1g₂, h2g₂⟩ ⟨g₃, h1g₃, h2g₃⟩ simp only [mem_preimage] at h1g₃ h1g₂ refine h.le_bot (?_ : g₁⁻¹ ∈ _) constructor <;> simp only [Set.mem_inv, Set.mem_mul, exists_exists_and_eq_and, exists_and_left] · refine ⟨_, h2g₂, (g₁ * g₂)⁻¹, ?_, ?_⟩ · simp only [inv_inv, h1g₂] · simp only [mul_inv_rev, mul_inv_cancel_left] · refine ⟨_, h2g₃, (g₁ * g₃)⁻¹, ?_, ?_⟩ · simp only [inv_inv, h1g₃] · simp only [mul_inv_rev, mul_inv_cancel_left] @[to_additive add_left_addIndex_le] theorem mul_left_index_le {K : Set G} (hK : IsCompact K) {V : Set G} (hV : (interior V).Nonempty) (g : G) : index ((fun h => g * h) '' K) V ≤ index K V := by rcases index_elim hK hV with ⟨s, h1s, h2s⟩; rw [← h2s] apply Nat.sInf_le; rw [mem_image] refine ⟨s.map (Equiv.mulRight g⁻¹).toEmbedding, ?_, Finset.card_map _⟩ simp only [mem_setOf_eq]; refine Subset.trans (image_subset _ h1s) ?_ rintro _ ⟨g₁, ⟨_, ⟨g₂, rfl⟩, ⟨_, ⟨hg₂, rfl⟩, hg₁⟩⟩, rfl⟩ simp only [mem_preimage] at hg₁ simp only [exists_prop, mem_iUnion, Finset.mem_map, Equiv.coe_mulRight, exists_exists_and_eq_and, mem_preimage, Equiv.toEmbedding_apply] refine ⟨_, hg₂, ?_⟩; simp only [mul_assoc, hg₁, inv_mul_cancel_left] @[to_additive is_left_invariant_addIndex] theorem is_left_invariant_index {K : Set G} (hK : IsCompact K) (g : G) {V : Set G} (hV : (interior V).Nonempty) : index ((fun h => g * h) '' K) V = index K V := by refine le_antisymm (mul_left_index_le hK hV g) ?_ convert mul_left_index_le (hK.image <\| continuous_mul_left g) hV g⁻¹ rw [image_image]; symm; convert image_id' _ with h; apply inv_mul_cancel_left /-! ### Lemmas about `prehaar` -/ @[to_additive add_prehaar_le_addIndex] theorem prehaar_le_index (K₀ : PositiveCompacts G) {U : Set G} (K : Compacts G) (hU : (interior U).Nonempty) : prehaar (K₀ : Set G) U K ≤ index (K : Set G) K₀ := by unfold prehaar; rw [div_le_iff₀] <;> norm_cast · apply le_index_mul K₀ K hU · exact index_pos K₀ hU @[to_additive] theorem prehaar_pos (K₀ : PositiveCompacts G) {U : Set G} (hU : (interior U).Nonempty) {K : Set G} (h1K : IsCompact K) (h2K : (interior K).Nonempty) : 0 < prehaar (K₀ : Set G) U ⟨K, h1K⟩ := by apply div_pos <;> norm_cast · apply index_pos ⟨⟨K, h1K⟩, h2K⟩ hU · exact index_pos K₀ hU @[to_additive] theorem prehaar_mono {K₀ : PositiveCompacts G} {U : Set G} (hU : (interior U).Nonempty) {K₁ K₂ : Compacts G} (h : (K₁ : Set G) ⊆ K₂.1) : prehaar (K₀ : Set G) U K₁ ≤ prehaar (K₀ : Set G) U K₂ := by simp only [prehaar]; rw [div_le_div_iff_of_pos_right] · exact mod_cast index_mono K₂.2 h hU · exact mod_cast index_pos K₀ hU @[to_additive] theorem prehaar_self {K₀ : PositiveCompacts G} {U : Set G} (hU : (interior U).Nonempty) : prehaar (K₀ : Set G) U K₀.toCompacts = 1 := div_self <\| ne_of_gt <\| mod_cast index_pos K₀ hU @[to_additive] theorem prehaar_sup_le {K₀ : PositiveCompacts G} {U : Set G} (K₁ K₂ : Compacts G) (hU : (interior U).Nonempty) : prehaar (K₀ : Set G) U (K₁ ⊔ K₂) ≤ prehaar (K₀ : Set G) U K₁ + prehaar (K₀ : Set G) U K₂ := by simp only [prehaar]; rw [div_add_div_same, div_le_div_iff_of_pos_right] · exact mod_cast index_union_le K₁ K₂ hU · exact mod_cast index_pos K₀ hU @[to_additive] theorem prehaar_sup_eq {K₀ : PositiveCompacts G} {U : Set G} {K₁ K₂ : Compacts G} (hU : (interior U).Nonempty) (h : Disjoint (K₁.1 * U⁻¹) (K₂.1 * U⁻¹)) : prehaar (K₀ : Set G) U (K₁ ⊔ K₂) = prehaar (K₀ : Set G) U K₁ + prehaar (K₀ : Set G) U K₂ := by simp only [prehaar]; rw [div_add_div_same] -- Porting note: Here was `congr`, but `to_additive` failed to generate a theorem.	refine congr_arg (fun x : ℝ => x / index K₀ U) ?_ exact mod_cast index_union_eq K₁ K₂ hU h @[to_additive] theorem is_left_invariant_prehaar {K₀ : PositiveCompacts G} {U : Set G} (hU : (interior U).Nonempty)	Mathlib/MeasureTheory/Measure/Haar/Basic.lean	302	306
/- 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.Data.ENNReal.Basic /-! # Maps between real and extended non-negative real numbers This file focuses on the functions `ENNReal.toReal : ℝ≥0∞ → ℝ` and `ENNReal.ofReal : ℝ → ℝ≥0∞` which were defined in `Data.ENNReal.Basic`. It collects all the basic results of the interactions between these functions and the algebraic and lattice operations, although a few may appear in earlier files. This file provides a `positivity` extension for `ENNReal.ofReal`. # Main theorems - `trichotomy (p : ℝ≥0∞) : p = 0 ∨ p = ∞ ∨ 0 < p.toReal`: often used for `WithLp` and `lp` - `dichotomy (p : ℝ≥0∞) [Fact (1 ≤ p)] : p = ∞ ∨ 1 ≤ p.toReal`: often used for `WithLp` and `lp` - `toNNReal_iInf` through `toReal_sSup`: these declarations allow for easy conversions between indexed or set infima and suprema in `ℝ`, `ℝ≥0` and `ℝ≥0∞`. This is especially useful because `ℝ≥0∞` is a complete lattice. -/ assert_not_exists Finset open Set NNReal ENNReal namespace ENNReal section Real variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} theorem toReal_add (ha : a ≠ ∞) (hb : b ≠ ∞) : (a + b).toReal = a.toReal + b.toReal := by lift a to ℝ≥0 using ha lift b to ℝ≥0 using hb rfl theorem toReal_add_le : (a + b).toReal ≤ a.toReal + b.toReal := if ha : a = ∞ then by simp only [ha, top_add, toReal_top, zero_add, toReal_nonneg] else if hb : b = ∞ then by simp only [hb, add_top, toReal_top, add_zero, toReal_nonneg] else le_of_eq (toReal_add ha hb) theorem ofReal_add {p q : ℝ} (hp : 0 ≤ p) (hq : 0 ≤ q) : ENNReal.ofReal (p + q) = ENNReal.ofReal p + ENNReal.ofReal q := by rw [ENNReal.ofReal, ENNReal.ofReal, ENNReal.ofReal, ← coe_add, coe_inj, Real.toNNReal_add hp hq] theorem ofReal_add_le {p q : ℝ} : ENNReal.ofReal (p + q) ≤ ENNReal.ofReal p + ENNReal.ofReal q := coe_le_coe.2 Real.toNNReal_add_le @[simp] theorem toReal_le_toReal (ha : a ≠ ∞) (hb : b ≠ ∞) : a.toReal ≤ b.toReal ↔ a ≤ b := by lift a to ℝ≥0 using ha lift b to ℝ≥0 using hb norm_cast @[gcongr] theorem toReal_mono (hb : b ≠ ∞) (h : a ≤ b) : a.toReal ≤ b.toReal := (toReal_le_toReal (ne_top_of_le_ne_top hb h) hb).2 h theorem toReal_mono' (h : a ≤ b) (ht : b = ∞ → a = ∞) : a.toReal ≤ b.toReal := by rcases eq_or_ne a ∞ with rfl \| ha · exact toReal_nonneg · exact toReal_mono (mt ht ha) h @[simp] theorem toReal_lt_toReal (ha : a ≠ ∞) (hb : b ≠ ∞) : a.toReal < b.toReal ↔ a < b := by lift a to ℝ≥0 using ha lift b to ℝ≥0 using hb norm_cast @[gcongr] theorem toReal_strict_mono (hb : b ≠ ∞) (h : a < b) : a.toReal < b.toReal := (toReal_lt_toReal h.ne_top hb).2 h @[gcongr] theorem toNNReal_mono (hb : b ≠ ∞) (h : a ≤ b) : a.toNNReal ≤ b.toNNReal := toReal_mono hb h theorem le_toNNReal_of_coe_le (h : p ≤ a) (ha : a ≠ ∞) : p ≤ a.toNNReal := @toNNReal_coe p ▸ toNNReal_mono ha h @[simp] theorem toNNReal_le_toNNReal (ha : a ≠ ∞) (hb : b ≠ ∞) : a.toNNReal ≤ b.toNNReal ↔ a ≤ b := ⟨fun h => by rwa [← coe_toNNReal ha, ← coe_toNNReal hb, coe_le_coe], toNNReal_mono hb⟩ @[gcongr] theorem toNNReal_strict_mono (hb : b ≠ ∞) (h : a < b) : a.toNNReal < b.toNNReal := by simpa [← ENNReal.coe_lt_coe, hb, h.ne_top] @[simp] theorem toNNReal_lt_toNNReal (ha : a ≠ ∞) (hb : b ≠ ∞) : a.toNNReal < b.toNNReal ↔ a < b := ⟨fun h => by rwa [← coe_toNNReal ha, ← coe_toNNReal hb, coe_lt_coe], toNNReal_strict_mono hb⟩ theorem toNNReal_lt_of_lt_coe (h : a < p) : a.toNNReal < p := @toNNReal_coe p ▸ toNNReal_strict_mono coe_ne_top h theorem toReal_max (hr : a ≠ ∞) (hp : b ≠ ∞) : ENNReal.toReal (max a b) = max (ENNReal.toReal a) (ENNReal.toReal b) := (le_total a b).elim (fun h => by simp only [h, ENNReal.toReal_mono hp h, max_eq_right]) fun h => by simp only [h, ENNReal.toReal_mono hr h, max_eq_left] theorem toReal_min {a b : ℝ≥0∞} (hr : a ≠ ∞) (hp : b ≠ ∞) : ENNReal.toReal (min a b) = min (ENNReal.toReal a) (ENNReal.toReal b) := (le_total a b).elim (fun h => by simp only [h, ENNReal.toReal_mono hp h, min_eq_left]) fun h => by simp only [h, ENNReal.toReal_mono hr h, min_eq_right] theorem toReal_sup {a b : ℝ≥0∞} : a ≠ ∞ → b ≠ ∞ → (a ⊔ b).toReal = a.toReal ⊔ b.toReal := toReal_max theorem toReal_inf {a b : ℝ≥0∞} : a ≠ ∞ → b ≠ ∞ → (a ⊓ b).toReal = a.toReal ⊓ b.toReal := toReal_min theorem toNNReal_pos_iff : 0 < a.toNNReal ↔ 0 < a ∧ a < ∞ := by induction a <;> simp theorem toNNReal_pos {a : ℝ≥0∞} (ha₀ : a ≠ 0) (ha_top : a ≠ ∞) : 0 < a.toNNReal := toNNReal_pos_iff.mpr ⟨bot_lt_iff_ne_bot.mpr ha₀, lt_top_iff_ne_top.mpr ha_top⟩ theorem toReal_pos_iff : 0 < a.toReal ↔ 0 < a ∧ a < ∞ := NNReal.coe_pos.trans toNNReal_pos_iff theorem toReal_pos {a : ℝ≥0∞} (ha₀ : a ≠ 0) (ha_top : a ≠ ∞) : 0 < a.toReal := toReal_pos_iff.mpr ⟨bot_lt_iff_ne_bot.mpr ha₀, lt_top_iff_ne_top.mpr ha_top⟩ @[gcongr, bound] theorem ofReal_le_ofReal {p q : ℝ} (h : p ≤ q) : ENNReal.ofReal p ≤ ENNReal.ofReal q := by simp [ENNReal.ofReal, Real.toNNReal_le_toNNReal h] theorem ofReal_le_of_le_toReal {a : ℝ} {b : ℝ≥0∞} (h : a ≤ ENNReal.toReal b) : ENNReal.ofReal a ≤ b := (ofReal_le_ofReal h).trans ofReal_toReal_le @[simp] theorem ofReal_le_ofReal_iff {p q : ℝ} (h : 0 ≤ q) : ENNReal.ofReal p ≤ ENNReal.ofReal q ↔ p ≤ q := by rw [ENNReal.ofReal, ENNReal.ofReal, coe_le_coe, Real.toNNReal_le_toNNReal_iff h] lemma ofReal_le_ofReal_iff' {p q : ℝ} : ENNReal.ofReal p ≤ .ofReal q ↔ p ≤ q ∨ p ≤ 0 := coe_le_coe.trans Real.toNNReal_le_toNNReal_iff' lemma ofReal_lt_ofReal_iff' {p q : ℝ} : ENNReal.ofReal p < .ofReal q ↔ p < q ∧ 0 < q := coe_lt_coe.trans Real.toNNReal_lt_toNNReal_iff' @[simp] theorem ofReal_eq_ofReal_iff {p q : ℝ} (hp : 0 ≤ p) (hq : 0 ≤ q) : ENNReal.ofReal p = ENNReal.ofReal q ↔ p = q := by rw [ENNReal.ofReal, ENNReal.ofReal, coe_inj, Real.toNNReal_eq_toNNReal_iff hp hq] @[simp] theorem ofReal_lt_ofReal_iff {p q : ℝ} (h : 0 < q) : ENNReal.ofReal p < ENNReal.ofReal q ↔ p < q := by rw [ENNReal.ofReal, ENNReal.ofReal, coe_lt_coe, Real.toNNReal_lt_toNNReal_iff h] theorem ofReal_lt_ofReal_iff_of_nonneg {p q : ℝ} (hp : 0 ≤ p) : ENNReal.ofReal p < ENNReal.ofReal q ↔ p < q := by rw [ENNReal.ofReal, ENNReal.ofReal, coe_lt_coe, Real.toNNReal_lt_toNNReal_iff_of_nonneg hp] @[simp] theorem ofReal_pos {p : ℝ} : 0 < ENNReal.ofReal p ↔ 0 < p := by simp [ENNReal.ofReal] @[bound] private alias ⟨_, Bound.ofReal_pos_of_pos⟩ := ofReal_pos @[simp] theorem ofReal_eq_zero {p : ℝ} : ENNReal.ofReal p = 0 ↔ p ≤ 0 := by simp [ENNReal.ofReal] theorem ofReal_ne_zero_iff {r : ℝ} : ENNReal.ofReal r ≠ 0 ↔ 0 < r := by rw [← zero_lt_iff, ENNReal.ofReal_pos] @[simp] theorem zero_eq_ofReal {p : ℝ} : 0 = ENNReal.ofReal p ↔ p ≤ 0 := eq_comm.trans ofReal_eq_zero alias ⟨_, ofReal_of_nonpos⟩ := ofReal_eq_zero @[simp] lemma ofReal_lt_natCast {p : ℝ} {n : ℕ} (hn : n ≠ 0) : ENNReal.ofReal p < n ↔ p < n := by exact mod_cast ofReal_lt_ofReal_iff (Nat.cast_pos.2 hn.bot_lt) @[simp] lemma ofReal_lt_one {p : ℝ} : ENNReal.ofReal p < 1 ↔ p < 1 := by exact mod_cast ofReal_lt_natCast one_ne_zero @[simp] lemma ofReal_lt_ofNat {p : ℝ} {n : ℕ} [n.AtLeastTwo] : ENNReal.ofReal p < ofNat(n) ↔ p < OfNat.ofNat n := ofReal_lt_natCast (NeZero.ne n) @[simp] lemma natCast_le_ofReal {n : ℕ} {p : ℝ} (hn : n ≠ 0) : n ≤ ENNReal.ofReal p ↔ n ≤ p := by simp only [← not_lt, ofReal_lt_natCast hn] @[simp] lemma one_le_ofReal {p : ℝ} : 1 ≤ ENNReal.ofReal p ↔ 1 ≤ p := by exact mod_cast natCast_le_ofReal one_ne_zero @[simp] lemma ofNat_le_ofReal {n : ℕ} [n.AtLeastTwo] {p : ℝ} : ofNat(n) ≤ ENNReal.ofReal p ↔ OfNat.ofNat n ≤ p := natCast_le_ofReal (NeZero.ne n) @[simp, norm_cast] lemma ofReal_le_natCast {r : ℝ} {n : ℕ} : ENNReal.ofReal r ≤ n ↔ r ≤ n := coe_le_coe.trans Real.toNNReal_le_natCast @[simp] lemma ofReal_le_one {r : ℝ} : ENNReal.ofReal r ≤ 1 ↔ r ≤ 1 := coe_le_coe.trans Real.toNNReal_le_one @[simp] lemma ofReal_le_ofNat {r : ℝ} {n : ℕ} [n.AtLeastTwo] : ENNReal.ofReal r ≤ ofNat(n) ↔ r ≤ OfNat.ofNat n := ofReal_le_natCast @[simp] lemma natCast_lt_ofReal {n : ℕ} {r : ℝ} : n < ENNReal.ofReal r ↔ n < r := coe_lt_coe.trans Real.natCast_lt_toNNReal @[simp] lemma one_lt_ofReal {r : ℝ} : 1 < ENNReal.ofReal r ↔ 1 < r := coe_lt_coe.trans Real.one_lt_toNNReal @[simp] lemma ofNat_lt_ofReal {n : ℕ} [n.AtLeastTwo] {r : ℝ} : ofNat(n) < ENNReal.ofReal r ↔ OfNat.ofNat n < r := natCast_lt_ofReal @[simp] lemma ofReal_eq_natCast {r : ℝ} {n : ℕ} (h : n ≠ 0) : ENNReal.ofReal r = n ↔ r = n := ENNReal.coe_inj.trans <\| Real.toNNReal_eq_natCast h	@[simp] lemma ofReal_eq_one {r : ℝ} : ENNReal.ofReal r = 1 ↔ r = 1 := ENNReal.coe_inj.trans Real.toNNReal_eq_one	Mathlib/Data/ENNReal/Real.lean	237	239
/- Copyright (c) 2018 Louis Carlin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Louis Carlin, Mario Carneiro -/ import Mathlib.Algebra.EuclideanDomain.Defs import Mathlib.Algebra.Ring.Divisibility.Basic import Mathlib.Algebra.Ring.Regular import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Algebra.Ring.Basic /-! # Lemmas about Euclidean domains ## Main statements * `gcd_eq_gcd_ab`: states Bézout's lemma for Euclidean domains. -/ universe u namespace EuclideanDomain variable {R : Type u} variable [EuclideanDomain R] /-- The well founded relation in a Euclidean Domain satisfying `a % b ≺ b` for `b ≠ 0` -/ local infixl:50 " ≺ " => EuclideanDomain.r -- See note [lower instance priority] instance (priority := 100) toMulDivCancelClass : MulDivCancelClass R where mul_div_cancel a b hb := by refine (eq_of_sub_eq_zero ?_).symm by_contra h have := mul_right_not_lt b h rw [sub_mul, mul_comm (_ / _), sub_eq_iff_eq_add'.2 (div_add_mod (a * b) b).symm] at this exact this (mod_lt _ hb) theorem mod_eq_sub_mul_div {R : Type} [EuclideanDomain R] (a b : R) : a % b = a - b (a / b) := calc a % b = b * (a / b) + a % b - b * (a / b) := (add_sub_cancel_left _ _).symm _ = a - b * (a / b) := by rw [div_add_mod] theorem val_dvd_le : ∀ a b : R, b ∣ a → a ≠ 0 → ¬a ≺ b \| _, b, ⟨d, rfl⟩, ha => mul_left_not_lt b (mt (by rintro rfl; exact mul_zero _) ha) @[simp] theorem mod_eq_zero {a b : R} : a % b = 0 ↔ b ∣ a := ⟨fun h => by rw [← div_add_mod a b, h, add_zero] exact dvd_mul_right _ _, fun ⟨c, e⟩ => by rw [e, ← add_left_cancel_iff, div_add_mod, add_zero] haveI := Classical.dec by_cases b0 : b = 0 · simp only [b0, zero_mul] · rw [mul_div_cancel_left₀ _ b0]⟩ @[simp] theorem mod_self (a : R) : a % a = 0 := mod_eq_zero.2 dvd_rfl theorem dvd_mod_iff {a b c : R} (h : c ∣ b) : c ∣ a % b ↔ c ∣ a := by rw [← dvd_add_right (h.mul_right _), div_add_mod] @[simp] theorem mod_one (a : R) : a % 1 = 0 := mod_eq_zero.2 (one_dvd _) @[simp] theorem zero_mod (b : R) : 0 % b = 0 := mod_eq_zero.2 (dvd_zero _) @[simp] theorem zero_div {a : R} : 0 / a = 0 := by_cases (fun a0 : a = 0 => a0.symm ▸ div_zero 0) fun a0 => by simpa only [zero_mul] using mul_div_cancel_right₀ 0 a0 @[simp] theorem div_self {a : R} (a0 : a ≠ 0) : a / a = 1 := by simpa only [one_mul] using mul_div_cancel_right₀ 1 a0 theorem eq_div_of_mul_eq_left {a b c : R} (hb : b ≠ 0) (h : a * b = c) : a = c / b := by rw [← h, mul_div_cancel_right₀ _ hb] theorem eq_div_of_mul_eq_right {a b c : R} (ha : a ≠ 0) (h : a * b = c) : b = c / a := by rw [← h, mul_div_cancel_left₀ _ ha] theorem mul_div_assoc (x : R) {y z : R} (h : z ∣ y) : x * y / z = x * (y / z) := by by_cases hz : z = 0 · subst hz rw [div_zero, div_zero, mul_zero] rcases h with ⟨p, rfl⟩ rw [mul_div_cancel_left₀ _ hz, mul_left_comm, mul_div_cancel_left₀ _ hz] protected theorem mul_div_cancel' {a b : R} (hb : b ≠ 0) (hab : b ∣ a) : b * (a / b) = a := by rw [← mul_div_assoc _ hab, mul_div_cancel_left₀ _ hb] -- This generalizes `Int.div_one`, see note [simp-normal form] @[simp] theorem div_one (p : R) : p / 1 = p := (EuclideanDomain.eq_div_of_mul_eq_left (one_ne_zero' R) (mul_one p)).symm theorem div_dvd_of_dvd {p q : R} (hpq : q ∣ p) : p / q ∣ p := by by_cases hq : q = 0 · rw [hq, zero_dvd_iff] at hpq rw [hpq] exact dvd_zero _ use q rw [mul_comm, ← EuclideanDomain.mul_div_assoc _ hpq, mul_comm, mul_div_cancel_right₀ _ hq] theorem dvd_div_of_mul_dvd {a b c : R} (h : a * b ∣ c) : b ∣ c / a := by rcases eq_or_ne a 0 with (rfl \| ha) · simp only [div_zero, dvd_zero] rcases h with ⟨d, rfl⟩ refine ⟨d, ?_⟩ rw [mul_assoc, mul_div_cancel_left₀ _ ha] section GCD variable [DecidableEq R] @[simp] theorem gcd_zero_right (a : R) : gcd a 0 = a := by rw [gcd] split_ifs with h <;> simp only [h, zero_mod, gcd_zero_left] theorem gcd_val (a b : R) : gcd a b = gcd (b % a) a := by rw [gcd] split_ifs with h <;> [simp only [h, mod_zero, gcd_zero_right]; rfl] theorem gcd_dvd (a b : R) : gcd a b ∣ a ∧ gcd a b ∣ b := GCD.induction a b (fun b => by rw [gcd_zero_left] exact ⟨dvd_zero _, dvd_rfl⟩) fun a b _ ⟨IH₁, IH₂⟩ => by rw [gcd_val] exact ⟨IH₂, (dvd_mod_iff IH₂).1 IH₁⟩ theorem gcd_dvd_left (a b : R) : gcd a b ∣ a := (gcd_dvd a b).left theorem gcd_dvd_right (a b : R) : gcd a b ∣ b := (gcd_dvd a b).right protected theorem gcd_eq_zero_iff {a b : R} : gcd a b = 0 ↔ a = 0 ∧ b = 0 := ⟨fun h => by simpa [h] using gcd_dvd a b, by rintro ⟨rfl, rfl⟩ exact gcd_zero_right _⟩ theorem dvd_gcd {a b c : R} : c ∣ a → c ∣ b → c ∣ gcd a b := GCD.induction a b (fun _ _ H => by simpa only [gcd_zero_left] using H) fun a b _ IH ca cb => by rw [gcd_val] exact IH ((dvd_mod_iff ca).2 cb) ca theorem gcd_eq_left {a b : R} : gcd a b = a ↔ a ∣ b := ⟨fun h => by rw [← h] apply gcd_dvd_right, fun h => by rw [gcd_val, mod_eq_zero.2 h, gcd_zero_left]⟩ @[simp] theorem gcd_one_left (a : R) : gcd 1 a = 1 := gcd_eq_left.2 (one_dvd _) @[simp] theorem gcd_self (a : R) : gcd a a = a := gcd_eq_left.2 dvd_rfl @[simp] theorem xgcdAux_fst (x y : R) : ∀ s t s' t', (xgcdAux x s t y s' t').1 = gcd x y := GCD.induction x y (by intros rw [xgcd_zero_left, gcd_zero_left]) fun x y h IH s t s' t' => by simp only [xgcdAux_rec h, if_neg h, IH] rw [← gcd_val] theorem xgcdAux_val (x y : R) : xgcdAux x 1 0 y 0 1 = (gcd x y, xgcd x y) := by rw [xgcd, ← xgcdAux_fst x y 1 0 0 1] private def P (a b : R) : R × R × R → Prop \| (r, s, t) => (r : R) = a * s + b * t theorem xgcdAux_P (a b : R) {r r' : R} {s t s' t'} (p : P a b (r, s, t)) (p' : P a b (r', s', t')) : P a b (xgcdAux r s t r' s' t') := by induction r, r' using GCD.induction generalizing s t s' t' with \| H0 n => simpa only [xgcd_zero_left] \| H1 _ _ h IH => rw [xgcdAux_rec h] refine IH ?_ p unfold P at p p' ⊢ dsimp rw [mul_sub, mul_sub, add_sub, sub_add_eq_add_sub, ← p', sub_sub, mul_comm _ s, ← mul_assoc, mul_comm _ t, ← mul_assoc, ← add_mul, ← p, mod_eq_sub_mul_div] /-- An explicit version of Bézout's lemma for Euclidean domains. -/ theorem gcd_eq_gcd_ab (a b : R) : (gcd a b : R) = a * gcdA a b + b * gcdB a b := by have := @xgcdAux_P _ _ _ a b a b 1 0 0 1 (by dsimp [P]; rw [mul_one, mul_zero, add_zero]) (by dsimp [P]; rw [mul_one, mul_zero, zero_add]) rwa [xgcdAux_val, xgcd_val] at this -- see Note [lower instance priority] instance (priority := 70) (R : Type) [e : EuclideanDomain R] : NoZeroDivisors R := haveI := Classical.decEq R { eq_zero_or_eq_zero_of_mul_eq_zero := fun {a b} h => or_iff_not_and_not.2 fun h0 => h0.1 <\| by rw [← mul_div_cancel_right₀ a h0.2, h, zero_div] } -- see Note [lower instance priority] instance (priority := 70) (R : Type) [e : EuclideanDomain R] : IsDomain R := { e, NoZeroDivisors.to_isDomain R with } end GCD section LCM variable [DecidableEq R] theorem dvd_lcm_left (x y : R) : x ∣ lcm x y := by_cases (fun hxy : gcd x y = 0 => by rw [lcm, hxy, div_zero] exact dvd_zero _) fun hxy => let ⟨z, hz⟩ := (gcd_dvd x y).2 ⟨z, Eq.symm <\| eq_div_of_mul_eq_left hxy <\| by rw [mul_right_comm, mul_assoc, ← hz]⟩ theorem dvd_lcm_right (x y : R) : y ∣ lcm x y := by_cases (fun hxy : gcd x y = 0 => by rw [lcm, hxy, div_zero] exact dvd_zero _) fun hxy => let ⟨z, hz⟩ := (gcd_dvd x y).1 ⟨z, Eq.symm <\| eq_div_of_mul_eq_right hxy <\| by rw [← mul_assoc, mul_right_comm, ← hz]⟩ theorem lcm_dvd {x y z : R} (hxz : x ∣ z) (hyz : y ∣ z) : lcm x y ∣ z := by rw [lcm] by_cases hxy : gcd x y = 0 · rw [hxy, div_zero] rw [EuclideanDomain.gcd_eq_zero_iff] at hxy rwa [hxy.1] at hxz rcases gcd_dvd x y with ⟨⟨r, hr⟩, ⟨s, hs⟩⟩ suffices x * y ∣ z * gcd x y by obtain ⟨p, hp⟩ := this use p generalize gcd x y = g at hxy hs hp ⊢ subst hs rw [mul_left_comm, mul_div_cancel_left₀ _ hxy, ← mul_left_inj' hxy, hp] rw [← mul_assoc] simp only [mul_right_comm] rw [gcd_eq_gcd_ab, mul_add] apply dvd_add · rw [mul_left_comm] exact mul_dvd_mul_left _ (hyz.mul_right _) · rw [mul_left_comm, mul_comm] exact mul_dvd_mul_left _ (hxz.mul_right _) @[simp] theorem lcm_dvd_iff {x y z : R} : lcm x y ∣ z ↔ x ∣ z ∧ y ∣ z := ⟨fun hz => ⟨(dvd_lcm_left _ _).trans hz, (dvd_lcm_right _ _).trans hz⟩, fun ⟨hxz, hyz⟩ => lcm_dvd hxz hyz⟩ @[simp] theorem lcm_zero_left (x : R) : lcm 0 x = 0 := by rw [lcm, zero_mul, zero_div] @[simp] theorem lcm_zero_right (x : R) : lcm x 0 = 0 := by rw [lcm, mul_zero, zero_div] @[simp] theorem lcm_eq_zero_iff {x y : R} : lcm x y = 0 ↔ x = 0 ∨ y = 0 := by constructor · intro hxy rw [lcm, mul_div_assoc _ (gcd_dvd_right _ _), mul_eq_zero] at hxy apply Or.imp_right _ hxy intro hy by_cases hgxy : gcd x y = 0 · rw [EuclideanDomain.gcd_eq_zero_iff] at hgxy exact hgxy.2 · rcases gcd_dvd x y with ⟨⟨r, hr⟩, ⟨s, hs⟩⟩ generalize gcd x y = g at hr hs hy hgxy ⊢ subst hs rw [mul_div_cancel_left₀ _ hgxy] at hy rw [hy, mul_zero] rintro (hx \| hy) · rw [hx, lcm_zero_left] · rw [hy, lcm_zero_right] @[simp] theorem gcd_mul_lcm (x y : R) : gcd x y * lcm x y = x * y := by rw [lcm]; by_cases h : gcd x y = 0 · rw [h, zero_mul] rw [EuclideanDomain.gcd_eq_zero_iff] at h rw [h.1, zero_mul] rcases gcd_dvd x y with ⟨⟨r, hr⟩, ⟨s, hs⟩⟩ generalize gcd x y = g at h hr ⊢; subst hr rw [mul_assoc, mul_div_cancel_left₀ _ h] end LCM section Div theorem mul_div_mul_cancel {a b c : R} (ha : a ≠ 0) (hcb : c ∣ b) : a * b / (a * c) = b / c := by by_cases hc : c = 0; · simp [hc] refine eq_div_of_mul_eq_right hc (mul_left_cancel₀ ha ?_) rw [← mul_assoc, ← mul_div_assoc _ (mul_dvd_mul_left a hcb), mul_div_cancel_left₀ _ (mul_ne_zero ha hc)] theorem mul_div_mul_comm_of_dvd_dvd {a b c d : R} (hac : c ∣ a) (hbd : d ∣ b) : a * b / (c * d) = a / c * (b / d) := by rcases eq_or_ne c 0 with (rfl \| hc0); · simp rcases eq_or_ne d 0 with (rfl \| hd0); · simp obtain ⟨k1, rfl⟩ := hac obtain ⟨k2, rfl⟩ := hbd rw [mul_div_cancel_left₀ _ hc0, mul_div_cancel_left₀ _ hd0, mul_mul_mul_comm, mul_div_cancel_left₀ _ (mul_ne_zero hc0 hd0)] theorem add_mul_div_left (x y z : R) (h1 : y ≠ 0) (h2 : y ∣ x) : (x + y * z) / y = x / y + z := by rw [eq_comm] apply eq_div_of_mul_eq_right h1 rw [mul_add, EuclideanDomain.mul_div_cancel' h1 h2] theorem add_mul_div_right (x y z : R) (h1 : y ≠ 0) (h2 : y ∣ x) : (x + z * y) / y = x / y + z := by rw [mul_comm z y] exact add_mul_div_left _ _ _ h1 h2 theorem sub_mul_div_left (x y z : R) (h1 : y ≠ 0) (h2 : y ∣ x) : (x - y * z) / y = x / y - z := by rw [eq_comm] apply eq_div_of_mul_eq_right h1 rw [mul_sub, EuclideanDomain.mul_div_cancel' h1 h2] theorem sub_mul_div_right (x y z : R) (h1 : y ≠ 0) (h2 : y ∣ x) : (x - z * y) / y = x / y - z := by rw [mul_comm z y] exact sub_mul_div_left _ _ _ h1 h2 theorem mul_add_div_left (x y z : R) (h1 : z ≠ 0) (h2 : z ∣ y) : (z * x + y) / z = x + y / z := by	rw [eq_comm] apply eq_div_of_mul_eq_right h1 rw [mul_add, EuclideanDomain.mul_div_cancel' h1 h2] theorem mul_add_div_right (x y z : R) (h1 : z ≠ 0) (h2 : z ∣ y) : (x * z + y) / z = x + y / z := by	Mathlib/Algebra/EuclideanDomain/Basic.lean	340	344
/- Copyright (c) 2021 Yakov Pechersky. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yakov Pechersky -/ import Mathlib.Algebra.Order.Group.Nat import Mathlib.Data.List.Rotate import Mathlib.GroupTheory.Perm.Support /-! # Permutations from a list A list `l : List α` can be interpreted as an `Equiv.Perm α` where each element in the list is permuted to the next one, defined as `formPerm`. When we have that `Nodup l`, we prove that `Equiv.Perm.support (formPerm l) = l.toFinset`, and that `formPerm l` is rotationally invariant, in `formPerm_rotate`. When there are duplicate elements in `l`, how and in what arrangement with respect to the other elements they appear in the list determines the formed permutation. This is because `List.formPerm` is implemented as a product of `Equiv.swap`s. That means that presence of a sublist of two adjacent duplicates like `[..., x, x, ...]` will produce the same permutation as if the adjacent duplicates were not present. The `List.formPerm` definition is meant to primarily be used with `Nodup l`, so that the resulting permutation is cyclic (if `l` has at least two elements). The presence of duplicates in a particular placement can lead `List.formPerm` to produce a nontrivial permutation that is noncyclic. -/ namespace List variable {α β : Type} section FormPerm variable [DecidableEq α] (l : List α) open Equiv Equiv.Perm /-- A list `l : List α` can be interpreted as an `Equiv.Perm α` where each element in the list is permuted to the next one, defined as `formPerm`. When we have that `Nodup l`, we prove that `Equiv.Perm.support (formPerm l) = l.toFinset`, and that `formPerm l` is rotationally invariant, in `formPerm_rotate`. -/ def formPerm : Equiv.Perm α := (zipWith Equiv.swap l l.tail).prod @[simp] theorem formPerm_nil : formPerm ([] : List α) = 1 := rfl @[simp] theorem formPerm_singleton (x : α) : formPerm [x] = 1 := rfl @[simp] theorem formPerm_cons_cons (x y : α) (l : List α) : formPerm (x :: y :: l) = swap x y formPerm (y :: l) := prod_cons theorem formPerm_pair (x y : α) : formPerm [x, y] = swap x y := rfl theorem mem_or_mem_of_zipWith_swap_prod_ne : ∀ {l l' : List α} {x : α}, (zipWith swap l l').prod x ≠ x → x ∈ l ∨ x ∈ l' \| [], _, _ => by simp \| _, [], _ => by simp \| a::l, b::l', x => fun hx ↦ if h : (zipWith swap l l').prod x = x then (eq_or_eq_of_swap_apply_ne_self (a := a) (b := b) (x := x) (by simpa [h] using hx)).imp (by rintro rfl; exact .head _) (by rintro rfl; exact .head _) else (mem_or_mem_of_zipWith_swap_prod_ne h).imp (.tail _) (.tail _) theorem zipWith_swap_prod_support' (l l' : List α) : { x \| (zipWith swap l l').prod x ≠ x } ≤ l.toFinset ⊔ l'.toFinset := fun _ h ↦ by simpa using mem_or_mem_of_zipWith_swap_prod_ne h theorem zipWith_swap_prod_support [Fintype α] (l l' : List α) : (zipWith swap l l').prod.support ≤ l.toFinset ⊔ l'.toFinset := by intro x hx have hx' : x ∈ { x \| (zipWith swap l l').prod x ≠ x } := by simpa using hx simpa using zipWith_swap_prod_support' _ _ hx' theorem support_formPerm_le' : { x \| formPerm l x ≠ x } ≤ l.toFinset := by refine (zipWith_swap_prod_support' l l.tail).trans ?_ simpa [Finset.subset_iff] using tail_subset l theorem support_formPerm_le [Fintype α] : support (formPerm l) ≤ l.toFinset := by intro x hx have hx' : x ∈ { x \| formPerm l x ≠ x } := by simpa using hx simpa using support_formPerm_le' _ hx' variable {l} {x : α} theorem mem_of_formPerm_apply_ne (h : l.formPerm x ≠ x) : x ∈ l := by simpa [or_iff_left_of_imp mem_of_mem_tail] using mem_or_mem_of_zipWith_swap_prod_ne h theorem formPerm_apply_of_not_mem (h : x ∉ l) : formPerm l x = x := not_imp_comm.1 mem_of_formPerm_apply_ne h theorem formPerm_apply_mem_of_mem (h : x ∈ l) : formPerm l x ∈ l := by rcases l with - \| ⟨y, l⟩ · simp at h induction' l with z l IH generalizing x y · simpa using h · by_cases hx : x ∈ z :: l · rw [formPerm_cons_cons, mul_apply, swap_apply_def] split_ifs · simp [IH _ hx] · simp · simp [] · replace h : x = y := Or.resolve_right (mem_cons.1 h) hx simp [formPerm_apply_of_not_mem hx, ← h] theorem mem_of_formPerm_apply_mem (h : l.formPerm x ∈ l) : x ∈ l := by contrapose h rwa [formPerm_apply_of_not_mem h] @[simp] theorem formPerm_mem_iff_mem : l.formPerm x ∈ l ↔ x ∈ l := ⟨l.mem_of_formPerm_apply_mem, l.formPerm_apply_mem_of_mem⟩ @[simp] theorem formPerm_cons_concat_apply_last (x y : α) (xs : List α) : formPerm (x :: (xs ++ [y])) y = x := by induction' xs with z xs IH generalizing x y · simp · simp [IH] @[simp] theorem formPerm_apply_getLast (x : α) (xs : List α) : formPerm (x :: xs) ((x :: xs).getLast (cons_ne_nil x xs)) = x := by induction' xs using List.reverseRecOn with xs y _ generalizing x <;> simp @[simp] theorem formPerm_apply_getElem_length (x : α) (xs : List α) : formPerm (x :: xs) (x :: xs)[xs.length] = x := by rw [getElem_cons_length rfl, formPerm_apply_getLast] theorem formPerm_apply_head (x y : α) (xs : List α) (h : Nodup (x :: y :: xs)) : formPerm (x :: y :: xs) x = y := by simp [formPerm_apply_of_not_mem h.not_mem] theorem formPerm_apply_getElem_zero (l : List α) (h : Nodup l) (hl : 1 < l.length) : formPerm l l[0] = l[1] := by rcases l with (_ \| ⟨x, _ \| ⟨y, tl⟩⟩) · simp at hl · simp at hl · rw [getElem_cons_zero, formPerm_apply_head _ _ _ h, getElem_cons_succ, getElem_cons_zero] variable (l) theorem formPerm_eq_head_iff_eq_getLast (x y : α) : formPerm (y :: l) x = y ↔ x = getLast (y :: l) (cons_ne_nil _ _) := Iff.trans (by rw [formPerm_apply_getLast]) (formPerm (y :: l)).injective.eq_iff theorem formPerm_apply_lt_getElem (xs : List α) (h : Nodup xs) (n : ℕ) (hn : n + 1 < xs.length) : formPerm xs xs[n] = xs[n + 1] := by induction' n with n IH generalizing xs · simpa using formPerm_apply_getElem_zero _ h _ · rcases xs with (_ \| ⟨x, _ \| ⟨y, l⟩⟩) · simp at hn · rw [formPerm_singleton, getElem_singleton, getElem_singleton, one_apply] · specialize IH (y :: l) h.of_cons _ · simpa [Nat.succ_lt_succ_iff] using hn simp only [swap_apply_eq_iff, coe_mul, formPerm_cons_cons, Function.comp] simp only [getElem_cons_succ] at rw [← IH, swap_apply_of_ne_of_ne] <;> · intro hx rw [← hx, IH] at h simp [getElem_mem] at h theorem formPerm_apply_getElem (xs : List α) (w : Nodup xs) (i : ℕ) (h : i < xs.length) : formPerm xs xs[i] = xs[(i + 1) % xs.length]'(Nat.mod_lt _ (i.zero_le.trans_lt h)) := by rcases xs with - \| ⟨x, xs⟩ · simp at h · have : i ≤ xs.length := by refine Nat.le_of_lt_succ ?_ simpa using h rcases this.eq_or_lt with (rfl \| hn') · simp · rw [formPerm_apply_lt_getElem (x :: xs) w _ (Nat.succ_lt_succ hn')] congr rw [Nat.mod_eq_of_lt]; simpa [Nat.succ_eq_add_one] theorem support_formPerm_of_nodup' (l : List α) (h : Nodup l) (h' : ∀ x : α, l ≠ [x]) : { x \| formPerm l x ≠ x } = l.toFinset := by apply _root_.le_antisymm · exact support_formPerm_le' l · intro x hx simp only [Finset.mem_coe, mem_toFinset] at hx obtain ⟨n, hn, rfl⟩ := getElem_of_mem hx rw [Set.mem_setOf_eq, formPerm_apply_getElem _ h] intro H rw [nodup_iff_injective_get, Function.Injective] at h specialize h H rcases (Nat.succ_le_of_lt hn).eq_or_lt with hn' \| hn' · simp only [← hn', Nat.mod_self] at h refine not_exists.mpr h' ?_ rw [← length_eq_one_iff, ← hn', (Fin.mk.inj_iff.mp h).symm] · simp [Nat.mod_eq_of_lt hn'] at h theorem support_formPerm_of_nodup [Fintype α] (l : List α) (h : Nodup l) (h' : ∀ x : α, l ≠ [x]) : support (formPerm l) = l.toFinset := by rw [← Finset.coe_inj] convert support_formPerm_of_nodup' _ h h' simp [Set.ext_iff] theorem formPerm_rotate_one (l : List α) (h : Nodup l) : formPerm (l.rotate 1) = formPerm l := by have h' : Nodup (l.rotate 1) := by simpa using h ext x by_cases hx : x ∈ l.rotate 1 · obtain ⟨k, hk, rfl⟩ := getElem_of_mem hx rw [formPerm_apply_getElem _ h', getElem_rotate l, getElem_rotate l, formPerm_apply_getElem _ h] simp · rw [formPerm_apply_of_not_mem hx, formPerm_apply_of_not_mem] simpa using hx theorem formPerm_rotate (l : List α) (h : Nodup l) (n : ℕ) : formPerm (l.rotate n) = formPerm l := by induction n with \| zero => simp \| succ n hn => rw [← rotate_rotate, formPerm_rotate_one, hn] rwa [IsRotated.nodup_iff] exact IsRotated.forall l n theorem formPerm_eq_of_isRotated {l l' : List α} (hd : Nodup l) (h : l ~r l') : formPerm l = formPerm l' := by obtain ⟨n, rfl⟩ := h exact (formPerm_rotate l hd n).symm theorem formPerm_append_pair : ∀ (l : List α) (a b : α), formPerm (l ++ [a, b]) = formPerm (l ++ [a]) * swap a b \| [], _, _ => rfl \| [_], _, _ => rfl \| x::y::l, a, b => by simpa [mul_assoc] using formPerm_append_pair (y::l) a b theorem formPerm_reverse : ∀ l : List α, formPerm l.reverse = (formPerm l)⁻¹ \| [] => rfl \| [_] => rfl \| a::b::l => by simp [formPerm_append_pair, swap_comm, ← formPerm_reverse (b::l)] theorem formPerm_pow_apply_getElem (l : List α) (w : Nodup l) (n : ℕ) (i : ℕ) (h : i < l.length) : (formPerm l ^ n) l[i] = l[(i + n) % l.length]'(Nat.mod_lt _ (i.zero_le.trans_lt h)) := by induction n with \| zero => simp [Nat.mod_eq_of_lt h] \| succ n hn => simp [pow_succ', mul_apply, hn, formPerm_apply_getElem _ w, Nat.succ_eq_add_one, ← Nat.add_assoc]	theorem formPerm_pow_apply_head (x : α) (l : List α) (h : Nodup (x :: l)) (n : ℕ) : (formPerm (x :: l) ^ n) x = (x :: l)[(n % (x :: l).length)]'(Nat.mod_lt _ (Nat.zero_lt_succ _)) := by convert formPerm_pow_apply_getElem _ h n 0 (Nat.succ_pos _) simp theorem formPerm_ext_iff {x y x' y' : α} {l l' : List α} (hd : Nodup (x :: y :: l)) (hd' : Nodup (x' :: y' :: l')) : formPerm (x :: y :: l) = formPerm (x' :: y' :: l') ↔ (x :: y :: l) ~r (x' :: y' :: l') := by refine ⟨fun h => ?_, fun hr => formPerm_eq_of_isRotated hd hr⟩ rw [Equiv.Perm.ext_iff] at h have hx : x' ∈ x :: y :: l := by have : x' ∈ { z \| formPerm (x :: y :: l) z ≠ z } := by rw [Set.mem_setOf_eq, h x', formPerm_apply_head _ _ _ hd'] simp only [mem_cons, nodup_cons] at hd' push_neg at hd'	Mathlib/GroupTheory/Perm/List.lean	257	272
/- Copyright (c) 2022 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn, Patrick Massot -/ import Mathlib.Topology.Neighborhoods /-! # Neighborhoods of a set In this file we define the filter `𝓝ˢ s` or `nhdsSet s` consisting of all neighborhoods of a set `s`. ## Main Properties There are a couple different notions equivalent to `s ∈ 𝓝ˢ t`: * `s ⊆ interior t` using `subset_interior_iff_mem_nhdsSet` * `∀ x : X, x ∈ t → s ∈ 𝓝 x` using `mem_nhdsSet_iff_forall` * `∃ U : Set X, IsOpen U ∧ t ⊆ U ∧ U ⊆ s` using `mem_nhdsSet_iff_exists` Furthermore, we have the following results: * `monotone_nhdsSet`: `𝓝ˢ` is monotone * In T₁-spaces, `𝓝ˢ`is strictly monotone and hence injective: `strict_mono_nhdsSet`/`injective_nhdsSet`. These results are in `Mathlib.Topology.Separation`. -/ open Set Filter Topology variable {X Y : Type} [TopologicalSpace X] [TopologicalSpace Y] {f : Filter X} {s t s₁ s₂ t₁ t₂ : Set X} {x : X} theorem nhdsSet_diagonal (X) [TopologicalSpace (X × X)] : 𝓝ˢ (diagonal X) = ⨆ (x : X), 𝓝 (x, x) := by rw [nhdsSet, ← range_diag, ← range_comp] rfl theorem mem_nhdsSet_iff_forall : s ∈ 𝓝ˢ t ↔ ∀ x : X, x ∈ t → s ∈ 𝓝 x := by simp_rw [nhdsSet, Filter.mem_sSup, forall_mem_image] lemma nhdsSet_le : 𝓝ˢ s ≤ f ↔ ∀ x ∈ s, 𝓝 x ≤ f := by simp [nhdsSet] theorem bUnion_mem_nhdsSet {t : X → Set X} (h : ∀ x ∈ s, t x ∈ 𝓝 x) : (⋃ x ∈ s, t x) ∈ 𝓝ˢ s := mem_nhdsSet_iff_forall.2 fun x hx => mem_of_superset (h x hx) <\| subset_iUnion₂ (s := fun x _ => t x) x hx theorem subset_interior_iff_mem_nhdsSet : s ⊆ interior t ↔ t ∈ 𝓝ˢ s := by simp_rw [mem_nhdsSet_iff_forall, subset_interior_iff_nhds] theorem disjoint_principal_nhdsSet : Disjoint (𝓟 s) (𝓝ˢ t) ↔ Disjoint (closure s) t := by rw [disjoint_principal_left, ← subset_interior_iff_mem_nhdsSet, interior_compl, subset_compl_iff_disjoint_left] theorem disjoint_nhdsSet_principal : Disjoint (𝓝ˢ s) (𝓟 t) ↔ Disjoint s (closure t) := by rw [disjoint_comm, disjoint_principal_nhdsSet, disjoint_comm] theorem mem_nhdsSet_iff_exists : s ∈ 𝓝ˢ t ↔ ∃ U : Set X, IsOpen U ∧ t ⊆ U ∧ U ⊆ s := by rw [← subset_interior_iff_mem_nhdsSet, subset_interior_iff] /-- A proposition is true on a set neighborhood of `s` iff it is true on a larger open set -/ theorem eventually_nhdsSet_iff_exists {p : X → Prop} : (∀ᶠ x in 𝓝ˢ s, p x) ↔ ∃ t, IsOpen t ∧ s ⊆ t ∧ ∀ x, x ∈ t → p x := mem_nhdsSet_iff_exists /-- A proposition is true on a set neighborhood of `s` iff it is eventually true near each point in the set. -/ theorem eventually_nhdsSet_iff_forall {p : X → Prop} : (∀ᶠ x in 𝓝ˢ s, p x) ↔ ∀ x, x ∈ s → ∀ᶠ y in 𝓝 x, p y := mem_nhdsSet_iff_forall theorem hasBasis_nhdsSet (s : Set X) : (𝓝ˢ s).HasBasis (fun U => IsOpen U ∧ s ⊆ U) fun U => U := ⟨fun t => by simp [mem_nhdsSet_iff_exists, and_assoc]⟩ @[simp] lemma lift'_nhdsSet_interior (s : Set X) : (𝓝ˢ s).lift' interior = 𝓝ˢ s := (hasBasis_nhdsSet s).lift'_interior_eq_self fun _ ↦ And.left lemma Filter.HasBasis.nhdsSet_interior {ι : Sort} {p : ι → Prop} {s : ι → Set X} {t : Set X} (h : (𝓝ˢ t).HasBasis p s) : (𝓝ˢ t).HasBasis p (interior <\| s ·) := lift'_nhdsSet_interior t ▸ h.lift'_interior theorem IsOpen.mem_nhdsSet (hU : IsOpen s) : s ∈ 𝓝ˢ t ↔ t ⊆ s := by rw [← subset_interior_iff_mem_nhdsSet, hU.interior_eq] /-- An open set belongs to its own set neighborhoods filter. -/ theorem IsOpen.mem_nhdsSet_self (ho : IsOpen s) : s ∈ 𝓝ˢ s := ho.mem_nhdsSet.mpr Subset.rfl theorem principal_le_nhdsSet : 𝓟 s ≤ 𝓝ˢ s := fun _s hs => (subset_interior_iff_mem_nhdsSet.mpr hs).trans interior_subset theorem subset_of_mem_nhdsSet (h : t ∈ 𝓝ˢ s) : s ⊆ t := principal_le_nhdsSet h theorem Filter.Eventually.self_of_nhdsSet {p : X → Prop} (h : ∀ᶠ x in 𝓝ˢ s, p x) : ∀ x ∈ s, p x := principal_le_nhdsSet h nonrec theorem Filter.EventuallyEq.self_of_nhdsSet {Y} {f g : X → Y} (h : f =ᶠ[𝓝ˢ s] g) : EqOn f g s := h.self_of_nhdsSet @[simp] theorem nhdsSet_eq_principal_iff : 𝓝ˢ s = 𝓟 s ↔ IsOpen s := by rw [← principal_le_nhdsSet.le_iff_eq, le_principal_iff, mem_nhdsSet_iff_forall, isOpen_iff_mem_nhds] alias ⟨_, IsOpen.nhdsSet_eq⟩ := nhdsSet_eq_principal_iff @[simp] theorem nhdsSet_interior : 𝓝ˢ (interior s) = 𝓟 (interior s) := isOpen_interior.nhdsSet_eq @[simp] theorem nhdsSet_singleton : 𝓝ˢ {x} = 𝓝 x := by simp [nhdsSet] theorem mem_nhdsSet_interior : s ∈ 𝓝ˢ (interior s) := subset_interior_iff_mem_nhdsSet.mp Subset.rfl @[simp] theorem nhdsSet_empty : 𝓝ˢ (∅ : Set X) = ⊥ := by rw [isOpen_empty.nhdsSet_eq, principal_empty] theorem mem_nhdsSet_empty : s ∈ 𝓝ˢ (∅ : Set X) := by simp @[simp] theorem nhdsSet_univ : 𝓝ˢ (univ : Set X) = ⊤ := by rw [isOpen_univ.nhdsSet_eq, principal_univ] @[gcongr, mono] theorem nhdsSet_mono (h : s ⊆ t) : 𝓝ˢ s ≤ 𝓝ˢ t := sSup_le_sSup <\| image_subset _ h theorem monotone_nhdsSet : Monotone (𝓝ˢ : Set X → Filter X) := fun _ _ => nhdsSet_mono theorem nhds_le_nhdsSet (h : x ∈ s) : 𝓝 x ≤ 𝓝ˢ s := le_sSup <\| mem_image_of_mem _ h @[simp] theorem nhdsSet_union (s t : Set X) : 𝓝ˢ (s ∪ t) = 𝓝ˢ s ⊔ 𝓝ˢ t := by simp only [nhdsSet, image_union, sSup_union] theorem union_mem_nhdsSet (h₁ : s₁ ∈ 𝓝ˢ t₁) (h₂ : s₂ ∈ 𝓝ˢ t₂) : s₁ ∪ s₂ ∈ 𝓝ˢ (t₁ ∪ t₂) := by rw [nhdsSet_union] exact union_mem_sup h₁ h₂ @[simp] theorem nhdsSet_insert (x : X) (s : Set X) : 𝓝ˢ (insert x s) = 𝓝 x ⊔ 𝓝ˢ s := by rw [insert_eq, nhdsSet_union, nhdsSet_singleton] /- This inequality cannot be improved to an equality. For instance, if `X` has two elements and the coarse topology and `s` and `t` are distinct singletons then `𝓝ˢ (s ∩ t) = ⊥` while `𝓝ˢ s ⊓ 𝓝ˢ t = ⊤` and those are different. -/ theorem nhdsSet_inter_le (s t : Set X) : 𝓝ˢ (s ∩ t) ≤ 𝓝ˢ s ⊓ 𝓝ˢ t := (monotone_nhdsSet (X := X)).map_inf_le s t theorem nhdsSet_iInter_le {ι : Sort} (s : ι → Set X) : 𝓝ˢ (⋂ i, s i) ≤ ⨅ i, 𝓝ˢ (s i) := (monotone_nhdsSet (X := X)).map_iInf_le theorem nhdsSet_sInter_le (s : Set (Set X)) : 𝓝ˢ (⋂₀ s) ≤ ⨅ x ∈ s, 𝓝ˢ x := (monotone_nhdsSet (X := X)).map_sInf_le variable (s) in theorem IsClosed.nhdsSet_le_sup (h : IsClosed t) : 𝓝ˢ s ≤ 𝓝ˢ (s ∩ t) ⊔ 𝓟 (tᶜ) := calc 𝓝ˢ s = 𝓝ˢ (s ∩ t ∪ s ∩ tᶜ) := by rw [Set.inter_union_compl s t] _ = 𝓝ˢ (s ∩ t) ⊔ 𝓝ˢ (s ∩ tᶜ) := by rw [nhdsSet_union] _ ≤ 𝓝ˢ (s ∩ t) ⊔ 𝓝ˢ (tᶜ) := sup_le_sup_left (monotone_nhdsSet inter_subset_right) _ _ = 𝓝ˢ (s ∩ t) ⊔ 𝓟 (tᶜ) := by rw [h.isOpen_compl.nhdsSet_eq] variable (s) in theorem IsClosed.nhdsSet_le_sup' (h : IsClosed t) : 𝓝ˢ s ≤ 𝓝ˢ (t ∩ s) ⊔ 𝓟 (tᶜ) := by rw [Set.inter_comm]; exact h.nhdsSet_le_sup s theorem Filter.Eventually.eventually_nhdsSet {p : X → Prop} (h : ∀ᶠ y in 𝓝ˢ s, p y) : ∀ᶠ y in 𝓝ˢ s, ∀ᶠ x in 𝓝 y, p x := eventually_nhdsSet_iff_forall.mpr fun x x_in ↦ (eventually_nhdsSet_iff_forall.mp h x x_in).eventually_nhds theorem Filter.Eventually.union_nhdsSet {p : X → Prop} : (∀ᶠ x in 𝓝ˢ (s ∪ t), p x) ↔ (∀ᶠ x in 𝓝ˢ s, p x) ∧ ∀ᶠ x in 𝓝ˢ t, p x := by rw [nhdsSet_union, eventually_sup] theorem Filter.Eventually.union {p : X → Prop} (hs : ∀ᶠ x in 𝓝ˢ s, p x) (ht : ∀ᶠ x in 𝓝ˢ t, p x) : ∀ᶠ x in 𝓝ˢ (s ∪ t), p x := Filter.Eventually.union_nhdsSet.mpr ⟨hs, ht⟩ theorem nhdsSet_iUnion {ι : Sort} (s : ι → Set X) : 𝓝ˢ (⋃ i, s i) = ⨆ i, 𝓝ˢ (s i) := by simp only [nhdsSet, image_iUnion, sSup_iUnion (β := Filter X)] theorem eventually_nhdsSet_iUnion₂ {ι : Sort} {p : ι → Prop} {s : ι → Set X} {P : X → Prop} : (∀ᶠ x in 𝓝ˢ (⋃ (i) (_ : p i), s i), P x) ↔ ∀ i, p i → ∀ᶠ x in 𝓝ˢ (s i), P x := by simp only [nhdsSet_iUnion, eventually_iSup] theorem eventually_nhdsSet_iUnion {ι : Sort} {s : ι → Set X} {P : X → Prop} : (∀ᶠ x in 𝓝ˢ (⋃ i, s i), P x) ↔ ∀ i, ∀ᶠ x in 𝓝ˢ (s i), P x := by simp only [nhdsSet_iUnion, eventually_iSup]		Mathlib/Topology/NhdsSet.lean	205	207
/- Copyright (c) 2021 Aaron Anderson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Aaron Anderson -/ import Mathlib.ModelTheory.Ultraproducts import Mathlib.ModelTheory.Bundled import Mathlib.ModelTheory.Skolem import Mathlib.Order.Filter.AtTopBot.Basic /-! # First-Order Satisfiability This file deals with the satisfiability of first-order theories, as well as equivalence over them. ## Main Definitions - `FirstOrder.Language.Theory.IsSatisfiable`: `T.IsSatisfiable` indicates that `T` has a nonempty model. - `FirstOrder.Language.Theory.IsFinitelySatisfiable`: `T.IsFinitelySatisfiable` indicates that every finite subset of `T` is satisfiable. - `FirstOrder.Language.Theory.IsComplete`: `T.IsComplete` indicates that `T` is satisfiable and models each sentence or its negation. - `Cardinal.Categorical`: A theory is `κ`-categorical if all models of size `κ` are isomorphic. ## Main Results - The Compactness Theorem, `FirstOrder.Language.Theory.isSatisfiable_iff_isFinitelySatisfiable`, shows that a theory is satisfiable iff it is finitely satisfiable. - `FirstOrder.Language.completeTheory.isComplete`: The complete theory of a structure is complete. - `FirstOrder.Language.Theory.exists_large_model_of_infinite_model` shows that any theory with an infinite model has arbitrarily large models. - `FirstOrder.Language.Theory.exists_elementaryEmbedding_card_eq`: The Upward Löwenheim–Skolem Theorem: If `κ` is a cardinal greater than the cardinalities of `L` and an infinite `L`-structure `M`, then `M` has an elementary extension of cardinality `κ`. ## Implementation Details - Satisfiability of an `L.Theory` `T` is defined in the minimal universe containing all the symbols of `L`. By Löwenheim-Skolem, this is equivalent to satisfiability in any universe. -/ universe u v w w' open Cardinal CategoryTheory open Cardinal FirstOrder namespace FirstOrder namespace Language variable {L : Language.{u, v}} {T : L.Theory} {α : Type w} {n : ℕ} namespace Theory variable (T) /-- A theory is satisfiable if a structure models it. -/ def IsSatisfiable : Prop := Nonempty (ModelType.{u, v, max u v} T) /-- A theory is finitely satisfiable if all of its finite subtheories are satisfiable. -/ def IsFinitelySatisfiable : Prop := ∀ T0 : Finset L.Sentence, (T0 : L.Theory) ⊆ T → IsSatisfiable (T0 : L.Theory) variable {T} {T' : L.Theory} theorem Model.isSatisfiable (M : Type w) [Nonempty M] [L.Structure M] [M ⊨ T] : T.IsSatisfiable := ⟨((⊥ : Substructure _ (ModelType.of T M)).elementarySkolem₁Reduct.toModel T).shrink⟩ theorem IsSatisfiable.mono (h : T'.IsSatisfiable) (hs : T ⊆ T') : T.IsSatisfiable := ⟨(Theory.Model.mono (ModelType.is_model h.some) hs).bundled⟩ theorem isSatisfiable_empty (L : Language.{u, v}) : IsSatisfiable (∅ : L.Theory) := ⟨default⟩ theorem isSatisfiable_of_isSatisfiable_onTheory {L' : Language.{w, w'}} (φ : L →ᴸ L') (h : (φ.onTheory T).IsSatisfiable) : T.IsSatisfiable := Model.isSatisfiable (h.some.reduct φ) theorem isSatisfiable_onTheory_iff {L' : Language.{w, w'}} {φ : L →ᴸ L'} (h : φ.Injective) : (φ.onTheory T).IsSatisfiable ↔ T.IsSatisfiable := by classical refine ⟨isSatisfiable_of_isSatisfiable_onTheory φ, fun h' => ?_⟩ haveI : Inhabited h'.some := Classical.inhabited_of_nonempty' exact Model.isSatisfiable (h'.some.defaultExpansion h) theorem IsSatisfiable.isFinitelySatisfiable (h : T.IsSatisfiable) : T.IsFinitelySatisfiable := fun _ => h.mono /-- The Compactness Theorem of first-order logic: A theory is satisfiable if and only if it is finitely satisfiable. -/ theorem isSatisfiable_iff_isFinitelySatisfiable {T : L.Theory} : T.IsSatisfiable ↔ T.IsFinitelySatisfiable := ⟨Theory.IsSatisfiable.isFinitelySatisfiable, fun h => by classical set M : Finset T → Type max u v := fun T0 : Finset T => (h (T0.map (Function.Embedding.subtype fun x => x ∈ T)) T0.map_subtype_subset).some.Carrier let M' := Filter.Product (Ultrafilter.of (Filter.atTop : Filter (Finset T))) M have h' : M' ⊨ T := by refine ⟨fun φ hφ => ?_⟩ rw [Ultraproduct.sentence_realize] refine Filter.Eventually.filter_mono (Ultrafilter.of_le _) (Filter.eventually_atTop.2 ⟨{⟨φ, hφ⟩}, fun s h' => Theory.realize_sentence_of_mem (s.map (Function.Embedding.subtype fun x => x ∈ T)) ?_⟩) simp only [Finset.coe_map, Function.Embedding.coe_subtype, Set.mem_image, Finset.mem_coe, Subtype.exists, Subtype.coe_mk, exists_and_right, exists_eq_right] exact ⟨hφ, h' (Finset.mem_singleton_self _)⟩ exact ⟨ModelType.of T M'⟩⟩ theorem isSatisfiable_directed_union_iff {ι : Type} [Nonempty ι] {T : ι → L.Theory} (h : Directed (· ⊆ ·) T) : Theory.IsSatisfiable (⋃ i, T i) ↔ ∀ i, (T i).IsSatisfiable := by refine ⟨fun h' i => h'.mono (Set.subset_iUnion _ _), fun h' => ?_⟩ rw [isSatisfiable_iff_isFinitelySatisfiable, IsFinitelySatisfiable] intro T0 hT0 obtain ⟨i, hi⟩ := h.exists_mem_subset_of_finset_subset_biUnion hT0 exact (h' i).mono hi theorem isSatisfiable_union_distinctConstantsTheory_of_card_le (T : L.Theory) (s : Set α) (M : Type w') [Nonempty M] [L.Structure M] [M ⊨ T] (h : Cardinal.lift.{w'} #s ≤ Cardinal.lift.{w} #M) : ((L.lhomWithConstants α).onTheory T ∪ L.distinctConstantsTheory s).IsSatisfiable := by haveI : Inhabited M := Classical.inhabited_of_nonempty inferInstance rw [Cardinal.lift_mk_le'] at h letI : (constantsOn α).Structure M := constantsOn.structure (Function.extend (↑) h.some default) have : M ⊨ (L.lhomWithConstants α).onTheory T ∪ L.distinctConstantsTheory s := by refine ((LHom.onTheory_model _ _).2 inferInstance).union ?_ rw [model_distinctConstantsTheory] refine fun a as b bs ab => ?_ rw [← Subtype.coe_mk a as, ← Subtype.coe_mk b bs, ← Subtype.ext_iff] exact h.some.injective ((Subtype.coe_injective.extend_apply h.some default ⟨a, as⟩).symm.trans (ab.trans (Subtype.coe_injective.extend_apply h.some default ⟨b, bs⟩))) exact Model.isSatisfiable M theorem isSatisfiable_union_distinctConstantsTheory_of_infinite (T : L.Theory) (s : Set α) (M : Type w') [L.Structure M] [M ⊨ T] [Infinite M] : ((L.lhomWithConstants α).onTheory T ∪ L.distinctConstantsTheory s).IsSatisfiable := by classical rw [distinctConstantsTheory_eq_iUnion, Set.union_iUnion, isSatisfiable_directed_union_iff] · exact fun t => isSatisfiable_union_distinctConstantsTheory_of_card_le T _ M ((lift_le_aleph0.2 (finset_card_lt_aleph0 _).le).trans (aleph0_le_lift.2 (aleph0_le_mk M))) · apply Monotone.directed_le refine monotone_const.union (monotone_distinctConstantsTheory.comp ?_) simp only [Finset.coe_map, Function.Embedding.coe_subtype] exact Monotone.comp (g := Set.image ((↑) : s → α)) (f := ((↑) : Finset s → Set s)) Set.monotone_image fun _ _ => Finset.coe_subset.2 /-- Any theory with an infinite model has arbitrarily large models. -/ theorem exists_large_model_of_infinite_model (T : L.Theory) (κ : Cardinal.{w}) (M : Type w') [L.Structure M] [M ⊨ T] [Infinite M] : ∃ N : ModelType.{_, _, max u v w} T, Cardinal.lift.{max u v w} κ ≤ #N := by obtain ⟨N⟩ := isSatisfiable_union_distinctConstantsTheory_of_infinite T (Set.univ : Set κ.out) M refine ⟨(N.is_model.mono Set.subset_union_left).bundled.reduct _, ?_⟩ haveI : N ⊨ distinctConstantsTheory _ _ := N.is_model.mono Set.subset_union_right rw [ModelType.reduct_Carrier, coe_of] refine _root_.trans (lift_le.2 (le_of_eq (Cardinal.mk_out κ).symm)) ?_ rw [← mk_univ] refine (card_le_of_model_distinctConstantsTheory L Set.univ N).trans (lift_le.{max u v w}.1 ?_) rw [lift_lift] theorem isSatisfiable_iUnion_iff_isSatisfiable_iUnion_finset {ι : Type} (T : ι → L.Theory) : IsSatisfiable (⋃ i, T i) ↔ ∀ s : Finset ι, IsSatisfiable (⋃ i ∈ s, T i) := by classical refine ⟨fun h s => h.mono (Set.iUnion_mono fun _ => Set.iUnion_subset_iff.2 fun _ => refl _), fun h => ?_⟩ rw [isSatisfiable_iff_isFinitelySatisfiable] intro s hs rw [Set.iUnion_eq_iUnion_finset] at hs obtain ⟨t, ht⟩ := Directed.exists_mem_subset_of_finset_subset_biUnion (by exact Monotone.directed_le fun t1 t2 (h : ∀ ⦃x⦄, x ∈ t1 → x ∈ t2) => Set.iUnion_mono fun _ => Set.iUnion_mono' fun h1 => ⟨h h1, refl _⟩) hs exact (h t).mono ht end Theory variable (L) /-- A version of The Downward Löwenheim–Skolem theorem where the structure `N` elementarily embeds into `M`, but is not by type a substructure of `M`, and thus can be chosen to belong to the universe of the cardinal `κ`. -/ theorem exists_elementaryEmbedding_card_eq_of_le (M : Type w') [L.Structure M] [Nonempty M] (κ : Cardinal.{w}) (h1 : ℵ₀ ≤ κ) (h2 : lift.{w} L.card ≤ Cardinal.lift.{max u v} κ) (h3 : lift.{w'} κ ≤ Cardinal.lift.{w} #M) : ∃ N : Bundled L.Structure, Nonempty (N ↪ₑ[L] M) ∧ #N = κ := by obtain ⟨S, _, hS⟩ := exists_elementarySubstructure_card_eq L ∅ κ h1 (by simp) h2 h3 have : Small.{w} S := by rw [← lift_inj.{_, w + 1}, lift_lift, lift_lift] at hS exact small_iff_lift_mk_lt_univ.2 (lt_of_eq_of_lt hS κ.lift_lt_univ') refine ⟨(equivShrink S).bundledInduced L, ⟨S.subtype.comp (Equiv.bundledInducedEquiv L _).symm.toElementaryEmbedding⟩, lift_inj.1 (_root_.trans ?_ hS)⟩ simp only [Equiv.bundledInduced_α, lift_mk_shrink'] section /-- The Upward Löwenheim–Skolem Theorem: If `κ` is a cardinal greater than the cardinalities of `L` and an infinite `L`-structure `M`, then `M` has an elementary extension of cardinality `κ`. -/ theorem exists_elementaryEmbedding_card_eq_of_ge (M : Type w') [L.Structure M] [iM : Infinite M] (κ : Cardinal.{w}) (h1 : Cardinal.lift.{w} L.card ≤ Cardinal.lift.{max u v} κ) (h2 : Cardinal.lift.{w} #M ≤ Cardinal.lift.{w'} κ) : ∃ N : Bundled L.Structure, Nonempty (M ↪ₑ[L] N) ∧ #N = κ := by obtain ⟨N0, hN0⟩ := (L.elementaryDiagram M).exists_large_model_of_infinite_model κ M rw [← lift_le.{max u v}, lift_lift, lift_lift] at h2 obtain ⟨N, ⟨NN0⟩, hN⟩ := exists_elementaryEmbedding_card_eq_of_le (L[[M]]) N0 κ (aleph0_le_lift.1 ((aleph0_le_lift.2 (aleph0_le_mk M)).trans h2)) (by simp only [card_withConstants, lift_add, lift_lift] rw [add_comm, add_eq_max (aleph0_le_lift.2 (infinite_iff.1 iM)), max_le_iff] rw [← lift_le.{w'}, lift_lift, lift_lift] at h1 exact ⟨h2, h1⟩) (hN0.trans (by rw [← lift_umax, lift_id])) letI := (lhomWithConstants L M).reduct N haveI h : N ⊨ L.elementaryDiagram M := (NN0.theory_model_iff (L.elementaryDiagram M)).2 inferInstance refine ⟨Bundled.of N, ⟨?_⟩, hN⟩ apply ElementaryEmbedding.ofModelsElementaryDiagram L M N end /-- The Löwenheim–Skolem Theorem: If `κ` is a cardinal greater than the cardinalities of `L` and an infinite `L`-structure `M`, then there is an elementary embedding in the appropriate direction between then `M` and a structure of cardinality `κ`. -/ theorem exists_elementaryEmbedding_card_eq (M : Type w') [L.Structure M] [iM : Infinite M] (κ : Cardinal.{w}) (h1 : ℵ₀ ≤ κ) (h2 : lift.{w} L.card ≤ Cardinal.lift.{max u v} κ) : ∃ N : Bundled L.Structure, (Nonempty (N ↪ₑ[L] M) ∨ Nonempty (M ↪ₑ[L] N)) ∧ #N = κ := by cases le_or_gt (lift.{w'} κ) (Cardinal.lift.{w} #M) with \| inl h => obtain ⟨N, hN1, hN2⟩ := exists_elementaryEmbedding_card_eq_of_le L M κ h1 h2 h exact ⟨N, Or.inl hN1, hN2⟩ \| inr h => obtain ⟨N, hN1, hN2⟩ := exists_elementaryEmbedding_card_eq_of_ge L M κ h2 (le_of_lt h) exact ⟨N, Or.inr hN1, hN2⟩ /-- A consequence of the Löwenheim–Skolem Theorem: If `κ` is a cardinal greater than the cardinalities of `L` and an infinite `L`-structure `M`, then there is a structure of cardinality `κ` elementarily equivalent to `M`. -/ theorem exists_elementarilyEquivalent_card_eq (M : Type w') [L.Structure M] [Infinite M] (κ : Cardinal.{w}) (h1 : ℵ₀ ≤ κ) (h2 : lift.{w} L.card ≤ Cardinal.lift.{max u v} κ) : ∃ N : CategoryTheory.Bundled L.Structure, (M ≅[L] N) ∧ #N = κ := by obtain ⟨N, NM \| MN, hNκ⟩ := exists_elementaryEmbedding_card_eq L M κ h1 h2 · exact ⟨N, NM.some.elementarilyEquivalent.symm, hNκ⟩ · exact ⟨N, MN.some.elementarilyEquivalent, hNκ⟩ variable {L} namespace Theory theorem exists_model_card_eq (h : ∃ M : ModelType.{u, v, max u v} T, Infinite M) (κ : Cardinal.{w}) (h1 : ℵ₀ ≤ κ) (h2 : Cardinal.lift.{w} L.card ≤ Cardinal.lift.{max u v} κ) : ∃ N : ModelType.{u, v, w} T, #N = κ := by cases h with \| intro M MI => haveI := MI obtain ⟨N, hN, rfl⟩ := exists_elementarilyEquivalent_card_eq L M κ h1 h2 haveI : Nonempty N := hN.nonempty exact ⟨hN.theory_model.bundled, rfl⟩ variable (T) /-- A theory models a (bounded) formula when any of its nonempty models realizes that formula on all inputs. -/ def ModelsBoundedFormula (φ : L.BoundedFormula α n) : Prop := ∀ (M : ModelType.{u, v, max u v w} T) (v : α → M) (xs : Fin n → M), φ.Realize v xs @[inherit_doc FirstOrder.Language.Theory.ModelsBoundedFormula] infixl:51 " ⊨ᵇ " => ModelsBoundedFormula -- input using \\|= or \vDash, but not using \models variable {T} theorem models_formula_iff {φ : L.Formula α} : T ⊨ᵇ φ ↔ ∀ (M : ModelType.{u, v, max u v w} T) (v : α → M), φ.Realize v := forall_congr' fun _ => forall_congr' fun _ => Unique.forall_iff theorem models_sentence_iff {φ : L.Sentence} : T ⊨ᵇ φ ↔ ∀ M : ModelType.{u, v, max u v} T, M ⊨ φ := models_formula_iff.trans (forall_congr' fun _ => Unique.forall_iff) theorem models_sentence_of_mem {φ : L.Sentence} (h : φ ∈ T) : T ⊨ᵇ φ := models_sentence_iff.2 fun _ => realize_sentence_of_mem T h theorem models_iff_not_satisfiable (φ : L.Sentence) : T ⊨ᵇ φ ↔ ¬IsSatisfiable (T ∪ {φ.not}) := by rw [models_sentence_iff, IsSatisfiable] refine ⟨fun h1 h2 => (Sentence.realize_not _).1 (realize_sentence_of_mem (T ∪ {Formula.not φ}) (Set.subset_union_right (Set.mem_singleton _))) (h1 (h2.some.subtheoryModel Set.subset_union_left)), fun h M => ?_⟩ contrapose! h rw [← Sentence.realize_not] at h refine ⟨{ Carrier := M is_model := ⟨fun ψ hψ => hψ.elim (realize_sentence_of_mem _) fun h' => ?_⟩ }⟩ rw [Set.mem_singleton_iff.1 h'] exact h theorem ModelsBoundedFormula.realize_sentence {φ : L.Sentence} (h : T ⊨ᵇ φ) (M : Type) [L.Structure M] [M ⊨ T] [Nonempty M] : M ⊨ φ := by rw [models_iff_not_satisfiable] at h contrapose! h have : M ⊨ T ∪ {Formula.not φ} := by simp only [Set.union_singleton, model_iff, Set.mem_insert_iff, forall_eq_or_imp, Sentence.realize_not] rw [← model_iff] exact ⟨h, inferInstance⟩ exact Model.isSatisfiable M theorem models_formula_iff_onTheory_models_equivSentence {φ : L.Formula α} : T ⊨ᵇ φ ↔ (L.lhomWithConstants α).onTheory T ⊨ᵇ Formula.equivSentence φ := by refine ⟨fun h => models_sentence_iff.2 (fun M => ?_), fun h => models_formula_iff.2 (fun M v => ?_)⟩ · letI := (L.lhomWithConstants α).reduct M have : (L.lhomWithConstants α).IsExpansionOn M := LHom.isExpansionOn_reduct _ _ -- why doesn't that instance just work? rw [Formula.realize_equivSentence] have : M ⊨ T := (LHom.onTheory_model _ _).1 M.is_model -- why isn't M.is_model inferInstance? let M' := Theory.ModelType.of T M exact h M' (fun a => (L.con a : M)) _ · letI : (constantsOn α).Structure M := constantsOn.structure v have : M ⊨ (L.lhomWithConstants α).onTheory T := (LHom.onTheory_model _ _).2 inferInstance exact (Formula.realize_equivSentence _ _).1 (h.realize_sentence M) theorem ModelsBoundedFormula.realize_formula {φ : L.Formula α} (h : T ⊨ᵇ φ) (M : Type) [L.Structure M] [M ⊨ T] [Nonempty M] {v : α → M} : φ.Realize v := by rw [models_formula_iff_onTheory_models_equivSentence] at h letI : (constantsOn α).Structure M := constantsOn.structure v have : M ⊨ (L.lhomWithConstants α).onTheory T := (LHom.onTheory_model _ _).2 inferInstance exact (Formula.realize_equivSentence _ _).1 (h.realize_sentence M) theorem models_toFormula_iff {φ : L.BoundedFormula α n} : T ⊨ᵇ φ.toFormula ↔ T ⊨ᵇ φ := by refine ⟨fun h M v xs => ?_, ?_⟩ · have h' : φ.toFormula.Realize (Sum.elim v xs) := h.realize_formula M simp only [BoundedFormula.realize_toFormula, Sum.elim_comp_inl, Sum.elim_comp_inr] at h' exact h' · simp only [models_formula_iff, BoundedFormula.realize_toFormula] exact fun h M v => h M _ _ theorem ModelsBoundedFormula.realize_boundedFormula {φ : L.BoundedFormula α n} (h : T ⊨ᵇ φ) (M : Type) [L.Structure M] [M ⊨ T] [Nonempty M] {v : α → M} {xs : Fin n → M} : φ.Realize v xs := by have h' : φ.toFormula.Realize (Sum.elim v xs) := (models_toFormula_iff.2 h).realize_formula M simp only [BoundedFormula.realize_toFormula, Sum.elim_comp_inl, Sum.elim_comp_inr] at h' exact h' theorem models_of_models_theory {T' : L.Theory} (h : ∀ φ : L.Sentence, φ ∈ T' → T ⊨ᵇ φ) {φ : L.Formula α} (hφ : T' ⊨ᵇ φ) : T ⊨ᵇ φ := fun M => by have hM : M ⊨ T' := T'.model_iff.2 (fun ψ hψ => (h ψ hψ).realize_sentence M) let M' : ModelType T' := ⟨M⟩ exact hφ M' /-- An alternative statement of the Compactness Theorem. A formula `φ` is modeled by a theory iff there is a finite subset `T0` of the theory such that `φ` is modeled by `T0` -/ theorem models_iff_finset_models {φ : L.Sentence} : T ⊨ᵇ φ ↔ ∃ T0 : Finset L.Sentence, (T0 : L.Theory) ⊆ T ∧ (T0 : L.Theory) ⊨ᵇ φ := by simp only [models_iff_not_satisfiable] rw [← not_iff_not, not_not, isSatisfiable_iff_isFinitelySatisfiable, IsFinitelySatisfiable] push_neg letI := Classical.decEq (Sentence L) constructor · intro h T0 hT0 simpa using h (T0 ∪ {Formula.not φ}) (by simp only [Finset.coe_union, Finset.coe_singleton] exact Set.union_subset_union hT0 (Set.Subset.refl _)) · intro h T0 hT0 exact IsSatisfiable.mono (h (T0.erase (Formula.not φ)) (by simpa using hT0)) (by simp) /-- A theory is complete when it is satisfiable and models each sentence or its negation. -/ def IsComplete (T : L.Theory) : Prop := T.IsSatisfiable ∧ ∀ φ : L.Sentence, T ⊨ᵇ φ ∨ T ⊨ᵇ φ.not namespace IsComplete theorem models_not_iff (h : T.IsComplete) (φ : L.Sentence) : T ⊨ᵇ φ.not ↔ ¬T ⊨ᵇ φ := by rcases h.2 φ with hφ \| hφn · simp only [hφ, not_true, iff_false] rw [models_sentence_iff, not_forall] refine ⟨h.1.some, ?_⟩ simp only [Sentence.realize_not, Classical.not_not] exact models_sentence_iff.1 hφ _ · simp only [hφn, true_iff] intro hφ rw [models_sentence_iff] at exact hφn h.1.some (hφ _) theorem realize_sentence_iff (h : T.IsComplete) (φ : L.Sentence) (M : Type*) [L.Structure M] [M ⊨ T] [Nonempty M] : M ⊨ φ ↔ T ⊨ᵇ φ := by rcases h.2 φ with hφ \| hφn · exact iff_of_true (hφ.realize_sentence M) hφ · exact iff_of_false ((Sentence.realize_not M).1 (hφn.realize_sentence M)) ((h.models_not_iff φ).1 hφn) end IsComplete /-- A theory is maximal when it is satisfiable and contains each sentence or its negation. Maximal theories are complete. -/ def IsMaximal (T : L.Theory) : Prop := T.IsSatisfiable ∧ ∀ φ : L.Sentence, φ ∈ T ∨ φ.not ∈ T theorem IsMaximal.isComplete (h : T.IsMaximal) : T.IsComplete := h.imp_right (forall_imp fun _ => Or.imp models_sentence_of_mem models_sentence_of_mem) theorem IsMaximal.mem_or_not_mem (h : T.IsMaximal) (φ : L.Sentence) : φ ∈ T ∨ φ.not ∈ T := h.2 φ theorem IsMaximal.mem_of_models (h : T.IsMaximal) {φ : L.Sentence} (hφ : T ⊨ᵇ φ) : φ ∈ T := by refine (h.mem_or_not_mem φ).resolve_right fun con => ?_ rw [models_iff_not_satisfiable, Set.union_singleton, Set.insert_eq_of_mem con] at hφ exact hφ h.1 theorem IsMaximal.mem_iff_models (h : T.IsMaximal) (φ : L.Sentence) : φ ∈ T ↔ T ⊨ᵇ φ := ⟨models_sentence_of_mem, h.mem_of_models⟩ end Theory namespace completeTheory variable (L) (M : Type w) variable [L.Structure M] theorem isSatisfiable [Nonempty M] : (L.completeTheory M).IsSatisfiable := Theory.Model.isSatisfiable M	theorem mem_or_not_mem (φ : L.Sentence) : φ ∈ L.completeTheory M ∨ φ.not ∈ L.completeTheory M := by simp_rw [completeTheory, Set.mem_setOf_eq, Sentence.Realize, Formula.realize_not, or_not]	Mathlib/ModelTheory/Satisfiability.lean	445	446
/- Copyright (c) 2018 Simon Hudon. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon -/ import Mathlib.Control.Applicative import Mathlib.Control.Traversable.Basic import Mathlib.Data.List.Forall2 import Mathlib.Data.Set.Functor /-! # LawfulTraversable instances This file provides instances of `LawfulTraversable` for types from the core library: `Option`, `List` and `Sum`. -/ universe u v section Option open Functor variable {F G : Type u → Type u} variable [Applicative F] [Applicative G] variable [LawfulApplicative G] theorem Option.id_traverse {α} (x : Option α) : Option.traverse (pure : α → Id α) x = x := by cases x <;> rfl theorem Option.comp_traverse {α β γ} (f : β → F γ) (g : α → G β) (x : Option α) : Option.traverse (Comp.mk ∘ (f <$> ·) ∘ g) x = Comp.mk (Option.traverse f <$> Option.traverse g x) := by cases x <;> (simp! [functor_norm] <;> rfl) theorem Option.traverse_eq_map_id {α β} (f : α → β) (x : Option α) : Option.traverse ((pure : _ → Id _) ∘ f) x = (pure : _ → Id _) (f <$> x) := by cases x <;> rfl variable (η : ApplicativeTransformation F G) theorem Option.naturality [LawfulApplicative F] {α β} (f : α → F β) (x : Option α) : η (Option.traverse f x) = Option.traverse (@η _ ∘ f) x := by -- Porting note: added `ApplicativeTransformation` theorems rcases x with - \| x <;> simp! [, functor_norm, ApplicativeTransformation.preserves_map, ApplicativeTransformation.preserves_seq, ApplicativeTransformation.preserves_pure] end Option instance : LawfulTraversable Option := { show LawfulMonad Option from inferInstance with id_traverse := Option.id_traverse comp_traverse := Option.comp_traverse traverse_eq_map_id := Option.traverse_eq_map_id naturality := fun η _ _ f x => Option.naturality η f x } namespace List variable {F G : Type u → Type u} variable [Applicative F] [Applicative G] section variable [LawfulApplicative G] open Applicative Functor List protected theorem id_traverse {α} (xs : List α) : List.traverse (pure : α → Id α) xs = xs := by induction xs <;> simp! [, List.traverse, functor_norm]; rfl protected theorem comp_traverse {α β γ} (f : β → F γ) (g : α → G β) (x : List α) : List.traverse (Comp.mk ∘ (f <$> ·) ∘ g) x = Comp.mk (List.traverse f <$> List.traverse g x) := by induction x <;> simp! [, functor_norm] <;> rfl protected theorem traverse_eq_map_id {α β} (f : α → β) (x : List α) : List.traverse ((pure : _ → Id _) ∘ f) x = (pure : _ → Id _) (f <$> x) := by induction x <;> simp! [, functor_norm]; rfl variable [LawfulApplicative F] (η : ApplicativeTransformation F G) protected theorem naturality {α β} (f : α → F β) (x : List α) : η (List.traverse f x) = List.traverse (@η _ ∘ f) x := by -- Porting note: added `ApplicativeTransformation` theorems induction x <;> simp! [, functor_norm, ApplicativeTransformation.preserves_map, ApplicativeTransformation.preserves_seq, ApplicativeTransformation.preserves_pure] instance : LawfulTraversable.{u} List := { show LawfulMonad List from inferInstance with id_traverse := List.id_traverse comp_traverse := List.comp_traverse traverse_eq_map_id := List.traverse_eq_map_id naturality := List.naturality } end section Traverse variable {α' β' : Type u} (f : α' → F β') @[simp] theorem traverse_nil : traverse f ([] : List α') = (pure [] : F (List β')) := rfl @[simp] theorem traverse_cons (a : α') (l : List α') : traverse f (a :: l) = (· :: ·) <$> f a <> traverse f l := rfl variable [LawfulApplicative F] @[simp] theorem traverse_append : ∀ as bs : List α', traverse f (as ++ bs) = (· ++ ·) <$> traverse f as <*> traverse f bs \| [], bs => by simp [functor_norm] \| a :: as, bs => by simp [traverse_append as bs, functor_norm]; congr theorem mem_traverse {f : α' → Set β'} : ∀ (l : List α') (n : List β'), n ∈ traverse f l ↔ Forall₂ (fun b a => b ∈ f a) n l \| [], [] => by simp \| a :: as, [] => by simp \| [], b :: bs => by simp \| a :: as, b :: bs => by simp [mem_traverse as bs] end Traverse end List namespace Sum	section Traverse variable {σ : Type u} variable {F G : Type u → Type u} variable [Applicative F] [Applicative G]	Mathlib/Control/Traversable/Instances.lean	131	136
/- Copyright (c) 2020 Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Y. Lewis -/ import Batteries.Tactic.Lint.Basic import Mathlib.Algebra.Order.Monoid.Unbundled.Basic import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Algebra.Order.ZeroLEOne import Mathlib.Data.Nat.Cast.Order.Ring import Mathlib.Data.Int.Order.Basic import Mathlib.Data.Ineq /-! # Lemmas for `linarith`. Those in the `Linarith` namespace should stay here. Those outside the `Linarith` namespace may be deleted as they are ported to mathlib4. -/ namespace Linarith universe u theorem lt_irrefl {α : Type u} [Preorder α] {a : α} : ¬a < a := _root_.lt_irrefl a theorem eq_of_eq_of_eq {α} [Semiring α] {a b : α} (ha : a = 0) (hb : b = 0) : a + b = 0 := by simp [*]	section Semiring variable {α : Type u} [Semiring α] [PartialOrder α]	Mathlib/Tactic/Linarith/Lemmas.lean	30	31
/- Copyright (c) 2018 Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Y. Lewis -/ import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.Inductions import Mathlib.Algebra.Polynomial.Splits import Mathlib.RingTheory.Polynomial.Vieta import Mathlib.Analysis.Normed.Field.Basic import Mathlib.Analysis.Normed.Ring.Lemmas /-! # Polynomials and limits In this file we prove the following lemmas. * `Polynomial.continuous_eval₂`: `Polynomial.eval₂` defines a continuous function. * `Polynomial.continuous_aeval`: `Polynomial.aeval` defines a continuous function; we also prove convenience lemmas `Polynomial.continuousAt_aeval`, `Polynomial.continuousWithinAt_aeval`, `Polynomial.continuousOn_aeval`. * `Polynomial.continuous`: `Polynomial.eval` defines a continuous functions; we also prove convenience lemmas `Polynomial.continuousAt`, `Polynomial.continuousWithinAt`, `Polynomial.continuousOn`. * `Polynomial.tendsto_norm_atTop`: `fun x ↦ ‖Polynomial.eval (z x) p‖` tends to infinity provided that `fun x ↦ ‖z x‖` tends to infinity and `0 < degree p`; * `Polynomial.tendsto_abv_eval₂_atTop`, `Polynomial.tendsto_abv_atTop`, `Polynomial.tendsto_abv_aeval_atTop`: a few versions of the previous statement for `IsAbsoluteValue abv` instead of norm. ## Tags Polynomial, continuity -/ open IsAbsoluteValue Filter namespace Polynomial section IsTopologicalSemiring variable {R S : Type} [Semiring R] [TopologicalSpace R] [IsTopologicalSemiring R] (p : R[X]) @[continuity, fun_prop] protected theorem continuous_eval₂ [Semiring S] (p : S[X]) (f : S →+ R) : Continuous fun x => p.eval₂ f x := by simp only [eval₂_eq_sum, Finsupp.sum] exact continuous_finset_sum _ fun c _ => continuous_const.mul (continuous_pow _) @[continuity, fun_prop] protected theorem continuous : Continuous fun x => p.eval x := p.continuous_eval₂ _ @[fun_prop] protected theorem continuousAt {a : R} : ContinuousAt (fun x => p.eval x) a := p.continuous.continuousAt @[fun_prop] protected theorem continuousWithinAt {s a} : ContinuousWithinAt (fun x => p.eval x) s a := p.continuous.continuousWithinAt @[fun_prop] protected theorem continuousOn {s} : ContinuousOn (fun x => p.eval x) s := p.continuous.continuousOn end IsTopologicalSemiring section TopologicalAlgebra variable {R A : Type} [CommSemiring R] [Semiring A] [Algebra R A] [TopologicalSpace A] [IsTopologicalSemiring A] (p : R[X]) @[continuity, fun_prop] protected theorem continuous_aeval : Continuous fun x : A => aeval x p := p.continuous_eval₂ _ @[fun_prop] protected theorem continuousAt_aeval {a : A} : ContinuousAt (fun x : A => aeval x p) a := p.continuous_aeval.continuousAt @[fun_prop] protected theorem continuousWithinAt_aeval {s a} : ContinuousWithinAt (fun x : A => aeval x p) s a := p.continuous_aeval.continuousWithinAt @[fun_prop] protected theorem continuousOn_aeval {s} : ContinuousOn (fun x : A => aeval x p) s := p.continuous_aeval.continuousOn end TopologicalAlgebra theorem tendsto_abv_eval₂_atTop {R S k α : Type} [Semiring R] [Ring S] [Field k] [LinearOrder k] [IsStrictOrderedRing k] (f : R →+* S) (abv : S → k) [IsAbsoluteValue abv] (p : R[X]) (hd : 0 < degree p) (hf : f p.leadingCoeff ≠ 0) {l : Filter α} {z : α → S} (hz : Tendsto (abv ∘ z) l atTop) : Tendsto (fun x => abv (p.eval₂ f (z x))) l atTop := by revert hf; refine degree_pos_induction_on p hd ?_ ?_ ?_ <;> clear hd p · rintro _ - hc rw [leadingCoeff_mul_X, leadingCoeff_C] at hc simpa [abv_mul abv] using hz.const_mul_atTop ((abv_pos abv).2 hc) · intro _ _ ihp hf rw [leadingCoeff_mul_X] at hf simpa [abv_mul abv] using (ihp hf).atTop_mul_atTop₀ hz	· intro _ a hd ihp hf rw [add_comm, leadingCoeff_add_of_degree_lt (degree_C_le.trans_lt hd)] at hf refine .atTop_of_add_const (abv (-f a)) ?_ refine tendsto_atTop_mono (fun _ => abv_add abv _ _) ?_ simpa using ihp hf theorem tendsto_abv_atTop {R k α : Type} [Ring R] [Field k] [LinearOrder k] [IsStrictOrderedRing k] (abv : R → k) [IsAbsoluteValue abv] (p : R[X]) (h : 0 < degree p) {l : Filter α} {z : α → R} (hz : Tendsto (abv ∘ z) l atTop) : Tendsto (fun x => abv (p.eval (z x))) l atTop := by apply tendsto_abv_eval₂_atTop _ _ _ h _ hz exact mt leadingCoeff_eq_zero.1 (ne_zero_of_degree_gt h) theorem tendsto_abv_aeval_atTop {R A k α : Type} [CommSemiring R] [Ring A] [Algebra R A] [Field k] [LinearOrder k] [IsStrictOrderedRing k] (abv : A → k) [IsAbsoluteValue abv] (p : R[X]) (hd : 0 < degree p)	Mathlib/Topology/Algebra/Polynomial.lean	105	120
/- Copyright (c) 2021 Christopher Hoskin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Christopher Hoskin -/ import Mathlib.Topology.Constructions import Mathlib.Topology.Order.OrderClosed /-! # Topological lattices In this file we define mixin classes `ContinuousInf` and `ContinuousSup`. We define the class `TopologicalLattice` as a topological space and lattice `L` extending `ContinuousInf` and `ContinuousSup`. ## References * [Gierz et al, A Compendium of Continuous Lattices][GierzEtAl1980] ## Tags topological, lattice -/ open Filter open Topology /-- Let `L` be a topological space and let `L×L` be equipped with the product topology and let `⊓:L×L → L` be an infimum. Then `L` is said to have (jointly) continuous infimum if the map `⊓:L×L → L` is continuous. -/ class ContinuousInf (L : Type) [TopologicalSpace L] [Min L] : Prop where /-- The infimum is continuous -/ continuous_inf : Continuous fun p : L × L => p.1 ⊓ p.2 /-- Let `L` be a topological space and let `L×L` be equipped with the product topology and let `⊓:L×L → L` be a supremum. Then `L` is said to have (jointly) continuous supremum* if the map `⊓:L×L → L` is continuous. -/ class ContinuousSup (L : Type) [TopologicalSpace L] [Max L] : Prop where /-- The supremum is continuous -/ continuous_sup : Continuous fun p : L × L => p.1 ⊔ p.2 -- see Note [lower instance priority] instance (priority := 100) OrderDual.continuousSup (L : Type) [TopologicalSpace L] [Min L] [ContinuousInf L] : ContinuousSup Lᵒᵈ where continuous_sup := @ContinuousInf.continuous_inf L _ _ _ -- see Note [lower instance priority] instance (priority := 100) OrderDual.continuousInf (L : Type) [TopologicalSpace L] [Max L] [ContinuousSup L] : ContinuousInf Lᵒᵈ where continuous_inf := @ContinuousSup.continuous_sup L _ _ _ /-- Let `L` be a lattice equipped with a topology such that `L` has continuous infimum and supremum. Then `L` is said to be a topological lattice. -/ class TopologicalLattice (L : Type) [TopologicalSpace L] [Lattice L] : Prop extends ContinuousInf L, ContinuousSup L -- see Note [lower instance priority] instance (priority := 100) OrderDual.topologicalLattice (L : Type) [TopologicalSpace L] [Lattice L] [TopologicalLattice L] : TopologicalLattice Lᵒᵈ where -- see Note [lower instance priority] instance (priority := 100) LinearOrder.topologicalLattice {L : Type} [TopologicalSpace L] [LinearOrder L] [OrderClosedTopology L] : TopologicalLattice L where continuous_inf := continuous_min continuous_sup := continuous_max variable {L X : Type} [TopologicalSpace L] [TopologicalSpace X] @[continuity] theorem continuous_inf [Min L] [ContinuousInf L] : Continuous fun p : L × L => p.1 ⊓ p.2 := ContinuousInf.continuous_inf @[continuity, fun_prop] theorem Continuous.inf [Min L] [ContinuousInf L] {f g : X → L} (hf : Continuous f) (hg : Continuous g) : Continuous fun x => f x ⊓ g x := continuous_inf.comp (hf.prodMk hg :) @[continuity] theorem continuous_sup [Max L] [ContinuousSup L] : Continuous fun p : L × L => p.1 ⊔ p.2 := ContinuousSup.continuous_sup @[continuity, fun_prop] theorem Continuous.sup [Max L] [ContinuousSup L] {f g : X → L} (hf : Continuous f) (hg : Continuous g) : Continuous fun x => f x ⊔ g x := continuous_sup.comp (hf.prodMk hg :) namespace Filter.Tendsto section SupInf variable {α : Type} {l : Filter α} {f g : α → L} {x y : L} lemma sup_nhds' [Max L] [ContinuousSup L] (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (f ⊔ g) l (𝓝 (x ⊔ y)) := (continuous_sup.tendsto _).comp (hf.prodMk_nhds hg) lemma sup_nhds [Max L] [ContinuousSup L] (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (fun i => f i ⊔ g i) l (𝓝 (x ⊔ y)) := hf.sup_nhds' hg lemma inf_nhds' [Min L] [ContinuousInf L] (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (f ⊓ g) l (𝓝 (x ⊓ y)) := (continuous_inf.tendsto _).comp (hf.prodMk_nhds hg) lemma inf_nhds [Min L] [ContinuousInf L] (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (fun i => f i ⊓ g i) l (𝓝 (x ⊓ y)) := hf.inf_nhds' hg end SupInf open Finset variable {ι α : Type} {s : Finset ι} {f : ι → α → L} {l : Filter α} {g : ι → L} lemma finset_sup'_nhds [SemilatticeSup L] [ContinuousSup L] (hne : s.Nonempty) (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (s.sup' hne f) l (𝓝 (s.sup' hne g)) := by induction hne using Finset.Nonempty.cons_induction with \| singleton => simpa using hs \| cons a s ha hne ihs => rw [forall_mem_cons] at hs simp only [sup'_cons, hne] exact hs.1.sup_nhds (ihs hs.2) lemma finset_sup'_nhds_apply [SemilatticeSup L] [ContinuousSup L] (hne : s.Nonempty) (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (fun a ↦ s.sup' hne (f · a)) l (𝓝 (s.sup' hne g)) := by simpa only [← Finset.sup'_apply] using finset_sup'_nhds hne hs lemma finset_inf'_nhds [SemilatticeInf L] [ContinuousInf L] (hne : s.Nonempty) (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (s.inf' hne f) l (𝓝 (s.inf' hne g)) := finset_sup'_nhds (L := Lᵒᵈ) hne hs lemma finset_inf'_nhds_apply [SemilatticeInf L] [ContinuousInf L] (hne : s.Nonempty) (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (fun a ↦ s.inf' hne (f · a)) l (𝓝 (s.inf' hne g)) := finset_sup'_nhds_apply (L := Lᵒᵈ) hne hs lemma finset_sup_nhds [SemilatticeSup L] [OrderBot L] [ContinuousSup L] (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (s.sup f) l (𝓝 (s.sup g)) := by rcases s.eq_empty_or_nonempty with rfl \| hne · simpa using tendsto_const_nhds · simp only [← sup'_eq_sup hne] exact finset_sup'_nhds hne hs lemma finset_sup_nhds_apply [SemilatticeSup L] [OrderBot L] [ContinuousSup L] (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (fun a ↦ s.sup (f · a)) l (𝓝 (s.sup g)) := by simpa only [← Finset.sup_apply] using finset_sup_nhds hs lemma finset_inf_nhds [SemilatticeInf L] [OrderTop L] [ContinuousInf L] (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (s.inf f) l (𝓝 (s.inf g)) := finset_sup_nhds (L := Lᵒᵈ) hs lemma finset_inf_nhds_apply [SemilatticeInf L] [OrderTop L] [ContinuousInf L] (hs : ∀ i ∈ s, Tendsto (f i) l (𝓝 (g i))) : Tendsto (fun a ↦ s.inf (f · a)) l (𝓝 (s.inf g)) := finset_sup_nhds_apply (L := Lᵒᵈ) hs end Filter.Tendsto section Sup variable [Max L] [ContinuousSup L] {f g : X → L} {s : Set X} {x : X} lemma ContinuousAt.sup' (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (f ⊔ g) x := hf.sup_nhds' hg @[fun_prop] lemma ContinuousAt.sup (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun a ↦ f a ⊔ g a) x := hf.sup' hg lemma ContinuousWithinAt.sup' (hf : ContinuousWithinAt f s x) (hg : ContinuousWithinAt g s x) : ContinuousWithinAt (f ⊔ g) s x := hf.sup_nhds' hg lemma ContinuousWithinAt.sup (hf : ContinuousWithinAt f s x) (hg : ContinuousWithinAt g s x) : ContinuousWithinAt (fun a ↦ f a ⊔ g a) s x := hf.sup' hg lemma ContinuousOn.sup' (hf : ContinuousOn f s) (hg : ContinuousOn g s) : ContinuousOn (f ⊔ g) s := fun x hx ↦ (hf x hx).sup' (hg x hx) @[fun_prop] lemma ContinuousOn.sup (hf : ContinuousOn f s) (hg : ContinuousOn g s) : ContinuousOn (fun a ↦ f a ⊔ g a) s := hf.sup' hg lemma Continuous.sup' (hf : Continuous f) (hg : Continuous g) : Continuous (f ⊔ g) := hf.sup hg end Sup section Inf variable [Min L] [ContinuousInf L] {f g : X → L} {s : Set X} {x : X} lemma ContinuousAt.inf' (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (f ⊓ g) x := hf.inf_nhds' hg @[fun_prop] lemma ContinuousAt.inf (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun a ↦ f a ⊓ g a) x := hf.inf' hg lemma ContinuousWithinAt.inf' (hf : ContinuousWithinAt f s x) (hg : ContinuousWithinAt g s x) : ContinuousWithinAt (f ⊓ g) s x := hf.inf_nhds' hg lemma ContinuousWithinAt.inf (hf : ContinuousWithinAt f s x) (hg : ContinuousWithinAt g s x) : ContinuousWithinAt (fun a ↦ f a ⊓ g a) s x := hf.inf' hg lemma ContinuousOn.inf' (hf : ContinuousOn f s) (hg : ContinuousOn g s) : ContinuousOn (f ⊓ g) s := fun x hx ↦ (hf x hx).inf' (hg x hx) @[fun_prop] lemma ContinuousOn.inf (hf : ContinuousOn f s) (hg : ContinuousOn g s) : ContinuousOn (fun a ↦ f a ⊓ g a) s := hf.inf' hg lemma Continuous.inf' (hf : Continuous f) (hg : Continuous g) : Continuous (f ⊓ g) := hf.inf hg end Inf section FinsetSup' variable {ι : Type} [SemilatticeSup L] [ContinuousSup L] {s : Finset ι} {f : ι → X → L} {t : Set X} {x : X} lemma ContinuousAt.finset_sup'_apply (hne : s.Nonempty) (hs : ∀ i ∈ s, ContinuousAt (f i) x) : ContinuousAt (fun a ↦ s.sup' hne (f · a)) x := Tendsto.finset_sup'_nhds_apply hne hs lemma ContinuousAt.finset_sup' (hne : s.Nonempty) (hs : ∀ i ∈ s, ContinuousAt (f i) x) : ContinuousAt (s.sup' hne f) x := by simpa only [← Finset.sup'_apply] using finset_sup'_apply hne hs lemma ContinuousWithinAt.finset_sup'_apply (hne : s.Nonempty) (hs : ∀ i ∈ s, ContinuousWithinAt (f i) t x) : ContinuousWithinAt (fun a ↦ s.sup' hne (f · a)) t x := Tendsto.finset_sup'_nhds_apply hne hs lemma ContinuousWithinAt.finset_sup' (hne : s.Nonempty) (hs : ∀ i ∈ s, ContinuousWithinAt (f i) t x) : ContinuousWithinAt (s.sup' hne f) t x := by simpa only [← Finset.sup'_apply] using finset_sup'_apply hne hs lemma ContinuousOn.finset_sup'_apply (hne : s.Nonempty) (hs : ∀ i ∈ s, ContinuousOn (f i) t) : ContinuousOn (fun a ↦ s.sup' hne (f · a)) t := fun x hx ↦ ContinuousWithinAt.finset_sup'_apply hne fun i hi ↦ hs i hi x hx lemma ContinuousOn.finset_sup' (hne : s.Nonempty) (hs : ∀ i ∈ s, ContinuousOn (f i) t) : ContinuousOn (s.sup' hne f) t := fun x hx ↦ ContinuousWithinAt.finset_sup' hne fun i hi ↦ hs i hi x hx lemma Continuous.finset_sup'_apply (hne : s.Nonempty) (hs : ∀ i ∈ s, Continuous (f i)) : Continuous (fun a ↦ s.sup' hne (f · a)) := continuous_iff_continuousAt.2 fun _ ↦ ContinuousAt.finset_sup'_apply _ fun i hi ↦ (hs i hi).continuousAt	lemma Continuous.finset_sup' (hne : s.Nonempty) (hs : ∀ i ∈ s, Continuous (f i)) : Continuous (s.sup' hne f) := continuous_iff_continuousAt.2 fun _ ↦ ContinuousAt.finset_sup' _ fun i hi ↦ (hs i hi).continuousAt	Mathlib/Topology/Order/Lattice.lean	270	272
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Fin.Tuple.Basic /-! # Lists from functions Theorems and lemmas for dealing with `List.ofFn`, which converts a function on `Fin n` to a list of length `n`. ## Main Statements The main statements pertain to lists generated using `List.ofFn` - `List.get?_ofFn`, which tells us the nth element of such a list - `List.equivSigmaTuple`, which is an `Equiv` between lists and the functions that generate them via `List.ofFn`. -/ assert_not_exists Monoid universe u variable {α : Type u} open Nat namespace List theorem get_ofFn {n} (f : Fin n → α) (i) : get (ofFn f) i = f (Fin.cast (by simp) i) := by simp; congr @[deprecated (since := "2025-02-15")] alias get?_ofFn := List.getElem?_ofFn @[simp] theorem map_ofFn {β : Type} {n : ℕ} (f : Fin n → α) (g : α → β) : map g (ofFn f) = ofFn (g ∘ f) := ext_get (by simp) fun i h h' => by simp @[congr] theorem ofFn_congr {m n : ℕ} (h : m = n) (f : Fin m → α) : ofFn f = ofFn fun i : Fin n => f (Fin.cast h.symm i) := by subst h simp_rw [Fin.cast_refl, id] theorem ofFn_succ' {n} (f : Fin (succ n) → α) : ofFn f = (ofFn fun i => f (Fin.castSucc i)).concat (f (Fin.last _)) := by induction' n with n IH · rw [ofFn_zero, concat_nil, ofFn_succ, ofFn_zero] rfl · rw [ofFn_succ, IH, ofFn_succ, concat_cons, Fin.castSucc_zero] congr /-- Note this matches the convention of `List.ofFn_succ'`, putting the `Fin m` elements first. -/ theorem ofFn_add {m n} (f : Fin (m + n) → α) : List.ofFn f = (List.ofFn fun i => f (Fin.castAdd n i)) ++ List.ofFn fun j => f (Fin.natAdd m j) := by induction' n with n IH · rw [ofFn_zero, append_nil, Fin.castAdd_zero, Fin.cast_refl] rfl · rw [ofFn_succ', ofFn_succ', IH, append_concat] rfl @[simp] theorem ofFn_fin_append {m n} (a : Fin m → α) (b : Fin n → α) : List.ofFn (Fin.append a b) = List.ofFn a ++ List.ofFn b := by simp_rw [ofFn_add, Fin.append_left, Fin.append_right] /-- This breaks a list of `mn` items into `m` groups each containing `n` elements. -/ theorem ofFn_mul {m n} (f : Fin (m * n) → α) : List.ofFn f = List.flatten (List.ofFn fun i : Fin m => List.ofFn fun j : Fin n => f ⟨i * n + j, calc ↑i * n + j < (i + 1) * n := (Nat.add_lt_add_left j.prop _).trans_eq (by rw [Nat.add_mul, Nat.one_mul]) _ ≤ _ := Nat.mul_le_mul_right _ i.prop⟩) := by induction' m with m IH · simp [ofFn_zero, Nat.zero_mul, ofFn_zero, flatten] · simp_rw [ofFn_succ', succ_mul] simp [flatten_concat, ofFn_add, IH] rfl /-- This breaks a list of `mn` items into `n` groups each containing `m` elements. -/ theorem ofFn_mul' {m n} (f : Fin (m n) → α) : List.ofFn f = List.flatten (List.ofFn fun i : Fin n => List.ofFn fun j : Fin m => f ⟨m * i + j, calc m * i + j < m * (i + 1) := (Nat.add_lt_add_left j.prop _).trans_eq (by rw [Nat.mul_add, Nat.mul_one]) _ ≤ _ := Nat.mul_le_mul_left _ i.prop⟩) := by simp_rw [m.mul_comm, ofFn_mul, Fin.cast_mk] @[simp] theorem ofFn_get : ∀ l : List α, (ofFn (get l)) = l \| [] => by rw [ofFn_zero] \| a :: l => by rw [ofFn_succ] congr exact ofFn_get l @[simp] theorem ofFn_getElem : ∀ l : List α, (ofFn (fun i : Fin l.length => l[(i : Nat)])) = l \| [] => by rw [ofFn_zero] \| a :: l => by rw [ofFn_succ] congr exact ofFn_get l @[simp] theorem ofFn_getElem_eq_map {β : Type*} (l : List α) (f : α → β) : ofFn (fun i : Fin l.length => f <\| l[(i : Nat)]) = l.map f := by rw [← Function.comp_def, ← map_ofFn, ofFn_getElem] -- Note there is a now another `mem_ofFn` defined in Lean, with an existential on the RHS, -- which is marked as a simp lemma. theorem mem_ofFn' {n} (f : Fin n → α) (a : α) : a ∈ ofFn f ↔ a ∈ Set.range f := by simp only [mem_iff_get, Set.mem_range, get_ofFn] exact ⟨fun ⟨i, hi⟩ => ⟨Fin.cast (by simp) i, hi⟩, fun ⟨i, hi⟩ => ⟨Fin.cast (by simp) i, hi⟩⟩ theorem forall_mem_ofFn_iff {n : ℕ} {f : Fin n → α} {P : α → Prop} : (∀ i ∈ ofFn f, P i) ↔ ∀ j : Fin n, P (f j) := by simp @[simp] theorem ofFn_const : ∀ (n : ℕ) (c : α), (ofFn fun _ : Fin n => c) = replicate n c \| 0, c => by rw [ofFn_zero, replicate_zero] \| n+1, c => by rw [replicate, ← ofFn_const n]; simp @[simp]	theorem ofFn_fin_repeat {m} (a : Fin m → α) (n : ℕ) : List.ofFn (Fin.repeat n a) = (List.replicate n (List.ofFn a)).flatten := by simp_rw [ofFn_mul, ← ofFn_const, Fin.repeat, Fin.modNat, Nat.add_comm, Nat.add_mul_mod_self_right, Nat.mod_eq_of_lt (Fin.is_lt _)]	Mathlib/Data/List/OfFn.lean	129	133
/- Copyright (c) 2021 Christopher Hoskin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Christopher Hoskin, Yaël Dillies -/ import Mathlib.Algebra.Order.Group.Unbundled.Abs import Mathlib.Algebra.Notation /-! # Positive & negative parts Mathematical structures possessing an absolute value often also possess a unique decomposition of elements into "positive" and "negative" parts which are in some sense "disjoint" (e.g. the Jordan decomposition of a measure). This file provides instances of `PosPart` and `NegPart`, the positive and negative parts of an element in a lattice ordered group. ## Main statements * `posPart_sub_negPart`: Every element `a` can be decomposed into `a⁺ - a⁻`, the difference of its positive and negative parts. * `posPart_inf_negPart_eq_zero`: The positive and negative parts are coprime. ## References * [Birkhoff, Lattice-ordered Groups][birkhoff1942] * [Bourbaki, Algebra II][bourbaki1981] * [Fuchs, Partially Ordered Algebraic Systems][fuchs1963] * [Zaanen, Lectures on "Riesz Spaces"][zaanen1966] * [Banasiak, Banach Lattices in Applications][banasiak] ## Tags positive part, negative part -/ open Function variable {α : Type} section Lattice variable [Lattice α] section Group variable [Group α] {a b : α} /-- The positive part* of an element `a` in a lattice ordered group is `a ⊔ 1`, denoted `a⁺ᵐ`. -/ @[to_additive "The positive part of an element `a` in a lattice ordered group is `a ⊔ 0`, denoted `a⁺`."] instance instOneLePart : OneLePart α where oneLePart a := a ⊔ 1 /-- The negative part of an element `a` in a lattice ordered group is `a⁻¹ ⊔ 1`, denoted `a⁻ᵐ `. -/ @[to_additive "The negative part of an element `a` in a lattice ordered group is `(-a) ⊔ 0`, denoted `a⁻`."] instance instLeOnePart : LeOnePart α where leOnePart a := a⁻¹ ⊔ 1 @[to_additive] lemma leOnePart_def (a : α) : a⁻ᵐ = a⁻¹ ⊔ 1 := rfl @[to_additive] lemma oneLePart_def (a : α) : a⁺ᵐ = a ⊔ 1 := rfl @[to_additive] lemma oneLePart_mono : Monotone (·⁺ᵐ : α → α) := fun _a _b hab ↦ sup_le_sup_right hab _ @[to_additive (attr := simp high)] lemma oneLePart_one : (1 : α)⁺ᵐ = 1 := sup_idem _ @[to_additive (attr := simp)] lemma leOnePart_one : (1 : α)⁻ᵐ = 1 := by simp [leOnePart] @[to_additive posPart_nonneg] lemma one_le_oneLePart (a : α) : 1 ≤ a⁺ᵐ := le_sup_right @[to_additive negPart_nonneg] lemma one_le_leOnePart (a : α) : 1 ≤ a⁻ᵐ := le_sup_right -- TODO: `to_additive` guesses `nonposPart` @[to_additive le_posPart] lemma le_oneLePart (a : α) : a ≤ a⁺ᵐ := le_sup_left @[to_additive] lemma inv_le_leOnePart (a : α) : a⁻¹ ≤ a⁻ᵐ := le_sup_left @[to_additive (attr := simp)] lemma oneLePart_eq_self : a⁺ᵐ = a ↔ 1 ≤ a := sup_eq_left @[to_additive (attr := simp)] lemma oneLePart_eq_one : a⁺ᵐ = 1 ↔ a ≤ 1 := sup_eq_right @[to_additive (attr := simp)] alias ⟨_, oneLePart_of_one_le⟩ := oneLePart_eq_self @[to_additive (attr := simp)] alias ⟨_, oneLePart_of_le_one⟩ := oneLePart_eq_one /-- See also `leOnePart_eq_inv`. -/ @[to_additive "See also `negPart_eq_neg`."] lemma leOnePart_eq_inv' : a⁻ᵐ = a⁻¹ ↔ 1 ≤ a⁻¹ := sup_eq_left /-- See also `leOnePart_eq_one`. -/ @[to_additive "See also `negPart_eq_zero`."] lemma leOnePart_eq_one' : a⁻ᵐ = 1 ↔ a⁻¹ ≤ 1 := sup_eq_right @[to_additive] lemma oneLePart_le_one : a⁺ᵐ ≤ 1 ↔ a ≤ 1 := by simp [oneLePart]	/-- See also `leOnePart_le_one`. -/	Mathlib/Algebra/Order/Group/PosPart.lean	97	97
/- Copyright (c) 2024 Mitchell Lee. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mitchell Lee -/ import Mathlib.Data.ZMod.Basic import Mathlib.GroupTheory.Coxeter.Basic import Mathlib.Tactic.Linarith import Mathlib.Tactic.Zify /-! # The length function, reduced words, and descents Throughout this file, `B` is a type and `M : CoxeterMatrix B` is a Coxeter matrix. `cs : CoxeterSystem M W` is a Coxeter system; that is, `W` is a group, and `cs` holds the data of a group isomorphism `W ≃* M.group`, where `M.group` refers to the quotient of the free group on `B` by the Coxeter relations given by the matrix `M`. See `Mathlib/GroupTheory/Coxeter/Basic.lean` for more details. Given any element $w \in W$, its length (`CoxeterSystem.length`), denoted $\ell(w)$, is the minimum number $\ell$ such that $w$ can be written as a product of a sequence of $\ell$ simple reflections: $$w = s_{i_1} \cdots s_{i_\ell}.$$ We prove for all $w_1, w_2 \in W$ that $\ell (w_1 w_2) \leq \ell (w_1) + \ell (w_2)$ and that $\ell (w_1 w_2)$ has the same parity as $\ell (w_1) + \ell (w_2)$. We define a reduced word (`CoxeterSystem.IsReduced`) for an element $w \in W$ to be a way of writing $w$ as a product of exactly $\ell(w)$ simple reflections. Every element of $W$ has a reduced word. We say that $i \in B$ is a left descent (`CoxeterSystem.IsLeftDescent`) of $w \in W$ if $\ell(s_i w) < \ell(w)$. We show that if $i$ is a left descent of $w$, then $\ell(s_i w) + 1 = \ell(w)$. On the other hand, if $i$ is not a left descent of $w$, then $\ell(s_i w) = \ell(w) + 1$. We similarly define right descents (`CoxeterSystem.IsRightDescent`) and prove analogous results. ## Main definitions * `cs.length` * `cs.IsReduced` * `cs.IsLeftDescent` * `cs.IsRightDescent` ## References * [A. Björner and F. Brenti, Combinatorics of Coxeter Groups](bjorner2005) -/ assert_not_exists TwoSidedIdeal namespace CoxeterSystem open List Matrix Function variable {B : Type} variable {W : Type} [Group W] variable {M : CoxeterMatrix B} (cs : CoxeterSystem M W) local prefix:100 "s" => cs.simple local prefix:100 "π" => cs.wordProd /-! ### Length -/ private theorem exists_word_with_prod (w : W) : ∃ n ω, ω.length = n ∧ π ω = w := by rcases cs.wordProd_surjective w with ⟨ω, rfl⟩ use ω.length, ω open scoped Classical in /-- The length of `w`; i.e., the minimum number of simple reflections that must be multiplied to form `w`. -/ noncomputable def length (w : W) : ℕ := Nat.find (cs.exists_word_with_prod w) local prefix:100 "ℓ" => cs.length theorem exists_reduced_word (w : W) : ∃ ω, ω.length = ℓ w ∧ w = π ω := by classical have := Nat.find_spec (cs.exists_word_with_prod w) tauto open scoped Classical in theorem length_wordProd_le (ω : List B) : ℓ (π ω) ≤ ω.length := Nat.find_min' (cs.exists_word_with_prod (π ω)) ⟨ω, by tauto⟩ @[simp] theorem length_one : ℓ (1 : W) = 0 := Nat.eq_zero_of_le_zero (cs.length_wordProd_le []) @[simp] theorem length_eq_zero_iff {w : W} : ℓ w = 0 ↔ w = 1 := by constructor · intro h rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩ have : ω = [] := eq_nil_of_length_eq_zero (hω.trans h) rw [this, wordProd_nil] · rintro rfl exact cs.length_one @[simp] theorem length_inv (w : W) : ℓ (w⁻¹) = ℓ w := by apply Nat.le_antisymm · rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩ have := cs.length_wordProd_le (List.reverse ω) rwa [wordProd_reverse, length_reverse, hω] at this · rcases cs.exists_reduced_word w⁻¹ with ⟨ω, hω, h'ω⟩ have := cs.length_wordProd_le (List.reverse ω) rwa [wordProd_reverse, length_reverse, ← h'ω, hω, inv_inv] at this theorem length_mul_le (w₁ w₂ : W) : ℓ (w₁ * w₂) ≤ ℓ w₁ + ℓ w₂ := by rcases cs.exists_reduced_word w₁ with ⟨ω₁, hω₁, rfl⟩ rcases cs.exists_reduced_word w₂ with ⟨ω₂, hω₂, rfl⟩ have := cs.length_wordProd_le (ω₁ ++ ω₂) simpa [hω₁, hω₂, wordProd_append] using this theorem length_mul_ge_length_sub_length (w₁ w₂ : W) : ℓ w₁ - ℓ w₂ ≤ ℓ (w₁ * w₂) := by simpa [Nat.sub_le_of_le_add] using cs.length_mul_le (w₁ * w₂) w₂⁻¹ theorem length_mul_ge_length_sub_length' (w₁ w₂ : W) : ℓ w₂ - ℓ w₁ ≤ ℓ (w₁ * w₂) := by simpa [Nat.sub_le_of_le_add, add_comm] using cs.length_mul_le w₁⁻¹ (w₁ * w₂) theorem length_mul_ge_max (w₁ w₂ : W) : max (ℓ w₁ - ℓ w₂) (ℓ w₂ - ℓ w₁) ≤ ℓ (w₁ * w₂) := max_le_iff.mpr ⟨length_mul_ge_length_sub_length _ _ _, length_mul_ge_length_sub_length' _ _ _⟩ /-- The homomorphism that sends each element `w : W` to the parity of the length of `w`. (See `lengthParity_eq_ofAdd_length`.) -/ def lengthParity : W →* Multiplicative (ZMod 2) := cs.lift ⟨fun _ ↦ Multiplicative.ofAdd 1, by simp_rw [CoxeterMatrix.IsLiftable, ← ofAdd_add, (by decide : (1 + 1 : ZMod 2) = 0)] simp⟩ theorem lengthParity_simple (i : B) : cs.lengthParity (s i) = Multiplicative.ofAdd 1 := cs.lift_apply_simple _ _ theorem lengthParity_comp_simple : cs.lengthParity ∘ cs.simple = fun _ ↦ Multiplicative.ofAdd 1 := funext cs.lengthParity_simple theorem lengthParity_eq_ofAdd_length (w : W) : cs.lengthParity w = Multiplicative.ofAdd (↑(ℓ w)) := by rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩ rw [← hω, wordProd, map_list_prod, List.map_map, lengthParity_comp_simple, map_const', prod_replicate, ← ofAdd_nsmul, nsmul_one] theorem length_mul_mod_two (w₁ w₂ : W) : ℓ (w₁ * w₂) % 2 = (ℓ w₁ + ℓ w₂) % 2 := by rw [← ZMod.natCast_eq_natCast_iff', Nat.cast_add] simpa only [lengthParity_eq_ofAdd_length, ofAdd_add] using map_mul cs.lengthParity w₁ w₂ @[simp] theorem length_simple (i : B) : ℓ (s i) = 1 := by apply Nat.le_antisymm · simpa using cs.length_wordProd_le [i] · by_contra! length_lt_one have : cs.lengthParity (s i) = Multiplicative.ofAdd 0 := by rw [lengthParity_eq_ofAdd_length, Nat.lt_one_iff.mp length_lt_one, Nat.cast_zero] have : Multiplicative.ofAdd (0 : ZMod 2) = Multiplicative.ofAdd 1 := this.symm.trans (cs.lengthParity_simple i) contradiction theorem length_eq_one_iff {w : W} : ℓ w = 1 ↔ ∃ i : B, w = s i := by constructor · intro h rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩ rcases List.length_eq_one_iff.mp (hω.trans h) with ⟨i, rfl⟩ exact ⟨i, cs.wordProd_singleton i⟩ · rintro ⟨i, rfl⟩ exact cs.length_simple i theorem length_mul_simple_ne (w : W) (i : B) : ℓ (w * s i) ≠ ℓ w := by intro eq have length_mod_two := cs.length_mul_mod_two w (s i) rw [eq, length_simple] at length_mod_two rcases Nat.mod_two_eq_zero_or_one (ℓ w) with even \| odd · rw [even, Nat.succ_mod_two_eq_one_iff.mpr even] at length_mod_two contradiction · rw [odd, Nat.succ_mod_two_eq_zero_iff.mpr odd] at length_mod_two contradiction theorem length_simple_mul_ne (w : W) (i : B) : ℓ (s i * w) ≠ ℓ w := by convert cs.length_mul_simple_ne w⁻¹ i using 1 · convert cs.length_inv ?_ using 2 simp · simp theorem length_mul_simple (w : W) (i : B) : ℓ (w * s i) = ℓ w + 1 ∨ ℓ (w * s i) + 1 = ℓ w := by rcases Nat.lt_or_gt_of_ne (cs.length_mul_simple_ne w i) with lt \| gt · -- lt : ℓ (w * s i) < ℓ w right have length_ge := cs.length_mul_ge_length_sub_length w (s i) simp only [length_simple, tsub_le_iff_right] at length_ge -- length_ge : ℓ w ≤ ℓ (w * s i) + 1 omega · -- gt : ℓ w < ℓ (w * s i) left have length_le := cs.length_mul_le w (s i) simp only [length_simple] at length_le -- length_le : ℓ (w * s i) ≤ ℓ w + 1 omega theorem length_simple_mul (w : W) (i : B) : ℓ (s i * w) = ℓ w + 1 ∨ ℓ (s i * w) + 1 = ℓ w := by have := cs.length_mul_simple w⁻¹ i rwa [(by simp : w⁻¹ * (s i) = ((s i) * w)⁻¹), length_inv, length_inv] at this /-! ### Reduced words -/ /-- The proposition that `ω` is reduced; that is, it has minimal length among all words that represent the same element of `W`. -/ def IsReduced (ω : List B) : Prop := ℓ (π ω) = ω.length @[simp] theorem isReduced_reverse_iff (ω : List B) : cs.IsReduced (ω.reverse) ↔ cs.IsReduced ω := by	simp [IsReduced] theorem IsReduced.reverse {cs : CoxeterSystem M W} {ω : List B} (hω : cs.IsReduced ω) : cs.IsReduced (ω.reverse) := (cs.isReduced_reverse_iff ω).mpr hω theorem exists_reduced_word' (w : W) : ∃ ω : List B, cs.IsReduced ω ∧ w = π ω := by rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩ use ω tauto private theorem isReduced_take_and_drop {ω : List B} (hω : cs.IsReduced ω) (j : ℕ) :	Mathlib/GroupTheory/Coxeter/Length.lean	213	224
/- Copyright (c) 2021 Alex J. Best. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alex J. Best -/ import Mathlib.Algebra.GroupWithZero.Units.Basic import Mathlib.Algebra.Group.Action.Basic import Mathlib.Algebra.Group.Pointwise.Set.Scalar /-! # Pointwise actions on sets in Pi types This file contains lemmas about pointwise actions on sets in Pi types. ## Tags set multiplication, set addition, pointwise addition, pointwise multiplication, pi -/ open Pointwise open Set variable {K ι : Type} {R : ι → Type} @[to_additive] theorem smul_pi_subset [∀ i, SMul K (R i)] (r : K) (s : Set ι) (t : ∀ i, Set (R i)) :	r • pi s t ⊆ pi s (r • t) := piMap_image_pi_subset _ @[to_additive]	Mathlib/Algebra/Module/PointwisePi.lean	29	32
/- Copyright (c) 2020 Bhavik Mehta, Edward Ayers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Bhavik Mehta, Edward Ayers -/ import Mathlib.CategoryTheory.Sites.Sieves import Mathlib.CategoryTheory.Limits.Shapes.Multiequalizer import Mathlib.CategoryTheory.Category.Preorder import Mathlib.Order.Copy import Mathlib.Data.Set.Subsingleton /-! # Grothendieck topologies Definition and lemmas about Grothendieck topologies. A Grothendieck topology for a category `C` is a set of sieves on each object `X` satisfying certain closure conditions. Alternate versions of the axioms (in arrow form) are also described. Two explicit examples of Grothendieck topologies are given: * The dense topology * The atomic topology as well as the complete lattice structure on Grothendieck topologies (which gives two additional explicit topologies: the discrete and trivial topologies.) A pretopology, or a basis for a topology is defined in `Mathlib/CategoryTheory/Sites/Pretopology.lean`. The topology associated to a topological space is defined in `Mathlib/CategoryTheory/Sites/Spaces.lean`. ## Tags Grothendieck topology, coverage, pretopology, site ## References * [nLab, Grothendieck topology](https://ncatlab.org/nlab/show/Grothendieck+topology) * [S. MacLane, I. Moerdijk, Sheaves in Geometry and Logic][MM92] ## Implementation notes We use the definition of [nlab] and [MM92][] (Chapter III, Section 2), where Grothendieck topologies are saturated collections of morphisms, rather than the notions of the Stacks project (00VG) and the Elephant, in which topologies are allowed to be unsaturated, and are then completed. TODO (BM): Add the definition from Stacks, as a pretopology, and complete to a topology. This is so that we can produce a bijective correspondence between Grothendieck topologies on a small category and Lawvere-Tierney topologies on its presheaf topos, as well as the equivalence between Grothendieck topoi and left exact reflective subcategories of presheaf toposes. -/ universe v₁ u₁ v u namespace CategoryTheory open Category variable (C : Type u) [Category.{v} C] /-- The definition of a Grothendieck topology: a set of sieves `J X` on each object `X` satisfying three axioms: 1. For every object `X`, the maximal sieve is in `J X`. 2. If `S ∈ J X` then its pullback along any `h : Y ⟶ X` is in `J Y`. 3. If `S ∈ J X` and `R` is a sieve on `X`, then provided that the pullback of `R` along any arrow `f : Y ⟶ X` in `S` is in `J Y`, we have that `R` itself is in `J X`. A sieve `S` on `X` is referred to as `J`-covering, (or just covering), if `S ∈ J X`. See also [nlab] or [MM92] Chapter III, Section 2, Definition 1. -/ @[stacks 00Z4] structure GrothendieckTopology where /-- A Grothendieck topology on `C` consists of a set of sieves for each object `X`, which satisfy some axioms. -/ sieves : ∀ X : C, Set (Sieve X) /-- The sieves associated to each object must contain the top sieve. Use `GrothendieckTopology.top_mem`. -/ top_mem' : ∀ X, ⊤ ∈ sieves X /-- Stability under pullback. Use `GrothendieckTopology.pullback_stable`. -/ pullback_stable' : ∀ ⦃X Y : C⦄ ⦃S : Sieve X⦄ (f : Y ⟶ X), S ∈ sieves X → S.pullback f ∈ sieves Y /-- Transitivity of sieves in a Grothendieck topology. Use `GrothendieckTopology.transitive`. -/ transitive' : ∀ ⦃X⦄ ⦃S : Sieve X⦄ (_ : S ∈ sieves X) (R : Sieve X), (∀ ⦃Y⦄ ⦃f : Y ⟶ X⦄, S f → R.pullback f ∈ sieves Y) → R ∈ sieves X namespace GrothendieckTopology instance : DFunLike (GrothendieckTopology C) C (fun X ↦ Set (Sieve X)) where coe J X := sieves J X coe_injective' J₁ J₂ h := by cases J₁; cases J₂; congr variable {C} variable {X Y : C} {S R : Sieve X} variable (J : GrothendieckTopology C) /-- An extensionality lemma in terms of the coercion to a pi-type. We prove this explicitly rather than deriving it so that it is in terms of the coercion rather than the projection `.sieves`. -/ @[ext] theorem ext {J₁ J₂ : GrothendieckTopology C} (h : (J₁ : ∀ X : C, Set (Sieve X)) = J₂) : J₁ = J₂ := DFunLike.coe_injective h @[simp] theorem mem_sieves_iff_coe : S ∈ J.sieves X ↔ S ∈ J X := Iff.rfl /-- Also known as the maximality axiom. -/ @[simp] theorem top_mem (X : C) : ⊤ ∈ J X := J.top_mem' X /-- Also known as the stability axiom. -/ @[simp] theorem pullback_stable (f : Y ⟶ X) (hS : S ∈ J X) : S.pullback f ∈ J Y := J.pullback_stable' f hS variable {J} in @[simp] lemma pullback_mem_iff_of_isIso {i : X ⟶ Y} [IsIso i] {S : Sieve Y} : S.pullback i ∈ J _ ↔ S ∈ J _ := by refine ⟨fun H ↦ ?_, J.pullback_stable i⟩ convert J.pullback_stable (inv i) H rw [← Sieve.pullback_comp, IsIso.inv_hom_id, Sieve.pullback_id] theorem transitive (hS : S ∈ J X) (R : Sieve X) (h : ∀ ⦃Y⦄ ⦃f : Y ⟶ X⦄, S f → R.pullback f ∈ J Y) : R ∈ J X := J.transitive' hS R h theorem covering_of_eq_top : S = ⊤ → S ∈ J X := fun h => h.symm ▸ J.top_mem X /-- If `S` is a subset of `R`, and `S` is covering, then `R` is covering as well. See also discussion after [MM92] Chapter III, Section 2, Definition 1. -/ @[stacks 00Z5 "(2)"] theorem superset_covering (Hss : S ≤ R) (sjx : S ∈ J X) : R ∈ J X := by apply J.transitive sjx R fun Y f hf => _ intros Y f hf apply covering_of_eq_top rw [← top_le_iff, ← S.pullback_eq_top_of_mem hf] apply Sieve.pullback_monotone _ Hss /-- The intersection of two covering sieves is covering. See also [MM92] Chapter III, Section 2, Definition 1 (iv). -/ @[stacks 00Z5 "(1)"] theorem intersection_covering (rj : R ∈ J X) (sj : S ∈ J X) : R ⊓ S ∈ J X := by apply J.transitive rj _ fun Y f Hf => _ intros Y f hf rw [Sieve.pullback_inter, R.pullback_eq_top_of_mem hf] simp [sj] @[simp] theorem intersection_covering_iff : R ⊓ S ∈ J X ↔ R ∈ J X ∧ S ∈ J X := ⟨fun h => ⟨J.superset_covering inf_le_left h, J.superset_covering inf_le_right h⟩, fun t => intersection_covering _ t.1 t.2⟩ theorem bind_covering {S : Sieve X} {R : ∀ ⦃Y : C⦄ ⦃f : Y ⟶ X⦄, S f → Sieve Y} (hS : S ∈ J X) (hR : ∀ ⦃Y⦄ ⦃f : Y ⟶ X⦄ (H : S f), R H ∈ J Y) : Sieve.bind S R ∈ J X := J.transitive hS _ fun _ f hf => superset_covering J (Sieve.le_pullback_bind S R f hf) (hR hf) /-- The sieve `S` on `X` `J`-covers an arrow `f` to `X` if `S.pullback f ∈ J Y`. This definition is an alternate way of presenting a Grothendieck topology. -/ def Covers (S : Sieve X) (f : Y ⟶ X) : Prop := S.pullback f ∈ J Y theorem covers_iff (S : Sieve X) (f : Y ⟶ X) : J.Covers S f ↔ S.pullback f ∈ J Y := Iff.rfl theorem covering_iff_covers_id (S : Sieve X) : S ∈ J X ↔ J.Covers S (𝟙 X) := by simp [covers_iff] /-- The maximality axiom in 'arrow' form: Any arrow `f` in `S` is covered by `S`. -/ theorem arrow_max (f : Y ⟶ X) (S : Sieve X) (hf : S f) : J.Covers S f := by rw [Covers, (Sieve.mem_iff_pullback_eq_top f).1 hf] apply J.top_mem /-- The stability axiom in 'arrow' form: If `S` covers `f` then `S` covers `g ≫ f` for any `g`. -/ theorem arrow_stable (f : Y ⟶ X) (S : Sieve X) (h : J.Covers S f) {Z : C} (g : Z ⟶ Y) : J.Covers S (g ≫ f) := by rw [covers_iff] at h ⊢ simp [h, Sieve.pullback_comp] /-- The transitivity axiom in 'arrow' form: If `S` covers `f` and every arrow in `S` is covered by `R`, then `R` covers `f`. -/ theorem arrow_trans (f : Y ⟶ X) (S R : Sieve X) (h : J.Covers S f) : (∀ {Z : C} (g : Z ⟶ X), S g → J.Covers R g) → J.Covers R f := by intro k apply J.transitive h intro Z g hg rw [← Sieve.pullback_comp] apply k (g ≫ f) hg theorem arrow_intersect (f : Y ⟶ X) (S R : Sieve X) (hS : J.Covers S f) (hR : J.Covers R f) : J.Covers (S ⊓ R) f := by simpa [covers_iff] using And.intro hS hR variable (C) /-- The trivial Grothendieck topology, in which only the maximal sieve is covering. This topology is also known as the indiscrete, coarse, or chaotic topology. See [MM92] Chapter III, Section 2, example (a), or https://en.wikipedia.org/wiki/Grothendieck_topology#The_discrete_and_indiscrete_topologies -/ def trivial : GrothendieckTopology C where sieves _ := {⊤} top_mem' _ := rfl pullback_stable' X Y S f hf := by rw [Set.mem_singleton_iff] at hf ⊢ simp [hf] transitive' X S hS R hR := by rw [Set.mem_singleton_iff, ← Sieve.id_mem_iff_eq_top] at hS	simpa using hR hS	Mathlib/CategoryTheory/Sites/Grothendieck.lean	215	216
/- 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.MetricSpace.Pseudo.Basic import Mathlib.Topology.MetricSpace.Pseudo.Lemmas import Mathlib.Topology.MetricSpace.Pseudo.Pi import Mathlib.Topology.MetricSpace.Defs /-! # Basic properties of metric spaces, and instances. -/ open Set Filter Bornology Topology open scoped NNReal Uniformity universe u v w variable {α : Type u} {β : Type v} {X : Type} variable [PseudoMetricSpace α] variable {γ : Type w} [MetricSpace γ] namespace Metric variable {x : γ} {s : Set γ} -- see Note [lower instance priority] instance (priority := 100) _root_.MetricSpace.instT0Space : T0Space γ where t0 _ _ h := eq_of_dist_eq_zero <\| Metric.inseparable_iff.1 h /-- A map between metric spaces is a uniform embedding if and only if the distance between `f x` and `f y` is controlled in terms of the distance between `x` and `y` and conversely. -/ theorem isUniformEmbedding_iff' [PseudoMetricSpace β] {f : γ → β} : IsUniformEmbedding f ↔ (∀ ε > 0, ∃ δ > 0, ∀ {a b : γ}, dist a b < δ → dist (f a) (f b) < ε) ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : γ}, dist (f a) (f b) < ε → dist a b < δ := by rw [isUniformEmbedding_iff_isUniformInducing, isUniformInducing_iff, uniformContinuous_iff] /-- If a `PseudoMetricSpace` is a T₀ space, then it is a `MetricSpace`. -/ abbrev _root_.MetricSpace.ofT0PseudoMetricSpace (α : Type) [PseudoMetricSpace α] [T0Space α] : MetricSpace α where toPseudoMetricSpace := ‹_› eq_of_dist_eq_zero hdist := (Metric.inseparable_iff.2 hdist).eq -- see Note [lower instance priority] /-- A metric space induces an emetric space -/ instance (priority := 100) _root_.MetricSpace.toEMetricSpace : EMetricSpace γ := .ofT0PseudoEMetricSpace γ theorem isClosed_of_pairwise_le_dist {s : Set γ} {ε : ℝ} (hε : 0 < ε) (hs : s.Pairwise fun x y => ε ≤ dist x y) : IsClosed s := isClosed_of_spaced_out (dist_mem_uniformity hε) <\| by simpa using hs theorem isClosedEmbedding_of_pairwise_le_dist {α : Type} [TopologicalSpace α] [DiscreteTopology α] {ε : ℝ} (hε : 0 < ε) {f : α → γ} (hf : Pairwise fun x y => ε ≤ dist (f x) (f y)) : IsClosedEmbedding f := isClosedEmbedding_of_spaced_out (dist_mem_uniformity hε) <\| by simpa using hf /-- If `f : β → α` sends any two distinct points to points at distance at least `ε > 0`, then `f` is a uniform embedding with respect to the discrete uniformity on `β`. -/ theorem isUniformEmbedding_bot_of_pairwise_le_dist {β : Type} {ε : ℝ} (hε : 0 < ε) {f : β → α} (hf : Pairwise fun x y => ε ≤ dist (f x) (f y)) : @IsUniformEmbedding _ _ ⊥ (by infer_instance) f := isUniformEmbedding_of_spaced_out (dist_mem_uniformity hε) <\| by simpa using hf end Metric /-- One gets a metric space from an emetric space if the edistance is everywhere finite, by pushing the edistance to reals. We set it up so that the edist and the uniformity are defeq in the metric space and the emetric space. In this definition, the distance is given separately, to be able to prescribe some expression which is not defeq to the push-forward of the edistance to reals. -/ abbrev EMetricSpace.toMetricSpaceOfDist {α : Type u} [EMetricSpace α] (dist : α → α → ℝ) (edist_ne_top : ∀ x y : α, edist x y ≠ ⊤) (h : ∀ x y, dist x y = ENNReal.toReal (edist x y)) : MetricSpace α := @MetricSpace.ofT0PseudoMetricSpace _ (PseudoEMetricSpace.toPseudoMetricSpaceOfDist dist edist_ne_top h) _ /-- One gets a metric space from an emetric space if the edistance is everywhere finite, by pushing the edistance to reals. We set it up so that the edist and the uniformity are defeq in the metric space and the emetric space. -/ def EMetricSpace.toMetricSpace {α : Type u} [EMetricSpace α] (h : ∀ x y : α, edist x y ≠ ⊤) : MetricSpace α := EMetricSpace.toMetricSpaceOfDist (fun x y => ENNReal.toReal (edist x y)) h fun _ _ => rfl /-- Metric space structure pulled back by an injective function. Injectivity is necessary to ensure that `dist x y = 0` only if `x = y`. -/ abbrev MetricSpace.induced {γ β} (f : γ → β) (hf : Function.Injective f) (m : MetricSpace β) : MetricSpace γ := { PseudoMetricSpace.induced f m.toPseudoMetricSpace with eq_of_dist_eq_zero := fun h => hf (dist_eq_zero.1 h) } /-- Pull back a metric space structure by a uniform embedding. This is a version of `MetricSpace.induced` useful in case if the domain already has a `UniformSpace` structure. -/ abbrev IsUniformEmbedding.comapMetricSpace {α β} [UniformSpace α] [m : MetricSpace β] (f : α → β) (h : IsUniformEmbedding f) : MetricSpace α := .replaceUniformity (.induced f h.injective m) h.comap_uniformity.symm /-- Pull back a metric space structure by an embedding. This is a version of `MetricSpace.induced` useful in case if the domain already has a `TopologicalSpace` structure. -/ abbrev Topology.IsEmbedding.comapMetricSpace {α β} [TopologicalSpace α] [m : MetricSpace β] (f : α → β) (h : IsEmbedding f) : MetricSpace α := .replaceTopology (.induced f h.injective m) h.eq_induced	@[deprecated (since := "2024-10-26")] alias Embedding.comapMetricSpace := IsEmbedding.comapMetricSpace	Mathlib/Topology/MetricSpace/Basic.lean	107	108
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov, Patrick Massot, Sébastien Gouëzel -/ import Mathlib.MeasureTheory.Integral.IntervalIntegral.FundThmCalculus deprecated_module (since := "2025-04-06")		Mathlib/MeasureTheory/Integral/FundThmCalculus.lean	1,321	1,330
/- Copyright (c) 2022 Yaël Dillies, Bhavik Mehta. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies, Bhavik Mehta -/ import Mathlib.Combinatorics.SimpleGraph.Regularity.Bound import Mathlib.Combinatorics.SimpleGraph.Regularity.Equitabilise import Mathlib.Combinatorics.SimpleGraph.Regularity.Uniform /-! # Chunk of the increment partition for Szemerédi Regularity Lemma In the proof of Szemerédi Regularity Lemma, we need to partition each part of a starting partition to increase the energy. This file defines those partitions of parts and shows that they locally increase the energy. This entire file is internal to the proof of Szemerédi Regularity Lemma. ## Main declarations * `SzemerediRegularity.chunk`: The partition of a part of the starting partition. * `SzemerediRegularity.edgeDensity_chunk_uniform`: `chunk` does not locally decrease the edge density between uniform parts too much. * `SzemerediRegularity.edgeDensity_chunk_not_uniform`: `chunk` locally increases the edge density between non-uniform parts. ## TODO Once ported to mathlib4, this file will be a great golfing ground for Heather's new tactic `gcongr`. ## References [Yaël Dillies, Bhavik Mehta, Formalising Szemerédi’s Regularity Lemma in Lean][srl_itp] -/ open Finpartition Finset Fintype Rel Nat open scoped SzemerediRegularity.Positivity namespace SzemerediRegularity variable {α : Type} [Fintype α] [DecidableEq α] {P : Finpartition (univ : Finset α)} (hP : P.IsEquipartition) (G : SimpleGraph α) [DecidableRel G.Adj] (ε : ℝ) {U : Finset α} (hU : U ∈ P.parts) (V : Finset α) local notation3 "m" => (card α / stepBound #P.parts : ℕ) /-! ### Definitions We define `chunk`, the partition of a part, and `star`, the sets of parts of `chunk` that are contained in the corresponding witness of non-uniformity. -/ /-- The portion of `SzemerediRegularity.increment` which partitions `U`. -/ noncomputable def chunk : Finpartition U := if hUcard : #U = m 4 ^ #P.parts + (card α / #P.parts - m * 4 ^ #P.parts) then (atomise U <\| P.nonuniformWitnesses G ε U).equitabilise <\| card_aux₁ hUcard else (atomise U <\| P.nonuniformWitnesses G ε U).equitabilise <\| card_aux₂ hP hU hUcard -- `hP` and `hU` are used to get that `U` has size -- `m * 4 ^ #P.parts + a or m * 4 ^ #P.parts + a + 1` /-- The portion of `SzemerediRegularity.chunk` which is contained in the witness of non-uniformity of `U` and `V`. -/ noncomputable def star (V : Finset α) : Finset (Finset α) := {A ∈ (chunk hP G ε hU).parts \| A ⊆ G.nonuniformWitness ε U V} /-! ### Density estimates We estimate the density between parts of `chunk`. -/ theorem biUnion_star_subset_nonuniformWitness : (star hP G ε hU V).biUnion id ⊆ G.nonuniformWitness ε U V := biUnion_subset_iff_forall_subset.2 fun _ hA => (mem_filter.1 hA).2 variable {hP G ε hU V} {𝒜 : Finset (Finset α)} {s : Finset α} theorem star_subset_chunk : star hP G ε hU V ⊆ (chunk hP G ε hU).parts := filter_subset _ _ private theorem card_nonuniformWitness_sdiff_biUnion_star (hV : V ∈ P.parts) (hUV : U ≠ V) (h₂ : ¬G.IsUniform ε U V) : #(G.nonuniformWitness ε U V \ (star hP G ε hU V).biUnion id) ≤ 2 ^ (#P.parts - 1) * m := by have hX : G.nonuniformWitness ε U V ∈ P.nonuniformWitnesses G ε U := nonuniformWitness_mem_nonuniformWitnesses h₂ hV hUV have q : G.nonuniformWitness ε U V \ (star hP G ε hU V).biUnion id ⊆ {B ∈ (atomise U <\| P.nonuniformWitnesses G ε U).parts \| B ⊆ G.nonuniformWitness ε U V ∧ B.Nonempty}.biUnion fun B => B \ {A ∈ (chunk hP G ε hU).parts \| A ⊆ B}.biUnion id := by intro x hx rw [← biUnion_filter_atomise hX (G.nonuniformWitness_subset h₂), star, mem_sdiff, mem_biUnion] at hx simp only [not_exists, mem_biUnion, and_imp, exists_prop, mem_filter, not_and, mem_sdiff, id, mem_sdiff] at hx ⊢ obtain ⟨⟨B, hB₁, hB₂⟩, hx⟩ := hx exact ⟨B, hB₁, hB₂, fun A hA AB => hx A hA <\| AB.trans hB₁.2.1⟩ apply (card_le_card q).trans (card_biUnion_le.trans _) trans ∑ B ∈ (atomise U <\| P.nonuniformWitnesses G ε U).parts with B ⊆ G.nonuniformWitness ε U V ∧ B.Nonempty, m · suffices ∀ B ∈ (atomise U <\| P.nonuniformWitnesses G ε U).parts, #(B \ {A ∈ (chunk hP G ε hU).parts \| A ⊆ B}.biUnion id) ≤ m by exact sum_le_sum fun B hB => this B <\| filter_subset _ _ hB intro B hB unfold chunk split_ifs with h₁ · convert card_parts_equitabilise_subset_le _ (card_aux₁ h₁) hB · convert card_parts_equitabilise_subset_le _ (card_aux₂ hP hU h₁) hB rw [sum_const] refine mul_le_mul_right' ?_ _ have t := card_filter_atomise_le_two_pow (s := U) hX refine t.trans (pow_right_mono₀ (by norm_num) <\| tsub_le_tsub_right ?_ _) exact card_image_le.trans (card_le_card <\| filter_subset _ _) private theorem one_sub_eps_mul_card_nonuniformWitness_le_card_star (hV : V ∈ P.parts) (hUV : U ≠ V) (hunif : ¬G.IsUniform ε U V) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hε₁ : ε ≤ 1) : (1 - ε / 10) * #(G.nonuniformWitness ε U V) ≤ #((star hP G ε hU V).biUnion id) := by have hP₁ : 0 < #P.parts := Finset.card_pos.2 ⟨_, hU⟩ have : (↑2 ^ #P.parts : ℝ) * m / (#U * ε) ≤ ε / 10 := by rw [← div_div, div_le_iff₀'] swap · sz_positivity refine le_of_mul_le_mul_left ?_ (pow_pos zero_lt_two #P.parts) calc ↑2 ^ #P.parts * ((↑2 ^ #P.parts * m : ℝ) / #U) = ((2 : ℝ) * 2) ^ #P.parts * m / #U := by rw [mul_pow, ← mul_div_assoc, mul_assoc] _ = ↑4 ^ #P.parts * m / #U := by norm_num _ ≤ 1 := div_le_one_of_le₀ (pow_mul_m_le_card_part hP hU) (cast_nonneg _) _ ≤ ↑2 ^ #P.parts * ε ^ 2 / 10 := by refine (one_le_sq_iff₀ <\| by positivity).1 ?_ rw [div_pow, mul_pow, pow_right_comm, ← pow_mul ε, one_le_div (sq_pos_of_ne_zero <\| by norm_num)] calc (↑10 ^ 2) = 100 := by norm_num _ ≤ ↑4 ^ #P.parts * ε ^ 5 := hPε _ ≤ ↑4 ^ #P.parts * ε ^ 4 := (mul_le_mul_of_nonneg_left (pow_le_pow_of_le_one (by sz_positivity) hε₁ <\| le_succ _) (by positivity)) _ = (↑2 ^ 2) ^ #P.parts * ε ^ (2 * 2) := by norm_num _ = ↑2 ^ #P.parts * (ε * (ε / 10)) := by rw [mul_div_assoc, sq, mul_div_assoc] calc (↑1 - ε / 10) * #(G.nonuniformWitness ε U V) ≤ (↑1 - ↑2 ^ #P.parts * m / (#U * ε)) * #(G.nonuniformWitness ε U V) := mul_le_mul_of_nonneg_right (sub_le_sub_left this _) (cast_nonneg _) _ = #(G.nonuniformWitness ε U V) - ↑2 ^ #P.parts * m / (#U * ε) * #(G.nonuniformWitness ε U V) := by rw [sub_mul, one_mul] _ ≤ #(G.nonuniformWitness ε U V) - ↑2 ^ (#P.parts - 1) * m := by refine sub_le_sub_left ?_ _ have : (2 : ℝ) ^ #P.parts = ↑2 ^ (#P.parts - 1) * 2 := by rw [← _root_.pow_succ, tsub_add_cancel_of_le (succ_le_iff.2 hP₁)] rw [← mul_div_right_comm, this, mul_right_comm _ (2 : ℝ), mul_assoc, le_div_iff₀] · refine mul_le_mul_of_nonneg_left ?_ (by positivity) exact (G.le_card_nonuniformWitness hunif).trans (le_mul_of_one_le_left (cast_nonneg _) one_le_two) have := Finset.card_pos.mpr (P.nonempty_of_mem_parts hU) sz_positivity _ ≤ #((star hP G ε hU V).biUnion id) := by rw [sub_le_comm, ← cast_sub (card_le_card <\| biUnion_star_subset_nonuniformWitness hP G ε hU V), ← card_sdiff (biUnion_star_subset_nonuniformWitness hP G ε hU V)] exact mod_cast card_nonuniformWitness_sdiff_biUnion_star hV hUV hunif /-! ### `chunk` -/ theorem card_chunk (hm : m ≠ 0) : #(chunk hP G ε hU).parts = 4 ^ #P.parts := by unfold chunk split_ifs · rw [card_parts_equitabilise _ _ hm, tsub_add_cancel_of_le] exact le_of_lt a_add_one_le_four_pow_parts_card · rw [card_parts_equitabilise _ _ hm, tsub_add_cancel_of_le a_add_one_le_four_pow_parts_card] theorem card_eq_of_mem_parts_chunk (hs : s ∈ (chunk hP G ε hU).parts) : #s = m ∨ #s = m + 1 := by unfold chunk at hs split_ifs at hs <;> exact card_eq_of_mem_parts_equitabilise hs theorem m_le_card_of_mem_chunk_parts (hs : s ∈ (chunk hP G ε hU).parts) : m ≤ #s := (card_eq_of_mem_parts_chunk hs).elim ge_of_eq fun i => by simp [i] theorem card_le_m_add_one_of_mem_chunk_parts (hs : s ∈ (chunk hP G ε hU).parts) : #s ≤ m + 1 := (card_eq_of_mem_parts_chunk hs).elim (fun i => by simp [i]) fun i => i.le theorem card_biUnion_star_le_m_add_one_card_star_mul : (#((star hP G ε hU V).biUnion id) : ℝ) ≤ #(star hP G ε hU V) * (m + 1) := mod_cast card_biUnion_le_card_mul _ _ _ fun _ hs => card_le_m_add_one_of_mem_chunk_parts <\| star_subset_chunk hs private theorem le_sum_card_subset_chunk_parts (h𝒜 : 𝒜 ⊆ (chunk hP G ε hU).parts) (hs : s ∈ 𝒜) : (#𝒜 : ℝ) * #s * (m / (m + 1)) ≤ #(𝒜.sup id) := by rw [mul_div_assoc', div_le_iff₀ coe_m_add_one_pos, mul_right_comm] refine mul_le_mul ?_ ?_ (cast_nonneg _) (cast_nonneg _) · rw [← (ofSubset _ h𝒜 rfl).sum_card_parts, ofSubset_parts, ← cast_mul, cast_le] exact card_nsmul_le_sum _ _ _ fun x hx => m_le_card_of_mem_chunk_parts <\| h𝒜 hx · exact mod_cast card_le_m_add_one_of_mem_chunk_parts (h𝒜 hs) private theorem sum_card_subset_chunk_parts_le (m_pos : (0 : ℝ) < m) (h𝒜 : 𝒜 ⊆ (chunk hP G ε hU).parts) (hs : s ∈ 𝒜) : (#(𝒜.sup id) : ℝ) ≤ #𝒜 * #s * ((m + 1) / m) := by rw [sup_eq_biUnion, mul_div_assoc', le_div_iff₀ m_pos, mul_right_comm] refine mul_le_mul ?_ ?_ (cast_nonneg _) (by positivity) · norm_cast refine card_biUnion_le_card_mul _ _ _ fun x hx => ?_ apply card_le_m_add_one_of_mem_chunk_parts (h𝒜 hx) · exact mod_cast m_le_card_of_mem_chunk_parts (h𝒜 hs) private theorem one_sub_le_m_div_m_add_one_sq [Nonempty α] (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) : ↑1 - ε ^ 5 / ↑50 ≤ (m / (m + 1 : ℝ)) ^ 2 := by have : (m : ℝ) / (m + 1) = 1 - 1 / (m + 1) := by rw [one_sub_div coe_m_add_one_pos.ne', add_sub_cancel_right] rw [this, sub_sq, one_pow, mul_one] refine le_trans ?_ (le_add_of_nonneg_right <\| sq_nonneg _) rw [sub_le_sub_iff_left, ← le_div_iff₀' (show (0 : ℝ) < 2 by norm_num), div_div, one_div_le coe_m_add_one_pos, one_div_div] · refine le_trans ?_ (le_add_of_nonneg_right zero_le_one) norm_num apply hundred_div_ε_pow_five_le_m hPα hPε sz_positivity private theorem m_add_one_div_m_le_one_add [Nonempty α] (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hε₁ : ε ≤ 1) : ((m + 1 : ℝ) / m) ^ 2 ≤ ↑1 + ε ^ 5 / 49 := by have : 0 ≤ ε := by sz_positivity rw [same_add_div (by sz_positivity)] calc _ ≤ (1 + ε ^ 5 / 100) ^ 2 := by gcongr (1 + ?_) ^ 2 rw [← one_div_div (100 : ℝ)] exact one_div_le_one_div_of_le (by sz_positivity) (hundred_div_ε_pow_five_le_m hPα hPε) _ = 1 + ε ^ 5 * (50⁻¹ + ε ^ 5 / 10000) := by ring _ ≤ 1 + ε ^ 5 * (50⁻¹ + 1 ^ 5 / 10000) := by gcongr _ ≤ 1 + ε ^ 5 * 49⁻¹ := by gcongr; norm_num _ = 1 + ε ^ 5 / 49 := by rw [div_eq_mul_inv] private theorem density_sub_eps_le_sum_density_div_card [Nonempty α] (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) {hU : U ∈ P.parts} {hV : V ∈ P.parts} {A B : Finset (Finset α)} (hA : A ⊆ (chunk hP G ε hU).parts) (hB : B ⊆ (chunk hP G ε hV).parts) : (G.edgeDensity (A.biUnion id) (B.biUnion id)) - ε ^ 5 / 50 ≤ (∑ ab ∈ A.product B, (G.edgeDensity ab.1 ab.2 : ℝ)) / (#A * #B) := by have : ↑(G.edgeDensity (A.biUnion id) (B.biUnion id)) - ε ^ 5 / ↑50 ≤ (↑1 - ε ^ 5 / 50) * G.edgeDensity (A.biUnion id) (B.biUnion id) := by rw [sub_mul, one_mul, sub_le_sub_iff_left] refine mul_le_of_le_one_right (by sz_positivity) ?_ exact mod_cast G.edgeDensity_le_one _ _ refine this.trans ?_ conv_rhs => -- Porting note: LHS and RHS need separate treatment to get the desired form simp only [SimpleGraph.edgeDensity_def, sum_div, Rat.cast_div, div_div] conv_lhs => rw [SimpleGraph.edgeDensity_def, SimpleGraph.interedges, ← sup_eq_biUnion, ← sup_eq_biUnion, Rel.card_interedges_finpartition _ (ofSubset _ hA rfl) (ofSubset _ hB rfl), ofSubset_parts, ofSubset_parts] simp only [cast_sum, sum_div, mul_sum, Rat.cast_sum, Rat.cast_div, mul_div_left_comm ((1 : ℝ) - _)] push_cast apply sum_le_sum simp only [and_imp, Prod.forall, mem_product] rintro x y hx hy rw [mul_mul_mul_comm, mul_comm (#x : ℝ), mul_comm (#y : ℝ), le_div_iff₀, mul_assoc] · refine mul_le_of_le_one_right (cast_nonneg _) ?_ rw [div_mul_eq_mul_div, ← mul_assoc, mul_assoc] refine div_le_one_of_le₀ ?_ (by positivity) refine (mul_le_mul_of_nonneg_right (one_sub_le_m_div_m_add_one_sq hPα hPε) ?_).trans ?_ · exact mod_cast _root_.zero_le _ rw [sq, mul_mul_mul_comm, mul_comm ((m : ℝ) / _), mul_comm ((m : ℝ) / _)] refine mul_le_mul ?_ ?_ ?_ (cast_nonneg _) · apply le_sum_card_subset_chunk_parts hA hx · apply le_sum_card_subset_chunk_parts hB hy · positivity refine mul_pos (mul_pos ?_ ?_) (mul_pos ?_ ?_) <;> rw [cast_pos, Finset.card_pos] exacts [⟨_, hx⟩, nonempty_of_mem_parts _ (hA hx), ⟨_, hy⟩, nonempty_of_mem_parts _ (hB hy)] private theorem sum_density_div_card_le_density_add_eps [Nonempty α] (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hε₁ : ε ≤ 1) {hU : U ∈ P.parts} {hV : V ∈ P.parts} {A B : Finset (Finset α)} (hA : A ⊆ (chunk hP G ε hU).parts) (hB : B ⊆ (chunk hP G ε hV).parts) : (∑ ab ∈ A.product B, G.edgeDensity ab.1 ab.2 : ℝ) / (#A * #B) ≤ G.edgeDensity (A.biUnion id) (B.biUnion id) + ε ^ 5 / 49 := by have : (↑1 + ε ^ 5 / ↑49) * G.edgeDensity (A.biUnion id) (B.biUnion id) ≤ G.edgeDensity (A.biUnion id) (B.biUnion id) + ε ^ 5 / 49 := by rw [add_mul, one_mul, add_le_add_iff_left] refine mul_le_of_le_one_right (by sz_positivity) ?_ exact mod_cast G.edgeDensity_le_one _ _ refine le_trans ?_ this conv_lhs => -- Porting note: LHS and RHS need separate treatment to get the desired form simp only [SimpleGraph.edgeDensity, edgeDensity, sum_div, Rat.cast_div, div_div] conv_rhs => rw [SimpleGraph.edgeDensity, edgeDensity, ← sup_eq_biUnion, ← sup_eq_biUnion, Rel.card_interedges_finpartition _ (ofSubset _ hA rfl) (ofSubset _ hB rfl)] simp only [cast_sum, mul_sum, sum_div, Rat.cast_sum, Rat.cast_div, mul_div_left_comm ((1 : ℝ) + _)] push_cast apply sum_le_sum simp only [and_imp, Prod.forall, mem_product, show A.product B = A ×ˢ B by rfl] intro x y hx hy rw [mul_mul_mul_comm, mul_comm (#x : ℝ), mul_comm (#y : ℝ), div_le_iff₀, mul_assoc] · refine le_mul_of_one_le_right (cast_nonneg _) ?_ rw [div_mul_eq_mul_div, one_le_div] · refine le_trans ?_ (mul_le_mul_of_nonneg_right (m_add_one_div_m_le_one_add hPα hPε hε₁) ?_) · rw [sq, mul_mul_mul_comm, mul_comm (_ / (m : ℝ)), mul_comm (_ / (m : ℝ))] exact mul_le_mul (sum_card_subset_chunk_parts_le (by sz_positivity) hA hx) (sum_card_subset_chunk_parts_le (by sz_positivity) hB hy) (by positivity) (by positivity) · exact mod_cast _root_.zero_le _ rw [← cast_mul, cast_pos] apply mul_pos <;> rw [Finset.card_pos, sup_eq_biUnion, biUnion_nonempty] · exact ⟨_, hx, nonempty_of_mem_parts _ (hA hx)⟩ · exact ⟨_, hy, nonempty_of_mem_parts _ (hB hy)⟩ refine mul_pos (mul_pos ?_ ?_) (mul_pos ?_ ?_) <;> rw [cast_pos, Finset.card_pos] exacts [⟨_, hx⟩, nonempty_of_mem_parts _ (hA hx), ⟨_, hy⟩, nonempty_of_mem_parts _ (hB hy)] private theorem average_density_near_total_density [Nonempty α] (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hε₁ : ε ≤ 1) {hU : U ∈ P.parts} {hV : V ∈ P.parts} {A B : Finset (Finset α)} (hA : A ⊆ (chunk hP G ε hU).parts) (hB : B ⊆ (chunk hP G ε hV).parts) : \|(∑ ab ∈ A.product B, G.edgeDensity ab.1 ab.2 : ℝ) / (#A * #B) - G.edgeDensity (A.biUnion id) (B.biUnion id)\| ≤ ε ^ 5 / 49 := by rw [abs_sub_le_iff] constructor · rw [sub_le_iff_le_add'] exact sum_density_div_card_le_density_add_eps hPα hPε hε₁ hA hB suffices (G.edgeDensity (A.biUnion id) (B.biUnion id) : ℝ) - (∑ ab ∈ A.product B, (G.edgeDensity ab.1 ab.2 : ℝ)) / (#A * #B) ≤ ε ^ 5 / 50 by apply this.trans gcongr <;> [sz_positivity; norm_num] rw [sub_le_iff_le_add, ← sub_le_iff_le_add'] apply density_sub_eps_le_sum_density_div_card hPα hPε hA hB private theorem edgeDensity_chunk_aux [Nonempty α] (hP) (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hU : U ∈ P.parts) (hV : V ∈ P.parts) : (G.edgeDensity U V : ℝ) ^ 2 - ε ^ 5 / ↑25 ≤ ((∑ ab ∈ (chunk hP G ε hU).parts.product (chunk hP G ε hV).parts, (G.edgeDensity ab.1 ab.2 : ℝ)) / ↑16 ^ #P.parts) ^ 2 := by obtain hGε \| hGε := le_total (G.edgeDensity U V : ℝ) (ε ^ 5 / 50) · refine (sub_nonpos_of_le <\| (sq_le ?_ ?_).trans <\| hGε.trans ?_).trans (sq_nonneg _) · exact mod_cast G.edgeDensity_nonneg _ _ · exact mod_cast G.edgeDensity_le_one _ _ · exact div_le_div_of_nonneg_left (by sz_positivity) (by norm_num) (by norm_num) rw [← sub_nonneg] at hGε have : 0 ≤ ε := by sz_positivity calc _ = G.edgeDensity U V ^ 2 - 1 * ε ^ 5 / 25 + 0 ^ 10 / 2500 := by ring _ ≤ G.edgeDensity U V ^ 2 - G.edgeDensity U V * ε ^ 5 / 25 + ε ^ 10 / 2500 := by gcongr; exact mod_cast G.edgeDensity_le_one .. _ = (G.edgeDensity U V - ε ^ 5 / 50) ^ 2 := by ring _ ≤ _ := by gcongr have rflU := Set.Subset.refl (chunk hP G ε hU).parts.toSet have rflV := Set.Subset.refl (chunk hP G ε hV).parts.toSet refine (le_trans ?_ <\| density_sub_eps_le_sum_density_div_card hPα hPε rflU rflV).trans ?_ · rw [biUnion_parts, biUnion_parts] · rw [card_chunk (m_pos hPα).ne', card_chunk (m_pos hPα).ne', ← cast_mul, ← mul_pow, cast_pow] norm_cast private theorem abs_density_star_sub_density_le_eps (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hε₁ : ε ≤ 1) {hU : U ∈ P.parts} {hV : V ∈ P.parts} (hUV' : U ≠ V) (hUV : ¬G.IsUniform ε U V) : \|(G.edgeDensity ((star hP G ε hU V).biUnion id) ((star hP G ε hV U).biUnion id) : ℝ) - G.edgeDensity (G.nonuniformWitness ε U V) (G.nonuniformWitness ε V U)\| ≤ ε / 5 := by convert abs_edgeDensity_sub_edgeDensity_le_two_mul G.Adj (biUnion_star_subset_nonuniformWitness hP G ε hU V) (biUnion_star_subset_nonuniformWitness hP G ε hV U) (by sz_positivity) (one_sub_eps_mul_card_nonuniformWitness_le_card_star hV hUV' hUV hPε hε₁) (one_sub_eps_mul_card_nonuniformWitness_le_card_star hU hUV'.symm (fun hVU => hUV hVU.symm) hPε hε₁) using 1 linarith private theorem eps_le_card_star_div [Nonempty α] (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) (hε₁ : ε ≤ 1) (hU : U ∈ P.parts) (hV : V ∈ P.parts)	(hUV : U ≠ V) (hunif : ¬G.IsUniform ε U V) : ↑4 / ↑5 * ε ≤ #(star hP G ε hU V) / ↑4 ^ #P.parts := by have hm : (0 : ℝ) ≤ 1 - (↑m)⁻¹ := sub_nonneg_of_le (inv_le_one_of_one_le₀ <\| one_le_m_coe hPα) have hε : 0 ≤ 1 - ε / 10 := sub_nonneg_of_le (div_le_one_of_le₀ (hε₁.trans <\| by norm_num) <\| by norm_num) have hε₀ : 0 < ε := by sz_positivity calc 4 / 5 * ε = (1 - 1 / 10) * (1 - 9⁻¹) * ε := by norm_num _ ≤ (1 - ε / 10) * (1 - (↑m)⁻¹) * (#(G.nonuniformWitness ε U V) / #U) := by gcongr exacts [mod_cast (show 9 ≤ 100 by norm_num).trans (hundred_le_m hPα hPε hε₁),	Mathlib/Combinatorics/SimpleGraph/Regularity/Chunk.lean	377	387
/- Copyright (c) 2020 Kevin Kappelmann. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kevin Kappelmann -/ import Mathlib.Algebra.ContinuedFractions.Computation.Approximations import Mathlib.Algebra.ContinuedFractions.Computation.CorrectnessTerminating import Mathlib.Data.Rat.Floor /-! # Termination of Continued Fraction Computations (`GenContFract.of`) ## Summary We show that the continued fraction for a value `v`, as defined in `Mathlib.Algebra.ContinuedFractions.Basic`, terminates if and only if `v` corresponds to a rational number, that is `↑v = q` for some `q : ℚ`. ## Main Theorems - `GenContFract.coe_of_rat_eq` shows that `GenContFract.of v = GenContFract.of q` for `v : α` given that `↑v = q` and `q : ℚ`. - `GenContFract.terminates_iff_rat` shows that `GenContFract.of v` terminates if and only if `↑v = q` for some `q : ℚ`. ## Tags rational, continued fraction, termination -/ namespace GenContFract open GenContFract (of) variable {K : Type*} [Field K] [LinearOrder K] [IsStrictOrderedRing K] [FloorRing K] /- We will have to constantly coerce along our structures in the following proofs using their provided map functions. -/ attribute [local simp] Pair.map IntFractPair.mapFr section RatOfTerminates /-! ### Terminating Continued Fractions Are Rational We want to show that the computation of a continued fraction `GenContFract.of v` terminates if and only if `v ∈ ℚ`. In this section, we show the implication from left to right. We first show that every finite convergent corresponds to a rational number `q` and then use the finite correctness proof (`of_correctness_of_terminates`) of `GenContFract.of` to show that `v = ↑q`. -/ variable (v : K) (n : ℕ) nonrec theorem exists_gcf_pair_rat_eq_of_nth_contsAux : ∃ conts : Pair ℚ, (of v).contsAux n = (conts.map (↑) : Pair K) := Nat.strong_induction_on n (by clear n let g := of v intro n IH rcases n with (_ \| _ \| n) -- n = 0 · suffices ∃ gp : Pair ℚ, Pair.mk (1 : K) 0 = gp.map (↑) by simpa [contsAux] use Pair.mk 1 0 simp -- n = 1 · suffices ∃ conts : Pair ℚ, Pair.mk g.h 1 = conts.map (↑) by simpa [contsAux] use Pair.mk ⌊v⌋ 1 simp [g] -- 2 ≤ n · obtain ⟨pred_conts, pred_conts_eq⟩ := IH (n + 1) <\| lt_add_one (n + 1) -- invoke the IH rcases s_ppred_nth_eq : g.s.get? n with gp_n \| gp_n -- option.none · use pred_conts have : g.contsAux (n + 2) = g.contsAux (n + 1) := contsAux_stable_of_terminated (n + 1).le_succ s_ppred_nth_eq simp only [g, this, pred_conts_eq] -- option.some · -- invoke the IH a second time obtain ⟨ppred_conts, ppred_conts_eq⟩ := IH n <\| lt_of_le_of_lt n.le_succ <\| lt_add_one <\| n + 1 obtain ⟨a_eq_one, z, b_eq_z⟩ : gp_n.a = 1 ∧ ∃ z : ℤ, gp_n.b = (z : K) := of_partNum_eq_one_and_exists_int_partDen_eq s_ppred_nth_eq -- finally, unfold the recurrence to obtain the required rational value. simp only [g, a_eq_one, b_eq_z, contsAux_recurrence s_ppred_nth_eq ppred_conts_eq pred_conts_eq] use nextConts 1 (z : ℚ) ppred_conts pred_conts cases ppred_conts; cases pred_conts simp [nextConts, nextNum, nextDen]) theorem exists_gcf_pair_rat_eq_nth_conts : ∃ conts : Pair ℚ, (of v).conts n = (conts.map (↑) : Pair K) := by rw [nth_cont_eq_succ_nth_contAux]; exact exists_gcf_pair_rat_eq_of_nth_contsAux v <\| n + 1 theorem exists_rat_eq_nth_num : ∃ q : ℚ, (of v).nums n = (q : K) := by rcases exists_gcf_pair_rat_eq_nth_conts v n with ⟨⟨a, _⟩, nth_cont_eq⟩ use a simp [num_eq_conts_a, nth_cont_eq] theorem exists_rat_eq_nth_den : ∃ q : ℚ, (of v).dens n = (q : K) := by rcases exists_gcf_pair_rat_eq_nth_conts v n with ⟨⟨_, b⟩, nth_cont_eq⟩ use b simp [den_eq_conts_b, nth_cont_eq] /-- Every finite convergent corresponds to a rational number. -/ theorem exists_rat_eq_nth_conv : ∃ q : ℚ, (of v).convs n = (q : K) := by rcases exists_rat_eq_nth_num v n with ⟨Aₙ, nth_num_eq⟩ rcases exists_rat_eq_nth_den v n with ⟨Bₙ, nth_den_eq⟩ use Aₙ / Bₙ simp [nth_num_eq, nth_den_eq, conv_eq_num_div_den] variable {v} /-- Every terminating continued fraction corresponds to a rational number. -/ theorem exists_rat_eq_of_terminates (terminates : (of v).Terminates) : ∃ q : ℚ, v = ↑q := by obtain ⟨n, v_eq_conv⟩ : ∃ n, v = (of v).convs n := of_correctness_of_terminates terminates obtain ⟨q, conv_eq_q⟩ : ∃ q : ℚ, (of v).convs n = (↑q : K) := exists_rat_eq_nth_conv v n have : v = (↑q : K) := Eq.trans v_eq_conv conv_eq_q use q, this end RatOfTerminates section RatTranslation /-! ### Technical Translation Lemmas Before we can show that the continued fraction of a rational number terminates, we have to prove some technical translation lemmas. More precisely, in this section, we show that, given a rational number `q : ℚ` and value `v : K` with `v = ↑q`, the continued fraction of `q` and `v` coincide. In particular, we show that ```lean (↑(GenContFract.of q : GenContFract ℚ) : GenContFract K) = GenContFract.of v` ``` in `GenContFract.coe_of_rat_eq`. To do this, we proceed bottom-up, showing the correspondence between the basic functions involved in the Computation first and then lift the results step-by-step. -/ -- The lifting works for arbitrary linear ordered fields with a floor function. variable {v : K} {q : ℚ} /-! First, we show the correspondence for the very basic functions in `GenContFract.IntFractPair`. -/ namespace IntFractPair theorem coe_of_rat_eq (v_eq_q : v = (↑q : K)) : ((IntFractPair.of q).mapFr (↑) : IntFractPair K) = IntFractPair.of v := by simp [IntFractPair.of, v_eq_q] theorem coe_stream_nth_rat_eq (v_eq_q : v = (↑q : K)) (n : ℕ) : ((IntFractPair.stream q n).map (mapFr (↑)) : Option <\| IntFractPair K) = IntFractPair.stream v n := by induction n with \| zero => simp only [IntFractPair.stream, Option.map_some', coe_of_rat_eq v_eq_q] \| succ n IH => rw [v_eq_q] at IH cases stream_q_nth_eq : IntFractPair.stream q n with \| none => simp [IntFractPair.stream, IH.symm, v_eq_q, stream_q_nth_eq] \| some ifp_n => obtain ⟨b, fr⟩ := ifp_n rcases Decidable.em (fr = 0) with fr_zero \| fr_ne_zero · simp [IntFractPair.stream, IH.symm, v_eq_q, stream_q_nth_eq, fr_zero] · replace IH : some (IntFractPair.mk b (fr : K)) = IntFractPair.stream (↑q) n := by rwa [stream_q_nth_eq] at IH have : (fr : K)⁻¹ = ((fr⁻¹ : ℚ) : K) := by norm_cast have coe_of_fr := coe_of_rat_eq this simpa [IntFractPair.stream, IH.symm, v_eq_q, stream_q_nth_eq, fr_ne_zero] theorem coe_stream'_rat_eq (v_eq_q : v = (↑q : K)) : ((IntFractPair.stream q).map (Option.map (mapFr (↑))) : Stream' <\| Option <\| IntFractPair K) = IntFractPair.stream v := by funext n; exact IntFractPair.coe_stream_nth_rat_eq v_eq_q n end IntFractPair /-! Now we lift the coercion results to the continued fraction computation. -/ theorem coe_of_h_rat_eq (v_eq_q : v = (↑q : K)) : (↑((of q).h : ℚ) : K) = (of v).h := by unfold of IntFractPair.seq1 rw [← IntFractPair.coe_of_rat_eq v_eq_q] simp theorem coe_of_s_get?_rat_eq (v_eq_q : v = (↑q : K)) (n : ℕ) : (((of q).s.get? n).map (Pair.map (↑)) : Option <\| Pair K) = (of v).s.get? n := by simp only [of, IntFractPair.seq1, Stream'.Seq.map_get?, Stream'.Seq.get?_tail] simp only [Stream'.Seq.get?] rw [← IntFractPair.coe_stream'_rat_eq v_eq_q] rcases succ_nth_stream_eq : IntFractPair.stream q (n + 1) with (_ \| ⟨_, _⟩) <;> simp [Stream'.map, Stream'.get, succ_nth_stream_eq] theorem coe_of_s_rat_eq (v_eq_q : v = (↑q : K)) : ((of q).s.map (Pair.map ((↑))) : Stream'.Seq <\| Pair K) = (of v).s := by ext n; rw [← coe_of_s_get?_rat_eq v_eq_q]; rfl /-- Given `(v : K), (q : ℚ), and v = q`, we have that `of q = of v` -/ theorem coe_of_rat_eq (v_eq_q : v = (↑q : K)) : (⟨(of q).h, (of q).s.map (Pair.map (↑))⟩ : GenContFract K) = of v := by rcases gcf_v_eq : of v with ⟨h, s⟩; subst v obtain rfl : ↑⌊(q : K)⌋ = h := by injection gcf_v_eq simp [coe_of_h_rat_eq rfl, coe_of_s_rat_eq rfl, gcf_v_eq] theorem of_terminates_iff_of_rat_terminates {v : K} {q : ℚ} (v_eq_q : v = (q : K)) : (of v).Terminates ↔ (of q).Terminates := by constructor <;> intro h <;> obtain ⟨n, h⟩ := h <;> use n <;> simp only [Stream'.Seq.TerminatedAt, (coe_of_s_get?_rat_eq v_eq_q n).symm] at h ⊢ <;> cases h' : (of q).s.get? n <;> simp only [h'] at h <;> trivial end RatTranslation section TerminatesOfRat /-!	### Continued Fractions of Rationals Terminate Finally, we show that the continued fraction of a rational number terminates. The crucial insight is that, given any `q : ℚ` with `0 < q < 1`, the numerator of `Int.fract q` is smaller than the numerator of `q`. As the continued fraction computation recursively operates on the fractional part of a value `v` and `0 ≤ Int.fract v < 1`, we infer that the numerator of the fractional part in the computation decreases by at least one in each step. As `0 ≤ Int.fract v`, this process must stop after finite number of steps, and the computation hence terminates.	Mathlib/Algebra/ContinuedFractions/Computation/TerminatesIffRat.lean	228	236
/- Copyright (c) 2018 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Simon Hudon -/ import Mathlib.Control.Functor.Multivariate import Mathlib.Data.PFunctor.Multivariate.Basic import Mathlib.Data.PFunctor.Multivariate.M import Mathlib.Data.QPF.Multivariate.Basic /-! # The final co-algebra of a multivariate qpf is again a qpf. For a `(n+1)`-ary QPF `F (α₀,..,αₙ)`, we take the least fixed point of `F` with regards to its last argument `αₙ`. The result is an `n`-ary functor: `Fix F (α₀,..,αₙ₋₁)`. Making `Fix F` into a functor allows us to take the fixed point, compose with other functors and take a fixed point again. ## Main definitions * `Cofix.mk` - constructor * `Cofix.dest` - destructor * `Cofix.corec` - corecursor: useful for formulating infinite, productive computations * `Cofix.bisim` - bisimulation: proof technique to show the equality of possibly infinite values of `Cofix F α` ## Implementation notes For `F` a QPF, we define `Cofix F α` in terms of the M-type of the polynomial functor `P` of `F`. We define the relation `Mcongr` and take its quotient as the definition of `Cofix F α`. `Mcongr` is taken as the weakest bisimulation on M-type. See [avigad-carneiro-hudon2019] for more details. ## Reference * Jeremy Avigad, Mario M. Carneiro and Simon Hudon. [Data Types as Quotients of Polynomial Functors][avigad-carneiro-hudon2019] -/ universe u open MvFunctor namespace MvQPF open TypeVec MvPFunctor open MvFunctor (LiftP LiftR) variable {n : ℕ} {F : TypeVec.{u} (n + 1) → Type u} [q : MvQPF F] /-- `corecF` is used as a basis for defining the corecursor of `Cofix F α`. `corecF` uses corecursion to construct the M-type generated by `q.P` and uses function on `F` as a corecursive step -/ def corecF {α : TypeVec n} {β : Type u} (g : β → F (α.append1 β)) : β → q.P.M α := M.corec _ fun x => repr (g x) theorem corecF_eq {α : TypeVec n} {β : Type u} (g : β → F (α.append1 β)) (x : β) : M.dest q.P (corecF g x) = appendFun id (corecF g) <$$> repr (g x) := by rw [corecF, M.dest_corec] /-- Characterization of desirable equivalence relations on M-types -/ def IsPrecongr {α : TypeVec n} (r : q.P.M α → q.P.M α → Prop) : Prop := ∀ ⦃x y⦄, r x y → abs (appendFun id (Quot.mk r) <$$> M.dest q.P x) = abs (appendFun id (Quot.mk r) <$$> M.dest q.P y) /-- Equivalence relation on M-types representing a value of type `Cofix F` -/ def Mcongr {α : TypeVec n} (x y : q.P.M α) : Prop := ∃ r, IsPrecongr r ∧ r x y /-- Greatest fixed point of functor F. The result is a functor with one fewer parameters than the input. For `F a b c` a ternary functor, fix F is a binary functor such that ```lean Cofix F a b = F a b (Cofix F a b) ``` -/ def Cofix (F : TypeVec (n + 1) → Type u) [MvQPF F] (α : TypeVec n) := Quot (@Mcongr _ F _ α) instance {α : TypeVec n} [Inhabited q.P.A] [∀ i : Fin2 n, Inhabited (α i)] : Inhabited (Cofix F α) := ⟨Quot.mk _ default⟩ /-- maps every element of the W type to a canonical representative -/ def mRepr {α : TypeVec n} : q.P.M α → q.P.M α := corecF (abs ∘ M.dest q.P) /-- the map function for the functor `Cofix F` -/ def Cofix.map {α β : TypeVec n} (g : α ⟹ β) : Cofix F α → Cofix F β := Quot.lift (fun x : q.P.M α => Quot.mk Mcongr (g <$$> x)) (by rintro aa₁ aa₂ ⟨r, pr, ra₁a₂⟩; apply Quot.sound let r' b₁ b₂ := ∃ a₁ a₂ : q.P.M α, r a₁ a₂ ∧ b₁ = g <$$> a₁ ∧ b₂ = g <$$> a₂ use r'; constructor · show IsPrecongr r' rintro b₁ b₂ ⟨a₁, a₂, ra₁a₂, b₁eq, b₂eq⟩ let u : Quot r → Quot r' := Quot.lift (fun x : q.P.M α => Quot.mk r' (g <$$> x)) (by intro a₁ a₂ ra₁a₂ apply Quot.sound exact ⟨a₁, a₂, ra₁a₂, rfl, rfl⟩) have hu : (Quot.mk r' ∘ fun x : q.P.M α => g <$$> x) = u ∘ Quot.mk r := by ext x rfl rw [b₁eq, b₂eq, M.dest_map, M.dest_map, ← q.P.comp_map, ← q.P.comp_map] rw [← appendFun_comp, id_comp, hu, ← comp_id g, appendFun_comp] rw [q.P.comp_map, q.P.comp_map, abs_map, pr ra₁a₂, ← abs_map] show r' (g <$$> aa₁) (g <$$> aa₂); exact ⟨aa₁, aa₂, ra₁a₂, rfl, rfl⟩) instance Cofix.mvfunctor : MvFunctor (Cofix F) where map := @Cofix.map _ _ _ /-- Corecursor for `Cofix F` -/ def Cofix.corec {α : TypeVec n} {β : Type u} (g : β → F (α.append1 β)) : β → Cofix F α := fun x => Quot.mk _ (corecF g x) /-- Destructor for `Cofix F` -/ def Cofix.dest {α : TypeVec n} : Cofix F α → F (α.append1 (Cofix F α)) := Quot.lift (fun x => appendFun id (Quot.mk Mcongr) <$$> abs (M.dest q.P x)) (by rintro x y ⟨r, pr, rxy⟩ dsimp have : ∀ x y, r x y → Mcongr x y := by intro x y h exact ⟨r, pr, h⟩ rw [← Quot.factor_mk_eq _ _ this] conv => lhs rw [appendFun_comp_id, comp_map, ← abs_map, pr rxy, abs_map, ← comp_map, ← appendFun_comp_id]) /-- Abstraction function for `cofix F α` -/ def Cofix.abs {α} : q.P.M α → Cofix F α := Quot.mk _ /-- Representation function for `Cofix F α` -/ def Cofix.repr {α} : Cofix F α → q.P.M α := M.corec _ <\| q.repr ∘ Cofix.dest /-- Corecursor for `Cofix F` -/ def Cofix.corec'₁ {α : TypeVec n} {β : Type u} (g : ∀ {X}, (β → X) → F (α.append1 X)) (x : β) : Cofix F α := Cofix.corec (fun _ => g id) x /-- More flexible corecursor for `Cofix F`. Allows the return of a fully formed value instead of making a recursive call -/ def Cofix.corec' {α : TypeVec n} {β : Type u} (g : β → F (α.append1 (Cofix F α ⊕ β))) (x : β) : Cofix F α := let f : (α ::: Cofix F α) ⟹ (α ::: (Cofix F α ⊕ β)) := id ::: Sum.inl Cofix.corec (Sum.elim (MvFunctor.map f ∘ Cofix.dest) g) (Sum.inr x : Cofix F α ⊕ β) /-- Corecursor for `Cofix F`. The shape allows recursive calls to look like recursive calls. -/ def Cofix.corec₁ {α : TypeVec n} {β : Type u} (g : ∀ {X}, (Cofix F α → X) → (β → X) → β → F (α ::: X)) (x : β) : Cofix F α := Cofix.corec' (fun x => g Sum.inl Sum.inr x) x theorem Cofix.dest_corec {α : TypeVec n} {β : Type u} (g : β → F (α.append1 β)) (x : β) : Cofix.dest (Cofix.corec g x) = appendFun id (Cofix.corec g) <$$> g x := by conv => lhs rw [Cofix.dest, Cofix.corec] dsimp rw [corecF_eq, abs_map, abs_repr, ← comp_map, ← appendFun_comp]; rfl /-- constructor for `Cofix F` -/ def Cofix.mk {α : TypeVec n} : F (α.append1 <\| Cofix F α) → Cofix F α := Cofix.corec fun x => (appendFun id fun i : Cofix F α => Cofix.dest.{u} i) <$$> x /-! ## Bisimulation principles for `Cofix F` The following theorems are bisimulation principles. The general idea is to use a bisimulation relation to prove the equality between specific values of type `Cofix F α`. A bisimulation relation `R` for values `x y : Cofix F α`: * holds for `x y`: `R x y` * for any values `x y` that satisfy `R`, their root has the same shape and their children can be paired in such a way that they satisfy `R`. -/ private theorem Cofix.bisim_aux {α : TypeVec n} (r : Cofix F α → Cofix F α → Prop) (h' : ∀ x, r x x) (h : ∀ x y, r x y → appendFun id (Quot.mk r) <$$> Cofix.dest x = appendFun id (Quot.mk r) <$$> Cofix.dest y) : ∀ x y, r x y → x = y := by intro x rcases x; clear x; rename M (P F) α => x intro y rcases y; clear y; rename M (P F) α => y intro rxy apply Quot.sound let r' := fun x y => r (Quot.mk _ x) (Quot.mk _ y) have hr' : r' = fun x y => r (Quot.mk _ x) (Quot.mk _ y) := rfl have : IsPrecongr r' := by intro a b r'ab have h₀ : appendFun id (Quot.mk r ∘ Quot.mk Mcongr) <$$> MvQPF.abs (M.dest q.P a) = appendFun id (Quot.mk r ∘ Quot.mk Mcongr) <$$> MvQPF.abs (M.dest q.P b) := by rw [appendFun_comp_id, comp_map, comp_map]; exact h _ _ r'ab have h₁ : ∀ u v : q.P.M α, Mcongr u v → Quot.mk r' u = Quot.mk r' v := by intro u v cuv apply Quot.sound dsimp [r', hr'] rw [Quot.sound cuv] apply h' let f : Quot r → Quot r' := Quot.lift (Quot.lift (Quot.mk r') h₁) (by intro c apply Quot.inductionOn (motive := fun c => ∀b, r c b → Quot.lift (Quot.mk r') h₁ c = Quot.lift (Quot.mk r') h₁ b) c clear c intro c d apply Quot.inductionOn (motive := fun d => r (Quot.mk Mcongr c) d → Quot.lift (Quot.mk r') h₁ (Quot.mk Mcongr c) = Quot.lift (Quot.mk r') h₁ d) d clear d intro d rcd; apply Quot.sound; apply rcd) have : f ∘ Quot.mk r ∘ Quot.mk Mcongr = Quot.mk r' := rfl rw [← this, appendFun_comp_id, q.P.comp_map, q.P.comp_map, abs_map, abs_map, abs_map, abs_map, h₀] exact ⟨r', this, rxy⟩ /-- Bisimulation principle using `map` and `Quot.mk` to match and relate children of two trees. -/ theorem Cofix.bisim_rel {α : TypeVec n} (r : Cofix F α → Cofix F α → Prop) (h : ∀ x y, r x y → appendFun id (Quot.mk r) <$$> Cofix.dest x = appendFun id (Quot.mk r) <$$> Cofix.dest y) : ∀ x y, r x y → x = y := by let r' (x y) := x = y ∨ r x y intro x y rxy apply Cofix.bisim_aux r' · intro x left rfl · intro x y r'xy cases r'xy with \| inl h => rw [h] \| inr r'xy => have : ∀ x y, r x y → r' x y := fun x y h => Or.inr h rw [← Quot.factor_mk_eq _ _ this] dsimp [r'] rw [appendFun_comp_id] rw [@comp_map _ _ q _ _ _ (appendFun id (Quot.mk r)), @comp_map _ _ q _ _ _ (appendFun id (Quot.mk r))] rw [h _ _ r'xy] right; exact rxy /-- Bisimulation principle using `LiftR` to match and relate children of two trees. -/ theorem Cofix.bisim {α : TypeVec n} (r : Cofix F α → Cofix F α → Prop) (h : ∀ x y, r x y → LiftR (RelLast α r) (Cofix.dest x) (Cofix.dest y)) : ∀ x y, r x y → x = y := by apply Cofix.bisim_rel intro x y rxy rcases (liftR_iff (fun a b => RelLast α r b) (dest x) (dest y)).mp (h x y rxy) with ⟨a, f₀, f₁, dxeq, dyeq, h'⟩ rw [dxeq, dyeq, ← abs_map, ← abs_map, MvPFunctor.map_eq, MvPFunctor.map_eq] rw [← split_dropFun_lastFun f₀, ← split_dropFun_lastFun f₁] rw [appendFun_comp_splitFun, appendFun_comp_splitFun] rw [id_comp, id_comp] congr 2 with (i j); rcases i with - \| i · apply Quot.sound apply h' _ j · change f₀ _ j = f₁ _ j apply h' _ j open MvFunctor /-- Bisimulation principle using `LiftR'` to match and relate children of two trees. -/ theorem Cofix.bisim₂ {α : TypeVec n} (r : Cofix F α → Cofix F α → Prop) (h : ∀ x y, r x y → LiftR' (RelLast' α r) (Cofix.dest x) (Cofix.dest y)) : ∀ x y, r x y → x = y := Cofix.bisim r <\| by intros; rw [← LiftR_RelLast_iff]; apply h; assumption /-- Bisimulation principle the values `⟨a,f⟩` of the polynomial functor representing `Cofix F α` as well as an invariant `Q : β → Prop` and a state `β` generating the left-hand side and right-hand side of the equality through functions `u v : β → Cofix F α` -/ theorem Cofix.bisim' {α : TypeVec n} {β : Type*} (Q : β → Prop) (u v : β → Cofix F α) (h : ∀ x, Q x → ∃ a f' f₀ f₁, Cofix.dest (u x) = q.abs ⟨a, q.P.appendContents f' f₀⟩ ∧ Cofix.dest (v x) = q.abs ⟨a, q.P.appendContents f' f₁⟩ ∧ ∀ i, ∃ x', Q x' ∧ f₀ i = u x' ∧ f₁ i = v x') : ∀ x, Q x → u x = v x := fun x Qx => let R := fun w z : Cofix F α => ∃ x', Q x' ∧ w = u x' ∧ z = v x' Cofix.bisim R (fun x y ⟨x', Qx', xeq, yeq⟩ => by rcases h x' Qx' with ⟨a, f', f₀, f₁, ux'eq, vx'eq, h'⟩ rw [liftR_iff] refine ⟨a, q.P.appendContents f' f₀, q.P.appendContents f' f₁, xeq.symm ▸ ux'eq, yeq.symm ▸ vx'eq, ?_⟩ intro i; cases i · apply h' · intro j apply Eq.refl) _ _ ⟨x, Qx, rfl, rfl⟩ theorem Cofix.mk_dest {α : TypeVec n} (x : Cofix F α) : Cofix.mk (Cofix.dest x) = x := by apply Cofix.bisim_rel (fun x y : Cofix F α => x = Cofix.mk (Cofix.dest y)) _ _ _ rfl dsimp intro x y h rw [h] conv => lhs congr rfl rw [Cofix.mk] rw [Cofix.dest_corec] rw [← comp_map, ← appendFun_comp, id_comp] rw [← comp_map, ← appendFun_comp, id_comp, ← Cofix.mk] congr apply congrArg funext x apply Quot.sound rfl theorem Cofix.dest_mk {α : TypeVec n} (x : F (α.append1 <\| Cofix F α)) : Cofix.dest (Cofix.mk x) = x := by have : Cofix.mk ∘ Cofix.dest = @_root_.id (Cofix F α) := funext Cofix.mk_dest rw [Cofix.mk, Cofix.dest_corec, ← comp_map, ← Cofix.mk, ← appendFun_comp, this, id_comp, appendFun_id_id, MvFunctor.id_map] theorem Cofix.ext {α : TypeVec n} (x y : Cofix F α) (h : x.dest = y.dest) : x = y := by rw [← Cofix.mk_dest x, h, Cofix.mk_dest]	theorem Cofix.ext_mk {α : TypeVec n} (x y : F (α ::: Cofix F α)) (h : Cofix.mk x = Cofix.mk y) : x = y := by rw [← Cofix.dest_mk x, h, Cofix.dest_mk] /-! `liftR_map`, `liftR_map_last` and `liftR_map_last'` are useful for reasoning about the induction step in bisimulation proofs. -/ section LiftRMap theorem liftR_map {α β : TypeVec n} {F' : TypeVec n → Type u} [MvFunctor F'] [LawfulMvFunctor F'] (R : β ⊗ β ⟹ «repeat» n Prop) (x : F' α) (f g : α ⟹ β) (h : α ⟹ Subtype_ R) (hh : subtypeVal _ ⊚ h = (f ⊗' g) ⊚ prod.diag) : LiftR' R (f <$$> x) (g <$$> x) := by rw [LiftR_def] exists h <$$> x rw [MvFunctor.map_map, comp_assoc, hh, ← comp_assoc, fst_prod_mk, comp_assoc, fst_diag]	Mathlib/Data/QPF/Multivariate/Constructions/Cofix.lean	335	352
/- 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, Kim Morrison, Jens Wagemaker -/ import Mathlib.Algebra.Group.Submonoid.Operations import Mathlib.Algebra.MonoidAlgebra.Defs import Mathlib.Algebra.Order.Monoid.Unbundled.WithTop import Mathlib.Algebra.Ring.Action.Rat import Mathlib.Data.Finset.Sort import Mathlib.Tactic.FastInstance /-! # Theory of univariate polynomials This file defines `Polynomial R`, the type of univariate polynomials over the semiring `R`, builds a semiring structure on it, and gives basic definitions that are expanded in other files in this directory. ## Main definitions * `monomial n a` is the polynomial `a X^n`. Note that `monomial n` is defined as an `R`-linear map. * `C a` is the constant polynomial `a`. Note that `C` is defined as a ring homomorphism. * `X` is the polynomial `X`, i.e., `monomial 1 1`. * `p.sum f` is `∑ n ∈ p.support, f n (p.coeff n)`, i.e., one sums the values of functions applied to coefficients of the polynomial `p`. * `p.erase n` is the polynomial `p` in which one removes the `c X^n` term. There are often two natural variants of lemmas involving sums, depending on whether one acts on the polynomials, or on the function. The naming convention is that one adds `index` when acting on the polynomials. For instance, * `sum_add_index` states that `(p + q).sum f = p.sum f + q.sum f`; * `sum_add` states that `p.sum (fun n x ↦ f n x + g n x) = p.sum f + p.sum g`. * Notation to refer to `Polynomial R`, as `R[X]` or `R[t]`. ## Implementation Polynomials are defined using `R[ℕ]`, where `R` is a semiring. The variable `X` commutes with every polynomial `p`: lemma `X_mul` proves the identity `X * p = p * X`. The relationship to `R[ℕ]` is through a structure to make polynomials irreducible from the point of view of the kernel. Most operations are irreducible since Lean can not compute anyway with `AddMonoidAlgebra`. There are two exceptions that we make semireducible: * The zero polynomial, so that its coefficients are definitionally equal to `0`. * The scalar action, to permit typeclass search to unfold it to resolve potential instance diamonds. The raw implementation of the equivalence between `R[X]` and `R[ℕ]` is done through `ofFinsupp` and `toFinsupp` (or, equivalently, `rcases p` when `p` is a polynomial gives an element `q` of `R[ℕ]`, and conversely `⟨q⟩` gives back `p`). The equivalence is also registered as a ring equiv in `Polynomial.toFinsuppIso`. These should in general not be used once the basic API for polynomials is constructed. -/ noncomputable section /-- `Polynomial R` is the type of univariate polynomials over `R`, denoted as `R[X]` within the `Polynomial` namespace. Polynomials should be seen as (semi-)rings with the additional constructor `X`. The embedding from `R` is called `C`. -/ structure Polynomial (R : Type) [Semiring R] where ofFinsupp :: toFinsupp : AddMonoidAlgebra R ℕ @[inherit_doc] scoped[Polynomial] notation:9000 R "[X]" => Polynomial R open AddMonoidAlgebra Finset open Finsupp hiding single open Function hiding Commute namespace Polynomial universe u variable {R : Type u} {a b : R} {m n : ℕ} section Semiring variable [Semiring R] {p q : R[X]} theorem forall_iff_forall_finsupp (P : R[X] → Prop) : (∀ p, P p) ↔ ∀ q : R[ℕ], P ⟨q⟩ := ⟨fun h q => h ⟨q⟩, fun h ⟨p⟩ => h p⟩ theorem exists_iff_exists_finsupp (P : R[X] → Prop) : (∃ p, P p) ↔ ∃ q : R[ℕ], P ⟨q⟩ := ⟨fun ⟨⟨p⟩, hp⟩ => ⟨p, hp⟩, fun ⟨q, hq⟩ => ⟨⟨q⟩, hq⟩⟩ @[simp] theorem eta (f : R[X]) : Polynomial.ofFinsupp f.toFinsupp = f := by cases f; rfl /-! ### Conversions to and from `AddMonoidAlgebra` Since `R[X]` is not defeq to `R[ℕ]`, but instead is a structure wrapping it, we have to copy across all the arithmetic operators manually, along with the lemmas about how they unfold around `Polynomial.ofFinsupp` and `Polynomial.toFinsupp`. -/ section AddMonoidAlgebra private irreducible_def add : R[X] → R[X] → R[X] \| ⟨a⟩, ⟨b⟩ => ⟨a + b⟩ private irreducible_def neg {R : Type u} [Ring R] : R[X] → R[X] \| ⟨a⟩ => ⟨-a⟩ private irreducible_def mul : R[X] → R[X] → R[X] \| ⟨a⟩, ⟨b⟩ => ⟨a b⟩ instance zero : Zero R[X] := ⟨⟨0⟩⟩ instance one : One R[X] := ⟨⟨1⟩⟩ instance add' : Add R[X] := ⟨add⟩ instance neg' {R : Type u} [Ring R] : Neg R[X] := ⟨neg⟩ instance sub {R : Type u} [Ring R] : Sub R[X] := ⟨fun a b => a + -b⟩ instance mul' : Mul R[X] := ⟨mul⟩ -- If the private definitions are accidentally exposed, simplify them away. @[simp] theorem add_eq_add : add p q = p + q := rfl @[simp] theorem mul_eq_mul : mul p q = p * q := rfl instance instNSMul : SMul ℕ R[X] where smul r p := ⟨r • p.toFinsupp⟩ instance smulZeroClass {S : Type} [SMulZeroClass S R] : SMulZeroClass S R[X] where smul r p := ⟨r • p.toFinsupp⟩ smul_zero a := congr_arg ofFinsupp (smul_zero a) instance {S : Type} [Zero S] [SMulZeroClass S R] [NoZeroSMulDivisors S R] : NoZeroSMulDivisors S R[X] where eq_zero_or_eq_zero_of_smul_eq_zero eq := (eq_zero_or_eq_zero_of_smul_eq_zero <\| congr_arg toFinsupp eq).imp id (congr_arg ofFinsupp) -- to avoid a bug in the `ring` tactic instance (priority := 1) pow : Pow R[X] ℕ where pow p n := npowRec n p @[simp] theorem ofFinsupp_zero : (⟨0⟩ : R[X]) = 0 := rfl @[simp] theorem ofFinsupp_one : (⟨1⟩ : R[X]) = 1 := rfl @[simp] theorem ofFinsupp_add {a b} : (⟨a + b⟩ : R[X]) = ⟨a⟩ + ⟨b⟩ := show _ = add _ _ by rw [add_def] @[simp] theorem ofFinsupp_neg {R : Type u} [Ring R] {a} : (⟨-a⟩ : R[X]) = -⟨a⟩ := show _ = neg _ by rw [neg_def] @[simp] theorem ofFinsupp_sub {R : Type u} [Ring R] {a b} : (⟨a - b⟩ : R[X]) = ⟨a⟩ - ⟨b⟩ := by rw [sub_eq_add_neg, ofFinsupp_add, ofFinsupp_neg] rfl @[simp] theorem ofFinsupp_mul (a b) : (⟨a * b⟩ : R[X]) = ⟨a⟩ * ⟨b⟩ := show _ = mul _ _ by rw [mul_def] @[simp] theorem ofFinsupp_nsmul (a : ℕ) (b) : (⟨a • b⟩ : R[X]) = (a • ⟨b⟩ : R[X]) := rfl @[simp] theorem ofFinsupp_smul {S : Type} [SMulZeroClass S R] (a : S) (b) : (⟨a • b⟩ : R[X]) = (a • ⟨b⟩ : R[X]) := rfl @[simp] theorem ofFinsupp_pow (a) (n : ℕ) : (⟨a ^ n⟩ : R[X]) = ⟨a⟩ ^ n := by change _ = npowRec n _ induction n with \| zero => simp [npowRec] \| succ n n_ih => simp [npowRec, n_ih, pow_succ] @[simp] theorem toFinsupp_zero : (0 : R[X]).toFinsupp = 0 := rfl @[simp] theorem toFinsupp_one : (1 : R[X]).toFinsupp = 1 := rfl @[simp] theorem toFinsupp_add (a b : R[X]) : (a + b).toFinsupp = a.toFinsupp + b.toFinsupp := by cases a cases b rw [← ofFinsupp_add] @[simp] theorem toFinsupp_neg {R : Type u} [Ring R] (a : R[X]) : (-a).toFinsupp = -a.toFinsupp := by cases a rw [← ofFinsupp_neg] @[simp] theorem toFinsupp_sub {R : Type u} [Ring R] (a b : R[X]) : (a - b).toFinsupp = a.toFinsupp - b.toFinsupp := by rw [sub_eq_add_neg, ← toFinsupp_neg, ← toFinsupp_add] rfl @[simp] theorem toFinsupp_mul (a b : R[X]) : (a b).toFinsupp = a.toFinsupp * b.toFinsupp := by cases a cases b rw [← ofFinsupp_mul] @[simp] theorem toFinsupp_nsmul (a : ℕ) (b : R[X]) : (a • b).toFinsupp = a • b.toFinsupp := rfl @[simp] theorem toFinsupp_smul {S : Type} [SMulZeroClass S R] (a : S) (b : R[X]) : (a • b).toFinsupp = a • b.toFinsupp := rfl @[simp] theorem toFinsupp_pow (a : R[X]) (n : ℕ) : (a ^ n).toFinsupp = a.toFinsupp ^ n := by cases a rw [← ofFinsupp_pow] theorem _root_.IsSMulRegular.polynomial {S : Type} [SMulZeroClass S R] {a : S} (ha : IsSMulRegular R a) : IsSMulRegular R[X] a \| ⟨_x⟩, ⟨_y⟩, h => congr_arg _ <\| ha.finsupp (Polynomial.ofFinsupp.inj h) theorem toFinsupp_injective : Function.Injective (toFinsupp : R[X] → AddMonoidAlgebra _ _) := fun ⟨_x⟩ ⟨_y⟩ => congr_arg _ @[simp] theorem toFinsupp_inj {a b : R[X]} : a.toFinsupp = b.toFinsupp ↔ a = b := toFinsupp_injective.eq_iff @[simp] theorem toFinsupp_eq_zero {a : R[X]} : a.toFinsupp = 0 ↔ a = 0 := by rw [← toFinsupp_zero, toFinsupp_inj] @[simp] theorem toFinsupp_eq_one {a : R[X]} : a.toFinsupp = 1 ↔ a = 1 := by rw [← toFinsupp_one, toFinsupp_inj] /-- A more convenient spelling of `Polynomial.ofFinsupp.injEq` in terms of `Iff`. -/ theorem ofFinsupp_inj {a b} : (⟨a⟩ : R[X]) = ⟨b⟩ ↔ a = b := iff_of_eq (ofFinsupp.injEq _ _) @[simp] theorem ofFinsupp_eq_zero {a} : (⟨a⟩ : R[X]) = 0 ↔ a = 0 := by rw [← ofFinsupp_zero, ofFinsupp_inj] @[simp] theorem ofFinsupp_eq_one {a} : (⟨a⟩ : R[X]) = 1 ↔ a = 1 := by rw [← ofFinsupp_one, ofFinsupp_inj] instance inhabited : Inhabited R[X] := ⟨0⟩ instance instNatCast : NatCast R[X] where natCast n := ofFinsupp n @[simp] theorem ofFinsupp_natCast (n : ℕ) : (⟨n⟩ : R[X]) = n := rfl @[simp] theorem toFinsupp_natCast (n : ℕ) : (n : R[X]).toFinsupp = n := rfl @[simp] theorem ofFinsupp_ofNat (n : ℕ) [n.AtLeastTwo] : (⟨ofNat(n)⟩ : R[X]) = ofNat(n) := rfl @[simp] theorem toFinsupp_ofNat (n : ℕ) [n.AtLeastTwo] : (ofNat(n) : R[X]).toFinsupp = ofNat(n) := rfl instance semiring : Semiring R[X] := fast_instance% Function.Injective.semiring toFinsupp toFinsupp_injective toFinsupp_zero toFinsupp_one toFinsupp_add toFinsupp_mul (fun _ _ => toFinsupp_nsmul _ _) toFinsupp_pow fun _ => rfl instance distribSMul {S} [DistribSMul S R] : DistribSMul S R[X] := fast_instance% Function.Injective.distribSMul ⟨⟨toFinsupp, toFinsupp_zero⟩, toFinsupp_add⟩ toFinsupp_injective toFinsupp_smul instance distribMulAction {S} [Monoid S] [DistribMulAction S R] : DistribMulAction S R[X] := fast_instance% Function.Injective.distribMulAction ⟨⟨toFinsupp, toFinsupp_zero (R := R)⟩, toFinsupp_add⟩ toFinsupp_injective toFinsupp_smul instance faithfulSMul {S} [SMulZeroClass S R] [FaithfulSMul S R] : FaithfulSMul S R[X] where eq_of_smul_eq_smul {_s₁ _s₂} h := eq_of_smul_eq_smul fun a : ℕ →₀ R => congr_arg toFinsupp (h ⟨a⟩) instance module {S} [Semiring S] [Module S R] : Module S R[X] := fast_instance% Function.Injective.module _ ⟨⟨toFinsupp, toFinsupp_zero⟩, toFinsupp_add⟩ toFinsupp_injective toFinsupp_smul instance smulCommClass {S₁ S₂} [SMulZeroClass S₁ R] [SMulZeroClass S₂ R] [SMulCommClass S₁ S₂ R] : SMulCommClass S₁ S₂ R[X] := ⟨by rintro m n ⟨f⟩ simp_rw [← ofFinsupp_smul, smul_comm m n f]⟩ instance isScalarTower {S₁ S₂} [SMul S₁ S₂] [SMulZeroClass S₁ R] [SMulZeroClass S₂ R] [IsScalarTower S₁ S₂ R] : IsScalarTower S₁ S₂ R[X] := ⟨by rintro _ _ ⟨⟩ simp_rw [← ofFinsupp_smul, smul_assoc]⟩ instance isScalarTower_right {α K : Type} [Semiring K] [DistribSMul α K] [IsScalarTower α K K] : IsScalarTower α K[X] K[X] := ⟨by rintro _ ⟨⟩ ⟨⟩ simp_rw [smul_eq_mul, ← ofFinsupp_smul, ← ofFinsupp_mul, ← ofFinsupp_smul, smul_mul_assoc]⟩ instance isCentralScalar {S} [SMulZeroClass S R] [SMulZeroClass Sᵐᵒᵖ R] [IsCentralScalar S R] : IsCentralScalar S R[X] := ⟨by rintro _ ⟨⟩ simp_rw [← ofFinsupp_smul, op_smul_eq_smul]⟩ instance unique [Subsingleton R] : Unique R[X] := { Polynomial.inhabited with uniq := by rintro ⟨x⟩ apply congr_arg ofFinsupp simp [eq_iff_true_of_subsingleton] } variable (R) /-- Ring isomorphism between `R[X]` and `R[ℕ]`. This is just an implementation detail, but it can be useful to transfer results from `Finsupp` to polynomials. -/ @[simps apply symm_apply] def toFinsuppIso : R[X] ≃+ R[ℕ] where toFun := toFinsupp invFun := ofFinsupp left_inv := fun ⟨_p⟩ => rfl right_inv _p := rfl map_mul' := toFinsupp_mul map_add' := toFinsupp_add instance [DecidableEq R] : DecidableEq R[X] := @Equiv.decidableEq R[X] _ (toFinsuppIso R).toEquiv (Finsupp.instDecidableEq) /-- Linear isomorphism between `R[X]` and `R[ℕ]`. This is just an implementation detail, but it can be useful to transfer results from `Finsupp` to polynomials. -/ @[simps!] def toFinsuppIsoLinear : R[X] ≃ₗ[R] R[ℕ] where __ := toFinsuppIso R map_smul' _ _ := rfl end AddMonoidAlgebra theorem ofFinsupp_sum {ι : Type} (s : Finset ι) (f : ι → R[ℕ]) : (⟨∑ i ∈ s, f i⟩ : R[X]) = ∑ i ∈ s, ⟨f i⟩ := map_sum (toFinsuppIso R).symm f s theorem toFinsupp_sum {ι : Type} (s : Finset ι) (f : ι → R[X]) : (∑ i ∈ s, f i : R[X]).toFinsupp = ∑ i ∈ s, (f i).toFinsupp := map_sum (toFinsuppIso R) f s /-- The set of all `n` such that `X^n` has a non-zero coefficient. -/ def support : R[X] → Finset ℕ \| ⟨p⟩ => p.support @[simp] theorem support_ofFinsupp (p) : support (⟨p⟩ : R[X]) = p.support := by rw [support] theorem support_toFinsupp (p : R[X]) : p.toFinsupp.support = p.support := by rw [support] @[simp] theorem support_zero : (0 : R[X]).support = ∅ := rfl @[simp] theorem support_eq_empty : p.support = ∅ ↔ p = 0 := by rcases p with ⟨⟩ simp [support] @[simp] lemma support_nonempty : p.support.Nonempty ↔ p ≠ 0 := Finset.nonempty_iff_ne_empty.trans support_eq_empty.not theorem card_support_eq_zero : #p.support = 0 ↔ p = 0 := by simp /-- `monomial s a` is the monomial `a * X^s` -/ def monomial (n : ℕ) : R →ₗ[R] R[X] where toFun t := ⟨Finsupp.single n t⟩ -- Porting note (https://github.com/leanprover-community/mathlib4/issues/10745): was `simp`. map_add' x y := by simp; rw [ofFinsupp_add] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/10745): was `simp [← ofFinsupp_smul]`. map_smul' r x := by simp; rw [← ofFinsupp_smul, smul_single'] @[simp] theorem toFinsupp_monomial (n : ℕ) (r : R) : (monomial n r).toFinsupp = Finsupp.single n r := by simp [monomial] @[simp] theorem ofFinsupp_single (n : ℕ) (r : R) : (⟨Finsupp.single n r⟩ : R[X]) = monomial n r := by simp [monomial] @[simp] theorem monomial_zero_right (n : ℕ) : monomial n (0 : R) = 0 := (monomial n).map_zero -- This is not a `simp` lemma as `monomial_zero_left` is more general. theorem monomial_zero_one : monomial 0 (1 : R) = 1 := rfl -- TODO: can't we just delete this one? theorem monomial_add (n : ℕ) (r s : R) : monomial n (r + s) = monomial n r + monomial n s := (monomial n).map_add _ _ theorem monomial_mul_monomial (n m : ℕ) (r s : R) : monomial n r * monomial m s = monomial (n + m) (r * s) := toFinsupp_injective <\| by simp only [toFinsupp_monomial, toFinsupp_mul, AddMonoidAlgebra.single_mul_single] @[simp] theorem monomial_pow (n : ℕ) (r : R) (k : ℕ) : monomial n r ^ k = monomial (n * k) (r ^ k) := by induction k with \| zero => simp [pow_zero, monomial_zero_one] \| succ k ih => simp [pow_succ, ih, monomial_mul_monomial, mul_add, add_comm] theorem smul_monomial {S} [SMulZeroClass S R] (a : S) (n : ℕ) (b : R) : a • monomial n b = monomial n (a • b) := toFinsupp_injective <\| AddMonoidAlgebra.smul_single _ _ _ theorem monomial_injective (n : ℕ) : Function.Injective (monomial n : R → R[X]) := (toFinsuppIso R).symm.injective.comp (single_injective n) @[simp] theorem monomial_eq_zero_iff (t : R) (n : ℕ) : monomial n t = 0 ↔ t = 0 := LinearMap.map_eq_zero_iff _ (Polynomial.monomial_injective n) theorem monomial_eq_monomial_iff {m n : ℕ} {a b : R} : monomial m a = monomial n b ↔ m = n ∧ a = b ∨ a = 0 ∧ b = 0 := by rw [← toFinsupp_inj, toFinsupp_monomial, toFinsupp_monomial, Finsupp.single_eq_single_iff] theorem support_add : (p + q).support ⊆ p.support ∪ q.support := by simpa [support] using Finsupp.support_add /-- `C a` is the constant polynomial `a`. `C` is provided as a ring homomorphism. -/ def C : R →+* R[X] := { monomial 0 with map_one' := by simp [monomial_zero_one] map_mul' := by simp [monomial_mul_monomial] map_zero' := by simp } @[simp] theorem monomial_zero_left (a : R) : monomial 0 a = C a := rfl @[simp] theorem toFinsupp_C (a : R) : (C a).toFinsupp = single 0 a := rfl theorem C_0 : C (0 : R) = 0 := by simp theorem C_1 : C (1 : R) = 1 := rfl theorem C_mul : C (a * b) = C a * C b := C.map_mul a b theorem C_add : C (a + b) = C a + C b := C.map_add a b @[simp] theorem smul_C {S} [SMulZeroClass S R] (s : S) (r : R) : s • C r = C (s • r) := smul_monomial _ _ r theorem C_pow : C (a ^ n) = C a ^ n := C.map_pow a n theorem C_eq_natCast (n : ℕ) : C (n : R) = (n : R[X]) := map_natCast C n @[simp] theorem C_mul_monomial : C a * monomial n b = monomial n (a * b) := by simp only [← monomial_zero_left, monomial_mul_monomial, zero_add] @[simp] theorem monomial_mul_C : monomial n a * C b = monomial n (a * b) := by simp only [← monomial_zero_left, monomial_mul_monomial, add_zero] /-- `X` is the polynomial variable (aka indeterminate). -/ def X : R[X] := monomial 1 1 theorem monomial_one_one_eq_X : monomial 1 (1 : R) = X := rfl theorem monomial_one_right_eq_X_pow (n : ℕ) : monomial n (1 : R) = X ^ n := by induction n with \| zero => simp [monomial_zero_one] \| succ n ih => rw [pow_succ, ← ih, ← monomial_one_one_eq_X, monomial_mul_monomial, mul_one] @[simp] theorem toFinsupp_X : X.toFinsupp = Finsupp.single 1 (1 : R) := rfl theorem X_ne_C [Nontrivial R] (a : R) : X ≠ C a := by intro he simpa using monomial_eq_monomial_iff.1 he /-- `X` commutes with everything, even when the coefficients are noncommutative. -/ theorem X_mul : X * p = p * X := by rcases p with ⟨⟩ simp only [X, ← ofFinsupp_single, ← ofFinsupp_mul, LinearMap.coe_mk, ofFinsupp.injEq] ext simp [AddMonoidAlgebra.mul_apply, AddMonoidAlgebra.sum_single_index, add_comm] theorem X_pow_mul {n : ℕ} : X ^ n * p = p * X ^ n := by induction n with \| zero => simp \| succ n ih => conv_lhs => rw [pow_succ] rw [mul_assoc, X_mul, ← mul_assoc, ih, mul_assoc, ← pow_succ] /-- Prefer putting constants to the left of `X`. This lemma is the loop-avoiding `simp` version of `Polynomial.X_mul`. -/ @[simp] theorem X_mul_C (r : R) : X * C r = C r * X := X_mul /-- Prefer putting constants to the left of `X ^ n`. This lemma is the loop-avoiding `simp` version of `X_pow_mul`. -/ @[simp] theorem X_pow_mul_C (r : R) (n : ℕ) : X ^ n * C r = C r * X ^ n := X_pow_mul theorem X_pow_mul_assoc {n : ℕ} : p * X ^ n * q = p * q * X ^ n := by rw [mul_assoc, X_pow_mul, ← mul_assoc] /-- Prefer putting constants to the left of `X ^ n`. This lemma is the loop-avoiding `simp` version of `X_pow_mul_assoc`. -/ @[simp] theorem X_pow_mul_assoc_C {n : ℕ} (r : R) : p * X ^ n * C r = p * C r * X ^ n := X_pow_mul_assoc theorem commute_X (p : R[X]) : Commute X p := X_mul theorem commute_X_pow (p : R[X]) (n : ℕ) : Commute (X ^ n) p := X_pow_mul @[simp] theorem monomial_mul_X (n : ℕ) (r : R) : monomial n r * X = monomial (n + 1) r := by rw [X, monomial_mul_monomial, mul_one] @[simp] theorem monomial_mul_X_pow (n : ℕ) (r : R) (k : ℕ) : monomial n r * X ^ k = monomial (n + k) r := by induction k with \| zero => simp \| succ k ih => simp [ih, pow_succ, ← mul_assoc, add_assoc] @[simp] theorem X_mul_monomial (n : ℕ) (r : R) : X * monomial n r = monomial (n + 1) r := by rw [X_mul, monomial_mul_X] @[simp] theorem X_pow_mul_monomial (k n : ℕ) (r : R) : X ^ k * monomial n r = monomial (n + k) r := by rw [X_pow_mul, monomial_mul_X_pow] /-- `coeff p n` (often denoted `p.coeff n`) is the coefficient of `X^n` in `p`. -/ def coeff : R[X] → ℕ → R \| ⟨p⟩ => p @[simp] theorem coeff_ofFinsupp (p) : coeff (⟨p⟩ : R[X]) = p := by rw [coeff] theorem coeff_injective : Injective (coeff : R[X] → ℕ → R) := by rintro ⟨p⟩ ⟨q⟩ simp only [coeff, DFunLike.coe_fn_eq, imp_self, ofFinsupp.injEq] @[simp] theorem coeff_inj : p.coeff = q.coeff ↔ p = q := coeff_injective.eq_iff theorem toFinsupp_apply (f : R[X]) (i) : f.toFinsupp i = f.coeff i := by cases f; rfl theorem coeff_monomial : coeff (monomial n a) m = if n = m then a else 0 := by simp [coeff, Finsupp.single_apply] @[simp] theorem coeff_monomial_same (n : ℕ) (c : R) : (monomial n c).coeff n = c := Finsupp.single_eq_same theorem coeff_monomial_of_ne {m n : ℕ} (c : R) (h : n ≠ m) : (monomial n c).coeff m = 0 := Finsupp.single_eq_of_ne h @[simp] theorem coeff_zero (n : ℕ) : coeff (0 : R[X]) n = 0 := rfl theorem coeff_one {n : ℕ} : coeff (1 : R[X]) n = if n = 0 then 1 else 0 := by simp_rw [eq_comm (a := n) (b := 0)] exact coeff_monomial @[simp] theorem coeff_one_zero : coeff (1 : R[X]) 0 = 1 := by simp [coeff_one] @[simp] theorem coeff_X_one : coeff (X : R[X]) 1 = 1 := coeff_monomial @[simp] theorem coeff_X_zero : coeff (X : R[X]) 0 = 0 := coeff_monomial @[simp] theorem coeff_monomial_succ : coeff (monomial (n + 1) a) 0 = 0 := by simp [coeff_monomial] theorem coeff_X : coeff (X : R[X]) n = if 1 = n then 1 else 0 := coeff_monomial theorem coeff_X_of_ne_one {n : ℕ} (hn : n ≠ 1) : coeff (X : R[X]) n = 0 := by rw [coeff_X, if_neg hn.symm] @[simp] theorem mem_support_iff : n ∈ p.support ↔ p.coeff n ≠ 0 := by rcases p with ⟨⟩ simp theorem not_mem_support_iff : n ∉ p.support ↔ p.coeff n = 0 := by simp theorem coeff_C : coeff (C a) n = ite (n = 0) a 0 := by convert coeff_monomial (a := a) (m := n) (n := 0) using 2 simp [eq_comm] @[simp] theorem coeff_C_zero : coeff (C a) 0 = a := coeff_monomial theorem coeff_C_ne_zero (h : n ≠ 0) : (C a).coeff n = 0 := by rw [coeff_C, if_neg h] @[simp] lemma coeff_C_succ {r : R} {n : ℕ} : coeff (C r) (n + 1) = 0 := by simp [coeff_C] @[simp] theorem coeff_natCast_ite : (Nat.cast m : R[X]).coeff n = ite (n = 0) m 0 := by simp only [← C_eq_natCast, coeff_C, Nat.cast_ite, Nat.cast_zero] @[simp] theorem coeff_ofNat_zero (a : ℕ) [a.AtLeastTwo] : coeff (ofNat(a) : R[X]) 0 = ofNat(a) := coeff_monomial @[simp] theorem coeff_ofNat_succ (a n : ℕ) [h : a.AtLeastTwo] : coeff (ofNat(a) : R[X]) (n + 1) = 0 := by rw [← Nat.cast_ofNat] simp [-Nat.cast_ofNat] theorem C_mul_X_pow_eq_monomial : ∀ {n : ℕ}, C a * X ^ n = monomial n a \| 0 => mul_one _ \| n + 1 => by rw [pow_succ, ← mul_assoc, C_mul_X_pow_eq_monomial, X, monomial_mul_monomial, mul_one] @[simp high] theorem toFinsupp_C_mul_X_pow (a : R) (n : ℕ) : Polynomial.toFinsupp (C a * X ^ n) = Finsupp.single n a := by rw [C_mul_X_pow_eq_monomial, toFinsupp_monomial] theorem C_mul_X_eq_monomial : C a * X = monomial 1 a := by rw [← C_mul_X_pow_eq_monomial, pow_one] @[simp high] theorem toFinsupp_C_mul_X (a : R) : Polynomial.toFinsupp (C a * X) = Finsupp.single 1 a := by rw [C_mul_X_eq_monomial, toFinsupp_monomial] theorem C_injective : Injective (C : R → R[X]) := monomial_injective 0 @[simp] theorem C_inj : C a = C b ↔ a = b := C_injective.eq_iff @[simp] theorem C_eq_zero : C a = 0 ↔ a = 0 := C_injective.eq_iff' (map_zero C) theorem C_ne_zero : C a ≠ 0 ↔ a ≠ 0 := C_eq_zero.not theorem subsingleton_iff_subsingleton : Subsingleton R[X] ↔ Subsingleton R := ⟨@Injective.subsingleton _ _ _ C_injective, by intro infer_instance⟩ theorem Nontrivial.of_polynomial_ne (h : p ≠ q) : Nontrivial R := (subsingleton_or_nontrivial R).resolve_left fun _hI => h <\| Subsingleton.elim _ _ theorem forall_eq_iff_forall_eq : (∀ f g : R[X], f = g) ↔ ∀ a b : R, a = b := by simpa only [← subsingleton_iff] using subsingleton_iff_subsingleton theorem ext_iff {p q : R[X]} : p = q ↔ ∀ n, coeff p n = coeff q n := by rcases p with ⟨f : ℕ →₀ R⟩ rcases q with ⟨g : ℕ →₀ R⟩ simpa [coeff] using DFunLike.ext_iff (f := f) (g := g) @[ext] theorem ext {p q : R[X]} : (∀ n, coeff p n = coeff q n) → p = q := ext_iff.2 /-- Monomials generate the additive monoid of polynomials. -/ theorem addSubmonoid_closure_setOf_eq_monomial : AddSubmonoid.closure { p : R[X] \| ∃ n a, p = monomial n a } = ⊤ := by apply top_unique rw [← AddSubmonoid.map_equiv_top (toFinsuppIso R).symm.toAddEquiv, ← Finsupp.add_closure_setOf_eq_single, AddMonoidHom.map_mclosure] refine AddSubmonoid.closure_mono (Set.image_subset_iff.2 ?_) rintro _ ⟨n, a, rfl⟩ exact ⟨n, a, Polynomial.ofFinsupp_single _ _⟩ theorem addHom_ext {M : Type} [AddZeroClass M] {f g : R[X] →+ M} (h : ∀ n a, f (monomial n a) = g (monomial n a)) : f = g := AddMonoidHom.eq_of_eqOn_denseM addSubmonoid_closure_setOf_eq_monomial <\| by rintro p ⟨n, a, rfl⟩ exact h n a @[ext high] theorem addHom_ext' {M : Type} [AddZeroClass M] {f g : R[X] →+ M} (h : ∀ n, f.comp (monomial n).toAddMonoidHom = g.comp (monomial n).toAddMonoidHom) : f = g := addHom_ext fun n => DFunLike.congr_fun (h n) @[ext high] theorem lhom_ext' {M : Type} [AddCommMonoid M] [Module R M] {f g : R[X] →ₗ[R] M} (h : ∀ n, f.comp (monomial n) = g.comp (monomial n)) : f = g := LinearMap.toAddMonoidHom_injective <\| addHom_ext fun n => LinearMap.congr_fun (h n) -- this has the same content as the subsingleton theorem eq_zero_of_eq_zero (h : (0 : R) = (1 : R)) (p : R[X]) : p = 0 := by rw [← one_smul R p, ← h, zero_smul] section Fewnomials theorem support_monomial (n) {a : R} (H : a ≠ 0) : (monomial n a).support = singleton n := by rw [← ofFinsupp_single, support]; exact Finsupp.support_single_ne_zero _ H theorem support_monomial' (n) (a : R) : (monomial n a).support ⊆ singleton n := by rw [← ofFinsupp_single, support] exact Finsupp.support_single_subset theorem support_C {a : R} (h : a ≠ 0) : (C a).support = singleton 0 := support_monomial 0 h theorem support_C_subset (a : R) : (C a).support ⊆ singleton 0 := support_monomial' 0 a theorem support_C_mul_X {c : R} (h : c ≠ 0) : Polynomial.support (C c X) = singleton 1 := by rw [C_mul_X_eq_monomial, support_monomial 1 h] theorem support_C_mul_X' (c : R) : Polynomial.support (C c * X) ⊆ singleton 1 := by simpa only [C_mul_X_eq_monomial] using support_monomial' 1 c theorem support_C_mul_X_pow (n : ℕ) {c : R} (h : c ≠ 0) : Polynomial.support (C c * X ^ n) = singleton n := by rw [C_mul_X_pow_eq_monomial, support_monomial n h] theorem support_C_mul_X_pow' (n : ℕ) (c : R) : Polynomial.support (C c * X ^ n) ⊆ singleton n := by simpa only [C_mul_X_pow_eq_monomial] using support_monomial' n c open Finset theorem support_binomial' (k m : ℕ) (x y : R) : Polynomial.support (C x * X ^ k + C y * X ^ m) ⊆ {k, m} := support_add.trans (union_subset ((support_C_mul_X_pow' k x).trans (singleton_subset_iff.mpr (mem_insert_self k {m}))) ((support_C_mul_X_pow' m y).trans (singleton_subset_iff.mpr (mem_insert_of_mem (mem_singleton_self m))))) theorem support_trinomial' (k m n : ℕ) (x y z : R) : Polynomial.support (C x * X ^ k + C y * X ^ m + C z * X ^ n) ⊆ {k, m, n} := support_add.trans (union_subset (support_add.trans (union_subset ((support_C_mul_X_pow' k x).trans (singleton_subset_iff.mpr (mem_insert_self k {m, n}))) ((support_C_mul_X_pow' m y).trans (singleton_subset_iff.mpr (mem_insert_of_mem (mem_insert_self m {n})))))) ((support_C_mul_X_pow' n z).trans (singleton_subset_iff.mpr (mem_insert_of_mem (mem_insert_of_mem (mem_singleton_self n)))))) end Fewnomials theorem X_pow_eq_monomial (n) : X ^ n = monomial n (1 : R) := by induction n with \| zero => rw [pow_zero, monomial_zero_one] \| succ n hn => rw [pow_succ, hn, X, monomial_mul_monomial, one_mul] @[simp high] theorem toFinsupp_X_pow (n : ℕ) : (X ^ n).toFinsupp = Finsupp.single n (1 : R) := by rw [X_pow_eq_monomial, toFinsupp_monomial] theorem smul_X_eq_monomial {n} : a • X ^ n = monomial n (a : R) := by rw [X_pow_eq_monomial, smul_monomial, smul_eq_mul, mul_one] theorem support_X_pow (H : ¬(1 : R) = 0) (n : ℕ) : (X ^ n : R[X]).support = singleton n := by convert support_monomial n H exact X_pow_eq_monomial n theorem support_X_empty (H : (1 : R) = 0) : (X : R[X]).support = ∅ := by rw [X, H, monomial_zero_right, support_zero] theorem support_X (H : ¬(1 : R) = 0) : (X : R[X]).support = singleton 1 := by rw [← pow_one X, support_X_pow H 1] theorem monomial_left_inj {a : R} (ha : a ≠ 0) {i j : ℕ} : monomial i a = monomial j a ↔ i = j := by simp only [← ofFinsupp_single, ofFinsupp.injEq, Finsupp.single_left_inj ha] theorem binomial_eq_binomial {k l m n : ℕ} {u v : R} (hu : u ≠ 0) (hv : v ≠ 0) : C u * X ^ k + C v * X ^ l = C u * X ^ m + C v * X ^ n ↔ k = m ∧ l = n ∨ u = v ∧ k = n ∧ l = m ∨ u + v = 0 ∧ k = l ∧ m = n := by simp_rw [C_mul_X_pow_eq_monomial, ← toFinsupp_inj, toFinsupp_add, toFinsupp_monomial] exact Finsupp.single_add_single_eq_single_add_single hu hv theorem natCast_mul (n : ℕ) (p : R[X]) : (n : R[X]) * p = n • p := (nsmul_eq_mul _ _).symm /-- Summing the values of a function applied to the coefficients of a polynomial -/ def sum {S : Type} [AddCommMonoid S] (p : R[X]) (f : ℕ → R → S) : S := ∑ n ∈ p.support, f n (p.coeff n) theorem sum_def {S : Type} [AddCommMonoid S] (p : R[X]) (f : ℕ → R → S) : p.sum f = ∑ n ∈ p.support, f n (p.coeff n) := rfl theorem sum_eq_of_subset {S : Type} [AddCommMonoid S] {p : R[X]} (f : ℕ → R → S) (hf : ∀ i, f i 0 = 0) {s : Finset ℕ} (hs : p.support ⊆ s) : p.sum f = ∑ n ∈ s, f n (p.coeff n) := Finsupp.sum_of_support_subset _ hs f (fun i _ ↦ hf i) /-- Expressing the product of two polynomials as a double sum. -/ theorem mul_eq_sum_sum : p q = ∑ i ∈ p.support, q.sum fun j a => (monomial (i + j)) (p.coeff i * a) := by apply toFinsupp_injective rcases p with ⟨⟩; rcases q with ⟨⟩ simp_rw [sum, coeff, toFinsupp_sum, support, toFinsupp_mul, toFinsupp_monomial, AddMonoidAlgebra.mul_def, Finsupp.sum] @[simp] theorem sum_zero_index {S : Type} [AddCommMonoid S] (f : ℕ → R → S) : (0 : R[X]).sum f = 0 := by simp [sum] @[simp] theorem sum_monomial_index {S : Type} [AddCommMonoid S] {n : ℕ} (a : R) (f : ℕ → R → S) (hf : f n 0 = 0) : (monomial n a : R[X]).sum f = f n a := Finsupp.sum_single_index hf @[simp] theorem sum_C_index {a} {β} [AddCommMonoid β] {f : ℕ → R → β} (h : f 0 0 = 0) : (C a).sum f = f 0 a := sum_monomial_index a f h -- the assumption `hf` is only necessary when the ring is trivial @[simp] theorem sum_X_index {S : Type} [AddCommMonoid S] {f : ℕ → R → S} (hf : f 1 0 = 0) : (X : R[X]).sum f = f 1 1 := sum_monomial_index 1 f hf theorem sum_add_index {S : Type} [AddCommMonoid S] (p q : R[X]) (f : ℕ → R → S) (hf : ∀ i, f i 0 = 0) (h_add : ∀ a b₁ b₂, f a (b₁ + b₂) = f a b₁ + f a b₂) : (p + q).sum f = p.sum f + q.sum f := by rw [show p + q = ⟨p.toFinsupp + q.toFinsupp⟩ from add_def p q] exact Finsupp.sum_add_index (fun i _ ↦ hf i) (fun a _ b₁ b₂ ↦ h_add a b₁ b₂) theorem sum_add' {S : Type} [AddCommMonoid S] (p : R[X]) (f g : ℕ → R → S) : p.sum (f + g) = p.sum f + p.sum g := by simp [sum_def, Finset.sum_add_distrib] theorem sum_add {S : Type} [AddCommMonoid S] (p : R[X]) (f g : ℕ → R → S) : (p.sum fun n x => f n x + g n x) = p.sum f + p.sum g := sum_add' _ _ _ theorem sum_smul_index {S : Type} [AddCommMonoid S] (p : R[X]) (b : R) (f : ℕ → R → S) (hf : ∀ i, f i 0 = 0) : (b • p).sum f = p.sum fun n a => f n (b a) := Finsupp.sum_smul_index hf theorem sum_smul_index' {S T : Type} [DistribSMul T R] [AddCommMonoid S] (p : R[X]) (b : T) (f : ℕ → R → S) (hf : ∀ i, f i 0 = 0) : (b • p).sum f = p.sum fun n a => f n (b • a) := Finsupp.sum_smul_index' hf protected theorem smul_sum {S T : Type} [AddCommMonoid S] [DistribSMul T S] (p : R[X]) (b : T) (f : ℕ → R → S) : b • p.sum f = p.sum fun n a => b • f n a := Finsupp.smul_sum @[simp] theorem sum_monomial_eq : ∀ p : R[X], (p.sum fun n a => monomial n a) = p \| ⟨_p⟩ => (ofFinsupp_sum _ _).symm.trans (congr_arg _ <\| Finsupp.sum_single _) theorem sum_C_mul_X_pow_eq (p : R[X]) : (p.sum fun n a => C a * X ^ n) = p := by simp_rw [C_mul_X_pow_eq_monomial, sum_monomial_eq] @[elab_as_elim] protected theorem induction_on {motive : R[X] → Prop} (p : R[X]) (C : ∀ a, motive (C a)) (add : ∀ p q, motive p → motive q → motive (p + q)) (monomial : ∀ (n : ℕ) (a : R), motive (Polynomial.C a * X ^ n) → motive (Polynomial.C a * X ^ (n + 1))) : motive p := by have A : ∀ {n : ℕ} {a}, motive (Polynomial.C a * X ^ n) := by intro n a induction n with \| zero => rw [pow_zero, mul_one]; exact C a \| succ n ih => exact monomial _ _ ih have B : ∀ s : Finset ℕ, motive (s.sum fun n : ℕ => Polynomial.C (p.coeff n) * X ^ n) := by apply Finset.induction · convert C 0 exact C_0.symm · intro n s ns ih rw [sum_insert ns] exact add _ _ A ih rw [← sum_C_mul_X_pow_eq p, Polynomial.sum] exact B (support p) /-- To prove something about polynomials, it suffices to show the condition is closed under taking sums, and it holds for monomials. -/ @[elab_as_elim] protected theorem induction_on' {motive : R[X] → Prop} (p : R[X]) (add : ∀ p q, motive p → motive q → motive (p + q)) (monomial : ∀ (n : ℕ) (a : R), motive (monomial n a)) : motive p := Polynomial.induction_on p (monomial 0) add fun n a _h => by rw [C_mul_X_pow_eq_monomial]; exact monomial _ _ /-- `erase p n` is the polynomial `p` in which the `X^n` term has been erased. -/ irreducible_def erase (n : ℕ) : R[X] → R[X] \| ⟨p⟩ => ⟨p.erase n⟩ @[simp] theorem toFinsupp_erase (p : R[X]) (n : ℕ) : toFinsupp (p.erase n) = p.toFinsupp.erase n := by rcases p with ⟨⟩ simp only [erase_def] @[simp] theorem ofFinsupp_erase (p : R[ℕ]) (n : ℕ) : (⟨p.erase n⟩ : R[X]) = (⟨p⟩ : R[X]).erase n := by rcases p with ⟨⟩ simp only [erase_def] @[simp] theorem support_erase (p : R[X]) (n : ℕ) : support (p.erase n) = (support p).erase n := by rcases p with ⟨⟩ simp only [support, erase_def, Finsupp.support_erase] theorem monomial_add_erase (p : R[X]) (n : ℕ) : monomial n (coeff p n) + p.erase n = p := toFinsupp_injective <\| by rcases p with ⟨⟩ rw [toFinsupp_add, toFinsupp_monomial, toFinsupp_erase, coeff] exact Finsupp.single_add_erase _ _ theorem coeff_erase (p : R[X]) (n i : ℕ) : (p.erase n).coeff i = if i = n then 0 else p.coeff i := by rcases p with ⟨⟩ simp only [erase_def, coeff] exact ite_congr rfl (fun _ => rfl) (fun _ => rfl) @[simp] theorem erase_zero (n : ℕ) : (0 : R[X]).erase n = 0 := toFinsupp_injective <\| by simp @[simp] theorem erase_monomial {n : ℕ} {a : R} : erase n (monomial n a) = 0 := toFinsupp_injective <\| by simp @[simp] theorem erase_same (p : R[X]) (n : ℕ) : coeff (p.erase n) n = 0 := by simp [coeff_erase] @[simp] theorem erase_ne (p : R[X]) (n i : ℕ) (h : i ≠ n) : coeff (p.erase n) i = coeff p i := by simp [coeff_erase, h] section Update /-- Replace the coefficient of a `p : R[X]` at a given degree `n : ℕ` by a given value `a : R`. If `a = 0`, this is equal to `p.erase n` If `p.natDegree < n` and `a ≠ 0`, this increases the degree to `n`. -/ def update (p : R[X]) (n : ℕ) (a : R) : R[X] := Polynomial.ofFinsupp (p.toFinsupp.update n a) theorem coeff_update (p : R[X]) (n : ℕ) (a : R) : (p.update n a).coeff = Function.update p.coeff n a := by ext cases p simp only [coeff, update, Function.update_apply, coe_update] theorem coeff_update_apply (p : R[X]) (n : ℕ) (a : R) (i : ℕ) : (p.update n a).coeff i = if i = n then a else p.coeff i := by rw [coeff_update, Function.update_apply] @[simp] theorem coeff_update_same (p : R[X]) (n : ℕ) (a : R) : (p.update n a).coeff n = a := by rw [p.coeff_update_apply, if_pos rfl] theorem coeff_update_ne (p : R[X]) {n : ℕ} (a : R) {i : ℕ} (h : i ≠ n) : (p.update n a).coeff i = p.coeff i := by rw [p.coeff_update_apply, if_neg h] @[simp] theorem update_zero_eq_erase (p : R[X]) (n : ℕ) : p.update n 0 = p.erase n := by ext rw [coeff_update_apply, coeff_erase] theorem support_update (p : R[X]) (n : ℕ) (a : R) [Decidable (a = 0)] : support (p.update n a) = if a = 0 then p.support.erase n else insert n p.support := by classical cases p simp only [support, update, Finsupp.support_update] congr theorem support_update_zero (p : R[X]) (n : ℕ) : support (p.update n 0) = p.support.erase n := by rw [update_zero_eq_erase, support_erase] theorem support_update_ne_zero (p : R[X]) (n : ℕ) {a : R} (ha : a ≠ 0) : support (p.update n a) = insert n p.support := by classical rw [support_update, if_neg ha] end Update /-- The finset of nonzero coefficients of a polynomial. -/ def coeffs (p : R[X]) : Finset R := letI := Classical.decEq R Finset.image (fun n => p.coeff n) p.support @[simp] theorem coeffs_zero : coeffs (0 : R[X]) = ∅ := rfl theorem mem_coeffs_iff {p : R[X]} {c : R} : c ∈ p.coeffs ↔ ∃ n ∈ p.support, c = p.coeff n := by simp [coeffs, eq_comm, (Finset.mem_image)] theorem coeffs_one : coeffs (1 : R[X]) ⊆ {1} := by classical simp_rw [coeffs, Finset.image_subset_iff] simp_all [coeff_one] theorem coeff_mem_coeffs (p : R[X]) (n : ℕ) (h : p.coeff n ≠ 0) : p.coeff n ∈ p.coeffs := by classical simp only [coeffs, exists_prop, mem_support_iff, Finset.mem_image, Ne] exact ⟨n, h, rfl⟩ theorem coeffs_monomial (n : ℕ) {c : R} (hc : c ≠ 0) : (monomial n c).coeffs = {c} := by rw [coeffs, support_monomial n hc] simp end Semiring section CommSemiring variable [CommSemiring R] instance commSemiring : CommSemiring R[X] := fast_instance% { Function.Injective.commSemigroup toFinsupp toFinsupp_injective toFinsupp_mul with toSemiring := Polynomial.semiring } end CommSemiring section Ring variable [Ring R] instance instZSMul : SMul ℤ R[X] where smul r p := ⟨r • p.toFinsupp⟩ @[simp] theorem ofFinsupp_zsmul (a : ℤ) (b) : (⟨a • b⟩ : R[X]) = (a • ⟨b⟩ : R[X]) := rfl @[simp] theorem toFinsupp_zsmul (a : ℤ) (b : R[X]) : (a • b).toFinsupp = a • b.toFinsupp := rfl instance instIntCast : IntCast R[X] where intCast n := ofFinsupp n @[simp] theorem ofFinsupp_intCast (z : ℤ) : (⟨z⟩ : R[X]) = z := rfl @[simp] theorem toFinsupp_intCast (z : ℤ) : (z : R[X]).toFinsupp = z := rfl instance ring : Ring R[X] := fast_instance% Function.Injective.ring toFinsupp toFinsupp_injective (toFinsupp_zero (R := R)) toFinsupp_one toFinsupp_add toFinsupp_mul toFinsupp_neg toFinsupp_sub (fun _ _ => toFinsupp_nsmul _ _) (fun _ _ => toFinsupp_zsmul _ _) toFinsupp_pow (fun _ => rfl) fun _ => rfl @[simp] theorem coeff_neg (p : R[X]) (n : ℕ) : coeff (-p) n = -coeff p n := by rcases p with ⟨⟩ rw [← ofFinsupp_neg, coeff, coeff, Finsupp.neg_apply] @[simp] theorem coeff_sub (p q : R[X]) (n : ℕ) : coeff (p - q) n = coeff p n - coeff q n := by rcases p with ⟨⟩ rcases q with ⟨⟩ rw [← ofFinsupp_sub, coeff, coeff, coeff, Finsupp.sub_apply] @[simp] theorem monomial_neg (n : ℕ) (a : R) : monomial n (-a) = -monomial n a := by rw [eq_neg_iff_add_eq_zero, ← monomial_add, neg_add_cancel, monomial_zero_right] theorem monomial_sub (n : ℕ) : monomial n (a - b) = monomial n a - monomial n b := by rw [sub_eq_add_neg, monomial_add, monomial_neg, sub_eq_add_neg] @[simp] theorem support_neg {p : R[X]} : (-p).support = p.support := by rcases p with ⟨⟩ rw [← ofFinsupp_neg, support, support, Finsupp.support_neg] theorem C_eq_intCast (n : ℤ) : C (n : R) = n := by simp theorem C_neg : C (-a) = -C a := RingHom.map_neg C a theorem C_sub : C (a - b) = C a - C b := RingHom.map_sub C a b end Ring instance commRing [CommRing R] : CommRing R[X] := --TODO: add reference to library note in PR https://github.com/leanprover-community/mathlib4/pull/7432 { toRing := Polynomial.ring mul_comm := mul_comm } section NonzeroSemiring variable [Semiring R] instance nontrivial [Nontrivial R] : Nontrivial R[X] := by have h : Nontrivial R[ℕ] := by infer_instance rcases h.exists_pair_ne with ⟨x, y, hxy⟩ refine ⟨⟨⟨x⟩, ⟨y⟩, ?_⟩⟩ simp [hxy] @[simp] theorem X_ne_zero [Nontrivial R] : (X : R[X]) ≠ 0 := mt (congr_arg fun p => coeff p 1) (by simp) end NonzeroSemiring section DivisionSemiring variable [DivisionSemiring R] lemma nnqsmul_eq_C_mul (q : ℚ≥0) (f : R[X]) : q • f = Polynomial.C (q : R) * f := by rw [← NNRat.smul_one_eq_cast, ← Polynomial.smul_C, C_1, smul_one_mul] end DivisionSemiring section DivisionRing variable [DivisionRing R] theorem qsmul_eq_C_mul (a : ℚ) (f : R[X]) : a • f = Polynomial.C (a : R) * f := by rw [← Rat.smul_one_eq_cast, ← Polynomial.smul_C, C_1, smul_one_mul] end DivisionRing @[simp] theorem nontrivial_iff [Semiring R] : Nontrivial R[X] ↔ Nontrivial R := ⟨fun h => let ⟨_r, _s, hrs⟩ := @exists_pair_ne _ h Nontrivial.of_polynomial_ne hrs, fun h => @Polynomial.nontrivial _ _ h⟩ section repr variable [Semiring R] protected instance repr [Repr R] [DecidableEq R] : Repr R[X] := ⟨fun p prec => let termPrecAndReprs : List (WithTop ℕ × Lean.Format) := List.map (fun \| 0 => (max_prec, "C " ++ reprArg (coeff p 0)) \| 1 => if coeff p 1 = 1 then (⊤, "X") else (70, "C " ++ reprArg (coeff p 1) ++ " * X") \| n => if coeff p n = 1 then (80, "X ^ " ++ Nat.repr n) else (70, "C " ++ reprArg (coeff p n) ++ " * X ^ " ++ Nat.repr n)) (p.support.sort (· ≤ ·)) match termPrecAndReprs with \| [] => "0" \| [(tprec, t)] => if prec ≥ tprec then Lean.Format.paren t else t \| ts => -- multiple terms, use `+` precedence (if prec ≥ 65 then Lean.Format.paren else id)	(Lean.Format.fill (Lean.Format.joinSep (ts.map Prod.snd) (" +" ++ Lean.Format.line)))⟩ end repr	Mathlib/Algebra/Polynomial/Basic.lean	1,201	1,205
/- Copyright (c) 2021 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison -/ import Mathlib.Algebra.Homology.HomologicalComplex /-! # Homological complexes supported in a single degree We define `single V j c : V ⥤ HomologicalComplex V c`, which constructs complexes in `V` of shape `c`, supported in degree `j`. In `ChainComplex.toSingle₀Equiv` we characterize chain maps to an `ℕ`-indexed complex concentrated in degree 0; they are equivalent to `{ f : C.X 0 ⟶ X // C.d 1 0 ≫ f = 0 }`. (This is useful translating between a projective resolution and an augmented exact complex of projectives.) -/ open CategoryTheory Category Limits ZeroObject universe v u variable (V : Type u) [Category.{v} V] [HasZeroMorphisms V] [HasZeroObject V] namespace HomologicalComplex variable {ι : Type*} [DecidableEq ι] (c : ComplexShape ι) /-- The functor `V ⥤ HomologicalComplex V c` creating a chain complex supported in a single degree. -/ noncomputable def single (j : ι) : V ⥤ HomologicalComplex V c where obj A := { X := fun i => if i = j then A else 0 d := fun _ _ => 0 } map f := { f := fun i => if h : i = j then eqToHom (by dsimp; rw [if_pos h]) ≫ f ≫ eqToHom (by dsimp; rw [if_pos h]) else 0 } map_id A := by ext dsimp split_ifs with h · subst h simp · #adaptation_note /-- nightly-2024-03-07 the previous sensible proof `rw [if_neg h]; simp` fails with "motive not type correct". The following is horrible. -/ convert (id_zero (C := V)).symm all_goals simp [if_neg h] map_comp f g := by ext dsimp split_ifs with h · subst h simp · simp variable {V} @[simp] lemma single_obj_X_self (j : ι) (A : V) : ((single V c j).obj A).X j = A := if_pos rfl lemma isZero_single_obj_X (j : ι) (A : V) (i : ι) (hi : i ≠ j) : IsZero (((single V c j).obj A).X i) := by dsimp [single] rw [if_neg hi] exact Limits.isZero_zero V /-- The object in degree `i` of `(single V c h).obj A` is just `A` when `i = j`. -/ noncomputable def singleObjXIsoOfEq (j : ι) (A : V) (i : ι) (hi : i = j) : ((single V c j).obj A).X i ≅ A := eqToIso (by subst hi; simp [single]) /-- The object in degree `j` of `(single V c h).obj A` is just `A`. -/ noncomputable def singleObjXSelf (j : ι) (A : V) : ((single V c j).obj A).X j ≅ A := singleObjXIsoOfEq c j A j rfl @[simp] lemma single_obj_d (j : ι) (A : V) (k l : ι) : ((single V c j).obj A).d k l = 0 := rfl @[reassoc] theorem single_map_f_self (j : ι) {A B : V} (f : A ⟶ B) : ((single V c j).map f).f j = (singleObjXSelf c j A).hom ≫ f ≫ (singleObjXSelf c j B).inv := by dsimp [single] rw [dif_pos rfl] rfl variable (V) /-- The natural isomorphism `single V c j ⋙ eval V c j ≅ 𝟭 V`. -/ @[simps!] noncomputable def singleCompEvalIsoSelf (j : ι) : single V c j ⋙ eval V c j ≅ 𝟭 V := NatIso.ofComponents (singleObjXSelf c j) (fun {A B} f => by simp [single_map_f_self]) lemma isZero_single_comp_eval (j i : ι) (hi : i ≠ j) : IsZero (single V c j ⋙ eval V c i) := Functor.isZero _ (fun _ ↦ isZero_single_obj_X c _ _ _ hi) variable {V c} @[ext] lemma from_single_hom_ext {K : HomologicalComplex V c} {j : ι} {A : V} {f g : (single V c j).obj A ⟶ K} (hfg : f.f j = g.f j) : f = g := by ext i by_cases h : i = j · subst h exact hfg · apply (isZero_single_obj_X c j A i h).eq_of_src @[ext] lemma to_single_hom_ext {K : HomologicalComplex V c} {j : ι} {A : V} {f g : K ⟶ (single V c j).obj A} (hfg : f.f j = g.f j) : f = g := by ext i by_cases h : i = j · subst h exact hfg · apply (isZero_single_obj_X c j A i h).eq_of_tgt instance (j : ι) : (single V c j).Faithful where map_injective {A B f g} w := by rw [← cancel_mono (singleObjXSelf c j B).inv, ← cancel_epi (singleObjXSelf c j A).hom, ← single_map_f_self, ← single_map_f_self, w] instance (j : ι) : (single V c j).Full where map_surjective {A B} f := ⟨(singleObjXSelf c j A).inv ≫ f.f j ≫ (singleObjXSelf c j B).hom, by ext simp [single_map_f_self]⟩ /-- Constructor for morphisms to a single homological complex. -/ noncomputable def mkHomToSingle {K : HomologicalComplex V c} {j : ι} {A : V} (φ : K.X j ⟶ A) (hφ : ∀ (i : ι), c.Rel i j → K.d i j ≫ φ = 0) : K ⟶ (single V c j).obj A where f i := if hi : i = j then (K.XIsoOfEq hi).hom ≫ φ ≫ (singleObjXIsoOfEq c j A i hi).inv else 0 comm' i k hik := by dsimp rw [comp_zero] split_ifs with hk · subst hk simp only [XIsoOfEq_rfl, Iso.refl_hom, id_comp, reassoc_of% hφ i hik, zero_comp] · apply (isZero_single_obj_X c j A k hk).eq_of_tgt @[simp] lemma mkHomToSingle_f {K : HomologicalComplex V c} {j : ι} {A : V} (φ : K.X j ⟶ A) (hφ : ∀ (i : ι), c.Rel i j → K.d i j ≫ φ = 0) : (mkHomToSingle φ hφ).f j = φ ≫ (singleObjXSelf c j A).inv := by dsimp [mkHomToSingle] rw [dif_pos rfl, id_comp] rfl /-- Constructor for morphisms from a single homological complex. -/ noncomputable def mkHomFromSingle {K : HomologicalComplex V c} {j : ι} {A : V} (φ : A ⟶ K.X j) (hφ : ∀ (k : ι), c.Rel j k → φ ≫ K.d j k = 0) : (single V c j).obj A ⟶ K where f i := if hi : i = j then (singleObjXIsoOfEq c j A i hi).hom ≫ φ ≫ (K.XIsoOfEq hi).inv else 0 comm' i k hik := by dsimp rw [zero_comp] split_ifs with hi · subst hi simp only [XIsoOfEq_rfl, Iso.refl_inv, comp_id, assoc, hφ k hik, comp_zero] · apply (isZero_single_obj_X c j A i hi).eq_of_src @[simp] lemma mkHomFromSingle_f {K : HomologicalComplex V c} {j : ι} {A : V} (φ : A ⟶ K.X j) (hφ : ∀ (k : ι), c.Rel j k → φ ≫ K.d j k = 0) : (mkHomFromSingle φ hφ).f j = (singleObjXSelf c j A).hom ≫ φ := by dsimp [mkHomFromSingle] rw [dif_pos rfl, comp_id] rfl instance (j : ι) : (single V c j).PreservesZeroMorphisms where end HomologicalComplex namespace ChainComplex /-- The functor `V ⥤ ChainComplex V ℕ` creating a chain complex supported in degree zero. -/ noncomputable abbrev single₀ : V ⥤ ChainComplex V ℕ := HomologicalComplex.single V (ComplexShape.down ℕ) 0 variable {V} @[simp] lemma single₀_obj_zero (A : V) : ((single₀ V).obj A).X 0 = A := rfl @[simp] lemma single₀_map_f_zero {A B : V} (f : A ⟶ B) : ((single₀ V).map f).f 0 = f := by rw [HomologicalComplex.single_map_f_self] dsimp [HomologicalComplex.singleObjXSelf, HomologicalComplex.singleObjXIsoOfEq] rw [comp_id, id_comp] @[simp] lemma single₀ObjXSelf (X : V) : HomologicalComplex.singleObjXSelf (ComplexShape.down ℕ) 0 X = Iso.refl _ := rfl /-- Morphisms from an `ℕ`-indexed chain complex `C` to a single object chain complex with `X` concentrated in degree 0 are the same as morphisms `f : C.X 0 ⟶ X` such that `C.d 1 0 ≫ f = 0`. -/ @[simps apply_coe] noncomputable def toSingle₀Equiv (C : ChainComplex V ℕ) (X : V) : (C ⟶ (single₀ V).obj X) ≃ { f : C.X 0 ⟶ X // C.d 1 0 ≫ f = 0 } where toFun φ := ⟨φ.f 0, by rw [← φ.comm 1 0, HomologicalComplex.single_obj_d, comp_zero]⟩ invFun f := HomologicalComplex.mkHomToSingle f.1 (fun i hi => by obtain rfl : i = 1 := by simpa using hi.symm exact f.2) left_inv φ := by aesop_cat right_inv f := by simp @[simp] lemma toSingle₀Equiv_symm_apply_f_zero {C : ChainComplex V ℕ} {X : V} (f : C.X 0 ⟶ X) (hf : C.d 1 0 ≫ f = 0) : ((toSingle₀Equiv C X).symm ⟨f, hf⟩).f 0 = f := by simp [toSingle₀Equiv] /-- Morphisms from a single object chain complex with `X` concentrated in degree 0 to an `ℕ`-indexed chain complex `C` are the same as morphisms `f : X → C.X 0`. -/ @[simps apply] noncomputable def fromSingle₀Equiv (C : ChainComplex V ℕ) (X : V) : ((single₀ V).obj X ⟶ C) ≃ (X ⟶ C.X 0) where toFun f := f.f 0 invFun f := HomologicalComplex.mkHomFromSingle f (fun i hi => by simp at hi) left_inv := by aesop_cat right_inv := by aesop_cat @[simp] lemma fromSingle₀Equiv_symm_apply_f_zero {C : ChainComplex V ℕ} {X : V} (f : X ⟶ C.X 0) : ((fromSingle₀Equiv C X).symm f).f 0 = f := by simp [fromSingle₀Equiv] @[simp] lemma fromSingle₀Equiv_symm_apply_f_succ {C : ChainComplex V ℕ} {X : V} (f : X ⟶ C.X 0) (n : ℕ) : ((fromSingle₀Equiv C X).symm f).f (n + 1) = 0 := rfl end ChainComplex namespace CochainComplex /-- The functor `V ⥤ CochainComplex V ℕ` creating a cochain complex supported in degree zero. -/ noncomputable abbrev single₀ : V ⥤ CochainComplex V ℕ := HomologicalComplex.single V (ComplexShape.up ℕ) 0 variable {V} @[simp] lemma single₀_obj_zero (A : V) : ((single₀ V).obj A).X 0 = A := rfl @[simp] lemma single₀_map_f_zero {A B : V} (f : A ⟶ B) : ((single₀ V).map f).f 0 = f := by rw [HomologicalComplex.single_map_f_self] dsimp [HomologicalComplex.singleObjXSelf, HomologicalComplex.singleObjXIsoOfEq] rw [comp_id, id_comp] @[simp] lemma single₀ObjXSelf (X : V) : HomologicalComplex.singleObjXSelf (ComplexShape.up ℕ) 0 X = Iso.refl _ := rfl /-- Morphisms from a single object cochain complex with `X` concentrated in degree 0 to an `ℕ`-indexed cochain complex `C` are the same as morphisms `f : X ⟶ C.X 0` such that `f ≫ C.d 0 1 = 0`. -/ @[simps apply_coe] noncomputable def fromSingle₀Equiv (C : CochainComplex V ℕ) (X : V) : ((single₀ V).obj X ⟶ C) ≃ { f : X ⟶ C.X 0 // f ≫ C.d 0 1 = 0 } where toFun φ := ⟨φ.f 0, by rw [φ.comm 0 1, HomologicalComplex.single_obj_d, zero_comp]⟩ invFun f := HomologicalComplex.mkHomFromSingle f.1 (fun i hi => by obtain rfl : i = 1 := by simpa using hi.symm exact f.2) left_inv φ := by aesop_cat right_inv := by aesop_cat @[simp] lemma fromSingle₀Equiv_symm_apply_f_zero {C : CochainComplex V ℕ} {X : V} (f : X ⟶ C.X 0) (hf : f ≫ C.d 0 1 = 0) : ((fromSingle₀Equiv C X).symm ⟨f, hf⟩).f 0 = f := by simp [fromSingle₀Equiv] /-- Morphisms to a single object cochain complex with `X` concentrated in degree 0 to an `ℕ`-indexed cochain complex `C` are the same as morphisms `f : C.X 0 ⟶ X`. -/ @[simps apply] noncomputable def toSingle₀Equiv (C : CochainComplex V ℕ) (X : V) : (C ⟶ (single₀ V).obj X) ≃ (C.X 0 ⟶ X) where toFun f := f.f 0 invFun f := HomologicalComplex.mkHomToSingle f (fun i hi => by simp at hi) left_inv := by aesop_cat right_inv := by aesop_cat @[simp] lemma toSingle₀Equiv_symm_apply_f_zero {C : CochainComplex V ℕ} {X : V} (f : C.X 0 ⟶ X) : ((toSingle₀Equiv C X).symm f).f 0 = f := by simp [toSingle₀Equiv] @[simp]	lemma toSingle₀Equiv_symm_apply_f_succ {C : CochainComplex V ℕ} {X : V} (f : C.X 0 ⟶ X) (n : ℕ) : ((toSingle₀Equiv C X).symm f).f (n + 1) = 0 := by rfl	Mathlib/Algebra/Homology/Single.lean	315	319
/- Copyright (c) 2014 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Algebra.Order.Ring.Nat import Mathlib.Algebra.Ring.Int.Defs import Mathlib.Data.Nat.Bitwise import Mathlib.Data.Nat.Cast.Order.Basic import Mathlib.Data.Nat.PSub import Mathlib.Data.Nat.Size import Mathlib.Data.Num.Bitwise /-! # Properties of the binary representation of integers -/ open Int attribute [local simp] add_assoc namespace PosNum variable {α : Type} @[simp, norm_cast] theorem cast_one [One α] [Add α] : ((1 : PosNum) : α) = 1 := rfl @[simp] theorem cast_one' [One α] [Add α] : (PosNum.one : α) = 1 := rfl @[simp, norm_cast] theorem cast_bit0 [One α] [Add α] (n : PosNum) : (n.bit0 : α) = (n : α) + n := rfl @[simp, norm_cast] theorem cast_bit1 [One α] [Add α] (n : PosNum) : (n.bit1 : α) = ((n : α) + n) + 1 := rfl @[simp, norm_cast] theorem cast_to_nat [AddMonoidWithOne α] : ∀ n : PosNum, ((n : ℕ) : α) = n \| 1 => Nat.cast_one \| bit0 p => by dsimp; rw [Nat.cast_add, p.cast_to_nat] \| bit1 p => by dsimp; rw [Nat.cast_add, Nat.cast_add, Nat.cast_one, p.cast_to_nat] @[norm_cast] theorem to_nat_to_int (n : PosNum) : ((n : ℕ) : ℤ) = n := cast_to_nat _ @[simp, norm_cast] theorem cast_to_int [AddGroupWithOne α] (n : PosNum) : ((n : ℤ) : α) = n := by rw [← to_nat_to_int, Int.cast_natCast, cast_to_nat] theorem succ_to_nat : ∀ n, (succ n : ℕ) = n + 1 \| 1 => rfl \| bit0 _ => rfl \| bit1 p => (congr_arg (fun n ↦ n + n) (succ_to_nat p)).trans <\| show ↑p + 1 + ↑p + 1 = ↑p + ↑p + 1 + 1 by simp [add_left_comm] theorem one_add (n : PosNum) : 1 + n = succ n := by cases n <;> rfl theorem add_one (n : PosNum) : n + 1 = succ n := by cases n <;> rfl @[norm_cast] theorem add_to_nat : ∀ m n, ((m + n : PosNum) : ℕ) = m + n \| 1, b => by rw [one_add b, succ_to_nat, add_comm, cast_one] \| a, 1 => by rw [add_one a, succ_to_nat, cast_one] \| bit0 a, bit0 b => (congr_arg (fun n ↦ n + n) (add_to_nat a b)).trans <\| add_add_add_comm _ _ _ _ \| bit0 a, bit1 b => (congr_arg (fun n ↦ (n + n) + 1) (add_to_nat a b)).trans <\| show (a + b + (a + b) + 1 : ℕ) = a + a + (b + b + 1) by simp [add_left_comm] \| bit1 a, bit0 b => (congr_arg (fun n ↦ (n + n) + 1) (add_to_nat a b)).trans <\| show (a + b + (a + b) + 1 : ℕ) = a + a + 1 + (b + b) by simp [add_comm, add_left_comm] \| bit1 a, bit1 b => show (succ (a + b) + succ (a + b) : ℕ) = a + a + 1 + (b + b + 1) by rw [succ_to_nat, add_to_nat a b]; simp [add_left_comm] theorem add_succ : ∀ m n : PosNum, m + succ n = succ (m + n) \| 1, b => by simp [one_add] \| bit0 a, 1 => congr_arg bit0 (add_one a) \| bit1 a, 1 => congr_arg bit1 (add_one a) \| bit0 _, bit0 _ => rfl \| bit0 a, bit1 b => congr_arg bit0 (add_succ a b) \| bit1 _, bit0 _ => rfl \| bit1 a, bit1 b => congr_arg bit1 (add_succ a b) theorem bit0_of_bit0 : ∀ n, n + n = bit0 n \| 1 => rfl \| bit0 p => congr_arg bit0 (bit0_of_bit0 p) \| bit1 p => show bit0 (succ (p + p)) = _ by rw [bit0_of_bit0 p, succ] theorem bit1_of_bit1 (n : PosNum) : (n + n) + 1 = bit1 n := show (n + n) + 1 = bit1 n by rw [add_one, bit0_of_bit0, succ] @[norm_cast] theorem mul_to_nat (m) : ∀ n, ((m n : PosNum) : ℕ) = m * n \| 1 => (mul_one _).symm \| bit0 p => show (↑(m * p) + ↑(m * p) : ℕ) = ↑m * (p + p) by rw [mul_to_nat m p, left_distrib] \| bit1 p => (add_to_nat (bit0 (m * p)) m).trans <\| show (↑(m * p) + ↑(m * p) + ↑m : ℕ) = ↑m * (p + p) + m by rw [mul_to_nat m p, left_distrib] theorem to_nat_pos : ∀ n : PosNum, 0 < (n : ℕ) \| 1 => Nat.zero_lt_one \| bit0 p => let h := to_nat_pos p add_pos h h \| bit1 _p => Nat.succ_pos _ theorem cmp_to_nat_lemma {m n : PosNum} : (m : ℕ) < n → (bit1 m : ℕ) < bit0 n := show (m : ℕ) < n → (m + m + 1 + 1 : ℕ) ≤ n + n by intro h; rw [Nat.add_right_comm m m 1, add_assoc]; exact Nat.add_le_add h h theorem cmp_swap (m) : ∀ n, (cmp m n).swap = cmp n m := by induction' m with m IH m IH <;> intro n <;> obtain - \| n \| n := n <;> unfold cmp <;> try { rfl } <;> rw [← IH] <;> cases cmp m n <;> rfl theorem cmp_to_nat : ∀ m n, (Ordering.casesOn (cmp m n) ((m : ℕ) < n) (m = n) ((n : ℕ) < m) : Prop) \| 1, 1 => rfl \| bit0 a, 1 => let h : (1 : ℕ) ≤ a := to_nat_pos a Nat.add_le_add h h \| bit1 a, 1 => Nat.succ_lt_succ <\| to_nat_pos <\| bit0 a \| 1, bit0 b => let h : (1 : ℕ) ≤ b := to_nat_pos b Nat.add_le_add h h \| 1, bit1 b => Nat.succ_lt_succ <\| to_nat_pos <\| bit0 b \| bit0 a, bit0 b => by dsimp [cmp] have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this · exact Nat.add_lt_add this this · rw [this] · exact Nat.add_lt_add this this \| bit0 a, bit1 b => by dsimp [cmp] have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this · exact Nat.le_succ_of_le (Nat.add_lt_add this this) · rw [this] apply Nat.lt_succ_self · exact cmp_to_nat_lemma this \| bit1 a, bit0 b => by dsimp [cmp] have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this · exact cmp_to_nat_lemma this · rw [this] apply Nat.lt_succ_self · exact Nat.le_succ_of_le (Nat.add_lt_add this this) \| bit1 a, bit1 b => by dsimp [cmp] have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this · exact Nat.succ_lt_succ (Nat.add_lt_add this this) · rw [this] · exact Nat.succ_lt_succ (Nat.add_lt_add this this) @[norm_cast] theorem lt_to_nat {m n : PosNum} : (m : ℕ) < n ↔ m < n := show (m : ℕ) < n ↔ cmp m n = Ordering.lt from match cmp m n, cmp_to_nat m n with \| Ordering.lt, h => by simp only at h; simp [h] \| Ordering.eq, h => by simp only at h; simp [h, lt_irrefl] \| Ordering.gt, h => by simp [not_lt_of_gt h] @[norm_cast] theorem le_to_nat {m n : PosNum} : (m : ℕ) ≤ n ↔ m ≤ n := by rw [← not_lt]; exact not_congr lt_to_nat end PosNum namespace Num variable {α : Type} open PosNum theorem add_zero (n : Num) : n + 0 = n := by cases n <;> rfl theorem zero_add (n : Num) : 0 + n = n := by cases n <;> rfl theorem add_one : ∀ n : Num, n + 1 = succ n \| 0 => rfl \| pos p => by cases p <;> rfl theorem add_succ : ∀ m n : Num, m + succ n = succ (m + n) \| 0, n => by simp [zero_add] \| pos p, 0 => show pos (p + 1) = succ (pos p + 0) by rw [PosNum.add_one, add_zero, succ, succ'] \| pos _, pos _ => congr_arg pos (PosNum.add_succ _ _) theorem bit0_of_bit0 : ∀ n : Num, n + n = n.bit0 \| 0 => rfl \| pos p => congr_arg pos p.bit0_of_bit0 theorem bit1_of_bit1 : ∀ n : Num, (n + n) + 1 = n.bit1 \| 0 => rfl \| pos p => congr_arg pos p.bit1_of_bit1 @[simp] theorem ofNat'_zero : Num.ofNat' 0 = 0 := by simp [Num.ofNat'] theorem ofNat'_bit (b n) : ofNat' (Nat.bit b n) = cond b Num.bit1 Num.bit0 (ofNat' n) := Nat.binaryRec_eq _ _ (.inl rfl) @[simp] theorem ofNat'_one : Num.ofNat' 1 = 1 := by erw [ofNat'_bit true 0, cond, ofNat'_zero]; rfl theorem bit1_succ : ∀ n : Num, n.bit1.succ = n.succ.bit0 \| 0 => rfl \| pos _n => rfl theorem ofNat'_succ : ∀ {n}, ofNat' (n + 1) = ofNat' n + 1 := @(Nat.binaryRec (by simp [zero_add]) fun b n ih => by cases b · erw [ofNat'_bit true n, ofNat'_bit] simp only [← bit1_of_bit1, ← bit0_of_bit0, cond] · rw [show n.bit true + 1 = (n + 1).bit false by simp [Nat.bit, mul_add], ofNat'_bit, ofNat'_bit, ih] simp only [cond, add_one, bit1_succ]) @[simp] theorem add_ofNat' (m n) : Num.ofNat' (m + n) = Num.ofNat' m + Num.ofNat' n := by induction n · simp only [Nat.add_zero, ofNat'_zero, add_zero] · simp only [Nat.add_succ, Nat.add_zero, ofNat'_succ, add_one, add_succ, ] @[simp, norm_cast] theorem cast_zero [Zero α] [One α] [Add α] : ((0 : Num) : α) = 0 := rfl @[simp] theorem cast_zero' [Zero α] [One α] [Add α] : (Num.zero : α) = 0 := rfl @[simp, norm_cast] theorem cast_one [Zero α] [One α] [Add α] : ((1 : Num) : α) = 1 := rfl @[simp] theorem cast_pos [Zero α] [One α] [Add α] (n : PosNum) : (Num.pos n : α) = n := rfl theorem succ'_to_nat : ∀ n, (succ' n : ℕ) = n + 1 \| 0 => (Nat.zero_add _).symm \| pos _p => PosNum.succ_to_nat _ theorem succ_to_nat (n) : (succ n : ℕ) = n + 1 := succ'_to_nat n @[simp, norm_cast] theorem cast_to_nat [AddMonoidWithOne α] : ∀ n : Num, ((n : ℕ) : α) = n \| 0 => Nat.cast_zero \| pos p => p.cast_to_nat @[norm_cast] theorem add_to_nat : ∀ m n, ((m + n : Num) : ℕ) = m + n \| 0, 0 => rfl \| 0, pos _q => (Nat.zero_add _).symm \| pos _p, 0 => rfl \| pos _p, pos _q => PosNum.add_to_nat _ _ @[norm_cast] theorem mul_to_nat : ∀ m n, ((m * n : Num) : ℕ) = m * n \| 0, 0 => rfl \| 0, pos _q => (zero_mul _).symm \| pos _p, 0 => rfl \| pos _p, pos _q => PosNum.mul_to_nat _ _ theorem cmp_to_nat : ∀ m n, (Ordering.casesOn (cmp m n) ((m : ℕ) < n) (m = n) ((n : ℕ) < m) : Prop) \| 0, 0 => rfl \| 0, pos _ => to_nat_pos _ \| pos _, 0 => to_nat_pos _ \| pos a, pos b => by have := PosNum.cmp_to_nat a b; revert this; dsimp [cmp]; cases PosNum.cmp a b exacts [id, congr_arg pos, id] @[norm_cast] theorem lt_to_nat {m n : Num} : (m : ℕ) < n ↔ m < n := show (m : ℕ) < n ↔ cmp m n = Ordering.lt from match cmp m n, cmp_to_nat m n with \| Ordering.lt, h => by simp only at h; simp [h] \| Ordering.eq, h => by simp only at h; simp [h, lt_irrefl] \| Ordering.gt, h => by simp [not_lt_of_gt h] @[norm_cast] theorem le_to_nat {m n : Num} : (m : ℕ) ≤ n ↔ m ≤ n := by rw [← not_lt]; exact not_congr lt_to_nat end Num namespace PosNum @[simp] theorem of_to_nat' : ∀ n : PosNum, Num.ofNat' (n : ℕ) = Num.pos n \| 1 => by erw [@Num.ofNat'_bit true 0, Num.ofNat'_zero]; rfl \| bit0 p => by simpa only [Nat.bit_false, cond_false, two_mul, of_to_nat' p] using Num.ofNat'_bit false p \| bit1 p => by simpa only [Nat.bit_true, cond_true, two_mul, of_to_nat' p] using Num.ofNat'_bit true p end PosNum namespace Num @[simp, norm_cast] theorem of_to_nat' : ∀ n : Num, Num.ofNat' (n : ℕ) = n \| 0 => ofNat'_zero \| pos p => p.of_to_nat' lemma toNat_injective : Function.Injective (castNum : Num → ℕ) := Function.LeftInverse.injective of_to_nat' @[norm_cast] theorem to_nat_inj {m n : Num} : (m : ℕ) = n ↔ m = n := toNat_injective.eq_iff /-- This tactic tries to turn an (in)equality about `Num`s to one about `Nat`s by rewriting. ```lean example (n : Num) (m : Num) : n ≤ n + m := by transfer_rw exact Nat.le_add_right _ _ ``` -/ scoped macro (name := transfer_rw) "transfer_rw" : tactic => `(tactic\| (repeat first \| rw [← to_nat_inj] \| rw [← lt_to_nat] \| rw [← le_to_nat] repeat first \| rw [add_to_nat] \| rw [mul_to_nat] \| rw [cast_one] \| rw [cast_zero])) /-- This tactic tries to prove (in)equalities about `Num`s by transferring them to the `Nat` world and then trying to call `simp`. ```lean example (n : Num) (m : Num) : n ≤ n + m := by transfer ``` -/ scoped macro (name := transfer) "transfer" : tactic => `(tactic\| (intros; transfer_rw; try simp)) instance addMonoid : AddMonoid Num where add := (· + ·) zero := 0 zero_add := zero_add add_zero := add_zero add_assoc := by transfer nsmul := nsmulRec instance addMonoidWithOne : AddMonoidWithOne Num := { Num.addMonoid with natCast := Num.ofNat' one := 1 natCast_zero := ofNat'_zero natCast_succ := fun _ => ofNat'_succ } instance commSemiring : CommSemiring Num where __ := Num.addMonoid __ := Num.addMonoidWithOne mul := (· * ·) npow := @npowRec Num ⟨1⟩ ⟨(· * ·)⟩ mul_zero _ := by rw [← to_nat_inj, mul_to_nat, cast_zero, mul_zero] zero_mul _ := by rw [← to_nat_inj, mul_to_nat, cast_zero, zero_mul] mul_one _ := by rw [← to_nat_inj, mul_to_nat, cast_one, mul_one] one_mul _ := by rw [← to_nat_inj, mul_to_nat, cast_one, one_mul] add_comm _ _ := by simp_rw [← to_nat_inj, add_to_nat, add_comm] mul_comm _ _ := by simp_rw [← to_nat_inj, mul_to_nat, mul_comm] mul_assoc _ _ _ := by simp_rw [← to_nat_inj, mul_to_nat, mul_assoc] left_distrib _ _ _ := by simp only [← to_nat_inj, mul_to_nat, add_to_nat, mul_add] right_distrib _ _ _ := by simp only [← to_nat_inj, mul_to_nat, add_to_nat, add_mul] instance partialOrder : PartialOrder Num where lt_iff_le_not_le a b := by simp only [← lt_to_nat, ← le_to_nat, lt_iff_le_not_le] le_refl := by transfer le_trans a b c := by transfer_rw; apply le_trans le_antisymm a b := by transfer_rw; apply le_antisymm instance isOrderedCancelAddMonoid : IsOrderedCancelAddMonoid Num where add_le_add_left a b h c := by revert h; transfer_rw; exact fun h => add_le_add_left h c le_of_add_le_add_left a b c := show a + b ≤ a + c → b ≤ c by transfer_rw; apply le_of_add_le_add_left instance linearOrder : LinearOrder Num := { le_total := by intro a b transfer_rw apply le_total toDecidableLT := Num.decidableLT toDecidableLE := Num.decidableLE -- This is relying on an automatically generated instance name, -- generated in a `deriving` handler. -- See https://github.com/leanprover/lean4/issues/2343 toDecidableEq := instDecidableEqNum } instance isStrictOrderedRing : IsStrictOrderedRing Num := { zero_le_one := by decide mul_lt_mul_of_pos_left := by intro a b c transfer_rw apply mul_lt_mul_of_pos_left mul_lt_mul_of_pos_right := by intro a b c transfer_rw apply mul_lt_mul_of_pos_right exists_pair_ne := ⟨0, 1, by decide⟩ } @[norm_cast] theorem add_of_nat (m n) : ((m + n : ℕ) : Num) = m + n := add_ofNat' _ _ @[norm_cast] theorem to_nat_to_int (n : Num) : ((n : ℕ) : ℤ) = n := cast_to_nat _ @[simp, norm_cast] theorem cast_to_int {α} [AddGroupWithOne α] (n : Num) : ((n : ℤ) : α) = n := by rw [← to_nat_to_int, Int.cast_natCast, cast_to_nat] theorem to_of_nat : ∀ n : ℕ, ((n : Num) : ℕ) = n \| 0 => by rw [Nat.cast_zero, cast_zero] \| n + 1 => by rw [Nat.cast_succ, add_one, succ_to_nat, to_of_nat n] @[simp, norm_cast] theorem of_natCast {α} [AddMonoidWithOne α] (n : ℕ) : ((n : Num) : α) = n := by rw [← cast_to_nat, to_of_nat] @[norm_cast] theorem of_nat_inj {m n : ℕ} : (m : Num) = n ↔ m = n := ⟨fun h => Function.LeftInverse.injective to_of_nat h, congr_arg _⟩ -- The priority should be `high`er than `cast_to_nat`. @[simp high, norm_cast] theorem of_to_nat : ∀ n : Num, ((n : ℕ) : Num) = n := of_to_nat' @[norm_cast] theorem dvd_to_nat (m n : Num) : (m : ℕ) ∣ n ↔ m ∣ n := ⟨fun ⟨k, e⟩ => ⟨k, by rw [← of_to_nat n, e]; simp⟩, fun ⟨k, e⟩ => ⟨k, by simp [e, mul_to_nat]⟩⟩ end Num namespace PosNum variable {α : Type} open Num -- The priority should be `high`er than `cast_to_nat`. @[simp high, norm_cast] theorem of_to_nat : ∀ n : PosNum, ((n : ℕ) : Num) = Num.pos n := of_to_nat' @[norm_cast] theorem to_nat_inj {m n : PosNum} : (m : ℕ) = n ↔ m = n := ⟨fun h => Num.pos.inj <\| by rw [← PosNum.of_to_nat, ← PosNum.of_to_nat, h], congr_arg _⟩ theorem pred'_to_nat : ∀ n, (pred' n : ℕ) = Nat.pred n \| 1 => rfl \| bit0 n => have : Nat.succ ↑(pred' n) = ↑n := by rw [pred'_to_nat n, Nat.succ_pred_eq_of_pos (to_nat_pos n)] match (motive := ∀ k : Num, Nat.succ ↑k = ↑n → ↑(Num.casesOn k 1 bit1 : PosNum) = Nat.pred (n + n)) pred' n, this with \| 0, (h : ((1 : Num) : ℕ) = n) => by rw [← to_nat_inj.1 h]; rfl \| Num.pos p, (h : Nat.succ ↑p = n) => by rw [← h]; exact (Nat.succ_add p p).symm \| bit1 _ => rfl @[simp] theorem pred'_succ' (n) : pred' (succ' n) = n := Num.to_nat_inj.1 <\| by rw [pred'_to_nat, succ'_to_nat, Nat.add_one, Nat.pred_succ] @[simp] theorem succ'_pred' (n) : succ' (pred' n) = n := to_nat_inj.1 <\| by rw [succ'_to_nat, pred'_to_nat, Nat.add_one, Nat.succ_pred_eq_of_pos (to_nat_pos _)] instance dvd : Dvd PosNum := ⟨fun m n => pos m ∣ pos n⟩ @[norm_cast] theorem dvd_to_nat {m n : PosNum} : (m : ℕ) ∣ n ↔ m ∣ n := Num.dvd_to_nat (pos m) (pos n) theorem size_to_nat : ∀ n, (size n : ℕ) = Nat.size n \| 1 => Nat.size_one.symm \| bit0 n => by rw [size, succ_to_nat, size_to_nat n, cast_bit0, ← two_mul] erw [@Nat.size_bit false n] have := to_nat_pos n dsimp [Nat.bit]; omega \| bit1 n => by rw [size, succ_to_nat, size_to_nat n, cast_bit1, ← two_mul] erw [@Nat.size_bit true n] dsimp [Nat.bit]; omega theorem size_eq_natSize : ∀ n, (size n : ℕ) = natSize n \| 1 => rfl \| bit0 n => by rw [size, succ_to_nat, natSize, size_eq_natSize n] \| bit1 n => by rw [size, succ_to_nat, natSize, size_eq_natSize n] theorem natSize_to_nat (n) : natSize n = Nat.size n := by rw [← size_eq_natSize, size_to_nat] theorem natSize_pos (n) : 0 < natSize n := by cases n <;> apply Nat.succ_pos /-- This tactic tries to turn an (in)equality about `PosNum`s to one about `Nat`s by rewriting. ```lean example (n : PosNum) (m : PosNum) : n ≤ n + m := by transfer_rw exact Nat.le_add_right _ _ ``` -/ scoped macro (name := transfer_rw) "transfer_rw" : tactic => `(tactic\| (repeat first \| rw [← to_nat_inj] \| rw [← lt_to_nat] \| rw [← le_to_nat] repeat first \| rw [add_to_nat] \| rw [mul_to_nat] \| rw [cast_one] \| rw [cast_zero])) /-- This tactic tries to prove (in)equalities about `PosNum`s by transferring them to the `Nat` world and then trying to call `simp`. ```lean example (n : PosNum) (m : PosNum) : n ≤ n + m := by transfer ``` -/ scoped macro (name := transfer) "transfer" : tactic => `(tactic\| (intros; transfer_rw; try simp [add_comm, add_left_comm, mul_comm, mul_left_comm])) instance addCommSemigroup : AddCommSemigroup PosNum where add := (· + ·) add_assoc := by transfer add_comm := by transfer instance commMonoid : CommMonoid PosNum where mul := (· ·) one := (1 : PosNum) npow := @npowRec PosNum ⟨1⟩ ⟨(· * ·)⟩ mul_assoc := by transfer one_mul := by transfer mul_one := by transfer mul_comm := by transfer instance distrib : Distrib PosNum where add := (· + ·) mul := (· * ·) left_distrib := by transfer; simp [mul_add] right_distrib := by transfer; simp [mul_add, mul_comm] instance linearOrder : LinearOrder PosNum where lt := (· < ·) lt_iff_le_not_le := by intro a b transfer_rw apply lt_iff_le_not_le le := (· ≤ ·) le_refl := by transfer le_trans := by intro a b c transfer_rw apply le_trans le_antisymm := by intro a b transfer_rw apply le_antisymm le_total := by intro a b transfer_rw apply le_total toDecidableLT := by infer_instance toDecidableLE := by infer_instance toDecidableEq := by infer_instance @[simp] theorem cast_to_num (n : PosNum) : ↑n = Num.pos n := by rw [← cast_to_nat, ← of_to_nat n] @[simp, norm_cast] theorem bit_to_nat (b n) : (bit b n : ℕ) = Nat.bit b n := by cases b <;> simp [bit, two_mul] @[simp, norm_cast] theorem cast_add [AddMonoidWithOne α] (m n) : ((m + n : PosNum) : α) = m + n := by rw [← cast_to_nat, add_to_nat, Nat.cast_add, cast_to_nat, cast_to_nat] @[simp 500, norm_cast] theorem cast_succ [AddMonoidWithOne α] (n : PosNum) : (succ n : α) = n + 1 := by rw [← add_one, cast_add, cast_one] @[simp, norm_cast] theorem cast_inj [AddMonoidWithOne α] [CharZero α] {m n : PosNum} : (m : α) = n ↔ m = n := by rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_inj, to_nat_inj] @[simp] theorem one_le_cast [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] (n : PosNum) : (1 : α) ≤ n := by rw [← cast_to_nat, ← Nat.cast_one, Nat.cast_le (α := α)]; apply to_nat_pos @[simp] theorem cast_pos [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] (n : PosNum) : 0 < (n : α) := lt_of_lt_of_le zero_lt_one (one_le_cast n) @[simp, norm_cast] theorem cast_mul [NonAssocSemiring α] (m n) : ((m * n : PosNum) : α) = m * n := by rw [← cast_to_nat, mul_to_nat, Nat.cast_mul, cast_to_nat, cast_to_nat] @[simp] theorem cmp_eq (m n) : cmp m n = Ordering.eq ↔ m = n := by have := cmp_to_nat m n -- Porting note: `cases` didn't rewrite at `this`, so `revert` & `intro` are required. revert this; cases cmp m n <;> intro this <;> simp at this ⊢ <;> try { exact this } <;> simp [show m ≠ n from fun e => by rw [e] at this;exact lt_irrefl _ this] @[simp, norm_cast] theorem cast_lt [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] {m n : PosNum} : (m : α) < n ↔ m < n := by rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_lt (α := α), lt_to_nat] @[simp, norm_cast] theorem cast_le [Semiring α] [LinearOrder α] [IsStrictOrderedRing α] {m n : PosNum} : (m : α) ≤ n ↔ m ≤ n := by rw [← not_lt]; exact not_congr cast_lt end PosNum namespace Num variable {α : Type} open PosNum theorem bit_to_nat (b n) : (bit b n : ℕ) = Nat.bit b n := by cases b <;> cases n <;> simp [bit, two_mul] <;> rfl theorem cast_succ' [AddMonoidWithOne α] (n) : (succ' n : α) = n + 1 := by rw [← PosNum.cast_to_nat, succ'_to_nat, Nat.cast_add_one, cast_to_nat] theorem cast_succ [AddMonoidWithOne α] (n) : (succ n : α) = n + 1 := cast_succ' n @[simp, norm_cast] theorem cast_add [AddMonoidWithOne α] (m n) : ((m + n : Num) : α) = m + n := by rw [← cast_to_nat, add_to_nat, Nat.cast_add, cast_to_nat, cast_to_nat] @[simp, norm_cast] theorem cast_bit0 [NonAssocSemiring α] (n : Num) : (n.bit0 : α) = 2 (n : α) := by rw [← bit0_of_bit0, two_mul, cast_add] @[simp, norm_cast] theorem cast_bit1 [NonAssocSemiring α] (n : Num) : (n.bit1 : α) = 2 * (n : α) + 1 := by rw [← bit1_of_bit1, bit0_of_bit0, cast_add, cast_bit0]; rfl @[simp, norm_cast] theorem cast_mul [NonAssocSemiring α] : ∀ m n, ((m * n : Num) : α) = m * n \| 0, 0 => (zero_mul _).symm \| 0, pos _q => (zero_mul _).symm \| pos _p, 0 => (mul_zero _).symm \| pos _p, pos _q => PosNum.cast_mul _ _ theorem size_to_nat : ∀ n, (size n : ℕ) = Nat.size n \| 0 => Nat.size_zero.symm \| pos p => p.size_to_nat theorem size_eq_natSize : ∀ n, (size n : ℕ) = natSize n \| 0 => rfl \| pos p => p.size_eq_natSize theorem natSize_to_nat (n) : natSize n = Nat.size n := by rw [← size_eq_natSize, size_to_nat] @[simp 999] theorem ofNat'_eq : ∀ n, Num.ofNat' n = n := Nat.binaryRec (by simp) fun b n IH => by tauto theorem zneg_toZNum (n : Num) : -n.toZNum = n.toZNumNeg := by cases n <;> rfl theorem zneg_toZNumNeg (n : Num) : -n.toZNumNeg = n.toZNum := by cases n <;> rfl theorem toZNum_inj {m n : Num} : m.toZNum = n.toZNum ↔ m = n := ⟨fun h => by cases m <;> cases n <;> cases h <;> rfl, congr_arg _⟩ @[simp] theorem cast_toZNum [Zero α] [One α] [Add α] [Neg α] : ∀ n : Num, (n.toZNum : α) = n \| 0 => rfl \| Num.pos _p => rfl @[simp] theorem cast_toZNumNeg [SubtractionMonoid α] [One α] : ∀ n : Num, (n.toZNumNeg : α) = -n \| 0 => neg_zero.symm \| Num.pos _p => rfl @[simp] theorem add_toZNum (m n : Num) : Num.toZNum (m + n) = m.toZNum + n.toZNum := by cases m <;> cases n <;> rfl end Num namespace PosNum open Num theorem pred_to_nat {n : PosNum} (h : 1 < n) : (pred n : ℕ) = Nat.pred n := by unfold pred cases e : pred' n · have : (1 : ℕ) ≤ Nat.pred n := Nat.pred_le_pred ((@cast_lt ℕ _ _ _).2 h) rw [← pred'_to_nat, e] at this exact absurd this (by decide) · rw [← pred'_to_nat, e] rfl theorem sub'_one (a : PosNum) : sub' a 1 = (pred' a).toZNum := by cases a <;> rfl theorem one_sub' (a : PosNum) : sub' 1 a = (pred' a).toZNumNeg := by cases a <;> rfl theorem lt_iff_cmp {m n} : m < n ↔ cmp m n = Ordering.lt := Iff.rfl theorem le_iff_cmp {m n} : m ≤ n ↔ cmp m n ≠ Ordering.gt := not_congr <\| lt_iff_cmp.trans <\| by rw [← cmp_swap]; cases cmp m n <;> decide end PosNum namespace Num variable {α : Type} open PosNum theorem pred_to_nat : ∀ n : Num, (pred n : ℕ) = Nat.pred n \| 0 => rfl \| pos p => by rw [pred, PosNum.pred'_to_nat]; rfl theorem ppred_to_nat : ∀ n : Num, (↑) <$> ppred n = Nat.ppred n \| 0 => rfl \| pos p => by rw [ppred, Option.map_some, Nat.ppred_eq_some.2] rw [PosNum.pred'_to_nat, Nat.succ_pred_eq_of_pos (PosNum.to_nat_pos _)] rfl theorem cmp_swap (m n) : (cmp m n).swap = cmp n m := by cases m <;> cases n <;> try { rfl }; apply PosNum.cmp_swap theorem cmp_eq (m n) : cmp m n = Ordering.eq ↔ m = n := by have := cmp_to_nat m n -- Porting note: `cases` didn't rewrite at `this`, so `revert` & `intro` are required. revert this; cases cmp m n <;> intro this <;> simp at this ⊢ <;> try { exact this } <;> simp [show m ≠ n from fun e => by rw [e] at this; exact lt_irrefl _ this] @[simp, norm_cast] theorem cast_lt [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] {m n : Num} : (m : α) < n ↔ m < n := by rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_lt (α := α), lt_to_nat] @[simp, norm_cast] theorem cast_le [Semiring α] [LinearOrder α] [IsStrictOrderedRing α] {m n : Num} : (m : α) ≤ n ↔ m ≤ n := by rw [← not_lt]; exact not_congr cast_lt @[simp, norm_cast] theorem cast_inj [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] {m n : Num} : (m : α) = n ↔ m = n := by rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_inj, to_nat_inj] theorem lt_iff_cmp {m n} : m < n ↔ cmp m n = Ordering.lt := Iff.rfl theorem le_iff_cmp {m n} : m ≤ n ↔ cmp m n ≠ Ordering.gt := not_congr <\| lt_iff_cmp.trans <\| by rw [← cmp_swap]; cases cmp m n <;> decide theorem castNum_eq_bitwise {f : Num → Num → Num} {g : Bool → Bool → Bool} (p : PosNum → PosNum → Num) (gff : g false false = false) (f00 : f 0 0 = 0) (f0n : ∀ n, f 0 (pos n) = cond (g false true) (pos n) 0) (fn0 : ∀ n, f (pos n) 0 = cond (g true false) (pos n) 0) (fnn : ∀ m n, f (pos m) (pos n) = p m n) (p11 : p 1 1 = cond (g true true) 1 0) (p1b : ∀ b n, p 1 (PosNum.bit b n) = bit (g true b) (cond (g false true) (pos n) 0)) (pb1 : ∀ a m, p (PosNum.bit a m) 1 = bit (g a true) (cond (g true false) (pos m) 0)) (pbb : ∀ a b m n, p (PosNum.bit a m) (PosNum.bit b n) = bit (g a b) (p m n)) : ∀ m n : Num, (f m n : ℕ) = Nat.bitwise g m n := by intros m n obtain - \| m := m <;> obtain - \| n := n <;> try simp only [show zero = 0 from rfl, show ((0 : Num) : ℕ) = 0 from rfl] · rw [f00, Nat.bitwise_zero]; rfl · rw [f0n, Nat.bitwise_zero_left] cases g false true <;> rfl · rw [fn0, Nat.bitwise_zero_right] cases g true false <;> rfl · rw [fnn] have this b (n : PosNum) : (cond b (↑n) 0 : ℕ) = ↑(cond b (pos n) 0 : Num) := by cases b <;> rfl have this' b (n : PosNum) : ↑ (pos (PosNum.bit b n)) = Nat.bit b ↑n := by cases b <;> simp induction' m with m IH m IH generalizing n <;> obtain - \| n \| n := n any_goals simp only [show one = 1 from rfl, show pos 1 = 1 from rfl, show PosNum.bit0 = PosNum.bit false from rfl, show PosNum.bit1 = PosNum.bit true from rfl, show ((1 : Num) : ℕ) = Nat.bit true 0 from rfl] all_goals repeat rw [this'] rw [Nat.bitwise_bit gff] any_goals rw [Nat.bitwise_zero, p11]; cases g true true <;> rfl any_goals rw [Nat.bitwise_zero_left, ← Bool.cond_eq_ite, this, ← bit_to_nat, p1b] any_goals rw [Nat.bitwise_zero_right, ← Bool.cond_eq_ite, this, ← bit_to_nat, pb1] all_goals rw [← show ∀ n : PosNum, ↑(p m n) = Nat.bitwise g ↑m ↑n from IH] rw [← bit_to_nat, pbb] @[simp, norm_cast] theorem castNum_or : ∀ m n : Num, ↑(m \|\|\| n) = (↑m \|\|\| ↑n : ℕ) := by apply castNum_eq_bitwise fun x y => pos (PosNum.lor x y) <;> (try rintro (_ \| _)) <;> (try rintro (_ \| _)) <;> intros <;> rfl @[simp, norm_cast] theorem castNum_and : ∀ m n : Num, ↑(m &&& n) = (↑m &&& ↑n : ℕ) := by apply castNum_eq_bitwise PosNum.land <;> intros <;> (try cases_type Bool) <;> rfl @[simp, norm_cast] theorem castNum_ldiff : ∀ m n : Num, (ldiff m n : ℕ) = Nat.ldiff m n := by apply castNum_eq_bitwise PosNum.ldiff <;> intros <;> (try cases_type* Bool) <;> rfl @[simp, norm_cast] theorem castNum_xor : ∀ m n : Num, ↑(m ^^^ n) = (↑m ^^^ ↑n : ℕ) := by apply castNum_eq_bitwise PosNum.lxor <;> intros <;> (try cases_type* Bool) <;> rfl @[simp, norm_cast] theorem castNum_shiftLeft (m : Num) (n : Nat) : ↑(m <<< n) = (m : ℕ) <<< (n : ℕ) := by cases m <;> dsimp only [← shiftl_eq_shiftLeft, shiftl] · symm apply Nat.zero_shiftLeft simp only [cast_pos] induction' n with n IH · rfl simp [PosNum.shiftl_succ_eq_bit0_shiftl, Nat.shiftLeft_succ, IH, pow_succ, ← mul_assoc, mul_comm, -shiftl_eq_shiftLeft, -PosNum.shiftl_eq_shiftLeft, shiftl, mul_two] @[simp, norm_cast] theorem castNum_shiftRight (m : Num) (n : Nat) : ↑(m >>> n) = (m : ℕ) >>> (n : ℕ) := by obtain - \| m := m <;> dsimp only [← shiftr_eq_shiftRight, shiftr] · symm apply Nat.zero_shiftRight induction' n with n IH generalizing m · cases m <;> rfl have hdiv2 : ∀ m, Nat.div2 (m + m) = m := by intro; rw [Nat.div2_val]; omega obtain - \| m \| m := m <;> dsimp only [PosNum.shiftr, ← PosNum.shiftr_eq_shiftRight] · rw [Nat.shiftRight_eq_div_pow] symm apply Nat.div_eq_of_lt simp · trans · apply IH change Nat.shiftRight m n = Nat.shiftRight (m + m + 1) (n + 1) rw [add_comm n 1, @Nat.shiftRight_eq _ (1 + n), Nat.shiftRight_add] apply congr_arg fun x => Nat.shiftRight x n simp [-add_assoc, Nat.shiftRight_succ, Nat.shiftRight_zero, ← Nat.div2_val, hdiv2] · trans · apply IH change Nat.shiftRight m n = Nat.shiftRight (m + m) (n + 1) rw [add_comm n 1, @Nat.shiftRight_eq _ (1 + n), Nat.shiftRight_add] apply congr_arg fun x => Nat.shiftRight x n simp [-add_assoc, Nat.shiftRight_succ, Nat.shiftRight_zero, ← Nat.div2_val, hdiv2] @[simp] theorem castNum_testBit (m n) : testBit m n = Nat.testBit m n := by cases m with dsimp only [testBit] \| zero => rw [show (Num.zero : Nat) = 0 from rfl, Nat.zero_testBit] \| pos m => rw [cast_pos] induction' n with n IH generalizing m <;> obtain - \| m \| m := m <;> simp only [PosNum.testBit] · rfl · rw [PosNum.cast_bit1, ← two_mul, ← congr_fun Nat.bit_true, Nat.testBit_bit_zero] · rw [PosNum.cast_bit0, ← two_mul, ← congr_fun Nat.bit_false, Nat.testBit_bit_zero] · simp [Nat.testBit_add_one] · rw [PosNum.cast_bit1, ← two_mul, ← congr_fun Nat.bit_true, Nat.testBit_bit_succ, IH] · rw [PosNum.cast_bit0, ← two_mul, ← congr_fun Nat.bit_false, Nat.testBit_bit_succ, IH] end Num namespace Int /-- Cast a `SNum` to the corresponding integer. -/ def ofSnum : SNum → ℤ := SNum.rec' (fun a => cond a (-1) 0) fun a _p IH => cond a (2 * IH + 1) (2 * IH) instance snumCoe : Coe SNum ℤ := ⟨ofSnum⟩ end Int instance SNum.lt : LT SNum := ⟨fun a b => (a : ℤ) < b⟩ instance SNum.le : LE SNum := ⟨fun a b => (a : ℤ) ≤ b⟩		Mathlib/Data/Num/Lemmas.lean	920	924
/- 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.Option.NAry import Mathlib.Data.Seq.Computation import Mathlib.Tactic.ApplyFun import Mathlib.Data.List.Basic /-! # Possibly infinite lists This file provides a `Seq α` type representing possibly infinite lists (referred here as sequences). It is encoded as an infinite stream of options such that if `f n = none`, then `f m = none` for all `m ≥ n`. -/ namespace Stream' universe u v w /- coinductive seq (α : Type u) : Type u \| nil : seq α \| cons : α → seq α → seq α -/ /-- A stream `s : Option α` is a sequence if `s.get n = none` implies `s.get (n + 1) = none`. -/ def IsSeq {α : Type u} (s : Stream' (Option α)) : Prop := ∀ {n : ℕ}, s n = none → s (n + 1) = none /-- `Seq α` is the type of possibly infinite lists (referred here as sequences). It is encoded as an infinite stream of options such that if `f n = none`, then `f m = none` for all `m ≥ n`. -/ def Seq (α : Type u) : Type u := { f : Stream' (Option α) // f.IsSeq } /-- `Seq1 α` is the type of nonempty sequences. -/ def Seq1 (α) := α × Seq α namespace Seq variable {α : Type u} {β : Type v} {γ : Type w} /-- The empty sequence -/ def nil : Seq α := ⟨Stream'.const none, fun {_} _ => rfl⟩ instance : Inhabited (Seq α) := ⟨nil⟩ /-- Prepend an element to a sequence -/ def cons (a : α) (s : Seq α) : Seq α := ⟨some a::s.1, by rintro (n \| _) h · contradiction · exact s.2 h⟩ @[simp] theorem val_cons (s : Seq α) (x : α) : (cons x s).val = some x::s.val := rfl /-- Get the nth element of a sequence (if it exists) -/ def get? : Seq α → ℕ → Option α := Subtype.val @[simp] theorem val_eq_get (s : Seq α) (n : ℕ) : s.val n = s.get? n := by rfl @[simp] theorem get?_mk (f hf) : @get? α ⟨f, hf⟩ = f := rfl @[simp] theorem get?_nil (n : ℕ) : (@nil α).get? n = none := rfl @[simp] theorem get?_cons_zero (a : α) (s : Seq α) : (cons a s).get? 0 = some a := rfl @[simp] theorem get?_cons_succ (a : α) (s : Seq α) (n : ℕ) : (cons a s).get? (n + 1) = s.get? n := rfl @[ext] protected theorem ext {s t : Seq α} (h : ∀ n : ℕ, s.get? n = t.get? n) : s = t := Subtype.eq <\| funext h theorem cons_injective2 : Function.Injective2 (cons : α → Seq α → Seq α) := fun x y s t h => ⟨by rw [← Option.some_inj, ← get?_cons_zero, h, get?_cons_zero], Seq.ext fun n => by simp_rw [← get?_cons_succ x s n, h, get?_cons_succ]⟩ theorem cons_left_injective (s : Seq α) : Function.Injective fun x => cons x s := cons_injective2.left _ theorem cons_right_injective (x : α) : Function.Injective (cons x) := cons_injective2.right _ /-- A sequence has terminated at position `n` if the value at position `n` equals `none`. -/ def TerminatedAt (s : Seq α) (n : ℕ) : Prop := s.get? n = none /-- It is decidable whether a sequence terminates at a given position. -/ instance terminatedAtDecidable (s : Seq α) (n : ℕ) : Decidable (s.TerminatedAt n) := decidable_of_iff' (s.get? n).isNone <\| by unfold TerminatedAt; cases s.get? n <;> simp /-- A sequence terminates if there is some position `n` at which it has terminated. -/ def Terminates (s : Seq α) : Prop := ∃ n : ℕ, s.TerminatedAt n theorem not_terminates_iff {s : Seq α} : ¬s.Terminates ↔ ∀ n, (s.get? n).isSome := by simp only [Terminates, TerminatedAt, ← Ne.eq_def, Option.ne_none_iff_isSome, not_exists, iff_self] /-- Functorial action of the functor `Option (α × _)` -/ @[simp] def omap (f : β → γ) : Option (α × β) → Option (α × γ) \| none => none \| some (a, b) => some (a, f b) /-- Get the first element of a sequence -/ def head (s : Seq α) : Option α := get? s 0 /-- Get the tail of a sequence (or `nil` if the sequence is `nil`) -/ def tail (s : Seq α) : Seq α := ⟨s.1.tail, fun n' => by obtain ⟨f, al⟩ := s exact al n'⟩ /-- member definition for `Seq` -/ protected def Mem (s : Seq α) (a : α) := some a ∈ s.1 instance : Membership α (Seq α) := ⟨Seq.Mem⟩ theorem le_stable (s : Seq α) {m n} (h : m ≤ n) : s.get? m = none → s.get? n = none := by obtain ⟨f, al⟩ := s induction' h with n _ IH exacts [id, fun h2 => al (IH h2)] /-- If a sequence terminated at position `n`, it also terminated at `m ≥ n`. -/ theorem terminated_stable : ∀ (s : Seq α) {m n : ℕ}, m ≤ n → s.TerminatedAt m → s.TerminatedAt n := le_stable /-- If `s.get? n = some aₙ` for some value `aₙ`, then there is also some value `aₘ` such that `s.get? = some aₘ` for `m ≤ n`. -/ theorem ge_stable (s : Seq α) {aₙ : α} {n m : ℕ} (m_le_n : m ≤ n) (s_nth_eq_some : s.get? n = some aₙ) : ∃ aₘ : α, s.get? m = some aₘ := have : s.get? n ≠ none := by simp [s_nth_eq_some] have : s.get? m ≠ none := mt (s.le_stable m_le_n) this Option.ne_none_iff_exists'.mp this theorem not_mem_nil (a : α) : a ∉ @nil α := fun ⟨_, (h : some a = none)⟩ => by injection h theorem mem_cons (a : α) : ∀ s : Seq α, a ∈ cons a s \| ⟨_, _⟩ => Stream'.mem_cons (some a) _ theorem mem_cons_of_mem (y : α) {a : α} : ∀ {s : Seq α}, a ∈ s → a ∈ cons y s \| ⟨_, _⟩ => Stream'.mem_cons_of_mem (some y) theorem eq_or_mem_of_mem_cons {a b : α} : ∀ {s : Seq α}, a ∈ cons b s → a = b ∨ a ∈ s \| ⟨_, _⟩, h => (Stream'.eq_or_mem_of_mem_cons h).imp_left fun h => by injection h @[simp] theorem mem_cons_iff {a b : α} {s : Seq α} : a ∈ cons b s ↔ a = b ∨ a ∈ s := ⟨eq_or_mem_of_mem_cons, by rintro (rfl \| m) <;> [apply mem_cons; exact mem_cons_of_mem _ m]⟩ @[simp] theorem get?_mem {s : Seq α} {n : ℕ} {x : α} (h : s.get? n = .some x) : x ∈ s := ⟨n, h.symm⟩ /-- Destructor for a sequence, resulting in either `none` (for `nil`) or `some (a, s)` (for `cons a s`). -/ def destruct (s : Seq α) : Option (Seq1 α) := (fun a' => (a', s.tail)) <$> get? s 0 theorem destruct_eq_none {s : Seq α} : destruct s = none → s = nil := by dsimp [destruct] induction' f0 : get? s 0 <;> intro h · apply Subtype.eq funext n induction' n with n IH exacts [f0, s.2 IH] · contradiction theorem destruct_eq_cons {s : Seq α} {a s'} : destruct s = some (a, s') → s = cons a s' := by dsimp [destruct] induction' f0 : get? s 0 with a' <;> intro h · contradiction · obtain ⟨f, al⟩ := s injections _ h1 h2 rw [← h2] apply Subtype.eq dsimp [tail, cons] rw [h1] at f0 rw [← f0] exact (Stream'.eta f).symm @[simp] theorem destruct_nil : destruct (nil : Seq α) = none := rfl @[simp] theorem destruct_cons (a : α) : ∀ s, destruct (cons a s) = some (a, s) \| ⟨f, al⟩ => by unfold cons destruct Functor.map apply congr_arg fun s => some (a, s) apply Subtype.eq; dsimp [tail] -- Porting note: needed universe annotation to avoid universe issues theorem head_eq_destruct (s : Seq α) : head.{u} s = Prod.fst.{u} <$> destruct.{u} s := by unfold destruct head; cases get? s 0 <;> rfl @[simp] theorem head_nil : head (nil : Seq α) = none := rfl @[simp] theorem head_cons (a : α) (s) : head (cons a s) = some a := by rw [head_eq_destruct, destruct_cons, Option.map_eq_map, Option.map_some'] @[simp] theorem tail_nil : tail (nil : Seq α) = nil := rfl @[simp] theorem tail_cons (a : α) (s) : tail (cons a s) = s := by obtain ⟨f, al⟩ := s apply Subtype.eq dsimp [tail, cons] @[simp] theorem get?_tail (s : Seq α) (n) : get? (tail s) n = get? s (n + 1) := rfl /-- Recursion principle for sequences, compare with `List.recOn`. -/ @[cases_eliminator] def recOn {motive : Seq α → Sort v} (s : Seq α) (nil : motive nil) (cons : ∀ x s, motive (cons x s)) : motive s := by rcases H : destruct s with - \| v · rw [destruct_eq_none H] apply nil · obtain ⟨a, s'⟩ := v rw [destruct_eq_cons H] apply cons @[simp] theorem cons_ne_nil {x : α} {s : Seq α} : (cons x s) ≠ .nil := by intro h apply_fun head at h simp at h @[simp] theorem nil_ne_cons {x : α} {s : Seq α} : .nil ≠ (cons x s) := cons_ne_nil.symm theorem cons_eq_cons {x x' : α} {s s' : Seq α} : (cons x s = cons x' s') ↔ (x = x' ∧ s = s') := by constructor · intro h constructor · apply_fun head at h simpa using h · apply_fun tail at h simpa using h · intro ⟨_, _⟩ congr theorem head_eq_some {s : Seq α} {x : α} (h : s.head = some x) : s = cons x s.tail := by cases s <;> simp at h simpa [cons_eq_cons] theorem head_eq_none {s : Seq α} (h : s.head = none) : s = nil := by cases s · rfl · simp at h @[simp] theorem head_eq_none_iff {s : Seq α} : s.head = none ↔ s = nil := by constructor · apply head_eq_none · intro h simp [h] theorem mem_rec_on {C : Seq α → Prop} {a s} (M : a ∈ s) (h1 : ∀ b s', a = b ∨ C s' → C (cons b s')) : C s := by obtain ⟨k, e⟩ := M; unfold Stream'.get at e induction' k with k IH generalizing s · have TH : s = cons a (tail s) := by apply destruct_eq_cons unfold destruct get? Functor.map rw [← e] rfl rw [TH] apply h1 _ _ (Or.inl rfl) cases s with \| nil => injection e \| cons b s' => have h_eq : (cons b s').val (Nat.succ k) = s'.val k := by cases s' using Subtype.recOn; rfl rw [h_eq] at e apply h1 _ _ (Or.inr (IH e)) /-- Corecursor over pairs of `Option` values -/ def Corec.f (f : β → Option (α × β)) : Option β → Option α × Option β \| none => (none, none) \| some b => match f b with \| none => (none, none) \| some (a, b') => (some a, some b') /-- Corecursor for `Seq α` as a coinductive type. Iterates `f` to produce new elements of the sequence until `none` is obtained. -/ def corec (f : β → Option (α × β)) (b : β) : Seq α := by refine ⟨Stream'.corec' (Corec.f f) (some b), fun {n} h => ?_⟩ rw [Stream'.corec'_eq] change Stream'.corec' (Corec.f f) (Corec.f f (some b)).2 n = none revert h; generalize some b = o; revert o induction' n with n IH <;> intro o · change (Corec.f f o).1 = none → (Corec.f f (Corec.f f o).2).1 = none rcases o with - \| b <;> intro h · rfl dsimp [Corec.f] at h dsimp [Corec.f] revert h; rcases h₁ : f b with - \| s <;> intro h · rfl · obtain ⟨a, b'⟩ := s contradiction · rw [Stream'.corec'_eq (Corec.f f) (Corec.f f o).2, Stream'.corec'_eq (Corec.f f) o] exact IH (Corec.f f o).2 @[simp] theorem corec_eq (f : β → Option (α × β)) (b : β) : destruct (corec f b) = omap (corec f) (f b) := by dsimp [corec, destruct, get] rw [show Stream'.corec' (Corec.f f) (some b) 0 = (Corec.f f (some b)).1 from rfl] dsimp [Corec.f] induction' h : f b with s; · rfl obtain ⟨a, b'⟩ := s; dsimp [Corec.f] apply congr_arg fun b' => some (a, b') apply Subtype.eq dsimp [corec, tail] rw [Stream'.corec'_eq, Stream'.tail_cons] dsimp [Corec.f]; rw [h] theorem corec_nil (f : β → Option (α × β)) (b : β) (h : f b = .none) : corec f b = nil := by apply destruct_eq_none simp [h] theorem corec_cons {f : β → Option (α × β)} {b : β} {x : α} {s : β} (h : f b = .some (x, s)) : corec f b = cons x (corec f s) := by apply destruct_eq_cons simp [h] section Bisim variable (R : Seq α → Seq α → Prop) local infixl:50 " ~ " => R /-- Bisimilarity relation over `Option` of `Seq1 α` -/ def BisimO : Option (Seq1 α) → Option (Seq1 α) → Prop \| none, none => True \| some (a, s), some (a', s') => a = a' ∧ R s s' \| _, _ => False attribute [simp] BisimO attribute [nolint simpNF] BisimO.eq_3 /-- a relation is bisimilar if it meets the `BisimO` test -/ def IsBisimulation := ∀ ⦃s₁ s₂⦄, s₁ ~ s₂ → BisimO R (destruct s₁) (destruct s₂) -- If two streams are bisimilar, then they are equal theorem eq_of_bisim (bisim : IsBisimulation R) {s₁ s₂} (r : s₁ ~ s₂) : s₁ = s₂ := by apply Subtype.eq apply Stream'.eq_of_bisim fun x y => ∃ s s' : Seq α, s.1 = x ∧ s'.1 = y ∧ R s s' · dsimp [Stream'.IsBisimulation] intro t₁ t₂ e exact match t₁, t₂, e with \| _, _, ⟨s, s', rfl, rfl, r⟩ => by suffices head s = head s' ∧ R (tail s) (tail s') from And.imp id (fun r => ⟨tail s, tail s', by cases s using Subtype.recOn; rfl, by cases s' using Subtype.recOn; rfl, r⟩) this have := bisim r; revert r this cases s <;> cases s' · intro r _ constructor · rfl · assumption · intro _ this rw [destruct_nil, destruct_cons] at this exact False.elim this · intro _ this rw [destruct_nil, destruct_cons] at this exact False.elim this · intro _ this rw [destruct_cons, destruct_cons] at this rw [head_cons, head_cons, tail_cons, tail_cons] obtain ⟨h1, h2⟩ := this constructor · rw [h1] · exact h2 · exact ⟨s₁, s₂, rfl, rfl, r⟩ end Bisim theorem coinduction : ∀ {s₁ s₂ : Seq α}, head s₁ = head s₂ → (∀ (β : Type u) (fr : Seq α → β), fr s₁ = fr s₂ → fr (tail s₁) = fr (tail s₂)) → s₁ = s₂ \| _, _, hh, ht => Subtype.eq (Stream'.coinduction hh fun β fr => ht β fun s => fr s.1) theorem coinduction2 (s) (f g : Seq α → Seq β) (H : ∀ s, BisimO (fun s1 s2 : Seq β => ∃ s : Seq α, s1 = f s ∧ s2 = g s) (destruct (f s)) (destruct (g s))) : f s = g s := by refine eq_of_bisim (fun s1 s2 => ∃ s, s1 = f s ∧ s2 = g s) ?_ ⟨s, rfl, rfl⟩ intro s1 s2 h; rcases h with ⟨s, h1, h2⟩ rw [h1, h2]; apply H /-- Embed a list as a sequence -/ @[coe] def ofList (l : List α) : Seq α := ⟨(l[·]?), fun {n} h => by rw [List.getElem?_eq_none_iff] at h ⊢ exact h.trans (Nat.le_succ n)⟩ instance coeList : Coe (List α) (Seq α) := ⟨ofList⟩ @[simp] theorem ofList_nil : ofList [] = (nil : Seq α) := rfl @[simp] theorem ofList_get? (l : List α) (n : ℕ) : (ofList l).get? n = l[n]? := rfl @[deprecated (since := "2025-02-21")] alias ofList_get := ofList_get? @[simp] theorem ofList_cons (a : α) (l : List α) : ofList (a::l) = cons a (ofList l) := by ext1 (_ \| n) <;> simp theorem ofList_injective : Function.Injective (ofList : List α → _) := fun _ _ h => List.ext_getElem? fun _ => congr_fun (Subtype.ext_iff.1 h) _ /-- Embed an infinite stream as a sequence -/ @[coe] def ofStream (s : Stream' α) : Seq α := ⟨s.map some, fun {n} h => by contradiction⟩ instance coeStream : Coe (Stream' α) (Seq α) := ⟨ofStream⟩ section MLList /-- Embed a `MLList α` as a sequence. Note that even though this is non-meta, it will produce infinite sequences if used with cyclic `MLList`s created by meta constructions. -/ def ofMLList : MLList Id α → Seq α := corec fun l => match l.uncons with \| .none => none \| .some (a, l') => some (a, l') instance coeMLList : Coe (MLList Id α) (Seq α) := ⟨ofMLList⟩ /-- Translate a sequence into a `MLList`. -/ unsafe def toMLList : Seq α → MLList Id α \| s => match destruct s with \| none => .nil \| some (a, s') => .cons a (toMLList s') end MLList /-- Translate a sequence to a list. This function will run forever if run on an infinite sequence. -/ unsafe def forceToList (s : Seq α) : List α := (toMLList s).force /-- The sequence of natural numbers some 0, some 1, ... -/ def nats : Seq ℕ := Stream'.nats @[simp] theorem nats_get? (n : ℕ) : nats.get? n = some n := rfl /-- Append two sequences. If `s₁` is infinite, then `s₁ ++ s₂ = s₁`, otherwise it puts `s₂` at the location of the `nil` in `s₁`. -/ def append (s₁ s₂ : Seq α) : Seq α := @corec α (Seq α × Seq α) (fun ⟨s₁, s₂⟩ => match destruct s₁ with \| none => omap (fun s₂ => (nil, s₂)) (destruct s₂) \| some (a, s₁') => some (a, s₁', s₂)) (s₁, s₂) /-- Map a function over a sequence. -/ def map (f : α → β) : Seq α → Seq β \| ⟨s, al⟩ => ⟨s.map (Option.map f), fun {n} => by dsimp [Stream'.map, Stream'.get] induction' e : s n with e <;> intro · rw [al e] assumption · contradiction⟩ /-- Flatten a sequence of sequences. (It is required that the sequences be nonempty to ensure productivity; in the case of an infinite sequence of `nil`, the first element is never generated.) -/ def join : Seq (Seq1 α) → Seq α := corec fun S => match destruct S with \| none => none \| some ((a, s), S') => some (a, match destruct s with \| none => S' \| some s' => cons s' S') /-- Remove the first `n` elements from the sequence. -/ def drop (s : Seq α) : ℕ → Seq α \| 0 => s \| n + 1 => tail (drop s n) /-- Take the first `n` elements of the sequence (producing a list) -/ def take : ℕ → Seq α → List α \| 0, _ => [] \| n + 1, s => match destruct s with \| none => [] \| some (x, r) => List.cons x (take n r) /-- Split a sequence at `n`, producing a finite initial segment and an infinite tail. -/ def splitAt : ℕ → Seq α → List α × Seq α \| 0, s => ([], s) \| n + 1, s => match destruct s with \| none => ([], nil) \| some (x, s') => let (l, r) := splitAt n s' (List.cons x l, r) /-- Folds a sequence using `f`, producing a sequence of intermediate values, i.e. `[init, f init s.head, f (f init s.head) s.tail.head, ...]`. -/ def fold (s : Seq α) (init : β) (f : β → α → β) : Seq β := let f : β × Seq α → Option (β × (β × Seq α)) := fun (acc, x) => match destruct x with \| none => .none \| some (x, s) => .some (f acc x, f acc x, s) cons init <\| corec f (init, s) section ZipWith /-- Combine two sequences with a function -/ def zipWith (f : α → β → γ) (s₁ : Seq α) (s₂ : Seq β) : Seq γ := ⟨fun n => Option.map₂ f (s₁.get? n) (s₂.get? n), fun {_} hn => Option.map₂_eq_none_iff.2 <\| (Option.map₂_eq_none_iff.1 hn).imp s₁.2 s₂.2⟩ @[simp] theorem get?_zipWith (f : α → β → γ) (s s' n) : (zipWith f s s').get? n = Option.map₂ f (s.get? n) (s'.get? n) := rfl end ZipWith /-- Pair two sequences into a sequence of pairs -/ def zip : Seq α → Seq β → Seq (α × β) := zipWith Prod.mk @[simp] theorem get?_zip (s : Seq α) (t : Seq β) (n : ℕ) : get? (zip s t) n = Option.map₂ Prod.mk (get? s n) (get? t n) := get?_zipWith _ _ _ _ /-- Separate a sequence of pairs into two sequences -/ def unzip (s : Seq (α × β)) : Seq α × Seq β := (map Prod.fst s, map Prod.snd s) /-- Enumerate a sequence by tagging each element with its index. -/ def enum (s : Seq α) : Seq (ℕ × α) := Seq.zip nats s @[simp] theorem get?_enum (s : Seq α) (n : ℕ) : get? (enum s) n = Option.map (Prod.mk n) (get? s n) := get?_zip _ _ _ @[simp] theorem enum_nil : enum (nil : Seq α) = nil := rfl /-- The length of a terminating sequence. -/ def length (s : Seq α) (h : s.Terminates) : ℕ := Nat.find h /-- Convert a sequence which is known to terminate into a list -/ def toList (s : Seq α) (h : s.Terminates) : List α := take (length s h) s /-- Convert a sequence which is known not to terminate into a stream -/ def toStream (s : Seq α) (h : ¬s.Terminates) : Stream' α := fun n => Option.get _ <\| not_terminates_iff.1 h n /-- Convert a sequence into either a list or a stream depending on whether it is finite or infinite. (Without decidability of the infiniteness predicate, this is not constructively possible.) -/ def toListOrStream (s : Seq α) [Decidable s.Terminates] : List α ⊕ Stream' α := if h : s.Terminates then Sum.inl (toList s h) else Sum.inr (toStream s h) @[simp] theorem nil_append (s : Seq α) : append nil s = s := by apply coinduction2; intro s dsimp [append]; rw [corec_eq] dsimp [append] cases s · trivial · rw [destruct_cons] dsimp exact ⟨rfl, _, rfl, rfl⟩ @[simp] theorem take_nil {n : ℕ} : (nil (α := α)).take n = List.nil := by cases n <;> rfl @[simp] theorem take_zero {s : Seq α} : s.take 0 = [] := by cases s <;> rfl @[simp] theorem take_succ_cons {n : ℕ} {x : α} {s : Seq α} : (cons x s).take (n + 1) = x :: s.take n := by rfl @[simp] theorem getElem?_take : ∀ (n k : ℕ) (s : Seq α), (s.take k)[n]? = if n < k then s.get? n else none \| n, 0, s => by simp [take] \| n, k+1, s => by rw [take] cases h : destruct s with \| none => simp [destruct_eq_none h] \| some a => match a with \| (x, r) => rw [destruct_eq_cons h] match n with \| 0 => simp \| n+1 => simp [List.getElem?_cons_succ, Nat.add_lt_add_iff_right, getElem?_take] theorem get?_mem_take {s : Seq α} {m n : ℕ} (h_mn : m < n) {x : α} (h_get : s.get? m = .some x) : x ∈ s.take n := by induction m generalizing n s with \| zero => obtain ⟨l, hl⟩ := Nat.exists_add_one_eq.mpr h_mn rw [← hl, take, head_eq_some h_get] simp \| succ k ih => obtain ⟨l, hl⟩ := Nat.exists_eq_add_of_lt h_mn subst hl have : ∃ y, s.get? 0 = .some y := by apply ge_stable _ _ h_get simp obtain ⟨y, hy⟩ := this rw [take, head_eq_some hy] simp right apply ih (by omega) rwa [get?_tail] theorem terminatedAt_ofList (l : List α) : (ofList l).TerminatedAt l.length := by simp [ofList, TerminatedAt] theorem terminates_ofList (l : List α) : (ofList l).Terminates := ⟨_, terminatedAt_ofList l⟩ @[simp] theorem terminatedAt_nil {n : ℕ} : TerminatedAt (nil : Seq α) n := rfl @[simp] theorem cons_not_terminatedAt_zero {x : α} {s : Seq α} : ¬(cons x s).TerminatedAt 0 := by simp [TerminatedAt] @[simp] theorem cons_terminatedAt_succ_iff {x : α} {s : Seq α} {n : ℕ} : (cons x s).TerminatedAt (n + 1) ↔ s.TerminatedAt n := by simp [TerminatedAt] @[simp] theorem terminates_nil : Terminates (nil : Seq α) := ⟨0, rfl⟩ @[simp] theorem terminates_cons_iff {x : α} {s : Seq α} : (cons x s).Terminates ↔ s.Terminates := by constructor <;> intro ⟨n, h⟩ · exact ⟨n, cons_terminatedAt_succ_iff.mp (terminated_stable _ (Nat.le_succ _) h)⟩ · exact ⟨n + 1, cons_terminatedAt_succ_iff.mpr h⟩ @[simp] theorem length_nil : length (nil : Seq α) terminates_nil = 0 := rfl @[simp] theorem get?_zero_eq_none {s : Seq α} : s.get? 0 = none ↔ s = nil := by refine ⟨fun h => ?_, fun h => h ▸ rfl⟩ ext1 n exact le_stable s (Nat.zero_le _) h @[simp] theorem length_eq_zero {s : Seq α} {h : s.Terminates} : s.length h = 0 ↔ s = nil := by simp [length, TerminatedAt] theorem terminatedAt_zero_iff {s : Seq α} : s.TerminatedAt 0 ↔ s = nil := by refine ⟨?_, ?_⟩ · intro h ext n rw [le_stable _ (Nat.zero_le _) h] simp · rintro rfl simp [TerminatedAt] /-- The statement of `length_le_iff'` does not assume that the sequence terminates. For a simpler statement of the theorem where the sequence is known to terminate see `length_le_iff` -/ theorem length_le_iff' {s : Seq α} {n : ℕ} : (∃ h, s.length h ≤ n) ↔ s.TerminatedAt n := by simp only [length, Nat.find_le_iff, TerminatedAt, Terminates, exists_prop] refine ⟨?_, ?_⟩ · rintro ⟨_, k, hkn, hk⟩ exact le_stable s hkn hk · intro hn exact ⟨⟨n, hn⟩, ⟨n, le_rfl, hn⟩⟩ /-- The statement of `length_le_iff` assumes that the sequence terminates. For a statement of the where the sequence is not known to terminate see `length_le_iff'` -/ theorem length_le_iff {s : Seq α} {n : ℕ} {h : s.Terminates} : s.length h ≤ n ↔ s.TerminatedAt n := by rw [← length_le_iff']; simp [h] /-- The statement of `lt_length_iff'` does not assume that the sequence terminates. For a simpler statement of the theorem where the sequence is known to terminate see `lt_length_iff` -/ theorem lt_length_iff' {s : Seq α} {n : ℕ} : (∀ h : s.Terminates, n < s.length h) ↔ ∃ a, a ∈ s.get? n := by simp only [Terminates, TerminatedAt, length, Nat.lt_find_iff, forall_exists_index, Option.mem_def, ← Option.ne_none_iff_exists', ne_eq] refine ⟨?_, ?_⟩ · intro h hn exact h n hn n le_rfl hn · intro hn _ _ k hkn hk exact hn <\| le_stable s hkn hk /-- The statement of `length_le_iff` assumes that the sequence terminates. For a statement of the where the sequence is not known to terminate see `length_le_iff'` -/ theorem lt_length_iff {s : Seq α} {n : ℕ} {h : s.Terminates} : n < s.length h ↔ ∃ a, a ∈ s.get? n := by rw [← lt_length_iff']; simp [h] theorem length_take_le {s : Seq α} {n : ℕ} : (s.take n).length ≤ n := by induction n generalizing s with \| zero => simp \| succ m ih => rw [take] cases s.destruct with \| none => simp \| some v => obtain ⟨x, r⟩ := v simpa using ih theorem length_take_of_le_length {s : Seq α} {n : ℕ} (hle : ∀ h : s.Terminates, n ≤ s.length h) : (s.take n).length = n := by induction n generalizing s with \| zero => simp [take] \| succ n ih => rw [take, destruct] let ⟨a, ha⟩ := lt_length_iff'.1 (fun ht => lt_of_lt_of_le (Nat.succ_pos _) (hle ht)) simp [Option.mem_def.1 ha] rw [ih] intro h simp only [length, tail, Nat.le_find_iff, TerminatedAt, get?_mk, Stream'.tail] intro m hmn hs have := lt_length_iff'.1 (fun ht => (Nat.lt_of_succ_le (hle ht))) rw [le_stable s (Nat.succ_le_of_lt hmn) hs] at this simp at this @[simp] theorem length_toList (s : Seq α) (h : s.Terminates) : (toList s h).length = length s h := by rw [toList, length_take_of_le_length] intro _ exact le_rfl @[simp] theorem getElem?_toList (s : Seq α) (h : s.Terminates) (n : ℕ) : (toList s h)[n]? = s.get? n := by ext k simp only [ofList, toList, get?_mk, Option.mem_def, getElem?_take, Nat.lt_find_iff, length, Option.ite_none_right_eq_some, and_iff_right_iff_imp, TerminatedAt] intro h m hmn let ⟨a, ha⟩ := ge_stable s hmn h simp [ha] @[simp] theorem ofList_toList (s : Seq α) (h : s.Terminates) : ofList (toList s h) = s := by ext n; simp [ofList] @[simp] theorem toList_ofList (l : List α) : toList (ofList l) (terminates_ofList l) = l := ofList_injective (by simp) @[simp] theorem toList_nil : toList (nil : Seq α) ⟨0, terminatedAt_zero_iff.2 rfl⟩ = [] := by ext; simp [nil, toList, const] theorem getLast?_toList (s : Seq α) (h : s.Terminates) : (toList s h).getLast? = s.get? (s.length h - 1) := by rw [List.getLast?_eq_getElem?, getElem?_toList, length_toList] @[simp] theorem cons_append (a : α) (s t) : append (cons a s) t = cons a (append s t) := destruct_eq_cons <\| by dsimp [append]; rw [corec_eq] dsimp [append]; rw [destruct_cons] @[simp] theorem append_nil (s : Seq α) : append s nil = s := by apply coinduction2 s; intro s cases s · trivial · rw [cons_append, destruct_cons, destruct_cons] dsimp exact ⟨rfl, _, rfl, rfl⟩ @[simp] theorem append_assoc (s t u : Seq α) : append (append s t) u = append s (append t u) := by apply eq_of_bisim fun s1 s2 => ∃ s t u, s1 = append (append s t) u ∧ s2 = append s (append t u) · intro s1 s2 h exact match s1, s2, h with \| _, _, ⟨s, t, u, rfl, rfl⟩ => by cases s <;> simp case nil => cases t <;> simp case nil => cases u <;> simp case cons _ u => refine ⟨nil, nil, u, ?_, ?_⟩ <;> simp case cons _ t => refine ⟨nil, t, u, ?_, ?_⟩ <;> simp case cons _ s => exact ⟨s, t, u, rfl, rfl⟩ · exact ⟨s, t, u, rfl, rfl⟩ @[simp] theorem map_nil (f : α → β) : map f nil = nil := rfl @[simp] theorem map_cons (f : α → β) (a) : ∀ s, map f (cons a s) = cons (f a) (map f s) \| ⟨s, al⟩ => by apply Subtype.eq; dsimp [cons, map]; rw [Stream'.map_cons]; rfl @[simp] theorem map_id : ∀ s : Seq α, map id s = s \| ⟨s, al⟩ => by apply Subtype.eq; dsimp [map] rw [Option.map_id, Stream'.map_id] @[simp] theorem map_tail (f : α → β) : ∀ s, map f (tail s) = tail (map f s) \| ⟨s, al⟩ => by apply Subtype.eq; dsimp [tail, map] theorem map_comp (f : α → β) (g : β → γ) : ∀ s : Seq α, map (g ∘ f) s = map g (map f s) \| ⟨s, al⟩ => by apply Subtype.eq; dsimp [map] apply congr_arg fun f : _ → Option γ => Stream'.map f s ext ⟨⟩ <;> rfl @[simp] theorem map_append (f : α → β) (s t) : map f (append s t) = append (map f s) (map f t) := by apply eq_of_bisim (fun s1 s2 => ∃ s t, s1 = map f (append s t) ∧ s2 = append (map f s) (map f t)) _ ⟨s, t, rfl, rfl⟩ intro s1 s2 h exact match s1, s2, h with \| _, _, ⟨s, t, rfl, rfl⟩ => by cases s <;> simp case nil => cases t <;> simp case cons _ t => refine ⟨nil, t, ?_, ?_⟩ <;> simp case cons _ s => exact ⟨s, t, rfl, rfl⟩ @[simp] theorem map_get? (f : α → β) : ∀ s n, get? (map f s) n = (get? s n).map f \| ⟨_, _⟩, _ => rfl @[simp] theorem terminatedAt_map_iff {f : α → β} {s : Seq α} {n : ℕ} : (map f s).TerminatedAt n ↔ s.TerminatedAt n := by simp [TerminatedAt] @[simp] theorem terminates_map_iff {f : α → β} {s : Seq α} : (map f s).Terminates ↔ s.Terminates := by simp [Terminates] @[simp] theorem length_map {s : Seq α} {f : α → β} (h : (s.map f).Terminates) : (s.map f).length h = s.length (terminates_map_iff.1 h) := by rw [length] congr ext simp instance : Functor Seq where map := @map instance : LawfulFunctor Seq where id_map := @map_id comp_map := @map_comp map_const := rfl @[simp] theorem join_nil : join nil = (nil : Seq α) := destruct_eq_none rfl -- Not a simp lemmas as `join_cons` is more general theorem join_cons_nil (a : α) (S) : join (cons (a, nil) S) = cons a (join S) := destruct_eq_cons <\| by simp [join] -- Not a simp lemmas as `join_cons` is more general theorem join_cons_cons (a b : α) (s S) : join (cons (a, cons b s) S) = cons a (join (cons (b, s) S)) := destruct_eq_cons <\| by simp [join] @[simp] theorem join_cons (a : α) (s S) : join (cons (a, s) S) = cons a (append s (join S)) := by apply eq_of_bisim (fun s1 s2 => s1 = s2 ∨ ∃ a s S, s1 = join (cons (a, s) S) ∧ s2 = cons a (append s (join S))) _ (Or.inr ⟨a, s, S, rfl, rfl⟩) intro s1 s2 h exact match s1, s2, h with \| s, _, Or.inl <\| Eq.refl s => by cases s; · trivial · rw [destruct_cons] exact ⟨rfl, Or.inl rfl⟩ \| _, _, Or.inr ⟨a, s, S, rfl, rfl⟩ => by cases s · simp [join_cons_cons, join_cons_nil] · simpa [join_cons_cons, join_cons_nil] using Or.inr ⟨_, _, S, rfl, rfl⟩ @[simp] theorem join_append (S T : Seq (Seq1 α)) : join (append S T) = append (join S) (join T) := by apply eq_of_bisim fun s1 s2 => ∃ s S T, s1 = append s (join (append S T)) ∧ s2 = append s (append (join S) (join T)) · intro s1 s2 h exact match s1, s2, h with \| _, _, ⟨s, S, T, rfl, rfl⟩ => by cases s <;> simp case nil => cases S <;> simp	case nil => cases T with \| nil => simp \| cons s T => obtain ⟨a, s⟩ := s; simp only [join_cons, destruct_cons, true_and] refine ⟨s, nil, T, ?_, ?_⟩ <;> simp case cons s S => obtain ⟨a, s⟩ := s simpa using ⟨s, S, T, rfl, rfl⟩ case cons _ s => exact ⟨s, S, T, rfl, rfl⟩ · refine ⟨nil, S, T, ?_, ?_⟩ <;> simp @[simp] theorem ofStream_cons (a : α) (s) : ofStream (a::s) = cons a (ofStream s) := by apply Subtype.eq; simp only [ofStream, cons]; rw [Stream'.map_cons] @[simp]	Mathlib/Data/Seq/Seq.lean	980	996
/- Copyright (c) 2021 Junyan Xu. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Junyan Xu -/ import Mathlib.AlgebraicGeometry.Restrict import Mathlib.CategoryTheory.Adjunction.Limits import Mathlib.CategoryTheory.Adjunction.Reflective /-! # Adjunction between `Γ` and `Spec` We define the adjunction `ΓSpec.adjunction : Γ ⊣ Spec` by defining the unit (`toΓSpec`, in multiple steps in this file) and counit (done in `Spec.lean`) and checking that they satisfy the left and right triangle identities. The constructions and proofs make use of maps and lemmas defined and proved in structure_sheaf.lean extensively. Notice that since the adjunction is between contravariant functors, you get to choose one of the two categories to have arrows reversed, and it is equally valid to present the adjunction as `Spec ⊣ Γ` (`Spec.to_LocallyRingedSpace.right_op ⊣ Γ`), in which case the unit and the counit would switch to each other. ## Main definition * `AlgebraicGeometry.identityToΓSpec` : The natural transformation `𝟭 _ ⟶ Γ ⋙ Spec`. * `AlgebraicGeometry.ΓSpec.locallyRingedSpaceAdjunction` : The adjunction `Γ ⊣ Spec` from `CommRingᵒᵖ` to `LocallyRingedSpace`. * `AlgebraicGeometry.ΓSpec.adjunction` : The adjunction `Γ ⊣ Spec` from `CommRingᵒᵖ` to `Scheme`. -/ -- Explicit universe annotations were used in this file to improve performance https://github.com/leanprover-community/mathlib4/issues/12737 noncomputable section universe u open PrimeSpectrum namespace AlgebraicGeometry open Opposite open CategoryTheory open StructureSheaf open Spec (structureSheaf) open TopologicalSpace open AlgebraicGeometry.LocallyRingedSpace open TopCat.Presheaf open TopCat.Presheaf.SheafCondition namespace LocallyRingedSpace variable (X : LocallyRingedSpace.{u}) /-- The canonical map from the underlying set to the prime spectrum of `Γ(X)`. -/ def toΓSpecFun : X → PrimeSpectrum (Γ.obj (op X)) := fun x => comap (X.presheaf.Γgerm x).hom (IsLocalRing.closedPoint (X.presheaf.stalk x)) theorem not_mem_prime_iff_unit_in_stalk (r : Γ.obj (op X)) (x : X) : r ∉ (X.toΓSpecFun x).asIdeal ↔ IsUnit (X.presheaf.Γgerm x r) := by simp [toΓSpecFun, IsLocalRing.closedPoint] /-- The preimage of a basic open in `Spec Γ(X)` under the unit is the basic open in `X` defined by the same element (they are equal as sets). -/ theorem toΓSpec_preimage_basicOpen_eq (r : Γ.obj (op X)) : X.toΓSpecFun ⁻¹' basicOpen r = SetLike.coe (X.toRingedSpace.basicOpen r) := by ext dsimp simp only [Set.mem_preimage, SetLike.mem_coe] rw [X.toRingedSpace.mem_top_basicOpen] exact not_mem_prime_iff_unit_in_stalk .. /-- `toΓSpecFun` is continuous. -/ theorem toΓSpec_continuous : Continuous X.toΓSpecFun := by	rw [isTopologicalBasis_basic_opens.continuous_iff] rintro _ ⟨r, rfl⟩ rw [X.toΓSpec_preimage_basicOpen_eq r] exact (X.toRingedSpace.basicOpen r).2	Mathlib/AlgebraicGeometry/GammaSpecAdjunction.lean	84	87
/- 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.Control.Combinators import Mathlib.Logic.Function.Defs import Mathlib.Tactic.CasesM import Mathlib.Tactic.Attr.Core /-! Extends the theory on functors, applicatives and monads. -/ universe u v w variable {α β γ : Type u} section Functor attribute [functor_norm] Functor.map_map end Functor section Applicative variable {F : Type u → Type v} [Applicative F] /-- A generalization of `List.zipWith` which combines list elements with an `Applicative`. -/ def zipWithM {α₁ α₂ φ : Type u} (f : α₁ → α₂ → F φ) : ∀ (_ : List α₁) (_ : List α₂), F (List φ) \| x :: xs, y :: ys => (· :: ·) <$> f x y <> zipWithM f xs ys \| _, _ => pure [] /-- Like `zipWithM` but evaluates the result as it traverses the lists using `>`. -/ def zipWithM' (f : α → β → F γ) : List α → List β → F PUnit \| x :: xs, y :: ys => f x y > zipWithM' f xs ys \| [], _ => pure PUnit.unit \| _, [] => pure PUnit.unit variable [LawfulApplicative F] @[simp] theorem pure_id'_seq (x : F α) : (pure fun x => x) <> x = x := pure_id_seq x @[functor_norm] theorem seq_map_assoc (x : F (α → β)) (f : γ → α) (y : F γ) : x <> f <$> y = (· ∘ f) <$> x <> y := by simp only [← pure_seq] simp only [seq_assoc, Function.comp, seq_pure, ← comp_map] simp [pure_seq] rfl @[functor_norm] theorem map_seq (f : β → γ) (x : F (α → β)) (y : F α) : f <$> (x <> y) = (f ∘ ·) <$> x <> y := by simp only [← pure_seq]; simp [seq_assoc] end Applicative	section Monad variable {m : Type u → Type v} [Monad m] [LawfulMonad m]	Mathlib/Control/Basic.lean	60	64
/- Copyright (c) 2020 Damiano Testa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Damiano Testa, Alex Meiburg -/ import Mathlib.Algebra.BigOperators.Fin import Mathlib.Algebra.Polynomial.Degree.Lemmas import Mathlib.Algebra.Polynomial.Degree.Monomial /-! # Erase the leading term of a univariate polynomial ## Definition * `eraseLead f`: the polynomial `f - leading term of f` `eraseLead` serves as reduction step in an induction, shaving off one monomial from a polynomial. The definition is set up so that it does not mention subtraction in the definition, and thus works for polynomials over semirings as well as rings. -/ noncomputable section open Polynomial open Polynomial Finset namespace Polynomial variable {R : Type} [Semiring R] {f : R[X]} /-- `eraseLead f` for a polynomial `f` is the polynomial obtained by subtracting from `f` the leading term of `f`. -/ def eraseLead (f : R[X]) : R[X] := Polynomial.erase f.natDegree f section EraseLead theorem eraseLead_support (f : R[X]) : f.eraseLead.support = f.support.erase f.natDegree := by simp only [eraseLead, support_erase] theorem eraseLead_coeff (i : ℕ) : f.eraseLead.coeff i = if i = f.natDegree then 0 else f.coeff i := by simp only [eraseLead, coeff_erase] @[simp] theorem eraseLead_coeff_natDegree : f.eraseLead.coeff f.natDegree = 0 := by simp [eraseLead_coeff] theorem eraseLead_coeff_of_ne (i : ℕ) (hi : i ≠ f.natDegree) : f.eraseLead.coeff i = f.coeff i := by simp [eraseLead_coeff, hi] @[simp] theorem eraseLead_zero : eraseLead (0 : R[X]) = 0 := by simp only [eraseLead, erase_zero] @[simp] theorem eraseLead_add_monomial_natDegree_leadingCoeff (f : R[X]) : f.eraseLead + monomial f.natDegree f.leadingCoeff = f := (add_comm _ _).trans (f.monomial_add_erase _) @[simp] theorem eraseLead_add_C_mul_X_pow (f : R[X]) : f.eraseLead + C f.leadingCoeff X ^ f.natDegree = f := by rw [C_mul_X_pow_eq_monomial, eraseLead_add_monomial_natDegree_leadingCoeff] @[simp] theorem self_sub_monomial_natDegree_leadingCoeff {R : Type} [Ring R] (f : R[X]) : f - monomial f.natDegree f.leadingCoeff = f.eraseLead := (eq_sub_iff_add_eq.mpr (eraseLead_add_monomial_natDegree_leadingCoeff f)).symm @[simp] theorem self_sub_C_mul_X_pow {R : Type} [Ring R] (f : R[X]) : f - C f.leadingCoeff * X ^ f.natDegree = f.eraseLead := by rw [C_mul_X_pow_eq_monomial, self_sub_monomial_natDegree_leadingCoeff] theorem eraseLead_ne_zero (f0 : 2 ≤ #f.support) : eraseLead f ≠ 0 := by rw [Ne, ← card_support_eq_zero, eraseLead_support] exact (zero_lt_one.trans_le <\| (tsub_le_tsub_right f0 1).trans Finset.pred_card_le_card_erase).ne.symm theorem lt_natDegree_of_mem_eraseLead_support {a : ℕ} (h : a ∈ (eraseLead f).support) : a < f.natDegree := by rw [eraseLead_support, mem_erase] at h exact (le_natDegree_of_mem_supp a h.2).lt_of_ne h.1 theorem ne_natDegree_of_mem_eraseLead_support {a : ℕ} (h : a ∈ (eraseLead f).support) : a ≠ f.natDegree := (lt_natDegree_of_mem_eraseLead_support h).ne theorem natDegree_not_mem_eraseLead_support : f.natDegree ∉ (eraseLead f).support := fun h => ne_natDegree_of_mem_eraseLead_support h rfl theorem eraseLead_support_card_lt (h : f ≠ 0) : #(eraseLead f).support < #f.support := by rw [eraseLead_support] exact card_lt_card (erase_ssubset <\| natDegree_mem_support_of_nonzero h) theorem card_support_eraseLead_add_one (h : f ≠ 0) : #f.eraseLead.support + 1 = #f.support := by set c := #f.support with hc cases h₁ : c case zero => by_contra exact h (card_support_eq_zero.mp h₁) case succ => rw [eraseLead_support, card_erase_of_mem (natDegree_mem_support_of_nonzero h), ← hc, h₁] rfl @[simp] theorem card_support_eraseLead : #f.eraseLead.support = #f.support - 1 := by by_cases hf : f = 0 · rw [hf, eraseLead_zero, support_zero, card_empty] · rw [← card_support_eraseLead_add_one hf, add_tsub_cancel_right] theorem card_support_eraseLead' {c : ℕ} (fc : #f.support = c + 1) : #f.eraseLead.support = c := by rw [card_support_eraseLead, fc, add_tsub_cancel_right] theorem card_support_eq_one_of_eraseLead_eq_zero (h₀ : f ≠ 0) (h₁ : f.eraseLead = 0) : #f.support = 1 := (card_support_eq_zero.mpr h₁ ▸ card_support_eraseLead_add_one h₀).symm theorem card_support_le_one_of_eraseLead_eq_zero (h : f.eraseLead = 0) : #f.support ≤ 1 := by by_cases hpz : f = 0 case pos => simp [hpz] case neg => exact le_of_eq (card_support_eq_one_of_eraseLead_eq_zero hpz h) @[simp] theorem eraseLead_monomial (i : ℕ) (r : R) : eraseLead (monomial i r) = 0 := by classical by_cases hr : r = 0 · subst r simp only [monomial_zero_right, eraseLead_zero] · rw [eraseLead, natDegree_monomial, if_neg hr, erase_monomial] @[simp] theorem eraseLead_C (r : R) : eraseLead (C r) = 0 := eraseLead_monomial _ _ @[simp] theorem eraseLead_X : eraseLead (X : R[X]) = 0 := eraseLead_monomial _ _ @[simp] theorem eraseLead_X_pow (n : ℕ) : eraseLead (X ^ n : R[X]) = 0 := by rw [X_pow_eq_monomial, eraseLead_monomial] @[simp] theorem eraseLead_C_mul_X_pow (r : R) (n : ℕ) : eraseLead (C r * X ^ n) = 0 := by rw [C_mul_X_pow_eq_monomial, eraseLead_monomial] @[simp] lemma eraseLead_C_mul_X (r : R) : eraseLead (C r * X) = 0 := by simpa using eraseLead_C_mul_X_pow _ 1 theorem eraseLead_add_of_degree_lt_left {p q : R[X]} (pq : q.degree < p.degree) : (p + q).eraseLead = p.eraseLead + q := by ext n by_cases nd : n = p.natDegree · rw [nd, eraseLead_coeff, if_pos (natDegree_add_eq_left_of_degree_lt pq).symm] simpa using (coeff_eq_zero_of_degree_lt (lt_of_lt_of_le pq degree_le_natDegree)).symm · rw [eraseLead_coeff, coeff_add, coeff_add, eraseLead_coeff, if_neg, if_neg nd] rintro rfl exact nd (natDegree_add_eq_left_of_degree_lt pq) theorem eraseLead_add_of_natDegree_lt_left {p q : R[X]} (pq : q.natDegree < p.natDegree) : (p + q).eraseLead = p.eraseLead + q := eraseLead_add_of_degree_lt_left (degree_lt_degree pq) theorem eraseLead_add_of_degree_lt_right {p q : R[X]} (pq : p.degree < q.degree) : (p + q).eraseLead = p + q.eraseLead := by ext n by_cases nd : n = q.natDegree · rw [nd, eraseLead_coeff, if_pos (natDegree_add_eq_right_of_degree_lt pq).symm] simpa using (coeff_eq_zero_of_degree_lt (lt_of_lt_of_le pq degree_le_natDegree)).symm · rw [eraseLead_coeff, coeff_add, coeff_add, eraseLead_coeff, if_neg, if_neg nd] rintro rfl exact nd (natDegree_add_eq_right_of_degree_lt pq) theorem eraseLead_add_of_natDegree_lt_right {p q : R[X]} (pq : p.natDegree < q.natDegree) : (p + q).eraseLead = p + q.eraseLead := eraseLead_add_of_degree_lt_right (degree_lt_degree pq) theorem eraseLead_degree_le : (eraseLead f).degree ≤ f.degree := f.degree_erase_le _ theorem degree_eraseLead_lt (hf : f ≠ 0) : (eraseLead f).degree < f.degree := f.degree_erase_lt hf theorem eraseLead_natDegree_le_aux : (eraseLead f).natDegree ≤ f.natDegree := natDegree_le_natDegree eraseLead_degree_le theorem eraseLead_natDegree_lt (f0 : 2 ≤ #f.support) : (eraseLead f).natDegree < f.natDegree := lt_of_le_of_ne eraseLead_natDegree_le_aux <\| ne_natDegree_of_mem_eraseLead_support <\| natDegree_mem_support_of_nonzero <\| eraseLead_ne_zero f0 theorem natDegree_pos_of_eraseLead_ne_zero (h : f.eraseLead ≠ 0) : 0 < f.natDegree := by by_contra h₂ rw [eq_C_of_natDegree_eq_zero (Nat.eq_zero_of_not_pos h₂)] at h simp at h theorem eraseLead_natDegree_lt_or_eraseLead_eq_zero (f : R[X]) : (eraseLead f).natDegree < f.natDegree ∨ f.eraseLead = 0 := by by_cases h : #f.support ≤ 1 · right rw [← C_mul_X_pow_eq_self h] simp · left apply eraseLead_natDegree_lt (lt_of_not_ge h) theorem eraseLead_natDegree_le (f : R[X]) : (eraseLead f).natDegree ≤ f.natDegree - 1 := by rcases f.eraseLead_natDegree_lt_or_eraseLead_eq_zero with (h \| h) · exact Nat.le_sub_one_of_lt h · simp only [h, natDegree_zero, zero_le] lemma natDegree_eraseLead (h : f.nextCoeff ≠ 0) : f.eraseLead.natDegree = f.natDegree - 1 := by have := natDegree_pos_of_nextCoeff_ne_zero h refine f.eraseLead_natDegree_le.antisymm <\| le_natDegree_of_ne_zero ?_ rwa [eraseLead_coeff_of_ne _ (tsub_lt_self _ _).ne, ← nextCoeff_of_natDegree_pos] all_goals positivity lemma natDegree_eraseLead_add_one (h : f.nextCoeff ≠ 0) : f.eraseLead.natDegree + 1 = f.natDegree := by rw [natDegree_eraseLead h, tsub_add_cancel_of_le] exact natDegree_pos_of_nextCoeff_ne_zero h theorem natDegree_eraseLead_le_of_nextCoeff_eq_zero (h : f.nextCoeff = 0) : f.eraseLead.natDegree ≤ f.natDegree - 2 := by refine natDegree_le_pred (n := f.natDegree - 1) (eraseLead_natDegree_le f) ?_ rw [nextCoeff_eq_zero, natDegree_eq_zero] at h obtain ⟨a, rfl⟩ \| ⟨hf, h⟩ := h · simp rw [eraseLead_coeff_of_ne _ (tsub_lt_self hf zero_lt_one).ne, ← nextCoeff_of_natDegree_pos hf] simp [nextCoeff_eq_zero, h, eq_zero_or_pos] lemma two_le_natDegree_of_nextCoeff_eraseLead (hlead : f.eraseLead ≠ 0) (hnext : f.nextCoeff = 0) : 2 ≤ f.natDegree := by contrapose! hlead rw [Nat.lt_succ_iff, Nat.le_one_iff_eq_zero_or_eq_one, natDegree_eq_zero, natDegree_eq_one] at hlead obtain ⟨a, rfl⟩ \| ⟨a, ha, b, rfl⟩ := hlead · simp · rw [nextCoeff_C_mul_X_add_C ha] at hnext subst b simp theorem leadingCoeff_eraseLead_eq_nextCoeff (h : f.nextCoeff ≠ 0) : f.eraseLead.leadingCoeff = f.nextCoeff := by have := natDegree_pos_of_nextCoeff_ne_zero h rw [leadingCoeff, nextCoeff, natDegree_eraseLead h, if_neg, eraseLead_coeff_of_ne _ (tsub_lt_self _ _).ne] all_goals positivity theorem nextCoeff_eq_zero_of_eraseLead_eq_zero (h : f.eraseLead = 0) : f.nextCoeff = 0 := by by_contra h₂ exact leadingCoeff_ne_zero.mp (leadingCoeff_eraseLead_eq_nextCoeff h₂ ▸ h₂) h end EraseLead /-- An induction lemma for polynomials. It takes a natural number `N` as a parameter, that is required to be at least as big as the `nat_degree` of the polynomial. This is useful to prove results where you want to change each term in a polynomial to something else depending on the `nat_degree` of the polynomial itself and not on the specific `nat_degree` of each term. -/ theorem induction_with_natDegree_le (P : R[X] → Prop) (N : ℕ) (P_0 : P 0) (P_C_mul_pow : ∀ n : ℕ, ∀ r : R, r ≠ 0 → n ≤ N → P (C r * X ^ n)) (P_C_add : ∀ f g : R[X], f.natDegree < g.natDegree → g.natDegree ≤ N → P f → P g → P (f + g)) : ∀ f : R[X], f.natDegree ≤ N → P f := by intro f df generalize hd : #f.support = c revert f induction' c with c hc · intro f _ f0 convert P_0 simpa [support_eq_empty, card_eq_zero] using f0 · intro f df f0 rw [← eraseLead_add_C_mul_X_pow f] cases c · convert P_C_mul_pow f.natDegree f.leadingCoeff ?_ df using 1 · convert zero_add (C (leadingCoeff f) * X ^ f.natDegree) rw [← card_support_eq_zero, card_support_eraseLead' f0] · rw [leadingCoeff_ne_zero, Ne, ← card_support_eq_zero, f0] exact zero_ne_one.symm refine P_C_add f.eraseLead _ ?_ ?_ ?_ ?_ · refine (eraseLead_natDegree_lt ?_).trans_le (le_of_eq ?_) · exact (Nat.succ_le_succ (Nat.succ_le_succ (Nat.zero_le _))).trans f0.ge · rw [natDegree_C_mul_X_pow _ _ (leadingCoeff_ne_zero.mpr _)] rintro rfl simp at f0 · exact (natDegree_C_mul_X_pow_le f.leadingCoeff f.natDegree).trans df · exact hc _ (eraseLead_natDegree_le_aux.trans df) (card_support_eraseLead' f0) · refine P_C_mul_pow _ _ ?_ df rw [Ne, leadingCoeff_eq_zero, ← card_support_eq_zero, f0] exact Nat.succ_ne_zero _ /-- Let `φ : R[x] → S[x]` be an additive map, `k : ℕ` a bound, and `fu : ℕ → ℕ` a "sufficiently monotone" map. Assume also that * `φ` maps to `0` all monomials of degree less than `k`, * `φ` maps each monomial `m` in `R[x]` to a polynomial `φ m` of degree `fu (deg m)`. Then, `φ` maps each polynomial `p` in `R[x]` to a polynomial of degree `fu (deg p)`. -/ theorem mono_map_natDegree_eq {S F : Type} [Semiring S] [FunLike F R[X] S[X]] [AddMonoidHomClass F R[X] S[X]] {φ : F} {p : R[X]} (k : ℕ) (fu : ℕ → ℕ) (fu0 : ∀ {n}, n ≤ k → fu n = 0) (fc : ∀ {n m}, k ≤ n → n < m → fu n < fu m) (φ_k : ∀ {f : R[X]}, f.natDegree < k → φ f = 0) (φ_mon_nat : ∀ n c, c ≠ 0 → (φ (monomial n c)).natDegree = fu n) : (φ p).natDegree = fu p.natDegree := by refine induction_with_natDegree_le (fun p => (φ p).natDegree = fu p.natDegree) p.natDegree (by simp [fu0]) ?_ ?_ _ rfl.le · intro n r r0 _ rw [natDegree_C_mul_X_pow _ _ r0, C_mul_X_pow_eq_monomial, φ_mon_nat _ _ r0] · intro f g fg _ fk gk rw [natDegree_add_eq_right_of_natDegree_lt fg, map_add] by_cases FG : k ≤ f.natDegree · rw [natDegree_add_eq_right_of_natDegree_lt, gk] rw [fk, gk] exact fc FG fg · cases k · exact (FG (Nat.zero_le _)).elim · rwa [φ_k (not_le.mp FG), zero_add] theorem map_natDegree_eq_sub {S F : Type} [Semiring S] [FunLike F R[X] S[X]] [AddMonoidHomClass F R[X] S[X]] {φ : F} {p : R[X]} {k : ℕ} (φ_k : ∀ f : R[X], f.natDegree < k → φ f = 0) (φ_mon : ∀ n c, c ≠ 0 → (φ (monomial n c)).natDegree = n - k) : (φ p).natDegree = p.natDegree - k := mono_map_natDegree_eq k (fun j => j - k) (by simp_all)	(@fun _ _ h => (tsub_lt_tsub_iff_right h).mpr) (φ_k _) φ_mon theorem map_natDegree_eq_natDegree {S F : Type} [Semiring S] [FunLike F R[X] S[X]] [AddMonoidHomClass F R[X] S[X]] {φ : F} (p) (φ_mon_nat : ∀ n c, c ≠ 0 → (φ (monomial n c)).natDegree = n) : (φ p).natDegree = p.natDegree := (map_natDegree_eq_sub (fun _ h => (Nat.not_lt_zero _ h).elim) (by simpa)).trans p.natDegree.sub_zero theorem card_support_eq' {n : ℕ} (k : Fin n → ℕ) (x : Fin n → R) (hk : Function.Injective k) (hx : ∀ i, x i ≠ 0) : #(∑ i, C (x i) X ^ k i).support = n := by suffices (∑ i, C (x i) * X ^ k i).support = image k univ by rw [this, univ.card_image_of_injective hk, card_fin] simp_rw [Finset.ext_iff, mem_support_iff, finset_sum_coeff, coeff_C_mul_X_pow, mem_image, mem_univ, true_and] refine fun i => ⟨fun h => ?_, ?_⟩ · obtain ⟨j, _, h⟩ := exists_ne_zero_of_sum_ne_zero h exact ⟨j, (ite_ne_right_iff.mp h).1.symm⟩	Mathlib/Algebra/Polynomial/EraseLead.lean	324	342
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.CategoryTheory.Shift.Basic /-! # Functors which commute with shifts Let `C` and `D` be two categories equipped with shifts by an additive monoid `A`. In this file, we define the notion of functor `F : C ⥤ D` which "commutes" with these shifts. The associated type class is `[F.CommShift A]`. The data consists of commutation isomorphisms `F.commShiftIso a : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a` for all `a : A` which satisfy a compatibility with the addition and the zero. After this was formalised in Lean, it was found that this definition is exactly the definition which appears in Jean-Louis Verdier's thesis (I 1.2.3/1.2.4), although the language is different. (In Verdier's thesis, the shift is not given by a monoidal functor `Discrete A ⥤ C ⥤ C`, but by a fibred category `C ⥤ BA`, where `BA` is the category with one object, the endomorphisms of which identify to `A`. The choice of a cleavage for this fibered category gives the individual shift functors.) ## References * [Jean-Louis Verdier, Des catégories dérivées des catégories abéliennes][verdier1996] -/ namespace CategoryTheory open Category namespace Functor variable {C D E : Type} [Category C] [Category D] [Category E] (F : C ⥤ D) (G : D ⥤ E) (A B : Type) [AddMonoid A] [AddCommMonoid B] [HasShift C A] [HasShift D A] [HasShift E A] [HasShift C B] [HasShift D B] namespace CommShift /-- For any functor `F : C ⥤ D`, this is the obvious isomorphism `shiftFunctor C (0 : A) ⋙ F ≅ F ⋙ shiftFunctor D (0 : A)` deduced from the isomorphisms `shiftFunctorZero` on both categories `C` and `D`. -/ @[simps!] noncomputable def isoZero : shiftFunctor C (0 : A) ⋙ F ≅ F ⋙ shiftFunctor D (0 : A) := isoWhiskerRight (shiftFunctorZero C A) F ≪≫ F.leftUnitor ≪≫ F.rightUnitor.symm ≪≫ isoWhiskerLeft F (shiftFunctorZero D A).symm /-- For any functor `F : C ⥤ D` and any `a` in `A` such that `a = 0`, this is the obvious isomorphism `shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a` deduced from the isomorphisms `shiftFunctorZero'` on both categories `C` and `D`. -/ @[simps!] noncomputable def isoZero' (a : A) (ha : a = 0) : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a := isoWhiskerRight (shiftFunctorZero' C a ha) F ≪≫ F.leftUnitor ≪≫ F.rightUnitor.symm ≪≫ isoWhiskerLeft F (shiftFunctorZero' D a ha).symm @[simp] lemma isoZero'_eq_isoZero : isoZero' F A 0 rfl = isoZero F A := by ext; simp [isoZero', shiftFunctorZero'] variable {F A} /-- If a functor `F : C ⥤ D` is equipped with "commutation isomorphisms" with the shifts by `a` and `b`, then there is a commutation isomorphism with the shift by `c` when `a + b = c`. -/ @[simps!] noncomputable def isoAdd' {a b c : A} (h : a + b = c) (e₁ : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a) (e₂ : shiftFunctor C b ⋙ F ≅ F ⋙ shiftFunctor D b) : shiftFunctor C c ⋙ F ≅ F ⋙ shiftFunctor D c := isoWhiskerRight (shiftFunctorAdd' C _ _ _ h) F ≪≫ Functor.associator _ _ _ ≪≫ isoWhiskerLeft _ e₂ ≪≫ (Functor.associator _ _ _).symm ≪≫ isoWhiskerRight e₁ _ ≪≫ Functor.associator _ _ _ ≪≫ isoWhiskerLeft _ (shiftFunctorAdd' D _ _ _ h).symm /-- If a functor `F : C ⥤ D` is equipped with "commutation isomorphisms" with the shifts by `a` and `b`, then there is a commutation isomorphism with the shift by `a + b`. -/ noncomputable def isoAdd {a b : A} (e₁ : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a) (e₂ : shiftFunctor C b ⋙ F ≅ F ⋙ shiftFunctor D b) : shiftFunctor C (a + b) ⋙ F ≅ F ⋙ shiftFunctor D (a + b) := CommShift.isoAdd' rfl e₁ e₂ @[simp] lemma isoAdd_hom_app {a b : A} (e₁ : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a) (e₂ : shiftFunctor C b ⋙ F ≅ F ⋙ shiftFunctor D b) (X : C) : (CommShift.isoAdd e₁ e₂).hom.app X = F.map ((shiftFunctorAdd C a b).hom.app X) ≫ e₂.hom.app ((shiftFunctor C a).obj X) ≫ (shiftFunctor D b).map (e₁.hom.app X) ≫ (shiftFunctorAdd D a b).inv.app (F.obj X) := by simp only [isoAdd, isoAdd'_hom_app, shiftFunctorAdd'_eq_shiftFunctorAdd] @[simp] lemma isoAdd_inv_app {a b : A} (e₁ : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a) (e₂ : shiftFunctor C b ⋙ F ≅ F ⋙ shiftFunctor D b) (X : C) : (CommShift.isoAdd e₁ e₂).inv.app X = (shiftFunctorAdd D a b).hom.app (F.obj X) ≫ (shiftFunctor D b).map (e₁.inv.app X) ≫ e₂.inv.app ((shiftFunctor C a).obj X) ≫ F.map ((shiftFunctorAdd C a b).inv.app X) := by simp only [isoAdd, isoAdd'_inv_app, shiftFunctorAdd'_eq_shiftFunctorAdd] end CommShift /-- A functor `F` commutes with the shift by a monoid `A` if it is equipped with commutation isomorphisms with the shifts by all `a : A`, and these isomorphisms satisfy coherence properties with respect to `0 : A` and the addition in `A`. -/ class CommShift where /-- The commutation isomorphisms for all `a`-shifts this functor is equipped with -/ iso (a : A) : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a zero : iso 0 = CommShift.isoZero F A := by aesop_cat add (a b : A) : iso (a + b) = CommShift.isoAdd (iso a) (iso b) := by aesop_cat variable {A} section variable [F.CommShift A] /-- If a functor `F` commutes with the shift by `A` (i.e. `[F.CommShift A]`), then `F.commShiftIso a` is the given isomorphism `shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a`. -/ def commShiftIso (a : A) : shiftFunctor C a ⋙ F ≅ F ⋙ shiftFunctor D a := CommShift.iso a -- Note: The following two lemmas are introduced in order to have more proofs work `by simp`. -- Indeed, `simp only [(F.commShiftIso a).hom.naturality f]` would almost never work because -- of the compositions of functors which appear in both the source and target of -- `F.commShiftIso a`. Otherwise, we would be forced to use `erw [NatTrans.naturality]`. @[reassoc (attr := simp)] lemma commShiftIso_hom_naturality {X Y : C} (f : X ⟶ Y) (a : A) : F.map (f⟦a⟧') ≫ (F.commShiftIso a).hom.app Y = (F.commShiftIso a).hom.app X ≫ (F.map f)⟦a⟧' := (F.commShiftIso a).hom.naturality f @[reassoc (attr := simp)] lemma commShiftIso_inv_naturality {X Y : C} (f : X ⟶ Y) (a : A) : (F.map f)⟦a⟧' ≫ (F.commShiftIso a).inv.app Y = (F.commShiftIso a).inv.app X ≫ F.map (f⟦a⟧') := (F.commShiftIso a).inv.naturality f variable (A) lemma commShiftIso_zero : F.commShiftIso (0 : A) = CommShift.isoZero F A := CommShift.zero set_option linter.docPrime false in lemma commShiftIso_zero' (a : A) (h : a = 0) : F.commShiftIso a = CommShift.isoZero' F A a h := by subst h; rw [CommShift.isoZero'_eq_isoZero, commShiftIso_zero] variable {A} lemma commShiftIso_add (a b : A) : F.commShiftIso (a + b) = CommShift.isoAdd (F.commShiftIso a) (F.commShiftIso b) := CommShift.add a b lemma commShiftIso_add' {a b c : A} (h : a + b = c) : F.commShiftIso c = CommShift.isoAdd' h (F.commShiftIso a) (F.commShiftIso b) := by subst h simp only [commShiftIso_add, CommShift.isoAdd] end namespace CommShift variable (C) in instance id : CommShift (𝟭 C) A where iso := fun _ => rightUnitor _ ≪≫ (leftUnitor _).symm instance comp [F.CommShift A] [G.CommShift A] : (F ⋙ G).CommShift A where iso a := (Functor.associator _ _ _).symm ≪≫ isoWhiskerRight (F.commShiftIso a) _ ≪≫ Functor.associator _ _ _ ≪≫ isoWhiskerLeft _ (G.commShiftIso a) ≪≫ (Functor.associator _ _ _).symm zero := by ext X dsimp simp only [id_comp, comp_id, commShiftIso_zero, isoZero_hom_app, ← Functor.map_comp_assoc, assoc, Iso.inv_hom_id_app, id_obj, comp_map, comp_obj] add := fun a b => by ext X dsimp simp only [commShiftIso_add, isoAdd_hom_app] dsimp simp only [comp_id, id_comp, assoc, ← Functor.map_comp_assoc, Iso.inv_hom_id_app, comp_obj] simp only [map_comp, assoc, commShiftIso_hom_naturality_assoc] end CommShift @[simp] lemma commShiftIso_id_hom_app (a : A) (X : C) : (commShiftIso (𝟭 C) a).hom.app X = 𝟙 _ := comp_id _ @[simp] lemma commShiftIso_id_inv_app (a : A) (X : C) : (commShiftIso (𝟭 C) a).inv.app X = 𝟙 _ := comp_id _ lemma commShiftIso_comp_hom_app [F.CommShift A] [G.CommShift A] (a : A) (X : C) : (commShiftIso (F ⋙ G) a).hom.app X = G.map ((commShiftIso F a).hom.app X) ≫ (commShiftIso G a).hom.app (F.obj X) := by simp [commShiftIso, CommShift.iso] lemma commShiftIso_comp_inv_app [F.CommShift A] [G.CommShift A] (a : A) (X : C) : (commShiftIso (F ⋙ G) a).inv.app X = (commShiftIso G a).inv.app (F.obj X) ≫ G.map ((commShiftIso F a).inv.app X) := by simp [commShiftIso, CommShift.iso] variable {B} lemma map_shiftFunctorComm_hom_app [F.CommShift B] (X : C) (a b : B) : F.map ((shiftFunctorComm C a b).hom.app X) = (F.commShiftIso b).hom.app (X⟦a⟧) ≫ ((F.commShiftIso a).hom.app X)⟦b⟧' ≫ (shiftFunctorComm D a b).hom.app (F.obj X) ≫ ((F.commShiftIso b).inv.app X)⟦a⟧' ≫ (F.commShiftIso a).inv.app (X⟦b⟧) := by have eq := NatTrans.congr_app (congr_arg Iso.hom (F.commShiftIso_add a b)) X simp only [comp_obj, CommShift.isoAdd_hom_app, ← cancel_epi (F.map ((shiftFunctorAdd C a b).inv.app X)), Category.assoc, ← F.map_comp_assoc, Iso.inv_hom_id_app, F.map_id, Category.id_comp, F.map_comp] at eq simp only [shiftFunctorComm_eq D a b _ rfl] dsimp simp only [Functor.map_comp, shiftFunctorAdd'_eq_shiftFunctorAdd, Category.assoc, ← reassoc_of% eq, shiftFunctorComm_eq C a b _ rfl] dsimp rw [Functor.map_comp]	simp only [NatTrans.congr_app (congr_arg Iso.hom (F.commShiftIso_add' (add_comm b a))) X, CommShift.isoAdd'_hom_app, Category.assoc, Iso.inv_hom_id_app_assoc, ← Functor.map_comp_assoc, Iso.hom_inv_id_app, Functor.map_id, Category.id_comp, comp_obj, Category.comp_id] @[simp, reassoc] lemma map_shiftFunctorCompIsoId_hom_app [F.CommShift A] (X : C) (a b : A) (h : a + b = 0) : F.map ((shiftFunctorCompIsoId C a b h).hom.app X) = (F.commShiftIso b).hom.app (X⟦a⟧) ≫ ((F.commShiftIso a).hom.app X)⟦b⟧' ≫	Mathlib/CategoryTheory/Shift/CommShift.lean	225	233
/- Copyright (c) 2022 Damiano Testa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Damiano Testa -/ import Mathlib.Algebra.Group.Nat.Even import Mathlib.Data.Nat.Cast.Basic import Mathlib.Data.Nat.Cast.Commute import Mathlib.Data.Set.Operations import Mathlib.Logic.Function.Iterate /-! # Even and odd elements in rings This file defines odd elements and proves some general facts about even and odd elements of rings. As opposed to `Even`, `Odd` does not have a multiplicative counterpart. ## TODO Try to generalize `Even` lemmas further. For example, there are still a few lemmas whose `Semiring` assumptions I (DT) am not convinced are necessary. If that turns out to be true, they could be moved to `Mathlib.Algebra.Group.Even`. ## See also `Mathlib.Algebra.Group.Even` for the definition of even elements. -/ assert_not_exists DenselyOrdered OrderedRing open MulOpposite variable {F α β : Type*} section Monoid variable [Monoid α] [HasDistribNeg α] {n : ℕ} {a : α} @[simp] lemma Even.neg_pow : Even n → ∀ a : α, (-a) ^ n = a ^ n := by rintro ⟨c, rfl⟩ a simp_rw [← two_mul, pow_mul, neg_sq] lemma Even.neg_one_pow (h : Even n) : (-1 : α) ^ n = 1 := by rw [h.neg_pow, one_pow] end Monoid		Mathlib/Algebra/Ring/Parity.lean	46	46
/- 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.Algebra.NoZeroSMulDivisors.Basic import Mathlib.Algebra.Order.GroupWithZero.Action.Synonym import Mathlib.Tactic.GCongr import Mathlib.Tactic.Positivity.Core /-! # Monotonicity of scalar multiplication by positive elements This file defines typeclasses to reason about monotonicity of the operations * `b ↦ a • b`, "left scalar multiplication" * `a ↦ a • b`, "right scalar multiplication" We use eight typeclasses to encode the various properties we care about for those two operations. These typeclasses are meant to be mostly internal to this file, to set up each lemma in the appropriate generality. Less granular typeclasses like `OrderedAddCommMonoid`, `LinearOrderedField`, `OrderedSMul` should be enough for most purposes, and the system is set up so that they imply the correct granular typeclasses here. If those are enough for you, you may stop reading here! Else, beware that what follows is a bit technical. ## Definitions In all that follows, `α` and `β` are orders which have a `0` and such that `α` acts on `β` by scalar multiplication. Note however that we do not use lawfulness of this action in most of the file. Hence `•` should be considered here as a mostly arbitrary function `α → β → β`. We use the following four typeclasses to reason about left scalar multiplication (`b ↦ a • b`): * `PosSMulMono`: If `a ≥ 0`, then `b₁ ≤ b₂` implies `a • b₁ ≤ a • b₂`. * `PosSMulStrictMono`: If `a > 0`, then `b₁ < b₂` implies `a • b₁ < a • b₂`. * `PosSMulReflectLT`: If `a ≥ 0`, then `a • b₁ < a • b₂` implies `b₁ < b₂`. * `PosSMulReflectLE`: If `a > 0`, then `a • b₁ ≤ a • b₂` implies `b₁ ≤ b₂`. We use the following four typeclasses to reason about right scalar multiplication (`a ↦ a • b`): * `SMulPosMono`: If `b ≥ 0`, then `a₁ ≤ a₂` implies `a₁ • b ≤ a₂ • b`. * `SMulPosStrictMono`: If `b > 0`, then `a₁ < a₂` implies `a₁ • b < a₂ • b`. * `SMulPosReflectLT`: If `b ≥ 0`, then `a₁ • b < a₂ • b` implies `a₁ < a₂`. * `SMulPosReflectLE`: If `b > 0`, then `a₁ • b ≤ a₂ • b` implies `a₁ ≤ a₂`. ## Constructors The four typeclasses about nonnegativity can usually be checked only on positive inputs due to their condition becoming trivial when `a = 0` or `b = 0`. We therefore make the following constructors available: `PosSMulMono.of_pos`, `PosSMulReflectLT.of_pos`, `SMulPosMono.of_pos`, `SMulPosReflectLT.of_pos` ## Implications As `α` and `β` get more and more structure, those typeclasses end up being equivalent. The commonly used implications are: * When `α`, `β` are partial orders: * `PosSMulStrictMono → PosSMulMono` * `SMulPosStrictMono → SMulPosMono` * `PosSMulReflectLE → PosSMulReflectLT` * `SMulPosReflectLE → SMulPosReflectLT` * When `β` is a linear order: * `PosSMulStrictMono → PosSMulReflectLE` * `PosSMulReflectLT → PosSMulMono` (not registered as instance) * `SMulPosReflectLT → SMulPosMono` (not registered as instance) * `PosSMulReflectLE → PosSMulStrictMono` (not registered as instance) * `SMulPosReflectLE → SMulPosStrictMono` (not registered as instance) * When `α` is a linear order: * `SMulPosStrictMono → SMulPosReflectLE` * When `α` is an ordered ring, `β` an ordered group and also an `α`-module: * `PosSMulMono → SMulPosMono` * `PosSMulStrictMono → SMulPosStrictMono` * When `α` is an linear ordered semifield, `β` is an `α`-module: * `PosSMulStrictMono → PosSMulReflectLT` * `PosSMulMono → PosSMulReflectLE` * When `α` is a semiring, `β` is an `α`-module with `NoZeroSMulDivisors`: * `PosSMulMono → PosSMulStrictMono` (not registered as instance) * When `α` is a ring, `β` is an `α`-module with `NoZeroSMulDivisors`: * `SMulPosMono → SMulPosStrictMono` (not registered as instance) Further, the bundled non-granular typeclasses imply the granular ones like so: * `OrderedSMul → PosSMulStrictMono` * `OrderedSMul → PosSMulReflectLT` Unless otherwise stated, all these implications are registered as instances, which means that in practice you should not worry about these implications. However, if you encounter a case where you think a statement is true but not covered by the current implications, please bring it up on Zulip! ## Implementation notes This file uses custom typeclasses instead of abbreviations of `CovariantClass`/`ContravariantClass` because: * They get displayed as classes in the docs. In particular, one can see their list of instances, instead of their instances being invariably dumped to the `CovariantClass`/`ContravariantClass` list. * They don't pollute other typeclass searches. Having many abbreviations of the same typeclass for different purposes always felt like a performance issue (more instances with the same key, for no added benefit), and indeed making the classes here abbreviation previous creates timeouts due to the higher number of `CovariantClass`/`ContravariantClass` instances. * `SMulPosReflectLT`/`SMulPosReflectLE` do not fit in the framework since they relate `≤` on two different types. So we would have to generalise `CovariantClass`/`ContravariantClass` to three types and two relations. * Very minor, but the constructors let you work with `a : α`, `h : 0 ≤ a` instead of `a : {a : α // 0 ≤ a}`. This actually makes some instances surprisingly cleaner to prove. * The `CovariantClass`/`ContravariantClass` framework is only useful to automate very simple logic anyway. It is easily copied over. In the future, it would be good to make the corresponding typeclasses in `Mathlib.Algebra.Order.GroupWithZero.Unbundled` custom typeclasses too. ## TODO This file acts as a substitute for `Mathlib.Algebra.Order.SMul`. We now need to * finish the transition by deleting the duplicate lemmas * rearrange the non-duplicate lemmas into new files * generalise (most of) the lemmas from `Mathlib.Algebra.Order.Module` to here * rethink `OrderedSMul` -/ open OrderDual variable (α β : Type) section Defs variable [SMul α β] [Preorder α] [Preorder β] section Left variable [Zero α] /-- Typeclass for monotonicity of scalar multiplication by nonnegative elements on the left, namely `b₁ ≤ b₂ → a • b₁ ≤ a • b₂` if `0 ≤ a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulMono : Prop where /-- Do not use this. Use `smul_le_smul_of_nonneg_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 ≤ a) ⦃b₁ b₂ : β⦄ (hb : b₁ ≤ b₂) : a • b₁ ≤ a • b₂ /-- Typeclass for strict monotonicity of scalar multiplication by positive elements on the left, namely `b₁ < b₂ → a • b₁ < a • b₂` if `0 < a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulStrictMono : Prop where /-- Do not use this. Use `smul_lt_smul_of_pos_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 < a) ⦃b₁ b₂ : β⦄ (hb : b₁ < b₂) : a • b₁ < a • b₂ /-- Typeclass for strict reverse monotonicity of scalar multiplication by nonnegative elements on the left, namely `a • b₁ < a • b₂ → b₁ < b₂` if `0 ≤ a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulReflectLT : Prop where /-- Do not use this. Use `lt_of_smul_lt_smul_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 ≤ a) ⦃b₁ b₂ : β⦄ (hb : a • b₁ < a • b₂) : b₁ < b₂ /-- Typeclass for reverse monotonicity of scalar multiplication by positive elements on the left, namely `a • b₁ ≤ a • b₂ → b₁ ≤ b₂` if `0 < a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulReflectLE : Prop where /-- Do not use this. Use `le_of_smul_lt_smul_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 < a) ⦃b₁ b₂ : β⦄ (hb : a • b₁ ≤ a • b₂) : b₁ ≤ b₂ end Left section Right variable [Zero β] /-- Typeclass for monotonicity of scalar multiplication by nonnegative elements on the left, namely `a₁ ≤ a₂ → a₁ • b ≤ a₂ • b` if `0 ≤ b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosMono : Prop where /-- Do not use this. Use `smul_le_smul_of_nonneg_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 ≤ b) ⦃a₁ a₂ : α⦄ (ha : a₁ ≤ a₂) : a₁ • b ≤ a₂ • b /-- Typeclass for strict monotonicity of scalar multiplication by positive elements on the left, namely `a₁ < a₂ → a₁ • b < a₂ • b` if `0 < b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosStrictMono : Prop where /-- Do not use this. Use `smul_lt_smul_of_pos_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 < b) ⦃a₁ a₂ : α⦄ (ha : a₁ < a₂) : a₁ • b < a₂ • b /-- Typeclass for strict reverse monotonicity of scalar multiplication by nonnegative elements on the left, namely `a₁ • b < a₂ • b → a₁ < a₂` if `0 ≤ b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosReflectLT : Prop where /-- Do not use this. Use `lt_of_smul_lt_smul_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 ≤ b) ⦃a₁ a₂ : α⦄ (hb : a₁ • b < a₂ • b) : a₁ < a₂ /-- Typeclass for reverse monotonicity of scalar multiplication by positive elements on the left, namely `a₁ • b ≤ a₂ • b → a₁ ≤ a₂` if `0 < b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosReflectLE : Prop where /-- Do not use this. Use `le_of_smul_lt_smul_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 < b) ⦃a₁ a₂ : α⦄ (hb : a₁ • b ≤ a₂ • b) : a₁ ≤ a₂ end Right end Defs variable {α β} {a a₁ a₂ : α} {b b₁ b₂ : β} section Mul variable [Zero α] [Mul α] [Preorder α] -- See note [lower instance priority] instance (priority := 100) PosMulMono.toPosSMulMono [PosMulMono α] : PosSMulMono α α where elim _a ha _b₁ _b₂ hb := mul_le_mul_of_nonneg_left hb ha -- See note [lower instance priority] instance (priority := 100) PosMulStrictMono.toPosSMulStrictMono [PosMulStrictMono α] : PosSMulStrictMono α α where elim _a ha _b₁ _b₂ hb := mul_lt_mul_of_pos_left hb ha -- See note [lower instance priority] instance (priority := 100) PosMulReflectLT.toPosSMulReflectLT [PosMulReflectLT α] : PosSMulReflectLT α α where elim _a ha _b₁ _b₂ h := lt_of_mul_lt_mul_left h ha -- See note [lower instance priority] instance (priority := 100) PosMulReflectLE.toPosSMulReflectLE [PosMulReflectLE α] : PosSMulReflectLE α α where elim _a ha _b₁ _b₂ h := le_of_mul_le_mul_left h ha -- See note [lower instance priority] instance (priority := 100) MulPosMono.toSMulPosMono [MulPosMono α] : SMulPosMono α α where elim _b hb _a₁ _a₂ ha := mul_le_mul_of_nonneg_right ha hb -- See note [lower instance priority] instance (priority := 100) MulPosStrictMono.toSMulPosStrictMono [MulPosStrictMono α] : SMulPosStrictMono α α where elim _b hb _a₁ _a₂ ha := mul_lt_mul_of_pos_right ha hb -- See note [lower instance priority] instance (priority := 100) MulPosReflectLT.toSMulPosReflectLT [MulPosReflectLT α] : SMulPosReflectLT α α where elim _b hb _a₁ _a₂ h := lt_of_mul_lt_mul_right h hb -- See note [lower instance priority] instance (priority := 100) MulPosReflectLE.toSMulPosReflectLE [MulPosReflectLE α] : SMulPosReflectLE α α where elim _b hb _a₁ _a₂ h := le_of_mul_le_mul_right h hb end Mul section SMul variable [SMul α β] section Preorder variable [Preorder α] [Preorder β] section Left variable [Zero α] lemma monotone_smul_left_of_nonneg [PosSMulMono α β] (ha : 0 ≤ a) : Monotone ((a • ·) : β → β) := PosSMulMono.elim ha lemma strictMono_smul_left_of_pos [PosSMulStrictMono α β] (ha : 0 < a) : StrictMono ((a • ·) : β → β) := PosSMulStrictMono.elim ha @[gcongr] lemma smul_le_smul_of_nonneg_left [PosSMulMono α β] (hb : b₁ ≤ b₂) (ha : 0 ≤ a) : a • b₁ ≤ a • b₂ := monotone_smul_left_of_nonneg ha hb @[gcongr] lemma smul_lt_smul_of_pos_left [PosSMulStrictMono α β] (hb : b₁ < b₂) (ha : 0 < a) : a • b₁ < a • b₂ := strictMono_smul_left_of_pos ha hb lemma lt_of_smul_lt_smul_left [PosSMulReflectLT α β] (h : a • b₁ < a • b₂) (ha : 0 ≤ a) : b₁ < b₂ := PosSMulReflectLT.elim ha h lemma le_of_smul_le_smul_left [PosSMulReflectLE α β] (h : a • b₁ ≤ a • b₂) (ha : 0 < a) : b₁ ≤ b₂ := PosSMulReflectLE.elim ha h alias lt_of_smul_lt_smul_of_nonneg_left := lt_of_smul_lt_smul_left alias le_of_smul_le_smul_of_pos_left := le_of_smul_le_smul_left @[simp] lemma smul_le_smul_iff_of_pos_left [PosSMulMono α β] [PosSMulReflectLE α β] (ha : 0 < a) : a • b₁ ≤ a • b₂ ↔ b₁ ≤ b₂ := ⟨fun h ↦ le_of_smul_le_smul_left h ha, fun h ↦ smul_le_smul_of_nonneg_left h ha.le⟩ @[simp] lemma smul_lt_smul_iff_of_pos_left [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : a • b₁ < a • b₂ ↔ b₁ < b₂ := ⟨fun h ↦ lt_of_smul_lt_smul_left h ha.le, fun hb ↦ smul_lt_smul_of_pos_left hb ha⟩ end Left section Right variable [Zero β] lemma monotone_smul_right_of_nonneg [SMulPosMono α β] (hb : 0 ≤ b) : Monotone ((· • b) : α → β) := SMulPosMono.elim hb lemma strictMono_smul_right_of_pos [SMulPosStrictMono α β] (hb : 0 < b) : StrictMono ((· • b) : α → β) := SMulPosStrictMono.elim hb @[gcongr] lemma smul_le_smul_of_nonneg_right [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : 0 ≤ b) : a₁ • b ≤ a₂ • b := monotone_smul_right_of_nonneg hb ha @[gcongr] lemma smul_lt_smul_of_pos_right [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : 0 < b) : a₁ • b < a₂ • b := strictMono_smul_right_of_pos hb ha lemma lt_of_smul_lt_smul_right [SMulPosReflectLT α β] (h : a₁ • b < a₂ • b) (hb : 0 ≤ b) : a₁ < a₂ := SMulPosReflectLT.elim hb h lemma le_of_smul_le_smul_right [SMulPosReflectLE α β] (h : a₁ • b ≤ a₂ • b) (hb : 0 < b) : a₁ ≤ a₂ := SMulPosReflectLE.elim hb h alias lt_of_smul_lt_smul_of_nonneg_right := lt_of_smul_lt_smul_right alias le_of_smul_le_smul_of_pos_right := le_of_smul_le_smul_right @[simp] lemma smul_le_smul_iff_of_pos_right [SMulPosMono α β] [SMulPosReflectLE α β] (hb : 0 < b) : a₁ • b ≤ a₂ • b ↔ a₁ ≤ a₂ := ⟨fun h ↦ le_of_smul_le_smul_right h hb, fun ha ↦ smul_le_smul_of_nonneg_right ha hb.le⟩ @[simp] lemma smul_lt_smul_iff_of_pos_right [SMulPosStrictMono α β] [SMulPosReflectLT α β] (hb : 0 < b) : a₁ • b < a₂ • b ↔ a₁ < a₂ := ⟨fun h ↦ lt_of_smul_lt_smul_right h hb.le, fun ha ↦ smul_lt_smul_of_pos_right ha hb⟩ end Right section LeftRight variable [Zero α] [Zero β] lemma smul_lt_smul_of_le_of_lt [PosSMulStrictMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ < b₂) (h₁ : 0 < a₁) (h₂ : 0 ≤ b₂) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_left hb h₁).trans_le (smul_le_smul_of_nonneg_right ha h₂) lemma smul_lt_smul_of_le_of_lt' [PosSMulStrictMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ < b₂) (h₂ : 0 < a₂) (h₁ : 0 ≤ b₁) : a₁ • b₁ < a₂ • b₂ := (smul_le_smul_of_nonneg_right ha h₁).trans_lt (smul_lt_smul_of_pos_left hb h₂) lemma smul_lt_smul_of_lt_of_le [PosSMulMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ ≤ b₂) (h₁ : 0 ≤ a₁) (h₂ : 0 < b₂) : a₁ • b₁ < a₂ • b₂ := (smul_le_smul_of_nonneg_left hb h₁).trans_lt (smul_lt_smul_of_pos_right ha h₂) lemma smul_lt_smul_of_lt_of_le' [PosSMulMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ ≤ b₂) (h₂ : 0 ≤ a₂) (h₁ : 0 < b₁) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_right ha h₁).trans_le (smul_le_smul_of_nonneg_left hb h₂) lemma smul_lt_smul [PosSMulStrictMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ < b₂) (h₁ : 0 < a₁) (h₂ : 0 < b₂) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_left hb h₁).trans (smul_lt_smul_of_pos_right ha h₂) lemma smul_lt_smul' [PosSMulStrictMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ < b₂) (h₂ : 0 < a₂) (h₁ : 0 < b₁) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_right ha h₁).trans (smul_lt_smul_of_pos_left hb h₂) lemma smul_le_smul [PosSMulMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) (h₁ : 0 ≤ a₁) (h₂ : 0 ≤ b₂) : a₁ • b₁ ≤ a₂ • b₂ := (smul_le_smul_of_nonneg_left hb h₁).trans (smul_le_smul_of_nonneg_right ha h₂) lemma smul_le_smul' [PosSMulMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) (h₂ : 0 ≤ a₂) (h₁ : 0 ≤ b₁) : a₁ • b₁ ≤ a₂ • b₂ := (smul_le_smul_of_nonneg_right ha h₁).trans (smul_le_smul_of_nonneg_left hb h₂) end LeftRight end Preorder section LinearOrder variable [Preorder α] [LinearOrder β] section Left variable [Zero α] -- See note [lower instance priority] instance (priority := 100) PosSMulStrictMono.toPosSMulReflectLE [PosSMulStrictMono α β] : PosSMulReflectLE α β where elim _a ha _b₁ _b₂ := (strictMono_smul_left_of_pos ha).le_iff_le.1 lemma PosSMulReflectLE.toPosSMulStrictMono [PosSMulReflectLE α β] : PosSMulStrictMono α β where elim _a ha _b₁ _b₂ hb := not_le.1 fun h ↦ hb.not_le <\| le_of_smul_le_smul_left h ha lemma posSMulStrictMono_iff_PosSMulReflectLE : PosSMulStrictMono α β ↔ PosSMulReflectLE α β := ⟨fun _ ↦ inferInstance, fun _ ↦ PosSMulReflectLE.toPosSMulStrictMono⟩ instance PosSMulMono.toPosSMulReflectLT [PosSMulMono α β] : PosSMulReflectLT α β where elim _a ha _b₁ _b₂ := (monotone_smul_left_of_nonneg ha).reflect_lt lemma PosSMulReflectLT.toPosSMulMono [PosSMulReflectLT α β] : PosSMulMono α β where elim _a ha _b₁ _b₂ hb := not_lt.1 fun h ↦ hb.not_lt <\| lt_of_smul_lt_smul_left h ha lemma posSMulMono_iff_posSMulReflectLT : PosSMulMono α β ↔ PosSMulReflectLT α β := ⟨fun _ ↦ PosSMulMono.toPosSMulReflectLT, fun _ ↦ PosSMulReflectLT.toPosSMulMono⟩ lemma smul_max_of_nonneg [PosSMulMono α β] (ha : 0 ≤ a) (b₁ b₂ : β) : a • max b₁ b₂ = max (a • b₁) (a • b₂) := (monotone_smul_left_of_nonneg ha).map_max lemma smul_min_of_nonneg [PosSMulMono α β] (ha : 0 ≤ a) (b₁ b₂ : β) : a • min b₁ b₂ = min (a • b₁) (a • b₂) := (monotone_smul_left_of_nonneg ha).map_min end Left section Right variable [Zero β] lemma SMulPosReflectLE.toSMulPosStrictMono [SMulPosReflectLE α β] : SMulPosStrictMono α β where elim _b hb _a₁ _a₂ ha := not_le.1 fun h ↦ ha.not_le <\| le_of_smul_le_smul_of_pos_right h hb lemma SMulPosReflectLT.toSMulPosMono [SMulPosReflectLT α β] : SMulPosMono α β where elim _b hb _a₁ _a₂ ha := not_lt.1 fun h ↦ ha.not_lt <\| lt_of_smul_lt_smul_right h hb end Right end LinearOrder section LinearOrder variable [LinearOrder α] [Preorder β] section Right variable [Zero β] -- See note [lower instance priority] instance (priority := 100) SMulPosStrictMono.toSMulPosReflectLE [SMulPosStrictMono α β] : SMulPosReflectLE α β where elim _b hb _a₁ _a₂ h := not_lt.1 fun ha ↦ h.not_lt <\| smul_lt_smul_of_pos_right ha hb lemma SMulPosMono.toSMulPosReflectLT [SMulPosMono α β] : SMulPosReflectLT α β where elim _b hb _a₁ _a₂ h := not_le.1 fun ha ↦ h.not_le <\| smul_le_smul_of_nonneg_right ha hb end Right end LinearOrder section LinearOrder variable [LinearOrder α] [LinearOrder β] section Right variable [Zero β] lemma smulPosStrictMono_iff_SMulPosReflectLE : SMulPosStrictMono α β ↔ SMulPosReflectLE α β := ⟨fun _ ↦ SMulPosStrictMono.toSMulPosReflectLE, fun _ ↦ SMulPosReflectLE.toSMulPosStrictMono⟩ lemma smulPosMono_iff_smulPosReflectLT : SMulPosMono α β ↔ SMulPosReflectLT α β := ⟨fun _ ↦ SMulPosMono.toSMulPosReflectLT, fun _ ↦ SMulPosReflectLT.toSMulPosMono⟩ end Right end LinearOrder end SMul section SMulZeroClass variable [Zero α] [Zero β] [SMulZeroClass α β] section Preorder variable [Preorder α] [Preorder β] lemma smul_pos [PosSMulStrictMono α β] (ha : 0 < a) (hb : 0 < b) : 0 < a • b := by simpa only [smul_zero] using smul_lt_smul_of_pos_left hb ha lemma smul_neg_of_pos_of_neg [PosSMulStrictMono α β] (ha : 0 < a) (hb : b < 0) : a • b < 0 := by simpa only [smul_zero] using smul_lt_smul_of_pos_left hb ha @[simp] lemma smul_pos_iff_of_pos_left [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : 0 < a • b ↔ 0 < b := by simpa only [smul_zero] using smul_lt_smul_iff_of_pos_left ha (b₁ := 0) (b₂ := b) lemma smul_neg_iff_of_pos_left [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : a • b < 0 ↔ b < 0 := by simpa only [smul_zero] using smul_lt_smul_iff_of_pos_left ha (b₂ := (0 : β)) lemma smul_nonneg [PosSMulMono α β] (ha : 0 ≤ a) (hb : 0 ≤ b₁) : 0 ≤ a • b₁ := by simpa only [smul_zero] using smul_le_smul_of_nonneg_left hb ha lemma smul_nonpos_of_nonneg_of_nonpos [PosSMulMono α β] (ha : 0 ≤ a) (hb : b ≤ 0) : a • b ≤ 0 := by simpa only [smul_zero] using smul_le_smul_of_nonneg_left hb ha lemma pos_of_smul_pos_left [PosSMulReflectLT α β] (h : 0 < a • b) (ha : 0 ≤ a) : 0 < b := lt_of_smul_lt_smul_left (by rwa [smul_zero]) ha lemma neg_of_smul_neg_left [PosSMulReflectLT α β] (h : a • b < 0) (ha : 0 ≤ a) : b < 0 := lt_of_smul_lt_smul_left (by rwa [smul_zero]) ha end Preorder end SMulZeroClass section SMulWithZero variable [Zero α] [Zero β] [SMulWithZero α β] section Preorder variable [Preorder α] [Preorder β] lemma smul_pos' [SMulPosStrictMono α β] (ha : 0 < a) (hb : 0 < b) : 0 < a • b := by simpa only [zero_smul] using smul_lt_smul_of_pos_right ha hb lemma smul_neg_of_neg_of_pos [SMulPosStrictMono α β] (ha : a < 0) (hb : 0 < b) : a • b < 0 := by simpa only [zero_smul] using smul_lt_smul_of_pos_right ha hb @[simp] lemma smul_pos_iff_of_pos_right [SMulPosStrictMono α β] [SMulPosReflectLT α β] (hb : 0 < b) : 0 < a • b ↔ 0 < a := by simpa only [zero_smul] using smul_lt_smul_iff_of_pos_right hb (a₁ := 0) (a₂ := a) lemma smul_nonneg' [SMulPosMono α β] (ha : 0 ≤ a) (hb : 0 ≤ b₁) : 0 ≤ a • b₁ := by simpa only [zero_smul] using smul_le_smul_of_nonneg_right ha hb lemma smul_nonpos_of_nonpos_of_nonneg [SMulPosMono α β] (ha : a ≤ 0) (hb : 0 ≤ b) : a • b ≤ 0 := by simpa only [zero_smul] using smul_le_smul_of_nonneg_right ha hb lemma pos_of_smul_pos_right [SMulPosReflectLT α β] (h : 0 < a • b) (hb : 0 ≤ b) : 0 < a := lt_of_smul_lt_smul_right (by rwa [zero_smul]) hb lemma neg_of_smul_neg_right [SMulPosReflectLT α β] (h : a • b < 0) (hb : 0 ≤ b) : a < 0 := lt_of_smul_lt_smul_right (by rwa [zero_smul]) hb lemma pos_iff_pos_of_smul_pos [PosSMulReflectLT α β] [SMulPosReflectLT α β] (hab : 0 < a • b) : 0 < a ↔ 0 < b := ⟨pos_of_smul_pos_left hab ∘ le_of_lt, pos_of_smul_pos_right hab ∘ le_of_lt⟩ end Preorder section PartialOrder variable [PartialOrder α] [Preorder β] /-- A constructor for `PosSMulMono` requiring you to prove `b₁ ≤ b₂ → a • b₁ ≤ a • b₂` only when `0 < a` -/ lemma PosSMulMono.of_pos (h₀ : ∀ a : α, 0 < a → ∀ b₁ b₂ : β, b₁ ≤ b₂ → a • b₁ ≤ a • b₂) : PosSMulMono α β where elim a ha b₁ b₂ h := by obtain ha \| ha := ha.eq_or_lt · simp [← ha] · exact h₀ _ ha _ _ h /-- A constructor for `PosSMulReflectLT` requiring you to prove `a • b₁ < a • b₂ → b₁ < b₂` only when `0 < a` -/ lemma PosSMulReflectLT.of_pos (h₀ : ∀ a : α, 0 < a → ∀ b₁ b₂ : β, a • b₁ < a • b₂ → b₁ < b₂) : PosSMulReflectLT α β where elim a ha b₁ b₂ h := by obtain ha \| ha := ha.eq_or_lt · simp [← ha] at h · exact h₀ _ ha _ _ h end PartialOrder section PartialOrder variable [Preorder α] [PartialOrder β] /-- A constructor for `SMulPosMono` requiring you to prove `a₁ ≤ a₂ → a₁ • b ≤ a₂ • b` only when `0 < b` -/ lemma SMulPosMono.of_pos (h₀ : ∀ b : β, 0 < b → ∀ a₁ a₂ : α, a₁ ≤ a₂ → a₁ • b ≤ a₂ • b) : SMulPosMono α β where elim b hb a₁ a₂ h := by obtain hb \| hb := hb.eq_or_lt · simp [← hb] · exact h₀ _ hb _ _ h /-- A constructor for `SMulPosReflectLT` requiring you to prove `a₁ • b < a₂ • b → a₁ < a₂` only when `0 < b` -/ lemma SMulPosReflectLT.of_pos (h₀ : ∀ b : β, 0 < b → ∀ a₁ a₂ : α, a₁ • b < a₂ • b → a₁ < a₂) : SMulPosReflectLT α β where elim b hb a₁ a₂ h := by obtain hb \| hb := hb.eq_or_lt · simp [← hb] at h · exact h₀ _ hb _ _ h end PartialOrder section PartialOrder variable [PartialOrder α] [PartialOrder β] -- See note [lower instance priority] instance (priority := 100) PosSMulStrictMono.toPosSMulMono [PosSMulStrictMono α β] : PosSMulMono α β := PosSMulMono.of_pos fun _a ha ↦ (strictMono_smul_left_of_pos ha).monotone -- See note [lower instance priority] instance (priority := 100) SMulPosStrictMono.toSMulPosMono [SMulPosStrictMono α β] : SMulPosMono α β := SMulPosMono.of_pos fun _b hb ↦ (strictMono_smul_right_of_pos hb).monotone -- See note [lower instance priority] instance (priority := 100) PosSMulReflectLE.toPosSMulReflectLT [PosSMulReflectLE α β] : PosSMulReflectLT α β := PosSMulReflectLT.of_pos fun a ha b₁ b₂ h ↦ (le_of_smul_le_smul_of_pos_left h.le ha).lt_of_ne <\| by rintro rfl; simp at h -- See note [lower instance priority] instance (priority := 100) SMulPosReflectLE.toSMulPosReflectLT [SMulPosReflectLE α β] : SMulPosReflectLT α β := SMulPosReflectLT.of_pos fun b hb a₁ a₂ h ↦ (le_of_smul_le_smul_of_pos_right h.le hb).lt_of_ne <\| by rintro rfl; simp at h lemma smul_eq_smul_iff_eq_and_eq_of_pos [PosSMulStrictMono α β] [SMulPosStrictMono α β] (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) (h₁ : 0 < a₁) (h₂ : 0 < b₂) : a₁ • b₁ = a₂ • b₂ ↔ a₁ = a₂ ∧ b₁ = b₂ := by refine ⟨fun h ↦ ?_, by rintro ⟨rfl, rfl⟩; rfl⟩ simp only [eq_iff_le_not_lt, ha, hb, true_and] refine ⟨fun ha ↦ h.not_lt ?_, fun hb ↦ h.not_lt ?_⟩ · exact (smul_le_smul_of_nonneg_left hb h₁.le).trans_lt (smul_lt_smul_of_pos_right ha h₂) · exact (smul_lt_smul_of_pos_left hb h₁).trans_le (smul_le_smul_of_nonneg_right ha h₂.le) lemma smul_eq_smul_iff_eq_and_eq_of_pos' [PosSMulStrictMono α β] [SMulPosStrictMono α β] (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) (h₂ : 0 < a₂) (h₁ : 0 < b₁) : a₁ • b₁ = a₂ • b₂ ↔ a₁ = a₂ ∧ b₁ = b₂ := by refine ⟨fun h ↦ ?_, by rintro ⟨rfl, rfl⟩; rfl⟩ simp only [eq_iff_le_not_lt, ha, hb, true_and] refine ⟨fun ha ↦ h.not_lt ?_, fun hb ↦ h.not_lt ?_⟩ · exact (smul_lt_smul_of_pos_right ha h₁).trans_le (smul_le_smul_of_nonneg_left hb h₂.le) · exact (smul_le_smul_of_nonneg_right ha h₁.le).trans_lt (smul_lt_smul_of_pos_left hb h₂) end PartialOrder section LinearOrder variable [LinearOrder α] [LinearOrder β] lemma pos_and_pos_or_neg_and_neg_of_smul_pos [PosSMulMono α β] [SMulPosMono α β] (hab : 0 < a • b) : 0 < a ∧ 0 < b ∨ a < 0 ∧ b < 0 := by obtain ha \| rfl \| ha := lt_trichotomy a 0 · refine Or.inr ⟨ha, lt_imp_lt_of_le_imp_le (fun hb ↦ ?_) hab⟩ exact smul_nonpos_of_nonpos_of_nonneg ha.le hb · rw [zero_smul] at hab exact hab.false.elim · refine Or.inl ⟨ha, lt_imp_lt_of_le_imp_le (fun hb ↦ ?_) hab⟩ exact smul_nonpos_of_nonneg_of_nonpos ha.le hb lemma neg_of_smul_pos_right [PosSMulMono α β] [SMulPosMono α β] (h : 0 < a • b) (ha : a ≤ 0) : b < 0 := ((pos_and_pos_or_neg_and_neg_of_smul_pos h).resolve_left fun h ↦ h.1.not_le ha).2 lemma neg_of_smul_pos_left [PosSMulMono α β] [SMulPosMono α β] (h : 0 < a • b) (ha : b ≤ 0) : a < 0 := ((pos_and_pos_or_neg_and_neg_of_smul_pos h).resolve_left fun h ↦ h.2.not_le ha).1 lemma neg_iff_neg_of_smul_pos [PosSMulMono α β] [SMulPosMono α β] (hab : 0 < a • b) : a < 0 ↔ b < 0 := ⟨neg_of_smul_pos_right hab ∘ le_of_lt, neg_of_smul_pos_left hab ∘ le_of_lt⟩ lemma neg_of_smul_neg_left' [SMulPosMono α β] (h : a • b < 0) (ha : 0 ≤ a) : b < 0 := lt_of_not_ge fun hb ↦ (smul_nonneg' ha hb).not_lt h lemma neg_of_smul_neg_right' [PosSMulMono α β] (h : a • b < 0) (hb : 0 ≤ b) : a < 0 := lt_of_not_ge fun ha ↦ (smul_nonneg ha hb).not_lt h end LinearOrder end SMulWithZero section MulAction variable [Monoid α] [Zero β] [MulAction α β] section Preorder variable [Preorder α] [Preorder β] @[simp] lemma le_smul_iff_one_le_left [SMulPosMono α β] [SMulPosReflectLE α β] (hb : 0 < b) : b ≤ a • b ↔ 1 ≤ a := Iff.trans (by rw [one_smul]) (smul_le_smul_iff_of_pos_right hb) @[simp] lemma lt_smul_iff_one_lt_left [SMulPosStrictMono α β] [SMulPosReflectLT α β] (hb : 0 < b) : b < a • b ↔ 1 < a := Iff.trans (by rw [one_smul]) (smul_lt_smul_iff_of_pos_right hb) @[simp] lemma smul_le_iff_le_one_left [SMulPosMono α β] [SMulPosReflectLE α β] (hb : 0 < b) : a • b ≤ b ↔ a ≤ 1 := Iff.trans (by rw [one_smul]) (smul_le_smul_iff_of_pos_right hb) @[simp] lemma smul_lt_iff_lt_one_left [SMulPosStrictMono α β] [SMulPosReflectLT α β] (hb : 0 < b) : a • b < b ↔ a < 1 := Iff.trans (by rw [one_smul]) (smul_lt_smul_iff_of_pos_right hb) lemma smul_le_of_le_one_left [SMulPosMono α β] (hb : 0 ≤ b) (h : a ≤ 1) : a • b ≤ b := by simpa only [one_smul] using smul_le_smul_of_nonneg_right h hb lemma le_smul_of_one_le_left [SMulPosMono α β] (hb : 0 ≤ b) (h : 1 ≤ a) : b ≤ a • b := by simpa only [one_smul] using smul_le_smul_of_nonneg_right h hb lemma smul_lt_of_lt_one_left [SMulPosStrictMono α β] (hb : 0 < b) (h : a < 1) : a • b < b := by simpa only [one_smul] using smul_lt_smul_of_pos_right h hb lemma lt_smul_of_one_lt_left [SMulPosStrictMono α β] (hb : 0 < b) (h : 1 < a) : b < a • b := by simpa only [one_smul] using smul_lt_smul_of_pos_right h hb end Preorder end MulAction section Semiring variable [Semiring α] [AddCommGroup β] [Module α β] [NoZeroSMulDivisors α β] section PartialOrder variable [Preorder α] [PartialOrder β] lemma PosSMulMono.toPosSMulStrictMono [PosSMulMono α β] : PosSMulStrictMono α β := ⟨fun _a ha _b₁ _b₂ hb ↦ (smul_le_smul_of_nonneg_left hb.le ha.le).lt_of_ne <\| (smul_right_injective _ ha.ne').ne hb.ne⟩ instance PosSMulReflectLT.toPosSMulReflectLE [PosSMulReflectLT α β] : PosSMulReflectLE α β := ⟨fun _a ha _b₁ _b₂ h ↦ h.eq_or_lt.elim (fun h ↦ (smul_right_injective _ ha.ne' h).le) fun h' ↦ (lt_of_smul_lt_smul_left h' ha.le).le⟩ end PartialOrder section PartialOrder variable [PartialOrder α] [PartialOrder β] lemma posSMulMono_iff_posSMulStrictMono : PosSMulMono α β ↔ PosSMulStrictMono α β := ⟨fun _ ↦ PosSMulMono.toPosSMulStrictMono, fun _ ↦ inferInstance⟩ lemma PosSMulReflectLE_iff_posSMulReflectLT : PosSMulReflectLE α β ↔ PosSMulReflectLT α β := ⟨fun _ ↦ inferInstance, fun _ ↦ PosSMulReflectLT.toPosSMulReflectLE⟩ end PartialOrder end Semiring section Ring variable [Ring α] [AddCommGroup β] [Module α β] [NoZeroSMulDivisors α β] section PartialOrder variable [PartialOrder α] [PartialOrder β] lemma SMulPosMono.toSMulPosStrictMono [SMulPosMono α β] : SMulPosStrictMono α β := ⟨fun _b hb _a₁ _a₂ ha ↦ (smul_le_smul_of_nonneg_right ha.le hb.le).lt_of_ne <\| (smul_left_injective _ hb.ne').ne ha.ne⟩ lemma smulPosMono_iff_smulPosStrictMono : SMulPosMono α β ↔ SMulPosStrictMono α β := ⟨fun _ ↦ SMulPosMono.toSMulPosStrictMono, fun _ ↦ inferInstance⟩ lemma SMulPosReflectLT.toSMulPosReflectLE [SMulPosReflectLT α β] : SMulPosReflectLE α β := ⟨fun _b hb _a₁ _a₂ h ↦ h.eq_or_lt.elim (fun h ↦ (smul_left_injective _ hb.ne' h).le) fun h' ↦ (lt_of_smul_lt_smul_right h' hb.le).le⟩ lemma SMulPosReflectLE_iff_smulPosReflectLT : SMulPosReflectLE α β ↔ SMulPosReflectLT α β := ⟨fun _ ↦ inferInstance, fun _ ↦ SMulPosReflectLT.toSMulPosReflectLE⟩ end PartialOrder end Ring section GroupWithZero variable [GroupWithZero α] [Preorder α] [Preorder β] [MulAction α β] lemma inv_smul_le_iff_of_pos [PosSMulMono α β] [PosSMulReflectLE α β] (ha : 0 < a) : a⁻¹ • b₁ ≤ b₂ ↔ b₁ ≤ a • b₂ := by rw [← smul_le_smul_iff_of_pos_left ha, smul_inv_smul₀ ha.ne'] lemma le_inv_smul_iff_of_pos [PosSMulMono α β] [PosSMulReflectLE α β] (ha : 0 < a) : b₁ ≤ a⁻¹ • b₂ ↔ a • b₁ ≤ b₂ := by rw [← smul_le_smul_iff_of_pos_left ha, smul_inv_smul₀ ha.ne'] lemma inv_smul_lt_iff_of_pos [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : a⁻¹ • b₁ < b₂ ↔ b₁ < a • b₂ := by rw [← smul_lt_smul_iff_of_pos_left ha, smul_inv_smul₀ ha.ne'] lemma lt_inv_smul_iff_of_pos [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : b₁ < a⁻¹ • b₂ ↔ a • b₁ < b₂ := by rw [← smul_lt_smul_iff_of_pos_left ha, smul_inv_smul₀ ha.ne'] /-- Right scalar multiplication as an order isomorphism. -/ @[simps!] def OrderIso.smulRight [PosSMulMono α β] [PosSMulReflectLE α β] {a : α} (ha : 0 < a) : β ≃o β where toEquiv := Equiv.smulRight ha.ne' map_rel_iff' := smul_le_smul_iff_of_pos_left ha end GroupWithZero namespace OrderDual section Left variable [Preorder α] [Preorder β] [SMul α β] [Zero α] instance instPosSMulMono [PosSMulMono α β] : PosSMulMono α βᵒᵈ where elim _a ha _b₁ _b₂ hb := smul_le_smul_of_nonneg_left (β := β) hb ha instance instPosSMulStrictMono [PosSMulStrictMono α β] : PosSMulStrictMono α βᵒᵈ where elim _a ha _b₁ _b₂ hb := smul_lt_smul_of_pos_left (β := β) hb ha instance instPosSMulReflectLT [PosSMulReflectLT α β] : PosSMulReflectLT α βᵒᵈ where elim _a ha _b₁ _b₂ h := lt_of_smul_lt_smul_of_nonneg_left (β := β) h ha instance instPosSMulReflectLE [PosSMulReflectLE α β] : PosSMulReflectLE α βᵒᵈ where elim _a ha _b₁ _b₂ h := le_of_smul_le_smul_of_pos_left (β := β) h ha end Left section Right variable [Preorder α] [Monoid α] [AddCommGroup β] [PartialOrder β] [IsOrderedAddMonoid β] [DistribMulAction α β] instance instSMulPosMono [SMulPosMono α β] : SMulPosMono α βᵒᵈ where elim _b hb a₁ a₂ ha := by rw [← neg_le_neg_iff, ← smul_neg, ← smul_neg] exact smul_le_smul_of_nonneg_right (β := β) ha <\| neg_nonneg.2 hb instance instSMulPosStrictMono [SMulPosStrictMono α β] : SMulPosStrictMono α βᵒᵈ where elim _b hb a₁ a₂ ha := by rw [← neg_lt_neg_iff, ← smul_neg, ← smul_neg] exact smul_lt_smul_of_pos_right (β := β) ha <\| neg_pos.2 hb instance instSMulPosReflectLT [SMulPosReflectLT α β] : SMulPosReflectLT α βᵒᵈ where elim _b hb a₁ a₂ h := by rw [← neg_lt_neg_iff, ← smul_neg, ← smul_neg] at h exact lt_of_smul_lt_smul_right (β := β) h <\| neg_nonneg.2 hb instance instSMulPosReflectLE [SMulPosReflectLE α β] : SMulPosReflectLE α βᵒᵈ where elim _b hb a₁ a₂ h := by rw [← neg_le_neg_iff, ← smul_neg, ← smul_neg] at h exact le_of_smul_le_smul_right (β := β) h <\| neg_pos.2 hb end Right end OrderDual section OrderedAddCommMonoid variable [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] [ExistsAddOfLE α] [AddCommMonoid β] [PartialOrder β] [IsOrderedCancelAddMonoid β] [Module α β] section PosSMulMono variable [PosSMulMono α β] {a₁ a₂ : α} {b₁ b₂ : β} /-- Binary rearrangement inequality. -/ lemma smul_add_smul_le_smul_add_smul (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) : a₁ • b₂ + a₂ • b₁ ≤ a₁ • b₁ + a₂ • b₂ := by obtain ⟨a, ha₀, rfl⟩ := exists_nonneg_add_of_le ha rw [add_smul, add_smul, add_left_comm] gcongr /-- Binary rearrangement inequality. -/ lemma smul_add_smul_le_smul_add_smul' (ha : a₂ ≤ a₁) (hb : b₂ ≤ b₁) : a₁ • b₂ + a₂ • b₁ ≤ a₁ • b₁ + a₂ • b₂ := by simp_rw [add_comm (a₁ • _)]; exact smul_add_smul_le_smul_add_smul ha hb end PosSMulMono section PosSMulStrictMono variable [PosSMulStrictMono α β] {a₁ a₂ : α} {b₁ b₂ : β} /-- Binary strict rearrangement inequality. -/ lemma smul_add_smul_lt_smul_add_smul (ha : a₁ < a₂) (hb : b₁ < b₂) : a₁ • b₂ + a₂ • b₁ < a₁ • b₁ + a₂ • b₂ := by obtain ⟨a, ha₀, rfl⟩ := lt_iff_exists_pos_add.1 ha rw [add_smul, add_smul, add_left_comm] gcongr /-- Binary strict rearrangement inequality. -/ lemma smul_add_smul_lt_smul_add_smul' (ha : a₂ < a₁) (hb : b₂ < b₁) : a₁ • b₂ + a₂ • b₁ < a₁ • b₁ + a₂ • b₂ := by simp_rw [add_comm (a₁ • _)]; exact smul_add_smul_lt_smul_add_smul ha hb end PosSMulStrictMono end OrderedAddCommMonoid section OrderedRing variable [Ring α] [PartialOrder α] [IsOrderedRing α] section OrderedAddCommGroup variable [AddCommGroup β] [PartialOrder β] [IsOrderedAddMonoid β] [Module α β] section PosSMulMono variable [PosSMulMono α β] lemma smul_le_smul_of_nonpos_left (h : b₁ ≤ b₂) (ha : a ≤ 0) : a • b₂ ≤ a • b₁ := by rw [← neg_neg a, neg_smul, neg_smul (-a), neg_le_neg_iff] exact smul_le_smul_of_nonneg_left h (neg_nonneg_of_nonpos ha) lemma antitone_smul_left (ha : a ≤ 0) : Antitone ((a • ·) : β → β) := fun _ _ h ↦ smul_le_smul_of_nonpos_left h ha instance PosSMulMono.toSMulPosMono : SMulPosMono α β where elim _b hb a₁ a₂ ha := by rw [← sub_nonneg, ← sub_smul]; exact smul_nonneg (sub_nonneg.2 ha) hb end PosSMulMono section PosSMulStrictMono variable [PosSMulStrictMono α β] lemma smul_lt_smul_of_neg_left (hb : b₁ < b₂) (ha : a < 0) : a • b₂ < a • b₁ := by rw [← neg_neg a, neg_smul, neg_smul (-a), neg_lt_neg_iff] exact smul_lt_smul_of_pos_left hb (neg_pos_of_neg ha) lemma strictAnti_smul_left (ha : a < 0) : StrictAnti ((a • ·) : β → β) := fun _ _ h ↦ smul_lt_smul_of_neg_left h ha instance PosSMulStrictMono.toSMulPosStrictMono : SMulPosStrictMono α β where elim _b hb a₁ a₂ ha := by rw [← sub_pos, ← sub_smul]; exact smul_pos (sub_pos.2 ha) hb end PosSMulStrictMono lemma le_of_smul_le_smul_of_neg [PosSMulReflectLE α β] (h : a • b₁ ≤ a • b₂) (ha : a < 0) : b₂ ≤ b₁ := by rw [← neg_neg a, neg_smul, neg_smul (-a), neg_le_neg_iff] at h exact le_of_smul_le_smul_of_pos_left h <\| neg_pos.2 ha lemma lt_of_smul_lt_smul_of_nonpos [PosSMulReflectLT α β] (h : a • b₁ < a • b₂) (ha : a ≤ 0) : b₂ < b₁ := by rw [← neg_neg a, neg_smul, neg_smul (-a), neg_lt_neg_iff] at h exact lt_of_smul_lt_smul_of_nonneg_left h (neg_nonneg_of_nonpos ha) omit [IsOrderedRing α] in lemma smul_nonneg_of_nonpos_of_nonpos [SMulPosMono α β] (ha : a ≤ 0) (hb : b ≤ 0) : 0 ≤ a • b := smul_nonpos_of_nonpos_of_nonneg (β := βᵒᵈ) ha hb lemma smul_le_smul_iff_of_neg_left [PosSMulMono α β] [PosSMulReflectLE α β] (ha : a < 0) : a • b₁ ≤ a • b₂ ↔ b₂ ≤ b₁ := by rw [← neg_neg a, neg_smul, neg_smul (-a), neg_le_neg_iff] exact smul_le_smul_iff_of_pos_left (neg_pos_of_neg ha) section PosSMulStrictMono variable [PosSMulStrictMono α β] [PosSMulReflectLT α β] lemma smul_lt_smul_iff_of_neg_left (ha : a < 0) : a • b₁ < a • b₂ ↔ b₂ < b₁ := by rw [← neg_neg a, neg_smul, neg_smul (-a), neg_lt_neg_iff] exact smul_lt_smul_iff_of_pos_left (neg_pos_of_neg ha) lemma smul_pos_iff_of_neg_left (ha : a < 0) : 0 < a • b ↔ b < 0 := by simpa only [smul_zero] using smul_lt_smul_iff_of_neg_left ha (b₁ := (0 : β)) alias ⟨_, smul_pos_of_neg_of_neg⟩ := smul_pos_iff_of_neg_left lemma smul_neg_iff_of_neg_left (ha : a < 0) : a • b < 0 ↔ 0 < b := by simpa only [smul_zero] using smul_lt_smul_iff_of_neg_left ha (b₂ := (0 : β)) end PosSMulStrictMono end OrderedAddCommGroup section LinearOrderedAddCommGroup variable [AddCommGroup β] [LinearOrder β] [IsOrderedAddMonoid β] [Module α β] [PosSMulMono α β] {a : α} {b b₁ b₂ : β} lemma smul_max_of_nonpos (ha : a ≤ 0) (b₁ b₂ : β) : a • max b₁ b₂ = min (a • b₁) (a • b₂) := (antitone_smul_left ha : Antitone (_ : β → β)).map_max lemma smul_min_of_nonpos (ha : a ≤ 0) (b₁ b₂ : β) : a • min b₁ b₂ = max (a • b₁) (a • b₂) := (antitone_smul_left ha : Antitone (_ : β → β)).map_min end LinearOrderedAddCommGroup end OrderedRing section LinearOrderedRing variable [Ring α] [LinearOrder α] [IsStrictOrderedRing α] [AddCommGroup β] [LinearOrder β] [IsOrderedAddMonoid β] [Module α β] [PosSMulStrictMono α β] {a : α} {b : β} lemma nonneg_and_nonneg_or_nonpos_and_nonpos_of_smul_nonneg (hab : 0 ≤ a • b) : 0 ≤ a ∧ 0 ≤ b ∨ a ≤ 0 ∧ b ≤ 0 := by simp only [Decidable.or_iff_not_not_and_not, not_and, not_le] refine fun ab nab ↦ hab.not_lt ?_ obtain ha \| rfl \| ha := lt_trichotomy 0 a exacts [smul_neg_of_pos_of_neg ha (ab ha.le), ((ab le_rfl).asymm (nab le_rfl)).elim, smul_neg_of_neg_of_pos ha (nab ha.le)] lemma smul_nonneg_iff : 0 ≤ a • b ↔ 0 ≤ a ∧ 0 ≤ b ∨ a ≤ 0 ∧ b ≤ 0 := ⟨nonneg_and_nonneg_or_nonpos_and_nonpos_of_smul_nonneg, fun h ↦ h.elim (and_imp.2 smul_nonneg) (and_imp.2 smul_nonneg_of_nonpos_of_nonpos)⟩ lemma smul_nonpos_iff : a • b ≤ 0 ↔ 0 ≤ a ∧ b ≤ 0 ∨ a ≤ 0 ∧ 0 ≤ b := by rw [← neg_nonneg, ← smul_neg, smul_nonneg_iff, neg_nonneg, neg_nonpos] lemma smul_nonneg_iff_pos_imp_nonneg : 0 ≤ a • b ↔ (0 < a → 0 ≤ b) ∧ (0 < b → 0 ≤ a) := smul_nonneg_iff.trans <\| by simp_rw [← not_le, ← or_iff_not_imp_left]; have := le_total a 0; have := le_total b 0; tauto lemma smul_nonneg_iff_neg_imp_nonpos : 0 ≤ a • b ↔ (a < 0 → b ≤ 0) ∧ (b < 0 → a ≤ 0) := by rw [← neg_smul_neg, smul_nonneg_iff_pos_imp_nonneg]; simp only [neg_pos, neg_nonneg] lemma smul_nonpos_iff_pos_imp_nonpos : a • b ≤ 0 ↔ (0 < a → b ≤ 0) ∧ (b < 0 → 0 ≤ a) := by rw [← neg_nonneg, ← smul_neg, smul_nonneg_iff_pos_imp_nonneg]; simp only [neg_pos, neg_nonneg] lemma smul_nonpos_iff_neg_imp_nonneg : a • b ≤ 0 ↔ (a < 0 → 0 ≤ b) ∧ (0 < b → a ≤ 0) := by rw [← neg_nonneg, ← neg_smul, smul_nonneg_iff_pos_imp_nonneg]; simp only [neg_pos, neg_nonneg] end LinearOrderedRing section LinearOrderedSemifield variable [Semifield α] [LinearOrder α] [IsStrictOrderedRing α] [AddCommGroup β] [PartialOrder β] -- See note [lower instance priority] instance (priority := 100) PosSMulMono.toPosSMulReflectLE [MulAction α β] [PosSMulMono α β] : PosSMulReflectLE α β where elim _a ha b₁ b₂ h := by simpa [ha.ne'] using smul_le_smul_of_nonneg_left h <\| inv_nonneg.2 ha.le -- See note [lower instance priority] instance (priority := 100) PosSMulStrictMono.toPosSMulReflectLT [MulActionWithZero α β] [PosSMulStrictMono α β] : PosSMulReflectLT α β := PosSMulReflectLT.of_pos fun a ha b₁ b₂ h ↦ by simpa [ha.ne'] using smul_lt_smul_of_pos_left h <\| inv_pos.2 ha end LinearOrderedSemifield section Field variable [Field α] [LinearOrder α] [IsStrictOrderedRing α] [AddCommGroup β] [PartialOrder β] [IsOrderedAddMonoid β] [Module α β] {a : α} {b₁ b₂ : β} section PosSMulMono variable [PosSMulMono α β] lemma inv_smul_le_iff_of_neg (h : a < 0) : a⁻¹ • b₁ ≤ b₂ ↔ a • b₂ ≤ b₁ := by rw [← smul_le_smul_iff_of_neg_left h, smul_inv_smul₀ h.ne] lemma smul_inv_le_iff_of_neg (h : a < 0) : b₁ ≤ a⁻¹ • b₂ ↔ b₂ ≤ a • b₁ := by rw [← smul_le_smul_iff_of_neg_left h, smul_inv_smul₀ h.ne] variable (β) /-- Left scalar multiplication as an order isomorphism. -/ @[simps!] def OrderIso.smulRightDual (ha : a < 0) : β ≃o βᵒᵈ where toEquiv := (Equiv.smulRight ha.ne).trans toDual map_rel_iff' := (@OrderDual.toDual_le_toDual β).trans <\| smul_le_smul_iff_of_neg_left ha end PosSMulMono variable [PosSMulStrictMono α β] lemma inv_smul_lt_iff_of_neg (h : a < 0) : a⁻¹ • b₁ < b₂ ↔ a • b₂ < b₁ := by rw [← smul_lt_smul_iff_of_neg_left h, smul_inv_smul₀ h.ne] lemma smul_inv_lt_iff_of_neg (h : a < 0) : b₁ < a⁻¹ • b₂ ↔ b₂ < a • b₁ := by rw [← smul_lt_smul_iff_of_neg_left h, smul_inv_smul₀ h.ne] end Field namespace Pi variable {ι : Type} {β : ι → Type} [Zero α] [∀ i, Zero (β i)] section SMulZeroClass variable [Preorder α] [∀ i, Preorder (β i)] [∀ i, SMulZeroClass α (β i)] instance instPosSMulMono [∀ i, PosSMulMono α (β i)] : PosSMulMono α (∀ i, β i) where elim _a ha _b₁ _b₂ hb i := smul_le_smul_of_nonneg_left (hb i) ha instance instSMulPosMono [∀ i, SMulPosMono α (β i)] : SMulPosMono α (∀ i, β i) where elim _b hb _a₁ _a₂ ha i := smul_le_smul_of_nonneg_right ha (hb i) instance instPosSMulReflectLE [∀ i, PosSMulReflectLE α (β i)] : PosSMulReflectLE α (∀ i, β i) where elim _a ha _b₁ _b₂ h i := le_of_smul_le_smul_left (h i) ha instance instSMulPosReflectLE [∀ i, SMulPosReflectLE α (β i)] : SMulPosReflectLE α (∀ i, β i) where elim _b hb _a₁ _a₂ h := by obtain ⟨-, i, hi⟩ := lt_def.1 hb; exact le_of_smul_le_smul_right (h _) hi end SMulZeroClass section SMulWithZero variable [PartialOrder α] [∀ i, PartialOrder (β i)] [∀ i, SMulWithZero α (β i)] instance instPosSMulStrictMono [∀ i, PosSMulStrictMono α (β i)] : PosSMulStrictMono α (∀ i, β i) where elim := by simp_rw [lt_def] rintro _a ha _b₁ _b₂ ⟨hb, i, hi⟩ exact ⟨smul_le_smul_of_nonneg_left hb ha.le, i, smul_lt_smul_of_pos_left hi ha⟩ instance instSMulPosStrictMono [∀ i, SMulPosStrictMono α (β i)] : SMulPosStrictMono α (∀ i, β i) where elim := by simp_rw [lt_def] rintro a ⟨ha, i, hi⟩ _b₁ _b₂ hb exact ⟨smul_le_smul_of_nonneg_right hb.le ha, i, smul_lt_smul_of_pos_right hb hi⟩ -- Note: There is no interesting instance for `PosSMulReflectLT α (∀ i, β i)` that's not already -- implied by the other instances instance instSMulPosReflectLT [∀ i, SMulPosReflectLT α (β i)] : SMulPosReflectLT α (∀ i, β i) where elim := by simp_rw [lt_def] rintro b hb _a₁ _a₂ ⟨-, i, hi⟩ exact lt_of_smul_lt_smul_right hi <\| hb _ end SMulWithZero end Pi section Lift variable {γ : Type} [Preorder α] [Preorder β] [Preorder γ] [SMul α β] [SMul α γ] (f : β → γ) section variable [Zero α] lemma PosSMulMono.lift [PosSMulMono α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) : PosSMulMono α β where elim a ha b₁ b₂ hb := by simp only [← hf, smul] at ; exact smul_le_smul_of_nonneg_left hb ha lemma PosSMulStrictMono.lift [PosSMulStrictMono α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) : PosSMulStrictMono α β where elim a ha b₁ b₂ hb := by simp only [← lt_iff_lt_of_le_iff_le' hf hf, smul] at ; exact smul_lt_smul_of_pos_left hb ha lemma PosSMulReflectLE.lift [PosSMulReflectLE α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) : PosSMulReflectLE α β where elim a ha b₁ b₂ h := hf.1 <\| le_of_smul_le_smul_left (by simpa only [smul] using hf.2 h) ha lemma PosSMulReflectLT.lift [PosSMulReflectLT α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) : PosSMulReflectLT α β where elim a ha b₁ b₂ h := by simp only [← lt_iff_lt_of_le_iff_le' hf hf, smul] at ; exact lt_of_smul_lt_smul_left h ha end section variable [Zero β] [Zero γ] lemma SMulPosMono.lift [SMulPosMono α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) (zero : f 0 = 0) : SMulPosMono α β where elim b hb a₁ a₂ ha := by simp only [← hf, zero, smul] at ; exact smul_le_smul_of_nonneg_right ha hb lemma SMulPosStrictMono.lift [SMulPosStrictMono α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) (zero : f 0 = 0) : SMulPosStrictMono α β where elim b hb a₁ a₂ ha := by simp only [← lt_iff_lt_of_le_iff_le' hf hf, zero, smul] at * exact smul_lt_smul_of_pos_right ha hb lemma SMulPosReflectLE.lift [SMulPosReflectLE α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) (zero : f 0 = 0) : SMulPosReflectLE α β where elim b hb a₁ a₂ h := by simp only [← hf, ← lt_iff_lt_of_le_iff_le' hf hf, zero, smul] at * exact le_of_smul_le_smul_right h hb lemma SMulPosReflectLT.lift [SMulPosReflectLT α γ] (hf : ∀ {b₁ b₂}, f b₁ ≤ f b₂ ↔ b₁ ≤ b₂) (smul : ∀ (a : α) b, f (a • b) = a • f b) (zero : f 0 = 0) : SMulPosReflectLT α β where elim b hb a₁ a₂ h := by simp only [← hf, ← lt_iff_lt_of_le_iff_le' hf hf, zero, smul] at * exact lt_of_smul_lt_smul_right h hb end end Lift	section Nat instance OrderedSemiring.toPosSMulMonoNat [Semiring α] [PartialOrder α] [IsOrderedRing α] : PosSMulMono ℕ α where	Mathlib/Algebra/Order/Module/Defs.lean	1,127	1,130
/- 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.Probability.Independence.Basic import Mathlib.Probability.Independence.Conditional /-! # Kolmogorov's 0-1 law Let `s : ι → MeasurableSpace Ω` be an independent sequence of sub-σ-algebras. Then any set which is measurable with respect to the tail σ-algebra `limsup s atTop` has probability 0 or 1. ## Main statements * `measure_zero_or_one_of_measurableSet_limsup_atTop`: Kolmogorov's 0-1 law. Any set which is measurable with respect to the tail σ-algebra `limsup s atTop` of an independent sequence of σ-algebras `s` has probability 0 or 1. -/ open MeasureTheory MeasurableSpace open scoped MeasureTheory ENNReal namespace ProbabilityTheory variable {α Ω ι : Type*} {_mα : MeasurableSpace α} {s : ι → MeasurableSpace Ω} {m m0 : MeasurableSpace Ω} {κ : Kernel α Ω} {μα : Measure α} {μ : Measure Ω} theorem Kernel.measure_eq_zero_or_one_or_top_of_indepSet_self {t : Set Ω} (h_indep : Kernel.IndepSet t t κ μα) : ∀ᵐ a ∂μα, κ a t = 0 ∨ κ a t = 1 ∨ κ a t = ∞ := by specialize h_indep t t (measurableSet_generateFrom (Set.mem_singleton t)) (measurableSet_generateFrom (Set.mem_singleton t)) filter_upwards [h_indep] with a ha by_cases h0 : κ a t = 0 · exact Or.inl h0 by_cases h_top : κ a t = ∞ · exact Or.inr (Or.inr h_top) rw [← one_mul (κ a (t ∩ t)), Set.inter_self, ENNReal.mul_left_inj h0 h_top] at ha exact Or.inr (Or.inl ha.symm) theorem measure_eq_zero_or_one_or_top_of_indepSet_self {t : Set Ω} (h_indep : IndepSet t t μ) : μ t = 0 ∨ μ t = 1 ∨ μ t = ∞ := by simpa only [ae_dirac_eq, Filter.eventually_pure] using Kernel.measure_eq_zero_or_one_or_top_of_indepSet_self h_indep theorem Kernel.measure_eq_zero_or_one_of_indepSet_self' (h : ∀ᵐ a ∂μα, IsFiniteMeasure (κ a)) {t : Set Ω} (h_indep : IndepSet t t κ μα) : ∀ᵐ a ∂μα, κ a t = 0 ∨ κ a t = 1 := by filter_upwards [measure_eq_zero_or_one_or_top_of_indepSet_self h_indep, h] with a h_0_1_top h' simpa only [measure_ne_top (κ a), or_false] using h_0_1_top theorem Kernel.measure_eq_zero_or_one_of_indepSet_self [h : ∀ a, IsFiniteMeasure (κ a)] {t : Set Ω} (h_indep : IndepSet t t κ μα) : ∀ᵐ a ∂μα, κ a t = 0 ∨ κ a t = 1 := Kernel.measure_eq_zero_or_one_of_indepSet_self' (ae_of_all μα h) h_indep theorem measure_eq_zero_or_one_of_indepSet_self [IsFiniteMeasure μ] {t : Set Ω} (h_indep : IndepSet t t μ) : μ t = 0 ∨ μ t = 1 := by simpa only [ae_dirac_eq, Filter.eventually_pure] using Kernel.measure_eq_zero_or_one_of_indepSet_self h_indep	theorem condExp_eq_zero_or_one_of_condIndepSet_self [StandardBorelSpace Ω] (hm : m ≤ m0) [hμ : IsFiniteMeasure μ] {t : Set Ω} (ht : MeasurableSet t) (h_indep : CondIndepSet m hm t t μ) : ∀ᵐ ω ∂μ, (μ⟦t \| m⟧) ω = 0 ∨ (μ⟦t \| m⟧) ω = 1 := by -- TODO: Why is not inferred? have (a) : IsFiniteMeasure (condExpKernel μ m a) := inferInstance have h := ae_of_ae_trim hm (Kernel.measure_eq_zero_or_one_of_indepSet_self h_indep) filter_upwards [condExpKernel_ae_eq_condExp hm ht, h] with ω hω_eq hω rwa [← hω_eq, measureReal_eq_zero_iff, measureReal_def, ENNReal.toReal_eq_one_iff]	Mathlib/Probability/Independence/ZeroOne.lean	64	74
/- Copyright (c) 2021 Aaron Anderson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Aaron Anderson -/ import Mathlib.Algebra.Group.Support import Mathlib.Algebra.Order.Monoid.Unbundled.WithTop import Mathlib.Order.WellFoundedSet /-! # Hahn Series If `Γ` is ordered and `R` has zero, then `HahnSeries Γ R` consists of formal series over `Γ` with coefficients in `R`, whose supports are partially well-ordered. With further structure on `R` and `Γ`, we can add further structure on `HahnSeries Γ R`, with the most studied case being when `Γ` is a linearly ordered abelian group and `R` is a field, in which case `HahnSeries Γ R` is a valued field, with value group `Γ`. These generalize Laurent series (with value group `ℤ`), and Laurent series are implemented that way in the file `Mathlib/RingTheory/LaurentSeries.lean`. ## Main Definitions * If `Γ` is ordered and `R` has zero, then `HahnSeries Γ R` consists of formal series over `Γ` with coefficients in `R`, whose supports are partially well-ordered. * `support x` is the subset of `Γ` whose coefficients are nonzero. * `single a r` is the Hahn series which has coefficient `r` at `a` and zero otherwise. * `orderTop x` is a minimal element of `WithTop Γ` where `x` has a nonzero coefficient if `x ≠ 0`, and is `⊤` when `x = 0`. * `order x` is a minimal element of `Γ` where `x` has a nonzero coefficient if `x ≠ 0`, and is zero when `x = 0`. * `map` takes each coefficient of a Hahn series to its target under a zero-preserving map. * `embDomain` preserves coefficients, but embeds the index set `Γ` in a larger poset. ## References - [J. van der Hoeven, Operators on Generalized Power Series][van_der_hoeven] -/ open Finset Function noncomputable section /-- If `Γ` is linearly ordered and `R` has zero, then `HahnSeries Γ R` consists of formal series over `Γ` with coefficients in `R`, whose supports are well-founded. -/ @[ext] structure HahnSeries (Γ : Type) (R : Type) [PartialOrder Γ] [Zero R] where /-- The coefficient function of a Hahn Series. -/ coeff : Γ → R isPWO_support' : (Function.support coeff).IsPWO variable {Γ Γ' R S : Type} namespace HahnSeries section Zero variable [PartialOrder Γ] [Zero R] theorem coeff_injective : Injective (coeff : HahnSeries Γ R → Γ → R) := fun _ _ => HahnSeries.ext @[simp] theorem coeff_inj {x y : HahnSeries Γ R} : x.coeff = y.coeff ↔ x = y := coeff_injective.eq_iff /-- The support of a Hahn series is just the set of indices whose coefficients are nonzero. Notably, it is well-founded. -/ nonrec def support (x : HahnSeries Γ R) : Set Γ := support x.coeff @[simp] theorem isPWO_support (x : HahnSeries Γ R) : x.support.IsPWO := x.isPWO_support' @[simp] theorem isWF_support (x : HahnSeries Γ R) : x.support.IsWF := x.isPWO_support.isWF @[simp] theorem mem_support (x : HahnSeries Γ R) (a : Γ) : a ∈ x.support ↔ x.coeff a ≠ 0 := Iff.refl _ instance : Zero (HahnSeries Γ R) := ⟨{ coeff := 0 isPWO_support' := by simp }⟩ instance : Inhabited (HahnSeries Γ R) := ⟨0⟩ instance [Subsingleton R] : Subsingleton (HahnSeries Γ R) := ⟨fun _ _ => HahnSeries.ext (by subsingleton)⟩ @[simp] theorem coeff_zero {a : Γ} : (0 : HahnSeries Γ R).coeff a = 0 := rfl @[deprecated (since := "2025-01-31")] alias zero_coeff := coeff_zero @[simp] theorem coeff_fun_eq_zero_iff {x : HahnSeries Γ R} : x.coeff = 0 ↔ x = 0 := coeff_injective.eq_iff' rfl theorem ne_zero_of_coeff_ne_zero {x : HahnSeries Γ R} {g : Γ} (h : x.coeff g ≠ 0) : x ≠ 0 := mt (fun x0 => (x0.symm ▸ coeff_zero : x.coeff g = 0)) h @[simp] theorem support_zero : support (0 : HahnSeries Γ R) = ∅ := Function.support_zero @[simp] nonrec theorem support_nonempty_iff {x : HahnSeries Γ R} : x.support.Nonempty ↔ x ≠ 0 := by rw [support, support_nonempty_iff, Ne, coeff_fun_eq_zero_iff] @[simp] theorem support_eq_empty_iff {x : HahnSeries Γ R} : x.support = ∅ ↔ x = 0 := Function.support_eq_empty_iff.trans coeff_fun_eq_zero_iff /-- The map of Hahn series induced by applying a zero-preserving map to each coefficient. -/ @[simps] def map [Zero S] (x : HahnSeries Γ R) {F : Type} [FunLike F R S] [ZeroHomClass F R S] (f : F) : HahnSeries Γ S where coeff g := f (x.coeff g) isPWO_support' := x.isPWO_support.mono <\| Function.support_comp_subset (ZeroHomClass.map_zero f) _ @[simp] protected lemma map_zero [Zero S] (f : ZeroHom R S) : (0 : HahnSeries Γ R).map f = 0 := by ext; simp /-- Change a HahnSeries with coefficients in HahnSeries to a HahnSeries on the Lex product. -/ def ofIterate [PartialOrder Γ'] (x : HahnSeries Γ (HahnSeries Γ' R)) : HahnSeries (Γ ×ₗ Γ') R where coeff := fun g => coeff (coeff x g.1) g.2 isPWO_support' := by refine Set.PartiallyWellOrderedOn.subsetProdLex ?_ ?_ · refine Set.IsPWO.mono x.isPWO_support' ?_ simp_rw [Set.image_subset_iff, support_subset_iff, Set.mem_preimage, Function.mem_support] exact fun _ ↦ ne_zero_of_coeff_ne_zero · exact fun a => by simpa [Function.mem_support, ne_eq] using (x.coeff a).isPWO_support' @[simp] lemma mk_eq_zero (f : Γ → R) (h) : HahnSeries.mk f h = 0 ↔ f = 0 := by simp_rw [HahnSeries.ext_iff, funext_iff, coeff_zero, Pi.zero_apply] /-- Change a Hahn series on a lex product to a Hahn series with coefficients in a Hahn series. -/ def toIterate [PartialOrder Γ'] (x : HahnSeries (Γ ×ₗ Γ') R) : HahnSeries Γ (HahnSeries Γ' R) where coeff := fun g => { coeff := fun g' => coeff x (g, g') isPWO_support' := Set.PartiallyWellOrderedOn.fiberProdLex x.isPWO_support' g } isPWO_support' := by have h₁ : (Function.support fun g => HahnSeries.mk (fun g' => x.coeff (g, g')) (Set.PartiallyWellOrderedOn.fiberProdLex x.isPWO_support' g)) = Function.support fun g => fun g' => x.coeff (g, g') := by simp only [Function.support, ne_eq, mk_eq_zero] rw [h₁, Function.support_curry' x.coeff] exact Set.PartiallyWellOrderedOn.imageProdLex x.isPWO_support' /-- The equivalence between iterated Hahn series and Hahn series on the lex product. -/ @[simps] def iterateEquiv [PartialOrder Γ'] : HahnSeries Γ (HahnSeries Γ' R) ≃ HahnSeries (Γ ×ₗ Γ') R where toFun := ofIterate invFun := toIterate left_inv := congrFun rfl right_inv := congrFun rfl open Classical in /-- `single a r` is the Hahn series which has coefficient `r` at `a` and zero otherwise. -/ def single (a : Γ) : ZeroHom R (HahnSeries Γ R) where toFun r := { coeff := Pi.single a r isPWO_support' := (Set.isPWO_singleton a).mono Pi.support_single_subset } map_zero' := HahnSeries.ext (Pi.single_zero _) variable {a b : Γ} {r : R} @[simp] theorem coeff_single_same (a : Γ) (r : R) : (single a r).coeff a = r := by classical exact Pi.single_eq_same (f := fun _ => R) a r @[deprecated (since := "2025-01-31")] alias single_coeff_same := coeff_single_same @[simp] theorem coeff_single_of_ne (h : b ≠ a) : (single a r).coeff b = 0 := by classical exact Pi.single_eq_of_ne (f := fun _ => R) h r @[deprecated (since := "2025-01-31")] alias single_coeff_of_ne := coeff_single_of_ne open Classical in theorem coeff_single : (single a r).coeff b = if b = a then r else 0 := by split_ifs with h <;> simp [h] @[deprecated (since := "2025-01-31")] alias single_coeff := coeff_single @[simp] theorem support_single_of_ne (h : r ≠ 0) : support (single a r) = {a} := by classical exact Pi.support_single_of_ne h theorem support_single_subset : support (single a r) ⊆ {a} := by classical exact Pi.support_single_subset theorem eq_of_mem_support_single {b : Γ} (h : b ∈ support (single a r)) : b = a := support_single_subset h theorem single_eq_zero : single a (0 : R) = 0 := (single a).map_zero theorem single_injective (a : Γ) : Function.Injective (single a : R → HahnSeries Γ R) := fun r s rs => by rw [← coeff_single_same a r, ← coeff_single_same a s, rs] theorem single_ne_zero (h : r ≠ 0) : single a r ≠ 0 := fun con => h (single_injective a (con.trans single_eq_zero.symm)) @[simp] theorem single_eq_zero_iff {a : Γ} {r : R} : single a r = 0 ↔ r = 0 := map_eq_zero_iff _ <\| single_injective a @[simp] protected lemma map_single [Zero S] (f : ZeroHom R S) : (single a r).map f = single a (f r) := by ext g by_cases h : g = a <;> simp [h] instance [Nonempty Γ] [Nontrivial R] : Nontrivial (HahnSeries Γ R) := ⟨by obtain ⟨r, s, rs⟩ := exists_pair_ne R inhabit Γ refine ⟨single default r, single default s, fun con => rs ?_⟩ rw [← coeff_single_same (default : Γ) r, con, coeff_single_same]⟩ section Order open Classical in /-- The orderTop of a Hahn series `x` is a minimal element of `WithTop Γ` where `x` has a nonzero coefficient if `x ≠ 0`, and is `⊤` when `x = 0`. -/ def orderTop (x : HahnSeries Γ R) : WithTop Γ := if h : x = 0 then ⊤ else x.isWF_support.min (support_nonempty_iff.2 h) @[simp] theorem orderTop_zero : orderTop (0 : HahnSeries Γ R) = ⊤ := dif_pos rfl @[simp] theorem orderTop_of_Subsingleton [Subsingleton R] {x : HahnSeries Γ R} : x.orderTop = ⊤ := (Subsingleton.eq_zero x) ▸ orderTop_zero theorem orderTop_of_ne {x : HahnSeries Γ R} (hx : x ≠ 0) : orderTop x = x.isWF_support.min (support_nonempty_iff.2 hx) := dif_neg hx @[simp] theorem ne_zero_iff_orderTop {x : HahnSeries Γ R} : x ≠ 0 ↔ orderTop x ≠ ⊤ := by constructor · exact fun hx => Eq.mpr (congrArg (fun h ↦ h ≠ ⊤) (orderTop_of_ne hx)) WithTop.coe_ne_top · contrapose! simp_all only [orderTop_zero, implies_true] theorem orderTop_eq_top_iff {x : HahnSeries Γ R} : orderTop x = ⊤ ↔ x = 0 := by constructor · contrapose! exact ne_zero_iff_orderTop.mp · simp_all only [orderTop_zero, implies_true] theorem orderTop_eq_of_le {x : HahnSeries Γ R} {g : Γ} (hg : g ∈ x.support) (hx : ∀ g' ∈ x.support, g ≤ g') : orderTop x = g := by rw [orderTop_of_ne <\| support_nonempty_iff.mp <\| Set.nonempty_of_mem hg, x.isWF_support.min_eq_of_le hg hx] theorem untop_orderTop_of_ne_zero {x : HahnSeries Γ R} (hx : x ≠ 0) : WithTop.untop x.orderTop (ne_zero_iff_orderTop.mp hx) = x.isWF_support.min (support_nonempty_iff.2 hx) := WithTop.coe_inj.mp ((WithTop.coe_untop (orderTop x) (ne_zero_iff_orderTop.mp hx)).trans	(orderTop_of_ne hx)) theorem coeff_orderTop_ne {x : HahnSeries Γ R} {g : Γ} (hg : x.orderTop = g) : x.coeff g ≠ 0 := by	Mathlib/RingTheory/HahnSeries/Basic.lean	272	275
/- 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.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.Calculus.FDeriv.Linear import Mathlib.Analysis.Calculus.FDeriv.Comp /-! # The derivative of a linear equivalence 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 continuous linear equivalences. We also prove the usual formula for the derivative of the inverse function, assuming it exists. The inverse function theorem is in `Mathlib/Analysis/Calculus/InverseFunctionTheorem/FDeriv.lean`. -/ open Filter Asymptotics ContinuousLinearMap Set Metric Topology NNReal 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 : E → F} {f' : E →L[𝕜] F} {x : E} {s : Set E} {c : F} namespace ContinuousLinearEquiv /-! ### Differentiability of linear equivs, and invariance of differentiability -/ variable (iso : E ≃L[𝕜] F) @[fun_prop] protected theorem hasStrictFDerivAt : HasStrictFDerivAt iso (iso : E →L[𝕜] F) x := iso.toContinuousLinearMap.hasStrictFDerivAt @[fun_prop] protected theorem hasFDerivWithinAt : HasFDerivWithinAt iso (iso : E →L[𝕜] F) s x := iso.toContinuousLinearMap.hasFDerivWithinAt @[fun_prop] protected theorem hasFDerivAt : HasFDerivAt iso (iso : E →L[𝕜] F) x := iso.toContinuousLinearMap.hasFDerivAtFilter @[fun_prop] protected theorem differentiableAt : DifferentiableAt 𝕜 iso x := iso.hasFDerivAt.differentiableAt @[fun_prop] protected theorem differentiableWithinAt : DifferentiableWithinAt 𝕜 iso s x := iso.differentiableAt.differentiableWithinAt protected theorem fderiv : fderiv 𝕜 iso x = iso := iso.hasFDerivAt.fderiv protected theorem fderivWithin (hxs : UniqueDiffWithinAt 𝕜 s x) : fderivWithin 𝕜 iso s x = iso := iso.toContinuousLinearMap.fderivWithin hxs @[fun_prop] protected theorem differentiable : Differentiable 𝕜 iso := fun _ => iso.differentiableAt @[fun_prop] protected theorem differentiableOn : DifferentiableOn 𝕜 iso s := iso.differentiable.differentiableOn theorem comp_differentiableWithinAt_iff {f : G → E} {s : Set G} {x : G} : DifferentiableWithinAt 𝕜 (iso ∘ f) s x ↔ DifferentiableWithinAt 𝕜 f s x := by refine ⟨fun H => ?_, fun H => iso.differentiable.differentiableAt.comp_differentiableWithinAt x H⟩ have : DifferentiableWithinAt 𝕜 (iso.symm ∘ iso ∘ f) s x := iso.symm.differentiable.differentiableAt.comp_differentiableWithinAt x H rwa [← Function.comp_assoc iso.symm iso f, iso.symm_comp_self] at this theorem comp_differentiableAt_iff {f : G → E} {x : G} : DifferentiableAt 𝕜 (iso ∘ f) x ↔ DifferentiableAt 𝕜 f x := by rw [← differentiableWithinAt_univ, ← differentiableWithinAt_univ, iso.comp_differentiableWithinAt_iff] theorem comp_differentiableOn_iff {f : G → E} {s : Set G} : DifferentiableOn 𝕜 (iso ∘ f) s ↔ DifferentiableOn 𝕜 f s := by rw [DifferentiableOn, DifferentiableOn] simp only [iso.comp_differentiableWithinAt_iff] theorem comp_differentiable_iff {f : G → E} : Differentiable 𝕜 (iso ∘ f) ↔ Differentiable 𝕜 f := by rw [← differentiableOn_univ, ← differentiableOn_univ] exact iso.comp_differentiableOn_iff theorem comp_hasFDerivWithinAt_iff {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] E} : HasFDerivWithinAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') s x ↔ HasFDerivWithinAt f f' s x := by refine ⟨fun H => ?_, fun H => iso.hasFDerivAt.comp_hasFDerivWithinAt x H⟩ have A : f = iso.symm ∘ iso ∘ f := by rw [← Function.comp_assoc, iso.symm_comp_self] rfl have B : f' = (iso.symm : F →L[𝕜] E).comp ((iso : E →L[𝕜] F).comp f') := by rw [← ContinuousLinearMap.comp_assoc, iso.coe_symm_comp_coe, ContinuousLinearMap.id_comp] rw [A, B] exact iso.symm.hasFDerivAt.comp_hasFDerivWithinAt x H theorem comp_hasStrictFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} : HasStrictFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasStrictFDerivAt f f' x := by refine ⟨fun H => ?_, fun H => iso.hasStrictFDerivAt.comp x H⟩ convert iso.symm.hasStrictFDerivAt.comp x H using 1 <;> ext z <;> apply (iso.symm_apply_apply _).symm theorem comp_hasFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} : HasFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasFDerivAt f f' x := by simp_rw [← hasFDerivWithinAt_univ, iso.comp_hasFDerivWithinAt_iff] theorem comp_hasFDerivWithinAt_iff' {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] F} : HasFDerivWithinAt (iso ∘ f) f' s x ↔	HasFDerivWithinAt f ((iso.symm : F →L[𝕜] E).comp f') s x := by rw [← iso.comp_hasFDerivWithinAt_iff, ← ContinuousLinearMap.comp_assoc, iso.coe_comp_coe_symm, ContinuousLinearMap.id_comp] theorem comp_hasFDerivAt_iff' {f : G → E} {x : G} {f' : G →L[𝕜] F} : HasFDerivAt (iso ∘ f) f' x ↔ HasFDerivAt f ((iso.symm : F →L[𝕜] E).comp f') x := by simp_rw [← hasFDerivWithinAt_univ, iso.comp_hasFDerivWithinAt_iff'] theorem comp_fderivWithin {f : G → E} {s : Set G} {x : G} (hxs : UniqueDiffWithinAt 𝕜 s x) : fderivWithin 𝕜 (iso ∘ f) s x = (iso : E →L[𝕜] F).comp (fderivWithin 𝕜 f s x) := by	Mathlib/Analysis/Calculus/FDeriv/Equiv.lean	121	130
/- Copyright (c) 2022 Moritz Doll. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Moritz Doll -/ import Mathlib.Analysis.Calculus.ContDiff.Bounds import Mathlib.Analysis.Calculus.IteratedDeriv.Defs import Mathlib.Analysis.Calculus.LineDeriv.Basic import Mathlib.Analysis.LocallyConvex.WithSeminorms import Mathlib.Analysis.Normed.Group.ZeroAtInfty import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.Analysis.SpecialFunctions.JapaneseBracket import Mathlib.Topology.Algebra.UniformFilterBasis import Mathlib.Tactic.MoveAdd /-! # Schwartz space This file defines the Schwartz space. Usually, the Schwartz space is defined as the set of smooth functions $f : ℝ^n → ℂ$ such that there exists $C_{αβ} > 0$ with $$\|x^α ∂^β f(x)\| < C_{αβ}$$ for all $x ∈ ℝ^n$ and for all multiindices $α, β$. In mathlib, we use a slightly different approach and define the Schwartz space as all smooth functions `f : E → F`, where `E` and `F` are real normed vector spaces such that for all natural numbers `k` and `n` we have uniform bounds `‖x‖^k * ‖iteratedFDeriv ℝ n f x‖ < C`. This approach completely avoids using partial derivatives as well as polynomials. We construct the topology on the Schwartz space by a family of seminorms, which are the best constants in the above estimates. The abstract theory of topological vector spaces developed in `SeminormFamily.moduleFilterBasis` and `WithSeminorms.toLocallyConvexSpace` turns the Schwartz space into a locally convex topological vector space. ## Main definitions * `SchwartzMap`: The Schwartz space is the space of smooth functions such that all derivatives decay faster than any power of `‖x‖`. * `SchwartzMap.seminorm`: The family of seminorms as described above * `SchwartzMap.compCLM`: Composition with a function on the right as a continuous linear map `𝓢(E, F) →L[𝕜] 𝓢(D, F)`, provided that the function is temperate and grows polynomially near infinity * `SchwartzMap.fderivCLM`: The differential as a continuous linear map `𝓢(E, F) →L[𝕜] 𝓢(E, E →L[ℝ] F)` * `SchwartzMap.derivCLM`: The one-dimensional derivative as a continuous linear map `𝓢(ℝ, F) →L[𝕜] 𝓢(ℝ, F)` * `SchwartzMap.integralCLM`: Integration as a continuous linear map `𝓢(ℝ, F) →L[ℝ] F` ## Main statements * `SchwartzMap.instIsUniformAddGroup` and `SchwartzMap.instLocallyConvexSpace`: The Schwartz space is a locally convex topological vector space. * `SchwartzMap.one_add_le_sup_seminorm_apply`: For a Schwartz function `f` there is a uniform bound on `(1 + ‖x‖) ^ k * ‖iteratedFDeriv ℝ n f x‖`. ## Implementation details The implementation of the seminorms is taken almost literally from `ContinuousLinearMap.opNorm`. ## Notation * `𝓢(E, F)`: The Schwartz space `SchwartzMap E F` localized in `SchwartzSpace` ## Tags Schwartz space, tempered distributions -/ noncomputable section open scoped Nat NNReal ContDiff variable {𝕜 𝕜' D E F G V : Type} variable [NormedAddCommGroup E] [NormedSpace ℝ E] variable [NormedAddCommGroup F] [NormedSpace ℝ F] variable (E F) /-- A function is a Schwartz function if it is smooth and all derivatives decay faster than any power of `‖x‖`. -/ structure SchwartzMap where toFun : E → F smooth' : ContDiff ℝ ∞ toFun decay' : ∀ k n : ℕ, ∃ C : ℝ, ∀ x, ‖x‖ ^ k ‖iteratedFDeriv ℝ n toFun x‖ ≤ C /-- A function is a Schwartz function if it is smooth and all derivatives decay faster than any power of `‖x‖`. -/ scoped[SchwartzMap] notation "𝓢(" E ", " F ")" => SchwartzMap E F variable {E F} namespace SchwartzMap instance instFunLike : FunLike 𝓢(E, F) E F where coe f := f.toFun coe_injective' f g h := by cases f; cases g; congr /-- All derivatives of a Schwartz function are rapidly decaying. -/ theorem decay (f : 𝓢(E, F)) (k n : ℕ) : ∃ C : ℝ, 0 < C ∧ ∀ x, ‖x‖ ^ k * ‖iteratedFDeriv ℝ n f x‖ ≤ C := by rcases f.decay' k n with ⟨C, hC⟩ exact ⟨max C 1, by positivity, fun x => (hC x).trans (le_max_left _ _)⟩ /-- Every Schwartz function is smooth. -/ theorem smooth (f : 𝓢(E, F)) (n : ℕ∞) : ContDiff ℝ n f := f.smooth'.of_le (mod_cast le_top) /-- Every Schwartz function is continuous. -/ @[continuity] protected theorem continuous (f : 𝓢(E, F)) : Continuous f := (f.smooth 0).continuous instance instContinuousMapClass : ContinuousMapClass 𝓢(E, F) E F where map_continuous := SchwartzMap.continuous /-- Every Schwartz function is differentiable. -/ protected theorem differentiable (f : 𝓢(E, F)) : Differentiable ℝ f := (f.smooth 1).differentiable rfl.le /-- Every Schwartz function is differentiable at any point. -/ protected theorem differentiableAt (f : 𝓢(E, F)) {x : E} : DifferentiableAt ℝ f x := f.differentiable.differentiableAt @[ext] theorem ext {f g : 𝓢(E, F)} (h : ∀ x, (f : E → F) x = g x) : f = g := DFunLike.ext f g h section IsBigO open Asymptotics Filter variable (f : 𝓢(E, F)) /-- Auxiliary lemma, used in proving the more general result `isBigO_cocompact_rpow`. -/ theorem isBigO_cocompact_zpow_neg_nat (k : ℕ) : f =O[cocompact E] fun x => ‖x‖ ^ (-k : ℤ) := by obtain ⟨d, _, hd'⟩ := f.decay k 0 simp only [norm_iteratedFDeriv_zero] at hd' simp_rw [Asymptotics.IsBigO, Asymptotics.IsBigOWith] refine ⟨d, Filter.Eventually.filter_mono Filter.cocompact_le_cofinite ?_⟩ refine (Filter.eventually_cofinite_ne 0).mono fun x hx => ?_ rw [Real.norm_of_nonneg (zpow_nonneg (norm_nonneg _) _), zpow_neg, ← div_eq_mul_inv, le_div_iff₀'] exacts [hd' x, zpow_pos (norm_pos_iff.mpr hx) _] theorem isBigO_cocompact_rpow [ProperSpace E] (s : ℝ) : f =O[cocompact E] fun x => ‖x‖ ^ s := by let k := ⌈-s⌉₊ have hk : -(k : ℝ) ≤ s := neg_le.mp (Nat.le_ceil (-s)) refine (isBigO_cocompact_zpow_neg_nat f k).trans ?_ suffices (fun x : ℝ => x ^ (-k : ℤ)) =O[atTop] fun x : ℝ => x ^ s from this.comp_tendsto tendsto_norm_cocompact_atTop simp_rw [Asymptotics.IsBigO, Asymptotics.IsBigOWith] refine ⟨1, (Filter.eventually_ge_atTop 1).mono fun x hx => ?_⟩ rw [one_mul, Real.norm_of_nonneg (Real.rpow_nonneg (zero_le_one.trans hx) _), Real.norm_of_nonneg (zpow_nonneg (zero_le_one.trans hx) _), ← Real.rpow_intCast, Int.cast_neg, Int.cast_natCast] exact Real.rpow_le_rpow_of_exponent_le hx hk theorem isBigO_cocompact_zpow [ProperSpace E] (k : ℤ) : f =O[cocompact E] fun x => ‖x‖ ^ k := by simpa only [Real.rpow_intCast] using isBigO_cocompact_rpow f k	end IsBigO section Aux theorem bounds_nonempty (k n : ℕ) (f : 𝓢(E, F)) : ∃ c : ℝ, c ∈ { c : ℝ \| 0 ≤ c ∧ ∀ x : E, ‖x‖ ^ k * ‖iteratedFDeriv ℝ n f x‖ ≤ c } := let ⟨M, hMp, hMb⟩ := f.decay k n ⟨M, le_of_lt hMp, hMb⟩ theorem bounds_bddBelow (k n : ℕ) (f : 𝓢(E, F)) : BddBelow { c \| 0 ≤ c ∧ ∀ x, ‖x‖ ^ k * ‖iteratedFDeriv ℝ n f x‖ ≤ c } := ⟨0, fun _ ⟨hn, _⟩ => hn⟩	Mathlib/Analysis/Distribution/SchwartzSpace.lean	157	169
/- Copyright (c) 2022 Alexander Bentkamp. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alexander Bentkamp, Mohanad Ahmed -/ import Mathlib.LinearAlgebra.Matrix.Spectrum import Mathlib.LinearAlgebra.QuadraticForm.Basic /-! # Positive Definite Matrices This file defines positive (semi)definite matrices and connects the notion to positive definiteness of quadratic forms. Most results require `𝕜 = ℝ` or `ℂ`. ## Main definitions * `Matrix.PosDef` : a matrix `M : Matrix n n 𝕜` is positive definite if it is hermitian and `xᴴMx` is greater than zero for all nonzero `x`. * `Matrix.PosSemidef` : a matrix `M : Matrix n n 𝕜` is positive semidefinite if it is hermitian and `xᴴMx` is nonnegative for all `x`. ## Main results * `Matrix.posSemidef_iff_eq_transpose_mul_self` : a matrix `M : Matrix n n 𝕜` is positive semidefinite iff it has the form `Bᴴ * B` for some `B`. * `Matrix.PosSemidef.sqrt` : the unique positive semidefinite square root of a positive semidefinite matrix. (See `Matrix.PosSemidef.eq_sqrt_of_sq_eq` for the proof of uniqueness.) -/ open scoped ComplexOrder namespace Matrix variable {m n R 𝕜 : Type} variable [Fintype m] [Fintype n] variable [CommRing R] [PartialOrder R] [StarRing R] variable [RCLike 𝕜] open scoped Matrix /-! ## Positive semidefinite matrices -/ /-- A matrix `M : Matrix n n R` is positive semidefinite if it is Hermitian and `xᴴ M * x` is nonnegative for all `x`. -/ def PosSemidef (M : Matrix n n R) := M.IsHermitian ∧ ∀ x : n → R, 0 ≤ dotProduct (star x) (M ᵥ x) protected theorem PosSemidef.diagonal [StarOrderedRing R] [DecidableEq n] {d : n → R} (h : 0 ≤ d) : PosSemidef (diagonal d) := ⟨isHermitian_diagonal_of_self_adjoint _ <\| funext fun i => IsSelfAdjoint.of_nonneg (h i), fun x => by refine Fintype.sum_nonneg fun i => ?_ simpa only [mulVec_diagonal, ← mul_assoc] using conjugate_nonneg (h i) _⟩ /-- A diagonal matrix is positive semidefinite iff its diagonal entries are nonnegative. -/ lemma posSemidef_diagonal_iff [StarOrderedRing R] [DecidableEq n] {d : n → R} : PosSemidef (diagonal d) ↔ (∀ i : n, 0 ≤ d i) := ⟨fun ⟨_, hP⟩ i ↦ by simpa using hP (Pi.single i 1), .diagonal⟩ namespace PosSemidef theorem isHermitian {M : Matrix n n R} (hM : M.PosSemidef) : M.IsHermitian := hM.1 theorem re_dotProduct_nonneg {M : Matrix n n 𝕜} (hM : M.PosSemidef) (x : n → 𝕜) : 0 ≤ RCLike.re (dotProduct (star x) (M ᵥ x)) := RCLike.nonneg_iff.mp (hM.2 _) \|>.1 lemma conjTranspose_mul_mul_same {A : Matrix n n R} (hA : PosSemidef A) {m : Type} [Fintype m] (B : Matrix n m R) : PosSemidef (Bᴴ A * B) := by constructor · exact isHermitian_conjTranspose_mul_mul B hA.1 · intro x simpa only [star_mulVec, dotProduct_mulVec, vecMul_vecMul] using hA.2 (B *ᵥ x)	lemma mul_mul_conjTranspose_same {A : Matrix n n R} (hA : PosSemidef A) {m : Type} [Fintype m] (B : Matrix m n R) : PosSemidef (B A * Bᴴ) := by	Mathlib/LinearAlgebra/Matrix/PosDef.lean	76	79
/- Copyright (c) 2022 Bolton Bailey. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Bolton Bailey, Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne -/ import Mathlib.Algebra.BigOperators.Field import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.Data.Int.Log /-! # Real logarithm base `b` In this file we define `Real.logb` to be the logarithm of a real number in a given base `b`. We define this as the division of the natural logarithms of the argument and the base, so that we have a globally defined function with `logb b 0 = 0`, `logb b (-x) = logb b x` `logb 0 x = 0` and `logb (-b) x = logb b x`. We prove some basic properties of this function and its relation to `rpow`. ## Tags logarithm, continuity -/ open Set Filter Function open Topology noncomputable section namespace Real variable {b x y : ℝ} /-- The real logarithm in a given base. As with the natural logarithm, we define `logb b x` to be `logb b \|x\|` for `x < 0`, and `0` for `x = 0`. -/ @[pp_nodot] noncomputable def logb (b x : ℝ) : ℝ := log x / log b theorem log_div_log : log x / log b = logb b x := rfl @[simp] theorem logb_zero : logb b 0 = 0 := by simp [logb] @[simp] theorem logb_one : logb b 1 = 0 := by simp [logb] theorem logb_zero_left : logb 0 x = 0 := by simp only [← log_div_log, log_zero, div_zero] @[simp] theorem logb_zero_left_eq_zero : logb 0 = 0 := by ext; rw [logb_zero_left, Pi.zero_apply] theorem logb_one_left : logb 1 x = 0 := by simp only [← log_div_log, log_one, div_zero] @[simp] theorem logb_one_left_eq_zero : logb 1 = 0 := by ext; rw [logb_one_left, Pi.zero_apply] @[simp] lemma logb_self_eq_one (hb : 1 < b) : logb b b = 1 := div_self (log_pos hb).ne' lemma logb_self_eq_one_iff : logb b b = 1 ↔ b ≠ 0 ∧ b ≠ 1 ∧ b ≠ -1 := Iff.trans ⟨fun h h' => by simp [logb, h'] at h, div_self⟩ log_ne_zero @[simp] theorem logb_abs (x : ℝ) : logb b \|x\| = logb b x := by rw [logb, logb, log_abs] @[simp] theorem logb_neg_eq_logb (x : ℝ) : logb b (-x) = logb b x := by rw [← logb_abs x, ← logb_abs (-x), abs_neg] theorem logb_mul (hx : x ≠ 0) (hy : y ≠ 0) : logb b (x * y) = logb b x + logb b y := by simp_rw [logb, log_mul hx hy, add_div] theorem logb_div (hx : x ≠ 0) (hy : y ≠ 0) : logb b (x / y) = logb b x - logb b y := by simp_rw [logb, log_div hx hy, sub_div] @[simp] theorem logb_inv (x : ℝ) : logb b x⁻¹ = -logb b x := by simp [logb, neg_div] theorem inv_logb (a b : ℝ) : (logb a b)⁻¹ = logb b a := by simp_rw [logb, inv_div] theorem inv_logb_mul_base {a b : ℝ} (h₁ : a ≠ 0) (h₂ : b ≠ 0) (c : ℝ) : (logb (a * b) c)⁻¹ = (logb a c)⁻¹ + (logb b c)⁻¹ := by simp_rw [inv_logb]; exact logb_mul h₁ h₂ theorem inv_logb_div_base {a b : ℝ} (h₁ : a ≠ 0) (h₂ : b ≠ 0) (c : ℝ) : (logb (a / b) c)⁻¹ = (logb a c)⁻¹ - (logb b c)⁻¹ := by simp_rw [inv_logb]; exact logb_div h₁ h₂ theorem logb_mul_base {a b : ℝ} (h₁ : a ≠ 0) (h₂ : b ≠ 0) (c : ℝ) : logb (a * b) c = ((logb a c)⁻¹ + (logb b c)⁻¹)⁻¹ := by rw [← inv_logb_mul_base h₁ h₂ c, inv_inv] theorem logb_div_base {a b : ℝ} (h₁ : a ≠ 0) (h₂ : b ≠ 0) (c : ℝ) : logb (a / b) c = ((logb a c)⁻¹ - (logb b c)⁻¹)⁻¹ := by rw [← inv_logb_div_base h₁ h₂ c, inv_inv] theorem mul_logb {a b c : ℝ} (h₁ : b ≠ 0) (h₂ : b ≠ 1) (h₃ : b ≠ -1) : logb a b * logb b c = logb a c := by unfold logb rw [mul_comm, div_mul_div_cancel₀ (log_ne_zero.mpr ⟨h₁, h₂, h₃⟩)] theorem div_logb {a b c : ℝ} (h₁ : c ≠ 0) (h₂ : c ≠ 1) (h₃ : c ≠ -1) : logb a c / logb b c = logb a b := div_div_div_cancel_left' _ _ <\| log_ne_zero.mpr ⟨h₁, h₂, h₃⟩ theorem logb_rpow_eq_mul_logb_of_pos (hx : 0 < x) : logb b (x ^ y) = y * logb b x := by rw [logb, log_rpow hx, logb, mul_div_assoc] theorem logb_pow (b x : ℝ) (k : ℕ) : logb b (x ^ k) = k * logb b x := by rw [logb, logb, log_pow, mul_div_assoc] section BPosAndNeOne variable (b_pos : 0 < b) (b_ne_one : b ≠ 1) include b_pos b_ne_one private theorem log_b_ne_zero : log b ≠ 0 := by have b_ne_zero : b ≠ 0 := by linarith have b_ne_minus_one : b ≠ -1 := by linarith simp [b_ne_one, b_ne_zero, b_ne_minus_one] @[simp] theorem logb_rpow : logb b (b ^ x) = x := by rw [logb, div_eq_iff, log_rpow b_pos] exact log_b_ne_zero b_pos b_ne_one theorem rpow_logb_eq_abs (hx : x ≠ 0) : b ^ logb b x = \|x\| := by apply log_injOn_pos · simp only [Set.mem_Ioi] apply rpow_pos_of_pos b_pos · simp only [abs_pos, mem_Ioi, Ne, hx, not_false_iff] rw [log_rpow b_pos, logb, log_abs] field_simp [log_b_ne_zero b_pos b_ne_one] @[simp] theorem rpow_logb (hx : 0 < x) : b ^ logb b x = x := by rw [rpow_logb_eq_abs b_pos b_ne_one hx.ne'] exact abs_of_pos hx theorem rpow_logb_of_neg (hx : x < 0) : b ^ logb b x = -x := by rw [rpow_logb_eq_abs b_pos b_ne_one (ne_of_lt hx)] exact abs_of_neg hx theorem logb_eq_iff_rpow_eq (hy : 0 < y) : logb b y = x ↔ b ^ x = y := by constructor <;> rintro rfl · exact rpow_logb b_pos b_ne_one hy · exact logb_rpow b_pos b_ne_one theorem surjOn_logb : SurjOn (logb b) (Ioi 0) univ := fun x _ => ⟨b ^ x, rpow_pos_of_pos b_pos x, logb_rpow b_pos b_ne_one⟩ theorem logb_surjective : Surjective (logb b) := fun x => ⟨b ^ x, logb_rpow b_pos b_ne_one⟩ @[simp] theorem range_logb : range (logb b) = univ := (logb_surjective b_pos b_ne_one).range_eq theorem surjOn_logb' : SurjOn (logb b) (Iio 0) univ := by intro x _ use -b ^ x constructor · simp only [Right.neg_neg_iff, Set.mem_Iio] apply rpow_pos_of_pos b_pos · rw [logb_neg_eq_logb, logb_rpow b_pos b_ne_one] end BPosAndNeOne section OneLtB variable (hb : 1 < b) include hb private theorem b_pos : 0 < b := by linarith -- Name has a prime added to avoid clashing with `b_ne_one` further down the file private theorem b_ne_one' : b ≠ 1 := by linarith @[simp] theorem logb_le_logb (h : 0 < x) (h₁ : 0 < y) : logb b x ≤ logb b y ↔ x ≤ y := by rw [logb, logb, div_le_div_iff_of_pos_right (log_pos hb), log_le_log_iff h h₁] @[gcongr] theorem logb_le_logb_of_le (h : 0 < x) (hxy : x ≤ y) : logb b x ≤ logb b y := (logb_le_logb hb h (by linarith)).mpr hxy @[gcongr] theorem logb_lt_logb (hx : 0 < x) (hxy : x < y) : logb b x < logb b y := by rw [logb, logb, div_lt_div_iff_of_pos_right (log_pos hb)] exact log_lt_log hx hxy @[simp] theorem logb_lt_logb_iff (hx : 0 < x) (hy : 0 < y) : logb b x < logb b y ↔ x < y := by rw [logb, logb, div_lt_div_iff_of_pos_right (log_pos hb)] exact log_lt_log_iff hx hy theorem logb_le_iff_le_rpow (hx : 0 < x) : logb b x ≤ y ↔ x ≤ b ^ y := by rw [← rpow_le_rpow_left_iff hb, rpow_logb (b_pos hb) (b_ne_one' hb) hx] theorem logb_lt_iff_lt_rpow (hx : 0 < x) : logb b x < y ↔ x < b ^ y := by rw [← rpow_lt_rpow_left_iff hb, rpow_logb (b_pos hb) (b_ne_one' hb) hx] theorem le_logb_iff_rpow_le (hy : 0 < y) : x ≤ logb b y ↔ b ^ x ≤ y := by rw [← rpow_le_rpow_left_iff hb, rpow_logb (b_pos hb) (b_ne_one' hb) hy] theorem lt_logb_iff_rpow_lt (hy : 0 < y) : x < logb b y ↔ b ^ x < y := by rw [← rpow_lt_rpow_left_iff hb, rpow_logb (b_pos hb) (b_ne_one' hb) hy] theorem logb_pos_iff (hx : 0 < x) : 0 < logb b x ↔ 1 < x := by rw [← @logb_one b] rw [logb_lt_logb_iff hb zero_lt_one hx] theorem logb_pos (hx : 1 < x) : 0 < logb b x := by rw [logb_pos_iff hb (lt_trans zero_lt_one hx)] exact hx theorem logb_neg_iff (h : 0 < x) : logb b x < 0 ↔ x < 1 := by rw [← logb_one] exact logb_lt_logb_iff hb h zero_lt_one theorem logb_neg (h0 : 0 < x) (h1 : x < 1) : logb b x < 0 := (logb_neg_iff hb h0).2 h1 theorem logb_nonneg_iff (hx : 0 < x) : 0 ≤ logb b x ↔ 1 ≤ x := by rw [← not_lt, logb_neg_iff hb hx, not_lt] theorem logb_nonneg (hx : 1 ≤ x) : 0 ≤ logb b x := (logb_nonneg_iff hb (zero_lt_one.trans_le hx)).2 hx theorem logb_nonpos_iff (hx : 0 < x) : logb b x ≤ 0 ↔ x ≤ 1 := by rw [← not_lt, logb_pos_iff hb hx, not_lt] theorem logb_nonpos_iff' (hx : 0 ≤ x) : logb b x ≤ 0 ↔ x ≤ 1 := by rcases hx.eq_or_lt with (rfl \| hx) · simp [le_refl, zero_le_one] exact logb_nonpos_iff hb hx theorem logb_nonpos (hx : 0 ≤ x) (h'x : x ≤ 1) : logb b x ≤ 0 := (logb_nonpos_iff' hb hx).2 h'x theorem strictMonoOn_logb : StrictMonoOn (logb b) (Set.Ioi 0) := fun _ hx _ _ hxy => logb_lt_logb hb hx hxy theorem strictAntiOn_logb : StrictAntiOn (logb b) (Set.Iio 0) := by rintro x (hx : x < 0) y (hy : y < 0) hxy rw [← logb_abs y, ← logb_abs x] refine logb_lt_logb hb (abs_pos.2 hy.ne) ?_ rwa [abs_of_neg hy, abs_of_neg hx, neg_lt_neg_iff] theorem logb_injOn_pos : Set.InjOn (logb b) (Set.Ioi 0) := (strictMonoOn_logb hb).injOn theorem eq_one_of_pos_of_logb_eq_zero (h₁ : 0 < x) (h₂ : logb b x = 0) : x = 1 := logb_injOn_pos hb (Set.mem_Ioi.2 h₁) (Set.mem_Ioi.2 zero_lt_one) (h₂.trans Real.logb_one.symm) theorem logb_ne_zero_of_pos_of_ne_one (hx_pos : 0 < x) (hx : x ≠ 1) : logb b x ≠ 0 := mt (eq_one_of_pos_of_logb_eq_zero hb hx_pos) hx theorem tendsto_logb_atTop : Tendsto (logb b) atTop atTop := Tendsto.atTop_div_const (log_pos hb) tendsto_log_atTop end OneLtB section BPosAndBLtOne variable (b_pos : 0 < b) (b_lt_one : b < 1) include b_lt_one private theorem b_ne_one : b ≠ 1 := by linarith include b_pos @[simp] theorem logb_le_logb_of_base_lt_one (h : 0 < x) (h₁ : 0 < y) : logb b x ≤ logb b y ↔ y ≤ x := by rw [logb, logb, div_le_div_right_of_neg (log_neg b_pos b_lt_one), log_le_log_iff h₁ h] theorem logb_lt_logb_of_base_lt_one (hx : 0 < x) (hxy : x < y) : logb b y < logb b x := by rw [logb, logb, div_lt_div_right_of_neg (log_neg b_pos b_lt_one)] exact log_lt_log hx hxy @[simp] theorem logb_lt_logb_iff_of_base_lt_one (hx : 0 < x) (hy : 0 < y) : logb b x < logb b y ↔ y < x := by rw [logb, logb, div_lt_div_right_of_neg (log_neg b_pos b_lt_one)] exact log_lt_log_iff hy hx theorem logb_le_iff_le_rpow_of_base_lt_one (hx : 0 < x) : logb b x ≤ y ↔ b ^ y ≤ x := by rw [← rpow_le_rpow_left_iff_of_base_lt_one b_pos b_lt_one, rpow_logb b_pos (b_ne_one b_lt_one) hx] theorem logb_lt_iff_lt_rpow_of_base_lt_one (hx : 0 < x) : logb b x < y ↔ b ^ y < x := by rw [← rpow_lt_rpow_left_iff_of_base_lt_one b_pos b_lt_one, rpow_logb b_pos (b_ne_one b_lt_one) hx] theorem le_logb_iff_rpow_le_of_base_lt_one (hy : 0 < y) : x ≤ logb b y ↔ y ≤ b ^ x := by rw [← rpow_le_rpow_left_iff_of_base_lt_one b_pos b_lt_one, rpow_logb b_pos (b_ne_one b_lt_one) hy] theorem lt_logb_iff_rpow_lt_of_base_lt_one (hy : 0 < y) : x < logb b y ↔ y < b ^ x := by rw [← rpow_lt_rpow_left_iff_of_base_lt_one b_pos b_lt_one, rpow_logb b_pos (b_ne_one b_lt_one) hy] theorem logb_pos_iff_of_base_lt_one (hx : 0 < x) : 0 < logb b x ↔ x < 1 := by rw [← @logb_one b, logb_lt_logb_iff_of_base_lt_one b_pos b_lt_one zero_lt_one hx] theorem logb_pos_of_base_lt_one (hx : 0 < x) (hx' : x < 1) : 0 < logb b x := by rw [logb_pos_iff_of_base_lt_one b_pos b_lt_one hx] exact hx' theorem logb_neg_iff_of_base_lt_one (h : 0 < x) : logb b x < 0 ↔ 1 < x := by rw [← @logb_one b, logb_lt_logb_iff_of_base_lt_one b_pos b_lt_one h zero_lt_one] theorem logb_neg_of_base_lt_one (h1 : 1 < x) : logb b x < 0 := (logb_neg_iff_of_base_lt_one b_pos b_lt_one (lt_trans zero_lt_one h1)).2 h1 theorem logb_nonneg_iff_of_base_lt_one (hx : 0 < x) : 0 ≤ logb b x ↔ x ≤ 1 := by rw [← not_lt, logb_neg_iff_of_base_lt_one b_pos b_lt_one hx, not_lt] theorem logb_nonneg_of_base_lt_one (hx : 0 < x) (hx' : x ≤ 1) : 0 ≤ logb b x := by rw [logb_nonneg_iff_of_base_lt_one b_pos b_lt_one hx] exact hx' theorem logb_nonpos_iff_of_base_lt_one (hx : 0 < x) : logb b x ≤ 0 ↔ 1 ≤ x := by rw [← not_lt, logb_pos_iff_of_base_lt_one b_pos b_lt_one hx, not_lt] theorem strictAntiOn_logb_of_base_lt_one : StrictAntiOn (logb b) (Set.Ioi 0) := fun _ hx _ _ hxy => logb_lt_logb_of_base_lt_one b_pos b_lt_one hx hxy theorem strictMonoOn_logb_of_base_lt_one : StrictMonoOn (logb b) (Set.Iio 0) := by rintro x (hx : x < 0) y (hy : y < 0) hxy rw [← logb_abs y, ← logb_abs x] refine logb_lt_logb_of_base_lt_one b_pos b_lt_one (abs_pos.2 hy.ne) ?_ rwa [abs_of_neg hy, abs_of_neg hx, neg_lt_neg_iff] theorem logb_injOn_pos_of_base_lt_one : Set.InjOn (logb b) (Set.Ioi 0) := (strictAntiOn_logb_of_base_lt_one b_pos b_lt_one).injOn theorem eq_one_of_pos_of_logb_eq_zero_of_base_lt_one (h₁ : 0 < x) (h₂ : logb b x = 0) : x = 1 := logb_injOn_pos_of_base_lt_one b_pos b_lt_one (Set.mem_Ioi.2 h₁) (Set.mem_Ioi.2 zero_lt_one) (h₂.trans Real.logb_one.symm) theorem logb_ne_zero_of_pos_of_ne_one_of_base_lt_one (hx_pos : 0 < x) (hx : x ≠ 1) : logb b x ≠ 0 := mt (eq_one_of_pos_of_logb_eq_zero_of_base_lt_one b_pos b_lt_one hx_pos) hx theorem tendsto_logb_atTop_of_base_lt_one : Tendsto (logb b) atTop atBot := by rw [tendsto_atTop_atBot] intro e use 1 ⊔ b ^ e intro a simp only [and_imp, sup_le_iff] intro ha rw [logb_le_iff_le_rpow_of_base_lt_one b_pos b_lt_one] · tauto · exact lt_of_lt_of_le zero_lt_one ha end BPosAndBLtOne @[norm_cast] theorem floor_logb_natCast {b : ℕ} {r : ℝ} (hr : 0 ≤ r) : ⌊logb b r⌋ = Int.log b r := by obtain rfl \| hr := hr.eq_or_lt · rw [logb_zero, Int.log_zero_right, Int.floor_zero] by_cases hb : 1 < b · have hb1' : 1 < (b : ℝ) := Nat.one_lt_cast.mpr hb apply le_antisymm · rw [← Int.zpow_le_iff_le_log hb hr, ← rpow_intCast b] refine le_of_le_of_eq ?_ (rpow_logb (zero_lt_one.trans hb1') hb1'.ne' hr) exact rpow_le_rpow_of_exponent_le hb1'.le (Int.floor_le _) · rw [Int.le_floor, le_logb_iff_rpow_le hb1' hr, rpow_intCast]	exact Int.zpow_log_le_self hb hr · rw [Nat.one_lt_iff_ne_zero_and_ne_one, ← or_iff_not_and_not] at hb	Mathlib/Analysis/SpecialFunctions/Log/Base.lean	366	367
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.Homotopy import Mathlib.Algebra.Ring.NegOnePow import Mathlib.Algebra.Category.Grp.Preadditive import Mathlib.Tactic.Linarith import Mathlib.CategoryTheory.Linear.LinearFunctor /-! The cochain complex of homomorphisms between cochain complexes If `F` and `G` are cochain complexes (indexed by `ℤ`) in a preadditive category, there is a cochain complex of abelian groups whose `0`-cocycles identify to morphisms `F ⟶ G`. Informally, in degree `n`, this complex shall consist of cochains of degree `n` from `F` to `G`, i.e. arbitrary families for morphisms `F.X p ⟶ G.X (p + n)`. This complex shall be denoted `HomComplex F G`. In order to avoid type theoretic issues, a cochain of degree `n : ℤ` (i.e. a term of type of `Cochain F G n`) shall be defined here as the data of a morphism `F.X p ⟶ G.X q` for all triplets `⟨p, q, hpq⟩` where `p` and `q` are integers and `hpq : p + n = q`. If `α : Cochain F G n`, we shall define `α.v p q hpq : F.X p ⟶ G.X q`. We follow the signs conventions appearing in the introduction of [Brian Conrad's book Grothendieck duality and base change][conrad2000]. ## References * [Brian Conrad, Grothendieck duality and base change][conrad2000] -/ assert_not_exists TwoSidedIdeal open CategoryTheory Category Limits Preadditive universe v u variable {C : Type u} [Category.{v} C] [Preadditive C] {R : Type*} [Ring R] [Linear R C] namespace CochainComplex variable {F G K L : CochainComplex C ℤ} (n m : ℤ) namespace HomComplex /-- A term of type `HomComplex.Triplet n` consists of two integers `p` and `q` such that `p + n = q`. (This type is introduced so that the instance `AddCommGroup (Cochain F G n)` defined below can be found automatically.) -/ structure Triplet (n : ℤ) where /-- a first integer -/ p : ℤ /-- a second integer -/ q : ℤ /-- the condition on the two integers -/ hpq : p + n = q variable (F G) /-- A cochain of degree `n : ℤ` between to cochain complexes `F` and `G` consists of a family of morphisms `F.X p ⟶ G.X q` whenever `p + n = q`, i.e. for all triplets in `HomComplex.Triplet n`. -/ def Cochain := ∀ (T : Triplet n), F.X T.p ⟶ G.X T.q instance : AddCommGroup (Cochain F G n) := by dsimp only [Cochain] infer_instance instance : Module R (Cochain F G n) := by dsimp only [Cochain] infer_instance namespace Cochain variable {F G n} /-- A practical constructor for cochains. -/ def mk (v : ∀ (p q : ℤ) (_ : p + n = q), F.X p ⟶ G.X q) : Cochain F G n := fun ⟨p, q, hpq⟩ => v p q hpq /-- The value of a cochain on a triplet `⟨p, q, hpq⟩`. -/ def v (γ : Cochain F G n) (p q : ℤ) (hpq : p + n = q) : F.X p ⟶ G.X q := γ ⟨p, q, hpq⟩ @[simp] lemma mk_v (v : ∀ (p q : ℤ) (_ : p + n = q), F.X p ⟶ G.X q) (p q : ℤ) (hpq : p + n = q) : (Cochain.mk v).v p q hpq = v p q hpq := rfl lemma congr_v {z₁ z₂ : Cochain F G n} (h : z₁ = z₂) (p q : ℤ) (hpq : p + n = q) : z₁.v p q hpq = z₂.v p q hpq := by subst h; rfl @[ext] lemma ext (z₁ z₂ : Cochain F G n) (h : ∀ (p q hpq), z₁.v p q hpq = z₂.v p q hpq) : z₁ = z₂ := by funext ⟨p, q, hpq⟩ apply h @[ext 1100] lemma ext₀ (z₁ z₂ : Cochain F G 0) (h : ∀ (p : ℤ), z₁.v p p (add_zero p) = z₂.v p p (add_zero p)) : z₁ = z₂ := by ext p q hpq obtain rfl : q = p := by rw [← hpq, add_zero] exact h q @[simp] lemma zero_v {n : ℤ} (p q : ℤ) (hpq : p + n = q) : (0 : Cochain F G n).v p q hpq = 0 := rfl @[simp] lemma add_v {n : ℤ} (z₁ z₂ : Cochain F G n) (p q : ℤ) (hpq : p + n = q) : (z₁ + z₂).v p q hpq = z₁.v p q hpq + z₂.v p q hpq := rfl @[simp] lemma sub_v {n : ℤ} (z₁ z₂ : Cochain F G n) (p q : ℤ) (hpq : p + n = q) : (z₁ - z₂).v p q hpq = z₁.v p q hpq - z₂.v p q hpq := rfl @[simp] lemma neg_v {n : ℤ} (z : Cochain F G n) (p q : ℤ) (hpq : p + n = q) : (-z).v p q hpq = - (z.v p q hpq) := rfl @[simp] lemma smul_v {n : ℤ} (k : R) (z : Cochain F G n) (p q : ℤ) (hpq : p + n = q) : (k • z).v p q hpq = k • (z.v p q hpq) := rfl @[simp] lemma units_smul_v {n : ℤ} (k : Rˣ) (z : Cochain F G n) (p q : ℤ) (hpq : p + n = q) : (k • z).v p q hpq = k • (z.v p q hpq) := rfl /-- A cochain of degree `0` from `F` to `G` can be constructed from a family of morphisms `F.X p ⟶ G.X p` for all `p : ℤ`. -/ def ofHoms (ψ : ∀ (p : ℤ), F.X p ⟶ G.X p) : Cochain F G 0 := Cochain.mk (fun p q hpq => ψ p ≫ eqToHom (by rw [← hpq, add_zero])) @[simp] lemma ofHoms_v (ψ : ∀ (p : ℤ), F.X p ⟶ G.X p) (p : ℤ) : (ofHoms ψ).v p p (add_zero p) = ψ p := by simp only [ofHoms, mk_v, eqToHom_refl, comp_id] @[simp] lemma ofHoms_zero : ofHoms (fun p => (0 : F.X p ⟶ G.X p)) = 0 := by aesop_cat @[simp] lemma ofHoms_v_comp_d (ψ : ∀ (p : ℤ), F.X p ⟶ G.X p) (p q q' : ℤ) (hpq : p + 0 = q) : (ofHoms ψ).v p q hpq ≫ G.d q q' = ψ p ≫ G.d p q' := by rw [add_zero] at hpq subst hpq rw [ofHoms_v] @[simp] lemma d_comp_ofHoms_v (ψ : ∀ (p : ℤ), F.X p ⟶ G.X p) (p' p q : ℤ) (hpq : p + 0 = q) : F.d p' p ≫ (ofHoms ψ).v p q hpq = F.d p' q ≫ ψ q := by rw [add_zero] at hpq subst hpq rw [ofHoms_v] /-- The `0`-cochain attached to a morphism of cochain complexes. -/ def ofHom (φ : F ⟶ G) : Cochain F G 0 := ofHoms (fun p => φ.f p) variable (F G) @[simp] lemma ofHom_zero : ofHom (0 : F ⟶ G) = 0 := by simp only [ofHom, HomologicalComplex.zero_f_apply, ofHoms_zero] variable {F G} @[simp] lemma ofHom_v (φ : F ⟶ G) (p : ℤ) : (ofHom φ).v p p (add_zero p) = φ.f p := by simp only [ofHom, ofHoms_v] @[simp] lemma ofHom_v_comp_d (φ : F ⟶ G) (p q q' : ℤ) (hpq : p + 0 = q) : (ofHom φ).v p q hpq ≫ G.d q q' = φ.f p ≫ G.d p q' := by simp only [ofHom, ofHoms_v_comp_d] @[simp] lemma d_comp_ofHom_v (φ : F ⟶ G) (p' p q : ℤ) (hpq : p + 0 = q) : F.d p' p ≫ (ofHom φ).v p q hpq = F.d p' q ≫ φ.f q := by simp only [ofHom, d_comp_ofHoms_v] @[simp] lemma ofHom_add (φ₁ φ₂ : F ⟶ G) : Cochain.ofHom (φ₁ + φ₂) = Cochain.ofHom φ₁ + Cochain.ofHom φ₂ := by aesop_cat @[simp] lemma ofHom_sub (φ₁ φ₂ : F ⟶ G) : Cochain.ofHom (φ₁ - φ₂) = Cochain.ofHom φ₁ - Cochain.ofHom φ₂ := by aesop_cat @[simp] lemma ofHom_neg (φ : F ⟶ G) : Cochain.ofHom (-φ) = -Cochain.ofHom φ := by aesop_cat /-- The cochain of degree `-1` given by an homotopy between two morphism of complexes. -/ def ofHomotopy {φ₁ φ₂ : F ⟶ G} (ho : Homotopy φ₁ φ₂) : Cochain F G (-1) := Cochain.mk (fun p q _ => ho.hom p q) @[simp] lemma ofHomotopy_ofEq {φ₁ φ₂ : F ⟶ G} (h : φ₁ = φ₂) : ofHomotopy (Homotopy.ofEq h) = 0 := rfl @[simp] lemma ofHomotopy_refl (φ : F ⟶ G) : ofHomotopy (Homotopy.refl φ) = 0 := rfl @[reassoc] lemma v_comp_XIsoOfEq_hom (γ : Cochain F G n) (p q q' : ℤ) (hpq : p + n = q) (hq' : q = q') : γ.v p q hpq ≫ (HomologicalComplex.XIsoOfEq G hq').hom = γ.v p q' (by rw [← hq', hpq]) := by subst hq' simp only [HomologicalComplex.XIsoOfEq, eqToIso_refl, Iso.refl_hom, comp_id] @[reassoc] lemma v_comp_XIsoOfEq_inv (γ : Cochain F G n) (p q q' : ℤ) (hpq : p + n = q) (hq' : q' = q) : γ.v p q hpq ≫ (HomologicalComplex.XIsoOfEq G hq').inv = γ.v p q' (by rw [hq', hpq]) := by subst hq' simp only [HomologicalComplex.XIsoOfEq, eqToIso_refl, Iso.refl_inv, comp_id] /-- The composition of cochains. -/ def comp {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : Cochain F K n₁₂ := Cochain.mk (fun p q hpq => z₁.v p (p + n₁) rfl ≫ z₂.v (p + n₁) q (by omega)) /-! If `z₁` is a cochain of degree `n₁` and `z₂` is a cochain of degree `n₂`, and that we have a relation `h : n₁ + n₂ = n₁₂`, then `z₁.comp z₂ h` is a cochain of degree `n₁₂`. The following lemma `comp_v` computes the value of this composition `z₁.comp z₂ h` on a triplet `⟨p₁, p₃, _⟩` (with `p₁ + n₁₂ = p₃`). In order to use this lemma, we need to provide an intermediate integer `p₂` such that `p₁ + n₁ = p₂`. It is advisable to use a `p₂` that has good definitional properties (i.e. `p₁ + n₁` is not always the best choice.) When `z₁` or `z₂` is a `0`-cochain, there is a better choice of `p₂`, and this leads to the two simplification lemmas `comp_zero_cochain_v` and `zero_cochain_comp_v`. -/ lemma comp_v {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) (p₁ p₂ p₃ : ℤ) (h₁ : p₁ + n₁ = p₂) (h₂ : p₂ + n₂ = p₃) : (z₁.comp z₂ h).v p₁ p₃ (by rw [← h₂, ← h₁, ← h, add_assoc]) = z₁.v p₁ p₂ h₁ ≫ z₂.v p₂ p₃ h₂ := by subst h₁; rfl @[simp] lemma comp_zero_cochain_v (z₁ : Cochain F G n) (z₂ : Cochain G K 0) (p q : ℤ) (hpq : p + n = q) : (z₁.comp z₂ (add_zero n)).v p q hpq = z₁.v p q hpq ≫ z₂.v q q (add_zero q) := comp_v z₁ z₂ (add_zero n) p q q hpq (add_zero q) @[simp] lemma zero_cochain_comp_v (z₁ : Cochain F G 0) (z₂ : Cochain G K n) (p q : ℤ) (hpq : p + n = q) : (z₁.comp z₂ (zero_add n)).v p q hpq = z₁.v p p (add_zero p) ≫ z₂.v p q hpq := comp_v z₁ z₂ (zero_add n) p p q (add_zero p) hpq /-- The associativity of the composition of cochains. -/ lemma comp_assoc {n₁ n₂ n₃ n₁₂ n₂₃ n₁₂₃ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (z₃ : Cochain K L n₃) (h₁₂ : n₁ + n₂ = n₁₂) (h₂₃ : n₂ + n₃ = n₂₃) (h₁₂₃ : n₁ + n₂ + n₃ = n₁₂₃) : (z₁.comp z₂ h₁₂).comp z₃ (show n₁₂ + n₃ = n₁₂₃ by rw [← h₁₂, h₁₂₃]) = z₁.comp (z₂.comp z₃ h₂₃) (by rw [← h₂₃, ← h₁₂₃, add_assoc]) := by substs h₁₂ h₂₃ h₁₂₃ ext p q hpq rw [comp_v _ _ rfl p (p + n₁ + n₂) q (add_assoc _ _ _).symm (by omega), comp_v z₁ z₂ rfl p (p + n₁) (p + n₁ + n₂) (by omega) (by omega), comp_v z₁ (z₂.comp z₃ rfl) (add_assoc n₁ n₂ n₃).symm p (p + n₁) q (by omega) (by omega), comp_v z₂ z₃ rfl (p + n₁) (p + n₁ + n₂) q (by omega) (by omega), assoc] /-! The formulation of the associativity of the composition of cochains given by the lemma `comp_assoc` often requires a careful selection of degrees with good definitional properties. In a few cases, like when one of the three cochains is a `0`-cochain, there are better choices, which provides the following simplification lemmas. -/ @[simp] lemma comp_assoc_of_first_is_zero_cochain {n₂ n₃ n₂₃ : ℤ} (z₁ : Cochain F G 0) (z₂ : Cochain G K n₂) (z₃ : Cochain K L n₃) (h₂₃ : n₂ + n₃ = n₂₃) : (z₁.comp z₂ (zero_add n₂)).comp z₃ h₂₃ = z₁.comp (z₂.comp z₃ h₂₃) (zero_add n₂₃) := comp_assoc _ _ _ _ _ (by omega) @[simp] lemma comp_assoc_of_second_is_zero_cochain {n₁ n₃ n₁₃ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K 0) (z₃ : Cochain K L n₃) (h₁₃ : n₁ + n₃ = n₁₃) : (z₁.comp z₂ (add_zero n₁)).comp z₃ h₁₃ = z₁.comp (z₂.comp z₃ (zero_add n₃)) h₁₃ := comp_assoc _ _ _ _ _ (by omega) @[simp] lemma comp_assoc_of_third_is_zero_cochain {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (z₃ : Cochain K L 0) (h₁₂ : n₁ + n₂ = n₁₂) : (z₁.comp z₂ h₁₂).comp z₃ (add_zero n₁₂) = z₁.comp (z₂.comp z₃ (add_zero n₂)) h₁₂ := comp_assoc _ _ _ _ _ (by omega) @[simp] lemma comp_assoc_of_second_degree_eq_neg_third_degree {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K (-n₂)) (z₃ : Cochain K L n₂) (h₁₂ : n₁ + (-n₂) = n₁₂) : (z₁.comp z₂ h₁₂).comp z₃ (show n₁₂ + n₂ = n₁ by rw [← h₁₂, add_assoc, neg_add_cancel, add_zero]) = z₁.comp (z₂.comp z₃ (neg_add_cancel n₂)) (add_zero n₁) := comp_assoc _ _ _ _ _ (by omega) @[simp] protected lemma zero_comp {n₁ n₂ n₁₂ : ℤ} (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : (0 : Cochain F G n₁).comp z₂ h = 0 := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), zero_v, zero_comp] @[simp] protected lemma add_comp {n₁ n₂ n₁₂ : ℤ} (z₁ z₁' : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : (z₁ + z₁').comp z₂ h = z₁.comp z₂ h + z₁'.comp z₂ h := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), add_v, add_comp] @[simp] protected lemma sub_comp {n₁ n₂ n₁₂ : ℤ} (z₁ z₁' : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : (z₁ - z₁').comp z₂ h = z₁.comp z₂ h - z₁'.comp z₂ h := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), sub_v, sub_comp] @[simp] protected lemma neg_comp {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : (-z₁).comp z₂ h = -z₁.comp z₂ h := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), neg_v, neg_comp] @[simp] protected lemma smul_comp {n₁ n₂ n₁₂ : ℤ} (k : R) (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : (k • z₁).comp z₂ h = k • (z₁.comp z₂ h) := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), smul_v, Linear.smul_comp] @[simp] lemma units_smul_comp {n₁ n₂ n₁₂ : ℤ} (k : Rˣ) (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : (k • z₁).comp z₂ h = k • (z₁.comp z₂ h) := by apply Cochain.smul_comp @[simp] protected lemma id_comp {n : ℤ} (z₂ : Cochain F G n) : (Cochain.ofHom (𝟙 F)).comp z₂ (zero_add n) = z₂ := by ext p q hpq simp only [zero_cochain_comp_v, ofHom_v, HomologicalComplex.id_f, id_comp] @[simp] protected lemma comp_zero {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (h : n₁ + n₂ = n₁₂) : z₁.comp (0 : Cochain G K n₂) h = 0 := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), zero_v, comp_zero] @[simp] protected lemma comp_add {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ z₂' : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : z₁.comp (z₂ + z₂') h = z₁.comp z₂ h + z₁.comp z₂' h := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), add_v, comp_add] @[simp] protected lemma comp_sub {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ z₂' : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : z₁.comp (z₂ - z₂') h = z₁.comp z₂ h - z₁.comp z₂' h := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), sub_v, comp_sub] @[simp] protected lemma comp_neg {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) : z₁.comp (-z₂) h = -z₁.comp z₂ h := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), neg_v, comp_neg] @[simp] protected lemma comp_smul {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (k : R) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂ ) : z₁.comp (k • z₂) h = k • (z₁.comp z₂ h) := by ext p q hpq simp only [comp_v _ _ h p _ q rfl (by omega), smul_v, Linear.comp_smul] @[simp] lemma comp_units_smul {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (k : Rˣ) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂ ) : z₁.comp (k • z₂) h = k • (z₁.comp z₂ h) := by apply Cochain.comp_smul @[simp] protected lemma comp_id {n : ℤ} (z₁ : Cochain F G n) : z₁.comp (Cochain.ofHom (𝟙 G)) (add_zero n) = z₁ := by ext p q hpq simp only [comp_zero_cochain_v, ofHom_v, HomologicalComplex.id_f, comp_id] @[simp] lemma ofHoms_comp (φ : ∀ (p : ℤ), F.X p ⟶ G.X p) (ψ : ∀ (p : ℤ), G.X p ⟶ K.X p) : (ofHoms φ).comp (ofHoms ψ) (zero_add 0) = ofHoms (fun p => φ p ≫ ψ p) := by aesop_cat @[simp] lemma ofHom_comp (f : F ⟶ G) (g : G ⟶ K) : ofHom (f ≫ g) = (ofHom f).comp (ofHom g) (zero_add 0) := by simp only [ofHom, HomologicalComplex.comp_f, ofHoms_comp] variable (K) /-- The differential on a cochain complex, as a cochain of degree `1`. -/ def diff : Cochain K K 1 := Cochain.mk (fun p q _ => K.d p q) @[simp] lemma diff_v (p q : ℤ) (hpq : p + 1 = q) : (diff K).v p q hpq = K.d p q := rfl end Cochain variable {F G} /-- The differential on the complex of morphisms between cochain complexes. -/ def δ (z : Cochain F G n) : Cochain F G m := Cochain.mk (fun p q hpq => z.v p (p + n) rfl ≫ G.d (p + n) q + m.negOnePow • F.d p (p + m - n) ≫ z.v (p + m - n) q (by rw [hpq, sub_add_cancel])) /-! Similarly as for the composition of cochains, if `z : Cochain F G n`, we usually need to carefully select intermediate indices with good definitional properties in order to obtain a suitable expansion of the morphisms which constitute `δ n m z : Cochain F G m` (when `n + 1 = m`, otherwise it shall be zero). The basic equational lemma is `δ_v` below. -/ lemma δ_v (hnm : n + 1 = m) (z : Cochain F G n) (p q : ℤ) (hpq : p + m = q) (q₁ q₂ : ℤ) (hq₁ : q₁ = q - 1) (hq₂ : p + 1 = q₂) : (δ n m z).v p q hpq = z.v p q₁ (by rw [hq₁, ← hpq, ← hnm, ← add_assoc, add_sub_cancel_right]) ≫ G.d q₁ q + m.negOnePow • F.d p q₂ ≫ z.v q₂ q (by rw [← hq₂, add_assoc, add_comm 1, hnm, hpq]) := by obtain rfl : q₁ = p + n := by omega obtain rfl : q₂ = p + m - n := by omega rfl lemma δ_shape (hnm : ¬ n + 1 = m) (z : Cochain F G n) : δ n m z = 0 := by ext p q hpq dsimp only [δ] rw [Cochain.mk_v, Cochain.zero_v, F.shape, G.shape, comp_zero, zero_add, zero_comp, smul_zero] all_goals simp only [ComplexShape.up_Rel] exact fun _ => hnm (by omega) variable (F G) (R) /-- The differential on the complex of morphisms between cochain complexes, as a linear map. -/ @[simps!] def δ_hom : Cochain F G n →ₗ[R] Cochain F G m where toFun := δ n m map_add' α β := by by_cases h : n + 1 = m · ext p q hpq dsimp simp only [δ_v n m h _ p q hpq _ _ rfl rfl, Cochain.add_v, add_comp, comp_add, smul_add] abel · simp only [δ_shape _ _ h, add_zero] map_smul' r a := by by_cases h : n + 1 = m · ext p q hpq dsimp simp only [δ_v n m h _ p q hpq _ _ rfl rfl, Cochain.smul_v, Linear.comp_smul, Linear.smul_comp, smul_add, add_right_inj, smul_comm m.negOnePow r] · simp only [δ_shape _ _ h, smul_zero] variable {F G R} @[simp] lemma δ_add (z₁ z₂ : Cochain F G n) : δ n m (z₁ + z₂) = δ n m z₁ + δ n m z₂ := (δ_hom ℤ F G n m).map_add z₁ z₂ @[simp] lemma δ_sub (z₁ z₂ : Cochain F G n) : δ n m (z₁ - z₂) = δ n m z₁ - δ n m z₂ := (δ_hom ℤ F G n m).map_sub z₁ z₂ @[simp] lemma δ_zero : δ n m (0 : Cochain F G n) = 0 := (δ_hom ℤ F G n m).map_zero @[simp] lemma δ_neg (z : Cochain F G n) : δ n m (-z) = - δ n m z := (δ_hom ℤ F G n m).map_neg z @[simp] lemma δ_smul (k : R) (z : Cochain F G n) : δ n m (k • z) = k • δ n m z := (δ_hom R F G n m).map_smul k z @[simp] lemma δ_units_smul (k : Rˣ) (z : Cochain F G n) : δ n m (k • z) = k • δ n m z := δ_smul .. lemma δ_δ (n₀ n₁ n₂ : ℤ) (z : Cochain F G n₀) : δ n₁ n₂ (δ n₀ n₁ z) = 0 := by by_cases h₁₂ : n₁ + 1 = n₂; swap · rw [δ_shape _ _ h₁₂] by_cases h₀₁ : n₀ + 1 = n₁; swap · rw [δ_shape _ _ h₀₁, δ_zero] ext p q hpq dsimp simp only [δ_v n₁ n₂ h₁₂ _ p q hpq _ _ rfl rfl, δ_v n₀ n₁ h₀₁ z p (q-1) (by omega) (q-2) _ (by omega) rfl, δ_v n₀ n₁ h₀₁ z (p+1) q (by omega) _ (p+2) rfl (by omega), ← h₁₂, Int.negOnePow_succ, add_comp, assoc, HomologicalComplex.d_comp_d, comp_zero, zero_add, comp_add, HomologicalComplex.d_comp_d_assoc, zero_comp, smul_zero, add_zero, add_neg_cancel, Units.neg_smul, Linear.units_smul_comp, Linear.comp_units_smul] lemma δ_comp {n₁ n₂ n₁₂ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K n₂) (h : n₁ + n₂ = n₁₂) (m₁ m₂ m₁₂ : ℤ) (h₁₂ : n₁₂ + 1 = m₁₂) (h₁ : n₁ + 1 = m₁) (h₂ : n₂ + 1 = m₂) : δ n₁₂ m₁₂ (z₁.comp z₂ h) = z₁.comp (δ n₂ m₂ z₂) (by rw [← h₁₂, ← h₂, ← h, add_assoc]) + n₂.negOnePow • (δ n₁ m₁ z₁).comp z₂ (by rw [← h₁₂, ← h₁, ← h, add_assoc, add_comm 1, add_assoc]) := by subst h₁₂ h₁ h₂ h ext p q hpq dsimp rw [z₁.comp_v _ (add_assoc n₁ n₂ 1).symm p _ q rfl (by omega), Cochain.comp_v _ _ (show n₁ + 1 + n₂ = n₁ + n₂ + 1 by omega) p (p+n₁+1) q (by omega) (by omega), δ_v (n₁ + n₂) _ rfl (z₁.comp z₂ rfl) p q hpq (p + n₁ + n₂) _ (by omega) rfl, z₁.comp_v z₂ rfl p _ _ rfl rfl, z₁.comp_v z₂ rfl (p+1) (p+n₁+1) q (by omega) (by omega), δ_v n₂ (n₂+1) rfl z₂ (p+n₁) q (by omega) (p+n₁+n₂) _ (by omega) rfl, δ_v n₁ (n₁+1) rfl z₁ p (p+n₁+1) (by omega) (p+n₁) _ (by omega) rfl] simp only [assoc, comp_add, add_comp, Int.negOnePow_succ, Int.negOnePow_add n₁ n₂, Units.neg_smul, comp_neg, neg_comp, smul_neg, smul_smul, Linear.units_smul_comp, mul_comm n₁.negOnePow n₂.negOnePow, Linear.comp_units_smul, smul_add] abel lemma δ_zero_cochain_comp {n₂ : ℤ} (z₁ : Cochain F G 0) (z₂ : Cochain G K n₂) (m₂ : ℤ) (h₂ : n₂ + 1 = m₂) : δ n₂ m₂ (z₁.comp z₂ (zero_add n₂)) = z₁.comp (δ n₂ m₂ z₂) (zero_add m₂) + n₂.negOnePow • ((δ 0 1 z₁).comp z₂ (by rw [add_comm, h₂])) :=	δ_comp z₁ z₂ (zero_add n₂) 1 m₂ m₂ h₂ (zero_add 1) h₂ lemma δ_comp_zero_cochain {n₁ : ℤ} (z₁ : Cochain F G n₁) (z₂ : Cochain G K 0) (m₁ : ℤ) (h₁ : n₁ + 1 = m₁) : δ n₁ m₁ (z₁.comp z₂ (add_zero n₁)) = z₁.comp (δ 0 1 z₂) h₁ + (δ n₁ m₁ z₁).comp z₂ (add_zero m₁) := by	Mathlib/Algebra/Homology/HomotopyCategory/HomComplex.lean	512	517
/- Copyright (c) 2021 Aaron Anderson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Aaron Anderson, Gabin Kolly -/ import Mathlib.Data.Fintype.Order import Mathlib.Order.Closure import Mathlib.ModelTheory.Semantics import Mathlib.ModelTheory.Encoding /-! # First-Order Substructures This file defines substructures of first-order structures in a similar manner to the various substructures appearing in the algebra library. ## Main Definitions - A `FirstOrder.Language.Substructure` is defined so that `L.Substructure M` is the type of all substructures of the `L`-structure `M`. - `FirstOrder.Language.Substructure.closure` is defined so that if `s : Set M`, `closure L s` is the least substructure of `M` containing `s`. - `FirstOrder.Language.Substructure.comap` is defined so that `s.comap f` is the preimage of the substructure `s` under the homomorphism `f`, as a substructure. - `FirstOrder.Language.Substructure.map` is defined so that `s.map f` is the image of the substructure `s` under the homomorphism `f`, as a substructure. - `FirstOrder.Language.Hom.range` is defined so that `f.range` is the range of the homomorphism `f`, as a substructure. - `FirstOrder.Language.Hom.domRestrict` and `FirstOrder.Language.Hom.codRestrict` restrict the domain and codomain respectively of first-order homomorphisms to substructures. - `FirstOrder.Language.Embedding.domRestrict` and `FirstOrder.Language.Embedding.codRestrict` restrict the domain and codomain respectively of first-order embeddings to substructures. - `FirstOrder.Language.Substructure.inclusion` is the inclusion embedding between substructures. - `FirstOrder.Language.Substructure.PartialEquiv` is defined so that `PartialEquiv L M N` is the type of equivalences between substructures of `M` and `N`. ## Main Results - `L.Substructure M` forms a `CompleteLattice`. -/ universe u v w namespace FirstOrder namespace Language variable {L : Language.{u, v}} {M : Type w} {N P : Type} variable [L.Structure M] [L.Structure N] [L.Structure P] open FirstOrder Cardinal open Structure Cardinal section ClosedUnder open Set variable {n : ℕ} (f : L.Functions n) (s : Set M) /-- Indicates that a set in a given structure is a closed under a function symbol. -/ def ClosedUnder : Prop := ∀ x : Fin n → M, (∀ i : Fin n, x i ∈ s) → funMap f x ∈ s variable (L) @[simp] theorem closedUnder_univ : ClosedUnder f (univ : Set M) := fun _ _ => mem_univ _ variable {L f s} {t : Set M} namespace ClosedUnder theorem inter (hs : ClosedUnder f s) (ht : ClosedUnder f t) : ClosedUnder f (s ∩ t) := fun x h => mem_inter (hs x fun i => mem_of_mem_inter_left (h i)) (ht x fun i => mem_of_mem_inter_right (h i)) theorem inf (hs : ClosedUnder f s) (ht : ClosedUnder f t) : ClosedUnder f (s ⊓ t) := hs.inter ht variable {S : Set (Set M)} theorem sInf (hS : ∀ s, s ∈ S → ClosedUnder f s) : ClosedUnder f (sInf S) := fun x h s hs => hS s hs x fun i => h i s hs end ClosedUnder end ClosedUnder variable (L) (M) /-- A substructure of a structure `M` is a set closed under application of function symbols. -/ structure Substructure where /-- The underlying set of this substructure -/ carrier : Set M fun_mem : ∀ {n}, ∀ f : L.Functions n, ClosedUnder f carrier variable {L} {M} namespace Substructure attribute [coe] Substructure.carrier instance instSetLike : SetLike (L.Substructure M) M := ⟨Substructure.carrier, fun p q h => by cases p; cases q; congr⟩ /-- See Note [custom simps projection] -/ def Simps.coe (S : L.Substructure M) : Set M := S initialize_simps_projections Substructure (carrier → coe, as_prefix coe) @[simp] theorem mem_carrier {s : L.Substructure M} {x : M} : x ∈ s.carrier ↔ x ∈ s := Iff.rfl /-- Two substructures are equal if they have the same elements. -/ @[ext] theorem ext {S T : L.Substructure M} (h : ∀ x, x ∈ S ↔ x ∈ T) : S = T := SetLike.ext h /-- Copy a substructure replacing `carrier` with a set that is equal to it. -/ protected def copy (S : L.Substructure M) (s : Set M) (hs : s = S) : L.Substructure M where carrier := s fun_mem _ f := hs.symm ▸ S.fun_mem _ f end Substructure variable {S : L.Substructure M} theorem Term.realize_mem {α : Type} (t : L.Term α) (xs : α → M) (h : ∀ a, xs a ∈ S) : t.realize xs ∈ S := by induction t with \| var a => exact h a \| func f ts ih => exact Substructure.fun_mem _ _ _ ih namespace Substructure @[simp] theorem coe_copy {s : Set M} (hs : s = S) : (S.copy s hs : Set M) = s := rfl theorem copy_eq {s : Set M} (hs : s = S) : S.copy s hs = S := SetLike.coe_injective hs theorem constants_mem (c : L.Constants) : (c : M) ∈ S := mem_carrier.2 (S.fun_mem c _ finZeroElim) /-- The substructure `M` of the structure `M`. -/ instance instTop : Top (L.Substructure M) := ⟨{ carrier := Set.univ fun_mem := fun {_} _ _ _ => Set.mem_univ _ }⟩ instance instInhabited : Inhabited (L.Substructure M) := ⟨⊤⟩ @[simp] theorem mem_top (x : M) : x ∈ (⊤ : L.Substructure M) := Set.mem_univ x @[simp] theorem coe_top : ((⊤ : L.Substructure M) : Set M) = Set.univ := rfl /-- The inf of two substructures is their intersection. -/ instance instInf : Min (L.Substructure M) := ⟨fun S₁ S₂ => { carrier := (S₁ : Set M) ∩ (S₂ : Set M) fun_mem := fun {_} f => (S₁.fun_mem f).inf (S₂.fun_mem f) }⟩ @[simp] theorem coe_inf (p p' : L.Substructure M) : ((p ⊓ p' : L.Substructure M) : Set M) = (p : Set M) ∩ (p' : Set M) := rfl @[simp] theorem mem_inf {p p' : L.Substructure M} {x : M} : x ∈ p ⊓ p' ↔ x ∈ p ∧ x ∈ p' := Iff.rfl instance instInfSet : InfSet (L.Substructure M) := ⟨fun s => { carrier := ⋂ t ∈ s, (t : Set M) fun_mem := fun {n} f => ClosedUnder.sInf (by rintro _ ⟨t, rfl⟩ by_cases h : t ∈ s · simpa [h] using t.fun_mem f · simp [h]) }⟩ @[simp, norm_cast] theorem coe_sInf (S : Set (L.Substructure M)) : ((sInf S : L.Substructure M) : Set M) = ⋂ s ∈ S, (s : Set M) := rfl theorem mem_sInf {S : Set (L.Substructure M)} {x : M} : x ∈ sInf S ↔ ∀ p ∈ S, x ∈ p := Set.mem_iInter₂ theorem mem_iInf {ι : Sort} {S : ι → L.Substructure M} {x : M} : (x ∈ ⨅ i, S i) ↔ ∀ i, x ∈ S i := by simp only [iInf, mem_sInf, Set.forall_mem_range] @[simp, norm_cast] theorem coe_iInf {ι : Sort} {S : ι → L.Substructure M} : ((⨅ i, S i : L.Substructure M) : Set M) = ⋂ i, (S i : Set M) := by simp only [iInf, coe_sInf, Set.biInter_range] /-- Substructures of a structure form a complete lattice. -/ instance instCompleteLattice : CompleteLattice (L.Substructure M) := { completeLatticeOfInf (L.Substructure M) fun _ => IsGLB.of_image (fun {S T : L.Substructure M} => show (S : Set M) ≤ T ↔ S ≤ T from SetLike.coe_subset_coe) isGLB_biInf with le := (· ≤ ·) lt := (· < ·) top := ⊤ le_top := fun _ x _ => mem_top x inf := (· ⊓ ·) sInf := InfSet.sInf le_inf := fun _a _b _c ha hb _x hx => ⟨ha hx, hb hx⟩ inf_le_left := fun _ _ _ => And.left inf_le_right := fun _ _ _ => And.right } variable (L) /-- The `L.Substructure` generated by a set. -/ def closure : LowerAdjoint ((↑) : L.Substructure M → Set M) := ⟨fun s => sInf { S \| s ⊆ S }, fun _ _ => ⟨Set.Subset.trans fun _x hx => mem_sInf.2 fun _S hS => hS hx, fun h => sInf_le h⟩⟩ variable {L} {s : Set M} theorem mem_closure {x : M} : x ∈ closure L s ↔ ∀ S : L.Substructure M, s ⊆ S → x ∈ S := mem_sInf /-- The substructure generated by a set includes the set. -/ @[simp] theorem subset_closure : s ⊆ closure L s := (closure L).le_closure s theorem not_mem_of_not_mem_closure {P : M} (hP : P ∉ closure L s) : P ∉ s := fun h => hP (subset_closure h) @[simp] theorem closed (S : L.Substructure M) : (closure L).closed (S : Set M) := congr rfl ((closure L).eq_of_le Set.Subset.rfl fun _x xS => mem_closure.2 fun _T hT => hT xS) open Set /-- A substructure `S` includes `closure L s` if and only if it includes `s`. -/ @[simp] theorem closure_le : closure L s ≤ S ↔ s ⊆ S := (closure L).closure_le_closed_iff_le s S.closed /-- Substructure closure of a set is monotone in its argument: if `s ⊆ t`, then `closure L s ≤ closure L t`. -/ @[gcongr] theorem closure_mono ⦃s t : Set M⦄ (h : s ⊆ t) : closure L s ≤ closure L t := (closure L).monotone h theorem closure_eq_of_le (h₁ : s ⊆ S) (h₂ : S ≤ closure L s) : closure L s = S := (closure L).eq_of_le h₁ h₂ theorem coe_closure_eq_range_term_realize : (closure L s : Set M) = range (@Term.realize L _ _ _ ((↑) : s → M)) := by let S : L.Substructure M := ⟨range (Term.realize (L := L) ((↑) : s → M)), fun {n} f x hx => by simp only [mem_range] at * refine ⟨func f fun i => Classical.choose (hx i), ?_⟩ simp only [Term.realize, fun i => Classical.choose_spec (hx i)]⟩ change _ = (S : Set M) rw [← SetLike.ext'_iff] refine closure_eq_of_le (fun x hx => ⟨var ⟨x, hx⟩, rfl⟩) (le_sInf fun S' hS' => ?_) rintro _ ⟨t, rfl⟩ exact t.realize_mem _ fun i => hS' i.2 instance small_closure [Small.{u} s] : Small.{u} (closure L s) := by rw [← SetLike.coe_sort_coe, Substructure.coe_closure_eq_range_term_realize] exact small_range _ theorem mem_closure_iff_exists_term {x : M} : x ∈ closure L s ↔ ∃ t : L.Term s, t.realize ((↑) : s → M) = x := by rw [← SetLike.mem_coe, coe_closure_eq_range_term_realize, mem_range] theorem lift_card_closure_le_card_term : Cardinal.lift.{max u w} #(closure L s) ≤ #(L.Term s) := by rw [← SetLike.coe_sort_coe, coe_closure_eq_range_term_realize] rw [← Cardinal.lift_id'.{w, max u w} #(L.Term s)] exact Cardinal.mk_range_le_lift theorem lift_card_closure_le : Cardinal.lift.{u, w} #(closure L s) ≤ max ℵ₀ (Cardinal.lift.{u, w} #s + Cardinal.lift.{w, u} #(Σi, L.Functions i)) := by rw [← lift_umax] refine lift_card_closure_le_card_term.trans (Term.card_le.trans ?_) rw [mk_sum, lift_umax.{w, u}] lemma mem_closed_iff (s : Set M) : s ∈ (closure L).closed ↔ ∀ {n}, ∀ f : L.Functions n, ClosedUnder f s := by refine ⟨fun h n f => ?_, fun h => ?_⟩ · rw [← h] exact Substructure.fun_mem _ _ · have h' : closure L s = ⟨s, h⟩ := closure_eq_of_le (refl _) subset_closure exact congr_arg _ h' variable (L) lemma mem_closed_of_isRelational [L.IsRelational] (s : Set M) : s ∈ (closure L).closed := (mem_closed_iff s).2 isEmptyElim @[simp] lemma closure_eq_of_isRelational [L.IsRelational] (s : Set M) : closure L s = s := LowerAdjoint.closure_eq_self_of_mem_closed _ (mem_closed_of_isRelational L s) @[simp] lemma mem_closure_iff_of_isRelational [L.IsRelational] (s : Set M) (m : M) : m ∈ closure L s ↔ m ∈ s := by rw [← SetLike.mem_coe, closure_eq_of_isRelational] theorem _root_.Set.Countable.substructure_closure [Countable (Σ l, L.Functions l)] (h : s.Countable) : Countable.{w + 1} (closure L s) := by haveI : Countable s := h.to_subtype rw [← mk_le_aleph0_iff, ← lift_le_aleph0] exact lift_card_closure_le_card_term.trans mk_le_aleph0 variable {L} (S) /-- An induction principle for closure membership. If `p` holds for all elements of `s`, and is preserved under function symbols, then `p` holds for all elements of the closure of `s`. -/ @[elab_as_elim] theorem closure_induction {p : M → Prop} {x} (h : x ∈ closure L s) (Hs : ∀ x ∈ s, p x) (Hfun : ∀ {n : ℕ} (f : L.Functions n), ClosedUnder f (setOf p)) : p x := (@closure_le L M _ ⟨setOf p, fun {_} => Hfun⟩ _).2 Hs h /-- If `s` is a dense set in a structure `M`, `Substructure.closure L s = ⊤`, then in order to prove that some predicate `p` holds for all `x : M` it suffices to verify `p x` for `x ∈ s`, and verify that `p` is preserved under function symbols. -/ @[elab_as_elim] theorem dense_induction {p : M → Prop} (x : M) {s : Set M} (hs : closure L s = ⊤) (Hs : ∀ x ∈ s, p x) (Hfun : ∀ {n : ℕ} (f : L.Functions n), ClosedUnder f (setOf p)) : p x := by have : ∀ x ∈ closure L s, p x := fun x hx => closure_induction hx Hs fun {n} => Hfun simpa [hs] using this x variable (L) (M) /-- `closure` forms a Galois insertion with the coercion to set. -/ protected def gi : GaloisInsertion (@closure L M _) (↑) where choice s _ := closure L s gc := (closure L).gc le_l_u _ := subset_closure choice_eq _ _ := rfl variable {L} {M} /-- Closure of a substructure `S` equals `S`. -/ @[simp] theorem closure_eq : closure L (S : Set M) = S := (Substructure.gi L M).l_u_eq S @[simp] theorem closure_empty : closure L (∅ : Set M) = ⊥ := (Substructure.gi L M).gc.l_bot @[simp] theorem closure_univ : closure L (univ : Set M) = ⊤ := @coe_top L M _ ▸ closure_eq ⊤ theorem closure_union (s t : Set M) : closure L (s ∪ t) = closure L s ⊔ closure L t := (Substructure.gi L M).gc.l_sup theorem closure_iUnion {ι} (s : ι → Set M) : closure L (⋃ i, s i) = ⨆ i, closure L (s i) := (Substructure.gi L M).gc.l_iSup theorem closure_insert (s : Set M) (m : M) : closure L (insert m s) = closure L {m} ⊔ closure L s := closure_union {m} s instance small_bot : Small.{u} (⊥ : L.Substructure M) := by rw [← closure_empty] haveI : Small.{u} (∅ : Set M) := small_subsingleton _ exact Substructure.small_closure theorem iSup_eq_closure {ι : Sort} (S : ι → L.Substructure M) : ⨆ i, S i = closure L (⋃ i, (S i : Set M)) := by simp_rw [closure_iUnion, closure_eq] -- This proof uses the fact that `Substructure.closure` is finitary. theorem mem_iSup_of_directed {ι : Type} [hι : Nonempty ι] {S : ι → L.Substructure M} (hS : Directed (· ≤ ·) S) {x : M} : x ∈ ⨆ i, S i ↔ ∃ i, x ∈ S i := by refine ⟨?_, fun ⟨i, hi⟩ ↦ le_iSup S i hi⟩ suffices x ∈ closure L (⋃ i, (S i : Set M)) → ∃ i, x ∈ S i by simpa only [closure_iUnion, closure_eq (S _)] using this refine fun hx ↦ closure_induction hx (fun _ ↦ mem_iUnion.1) (fun f v hC ↦ ?_) simp_rw [Set.mem_setOf] at * have ⟨i, hi⟩ := hS.finite_le (fun i ↦ Classical.choose (hC i)) refine ⟨i, (S i).fun_mem f v (fun j ↦ hi j (Classical.choose_spec (hC j)))⟩ -- This proof uses the fact that `Substructure.closure` is finitary. theorem mem_sSup_of_directedOn {S : Set (L.Substructure M)} (Sne : S.Nonempty) (hS : DirectedOn (· ≤ ·) S) {x : M} : x ∈ sSup S ↔ ∃ s ∈ S, x ∈ s := by haveI : Nonempty S := Sne.to_subtype simp only [sSup_eq_iSup', mem_iSup_of_directed hS.directed_val, Subtype.exists, exists_prop] variable (L) (M) instance [IsEmpty L.Constants] : IsEmpty (⊥ : L.Substructure M) := by refine (isEmpty_subtype _).2 (fun x => ?_) have h : (∅ : Set M) ∈ (closure L).closed := by rw [mem_closed_iff] intro n f cases n · exact isEmptyElim f · intro x hx simp only [mem_empty_iff_false, forall_const] at hx rw [← closure_empty, ← SetLike.mem_coe, h] exact Set.not_mem_empty _ variable {L} {M} /-! ### `comap` and `map` -/ /-- The preimage of a substructure along a homomorphism is a substructure. -/ @[simps] def comap (φ : M →[L] N) (S : L.Substructure N) : L.Substructure M where carrier := φ ⁻¹' S fun_mem {n} f x hx := by rw [mem_preimage, φ.map_fun] exact S.fun_mem f (φ ∘ x) hx @[simp] theorem mem_comap {S : L.Substructure N} {f : M →[L] N} {x : M} : x ∈ S.comap f ↔ f x ∈ S := Iff.rfl theorem comap_comap (S : L.Substructure P) (g : N →[L] P) (f : M →[L] N) : (S.comap g).comap f = S.comap (g.comp f) := rfl @[simp] theorem comap_id (S : L.Substructure P) : S.comap (Hom.id _ _) = S := ext (by simp) /-- The image of a substructure along a homomorphism is a substructure. -/ @[simps] def map (φ : M →[L] N) (S : L.Substructure M) : L.Substructure N where carrier := φ '' S fun_mem {n} f x hx := (mem_image _ _ _).1 ⟨funMap f fun i => Classical.choose (hx i), S.fun_mem f _ fun i => (Classical.choose_spec (hx i)).1, by simp only [Hom.map_fun, SetLike.mem_coe] exact congr rfl (funext fun i => (Classical.choose_spec (hx i)).2)⟩ @[simp] theorem mem_map {f : M →[L] N} {S : L.Substructure M} {y : N} : y ∈ S.map f ↔ ∃ x ∈ S, f x = y := Iff.rfl theorem mem_map_of_mem (f : M →[L] N) {S : L.Substructure M} {x : M} (hx : x ∈ S) : f x ∈ S.map f := mem_image_of_mem f hx theorem apply_coe_mem_map (f : M →[L] N) (S : L.Substructure M) (x : S) : f x ∈ S.map f := mem_map_of_mem f x.prop theorem map_map (g : N →[L] P) (f : M →[L] N) : (S.map f).map g = S.map (g.comp f) := SetLike.coe_injective <\| image_image _ _ _ theorem map_le_iff_le_comap {f : M →[L] N} {S : L.Substructure M} {T : L.Substructure N} : S.map f ≤ T ↔ S ≤ T.comap f := image_subset_iff theorem gc_map_comap (f : M →[L] N) : GaloisConnection (map f) (comap f) := fun _ _ => map_le_iff_le_comap theorem map_le_of_le_comap {T : L.Substructure N} {f : M →[L] N} : S ≤ T.comap f → S.map f ≤ T := (gc_map_comap f).l_le theorem le_comap_of_map_le {T : L.Substructure N} {f : M →[L] N} : S.map f ≤ T → S ≤ T.comap f := (gc_map_comap f).le_u theorem le_comap_map {f : M →[L] N} : S ≤ (S.map f).comap f := (gc_map_comap f).le_u_l _ theorem map_comap_le {S : L.Substructure N} {f : M →[L] N} : (S.comap f).map f ≤ S := (gc_map_comap f).l_u_le _ theorem monotone_map {f : M →[L] N} : Monotone (map f) := (gc_map_comap f).monotone_l theorem monotone_comap {f : M →[L] N} : Monotone (comap f) := (gc_map_comap f).monotone_u @[simp] theorem map_comap_map {f : M →[L] N} : ((S.map f).comap f).map f = S.map f := (gc_map_comap f).l_u_l_eq_l _ @[simp] theorem comap_map_comap {S : L.Substructure N} {f : M →[L] N} : ((S.comap f).map f).comap f = S.comap f := (gc_map_comap f).u_l_u_eq_u _ theorem map_sup (S T : L.Substructure M) (f : M →[L] N) : (S ⊔ T).map f = S.map f ⊔ T.map f := (gc_map_comap f).l_sup theorem map_iSup {ι : Sort} (f : M →[L] N) (s : ι → L.Substructure M) : (⨆ i, s i).map f = ⨆ i, (s i).map f := (gc_map_comap f).l_iSup theorem comap_inf (S T : L.Substructure N) (f : M →[L] N) : (S ⊓ T).comap f = S.comap f ⊓ T.comap f := (gc_map_comap f).u_inf theorem comap_iInf {ι : Sort} (f : M →[L] N) (s : ι → L.Substructure N) : (⨅ i, s i).comap f = ⨅ i, (s i).comap f := (gc_map_comap f).u_iInf @[simp] theorem map_bot (f : M →[L] N) : (⊥ : L.Substructure M).map f = ⊥ := (gc_map_comap f).l_bot @[simp] theorem comap_top (f : M →[L] N) : (⊤ : L.Substructure N).comap f = ⊤ := (gc_map_comap f).u_top @[simp] theorem map_id (S : L.Substructure M) : S.map (Hom.id L M) = S := SetLike.coe_injective <\| Set.image_id _ theorem map_closure (f : M →[L] N) (s : Set M) : (closure L s).map f = closure L (f '' s) := Eq.symm <\| closure_eq_of_le (Set.image_subset f subset_closure) <\| map_le_iff_le_comap.2 <\| closure_le.2 fun x hx => subset_closure ⟨x, hx, rfl⟩ @[simp] theorem closure_image (f : M →[L] N) : closure L (f '' s) = map f (closure L s) := (map_closure f s).symm section GaloisCoinsertion variable {ι : Type} {f : M →[L] N} /-- `map f` and `comap f` form a `GaloisCoinsertion` when `f` is injective. -/ def gciMapComap (hf : Function.Injective f) : GaloisCoinsertion (map f) (comap f) := (gc_map_comap f).toGaloisCoinsertion fun S x => by simp [mem_comap, mem_map, hf.eq_iff] variable (hf : Function.Injective f) include hf theorem comap_map_eq_of_injective (S : L.Substructure M) : (S.map f).comap f = S := (gciMapComap hf).u_l_eq _ theorem comap_surjective_of_injective : Function.Surjective (comap f) := (gciMapComap hf).u_surjective theorem map_injective_of_injective : Function.Injective (map f) := (gciMapComap hf).l_injective theorem comap_inf_map_of_injective (S T : L.Substructure M) : (S.map f ⊓ T.map f).comap f = S ⊓ T := (gciMapComap hf).u_inf_l _ _ theorem comap_iInf_map_of_injective (S : ι → L.Substructure M) : (⨅ i, (S i).map f).comap f = ⨅ i, S i := (gciMapComap hf).u_iInf_l _ theorem comap_sup_map_of_injective (S T : L.Substructure M) : (S.map f ⊔ T.map f).comap f = S ⊔ T := (gciMapComap hf).u_sup_l _ _ theorem comap_iSup_map_of_injective (S : ι → L.Substructure M) : (⨆ i, (S i).map f).comap f = ⨆ i, S i := (gciMapComap hf).u_iSup_l _ theorem map_le_map_iff_of_injective {S T : L.Substructure M} : S.map f ≤ T.map f ↔ S ≤ T := (gciMapComap hf).l_le_l_iff theorem map_strictMono_of_injective : StrictMono (map f) := (gciMapComap hf).strictMono_l end GaloisCoinsertion section GaloisInsertion variable {ι : Type} {f : M →[L] N} (hf : Function.Surjective f) include hf /-- `map f` and `comap f` form a `GaloisInsertion` when `f` is surjective. -/ def giMapComap : GaloisInsertion (map f) (comap f) := (gc_map_comap f).toGaloisInsertion fun S x h => let ⟨y, hy⟩ := hf x mem_map.2 ⟨y, by simp [hy, h]⟩ theorem map_comap_eq_of_surjective (S : L.Substructure N) : (S.comap f).map f = S := (giMapComap hf).l_u_eq _ theorem map_surjective_of_surjective : Function.Surjective (map f) := (giMapComap hf).l_surjective theorem comap_injective_of_surjective : Function.Injective (comap f) := (giMapComap hf).u_injective theorem map_inf_comap_of_surjective (S T : L.Substructure N) : (S.comap f ⊓ T.comap f).map f = S ⊓ T := (giMapComap hf).l_inf_u _ _ theorem map_iInf_comap_of_surjective (S : ι → L.Substructure N) : (⨅ i, (S i).comap f).map f = ⨅ i, S i := (giMapComap hf).l_iInf_u _ theorem map_sup_comap_of_surjective (S T : L.Substructure N) : (S.comap f ⊔ T.comap f).map f = S ⊔ T := (giMapComap hf).l_sup_u _ _ theorem map_iSup_comap_of_surjective (S : ι → L.Substructure N) : (⨆ i, (S i).comap f).map f = ⨆ i, S i := (giMapComap hf).l_iSup_u _ theorem comap_le_comap_iff_of_surjective {S T : L.Substructure N} : S.comap f ≤ T.comap f ↔ S ≤ T := (giMapComap hf).u_le_u_iff theorem comap_strictMono_of_surjective : StrictMono (comap f) := (giMapComap hf).strictMono_u end GaloisInsertion instance inducedStructure {S : L.Substructure M} : L.Structure S where funMap {_} f x := ⟨funMap f fun i => x i, S.fun_mem f (fun i => x i) fun i => (x i).2⟩ RelMap {_} r x := RelMap r fun i => (x i : M) /-- The natural embedding of an `L.Substructure` of `M` into `M`. -/ def subtype (S : L.Substructure M) : S ↪[L] M where toFun := (↑) inj' := Subtype.coe_injective @[simp] theorem subtype_apply {S : L.Substructure M} {x : S} : subtype S x = x := rfl theorem subtype_injective (S : L.Substructure M): Function.Injective (subtype S) := Subtype.coe_injective @[simp] theorem coe_subtype : ⇑S.subtype = ((↑) : S → M) := rfl @[deprecated (since := "2025-02-18")] alias coeSubtype := coe_subtype /-- The equivalence between the maximal substructure of a structure and the structure itself. -/ def topEquiv : (⊤ : L.Substructure M) ≃[L] M where toFun := subtype ⊤ invFun m := ⟨m, mem_top m⟩ left_inv m := by simp right_inv _ := rfl @[simp] theorem coe_topEquiv : ⇑(topEquiv : (⊤ : L.Substructure M) ≃[L] M) = ((↑) : (⊤ : L.Substructure M) → M) := rfl @[simp] theorem realize_boundedFormula_top {α : Type} {n : ℕ} {φ : L.BoundedFormula α n} {v : α → (⊤ : L.Substructure M)} {xs : Fin n → (⊤ : L.Substructure M)} : φ.Realize v xs ↔ φ.Realize (((↑) : _ → M) ∘ v) ((↑) ∘ xs) := by rw [← StrongHomClass.realize_boundedFormula Substructure.topEquiv φ] simp @[simp] theorem realize_formula_top {α : Type} {φ : L.Formula α} {v : α → (⊤ : L.Substructure M)} : φ.Realize v ↔ φ.Realize (((↑) : (⊤ : L.Substructure M) → M) ∘ v) := by rw [← StrongHomClass.realize_formula Substructure.topEquiv φ] simp /-- A dependent version of `Substructure.closure_induction`. -/ @[elab_as_elim] theorem closure_induction' (s : Set M) {p : ∀ x, x ∈ closure L s → Prop} (Hs : ∀ (x) (h : x ∈ s), p x (subset_closure h)) (Hfun : ∀ {n : ℕ} (f : L.Functions n), ClosedUnder f { x \| ∃ hx, p x hx }) {x} (hx : x ∈ closure L s) : p x hx := by refine Exists.elim ?_ fun (hx : x ∈ closure L s) (hc : p x hx) => hc exact closure_induction hx (fun x hx => ⟨subset_closure hx, Hs x hx⟩) @Hfun end Substructure open Substructure namespace LHom variable {L' : Language} [L'.Structure M] /-- Reduces the language of a substructure along a language hom. -/	def substructureReduct (φ : L →ᴸ L') [φ.IsExpansionOn M] : L'.Substructure M ↪o L.Substructure M where toFun S := { carrier := S fun_mem := fun {n} f x hx => by	Mathlib/ModelTheory/Substructures.lean	688	692
/- Copyright (c) 2019 Johannes Hölzl, Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Zhouhang Zhou -/ import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Function.StronglyMeasurable.AEStronglyMeasurable import Mathlib.MeasureTheory.Integral.Lebesgue.Add import Mathlib.Order.Filter.Germ.Basic import Mathlib.Topology.ContinuousMap.Algebra /-! # Almost everywhere equal functions We build a space of equivalence classes of functions, where two functions are treated as identical if they are almost everywhere equal. We form the set of equivalence classes under the relation of being almost everywhere equal, which is sometimes known as the `L⁰` space. To use this space as a basis for the `L^p` spaces and for the Bochner integral, we consider equivalence classes of strongly measurable functions (or, equivalently, of almost everywhere strongly measurable functions.) See `L1Space.lean` for `L¹` space. ## Notation * `α →ₘ[μ] β` is the type of `L⁰` space, where `α` is a measurable space, `β` is a topological space, and `μ` is a measure on `α`. `f : α →ₘ β` is a "function" in `L⁰`. In comments, `[f]` is also used to denote an `L⁰` function. `ₘ` can be typed as `\_m`. Sometimes it is shown as a box if font is missing. ## Main statements * The linear structure of `L⁰` : Addition and scalar multiplication are defined on `L⁰` in the natural way, i.e., `[f] + [g] := [f + g]`, `c • [f] := [c • f]`. So defined, `α →ₘ β` inherits the linear structure of `β`. For example, if `β` is a module, then `α →ₘ β` is a module over the same ring. See `mk_add_mk`, `neg_mk`, `mk_sub_mk`, `smul_mk`, `add_toFun`, `neg_toFun`, `sub_toFun`, `smul_toFun` * The order structure of `L⁰` : `≤` can be defined in a similar way: `[f] ≤ [g]` if `f a ≤ g a` for almost all `a` in domain. And `α →ₘ β` inherits the preorder and partial order of `β`. TODO: Define `sup` and `inf` on `L⁰` so that it forms a lattice. It seems that `β` must be a linear order, since otherwise `f ⊔ g` may not be a measurable function. ## Implementation notes * `f.toFun` : To find a representative of `f : α →ₘ β`, use the coercion `(f : α → β)`, which is implemented as `f.toFun`. For each operation `op` in `L⁰`, there is a lemma called `coe_fn_op`, characterizing, say, `(f op g : α → β)`. * `ae_eq_fun.mk` : To constructs an `L⁰` function `α →ₘ β` from an almost everywhere strongly measurable function `f : α → β`, use `ae_eq_fun.mk` * `comp` : Use `comp g f` to get `[g ∘ f]` from `g : β → γ` and `[f] : α →ₘ γ` when `g` is continuous. Use `comp_measurable` if `g` is only measurable (this requires the target space to be second countable). * `comp₂` : Use `comp₂ g f₁ f₂` to get `[fun a ↦ g (f₁ a) (f₂ a)]`. For example, `[f + g]` is `comp₂ (+)` ## Tags function space, almost everywhere equal, `L⁰`, ae_eq_fun -/ -- Guard against import creep assert_not_exists InnerProductSpace noncomputable section open Topology Set Filter TopologicalSpace ENNReal EMetric MeasureTheory Function variable {α β γ δ : Type} [MeasurableSpace α] {μ ν : Measure α} namespace MeasureTheory section MeasurableSpace variable [TopologicalSpace β] variable (β) /-- The equivalence relation of being almost everywhere equal for almost everywhere strongly measurable functions. -/ def Measure.aeEqSetoid (μ : Measure α) : Setoid { f : α → β // AEStronglyMeasurable f μ } := ⟨fun f g => (f : α → β) =ᵐ[μ] g, fun {f} => ae_eq_refl f.val, fun {_ _} => ae_eq_symm, fun {_ _ _} => ae_eq_trans⟩ variable (α) /-- The space of equivalence classes of almost everywhere strongly measurable functions, where two strongly measurable functions are equivalent if they agree almost everywhere, i.e., they differ on a set of measure `0`. -/ def AEEqFun (μ : Measure α) : Type _ := Quotient (μ.aeEqSetoid β) variable {α β} @[inherit_doc MeasureTheory.AEEqFun] notation:25 α " →ₘ[" μ "] " β => AEEqFun α β μ end MeasurableSpace variable [TopologicalSpace δ] namespace AEEqFun section variable [TopologicalSpace β] /-- Construct the equivalence class `[f]` of an almost everywhere measurable function `f`, based on the equivalence relation of being almost everywhere equal. -/ def mk {β : Type} [TopologicalSpace β] (f : α → β) (hf : AEStronglyMeasurable f μ) : α →ₘ[μ] β := Quotient.mk'' ⟨f, hf⟩ open scoped Classical in /-- Coercion from a space of equivalence classes of almost everywhere strongly measurable functions to functions. We ensure that if `f` has a constant representative, then we choose that one. -/ @[coe] def cast (f : α →ₘ[μ] β) : α → β := if h : ∃ (b : β), f = mk (const α b) aestronglyMeasurable_const then const α <\| Classical.choose h else AEStronglyMeasurable.mk _ (Quotient.out f : { f : α → β // AEStronglyMeasurable f μ }).2 /-- A measurable representative of an `AEEqFun` [f] -/ instance instCoeFun : CoeFun (α →ₘ[μ] β) fun _ => α → β := ⟨cast⟩ protected theorem stronglyMeasurable (f : α →ₘ[μ] β) : StronglyMeasurable f := by simp only [cast] split_ifs with h · exact stronglyMeasurable_const · apply AEStronglyMeasurable.stronglyMeasurable_mk protected theorem aestronglyMeasurable (f : α →ₘ[μ] β) : AEStronglyMeasurable f μ := f.stronglyMeasurable.aestronglyMeasurable protected theorem measurable [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (f : α →ₘ[μ] β) : Measurable f := f.stronglyMeasurable.measurable protected theorem aemeasurable [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (f : α →ₘ[μ] β) : AEMeasurable f μ := f.measurable.aemeasurable @[simp] theorem quot_mk_eq_mk (f : α → β) (hf) : (Quot.mk (@Setoid.r _ <\| μ.aeEqSetoid β) ⟨f, hf⟩ : α →ₘ[μ] β) = mk f hf := rfl @[simp] theorem mk_eq_mk {f g : α → β} {hf hg} : (mk f hf : α →ₘ[μ] β) = mk g hg ↔ f =ᵐ[μ] g := Quotient.eq'' @[simp] theorem mk_coeFn (f : α →ₘ[μ] β) : mk f f.aestronglyMeasurable = f := by conv_lhs => simp only [cast] split_ifs with h · exact Classical.choose_spec h \|>.symm conv_rhs => rw [← Quotient.out_eq' f] rw [← mk, mk_eq_mk] exact (AEStronglyMeasurable.ae_eq_mk _).symm @[ext] theorem ext {f g : α →ₘ[μ] β} (h : f =ᵐ[μ] g) : f = g := by rwa [← f.mk_coeFn, ← g.mk_coeFn, mk_eq_mk] theorem coeFn_mk (f : α → β) (hf) : (mk f hf : α →ₘ[μ] β) =ᵐ[μ] f := by rw [← mk_eq_mk, mk_coeFn] @[elab_as_elim] theorem induction_on (f : α →ₘ[μ] β) {p : (α →ₘ[μ] β) → Prop} (H : ∀ f hf, p (mk f hf)) : p f := Quotient.inductionOn' f <\| Subtype.forall.2 H @[elab_as_elim] theorem induction_on₂ {α' β' : Type} [MeasurableSpace α'] [TopologicalSpace β'] {μ' : Measure α'} (f : α →ₘ[μ] β) (f' : α' →ₘ[μ'] β') {p : (α →ₘ[μ] β) → (α' →ₘ[μ'] β') → Prop} (H : ∀ f hf f' hf', p (mk f hf) (mk f' hf')) : p f f' := induction_on f fun f hf => induction_on f' <\| H f hf @[elab_as_elim] theorem induction_on₃ {α' β' : Type} [MeasurableSpace α'] [TopologicalSpace β'] {μ' : Measure α'} {α'' β'' : Type} [MeasurableSpace α''] [TopologicalSpace β''] {μ'' : Measure α''} (f : α →ₘ[μ] β) (f' : α' →ₘ[μ'] β') (f'' : α'' →ₘ[μ''] β'') {p : (α →ₘ[μ] β) → (α' →ₘ[μ'] β') → (α'' →ₘ[μ''] β'') → Prop} (H : ∀ f hf f' hf' f'' hf'', p (mk f hf) (mk f' hf') (mk f'' hf'')) : p f f' f'' := induction_on f fun f hf => induction_on₂ f' f'' <\| H f hf end /-! ### Composition of an a.e. equal function with a (quasi) measure preserving function -/ section compQuasiMeasurePreserving variable [TopologicalSpace γ] [MeasurableSpace β] {ν : MeasureTheory.Measure β} {f : α → β} open MeasureTheory.Measure (QuasiMeasurePreserving) /-- Composition of an almost everywhere equal function and a quasi measure preserving function. See also `AEEqFun.compMeasurePreserving`. -/ def compQuasiMeasurePreserving (g : β →ₘ[ν] γ) (f : α → β) (hf : QuasiMeasurePreserving f μ ν) : α →ₘ[μ] γ := Quotient.liftOn' g (fun g ↦ mk (g ∘ f) <\| g.2.comp_quasiMeasurePreserving hf) fun _ _ h ↦ mk_eq_mk.2 <\| h.comp_tendsto hf.tendsto_ae @[simp] theorem compQuasiMeasurePreserving_mk {g : β → γ} (hg : AEStronglyMeasurable g ν) (hf : QuasiMeasurePreserving f μ ν) : (mk g hg).compQuasiMeasurePreserving f hf = mk (g ∘ f) (hg.comp_quasiMeasurePreserving hf) := rfl theorem compQuasiMeasurePreserving_eq_mk (g : β →ₘ[ν] γ) (hf : QuasiMeasurePreserving f μ ν) : g.compQuasiMeasurePreserving f hf = mk (g ∘ f) (g.aestronglyMeasurable.comp_quasiMeasurePreserving hf) := by rw [← compQuasiMeasurePreserving_mk g.aestronglyMeasurable hf, mk_coeFn] theorem coeFn_compQuasiMeasurePreserving (g : β →ₘ[ν] γ) (hf : QuasiMeasurePreserving f μ ν) : g.compQuasiMeasurePreserving f hf =ᵐ[μ] g ∘ f := by rw [compQuasiMeasurePreserving_eq_mk] apply coeFn_mk end compQuasiMeasurePreserving section compMeasurePreserving variable [TopologicalSpace γ] [MeasurableSpace β] {ν : MeasureTheory.Measure β} {f : α → β} {g : β → γ} /-- Composition of an almost everywhere equal function and a quasi measure preserving function. This is an important special case of `AEEqFun.compQuasiMeasurePreserving`. We use a separate definition so that lemmas that need `f` to be measure preserving can be `@[simp]` lemmas. -/ def compMeasurePreserving (g : β →ₘ[ν] γ) (f : α → β) (hf : MeasurePreserving f μ ν) : α →ₘ[μ] γ := g.compQuasiMeasurePreserving f hf.quasiMeasurePreserving @[simp] theorem compMeasurePreserving_mk (hg : AEStronglyMeasurable g ν) (hf : MeasurePreserving f μ ν) : (mk g hg).compMeasurePreserving f hf = mk (g ∘ f) (hg.comp_quasiMeasurePreserving hf.quasiMeasurePreserving) := rfl theorem compMeasurePreserving_eq_mk (g : β →ₘ[ν] γ) (hf : MeasurePreserving f μ ν) : g.compMeasurePreserving f hf = mk (g ∘ f) (g.aestronglyMeasurable.comp_quasiMeasurePreserving hf.quasiMeasurePreserving) := g.compQuasiMeasurePreserving_eq_mk _ theorem coeFn_compMeasurePreserving (g : β →ₘ[ν] γ) (hf : MeasurePreserving f μ ν) : g.compMeasurePreserving f hf =ᵐ[μ] g ∘ f := g.coeFn_compQuasiMeasurePreserving _ end compMeasurePreserving variable [TopologicalSpace β] [TopologicalSpace γ] /-- Given a continuous function `g : β → γ`, and an almost everywhere equal function `[f] : α →ₘ β`, return the equivalence class of `g ∘ f`, i.e., the almost everywhere equal function `[g ∘ f] : α →ₘ γ`. -/ def comp (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : α →ₘ[μ] γ := Quotient.liftOn' f (fun f => mk (g ∘ (f : α → β)) (hg.comp_aestronglyMeasurable f.2)) fun _ _ H => mk_eq_mk.2 <\| H.fun_comp g @[simp] theorem comp_mk (g : β → γ) (hg : Continuous g) (f : α → β) (hf) : comp g hg (mk f hf : α →ₘ[μ] β) = mk (g ∘ f) (hg.comp_aestronglyMeasurable hf) := rfl theorem comp_eq_mk (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : comp g hg f = mk (g ∘ f) (hg.comp_aestronglyMeasurable f.aestronglyMeasurable) := by rw [← comp_mk g hg f f.aestronglyMeasurable, mk_coeFn] theorem coeFn_comp (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : comp g hg f =ᵐ[μ] g ∘ f := by rw [comp_eq_mk] apply coeFn_mk theorem comp_compQuasiMeasurePreserving {β : Type} [MeasurableSpace β] {ν} (g : γ → δ) (hg : Continuous g) (f : β →ₘ[ν] γ) {φ : α → β} (hφ : Measure.QuasiMeasurePreserving φ μ ν) : (comp g hg f).compQuasiMeasurePreserving φ hφ = comp g hg (f.compQuasiMeasurePreserving φ hφ) := by rcases f; rfl section CompMeasurable variable [MeasurableSpace β] [PseudoMetrizableSpace β] [BorelSpace β] [MeasurableSpace γ] [PseudoMetrizableSpace γ] [OpensMeasurableSpace γ] [SecondCountableTopology γ] /-- Given a measurable function `g : β → γ`, and an almost everywhere equal function `[f] : α →ₘ β`, return the equivalence class of `g ∘ f`, i.e., the almost everywhere equal function `[g ∘ f] : α →ₘ γ`. This requires that `γ` has a second countable topology. -/ def compMeasurable (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : α →ₘ[μ] γ := Quotient.liftOn' f (fun f' => mk (g ∘ (f' : α → β)) (hg.comp_aemeasurable f'.2.aemeasurable).aestronglyMeasurable) fun _ _ H => mk_eq_mk.2 <\| H.fun_comp g @[simp] theorem compMeasurable_mk (g : β → γ) (hg : Measurable g) (f : α → β) (hf : AEStronglyMeasurable f μ) : compMeasurable g hg (mk f hf : α →ₘ[μ] β) = mk (g ∘ f) (hg.comp_aemeasurable hf.aemeasurable).aestronglyMeasurable := rfl theorem compMeasurable_eq_mk (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : compMeasurable g hg f = mk (g ∘ f) (hg.comp_aemeasurable f.aemeasurable).aestronglyMeasurable := by rw [← compMeasurable_mk g hg f f.aestronglyMeasurable, mk_coeFn] theorem coeFn_compMeasurable (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : compMeasurable g hg f =ᵐ[μ] g ∘ f := by rw [compMeasurable_eq_mk] apply coeFn_mk end CompMeasurable /-- The class of `x ↦ (f x, g x)`. -/ def pair (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : α →ₘ[μ] β × γ := Quotient.liftOn₂' f g (fun f g => mk (fun x => (f.1 x, g.1 x)) (f.2.prodMk g.2)) fun _f _g _f' _g' Hf Hg => mk_eq_mk.2 <\| Hf.prodMk Hg @[simp] theorem pair_mk_mk (f : α → β) (hf) (g : α → γ) (hg) : (mk f hf : α →ₘ[μ] β).pair (mk g hg) = mk (fun x => (f x, g x)) (hf.prodMk hg) := rfl theorem pair_eq_mk (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : f.pair g = mk (fun x => (f x, g x)) (f.aestronglyMeasurable.prodMk g.aestronglyMeasurable) := by simp only [← pair_mk_mk, mk_coeFn, f.aestronglyMeasurable, g.aestronglyMeasurable] theorem coeFn_pair (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : f.pair g =ᵐ[μ] fun x => (f x, g x) := by rw [pair_eq_mk] apply coeFn_mk /-- Given a continuous function `g : β → γ → δ`, and almost everywhere equal functions `[f₁] : α →ₘ β` and `[f₂] : α →ₘ γ`, return the equivalence class of the function `fun a => g (f₁ a) (f₂ a)`, i.e., the almost everywhere equal function `[fun a => g (f₁ a) (f₂ a)] : α →ₘ γ` -/ def comp₂ (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : α →ₘ[μ] δ := comp _ hg (f₁.pair f₂) @[simp] theorem comp₂_mk_mk (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α → β) (f₂ : α → γ) (hf₁ hf₂) : comp₂ g hg (mk f₁ hf₁ : α →ₘ[μ] β) (mk f₂ hf₂) = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aestronglyMeasurable (hf₁.prodMk hf₂)) := rfl theorem comp₂_eq_pair (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂ g hg f₁ f₂ = comp _ hg (f₁.pair f₂) := rfl theorem comp₂_eq_mk (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂ g hg f₁ f₂ = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aestronglyMeasurable (f₁.aestronglyMeasurable.prodMk f₂.aestronglyMeasurable)) := by rw [comp₂_eq_pair, pair_eq_mk, comp_mk]; rfl theorem coeFn_comp₂ (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂ g hg f₁ f₂ =ᵐ[μ] fun a => g (f₁ a) (f₂ a) := by rw [comp₂_eq_mk] apply coeFn_mk section variable [MeasurableSpace β] [PseudoMetrizableSpace β] [BorelSpace β] [MeasurableSpace γ] [PseudoMetrizableSpace γ] [BorelSpace γ] [SecondCountableTopologyEither β γ] [MeasurableSpace δ] [PseudoMetrizableSpace δ] [OpensMeasurableSpace δ] [SecondCountableTopology δ] /-- Given a measurable function `g : β → γ → δ`, and almost everywhere equal functions `[f₁] : α →ₘ β` and `[f₂] : α →ₘ γ`, return the equivalence class of the function `fun a => g (f₁ a) (f₂ a)`, i.e., the almost everywhere equal function `[fun a => g (f₁ a) (f₂ a)] : α →ₘ γ`. This requires `δ` to have second-countable topology. -/ def comp₂Measurable (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : α →ₘ[μ] δ := compMeasurable _ hg (f₁.pair f₂) @[simp] theorem comp₂Measurable_mk_mk (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α → β) (f₂ : α → γ) (hf₁ hf₂) : comp₂Measurable g hg (mk f₁ hf₁ : α →ₘ[μ] β) (mk f₂ hf₂) = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aemeasurable (hf₁.aemeasurable.prodMk hf₂.aemeasurable)).aestronglyMeasurable := rfl theorem comp₂Measurable_eq_pair (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂Measurable g hg f₁ f₂ = compMeasurable _ hg (f₁.pair f₂) := rfl theorem comp₂Measurable_eq_mk (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂Measurable g hg f₁ f₂ = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aemeasurable (f₁.aemeasurable.prodMk f₂.aemeasurable)).aestronglyMeasurable := by rw [comp₂Measurable_eq_pair, pair_eq_mk, compMeasurable_mk]; rfl theorem coeFn_comp₂Measurable (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂Measurable g hg f₁ f₂ =ᵐ[μ] fun a => g (f₁ a) (f₂ a) := by rw [comp₂Measurable_eq_mk] apply coeFn_mk end /-- Interpret `f : α →ₘ[μ] β` as a germ at `ae μ` forgetting that `f` is almost everywhere strongly measurable. -/ def toGerm (f : α →ₘ[μ] β) : Germ (ae μ) β := Quotient.liftOn' f (fun f => ((f : α → β) : Germ (ae μ) β)) fun _ _ H => Germ.coe_eq.2 H @[simp] theorem mk_toGerm (f : α → β) (hf) : (mk f hf : α →ₘ[μ] β).toGerm = f := rfl theorem toGerm_eq (f : α →ₘ[μ] β) : f.toGerm = (f : α → β) := by rw [← mk_toGerm, mk_coeFn] theorem toGerm_injective : Injective (toGerm : (α →ₘ[μ] β) → Germ (ae μ) β) := fun f g H => ext <\| Germ.coe_eq.1 <\| by rwa [← toGerm_eq, ← toGerm_eq] @[simp] theorem compQuasiMeasurePreserving_toGerm {β : Type} [MeasurableSpace β] {f : α → β} {ν} (g : β →ₘ[ν] γ) (hf : Measure.QuasiMeasurePreserving f μ ν) : (g.compQuasiMeasurePreserving f hf).toGerm = g.toGerm.compTendsto f hf.tendsto_ae := by rcases g; rfl @[simp] theorem compMeasurePreserving_toGerm {β : Type} [MeasurableSpace β] {f : α → β} {ν} (g : β →ₘ[ν] γ) (hf : MeasurePreserving f μ ν) : (g.compMeasurePreserving f hf).toGerm = g.toGerm.compTendsto f hf.quasiMeasurePreserving.tendsto_ae := compQuasiMeasurePreserving_toGerm _ _ theorem comp_toGerm (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : (comp g hg f).toGerm = f.toGerm.map g := induction_on f fun f _ => by simp theorem compMeasurable_toGerm [MeasurableSpace β] [BorelSpace β] [PseudoMetrizableSpace β] [PseudoMetrizableSpace γ] [SecondCountableTopology γ] [MeasurableSpace γ] [OpensMeasurableSpace γ] (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : (compMeasurable g hg f).toGerm = f.toGerm.map g := induction_on f fun f _ => by simp theorem comp₂_toGerm (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : (comp₂ g hg f₁ f₂).toGerm = f₁.toGerm.map₂ g f₂.toGerm := induction_on₂ f₁ f₂ fun f₁ _ f₂ _ => by simp theorem comp₂Measurable_toGerm [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] [PseudoMetrizableSpace γ] [SecondCountableTopologyEither β γ] [MeasurableSpace γ] [BorelSpace γ] [PseudoMetrizableSpace δ] [SecondCountableTopology δ] [MeasurableSpace δ] [OpensMeasurableSpace δ] (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : (comp₂Measurable g hg f₁ f₂).toGerm = f₁.toGerm.map₂ g f₂.toGerm := induction_on₂ f₁ f₂ fun f₁ _ f₂ _ => by simp /-- Given a predicate `p` and an equivalence class `[f]`, return true if `p` holds of `f a` for almost all `a` -/ def LiftPred (p : β → Prop) (f : α →ₘ[μ] β) : Prop := f.toGerm.LiftPred p /-- Given a relation `r` and equivalence class `[f]` and `[g]`, return true if `r` holds of `(f a, g a)` for almost all `a` -/ def LiftRel (r : β → γ → Prop) (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : Prop := f.toGerm.LiftRel r g.toGerm theorem liftRel_mk_mk {r : β → γ → Prop} {f : α → β} {g : α → γ} {hf hg} : LiftRel r (mk f hf : α →ₘ[μ] β) (mk g hg) ↔ ∀ᵐ a ∂μ, r (f a) (g a) := Iff.rfl theorem liftRel_iff_coeFn {r : β → γ → Prop} {f : α →ₘ[μ] β} {g : α →ₘ[μ] γ} : LiftRel r f g ↔ ∀ᵐ a ∂μ, r (f a) (g a) := by rw [← liftRel_mk_mk, mk_coeFn, mk_coeFn] section Order instance instPreorder [Preorder β] : Preorder (α →ₘ[μ] β) := Preorder.lift toGerm @[simp] theorem mk_le_mk [Preorder β] {f g : α → β} (hf hg) : (mk f hf : α →ₘ[μ] β) ≤ mk g hg ↔ f ≤ᵐ[μ] g := Iff.rfl @[simp, norm_cast] theorem coeFn_le [Preorder β] {f g : α →ₘ[μ] β} : (f : α → β) ≤ᵐ[μ] g ↔ f ≤ g := liftRel_iff_coeFn.symm instance instPartialOrder [PartialOrder β] : PartialOrder (α →ₘ[μ] β) := PartialOrder.lift toGerm toGerm_injective section Lattice section Sup variable [SemilatticeSup β] [ContinuousSup β] instance instSup : Max (α →ₘ[μ] β) where max f g := AEEqFun.comp₂ (· ⊔ ·) continuous_sup f g theorem coeFn_sup (f g : α →ₘ[μ] β) : ⇑(f ⊔ g) =ᵐ[μ] fun x => f x ⊔ g x := coeFn_comp₂ _ _ _ _ protected theorem le_sup_left (f g : α →ₘ[μ] β) : f ≤ f ⊔ g := by rw [← coeFn_le] filter_upwards [coeFn_sup f g] with _ ha rw [ha] exact le_sup_left protected theorem le_sup_right (f g : α →ₘ[μ] β) : g ≤ f ⊔ g := by rw [← coeFn_le]	filter_upwards [coeFn_sup f g] with _ ha rw [ha]	Mathlib/MeasureTheory/Function/AEEqFun.lean	510	511
/- Copyright (c) 2022 Kexing Ying. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kexing Ying -/ import Mathlib.Probability.Process.HittingTime import Mathlib.Probability.Martingale.Basic /-! # Optional stopping theorem (fair game theorem) The optional stopping theorem states that an adapted integrable process `f` is a submartingale if and only if for all bounded stopping times `τ` and `π` such that `τ ≤ π`, the stopped value of `f` at `τ` has expectation smaller than its stopped value at `π`. This file also contains Doob's maximal inequality: given a non-negative submartingale `f`, for all `ε : ℝ≥0`, we have `ε • μ {ε ≤ f* n} ≤ ∫ ω in {ε ≤ f* n}, f n` where `f* n ω = max_{k ≤ n}, f k ω`. ### Main results * `MeasureTheory.submartingale_iff_expected_stoppedValue_mono`: the optional stopping theorem. * `MeasureTheory.Submartingale.stoppedProcess`: the stopped process of a submartingale with respect to a stopping time is a submartingale. * `MeasureTheory.maximal_ineq`: Doob's maximal inequality. -/ open scoped NNReal ENNReal MeasureTheory ProbabilityTheory namespace MeasureTheory variable {Ω : Type} {m0 : MeasurableSpace Ω} {μ : Measure Ω} {𝒢 : Filtration ℕ m0} {f : ℕ → Ω → ℝ} {τ π : Ω → ℕ} -- We may generalize the below lemma to functions taking value in a `NormedLatticeAddCommGroup`. -- Similarly, generalize `(Super/Sub)martingale.setIntegral_le`. /-- Given a submartingale `f` and bounded stopping times `τ` and `π` such that `τ ≤ π`, the expectation of `stoppedValue f τ` is less than or equal to the expectation of `stoppedValue f π`. This is the forward direction of the optional stopping theorem. -/ theorem Submartingale.expected_stoppedValue_mono [SigmaFiniteFiltration μ 𝒢] (hf : Submartingale f 𝒢 μ) (hτ : IsStoppingTime 𝒢 τ) (hπ : IsStoppingTime 𝒢 π) (hle : τ ≤ π) {N : ℕ} (hbdd : ∀ ω, π ω ≤ N) : μ[stoppedValue f τ] ≤ μ[stoppedValue f π] := by rw [← sub_nonneg, ← integral_sub', stoppedValue_sub_eq_sum' hle hbdd] · simp only [Finset.sum_apply] have : ∀ i, MeasurableSet[𝒢 i] {ω : Ω \| τ ω ≤ i ∧ i < π ω} := by intro i refine (hτ i).inter ?_ convert (hπ i).compl using 1 ext x simp; rfl rw [integral_finset_sum] · refine Finset.sum_nonneg fun i _ => ?_ rw [integral_indicator (𝒢.le _ _ (this _)), integral_sub', sub_nonneg] · exact hf.setIntegral_le (Nat.le_succ i) (this _) · exact (hf.integrable _).integrableOn · exact (hf.integrable _).integrableOn intro i _ exact Integrable.indicator (Integrable.sub (hf.integrable _) (hf.integrable _)) (𝒢.le _ _ (this _)) · exact hf.integrable_stoppedValue hπ hbdd · exact hf.integrable_stoppedValue hτ fun ω => le_trans (hle ω) (hbdd ω) /-- The converse direction of the optional stopping theorem, i.e. an adapted integrable process `f` is a submartingale if for all bounded stopping times `τ` and `π` such that `τ ≤ π`, the stopped value of `f` at `τ` has expectation smaller than its stopped value at `π`. -/ theorem submartingale_of_expected_stoppedValue_mono [IsFiniteMeasure μ] (hadp : Adapted 𝒢 f) (hint : ∀ i, Integrable (f i) μ) (hf : ∀ τ π : Ω → ℕ, IsStoppingTime 𝒢 τ → IsStoppingTime 𝒢 π → τ ≤ π → (∃ N, ∀ ω, π ω ≤ N) → μ[stoppedValue f τ] ≤ μ[stoppedValue f π]) : Submartingale f 𝒢 μ := by refine submartingale_of_setIntegral_le hadp hint fun i j hij s hs => ?_ classical specialize hf (s.piecewise (fun _ => i) fun _ => j) _ (isStoppingTime_piecewise_const hij hs) (isStoppingTime_const 𝒢 j) (fun x => (ite_le_sup _ _ (x ∈ s)).trans (max_eq_right hij).le) ⟨j, fun _ => le_rfl⟩ rwa [stoppedValue_const, stoppedValue_piecewise_const, integral_piecewise (𝒢.le _ _ hs) (hint _).integrableOn (hint _).integrableOn, ← integral_add_compl (𝒢.le _ _ hs) (hint j), add_le_add_iff_right] at hf /-- The optional stopping theorem* (fair game theorem): an adapted integrable process `f` is a submartingale if and only if for all bounded stopping times `τ` and `π` such that `τ ≤ π`, the stopped value of `f` at `τ` has expectation smaller than its stopped value at `π`. -/ theorem submartingale_iff_expected_stoppedValue_mono [IsFiniteMeasure μ] (hadp : Adapted 𝒢 f) (hint : ∀ i, Integrable (f i) μ) : Submartingale f 𝒢 μ ↔ ∀ τ π : Ω → ℕ, IsStoppingTime 𝒢 τ → IsStoppingTime 𝒢 π → τ ≤ π → (∃ N, ∀ x, π x ≤ N) → μ[stoppedValue f τ] ≤ μ[stoppedValue f π] := ⟨fun hf _ _ hτ hπ hle ⟨_, hN⟩ => hf.expected_stoppedValue_mono hτ hπ hle hN, submartingale_of_expected_stoppedValue_mono hadp hint⟩ /-- The stopped process of a submartingale with respect to a stopping time is a submartingale. -/ protected theorem Submartingale.stoppedProcess [IsFiniteMeasure μ] (h : Submartingale f 𝒢 μ) (hτ : IsStoppingTime 𝒢 τ) : Submartingale (stoppedProcess f τ) 𝒢 μ := by rw [submartingale_iff_expected_stoppedValue_mono] · intro σ π hσ hπ hσ_le_π hπ_bdd simp_rw [stoppedValue_stoppedProcess]	obtain ⟨n, hπ_le_n⟩ := hπ_bdd exact h.expected_stoppedValue_mono (hσ.min hτ) (hπ.min hτ) (fun ω => min_le_min (hσ_le_π ω) le_rfl) fun ω => (min_le_left _ _).trans (hπ_le_n ω) · exact Adapted.stoppedProcess_of_discrete h.adapted hτ · exact fun i => h.integrable_stoppedValue ((isStoppingTime_const _ i).min hτ) fun ω => min_le_left _ _ section Maximal open Finset	Mathlib/Probability/Martingale/OptionalStopping.lean	95	105
/- 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, Simon Hudon, Mario Carneiro -/ import Aesop import Mathlib.Algebra.Group.Defs import Mathlib.Data.Nat.Init import Mathlib.Data.Int.Init import Mathlib.Logic.Function.Iterate import Mathlib.Tactic.SimpRw import Mathlib.Tactic.SplitIfs /-! # Basic lemmas about semigroups, monoids, and groups This file lists various basic lemmas about semigroups, monoids, and groups. Most proofs are one-liners from the corresponding axioms. For the definitions of semigroups, monoids and groups, see `Algebra/Group/Defs.lean`. -/ assert_not_exists MonoidWithZero DenselyOrdered open Function variable {α β G M : Type} section ite variable [Pow α β] @[to_additive (attr := simp) dite_smul] lemma pow_dite (p : Prop) [Decidable p] (a : α) (b : p → β) (c : ¬ p → β) : a ^ (if h : p then b h else c h) = if h : p then a ^ b h else a ^ c h := by split_ifs <;> rfl @[to_additive (attr := simp) smul_dite] lemma dite_pow (p : Prop) [Decidable p] (a : p → α) (b : ¬ p → α) (c : β) : (if h : p then a h else b h) ^ c = if h : p then a h ^ c else b h ^ c := by split_ifs <;> rfl @[to_additive (attr := simp) ite_smul] lemma pow_ite (p : Prop) [Decidable p] (a : α) (b c : β) : a ^ (if p then b else c) = if p then a ^ b else a ^ c := pow_dite _ _ _ _ @[to_additive (attr := simp) smul_ite] lemma ite_pow (p : Prop) [Decidable p] (a b : α) (c : β) : (if p then a else b) ^ c = if p then a ^ c else b ^ c := dite_pow _ _ _ _ set_option linter.existingAttributeWarning false in attribute [to_additive (attr := simp)] dite_smul smul_dite ite_smul smul_ite end ite section Semigroup variable [Semigroup α] @[to_additive] instance Semigroup.to_isAssociative : Std.Associative (α := α) (· ·) := ⟨mul_assoc⟩ /-- Composing two multiplications on the left by `y` then `x` is equal to a multiplication on the left by `x * y`. -/ @[to_additive (attr := simp) "Composing two additions on the left by `y` then `x` is equal to an addition on the left by `x + y`."] theorem comp_mul_left (x y : α) : (x * ·) ∘ (y * ·) = (x * y * ·) := by ext z simp [mul_assoc] /-- Composing two multiplications on the right by `y` and `x` is equal to a multiplication on the right by `y * x`. -/ @[to_additive (attr := simp) "Composing two additions on the right by `y` and `x` is equal to an addition on the right by `y + x`."] theorem comp_mul_right (x y : α) : (· * x) ∘ (· * y) = (· * (y * x)) := by ext z simp [mul_assoc] end Semigroup @[to_additive] instance CommMagma.to_isCommutative [CommMagma G] : Std.Commutative (α := G) (· * ·) := ⟨mul_comm⟩ section MulOneClass variable [MulOneClass M] @[to_additive] theorem ite_mul_one {P : Prop} [Decidable P] {a b : M} : ite P (a * b) 1 = ite P a 1 * ite P b 1 := by by_cases h : P <;> simp [h] @[to_additive] theorem ite_one_mul {P : Prop} [Decidable P] {a b : M} : ite P 1 (a * b) = ite P 1 a * ite P 1 b := by by_cases h : P <;> simp [h] @[to_additive] theorem eq_one_iff_eq_one_of_mul_eq_one {a b : M} (h : a * b = 1) : a = 1 ↔ b = 1 := by constructor <;> (rintro rfl; simpa using h) @[to_additive] theorem one_mul_eq_id : ((1 : M) * ·) = id := funext one_mul @[to_additive] theorem mul_one_eq_id : (· * (1 : M)) = id := funext mul_one end MulOneClass section CommSemigroup variable [CommSemigroup G] @[to_additive] theorem mul_left_comm (a b c : G) : a * (b * c) = b * (a * c) := by rw [← mul_assoc, mul_comm a, mul_assoc] @[to_additive] theorem mul_right_comm (a b c : G) : a * b * c = a * c * b := by rw [mul_assoc, mul_comm b, mul_assoc] @[to_additive] theorem mul_mul_mul_comm (a b c d : G) : a * b * (c * d) = a * c * (b * d) := by simp only [mul_left_comm, mul_assoc] @[to_additive] theorem mul_rotate (a b c : G) : a * b * c = b * c * a := by simp only [mul_left_comm, mul_comm] @[to_additive] theorem mul_rotate' (a b c : G) : a * (b * c) = b * (c * a) := by simp only [mul_left_comm, mul_comm] end CommSemigroup attribute [local simp] mul_assoc sub_eq_add_neg section Monoid variable [Monoid M] {a b : M} {m n : ℕ} @[to_additive boole_nsmul] lemma pow_boole (P : Prop) [Decidable P] (a : M) : (a ^ if P then 1 else 0) = if P then a else 1 := by simp only [pow_ite, pow_one, pow_zero] @[to_additive nsmul_add_sub_nsmul] lemma pow_mul_pow_sub (a : M) (h : m ≤ n) : a ^ m * a ^ (n - m) = a ^ n := by rw [← pow_add, Nat.add_comm, Nat.sub_add_cancel h] @[to_additive sub_nsmul_nsmul_add] lemma pow_sub_mul_pow (a : M) (h : m ≤ n) : a ^ (n - m) * a ^ m = a ^ n := by rw [← pow_add, Nat.sub_add_cancel h] @[to_additive sub_one_nsmul_add] lemma mul_pow_sub_one (hn : n ≠ 0) (a : M) : a * a ^ (n - 1) = a ^ n := by rw [← pow_succ', Nat.sub_add_cancel <\| Nat.one_le_iff_ne_zero.2 hn] @[to_additive add_sub_one_nsmul] lemma pow_sub_one_mul (hn : n ≠ 0) (a : M) : a ^ (n - 1) * a = a ^ n := by rw [← pow_succ, Nat.sub_add_cancel <\| Nat.one_le_iff_ne_zero.2 hn] /-- If `x ^ n = 1`, then `x ^ m` is the same as `x ^ (m % n)` -/ @[to_additive nsmul_eq_mod_nsmul "If `n • x = 0`, then `m • x` is the same as `(m % n) • x`"] lemma pow_eq_pow_mod (m : ℕ) (ha : a ^ n = 1) : a ^ m = a ^ (m % n) := by calc a ^ m = a ^ (m % n + n * (m / n)) := by rw [Nat.mod_add_div] _ = a ^ (m % n) := by simp [pow_add, pow_mul, ha] @[to_additive] lemma pow_mul_pow_eq_one : ∀ n, a * b = 1 → a ^ n * b ^ n = 1 \| 0, _ => by simp \| n + 1, h => calc a ^ n.succ * b ^ n.succ = a ^ n * a * (b * b ^ n) := by rw [pow_succ, pow_succ'] _ = a ^ n * (a * b) * b ^ n := by simp only [mul_assoc] _ = 1 := by simp [h, pow_mul_pow_eq_one] @[to_additive (attr := simp)] lemma mul_left_iterate (a : M) : ∀ n : ℕ, (a * ·)^[n] = (a ^ n * ·) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_succ, mul_left_iterate] @[to_additive (attr := simp)] lemma mul_right_iterate (a : M) : ∀ n : ℕ, (· * a)^[n] = (· * a ^ n) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_succ', mul_right_iterate] @[to_additive] lemma mul_left_iterate_apply_one (a : M) : (a * ·)^[n] 1 = a ^ n := by simp [mul_right_iterate] @[to_additive] lemma mul_right_iterate_apply_one (a : M) : (· * a)^[n] 1 = a ^ n := by simp [mul_right_iterate] @[to_additive (attr := simp)] lemma pow_iterate (k : ℕ) : ∀ n : ℕ, (fun x : M ↦ x ^ k)^[n] = (· ^ k ^ n) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_iterate, Nat.pow_succ', pow_mul] end Monoid section CommMonoid variable [CommMonoid M] {x y z : M} @[to_additive] theorem inv_unique (hy : x * y = 1) (hz : x * z = 1) : y = z := left_inv_eq_right_inv (Trans.trans (mul_comm _ _) hy) hz @[to_additive nsmul_add] lemma mul_pow (a b : M) : ∀ n, (a * b) ^ n = a ^ n * b ^ n \| 0 => by rw [pow_zero, pow_zero, pow_zero, one_mul] \| n + 1 => by rw [pow_succ', pow_succ', pow_succ', mul_pow, mul_mul_mul_comm] end CommMonoid section LeftCancelMonoid variable [Monoid M] [IsLeftCancelMul M] {a b : M} @[to_additive (attr := simp)] theorem mul_eq_left : a * b = a ↔ b = 1 := calc a * b = a ↔ a * b = a * 1 := by rw [mul_one] _ ↔ b = 1 := mul_left_cancel_iff @[deprecated (since := "2025-03-05")] alias mul_right_eq_self := mul_eq_left @[deprecated (since := "2025-03-05")] alias add_right_eq_self := add_eq_left set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_right_eq_self @[to_additive (attr := simp)] theorem left_eq_mul : a = a * b ↔ b = 1 := eq_comm.trans mul_eq_left @[deprecated (since := "2025-03-05")] alias self_eq_mul_right := left_eq_mul @[deprecated (since := "2025-03-05")] alias self_eq_add_right := left_eq_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_eq_mul_right @[to_additive] theorem mul_ne_left : a * b ≠ a ↔ b ≠ 1 := mul_eq_left.not @[deprecated (since := "2025-03-05")] alias mul_right_ne_self := mul_ne_left @[deprecated (since := "2025-03-05")] alias add_right_ne_self := add_ne_left set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_right_ne_self @[to_additive] theorem left_ne_mul : a ≠ a * b ↔ b ≠ 1 := left_eq_mul.not @[deprecated (since := "2025-03-05")] alias self_ne_mul_right := left_ne_mul @[deprecated (since := "2025-03-05")] alias self_ne_add_right := left_ne_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_ne_mul_right end LeftCancelMonoid section RightCancelMonoid variable [RightCancelMonoid M] {a b : M} @[to_additive (attr := simp)] theorem mul_eq_right : a * b = b ↔ a = 1 := calc a * b = b ↔ a * b = 1 * b := by rw [one_mul] _ ↔ a = 1 := mul_right_cancel_iff @[deprecated (since := "2025-03-05")] alias mul_left_eq_self := mul_eq_right @[deprecated (since := "2025-03-05")] alias add_left_eq_self := add_eq_right set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_left_eq_self @[to_additive (attr := simp)] theorem right_eq_mul : b = a * b ↔ a = 1 := eq_comm.trans mul_eq_right @[deprecated (since := "2025-03-05")] alias self_eq_mul_left := right_eq_mul @[deprecated (since := "2025-03-05")] alias self_eq_add_left := right_eq_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_eq_mul_left @[to_additive] theorem mul_ne_right : a * b ≠ b ↔ a ≠ 1 := mul_eq_right.not @[deprecated (since := "2025-03-05")] alias mul_left_ne_self := mul_ne_right @[deprecated (since := "2025-03-05")] alias add_left_ne_self := add_ne_right set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_left_ne_self @[to_additive] theorem right_ne_mul : b ≠ a * b ↔ a ≠ 1 := right_eq_mul.not @[deprecated (since := "2025-03-05")] alias self_ne_mul_left := right_ne_mul @[deprecated (since := "2025-03-05")] alias self_ne_add_left := right_ne_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_ne_mul_left end RightCancelMonoid section CancelCommMonoid variable [CancelCommMonoid α] {a b c d : α} @[to_additive] lemma eq_iff_eq_of_mul_eq_mul (h : a * b = c * d) : a = c ↔ b = d := by aesop @[to_additive] lemma ne_iff_ne_of_mul_eq_mul (h : a * b = c * d) : a ≠ c ↔ b ≠ d := by aesop end CancelCommMonoid section InvolutiveInv variable [InvolutiveInv G] {a b : G} @[to_additive (attr := simp)] theorem inv_involutive : Function.Involutive (Inv.inv : G → G) := inv_inv @[to_additive (attr := simp)] theorem inv_surjective : Function.Surjective (Inv.inv : G → G) := inv_involutive.surjective @[to_additive] theorem inv_injective : Function.Injective (Inv.inv : G → G) := inv_involutive.injective @[to_additive (attr := simp)] theorem inv_inj : a⁻¹ = b⁻¹ ↔ a = b := inv_injective.eq_iff @[to_additive] theorem inv_eq_iff_eq_inv : a⁻¹ = b ↔ a = b⁻¹ := ⟨fun h => h ▸ (inv_inv a).symm, fun h => h.symm ▸ inv_inv b⟩ variable (G) @[to_additive] theorem inv_comp_inv : Inv.inv ∘ Inv.inv = @id G := inv_involutive.comp_self @[to_additive] theorem leftInverse_inv : LeftInverse (fun a : G ↦ a⁻¹) fun a ↦ a⁻¹ := inv_inv @[to_additive] theorem rightInverse_inv : RightInverse (fun a : G ↦ a⁻¹) fun a ↦ a⁻¹ := inv_inv end InvolutiveInv section DivInvMonoid variable [DivInvMonoid G] @[to_additive] theorem mul_one_div (x y : G) : x * (1 / y) = x / y := by rw [div_eq_mul_inv, one_mul, div_eq_mul_inv] @[to_additive, field_simps] -- The attributes are out of order on purpose theorem mul_div_assoc' (a b c : G) : a * (b / c) = a * b / c := (mul_div_assoc _ _ _).symm @[to_additive] theorem mul_div (a b c : G) : a * (b / c) = a * b / c := by simp only [mul_assoc, div_eq_mul_inv] @[to_additive] theorem div_eq_mul_one_div (a b : G) : a / b = a * (1 / b) := by rw [div_eq_mul_inv, one_div] end DivInvMonoid section DivInvOneMonoid variable [DivInvOneMonoid G] @[to_additive (attr := simp)] theorem div_one (a : G) : a / 1 = a := by simp [div_eq_mul_inv] @[to_additive] theorem one_div_one : (1 : G) / 1 = 1 := div_one _ end DivInvOneMonoid section DivisionMonoid variable [DivisionMonoid α] {a b c d : α} attribute [local simp] mul_assoc div_eq_mul_inv @[to_additive] theorem eq_inv_of_mul_eq_one_right (h : a * b = 1) : b = a⁻¹ := (inv_eq_of_mul_eq_one_right h).symm @[to_additive] theorem eq_one_div_of_mul_eq_one_left (h : b * a = 1) : b = 1 / a := by rw [eq_inv_of_mul_eq_one_left h, one_div] @[to_additive] theorem eq_one_div_of_mul_eq_one_right (h : a * b = 1) : b = 1 / a := by rw [eq_inv_of_mul_eq_one_right h, one_div] @[to_additive] theorem eq_of_div_eq_one (h : a / b = 1) : a = b := inv_injective <\| inv_eq_of_mul_eq_one_right <\| by rwa [← div_eq_mul_inv] @[to_additive] lemma eq_of_inv_mul_eq_one (h : a⁻¹ * b = 1) : a = b := by simpa using eq_inv_of_mul_eq_one_left h @[to_additive] lemma eq_of_mul_inv_eq_one (h : a * b⁻¹ = 1) : a = b := by simpa using eq_inv_of_mul_eq_one_left h @[to_additive] theorem div_ne_one_of_ne : a ≠ b → a / b ≠ 1 := mt eq_of_div_eq_one variable (a b c) @[to_additive] theorem one_div_mul_one_div_rev : 1 / a * (1 / b) = 1 / (b * a) := by simp @[to_additive] theorem inv_div_left : a⁻¹ / b = (b * a)⁻¹ := by simp @[to_additive (attr := simp)] theorem inv_div : (a / b)⁻¹ = b / a := by simp @[to_additive] theorem one_div_div : 1 / (a / b) = b / a := by simp @[to_additive] theorem one_div_one_div : 1 / (1 / a) = a := by simp @[to_additive] theorem div_eq_div_iff_comm : a / b = c / d ↔ b / a = d / c := inv_inj.symm.trans <\| by simp only [inv_div] @[to_additive] instance (priority := 100) DivisionMonoid.toDivInvOneMonoid : DivInvOneMonoid α := { DivisionMonoid.toDivInvMonoid with inv_one := by simpa only [one_div, inv_inv] using (inv_div (1 : α) 1).symm } @[to_additive (attr := simp)] lemma inv_pow (a : α) : ∀ n : ℕ, a⁻¹ ^ n = (a ^ n)⁻¹ \| 0 => by rw [pow_zero, pow_zero, inv_one] \| n + 1 => by rw [pow_succ', pow_succ, inv_pow _ n, mul_inv_rev] -- the attributes are intentionally out of order. `smul_zero` proves `zsmul_zero`. @[to_additive zsmul_zero, simp] lemma one_zpow : ∀ n : ℤ, (1 : α) ^ n = 1 \| (n : ℕ) => by rw [zpow_natCast, one_pow] \| .negSucc n => by rw [zpow_negSucc, one_pow, inv_one] @[to_additive (attr := simp) neg_zsmul] lemma zpow_neg (a : α) : ∀ n : ℤ, a ^ (-n) = (a ^ n)⁻¹ \| (_ + 1 : ℕ) => DivInvMonoid.zpow_neg' _ _ \| 0 => by simp \| Int.negSucc n => by rw [zpow_negSucc, inv_inv, ← zpow_natCast] rfl @[to_additive neg_one_zsmul_add] lemma mul_zpow_neg_one (a b : α) : (a * b) ^ (-1 : ℤ) = b ^ (-1 : ℤ) * a ^ (-1 : ℤ) := by simp only [zpow_neg, zpow_one, mul_inv_rev] @[to_additive zsmul_neg] lemma inv_zpow (a : α) : ∀ n : ℤ, a⁻¹ ^ n = (a ^ n)⁻¹ \| (n : ℕ) => by rw [zpow_natCast, zpow_natCast, inv_pow] \| .negSucc n => by rw [zpow_negSucc, zpow_negSucc, inv_pow] @[to_additive (attr := simp) zsmul_neg'] lemma inv_zpow' (a : α) (n : ℤ) : a⁻¹ ^ n = a ^ (-n) := by rw [inv_zpow, zpow_neg] @[to_additive nsmul_zero_sub] lemma one_div_pow (a : α) (n : ℕ) : (1 / a) ^ n = 1 / a ^ n := by simp only [one_div, inv_pow] @[to_additive zsmul_zero_sub] lemma one_div_zpow (a : α) (n : ℤ) : (1 / a) ^ n = 1 / a ^ n := by simp only [one_div, inv_zpow] variable {a b c} @[to_additive (attr := simp)] theorem inv_eq_one : a⁻¹ = 1 ↔ a = 1 := inv_injective.eq_iff' inv_one @[to_additive (attr := simp)] theorem one_eq_inv : 1 = a⁻¹ ↔ a = 1 := eq_comm.trans inv_eq_one @[to_additive] theorem inv_ne_one : a⁻¹ ≠ 1 ↔ a ≠ 1 := inv_eq_one.not @[to_additive] theorem eq_of_one_div_eq_one_div (h : 1 / a = 1 / b) : a = b := by rw [← one_div_one_div a, h, one_div_one_div] -- Note that `mul_zsmul` and `zpow_mul` have the primes swapped -- when additivised since their argument order, -- and therefore the more "natural" choice of lemma, is reversed. @[to_additive mul_zsmul'] lemma zpow_mul (a : α) : ∀ m n : ℤ, a ^ (m * n) = (a ^ m) ^ n \| (m : ℕ), (n : ℕ) => by rw [zpow_natCast, zpow_natCast, ← pow_mul, ← zpow_natCast] rfl \| (m : ℕ), .negSucc n => by rw [zpow_natCast, zpow_negSucc, ← pow_mul, Int.ofNat_mul_negSucc, zpow_neg, inv_inj, ← zpow_natCast] \| .negSucc m, (n : ℕ) => by rw [zpow_natCast, zpow_negSucc, ← inv_pow, ← pow_mul, Int.negSucc_mul_ofNat, zpow_neg, inv_pow, inv_inj, ← zpow_natCast] \| .negSucc m, .negSucc n => by rw [zpow_negSucc, zpow_negSucc, Int.negSucc_mul_negSucc, inv_pow, inv_inv, ← pow_mul, ← zpow_natCast] rfl @[to_additive mul_zsmul] lemma zpow_mul' (a : α) (m n : ℤ) : a ^ (m * n) = (a ^ n) ^ m := by rw [Int.mul_comm, zpow_mul] @[to_additive] theorem zpow_comm (a : α) (m n : ℤ) : (a ^ m) ^ n = (a ^ n) ^ m := by rw [← zpow_mul, zpow_mul'] variable (a b c)	@[to_additive, field_simps] -- The attributes are out of order on purpose theorem div_div_eq_mul_div : a / (b / c) = a * c / b := by simp	Mathlib/Algebra/Group/Basic.lean	521	522
/- Copyright (c) 2022 Pierre-Alexandre Bazin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Pierre-Alexandre Bazin -/ import Mathlib.Algebra.DirectSum.Module import Mathlib.Algebra.Module.ZMod import Mathlib.GroupTheory.Torsion import Mathlib.LinearAlgebra.Isomorphisms import Mathlib.RingTheory.Coprime.Ideal import Mathlib.RingTheory.Finiteness.Defs import Mathlib.RingTheory.Ideal.Maps import Mathlib.RingTheory.Ideal.Quotient.Defs import Mathlib.RingTheory.SimpleModule.Basic /-! # Torsion submodules ## Main definitions * `torsionOf R M x` : the torsion ideal of `x`, containing all `a` such that `a • x = 0`. * `Submodule.torsionBy R M a` : the `a`-torsion submodule, containing all elements `x` of `M` such that `a • x = 0`. * `Submodule.torsionBySet R M s` : the submodule containing all elements `x` of `M` such that `a • x = 0` for all `a` in `s`. * `Submodule.torsion' R M S` : the `S`-torsion submodule, containing all elements `x` of `M` such that `a • x = 0` for some `a` in `S`. * `Submodule.torsion R M` : the torsion submodule, containing all elements `x` of `M` such that `a • x = 0` for some non-zero-divisor `a` in `R`. * `Module.IsTorsionBy R M a` : the property that defines an `a`-torsion module. Similarly, `IsTorsionBySet`, `IsTorsion'` and `IsTorsion`. * `Module.IsTorsionBySet.module` : Creates an `R ⧸ I`-module from an `R`-module that `IsTorsionBySet R _ I`. ## Main statements * `quot_torsionOf_equiv_span_singleton` : isomorphism between the span of an element of `M` and the quotient by its torsion ideal. * `torsion' R M S` and `torsion R M` are submodules. * `torsionBySet_eq_torsionBySet_span` : torsion by a set is torsion by the ideal generated by it. * `Submodule.torsionBy_is_torsionBy` : the `a`-torsion submodule is an `a`-torsion module. Similar lemmas for `torsion'` and `torsion`. * `Submodule.torsionBy_isInternal` : a `∏ i, p i`-torsion module is the internal direct sum of its `p i`-torsion submodules when the `p i` are pairwise coprime. A more general version with coprime ideals is `Submodule.torsionBySet_is_internal`. * `Submodule.noZeroSMulDivisors_iff_torsion_bot` : a module over a domain has `NoZeroSMulDivisors` (that is, there is no non-zero `a`, `x` such that `a • x = 0`) iff its torsion submodule is trivial. * `Submodule.QuotientTorsion.torsion_eq_bot` : quotienting by the torsion submodule makes the torsion submodule of the new module trivial. If `R` is a domain, we can derive an instance `Submodule.QuotientTorsion.noZeroSMulDivisors : NoZeroSMulDivisors R (M ⧸ torsion R M)`. ## Notation * The notions are defined for a `CommSemiring R` and a `Module R M`. Some additional hypotheses on `R` and `M` are required by some lemmas. * The letters `a`, `b`, ... are used for scalars (in `R`), while `x`, `y`, ... are used for vectors (in `M`). ## Tags Torsion, submodule, module, quotient -/ namespace Ideal section TorsionOf variable (R M : Type) [Semiring R] [AddCommMonoid M] [Module R M] /-- The torsion ideal of `x`, containing all `a` such that `a • x = 0`. -/ @[simps!] def torsionOf (x : M) : Ideal R := -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11036): broken dot notation on LinearMap.ker https://github.com/leanprover/lean4/issues/1629 LinearMap.ker (LinearMap.toSpanSingleton R M x) @[simp] theorem torsionOf_zero : torsionOf R M (0 : M) = ⊤ := by simp [torsionOf] variable {R M} @[simp] theorem mem_torsionOf_iff (x : M) (a : R) : a ∈ torsionOf R M x ↔ a • x = 0 := Iff.rfl variable (R) @[simp] theorem torsionOf_eq_top_iff (m : M) : torsionOf R M m = ⊤ ↔ m = 0 := by refine ⟨fun h => ?_, fun h => by simp [h]⟩ rw [← one_smul R m, ← mem_torsionOf_iff m (1 : R), h] exact Submodule.mem_top @[simp] theorem torsionOf_eq_bot_iff_of_noZeroSMulDivisors [Nontrivial R] [NoZeroSMulDivisors R M] (m : M) : torsionOf R M m = ⊥ ↔ m ≠ 0 := by refine ⟨fun h contra => ?_, fun h => (Submodule.eq_bot_iff _).mpr fun r hr => ?_⟩ · rw [contra, torsionOf_zero] at h exact bot_ne_top.symm h · rw [mem_torsionOf_iff, smul_eq_zero] at hr tauto /-- See also `iSupIndep.linearIndependent` which provides the same conclusion but requires the stronger hypothesis `NoZeroSMulDivisors R M`. -/ theorem iSupIndep.linearIndependent' {ι R M : Type} {v : ι → M} [Ring R] [AddCommGroup M] [Module R M] (hv : iSupIndep fun i => R ∙ v i) (h_ne_zero : ∀ i, Ideal.torsionOf R M (v i) = ⊥) : LinearIndependent R v := by refine linearIndependent_iff_not_smul_mem_span.mpr fun i r hi => ?_ replace hv := iSupIndep_def.mp hv i simp only [iSup_subtype', ← Submodule.span_range_eq_iSup (ι := Subtype _), disjoint_iff] at hv have : r • v i ∈ (⊥ : Submodule R M) := by rw [← hv, Submodule.mem_inf] refine ⟨Submodule.mem_span_singleton.mpr ⟨r, rfl⟩, ?_⟩ convert hi ext simp rw [← Submodule.mem_bot R, ← h_ne_zero i] simpa using this @[deprecated (since := "2024-11-24")] alias CompleteLattice.Independent.linear_independent' := iSupIndep.linearIndependent' end TorsionOf section variable (R M : Type) [Ring R] [AddCommGroup M] [Module R M] /-- The span of `x` in `M` is isomorphic to `R` quotiented by the torsion ideal of `x`. -/ noncomputable def quotTorsionOfEquivSpanSingleton (x : M) : (R ⧸ torsionOf R M x) ≃ₗ[R] R ∙ x := (LinearMap.toSpanSingleton R M x).quotKerEquivRange.trans <\| LinearEquiv.ofEq _ _ (LinearMap.span_singleton_eq_range R M x).symm variable {R M} @[simp] theorem quotTorsionOfEquivSpanSingleton_apply_mk (x : M) (a : R) : quotTorsionOfEquivSpanSingleton R M x (Submodule.Quotient.mk a) = a • ⟨x, Submodule.mem_span_singleton_self x⟩ := rfl end end Ideal open nonZeroDivisors section Defs namespace Submodule variable (R M : Type) [CommSemiring R] [AddCommMonoid M] [Module R M] -- TODO: generalize to `Submodule S M` with `SMulCommClass R S M`. /-- The `a`-torsion submodule for `a` in `R`, containing all elements `x` of `M` such that `a • x = 0`. -/ @[simps!] def torsionBy (a : R) : Submodule R M := -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11036): broken dot notation on LinearMap.ker https://github.com/leanprover/lean4/issues/1629 LinearMap.ker (DistribMulAction.toLinearMap R M a) /-- The submodule containing all elements `x` of `M` such that `a • x = 0` for all `a` in `s`. -/ @[simps!] def torsionBySet (s : Set R) : Submodule R M := sInf (torsionBy R M '' s) /-- The `S`-torsion submodule, containing all elements `x` of `M` such that `a • x = 0` for some `a` in `S`. -/ @[simps!] def torsion' (S : Type) [CommMonoid S] [DistribMulAction S M] [SMulCommClass S R M] : Submodule R M where carrier := { x \| ∃ a : S, a • x = 0 } add_mem' := by intro x y ⟨a,hx⟩ ⟨b,hy⟩ use b a rw [smul_add, mul_smul, mul_comm, mul_smul, hx, hy, smul_zero, smul_zero, add_zero] zero_mem' := ⟨1, smul_zero 1⟩ smul_mem' := fun a x ⟨b, h⟩ => ⟨b, by rw [smul_comm, h, smul_zero]⟩ /-- The torsion submodule, containing all elements `x` of `M` such that `a • x = 0` for some non-zero-divisor `a` in `R`. -/ abbrev torsion := torsion' R M R⁰ end Submodule namespace Module variable (R M : Type) [Semiring R] [AddCommMonoid M] [Module R M] /-- An `a`-torsion module is a module where every element is `a`-torsion. -/ abbrev IsTorsionBy (a : R) := ∀ ⦃x : M⦄, a • x = 0 /-- A module where every element is `a`-torsion for all `a` in `s`. -/ abbrev IsTorsionBySet (s : Set R) := ∀ ⦃x : M⦄ ⦃a : s⦄, (a : R) • x = 0 /-- An `S`-torsion module is a module where every element is `a`-torsion for some `a` in `S`. -/ abbrev IsTorsion' (S : Type) [SMul S M] := ∀ ⦃x : M⦄, ∃ a : S, a • x = 0 /-- A torsion module is a module where every element is `a`-torsion for some non-zero-divisor `a`. -/ abbrev IsTorsion := ∀ ⦃x : M⦄, ∃ a : R⁰, a • x = 0 theorem isTorsionBySet_annihilator : IsTorsionBySet R M (annihilator R M) := fun _ r ↦ Module.mem_annihilator.mp r.2 _ theorem isTorsionBy_iff_mem_annihilator {a : R} : IsTorsionBy R M a ↔ a ∈ annihilator R M := by rw [IsTorsionBy, mem_annihilator] theorem isTorsionBySet_iff_subset_annihilator {s : Set R} : IsTorsionBySet R M s ↔ s ⊆ annihilator R M := by simp_rw [IsTorsionBySet, Set.subset_def, SetLike.mem_coe, mem_annihilator] rw [forall_comm, SetCoe.forall] end Module end Defs lemma isSMulRegular_iff_torsionBy_eq_bot {R} (M : Type) [CommRing R] [AddCommGroup M] [Module R M] (r : R) : IsSMulRegular M r ↔ Submodule.torsionBy R M r = ⊥ := Iff.symm (DistribMulAction.toLinearMap R M r).ker_eq_bot variable {R M : Type} section namespace Submodule variable [CommSemiring R] [AddCommMonoid M] [Module R M] (s : Set R) (a : R) @[simp] theorem smul_torsionBy (x : torsionBy R M a) : a • x = 0 := Subtype.ext x.prop @[simp] theorem smul_coe_torsionBy (x : torsionBy R M a) : a • (x : M) = 0 := x.prop @[simp] theorem mem_torsionBy_iff (x : M) : x ∈ torsionBy R M a ↔ a • x = 0 := Iff.rfl @[simp] theorem mem_torsionBySet_iff (x : M) : x ∈ torsionBySet R M s ↔ ∀ a : s, (a : R) • x = 0 := by refine ⟨fun h ⟨a, ha⟩ => mem_sInf.mp h _ (Set.mem_image_of_mem _ ha), fun h => mem_sInf.mpr ?_⟩ rintro _ ⟨a, ha, rfl⟩; exact h ⟨a, ha⟩ @[simp] theorem torsionBySet_singleton_eq : torsionBySet R M {a} = torsionBy R M a := by ext x simp only [mem_torsionBySet_iff, SetCoe.forall, Subtype.coe_mk, Set.mem_singleton_iff, forall_eq, mem_torsionBy_iff] theorem torsionBySet_le_torsionBySet_of_subset {s t : Set R} (st : s ⊆ t) : torsionBySet R M t ≤ torsionBySet R M s := sInf_le_sInf fun _ ⟨a, ha, h⟩ => ⟨a, st ha, h⟩ /-- Torsion by a set is torsion by the ideal generated by it. -/ theorem torsionBySet_eq_torsionBySet_span : torsionBySet R M s = torsionBySet R M (Ideal.span s) := by refine le_antisymm (fun x hx => ?_) (torsionBySet_le_torsionBySet_of_subset subset_span) rw [mem_torsionBySet_iff] at hx ⊢ suffices Ideal.span s ≤ Ideal.torsionOf R M x by rintro ⟨a, ha⟩ exact this ha rw [Ideal.span_le] exact fun a ha => hx ⟨a, ha⟩ theorem torsionBySet_span_singleton_eq : torsionBySet R M (R ∙ a) = torsionBy R M a := (torsionBySet_eq_torsionBySet_span _).symm.trans <\| torsionBySet_singleton_eq _ theorem torsionBy_le_torsionBy_of_dvd (a b : R) (dvd : a ∣ b) : torsionBy R M a ≤ torsionBy R M b := by rw [← torsionBySet_span_singleton_eq, ← torsionBySet_singleton_eq] apply torsionBySet_le_torsionBySet_of_subset rintro c (rfl : c = b); exact Ideal.mem_span_singleton.mpr dvd @[simp] theorem torsionBy_one : torsionBy R M 1 = ⊥ := eq_bot_iff.mpr fun _ h => by rw [mem_torsionBy_iff, one_smul] at h exact h @[simp] theorem torsionBySet_univ : torsionBySet R M Set.univ = ⊥ := by rw [eq_bot_iff, ← torsionBy_one, ← torsionBySet_singleton_eq] exact torsionBySet_le_torsionBySet_of_subset fun _ _ => trivial end Submodule open Submodule namespace Module variable [Semiring R] [AddCommMonoid M] [Module R M] (s : Set R) (a : R) theorem isTorsionBySet_of_subset {s t : Set R} (h : s ⊆ t) (ht : IsTorsionBySet R M t) : IsTorsionBySet R M s := fun m r ↦ @ht m ⟨r, h r.2⟩ @[simp] theorem isTorsionBySet_singleton_iff : IsTorsionBySet R M {a} ↔ IsTorsionBy R M a := by refine ⟨fun h x => @h _ ⟨_, Set.mem_singleton _⟩, fun h x => ?_⟩ rintro ⟨b, rfl : b = a⟩; exact @h _ theorem isTorsionBySet_iff_is_torsion_by_span : IsTorsionBySet R M s ↔ IsTorsionBySet R M (Ideal.span s) := by simpa only [isTorsionBySet_iff_subset_annihilator] using Ideal.span_le.symm theorem isTorsionBySet_span_singleton_iff : IsTorsionBySet R M (R ∙ a) ↔ IsTorsionBy R M a := (isTorsionBySet_iff_is_torsion_by_span _).symm.trans <\| isTorsionBySet_singleton_iff _ end Module namespace Module variable [CommSemiring R] [AddCommMonoid M] [Module R M] (s : Set R) (a : R) theorem isTorsionBySet_iff_torsionBySet_eq_top : IsTorsionBySet R M s ↔ torsionBySet R M s = ⊤ := ⟨fun h => eq_top_iff.mpr fun _ _ => (mem_torsionBySet_iff _ _).mpr <\| @h _, fun h x => by rw [← mem_torsionBySet_iff, h] trivial⟩ /-- An `a`-torsion module is a module whose `a`-torsion submodule is the full space. -/ theorem isTorsionBy_iff_torsionBy_eq_top : IsTorsionBy R M a ↔ torsionBy R M a = ⊤ := by rw [← torsionBySet_singleton_eq, ← isTorsionBySet_singleton_iff, isTorsionBySet_iff_torsionBySet_eq_top] theorem isTorsionBySet_iff_subseteq_ker_lsmul : IsTorsionBySet R M s ↔ s ⊆ LinearMap.ker (LinearMap.lsmul R M) where mp h r hr := LinearMap.mem_ker.mpr <\| LinearMap.ext fun x => @h x ⟨r, hr⟩ mpr \| h, x, ⟨_, hr⟩ => DFunLike.congr_fun (LinearMap.mem_ker.mp (h hr)) x theorem isTorsionBy_iff_mem_ker_lsmul : IsTorsionBy R M a ↔ a ∈ LinearMap.ker (LinearMap.lsmul R M) := Iff.symm LinearMap.ext_iff end Module namespace Submodule open Module variable [CommSemiring R] [AddCommMonoid M] [Module R M] (s : Set R) (a : R) theorem torsionBySet_isTorsionBySet : IsTorsionBySet R (torsionBySet R M s) s := fun ⟨_, hx⟩ a => Subtype.ext <\| (mem_torsionBySet_iff _ _).mp hx a /-- The `a`-torsion submodule is an `a`-torsion module. -/ theorem torsionBy_isTorsionBy : IsTorsionBy R (torsionBy R M a) a := smul_torsionBy a @[simp] theorem torsionBy_torsionBy_eq_top : torsionBy R (torsionBy R M a) a = ⊤ := (isTorsionBy_iff_torsionBy_eq_top a).mp <\| torsionBy_isTorsionBy a @[simp] theorem torsionBySet_torsionBySet_eq_top : torsionBySet R (torsionBySet R M s) s = ⊤ := (isTorsionBySet_iff_torsionBySet_eq_top s).mp <\| torsionBySet_isTorsionBySet s variable (R M) theorem torsion_gc : @GaloisConnection (Submodule R M) (Ideal R)ᵒᵈ _ _ annihilator fun I => torsionBySet R M ↑(OrderDual.ofDual I) := fun _ _ => ⟨fun h x hx => (mem_torsionBySet_iff _ _).mpr fun ⟨_, ha⟩ => mem_annihilator.mp (h ha) x hx, fun h a ha => mem_annihilator.mpr fun _ hx => (mem_torsionBySet_iff _ _).mp (h hx) ⟨a, ha⟩⟩ variable {R M} section Coprime variable {ι : Type} {p : ι → Ideal R} {S : Finset ι} theorem iSup_torsionBySet_ideal_eq_torsionBySet_iInf (hp : (S : Set ι).Pairwise fun i j => p i ⊔ p j = ⊤) : ⨆ i ∈ S, torsionBySet R M (p i) = torsionBySet R M ↑(⨅ i ∈ S, p i) := by rcases S.eq_empty_or_nonempty with h \| h · simp [h] apply le_antisymm · apply iSup_le _ intro i apply iSup_le _ intro is apply torsionBySet_le_torsionBySet_of_subset exact (iInf_le (fun i => ⨅ _ : i ∈ S, p i) i).trans (iInf_le _ is) · intro x hx rw [mem_iSup_finset_iff_exists_sum] obtain ⟨μ, hμ⟩ := (mem_iSup_finset_iff_exists_sum _ _).mp ((Ideal.eq_top_iff_one _).mp <\| (Ideal.iSup_iInf_eq_top_iff_pairwise h _).mpr hp) refine ⟨fun i => ⟨(μ i : R) • x, ?_⟩, ?_⟩ · rw [mem_torsionBySet_iff] at hx ⊢ rintro ⟨a, ha⟩ rw [smul_smul] suffices a μ i ∈ ⨅ i ∈ S, p i from hx ⟨_, this⟩ rw [mem_iInf] intro j rw [mem_iInf] intro hj by_cases ij : j = i · rw [ij] exact Ideal.mul_mem_right _ _ ha · have := coe_mem (μ i) simp only [mem_iInf] at this exact Ideal.mul_mem_left _ _ (this j hj ij) · rw [← Finset.sum_smul, hμ, one_smul] theorem supIndep_torsionBySet_ideal (hp : (S : Set ι).Pairwise fun i j => p i ⊔ p j = ⊤) : S.SupIndep fun i => torsionBySet R M <\| p i := fun T hT i hi hiT => by rw [disjoint_iff, Finset.sup_eq_iSup, iSup_torsionBySet_ideal_eq_torsionBySet_iInf fun i hi j hj ij => hp (hT hi) (hT hj) ij] have := GaloisConnection.u_inf (b₁ := OrderDual.toDual (p i)) (b₂ := OrderDual.toDual (⨅ i ∈ T, p i)) (torsion_gc R M) dsimp at this ⊢ rw [← this, Ideal.sup_iInf_eq_top, top_coe, torsionBySet_univ] intro j hj; apply hp hi (hT hj); rintro rfl; exact hiT hj variable {q : ι → R} open scoped Function -- required for scoped `on` notation theorem iSup_torsionBy_eq_torsionBy_prod (hq : (S : Set ι).Pairwise <\| (IsCoprime on q)) : ⨆ i ∈ S, torsionBy R M (q i) = torsionBy R M (∏ i ∈ S, q i) := by rw [← torsionBySet_span_singleton_eq, Ideal.submodule_span_eq, ← Ideal.finset_inf_span_singleton _ _ hq, Finset.inf_eq_iInf, ← iSup_torsionBySet_ideal_eq_torsionBySet_iInf] · congr ext : 1 congr ext : 1 exact (torsionBySet_span_singleton_eq _).symm exact fun i hi j hj ij => (Ideal.sup_eq_top_iff_isCoprime _ _).mpr (hq hi hj ij) theorem supIndep_torsionBy (hq : (S : Set ι).Pairwise <\| (IsCoprime on q)) : S.SupIndep fun i => torsionBy R M <\| q i := by convert supIndep_torsionBySet_ideal (M := M) fun i hi j hj ij => (Ideal.sup_eq_top_iff_isCoprime (q i) _).mpr <\| hq hi hj ij exact (torsionBySet_span_singleton_eq (R := R) (M := M) _).symm end Coprime end Submodule end section NeedsGroup namespace Submodule variable [CommRing R] [AddCommGroup M] [Module R M] variable {ι : Type} [DecidableEq ι] {S : Finset ι} /-- If the `p i` are pairwise coprime, a `⨅ i, p i`-torsion module is the internal direct sum of its `p i`-torsion submodules. -/ theorem torsionBySet_isInternal {p : ι → Ideal R} (hp : (S : Set ι).Pairwise fun i j => p i ⊔ p j = ⊤) (hM : Module.IsTorsionBySet R M (⨅ i ∈ S, p i : Ideal R)) : DirectSum.IsInternal fun i : S => torsionBySet R M <\| p i := DirectSum.isInternal_submodule_of_iSupIndep_of_iSup_eq_top (iSupIndep_iff_supIndep.mpr <\| supIndep_torsionBySet_ideal hp) (by apply (iSup_subtype'' ↑S fun i => torsionBySet R M <\| p i).trans -- Porting note: times out if we change apply below to <\| apply (iSup_torsionBySet_ideal_eq_torsionBySet_iInf hp).trans <\| (Module.isTorsionBySet_iff_torsionBySet_eq_top _).mp hM) open scoped Function in -- required for scoped `on` notation /-- If the `q i` are pairwise coprime, a `∏ i, q i`-torsion module is the internal direct sum of its `q i`-torsion submodules. -/ theorem torsionBy_isInternal {q : ι → R} (hq : (S : Set ι).Pairwise <\| (IsCoprime on q)) (hM : Module.IsTorsionBy R M <\| ∏ i ∈ S, q i) : DirectSum.IsInternal fun i : S => torsionBy R M <\| q i := by rw [← Module.isTorsionBySet_span_singleton_iff, Ideal.submodule_span_eq, ← Ideal.finset_inf_span_singleton _ _ hq, Finset.inf_eq_iInf] at hM convert torsionBySet_isInternal (fun i hi j hj ij => (Ideal.sup_eq_top_iff_isCoprime (q i) _).mpr <\| hq hi hj ij) hM exact (torsionBySet_span_singleton_eq _ (R := R) (M := M)).symm end Submodule namespace Module variable [Ring R] [AddCommGroup M] [Module R M] variable {I : Ideal R} {r : R} /-- can't be an instance because `hM` can't be inferred -/ def IsTorsionBySet.hasSMul (hM : IsTorsionBySet R M I) : SMul (R ⧸ I) M where smul b := QuotientAddGroup.lift I.toAddSubgroup (smulAddHom R M) (by rwa [isTorsionBySet_iff_subset_annihilator] at hM) b /-- can't be an instance because `hM` can't be inferred -/ abbrev IsTorsionBy.hasSMul (hM : IsTorsionBy R M r) : SMul (R ⧸ Ideal.span {r}) M := ((isTorsionBySet_span_singleton_iff r).mpr hM).hasSMul @[simp] theorem IsTorsionBySet.mk_smul [I.IsTwoSided] (hM : IsTorsionBySet R M I) (b : R) (x : M) : haveI := hM.hasSMul Ideal.Quotient.mk I b • x = b • x := rfl @[simp] theorem IsTorsionBy.mk_smul [(Ideal.span {r}).IsTwoSided] (hM : IsTorsionBy R M r) (b : R) (x : M) : haveI := hM.hasSMul Ideal.Quotient.mk (Ideal.span {r}) b • x = b • x := rfl /-- An `(R ⧸ I)`-module is an `R`-module which `IsTorsionBySet R M I`. -/ def IsTorsionBySet.module [I.IsTwoSided] (hM : IsTorsionBySet R M I) : Module (R ⧸ I) M := letI := hM.hasSMul; I.mkQ_surjective.moduleLeft _ (IsTorsionBySet.mk_smul hM) instance IsTorsionBySet.isScalarTower [I.IsTwoSided] (hM : IsTorsionBySet R M I) {S : Type} [SMul S R] [SMul S M] [IsScalarTower S R M] [IsScalarTower S R R] : @IsScalarTower S (R ⧸ I) M _ (IsTorsionBySet.module hM).toSMul _ := -- Porting note: still needed to be fed the Module R / I M instance @IsScalarTower.mk S (R ⧸ I) M _ (IsTorsionBySet.module hM).toSMul _ (fun b d x => Quotient.inductionOn' d fun c => (smul_assoc b c x :)) /-- If a `R`-module `M` is annihilated by a two-sided ideal `I`, then the identity is a semilinear map from the `R`-module `M` to the `R ⧸ I`-module `M`. -/ def IsTorsionBySet.semilinearMap [I.IsTwoSided] (hM : IsTorsionBySet R M I) : let _ := hM.module; M →ₛₗ[Ideal.Quotient.mk I] M := let _ := hM.module { toFun := id map_add' := fun _ _ ↦ rfl map_smul' := fun _ _ ↦ rfl } theorem IsTorsionBySet.isSemisimpleModule_iff [I.IsTwoSided] (hM : Module.IsTorsionBySet R M I) : let _ := hM.module IsSemisimpleModule (R ⧸ I) M ↔ IsSemisimpleModule R M := let _ := hM.module (hM.semilinearMap.isSemisimpleModule_iff_of_bijective Function.bijective_id).symm /-- An `(R ⧸ Ideal.span {r})`-module is an `R`-module for which `IsTorsionBy R M r`. -/ abbrev IsTorsionBy.module [h : (Ideal.span {r}).IsTwoSided] (hM : IsTorsionBy R M r) : Module (R ⧸ Ideal.span {r}) M := by rw [Ideal.span] at h; exact ((isTorsionBySet_span_singleton_iff r).mpr hM).module /-- Any module is also a module over the quotient of the ring by the annihilator. Not an instance because it causes synthesis failures / timeouts. -/ def quotientAnnihilator : Module (R ⧸ Module.annihilator R M) M := (isTorsionBySet_annihilator R M).module theorem isTorsionBy_quotient_iff (N : Submodule R M) (r : R) : IsTorsionBy R (M⧸N) r ↔ ∀ x, r • x ∈ N := Iff.trans N.mkQ_surjective.forall <\| forall_congr' fun _ => Submodule.Quotient.mk_eq_zero N theorem IsTorsionBy.quotient (N : Submodule R M) {r : R} (h : IsTorsionBy R M r) : IsTorsionBy R (M⧸N) r := (isTorsionBy_quotient_iff N r).mpr fun x => @h x ▸ N.zero_mem theorem isTorsionBySet_quotient_iff (N : Submodule R M) (s : Set R) : IsTorsionBySet R (M⧸N) s ↔ ∀ x, ∀ r ∈ s, r • x ∈ N := Iff.trans N.mkQ_surjective.forall <\| forall_congr' fun _ => Iff.trans Subtype.forall <\| forall₂_congr fun _ _ => Submodule.Quotient.mk_eq_zero N theorem IsTorsionBySet.quotient (N : Submodule R M) {s} (h : IsTorsionBySet R M s) : IsTorsionBySet R (M⧸N) s := (isTorsionBySet_quotient_iff N s).mpr fun x r h' => @h x ⟨r, h'⟩ ▸ N.zero_mem variable (M I) (s : Set R) (r : R) open Pointwise Submodule lemma isTorsionBySet_quotient_set_smul : IsTorsionBySet R (M⧸s • (⊤ : Submodule R M)) s := (isTorsionBySet_quotient_iff _ _).mpr fun _ _ h => mem_set_smul_of_mem_mem h mem_top lemma isTorsionBySet_quotient_ideal_smul : IsTorsionBySet R (M⧸I • (⊤ : Submodule R M)) I := (isTorsionBySet_quotient_iff _ _).mpr fun _ _ h => smul_mem_smul h ⟨⟩ instance [I.IsTwoSided] : Module (R ⧸ I) (M ⧸ I • (⊤ : Submodule R M)) := (isTorsionBySet_quotient_ideal_smul M I).module lemma Quotient.mk_smul_mk [I.IsTwoSided] (r : R) (m : M) : Ideal.Quotient.mk I r • Submodule.Quotient.mk (p := (I • ⊤ : Submodule R M)) m = Submodule.Quotient.mk (p := (I • ⊤ : Submodule R M)) (r • m) := rfl end Module namespace Module variable (M) [CommRing R] [AddCommGroup M] [Module R M] (s : Set R) (r : R) open Pointwise lemma isTorsionBy_quotient_element_smul : IsTorsionBy R (M⧸r • (⊤ : Submodule R M)) r := (isTorsionBy_quotient_iff _ _).mpr (Submodule.smul_mem_pointwise_smul · r ⊤ ⟨⟩) instance : Module (R ⧸ Ideal.span s) (M ⧸ s • (⊤ : Submodule R M)) := ((isTorsionBySet_iff_is_torsion_by_span s).mp (isTorsionBySet_quotient_set_smul M s)).module instance : Module (R ⧸ Ideal.span {r}) (M ⧸ r • (⊤ : Submodule R M)) := (isTorsionBy_quotient_element_smul M r).module end Module namespace Submodule variable [CommRing R] [AddCommGroup M] [Module R M] instance (I : Ideal R) : Module (R ⧸ I) (torsionBySet R M I) := -- Porting note: times out without the (R := R) Module.IsTorsionBySet.module <\| torsionBySet_isTorsionBySet (R := R) I @[simp] theorem torsionBySet.mk_smul (I : Ideal R) (b : R) (x : torsionBySet R M I) : Ideal.Quotient.mk I b • x = b • x := rfl instance (I : Ideal R) {S : Type} [SMul S R] [SMul S M] [IsScalarTower S R M] [IsScalarTower S R R] : IsScalarTower S (R ⧸ I) (torsionBySet R M I) := inferInstance /-- The `a`-torsion submodule as an `(R ⧸ R∙a)`-module. -/ instance instModuleQuotientTorsionBy (a : R) : Module (R ⧸ R ∙ a) (torsionBy R M a) := Module.IsTorsionBySet.module <\| (Module.isTorsionBySet_span_singleton_iff a).mpr <\| torsionBy_isTorsionBy a instance (a : R) : Module (R ⧸ Ideal.span {a}) (torsionBy R M a) := inferInstanceAs <\| Module (R ⧸ R ∙ a) (torsionBy R M a) @[simp] theorem torsionBy.mk_ideal_smul (a b : R) (x : torsionBy R M a) : (Ideal.Quotient.mk (Ideal.span {a})) b • x = b • x := rfl theorem torsionBy.mk_smul (a b : R) (x : torsionBy R M a) : Ideal.Quotient.mk (R ∙ a) b • x = b • x := rfl instance (a : R) {S : Type} [SMul S R] [SMul S M] [IsScalarTower S R M] [IsScalarTower S R R] : IsScalarTower S (R ⧸ R ∙ a) (torsionBy R M a) := inferInstance /-- Given an `R`-module `M` and an element `a` in `R`, submodules of the `a`-torsion submodule of `M` do not depend on whether we take scalars to be `R` or `R ⧸ R ∙ a`. -/ def submodule_torsionBy_orderIso (a : R) : Submodule (R ⧸ R ∙ a) (torsionBy R M a) ≃o Submodule R (torsionBy R M a) := { restrictScalarsEmbedding R (R ⧸ R ∙ a) (torsionBy R M a) with invFun := fun p ↦ { carrier := p add_mem' := add_mem zero_mem' := p.zero_mem smul_mem' := by rintro ⟨b⟩; exact p.smul_mem b } left_inv := by intro; ext; simp [restrictScalarsEmbedding] right_inv := by intro; ext; simp [restrictScalarsEmbedding] } end Submodule end NeedsGroup namespace Submodule section Torsion' open Module variable [CommSemiring R] [AddCommMonoid M] [Module R M] variable (S : Type) [CommMonoid S] [DistribMulAction S M] [SMulCommClass S R M] @[simp] theorem mem_torsion'_iff (x : M) : x ∈ torsion' R M S ↔ ∃ a : S, a • x = 0 := Iff.rfl theorem mem_torsion_iff (x : M) : x ∈ torsion R M ↔ ∃ a : R⁰, a • x = 0 := Iff.rfl @[simps] instance : SMul S (torsion' R M S) := ⟨fun s x => ⟨s • (x : M), by obtain ⟨x, a, h⟩ := x use a dsimp rw [smul_comm, h, smul_zero]⟩⟩ instance : DistribMulAction S (torsion' R M S) := Subtype.coe_injective.distribMulAction (torsion' R M S).subtype.toAddMonoidHom fun (_ : S) _ => rfl instance : SMulCommClass S R (torsion' R M S) := ⟨fun _ _ _ => Subtype.ext <\| smul_comm _ _ _⟩ /-- An `S`-torsion module is a module whose `S`-torsion submodule is the full space. -/ theorem isTorsion'_iff_torsion'_eq_top : IsTorsion' M S ↔ torsion' R M S = ⊤ := ⟨fun h => eq_top_iff.mpr fun _ _ => @h _, fun h x => by rw [← @mem_torsion'_iff R, h] trivial⟩ /-- The `S`-torsion submodule is an `S`-torsion module. -/ theorem torsion'_isTorsion' : IsTorsion' (torsion' R M S) S := fun ⟨_, ⟨a, h⟩⟩ => ⟨a, Subtype.ext h⟩ @[simp] theorem torsion'_torsion'_eq_top : torsion' R (torsion' R M S) S = ⊤ := (isTorsion'_iff_torsion'_eq_top S).mp <\| torsion'_isTorsion' S /-- The torsion submodule of the torsion submodule (viewed as a module) is the full torsion module. -/ theorem torsion_torsion_eq_top : torsion R (torsion R M) = ⊤ := torsion'_torsion'_eq_top R⁰ /-- The torsion submodule is always a torsion module. -/ theorem torsion_isTorsion : Module.IsTorsion R (torsion R M) := torsion'_isTorsion' R⁰ end Torsion' section Torsion variable [CommSemiring R] [AddCommMonoid M] [Module R M] variable (R M) theorem _root_.Module.isTorsionBySet_annihilator_top : Module.IsTorsionBySet R M (⊤ : Submodule R M).annihilator := fun x ha => mem_annihilator.mp ha.prop x mem_top variable {R M} theorem _root_.Submodule.annihilator_top_inter_nonZeroDivisors [Module.Finite R M] (hM : Module.IsTorsion R M) : ((⊤ : Submodule R M).annihilator : Set R) ∩ R⁰ ≠ ∅ := by obtain ⟨S, hS⟩ := ‹Module.Finite R M›.fg_top refine Set.Nonempty.ne_empty ⟨_, ?_, (∏ x ∈ S, (@hM x).choose : R⁰).prop⟩ rw [Submonoid.coe_finset_prod, SetLike.mem_coe, ← hS, mem_annihilator_span] intro n letI := Classical.decEq M rw [← Finset.prod_erase_mul _ _ n.prop, mul_smul, ← Submonoid.smul_def, (@hM n).choose_spec, smul_zero] variable [NoZeroDivisors R] [Nontrivial R] theorem coe_torsion_eq_annihilator_ne_bot : (torsion R M : Set M) = { x : M \| (R ∙ x).annihilator ≠ ⊥ } := by ext x; simp_rw [Submodule.ne_bot_iff, mem_annihilator, mem_span_singleton] exact ⟨fun ⟨a, hax⟩ => ⟨a, fun _ ⟨b, hb⟩ => by rw [← hb, smul_comm, ← Submonoid.smul_def, hax, smul_zero], nonZeroDivisors.coe_ne_zero _⟩, fun ⟨a, hax, ha⟩ => ⟨⟨_, mem_nonZeroDivisors_of_ne_zero ha⟩, hax x ⟨1, one_smul _ _⟩⟩⟩ /-- A module over a domain has `NoZeroSMulDivisors` iff its torsion submodule is trivial. -/ theorem noZeroSMulDivisors_iff_torsion_eq_bot : NoZeroSMulDivisors R M ↔ torsion R M = ⊥ := by constructor <;> intro h · haveI : NoZeroSMulDivisors R M := h rw [eq_bot_iff] rintro x ⟨a, hax⟩ change (a : R) • x = 0 at hax rcases eq_zero_or_eq_zero_of_smul_eq_zero hax with h0 \| h0 · exfalso exact nonZeroDivisors.coe_ne_zero a h0 · exact h0 · exact { eq_zero_or_eq_zero_of_smul_eq_zero := fun {a} {x} hax => by by_cases ha : a = 0 · left exact ha · right rw [← mem_bot R, ← h] exact ⟨⟨a, mem_nonZeroDivisors_of_ne_zero ha⟩, hax⟩ } lemma torsion_int {G} [AddCommGroup G] : (torsion ℤ G).toAddSubgroup = AddCommGroup.torsion G := by ext x refine ((isOfFinAddOrder_iff_zsmul_eq_zero (x := x)).trans ?_).symm simp [mem_nonZeroDivisors_iff_ne_zero] end Torsion namespace QuotientTorsion variable [CommRing R] [AddCommGroup M] [Module R M] /-- Quotienting by the torsion submodule gives a torsion-free module. -/ @[simp] theorem torsion_eq_bot : torsion R (M ⧸ torsion R M) = ⊥ := eq_bot_iff.mpr fun z => Quotient.inductionOn' z fun x ⟨a, hax⟩ => by rw [Quotient.mk''_eq_mk, ← Quotient.mk_smul, Quotient.mk_eq_zero] at hax rw [mem_bot, Quotient.mk''_eq_mk, Quotient.mk_eq_zero] obtain ⟨b, h⟩ := hax exact ⟨b a, (mul_smul _ _ _).trans h⟩ instance noZeroSMulDivisors [IsDomain R] : NoZeroSMulDivisors R (M ⧸ torsion R M) := noZeroSMulDivisors_iff_torsion_eq_bot.mpr torsion_eq_bot end QuotientTorsion section PTorsion open Module section variable [Monoid R] [AddCommMonoid M] [DistribMulAction R M] theorem isTorsion'_powers_iff (p : R) : IsTorsion' M (Submonoid.powers p) ↔ ∀ x : M, ∃ n : ℕ, p ^ n • x = 0 := by constructor · intro h x let ⟨⟨a, ⟨n, hn⟩⟩, hx⟩ := @h x dsimp at hn use n rw [hn] apply hx · intro h x let ⟨n, hn⟩ := h x exact ⟨⟨_, ⟨n, rfl⟩⟩, hn⟩ /-- In a `p ^ ∞`-torsion module (that is, a module where all elements are cancelled by scalar multiplication by some power of `p`), the smallest `n` such that `p ^ n • x = 0`. -/ def pOrder {p : R} (hM : IsTorsion' M <\| Submonoid.powers p) (x : M) [∀ n : ℕ, Decidable (p ^ n • x = 0)] := Nat.find <\| (isTorsion'_powers_iff p).mp hM x @[simp] theorem pow_pOrder_smul {p : R} (hM : IsTorsion' M <\| Submonoid.powers p) (x : M) [∀ n : ℕ, Decidable (p ^ n • x = 0)] : p ^ pOrder hM x • x = 0 := Nat.find_spec <\| (isTorsion'_powers_iff p).mp hM x end variable [CommSemiring R] [AddCommMonoid M] [Module R M] [∀ x : M, Decidable (x = 0)] theorem exists_isTorsionBy {p : R} (hM : IsTorsion' M <\| Submonoid.powers p) (d : ℕ) (hd : d ≠ 0) (s : Fin d → M) (hs : span R (Set.range s) = ⊤) : ∃ j : Fin d, Module.IsTorsionBy R M (p ^ pOrder hM (s j)) := by let oj := List.argmax (fun i => pOrder hM <\| s i) (List.finRange d) have hoj : oj.isSome := Option.ne_none_iff_isSome.mp fun eq_none => hd <\| List.finRange_eq_nil.mp <\| List.argmax_eq_none.mp eq_none use Option.get _ hoj rw [isTorsionBy_iff_torsionBy_eq_top, eq_top_iff, ← hs, Submodule.span_le, Set.range_subset_iff] intro i; change (p ^ pOrder hM (s (Option.get oj hoj))) • s i = 0 have : pOrder hM (s i) ≤ pOrder hM (s <\| Option.get _ hoj) := List.le_of_mem_argmax (List.mem_finRange i) (Option.get_mem hoj) rw [← Nat.sub_add_cancel this, pow_add, mul_smul, pow_pOrder_smul, smul_zero] end PTorsion end Submodule namespace Ideal.Quotient open Submodule universe w	theorem torsionBy_eq_span_singleton {R : Type w} [CommRing R] (a b : R) (ha : a ∈ R⁰) : torsionBy R (R ⧸ R ∙ a * b) a = R ∙ mk (R ∙ a * b) b := by ext x; rw [mem_torsionBy_iff, Submodule.mem_span_singleton] obtain ⟨x, rfl⟩ := mk_surjective x; constructor <;> intro h · rw [← mk_eq_mk, ← Quotient.mk_smul, Quotient.mk_eq_zero, Submodule.mem_span_singleton] at h obtain ⟨c, h⟩ := h rw [smul_eq_mul, smul_eq_mul, mul_comm, mul_assoc, mul_cancel_left_mem_nonZeroDivisors ha, mul_comm] at h use c rw [← h, ← mk_eq_mk, ← Quotient.mk_smul, smul_eq_mul, mk_eq_mk] · obtain ⟨c, h⟩ := h rw [← h, smul_comm, ← mk_eq_mk, ← Quotient.mk_smul, (Quotient.mk_eq_zero _).mpr <\| mem_span_singleton_self _, smul_zero]	Mathlib/Algebra/Module/Torsion.lean	865	878
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.ShortComplex.RightHomology /-! # Homology of short complexes In this file, we shall define the homology of short complexes `S`, i.e. diagrams `f : X₁ ⟶ X₂` and `g : X₂ ⟶ X₃` such that `f ≫ g = 0`. We shall say that `[S.HasHomology]` when there exists `h : S.HomologyData`. A homology data for `S` consists of compatible left/right homology data `left` and `right`. The left homology data `left` involves an object `left.H` that is a cokernel of the canonical map `S.X₁ ⟶ K` where `K` is a kernel of `g`. On the other hand, the dual notion `right.H` is a kernel of the canonical morphism `Q ⟶ S.X₃` when `Q` is a cokernel of `f`. The compatibility that is required involves an isomorphism `left.H ≅ right.H` which makes a certain pentagon commute. When such a homology data exists, `S.homology` shall be defined as `h.left.H` for a chosen `h : S.HomologyData`. This definition requires very little assumption on the category (only the existence of zero morphisms). We shall prove that in abelian categories, all short complexes have homology data. Note: This definition arose by the end of the Liquid Tensor Experiment which contained a structure `has_homology` which is quite similar to `S.HomologyData`. After the category `ShortComplex C` was introduced by J. Riou, A. Topaz suggested such a structure could be used as a basis for the definition of homology. -/ universe v u namespace CategoryTheory open Category Limits variable {C : Type u} [Category.{v} C] [HasZeroMorphisms C] (S : ShortComplex C) {S₁ S₂ S₃ S₄ : ShortComplex C} namespace ShortComplex /-- A homology data for a short complex consists of two compatible left and right homology data -/ structure HomologyData where /-- a left homology data -/ left : S.LeftHomologyData /-- a right homology data -/ right : S.RightHomologyData /-- the compatibility isomorphism relating the two dual notions of `LeftHomologyData` and `RightHomologyData` -/ iso : left.H ≅ right.H /-- the pentagon relation expressing the compatibility of the left and right homology data -/ comm : left.π ≫ iso.hom ≫ right.ι = left.i ≫ right.p := by aesop_cat attribute [reassoc (attr := simp)] HomologyData.comm variable (φ : S₁ ⟶ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) /-- A homology map data for a morphism `φ : S₁ ⟶ S₂` where both `S₁` and `S₂` are equipped with homology data consists of left and right homology map data. -/ structure HomologyMapData where /-- a left homology map data -/ left : LeftHomologyMapData φ h₁.left h₂.left /-- a right homology map data -/ right : RightHomologyMapData φ h₁.right h₂.right namespace HomologyMapData variable {φ h₁ h₂} @[reassoc] lemma comm (h : HomologyMapData φ h₁ h₂) : h.left.φH ≫ h₂.iso.hom = h₁.iso.hom ≫ h.right.φH := by simp only [← cancel_epi h₁.left.π, ← cancel_mono h₂.right.ι, assoc, LeftHomologyMapData.commπ_assoc, HomologyData.comm, LeftHomologyMapData.commi_assoc, RightHomologyMapData.commι, HomologyData.comm_assoc, RightHomologyMapData.commp] instance : Subsingleton (HomologyMapData φ h₁ h₂) := ⟨by rintro ⟨left₁, right₁⟩ ⟨left₂, right₂⟩ simp only [mk.injEq, eq_iff_true_of_subsingleton, and_self]⟩ instance : Inhabited (HomologyMapData φ h₁ h₂) := ⟨⟨default, default⟩⟩ instance : Unique (HomologyMapData φ h₁ h₂) := Unique.mk' _ variable (φ h₁ h₂) /-- A choice of the (unique) homology map data associated with a morphism `φ : S₁ ⟶ S₂` where both short complexes `S₁` and `S₂` are equipped with homology data. -/ def homologyMapData : HomologyMapData φ h₁ h₂ := default variable {φ h₁ h₂} lemma congr_left_φH {γ₁ γ₂ : HomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.left.φH = γ₂.left.φH := by rw [eq] end HomologyMapData namespace HomologyData /-- When the first map `S.f` is zero, this is the homology data on `S` given by any limit kernel fork of `S.g` -/ @[simps] def ofIsLimitKernelFork (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) : S.HomologyData where left := LeftHomologyData.ofIsLimitKernelFork S hf c hc right := RightHomologyData.ofIsLimitKernelFork S hf c hc iso := Iso.refl _ /-- When the first map `S.f` is zero, this is the homology data on `S` given by the chosen `kernel S.g` -/ @[simps] noncomputable def ofHasKernel (hf : S.f = 0) [HasKernel S.g] : S.HomologyData where left := LeftHomologyData.ofHasKernel S hf right := RightHomologyData.ofHasKernel S hf iso := Iso.refl _ /-- When the second map `S.g` is zero, this is the homology data on `S` given by any colimit cokernel cofork of `S.f` -/ @[simps] def ofIsColimitCokernelCofork (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : S.HomologyData where left := LeftHomologyData.ofIsColimitCokernelCofork S hg c hc right := RightHomologyData.ofIsColimitCokernelCofork S hg c hc iso := Iso.refl _ /-- When the second map `S.g` is zero, this is the homology data on `S` given by the chosen `cokernel S.f` -/ @[simps] noncomputable def ofHasCokernel (hg : S.g = 0) [HasCokernel S.f] : S.HomologyData where left := LeftHomologyData.ofHasCokernel S hg right := RightHomologyData.ofHasCokernel S hg iso := Iso.refl _ /-- When both `S.f` and `S.g` are zero, the middle object `S.X₂` gives a homology data on S -/ @[simps] noncomputable def ofZeros (hf : S.f = 0) (hg : S.g = 0) : S.HomologyData where left := LeftHomologyData.ofZeros S hf hg right := RightHomologyData.ofZeros S hf hg iso := Iso.refl _ /-- If `φ : S₁ ⟶ S₂` is a morphism of short complexes such that `φ.τ₁` is epi, `φ.τ₂` is an iso and `φ.τ₃` is mono, then a homology data for `S₁` induces a homology data for `S₂`. The inverse construction is `ofEpiOfIsIsoOfMono'`. -/ @[simps] noncomputable def ofEpiOfIsIsoOfMono (φ : S₁ ⟶ S₂) (h : HomologyData S₁) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyData S₂ where left := LeftHomologyData.ofEpiOfIsIsoOfMono φ h.left right := RightHomologyData.ofEpiOfIsIsoOfMono φ h.right iso := h.iso /-- If `φ : S₁ ⟶ S₂` is a morphism of short complexes such that `φ.τ₁` is epi, `φ.τ₂` is an iso and `φ.τ₃` is mono, then a homology data for `S₂` induces a homology data for `S₁`. The inverse construction is `ofEpiOfIsIsoOfMono`. -/ @[simps] noncomputable def ofEpiOfIsIsoOfMono' (φ : S₁ ⟶ S₂) (h : HomologyData S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyData S₁ where left := LeftHomologyData.ofEpiOfIsIsoOfMono' φ h.left right := RightHomologyData.ofEpiOfIsIsoOfMono' φ h.right iso := h.iso /-- If `e : S₁ ≅ S₂` is an isomorphism of short complexes and `h₁ : HomologyData S₁`, this is the homology data for `S₂` deduced from the isomorphism. -/ @[simps!] noncomputable def ofIso (e : S₁ ≅ S₂) (h : HomologyData S₁) := h.ofEpiOfIsIsoOfMono e.hom variable {S} /-- A homology data for a short complex `S` induces a homology data for `S.op`. -/ @[simps] def op (h : S.HomologyData) : S.op.HomologyData where left := h.right.op right := h.left.op iso := h.iso.op comm := Quiver.Hom.unop_inj (by simp) /-- A homology data for a short complex `S` in the opposite category induces a homology data for `S.unop`. -/ @[simps] def unop {S : ShortComplex Cᵒᵖ} (h : S.HomologyData) : S.unop.HomologyData where left := h.right.unop right := h.left.unop iso := h.iso.unop comm := Quiver.Hom.op_inj (by simp) end HomologyData /-- A short complex `S` has homology when there exists a `S.HomologyData` -/ class HasHomology : Prop where /-- the condition that there exists a homology data -/ condition : Nonempty S.HomologyData /-- A chosen `S.HomologyData` for a short complex `S` that has homology -/ noncomputable def homologyData [HasHomology S] : S.HomologyData := HasHomology.condition.some variable {S} lemma HasHomology.mk' (h : S.HomologyData) : HasHomology S := ⟨Nonempty.intro h⟩ instance [HasHomology S] : HasHomology S.op := HasHomology.mk' S.homologyData.op instance (S : ShortComplex Cᵒᵖ) [HasHomology S] : HasHomology S.unop := HasHomology.mk' S.homologyData.unop instance hasLeftHomology_of_hasHomology [S.HasHomology] : S.HasLeftHomology := HasLeftHomology.mk' S.homologyData.left instance hasRightHomology_of_hasHomology [S.HasHomology] : S.HasRightHomology := HasRightHomology.mk' S.homologyData.right instance hasHomology_of_hasCokernel {X Y : C} (f : X ⟶ Y) (Z : C) [HasCokernel f] : (ShortComplex.mk f (0 : Y ⟶ Z) comp_zero).HasHomology := HasHomology.mk' (HomologyData.ofHasCokernel _ rfl) instance hasHomology_of_hasKernel {Y Z : C} (g : Y ⟶ Z) (X : C) [HasKernel g] : (ShortComplex.mk (0 : X ⟶ Y) g zero_comp).HasHomology := HasHomology.mk' (HomologyData.ofHasKernel _ rfl) instance hasHomology_of_zeros (X Y Z : C) : (ShortComplex.mk (0 : X ⟶ Y) (0 : Y ⟶ Z) zero_comp).HasHomology := HasHomology.mk' (HomologyData.ofZeros _ rfl rfl) lemma hasHomology_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) [HasHomology S₁] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HasHomology S₂ := HasHomology.mk' (HomologyData.ofEpiOfIsIsoOfMono φ S₁.homologyData) lemma hasHomology_of_epi_of_isIso_of_mono' (φ : S₁ ⟶ S₂) [HasHomology S₂] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HasHomology S₁ := HasHomology.mk' (HomologyData.ofEpiOfIsIsoOfMono' φ S₂.homologyData) lemma hasHomology_of_iso (e : S₁ ≅ S₂) [HasHomology S₁] : HasHomology S₂ := HasHomology.mk' (HomologyData.ofIso e S₁.homologyData) namespace HomologyMapData /-- The homology map data associated to the identity morphism of a short complex. -/ @[simps] def id (h : S.HomologyData) : HomologyMapData (𝟙 S) h h where left := LeftHomologyMapData.id h.left right := RightHomologyMapData.id h.right /-- The homology map data associated to the zero morphism between two short complexes. -/ @[simps] def zero (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : HomologyMapData 0 h₁ h₂ where left := LeftHomologyMapData.zero h₁.left h₂.left right := RightHomologyMapData.zero h₁.right h₂.right /-- The composition of homology map data. -/ @[simps] def comp {φ : S₁ ⟶ S₂} {φ' : S₂ ⟶ S₃} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} {h₃ : S₃.HomologyData} (ψ : HomologyMapData φ h₁ h₂) (ψ' : HomologyMapData φ' h₂ h₃) : HomologyMapData (φ ≫ φ') h₁ h₃ where left := ψ.left.comp ψ'.left right := ψ.right.comp ψ'.right /-- A homology map data for a morphism of short complexes induces a homology map data in the opposite category. -/ @[simps] def op {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (ψ : HomologyMapData φ h₁ h₂) : HomologyMapData (opMap φ) h₂.op h₁.op where left := ψ.right.op right := ψ.left.op /-- A homology map data for a morphism of short complexes in the opposite category induces a homology map data in the original category. -/ @[simps] def unop {S₁ S₂ : ShortComplex Cᵒᵖ} {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (ψ : HomologyMapData φ h₁ h₂) : HomologyMapData (unopMap φ) h₂.unop h₁.unop where left := ψ.right.unop right := ψ.left.unop /-- When `S₁.f`, `S₁.g`, `S₂.f` and `S₂.g` are all zero, the action on homology of a morphism `φ : S₁ ⟶ S₂` is given by the action `φ.τ₂` on the middle objects. -/ @[simps] def ofZeros (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (hg₁ : S₁.g = 0) (hf₂ : S₂.f = 0) (hg₂ : S₂.g = 0) : HomologyMapData φ (HomologyData.ofZeros S₁ hf₁ hg₁) (HomologyData.ofZeros S₂ hf₂ hg₂) where left := LeftHomologyMapData.ofZeros φ hf₁ hg₁ hf₂ hg₂ right := RightHomologyMapData.ofZeros φ hf₁ hg₁ hf₂ hg₂ /-- When `S₁.g` and `S₂.g` are zero and we have chosen colimit cokernel coforks `c₁` and `c₂` for `S₁.f` and `S₂.f` respectively, the action on homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `φ.τ₂ ≫ c₂.π = c₁.π ≫ f`. -/ @[simps] def ofIsColimitCokernelCofork (φ : S₁ ⟶ S₂) (hg₁ : S₁.g = 0) (c₁ : CokernelCofork S₁.f) (hc₁ : IsColimit c₁) (hg₂ : S₂.g = 0) (c₂ : CokernelCofork S₂.f) (hc₂ : IsColimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : φ.τ₂ ≫ c₂.π = c₁.π ≫ f) : HomologyMapData φ (HomologyData.ofIsColimitCokernelCofork S₁ hg₁ c₁ hc₁) (HomologyData.ofIsColimitCokernelCofork S₂ hg₂ c₂ hc₂) where left := LeftHomologyMapData.ofIsColimitCokernelCofork φ hg₁ c₁ hc₁ hg₂ c₂ hc₂ f comm right := RightHomologyMapData.ofIsColimitCokernelCofork φ hg₁ c₁ hc₁ hg₂ c₂ hc₂ f comm /-- When `S₁.f` and `S₂.f` are zero and we have chosen limit kernel forks `c₁` and `c₂` for `S₁.g` and `S₂.g` respectively, the action on homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι`. -/ @[simps] def ofIsLimitKernelFork (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (c₁ : KernelFork S₁.g) (hc₁ : IsLimit c₁) (hf₂ : S₂.f = 0) (c₂ : KernelFork S₂.g) (hc₂ : IsLimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι) : HomologyMapData φ (HomologyData.ofIsLimitKernelFork S₁ hf₁ c₁ hc₁) (HomologyData.ofIsLimitKernelFork S₂ hf₂ c₂ hc₂) where left := LeftHomologyMapData.ofIsLimitKernelFork φ hf₁ c₁ hc₁ hf₂ c₂ hc₂ f comm right := RightHomologyMapData.ofIsLimitKernelFork φ hf₁ c₁ hc₁ hf₂ c₂ hc₂ f comm /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the homology map data (for the identity of `S`) which relates the homology data `ofZeros` and `ofIsColimitCokernelCofork`. -/ def compatibilityOfZerosOfIsColimitCokernelCofork (hf : S.f = 0) (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : HomologyMapData (𝟙 S) (HomologyData.ofZeros S hf hg) (HomologyData.ofIsColimitCokernelCofork S hg c hc) where left := LeftHomologyMapData.compatibilityOfZerosOfIsColimitCokernelCofork S hf hg c hc right := RightHomologyMapData.compatibilityOfZerosOfIsColimitCokernelCofork S hf hg c hc /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the homology map data (for the identity of `S`) which relates the homology data `HomologyData.ofIsLimitKernelFork` and `ofZeros` . -/ @[simps] def compatibilityOfZerosOfIsLimitKernelFork (hf : S.f = 0) (hg : S.g = 0) (c : KernelFork S.g) (hc : IsLimit c) : HomologyMapData (𝟙 S) (HomologyData.ofIsLimitKernelFork S hf c hc) (HomologyData.ofZeros S hf hg) where left := LeftHomologyMapData.compatibilityOfZerosOfIsLimitKernelFork S hf hg c hc right := RightHomologyMapData.compatibilityOfZerosOfIsLimitKernelFork S hf hg c hc /-- This homology map data expresses compatibilities of the homology data constructed by `HomologyData.ofEpiOfIsIsoOfMono` -/ noncomputable def ofEpiOfIsIsoOfMono (φ : S₁ ⟶ S₂) (h : HomologyData S₁) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyMapData φ h (HomologyData.ofEpiOfIsIsoOfMono φ h) where left := LeftHomologyMapData.ofEpiOfIsIsoOfMono φ h.left right := RightHomologyMapData.ofEpiOfIsIsoOfMono φ h.right /-- This homology map data expresses compatibilities of the homology data constructed by `HomologyData.ofEpiOfIsIsoOfMono'` -/ noncomputable def ofEpiOfIsIsoOfMono' (φ : S₁ ⟶ S₂) (h : HomologyData S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyMapData φ (HomologyData.ofEpiOfIsIsoOfMono' φ h) h where left := LeftHomologyMapData.ofEpiOfIsIsoOfMono' φ h.left right := RightHomologyMapData.ofEpiOfIsIsoOfMono' φ h.right end HomologyMapData variable (S) /-- The homology of a short complex is the `left.H` field of a chosen homology data. -/ noncomputable def homology [HasHomology S] : C := S.homologyData.left.H /-- When a short complex has homology, this is the canonical isomorphism `S.leftHomology ≅ S.homology`. -/ noncomputable def leftHomologyIso [S.HasHomology] : S.leftHomology ≅ S.homology := leftHomologyMapIso' (Iso.refl _) _ _ /-- When a short complex has homology, this is the canonical isomorphism `S.rightHomology ≅ S.homology`. -/ noncomputable def rightHomologyIso [S.HasHomology] : S.rightHomology ≅ S.homology := rightHomologyMapIso' (Iso.refl _) _ _ ≪≫ S.homologyData.iso.symm variable {S} /-- When a short complex has homology, its homology can be computed using any left homology data. -/ noncomputable def LeftHomologyData.homologyIso (h : S.LeftHomologyData) [S.HasHomology] : S.homology ≅ h.H := S.leftHomologyIso.symm ≪≫ h.leftHomologyIso /-- When a short complex has homology, its homology can be computed using any right homology data. -/ noncomputable def RightHomologyData.homologyIso (h : S.RightHomologyData) [S.HasHomology] : S.homology ≅ h.H := S.rightHomologyIso.symm ≪≫ h.rightHomologyIso variable (S) @[simp] lemma LeftHomologyData.homologyIso_leftHomologyData [S.HasHomology] : S.leftHomologyData.homologyIso = S.leftHomologyIso.symm := by ext dsimp [homologyIso, leftHomologyIso, ShortComplex.leftHomologyIso] rw [← leftHomologyMap'_comp, comp_id] @[simp] lemma RightHomologyData.homologyIso_rightHomologyData [S.HasHomology] : S.rightHomologyData.homologyIso = S.rightHomologyIso.symm := by ext simp [homologyIso, rightHomologyIso] variable {S} /-- Given a morphism `φ : S₁ ⟶ S₂` of short complexes and homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced homology map `h₁.left.H ⟶ h₁.left.H`. -/ def homologyMap' (φ : S₁ ⟶ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : h₁.left.H ⟶ h₂.left.H := leftHomologyMap' φ _ _ /-- The homology map `S₁.homology ⟶ S₂.homology` induced by a morphism `S₁ ⟶ S₂` of short complexes. -/ noncomputable def homologyMap (φ : S₁ ⟶ S₂) [HasHomology S₁] [HasHomology S₂] : S₁.homology ⟶ S₂.homology := homologyMap' φ _ _ namespace HomologyMapData variable {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (γ : HomologyMapData φ h₁ h₂) lemma homologyMap'_eq : homologyMap' φ h₁ h₂ = γ.left.φH := LeftHomologyMapData.congr_φH (Subsingleton.elim _ _) lemma cyclesMap'_eq : cyclesMap' φ h₁.left h₂.left = γ.left.φK := LeftHomologyMapData.congr_φK (Subsingleton.elim _ _) lemma opcyclesMap'_eq : opcyclesMap' φ h₁.right h₂.right = γ.right.φQ := RightHomologyMapData.congr_φQ (Subsingleton.elim _ _) end HomologyMapData namespace LeftHomologyMapData variable {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (γ : LeftHomologyMapData φ h₁ h₂) [S₁.HasHomology] [S₂.HasHomology] lemma homologyMap_eq : homologyMap φ = h₁.homologyIso.hom ≫ γ.φH ≫ h₂.homologyIso.inv := by dsimp [homologyMap, LeftHomologyData.homologyIso, leftHomologyIso, LeftHomologyData.leftHomologyIso, homologyMap'] simp only [← γ.leftHomologyMap'_eq, ← leftHomologyMap'_comp, id_comp, comp_id] lemma homologyMap_comm : homologyMap φ ≫ h₂.homologyIso.hom = h₁.homologyIso.hom ≫ γ.φH := by simp only [γ.homologyMap_eq, assoc, Iso.inv_hom_id, comp_id] end LeftHomologyMapData namespace RightHomologyMapData variable {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (γ : RightHomologyMapData φ h₁ h₂) [S₁.HasHomology] [S₂.HasHomology] lemma homologyMap_eq : homologyMap φ = h₁.homologyIso.hom ≫ γ.φH ≫ h₂.homologyIso.inv := by dsimp [homologyMap, homologyMap', RightHomologyData.homologyIso, rightHomologyIso, RightHomologyData.rightHomologyIso] have γ' : HomologyMapData φ S₁.homologyData S₂.homologyData := default simp only [← γ.rightHomologyMap'_eq, assoc, ← rightHomologyMap'_comp_assoc, id_comp, comp_id, γ'.left.leftHomologyMap'_eq, γ'.right.rightHomologyMap'_eq, ← γ'.comm_assoc, Iso.hom_inv_id] lemma homologyMap_comm : homologyMap φ ≫ h₂.homologyIso.hom = h₁.homologyIso.hom ≫ γ.φH := by simp only [γ.homologyMap_eq, assoc, Iso.inv_hom_id, comp_id] end RightHomologyMapData @[simp] lemma homologyMap'_id (h : S.HomologyData) : homologyMap' (𝟙 S) h h = 𝟙 _ := (HomologyMapData.id h).homologyMap'_eq variable (S) @[simp] lemma homologyMap_id [HasHomology S] : homologyMap (𝟙 S) = 𝟙 _ := homologyMap'_id _ @[simp] lemma homologyMap'_zero (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : homologyMap' 0 h₁ h₂ = 0 := (HomologyMapData.zero h₁ h₂).homologyMap'_eq variable (S₁ S₂) @[simp] lemma homologyMap_zero [S₁.HasHomology] [S₂.HasHomology] : homologyMap (0 : S₁ ⟶ S₂) = 0 := homologyMap'_zero _ _ variable {S₁ S₂} lemma homologyMap'_comp (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) (h₃ : S₃.HomologyData) : homologyMap' (φ₁ ≫ φ₂) h₁ h₃ = homologyMap' φ₁ h₁ h₂ ≫ homologyMap' φ₂ h₂ h₃ := leftHomologyMap'_comp _ _ _ _ _ @[simp] lemma homologyMap_comp [HasHomology S₁] [HasHomology S₂] [HasHomology S₃] (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) : homologyMap (φ₁ ≫ φ₂) = homologyMap φ₁ ≫ homologyMap φ₂ := homologyMap'_comp _ _ _ _ _ /-- Given an isomorphism `S₁ ≅ S₂` of short complexes and homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced homology isomorphism `h₁.left.H ≅ h₁.left.H`. -/ @[simps] def homologyMapIso' (e : S₁ ≅ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : h₁.left.H ≅ h₂.left.H where hom := homologyMap' e.hom h₁ h₂ inv := homologyMap' e.inv h₂ h₁ hom_inv_id := by rw [← homologyMap'_comp, e.hom_inv_id, homologyMap'_id] inv_hom_id := by rw [← homologyMap'_comp, e.inv_hom_id, homologyMap'_id] instance isIso_homologyMap'_of_isIso (φ : S₁ ⟶ S₂) [IsIso φ] (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : IsIso (homologyMap' φ h₁ h₂) := (inferInstance : IsIso (homologyMapIso' (asIso φ) h₁ h₂).hom) /-- The homology isomorphism `S₁.homology ⟶ S₂.homology` induced by an isomorphism `S₁ ≅ S₂` of short complexes. -/ @[simps] noncomputable def homologyMapIso (e : S₁ ≅ S₂) [S₁.HasHomology] [S₂.HasHomology] : S₁.homology ≅ S₂.homology where hom := homologyMap e.hom inv := homologyMap e.inv hom_inv_id := by rw [← homologyMap_comp, e.hom_inv_id, homologyMap_id] inv_hom_id := by rw [← homologyMap_comp, e.inv_hom_id, homologyMap_id] instance isIso_homologyMap_of_iso (φ : S₁ ⟶ S₂) [IsIso φ] [S₁.HasHomology] [S₂.HasHomology] : IsIso (homologyMap φ) := (inferInstance : IsIso (homologyMapIso (asIso φ)).hom) variable {S} section variable (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) /-- If a short complex `S` has both a left homology data `h₁` and a right homology data `h₂`, this is the canonical morphism `h₁.H ⟶ h₂.H`. -/ def leftRightHomologyComparison' : h₁.H ⟶ h₂.H := h₂.liftH (h₁.descH (h₁.i ≫ h₂.p) (by simp)) (by rw [← cancel_epi h₁.π, LeftHomologyData.π_descH_assoc, assoc, RightHomologyData.p_g', LeftHomologyData.wi, comp_zero]) lemma leftRightHomologyComparison'_eq_liftH : leftRightHomologyComparison' h₁ h₂ = h₂.liftH (h₁.descH (h₁.i ≫ h₂.p) (by simp)) (by rw [← cancel_epi h₁.π, LeftHomologyData.π_descH_assoc, assoc, RightHomologyData.p_g', LeftHomologyData.wi, comp_zero]) := rfl @[reassoc (attr := simp)] lemma π_leftRightHomologyComparison'_ι : h₁.π ≫ leftRightHomologyComparison' h₁ h₂ ≫ h₂.ι = h₁.i ≫ h₂.p := by	simp only [leftRightHomologyComparison'_eq_liftH, RightHomologyData.liftH_ι, LeftHomologyData.π_descH] lemma leftRightHomologyComparison'_eq_descH : leftRightHomologyComparison' h₁ h₂ =	Mathlib/Algebra/Homology/ShortComplex/Homology.lean	564	568
/- Copyright (c) 2021 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Riccardo Brasca, Adam Topaz, Jujian Zhang, Joël Riou -/ import Mathlib.Algebra.Homology.Additive import Mathlib.CategoryTheory.Abelian.Projective.Resolution /-! # Left-derived functors We define the left-derived functors `F.leftDerived n : C ⥤ D` for any additive functor `F` out of a category with projective resolutions. We first define a functor `F.leftDerivedToHomotopyCategory : C ⥤ HomotopyCategory D (ComplexShape.down ℕ)` which is `projectiveResolutions C ⋙ F.mapHomotopyCategory _`. We show that if `X : C` and `P : ProjectiveResolution X`, then `F.leftDerivedToHomotopyCategory.obj X` identifies to the image in the homotopy category of the functor `F` applied objectwise to `P.complex` (this isomorphism is `P.isoLeftDerivedToHomotopyCategoryObj F`). Then, the left-derived functors `F.leftDerived n : C ⥤ D` are obtained by composing `F.leftDerivedToHomotopyCategory` with the homology functors on the homotopy category. Similarly we define natural transformations between left-derived functors coming from natural transformations between the original additive functors, and show how to compute the components. ## Main results * `Functor.isZero_leftDerived_obj_projective_succ`: projective objects have no higher left derived functor. * `NatTrans.leftDerived`: the natural isomorphism between left derived functors induced by natural transformation. * `Functor.fromLeftDerivedZero`: the natural transformation `F.leftDerived 0 ⟶ F`, which is an isomorphism when `F` is right exact (i.e. preserves finite colimits), see also `Functor.leftDerivedZeroIsoSelf`. ## TODO * refactor `Functor.leftDerived` (and `Functor.rightDerived`) when the necessary material enters mathlib: derived categories, injective/projective derivability structures, existence of derived functors from derivability structures. Eventually, we shall get a right derived functor `F.leftDerivedFunctorMinus : DerivedCategory.Minus C ⥤ DerivedCategory.Minus D`, and `F.leftDerived` shall be redefined using `F.leftDerivedFunctorMinus`. -/ universe v u namespace CategoryTheory open Category Limits variable {C : Type u} [Category.{v} C] {D : Type*} [Category D] [Abelian C] [HasProjectiveResolutions C] [Abelian D] /-- When `F : C ⥤ D` is an additive functor, this is the functor `C ⥤ HomotopyCategory D (ComplexShape.down ℕ)` which sends `X : C` to `F` applied to a projective resolution of `X`. -/ noncomputable def Functor.leftDerivedToHomotopyCategory (F : C ⥤ D) [F.Additive] : C ⥤ HomotopyCategory D (ComplexShape.down ℕ) := projectiveResolutions C ⋙ F.mapHomotopyCategory _ /-- If `P : ProjectiveResolution Z` and `F : C ⥤ D` is an additive functor, this is an isomorphism between `F.leftDerivedToHomotopyCategory.obj X` and the complex obtained by applying `F` to `P.complex`. -/ noncomputable def ProjectiveResolution.isoLeftDerivedToHomotopyCategoryObj {X : C} (P : ProjectiveResolution X) (F : C ⥤ D) [F.Additive] : F.leftDerivedToHomotopyCategory.obj X ≅ (F.mapHomologicalComplex _ ⋙ HomotopyCategory.quotient _ _).obj P.complex := (F.mapHomotopyCategory _).mapIso P.iso ≪≫ (F.mapHomotopyCategoryFactors _).app P.complex @[reassoc] lemma ProjectiveResolution.isoLeftDerivedToHomotopyCategoryObj_inv_naturality {X Y : C} (f : X ⟶ Y) (P : ProjectiveResolution X) (Q : ProjectiveResolution Y) (φ : P.complex ⟶ Q.complex) (comm : φ.f 0 ≫ Q.π.f 0 = P.π.f 0 ≫ f) (F : C ⥤ D) [F.Additive] : (P.isoLeftDerivedToHomotopyCategoryObj F).inv ≫ F.leftDerivedToHomotopyCategory.map f = (F.mapHomologicalComplex _ ⋙ HomotopyCategory.quotient _ _).map φ ≫ (Q.isoLeftDerivedToHomotopyCategoryObj F).inv := by dsimp [Functor.leftDerivedToHomotopyCategory, isoLeftDerivedToHomotopyCategoryObj] rw [assoc, ← Functor.map_comp, iso_inv_naturality f P Q φ comm, Functor.map_comp] erw [(F.mapHomotopyCategoryFactors (ComplexShape.down ℕ)).inv.naturality_assoc] rfl @[reassoc] lemma ProjectiveResolution.isoLeftDerivedToHomotopyCategoryObj_hom_naturality {X Y : C} (f : X ⟶ Y) (P : ProjectiveResolution X) (Q : ProjectiveResolution Y)	(φ : P.complex ⟶ Q.complex) (comm : φ.f 0 ≫ Q.π.f 0 = P.π.f 0 ≫ f) (F : C ⥤ D) [F.Additive] : F.leftDerivedToHomotopyCategory.map f ≫ (Q.isoLeftDerivedToHomotopyCategoryObj F).hom = (P.isoLeftDerivedToHomotopyCategoryObj F).hom ≫ (F.mapHomologicalComplex _ ⋙ HomotopyCategory.quotient _ _).map φ := by dsimp rw [← cancel_epi (P.isoLeftDerivedToHomotopyCategoryObj F).inv, Iso.inv_hom_id_assoc, isoLeftDerivedToHomotopyCategoryObj_inv_naturality_assoc f P Q φ comm F, Iso.inv_hom_id, comp_id] /-- The left derived functors of an additive functor. -/ noncomputable def Functor.leftDerived (F : C ⥤ D) [F.Additive] (n : ℕ) : C ⥤ D :=	Mathlib/CategoryTheory/Abelian/LeftDerived.lean	91	102
/- 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.Analysis.InnerProductSpace.PiL2 import Mathlib.Analysis.SpecialFunctions.Sqrt import Mathlib.Analysis.NormedSpace.HomeomorphBall import Mathlib.Analysis.Calculus.ContDiff.WithLp import Mathlib.Analysis.Calculus.FDeriv.WithLp /-! # Calculus in inner product spaces In this file we prove that the inner product and square of the norm in an inner space are infinitely `ℝ`-smooth. In order to state these results, we need a `NormedSpace ℝ E` instance. Though we can deduce this structure from `InnerProductSpace 𝕜 E`, this instance may be not definitionally equal to some other “natural” instance. So, we assume `[NormedSpace ℝ E]`. We also prove that functions to a `EuclideanSpace` are (higher) differentiable if and only if their components are. This follows from the corresponding fact for finite product of normed spaces, and from the equivalence of norms in finite dimensions. ## TODO The last part of the file should be generalized to `PiLp`. -/ noncomputable section open RCLike Real Filter section DerivInner variable {𝕜 E F : Type} [RCLike 𝕜] variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y variable (𝕜) [NormedSpace ℝ E] /-- Derivative of the inner product. -/ def fderivInnerCLM (p : E × E) : E × E →L[ℝ] 𝕜 := isBoundedBilinearMap_inner.deriv p @[simp] theorem fderivInnerCLM_apply (p x : E × E) : fderivInnerCLM 𝕜 p x = ⟪p.1, x.2⟫ + ⟪x.1, p.2⟫ := rfl variable {𝕜} theorem contDiff_inner {n} : ContDiff ℝ n fun p : E × E => ⟪p.1, p.2⟫ := isBoundedBilinearMap_inner.contDiff theorem contDiffAt_inner {p : E × E} {n} : ContDiffAt ℝ n (fun p : E × E => ⟪p.1, p.2⟫) p := ContDiff.contDiffAt contDiff_inner theorem differentiable_inner : Differentiable ℝ fun p : E × E => ⟪p.1, p.2⟫ := isBoundedBilinearMap_inner.differentiableAt variable (𝕜) variable {G : Type} [NormedAddCommGroup G] [NormedSpace ℝ G] {f g : G → E} {f' g' : G →L[ℝ] E} {s : Set G} {x : G} {n : WithTop ℕ∞} theorem ContDiffWithinAt.inner (hf : ContDiffWithinAt ℝ n f s x) (hg : ContDiffWithinAt ℝ n g s x) : ContDiffWithinAt ℝ n (fun x => ⟪f x, g x⟫) s x := contDiffAt_inner.comp_contDiffWithinAt x (hf.prodMk hg) nonrec theorem ContDiffAt.inner (hf : ContDiffAt ℝ n f x) (hg : ContDiffAt ℝ n g x) : ContDiffAt ℝ n (fun x => ⟪f x, g x⟫) x := hf.inner 𝕜 hg theorem ContDiffOn.inner (hf : ContDiffOn ℝ n f s) (hg : ContDiffOn ℝ n g s) : ContDiffOn ℝ n (fun x => ⟪f x, g x⟫) s := fun x hx => (hf x hx).inner 𝕜 (hg x hx) theorem ContDiff.inner (hf : ContDiff ℝ n f) (hg : ContDiff ℝ n g) : ContDiff ℝ n fun x => ⟪f x, g x⟫ := contDiff_inner.comp (hf.prodMk hg) #adaptation_note /-- https://github.com/leanprover/lean4/pull/6024 added `by exact` to handle a unification issue. -/ theorem HasFDerivWithinAt.inner (hf : HasFDerivWithinAt f f' s x) (hg : HasFDerivWithinAt g g' s x) : HasFDerivWithinAt (fun t => ⟪f t, g t⟫) ((fderivInnerCLM 𝕜 (f x, g x)).comp <\| f'.prod g') s x := by exact isBoundedBilinearMap_inner (𝕜 := 𝕜) (E := E) \|>.hasFDerivAt (f x, g x) \|>.comp_hasFDerivWithinAt x (hf.prodMk hg) theorem HasStrictFDerivAt.inner (hf : HasStrictFDerivAt f f' x) (hg : HasStrictFDerivAt g g' x) : HasStrictFDerivAt (fun t => ⟪f t, g t⟫) ((fderivInnerCLM 𝕜 (f x, g x)).comp <\| f'.prod g') x := isBoundedBilinearMap_inner (𝕜 := 𝕜) (E := E) \|>.hasStrictFDerivAt (f x, g x) \|>.comp x (hf.prodMk hg) #adaptation_note /-- https://github.com/leanprover/lean4/pull/6024 added `by exact` to handle a unification issue. -/ theorem HasFDerivAt.inner (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) : HasFDerivAt (fun t => ⟪f t, g t⟫) ((fderivInnerCLM 𝕜 (f x, g x)).comp <\| f'.prod g') x := by exact isBoundedBilinearMap_inner (𝕜 := 𝕜) (E := E) \|>.hasFDerivAt (f x, g x) \|>.comp x (hf.prodMk hg) theorem HasDerivWithinAt.inner {f g : ℝ → E} {f' g' : E} {s : Set ℝ} {x : ℝ} (hf : HasDerivWithinAt f f' s x) (hg : HasDerivWithinAt g g' s x) : HasDerivWithinAt (fun t => ⟪f t, g t⟫) (⟪f x, g'⟫ + ⟪f', g x⟫) s x := by simpa using (hf.hasFDerivWithinAt.inner 𝕜 hg.hasFDerivWithinAt).hasDerivWithinAt theorem HasDerivAt.inner {f g : ℝ → E} {f' g' : E} {x : ℝ} : HasDerivAt f f' x → HasDerivAt g g' x → HasDerivAt (fun t => ⟪f t, g t⟫) (⟪f x, g'⟫ + ⟪f', g x⟫) x := by simpa only [← hasDerivWithinAt_univ] using HasDerivWithinAt.inner 𝕜 theorem DifferentiableWithinAt.inner (hf : DifferentiableWithinAt ℝ f s x) (hg : DifferentiableWithinAt ℝ g s x) : DifferentiableWithinAt ℝ (fun x => ⟪f x, g x⟫) s x := (hf.hasFDerivWithinAt.inner 𝕜 hg.hasFDerivWithinAt).differentiableWithinAt theorem DifferentiableAt.inner (hf : DifferentiableAt ℝ f x) (hg : DifferentiableAt ℝ g x) : DifferentiableAt ℝ (fun x => ⟪f x, g x⟫) x := (hf.hasFDerivAt.inner 𝕜 hg.hasFDerivAt).differentiableAt theorem DifferentiableOn.inner (hf : DifferentiableOn ℝ f s) (hg : DifferentiableOn ℝ g s) : DifferentiableOn ℝ (fun x => ⟪f x, g x⟫) s := fun x hx => (hf x hx).inner 𝕜 (hg x hx) theorem Differentiable.inner (hf : Differentiable ℝ f) (hg : Differentiable ℝ g) : Differentiable ℝ fun x => ⟪f x, g x⟫ := fun x => (hf x).inner 𝕜 (hg x) theorem fderiv_inner_apply (hf : DifferentiableAt ℝ f x) (hg : DifferentiableAt ℝ g x) (y : G) : fderiv ℝ (fun t => ⟪f t, g t⟫) x y = ⟪f x, fderiv ℝ g x y⟫ + ⟪fderiv ℝ f x y, g x⟫ := by rw [(hf.hasFDerivAt.inner 𝕜 hg.hasFDerivAt).fderiv]; rfl theorem deriv_inner_apply {f g : ℝ → E} {x : ℝ} (hf : DifferentiableAt ℝ f x) (hg : DifferentiableAt ℝ g x) : deriv (fun t => ⟪f t, g t⟫) x = ⟪f x, deriv g x⟫ + ⟪deriv f x, g x⟫ := (hf.hasDerivAt.inner 𝕜 hg.hasDerivAt).deriv section include 𝕜 theorem contDiff_norm_sq : ContDiff ℝ n fun x : E => ‖x‖ ^ 2 := by convert (reCLM : 𝕜 →L[ℝ] ℝ).contDiff.comp ((contDiff_id (E := E)).inner 𝕜 (contDiff_id (E := E))) exact (inner_self_eq_norm_sq _).symm theorem ContDiff.norm_sq (hf : ContDiff ℝ n f) : ContDiff ℝ n fun x => ‖f x‖ ^ 2 := (contDiff_norm_sq 𝕜).comp hf theorem ContDiffWithinAt.norm_sq (hf : ContDiffWithinAt ℝ n f s x) : ContDiffWithinAt ℝ n (fun y => ‖f y‖ ^ 2) s x := (contDiff_norm_sq 𝕜).contDiffAt.comp_contDiffWithinAt x hf nonrec theorem ContDiffAt.norm_sq (hf : ContDiffAt ℝ n f x) : ContDiffAt ℝ n (‖f ·‖ ^ 2) x := hf.norm_sq 𝕜 theorem contDiffAt_norm {x : E} (hx : x ≠ 0) : ContDiffAt ℝ n norm x := by have : ‖id x‖ ^ 2 ≠ 0 := pow_ne_zero 2 (norm_pos_iff.2 hx).ne' simpa only [id, sqrt_sq, norm_nonneg] using (contDiffAt_id.norm_sq 𝕜).sqrt this theorem ContDiffAt.norm (hf : ContDiffAt ℝ n f x) (h0 : f x ≠ 0) : ContDiffAt ℝ n (fun y => ‖f y‖) x := (contDiffAt_norm 𝕜 h0).comp x hf theorem ContDiffAt.dist (hf : ContDiffAt ℝ n f x) (hg : ContDiffAt ℝ n g x) (hne : f x ≠ g x) : ContDiffAt ℝ n (fun y => dist (f y) (g y)) x := by simp only [dist_eq_norm] exact (hf.sub hg).norm 𝕜 (sub_ne_zero.2 hne) theorem ContDiffWithinAt.norm (hf : ContDiffWithinAt ℝ n f s x) (h0 : f x ≠ 0) : ContDiffWithinAt ℝ n (fun y => ‖f y‖) s x := (contDiffAt_norm 𝕜 h0).comp_contDiffWithinAt x hf	theorem ContDiffWithinAt.dist (hf : ContDiffWithinAt ℝ n f s x) (hg : ContDiffWithinAt ℝ n g s x) (hne : f x ≠ g x) : ContDiffWithinAt ℝ n (fun y => dist (f y) (g y)) s x := by simp only [dist_eq_norm]; exact (hf.sub hg).norm 𝕜 (sub_ne_zero.2 hne)	Mathlib/Analysis/InnerProductSpace/Calculus.lean	169	171
/- Copyright (c) 2021 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.Algebra.Group.Submonoid.Pointwise /-! # Submonoid of inverses Given a submonoid `N` of a monoid `M`, we define the submonoid `N.leftInv` as the submonoid of left inverses of `N`. When `M` is commutative, we may define `fromCommLeftInv : N.leftInv →* N` since the inverses are unique. When `N ≤ IsUnit.Submonoid M`, this is precisely the pointwise inverse of `N`, and we may define `leftInvEquiv : S.leftInv ≃* S`. For the pointwise inverse of submonoids of groups, please refer to the file `Mathlib.Algebra.Group.Submonoid.Pointwise`. `N.leftInv` is distinct from `N.units`, which is the subgroup of `Mˣ` containing all units that are in `N`. See the implementation notes of `Mathlib.GroupTheory.Submonoid.Units` for more details on related constructions. ## TODO Define the submonoid of right inverses and two-sided inverses. See the comments of https://github.com/leanprover-community/mathlib4/pull/10679 for a possible implementation. -/ variable {M : Type} namespace Submonoid @[to_additive] noncomputable instance [Monoid M] : Group (IsUnit.submonoid M) := { inferInstanceAs (Monoid (IsUnit.submonoid M)) with inv := fun x ↦ ⟨x.prop.unit⁻¹.val, x.prop.unit⁻¹.isUnit⟩ inv_mul_cancel := fun x ↦ Subtype.ext ((Units.val_mul x.prop.unit⁻¹ _).trans x.prop.unit.inv_val) } @[to_additive] noncomputable instance [CommMonoid M] : CommGroup (IsUnit.submonoid M) := { inferInstanceAs (Group (IsUnit.submonoid M)) with mul_comm := fun a b ↦ by convert mul_comm a b } @[to_additive] theorem IsUnit.Submonoid.coe_inv [Monoid M] (x : IsUnit.submonoid M) : ↑x⁻¹ = (↑x.prop.unit⁻¹ : M) := rfl section Monoid variable [Monoid M] (S : Submonoid M) /-- `S.leftInv` is the submonoid containing all the left inverses of `S`. -/ @[to_additive "`S.leftNeg` is the additive submonoid containing all the left additive inverses of `S`."] def leftInv : Submonoid M where carrier := { x : M \| ∃ y : S, x y = 1 } one_mem' := ⟨1, mul_one 1⟩ mul_mem' := fun {a} _b ⟨a', ha⟩ ⟨b', hb⟩ ↦ ⟨b' * a', by simp only [coe_mul, ← mul_assoc, mul_assoc a, hb, mul_one, ha]⟩ @[to_additive] theorem leftInv_leftInv_le : S.leftInv.leftInv ≤ S := by rintro x ⟨⟨y, z, h₁⟩, h₂ : x * y = 1⟩ convert z.prop rw [← mul_one x, ← h₁, ← mul_assoc, h₂, one_mul] @[to_additive] theorem unit_mem_leftInv (x : Mˣ) (hx : (x : M) ∈ S) : ((x⁻¹ :) : M) ∈ S.leftInv := ⟨⟨x, hx⟩, x.inv_val⟩ @[to_additive] theorem leftInv_leftInv_eq (hS : S ≤ IsUnit.submonoid M) : S.leftInv.leftInv = S := by refine le_antisymm S.leftInv_leftInv_le ?_ intro x hx have : x = ((hS hx).unit⁻¹⁻¹ : Mˣ) := by rw [inv_inv (hS hx).unit] rfl rw [this] exact S.leftInv.unit_mem_leftInv _ (S.unit_mem_leftInv _ hx) /-- The function from `S.leftInv` to `S` sending an element to its right inverse in `S`. This is a `MonoidHom` when `M` is commutative. -/ @[to_additive "The function from `S.leftAdd` to `S` sending an element to its right additive inverse in `S`. This is an `AddMonoidHom` when `M` is commutative."] noncomputable def fromLeftInv : S.leftInv → S := fun x ↦ x.prop.choose @[to_additive (attr := simp)] theorem mul_fromLeftInv (x : S.leftInv) : (x : M) * S.fromLeftInv x = 1 := x.prop.choose_spec @[to_additive (attr := simp)] theorem fromLeftInv_one : S.fromLeftInv 1 = 1 := (one_mul _).symm.trans (Subtype.eq <\| S.mul_fromLeftInv 1) end Monoid section CommMonoid variable [CommMonoid M] (S : Submonoid M) @[to_additive (attr := simp)] theorem fromLeftInv_mul (x : S.leftInv) : (S.fromLeftInv x : M) * x = 1 := by rw [mul_comm, mul_fromLeftInv] @[to_additive] theorem leftInv_le_isUnit : S.leftInv ≤ IsUnit.submonoid M := fun x ⟨y, hx⟩ ↦ ⟨⟨x, y, hx, mul_comm x y ▸ hx⟩, rfl⟩ @[to_additive] theorem fromLeftInv_eq_iff (a : S.leftInv) (b : M) : (S.fromLeftInv a : M) = b ↔ (a : M) * b = 1 := by rw [← IsUnit.mul_right_inj (leftInv_le_isUnit _ a.prop), S.mul_fromLeftInv, eq_comm] /-- The `MonoidHom` from `S.leftInv` to `S` sending an element to its right inverse in `S`. -/ @[to_additive (attr := simps) "The `AddMonoidHom` from `S.leftNeg` to `S` sending an element to its right additive inverse in `S`."] noncomputable def fromCommLeftInv : S.leftInv →* S where toFun := S.fromLeftInv map_one' := S.fromLeftInv_one map_mul' x y := Subtype.ext <\| by rw [fromLeftInv_eq_iff, mul_comm x, Submonoid.coe_mul, Submonoid.coe_mul, mul_assoc, ← mul_assoc (x : M), mul_fromLeftInv, one_mul, mul_fromLeftInv] variable (hS : S ≤ IsUnit.submonoid M) /-- The submonoid of pointwise inverse of `S` is `MulEquiv` to `S`. -/ @[to_additive (attr := simps apply) "The additive submonoid of pointwise additive inverse of `S` is `AddEquiv` to `S`."] noncomputable def leftInvEquiv : S.leftInv ≃* S := { S.fromCommLeftInv with invFun := fun x ↦ ⟨↑(hS x.2).unit⁻¹, x, by simp⟩ left_inv := by intro x ext simp [← Units.mul_eq_one_iff_inv_eq] right_inv := by rintro ⟨x, hx⟩ ext simp [fromLeftInv_eq_iff] } @[to_additive (attr := simp)] theorem fromLeftInv_leftInvEquiv_symm (x : S) : S.fromLeftInv ((S.leftInvEquiv hS).symm x) = x := (S.leftInvEquiv hS).right_inv x @[to_additive (attr := simp)] theorem leftInvEquiv_symm_fromLeftInv (x : S.leftInv) : (S.leftInvEquiv hS).symm (S.fromLeftInv x) = x := (S.leftInvEquiv hS).left_inv x @[to_additive] theorem leftInvEquiv_mul (x : S.leftInv) : (S.leftInvEquiv hS x : M) * x = 1 := by simpa only [leftInvEquiv_apply, fromCommLeftInv] using fromLeftInv_mul S x @[to_additive] theorem mul_leftInvEquiv (x : S.leftInv) : (x : M) * S.leftInvEquiv hS x = 1 := by simp only [leftInvEquiv_apply, fromCommLeftInv, mul_fromLeftInv] @[to_additive (attr := simp)] theorem leftInvEquiv_symm_mul (x : S) : ((S.leftInvEquiv hS).symm x : M) * x = 1 := by convert S.mul_leftInvEquiv hS ((S.leftInvEquiv hS).symm x) simp @[to_additive (attr := simp)] theorem mul_leftInvEquiv_symm (x : S) : (x : M) * (S.leftInvEquiv hS).symm x = 1 := by convert S.leftInvEquiv_mul hS ((S.leftInvEquiv hS).symm x) simp end CommMonoid section Group variable [Group M] (S : Submonoid M) open Pointwise @[to_additive] theorem leftInv_eq_inv : S.leftInv = S⁻¹ := Submonoid.ext fun _ ↦ ⟨fun h ↦ Submonoid.mem_inv.mpr ((inv_eq_of_mul_eq_one_right h.choose_spec).symm ▸ h.choose.prop), fun h ↦ ⟨⟨_, h⟩, mul_inv_cancel _⟩⟩ @[to_additive (attr := simp)] theorem fromLeftInv_eq_inv (x : S.leftInv) : (S.fromLeftInv x : M) = (x : M)⁻¹ := by rw [← mul_right_inj (x : M), mul_inv_cancel, mul_fromLeftInv] end Group section CommGroup variable [CommGroup M] (S : Submonoid M) (hS : S ≤ IsUnit.submonoid M) @[to_additive (attr := simp)] theorem leftInvEquiv_symm_eq_inv (x : S) : ((S.leftInvEquiv hS).symm x : M) = (x : M)⁻¹ := by rw [← mul_right_inj (x : M), mul_inv_cancel, mul_leftInvEquiv_symm] end CommGroup end Submonoid		Mathlib/GroupTheory/Submonoid/Inverses.lean	251	252
/- Copyright (c) 2022 Jireh Loreaux. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jireh Loreaux -/ import Mathlib.Algebra.Group.Subsemigroup.Basic /-! # Subsemigroups: membership criteria In this file we prove various facts about membership in a subsemigroup. The intent is to mimic `GroupTheory/Submonoid/Membership`, but currently this file is mostly a stub and only provides rudimentary support. * `mem_iSup_of_directed`, `coe_iSup_of_directed`, `mem_sSup_of_directed_on`, `coe_sSup_of_directed_on`: the supremum of a directed collection of subsemigroup is their union. ## TODO * Define the `FreeSemigroup` generated by a set. This might require some rather substantial additions to low-level API. For example, developing the subtype of nonempty lists, then defining a product on nonempty lists, powers where the exponent is a positive natural, et cetera. Another option would be to define the `FreeSemigroup` as the subsemigroup (pushed to be a semigroup) of the `FreeMonoid` consisting of non-identity elements. ## Tags subsemigroup -/ assert_not_exists MonoidWithZero variable {ι : Sort} {M : Type} section NonAssoc variable [Mul M] open Set namespace Subsemigroup -- TODO: this section can be generalized to `[MulMemClass B M] [CompleteLattice B]` -- such that `complete_lattice.le` coincides with `set_like.le` @[to_additive] theorem mem_iSup_of_directed {S : ι → Subsemigroup M} (hS : Directed (· ≤ ·) S) {x : M} : (x ∈ ⨆ i, S i) ↔ ∃ i, x ∈ S i := by refine ⟨?_, fun ⟨i, hi⟩ ↦ le_iSup S i hi⟩ suffices x ∈ closure (⋃ i, (S i : Set M)) → ∃ i, x ∈ S i by simpa only [closure_iUnion, closure_eq (S _)] using this refine fun hx ↦ closure_induction (fun y hy ↦ mem_iUnion.mp hy) ?_ hx rintro x y - - ⟨i, hi⟩ ⟨j, hj⟩ rcases hS i j with ⟨k, hki, hkj⟩ exact ⟨k, (S k).mul_mem (hki hi) (hkj hj)⟩ @[to_additive] theorem coe_iSup_of_directed {S : ι → Subsemigroup M} (hS : Directed (· ≤ ·) S) : ((⨆ i, S i : Subsemigroup M) : Set M) = ⋃ i, S i := Set.ext fun x => by simp [mem_iSup_of_directed hS] @[to_additive] theorem mem_sSup_of_directed_on {S : Set (Subsemigroup M)} (hS : DirectedOn (· ≤ ·) S) {x : M} : x ∈ sSup S ↔ ∃ s ∈ S, x ∈ s := by simp only [sSup_eq_iSup', mem_iSup_of_directed hS.directed_val, SetCoe.exists, Subtype.coe_mk, exists_prop] @[to_additive] theorem coe_sSup_of_directed_on {S : Set (Subsemigroup M)} (hS : DirectedOn (· ≤ ·) S) : (↑(sSup S) : Set M) = ⋃ s ∈ S, ↑s := Set.ext fun x => by simp [mem_sSup_of_directed_on hS] @[to_additive] theorem mem_sup_left {S T : Subsemigroup M} : ∀ {x : M}, x ∈ S → x ∈ S ⊔ T := by have : S ≤ S ⊔ T := le_sup_left tauto @[to_additive] theorem mem_sup_right {S T : Subsemigroup M} : ∀ {x : M}, x ∈ T → x ∈ S ⊔ T := by have : T ≤ S ⊔ T := le_sup_right tauto @[to_additive] theorem mul_mem_sup {S T : Subsemigroup M} {x y : M} (hx : x ∈ S) (hy : y ∈ T) : x * y ∈ S ⊔ T := mul_mem (mem_sup_left hx) (mem_sup_right hy) @[to_additive] theorem mem_iSup_of_mem {S : ι → Subsemigroup M} (i : ι) : ∀ {x : M}, x ∈ S i → x ∈ iSup S := by have : S i ≤ iSup S := le_iSup _ _ tauto @[to_additive] theorem mem_sSup_of_mem {S : Set (Subsemigroup M)} {s : Subsemigroup M} (hs : s ∈ S) : ∀ {x : M}, x ∈ s → x ∈ sSup S := by have : s ≤ sSup S := le_sSup hs tauto /-- An induction principle for elements of `⨆ i, S i`. If `C` holds all elements of `S i` for all `i`, and is preserved under multiplication, then it holds for all elements of the supremum of `S`. -/ @[to_additive (attr := elab_as_elim) "An induction principle for elements of `⨆ i, S i`. If `C` holds all elements of `S i` for all `i`, and is preserved under addition, then it holds for all elements of the supremum of `S`."] theorem iSup_induction (S : ι → Subsemigroup M) {C : M → Prop} {x₁ : M} (hx₁ : x₁ ∈ ⨆ i, S i) (mem : ∀ i, ∀ x₂ ∈ S i, C x₂) (mul : ∀ x y, C x → C y → C (x * y)) : C x₁ := by rw [iSup_eq_closure] at hx₁ refine closure_induction (fun x₂ hx₂ => ?_) (fun x y _ _ ↦ mul x y) hx₁ obtain ⟨i, hi⟩ := Set.mem_iUnion.mp hx₂ exact mem _ _ hi /-- A dependent version of `Subsemigroup.iSup_induction`. -/ @[to_additive (attr := elab_as_elim) "A dependent version of `AddSubsemigroup.iSup_induction`."] theorem iSup_induction' (S : ι → Subsemigroup M) {C : ∀ x, (x ∈ ⨆ i, S i) → Prop} (mem : ∀ (i) (x) (hxS : x ∈ S i), C x (mem_iSup_of_mem i ‹_›)) (mul : ∀ x y hx hy, C x hx → C y hy → C (x * y) (mul_mem ‹_› ‹_›)) {x₁ : M} (hx₁ : x₁ ∈ ⨆ i, S i) : C x₁ hx₁ := by refine Exists.elim ?_ fun (hx₁' : x₁ ∈ ⨆ i, S i) (hc : C x₁ hx₁') => hc refine @iSup_induction _ _ _ S (fun x' => ∃ hx'', C x' hx'') _ hx₁ (fun i x₂ hx₂ => ?_) fun x₃ y => ?_ · exact ⟨_, mem _ _ hx₂⟩ · rintro ⟨_, Cx⟩ ⟨_, Cy⟩ exact ⟨_, mul _ _ _ _ Cx Cy⟩	end Subsemigroup end NonAssoc	Mathlib/Algebra/Group/Subsemigroup/Membership.lean	123	128
/- Copyright (c) 2019 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin, Kenny Lau -/ import Mathlib.Algebra.CharP.Defs import Mathlib.RingTheory.Multiplicity import Mathlib.RingTheory.PowerSeries.Basic /-! # Formal power series (in one variable) - Order The `PowerSeries.order` of a formal power series `φ` is the multiplicity of the variable `X` in `φ`. If the coefficients form an integral domain, then `PowerSeries.order` is an additive valuation (`PowerSeries.order_mul`, `PowerSeries.min_order_le_order_add`). We prove that if the commutative ring `R` of coefficients is an integral domain, then the ring `R⟦X⟧` of formal power series in one variable over `R` is an integral domain. Given a non-zero power series `f`, `divided_by_X_pow_order f` is the power series obtained by dividing out the largest power of X that divides `f`, that is its order. This is useful when proving that `R⟦X⟧` is a normalization monoid, which is done in `PowerSeries.Inverse`. -/ noncomputable section open Polynomial open Finset (antidiagonal mem_antidiagonal) namespace PowerSeries open Finsupp (single) variable {R : Type} section OrderBasic variable [Semiring R] {φ : R⟦X⟧} theorem exists_coeff_ne_zero_iff_ne_zero : (∃ n : ℕ, coeff R n φ ≠ 0) ↔ φ ≠ 0 := by refine not_iff_not.mp ?_ push_neg simp [(coeff R _).map_zero] /-- The order of a formal power series `φ` is the greatest `n : PartENat` such that `X^n` divides `φ`. The order is `⊤` if and only if `φ = 0`. -/ def order (φ : R⟦X⟧) : ℕ∞ := letI := Classical.decEq R letI := Classical.decEq R⟦X⟧ if h : φ = 0 then ⊤ else Nat.find (exists_coeff_ne_zero_iff_ne_zero.mpr h) /-- The order of the `0` power series is infinite. -/ @[simp] theorem order_zero : order (0 : R⟦X⟧) = ⊤ := dif_pos rfl theorem order_finite_iff_ne_zero : (order φ < ⊤) ↔ φ ≠ 0 := by simp only [order] split_ifs with h <;> simpa /-- The `0` power series is the unique power series with infinite order. -/ @[simp] theorem order_eq_top {φ : R⟦X⟧} : φ.order = ⊤ ↔ φ = 0 := by simpa using order_finite_iff_ne_zero.not_left theorem coe_toNat_order {φ : R⟦X⟧} (hf : φ ≠ 0) : φ.order.toNat = φ.order := by rw [ENat.coe_toNat_eq_self.mpr (order_eq_top.not.mpr hf)] /-- If the order of a formal power series is finite, then the coefficient indexed by the order is nonzero. -/ theorem coeff_order (h : φ ≠ 0) : coeff R φ.order.toNat φ ≠ 0 := by classical simp only [order, h, not_false_iff, dif_neg] generalize_proofs h exact Nat.find_spec h /-- If the `n`th coefficient of a formal power series is nonzero, then the order of the power series is less than or equal to `n`. -/ theorem order_le (n : ℕ) (h : coeff R n φ ≠ 0) : order φ ≤ n := by classical rw [order, dif_neg] · simpa using ⟨n, le_rfl, h⟩ · exact exists_coeff_ne_zero_iff_ne_zero.mp ⟨n, h⟩ /-- The `n`th coefficient of a formal power series is `0` if `n` is strictly smaller than the order of the power series. -/ theorem coeff_of_lt_order (n : ℕ) (h : ↑n < order φ) : coeff R n φ = 0 := by contrapose! h exact order_le _ h theorem coeff_of_lt_order_toNat (n : ℕ) (h : n < φ.order.toNat) : coeff R n φ = 0 := by by_cases h' : φ = 0 · simp [h'] · refine coeff_of_lt_order _ ?_ rwa [← coe_toNat_order h', ENat.coe_lt_coe] /-- The order of a formal power series is at least `n` if the `i`th coefficient is `0` for all `i < n`. -/ theorem nat_le_order (φ : R⟦X⟧) (n : ℕ) (h : ∀ i < n, coeff R i φ = 0) : ↑n ≤ order φ := by classical simp only [order] split_ifs · simp · simpa [Nat.le_find_iff] /-- The order of a formal power series is at least `n` if the `i`th coefficient is `0` for all `i < n`. -/ theorem le_order (φ : R⟦X⟧) (n : ℕ∞) (h : ∀ i : ℕ, ↑i < n → coeff R i φ = 0) : n ≤ order φ := by cases n with \| top => simpa using ext (by simpa using h) \| coe n => convert nat_le_order φ n _ simpa using h /-- The order of a formal power series is exactly `n` if the `n`th coefficient is nonzero, and the `i`th coefficient is `0` for all `i < n`. -/ theorem order_eq_nat {φ : R⟦X⟧} {n : ℕ} : order φ = n ↔ coeff R n φ ≠ 0 ∧ ∀ i, i < n → coeff R i φ = 0 := by classical rcases eq_or_ne φ 0 with (rfl \| hφ) · simp simp [order, dif_neg hφ, Nat.find_eq_iff] /-- The order of a formal power series is exactly `n` if the `n`th coefficient is nonzero, and the `i`th coefficient is `0` for all `i < n`. -/ theorem order_eq {φ : R⟦X⟧} {n : ℕ∞} : order φ = n ↔ (∀ i : ℕ, ↑i = n → coeff R i φ ≠ 0) ∧ ∀ i : ℕ, ↑i < n → coeff R i φ = 0 := by cases n with \| top => simp [ext_iff] \| coe n => simp [order_eq_nat] /-- The order of the sum of two formal power series is at least the minimum of their orders. -/ theorem min_order_le_order_add (φ ψ : R⟦X⟧) : min (order φ) (order ψ) ≤ order (φ + ψ) := by refine le_order _ _ ?_ simp +contextual [coeff_of_lt_order] @[deprecated (since := "2024-11-12")] alias le_order_add := min_order_le_order_add private theorem order_add_of_order_eq.aux (φ ψ : R⟦X⟧) (H : order φ < order ψ) : order (φ + ψ) ≤ order φ ⊓ order ψ := by suffices order (φ + ψ) = order φ by rw [le_inf_iff, this] exact ⟨le_rfl, le_of_lt H⟩ rw [order_eq] constructor · intro i hi rw [← hi] at H rw [(coeff _ _).map_add, coeff_of_lt_order i H, add_zero] exact (order_eq_nat.1 hi.symm).1 · intro i hi rw [(coeff _ _).map_add, coeff_of_lt_order i hi, coeff_of_lt_order i (lt_trans hi H), zero_add] /-- The order of the sum of two formal power series is the minimum of their orders if their orders differ. -/ theorem order_add_of_order_eq (φ ψ : R⟦X⟧) (h : order φ ≠ order ψ) : order (φ + ψ) = order φ ⊓ order ψ := by refine le_antisymm ?_ (min_order_le_order_add _ _) rcases h.lt_or_lt with (φ_lt_ψ \| ψ_lt_φ) · apply order_add_of_order_eq.aux _ _ φ_lt_ψ · simpa only [add_comm, inf_comm] using order_add_of_order_eq.aux _ _ ψ_lt_φ /-- The order of the product of two formal power series is at least the sum of their orders. -/ theorem le_order_mul (φ ψ : R⟦X⟧) : order φ + order ψ ≤ order (φ ψ) := by apply le_order intro n hn; rw [coeff_mul, Finset.sum_eq_zero] rintro ⟨i, j⟩ hij by_cases hi : ↑i < order φ · rw [coeff_of_lt_order i hi, zero_mul] by_cases hj : ↑j < order ψ · rw [coeff_of_lt_order j hj, mul_zero] rw [not_lt] at hi hj; rw [mem_antidiagonal] at hij exfalso apply ne_of_lt (lt_of_lt_of_le hn <\| add_le_add hi hj) rw [← Nat.cast_add, hij] theorem le_order_pow (φ : R⟦X⟧) (n : ℕ) : n • order φ ≤ order (φ ^ n) := by induction n with \| zero => simp \| succ n hn => simp only [add_smul, one_smul, pow_succ] apply le_trans _ (le_order_mul _ _) exact add_le_add_right hn φ.order alias order_mul_ge := le_order_mul /-- The order of the monomial `aX^n` is infinite if `a = 0` and `n` otherwise. -/ theorem order_monomial (n : ℕ) (a : R) [Decidable (a = 0)] : order (monomial R n a) = if a = 0 then (⊤ : ℕ∞) else n := by split_ifs with h · rw [h, order_eq_top, LinearMap.map_zero] · rw [order_eq] constructor <;> intro i hi · simp only [Nat.cast_inj] at hi rwa [hi, coeff_monomial_same] · simp only [Nat.cast_lt] at hi rw [coeff_monomial, if_neg] exact ne_of_lt hi /-- The order of the monomial `aX^n` is `n` if `a ≠ 0`. -/ theorem order_monomial_of_ne_zero (n : ℕ) (a : R) (h : a ≠ 0) : order (monomial R n a) = n := by classical rw [order_monomial, if_neg h] /-- If `n` is strictly smaller than the order of `ψ`, then the `n`th coefficient of its product with any other power series is `0`. -/ theorem coeff_mul_of_lt_order {φ ψ : R⟦X⟧} {n : ℕ} (h : ↑n < ψ.order) : coeff R n (φ * ψ) = 0 := by suffices coeff R n (φ * ψ) = ∑ p ∈ antidiagonal n, 0 by rw [this, Finset.sum_const_zero] rw [coeff_mul] apply Finset.sum_congr rfl intro x hx refine mul_eq_zero_of_right (coeff R x.fst φ) (coeff_of_lt_order x.snd (lt_of_le_of_lt ?_ h)) rw [mem_antidiagonal] at hx norm_cast omega theorem coeff_mul_one_sub_of_lt_order {R : Type} [Ring R] {φ ψ : R⟦X⟧} (n : ℕ) (h : ↑n < ψ.order) : coeff R n (φ (1 - ψ)) = coeff R n φ := by simp [coeff_mul_of_lt_order h, mul_sub] theorem coeff_mul_prod_one_sub_of_lt_order {R ι : Type} [CommRing R] (k : ℕ) (s : Finset ι) (φ : R⟦X⟧) (f : ι → R⟦X⟧) : (∀ i ∈ s, ↑k < (f i).order) → coeff R k (φ ∏ i ∈ s, (1 - f i)) = coeff R k φ := by classical induction' s using Finset.induction_on with a s ha ih t · simp · intro t simp only [Finset.mem_insert, forall_eq_or_imp] at t rw [Finset.prod_insert ha, ← mul_assoc, mul_right_comm, coeff_mul_one_sub_of_lt_order _ t.1] exact ih t.2 /-- Given a non-zero power series `f`, `divXPowOrder f` is the power series obtained by dividing out the largest power of X that divides `f`, that is its order -/ def divXPowOrder (f : R⟦X⟧) : R⟦X⟧ := .mk fun n ↦ coeff R (n + f.order.toNat) f	@[deprecated (since := "2025-04-15")] noncomputable alias divided_by_X_pow_order := divXPowOrder	Mathlib/RingTheory/PowerSeries/Order.lean	245	247
/- Copyright (c) 2021 Yaël Dillies, Bhavik Mehta. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies, Bhavik Mehta -/ import Mathlib.Algebra.Order.BigOperators.Group.Finset import Mathlib.Algebra.Order.Ring.Defs /-! # Equitable functions This file defines equitable functions. A function `f` is equitable on a set `s` if `f a₁ ≤ f a₂ + 1` for all `a₁, a₂ ∈ s`. This is mostly useful when the codomain of `f` is `ℕ` or `ℤ` (or more generally a successor order). ## TODO `ℕ` can be replaced by any `SuccOrder` + `ConditionallyCompleteMonoid`, but we don't have the latter yet. -/ variable {α β : Type*} namespace Set /-- A set is equitable if no element value is more than one bigger than another. -/ def EquitableOn [LE β] [Add β] [One β] (s : Set α) (f : α → β) : Prop := ∀ ⦃a₁ a₂⦄, a₁ ∈ s → a₂ ∈ s → f a₁ ≤ f a₂ + 1 @[simp] theorem equitableOn_empty [LE β] [Add β] [One β] (f : α → β) : EquitableOn ∅ f := fun a _ ha => (Set.not_mem_empty a ha).elim theorem equitableOn_iff_exists_le_le_add_one {s : Set α} {f : α → ℕ} : s.EquitableOn f ↔ ∃ b, ∀ a ∈ s, b ≤ f a ∧ f a ≤ b + 1 := by refine ⟨?_, fun ⟨b, hb⟩ x y hx hy => (hb x hx).2.trans (add_le_add_right (hb y hy).1 _)⟩ obtain rfl \| ⟨x, hx⟩ := s.eq_empty_or_nonempty · simp intro hs	by_cases h : ∀ y ∈ s, f x ≤ f y · exact ⟨f x, fun y hy => ⟨h _ hy, hs hy hx⟩⟩ push_neg at h obtain ⟨w, hw, hwx⟩ := h refine ⟨f w, fun y hy => ⟨Nat.le_of_succ_le_succ ?_, hs hy hw⟩⟩ rw [(Nat.succ_le_of_lt hwx).antisymm (hs hx hw)] exact hs hx hy theorem equitableOn_iff_exists_image_subset_icc {s : Set α} {f : α → ℕ} : s.EquitableOn f ↔ ∃ b, f '' s ⊆ Icc b (b + 1) := by simpa only [image_subset_iff] using equitableOn_iff_exists_le_le_add_one theorem equitableOn_iff_exists_eq_eq_add_one {s : Set α} {f : α → ℕ} :	Mathlib/Data/Set/Equitable.lean	42	54
/- 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.Order.Interval.Set.OrderEmbedding import Mathlib.Order.Antichain import Mathlib.Order.SetNotation /-! # Order-connected sets We say that a set `s : Set α` is `OrdConnected` if for all `x y ∈ s` it includes the interval `[[x, y]]`. If `α` is a `DenselyOrdered` `ConditionallyCompleteLinearOrder` with the `OrderTopology`, then this condition is equivalent to `IsPreconnected s`. If `α` is a `LinearOrderedField`, then this condition is also equivalent to `Convex α s`. In this file we prove that intersection of a family of `OrdConnected` sets is `OrdConnected` and that all standard intervals are `OrdConnected`. -/ open scoped Interval open Set open OrderDual (toDual ofDual) namespace Set section Preorder variable {α β : Type} [Preorder α] [Preorder β] {s : Set α} theorem OrdConnected.out (h : OrdConnected s) : ∀ ⦃x⦄ (_ : x ∈ s) ⦃y⦄ (_ : y ∈ s), Icc x y ⊆ s := h.1 theorem ordConnected_def : OrdConnected s ↔ ∀ ⦃x⦄ (_ : x ∈ s) ⦃y⦄ (_ : y ∈ s), Icc x y ⊆ s := ⟨fun h => h.1, fun h => ⟨h⟩⟩ /-- It suffices to prove `[[x, y]] ⊆ s` for `x y ∈ s`, `x ≤ y`. -/ theorem ordConnected_iff : OrdConnected s ↔ ∀ x ∈ s, ∀ y ∈ s, x ≤ y → Icc x y ⊆ s := ordConnected_def.trans ⟨fun hs _ hx _ hy _ => hs hx hy, fun H x hx y hy _ hz => H x hx y hy (le_trans hz.1 hz.2) hz⟩ theorem ordConnected_of_Ioo {α : Type} [PartialOrder α] {s : Set α} (hs : ∀ x ∈ s, ∀ y ∈ s, x < y → Ioo x y ⊆ s) : OrdConnected s := by rw [ordConnected_iff] intro x hx y hy hxy rcases eq_or_lt_of_le hxy with (rfl \| hxy'); · simpa rw [← Ioc_insert_left hxy, ← Ioo_insert_right hxy'] exact insert_subset_iff.2 ⟨hx, insert_subset_iff.2 ⟨hy, hs x hx y hy hxy'⟩⟩ theorem OrdConnected.preimage_mono {f : β → α} (hs : OrdConnected s) (hf : Monotone f) : OrdConnected (f ⁻¹' s) := ⟨fun _ hx _ hy _ hz => hs.out hx hy ⟨hf hz.1, hf hz.2⟩⟩ theorem OrdConnected.preimage_anti {f : β → α} (hs : OrdConnected s) (hf : Antitone f) : OrdConnected (f ⁻¹' s) := ⟨fun _ hx _ hy _ hz => hs.out hy hx ⟨hf hz.2, hf hz.1⟩⟩ protected theorem Icc_subset (s : Set α) [hs : OrdConnected s] {x y} (hx : x ∈ s) (hy : y ∈ s) : Icc x y ⊆ s := hs.out hx hy end Preorder end Set namespace OrderEmbedding variable {α β : Type} [Preorder α] [Preorder β] theorem image_Icc (e : α ↪o β) (he : OrdConnected (range e)) (x y : α) : e '' Icc x y = Icc (e x) (e y) := by rw [← e.preimage_Icc, image_preimage_eq_inter_range, inter_eq_left.2 (he.out ⟨_, rfl⟩ ⟨_, rfl⟩)] theorem image_Ico (e : α ↪o β) (he : OrdConnected (range e)) (x y : α) : e '' Ico x y = Ico (e x) (e y) := by rw [← e.preimage_Ico, image_preimage_eq_inter_range, inter_eq_left.2 <\| Ico_subset_Icc_self.trans <\| he.out ⟨_, rfl⟩ ⟨_, rfl⟩] theorem image_Ioc (e : α ↪o β) (he : OrdConnected (range e)) (x y : α) : e '' Ioc x y = Ioc (e x) (e y) := by rw [← e.preimage_Ioc, image_preimage_eq_inter_range, inter_eq_left.2 <\| Ioc_subset_Icc_self.trans <\| he.out ⟨_, rfl⟩ ⟨_, rfl⟩] theorem image_Ioo (e : α ↪o β) (he : OrdConnected (range e)) (x y : α) : e '' Ioo x y = Ioo (e x) (e y) := by rw [← e.preimage_Ioo, image_preimage_eq_inter_range, inter_eq_left.2 <\| Ioo_subset_Icc_self.trans <\| he.out ⟨_, rfl⟩ ⟨_, rfl⟩] end OrderEmbedding namespace Set section Preorder variable {α β : Type} [Preorder α] [Preorder β] @[simp] lemma image_subtype_val_Icc {s : Set α} [OrdConnected s] (x y : s) : Subtype.val '' Icc x y = Icc x.1 y := (OrderEmbedding.subtype (· ∈ s)).image_Icc (by simpa) x y @[simp] lemma image_subtype_val_Ico {s : Set α} [OrdConnected s] (x y : s) : Subtype.val '' Ico x y = Ico x.1 y := (OrderEmbedding.subtype (· ∈ s)).image_Ico (by simpa) x y @[simp] lemma image_subtype_val_Ioc {s : Set α} [OrdConnected s] (x y : s) : Subtype.val '' Ioc x y = Ioc x.1 y := (OrderEmbedding.subtype (· ∈ s)).image_Ioc (by simpa) x y @[simp] lemma image_subtype_val_Ioo {s : Set α} [OrdConnected s] (x y : s) : Subtype.val '' Ioo x y = Ioo x.1 y := (OrderEmbedding.subtype (· ∈ s)).image_Ioo (by simpa) x y theorem OrdConnected.inter {s t : Set α} (hs : OrdConnected s) (ht : OrdConnected t) : OrdConnected (s ∩ t) := ⟨fun _ hx _ hy => subset_inter (hs.out hx.1 hy.1) (ht.out hx.2 hy.2)⟩ instance OrdConnected.inter' {s t : Set α} [OrdConnected s] [OrdConnected t] : OrdConnected (s ∩ t) := OrdConnected.inter ‹_› ‹_› theorem OrdConnected.dual {s : Set α} (hs : OrdConnected s) : OrdConnected (OrderDual.ofDual ⁻¹' s) := ⟨fun _ hx _ hy _ hz => hs.out hy hx ⟨hz.2, hz.1⟩⟩ theorem ordConnected_dual {s : Set α} : OrdConnected (OrderDual.ofDual ⁻¹' s) ↔ OrdConnected s := ⟨fun h => by simpa only [ordConnected_def] using h.dual, fun h => h.dual⟩ theorem ordConnected_sInter {S : Set (Set α)} (hS : ∀ s ∈ S, OrdConnected s) : OrdConnected (⋂₀ S) := ⟨fun _x hx _y hy _z hz s hs => (hS s hs).out (hx s hs) (hy s hs) hz⟩ theorem ordConnected_iInter {ι : Sort} {s : ι → Set α} (hs : ∀ i, OrdConnected (s i)) : OrdConnected (⋂ i, s i) := ordConnected_sInter <\| forall_mem_range.2 hs instance ordConnected_iInter' {ι : Sort} {s : ι → Set α} [∀ i, OrdConnected (s i)] : OrdConnected (⋂ i, s i) := ordConnected_iInter ‹_› theorem ordConnected_biInter {ι : Sort} {p : ι → Prop} {s : ∀ i, p i → Set α} (hs : ∀ i hi, OrdConnected (s i hi)) : OrdConnected (⋂ (i) (hi), s i hi) := ordConnected_iInter fun i => ordConnected_iInter <\| hs i theorem ordConnected_pi {ι : Type} {α : ι → Type*} [∀ i, Preorder (α i)] {s : Set ι} {t : ∀ i, Set (α i)} (h : ∀ i ∈ s, OrdConnected (t i)) : OrdConnected (s.pi t) :=	⟨fun _ hx _ hy _ hz i hi => (h i hi).out (hx i hi) (hy i hi) ⟨hz.1 i, hz.2 i⟩⟩	Mathlib/Order/Interval/Set/OrdConnected.lean	151	152
/- Copyright (c) 2021 Eric Wieser. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Eric Wieser -/ import Mathlib.LinearAlgebra.CliffordAlgebra.Basic import Mathlib.RingTheory.GradedAlgebra.Basic /-! # Results about the grading structure of the clifford algebra The main result is `CliffordAlgebra.gradedAlgebra`, which says that the clifford algebra is a ℤ₂-graded algebra (or "superalgebra"). -/ namespace CliffordAlgebra variable {R M : Type} [CommRing R] [AddCommGroup M] [Module R M] variable {Q : QuadraticForm R M} open scoped DirectSum variable (Q) /-- The even or odd submodule, defined as the supremum of the even or odd powers of `(ι Q).range`. `evenOdd 0` is the even submodule, and `evenOdd 1` is the odd submodule. -/ def evenOdd (i : ZMod 2) : Submodule R (CliffordAlgebra Q) := ⨆ j : { n : ℕ // ↑n = i }, LinearMap.range (ι Q) ^ (j : ℕ) theorem one_le_evenOdd_zero : 1 ≤ evenOdd Q 0 := by refine le_trans ?_ (le_iSup _ ⟨0, Nat.cast_zero⟩) exact (pow_zero _).ge theorem range_ι_le_evenOdd_one : LinearMap.range (ι Q) ≤ evenOdd Q 1 := by refine le_trans ?_ (le_iSup _ ⟨1, Nat.cast_one⟩) exact (pow_one _).ge theorem ι_mem_evenOdd_one (m : M) : ι Q m ∈ evenOdd Q 1 := range_ι_le_evenOdd_one Q <\| LinearMap.mem_range_self _ m theorem ι_mul_ι_mem_evenOdd_zero (m₁ m₂ : M) : ι Q m₁ ι Q m₂ ∈ evenOdd Q 0 := Submodule.mem_iSup_of_mem ⟨2, rfl⟩ (by rw [Subtype.coe_mk, pow_two] exact Submodule.mul_mem_mul (LinearMap.mem_range_self (ι Q) m₁) (LinearMap.mem_range_self (ι Q) m₂)) theorem evenOdd_mul_le (i j : ZMod 2) : evenOdd Q i * evenOdd Q j ≤ evenOdd Q (i + j) := by simp_rw [evenOdd, Submodule.iSup_eq_span, Submodule.span_mul_span] apply Submodule.span_mono simp_rw [Set.iUnion_mul, Set.mul_iUnion, Set.iUnion_subset_iff, Set.mul_subset_iff] rintro ⟨xi, rfl⟩ ⟨yi, rfl⟩ x hx y hy refine Set.mem_iUnion.mpr ⟨⟨xi + yi, Nat.cast_add _ _⟩, ?_⟩ simp only [Subtype.coe_mk, Nat.cast_add, pow_add] exact Submodule.mul_mem_mul hx hy instance evenOdd.gradedMonoid : SetLike.GradedMonoid (evenOdd Q) where one_mem := Submodule.one_le.mp (one_le_evenOdd_zero Q) mul_mem _i _j _p _q hp hq := Submodule.mul_le.mp (evenOdd_mul_le Q _ _) _ hp _ hq /-- A version of `CliffordAlgebra.ι` that maps directly into the graded structure. This is primarily an auxiliary construction used to provide `CliffordAlgebra.gradedAlgebra`. -/ protected def GradedAlgebra.ι : M →ₗ[R] ⨁ i : ZMod 2, evenOdd Q i := DirectSum.lof R (ZMod 2) (fun i => ↥(evenOdd Q i)) 1 ∘ₗ (ι Q).codRestrict _ (ι_mem_evenOdd_one Q) theorem GradedAlgebra.ι_apply (m : M) : GradedAlgebra.ι Q m = DirectSum.of (fun i => ↥(evenOdd Q i)) 1 ⟨ι Q m, ι_mem_evenOdd_one Q m⟩ := rfl nonrec theorem GradedAlgebra.ι_sq_scalar (m : M) : GradedAlgebra.ι Q m * GradedAlgebra.ι Q m = algebraMap R _ (Q m) := by rw [GradedAlgebra.ι_apply Q, DirectSum.of_mul_of, DirectSum.algebraMap_apply] exact DirectSum.of_eq_of_gradedMonoid_eq (Sigma.subtype_ext rfl <\| ι_sq_scalar _ _) theorem GradedAlgebra.lift_ι_eq (i' : ZMod 2) (x' : evenOdd Q i') : lift Q ⟨GradedAlgebra.ι Q, GradedAlgebra.ι_sq_scalar Q⟩ x' = DirectSum.of (fun i => evenOdd Q i) i' x' := by obtain ⟨x', hx'⟩ := x' dsimp only [Subtype.coe_mk, DirectSum.lof_eq_of] induction hx' using Submodule.iSup_induction' with \| mem i x hx => obtain ⟨i, rfl⟩ := i dsimp only [Subtype.coe_mk] at hx induction hx using Submodule.pow_induction_on_left' with \| algebraMap r => rw [AlgHom.commutes, DirectSum.algebraMap_apply]; rfl \| add x y i hx hy ihx ihy => rw [map_add, ihx, ihy, ← AddMonoidHom.map_add]	rfl \| mem_mul m hm i x hx ih => obtain ⟨_, rfl⟩ := hm rw [map_mul, ih, lift_ι_apply, GradedAlgebra.ι_apply Q, DirectSum.of_mul_of] refine DirectSum.of_eq_of_gradedMonoid_eq (Sigma.subtype_ext ?_ ?_) <;> dsimp only [GradedMonoid.mk, Subtype.coe_mk] · rw [Nat.succ_eq_add_one, add_comm, Nat.cast_add, Nat.cast_one] rfl \| zero => rw [map_zero] apply Eq.symm apply DFinsupp.single_eq_zero.mpr; rfl \| add x y hx hy ihx ihy => rw [map_add, ihx, ihy, ← AddMonoidHom.map_add]; rfl /-- The clifford algebra is graded by the even and odd parts. -/ instance gradedAlgebra : GradedAlgebra (evenOdd Q) := GradedAlgebra.ofAlgHom (evenOdd Q) -- while not necessary, the `by apply` makes this elaborate faster (lift Q ⟨by apply GradedAlgebra.ι Q, by apply GradedAlgebra.ι_sq_scalar Q⟩) -- the proof from here onward is mostly similar to the `TensorAlgebra` case, with some extra -- handling for the `iSup` in `evenOdd`. (by ext m dsimp only [LinearMap.comp_apply, AlgHom.toLinearMap_apply, AlgHom.comp_apply, AlgHom.id_apply] rw [lift_ι_apply, GradedAlgebra.ι_apply Q, DirectSum.coeAlgHom_of, Subtype.coe_mk]) (by apply GradedAlgebra.lift_ι_eq Q) theorem iSup_ι_range_eq_top : ⨆ i : ℕ, LinearMap.range (ι Q) ^ i = ⊤ := by rw [← (DirectSum.Decomposition.isInternal (evenOdd Q)).submodule_iSup_eq_top, eq_comm] calc	Mathlib/LinearAlgebra/CliffordAlgebra/Grading.lean	91	122
/- Copyright (c) 2022 Eric Wieser. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Eric Wieser -/ import Mathlib.Algebra.Field.Basic import Mathlib.Algebra.Order.Group.Unbundled.Int import Mathlib.Algebra.Module.NatInt import Mathlib.GroupTheory.QuotientGroup.Defs import Mathlib.Algebra.Group.Subgroup.ZPowers.Basic /-! # Lemmas about quotients in characteristic zero -/ variable {R : Type*} [DivisionRing R] [CharZero R] {p : R} namespace AddSubgroup /-- `z • r` is a multiple of `p` iff `r` is `pk/z` above a multiple of `p`, where `0 ≤ k < \|z\|`. -/ theorem zsmul_mem_zmultiples_iff_exists_sub_div {r : R} {z : ℤ} (hz : z ≠ 0) : z • r ∈ AddSubgroup.zmultiples p ↔ ∃ k : Fin z.natAbs, r - (k : ℕ) • (p / z : R) ∈ AddSubgroup.zmultiples p := by rw [AddSubgroup.mem_zmultiples_iff] simp_rw [AddSubgroup.mem_zmultiples_iff, div_eq_mul_inv, ← smul_mul_assoc, eq_sub_iff_add_eq] have hz' : (z : R) ≠ 0 := Int.cast_ne_zero.mpr hz conv_rhs => simp +singlePass only [← (mul_right_injective₀ hz').eq_iff] simp_rw [← zsmul_eq_mul, smul_add, ← mul_smul_comm, zsmul_eq_mul (z : R)⁻¹, mul_inv_cancel₀ hz', mul_one, ← natCast_zsmul, smul_smul, ← add_smul] constructor · rintro ⟨k, h⟩ simp_rw [← h] refine ⟨⟨(k % z).toNat, ?_⟩, k / z, ?_⟩ · rw [← Int.ofNat_lt, Int.toNat_of_nonneg (Int.emod_nonneg _ hz)] exact (Int.emod_lt_abs _ hz).trans_eq (Int.abs_eq_natAbs _) rw [Fin.val_mk, Int.toNat_of_nonneg (Int.emod_nonneg _ hz)] nth_rewrite 3 [← Int.ediv_add_emod k z] rfl · rintro ⟨k, n, h⟩ exact ⟨_, h⟩	theorem nsmul_mem_zmultiples_iff_exists_sub_div {r : R} {n : ℕ} (hn : n ≠ 0) : n • r ∈ AddSubgroup.zmultiples p ↔ ∃ k : Fin n, r - (k : ℕ) • (p / n : R) ∈ AddSubgroup.zmultiples p := by rw [← natCast_zsmul r, zsmul_mem_zmultiples_iff_exists_sub_div (Int.natCast_ne_zero.mpr hn), Int.cast_natCast]	Mathlib/Algebra/CharZero/Quotient.lean	42	47
/- Copyright (c) 2018 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Analysis.Normed.Lp.lpSpace import Mathlib.Topology.Sets.Compacts /-! # The Kuratowski embedding Any separable metric space can be embedded isometrically in `ℓ^∞(ℕ, ℝ)`. Any partially defined Lipschitz map into `ℓ^∞` can be extended to the whole space. -/ noncomputable section open Set Metric TopologicalSpace NNReal ENNReal lp Function universe u variable {α : Type u} namespace KuratowskiEmbedding /-! ### Any separable metric space can be embedded isometrically in ℓ^∞(ℕ, ℝ) -/ variable {n : ℕ} [MetricSpace α] (x : ℕ → α) (a : α) /-- A metric space can be embedded in `l^∞(ℝ)` via the distances to points in a fixed countable set, if this set is dense. This map is given in `kuratowskiEmbedding`, without density assumptions. -/ def embeddingOfSubset : ℓ^∞(ℕ) := ⟨fun n => dist a (x n) - dist (x 0) (x n), by apply memℓp_infty use dist a (x 0) rintro - ⟨n, rfl⟩ exact abs_dist_sub_le _ _ _⟩ theorem embeddingOfSubset_coe : embeddingOfSubset x a n = dist a (x n) - dist (x 0) (x n) := rfl /-- The embedding map is always a semi-contraction. -/ theorem embeddingOfSubset_dist_le (a b : α) : dist (embeddingOfSubset x a) (embeddingOfSubset x b) ≤ dist a b := by refine lp.norm_le_of_forall_le dist_nonneg fun n => ?_ simp only [lp.coeFn_sub, Pi.sub_apply, embeddingOfSubset_coe, Real.dist_eq] convert abs_dist_sub_le a b (x n) using 2 ring /-- When the reference set is dense, the embedding map is an isometry on its image. -/ theorem embeddingOfSubset_isometry (H : DenseRange x) : Isometry (embeddingOfSubset x) := by refine Isometry.of_dist_eq fun a b => ?_ refine (embeddingOfSubset_dist_le x a b).antisymm (le_of_forall_pos_le_add fun e epos => ?_) -- First step: find n with dist a (x n) < e rcases Metric.mem_closure_range_iff.1 (H a) (e / 2) (half_pos epos) with ⟨n, hn⟩ -- Second step: use the norm control at index n to conclude have C : dist b (x n) - dist a (x n) = embeddingOfSubset x b n - embeddingOfSubset x a n := by simp only [embeddingOfSubset_coe, sub_sub_sub_cancel_right] have := calc dist a b ≤ dist a (x n) + dist (x n) b := dist_triangle _ _ _ _ = 2 * dist a (x n) + (dist b (x n) - dist a (x n)) := by simp [dist_comm]; ring _ ≤ 2 * dist a (x n) + \|dist b (x n) - dist a (x n)\| := by apply_rules [add_le_add_left, le_abs_self] _ ≤ 2 * (e / 2) + \|embeddingOfSubset x b n - embeddingOfSubset x a n\| := by rw [C] gcongr _ ≤ 2 * (e / 2) + dist (embeddingOfSubset x b) (embeddingOfSubset x a) := by gcongr simp only [dist_eq_norm] exact lp.norm_apply_le_norm ENNReal.top_ne_zero (embeddingOfSubset x b - embeddingOfSubset x a) n _ = dist (embeddingOfSubset x b) (embeddingOfSubset x a) + e := by ring simpa [dist_comm] using this /-- Every separable metric space embeds isometrically in `ℓ^∞(ℕ)`. -/ theorem exists_isometric_embedding (α : Type u) [MetricSpace α] [SeparableSpace α] : ∃ f : α → ℓ^∞(ℕ), Isometry f := by rcases (univ : Set α).eq_empty_or_nonempty with h \| h · use fun _ => 0; intro x; exact absurd h (Nonempty.ne_empty ⟨x, mem_univ x⟩) · -- We construct a map x : ℕ → α with dense image rcases h with ⟨basepoint⟩ haveI : Inhabited α := ⟨basepoint⟩ have : ∃ s : Set α, s.Countable ∧ Dense s := exists_countable_dense α rcases this with ⟨S, ⟨S_countable, S_dense⟩⟩ rcases Set.countable_iff_exists_subset_range.1 S_countable with ⟨x, x_range⟩	-- Use embeddingOfSubset to construct the desired isometry exact ⟨embeddingOfSubset x, embeddingOfSubset_isometry x (S_dense.mono x_range)⟩ end KuratowskiEmbedding open TopologicalSpace KuratowskiEmbedding /-- The Kuratowski embedding is an isometric embedding of a separable metric space in `ℓ^∞(ℕ, ℝ)`. -/ def kuratowskiEmbedding (α : Type u) [MetricSpace α] [SeparableSpace α] : α → ℓ^∞(ℕ) := Classical.choose (KuratowskiEmbedding.exists_isometric_embedding α)	Mathlib/Topology/MetricSpace/Kuratowski.lean	91	102
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.ShortComplex.Basic import Mathlib.CategoryTheory.Limits.Shapes.Kernels /-! # Left Homology of short complexes Given a short complex `S : ShortComplex C`, which consists of two composable maps `f : X₁ ⟶ X₂` and `g : X₂ ⟶ X₃` such that `f ≫ g = 0`, we shall define here the "left homology" `S.leftHomology` of `S`. For this, we introduce the notion of "left homology data". Such an `h : S.LeftHomologyData` consists of the data of morphisms `i : K ⟶ X₂` and `π : K ⟶ H` such that `i` identifies `K` with the kernel of `g : X₂ ⟶ X₃`, and that `π` identifies `H` with the cokernel of the induced map `f' : X₁ ⟶ K`. When such a `S.LeftHomologyData` exists, we shall say that `[S.HasLeftHomology]` and we define `S.leftHomology` to be the `H` field of a chosen left homology data. Similarly, we define `S.cycles` to be the `K` field. The dual notion is defined in `RightHomologyData.lean`. In `Homology.lean`, when `S` has two compatible left and right homology data (i.e. they give the same `H` up to a canonical isomorphism), we shall define `[S.HasHomology]` and `S.homology`. -/ namespace CategoryTheory open Category Limits namespace ShortComplex variable {C : Type*} [Category C] [HasZeroMorphisms C] (S : ShortComplex C) {S₁ S₂ S₃ : ShortComplex C} /-- A left homology data for a short complex `S` consists of morphisms `i : K ⟶ S.X₂` and `π : K ⟶ H` such that `i` identifies `K` to the kernel of `g : S.X₂ ⟶ S.X₃`, and that `π` identifies `H` to the cokernel of the induced map `f' : S.X₁ ⟶ K` -/ structure LeftHomologyData where /-- a choice of kernel of `S.g : S.X₂ ⟶ S.X₃` -/ K : C /-- a choice of cokernel of the induced morphism `S.f' : S.X₁ ⟶ K` -/ H : C /-- the inclusion of cycles in `S.X₂` -/ i : K ⟶ S.X₂ /-- the projection from cycles to the (left) homology -/ π : K ⟶ H /-- the kernel condition for `i` -/ wi : i ≫ S.g = 0 /-- `i : K ⟶ S.X₂` is a kernel of `g : S.X₂ ⟶ S.X₃` -/ hi : IsLimit (KernelFork.ofι i wi) /-- the cokernel condition for `π` -/ wπ : hi.lift (KernelFork.ofι _ S.zero) ≫ π = 0 /-- `π : K ⟶ H` is a cokernel of the induced morphism `S.f' : S.X₁ ⟶ K` -/ hπ : IsColimit (CokernelCofork.ofπ π wπ) initialize_simps_projections LeftHomologyData (-hi, -hπ) namespace LeftHomologyData /-- The chosen kernels and cokernels of the limits API give a `LeftHomologyData` -/ @[simps] noncomputable def ofHasKernelOfHasCokernel [HasKernel S.g] [HasCokernel (kernel.lift S.g S.f S.zero)] : S.LeftHomologyData where K := kernel S.g H := cokernel (kernel.lift S.g S.f S.zero) i := kernel.ι _ π := cokernel.π _ wi := kernel.condition _ hi := kernelIsKernel _ wπ := cokernel.condition _ hπ := cokernelIsCokernel _ attribute [reassoc (attr := simp)] wi wπ variable {S} variable (h : S.LeftHomologyData) {A : C} instance : Mono h.i := ⟨fun _ _ => Fork.IsLimit.hom_ext h.hi⟩ instance : Epi h.π := ⟨fun _ _ => Cofork.IsColimit.hom_ext h.hπ⟩ /-- Any morphism `k : A ⟶ S.X₂` that is a cycle (i.e. `k ≫ S.g = 0`) lifts to a morphism `A ⟶ K` -/ def liftK (k : A ⟶ S.X₂) (hk : k ≫ S.g = 0) : A ⟶ h.K := h.hi.lift (KernelFork.ofι k hk) @[reassoc (attr := simp)] lemma liftK_i (k : A ⟶ S.X₂) (hk : k ≫ S.g = 0) : h.liftK k hk ≫ h.i = k := h.hi.fac _ WalkingParallelPair.zero /-- The (left) homology class `A ⟶ H` attached to a cycle `k : A ⟶ S.X₂` -/ @[simp] def liftH (k : A ⟶ S.X₂) (hk : k ≫ S.g = 0) : A ⟶ h.H := h.liftK k hk ≫ h.π /-- Given `h : LeftHomologyData S`, this is morphism `S.X₁ ⟶ h.K` induced by `S.f : S.X₁ ⟶ S.X₂` and the fact that `h.K` is a kernel of `S.g : S.X₂ ⟶ S.X₃`. -/ def f' : S.X₁ ⟶ h.K := h.liftK S.f S.zero @[reassoc (attr := simp)] lemma f'_i : h.f' ≫ h.i = S.f := liftK_i _ _ _ @[reassoc (attr := simp)] lemma f'_π : h.f' ≫ h.π = 0 := h.wπ @[reassoc] lemma liftK_π_eq_zero_of_boundary (k : A ⟶ S.X₂) (x : A ⟶ S.X₁) (hx : k = x ≫ S.f) : h.liftK k (by rw [hx, assoc, S.zero, comp_zero]) ≫ h.π = 0 := by rw [show 0 = (x ≫ h.f') ≫ h.π by simp] congr 1 simp only [← cancel_mono h.i, hx, liftK_i, assoc, f'_i] /-- For `h : S.LeftHomologyData`, this is a restatement of `h.hπ`, saying that `π : h.K ⟶ h.H` is a cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ def hπ' : IsColimit (CokernelCofork.ofπ h.π h.f'_π) := h.hπ /-- The morphism `H ⟶ A` induced by a morphism `k : K ⟶ A` such that `f' ≫ k = 0` -/ def descH (k : h.K ⟶ A) (hk : h.f' ≫ k = 0) : h.H ⟶ A := h.hπ.desc (CokernelCofork.ofπ k hk) @[reassoc (attr := simp)] lemma π_descH (k : h.K ⟶ A) (hk : h.f' ≫ k = 0) : h.π ≫ h.descH k hk = k := h.hπ.fac (CokernelCofork.ofπ k hk) WalkingParallelPair.one lemma isIso_i (hg : S.g = 0) : IsIso h.i := ⟨h.liftK (𝟙 S.X₂) (by rw [hg, id_comp]), by simp only [← cancel_mono h.i, id_comp, assoc, liftK_i, comp_id], liftK_i _ _ _⟩ lemma isIso_π (hf : S.f = 0) : IsIso h.π := by have ⟨φ, hφ⟩ := CokernelCofork.IsColimit.desc' h.hπ' (𝟙 _) (by rw [← cancel_mono h.i, comp_id, f'_i, zero_comp, hf]) dsimp at hφ exact ⟨φ, hφ, by rw [← cancel_epi h.π, reassoc_of% hφ, comp_id]⟩ variable (S) /-- When the second map `S.g` is zero, this is the left homology data on `S` given by any colimit cokernel cofork of `S.f` -/ @[simps] def ofIsColimitCokernelCofork (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : S.LeftHomologyData where K := S.X₂ H := c.pt i := 𝟙 _ π := c.π wi := by rw [id_comp, hg] hi := KernelFork.IsLimit.ofId _ hg wπ := CokernelCofork.condition _ hπ := IsColimit.ofIsoColimit hc (Cofork.ext (Iso.refl _)) @[simp] lemma ofIsColimitCokernelCofork_f' (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : (ofIsColimitCokernelCofork S hg c hc).f' = S.f := by rw [← cancel_mono (ofIsColimitCokernelCofork S hg c hc).i, f'_i, ofIsColimitCokernelCofork_i] dsimp rw [comp_id] /-- When the second map `S.g` is zero, this is the left homology data on `S` given by the chosen `cokernel S.f` -/ @[simps!] noncomputable def ofHasCokernel [HasCokernel S.f] (hg : S.g = 0) : S.LeftHomologyData := ofIsColimitCokernelCofork S hg _ (cokernelIsCokernel _) /-- When the first map `S.f` is zero, this is the left homology data on `S` given by any limit kernel fork of `S.g` -/ @[simps] def ofIsLimitKernelFork (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) : S.LeftHomologyData where K := c.pt H := c.pt i := c.ι π := 𝟙 _ wi := KernelFork.condition _ hi := IsLimit.ofIsoLimit hc (Fork.ext (Iso.refl _)) wπ := Fork.IsLimit.hom_ext hc (by dsimp simp only [comp_id, zero_comp, Fork.IsLimit.lift_ι, Fork.ι_ofι, hf]) hπ := CokernelCofork.IsColimit.ofId _ (Fork.IsLimit.hom_ext hc (by dsimp simp only [comp_id, zero_comp, Fork.IsLimit.lift_ι, Fork.ι_ofι, hf])) @[simp] lemma ofIsLimitKernelFork_f' (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) : (ofIsLimitKernelFork S hf c hc).f' = 0 := by rw [← cancel_mono (ofIsLimitKernelFork S hf c hc).i, f'_i, hf, zero_comp] /-- When the first map `S.f` is zero, this is the left homology data on `S` given by the chosen `kernel S.g` -/ @[simp] noncomputable def ofHasKernel [HasKernel S.g] (hf : S.f = 0) : S.LeftHomologyData := ofIsLimitKernelFork S hf _ (kernelIsKernel _) /-- When both `S.f` and `S.g` are zero, the middle object `S.X₂` gives a left homology data on S -/ @[simps] def ofZeros (hf : S.f = 0) (hg : S.g = 0) : S.LeftHomologyData where K := S.X₂ H := S.X₂ i := 𝟙 _ π := 𝟙 _ wi := by rw [id_comp, hg] hi := KernelFork.IsLimit.ofId _ hg wπ := by change S.f ≫ 𝟙 _ = 0 simp only [hf, zero_comp] hπ := CokernelCofork.IsColimit.ofId _ hf @[simp] lemma ofZeros_f' (hf : S.f = 0) (hg : S.g = 0) : (ofZeros S hf hg).f' = 0 := by rw [← cancel_mono ((ofZeros S hf hg).i), zero_comp, f'_i, hf] end LeftHomologyData /-- A short complex `S` has left homology when there exists a `S.LeftHomologyData` -/ class HasLeftHomology : Prop where condition : Nonempty S.LeftHomologyData /-- A chosen `S.LeftHomologyData` for a short complex `S` that has left homology -/ noncomputable def leftHomologyData [S.HasLeftHomology] : S.LeftHomologyData := HasLeftHomology.condition.some variable {S} namespace HasLeftHomology lemma mk' (h : S.LeftHomologyData) : HasLeftHomology S := ⟨Nonempty.intro h⟩ instance of_hasKernel_of_hasCokernel [HasKernel S.g] [HasCokernel (kernel.lift S.g S.f S.zero)] : S.HasLeftHomology := HasLeftHomology.mk' (LeftHomologyData.ofHasKernelOfHasCokernel S) instance of_hasCokernel {X Y : C} (f : X ⟶ Y) (Z : C) [HasCokernel f] : (ShortComplex.mk f (0 : Y ⟶ Z) comp_zero).HasLeftHomology := HasLeftHomology.mk' (LeftHomologyData.ofHasCokernel _ rfl) instance of_hasKernel {Y Z : C} (g : Y ⟶ Z) (X : C) [HasKernel g] : (ShortComplex.mk (0 : X ⟶ Y) g zero_comp).HasLeftHomology := HasLeftHomology.mk' (LeftHomologyData.ofHasKernel _ rfl) instance of_zeros (X Y Z : C) : (ShortComplex.mk (0 : X ⟶ Y) (0 : Y ⟶ Z) zero_comp).HasLeftHomology := HasLeftHomology.mk' (LeftHomologyData.ofZeros _ rfl rfl) end HasLeftHomology section variable (φ : S₁ ⟶ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) /-- Given left homology data `h₁` and `h₂` for two short complexes `S₁` and `S₂`, a `LeftHomologyMapData` for a morphism `φ : S₁ ⟶ S₂` consists of a description of the induced morphisms on the `K` (cycles) and `H` (left homology) fields of `h₁` and `h₂`. -/ structure LeftHomologyMapData where /-- the induced map on cycles -/ φK : h₁.K ⟶ h₂.K /-- the induced map on left homology -/ φH : h₁.H ⟶ h₂.H /-- commutation with `i` -/ commi : φK ≫ h₂.i = h₁.i ≫ φ.τ₂ := by aesop_cat /-- commutation with `f'` -/ commf' : h₁.f' ≫ φK = φ.τ₁ ≫ h₂.f' := by aesop_cat /-- commutation with `π` -/ commπ : h₁.π ≫ φH = φK ≫ h₂.π := by aesop_cat namespace LeftHomologyMapData attribute [reassoc (attr := simp)] commi commf' commπ /-- The left homology map data associated to the zero morphism between two short complexes. -/ @[simps] def zero (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : LeftHomologyMapData 0 h₁ h₂ where φK := 0 φH := 0 /-- The left homology map data associated to the identity morphism of a short complex. -/ @[simps] def id (h : S.LeftHomologyData) : LeftHomologyMapData (𝟙 S) h h where φK := 𝟙 _ φH := 𝟙 _ /-- The composition of left homology map data. -/ @[simps] def comp {φ : S₁ ⟶ S₂} {φ' : S₂ ⟶ S₃} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} {h₃ : S₃.LeftHomologyData} (ψ : LeftHomologyMapData φ h₁ h₂) (ψ' : LeftHomologyMapData φ' h₂ h₃) : LeftHomologyMapData (φ ≫ φ') h₁ h₃ where φK := ψ.φK ≫ ψ'.φK φH := ψ.φH ≫ ψ'.φH instance : Subsingleton (LeftHomologyMapData φ h₁ h₂) := ⟨fun ψ₁ ψ₂ => by have hK : ψ₁.φK = ψ₂.φK := by rw [← cancel_mono h₂.i, commi, commi] have hH : ψ₁.φH = ψ₂.φH := by rw [← cancel_epi h₁.π, commπ, commπ, hK] cases ψ₁ cases ψ₂ congr⟩ instance : Inhabited (LeftHomologyMapData φ h₁ h₂) := ⟨by let φK : h₁.K ⟶ h₂.K := h₂.liftK (h₁.i ≫ φ.τ₂) (by rw [assoc, φ.comm₂₃, h₁.wi_assoc, zero_comp]) have commf' : h₁.f' ≫ φK = φ.τ₁ ≫ h₂.f' := by rw [← cancel_mono h₂.i, assoc, assoc, LeftHomologyData.liftK_i, LeftHomologyData.f'_i_assoc, LeftHomologyData.f'_i, φ.comm₁₂] let φH : h₁.H ⟶ h₂.H := h₁.descH (φK ≫ h₂.π) (by rw [reassoc_of% commf', h₂.f'_π, comp_zero]) exact ⟨φK, φH, by simp [φK], commf', by simp [φH]⟩⟩ instance : Unique (LeftHomologyMapData φ h₁ h₂) := Unique.mk' _ variable {φ h₁ h₂} lemma congr_φH {γ₁ γ₂ : LeftHomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.φH = γ₂.φH := by rw [eq] lemma congr_φK {γ₁ γ₂ : LeftHomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.φK = γ₂.φK := by rw [eq] /-- When `S₁.f`, `S₁.g`, `S₂.f` and `S₂.g` are all zero, the action on left homology of a morphism `φ : S₁ ⟶ S₂` is given by the action `φ.τ₂` on the middle objects. -/ @[simps] def ofZeros (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (hg₁ : S₁.g = 0) (hf₂ : S₂.f = 0) (hg₂ : S₂.g = 0) : LeftHomologyMapData φ (LeftHomologyData.ofZeros S₁ hf₁ hg₁) (LeftHomologyData.ofZeros S₂ hf₂ hg₂) where φK := φ.τ₂ φH := φ.τ₂ /-- When `S₁.g` and `S₂.g` are zero and we have chosen colimit cokernel coforks `c₁` and `c₂` for `S₁.f` and `S₂.f` respectively, the action on left homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `φ.τ₂ ≫ c₂.π = c₁.π ≫ f`. -/ @[simps] def ofIsColimitCokernelCofork (φ : S₁ ⟶ S₂) (hg₁ : S₁.g = 0) (c₁ : CokernelCofork S₁.f) (hc₁ : IsColimit c₁) (hg₂ : S₂.g = 0) (c₂ : CokernelCofork S₂.f) (hc₂ : IsColimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : φ.τ₂ ≫ c₂.π = c₁.π ≫ f) : LeftHomologyMapData φ (LeftHomologyData.ofIsColimitCokernelCofork S₁ hg₁ c₁ hc₁) (LeftHomologyData.ofIsColimitCokernelCofork S₂ hg₂ c₂ hc₂) where φK := φ.τ₂ φH := f commπ := comm.symm commf' := by simp only [LeftHomologyData.ofIsColimitCokernelCofork_f', φ.comm₁₂] /-- When `S₁.f` and `S₂.f` are zero and we have chosen limit kernel forks `c₁` and `c₂` for `S₁.g` and `S₂.g` respectively, the action on left homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι`. -/ @[simps] def ofIsLimitKernelFork (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (c₁ : KernelFork S₁.g) (hc₁ : IsLimit c₁) (hf₂ : S₂.f = 0) (c₂ : KernelFork S₂.g) (hc₂ : IsLimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι) : LeftHomologyMapData φ (LeftHomologyData.ofIsLimitKernelFork S₁ hf₁ c₁ hc₁) (LeftHomologyData.ofIsLimitKernelFork S₂ hf₂ c₂ hc₂) where φK := f φH := f commi := comm.symm variable (S) /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the left homology map data (for the identity of `S`) which relates the left homology data `ofZeros` and `ofIsColimitCokernelCofork`. -/ @[simps] def compatibilityOfZerosOfIsColimitCokernelCofork (hf : S.f = 0) (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : LeftHomologyMapData (𝟙 S) (LeftHomologyData.ofZeros S hf hg) (LeftHomologyData.ofIsColimitCokernelCofork S hg c hc) where φK := 𝟙 _ φH := c.π /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the left homology map data (for the identity of `S`) which relates the left homology data `LeftHomologyData.ofIsLimitKernelFork` and `ofZeros` . -/ @[simps] def compatibilityOfZerosOfIsLimitKernelFork (hf : S.f = 0) (hg : S.g = 0) (c : KernelFork S.g) (hc : IsLimit c) : LeftHomologyMapData (𝟙 S) (LeftHomologyData.ofIsLimitKernelFork S hf c hc) (LeftHomologyData.ofZeros S hf hg) where φK := c.ι φH := c.ι end LeftHomologyMapData end section variable (S) variable [S.HasLeftHomology] /-- The left homology of a short complex, given by the `H` field of a chosen left homology data. -/ noncomputable def leftHomology : C := S.leftHomologyData.H -- `S.leftHomology` is the simp normal form. @[simp] lemma leftHomologyData_H : S.leftHomologyData.H = S.leftHomology := rfl /-- The cycles of a short complex, given by the `K` field of a chosen left homology data. -/ noncomputable def cycles : C := S.leftHomologyData.K /-- The "homology class" map `S.cycles ⟶ S.leftHomology`. -/ noncomputable def leftHomologyπ : S.cycles ⟶ S.leftHomology := S.leftHomologyData.π /-- The inclusion `S.cycles ⟶ S.X₂`. -/ noncomputable def iCycles : S.cycles ⟶ S.X₂ := S.leftHomologyData.i /-- The "boundaries" map `S.X₁ ⟶ S.cycles`. (Note that in this homology API, we make no use of the "image" of this morphism, which under some categorical assumptions would be a subobject of `S.X₂` contained in `S.cycles`.) -/ noncomputable def toCycles : S.X₁ ⟶ S.cycles := S.leftHomologyData.f' @[reassoc (attr := simp)] lemma iCycles_g : S.iCycles ≫ S.g = 0 := S.leftHomologyData.wi @[reassoc (attr := simp)] lemma toCycles_i : S.toCycles ≫ S.iCycles = S.f := S.leftHomologyData.f'_i instance : Mono S.iCycles := by dsimp only [iCycles] infer_instance instance : Epi S.leftHomologyπ := by dsimp only [leftHomologyπ] infer_instance lemma leftHomology_ext_iff {A : C} (f₁ f₂ : S.leftHomology ⟶ A) : f₁ = f₂ ↔ S.leftHomologyπ ≫ f₁ = S.leftHomologyπ ≫ f₂ := by rw [cancel_epi] @[ext] lemma leftHomology_ext {A : C} (f₁ f₂ : S.leftHomology ⟶ A) (h : S.leftHomologyπ ≫ f₁ = S.leftHomologyπ ≫ f₂) : f₁ = f₂ := by simpa only [leftHomology_ext_iff] using h lemma cycles_ext_iff {A : C} (f₁ f₂ : A ⟶ S.cycles) : f₁ = f₂ ↔ f₁ ≫ S.iCycles = f₂ ≫ S.iCycles := by rw [cancel_mono] @[ext] lemma cycles_ext {A : C} (f₁ f₂ : A ⟶ S.cycles) (h : f₁ ≫ S.iCycles = f₂ ≫ S.iCycles) : f₁ = f₂ := by simpa only [cycles_ext_iff] using h lemma isIso_iCycles (hg : S.g = 0) : IsIso S.iCycles := LeftHomologyData.isIso_i _ hg /-- When `S.g = 0`, this is the canonical isomorphism `S.cycles ≅ S.X₂` induced by `S.iCycles`. -/ @[simps! hom] noncomputable def cyclesIsoX₂ (hg : S.g = 0) : S.cycles ≅ S.X₂ := by have := S.isIso_iCycles hg exact asIso S.iCycles @[reassoc (attr := simp)] lemma cyclesIsoX₂_hom_inv_id (hg : S.g = 0) : S.iCycles ≫ (S.cyclesIsoX₂ hg).inv = 𝟙 _ := (S.cyclesIsoX₂ hg).hom_inv_id @[reassoc (attr := simp)] lemma cyclesIsoX₂_inv_hom_id (hg : S.g = 0) : (S.cyclesIsoX₂ hg).inv ≫ S.iCycles = 𝟙 _ := (S.cyclesIsoX₂ hg).inv_hom_id lemma isIso_leftHomologyπ (hf : S.f = 0) : IsIso S.leftHomologyπ := LeftHomologyData.isIso_π _ hf /-- When `S.f = 0`, this is the canonical isomorphism `S.cycles ≅ S.leftHomology` induced by `S.leftHomologyπ`. -/ @[simps! hom] noncomputable def cyclesIsoLeftHomology (hf : S.f = 0) : S.cycles ≅ S.leftHomology := by have := S.isIso_leftHomologyπ hf exact asIso S.leftHomologyπ @[reassoc (attr := simp)] lemma cyclesIsoLeftHomology_hom_inv_id (hf : S.f = 0) : S.leftHomologyπ ≫ (S.cyclesIsoLeftHomology hf).inv = 𝟙 _ := (S.cyclesIsoLeftHomology hf).hom_inv_id @[reassoc (attr := simp)] lemma cyclesIsoLeftHomology_inv_hom_id (hf : S.f = 0) : (S.cyclesIsoLeftHomology hf).inv ≫ S.leftHomologyπ = 𝟙 _ := (S.cyclesIsoLeftHomology hf).inv_hom_id end section variable (φ : S₁ ⟶ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) /-- The (unique) left homology map data associated to a morphism of short complexes that are both equipped with left homology data. -/ def leftHomologyMapData : LeftHomologyMapData φ h₁ h₂ := default /-- Given a morphism `φ : S₁ ⟶ S₂` of short complexes and left homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced left homology map `h₁.H ⟶ h₁.H`. -/ def leftHomologyMap' : h₁.H ⟶ h₂.H := (leftHomologyMapData φ _ _).φH /-- Given a morphism `φ : S₁ ⟶ S₂` of short complexes and left homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced morphism `h₁.K ⟶ h₁.K` on cycles. -/ def cyclesMap' : h₁.K ⟶ h₂.K := (leftHomologyMapData φ _ _).φK @[reassoc (attr := simp)] lemma cyclesMap'_i : cyclesMap' φ h₁ h₂ ≫ h₂.i = h₁.i ≫ φ.τ₂ := LeftHomologyMapData.commi _ @[reassoc (attr := simp)] lemma f'_cyclesMap' : h₁.f' ≫ cyclesMap' φ h₁ h₂ = φ.τ₁ ≫ h₂.f' := by simp only [← cancel_mono h₂.i, assoc, φ.comm₁₂, cyclesMap'_i, LeftHomologyData.f'_i_assoc, LeftHomologyData.f'_i] @[reassoc (attr := simp)] lemma leftHomologyπ_naturality' : h₁.π ≫ leftHomologyMap' φ h₁ h₂ = cyclesMap' φ h₁ h₂ ≫ h₂.π := LeftHomologyMapData.commπ _ end section variable [HasLeftHomology S₁] [HasLeftHomology S₂] (φ : S₁ ⟶ S₂) /-- The (left) homology map `S₁.leftHomology ⟶ S₂.leftHomology` induced by a morphism `S₁ ⟶ S₂` of short complexes. -/ noncomputable def leftHomologyMap : S₁.leftHomology ⟶ S₂.leftHomology := leftHomologyMap' φ _ _ /-- The morphism `S₁.cycles ⟶ S₂.cycles` induced by a morphism `S₁ ⟶ S₂` of short complexes. -/ noncomputable def cyclesMap : S₁.cycles ⟶ S₂.cycles := cyclesMap' φ _ _ @[reassoc (attr := simp)] lemma cyclesMap_i : cyclesMap φ ≫ S₂.iCycles = S₁.iCycles ≫ φ.τ₂ := cyclesMap'_i _ _ _ @[reassoc (attr := simp)] lemma toCycles_naturality : S₁.toCycles ≫ cyclesMap φ = φ.τ₁ ≫ S₂.toCycles := f'_cyclesMap' _ _ _ @[reassoc (attr := simp)] lemma leftHomologyπ_naturality : S₁.leftHomologyπ ≫ leftHomologyMap φ = cyclesMap φ ≫ S₂.leftHomologyπ := leftHomologyπ_naturality' _ _ _ end namespace LeftHomologyMapData variable {φ : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (γ : LeftHomologyMapData φ h₁ h₂) lemma leftHomologyMap'_eq : leftHomologyMap' φ h₁ h₂ = γ.φH := LeftHomologyMapData.congr_φH (Subsingleton.elim _ _) lemma cyclesMap'_eq : cyclesMap' φ h₁ h₂ = γ.φK := LeftHomologyMapData.congr_φK (Subsingleton.elim _ _) end LeftHomologyMapData @[simp] lemma leftHomologyMap'_id (h : S.LeftHomologyData) : leftHomologyMap' (𝟙 S) h h = 𝟙 _ := (LeftHomologyMapData.id h).leftHomologyMap'_eq @[simp] lemma cyclesMap'_id (h : S.LeftHomologyData) : cyclesMap' (𝟙 S) h h = 𝟙 _ := (LeftHomologyMapData.id h).cyclesMap'_eq variable (S) @[simp] lemma leftHomologyMap_id [HasLeftHomology S] : leftHomologyMap (𝟙 S) = 𝟙 _ := leftHomologyMap'_id _ @[simp] lemma cyclesMap_id [HasLeftHomology S] : cyclesMap (𝟙 S) = 𝟙 _ := cyclesMap'_id _ @[simp] lemma leftHomologyMap'_zero (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : leftHomologyMap' 0 h₁ h₂ = 0 := (LeftHomologyMapData.zero h₁ h₂).leftHomologyMap'_eq @[simp] lemma cyclesMap'_zero (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : cyclesMap' 0 h₁ h₂ = 0 := (LeftHomologyMapData.zero h₁ h₂).cyclesMap'_eq variable (S₁ S₂) @[simp] lemma leftHomologyMap_zero [HasLeftHomology S₁] [HasLeftHomology S₂] : leftHomologyMap (0 : S₁ ⟶ S₂) = 0 := leftHomologyMap'_zero _ _ @[simp] lemma cyclesMap_zero [HasLeftHomology S₁] [HasLeftHomology S₂] : cyclesMap (0 : S₁ ⟶ S₂) = 0 := cyclesMap'_zero _ _ variable {S₁ S₂} @[reassoc] lemma leftHomologyMap'_comp (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) (h₃ : S₃.LeftHomologyData) : leftHomologyMap' (φ₁ ≫ φ₂) h₁ h₃ = leftHomologyMap' φ₁ h₁ h₂ ≫ leftHomologyMap' φ₂ h₂ h₃ := by let γ₁ := leftHomologyMapData φ₁ h₁ h₂ let γ₂ := leftHomologyMapData φ₂ h₂ h₃ rw [γ₁.leftHomologyMap'_eq, γ₂.leftHomologyMap'_eq, (γ₁.comp γ₂).leftHomologyMap'_eq, LeftHomologyMapData.comp_φH] @[reassoc] lemma cyclesMap'_comp (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) (h₃ : S₃.LeftHomologyData) : cyclesMap' (φ₁ ≫ φ₂) h₁ h₃ = cyclesMap' φ₁ h₁ h₂ ≫ cyclesMap' φ₂ h₂ h₃ := by let γ₁ := leftHomologyMapData φ₁ h₁ h₂ let γ₂ := leftHomologyMapData φ₂ h₂ h₃ rw [γ₁.cyclesMap'_eq, γ₂.cyclesMap'_eq, (γ₁.comp γ₂).cyclesMap'_eq, LeftHomologyMapData.comp_φK] @[reassoc] lemma leftHomologyMap_comp [HasLeftHomology S₁] [HasLeftHomology S₂] [HasLeftHomology S₃] (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) : leftHomologyMap (φ₁ ≫ φ₂) = leftHomologyMap φ₁ ≫ leftHomologyMap φ₂ := leftHomologyMap'_comp _ _ _ _ _ @[reassoc] lemma cyclesMap_comp [HasLeftHomology S₁] [HasLeftHomology S₂] [HasLeftHomology S₃] (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) : cyclesMap (φ₁ ≫ φ₂) = cyclesMap φ₁ ≫ cyclesMap φ₂ := cyclesMap'_comp _ _ _ _ _ attribute [simp] leftHomologyMap_comp cyclesMap_comp /-- An isomorphism of short complexes `S₁ ≅ S₂` induces an isomorphism on the `H` fields of left homology data of `S₁` and `S₂`. -/ @[simps] def leftHomologyMapIso' (e : S₁ ≅ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : h₁.H ≅ h₂.H where hom := leftHomologyMap' e.hom h₁ h₂ inv := leftHomologyMap' e.inv h₂ h₁ hom_inv_id := by rw [← leftHomologyMap'_comp, e.hom_inv_id, leftHomologyMap'_id] inv_hom_id := by rw [← leftHomologyMap'_comp, e.inv_hom_id, leftHomologyMap'_id] instance isIso_leftHomologyMap'_of_isIso (φ : S₁ ⟶ S₂) [IsIso φ] (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : IsIso (leftHomologyMap' φ h₁ h₂) := (inferInstance : IsIso (leftHomologyMapIso' (asIso φ) h₁ h₂).hom) /-- An isomorphism of short complexes `S₁ ≅ S₂` induces an isomorphism on the `K` fields of left homology data of `S₁` and `S₂`. -/ @[simps] def cyclesMapIso' (e : S₁ ≅ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : h₁.K ≅ h₂.K where hom := cyclesMap' e.hom h₁ h₂ inv := cyclesMap' e.inv h₂ h₁ hom_inv_id := by rw [← cyclesMap'_comp, e.hom_inv_id, cyclesMap'_id] inv_hom_id := by rw [← cyclesMap'_comp, e.inv_hom_id, cyclesMap'_id] instance isIso_cyclesMap'_of_isIso (φ : S₁ ⟶ S₂) [IsIso φ] (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : IsIso (cyclesMap' φ h₁ h₂) := (inferInstance : IsIso (cyclesMapIso' (asIso φ) h₁ h₂).hom) /-- The isomorphism `S₁.leftHomology ≅ S₂.leftHomology` induced by an isomorphism of short complexes `S₁ ≅ S₂`. -/ @[simps] noncomputable def leftHomologyMapIso (e : S₁ ≅ S₂) [S₁.HasLeftHomology] [S₂.HasLeftHomology] : S₁.leftHomology ≅ S₂.leftHomology where hom := leftHomologyMap e.hom inv := leftHomologyMap e.inv hom_inv_id := by rw [← leftHomologyMap_comp, e.hom_inv_id, leftHomologyMap_id] inv_hom_id := by rw [← leftHomologyMap_comp, e.inv_hom_id, leftHomologyMap_id] instance isIso_leftHomologyMap_of_iso (φ : S₁ ⟶ S₂) [IsIso φ] [S₁.HasLeftHomology] [S₂.HasLeftHomology] : IsIso (leftHomologyMap φ) := (inferInstance : IsIso (leftHomologyMapIso (asIso φ)).hom) /-- The isomorphism `S₁.cycles ≅ S₂.cycles` induced by an isomorphism of short complexes `S₁ ≅ S₂`. -/ @[simps] noncomputable def cyclesMapIso (e : S₁ ≅ S₂) [S₁.HasLeftHomology] [S₂.HasLeftHomology] : S₁.cycles ≅ S₂.cycles where hom := cyclesMap e.hom inv := cyclesMap e.inv hom_inv_id := by rw [← cyclesMap_comp, e.hom_inv_id, cyclesMap_id] inv_hom_id := by rw [← cyclesMap_comp, e.inv_hom_id, cyclesMap_id] instance isIso_cyclesMap_of_iso (φ : S₁ ⟶ S₂) [IsIso φ] [S₁.HasLeftHomology] [S₂.HasLeftHomology] : IsIso (cyclesMap φ) := (inferInstance : IsIso (cyclesMapIso (asIso φ)).hom) variable {S} namespace LeftHomologyData variable (h : S.LeftHomologyData) [S.HasLeftHomology] /-- The isomorphism `S.leftHomology ≅ h.H` induced by a left homology data `h` for a short complex `S`. -/ noncomputable def leftHomologyIso : S.leftHomology ≅ h.H := leftHomologyMapIso' (Iso.refl _) _ _ /-- The isomorphism `S.cycles ≅ h.K` induced by a left homology data `h` for a short complex `S`. -/ noncomputable def cyclesIso : S.cycles ≅ h.K := cyclesMapIso' (Iso.refl _) _ _ @[reassoc (attr := simp)] lemma cyclesIso_hom_comp_i : h.cyclesIso.hom ≫ h.i = S.iCycles := by dsimp [iCycles, LeftHomologyData.cyclesIso] simp only [cyclesMap'_i, id_τ₂, comp_id] @[reassoc (attr := simp)] lemma cyclesIso_inv_comp_iCycles : h.cyclesIso.inv ≫ S.iCycles = h.i := by simp only [← h.cyclesIso_hom_comp_i, Iso.inv_hom_id_assoc] @[reassoc (attr := simp)] lemma leftHomologyπ_comp_leftHomologyIso_hom : S.leftHomologyπ ≫ h.leftHomologyIso.hom = h.cyclesIso.hom ≫ h.π := by dsimp only [leftHomologyπ, leftHomologyIso, cyclesIso, leftHomologyMapIso', cyclesMapIso', Iso.refl] rw [← leftHomologyπ_naturality'] @[reassoc (attr := simp)] lemma π_comp_leftHomologyIso_inv : h.π ≫ h.leftHomologyIso.inv = h.cyclesIso.inv ≫ S.leftHomologyπ := by simp only [← cancel_epi h.cyclesIso.hom, ← cancel_mono h.leftHomologyIso.hom, assoc, Iso.inv_hom_id, comp_id, Iso.hom_inv_id_assoc, LeftHomologyData.leftHomologyπ_comp_leftHomologyIso_hom] end LeftHomologyData namespace LeftHomologyMapData variable {φ : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData}	(γ : LeftHomologyMapData φ h₁ h₂) lemma leftHomologyMap_eq [S₁.HasLeftHomology] [S₂.HasLeftHomology] : leftHomologyMap φ = h₁.leftHomologyIso.hom ≫ γ.φH ≫ h₂.leftHomologyIso.inv := by dsimp [LeftHomologyData.leftHomologyIso, leftHomologyMapIso'] rw [← γ.leftHomologyMap'_eq, ← leftHomologyMap'_comp,	Mathlib/Algebra/Homology/ShortComplex/LeftHomology.lean	735	740
/- Copyright (c) 2019 Abhimanyu Pallavi Sudhir. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Abhimanyu Pallavi Sudhir, Yury Kudryashov -/ import Mathlib.Algebra.Field.Defs import Mathlib.Algebra.Order.Group.Unbundled.Abs import Mathlib.Order.Filter.Ring import Mathlib.Order.Filter.Ultrafilter.Defs /-! # Ultraproducts If `φ` is an ultrafilter, then the space of germs of functions `f : α → β` at `φ` is called the ultraproduct. In this file we prove properties of ultraproducts that rely on `φ` being an ultrafilter. Definitions and properties that work for any filter should go to `Order.Filter.Germ`. ## Tags ultrafilter, ultraproduct -/ universe u v variable {α : Type u} {β : Type v} {φ : Ultrafilter α} namespace Filter local notation3 "∀* "(...)", "r:(scoped p => Filter.Eventually p (Ultrafilter.toFilter φ)) => r namespace Germ open Ultrafilter local notation "β" => Germ (φ : Filter α) β instance instGroupWithZero [GroupWithZero β] : GroupWithZero β where __ := instDivInvMonoid __ := instMonoidWithZero mul_inv_cancel f := inductionOn f fun f hf ↦ coe_eq.2 <\| (φ.em fun y ↦ f y = 0).elim (fun H ↦ (hf <\| coe_eq.2 H).elim) fun H ↦ H.mono fun _ ↦ mul_inv_cancel₀ inv_zero := coe_eq.2 <\| by simp only [Function.comp_def, inv_zero, EventuallyEq.rfl] instance instDivisionSemiring [DivisionSemiring β] : DivisionSemiring β* where toSemiring := instSemiring __ := instGroupWithZero nnqsmul := _ nnqsmul_def := fun _ _ => rfl instance instDivisionRing [DivisionRing β] : DivisionRing β* where __ := instRing __ := instDivisionSemiring qsmul := _ qsmul_def := fun _ _ => rfl instance instSemifield [Semifield β] : Semifield β* where __ := instCommSemiring __ := instDivisionSemiring instance instField [Field β] : Field β* where __ := instCommRing __ := instDivisionRing theorem coe_lt [Preorder β] {f g : α → β} : (f : β) < g ↔ ∀ x, f x < g x := by simp only [lt_iff_le_not_le, eventually_and, coe_le, eventually_not, EventuallyLE] theorem coe_pos [Preorder β] [Zero β] {f : α → β} : 0 < (f : β) ↔ ∀ x, 0 < f x := coe_lt theorem const_lt [Preorder β] {x y : β} : x < y → (↑x : β) < ↑y := coe_lt.mpr ∘ liftRel_const @[simp, norm_cast] theorem const_lt_iff [Preorder β] {x y : β} : (↑x : β) < ↑y ↔ x < y := coe_lt.trans liftRel_const_iff theorem lt_def [Preorder β] : ((· < ·) : β* → β* → Prop) = LiftRel (· < ·) := by ext ⟨f⟩ ⟨g⟩ exact coe_lt instance isTotal [LE β] [IsTotal β (· ≤ ·)] : IsTotal β* (· ≤ ·) := ⟨fun f g => inductionOn₂ f g fun _f _g => eventually_or.1 <\| Eventually.of_forall fun _x => total_of _ _ _⟩ open Classical in /-- If `φ` is an ultrafilter then the ultraproduct is a linear order. -/ noncomputable instance instLinearOrder [LinearOrder β] : LinearOrder β* := Lattice.toLinearOrder _ instance instIsStrictOrderedRing [Semiring β] [PartialOrder β] [IsStrictOrderedRing β] : IsStrictOrderedRing β* where mul_lt_mul_of_pos_left x y z := inductionOn₃ x y z fun _f _g _h hfg hh ↦ coe_lt.2 <\| (coe_lt.1 hh).mp <\| (coe_lt.1 hfg).mono fun _a ↦ mul_lt_mul_of_pos_left mul_lt_mul_of_pos_right x y z := inductionOn₃ x y z fun _f _g _h hfg hh ↦ coe_lt.2 <\| (coe_lt.1 hh).mp <\| (coe_lt.1 hfg).mono fun _a ↦ mul_lt_mul_of_pos_right theorem max_def [LinearOrder β] (x y : β) : max x y = map₂ max x y := inductionOn₂ x y fun a b => by rcases le_total (a : β) b with h \| h · rw [max_eq_right h, map₂_coe, coe_eq] exact h.mono fun i hi => (max_eq_right hi).symm · rw [max_eq_left h, map₂_coe, coe_eq] exact h.mono fun i hi => (max_eq_left hi).symm theorem min_def [K : LinearOrder β] (x y : β) : min x y = map₂ min x y := inductionOn₂ x y fun a b => by rcases le_total (a : β) b with h \| h · rw [min_eq_left h, map₂_coe, coe_eq] exact h.mono fun i hi => (min_eq_left hi).symm · rw [min_eq_right h, map₂_coe, coe_eq] exact h.mono fun i hi => (min_eq_right hi).symm theorem abs_def [AddCommGroup β] [LinearOrder β] (x : β) : \|x\| = map abs x := inductionOn x fun _a => rfl @[simp] theorem const_max [LinearOrder β] (x y : β) : (↑(max x y : β) : β) = max ↑x ↑y := by rw [max_def, map₂_const] @[simp] theorem const_min [LinearOrder β] (x y : β) : (↑(min x y : β) : β) = min ↑x ↑y := by rw [min_def, map₂_const] @[simp] theorem const_abs [AddCommGroup β] [LinearOrder β] (x : β) : (↑\|x\| : β) = \|↑x\| := by rw [abs_def, map_const] end Germ end Filter		Mathlib/Order/Filter/FilterProduct.lean	147	153
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura, Mario Carneiro -/ import Mathlib.Algebra.Notation.Prod import Mathlib.Data.Nat.Sqrt import Mathlib.Data.Set.Lattice.Image /-! # Naturals pairing function This file defines a pairing function for the naturals as follows: ```text 0 1 4 9 16 2 3 5 10 17 6 7 8 11 18 12 13 14 15 19 20 21 22 23 24 ``` It has the advantage of being monotone in both directions and sending `⟦0, n^2 - 1⟧` to `⟦0, n - 1⟧²`. -/ assert_not_exists Monoid open Prod Decidable Function namespace Nat /-- Pairing function for the natural numbers. -/ @[pp_nodot] def pair (a b : ℕ) : ℕ := if a < b then b * b + a else a * a + a + b /-- Unpairing function for the natural numbers. -/ @[pp_nodot] def unpair (n : ℕ) : ℕ × ℕ := let s := sqrt n if n - s * s < s then (n - s * s, s) else (s, n - s * s - s) @[simp] theorem pair_unpair (n : ℕ) : pair (unpair n).1 (unpair n).2 = n := by dsimp only [unpair]; let s := sqrt n have sm : s * s + (n - s * s) = n := Nat.add_sub_cancel' (sqrt_le _) split_ifs with h · simp [s, pair, h, sm] · have hl : n - s * s - s ≤ s := Nat.sub_le_iff_le_add.2 (Nat.sub_le_iff_le_add'.2 <\| by rw [← Nat.add_assoc]; apply sqrt_le_add) simp [s, pair, hl.not_lt, Nat.add_assoc, Nat.add_sub_cancel' (le_of_not_gt h), sm] theorem pair_unpair' {n a b} (H : unpair n = (a, b)) : pair a b = n := by simpa [H] using pair_unpair n @[simp] theorem unpair_pair (a b : ℕ) : unpair (pair a b) = (a, b) := by dsimp only [pair]; split_ifs with h · show unpair (b * b + a) = (a, b) have be : sqrt (b * b + a) = b := sqrt_add_eq _ (le_trans (le_of_lt h) (Nat.le_add_left _ _)) simp [unpair, be, Nat.add_sub_cancel_left, h] · show unpair (a * a + a + b) = (a, b) have ae : sqrt (a * a + (a + b)) = a := by rw [sqrt_add_eq] exact Nat.add_le_add_left (le_of_not_gt h) _ simp [unpair, ae, Nat.not_lt_zero, Nat.add_assoc, Nat.add_sub_cancel_left] /-- An equivalence between `ℕ × ℕ` and `ℕ`. -/ @[simps -fullyApplied] def pairEquiv : ℕ × ℕ ≃ ℕ := ⟨uncurry pair, unpair, fun ⟨a, b⟩ => unpair_pair a b, pair_unpair⟩ theorem surjective_unpair : Surjective unpair := pairEquiv.symm.surjective @[simp] theorem pair_eq_pair {a b c d : ℕ} : pair a b = pair c d ↔ a = c ∧ b = d := pairEquiv.injective.eq_iff.trans (@Prod.ext_iff ℕ ℕ (a, b) (c, d)) theorem unpair_lt {n : ℕ} (n1 : 1 ≤ n) : (unpair n).1 < n := by let s := sqrt n simp only [unpair, Nat.sub_le_iff_le_add] by_cases h : n - s * s < s <;> simp [s, h, ↓reduceIte] · exact lt_of_lt_of_le h (sqrt_le_self _) · simp only [not_lt] at h have s0 : 0 < s := sqrt_pos.2 n1 exact lt_of_le_of_lt h (Nat.sub_lt n1 (Nat.mul_pos s0 s0)) @[simp] theorem unpair_zero : unpair 0 = 0 := by rw [unpair] simp theorem unpair_left_le : ∀ n : ℕ, (unpair n).1 ≤ n \| 0 => by simp \| _ + 1 => le_of_lt (unpair_lt (Nat.succ_pos _)) theorem left_le_pair (a b : ℕ) : a ≤ pair a b := by simpa using unpair_left_le (pair a b) theorem right_le_pair (a b : ℕ) : b ≤ pair a b := by by_cases h : a < b · simpa [pair, h] using le_trans (le_mul_self _) (Nat.le_add_right _ _) · simp [pair, h] theorem unpair_right_le (n : ℕ) : (unpair n).2 ≤ n := by simpa using right_le_pair n.unpair.1 n.unpair.2 theorem pair_lt_pair_left {a₁ a₂} (b) (h : a₁ < a₂) : pair a₁ b < pair a₂ b := by by_cases h₁ : a₁ < b <;> simp [pair, h₁, Nat.add_assoc] · by_cases h₂ : a₂ < b <;> simp [pair, h₂, h] simp? at h₂ says simp only [not_lt] at h₂ apply Nat.add_lt_add_of_le_of_lt · exact Nat.mul_self_le_mul_self h₂ · exact Nat.lt_add_right _ h · simp at h₁ simp only [not_lt_of_gt (lt_of_le_of_lt h₁ h), ite_false] apply add_lt_add · exact Nat.mul_self_lt_mul_self h · apply Nat.add_lt_add_right; assumption	theorem pair_lt_pair_right (a) {b₁ b₂} (h : b₁ < b₂) : pair a b₁ < pair a b₂ := by	Mathlib/Data/Nat/Pairing.lean	120	121
/- 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.Nat.ModEq /-! # Congruences modulo an integer This file defines the equivalence relation `a ≡ b [ZMOD n]` on the integers, similarly to how `Data.Nat.ModEq` defines them for the natural numbers. The notation is short for `n.ModEq a b`, which is defined to be `a % n = b % n` for integers `a b n`. ## Tags modeq, congruence, mod, MOD, modulo, integers -/ namespace Int /-- `a ≡ b [ZMOD n]` when `a % n = b % n`. -/ def ModEq (n a b : ℤ) := a % n = b % n @[inherit_doc] notation:50 a " ≡ " b " [ZMOD " n "]" => ModEq n a b variable {m n a b c d : ℤ} instance : Decidable (ModEq n a b) := decEq (a % n) (b % n) namespace ModEq @[refl, simp] protected theorem refl (a : ℤ) : a ≡ a [ZMOD n] := @rfl _ _ protected theorem rfl : a ≡ a [ZMOD n] := ModEq.refl _ instance : IsRefl _ (ModEq n) := ⟨ModEq.refl⟩ @[symm] protected theorem symm : a ≡ b [ZMOD n] → b ≡ a [ZMOD n] := Eq.symm @[trans] protected theorem trans : a ≡ b [ZMOD n] → b ≡ c [ZMOD n] → a ≡ c [ZMOD n] := Eq.trans instance : IsTrans ℤ (ModEq n) where trans := @Int.ModEq.trans n protected theorem eq : a ≡ b [ZMOD n] → a % n = b % n := id end ModEq theorem modEq_comm : a ≡ b [ZMOD n] ↔ b ≡ a [ZMOD n] := ⟨ModEq.symm, ModEq.symm⟩ theorem natCast_modEq_iff {a b n : ℕ} : a ≡ b [ZMOD n] ↔ a ≡ b [MOD n] := by unfold ModEq Nat.ModEq; rw [← Int.ofNat_inj]; simp [natCast_mod] theorem modEq_zero_iff_dvd : a ≡ 0 [ZMOD n] ↔ n ∣ a := by rw [ModEq, zero_emod, dvd_iff_emod_eq_zero] theorem _root_.Dvd.dvd.modEq_zero_int (h : n ∣ a) : a ≡ 0 [ZMOD n] := modEq_zero_iff_dvd.2 h theorem _root_.Dvd.dvd.zero_modEq_int (h : n ∣ a) : 0 ≡ a [ZMOD n] := h.modEq_zero_int.symm theorem modEq_iff_dvd : a ≡ b [ZMOD n] ↔ n ∣ b - a := by rw [ModEq, eq_comm] simp [emod_eq_emod_iff_emod_sub_eq_zero, dvd_iff_emod_eq_zero] theorem modEq_iff_add_fac {a b n : ℤ} : a ≡ b [ZMOD n] ↔ ∃ t, b = a + n * t := by rw [modEq_iff_dvd] exact exists_congr fun t => sub_eq_iff_eq_add' alias ⟨ModEq.dvd, modEq_of_dvd⟩ := modEq_iff_dvd theorem mod_modEq (a n) : a % n ≡ a [ZMOD n] := emod_emod _ _ @[simp] theorem neg_modEq_neg : -a ≡ -b [ZMOD n] ↔ a ≡ b [ZMOD n] := by simp only [modEq_iff_dvd, (by omega : -b - -a = -(b - a)), Int.dvd_neg] @[simp] theorem modEq_neg : a ≡ b [ZMOD -n] ↔ a ≡ b [ZMOD n] := by simp [modEq_iff_dvd] namespace ModEq protected theorem of_dvd (d : m ∣ n) (h : a ≡ b [ZMOD n]) : a ≡ b [ZMOD m] := modEq_iff_dvd.2 <\| d.trans h.dvd protected theorem mul_left' (h : a ≡ b [ZMOD n]) : c * a ≡ c * b [ZMOD c * n] := by obtain hc \| rfl \| hc := lt_trichotomy c 0 · rw [← neg_modEq_neg, ← modEq_neg, ← Int.neg_mul, ← Int.neg_mul, ← Int.neg_mul] simp only [ModEq, mul_emod_mul_of_pos _ _ (neg_pos.2 hc), h.eq] · simp only [Int.zero_mul, ModEq.rfl] · simp only [ModEq, mul_emod_mul_of_pos _ _ hc, h.eq] protected theorem mul_right' (h : a ≡ b [ZMOD n]) : a * c ≡ b * c [ZMOD n * c] := by rw [mul_comm a, mul_comm b, mul_comm n]; exact h.mul_left' @[gcongr] protected theorem add (h₁ : a ≡ b [ZMOD n]) (h₂ : c ≡ d [ZMOD n]) : a + c ≡ b + d [ZMOD n] := modEq_iff_dvd.2 <\| by convert Int.dvd_add h₁.dvd h₂.dvd using 1; omega @[gcongr] protected theorem add_left (c : ℤ) (h : a ≡ b [ZMOD n]) : c + a ≡ c + b [ZMOD n] := ModEq.rfl.add h @[gcongr] protected theorem add_right (c : ℤ) (h : a ≡ b [ZMOD n]) : a + c ≡ b + c [ZMOD n] := h.add ModEq.rfl protected theorem add_left_cancel (h₁ : a ≡ b [ZMOD n]) (h₂ : a + c ≡ b + d [ZMOD n]) : c ≡ d [ZMOD n] := have : d - c = b + d - (a + c) - (b - a) := by omega modEq_iff_dvd.2 <\| by rw [this] exact Int.dvd_sub h₂.dvd h₁.dvd protected theorem add_left_cancel' (c : ℤ) (h : c + a ≡ c + b [ZMOD n]) : a ≡ b [ZMOD n] := ModEq.rfl.add_left_cancel h protected theorem add_right_cancel (h₁ : c ≡ d [ZMOD n]) (h₂ : a + c ≡ b + d [ZMOD n]) : a ≡ b [ZMOD n] := by rw [add_comm a, add_comm b] at h₂ exact h₁.add_left_cancel h₂ protected theorem add_right_cancel' (c : ℤ) (h : a + c ≡ b + c [ZMOD n]) : a ≡ b [ZMOD n] := ModEq.rfl.add_right_cancel h @[gcongr] protected theorem neg (h : a ≡ b [ZMOD n]) : -a ≡ -b [ZMOD n] := h.add_left_cancel (by simp_rw [← sub_eq_add_neg, sub_self]; rfl) @[gcongr] protected theorem sub (h₁ : a ≡ b [ZMOD n]) (h₂ : c ≡ d [ZMOD n]) : a - c ≡ b - d [ZMOD n] := by rw [sub_eq_add_neg, sub_eq_add_neg] exact h₁.add h₂.neg @[gcongr] protected theorem sub_left (c : ℤ) (h : a ≡ b [ZMOD n]) : c - a ≡ c - b [ZMOD n] := ModEq.rfl.sub h @[gcongr] protected theorem sub_right (c : ℤ) (h : a ≡ b [ZMOD n]) : a - c ≡ b - c [ZMOD n] := h.sub ModEq.rfl @[gcongr] protected theorem mul_left (c : ℤ) (h : a ≡ b [ZMOD n]) : c * a ≡ c * b [ZMOD n] := h.mul_left'.of_dvd <\| dvd_mul_left _ _ @[gcongr] protected theorem mul_right (c : ℤ) (h : a ≡ b [ZMOD n]) : a * c ≡ b * c [ZMOD n] := h.mul_right'.of_dvd <\| dvd_mul_right _ _ @[gcongr] protected theorem mul (h₁ : a ≡ b [ZMOD n]) (h₂ : c ≡ d [ZMOD n]) : a * c ≡ b * d [ZMOD n] := (h₂.mul_left _).trans (h₁.mul_right _) @[gcongr] protected theorem pow (m : ℕ) (h : a ≡ b [ZMOD n]) : a ^ m ≡ b ^ m [ZMOD n] := by induction' m with d hd; · rfl rw [pow_succ, pow_succ] exact hd.mul h lemma of_mul_left (m : ℤ) (h : a ≡ b [ZMOD m * n]) : a ≡ b [ZMOD n] := by rw [modEq_iff_dvd] at ; exact (dvd_mul_left n m).trans h lemma of_mul_right (m : ℤ) : a ≡ b [ZMOD n m] → a ≡ b [ZMOD n] := mul_comm m n ▸ of_mul_left _ /-- To cancel a common factor `c` from a `ModEq` we must divide the modulus `m` by `gcd m c`. -/ theorem cancel_right_div_gcd (hm : 0 < m) (h : a * c ≡ b * c [ZMOD m]) : a ≡ b [ZMOD m / gcd m c] := by letI d := gcd m c	rw [modEq_iff_dvd] at h ⊢ refine Int.dvd_of_dvd_mul_right_of_gcd_one (?_ : m / d ∣ c / d * (b - a)) ?_ · rw [mul_comm, ← Int.mul_ediv_assoc (b - a) gcd_dvd_right, Int.sub_mul]	Mathlib/Data/Int/ModEq.lean	179	181
/- Copyright (c) 2022 Violeta Hernández Palacios. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Violeta Hernández Palacios -/ import Mathlib.SetTheory.Ordinal.Family import Mathlib.Tactic.Abel /-! # Natural operations on ordinals The goal of this file is to define natural addition and multiplication on ordinals, also known as the Hessenberg sum and product, and provide a basic API. The natural addition of two ordinals `a ♯ b` is recursively defined as the least ordinal greater than `a' ♯ b` and `a ♯ b'` for `a' < a` and `b' < b`. The natural multiplication `a ⨳ b` is likewise recursively defined as the least ordinal such that `a ⨳ b ♯ a' ⨳ b'` is greater than `a' ⨳ b ♯ a ⨳ b'` for any `a' < a` and `b' < b`. These operations form a rich algebraic structure: they're commutative, associative, preserve order, have the usual `0` and `1` from ordinals, and distribute over one another. Moreover, these operations are the addition and multiplication of ordinals when viewed as combinatorial `Game`s. This makes them particularly useful for game theory. Finally, both operations admit simple, intuitive descriptions in terms of the Cantor normal form. The natural addition of two ordinals corresponds to adding their Cantor normal forms as if they were polynomials in `ω`. Likewise, their natural multiplication corresponds to multiplying the Cantor normal forms as polynomials. ## Implementation notes Given the rich algebraic structure of these two operations, we choose to create a type synonym `NatOrdinal`, where we provide the appropriate instances. However, to avoid casting back and forth between both types, we attempt to prove and state most results on `Ordinal`. ## Todo - Prove the characterizations of natural addition and multiplication in terms of the Cantor normal form. -/ universe u v open Function Order Set noncomputable section /-! ### Basic casts between `Ordinal` and `NatOrdinal` -/ /-- A type synonym for ordinals with natural addition and multiplication. -/ def NatOrdinal : Type _ := Ordinal deriving Zero, Inhabited, One, WellFoundedRelation -- The `LinearOrder, `SuccOrder` instances should be constructed by a deriving handler. -- https://github.com/leanprover-community/mathlib4/issues/380 instance NatOrdinal.instLinearOrder : LinearOrder NatOrdinal := Ordinal.instLinearOrder instance NatOrdinal.instSuccOrder : SuccOrder NatOrdinal := Ordinal.instSuccOrder instance NatOrdinal.instOrderBot : OrderBot NatOrdinal := Ordinal.instOrderBot instance NatOrdinal.instNoMaxOrder : NoMaxOrder NatOrdinal := Ordinal.instNoMaxOrder instance NatOrdinal.instZeroLEOneClass : ZeroLEOneClass NatOrdinal := Ordinal.instZeroLEOneClass instance NatOrdinal.instNeZeroOne : NeZero (1 : NatOrdinal) := Ordinal.instNeZeroOne instance NatOrdinal.uncountable : Uncountable NatOrdinal := Ordinal.uncountable /-- The identity function between `Ordinal` and `NatOrdinal`. -/ @[match_pattern] def Ordinal.toNatOrdinal : Ordinal ≃o NatOrdinal := OrderIso.refl _ /-- The identity function between `NatOrdinal` and `Ordinal`. -/ @[match_pattern] def NatOrdinal.toOrdinal : NatOrdinal ≃o Ordinal := OrderIso.refl _ namespace NatOrdinal open Ordinal @[simp] theorem toOrdinal_symm_eq : NatOrdinal.toOrdinal.symm = Ordinal.toNatOrdinal := rfl @[simp] theorem toOrdinal_toNatOrdinal (a : NatOrdinal) : a.toOrdinal.toNatOrdinal = a := rfl theorem lt_wf : @WellFounded NatOrdinal (· < ·) := Ordinal.lt_wf instance : WellFoundedLT NatOrdinal := Ordinal.wellFoundedLT instance : ConditionallyCompleteLinearOrderBot NatOrdinal := WellFoundedLT.conditionallyCompleteLinearOrderBot _ @[simp] theorem bot_eq_zero : (⊥ : NatOrdinal) = 0 := rfl @[simp] theorem toOrdinal_zero : toOrdinal 0 = 0 := rfl @[simp] theorem toOrdinal_one : toOrdinal 1 = 1 := rfl @[simp] theorem toOrdinal_eq_zero {a} : toOrdinal a = 0 ↔ a = 0 := Iff.rfl @[simp] theorem toOrdinal_eq_one {a} : toOrdinal a = 1 ↔ a = 1 := Iff.rfl @[simp] theorem toOrdinal_max (a b : NatOrdinal) : toOrdinal (max a b) = max (toOrdinal a) (toOrdinal b) := rfl @[simp] theorem toOrdinal_min (a b : NatOrdinal) : toOrdinal (min a b) = min (toOrdinal a) (toOrdinal b) := rfl theorem succ_def (a : NatOrdinal) : succ a = toNatOrdinal (toOrdinal a + 1) := rfl @[simp] theorem zero_le (o : NatOrdinal) : 0 ≤ o := Ordinal.zero_le o theorem not_lt_zero (o : NatOrdinal) : ¬ o < 0 := Ordinal.not_lt_zero o @[simp] theorem lt_one_iff_zero {o : NatOrdinal} : o < 1 ↔ o = 0 := Ordinal.lt_one_iff_zero /-- A recursor for `NatOrdinal`. Use as `induction x`. -/ @[elab_as_elim, cases_eliminator, induction_eliminator] protected def rec {β : NatOrdinal → Sort*} (h : ∀ a, β (toNatOrdinal a)) : ∀ a, β a := fun a => h (toOrdinal a) /-- `Ordinal.induction` but for `NatOrdinal`. -/ theorem induction {p : NatOrdinal → Prop} : ∀ (i) (_ : ∀ j, (∀ k, k < j → p k) → p j), p i := Ordinal.induction instance small_Iio (a : NatOrdinal.{u}) : Small.{u} (Set.Iio a) := Ordinal.small_Iio a instance small_Iic (a : NatOrdinal.{u}) : Small.{u} (Set.Iic a) := Ordinal.small_Iic a instance small_Ico (a b : NatOrdinal.{u}) : Small.{u} (Set.Ico a b) := Ordinal.small_Ico a b instance small_Icc (a b : NatOrdinal.{u}) : Small.{u} (Set.Icc a b) := Ordinal.small_Icc a b instance small_Ioo (a b : NatOrdinal.{u}) : Small.{u} (Set.Ioo a b) := Ordinal.small_Ioo a b instance small_Ioc (a b : NatOrdinal.{u}) : Small.{u} (Set.Ioc a b) := Ordinal.small_Ioc a b end NatOrdinal namespace Ordinal variable {a b c : Ordinal.{u}} @[simp] theorem toNatOrdinal_symm_eq : toNatOrdinal.symm = NatOrdinal.toOrdinal := rfl @[simp] theorem toNatOrdinal_toOrdinal (a : Ordinal) : a.toNatOrdinal.toOrdinal = a := rfl @[simp] theorem toNatOrdinal_zero : toNatOrdinal 0 = 0 := rfl @[simp] theorem toNatOrdinal_one : toNatOrdinal 1 = 1 := rfl @[simp] theorem toNatOrdinal_eq_zero (a) : toNatOrdinal a = 0 ↔ a = 0 := Iff.rfl @[simp] theorem toNatOrdinal_eq_one (a) : toNatOrdinal a = 1 ↔ a = 1 := Iff.rfl @[simp] theorem toNatOrdinal_max (a b : Ordinal) : toNatOrdinal (max a b) = max (toNatOrdinal a) (toNatOrdinal b) := rfl @[simp] theorem toNatOrdinal_min (a b : Ordinal) : toNatOrdinal (min a b) = min (toNatOrdinal a) (toNatOrdinal b) := rfl /-! We place the definitions of `nadd` and `nmul` before actually developing their API, as this guarantees we only need to open the `NaturalOps` locale once. -/ /-- Natural addition on ordinals `a ♯ b`, also known as the Hessenberg sum, is recursively defined as the least ordinal greater than `a' ♯ b` and `a ♯ b'` for all `a' < a` and `b' < b`. In contrast to normal ordinal addition, it is commutative. Natural addition can equivalently be characterized as the ordinal resulting from adding up corresponding coefficients in the Cantor normal forms of `a` and `b`. -/ noncomputable def nadd (a b : Ordinal.{u}) : Ordinal.{u} := max (⨆ x : Iio a, succ (nadd x.1 b)) (⨆ x : Iio b, succ (nadd a x.1)) termination_by (a, b) decreasing_by all_goals cases x; decreasing_tactic @[inherit_doc] scoped[NaturalOps] infixl:65 " ♯ " => Ordinal.nadd open NaturalOps /-- Natural multiplication on ordinals `a ⨳ b`, also known as the Hessenberg product, is recursively defined as the least ordinal such that `a ⨳ b ♯ a' ⨳ b'` is greater than `a' ⨳ b ♯ a ⨳ b'` for all `a' < a` and `b < b'`. In contrast to normal ordinal multiplication, it is commutative and distributive (over natural addition). Natural multiplication can equivalently be characterized as the ordinal resulting from multiplying the Cantor normal forms of `a` and `b` as if they were polynomials in `ω`. Addition of exponents is done via natural addition. -/ noncomputable def nmul (a b : Ordinal.{u}) : Ordinal.{u} := sInf {c \| ∀ a' < a, ∀ b' < b, nmul a' b ♯ nmul a b' < c ♯ nmul a' b'} termination_by (a, b) @[inherit_doc] scoped[NaturalOps] infixl:70 " ⨳ " => Ordinal.nmul /-! ### Natural addition -/ theorem lt_nadd_iff : a < b ♯ c ↔ (∃ b' < b, a ≤ b' ♯ c) ∨ ∃ c' < c, a ≤ b ♯ c' := by rw [nadd] simp [Ordinal.lt_iSup_iff] theorem nadd_le_iff : b ♯ c ≤ a ↔ (∀ b' < b, b' ♯ c < a) ∧ ∀ c' < c, b ♯ c' < a := by rw [← not_lt, lt_nadd_iff] simp theorem nadd_lt_nadd_left (h : b < c) (a) : a ♯ b < a ♯ c := lt_nadd_iff.2 (Or.inr ⟨b, h, le_rfl⟩) theorem nadd_lt_nadd_right (h : b < c) (a) : b ♯ a < c ♯ a := lt_nadd_iff.2 (Or.inl ⟨b, h, le_rfl⟩) theorem nadd_le_nadd_left (h : b ≤ c) (a) : a ♯ b ≤ a ♯ c := by rcases lt_or_eq_of_le h with (h \| rfl) · exact (nadd_lt_nadd_left h a).le · exact le_rfl theorem nadd_le_nadd_right (h : b ≤ c) (a) : b ♯ a ≤ c ♯ a := by rcases lt_or_eq_of_le h with (h \| rfl) · exact (nadd_lt_nadd_right h a).le · exact le_rfl variable (a b) theorem nadd_comm (a b) : a ♯ b = b ♯ a := by rw [nadd, nadd, max_comm] congr <;> ext x <;> cases x <;> apply congr_arg _ (nadd_comm _ _) termination_by (a, b) @[deprecated "blsub will soon be deprecated" (since := "2024-11-18")] theorem blsub_nadd_of_mono {f : ∀ c < a ♯ b, Ordinal.{max u v}} (hf : ∀ {i j} (hi hj), i ≤ j → f i hi ≤ f j hj) : blsub.{u,v} _ f = max (blsub.{u, v} a fun a' ha' => f (a' ♯ b) <\| nadd_lt_nadd_right ha' b) (blsub.{u, v} b fun b' hb' => f (a ♯ b') <\| nadd_lt_nadd_left hb' a) := by apply (blsub_le_iff.2 fun i h => _).antisymm (max_le _ _) · intro i h rcases lt_nadd_iff.1 h with (⟨a', ha', hi⟩ \| ⟨b', hb', hi⟩) · exact lt_max_of_lt_left ((hf h (nadd_lt_nadd_right ha' b) hi).trans_lt (lt_blsub _ _ ha')) · exact lt_max_of_lt_right ((hf h (nadd_lt_nadd_left hb' a) hi).trans_lt (lt_blsub _ _ hb')) all_goals apply blsub_le_of_brange_subset.{u, u, v} rintro c ⟨d, hd, rfl⟩ apply mem_brange_self private theorem iSup_nadd_of_monotone {a b} (f : Ordinal.{u} → Ordinal.{u}) (h : Monotone f) : ⨆ x : Iio (a ♯ b), f x = max (⨆ a' : Iio a, f (a'.1 ♯ b)) (⨆ b' : Iio b, f (a ♯ b'.1)) := by apply (max_le _ _).antisymm' · rw [Ordinal.iSup_le_iff] rintro ⟨i, hi⟩ obtain ⟨x, hx, hi⟩ \| ⟨x, hx, hi⟩ := lt_nadd_iff.1 hi · exact le_max_of_le_left ((h hi).trans <\| Ordinal.le_iSup (fun x : Iio a ↦ _) ⟨x, hx⟩) · exact le_max_of_le_right ((h hi).trans <\| Ordinal.le_iSup (fun x : Iio b ↦ _) ⟨x, hx⟩) all_goals apply csSup_le_csSup' (bddAbove_of_small _) rintro _ ⟨⟨c, hc⟩, rfl⟩ refine mem_range_self (⟨_, ?_⟩ : Iio _) apply_rules [nadd_lt_nadd_left, nadd_lt_nadd_right] theorem nadd_assoc (a b c) : a ♯ b ♯ c = a ♯ (b ♯ c) := by unfold nadd rw [iSup_nadd_of_monotone fun a' ↦ succ (a' ♯ c), iSup_nadd_of_monotone fun b' ↦ succ (a ♯ b'), max_assoc] · congr <;> ext x <;> cases x <;> apply congr_arg _ (nadd_assoc _ _ _) · exact succ_mono.comp fun x y h ↦ nadd_le_nadd_left h _ · exact succ_mono.comp fun x y h ↦ nadd_le_nadd_right h _ termination_by (a, b, c) @[simp] theorem nadd_zero (a : Ordinal) : a ♯ 0 = a := by rw [nadd, ciSup_of_empty fun _ : Iio 0 ↦ _, sup_bot_eq] convert iSup_succ a rename_i x cases x exact nadd_zero _ termination_by a @[simp] theorem zero_nadd : 0 ♯ a = a := by rw [nadd_comm, nadd_zero] @[simp] theorem nadd_one (a : Ordinal) : a ♯ 1 = succ a := by rw [nadd, ciSup_unique (s := fun _ : Iio 1 ↦ _), Iio_one_default_eq, nadd_zero, max_eq_right_iff, Ordinal.iSup_le_iff] rintro ⟨i, hi⟩ rwa [nadd_one, succ_le_succ_iff, succ_le_iff] termination_by a @[simp] theorem one_nadd : 1 ♯ a = succ a := by rw [nadd_comm, nadd_one] theorem nadd_succ : a ♯ succ b = succ (a ♯ b) := by rw [← nadd_one (a ♯ b), nadd_assoc, nadd_one] theorem succ_nadd : succ a ♯ b = succ (a ♯ b) := by rw [← one_nadd (a ♯ b), ← nadd_assoc, one_nadd] @[simp] theorem nadd_nat (n : ℕ) : a ♯ n = a + n := by induction' n with n hn · simp · rw [Nat.cast_succ, add_one_eq_succ, nadd_succ, add_succ, hn] @[simp] theorem nat_nadd (n : ℕ) : ↑n ♯ a = a + n := by rw [nadd_comm, nadd_nat] theorem add_le_nadd : a + b ≤ a ♯ b := by induction b using limitRecOn with \| zero => simp \| succ c h => rwa [add_succ, nadd_succ, succ_le_succ_iff] \| isLimit c hc H => rw [(isNormal_add_right a).apply_of_isLimit hc, Ordinal.iSup_le_iff] rintro ⟨i, hi⟩ exact (H i hi).trans (nadd_le_nadd_left hi.le a) end Ordinal namespace NatOrdinal open Ordinal NaturalOps instance : Add NatOrdinal := ⟨nadd⟩ instance : SuccAddOrder NatOrdinal := ⟨fun x => (nadd_one x).symm⟩ theorem lt_add_iff {a b c : NatOrdinal} : a < b + c ↔ (∃ b' < b, a ≤ b' + c) ∨ ∃ c' < c, a ≤ b + c' := Ordinal.lt_nadd_iff theorem add_le_iff {a b c : NatOrdinal} : b + c ≤ a ↔ (∀ b' < b, b' + c < a) ∧ ∀ c' < c, b + c' < a := Ordinal.nadd_le_iff instance : AddLeftStrictMono NatOrdinal.{u} := ⟨fun a _ _ h => nadd_lt_nadd_left h a⟩ instance : AddLeftMono NatOrdinal.{u} := ⟨fun a _ _ h => nadd_le_nadd_left h a⟩ instance : AddLeftReflectLE NatOrdinal.{u} := ⟨fun a b c h => by by_contra! h' exact h.not_lt (add_lt_add_left h' a)⟩ instance : AddCommMonoid NatOrdinal := { add := (· + ·) add_assoc := nadd_assoc zero := 0 zero_add := zero_nadd add_zero := nadd_zero add_comm := nadd_comm nsmul := nsmulRec } instance : IsOrderedCancelAddMonoid NatOrdinal := { add_le_add_left := fun _ _ => add_le_add_left le_of_add_le_add_left := fun _ _ _ => le_of_add_le_add_left } instance : AddMonoidWithOne NatOrdinal := AddMonoidWithOne.unary @[simp] theorem toOrdinal_natCast (n : ℕ) : toOrdinal n = n := by induction' n with n hn · rfl · change (toOrdinal n) ♯ 1 = n + 1 rw [hn]; exact nadd_one n instance : CharZero NatOrdinal where cast_injective m n h := by apply_fun toOrdinal at h simpa using h end NatOrdinal open NatOrdinal open NaturalOps namespace Ordinal theorem nadd_eq_add (a b : Ordinal) : a ♯ b = toOrdinal (toNatOrdinal a + toNatOrdinal b) := rfl @[simp] theorem toNatOrdinal_natCast (n : ℕ) : toNatOrdinal n = n := by rw [← toOrdinal_natCast n] rfl theorem lt_of_nadd_lt_nadd_left : ∀ {a b c}, a ♯ b < a ♯ c → b < c := @lt_of_add_lt_add_left NatOrdinal _ _ _ theorem lt_of_nadd_lt_nadd_right : ∀ {a b c}, b ♯ a < c ♯ a → b < c := @lt_of_add_lt_add_right NatOrdinal _ _ _ theorem le_of_nadd_le_nadd_left : ∀ {a b c}, a ♯ b ≤ a ♯ c → b ≤ c := @le_of_add_le_add_left NatOrdinal _ _ _ theorem le_of_nadd_le_nadd_right : ∀ {a b c}, b ♯ a ≤ c ♯ a → b ≤ c := @le_of_add_le_add_right NatOrdinal _ _ _ @[simp] theorem nadd_lt_nadd_iff_left : ∀ (a) {b c}, a ♯ b < a ♯ c ↔ b < c := @add_lt_add_iff_left NatOrdinal _ _ _ _ @[simp] theorem nadd_lt_nadd_iff_right : ∀ (a) {b c}, b ♯ a < c ♯ a ↔ b < c := @add_lt_add_iff_right NatOrdinal _ _ _ _ @[simp] theorem nadd_le_nadd_iff_left : ∀ (a) {b c}, a ♯ b ≤ a ♯ c ↔ b ≤ c := @add_le_add_iff_left NatOrdinal _ _ _ _ @[simp] theorem nadd_le_nadd_iff_right : ∀ (a) {b c}, b ♯ a ≤ c ♯ a ↔ b ≤ c := @_root_.add_le_add_iff_right NatOrdinal _ _ _ _ theorem nadd_le_nadd : ∀ {a b c d}, a ≤ b → c ≤ d → a ♯ c ≤ b ♯ d := @add_le_add NatOrdinal _ _ _ _ theorem nadd_lt_nadd : ∀ {a b c d}, a < b → c < d → a ♯ c < b ♯ d := @add_lt_add NatOrdinal _ _ _ _ theorem nadd_lt_nadd_of_lt_of_le : ∀ {a b c d}, a < b → c ≤ d → a ♯ c < b ♯ d := @add_lt_add_of_lt_of_le NatOrdinal _ _ _ _ theorem nadd_lt_nadd_of_le_of_lt : ∀ {a b c d}, a ≤ b → c < d → a ♯ c < b ♯ d := @add_lt_add_of_le_of_lt NatOrdinal _ _ _ _ theorem nadd_left_cancel : ∀ {a b c}, a ♯ b = a ♯ c → b = c := @_root_.add_left_cancel NatOrdinal _ _ theorem nadd_right_cancel : ∀ {a b c}, a ♯ b = c ♯ b → a = c := @_root_.add_right_cancel NatOrdinal _ _ @[simp] theorem nadd_left_cancel_iff : ∀ {a b c}, a ♯ b = a ♯ c ↔ b = c := @add_left_cancel_iff NatOrdinal _ _ @[simp] theorem nadd_right_cancel_iff : ∀ {a b c}, b ♯ a = c ♯ a ↔ b = c := @add_right_cancel_iff NatOrdinal _ _ theorem le_nadd_self {a b} : a ≤ b ♯ a := by simpa using nadd_le_nadd_right (Ordinal.zero_le b) a theorem le_nadd_left {a b c} (h : a ≤ c) : a ≤ b ♯ c := le_nadd_self.trans (nadd_le_nadd_left h b) theorem le_self_nadd {a b} : a ≤ a ♯ b := by simpa using nadd_le_nadd_left (Ordinal.zero_le b) a theorem le_nadd_right {a b c} (h : a ≤ b) : a ≤ b ♯ c := le_self_nadd.trans (nadd_le_nadd_right h c) theorem nadd_left_comm : ∀ a b c, a ♯ (b ♯ c) = b ♯ (a ♯ c) := @add_left_comm NatOrdinal _ theorem nadd_right_comm : ∀ a b c, a ♯ b ♯ c = a ♯ c ♯ b := @add_right_comm NatOrdinal _ /-! ### Natural multiplication -/ variable {a b c d : Ordinal.{u}} @[deprecated "avoid using the definition of `nmul` directly" (since := "2024-11-19")] theorem nmul_def (a b : Ordinal) : a ⨳ b = sInf {c \| ∀ a' < a, ∀ b' < b, a' ⨳ b ♯ a ⨳ b' < c ♯ a' ⨳ b'} := by rw [nmul] /-- The set in the definition of `nmul` is nonempty. -/ private theorem nmul_nonempty (a b : Ordinal.{u}) : {c : Ordinal.{u} \| ∀ a' < a, ∀ b' < b, a' ⨳ b ♯ a ⨳ b' < c ♯ a' ⨳ b'}.Nonempty := by obtain ⟨c, hc⟩ : BddAbove ((fun x ↦ x.1 ⨳ b ♯ a ⨳ x.2) '' Set.Iio a ×ˢ Set.Iio b) := bddAbove_of_small _ exact ⟨_, fun x hx y hy ↦ (lt_succ_of_le <\| hc <\| Set.mem_image_of_mem _ <\| Set.mk_mem_prod hx hy).trans_le le_self_nadd⟩ theorem nmul_nadd_lt {a' b' : Ordinal} (ha : a' < a) (hb : b' < b) : a' ⨳ b ♯ a ⨳ b' < a ⨳ b ♯ a' ⨳ b' := by conv_rhs => rw [nmul] exact csInf_mem (nmul_nonempty a b) a' ha b' hb theorem nmul_nadd_le {a' b' : Ordinal} (ha : a' ≤ a) (hb : b' ≤ b) : a' ⨳ b ♯ a ⨳ b' ≤ a ⨳ b ♯ a' ⨳ b' := by rcases lt_or_eq_of_le ha with (ha \| rfl) · rcases lt_or_eq_of_le hb with (hb \| rfl) · exact (nmul_nadd_lt ha hb).le · rw [nadd_comm] · exact le_rfl theorem lt_nmul_iff : c < a ⨳ b ↔ ∃ a' < a, ∃ b' < b, c ♯ a' ⨳ b' ≤ a' ⨳ b ♯ a ⨳ b' := by refine ⟨fun h => ?_, ?_⟩ · rw [nmul] at h simpa using not_mem_of_lt_csInf h ⟨0, fun _ _ => bot_le⟩ · rintro ⟨a', ha, b', hb, h⟩ have := h.trans_lt (nmul_nadd_lt ha hb) rwa [nadd_lt_nadd_iff_right] at this theorem nmul_le_iff : a ⨳ b ≤ c ↔ ∀ a' < a, ∀ b' < b, a' ⨳ b ♯ a ⨳ b' < c ♯ a' ⨳ b' := by rw [← not_iff_not]; simp [lt_nmul_iff] theorem nmul_comm (a b) : a ⨳ b = b ⨳ a := by rw [nmul, nmul] congr; ext x; constructor <;> intro H c hc d hd · rw [nadd_comm, ← nmul_comm, ← nmul_comm a, ← nmul_comm d] exact H _ hd _ hc · rw [nadd_comm, nmul_comm, nmul_comm c, nmul_comm c] exact H _ hd _ hc termination_by (a, b) @[simp] theorem nmul_zero (a) : a ⨳ 0 = 0 := by rw [← Ordinal.le_zero, nmul_le_iff] exact fun _ _ a ha => (Ordinal.not_lt_zero a ha).elim @[simp] theorem zero_nmul (a) : 0 ⨳ a = 0 := by rw [nmul_comm, nmul_zero] @[simp] theorem nmul_one (a : Ordinal) : a ⨳ 1 = a := by rw [nmul] convert csInf_Ici ext b refine ⟨fun H ↦ le_of_forall_lt (a := a) fun c hc ↦ ?_, fun ha c hc ↦ ?_⟩ -- Porting note: had to add arguments to `nmul_one` in the next two lines -- for the termination checker. · simpa [nmul_one c] using H c hc · simpa [nmul_one c] using hc.trans_le ha termination_by a @[simp] theorem one_nmul (a) : 1 ⨳ a = a := by rw [nmul_comm, nmul_one] theorem nmul_lt_nmul_of_pos_left (h₁ : a < b) (h₂ : 0 < c) : c ⨳ a < c ⨳ b := lt_nmul_iff.2 ⟨0, h₂, a, h₁, by simp⟩ theorem nmul_lt_nmul_of_pos_right (h₁ : a < b) (h₂ : 0 < c) : a ⨳ c < b ⨳ c := lt_nmul_iff.2 ⟨a, h₁, 0, h₂, by simp⟩ theorem nmul_le_nmul_left (h : a ≤ b) (c) : c ⨳ a ≤ c ⨳ b := by rcases lt_or_eq_of_le h with (h₁ \| rfl) <;> rcases (eq_zero_or_pos c).symm with (h₂ \| rfl) · exact (nmul_lt_nmul_of_pos_left h₁ h₂).le all_goals simp theorem nmul_le_nmul_right (h : a ≤ b) (c) : a ⨳ c ≤ b ⨳ c := by rw [nmul_comm, nmul_comm b] exact nmul_le_nmul_left h c theorem nmul_nadd (a b c : Ordinal) : a ⨳ (b ♯ c) = a ⨳ b ♯ a ⨳ c := by refine le_antisymm (nmul_le_iff.2 fun a' ha d hd => ?_) (nadd_le_iff.2 ⟨fun d hd => ?_, fun d hd => ?_⟩) · rw [nmul_nadd] rcases lt_nadd_iff.1 hd with (⟨b', hb, hd⟩ \| ⟨c', hc, hd⟩) · have := nadd_lt_nadd_of_lt_of_le (nmul_nadd_lt ha hb) (nmul_nadd_le ha.le hd) rw [nmul_nadd, nmul_nadd] at this simp only [nadd_assoc] at this rwa [nadd_left_comm, nadd_left_comm _ (a ⨳ b'), nadd_left_comm (a ⨳ b), nadd_lt_nadd_iff_left, nadd_left_comm (a' ⨳ b), nadd_left_comm (a ⨳ b), nadd_lt_nadd_iff_left, ← nadd_assoc, ← nadd_assoc] at this · have := nadd_lt_nadd_of_le_of_lt (nmul_nadd_le ha.le hd) (nmul_nadd_lt ha hc) rw [nmul_nadd, nmul_nadd] at this simp only [nadd_assoc] at this rwa [nadd_left_comm, nadd_comm (a ⨳ c), nadd_left_comm (a' ⨳ d), nadd_left_comm (a ⨳ c'), nadd_left_comm (a ⨳ b), nadd_lt_nadd_iff_left, nadd_comm (a' ⨳ c), nadd_left_comm (a ⨳ d), nadd_left_comm (a' ⨳ b), nadd_left_comm (a ⨳ b), nadd_lt_nadd_iff_left, nadd_comm (a ⨳ d), nadd_comm (a' ⨳ d), ← nadd_assoc, ← nadd_assoc] at this · rcases lt_nmul_iff.1 hd with ⟨a', ha, b', hb, hd⟩ have := nadd_lt_nadd_of_le_of_lt hd (nmul_nadd_lt ha (nadd_lt_nadd_right hb c)) rw [nmul_nadd, nmul_nadd, nmul_nadd a'] at this simp only [nadd_assoc] at this rwa [nadd_left_comm (a' ⨳ b'), nadd_left_comm, nadd_lt_nadd_iff_left, nadd_left_comm, nadd_left_comm _ (a' ⨳ b'), nadd_left_comm (a ⨳ b'), nadd_lt_nadd_iff_left, nadd_left_comm (a' ⨳ c), nadd_left_comm, nadd_lt_nadd_iff_left, nadd_left_comm, nadd_comm _ (a' ⨳ c), nadd_lt_nadd_iff_left] at this · rcases lt_nmul_iff.1 hd with ⟨a', ha, c', hc, hd⟩ have := nadd_lt_nadd_of_lt_of_le (nmul_nadd_lt ha (nadd_lt_nadd_left hc b)) hd rw [nmul_nadd, nmul_nadd, nmul_nadd a'] at this simp only [nadd_assoc] at this rwa [nadd_left_comm _ (a' ⨳ b), nadd_lt_nadd_iff_left, nadd_left_comm (a' ⨳ c'), nadd_left_comm _ (a' ⨳ c), nadd_lt_nadd_iff_left, nadd_left_comm, nadd_comm (a' ⨳ c'), nadd_left_comm _ (a ⨳ c'), nadd_lt_nadd_iff_left, nadd_comm _ (a' ⨳ c'), nadd_comm _ (a' ⨳ c'), nadd_left_comm, nadd_lt_nadd_iff_left] at this termination_by (a, b, c) theorem nadd_nmul (a b c) : (a ♯ b) ⨳ c = a ⨳ c ♯ b ⨳ c := by rw [nmul_comm, nmul_nadd, nmul_comm, nmul_comm c] theorem nmul_nadd_lt₃ {a' b' c' : Ordinal} (ha : a' < a) (hb : b' < b) (hc : c' < c) : a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' < a ⨳ b ⨳ c ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' := by simpa only [nadd_nmul, ← nadd_assoc] using nmul_nadd_lt (nmul_nadd_lt ha hb) hc theorem nmul_nadd_le₃ {a' b' c' : Ordinal} (ha : a' ≤ a) (hb : b' ≤ b) (hc : c' ≤ c) : a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' ≤ a ⨳ b ⨳ c ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' := by simpa only [nadd_nmul, ← nadd_assoc] using nmul_nadd_le (nmul_nadd_le ha hb) hc private theorem nmul_nadd_lt₃' {a' b' c' : Ordinal} (ha : a' < a) (hb : b' < b) (hc : c' < c) : a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') < a ⨳ (b ⨳ c) ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') := by simp only [nmul_comm _ (_ ⨳ _)] convert nmul_nadd_lt₃ hb hc ha using 1 <;> (simp only [nadd_eq_add, NatOrdinal.toOrdinal_toNatOrdinal]; abel_nf) @[deprecated nmul_nadd_le₃ (since := "2024-11-19")] theorem nmul_nadd_le₃' {a' b' c' : Ordinal} (ha : a' ≤ a) (hb : b' ≤ b) (hc : c' ≤ c) : a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') ≤ a ⨳ (b ⨳ c) ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') := by simp only [nmul_comm _ (_ ⨳ _)] convert nmul_nadd_le₃ hb hc ha using 1 <;> (simp only [nadd_eq_add, NatOrdinal.toOrdinal_toNatOrdinal]; abel_nf) theorem lt_nmul_iff₃ : d < a ⨳ b ⨳ c ↔ ∃ a' < a, ∃ b' < b, ∃ c' < c, d ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' ≤ a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' := by refine ⟨fun h ↦ ?_, fun ⟨a', ha, b', hb, c', hc, h⟩ ↦ ?_⟩ · rcases lt_nmul_iff.1 h with ⟨e, he, c', hc, H₁⟩ rcases lt_nmul_iff.1 he with ⟨a', ha, b', hb, H₂⟩ refine ⟨a', ha, b', hb, c', hc, ?_⟩ have := nadd_le_nadd H₁ (nmul_nadd_le H₂ hc.le) simp only [nadd_nmul, nadd_assoc] at this rw [nadd_left_comm, nadd_left_comm d, nadd_left_comm, nadd_le_nadd_iff_left, nadd_left_comm (a ⨳ b' ⨳ c), nadd_left_comm (a' ⨳ b ⨳ c), nadd_left_comm (a ⨳ b ⨳ c'), nadd_le_nadd_iff_left, nadd_left_comm (a ⨳ b ⨳ c'), nadd_left_comm (a ⨳ b ⨳ c')] at this simpa only [nadd_assoc] · have := h.trans_lt (nmul_nadd_lt₃ ha hb hc) repeat rw [nadd_lt_nadd_iff_right] at this assumption theorem nmul_le_iff₃ : a ⨳ b ⨳ c ≤ d ↔ ∀ a' < a, ∀ b' < b, ∀ c' < c, a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' < d ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' := by simpa using lt_nmul_iff₃.not private theorem nmul_le_iff₃' : a ⨳ (b ⨳ c) ≤ d ↔ ∀ a' < a, ∀ b' < b, ∀ c' < c, a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') < d ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') := by simp only [nmul_comm _ (_ ⨳ _), nmul_le_iff₃, nadd_eq_add, toOrdinal_toNatOrdinal] constructor <;> intro h a' ha b' hb c' hc · convert h b' hb c' hc a' ha using 1 <;> abel_nf · convert h c' hc a' ha b' hb using 1 <;> abel_nf @[deprecated lt_nmul_iff₃ (since := "2024-11-19")] theorem lt_nmul_iff₃' : d < a ⨳ (b ⨳ c) ↔ ∃ a' < a, ∃ b' < b, ∃ c' < c, d ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') ≤ a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') := by simpa using nmul_le_iff₃'.not theorem nmul_assoc (a b c : Ordinal) : a ⨳ b ⨳ c = a ⨳ (b ⨳ c) := by apply le_antisymm · rw [nmul_le_iff₃] intro a' ha b' hb c' hc repeat rw [nmul_assoc] exact nmul_nadd_lt₃' ha hb hc · rw [nmul_le_iff₃'] intro a' ha b' hb c' hc	repeat rw [← nmul_assoc] exact nmul_nadd_lt₃ ha hb hc termination_by (a, b, c)	Mathlib/SetTheory/Ordinal/NaturalOps.lean	659	662
/- 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 -/ import Mathlib.Data.NNRat.Order import Mathlib.Topology.Algebra.Order.Archimedean import Mathlib.Topology.Algebra.Ring.Real import Mathlib.Topology.Instances.Nat /-! # Topology on the rational numbers The structure of a metric space on `ℚ` is introduced in this file, induced from `ℝ`. -/ open Filter Metric Set Topology namespace Rat instance : MetricSpace ℚ := MetricSpace.induced (↑) Rat.cast_injective Real.metricSpace theorem dist_eq (x y : ℚ) : dist x y = \|(x : ℝ) - y\| := rfl @[norm_cast, simp] theorem dist_cast (x y : ℚ) : dist (x : ℝ) y = dist x y := rfl theorem uniformContinuous_coe_real : UniformContinuous ((↑) : ℚ → ℝ) := uniformContinuous_comap theorem isUniformEmbedding_coe_real : IsUniformEmbedding ((↑) : ℚ → ℝ) := isUniformEmbedding_comap Rat.cast_injective theorem isDenseEmbedding_coe_real : IsDenseEmbedding ((↑) : ℚ → ℝ) := isUniformEmbedding_coe_real.isDenseEmbedding Rat.denseRange_cast theorem isEmbedding_coe_real : IsEmbedding ((↑) : ℚ → ℝ) := isDenseEmbedding_coe_real.isEmbedding @[deprecated (since := "2024-10-26")] alias embedding_coe_real := isEmbedding_coe_real theorem continuous_coe_real : Continuous ((↑) : ℚ → ℝ) := uniformContinuous_coe_real.continuous end Rat @[norm_cast, simp] theorem Nat.dist_cast_rat (x y : ℕ) : dist (x : ℚ) y = dist x y := by rw [← Nat.dist_cast_real, ← Rat.dist_cast]; congr theorem Nat.isUniformEmbedding_coe_rat : IsUniformEmbedding ((↑) : ℕ → ℚ) := isUniformEmbedding_bot_of_pairwise_le_dist zero_lt_one <\| by simpa using Nat.pairwise_one_le_dist	theorem Nat.isClosedEmbedding_coe_rat : IsClosedEmbedding ((↑) : ℕ → ℚ) := isClosedEmbedding_of_pairwise_le_dist zero_lt_one <\| by simpa using Nat.pairwise_one_le_dist	Mathlib/Topology/Instances/Rat.lean	57	58
/- Copyright (c) 2023 Jeremy Tan. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Tan -/ import Mathlib.Combinatorics.SimpleGraph.Finite import Mathlib.Combinatorics.SimpleGraph.Maps import Mathlib.Combinatorics.SimpleGraph.Subgraph /-! # Local graph operations This file defines some single-graph operations that modify a finite number of vertices and proves basic theorems about them. When the graph itself has a finite number of vertices we also prove theorems about the number of edges in the modified graphs. ## Main definitions * `G.replaceVertex s t` is `G` with `t` replaced by a copy of `s`, removing the `s-t` edge if present. * `edge s t` is the graph with a single `s-t` edge. Adding this edge to a graph `G` is then `G ⊔ edge s t`. -/ open Finset namespace SimpleGraph variable {V : Type} (G : SimpleGraph V) (s t : V) namespace Iso variable {G} {W : Type} {G' : SimpleGraph W} (f : G ≃g G') include f in theorem card_edgeFinset_eq [Fintype G.edgeSet] [Fintype G'.edgeSet] : #G.edgeFinset = #G'.edgeFinset := by apply Finset.card_eq_of_equiv simp only [Set.mem_toFinset] exact f.mapEdgeSet end Iso section ReplaceVertex variable [DecidableEq V] /-- The graph formed by forgetting `t`'s neighbours and instead giving it those of `s`. The `s-t` edge is removed if present. -/ def replaceVertex : SimpleGraph V where Adj v w := if v = t then if w = t then False else G.Adj s w else if w = t then G.Adj v s else G.Adj v w symm v w := by dsimp only; split_ifs <;> simp [adj_comm] /-- There is never an `s-t` edge in `G.replaceVertex s t`. -/ lemma not_adj_replaceVertex_same : ¬(G.replaceVertex s t).Adj s t := by simp [replaceVertex] @[simp] lemma replaceVertex_self : G.replaceVertex s s = G := by ext; unfold replaceVertex; aesop (add simp or_iff_not_imp_left) variable {t} /-- Except possibly for `t`, the neighbours of `s` in `G.replaceVertex s t` are its neighbours in `G`. -/ lemma adj_replaceVertex_iff_of_ne_left {w : V} (hw : w ≠ t) : (G.replaceVertex s t).Adj s w ↔ G.Adj s w := by simp [replaceVertex, hw] /-- Except possibly for itself, the neighbours of `t` in `G.replaceVertex s t` are the neighbours of `s` in `G`. -/ lemma adj_replaceVertex_iff_of_ne_right {w : V} (hw : w ≠ t) : (G.replaceVertex s t).Adj t w ↔ G.Adj s w := by simp [replaceVertex, hw] /-- Adjacency in `G.replaceVertex s t` which does not involve `t` is the same as that of `G`. -/ lemma adj_replaceVertex_iff_of_ne {v w : V} (hv : v ≠ t) (hw : w ≠ t) : (G.replaceVertex s t).Adj v w ↔ G.Adj v w := by simp [replaceVertex, hv, hw] variable {s} theorem edgeSet_replaceVertex_of_not_adj (hn : ¬G.Adj s t) : (G.replaceVertex s t).edgeSet = G.edgeSet \ G.incidenceSet t ∪ (s(·, t)) '' (G.neighborSet s) := by	ext e; refine e.inductionOn ?_ simp only [replaceVertex, mem_edgeSet, Set.mem_union, Set.mem_diff, mk'_mem_incidenceSet_iff] intros; split_ifs; exacts [by simp_all, by aesop, by rw [adj_comm]; aesop, by aesop] theorem edgeSet_replaceVertex_of_adj (ha : G.Adj s t) : (G.replaceVertex s t).edgeSet =	Mathlib/Combinatorics/SimpleGraph/Operations.lean	82	86
/- 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, Yury Kudryashov -/ import Mathlib.Data.List.Forall2 import Mathlib.Data.List.Lex import Mathlib.Logic.Function.Iterate import Mathlib.Logic.Relation /-! # Relation chain This file provides basic results about `List.Chain` (definition in `Data.List.Defs`). A list `[a₂, ..., aₙ]` is a `Chain` starting at `a₁` with respect to the relation `r` if `r a₁ a₂` and `r a₂ a₃` and ... and `r aₙ₋₁ aₙ`. We write it `Chain r a₁ [a₂, ..., aₙ]`. A graph-specialized version is in development and will hopefully be added under `combinatorics.` sometime soon. -/ assert_not_imported Mathlib.Algebra.Order.Group.Nat universe u v open Nat namespace List variable {α : Type u} {β : Type v} {R r : α → α → Prop} {l l₁ l₂ : List α} {a b : α} mk_iff_of_inductive_prop List.Chain List.chain_iff theorem Chain.iff {S : α → α → Prop} (H : ∀ a b, R a b ↔ S a b) {a : α} {l : List α} : Chain R a l ↔ Chain S a l := ⟨Chain.imp fun a b => (H a b).1, Chain.imp fun a b => (H a b).2⟩ theorem Chain.iff_mem {a : α} {l : List α} : Chain R a l ↔ Chain (fun x y => x ∈ a :: l ∧ y ∈ l ∧ R x y) a l := ⟨fun p => by induction p with \| nil => exact nil \| @cons _ _ _ r _ IH => constructor · exact ⟨mem_cons_self, mem_cons_self, r⟩ · exact IH.imp fun a b ⟨am, bm, h⟩ => ⟨mem_cons_of_mem _ am, mem_cons_of_mem _ bm, h⟩, Chain.imp fun _ _ h => h.2.2⟩ theorem chain_singleton {a b : α} : Chain R a [b] ↔ R a b := by simp only [chain_cons, Chain.nil, and_true] theorem chain_split {a b : α} {l₁ l₂ : List α} : Chain R a (l₁ ++ b :: l₂) ↔ Chain R a (l₁ ++ [b]) ∧ Chain R b l₂ := by induction' l₁ with x l₁ IH generalizing a <;> simp only [*, nil_append, cons_append, Chain.nil, chain_cons, and_true, and_assoc] @[simp] theorem chain_append_cons_cons {a b c : α} {l₁ l₂ : List α} :	Chain R a (l₁ ++ b :: c :: l₂) ↔ Chain R a (l₁ ++ [b]) ∧ R b c ∧ Chain R c l₂ := by rw [chain_split, chain_cons]	Mathlib/Data/List/Chain.lean	58	59
/- Copyright (c) 2022 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Batteries.Tactic.Init import Mathlib.Logic.Function.Defs /-! # Binary map of options This file defines the binary map of `Option`. This is mostly useful to define pointwise operations on intervals. ## Main declarations * `Option.map₂`: Binary map of options. ## Notes This file is very similar to the n-ary section of `Mathlib.Data.Set.Basic`, to `Mathlib.Data.Finset.NAry` and to `Mathlib.Order.Filter.NAry`. Please keep them in sync. We do not define `Option.map₃` as its only purpose so far would be to prove properties of `Option.map₂` and casing already fulfills this task. -/ universe u open Function namespace Option variable {α β γ δ : Type} {f : α → β → γ} {a : Option α} {b : Option β} {c : Option γ} /-- The image of a binary function `f : α → β → γ` as a function `Option α → Option β → Option γ`. Mathematically this should be thought of as the image of the corresponding function `α × β → γ`. -/ def map₂ (f : α → β → γ) (a : Option α) (b : Option β) : Option γ := a.bind fun a => b.map <\| f a /-- `Option.map₂` in terms of monadic operations. Note that this can't be taken as the definition because of the lack of universe polymorphism. -/ theorem map₂_def {α β γ : Type u} (f : α → β → γ) (a : Option α) (b : Option β) : map₂ f a b = f <$> a <> b := by cases a <;> rfl @[simp] theorem map₂_some_some (f : α → β → γ) (a : α) (b : β) : map₂ f (some a) (some b) = f a b := rfl theorem map₂_coe_coe (f : α → β → γ) (a : α) (b : β) : map₂ f a b = f a b := rfl @[simp] theorem map₂_none_left (f : α → β → γ) (b : Option β) : map₂ f none b = none := rfl @[simp] theorem map₂_none_right (f : α → β → γ) (a : Option α) : map₂ f a none = none := by cases a <;> rfl @[simp] theorem map₂_coe_left (f : α → β → γ) (a : α) (b : Option β) : map₂ f a b = b.map fun b => f a b := rfl -- Porting note: This proof was `rfl` in Lean3, but now is not.	@[simp]	Mathlib/Data/Option/NAry.lean	63	63
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers, Heather Macbeth -/ import Mathlib.Analysis.SpecialFunctions.Complex.Circle import Mathlib.Geometry.Euclidean.Angle.Oriented.Basic /-! # Rotations by oriented angles. This file defines rotations by oriented angles in real inner product spaces. ## Main definitions * `Orientation.rotation` is the rotation by an oriented angle with respect to an orientation. -/ noncomputable section open Module Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "J" => o.rightAngleRotation /-- Auxiliary construction to build a rotation by the oriented angle `θ`. -/ def rotationAux (θ : Real.Angle) : V →ₗᵢ[ℝ] V := LinearMap.isometryOfInner (Real.Angle.cos θ • LinearMap.id + Real.Angle.sin θ • (LinearIsometryEquiv.toLinearEquiv J).toLinearMap) (by intro x y simp only [RCLike.conj_to_real, id, LinearMap.smul_apply, LinearMap.add_apply, LinearMap.id_coe, LinearEquiv.coe_coe, LinearIsometryEquiv.coe_toLinearEquiv, Orientation.areaForm_rightAngleRotation_left, Orientation.inner_rightAngleRotation_left, Orientation.inner_rightAngleRotation_right, inner_add_left, inner_smul_left, inner_add_right, inner_smul_right] linear_combination inner (𝕜 := ℝ) x y θ.cos_sq_add_sin_sq) @[simp] theorem rotationAux_apply (θ : Real.Angle) (x : V) : o.rotationAux θ x = Real.Angle.cos θ • x + Real.Angle.sin θ • J x := rfl /-- A rotation by the oriented angle `θ`. -/ def rotation (θ : Real.Angle) : V ≃ₗᵢ[ℝ] V := LinearIsometryEquiv.ofLinearIsometry (o.rotationAux θ) (Real.Angle.cos θ • LinearMap.id - Real.Angle.sin θ • (LinearIsometryEquiv.toLinearEquiv J).toLinearMap) (by ext x convert congr_arg (fun t : ℝ => t • x) θ.cos_sq_add_sin_sq using 1 · simp only [o.rightAngleRotation_rightAngleRotation, o.rotationAux_apply, Function.comp_apply, id, LinearEquiv.coe_coe, LinearIsometry.coe_toLinearMap, LinearIsometryEquiv.coe_toLinearEquiv, map_smul, map_sub, LinearMap.coe_comp, LinearMap.id_coe, LinearMap.smul_apply, LinearMap.sub_apply] module · simp) (by ext x convert congr_arg (fun t : ℝ => t • x) θ.cos_sq_add_sin_sq using 1 · simp only [o.rightAngleRotation_rightAngleRotation, o.rotationAux_apply, Function.comp_apply, id, LinearEquiv.coe_coe, LinearIsometry.coe_toLinearMap, LinearIsometryEquiv.coe_toLinearEquiv, map_add, map_smul, LinearMap.coe_comp, LinearMap.id_coe, LinearMap.smul_apply, LinearMap.sub_apply] module · simp) theorem rotation_apply (θ : Real.Angle) (x : V) : o.rotation θ x = Real.Angle.cos θ • x + Real.Angle.sin θ • J x := rfl theorem rotation_symm_apply (θ : Real.Angle) (x : V) : (o.rotation θ).symm x = Real.Angle.cos θ • x - Real.Angle.sin θ • J x := rfl theorem rotation_eq_matrix_toLin (θ : Real.Angle) {x : V} (hx : x ≠ 0) : (o.rotation θ).toLinearMap = Matrix.toLin (o.basisRightAngleRotation x hx) (o.basisRightAngleRotation x hx) !![θ.cos, -θ.sin; θ.sin, θ.cos] := by apply (o.basisRightAngleRotation x hx).ext intro i fin_cases i · rw [Matrix.toLin_self] simp [rotation_apply, Fin.sum_univ_succ] · rw [Matrix.toLin_self] simp [rotation_apply, Fin.sum_univ_succ, add_comm] /-- The determinant of `rotation` (as a linear map) is equal to `1`. -/ @[simp] theorem det_rotation (θ : Real.Angle) : LinearMap.det (o.rotation θ).toLinearMap = 1 := by haveI : Nontrivial V := nontrivial_of_finrank_eq_succ (@Fact.out (finrank ℝ V = 2) _) obtain ⟨x, hx⟩ : ∃ x, x ≠ (0 : V) := exists_ne (0 : V) rw [o.rotation_eq_matrix_toLin θ hx] simpa [sq] using θ.cos_sq_add_sin_sq /-- The determinant of `rotation` (as a linear equiv) is equal to `1`. -/ @[simp] theorem linearEquiv_det_rotation (θ : Real.Angle) : LinearEquiv.det (o.rotation θ).toLinearEquiv = 1 := Units.ext <\| by -- Porting note: Lean can't see through `LinearEquiv.coe_det` and needed the rewrite -- in mathlib3 this was just `units.ext <\| o.det_rotation θ` simpa only [LinearEquiv.coe_det, Units.val_one] using o.det_rotation θ /-- The inverse of `rotation` is rotation by the negation of the angle. -/ @[simp] theorem rotation_symm (θ : Real.Angle) : (o.rotation θ).symm = o.rotation (-θ) := by ext; simp [o.rotation_apply, o.rotation_symm_apply, sub_eq_add_neg] /-- Rotation by 0 is the identity. -/ @[simp] theorem rotation_zero : o.rotation 0 = LinearIsometryEquiv.refl ℝ V := by ext; simp [rotation] /-- Rotation by π is negation. -/ @[simp] theorem rotation_pi : o.rotation π = LinearIsometryEquiv.neg ℝ := by ext x simp [rotation] /-- Rotation by π is negation. -/ theorem rotation_pi_apply (x : V) : o.rotation π x = -x := by simp /-- Rotation by π / 2 is the "right-angle-rotation" map `J`. -/ theorem rotation_pi_div_two : o.rotation (π / 2 : ℝ) = J := by ext x simp [rotation] /-- Rotating twice is equivalent to rotating by the sum of the angles. -/ @[simp] theorem rotation_rotation (θ₁ θ₂ : Real.Angle) (x : V) : o.rotation θ₁ (o.rotation θ₂ x) = o.rotation (θ₁ + θ₂) x := by simp only [o.rotation_apply, Real.Angle.cos_add, Real.Angle.sin_add, LinearIsometryEquiv.map_add, LinearIsometryEquiv.trans_apply, map_smul, rightAngleRotation_rightAngleRotation] module /-- Rotating twice is equivalent to rotating by the sum of the angles. -/ @[simp] theorem rotation_trans (θ₁ θ₂ : Real.Angle) : (o.rotation θ₁).trans (o.rotation θ₂) = o.rotation (θ₂ + θ₁) := LinearIsometryEquiv.ext fun _ => by rw [← rotation_rotation, LinearIsometryEquiv.trans_apply] /-- Rotating the first of two vectors by `θ` scales their Kahler form by `cos θ - sin θ * I`. -/ @[simp] theorem kahler_rotation_left (x y : V) (θ : Real.Angle) : o.kahler (o.rotation θ x) y = conj (θ.toCircle : ℂ) * o.kahler x y := by -- Porting note: this needed the `Complex.conj_ofReal` instead of `RCLike.conj_ofReal`; -- I believe this is because the respective coercions are no longer defeq, and -- `Real.Angle.coe_toCircle` uses the `Complex` version. simp only [o.rotation_apply, map_add, map_mul, LinearMap.map_smulₛₗ, RingHom.id_apply, LinearMap.add_apply, LinearMap.smul_apply, real_smul, kahler_rightAngleRotation_left, Real.Angle.coe_toCircle, Complex.conj_ofReal, conj_I] ring /-- Negating a rotation is equivalent to rotation by π plus the angle. -/ theorem neg_rotation (θ : Real.Angle) (x : V) : -o.rotation θ x = o.rotation (π + θ) x := by rw [← o.rotation_pi_apply, rotation_rotation] /-- Negating a rotation by -π / 2 is equivalent to rotation by π / 2. -/ @[simp] theorem neg_rotation_neg_pi_div_two (x : V) : -o.rotation (-π / 2 : ℝ) x = o.rotation (π / 2 : ℝ) x := by rw [neg_rotation, ← Real.Angle.coe_add, neg_div, ← sub_eq_add_neg, sub_half] /-- Negating a rotation by π / 2 is equivalent to rotation by -π / 2. -/ theorem neg_rotation_pi_div_two (x : V) : -o.rotation (π / 2 : ℝ) x = o.rotation (-π / 2 : ℝ) x := (neg_eq_iff_eq_neg.mp <\| o.neg_rotation_neg_pi_div_two _).symm /-- Rotating the first of two vectors by `θ` scales their Kahler form by `cos (-θ) + sin (-θ) * I`. -/ theorem kahler_rotation_left' (x y : V) (θ : Real.Angle) : o.kahler (o.rotation θ x) y = (-θ).toCircle * o.kahler x y := by simp only [Real.Angle.toCircle_neg, Circle.coe_inv_eq_conj, kahler_rotation_left] /-- Rotating the second of two vectors by `θ` scales their Kahler form by `cos θ + sin θ * I`. -/ @[simp] theorem kahler_rotation_right (x y : V) (θ : Real.Angle) : o.kahler x (o.rotation θ y) = θ.toCircle * o.kahler x y := by simp only [o.rotation_apply, map_add, LinearMap.map_smulₛₗ, RingHom.id_apply, real_smul, kahler_rightAngleRotation_right, Real.Angle.coe_toCircle] ring /-- Rotating the first vector by `θ` subtracts `θ` from the angle between two vectors. -/ @[simp] theorem oangle_rotation_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle (o.rotation θ x) y = o.oangle x y - θ := by simp only [oangle, o.kahler_rotation_left'] rw [Complex.arg_mul_coe_angle, Real.Angle.arg_toCircle] · abel · exact Circle.coe_ne_zero _ · exact o.kahler_ne_zero hx hy /-- Rotating the second vector by `θ` adds `θ` to the angle between two vectors. -/ @[simp] theorem oangle_rotation_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x (o.rotation θ y) = o.oangle x y + θ := by simp only [oangle, o.kahler_rotation_right] rw [Complex.arg_mul_coe_angle, Real.Angle.arg_toCircle] · abel · exact Circle.coe_ne_zero _ · exact o.kahler_ne_zero hx hy /-- The rotation of a vector by `θ` has an angle of `-θ` from that vector. -/ @[simp] theorem oangle_rotation_self_left {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.oangle (o.rotation θ x) x = -θ := by simp [hx] /-- A vector has an angle of `θ` from the rotation of that vector by `θ`. -/ @[simp] theorem oangle_rotation_self_right {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.oangle x (o.rotation θ x) = θ := by simp [hx] /-- Rotating the first vector by the angle between the two vectors results in an angle of 0. -/ @[simp] theorem oangle_rotation_oangle_left (x y : V) : o.oangle (o.rotation (o.oangle x y) x) y = 0 := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [hx, hy] /-- Rotating the first vector by the angle between the two vectors and swapping the vectors results in an angle of 0. -/ @[simp] theorem oangle_rotation_oangle_right (x y : V) : o.oangle y (o.rotation (o.oangle x y) x) = 0 := by rw [oangle_rev] simp /-- Rotating both vectors by the same angle does not change the angle between those vectors. -/ @[simp] theorem oangle_rotation (x y : V) (θ : Real.Angle) : o.oangle (o.rotation θ x) (o.rotation θ y) = o.oangle x y := by by_cases hx : x = 0 <;> by_cases hy : y = 0 <;> simp [hx, hy] /-- A rotation of a nonzero vector equals that vector if and only if the angle is zero. -/ @[simp] theorem rotation_eq_self_iff_angle_eq_zero {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.rotation θ x = x ↔ θ = 0 := by constructor · intro h rw [eq_comm] simpa [hx, h] using o.oangle_rotation_right hx hx θ · intro h simp [h] /-- A nonzero vector equals a rotation of that vector if and only if the angle is zero. -/ @[simp] theorem eq_rotation_self_iff_angle_eq_zero {x : V} (hx : x ≠ 0) (θ : Real.Angle) : x = o.rotation θ x ↔ θ = 0 := by rw [← o.rotation_eq_self_iff_angle_eq_zero hx, eq_comm] /-- A rotation of a vector equals that vector if and only if the vector or the angle is zero. -/ theorem rotation_eq_self_iff (x : V) (θ : Real.Angle) : o.rotation θ x = x ↔ x = 0 ∨ θ = 0 := by by_cases h : x = 0 <;> simp [h] /-- A vector equals a rotation of that vector if and only if the vector or the angle is zero. -/ theorem eq_rotation_self_iff (x : V) (θ : Real.Angle) : x = o.rotation θ x ↔ x = 0 ∨ θ = 0 := by rw [← rotation_eq_self_iff, eq_comm] /-- Rotating a vector by the angle to another vector gives the second vector if and only if the norms are equal. -/ @[simp] theorem rotation_oangle_eq_iff_norm_eq (x y : V) : o.rotation (o.oangle x y) x = y ↔ ‖x‖ = ‖y‖ := by constructor · intro h rw [← h, LinearIsometryEquiv.norm_map] · intro h rw [o.eq_iff_oangle_eq_zero_of_norm_eq] <;> simp [h] /-- The angle between two nonzero vectors is `θ` if and only if the second vector is the first rotated by `θ` and scaled by the ratio of the norms. -/ theorem oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x y = θ ↔ y = (‖y‖ / ‖x‖) • o.rotation θ x := by have hp := div_pos (norm_pos_iff.2 hy) (norm_pos_iff.2 hx) constructor · rintro rfl rw [← LinearIsometryEquiv.map_smul, ← o.oangle_smul_left_of_pos x y hp, eq_comm, rotation_oangle_eq_iff_norm_eq, norm_smul, Real.norm_of_nonneg hp.le, div_mul_cancel₀ _ (norm_ne_zero_iff.2 hx)] · intro hye rw [hye, o.oangle_smul_right_of_pos _ _ hp, o.oangle_rotation_self_right hx] /-- The angle between two nonzero vectors is `θ` if and only if the second vector is the first rotated by `θ` and scaled by a positive real. -/ theorem oangle_eq_iff_eq_pos_smul_rotation_of_ne_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x y = θ ↔ ∃ r : ℝ, 0 < r ∧ y = r • o.rotation θ x := by constructor · intro h rw [o.oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero hx hy] at h exact ⟨‖y‖ / ‖x‖, div_pos (norm_pos_iff.2 hy) (norm_pos_iff.2 hx), h⟩ · rintro ⟨r, hr, rfl⟩ rw [o.oangle_smul_right_of_pos _ _ hr, o.oangle_rotation_self_right hx] /-- The angle between two vectors is `θ` if and only if they are nonzero and the second vector is the first rotated by `θ` and scaled by the ratio of the norms, or `θ` and at least one of the vectors are zero. -/ theorem oangle_eq_iff_eq_norm_div_norm_smul_rotation_or_eq_zero {x y : V} (θ : Real.Angle) : o.oangle x y = θ ↔ x ≠ 0 ∧ y ≠ 0 ∧ y = (‖y‖ / ‖x‖) • o.rotation θ x ∨ θ = 0 ∧ (x = 0 ∨ y = 0) := by by_cases hx : x = 0 · simp [hx, eq_comm] · by_cases hy : y = 0 · simp [hy, eq_comm] · rw [o.oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero hx hy] simp [hx, hy] /-- The angle between two vectors is `θ` if and only if they are nonzero and the second vector is the first rotated by `θ` and scaled by a positive real, or `θ` and at least one of the vectors are zero. -/ theorem oangle_eq_iff_eq_pos_smul_rotation_or_eq_zero {x y : V} (θ : Real.Angle) : o.oangle x y = θ ↔ (x ≠ 0 ∧ y ≠ 0 ∧ ∃ r : ℝ, 0 < r ∧ y = r • o.rotation θ x) ∨ θ = 0 ∧ (x = 0 ∨ y = 0) := by by_cases hx : x = 0 · simp [hx, eq_comm] · by_cases hy : y = 0 · simp [hy, eq_comm] · rw [o.oangle_eq_iff_eq_pos_smul_rotation_of_ne_zero hx hy] simp [hx, hy] /-- Any linear isometric equivalence in `V` with positive determinant is `rotation`. -/ theorem exists_linearIsometryEquiv_eq_of_det_pos {f : V ≃ₗᵢ[ℝ] V} (hd : 0 < LinearMap.det (f.toLinearEquiv : V →ₗ[ℝ] V)) : ∃ θ : Real.Angle, f = o.rotation θ := by haveI : Nontrivial V := nontrivial_of_finrank_eq_succ (@Fact.out (finrank ℝ V = 2) _) obtain ⟨x, hx⟩ : ∃ x, x ≠ (0 : V) := exists_ne (0 : V) use o.oangle x (f x) apply LinearIsometryEquiv.toLinearEquiv_injective apply LinearEquiv.toLinearMap_injective apply (o.basisRightAngleRotation x hx).ext intro i symm fin_cases i · simp have : o.oangle (J x) (f (J x)) = o.oangle x (f x) := by simp only [oangle, o.linearIsometryEquiv_comp_rightAngleRotation f hd, o.kahler_comp_rightAngleRotation] simp [← this] theorem rotation_map (θ : Real.Angle) (f : V ≃ₗᵢ[ℝ] V') (x : V') :	(Orientation.map (Fin 2) f.toLinearEquiv o).rotation θ x = f (o.rotation θ (f.symm x)) := by simp [rotation_apply, o.rightAngleRotation_map] @[simp] protected theorem _root_.Complex.rotation (θ : Real.Angle) (z : ℂ) : Complex.orientation.rotation θ z = θ.toCircle * z := by simp only [rotation_apply, Complex.rightAngleRotation, Real.Angle.coe_toCircle, real_smul] ring	Mathlib/Geometry/Euclidean/Angle/Oriented/Rotation.lean	351	359
/- Copyright (c) 2017 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Patrick Massot, Kim Morrison, Mario Carneiro, Andrew Yang -/ import Mathlib.Topology.Category.TopCat.EpiMono import Mathlib.Topology.Category.TopCat.Limits.Basic import Mathlib.CategoryTheory.Limits.Shapes.Products import Mathlib.CategoryTheory.Limits.ConcreteCategory.Basic import Mathlib.Data.Set.Subsingleton import Mathlib.Tactic.CategoryTheory.Elementwise import Mathlib.Topology.Homeomorph.Lemmas /-! # Products and coproducts in the category of topological spaces -/ open CategoryTheory Limits Set TopologicalSpace Topology universe v u w noncomputable section namespace TopCat variable {J : Type v} [Category.{w} J] /-- The projection from the product as a bundled continuous map. -/ abbrev piπ {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) : TopCat.of (∀ i, α i) ⟶ α i := ofHom ⟨fun f => f i, continuous_apply i⟩ /-- The explicit fan of a family of topological spaces given by the pi type. -/ @[simps! pt π_app] def piFan {ι : Type v} (α : ι → TopCat.{max v u}) : Fan α := Fan.mk (TopCat.of (∀ i, α i)) (piπ.{v,u} α) /-- The constructed fan is indeed a limit -/ def piFanIsLimit {ι : Type v} (α : ι → TopCat.{max v u}) : IsLimit (piFan α) where lift S := ofHom { toFun := fun s i => S.π.app ⟨i⟩ s continuous_toFun := continuous_pi (fun i => (S.π.app ⟨i⟩).hom.2) } uniq := by intro S m h ext x funext i simp [ContinuousMap.coe_mk, ← h ⟨i⟩] fac _ _ := rfl /-- The product is homeomorphic to the product of the underlying spaces, equipped with the product topology. -/ def piIsoPi {ι : Type v} (α : ι → TopCat.{max v u}) : ∏ᶜ α ≅ TopCat.of (∀ i, α i) := (limit.isLimit _).conePointUniqueUpToIso (piFanIsLimit.{v, u} α) @[reassoc (attr := simp)] theorem piIsoPi_inv_π {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) : (piIsoPi α).inv ≫ Pi.π α i = piπ α i := by simp [piIsoPi] theorem piIsoPi_inv_π_apply {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) (x : ∀ i, α i) : (Pi.π α i :) ((piIsoPi α).inv x) = x i := ConcreteCategory.congr_hom (piIsoPi_inv_π α i) x theorem piIsoPi_hom_apply {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) (x : (∏ᶜ α : TopCat.{max v u})) : (piIsoPi α).hom x i = (Pi.π α i :) x := by have := piIsoPi_inv_π α i rw [Iso.inv_comp_eq] at this exact ConcreteCategory.congr_hom this x /-- The inclusion to the coproduct as a bundled continuous map. -/ abbrev sigmaι {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) : α i ⟶ TopCat.of (Σi, α i) := by refine ofHom (ContinuousMap.mk ?_ ?_) · dsimp apply Sigma.mk i · dsimp; continuity /-- The explicit cofan of a family of topological spaces given by the sigma type. -/ @[simps! pt ι_app] def sigmaCofan {ι : Type v} (α : ι → TopCat.{max v u}) : Cofan α := Cofan.mk (TopCat.of (Σi, α i)) (sigmaι α) /-- The constructed cofan is indeed a colimit -/ def sigmaCofanIsColimit {ι : Type v} (β : ι → TopCat.{max v u}) : IsColimit (sigmaCofan β) where desc S := ofHom { toFun := fun (s : of (Σ i, β i)) => S.ι.app ⟨s.1⟩ s.2 continuous_toFun := by continuity } uniq := by intro S m h ext ⟨i, x⟩ simp only [← h] congr fac s j := by cases j aesop_cat /-- The coproduct is homeomorphic to the disjoint union of the topological spaces. -/ def sigmaIsoSigma {ι : Type v} (α : ι → TopCat.{max v u}) : ∐ α ≅ TopCat.of (Σi, α i) := (colimit.isColimit _).coconePointUniqueUpToIso (sigmaCofanIsColimit.{v, u} α) @[reassoc (attr := simp)] theorem sigmaIsoSigma_hom_ι {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) : Sigma.ι α i ≫ (sigmaIsoSigma α).hom = sigmaι α i := by simp [sigmaIsoSigma] theorem sigmaIsoSigma_hom_ι_apply {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) (x : α i) : (sigmaIsoSigma α).hom ((Sigma.ι α i :) x) = Sigma.mk i x := ConcreteCategory.congr_hom (sigmaIsoSigma_hom_ι α i) x theorem sigmaIsoSigma_inv_apply {ι : Type v} (α : ι → TopCat.{max v u}) (i : ι) (x : α i) : (sigmaIsoSigma α).inv ⟨i, x⟩ = (Sigma.ι α i :) x := by rw [← sigmaIsoSigma_hom_ι_apply, ← comp_app, ← comp_app, Iso.hom_inv_id, Category.comp_id] section Prod /-- The first projection from the product. -/ abbrev prodFst {X Y : TopCat.{u}} : TopCat.of (X × Y) ⟶ X := ofHom { toFun := Prod.fst } /-- The second projection from the product. -/ abbrev prodSnd {X Y : TopCat.{u}} : TopCat.of (X × Y) ⟶ Y := ofHom { toFun := Prod.snd } /-- The explicit binary cofan of `X, Y` given by `X × Y`. -/ def prodBinaryFan (X Y : TopCat.{u}) : BinaryFan X Y := BinaryFan.mk prodFst prodSnd /-- The constructed binary fan is indeed a limit -/ def prodBinaryFanIsLimit (X Y : TopCat.{u}) : IsLimit (prodBinaryFan X Y) where lift := fun S : BinaryFan X Y => ofHom { toFun := fun s => (S.fst s, S.snd s) continuous_toFun := by continuity } fac := by rintro S (_ \| _) <;> {dsimp; ext; rfl} uniq := by	intro S m h ext x -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11041): used to be part of `ext x` refine Prod.ext ?_ ?_	Mathlib/Topology/Category/TopCat/Limits/Products.lean	135	138
/- Copyright (c) 2024 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin -/ import Mathlib.Order.CompactlyGenerated.Basic /-! # Generators for boolean algebras In this file, we provide an alternative constructor for boolean algebras. A set of boolean generators in a compactly generated complete lattice is a subset `S` such that * the elements of `S` are all atoms, and * the set `S` satisfies an atomicity condition: any compact element below the supremum of a subset `s` of generators is equal to the supremum of a subset of `s`. ## Main declarations * `IsCompactlyGenerated.BooleanGenerators`: the predicate described above. * `IsCompactlyGenerated.BooleanGenerators.complementedLattice_of_sSup_eq_top`: if `S` generates the entire lattice, then it is complemented. * `IsCompactlyGenerated.BooleanGenerators.distribLattice_of_sSup_eq_top`: if `S` generates the entire lattice, then it is distributive. * `IsCompactlyGenerated.BooleanGenerators.booleanAlgebra_of_sSup_eq_top`: if `S` generates the entire lattice, then it is a boolean algebra. -/ namespace IsCompactlyGenerated open CompleteLattice variable {α : Type} [CompleteLattice α] /-- An alternative constructor for boolean algebras. A set of boolean generators* in a compactly generated complete lattice is a subset `S` such that * the elements of `S` are all atoms, and * the set `S` satisfies an atomicity condition: any compact element below the supremum of a finite subset `s` of generators is equal to the supremum of a subset of `s`. If the supremum of `S` is the whole lattice, then the lattice is a boolean algebra (see `IsCompactlyGenerated.BooleanGenerators.booleanAlgebra_of_sSup_eq_top`). -/ structure BooleanGenerators (S : Set α) : Prop where /-- The elements in a collection of boolean generators are all atoms. -/ isAtom : ∀ I ∈ S, IsAtom I /-- The elements in a collection of boolean generators satisfy an atomicity condition: any compact element below the supremum of a finite subset `s` of generators is equal to the supremum of a subset of `s`. -/ finitelyAtomistic : ∀ (s : Finset α) (a : α), ↑s ⊆ S → IsCompactElement a → a ≤ s.sup id → ∃ t ⊆ s, a = t.sup id namespace BooleanGenerators variable {S : Set α} lemma mono (hS : BooleanGenerators S) {T : Set α} (hTS : T ⊆ S) : BooleanGenerators T where isAtom I hI := hS.isAtom I (hTS hI) finitelyAtomistic := fun s a hs ↦ hS.finitelyAtomistic s a (le_trans hs hTS) variable [IsCompactlyGenerated α] lemma atomistic (hS : BooleanGenerators S) (a : α) (ha : a ≤ sSup S) : ∃ T ⊆ S, a = sSup T := by obtain ⟨C, hC, rfl⟩ := IsCompactlyGenerated.exists_sSup_eq a have aux : ∀ b : α, IsCompactElement b → b ≤ sSup S → ∃ T ⊆ S, b = sSup T := by intro b hb hbS obtain ⟨s, hs₁, hs₂⟩ := hb S hbS obtain ⟨t, ht, rfl⟩ := hS.finitelyAtomistic s b hs₁ hb hs₂ refine ⟨t, ?_, Finset.sup_id_eq_sSup t⟩ refine Set.Subset.trans ?_ hs₁ simpa only [Finset.coe_subset] using ht choose T hT₁ hT₂ using aux use sSup {T c h₁ h₂ \| (c ∈ C) (h₁ : IsCompactElement c) (h₂ : c ≤ sSup S)} constructor · apply _root_.sSup_le rintro _ ⟨c, -, h₁, h₂, rfl⟩ apply hT₁ · apply le_antisymm · apply _root_.sSup_le intro c hc rw [hT₂ c (hC _ hc) ((le_sSup hc).trans ha)] apply sSup_le_sSup apply _root_.le_sSup use c, hc, hC _ hc, (le_sSup hc).trans ha · simp only [Set.sSup_eq_sUnion, sSup_le_iff, Set.mem_sUnion, Set.mem_setOf_eq, forall_exists_index, and_imp] rintro a T b hbC hb hbS rfl haT apply (le_sSup haT).trans rw [← hT₂] exact le_sSup hbC lemma isAtomistic_of_sSup_eq_top (hS : BooleanGenerators S) (h : sSup S = ⊤) : IsAtomistic α := by refine CompleteLattice.isAtomistic_iff.2 fun a ↦ ?_ obtain ⟨s, hs, hs'⟩ := hS.atomistic a (h ▸ le_top)	exact ⟨s, hs', fun I hI ↦ hS.isAtom I (hs hI)⟩ lemma mem_of_isAtom_of_le_sSup_atoms (hS : BooleanGenerators S) (a : α) (ha : IsAtom a) (haS : a ≤ sSup S) : a ∈ S := by obtain ⟨T, hT, rfl⟩ := hS.atomistic a haS obtain rfl \| ⟨a, haT⟩ := T.eq_empty_or_nonempty · simp only [sSup_empty] at ha exact (ha.1 rfl).elim suffices sSup T = a from this ▸ hT haT have : a ≤ sSup T := le_sSup haT	Mathlib/Order/BooleanGenerators.lean	105	114
/- Copyright (c) 2020 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers, Yury Kudryashov -/ import Mathlib.Analysis.Normed.Group.Submodule import Mathlib.LinearAlgebra.AffineSpace.AffineSubspace.Basic import Mathlib.LinearAlgebra.AffineSpace.Midpoint import Mathlib.Topology.MetricSpace.IsometricSMul import Mathlib.Topology.Metrizable.Uniformity import Mathlib.Topology.Sequences /-! # Torsors of additive normed group actions. This file defines torsors of additive normed group actions, with a metric space structure. The motivating case is Euclidean affine spaces. -/ noncomputable section open NNReal Topology open Filter /-- A `NormedAddTorsor V P` is a torsor of an additive seminormed group action by a `SeminormedAddCommGroup V` on points `P`. We bundle the pseudometric space structure and require the distance to be the same as results from the norm (which in fact implies the distance yields a pseudometric space, but bundling just the distance and using an instance for the pseudometric space results in type class problems). -/ class NormedAddTorsor (V : outParam Type) (P : Type) [SeminormedAddCommGroup V] [PseudoMetricSpace P] extends AddTorsor V P where dist_eq_norm' : ∀ x y : P, dist x y = ‖(x -ᵥ y : V)‖ /-- Shortcut instance to help typeclass inference out. -/ instance (priority := 100) NormedAddTorsor.toAddTorsor' {V P : Type} [NormedAddCommGroup V] [MetricSpace P] [NormedAddTorsor V P] : AddTorsor V P := NormedAddTorsor.toAddTorsor variable {α V P W Q : Type} [SeminormedAddCommGroup V] [PseudoMetricSpace P] [NormedAddTorsor V P] [NormedAddCommGroup W] [MetricSpace Q] [NormedAddTorsor W Q] instance (priority := 100) NormedAddTorsor.to_isIsIsometricVAdd : IsIsometricVAdd V P := ⟨fun c => Isometry.of_dist_eq fun x y => by simp [NormedAddTorsor.dist_eq_norm']⟩ /-- A `SeminormedAddCommGroup` is a `NormedAddTorsor` over itself. -/ instance (priority := 100) SeminormedAddCommGroup.toNormedAddTorsor : NormedAddTorsor V V where dist_eq_norm' := dist_eq_norm -- Because of the AddTorsor.nonempty instance. /-- A nonempty affine subspace of a `NormedAddTorsor` is itself a `NormedAddTorsor`. -/ instance AffineSubspace.toNormedAddTorsor {R : Type} [Ring R] [Module R V] (s : AffineSubspace R P) [Nonempty s] : NormedAddTorsor s.direction s := { AffineSubspace.toAddTorsor s with dist_eq_norm' := fun x y => NormedAddTorsor.dist_eq_norm' x.val y.val } section variable (V W) /-- The distance equals the norm of subtracting two points. In this lemma, it is necessary to have `V` as an explicit argument; otherwise `rw dist_eq_norm_vsub` sometimes doesn't work. -/ theorem dist_eq_norm_vsub (x y : P) : dist x y = ‖x -ᵥ y‖ := NormedAddTorsor.dist_eq_norm' x y theorem nndist_eq_nnnorm_vsub (x y : P) : nndist x y = ‖x -ᵥ y‖₊ := NNReal.eq <\| dist_eq_norm_vsub V x y /-- The distance equals the norm of subtracting two points. In this lemma, it is necessary to have `V` as an explicit argument; otherwise `rw dist_eq_norm_vsub'` sometimes doesn't work. -/ theorem dist_eq_norm_vsub' (x y : P) : dist x y = ‖y -ᵥ x‖ := (dist_comm _ _).trans (dist_eq_norm_vsub _ _ _) theorem nndist_eq_nnnorm_vsub' (x y : P) : nndist x y = ‖y -ᵥ x‖₊ := NNReal.eq <\| dist_eq_norm_vsub' V x y end theorem dist_vadd_cancel_left (v : V) (x y : P) : dist (v +ᵥ x) (v +ᵥ y) = dist x y := dist_vadd _ _ _ theorem nndist_vadd_cancel_left (v : V) (x y : P) : nndist (v +ᵥ x) (v +ᵥ y) = nndist x y := NNReal.eq <\| dist_vadd_cancel_left _ _ _ @[simp] theorem dist_vadd_cancel_right (v₁ v₂ : V) (x : P) : dist (v₁ +ᵥ x) (v₂ +ᵥ x) = dist v₁ v₂ := by rw [dist_eq_norm_vsub V, dist_eq_norm, vadd_vsub_vadd_cancel_right] @[simp] theorem nndist_vadd_cancel_right (v₁ v₂ : V) (x : P) : nndist (v₁ +ᵥ x) (v₂ +ᵥ x) = nndist v₁ v₂ := NNReal.eq <\| dist_vadd_cancel_right _ _ _ @[simp] theorem dist_vadd_left (v : V) (x : P) : dist (v +ᵥ x) x = ‖v‖ := by simp [dist_eq_norm_vsub V _ x] @[simp] theorem nndist_vadd_left (v : V) (x : P) : nndist (v +ᵥ x) x = ‖v‖₊ := NNReal.eq <\| dist_vadd_left _ _ @[simp] theorem dist_vadd_right (v : V) (x : P) : dist x (v +ᵥ x) = ‖v‖ := by rw [dist_comm, dist_vadd_left] @[simp] theorem nndist_vadd_right (v : V) (x : P) : nndist x (v +ᵥ x) = ‖v‖₊ := NNReal.eq <\| dist_vadd_right _ _ /-- Isometry between the tangent space `V` of a (semi)normed add torsor `P` and `P` given by addition/subtraction of `x : P`. -/ @[simps!] def IsometryEquiv.vaddConst (x : P) : V ≃ᵢ P where toEquiv := Equiv.vaddConst x isometry_toFun := Isometry.of_dist_eq fun _ _ => dist_vadd_cancel_right _ _ _ @[simp] theorem dist_vsub_cancel_left (x y z : P) : dist (x -ᵥ y) (x -ᵥ z) = dist y z := by rw [dist_eq_norm, vsub_sub_vsub_cancel_left, dist_comm, dist_eq_norm_vsub V] @[simp] theorem nndist_vsub_cancel_left (x y z : P) : nndist (x -ᵥ y) (x -ᵥ z) = nndist y z := NNReal.eq <\| dist_vsub_cancel_left _ _ _ /-- Isometry between the tangent space `V` of a (semi)normed add torsor `P` and `P` given by subtraction from `x : P`. -/ @[simps!] def IsometryEquiv.constVSub (x : P) : P ≃ᵢ V where toEquiv := Equiv.constVSub x isometry_toFun := Isometry.of_dist_eq fun _ _ => dist_vsub_cancel_left _ _ _ @[simp] theorem dist_vsub_cancel_right (x y z : P) : dist (x -ᵥ z) (y -ᵥ z) = dist x y := (IsometryEquiv.vaddConst z).symm.dist_eq x y @[simp] theorem nndist_vsub_cancel_right (x y z : P) : nndist (x -ᵥ z) (y -ᵥ z) = nndist x y := NNReal.eq <\| dist_vsub_cancel_right _ _ _ theorem dist_vadd_vadd_le (v v' : V) (p p' : P) : dist (v +ᵥ p) (v' +ᵥ p') ≤ dist v v' + dist p p' := by simpa using dist_triangle (v +ᵥ p) (v' +ᵥ p) (v' +ᵥ p') theorem nndist_vadd_vadd_le (v v' : V) (p p' : P) : nndist (v +ᵥ p) (v' +ᵥ p') ≤ nndist v v' + nndist p p' := dist_vadd_vadd_le _ _ _ _ theorem dist_vsub_vsub_le (p₁ p₂ p₃ p₄ : P) : dist (p₁ -ᵥ p₂) (p₃ -ᵥ p₄) ≤ dist p₁ p₃ + dist p₂ p₄ := by rw [dist_eq_norm, vsub_sub_vsub_comm, dist_eq_norm_vsub V, dist_eq_norm_vsub V] exact norm_sub_le _ _ theorem nndist_vsub_vsub_le (p₁ p₂ p₃ p₄ : P) : nndist (p₁ -ᵥ p₂) (p₃ -ᵥ p₄) ≤ nndist p₁ p₃ + nndist p₂ p₄ := by simp only [← NNReal.coe_le_coe, NNReal.coe_add, ← dist_nndist, dist_vsub_vsub_le] theorem edist_vadd_vadd_le (v v' : V) (p p' : P) : edist (v +ᵥ p) (v' +ᵥ p') ≤ edist v v' + edist p p' := by simp only [edist_nndist] norm_cast -- Porting note: was apply_mod_cast apply dist_vadd_vadd_le theorem edist_vsub_vsub_le (p₁ p₂ p₃ p₄ : P) : edist (p₁ -ᵥ p₂) (p₃ -ᵥ p₄) ≤ edist p₁ p₃ + edist p₂ p₄ := by simp only [edist_nndist] norm_cast -- Porting note: was apply_mod_cast apply dist_vsub_vsub_le /-- The pseudodistance defines a pseudometric space structure on the torsor. This is not an instance because it depends on `V` to define a `MetricSpace P`. -/ def pseudoMetricSpaceOfNormedAddCommGroupOfAddTorsor (V P : Type) [SeminormedAddCommGroup V] [AddTorsor V P] : PseudoMetricSpace P where dist x y := ‖(x -ᵥ y : V)‖ dist_self x := by simp dist_comm x y := by simp only [← neg_vsub_eq_vsub_rev y x, norm_neg] dist_triangle x y z := by rw [← vsub_add_vsub_cancel] apply norm_add_le /-- The distance defines a metric space structure on the torsor. This is not an instance because it depends on `V` to define a `MetricSpace P`. -/ def metricSpaceOfNormedAddCommGroupOfAddTorsor (V P : Type) [NormedAddCommGroup V] [AddTorsor V P] : MetricSpace P where dist x y := ‖(x -ᵥ y : V)‖ dist_self x := by simp eq_of_dist_eq_zero h := by simpa using h dist_comm x y := by simp only [← neg_vsub_eq_vsub_rev y x, norm_neg] dist_triangle x y z := by rw [← vsub_add_vsub_cancel] apply norm_add_le theorem LipschitzWith.vadd [PseudoEMetricSpace α] {f : α → V} {g : α → P} {Kf Kg : ℝ≥0} (hf : LipschitzWith Kf f) (hg : LipschitzWith Kg g) : LipschitzWith (Kf + Kg) (f +ᵥ g) := fun x y => calc edist (f x +ᵥ g x) (f y +ᵥ g y) ≤ edist (f x) (f y) + edist (g x) (g y) := edist_vadd_vadd_le _ _ _ _ _ ≤ Kf edist x y + Kg * edist x y := add_le_add (hf x y) (hg x y) _ = (Kf + Kg) * edist x y := (add_mul _ _ _).symm theorem LipschitzWith.vsub [PseudoEMetricSpace α] {f g : α → P} {Kf Kg : ℝ≥0} (hf : LipschitzWith Kf f) (hg : LipschitzWith Kg g) : LipschitzWith (Kf + Kg) (f -ᵥ g) := fun x y => calc edist (f x -ᵥ g x) (f y -ᵥ g y) ≤ edist (f x) (f y) + edist (g x) (g y) := edist_vsub_vsub_le _ _ _ _ _ ≤ Kf * edist x y + Kg * edist x y := add_le_add (hf x y) (hg x y) _ = (Kf + Kg) * edist x y := (add_mul _ _ _).symm theorem uniformContinuous_vadd : UniformContinuous fun x : V × P => x.1 +ᵥ x.2 := (LipschitzWith.prod_fst.vadd LipschitzWith.prod_snd).uniformContinuous theorem uniformContinuous_vsub : UniformContinuous fun x : P × P => x.1 -ᵥ x.2 := (LipschitzWith.prod_fst.vsub LipschitzWith.prod_snd).uniformContinuous instance (priority := 100) NormedAddTorsor.to_continuousVAdd : ContinuousVAdd V P where continuous_vadd := uniformContinuous_vadd.continuous theorem continuous_vsub : Continuous fun x : P × P => x.1 -ᵥ x.2 := uniformContinuous_vsub.continuous theorem Filter.Tendsto.vsub {l : Filter α} {f g : α → P} {x y : P} (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (f -ᵥ g) l (𝓝 (x -ᵥ y)) := (continuous_vsub.tendsto (x, y)).comp (hf.prodMk_nhds hg) section variable [TopologicalSpace α] @[fun_prop] theorem Continuous.vsub {f g : α → P} (hf : Continuous f) (hg : Continuous g) : Continuous (fun x ↦ f x -ᵥ g x) := continuous_vsub.comp₂ hf hg @[fun_prop] nonrec theorem ContinuousAt.vsub {f g : α → P} {x : α} (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun x ↦ f x -ᵥ g x) x := hf.vsub hg @[fun_prop] nonrec theorem ContinuousWithinAt.vsub {f g : α → P} {x : α} {s : Set α} (hf : ContinuousWithinAt f s x) (hg : ContinuousWithinAt g s x) : ContinuousWithinAt (fun x ↦ f x -ᵥ g x) s x := hf.vsub hg @[fun_prop] theorem ContinuousOn.vsub {f g : α → P} {s : Set α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) : ContinuousOn (fun x ↦ f x -ᵥ g x) s := fun x hx ↦ (hf x hx).vsub (hg x hx) end section variable {R : Type*} [Ring R] [TopologicalSpace R] [Module R V] [ContinuousSMul R V] theorem Filter.Tendsto.lineMap {l : Filter α} {f₁ f₂ : α → P} {g : α → R} {p₁ p₂ : P} {c : R} (h₁ : Tendsto f₁ l (𝓝 p₁)) (h₂ : Tendsto f₂ l (𝓝 p₂)) (hg : Tendsto g l (𝓝 c)) : Tendsto (fun x => AffineMap.lineMap (f₁ x) (f₂ x) (g x)) l (𝓝 <\| AffineMap.lineMap p₁ p₂ c) := (hg.smul (h₂.vsub h₁)).vadd h₁ theorem Filter.Tendsto.midpoint [Invertible (2 : R)] {l : Filter α} {f₁ f₂ : α → P} {p₁ p₂ : P} (h₁ : Tendsto f₁ l (𝓝 p₁)) (h₂ : Tendsto f₂ l (𝓝 p₂)) : Tendsto (fun x => midpoint R (f₁ x) (f₂ x)) l (𝓝 <\| midpoint R p₁ p₂) := h₁.lineMap h₂ tendsto_const_nhds end section Pointwise open Pointwise theorem IsClosed.vadd_right_of_isCompact {s : Set V} {t : Set P} (hs : IsClosed s) (ht : IsCompact t) : IsClosed (s +ᵥ t) := by -- This result is still true for any `AddTorsor` where `-ᵥ` is continuous, -- but we don't yet have a nice way to state it. refine IsSeqClosed.isClosed (fun u p husv hup ↦ ?_) choose! a ha v hv hav using husv rcases ht.isSeqCompact hv with ⟨q, hqt, φ, φ_mono, hφq⟩ refine ⟨p -ᵥ q, hs.mem_of_tendsto ((hup.comp φ_mono.tendsto_atTop).vsub hφq) (Eventually.of_forall fun n ↦ ?_), q, hqt, vsub_vadd _ _⟩ convert ha (φ n) using 1 exact (eq_vadd_iff_vsub_eq _ _ _).mp (hav (φ n)).symm end Pointwise		Mathlib/Analysis/Normed/Group/AddTorsor.lean	324	334
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Yury Kudryashov -/ import Mathlib.Analysis.Calculus.Deriv.Inv import Mathlib.Analysis.Calculus.Deriv.Polynomial import Mathlib.Analysis.SpecialFunctions.ExpDeriv import Mathlib.Analysis.SpecialFunctions.PolynomialExp /-! # Infinitely smooth transition function In this file we construct two infinitely smooth functions with properties that an analytic function cannot have: * `expNegInvGlue` is equal to zero for `x ≤ 0` and is strictly positive otherwise; it is given by `x ↦ exp (-1/x)` for `x > 0`; * `Real.smoothTransition` is equal to zero for `x ≤ 0` and is equal to one for `x ≥ 1`; it is given by `expNegInvGlue x / (expNegInvGlue x + expNegInvGlue (1 - x))`; -/ noncomputable section open scoped Topology open Polynomial Real Filter Set Function /-- `expNegInvGlue` is the real function given by `x ↦ exp (-1/x)` for `x > 0` and `0` for `x ≤ 0`. It is a basic building block to construct smooth partitions of unity. Its main property is that it vanishes for `x ≤ 0`, it is positive for `x > 0`, and the junction between the two behaviors is flat enough to retain smoothness. The fact that this function is `C^∞` is proved in `expNegInvGlue.contDiff`. -/ def expNegInvGlue (x : ℝ) : ℝ := if x ≤ 0 then 0 else exp (-x⁻¹) namespace expNegInvGlue /-- The function `expNegInvGlue` vanishes on `(-∞, 0]`. -/ theorem zero_of_nonpos {x : ℝ} (hx : x ≤ 0) : expNegInvGlue x = 0 := by simp [expNegInvGlue, hx] @[simp] protected theorem zero : expNegInvGlue 0 = 0 := zero_of_nonpos le_rfl /-- The function `expNegInvGlue` is positive on `(0, +∞)`. -/ theorem pos_of_pos {x : ℝ} (hx : 0 < x) : 0 < expNegInvGlue x := by simp [expNegInvGlue, not_le.2 hx, exp_pos] /-- The function `expNegInvGlue` is nonnegative. -/ theorem nonneg (x : ℝ) : 0 ≤ expNegInvGlue x := by cases le_or_gt x 0 with \| inl h => exact ge_of_eq (zero_of_nonpos h)	\| inr h => exact le_of_lt (pos_of_pos h)	Mathlib/Analysis/SpecialFunctions/SmoothTransition.lean	53	54
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Jeremy Avigad, Yury Kudryashov -/ import Mathlib.Data.Finite.Prod import Mathlib.Data.Fintype.Pi import Mathlib.Data.Set.Finite.Lemmas import Mathlib.Order.ConditionallyCompleteLattice.Basic import Mathlib.Order.Filter.CountablyGenerated import Mathlib.Order.Filter.Ker import Mathlib.Order.Filter.Pi import Mathlib.Order.Filter.Prod import Mathlib.Order.Filter.AtTopBot.Basic /-! # The cofinite filter In this file we define `Filter.cofinite`: the filter of sets with finite complement and prove its basic properties. In particular, we prove that for `ℕ` it is equal to `Filter.atTop`. ## TODO Define filters for other cardinalities of the complement. -/ open Set Function variable {ι α β : Type*} {l : Filter α} namespace Filter /-- The cofinite filter is the filter of subsets whose complements are finite. -/ def cofinite : Filter α := comk Set.Finite finite_empty (fun _t ht _s hsub ↦ ht.subset hsub) fun _ h _ ↦ h.union @[simp] theorem mem_cofinite {s : Set α} : s ∈ @cofinite α ↔ sᶜ.Finite := Iff.rfl @[simp] theorem eventually_cofinite {p : α → Prop} : (∀ᶠ x in cofinite, p x) ↔ { x \| ¬p x }.Finite := Iff.rfl theorem hasBasis_cofinite : HasBasis cofinite (fun s : Set α => s.Finite) compl := ⟨fun s => ⟨fun h => ⟨sᶜ, h, (compl_compl s).subset⟩, fun ⟨_t, htf, hts⟩ => htf.subset <\| compl_subset_comm.2 hts⟩⟩ instance cofinite_neBot [Infinite α] : NeBot (@cofinite α) := hasBasis_cofinite.neBot_iff.2 fun hs => hs.infinite_compl.nonempty @[simp] theorem cofinite_eq_bot_iff : @cofinite α = ⊥ ↔ Finite α := by simp [← empty_mem_iff_bot, finite_univ_iff] @[simp] theorem cofinite_eq_bot [Finite α] : @cofinite α = ⊥ := cofinite_eq_bot_iff.2 ‹_› theorem frequently_cofinite_iff_infinite {p : α → Prop} : (∃ᶠ x in cofinite, p x) ↔ Set.Infinite { x \| p x } := by simp only [Filter.Frequently, eventually_cofinite, not_not, Set.Infinite] lemma frequently_cofinite_mem_iff_infinite {s : Set α} : (∃ᶠ x in cofinite, x ∈ s) ↔ s.Infinite := frequently_cofinite_iff_infinite alias ⟨_, _root_.Set.Infinite.frequently_cofinite⟩ := frequently_cofinite_mem_iff_infinite @[simp] lemma cofinite_inf_principal_neBot_iff {s : Set α} : (cofinite ⊓ 𝓟 s).NeBot ↔ s.Infinite := frequently_mem_iff_neBot.symm.trans frequently_cofinite_mem_iff_infinite alias ⟨_, _root_.Set.Infinite.cofinite_inf_principal_neBot⟩ := cofinite_inf_principal_neBot_iff theorem _root_.Set.Finite.compl_mem_cofinite {s : Set α} (hs : s.Finite) : sᶜ ∈ @cofinite α := mem_cofinite.2 <\| (compl_compl s).symm ▸ hs theorem _root_.Set.Finite.eventually_cofinite_nmem {s : Set α} (hs : s.Finite) : ∀ᶠ x in cofinite, x ∉ s := hs.compl_mem_cofinite theorem _root_.Finset.eventually_cofinite_nmem (s : Finset α) : ∀ᶠ x in cofinite, x ∉ s := s.finite_toSet.eventually_cofinite_nmem theorem _root_.Set.infinite_iff_frequently_cofinite {s : Set α} : Set.Infinite s ↔ ∃ᶠ x in cofinite, x ∈ s := frequently_cofinite_iff_infinite.symm theorem eventually_cofinite_ne (x : α) : ∀ᶠ a in cofinite, a ≠ x := (Set.finite_singleton x).eventually_cofinite_nmem theorem le_cofinite_iff_compl_singleton_mem : l ≤ cofinite ↔ ∀ x, {x}ᶜ ∈ l := by refine ⟨fun h x => h (finite_singleton x).compl_mem_cofinite, fun h s (hs : sᶜ.Finite) => ?_⟩ rw [← compl_compl s, ← biUnion_of_singleton sᶜ, compl_iUnion₂, Filter.biInter_mem hs] exact fun x _ => h x theorem le_cofinite_iff_eventually_ne : l ≤ cofinite ↔ ∀ x, ∀ᶠ y in l, y ≠ x :=	le_cofinite_iff_compl_singleton_mem /-- If `α` is a preorder with no top element, then `atTop ≤ cofinite`. -/ theorem atTop_le_cofinite [Preorder α] [NoTopOrder α] : (atTop : Filter α) ≤ cofinite :=	Mathlib/Order/Filter/Cofinite.lean	101	104
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Bhavik Mehta, Stuart Presnell -/ import Mathlib.Data.Nat.Factorial.Basic import Mathlib.Order.Monotone.Defs /-! # Binomial coefficients This file defines binomial coefficients and proves simple lemmas (i.e. those not requiring more imports). For the lemma that `n.choose k` counts the `k`-element-subsets of an `n`-element set, see `Fintype.card_powersetCard` in `Mathlib.Data.Finset.Powerset`. ## Main definition and results * `Nat.choose`: binomial coefficients, defined inductively * `Nat.choose_eq_factorial_div_factorial`: a proof that `choose n k = n! / (k! * (n - k)!)` * `Nat.choose_symm`: symmetry of binomial coefficients * `Nat.choose_le_succ_of_lt_half_left`: `choose n k` is increasing for small values of `k` * `Nat.choose_le_middle`: `choose n r` is maximised when `r` is `n/2` * `Nat.descFactorial_eq_factorial_mul_choose`: Relates binomial coefficients to the descending factorial. This is used to prove `Nat.choose_le_pow` and variants. We provide similar statements for the ascending factorial. * `Nat.multichoose`: whereas `choose` counts combinations, `multichoose` counts multicombinations. The fact that this is indeed the correct counting function for multisets is proved in `Sym.card_sym_eq_multichoose` in `Data.Sym.Card`. * `Nat.multichoose_eq` : a proof that `multichoose n k = (n + k - 1).choose k`. This is central to the "stars and bars" technique in informal mathematics, where we switch between counting multisets of size `k` over an alphabet of size `n` to counting strings of `k` elements ("stars") separated by `n-1` dividers ("bars"). See `Data.Sym.Card` for more detail. ## Tags binomial coefficient, combination, multicombination, stars and bars -/ open Nat namespace Nat /-- `choose n k` is the number of `k`-element subsets in an `n`-element set. Also known as binomial coefficients. For the fact that this is the number of `k`-element-subsets of an `n`-element set, see `Fintype.card_powersetCard`. -/ def choose : ℕ → ℕ → ℕ \| _, 0 => 1 \| 0, _ + 1 => 0 \| n + 1, k + 1 => choose n k + choose n (k + 1) @[simp] theorem choose_zero_right (n : ℕ) : choose n 0 = 1 := by cases n <;> rfl @[simp] theorem choose_zero_succ (k : ℕ) : choose 0 (succ k) = 0 := rfl theorem choose_succ_succ (n k : ℕ) : choose (succ n) (succ k) = choose n k + choose n (succ k) := rfl theorem choose_succ_succ' (n k : ℕ) : choose (n + 1) (k + 1) = choose n k + choose n (k + 1) := rfl theorem choose_succ_left (n k : ℕ) (hk : 0 < k) : choose (n + 1) k = choose n (k - 1) + choose n k := by obtain ⟨l, rfl⟩ : ∃ l, k = l + 1 := Nat.exists_eq_add_of_le' hk rfl theorem choose_succ_right (n k : ℕ) (hn : 0 < n) : choose n (k + 1) = choose (n - 1) k + choose (n - 1) (k + 1) := by obtain ⟨l, rfl⟩ : ∃ l, n = l + 1 := Nat.exists_eq_add_of_le' hn rfl theorem choose_eq_choose_pred_add {n k : ℕ} (hn : 0 < n) (hk : 0 < k) : choose n k = choose (n - 1) (k - 1) + choose (n - 1) k := by obtain ⟨l, rfl⟩ : ∃ l, k = l + 1 := Nat.exists_eq_add_of_le' hk rw [choose_succ_right _ _ hn, Nat.add_one_sub_one] theorem choose_eq_zero_of_lt : ∀ {n k}, n < k → choose n k = 0 \| _, 0, hk => absurd hk (Nat.not_lt_zero _) \| 0, _ + 1, _ => choose_zero_succ _ \| n + 1, k + 1, hk => by have hnk : n < k := lt_of_succ_lt_succ hk have hnk1 : n < k + 1 := lt_of_succ_lt hk rw [choose_succ_succ, choose_eq_zero_of_lt hnk, choose_eq_zero_of_lt hnk1] @[simp] theorem choose_self (n : ℕ) : choose n n = 1 := by induction n <;> simp [, choose, choose_eq_zero_of_lt (lt_succ_self _)] @[simp] theorem choose_succ_self (n : ℕ) : choose n (succ n) = 0 := choose_eq_zero_of_lt (lt_succ_self _) @[simp] lemma choose_one_right (n : ℕ) : choose n 1 = n := by induction n <;> simp [, choose, Nat.add_comm] -- The `n+1`-st triangle number is `n` more than the `n`-th triangle number theorem triangle_succ (n : ℕ) : (n + 1) * (n + 1 - 1) / 2 = n * (n - 1) / 2 + n := by rw [← add_mul_div_left, Nat.mul_comm 2 n, ← Nat.mul_add, Nat.add_sub_cancel, Nat.mul_comm] cases n <;> rfl; apply zero_lt_succ /-- `choose n 2` is the `n`-th triangle number. -/ theorem choose_two_right (n : ℕ) : choose n 2 = n * (n - 1) / 2 := by induction' n with n ih · simp · rw [triangle_succ n, choose, ih] simp [Nat.add_comm] theorem choose_pos : ∀ {n k}, k ≤ n → 0 < choose n k \| 0, _, hk => by rw [Nat.eq_zero_of_le_zero hk]; decide \| n + 1, 0, _ => by simp \| _ + 1, _ + 1, hk => Nat.add_pos_left (choose_pos (le_of_succ_le_succ hk)) _ theorem choose_eq_zero_iff {n k : ℕ} : n.choose k = 0 ↔ n < k := ⟨fun h => lt_of_not_ge (mt Nat.choose_pos h.symm.not_lt), Nat.choose_eq_zero_of_lt⟩ theorem succ_mul_choose_eq : ∀ n k, succ n * choose n k = choose (succ n) (succ k) * succ k \| 0, 0 => by decide \| 0, k + 1 => by simp [choose] \| n + 1, 0 => by simp [choose, mul_succ, Nat.add_comm] \| n + 1, k + 1 => by rw [choose_succ_succ (succ n) (succ k), Nat.add_mul, ← succ_mul_choose_eq n, mul_succ, ← succ_mul_choose_eq n, Nat.add_right_comm, ← Nat.mul_add, ← choose_succ_succ, ← succ_mul] theorem choose_mul_factorial_mul_factorial : ∀ {n k}, k ≤ n → choose n k * k ! * (n - k)! = n ! \| 0, _, hk => by simp [Nat.eq_zero_of_le_zero hk] \| n + 1, 0, _ => by simp \| n + 1, succ k, hk => by rcases lt_or_eq_of_le hk with hk₁ \| hk₁ · have h : choose n k * k.succ ! * (n - k)! = (k + 1) * n ! := by rw [← choose_mul_factorial_mul_factorial (le_of_succ_le_succ hk)] simp [factorial_succ, Nat.mul_comm, Nat.mul_left_comm, Nat.mul_assoc] have h₁ : (n - k)! = (n - k) * (n - k.succ)! := by rw [← succ_sub_succ, succ_sub (le_of_lt_succ hk₁), factorial_succ] have h₂ : choose n (succ k) * k.succ ! * ((n - k) * (n - k.succ)!) = (n - k) * n ! := by rw [← choose_mul_factorial_mul_factorial (le_of_lt_succ hk₁)] simp [factorial_succ, Nat.mul_comm, Nat.mul_left_comm, Nat.mul_assoc] have h₃ : k * n ! ≤ n * n ! := Nat.mul_le_mul_right _ (le_of_succ_le_succ hk) rw [choose_succ_succ, Nat.add_mul, Nat.add_mul, succ_sub_succ, h, h₁, h₂, Nat.add_mul, Nat.mul_sub_right_distrib, factorial_succ, ← Nat.add_sub_assoc h₃, Nat.add_assoc, ← Nat.add_mul, Nat.add_sub_cancel_left, Nat.add_comm] · rw [hk₁]; simp [hk₁, Nat.mul_comm, choose, Nat.sub_self] theorem choose_mul {n k s : ℕ} (hkn : k ≤ n) (hsk : s ≤ k) : n.choose k * k.choose s = n.choose s * (n - s).choose (k - s) := have h : 0 < (n - k)! * (k - s)! * s ! := by apply_rules [factorial_pos, Nat.mul_pos] Nat.mul_right_cancel h <\| calc n.choose k * k.choose s * ((n - k)! * (k - s)! * s !) = n.choose k * (k.choose s * s ! * (k - s)!) * (n - k)! := by rw [Nat.mul_assoc, Nat.mul_assoc, Nat.mul_assoc, Nat.mul_assoc _ s !, Nat.mul_assoc, Nat.mul_comm (n - k)!, Nat.mul_comm s !] _ = n ! := by rw [choose_mul_factorial_mul_factorial hsk, choose_mul_factorial_mul_factorial hkn] _ = n.choose s * s ! * ((n - s).choose (k - s) * (k - s)! * (n - s - (k - s))!) := by rw [choose_mul_factorial_mul_factorial (Nat.sub_le_sub_right hkn _), choose_mul_factorial_mul_factorial (hsk.trans hkn)] _ = n.choose s * (n - s).choose (k - s) * ((n - k)! * (k - s)! * s !) := by rw [Nat.sub_sub_sub_cancel_right hsk, Nat.mul_assoc, Nat.mul_left_comm s !, Nat.mul_assoc, Nat.mul_comm (k - s)!, Nat.mul_comm s !, Nat.mul_right_comm, ← Nat.mul_assoc] theorem choose_eq_factorial_div_factorial {n k : ℕ} (hk : k ≤ n) : choose n k = n ! / (k ! * (n - k)!) := by rw [← choose_mul_factorial_mul_factorial hk, Nat.mul_assoc] exact (mul_div_left _ (Nat.mul_pos (factorial_pos _) (factorial_pos _))).symm theorem add_choose (i j : ℕ) : (i + j).choose j = (i + j)! / (i ! * j !) := by rw [choose_eq_factorial_div_factorial (Nat.le_add_left j i), Nat.add_sub_cancel_right, Nat.mul_comm] theorem add_choose_mul_factorial_mul_factorial (i j : ℕ) : (i + j).choose j * i ! * j ! = (i + j)! := by rw [← choose_mul_factorial_mul_factorial (Nat.le_add_left _ _), Nat.add_sub_cancel_right, Nat.mul_right_comm] theorem factorial_mul_factorial_dvd_factorial {n k : ℕ} (hk : k ≤ n) : k ! * (n - k)! ∣ n ! := by rw [← choose_mul_factorial_mul_factorial hk, Nat.mul_assoc]; exact Nat.dvd_mul_left _ _ theorem factorial_mul_factorial_dvd_factorial_add (i j : ℕ) : i ! * j ! ∣ (i + j)! := by suffices i ! * (i + j - i) ! ∣ (i + j)! by rwa [Nat.add_sub_cancel_left i j] at this exact factorial_mul_factorial_dvd_factorial (Nat.le_add_right _ _) @[simp] theorem choose_symm {n k : ℕ} (hk : k ≤ n) : choose n (n - k) = choose n k := by rw [choose_eq_factorial_div_factorial hk, choose_eq_factorial_div_factorial (Nat.sub_le _ _), Nat.sub_sub_self hk, Nat.mul_comm] theorem choose_symm_of_eq_add {n a b : ℕ} (h : n = a + b) : Nat.choose n a = Nat.choose n b := by suffices choose n (n - b) = choose n b by rw [h, Nat.add_sub_cancel_right] at this; rwa [h] exact choose_symm (h ▸ le_add_left _ _) theorem choose_symm_add {a b : ℕ} : choose (a + b) a = choose (a + b) b := choose_symm_of_eq_add rfl theorem choose_symm_half (m : ℕ) : choose (2 * m + 1) (m + 1) = choose (2 * m + 1) m := by apply choose_symm_of_eq_add rw [Nat.add_comm m 1, Nat.add_assoc 1 m m, Nat.add_comm (2 * m) 1, Nat.two_mul m] theorem choose_succ_right_eq (n k : ℕ) : choose n (k + 1) * (k + 1) = choose n k * (n - k) := by have e : (n + 1) * choose n k = choose n (k + 1) * (k + 1) + choose n k * (k + 1) := by rw [← Nat.add_mul, Nat.add_comm (choose _ _), ← choose_succ_succ, succ_mul_choose_eq] rw [← Nat.sub_eq_of_eq_add e, Nat.mul_comm, ← Nat.mul_sub_left_distrib, Nat.add_sub_add_right] @[simp] theorem choose_succ_self_right : ∀ n : ℕ, (n + 1).choose n = n + 1 \| 0 => rfl \| n + 1 => by rw [choose_succ_succ, choose_succ_self_right n, choose_self] theorem choose_mul_succ_eq (n k : ℕ) : n.choose k * (n + 1) = (n + 1).choose k * (n + 1 - k) := by cases k with \| zero => simp \| succ k => obtain hk \| hk := le_or_lt (k + 1) (n + 1) · rw [choose_succ_succ, Nat.add_mul, succ_sub_succ, ← choose_succ_right_eq, ← succ_sub_succ, Nat.mul_sub_left_distrib, Nat.add_sub_cancel' (Nat.mul_le_mul_left _ hk)] · rw [choose_eq_zero_of_lt hk, choose_eq_zero_of_lt (n.lt_succ_self.trans hk), Nat.zero_mul, Nat.zero_mul] theorem ascFactorial_eq_factorial_mul_choose (n k : ℕ) : (n + 1).ascFactorial k = k ! * (n + k).choose k := by rw [Nat.mul_comm] apply Nat.mul_right_cancel (n + k - k).factorial_pos rw [choose_mul_factorial_mul_factorial <\| Nat.le_add_left k n, Nat.add_sub_cancel_right, ← factorial_mul_ascFactorial, Nat.mul_comm] theorem ascFactorial_eq_factorial_mul_choose' (n k : ℕ) : n.ascFactorial k = k ! * (n + k - 1).choose k := by cases n · cases k · rw [ascFactorial_zero, choose_zero_right, factorial_zero, Nat.mul_one] · simp only [zero_ascFactorial, zero_eq, Nat.zero_add, succ_sub_succ_eq_sub, Nat.le_zero_eq, Nat.sub_zero, choose_succ_self, Nat.mul_zero] rw [ascFactorial_eq_factorial_mul_choose] simp only [succ_add_sub_one] theorem factorial_dvd_ascFactorial (n k : ℕ) : k ! ∣ n.ascFactorial k := ⟨(n + k - 1).choose k, ascFactorial_eq_factorial_mul_choose' _ _⟩ theorem choose_eq_asc_factorial_div_factorial (n k : ℕ) : (n + k).choose k = (n + 1).ascFactorial k / k ! := by apply Nat.mul_left_cancel k.factorial_pos rw [← ascFactorial_eq_factorial_mul_choose] exact (Nat.mul_div_cancel' <\| factorial_dvd_ascFactorial _ _).symm theorem choose_eq_asc_factorial_div_factorial' (n k : ℕ) : (n + k - 1).choose k = n.ascFactorial k / k ! := Nat.eq_div_of_mul_eq_right k.factorial_ne_zero (ascFactorial_eq_factorial_mul_choose' _ _).symm theorem descFactorial_eq_factorial_mul_choose (n k : ℕ) : n.descFactorial k = k ! * n.choose k := by obtain h \| h := Nat.lt_or_ge n k · rw [descFactorial_eq_zero_iff_lt.2 h, choose_eq_zero_of_lt h, Nat.mul_zero] rw [Nat.mul_comm] apply Nat.mul_right_cancel (n - k).factorial_pos rw [choose_mul_factorial_mul_factorial h, ← factorial_mul_descFactorial h, Nat.mul_comm] theorem factorial_dvd_descFactorial (n k : ℕ) : k ! ∣ n.descFactorial k := ⟨n.choose k, descFactorial_eq_factorial_mul_choose _ _⟩ theorem choose_eq_descFactorial_div_factorial (n k : ℕ) : n.choose k = n.descFactorial k / k ! := Nat.eq_div_of_mul_eq_right k.factorial_ne_zero (descFactorial_eq_factorial_mul_choose _ _).symm /-- A faster implementation of `choose`, to be used during bytecode evaluation and in compiled code. -/ def fast_choose n k := Nat.descFactorial n k / Nat.factorial k @[csimp] lemma choose_eq_fast_choose : Nat.choose = fast_choose := funext (fun _ => funext (Nat.choose_eq_descFactorial_div_factorial _)) /-! ### Inequalities -/ /-- Show that `Nat.choose` is increasing for small values of the right argument. -/ theorem choose_le_succ_of_lt_half_left {r n : ℕ} (h : r < n / 2) : choose n r ≤ choose n (r + 1) := by refine Nat.le_of_mul_le_mul_right ?_ (Nat.sub_pos_of_lt (h.trans_le (n.div_le_self 2))) rw [← choose_succ_right_eq] apply Nat.mul_le_mul_left rw [← Nat.lt_iff_add_one_le, Nat.lt_sub_iff_add_lt, ← Nat.mul_two] exact lt_of_lt_of_le (Nat.mul_lt_mul_of_pos_right h Nat.zero_lt_two) (n.div_mul_le_self 2) /-- Show that for small values of the right argument, the middle value is largest. -/ private theorem choose_le_middle_of_le_half_left {n r : ℕ} (hr : r ≤ n / 2) : choose n r ≤ choose n (n / 2) := by induction hr using decreasingInduction with \| self => rfl \| of_succ k hk ih => exact (choose_le_succ_of_lt_half_left hk).trans ih /-- `choose n r` is maximised when `r` is `n/2`. -/ theorem choose_le_middle (r n : ℕ) : choose n r ≤ choose n (n / 2) := by rcases le_or_gt r n with b \| b · rcases le_or_lt r (n / 2) with a \| h · apply choose_le_middle_of_le_half_left a · rw [← choose_symm b] apply choose_le_middle_of_le_half_left rw [div_lt_iff_lt_mul Nat.zero_lt_two] at h rw [le_div_iff_mul_le Nat.zero_lt_two, Nat.mul_sub_right_distrib, Nat.sub_le_iff_le_add, ← Nat.sub_le_iff_le_add', Nat.mul_two, Nat.add_sub_cancel] exact le_of_lt h · rw [choose_eq_zero_of_lt b] apply zero_le /-! #### Inequalities about increasing the first argument -/ theorem choose_le_succ (a c : ℕ) : choose a c ≤ choose a.succ c := by cases c <;> simp [Nat.choose_succ_succ] theorem choose_le_add (a b c : ℕ) : choose a c ≤ choose (a + b) c := by	induction' b with b_n b_ih · simp exact le_trans b_ih (choose_le_succ (a + b_n) c) theorem choose_le_choose {a b : ℕ} (c : ℕ) (h : a ≤ b) : choose a c ≤ choose b c := Nat.add_sub_cancel' h ▸ choose_le_add a (b - a) c theorem choose_mono (b : ℕ) : Monotone fun a => choose a b := fun _ _ => choose_le_choose b /-! #### Multichoose Whereas `choose n k` is the number of subsets of cardinality `k` from a type of cardinality `n`,	Mathlib/Data/Nat/Choose/Basic.lean	315	326
/- 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.Finite.Defs import Mathlib.Data.Finset.BooleanAlgebra import Mathlib.Data.Finset.Image import Mathlib.Data.Fintype.Defs import Mathlib.Data.Fintype.OfMap import Mathlib.Data.Fintype.Sets import Mathlib.Data.List.FinRange /-! # Instances for finite types This file is a collection of basic `Fintype` instances for types such as `Fin`, `Prod` and pi types. -/ assert_not_exists Monoid open Function open Nat universe u v variable {α β γ : Type} open Finset instance Fin.fintype (n : ℕ) : Fintype (Fin n) := ⟨⟨List.finRange n, List.nodup_finRange n⟩, List.mem_finRange⟩ theorem Fin.univ_def (n : ℕ) : (univ : Finset (Fin n)) = ⟨List.finRange n, List.nodup_finRange n⟩ := rfl theorem Finset.val_univ_fin (n : ℕ) : (Finset.univ : Finset (Fin n)).val = List.finRange n := rfl /-- See also `nonempty_encodable`, `nonempty_denumerable`. -/ theorem nonempty_fintype (α : Type) [Finite α] : Nonempty (Fintype α) := by rcases Finite.exists_equiv_fin α with ⟨n, ⟨e⟩⟩ exact ⟨.ofEquiv _ e.symm⟩ @[simp] theorem List.toFinset_finRange (n : ℕ) : (List.finRange n).toFinset = Finset.univ := by ext; simp @[simp] theorem Fin.univ_val_map {n : ℕ} (f : Fin n → α) : Finset.univ.val.map f = List.ofFn f := by simp [List.ofFn_eq_map, univ_def] theorem Fin.univ_image_def {n : ℕ} [DecidableEq α] (f : Fin n → α) : Finset.univ.image f = (List.ofFn f).toFinset := by simp [Finset.image] theorem Fin.univ_map_def {n : ℕ} (f : Fin n ↪ α) : Finset.univ.map f = ⟨List.ofFn f, List.nodup_ofFn.mpr f.injective⟩ := by simp [Finset.map] @[simp] theorem Fin.image_succAbove_univ {n : ℕ} (i : Fin (n + 1)) : univ.image i.succAbove = {i}ᶜ := by ext m simp @[simp] theorem Fin.image_succ_univ (n : ℕ) : (univ : Finset (Fin n)).image Fin.succ = {0}ᶜ := by rw [← Fin.succAbove_zero, Fin.image_succAbove_univ] @[simp] theorem Fin.image_castSucc (n : ℕ) : (univ : Finset (Fin n)).image Fin.castSucc = {Fin.last n}ᶜ := by rw [← Fin.succAbove_last, Fin.image_succAbove_univ] /- The following three lemmas use `Finset.cons` instead of `insert` and `Finset.map` instead of `Finset.image` to reduce proof obligations downstream. -/ /-- Embed `Fin n` into `Fin (n + 1)` by prepending zero to the `univ` -/ theorem Fin.univ_succ (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons 0 (univ.map ⟨Fin.succ, Fin.succ_injective _⟩) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by appending a new `Fin.last n` to the `univ` -/ theorem Fin.univ_castSuccEmb (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons (Fin.last n) (univ.map Fin.castSuccEmb) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by inserting around a specified pivot `p : Fin (n + 1)` into the `univ` -/ theorem Fin.univ_succAbove (n : ℕ) (p : Fin (n + 1)) : (univ : Finset (Fin (n + 1))) = Finset.cons p (univ.map <\| Fin.succAboveEmb p) (by simp) := by simp [map_eq_image] @[simp] theorem Fin.univ_image_get [DecidableEq α] (l : List α) : Finset.univ.image l.get = l.toFinset := by simp [univ_image_def] @[simp] theorem Fin.univ_image_getElem' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (fun i : Fin l.length => f <\| l[(i : Nat)]) = (l.map f).toFinset := by simp only [univ_image_def, List.ofFn_getElem_eq_map] theorem Fin.univ_image_get' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (f <\| l.get ·) = (l.map f).toFinset := by simp @[instance] def Unique.fintype {α : Type} [Unique α] : Fintype α := Fintype.ofSubsingleton default /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq (y : α) : Fintype { x // x = y } := Fintype.subtype {y} (by simp) /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq' (y : α) : Fintype { x // y = x } := Fintype.subtype {y} (by simp [eq_comm]) theorem Fintype.univ_empty : @univ Empty _ = ∅ := rfl theorem Fintype.univ_pempty : @univ PEmpty _ = ∅ := rfl instance Unit.fintype : Fintype Unit := Fintype.ofSubsingleton () theorem Fintype.univ_unit : @univ Unit _ = {()} := rfl instance PUnit.fintype : Fintype PUnit := Fintype.ofSubsingleton PUnit.unit theorem Fintype.univ_punit : @univ PUnit _ = {PUnit.unit} := rfl @[simp] theorem Fintype.univ_bool : @univ Bool _ = {true, false} := rfl /-- Given that `α × β` is a fintype, `α` is also a fintype. -/ def Fintype.prodLeft {α β} [DecidableEq α] [Fintype (α × β)] [Nonempty β] : Fintype α := ⟨(@univ (α × β) _).image Prod.fst, fun a => by simp⟩ /-- Given that `α × β` is a fintype, `β` is also a fintype. -/ def Fintype.prodRight {α β} [DecidableEq β] [Fintype (α × β)] [Nonempty α] : Fintype β := ⟨(@univ (α × β) _).image Prod.snd, fun b => by simp⟩ instance ULift.fintype (α : Type) [Fintype α] : Fintype (ULift α) := Fintype.ofEquiv _ Equiv.ulift.symm instance PLift.fintype (α : Type) [Fintype α] : Fintype (PLift α) := Fintype.ofEquiv _ Equiv.plift.symm instance PLift.fintypeProp (p : Prop) [Decidable p] : Fintype (PLift p) := ⟨if h : p then {⟨h⟩} else ∅, fun ⟨h⟩ => by simp [h]⟩ instance Quotient.fintype [Fintype α] (s : Setoid α) [DecidableRel ((· ≈ ·) : α → α → Prop)] : Fintype (Quotient s) := Fintype.ofSurjective Quotient.mk'' Quotient.mk''_surjective instance PSigma.fintypePropLeft {α : Prop} {β : α → Type} [Decidable α] [∀ a, Fintype (β a)] : Fintype (Σ'a, β a) := if h : α then Fintype.ofEquiv (β h) ⟨fun x => ⟨h, x⟩, PSigma.snd, fun _ => rfl, fun ⟨_, _⟩ => rfl⟩ else ⟨∅, fun x => (h x.1).elim⟩ instance PSigma.fintypePropRight {α : Type} {β : α → Prop} [∀ a, Decidable (β a)] [Fintype α] : Fintype (Σ'a, β a) := Fintype.ofEquiv { a // β a } ⟨fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨_, _⟩ => rfl, fun ⟨_, _⟩ => rfl⟩ instance PSigma.fintypePropProp {α : Prop} {β : α → Prop} [Decidable α] [∀ a, Decidable (β a)] : Fintype (Σ'a, β a) := if h : ∃ a, β a then ⟨{⟨h.fst, h.snd⟩}, fun ⟨_, _⟩ => by simp⟩ else ⟨∅, fun ⟨x, y⟩ => (h ⟨x, y⟩).elim⟩ instance pfunFintype (p : Prop) [Decidable p] (α : p → Type) [∀ hp, Fintype (α hp)] : Fintype (∀ hp : p, α hp) := if hp : p then Fintype.ofEquiv (α hp) ⟨fun a _ => a, fun f => f hp, fun _ => rfl, fun _ => rfl⟩ else ⟨singleton fun h => (hp h).elim, fun h => mem_singleton.2 (funext fun x => by contradiction)⟩ section Trunc /-- For `s : Multiset α`, we can lift the existential statement that `∃ x, x ∈ s` to a `Trunc α`. -/ def truncOfMultisetExistsMem {α} (s : Multiset α) : (∃ x, x ∈ s) → Trunc α := Quotient.recOnSubsingleton s fun l h => match l, h with \| [], _ => False.elim (by tauto) \| a :: _, _ => Trunc.mk a /-- A `Nonempty` `Fintype` constructively contains an element. -/ def truncOfNonemptyFintype (α) [Nonempty α] [Fintype α] : Trunc α := truncOfMultisetExistsMem Finset.univ.val (by simp) /-- By iterating over the elements of a fintype, we can lift an existential statement `∃ a, P a` to `Trunc (Σ' a, P a)`, containing data. -/ def truncSigmaOfExists {α} [Fintype α] {P : α → Prop} [DecidablePred P] (h : ∃ a, P a) : Trunc (Σ'a, P a) := @truncOfNonemptyFintype (Σ'a, P a) ((Exists.elim h) fun a ha => ⟨⟨a, ha⟩⟩) _ end Trunc namespace Multiset variable [Fintype α] [Fintype β] @[simp] theorem count_univ [DecidableEq α] (a : α) : count a Finset.univ.val = 1 := count_eq_one_of_mem Finset.univ.nodup (Finset.mem_univ _) @[simp] theorem map_univ_val_equiv (e : α ≃ β) : map e univ.val = univ.val := by rw [← congr_arg Finset.val (Finset.map_univ_equiv e), Finset.map_val, Equiv.coe_toEmbedding] /-- For functions on finite sets, they are bijections iff they map universes into universes. -/ @[simp] theorem bijective_iff_map_univ_eq_univ (f : α → β) : f.Bijective ↔ map f (Finset.univ : Finset α).val = univ.val := ⟨fun bij ↦ congr_arg (·.val) (map_univ_equiv <\| Equiv.ofBijective f bij), fun eq ↦ ⟨ fun a₁ a₂ ↦ inj_on_of_nodup_map (eq.symm ▸ univ.nodup) _ (mem_univ a₁) _ (mem_univ a₂), fun b ↦ have ⟨a, _, h⟩ := mem_map.mp (eq.symm ▸ mem_univ_val b); ⟨a, h⟩⟩⟩ end Multiset /-- Auxiliary definition to show `exists_seq_of_forall_finset_exists`. -/ noncomputable def seqOfForallFinsetExistsAux {α : Type} [DecidableEq α] (P : α → Prop) (r : α → α → Prop) (h : ∀ s : Finset α, ∃ y, (∀ x ∈ s, P x) → P y ∧ ∀ x ∈ s, r x y) : ℕ → α \| n => Classical.choose (h (Finset.image (fun i : Fin n => seqOfForallFinsetExistsAux P r h i) (Finset.univ : Finset (Fin n)))) /-- Induction principle to build a sequence, by adding one point at a time satisfying a given relation with respect to all the previously chosen points. More precisely, Assume that, for any finite set `s`, one can find another point satisfying some relation `r` with respect to all the points in `s`. Then one may construct a function `f : ℕ → α` such that `r (f m) (f n)` holds whenever `m < n`. We also ensure that all constructed points satisfy a given predicate `P`. -/ theorem exists_seq_of_forall_finset_exists {α : Type} (P : α → Prop) (r : α → α → Prop) (h : ∀ s : Finset α, (∀ x ∈ s, P x) → ∃ y, P y ∧ ∀ x ∈ s, r x y) : ∃ f : ℕ → α, (∀ n, P (f n)) ∧ ∀ m n, m < n → r (f m) (f n) := by classical have : Nonempty α := by rcases h ∅ (by simp) with ⟨y, _⟩ exact ⟨y⟩ choose! F hF using h have h' : ∀ s : Finset α, ∃ y, (∀ x ∈ s, P x) → P y ∧ ∀ x ∈ s, r x y := fun s => ⟨F s, hF s⟩ set f := seqOfForallFinsetExistsAux P r h' with hf have A : ∀ n : ℕ, P (f n) := by intro n induction' n using Nat.strong_induction_on with n IH have IH' : ∀ x : Fin n, P (f x) := fun n => IH n.1 n.2 rw [hf, seqOfForallFinsetExistsAux] exact (Classical.choose_spec (h' (Finset.image (fun i : Fin n => f i) (Finset.univ : Finset (Fin n)))) (by simp [IH'])).1 refine ⟨f, A, fun m n hmn => ?_⟩ conv_rhs => rw [hf] rw [seqOfForallFinsetExistsAux] apply (Classical.choose_spec (h' (Finset.image (fun i : Fin n => f i) (Finset.univ : Finset (Fin n)))) (by simp [A])).2 exact Finset.mem_image.2 ⟨⟨m, hmn⟩, Finset.mem_univ _, rfl⟩ /-- Induction principle to build a sequence, by adding one point at a time satisfying a given symmetric relation with respect to all the previously chosen points. More precisely, Assume that, for any finite set `s`, one can find another point satisfying some relation `r` with respect to all the points in `s`. Then one may construct a function `f : ℕ → α` such that `r (f m) (f n)` holds whenever `m ≠ n`. We also ensure that all constructed points satisfy a given predicate `P`. -/ theorem exists_seq_of_forall_finset_exists' {α : Type*} (P : α → Prop) (r : α → α → Prop) [IsSymm α r] (h : ∀ s : Finset α, (∀ x ∈ s, P x) → ∃ y, P y ∧ ∀ x ∈ s, r x y) : ∃ f : ℕ → α, (∀ n, P (f n)) ∧ Pairwise (r on f) := by rcases exists_seq_of_forall_finset_exists P r h with ⟨f, hf, hf'⟩ refine ⟨f, hf, fun m n hmn => ?_⟩ rcases lt_trichotomy m n with (h \| rfl \| h) · exact hf' m n h · exact (hmn rfl).elim · unfold Function.onFun apply symm exact hf' n m h		Mathlib/Data/Fintype/Basic.lean	545	548
/- Copyright (c) 2018 Patrick Massot. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Patrick Massot, Johannes Hölzl, Yaël Dillies -/ import Mathlib.Analysis.Normed.Group.Continuity import Mathlib.Topology.Algebra.IsUniformGroup.Basic import Mathlib.Topology.MetricSpace.Algebra import Mathlib.Topology.MetricSpace.IsometricSMul /-! # Normed groups are uniform groups This file proves lipschitzness of normed group operations and shows that normed groups are uniform groups. -/ variable {𝓕 E F : Type} open Filter Function Metric Bornology open scoped ENNReal NNReal Uniformity Pointwise Topology section SeminormedGroup variable [SeminormedGroup E] [SeminormedGroup F] {s : Set E} {a b : E} {r : ℝ} @[to_additive] instance NormedGroup.to_isIsometricSMul_right : IsIsometricSMul Eᵐᵒᵖ E := ⟨fun a => Isometry.of_dist_eq fun b c => by simp [dist_eq_norm_div]⟩ @[to_additive] theorem Isometry.norm_map_of_map_one {f : E → F} (hi : Isometry f) (h₁ : f 1 = 1) (x : E) : ‖f x‖ = ‖x‖ := by rw [← dist_one_right, ← h₁, hi.dist_eq, dist_one_right] @[to_additive (attr := simp)] theorem dist_mul_self_right (a b : E) : dist b (a b) = ‖a‖ := by rw [← dist_one_left, ← dist_mul_right 1 a b, one_mul] @[to_additive (attr := simp)] theorem dist_mul_self_left (a b : E) : dist (a * b) b = ‖a‖ := by rw [dist_comm, dist_mul_self_right] @[to_additive (attr := simp)] theorem dist_div_eq_dist_mul_left (a b c : E) : dist (a / b) c = dist a (c * b) := by rw [← dist_mul_right _ _ b, div_mul_cancel] @[to_additive (attr := simp)] theorem dist_div_eq_dist_mul_right (a b c : E) : dist a (b / c) = dist (a * c) b := by rw [← dist_mul_right _ _ c, div_mul_cancel] open Finset variable [FunLike 𝓕 E F] /-- A homomorphism `f` of seminormed groups is Lipschitz, if there exists a constant `C` such that for all `x`, one has `‖f x‖ ≤ C * ‖x‖`. The analogous condition for a linear map of (semi)normed spaces is in `Mathlib/Analysis/NormedSpace/OperatorNorm.lean`. -/ @[to_additive "A homomorphism `f` of seminormed groups is Lipschitz, if there exists a constant `C` such that for all `x`, one has `‖f x‖ ≤ C * ‖x‖`. The analogous condition for a linear map of (semi)normed spaces is in `Mathlib/Analysis/NormedSpace/OperatorNorm.lean`."] theorem MonoidHomClass.lipschitz_of_bound [MonoidHomClass 𝓕 E F] (f : 𝓕) (C : ℝ) (h : ∀ x, ‖f x‖ ≤ C * ‖x‖) : LipschitzWith (Real.toNNReal C) f := LipschitzWith.of_dist_le' fun x y => by simpa only [dist_eq_norm_div, map_div] using h (x / y) @[to_additive] theorem lipschitzOnWith_iff_norm_div_le {f : E → F} {C : ℝ≥0} : LipschitzOnWith C f s ↔ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → ‖f x / f y‖ ≤ C * ‖x / y‖ := by simp only [lipschitzOnWith_iff_dist_le_mul, dist_eq_norm_div] alias ⟨LipschitzOnWith.norm_div_le, _⟩ := lipschitzOnWith_iff_norm_div_le attribute [to_additive] LipschitzOnWith.norm_div_le @[to_additive] theorem LipschitzOnWith.norm_div_le_of_le {f : E → F} {C : ℝ≥0} (h : LipschitzOnWith C f s) (ha : a ∈ s) (hb : b ∈ s) (hr : ‖a / b‖ ≤ r) : ‖f a / f b‖ ≤ C * r := (h.norm_div_le ha hb).trans <\| by gcongr @[to_additive] theorem lipschitzWith_iff_norm_div_le {f : E → F} {C : ℝ≥0} : LipschitzWith C f ↔ ∀ x y, ‖f x / f y‖ ≤ C * ‖x / y‖ := by simp only [lipschitzWith_iff_dist_le_mul, dist_eq_norm_div] alias ⟨LipschitzWith.norm_div_le, _⟩ := lipschitzWith_iff_norm_div_le attribute [to_additive] LipschitzWith.norm_div_le @[to_additive] theorem LipschitzWith.norm_div_le_of_le {f : E → F} {C : ℝ≥0} (h : LipschitzWith C f) (hr : ‖a / b‖ ≤ r) : ‖f a / f b‖ ≤ C * r := (h.norm_div_le _ _).trans <\| by gcongr /-- A homomorphism `f` of seminormed groups is continuous, if there exists a constant `C` such that for all `x`, one has `‖f x‖ ≤ C * ‖x‖`. -/ @[to_additive "A homomorphism `f` of seminormed groups is continuous, if there exists a constant `C` such that for all `x`, one has `‖f x‖ ≤ C * ‖x‖`"] theorem MonoidHomClass.continuous_of_bound [MonoidHomClass 𝓕 E F] (f : 𝓕) (C : ℝ) (h : ∀ x, ‖f x‖ ≤ C * ‖x‖) : Continuous f := (MonoidHomClass.lipschitz_of_bound f C h).continuous @[to_additive] theorem MonoidHomClass.uniformContinuous_of_bound [MonoidHomClass 𝓕 E F] (f : 𝓕) (C : ℝ) (h : ∀ x, ‖f x‖ ≤ C * ‖x‖) : UniformContinuous f := (MonoidHomClass.lipschitz_of_bound f C h).uniformContinuous @[to_additive] theorem MonoidHomClass.isometry_iff_norm [MonoidHomClass 𝓕 E F] (f : 𝓕) : Isometry f ↔ ∀ x, ‖f x‖ = ‖x‖ := by simp only [isometry_iff_dist_eq, dist_eq_norm_div, ← map_div] refine ⟨fun h x => ?_, fun h x y => h _⟩ simpa using h x 1 alias ⟨_, MonoidHomClass.isometry_of_norm⟩ := MonoidHomClass.isometry_iff_norm attribute [to_additive] MonoidHomClass.isometry_of_norm section NNNorm @[to_additive] theorem MonoidHomClass.lipschitz_of_bound_nnnorm [MonoidHomClass 𝓕 E F] (f : 𝓕) (C : ℝ≥0) (h : ∀ x, ‖f x‖₊ ≤ C * ‖x‖₊) : LipschitzWith C f := @Real.toNNReal_coe C ▸ MonoidHomClass.lipschitz_of_bound f C h @[to_additive] theorem MonoidHomClass.antilipschitz_of_bound [MonoidHomClass 𝓕 E F] (f : 𝓕) {K : ℝ≥0} (h : ∀ x, ‖x‖ ≤ K * ‖f x‖) : AntilipschitzWith K f := AntilipschitzWith.of_le_mul_dist fun x y => by simpa only [dist_eq_norm_div, map_div] using h (x / y) @[to_additive LipschitzWith.norm_le_mul] theorem LipschitzWith.norm_le_mul' {f : E → F} {K : ℝ≥0} (h : LipschitzWith K f) (hf : f 1 = 1) (x) : ‖f x‖ ≤ K * ‖x‖ := by simpa only [dist_one_right, hf] using h.dist_le_mul x 1 @[to_additive LipschitzWith.nnorm_le_mul] theorem LipschitzWith.nnorm_le_mul' {f : E → F} {K : ℝ≥0} (h : LipschitzWith K f) (hf : f 1 = 1) (x) : ‖f x‖₊ ≤ K * ‖x‖₊ :=	h.norm_le_mul' hf x @[to_additive AntilipschitzWith.le_mul_norm] theorem AntilipschitzWith.le_mul_norm' {f : E → F} {K : ℝ≥0} (h : AntilipschitzWith K f) (hf : f 1 = 1) (x) : ‖x‖ ≤ K * ‖f x‖ := by	Mathlib/Analysis/Normed/Group/Uniform.lean	136	140
/- 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.Data.Finset.Option import Mathlib.Data.PFun import Mathlib.Data.Part /-! # Image of a `Finset α` under a partially defined function In this file we define `Part.toFinset` and `Finset.pimage`. We also prove some trivial lemmas about these definitions. ## Tags finite set, image, partial function -/ variable {α β : Type*} namespace Part /-- Convert an `o : Part α` with decidable `Part.Dom o` to `Finset α`. -/ def toFinset (o : Part α) [Decidable o.Dom] : Finset α := o.toOption.toFinset @[simp] theorem mem_toFinset {o : Part α} [Decidable o.Dom] {x : α} : x ∈ o.toFinset ↔ x ∈ o := by simp [toFinset] @[simp] theorem toFinset_none [Decidable (none : Part α).Dom] : none.toFinset = (∅ : Finset α) := by simp [toFinset] @[simp] theorem toFinset_some {a : α} [Decidable (some a).Dom] : (some a).toFinset = {a} := by simp [toFinset] @[simp] theorem coe_toFinset (o : Part α) [Decidable o.Dom] : (o.toFinset : Set α) = { x \| x ∈ o } := Set.ext fun _ => mem_toFinset end Part namespace Finset variable [DecidableEq β] {f g : α →. β} [∀ x, Decidable (f x).Dom] [∀ x, Decidable (g x).Dom] {s t : Finset α} {b : β} /-- Image of `s : Finset α` under a partially defined function `f : α →. β`. -/ def pimage (f : α →. β) [∀ x, Decidable (f x).Dom] (s : Finset α) : Finset β := s.biUnion fun x => (f x).toFinset @[simp] theorem mem_pimage : b ∈ s.pimage f ↔ ∃ a ∈ s, b ∈ f a := by simp [pimage] @[simp, norm_cast] theorem coe_pimage : (s.pimage f : Set β) = f.image s := Set.ext fun _ => mem_pimage @[simp] theorem pimage_some (s : Finset α) (f : α → β) [∀ x, Decidable (Part.some <\| f x).Dom] : (s.pimage fun x => Part.some (f x)) = s.image f := by ext simp [eq_comm] theorem pimage_congr (h₁ : s = t) (h₂ : ∀ x ∈ t, f x = g x) : s.pimage f = t.pimage g := by aesop /-- Rewrite `s.pimage f` in terms of `Finset.filter`, `Finset.attach`, and `Finset.image`. -/ theorem pimage_eq_image_filter : s.pimage f = {x ∈ s \| (f x).Dom}.attach.image fun x : { x // x ∈ filter (fun x => (f x).Dom) s } => (f x).get (mem_filter.mp x.coe_prop).2 := by aesop (add simp Part.mem_eq) theorem pimage_union [DecidableEq α] : (s ∪ t).pimage f = s.pimage f ∪ t.pimage f := coe_inj.1 <\| by simp only [coe_pimage, coe_union, ← PFun.image_union] @[simp] theorem pimage_empty : pimage f ∅ = ∅ := by ext simp theorem pimage_subset {t : Finset β} : s.pimage f ⊆ t ↔ ∀ x ∈ s, ∀ y ∈ f x, y ∈ t := by simp [subset_iff, @forall_swap _ β] @[mono] theorem pimage_mono (h : s ⊆ t) : s.pimage f ⊆ t.pimage f := pimage_subset.2 fun x hx _ hy => mem_pimage.2 ⟨x, h hx, hy⟩ theorem pimage_inter [DecidableEq α] : (s ∩ t).pimage f ⊆ s.pimage f ∩ t.pimage f := by simp only [← coe_subset, coe_pimage, coe_inter, PFun.image_inter] end Finset		Mathlib/Data/Finset/PImage.lean	120	121
/- Copyright (c) 2018 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Chris Hughes, Mario Carneiro -/ import Mathlib.Algebra.Field.IsField import Mathlib.Data.Fin.VecNotation import Mathlib.Data.Nat.Choose.Sum import Mathlib.LinearAlgebra.Finsupp.LinearCombination import Mathlib.RingTheory.Ideal.Maximal import Mathlib.Tactic.FinCases /-! # Ideals over a ring This file contains an assortment of definitions and results for `Ideal R`, the type of (left) ideals over a ring `R`. Note that over commutative rings, left ideals and two-sided ideals are equivalent. ## Implementation notes `Ideal R` is implemented using `Submodule R R`, where `•` is interpreted as ``. ## TODO Support right ideals, and two-sided ideals over non-commutative rings. -/ variable {ι α β F : Type} open Set Function open Pointwise section Semiring namespace Ideal variable {α : ι → Type} [Π i, Semiring (α i)] (I : Π i, Ideal (α i)) section Pi /-- `Πᵢ Iᵢ` as an ideal of `Πᵢ Rᵢ`. -/ def pi : Ideal (Π i, α i) where carrier := { x \| ∀ i, x i ∈ I i } zero_mem' i := (I i).zero_mem add_mem' ha hb i := (I i).add_mem (ha i) (hb i) smul_mem' a _b hb i := (I i).mul_mem_left (a i) (hb i) theorem mem_pi (x : Π i, α i) : x ∈ pi I ↔ ∀ i, x i ∈ I i := Iff.rfl instance (priority := low) [∀ i, (I i).IsTwoSided] : (pi I).IsTwoSided := ⟨fun _b hb i ↦ mul_mem_right _ _ (hb i)⟩ end Pi section Commute variable {α : Type} [Semiring α] (I : Ideal α) {a b : α} theorem add_pow_mem_of_pow_mem_of_le_of_commute {m n k : ℕ} (ha : a ^ m ∈ I) (hb : b ^ n ∈ I) (hk : m + n ≤ k + 1) (hab : Commute a b) : (a + b) ^ k ∈ I := by simp_rw [hab.add_pow, ← Nat.cast_comm] apply I.sum_mem intro c _ apply mul_mem_left by_cases h : m ≤ c · rw [hab.pow_pow] exact I.mul_mem_left _ (I.pow_mem_of_pow_mem ha h) · refine I.mul_mem_left _ (I.pow_mem_of_pow_mem hb ?_) omega theorem add_pow_add_pred_mem_of_pow_mem_of_commute {m n : ℕ} (ha : a ^ m ∈ I) (hb : b ^ n ∈ I) (hab : Commute a b) : (a + b) ^ (m + n - 1) ∈ I := I.add_pow_mem_of_pow_mem_of_le_of_commute ha hb (by rw [← Nat.sub_le_iff_le_add]) hab end Commute end Ideal end Semiring section CommSemiring variable {a b : α} -- A separate namespace definition is needed because the variables were historically in a different -- order. namespace Ideal variable [CommSemiring α] (I : Ideal α) theorem add_pow_mem_of_pow_mem_of_le {m n k : ℕ} (ha : a ^ m ∈ I) (hb : b ^ n ∈ I) (hk : m + n ≤ k + 1) : (a + b) ^ k ∈ I := I.add_pow_mem_of_pow_mem_of_le_of_commute ha hb hk (Commute.all ..) theorem add_pow_add_pred_mem_of_pow_mem {m n : ℕ} (ha : a ^ m ∈ I) (hb : b ^ n ∈ I) : (a + b) ^ (m + n - 1) ∈ I := I.add_pow_add_pred_mem_of_pow_mem_of_commute ha hb (Commute.all ..) theorem pow_multiset_sum_mem_span_pow [DecidableEq α] (s : Multiset α) (n : ℕ) : s.sum ^ (Multiset.card s * n + 1) ∈ span ((s.map fun (x : α) ↦ x ^ (n + 1)).toFinset : Set α) := by induction' s using Multiset.induction_on with a s hs · simp simp only [Finset.coe_insert, Multiset.map_cons, Multiset.toFinset_cons, Multiset.sum_cons, Multiset.card_cons, add_pow] refine Submodule.sum_mem _ ?_ intro c _hc rw [mem_span_insert] by_cases h : n + 1 ≤ c · refine ⟨a ^ (c - (n + 1)) * s.sum ^ ((Multiset.card s + 1) * n + 1 - c) * ((Multiset.card s + 1) * n + 1).choose c, 0, Submodule.zero_mem _, ?_⟩ rw [mul_comm _ (a ^ (n + 1))] simp_rw [← mul_assoc] rw [← pow_add, add_zero, add_tsub_cancel_of_le h] · use 0 simp_rw [zero_mul, zero_add] refine ⟨_, ?_, rfl⟩ replace h : c ≤ n := Nat.lt_succ_iff.mp (not_le.mp h) have : (Multiset.card s + 1) * n + 1 - c = Multiset.card s * n + 1 + (n - c) := by rw [add_mul, one_mul, add_assoc, add_comm n 1, ← add_assoc, add_tsub_assoc_of_le h] rw [this, pow_add] simp_rw [mul_assoc, mul_comm (s.sum ^ (Multiset.card s * n + 1)), ← mul_assoc] exact mul_mem_left _ _ hs theorem sum_pow_mem_span_pow {ι} (s : Finset ι) (f : ι → α) (n : ℕ) : (∑ i ∈ s, f i) ^ (s.card * n + 1) ∈ span ((fun i => f i ^ (n + 1)) '' s) := by classical simpa only [Multiset.card_map, Multiset.map_map, comp_apply, Multiset.toFinset_map, Finset.coe_image, Finset.val_toFinset] using pow_multiset_sum_mem_span_pow (s.1.map f) n theorem span_pow_eq_top (s : Set α) (hs : span s = ⊤) (n : ℕ) : span ((fun (x : α) => x ^ n) '' s) = ⊤ := by rw [eq_top_iff_one] rcases n with - \| n · obtain rfl \| ⟨x, hx⟩ := eq_empty_or_nonempty s · rw [Set.image_empty, hs] trivial · exact subset_span ⟨_, hx, pow_zero _⟩ rw [eq_top_iff_one, span, Finsupp.mem_span_iff_linearCombination] at hs rcases hs with ⟨f, hf⟩ have hf : (f.support.sum fun a => f a * a) = 1 := hf -- Porting note: was `change ... at hf` have := sum_pow_mem_span_pow f.support (fun a => f a * a) n rw [hf, one_pow] at this refine span_le.mpr ?_ this rintro _ hx simp_rw [Set.mem_image] at hx rcases hx with ⟨x, _, rfl⟩ have : span ({(x : α) ^ (n + 1)} : Set α) ≤ span ((fun x : α => x ^ (n + 1)) '' s) := by rw [span_le, Set.singleton_subset_iff] exact subset_span ⟨x, x.prop, rfl⟩ refine this ?_ rw [mul_pow, mem_span_singleton] exact ⟨f x ^ (n + 1), mul_comm _ _⟩ theorem span_range_pow_eq_top (s : Set α) (hs : span s = ⊤) (n : s → ℕ) : span (Set.range fun x ↦ x.1 ^ n x) = ⊤ := by have ⟨t, hts, mem⟩ := Submodule.mem_span_finite_of_mem_span ((eq_top_iff_one _).mp hs) refine top_unique ((span_pow_eq_top _ ((eq_top_iff_one _).mpr mem) <\| t.attach.sup fun x ↦ n ⟨x, hts x.2⟩).ge.trans <\| span_le.mpr ?_) rintro _ ⟨x, hxt, rfl⟩ rw [← Nat.sub_add_cancel (Finset.le_sup <\| t.mem_attach ⟨x, hxt⟩)] simp_rw [pow_add] exact mul_mem_left _ _ (subset_span ⟨_, rfl⟩) theorem prod_mem {ι : Type} {f : ι → α} {s : Finset ι} (I : Ideal α) {i : ι} (hi : i ∈ s) (hfi : f i ∈ I) : ∏ i ∈ s, f i ∈ I := by classical rw [Finset.prod_eq_prod_diff_singleton_mul hi] exact Ideal.mul_mem_left _ _ hfi end Ideal end CommSemiring section DivisionSemiring variable {K : Type} [DivisionSemiring K] (I : Ideal K) namespace Ideal variable (K) in /-- A bijection between (left) ideals of a division ring and `{0, 1}`, sending `⊥` to `0` and `⊤` to `1`. -/ def equivFinTwo [DecidableEq (Ideal K)] : Ideal K ≃ Fin 2 where toFun := fun I ↦ if I = ⊥ then 0 else 1 invFun := ![⊥, ⊤] left_inv := fun I ↦ by rcases eq_bot_or_top I with rfl \| rfl <;> simp right_inv := fun i ↦ by fin_cases i <;> simp instance : Finite (Ideal K) := let _i := Classical.decEq (Ideal K); ⟨equivFinTwo K⟩ /-- Ideals of a `DivisionSemiring` are a simple order. Thanks to the way abbreviations work, this automatically gives an `IsSimpleModule K` instance. -/ instance isSimpleOrder : IsSimpleOrder (Ideal K) := ⟨eq_bot_or_top⟩ end Ideal end DivisionSemiring -- TODO: consider moving the lemmas below out of the `Ring` namespace since they are -- about `CommSemiring`s. namespace Ring variable {R : Type} [CommSemiring R] theorem exists_not_isUnit_of_not_isField [Nontrivial R] (hf : ¬IsField R) : ∃ (x : R) (_hx : x ≠ (0 : R)), ¬IsUnit x := by have : ¬_ := fun h => hf ⟨exists_pair_ne R, mul_comm, h⟩ simp_rw [isUnit_iff_exists_inv] push_neg at this ⊢ obtain ⟨x, hx, not_unit⟩ := this exact ⟨x, hx, not_unit⟩ theorem not_isField_iff_exists_ideal_bot_lt_and_lt_top [Nontrivial R] : ¬IsField R ↔ ∃ I : Ideal R, ⊥ < I ∧ I < ⊤ := by constructor · intro h obtain ⟨x, nz, nu⟩ := exists_not_isUnit_of_not_isField h use Ideal.span {x} rw [bot_lt_iff_ne_bot, lt_top_iff_ne_top] exact ⟨mt Ideal.span_singleton_eq_bot.mp nz, mt Ideal.span_singleton_eq_top.mp nu⟩ · rintro ⟨I, bot_lt, lt_top⟩ hf obtain ⟨x, mem, ne_zero⟩ := SetLike.exists_of_lt bot_lt rw [Submodule.mem_bot] at ne_zero obtain ⟨y, hy⟩ := hf.mul_inv_cancel ne_zero rw [lt_top_iff_ne_top, Ne, Ideal.eq_top_iff_one, ← hy] at lt_top exact lt_top (I.mul_mem_right _ mem) theorem not_isField_iff_exists_prime [Nontrivial R] : ¬IsField R ↔ ∃ p : Ideal R, p ≠ ⊥ ∧ p.IsPrime := not_isField_iff_exists_ideal_bot_lt_and_lt_top.trans ⟨fun ⟨I, bot_lt, lt_top⟩ => let ⟨p, hp, le_p⟩ := I.exists_le_maximal (lt_top_iff_ne_top.mp lt_top) ⟨p, bot_lt_iff_ne_bot.mp (lt_of_lt_of_le bot_lt le_p), hp.isPrime⟩, fun ⟨p, ne_bot, Prime⟩ => ⟨p, bot_lt_iff_ne_bot.mpr ne_bot, lt_top_iff_ne_top.mpr Prime.1⟩⟩ /-- Also see `Ideal.isSimpleOrder` for the forward direction as an instance when `R` is a division (semi)ring. This result actually holds for all division semirings, but we lack the predicate to state it. -/ theorem isField_iff_isSimpleOrder_ideal : IsField R ↔ IsSimpleOrder (Ideal R) := by cases subsingleton_or_nontrivial R · exact ⟨fun h => (not_isField_of_subsingleton _ h).elim, fun h => (false_of_nontrivial_of_subsingleton <\| Ideal R).elim⟩ rw [← not_iff_not, Ring.not_isField_iff_exists_ideal_bot_lt_and_lt_top, ← not_iff_not] push_neg simp_rw [lt_top_iff_ne_top, bot_lt_iff_ne_bot, ← or_iff_not_imp_left, not_ne_iff] exact ⟨fun h => ⟨h⟩, fun h => h.2⟩ /-- When a ring is not a field, the maximal ideals are nontrivial. -/ theorem ne_bot_of_isMaximal_of_not_isField [Nontrivial R] {M : Ideal R} (max : M.IsMaximal) (not_field : ¬IsField R) : M ≠ ⊥ := by rintro h rw [h] at max rcases max with ⟨⟨_h1, h2⟩⟩ obtain ⟨I, hIbot, hItop⟩ := not_isField_iff_exists_ideal_bot_lt_and_lt_top.mp not_field exact ne_of_lt hItop (h2 I hIbot) end Ring namespace Ideal variable {R : Type} [CommSemiring R] [Nontrivial R] theorem bot_lt_of_maximal (M : Ideal R) [hm : M.IsMaximal] (non_field : ¬IsField R) : ⊥ < M := by rcases Ring.not_isField_iff_exists_ideal_bot_lt_and_lt_top.1 non_field with ⟨I, Ibot, Itop⟩ constructor; · simp intro mle apply lt_irrefl (⊤ : Ideal R) have : M = ⊥ := eq_bot_iff.mpr mle rw [← this] at Ibot rwa [hm.1.2 I Ibot] at Itop end Ideal		Mathlib/RingTheory/Ideal/Basic.lean	516	519
/- Copyright (c) 2020 Riccardo Brasca. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Riccardo Brasca, Johan Commelin -/ import Mathlib.Algebra.GCDMonoid.IntegrallyClosed import Mathlib.FieldTheory.Finite.Basic import Mathlib.FieldTheory.Minpoly.IsIntegrallyClosed import Mathlib.RingTheory.RootsOfUnity.PrimitiveRoots import Mathlib.RingTheory.UniqueFactorizationDomain.Nat /-! # Minimal polynomial of roots of unity We gather several results about minimal polynomial of root of unity. ## Main results * `IsPrimitiveRoot.totient_le_degree_minpoly`: The degree of the minimal polynomial of an `n`-th primitive root of unity is at least `totient n`. -/ open minpoly Polynomial open scoped Polynomial namespace IsPrimitiveRoot section CommRing variable {n : ℕ} {K : Type*} [CommRing K] {μ : K} (h : IsPrimitiveRoot μ n) include h /-- `μ` is integral over `ℤ`. -/ -- Porting note: `hpos` was in the `variable` line, with an `omit` in mathlib3 just after this -- declaration. For some reason, in Lean4, `hpos` gets included also in the declarations below, -- even if it is not used in the proof. theorem isIntegral (hpos : 0 < n) : IsIntegral ℤ μ := by use X ^ n - 1 constructor · exact monic_X_pow_sub_C 1 (ne_of_lt hpos).symm · simp only [((IsPrimitiveRoot.iff_def μ n).mp h).left, eval₂_one, eval₂_X_pow, eval₂_sub, sub_self] section IsDomain variable [IsDomain K] [CharZero K] /-- The minimal polynomial of a root of unity `μ` divides `X ^ n - 1`. -/ theorem minpoly_dvd_x_pow_sub_one : minpoly ℤ μ ∣ X ^ n - 1 := by rcases n.eq_zero_or_pos with (rfl \| h0) · simp apply minpoly.isIntegrallyClosed_dvd (isIntegral h h0) simp only [((IsPrimitiveRoot.iff_def μ n).mp h).left, aeval_X_pow, eq_intCast, Int.cast_one, aeval_one, map_sub, sub_self] /-- The reduction modulo `p` of the minimal polynomial of a root of unity `μ` is separable. -/ theorem separable_minpoly_mod {p : ℕ} [Fact p.Prime] (hdiv : ¬p ∣ n) : Separable (map (Int.castRingHom (ZMod p)) (minpoly ℤ μ)) := by have hdvd : map (Int.castRingHom (ZMod p)) (minpoly ℤ μ) ∣ X ^ n - 1 := by convert RingHom.map_dvd (mapRingHom (Int.castRingHom (ZMod p))) (minpoly_dvd_x_pow_sub_one h) simp only [map_sub, map_pow, coe_mapRingHom, map_X, map_one] refine Separable.of_dvd (separable_X_pow_sub_C 1 ?_ one_ne_zero) hdvd by_contra hzero exact hdiv ((ZMod.natCast_zmod_eq_zero_iff_dvd n p).1 hzero) /-- The reduction modulo `p` of the minimal polynomial of a root of unity `μ` is squarefree. -/ theorem squarefree_minpoly_mod {p : ℕ} [Fact p.Prime] (hdiv : ¬p ∣ n) : Squarefree (map (Int.castRingHom (ZMod p)) (minpoly ℤ μ)) := (separable_minpoly_mod h hdiv).squarefree /-- Let `P` be the minimal polynomial of a root of unity `μ` and `Q` be the minimal polynomial of `μ ^ p`, where `p` is a natural number that does not divide `n`. Then `P` divides `expand ℤ p Q`. -/ theorem minpoly_dvd_expand {p : ℕ} (hdiv : ¬p ∣ n) : minpoly ℤ μ ∣ expand ℤ p (minpoly ℤ (μ ^ p)) := by rcases n.eq_zero_or_pos with (rfl \| hpos) · simp_all letI : IsIntegrallyClosed ℤ := GCDMonoid.toIsIntegrallyClosed refine minpoly.isIntegrallyClosed_dvd (h.isIntegral hpos) ?_ rw [aeval_def, coe_expand, ← comp, eval₂_eq_eval_map, map_comp, Polynomial.map_pow, map_X, eval_comp, eval_pow, eval_X, ← eval₂_eq_eval_map, ← aeval_def] exact minpoly.aeval _ _ /-- Let `P` be the minimal polynomial of a root of unity `μ` and `Q` be the minimal polynomial of `μ ^ p`, where `p` is a prime that does not divide `n`. Then `P` divides `Q ^ p` modulo `p`. -/ theorem minpoly_dvd_pow_mod {p : ℕ} [hprime : Fact p.Prime] (hdiv : ¬p ∣ n) : map (Int.castRingHom (ZMod p)) (minpoly ℤ μ) ∣ map (Int.castRingHom (ZMod p)) (minpoly ℤ (μ ^ p)) ^ p := by set Q := minpoly ℤ (μ ^ p) have hfrob : map (Int.castRingHom (ZMod p)) Q ^ p = map (Int.castRingHom (ZMod p)) (expand ℤ p Q) := by	rw [← ZMod.expand_card, map_expand] rw [hfrob] apply RingHom.map_dvd (mapRingHom (Int.castRingHom (ZMod p))) exact minpoly_dvd_expand h hdiv /-- Let `P` be the minimal polynomial of a root of unity `μ` and `Q` be the minimal polynomial of `μ ^ p`, where `p` is a prime that does not divide `n`. Then `P` divides `Q` modulo `p`. -/ theorem minpoly_dvd_mod_p {p : ℕ} [Fact p.Prime] (hdiv : ¬p ∣ n) : map (Int.castRingHom (ZMod p)) (minpoly ℤ μ) ∣ map (Int.castRingHom (ZMod p)) (minpoly ℤ (μ ^ p)) :=	Mathlib/RingTheory/RootsOfUnity/Minpoly.lean	95	104
/- 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.Algebra.Algebra.Pi import Mathlib.LinearAlgebra.Finsupp.SumProd import Mathlib.LinearAlgebra.FreeModule.Basic import Mathlib.LinearAlgebra.LinearIndependent.Lemmas /-! # The standard basis This file defines the standard basis `Pi.basis (s : ∀ j, Basis (ι j) R (M j))`, which is the `Σ j, ι j`-indexed basis of `Π j, M j`. The basis vectors are given by `Pi.basis s ⟨j, i⟩ j' = Pi.single j' (s j) i = if j = j' then s i else 0`. The standard basis on `R^η`, i.e. `η → R` is called `Pi.basisFun`. To give a concrete example, `Pi.single (i : Fin 3) (1 : R)` gives the `i`th unit basis vector in `R³`, and `Pi.basisFun R (Fin 3)` proves this is a basis over `Fin 3 → R`. ## Main definitions - `Pi.basis s`: given a basis `s i` for each `M i`, the standard basis on `Π i, M i` - `Pi.basisFun R η`: the standard basis on `R^η`, i.e. `η → R`, given by `Pi.basisFun R η i j = Pi.single i 1 j = if i = j then 1 else 0`. - `Matrix.stdBasis R n m`: the standard basis on `Matrix n m R`, given by `Matrix.stdBasis R n m (i, j) i' j' = if (i, j) = (i', j') then 1 else 0`. -/ open Function Set Submodule namespace Pi open LinearMap open Set variable {R : Type} section Module variable {η : Type} {ιs : η → Type} {Ms : η → Type} theorem linearIndependent_single [Ring R] [∀ i, AddCommGroup (Ms i)] [∀ i, Module R (Ms i)] [DecidableEq η] (v : ∀ j, ιs j → Ms j) (hs : ∀ i, LinearIndependent R (v i)) : LinearIndependent R fun ji : Σj, ιs j ↦ Pi.single ji.1 (v ji.1 ji.2) := by have hs' : ∀ j : η, LinearIndependent R fun i : ιs j => LinearMap.single R Ms j (v j i) := by intro j exact (hs j).map' _ (LinearMap.ker_single _ _ _) apply linearIndependent_iUnion_finite hs' intro j J _ hiJ have h₀ : ∀ j, span R (range fun i : ιs j => LinearMap.single R Ms j (v j i)) ≤ LinearMap.range (LinearMap.single R Ms j) := by intro j rw [span_le, LinearMap.range_coe] apply range_comp_subset_range have h₁ : span R (range fun i : ιs j => LinearMap.single R Ms j (v j i)) ≤ ⨆ i ∈ ({j} : Set _), LinearMap.range (LinearMap.single R Ms i) := by rw [@iSup_singleton _ _ _ fun i => LinearMap.range (LinearMap.single R (Ms) i)] apply h₀ have h₂ : ⨆ j ∈ J, span R (range fun i : ιs j => LinearMap.single R Ms j (v j i)) ≤ ⨆ j ∈ J, LinearMap.range (LinearMap.single R (fun j : η => Ms j) j) := iSup₂_mono fun i _ => h₀ i have h₃ : Disjoint (fun i : η => i ∈ ({j} : Set _)) J := by convert Set.disjoint_singleton_left.2 hiJ using 0 exact (disjoint_single_single _ _ _ _ h₃).mono h₁ h₂ theorem linearIndependent_single_one (ι R : Type) [Ring R] [DecidableEq ι] : LinearIndependent R (fun i : ι ↦ Pi.single i (1 : R)) := by rw [← linearIndependent_equiv (Equiv.sigmaPUnit ι)] exact Pi.linearIndependent_single (fun (_ : ι) (_ : Unit) ↦ (1 : R)) <\| by simp +contextual [Fintype.linearIndependent_iff] lemma linearIndependent_single_of_ne_zero {ι R M : Type} [Ring R] [AddCommGroup M] [Module R M] [NoZeroSMulDivisors R M] [DecidableEq ι] {v : ι → M} (hv : ∀ i, v i ≠ 0) : LinearIndependent R fun i : ι ↦ Pi.single i (v i) := by rw [← linearIndependent_equiv (Equiv.sigmaPUnit ι)] exact linearIndependent_single (fun i (_ : Unit) ↦ v i) <\| by simp +contextual [Fintype.linearIndependent_iff, hv] @[deprecated linearIndependent_single_of_ne_zero (since := "2025-04-14")] theorem linearIndependent_single_ne_zero {ι R : Type} [Ring R] [NoZeroDivisors R] [DecidableEq ι] {v : ι → R} (hv : ∀ i, v i ≠ 0) : LinearIndependent R (fun i : ι ↦ Pi.single i (v i)) := linearIndependent_single_of_ne_zero hv variable [Semiring R] [∀ i, AddCommMonoid (Ms i)] [∀ i, Module R (Ms i)] section Fintype variable [Fintype η] open LinearEquiv /-- `Pi.basis (s : ∀ j, Basis (ιs j) R (Ms j))` is the `Σ j, ιs j`-indexed basis on `Π j, Ms j` given by `s j` on each component. For the standard basis over `R` on the finite-dimensional space `η → R` see `Pi.basisFun`. -/ protected noncomputable def basis (s : ∀ j, Basis (ιs j) R (Ms j)) : Basis (Σj, ιs j) R (∀ j, Ms j) := Basis.ofRepr ((LinearEquiv.piCongrRight fun j => (s j).repr) ≪≫ₗ (Finsupp.sigmaFinsuppLEquivPiFinsupp R).symm) @[simp] theorem basis_repr_single [DecidableEq η] (s : ∀ j, Basis (ιs j) R (Ms j)) (j i) : (Pi.basis s).repr (Pi.single j (s j i)) = Finsupp.single ⟨j, i⟩ 1 := by classical ext ⟨j', i'⟩ by_cases hj : j = j' · subst hj simp only [Pi.basis, LinearEquiv.trans_apply, Basis.repr_self, Pi.single_eq_same, LinearEquiv.piCongrRight, Finsupp.sigmaFinsuppLEquivPiFinsupp_symm_apply, Basis.repr_symm_apply, LinearEquiv.coe_mk, ne_eq, Sigma.mk.inj_iff, heq_eq_eq, true_and] symm simp [Finsupp.single_apply] simp only [Pi.basis, LinearEquiv.trans_apply, Finsupp.sigmaFinsuppLEquivPiFinsupp_symm_apply, LinearEquiv.piCongrRight, coe_single] dsimp rw [Pi.single_eq_of_ne (Ne.symm hj), LinearEquiv.map_zero, Finsupp.zero_apply, Finsupp.single_eq_of_ne] rintro ⟨⟩ contradiction @[simp] theorem basis_apply [DecidableEq η] (s : ∀ j, Basis (ιs j) R (Ms j)) (ji) : Pi.basis s ji = Pi.single ji.1 (s ji.1 ji.2) := Basis.apply_eq_iff.mpr (by simp) @[simp] theorem basis_repr (s : ∀ j, Basis (ιs j) R (Ms j)) (x) (ji) : (Pi.basis s).repr x ji = (s ji.1).repr (x ji.1) ji.2 := rfl end Fintype section variable [Finite η] variable (R η) /-- The basis on `η → R` where the `i`th basis vector is `Function.update 0 i 1`. -/ noncomputable def basisFun : Basis η R (η → R) := Basis.ofEquivFun (LinearEquiv.refl _ _) @[simp] theorem basisFun_apply [DecidableEq η] (i) : basisFun R η i = Pi.single i 1 := by simp only [basisFun, Basis.coe_ofEquivFun, LinearEquiv.refl_symm, LinearEquiv.refl_apply] @[simp] theorem basisFun_repr (x : η → R) (i : η) : (Pi.basisFun R η).repr x i = x i := by simp [basisFun] @[simp] theorem basisFun_equivFun : (Pi.basisFun R η).equivFun = LinearEquiv.refl _ _ := Basis.equivFun_ofEquivFun _ end end Module end Pi /-- Let `k` be an integral domain and `G` an arbitrary finite set. Then any algebra morphism `φ : (G → k) →ₐ[k] k` is an evaluation map. -/ lemma AlgHom.eq_piEvalAlgHom {k G : Type} [CommSemiring k] [NoZeroDivisors k] [Nontrivial k] [Finite G] (φ : (G → k) →ₐ[k] k) : ∃ (s : G), φ = Pi.evalAlgHom _ _ s := by have h1 := map_one φ classical have := Fintype.ofFinite G simp only [← Finset.univ_sum_single (1 : G → k), Pi.one_apply, map_sum] at h1 obtain ⟨s, hs⟩ : ∃ (s : G), φ (Pi.single s 1) ≠ 0 := by by_contra simp_all have h2 : ∀ t ≠ s, φ (Pi.single t 1) = 0 := by refine fun _ _ ↦ (eq_zero_or_eq_zero_of_mul_eq_zero ?_).resolve_left hs rw [← map_mul] convert map_zero φ ext u by_cases u = s <;> simp_all have h3 : φ (Pi.single s 1) = 1 := by rwa [Fintype.sum_eq_single s h2] at h1 use s refine AlgHom.toLinearMap_injective ((Pi.basisFun k G).ext fun t ↦ ?_) by_cases t = s <;> simp_all @[deprecated (since := "2025-04-15")] alias eval_of_algHom := AlgHom.eq_piEvalAlgHom namespace Module variable (ι R M N : Type) [Finite ι] [CommSemiring R] [AddCommMonoid M] [AddCommMonoid N] [Module R M] [Module R N] /-- The natural linear equivalence: `Mⁱ ≃ Hom(Rⁱ, M)` for an `R`-module `M`. -/ noncomputable def piEquiv : (ι → M) ≃ₗ[R] ((ι → R) →ₗ[R] M) := Basis.constr (Pi.basisFun R ι) R lemma piEquiv_apply_apply (ι R M : Type) [Fintype ι] [CommSemiring R] [AddCommMonoid M] [Module R M] (v : ι → M) (w : ι → R) : piEquiv ι R M v w = ∑ i, w i • v i := by simp only [piEquiv, Basis.constr_apply_fintype, Basis.equivFun_apply] congr @[simp] lemma range_piEquiv (v : ι → M) : LinearMap.range (piEquiv ι R M v) = span R (range v) := Basis.constr_range _ _ @[simp] lemma surjective_piEquiv_apply_iff (v : ι → M) : Surjective (piEquiv ι R M v) ↔ span R (range v) = ⊤ := by rw [← LinearMap.range_eq_top, range_piEquiv] end Module namespace Module.Free variable {ι : Type} (R : Type) (M : Type) [Semiring R] [AddCommMonoid M] [Module R M] /-- The product of finitely many free modules is free. -/ instance _root_.Module.Free.pi (M : ι → Type) [Finite ι] [∀ i : ι, AddCommMonoid (M i)] [∀ i : ι, Module R (M i)] [∀ i : ι, Module.Free R (M i)] : Module.Free R (∀ i, M i) := let ⟨_⟩ := nonempty_fintype ι .of_basis <\| Pi.basis fun i => Module.Free.chooseBasis R (M i)	variable (ι) in /-- The product of finitely many free modules is free (non-dependent version to help with typeclass search). -/ instance _root_.Module.Free.function [Finite ι] [Module.Free R M] : Module.Free R (ι → M) := Free.pi _ _ end Module.Free	Mathlib/LinearAlgebra/StdBasis.lean	230	250
/- 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.Rat import Mathlib.Data.Nat.Cast.Field import Mathlib.RingTheory.PowerSeries.Basic /-! # Definition of well-known power series In this file we define the following power series: * `PowerSeries.invUnitsSub`: given `u : Rˣ`, this is the series for `1 / (u - x)`. It is given by `∑ n, x ^ n /ₚ u ^ (n + 1)`. * `PowerSeries.invOneSubPow`: given a commutative ring `S` and a number `d : ℕ`, `PowerSeries.invOneSubPow S d` is the multiplicative inverse of `(1 - X) ^ d` in `S⟦X⟧ˣ`. When `d` is `0`, `PowerSeries.invOneSubPow S d` will just be `1`. When `d` is positive, `PowerSeries.invOneSubPow S d` will be `∑ n, Nat.choose (d - 1 + n) (d - 1)`. * `PowerSeries.sin`, `PowerSeries.cos`, `PowerSeries.exp` : power series for sin, cosine, and exponential functions. -/ namespace PowerSeries section Ring variable {R S : Type} [Ring R] [Ring S] /-- The power series for `1 / (u - x)`. -/ def invUnitsSub (u : Rˣ) : PowerSeries R := mk fun n => 1 /ₚ u ^ (n + 1) @[simp] theorem coeff_invUnitsSub (u : Rˣ) (n : ℕ) : coeff R n (invUnitsSub u) = 1 /ₚ u ^ (n + 1) := coeff_mk _ _ @[simp] theorem constantCoeff_invUnitsSub (u : Rˣ) : constantCoeff R (invUnitsSub u) = 1 /ₚ u := by rw [← coeff_zero_eq_constantCoeff_apply, coeff_invUnitsSub, zero_add, pow_one] @[simp] theorem invUnitsSub_mul_X (u : Rˣ) : invUnitsSub u X = invUnitsSub u * C R u - 1 := by ext (_ \| n) · simp · simp [n.succ_ne_zero, pow_succ'] @[simp] theorem invUnitsSub_mul_sub (u : Rˣ) : invUnitsSub u * (C R u - X) = 1 := by simp [mul_sub, sub_sub_cancel] theorem map_invUnitsSub (f : R →+* S) (u : Rˣ) : map f (invUnitsSub u) = invUnitsSub (Units.map (f : R →* S) u) := by ext simp only [← map_pow, coeff_map, coeff_invUnitsSub, one_divp] rfl end Ring section invOneSubPow variable (S : Type) [CommRing S] (d : ℕ) /-- (1 + X + X^2 + ...) (1 - X) = 1. Note that the power series `1 + X + X^2 + ...` is written as `mk 1` where `1` is the constant function so that `mk 1` is the power series with all coefficients equal to one. -/ theorem mk_one_mul_one_sub_eq_one : (mk 1 : S⟦X⟧) * (1 - X) = 1 := by rw [mul_comm, PowerSeries.ext_iff] intro n cases n with \| zero => simp \| succ n => simp [sub_mul] /-- Note that `mk 1` is the constant function `1` so the power series `1 + X + X^2 + ...`. This theorem states that for any `d : ℕ`, `(1 + X + X^2 + ... : S⟦X⟧) ^ (d + 1)` is equal to the power series `mk fun n => Nat.choose (d + n) d : S⟦X⟧`. -/ theorem mk_one_pow_eq_mk_choose_add : (mk 1 : S⟦X⟧) ^ (d + 1) = (mk fun n => Nat.choose (d + n) d : S⟦X⟧) := by induction d with \| zero => ext; simp \| succ d hd => ext n rw [pow_add, hd, pow_one, mul_comm, coeff_mul] simp_rw [coeff_mk, Pi.one_apply, one_mul] norm_cast rw [Finset.sum_antidiagonal_choose_add, add_right_comm] /-- Given a natural number `d : ℕ` and a commutative ring `S`, `PowerSeries.invOneSubPow S d` is the multiplicative inverse of `(1 - X) ^ d` in `S⟦X⟧ˣ`. When `d` is `0`, `PowerSeries.invOneSubPow S d` will just be `1`. When `d` is positive, `PowerSeries.invOneSubPow S d` will be the power series `mk fun n => Nat.choose (d - 1 + n) (d - 1)`. -/ noncomputable def invOneSubPow : ℕ → S⟦X⟧ˣ \| 0 => 1 \| d + 1 => { val := mk fun n => Nat.choose (d + n) d inv := (1 - X) ^ (d + 1) val_inv := by rw [← mk_one_pow_eq_mk_choose_add, ← mul_pow, mk_one_mul_one_sub_eq_one, one_pow] inv_val := by rw [← mk_one_pow_eq_mk_choose_add, ← mul_pow, mul_comm, mk_one_mul_one_sub_eq_one, one_pow] } theorem invOneSubPow_zero : invOneSubPow S 0 = 1 := by delta invOneSubPow simp only [Units.val_one] theorem invOneSubPow_val_eq_mk_sub_one_add_choose_of_pos (h : 0 < d) : (invOneSubPow S d).val = (mk fun n => Nat.choose (d - 1 + n) (d - 1) : S⟦X⟧) := by rw [← Nat.sub_one_add_one_eq_of_pos h, invOneSubPow, add_tsub_cancel_right] theorem invOneSubPow_val_succ_eq_mk_add_choose : (invOneSubPow S (d + 1)).val = (mk fun n => Nat.choose (d + n) d : S⟦X⟧) := rfl theorem invOneSubPow_val_one_eq_invUnitSub_one : (invOneSubPow S 1).val = invUnitsSub (1 : Sˣ) := by simp [invOneSubPow, invUnitsSub] /-- The theorem `PowerSeries.mk_one_mul_one_sub_eq_one` implies that `1 - X` is a unit in `S⟦X⟧` whose inverse is the power series `1 + X + X^2 + ...`. This theorem states that for any `d : ℕ`, `PowerSeries.invOneSubPow S d` is equal to `(1 - X)⁻¹ ^ d`. -/ theorem invOneSubPow_eq_inv_one_sub_pow : invOneSubPow S d = (Units.mkOfMulEqOne (1 - X) (mk 1 : S⟦X⟧) <\| Eq.trans (mul_comm _ _) (mk_one_mul_one_sub_eq_one S))⁻¹ ^ d := by induction d with \| zero => exact Eq.symm <\| pow_zero _ \| succ d _ => rw [inv_pow] exact (DivisionMonoid.inv_eq_of_mul _ (invOneSubPow S (d + 1)) <\| by rw [← Units.val_eq_one, Units.val_mul, Units.val_pow_eq_pow_val] exact (invOneSubPow S (d + 1)).inv_val).symm theorem invOneSubPow_inv_eq_one_sub_pow : (invOneSubPow S d).inv = (1 - X : S⟦X⟧) ^ d := by induction d with \| zero => exact Eq.symm <\| pow_zero _ \| succ d => rfl theorem invOneSubPow_inv_zero_eq_one : (invOneSubPow S 0).inv = 1 := by delta invOneSubPow simp only [Units.inv_eq_val_inv, inv_one, Units.val_one] theorem mk_add_choose_mul_one_sub_pow_eq_one : (mk fun n ↦ Nat.choose (d + n) d : S⟦X⟧) * ((1 - X) ^ (d + 1)) = 1 := (invOneSubPow S (d + 1)).val_inv theorem invOneSubPow_add (e : ℕ) : invOneSubPow S (d + e) = invOneSubPow S d * invOneSubPow S e := by simp_rw [invOneSubPow_eq_inv_one_sub_pow, pow_add] theorem one_sub_pow_mul_invOneSubPow_val_add_eq_invOneSubPow_val (e : ℕ) : (1 - X) ^ e * (invOneSubPow S (d + e)).val = (invOneSubPow S d).val := by simp [invOneSubPow_add, Units.val_mul, mul_comm, mul_assoc, ← invOneSubPow_inv_eq_one_sub_pow] theorem one_sub_pow_add_mul_invOneSubPow_val_eq_one_sub_pow (e : ℕ) : (1 - X) ^ (d + e) * (invOneSubPow S e).val = (1 - X) ^ d := by simp [pow_add, mul_assoc, ← invOneSubPow_inv_eq_one_sub_pow S e] end invOneSubPow section Field variable (A A' : Type*) [Ring A] [Ring A'] [Algebra ℚ A] [Algebra ℚ A'] open Nat /-- Power series for the exponential function at zero. -/ def exp : PowerSeries A := mk fun n => algebraMap ℚ A (1 / n !) /-- Power series for the sine function at zero. -/ def sin : PowerSeries A := mk fun n => if Even n then 0 else algebraMap ℚ A ((-1) ^ (n / 2) / n !) /-- Power series for the cosine function at zero. -/ def cos : PowerSeries A := mk fun n => if Even n then algebraMap ℚ A ((-1) ^ (n / 2) / n !) else 0 variable {A A'} (n : ℕ) @[simp] theorem coeff_exp : coeff A n (exp A) = algebraMap ℚ A (1 / n !) := coeff_mk _ _ @[simp] theorem constantCoeff_exp : constantCoeff A (exp A) = 1 := by rw [← coeff_zero_eq_constantCoeff_apply, coeff_exp]	simp	Mathlib/RingTheory/PowerSeries/WellKnown.lean	201	202
/- Copyright (c) 2022 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne, Kexing Ying -/ import Mathlib.MeasureTheory.Function.ConditionalExpectation.Indicator import Mathlib.MeasureTheory.Function.UniformIntegrable import Mathlib.MeasureTheory.VectorMeasure.Decomposition.RadonNikodym /-! # Conditional expectation of real-valued functions This file proves some results regarding the conditional expectation of real-valued functions. ## Main results * `MeasureTheory.rnDeriv_ae_eq_condExp`: the conditional expectation `μ[f \| m]` is equal to the Radon-Nikodym derivative of `fμ` restricted on `m` with respect to `μ` restricted on `m`. * `MeasureTheory.Integrable.uniformIntegrable_condExp`: the conditional expectation of a function form a uniformly integrable class. * `MeasureTheory.condExp_mul_of_stronglyMeasurable_left`: the pull-out property of the conditional expectation. -/ noncomputable section open TopologicalSpace MeasureTheory.Lp Filter ContinuousLinearMap open scoped NNReal ENNReal Topology MeasureTheory namespace MeasureTheory variable {α : Type} {m m0 : MeasurableSpace α} {μ : Measure α} theorem rnDeriv_ae_eq_condExp {hm : m ≤ m0} [hμm : SigmaFinite (μ.trim hm)] {f : α → ℝ} (hf : Integrable f μ) : SignedMeasure.rnDeriv ((μ.withDensityᵥ f).trim hm) (μ.trim hm) =ᵐ[μ] μ[f\|m] := by refine ae_eq_condExp_of_forall_setIntegral_eq hm hf ?_ ?_ ?_ · exact fun _ _ _ => (integrable_of_integrable_trim hm (SignedMeasure.integrable_rnDeriv ((μ.withDensityᵥ f).trim hm) (μ.trim hm))).integrableOn · intro s hs _ conv_rhs => rw [← hf.withDensityᵥ_trim_eq_integral hm hs, ← SignedMeasure.withDensityᵥ_rnDeriv_eq ((μ.withDensityᵥ f).trim hm) (μ.trim hm) (hf.withDensityᵥ_trim_absolutelyContinuous hm)] rw [withDensityᵥ_apply (SignedMeasure.integrable_rnDeriv ((μ.withDensityᵥ f).trim hm) (μ.trim hm)) hs, ← setIntegral_trim hm _ hs] exact (SignedMeasure.measurable_rnDeriv _ _).stronglyMeasurable · exact (SignedMeasure.measurable_rnDeriv _ _).stronglyMeasurable.aestronglyMeasurable @[deprecated (since := "2025-01-21")] alias rnDeriv_ae_eq_condexp := rnDeriv_ae_eq_condExp -- TODO: the following couple of lemmas should be generalized and proved using Jensen's inequality -- for the conditional expectation (not in mathlib yet) . theorem eLpNorm_one_condExp_le_eLpNorm (f : α → ℝ) : eLpNorm (μ[f\|m]) 1 μ ≤ eLpNorm f 1 μ := by by_cases hf : Integrable f μ swap; · rw [condExp_of_not_integrable hf, eLpNorm_zero]; exact zero_le _ by_cases hm : m ≤ m0 swap; · rw [condExp_of_not_le hm, eLpNorm_zero]; exact zero_le _ by_cases hsig : SigmaFinite (μ.trim hm) swap; · rw [condExp_of_not_sigmaFinite hm hsig, eLpNorm_zero]; exact zero_le _ calc eLpNorm (μ[f\|m]) 1 μ ≤ eLpNorm (μ[(\|f\|)\|m]) 1 μ := by refine eLpNorm_mono_ae ?_ filter_upwards [condExp_mono hf hf.abs (ae_of_all μ (fun x => le_abs_self (f x) : ∀ x, f x ≤ \|f x\|)), (condExp_neg ..).symm.le.trans (condExp_mono hf.neg hf.abs (ae_of_all μ (fun x => neg_le_abs (f x) : ∀ x, -f x ≤ \|f x\|)))] with x hx₁ hx₂ exact abs_le_abs hx₁ hx₂ _ = eLpNorm f 1 μ := by rw [eLpNorm_one_eq_lintegral_enorm, eLpNorm_one_eq_lintegral_enorm, ← ENNReal.toReal_eq_toReal (hasFiniteIntegral_iff_enorm.mp integrable_condExp.2).ne (hasFiniteIntegral_iff_enorm.mp hf.2).ne, ← integral_norm_eq_lintegral_enorm (stronglyMeasurable_condExp.mono hm).aestronglyMeasurable, ← integral_norm_eq_lintegral_enorm hf.1] simp_rw [Real.norm_eq_abs] rw (config := {occs := .pos [2]}) [← integral_condExp hm] refine integral_congr_ae ?_ have : 0 ≤ᵐ[μ] μ[(\|f\|)\|m] := by rw [← condExp_zero] exact condExp_mono (integrable_zero _ _ _) hf.abs (ae_of_all μ (fun x => abs_nonneg (f x) : ∀ x, 0 ≤ \|f x\|)) filter_upwards [this] with x hx exact abs_eq_self.2 hx @[deprecated (since := "2025-01-21")] alias eLpNorm_one_condexp_le_eLpNorm := eLpNorm_one_condExp_le_eLpNorm theorem integral_abs_condExp_le (f : α → ℝ) : ∫ x, \|(μ[f\|m]) x\| ∂μ ≤ ∫ x, \|f x\| ∂μ := by by_cases hm : m ≤ m0 swap · simp_rw [condExp_of_not_le hm, Pi.zero_apply, abs_zero, integral_zero] positivity by_cases hfint : Integrable f μ swap · simp only [condExp_of_not_integrable hfint, Pi.zero_apply, abs_zero, integral_const, Algebra.id.smul_eq_mul, mul_zero] positivity rw [integral_eq_lintegral_of_nonneg_ae, integral_eq_lintegral_of_nonneg_ae] · apply ENNReal.toReal_mono <;> simp_rw [← Real.norm_eq_abs, ofReal_norm_eq_enorm] · exact hfint.2.ne · rw [← eLpNorm_one_eq_lintegral_enorm, ← eLpNorm_one_eq_lintegral_enorm] exact eLpNorm_one_condExp_le_eLpNorm _ · filter_upwards with x using abs_nonneg _ · simp_rw [← Real.norm_eq_abs] exact hfint.1.norm · filter_upwards with x using abs_nonneg _ · simp_rw [← Real.norm_eq_abs] exact (stronglyMeasurable_condExp.mono hm).aestronglyMeasurable.norm @[deprecated (since := "2025-01-21")] alias integral_abs_condexp_le := integral_abs_condExp_le theorem setIntegral_abs_condExp_le {s : Set α} (hs : MeasurableSet[m] s) (f : α → ℝ) : ∫ x in s, \|(μ[f\|m]) x\| ∂μ ≤ ∫ x in s, \|f x\| ∂μ := by by_cases hnm : m ≤ m0 swap · simp_rw [condExp_of_not_le hnm, Pi.zero_apply, abs_zero, integral_zero] positivity by_cases hfint : Integrable f μ swap · simp only [condExp_of_not_integrable hfint, Pi.zero_apply, abs_zero, integral_const, Algebra.id.smul_eq_mul, mul_zero] positivity have : ∫ x in s, \|(μ[f\|m]) x\| ∂μ = ∫ x, \|(μ[s.indicator f\|m]) x\| ∂μ := by rw [← integral_indicator (hnm _ hs)] refine integral_congr_ae ?_ have : (fun x => \|(μ[s.indicator f\|m]) x\|) =ᵐ[μ] fun x => \|s.indicator (μ[f\|m]) x\| := (condExp_indicator hfint hs).fun_comp abs refine EventuallyEq.trans (Eventually.of_forall fun x => ?_) this.symm rw [← Real.norm_eq_abs, norm_indicator_eq_indicator_norm] simp only [Real.norm_eq_abs] rw [this, ← integral_indicator (hnm _ hs)] refine (integral_abs_condExp_le _).trans (le_of_eq <\| integral_congr_ae <\| Eventually.of_forall fun x => ?_) simp_rw [← Real.norm_eq_abs, norm_indicator_eq_indicator_norm] @[deprecated (since := "2025-01-21")] alias setIntegral_abs_condexp_le := setIntegral_abs_condExp_le /-- If the real valued function `f` is bounded almost everywhere by `R`, then so is its conditional expectation. -/ theorem ae_bdd_condExp_of_ae_bdd {R : ℝ≥0} {f : α → ℝ} (hbdd : ∀ᵐ x ∂μ, \|f x\| ≤ R) : ∀ᵐ x ∂μ, \|(μ[f\|m]) x\| ≤ R := by by_cases hnm : m ≤ m0 swap · simp_rw [condExp_of_not_le hnm, Pi.zero_apply, abs_zero] exact Eventually.of_forall fun _ => R.coe_nonneg by_cases hfint : Integrable f μ swap · simp_rw [condExp_of_not_integrable hfint] filter_upwards [hbdd] with x hx rw [Pi.zero_apply, abs_zero] exact (abs_nonneg _).trans hx by_contra h change μ _ ≠ 0 at h simp only [← zero_lt_iff, Set.compl_def, Set.mem_setOf_eq, not_le] at h suffices μ.real {x \| ↑R < \|(μ[f\|m]) x\|} ↑R < μ.real {x \| ↑R < \|(μ[f\|m]) x\|} * ↑R by exact this.ne rfl refine lt_of_lt_of_le (setIntegral_gt_gt R.coe_nonneg ?_ h.ne') ?_ · exact integrable_condExp.abs.integrableOn refine (setIntegral_abs_condExp_le ?_ _).trans ?_ · simp_rw [← Real.norm_eq_abs] exact @measurableSet_lt _ _ _ _ _ m _ _ _ _ _ measurable_const stronglyMeasurable_condExp.norm.measurable simp only [← smul_eq_mul, ← setIntegral_const, NNReal.val_eq_coe, RCLike.ofReal_real_eq_id, _root_.id] refine setIntegral_mono_ae hfint.abs.integrableOn ?_ hbdd refine ⟨aestronglyMeasurable_const, lt_of_le_of_lt ?_ (integrable_condExp.integrableOn : IntegrableOn (μ[f\|m]) {x \| ↑R < \|(μ[f\|m]) x\|} μ).2⟩ refine setLIntegral_mono (stronglyMeasurable_condExp.mono hnm).measurable.nnnorm.coe_nnreal_ennreal fun x hx => ?_ rw [enorm_eq_nnnorm, enorm_eq_nnnorm, ENNReal.coe_le_coe, Real.nnnorm_of_nonneg R.coe_nonneg] exact Subtype.mk_le_mk.2 (le_of_lt hx) @[deprecated (since := "2025-01-21")] alias ae_bdd_condexp_of_ae_bdd := ae_bdd_condExp_of_ae_bdd /-- Given an integrable function `g`, the conditional expectations of `g` with respect to a sequence of sub-σ-algebras is uniformly integrable. -/ theorem Integrable.uniformIntegrable_condExp {ι : Type} [IsFiniteMeasure μ] {g : α → ℝ} (hint : Integrable g μ) {ℱ : ι → MeasurableSpace α} (hℱ : ∀ i, ℱ i ≤ m0) : UniformIntegrable (fun i => μ[g\|ℱ i]) 1 μ := by let A : MeasurableSpace α := m0 have hmeas : ∀ n, ∀ C, MeasurableSet {x \| C ≤ ‖(μ[g\|ℱ n]) x‖₊} := fun n C => measurableSet_le measurable_const (stronglyMeasurable_condExp.mono (hℱ n)).measurable.nnnorm have hg : MemLp g 1 μ := memLp_one_iff_integrable.2 hint refine uniformIntegrable_of le_rfl ENNReal.one_ne_top (fun n => (stronglyMeasurable_condExp.mono (hℱ n)).aestronglyMeasurable) fun ε hε => ?_ by_cases hne : eLpNorm g 1 μ = 0 · rw [eLpNorm_eq_zero_iff hg.1 one_ne_zero] at hne refine ⟨0, fun n => (le_of_eq <\| (eLpNorm_eq_zero_iff ((stronglyMeasurable_condExp.mono (hℱ n)).aestronglyMeasurable.indicator (hmeas n 0)) one_ne_zero).2 ?_).trans (zero_le _)⟩ filter_upwards [condExp_congr_ae (m := ℱ n) hne] with x hx simp only [zero_le', Set.setOf_true, Set.indicator_univ, Pi.zero_apply, hx, condExp_zero] obtain ⟨δ, hδ, h⟩ := hg.eLpNorm_indicator_le le_rfl ENNReal.one_ne_top hε set C : ℝ≥0 := ⟨δ, hδ.le⟩⁻¹ (eLpNorm g 1 μ).toNNReal with hC have hCpos : 0 < C := mul_pos (inv_pos.2 hδ) (ENNReal.toNNReal_pos hne hg.eLpNorm_lt_top.ne) have : ∀ n, μ {x : α \| C ≤ ‖(μ[g\|ℱ n]) x‖₊} ≤ ENNReal.ofReal δ := by intro n have := mul_meas_ge_le_pow_eLpNorm' μ one_ne_zero ENNReal.one_ne_top ((stronglyMeasurable_condExp (m := ℱ n) (μ := μ) (f := g)).mono (hℱ n)).aestronglyMeasurable C rw [ENNReal.toReal_one, ENNReal.rpow_one, ENNReal.rpow_one, mul_comm, ← ENNReal.le_div_iff_mul_le (Or.inl (ENNReal.coe_ne_zero.2 hCpos.ne')) (Or.inl ENNReal.coe_lt_top.ne)] at this simp_rw [ENNReal.coe_le_coe] at this refine this.trans ?_ rw [ENNReal.div_le_iff_le_mul (Or.inl (ENNReal.coe_ne_zero.2 hCpos.ne')) (Or.inl ENNReal.coe_lt_top.ne), hC, Nonneg.inv_mk, ENNReal.coe_mul, ENNReal.coe_toNNReal hg.eLpNorm_lt_top.ne, ← mul_assoc, ← ENNReal.ofReal_eq_coe_nnreal, ← ENNReal.ofReal_mul hδ.le, mul_inv_cancel₀ hδ.ne', ENNReal.ofReal_one, one_mul] exact eLpNorm_one_condExp_le_eLpNorm _ refine ⟨C, fun n => le_trans ?_ (h {x : α \| C ≤ ‖(μ[g\|ℱ n]) x‖₊} (hmeas n C) (this n))⟩ have hmeasℱ : MeasurableSet[ℱ n] {x : α \| C ≤ ‖(μ[g\|ℱ n]) x‖₊} := @measurableSet_le _ _ _ _ _ (ℱ n) _ _ _ _ _ measurable_const (@Measurable.nnnorm _ _ _ _ _ (ℱ n) _ stronglyMeasurable_condExp.measurable) rw [← eLpNorm_congr_ae (condExp_indicator hint hmeasℱ)] exact eLpNorm_one_condExp_le_eLpNorm _ @[deprecated (since := "2025-01-21")] alias Integrable.uniformIntegrable_condexp := Integrable.uniformIntegrable_condExp section PullOut -- TODO: this section could be generalized beyond multiplication, to any bounded bilinear map. /-- Auxiliary lemma for `condExp_mul_of_stronglyMeasurable_left`. -/ theorem condExp_stronglyMeasurable_simpleFunc_mul (hm : m ≤ m0) (f : @SimpleFunc α m ℝ) {g : α → ℝ} (hg : Integrable g μ) : μ[(f * g : α → ℝ)\|m] =ᵐ[μ] f * μ[g\|m] := by have : ∀ (s c) (f : α → ℝ), Set.indicator s (Function.const α c) * f = s.indicator (c • f) := by intro s c f ext1 x by_cases hx : x ∈ s · simp only [hx, Pi.mul_apply, Set.indicator_of_mem, Pi.smul_apply, Algebra.id.smul_eq_mul, Function.const_apply] · simp only [hx, Pi.mul_apply, Set.indicator_of_not_mem, not_false_iff, zero_mul] apply @SimpleFunc.induction _ _ m _ (fun f => _) (fun c s hs => ?_) (fun g₁ g₂ _ h_eq₁ h_eq₂ => ?_) f · simp only [SimpleFunc.const_zero, SimpleFunc.coe_piecewise, SimpleFunc.coe_const, SimpleFunc.coe_zero, Set.piecewise_eq_indicator] rw [this, this] refine (condExp_indicator (hg.smul c) hs).trans ?_ filter_upwards [condExp_smul c g m] with x hx classical simp_rw [Set.indicator_apply, hx] · have h_add := @SimpleFunc.coe_add _ _ m _ g₁ g₂ calc μ[⇑(g₁ + g₂) * g\|m] =ᵐ[μ] μ[(⇑g₁ + ⇑g₂) * g\|m] := by refine condExp_congr_ae (EventuallyEq.mul ?_ EventuallyEq.rfl); rw [h_add] _ =ᵐ[μ] μ[⇑g₁ * g\|m] + μ[⇑g₂ * g\|m] := by rw [add_mul]; exact condExp_add (hg.simpleFunc_mul' hm _) (hg.simpleFunc_mul' hm _) _ _ =ᵐ[μ] ⇑g₁ * μ[g\|m] + ⇑g₂ * μ[g\|m] := EventuallyEq.add h_eq₁ h_eq₂ _ =ᵐ[μ] ⇑(g₁ + g₂) * μ[g\|m] := by rw [h_add, add_mul] @[deprecated (since := "2025-01-21")] alias condexp_stronglyMeasurable_simpleFunc_mul := condExp_stronglyMeasurable_simpleFunc_mul	theorem condExp_stronglyMeasurable_mul_of_bound (hm : m ≤ m0) [IsFiniteMeasure μ] {f g : α → ℝ} (hf : StronglyMeasurable[m] f) (hg : Integrable g μ) (c : ℝ) (hf_bound : ∀ᵐ x ∂μ, ‖f x‖ ≤ c) : μ[f * g\|m] =ᵐ[μ] f * μ[g\|m] := by let fs := hf.approxBounded c have hfs_tendsto : ∀ᵐ x ∂μ, Tendsto (fs · x) atTop (𝓝 (f x)) := hf.tendsto_approxBounded_ae hf_bound by_cases hμ : μ = 0 · simp only [hμ, ae_zero]; norm_cast have : (ae μ).NeBot := ae_neBot.2 hμ have hc : 0 ≤ c := by rcases hf_bound.exists with ⟨_x, hx⟩ exact (norm_nonneg _).trans hx have hfs_bound : ∀ n x, ‖fs n x‖ ≤ c := hf.norm_approxBounded_le hc have : μ[f * μ[g\|m]\|m] = f * μ[g\|m] := by refine condExp_of_stronglyMeasurable hm (hf.mul stronglyMeasurable_condExp) ?_ exact integrable_condExp.bdd_mul' (hf.mono hm).aestronglyMeasurable hf_bound rw [← this] refine tendsto_condExp_unique (fun n x => fs n x * g x) (fun n x => fs n x * (μ[g\|m]) x) (f * g) (f * μ[g\|m]) ?_ ?_ ?_ ?_ (c * ‖g ·‖) ?_ (c * ‖(μ[g\|m]) ·‖) ?_ ?_ ?_ ?_ · exact fun n => hg.bdd_mul' ((SimpleFunc.stronglyMeasurable (fs n)).mono hm).aestronglyMeasurable (Eventually.of_forall (hfs_bound n)) · exact fun n => integrable_condExp.bdd_mul' ((SimpleFunc.stronglyMeasurable (fs n)).mono hm).aestronglyMeasurable (Eventually.of_forall (hfs_bound n)) · filter_upwards [hfs_tendsto] with x hx exact hx.mul tendsto_const_nhds · filter_upwards [hfs_tendsto] with x hx exact hx.mul tendsto_const_nhds · exact hg.norm.const_mul c · fun_prop · refine fun n => Eventually.of_forall fun x => ?_ exact (norm_mul_le _ _).trans (mul_le_mul_of_nonneg_right (hfs_bound n x) (norm_nonneg _)) · refine fun n => Eventually.of_forall fun x => ?_ exact (norm_mul_le _ _).trans (mul_le_mul_of_nonneg_right (hfs_bound n x) (norm_nonneg _)) · intro n simp_rw [← Pi.mul_apply] refine (condExp_stronglyMeasurable_simpleFunc_mul hm _ hg).trans ?_ rw [condExp_of_stronglyMeasurable hm ((SimpleFunc.stronglyMeasurable _).mul stronglyMeasurable_condExp) _] exact integrable_condExp.bdd_mul' ((SimpleFunc.stronglyMeasurable (fs n)).mono hm).aestronglyMeasurable (Eventually.of_forall (hfs_bound n))	Mathlib/MeasureTheory/Function/ConditionalExpectation/Real.lean	259	300
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Jeremy Avigad -/ import Mathlib.Algebra.Group.Basic import Mathlib.Algebra.Notation.Pi import Mathlib.Data.Set.Lattice import Mathlib.Order.Filter.Defs /-! # Theory of filters on sets A filter on a type `α` is a collection of sets of `α` which contains the whole `α`, is upwards-closed, and is stable under intersection. They are mostly used to abstract two related kinds of ideas: * limits, including finite or infinite limits of sequences, finite or infinite limits of functions at a point or at infinity, etc... * things happening eventually, including things happening for large enough `n : ℕ`, or near enough a point `x`, or for close enough pairs of points, or things happening almost everywhere in the sense of measure theory. Dually, filters can also express the idea of things happening often: for arbitrarily large `n`, or at a point in any neighborhood of given a point etc... ## Main definitions In this file, we endow `Filter α` it with a complete lattice structure. This structure is lifted from the lattice structure on `Set (Set X)` using the Galois insertion which maps a filter to its elements in one direction, and an arbitrary set of sets to the smallest filter containing it in the other direction. We also prove `Filter` is a monadic functor, with a push-forward operation `Filter.map` and a pull-back operation `Filter.comap` that form a Galois connections for the order on filters. The examples of filters appearing in the description of the two motivating ideas are: * `(Filter.atTop : Filter ℕ)` : made of sets of `ℕ` containing `{n \| n ≥ N}` for some `N` * `𝓝 x` : made of neighborhoods of `x` in a topological space (defined in topology.basic) * `𝓤 X` : made of entourages of a uniform space (those space are generalizations of metric spaces defined in `Mathlib/Topology/UniformSpace/Basic.lean`) * `MeasureTheory.ae` : made of sets whose complement has zero measure with respect to `μ` (defined in `Mathlib/MeasureTheory/OuterMeasure/AE`) The predicate "happening eventually" is `Filter.Eventually`, and "happening often" is `Filter.Frequently`, whose definitions are immediate after `Filter` is defined (but they come rather late in this file in order to immediately relate them to the lattice structure). ## Notations * `∀ᶠ x in f, p x` : `f.Eventually p`; * `∃ᶠ x in f, p x` : `f.Frequently p`; * `f =ᶠ[l] g` : `∀ᶠ x in l, f x = g x`; * `f ≤ᶠ[l] g` : `∀ᶠ x in l, f x ≤ g x`; * `𝓟 s` : `Filter.Principal s`, localized in `Filter`. ## References * [N. Bourbaki, General Topology][bourbaki1966] Important note: Bourbaki requires that a filter on `X` cannot contain all sets of `X`, which we do not require. This gives `Filter X` better formal properties, in particular a bottom element `⊥` for its lattice structure, at the cost of including the assumption `[NeBot f]` in a number of lemmas and definitions. -/ assert_not_exists OrderedSemiring Fintype open Function Set Order open scoped symmDiff universe u v w x y namespace Filter variable {α : Type u} {f g : Filter α} {s t : Set α} instance inhabitedMem : Inhabited { s : Set α // s ∈ f } := ⟨⟨univ, f.univ_sets⟩⟩ theorem filter_eq_iff : f = g ↔ f.sets = g.sets := ⟨congr_arg _, filter_eq⟩ @[simp] theorem sets_subset_sets : f.sets ⊆ g.sets ↔ g ≤ f := .rfl @[simp] theorem sets_ssubset_sets : f.sets ⊂ g.sets ↔ g < f := .rfl /-- An extensionality lemma that is useful for filters with good lemmas about `sᶜ ∈ f` (e.g., `Filter.comap`, `Filter.coprod`, `Filter.Coprod`, `Filter.cofinite`). -/ protected theorem coext (h : ∀ s, sᶜ ∈ f ↔ sᶜ ∈ g) : f = g := Filter.ext <\| compl_surjective.forall.2 h instance : Trans (· ⊇ ·) ((· ∈ ·) : Set α → Filter α → Prop) (· ∈ ·) where trans h₁ h₂ := mem_of_superset h₂ h₁ instance : Trans Membership.mem (· ⊆ ·) (Membership.mem : Filter α → Set α → Prop) where trans h₁ h₂ := mem_of_superset h₁ h₂ @[simp] theorem inter_mem_iff {s t : Set α} : s ∩ t ∈ f ↔ s ∈ f ∧ t ∈ f := ⟨fun h => ⟨mem_of_superset h inter_subset_left, mem_of_superset h inter_subset_right⟩, and_imp.2 inter_mem⟩ theorem diff_mem {s t : Set α} (hs : s ∈ f) (ht : tᶜ ∈ f) : s \ t ∈ f := inter_mem hs ht theorem congr_sets (h : { x \| x ∈ s ↔ x ∈ t } ∈ f) : s ∈ f ↔ t ∈ f := ⟨fun hs => mp_mem hs (mem_of_superset h fun _ => Iff.mp), fun hs => mp_mem hs (mem_of_superset h fun _ => Iff.mpr)⟩ lemma copy_eq {S} (hmem : ∀ s, s ∈ S ↔ s ∈ f) : f.copy S hmem = f := Filter.ext hmem /-- Weaker version of `Filter.biInter_mem` that assumes `Subsingleton β` rather than `Finite β`. -/ theorem biInter_mem' {β : Type v} {s : β → Set α} {is : Set β} (hf : is.Subsingleton) : (⋂ i ∈ is, s i) ∈ f ↔ ∀ i ∈ is, s i ∈ f := by apply Subsingleton.induction_on hf <;> simp /-- Weaker version of `Filter.iInter_mem` that assumes `Subsingleton β` rather than `Finite β`. -/ theorem iInter_mem' {β : Sort v} {s : β → Set α} [Subsingleton β] : (⋂ i, s i) ∈ f ↔ ∀ i, s i ∈ f := by rw [← sInter_range, sInter_eq_biInter, biInter_mem' (subsingleton_range s), forall_mem_range] theorem exists_mem_subset_iff : (∃ t ∈ f, t ⊆ s) ↔ s ∈ f := ⟨fun ⟨_, ht, ts⟩ => mem_of_superset ht ts, fun hs => ⟨s, hs, Subset.rfl⟩⟩ theorem monotone_mem {f : Filter α} : Monotone fun s => s ∈ f := fun _ _ hst h => mem_of_superset h hst theorem exists_mem_and_iff {P : Set α → Prop} {Q : Set α → Prop} (hP : Antitone P) (hQ : Antitone Q) : ((∃ u ∈ f, P u) ∧ ∃ u ∈ f, Q u) ↔ ∃ u ∈ f, P u ∧ Q u := by constructor · rintro ⟨⟨u, huf, hPu⟩, v, hvf, hQv⟩ exact ⟨u ∩ v, inter_mem huf hvf, hP inter_subset_left hPu, hQ inter_subset_right hQv⟩ · rintro ⟨u, huf, hPu, hQu⟩ exact ⟨⟨u, huf, hPu⟩, u, huf, hQu⟩ theorem forall_in_swap {β : Type} {p : Set α → β → Prop} : (∀ a ∈ f, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ f, p a b := Set.forall_in_swap end Filter namespace Filter variable {α : Type u} {β : Type v} {γ : Type w} {δ : Type} {ι : Sort x} theorem mem_principal_self (s : Set α) : s ∈ 𝓟 s := Subset.rfl section Lattice variable {f g : Filter α} {s t : Set α} protected theorem not_le : ¬f ≤ g ↔ ∃ s ∈ g, s ∉ f := by simp_rw [le_def, not_forall, exists_prop] /-- `GenerateSets g s`: `s` is in the filter closure of `g`. -/ inductive GenerateSets (g : Set (Set α)) : Set α → Prop \| basic {s : Set α} : s ∈ g → GenerateSets g s \| univ : GenerateSets g univ \| superset {s t : Set α} : GenerateSets g s → s ⊆ t → GenerateSets g t \| inter {s t : Set α} : GenerateSets g s → GenerateSets g t → GenerateSets g (s ∩ t) /-- `generate g` is the largest filter containing the sets `g`. -/ def generate (g : Set (Set α)) : Filter α where sets := {s \| GenerateSets g s} univ_sets := GenerateSets.univ sets_of_superset := GenerateSets.superset inter_sets := GenerateSets.inter lemma mem_generate_of_mem {s : Set <\| Set α} {U : Set α} (h : U ∈ s) : U ∈ generate s := GenerateSets.basic h theorem le_generate_iff {s : Set (Set α)} {f : Filter α} : f ≤ generate s ↔ s ⊆ f.sets := Iff.intro (fun h _ hu => h <\| GenerateSets.basic <\| hu) fun h _ hu => hu.recOn (fun h' => h h') univ_mem (fun _ hxy hx => mem_of_superset hx hxy) fun _ _ hx hy => inter_mem hx hy @[simp] lemma generate_singleton (s : Set α) : generate {s} = 𝓟 s := le_antisymm (fun _t ht ↦ mem_of_superset (mem_generate_of_mem <\| mem_singleton _) ht) <\| le_generate_iff.2 <\| singleton_subset_iff.2 Subset.rfl /-- `mkOfClosure s hs` constructs a filter on `α` whose elements set is exactly `s : Set (Set α)`, provided one gives the assumption `hs : (generate s).sets = s`. -/ protected def mkOfClosure (s : Set (Set α)) (hs : (generate s).sets = s) : Filter α where sets := s univ_sets := hs ▸ univ_mem sets_of_superset := hs ▸ mem_of_superset inter_sets := hs ▸ inter_mem theorem mkOfClosure_sets {s : Set (Set α)} {hs : (generate s).sets = s} : Filter.mkOfClosure s hs = generate s := Filter.ext fun u => show u ∈ (Filter.mkOfClosure s hs).sets ↔ u ∈ (generate s).sets from hs.symm ▸ Iff.rfl /-- Galois insertion from sets of sets into filters. -/ def giGenerate (α : Type) : @GaloisInsertion (Set (Set α)) (Filter α)ᵒᵈ _ _ Filter.generate Filter.sets where gc _ _ := le_generate_iff le_l_u _ _ h := GenerateSets.basic h choice s hs := Filter.mkOfClosure s (le_antisymm hs <\| le_generate_iff.1 <\| le_rfl) choice_eq _ _ := mkOfClosure_sets theorem mem_inf_iff {f g : Filter α} {s : Set α} : s ∈ f ⊓ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, s = t₁ ∩ t₂ := Iff.rfl theorem mem_inf_of_left {f g : Filter α} {s : Set α} (h : s ∈ f) : s ∈ f ⊓ g := ⟨s, h, univ, univ_mem, (inter_univ s).symm⟩ theorem mem_inf_of_right {f g : Filter α} {s : Set α} (h : s ∈ g) : s ∈ f ⊓ g := ⟨univ, univ_mem, s, h, (univ_inter s).symm⟩ theorem inter_mem_inf {α : Type u} {f g : Filter α} {s t : Set α} (hs : s ∈ f) (ht : t ∈ g) : s ∩ t ∈ f ⊓ g := ⟨s, hs, t, ht, rfl⟩ theorem mem_inf_of_inter {f g : Filter α} {s t u : Set α} (hs : s ∈ f) (ht : t ∈ g) (h : s ∩ t ⊆ u) : u ∈ f ⊓ g := mem_of_superset (inter_mem_inf hs ht) h theorem mem_inf_iff_superset {f g : Filter α} {s : Set α} : s ∈ f ⊓ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, t₁ ∩ t₂ ⊆ s := ⟨fun ⟨t₁, h₁, t₂, h₂, Eq⟩ => ⟨t₁, h₁, t₂, h₂, Eq ▸ Subset.rfl⟩, fun ⟨_, h₁, _, h₂, sub⟩ => mem_inf_of_inter h₁ h₂ sub⟩ section CompleteLattice /-- Complete lattice structure on `Filter α`. -/ instance instCompleteLatticeFilter : CompleteLattice (Filter α) where inf a b := min a b sup a b := max a b le_sup_left _ _ _ h := h.1 le_sup_right _ _ _ h := h.2 sup_le _ _ _ h₁ h₂ _ h := ⟨h₁ h, h₂ h⟩ inf_le_left _ _ _ := mem_inf_of_left inf_le_right _ _ _ := mem_inf_of_right le_inf := fun _ _ _ h₁ h₂ _s ⟨_a, ha, _b, hb, hs⟩ => hs.symm ▸ inter_mem (h₁ ha) (h₂ hb) le_sSup _ _ h₁ _ h₂ := h₂ h₁ sSup_le _ _ h₁ _ h₂ _ h₃ := h₁ _ h₃ h₂ sInf_le _ _ h₁ _ h₂ := by rw [← Filter.sSup_lowerBounds]; exact fun _ h₃ ↦ h₃ h₁ h₂ le_sInf _ _ h₁ _ h₂ := by rw [← Filter.sSup_lowerBounds] at h₂; exact h₂ h₁ le_top _ _ := univ_mem' bot_le _ _ _ := trivial instance : Inhabited (Filter α) := ⟨⊥⟩ end CompleteLattice theorem NeBot.ne {f : Filter α} (hf : NeBot f) : f ≠ ⊥ := hf.ne' @[simp] theorem not_neBot {f : Filter α} : ¬f.NeBot ↔ f = ⊥ := neBot_iff.not_left theorem NeBot.mono {f g : Filter α} (hf : NeBot f) (hg : f ≤ g) : NeBot g := ⟨ne_bot_of_le_ne_bot hf.1 hg⟩ theorem neBot_of_le {f g : Filter α} [hf : NeBot f] (hg : f ≤ g) : NeBot g := hf.mono hg @[simp] theorem sup_neBot {f g : Filter α} : NeBot (f ⊔ g) ↔ NeBot f ∨ NeBot g := by simp only [neBot_iff, not_and_or, Ne, sup_eq_bot_iff] theorem not_disjoint_self_iff : ¬Disjoint f f ↔ f.NeBot := by rw [disjoint_self, neBot_iff] theorem bot_sets_eq : (⊥ : Filter α).sets = univ := rfl /-- Either `f = ⊥` or `Filter.NeBot f`. This is a version of `eq_or_ne` that uses `Filter.NeBot` as the second alternative, to be used as an instance. -/ theorem eq_or_neBot (f : Filter α) : f = ⊥ ∨ NeBot f := (eq_or_ne f ⊥).imp_right NeBot.mk theorem sup_sets_eq {f g : Filter α} : (f ⊔ g).sets = f.sets ∩ g.sets := (giGenerate α).gc.u_inf theorem sSup_sets_eq {s : Set (Filter α)} : (sSup s).sets = ⋂ f ∈ s, (f : Filter α).sets := (giGenerate α).gc.u_sInf theorem iSup_sets_eq {f : ι → Filter α} : (iSup f).sets = ⋂ i, (f i).sets := (giGenerate α).gc.u_iInf theorem generate_empty : Filter.generate ∅ = (⊤ : Filter α) := (giGenerate α).gc.l_bot theorem generate_univ : Filter.generate univ = (⊥ : Filter α) := bot_unique fun _ _ => GenerateSets.basic (mem_univ _) theorem generate_union {s t : Set (Set α)} : Filter.generate (s ∪ t) = Filter.generate s ⊓ Filter.generate t := (giGenerate α).gc.l_sup theorem generate_iUnion {s : ι → Set (Set α)} : Filter.generate (⋃ i, s i) = ⨅ i, Filter.generate (s i) := (giGenerate α).gc.l_iSup @[simp] theorem mem_sup {f g : Filter α} {s : Set α} : s ∈ f ⊔ g ↔ s ∈ f ∧ s ∈ g := Iff.rfl theorem union_mem_sup {f g : Filter α} {s t : Set α} (hs : s ∈ f) (ht : t ∈ g) : s ∪ t ∈ f ⊔ g := ⟨mem_of_superset hs subset_union_left, mem_of_superset ht subset_union_right⟩ @[simp] theorem mem_iSup {x : Set α} {f : ι → Filter α} : x ∈ iSup f ↔ ∀ i, x ∈ f i := by simp only [← Filter.mem_sets, iSup_sets_eq, mem_iInter] @[simp] theorem iSup_neBot {f : ι → Filter α} : (⨆ i, f i).NeBot ↔ ∃ i, (f i).NeBot := by simp [neBot_iff] theorem iInf_eq_generate (s : ι → Filter α) : iInf s = generate (⋃ i, (s i).sets) := eq_of_forall_le_iff fun _ ↦ by simp [le_generate_iff] theorem mem_iInf_of_mem {f : ι → Filter α} (i : ι) {s} (hs : s ∈ f i) : s ∈ ⨅ i, f i := iInf_le f i hs @[simp] theorem le_principal_iff {s : Set α} {f : Filter α} : f ≤ 𝓟 s ↔ s ∈ f := ⟨fun h => h Subset.rfl, fun hs _ ht => mem_of_superset hs ht⟩ theorem Iic_principal (s : Set α) : Iic (𝓟 s) = { l \| s ∈ l } := Set.ext fun _ => le_principal_iff theorem principal_mono {s t : Set α} : 𝓟 s ≤ 𝓟 t ↔ s ⊆ t := by simp only [le_principal_iff, mem_principal] @[gcongr] alias ⟨_, _root_.GCongr.filter_principal_mono⟩ := principal_mono @[mono] theorem monotone_principal : Monotone (𝓟 : Set α → Filter α) := fun _ _ => principal_mono.2 @[simp] theorem principal_eq_iff_eq {s t : Set α} : 𝓟 s = 𝓟 t ↔ s = t := by simp only [le_antisymm_iff, le_principal_iff, mem_principal]; rfl @[simp] theorem join_principal_eq_sSup {s : Set (Filter α)} : join (𝓟 s) = sSup s := rfl @[simp] theorem principal_univ : 𝓟 (univ : Set α) = ⊤ := top_unique <\| by simp only [le_principal_iff, mem_top, eq_self_iff_true] @[simp] theorem principal_empty : 𝓟 (∅ : Set α) = ⊥ := bot_unique fun _ _ => empty_subset _ theorem generate_eq_biInf (S : Set (Set α)) : generate S = ⨅ s ∈ S, 𝓟 s := eq_of_forall_le_iff fun f => by simp [le_generate_iff, le_principal_iff, subset_def] /-! ### Lattice equations -/ theorem empty_mem_iff_bot {f : Filter α} : ∅ ∈ f ↔ f = ⊥ := ⟨fun h => bot_unique fun s _ => mem_of_superset h (empty_subset s), fun h => h.symm ▸ mem_bot⟩ theorem nonempty_of_mem {f : Filter α} [hf : NeBot f] {s : Set α} (hs : s ∈ f) : s.Nonempty := s.eq_empty_or_nonempty.elim (fun h => absurd hs (h.symm ▸ mt empty_mem_iff_bot.mp hf.1)) id theorem NeBot.nonempty_of_mem {f : Filter α} (hf : NeBot f) {s : Set α} (hs : s ∈ f) : s.Nonempty := @Filter.nonempty_of_mem α f hf s hs @[simp] theorem empty_not_mem (f : Filter α) [NeBot f] : ¬∅ ∈ f := fun h => (nonempty_of_mem h).ne_empty rfl theorem nonempty_of_neBot (f : Filter α) [NeBot f] : Nonempty α := nonempty_of_exists <\| nonempty_of_mem (univ_mem : univ ∈ f) theorem compl_not_mem {f : Filter α} {s : Set α} [NeBot f] (h : s ∈ f) : sᶜ ∉ f := fun hsc => (nonempty_of_mem (inter_mem h hsc)).ne_empty <\| inter_compl_self s theorem filter_eq_bot_of_isEmpty [IsEmpty α] (f : Filter α) : f = ⊥ := empty_mem_iff_bot.mp <\| univ_mem' isEmptyElim protected lemma disjoint_iff {f g : Filter α} : Disjoint f g ↔ ∃ s ∈ f, ∃ t ∈ g, Disjoint s t := by simp only [disjoint_iff, ← empty_mem_iff_bot, mem_inf_iff, inf_eq_inter, bot_eq_empty, @eq_comm _ ∅] theorem disjoint_of_disjoint_of_mem {f g : Filter α} {s t : Set α} (h : Disjoint s t) (hs : s ∈ f) (ht : t ∈ g) : Disjoint f g := Filter.disjoint_iff.mpr ⟨s, hs, t, ht, h⟩ theorem NeBot.not_disjoint (hf : f.NeBot) (hs : s ∈ f) (ht : t ∈ f) : ¬Disjoint s t := fun h => not_disjoint_self_iff.2 hf <\| Filter.disjoint_iff.2 ⟨s, hs, t, ht, h⟩ theorem inf_eq_bot_iff {f g : Filter α} : f ⊓ g = ⊥ ↔ ∃ U ∈ f, ∃ V ∈ g, U ∩ V = ∅ := by simp only [← disjoint_iff, Filter.disjoint_iff, Set.disjoint_iff_inter_eq_empty] /-- There is exactly one filter on an empty type. -/ instance unique [IsEmpty α] : Unique (Filter α) where default := ⊥ uniq := filter_eq_bot_of_isEmpty theorem NeBot.nonempty (f : Filter α) [hf : f.NeBot] : Nonempty α := not_isEmpty_iff.mp fun _ ↦ hf.ne (Subsingleton.elim _ _) /-- There are only two filters on a `Subsingleton`: `⊥` and `⊤`. If the type is empty, then they are equal. -/ theorem eq_top_of_neBot [Subsingleton α] (l : Filter α) [NeBot l] : l = ⊤ := by refine top_unique fun s hs => ?_ obtain rfl : s = univ := Subsingleton.eq_univ_of_nonempty (nonempty_of_mem hs) exact univ_mem theorem forall_mem_nonempty_iff_neBot {f : Filter α} : (∀ s : Set α, s ∈ f → s.Nonempty) ↔ NeBot f := ⟨fun h => ⟨fun hf => not_nonempty_empty (h ∅ <\| hf.symm ▸ mem_bot)⟩, @nonempty_of_mem _ _⟩ instance instNeBotTop [Nonempty α] : NeBot (⊤ : Filter α) := forall_mem_nonempty_iff_neBot.1 fun s hs => by rwa [mem_top.1 hs, ← nonempty_iff_univ_nonempty] instance instNontrivialFilter [Nonempty α] : Nontrivial (Filter α) := ⟨⟨⊤, ⊥, instNeBotTop.ne⟩⟩ theorem nontrivial_iff_nonempty : Nontrivial (Filter α) ↔ Nonempty α := ⟨fun _ => by_contra fun h' => haveI := not_nonempty_iff.1 h' not_subsingleton (Filter α) inferInstance, @Filter.instNontrivialFilter α⟩ theorem eq_sInf_of_mem_iff_exists_mem {S : Set (Filter α)} {l : Filter α} (h : ∀ {s}, s ∈ l ↔ ∃ f ∈ S, s ∈ f) : l = sInf S := le_antisymm (le_sInf fun f hf _ hs => h.2 ⟨f, hf, hs⟩) fun _ hs => let ⟨_, hf, hs⟩ := h.1 hs; (sInf_le hf) hs theorem eq_iInf_of_mem_iff_exists_mem {f : ι → Filter α} {l : Filter α} (h : ∀ {s}, s ∈ l ↔ ∃ i, s ∈ f i) : l = iInf f := eq_sInf_of_mem_iff_exists_mem <\| h.trans (exists_range_iff (p := (_ ∈ ·))).symm theorem eq_biInf_of_mem_iff_exists_mem {f : ι → Filter α} {p : ι → Prop} {l : Filter α} (h : ∀ {s}, s ∈ l ↔ ∃ i, p i ∧ s ∈ f i) : l = ⨅ (i) (_ : p i), f i := by rw [iInf_subtype'] exact eq_iInf_of_mem_iff_exists_mem fun {_} => by simp only [Subtype.exists, h, exists_prop] theorem iInf_sets_eq {f : ι → Filter α} (h : Directed (· ≥ ·) f) [ne : Nonempty ι] : (iInf f).sets = ⋃ i, (f i).sets := let ⟨i⟩ := ne let u := { sets := ⋃ i, (f i).sets univ_sets := mem_iUnion.2 ⟨i, univ_mem⟩ sets_of_superset := by simp only [mem_iUnion, exists_imp] exact fun i hx hxy => ⟨i, mem_of_superset hx hxy⟩ inter_sets := by simp only [mem_iUnion, exists_imp] intro x y a hx b hy rcases h a b with ⟨c, ha, hb⟩ exact ⟨c, inter_mem (ha hx) (hb hy)⟩ } have : u = iInf f := eq_iInf_of_mem_iff_exists_mem mem_iUnion congr_arg Filter.sets this.symm theorem mem_iInf_of_directed {f : ι → Filter α} (h : Directed (· ≥ ·) f) [Nonempty ι] (s) : s ∈ iInf f ↔ ∃ i, s ∈ f i := by simp only [← Filter.mem_sets, iInf_sets_eq h, mem_iUnion] theorem mem_biInf_of_directed {f : β → Filter α} {s : Set β} (h : DirectedOn (f ⁻¹'o (· ≥ ·)) s) (ne : s.Nonempty) {t : Set α} : (t ∈ ⨅ i ∈ s, f i) ↔ ∃ i ∈ s, t ∈ f i := by haveI := ne.to_subtype simp_rw [iInf_subtype', mem_iInf_of_directed h.directed_val, Subtype.exists, exists_prop] theorem biInf_sets_eq {f : β → Filter α} {s : Set β} (h : DirectedOn (f ⁻¹'o (· ≥ ·)) s) (ne : s.Nonempty) : (⨅ i ∈ s, f i).sets = ⋃ i ∈ s, (f i).sets := ext fun t => by simp [mem_biInf_of_directed h ne] @[simp] theorem sup_join {f₁ f₂ : Filter (Filter α)} : join f₁ ⊔ join f₂ = join (f₁ ⊔ f₂) := Filter.ext fun x => by simp only [mem_sup, mem_join] @[simp] theorem iSup_join {ι : Sort w} {f : ι → Filter (Filter α)} : ⨆ x, join (f x) = join (⨆ x, f x) := Filter.ext fun x => by simp only [mem_iSup, mem_join] instance : DistribLattice (Filter α) := { Filter.instCompleteLatticeFilter with le_sup_inf := by intro x y z s simp only [and_assoc, mem_inf_iff, mem_sup, exists_prop, exists_imp, and_imp] rintro hs t₁ ht₁ t₂ ht₂ rfl exact ⟨t₁, x.sets_of_superset hs inter_subset_left, ht₁, t₂, x.sets_of_superset hs inter_subset_right, ht₂, rfl⟩ } /-- If `f : ι → Filter α` is directed, `ι` is not empty, and `∀ i, f i ≠ ⊥`, then `iInf f ≠ ⊥`. See also `iInf_neBot_of_directed` for a version assuming `Nonempty α` instead of `Nonempty ι`. -/ theorem iInf_neBot_of_directed' {f : ι → Filter α} [Nonempty ι] (hd : Directed (· ≥ ·) f) : (∀ i, NeBot (f i)) → NeBot (iInf f) := not_imp_not.1 <\| by simpa only [not_forall, not_neBot, ← empty_mem_iff_bot, mem_iInf_of_directed hd] using id /-- If `f : ι → Filter α` is directed, `α` is not empty, and `∀ i, f i ≠ ⊥`, then `iInf f ≠ ⊥`. See also `iInf_neBot_of_directed'` for a version assuming `Nonempty ι` instead of `Nonempty α`. -/ theorem iInf_neBot_of_directed {f : ι → Filter α} [hn : Nonempty α] (hd : Directed (· ≥ ·) f) (hb : ∀ i, NeBot (f i)) : NeBot (iInf f) := by cases isEmpty_or_nonempty ι · constructor simp [iInf_of_empty f, top_ne_bot] · exact iInf_neBot_of_directed' hd hb theorem sInf_neBot_of_directed' {s : Set (Filter α)} (hne : s.Nonempty) (hd : DirectedOn (· ≥ ·) s) (hbot : ⊥ ∉ s) : NeBot (sInf s) := (sInf_eq_iInf' s).symm ▸ @iInf_neBot_of_directed' _ _ _ hne.to_subtype hd.directed_val fun ⟨_, hf⟩ => ⟨ne_of_mem_of_not_mem hf hbot⟩ theorem sInf_neBot_of_directed [Nonempty α] {s : Set (Filter α)} (hd : DirectedOn (· ≥ ·) s) (hbot : ⊥ ∉ s) : NeBot (sInf s) := (sInf_eq_iInf' s).symm ▸ iInf_neBot_of_directed hd.directed_val fun ⟨_, hf⟩ => ⟨ne_of_mem_of_not_mem hf hbot⟩ theorem iInf_neBot_iff_of_directed' {f : ι → Filter α} [Nonempty ι] (hd : Directed (· ≥ ·) f) : NeBot (iInf f) ↔ ∀ i, NeBot (f i) := ⟨fun H i => H.mono (iInf_le _ i), iInf_neBot_of_directed' hd⟩ theorem iInf_neBot_iff_of_directed {f : ι → Filter α} [Nonempty α] (hd : Directed (· ≥ ·) f) : NeBot (iInf f) ↔ ∀ i, NeBot (f i) := ⟨fun H i => H.mono (iInf_le _ i), iInf_neBot_of_directed hd⟩ /-! #### `principal` equations -/ @[simp] theorem inf_principal {s t : Set α} : 𝓟 s ⊓ 𝓟 t = 𝓟 (s ∩ t) := le_antisymm (by simp only [le_principal_iff, mem_inf_iff]; exact ⟨s, Subset.rfl, t, Subset.rfl, rfl⟩) (by simp [le_inf_iff, inter_subset_left, inter_subset_right]) @[simp] theorem sup_principal {s t : Set α} : 𝓟 s ⊔ 𝓟 t = 𝓟 (s ∪ t) := Filter.ext fun u => by simp only [union_subset_iff, mem_sup, mem_principal] @[simp] theorem iSup_principal {ι : Sort w} {s : ι → Set α} : ⨆ x, 𝓟 (s x) = 𝓟 (⋃ i, s i) := Filter.ext fun x => by simp only [mem_iSup, mem_principal, iUnion_subset_iff] @[simp] theorem principal_eq_bot_iff {s : Set α} : 𝓟 s = ⊥ ↔ s = ∅ := empty_mem_iff_bot.symm.trans <\| mem_principal.trans subset_empty_iff @[simp] theorem principal_neBot_iff {s : Set α} : NeBot (𝓟 s) ↔ s.Nonempty := neBot_iff.trans <\| (not_congr principal_eq_bot_iff).trans nonempty_iff_ne_empty.symm alias ⟨_, _root_.Set.Nonempty.principal_neBot⟩ := principal_neBot_iff theorem isCompl_principal (s : Set α) : IsCompl (𝓟 s) (𝓟 sᶜ) := IsCompl.of_eq (by rw [inf_principal, inter_compl_self, principal_empty]) <\| by rw [sup_principal, union_compl_self, principal_univ] theorem mem_inf_principal' {f : Filter α} {s t : Set α} : s ∈ f ⊓ 𝓟 t ↔ tᶜ ∪ s ∈ f := by simp only [← le_principal_iff, (isCompl_principal s).le_left_iff, disjoint_assoc, inf_principal, ← (isCompl_principal (t ∩ sᶜ)).le_right_iff, compl_inter, compl_compl] lemma mem_inf_principal {f : Filter α} {s t : Set α} : s ∈ f ⊓ 𝓟 t ↔ { x \| x ∈ t → x ∈ s } ∈ f := by simp only [mem_inf_principal', imp_iff_not_or, setOf_or, compl_def, setOf_mem_eq] lemma iSup_inf_principal (f : ι → Filter α) (s : Set α) : ⨆ i, f i ⊓ 𝓟 s = (⨆ i, f i) ⊓ 𝓟 s := by ext simp only [mem_iSup, mem_inf_principal] theorem inf_principal_eq_bot {f : Filter α} {s : Set α} : f ⊓ 𝓟 s = ⊥ ↔ sᶜ ∈ f := by rw [← empty_mem_iff_bot, mem_inf_principal] simp only [mem_empty_iff_false, imp_false, compl_def] theorem mem_of_eq_bot {f : Filter α} {s : Set α} (h : f ⊓ 𝓟 sᶜ = ⊥) : s ∈ f := by rwa [inf_principal_eq_bot, compl_compl] at h theorem diff_mem_inf_principal_compl {f : Filter α} {s : Set α} (hs : s ∈ f) (t : Set α) : s \ t ∈ f ⊓ 𝓟 tᶜ := inter_mem_inf hs <\| mem_principal_self tᶜ theorem principal_le_iff {s : Set α} {f : Filter α} : 𝓟 s ≤ f ↔ ∀ V ∈ f, s ⊆ V := by simp_rw [le_def, mem_principal] end Lattice @[mono, gcongr] theorem join_mono {f₁ f₂ : Filter (Filter α)} (h : f₁ ≤ f₂) : join f₁ ≤ join f₂ := fun _ hs => h hs /-! ### Eventually -/ theorem eventually_iff {f : Filter α} {P : α → Prop} : (∀ᶠ x in f, P x) ↔ { x \| P x } ∈ f := Iff.rfl @[simp] theorem eventually_mem_set {s : Set α} {l : Filter α} : (∀ᶠ x in l, x ∈ s) ↔ s ∈ l := Iff.rfl protected theorem ext' {f₁ f₂ : Filter α} (h : ∀ p : α → Prop, (∀ᶠ x in f₁, p x) ↔ ∀ᶠ x in f₂, p x) : f₁ = f₂ := Filter.ext h theorem Eventually.filter_mono {f₁ f₂ : Filter α} (h : f₁ ≤ f₂) {p : α → Prop} (hp : ∀ᶠ x in f₂, p x) : ∀ᶠ x in f₁, p x := h hp theorem eventually_of_mem {f : Filter α} {P : α → Prop} {U : Set α} (hU : U ∈ f) (h : ∀ x ∈ U, P x) : ∀ᶠ x in f, P x := mem_of_superset hU h protected theorem Eventually.and {p q : α → Prop} {f : Filter α} : f.Eventually p → f.Eventually q → ∀ᶠ x in f, p x ∧ q x := inter_mem @[simp] theorem eventually_true (f : Filter α) : ∀ᶠ _ in f, True := univ_mem theorem Eventually.of_forall {p : α → Prop} {f : Filter α} (hp : ∀ x, p x) : ∀ᶠ x in f, p x := univ_mem' hp @[simp] theorem eventually_false_iff_eq_bot {f : Filter α} : (∀ᶠ _ in f, False) ↔ f = ⊥ := empty_mem_iff_bot @[simp] theorem eventually_const {f : Filter α} [t : NeBot f] {p : Prop} : (∀ᶠ _ in f, p) ↔ p := by by_cases h : p <;> simp [h, t.ne] theorem eventually_iff_exists_mem {p : α → Prop} {f : Filter α} : (∀ᶠ x in f, p x) ↔ ∃ v ∈ f, ∀ y ∈ v, p y := exists_mem_subset_iff.symm theorem Eventually.exists_mem {p : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) : ∃ v ∈ f, ∀ y ∈ v, p y := eventually_iff_exists_mem.1 hp theorem Eventually.mp {p q : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) (hq : ∀ᶠ x in f, p x → q x) : ∀ᶠ x in f, q x := mp_mem hp hq theorem Eventually.mono {p q : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) (hq : ∀ x, p x → q x) : ∀ᶠ x in f, q x := hp.mp (Eventually.of_forall hq) theorem forall_eventually_of_eventually_forall {f : Filter α} {p : α → β → Prop} (h : ∀ᶠ x in f, ∀ y, p x y) : ∀ y, ∀ᶠ x in f, p x y := fun y => h.mono fun _ h => h y @[simp] theorem eventually_and {p q : α → Prop} {f : Filter α} : (∀ᶠ x in f, p x ∧ q x) ↔ (∀ᶠ x in f, p x) ∧ ∀ᶠ x in f, q x := inter_mem_iff theorem Eventually.congr {f : Filter α} {p q : α → Prop} (h' : ∀ᶠ x in f, p x) (h : ∀ᶠ x in f, p x ↔ q x) : ∀ᶠ x in f, q x := h'.mp (h.mono fun _ hx => hx.mp) theorem eventually_congr {f : Filter α} {p q : α → Prop} (h : ∀ᶠ x in f, p x ↔ q x) : (∀ᶠ x in f, p x) ↔ ∀ᶠ x in f, q x := ⟨fun hp => hp.congr h, fun hq => hq.congr <\| by simpa only [Iff.comm] using h⟩ @[simp] theorem eventually_or_distrib_left {f : Filter α} {p : Prop} {q : α → Prop} : (∀ᶠ x in f, p ∨ q x) ↔ p ∨ ∀ᶠ x in f, q x := by_cases (fun h : p => by simp [h]) fun h => by simp [h] @[simp] theorem eventually_or_distrib_right {f : Filter α} {p : α → Prop} {q : Prop} : (∀ᶠ x in f, p x ∨ q) ↔ (∀ᶠ x in f, p x) ∨ q := by simp only [@or_comm _ q, eventually_or_distrib_left] theorem eventually_imp_distrib_left {f : Filter α} {p : Prop} {q : α → Prop} : (∀ᶠ x in f, p → q x) ↔ p → ∀ᶠ x in f, q x := by simp only [imp_iff_not_or, eventually_or_distrib_left] @[simp] theorem eventually_bot {p : α → Prop} : ∀ᶠ x in ⊥, p x := ⟨⟩ @[simp] theorem eventually_top {p : α → Prop} : (∀ᶠ x in ⊤, p x) ↔ ∀ x, p x := Iff.rfl @[simp] theorem eventually_sup {p : α → Prop} {f g : Filter α} : (∀ᶠ x in f ⊔ g, p x) ↔ (∀ᶠ x in f, p x) ∧ ∀ᶠ x in g, p x := Iff.rfl @[simp] theorem eventually_sSup {p : α → Prop} {fs : Set (Filter α)} : (∀ᶠ x in sSup fs, p x) ↔ ∀ f ∈ fs, ∀ᶠ x in f, p x := Iff.rfl @[simp] theorem eventually_iSup {p : α → Prop} {fs : ι → Filter α} : (∀ᶠ x in ⨆ b, fs b, p x) ↔ ∀ b, ∀ᶠ x in fs b, p x := mem_iSup @[simp] theorem eventually_principal {a : Set α} {p : α → Prop} : (∀ᶠ x in 𝓟 a, p x) ↔ ∀ x ∈ a, p x := Iff.rfl theorem Eventually.forall_mem {α : Type} {f : Filter α} {s : Set α} {P : α → Prop} (hP : ∀ᶠ x in f, P x) (hf : 𝓟 s ≤ f) : ∀ x ∈ s, P x := Filter.eventually_principal.mp (hP.filter_mono hf) theorem eventually_inf {f g : Filter α} {p : α → Prop} : (∀ᶠ x in f ⊓ g, p x) ↔ ∃ s ∈ f, ∃ t ∈ g, ∀ x ∈ s ∩ t, p x := mem_inf_iff_superset theorem eventually_inf_principal {f : Filter α} {p : α → Prop} {s : Set α} : (∀ᶠ x in f ⊓ 𝓟 s, p x) ↔ ∀ᶠ x in f, x ∈ s → p x := mem_inf_principal theorem eventually_iff_all_subsets {f : Filter α} {p : α → Prop} : (∀ᶠ x in f, p x) ↔ ∀ (s : Set α), ∀ᶠ x in f, x ∈ s → p x where mp h _ := by filter_upwards [h] with _ pa _ using pa mpr h := by filter_upwards [h univ] with _ pa using pa (by simp) /-! ### Frequently -/ theorem Eventually.frequently {f : Filter α} [NeBot f] {p : α → Prop} (h : ∀ᶠ x in f, p x) : ∃ᶠ x in f, p x := compl_not_mem h theorem Frequently.of_forall {f : Filter α} [NeBot f] {p : α → Prop} (h : ∀ x, p x) : ∃ᶠ x in f, p x := Eventually.frequently (Eventually.of_forall h) theorem Frequently.mp {p q : α → Prop} {f : Filter α} (h : ∃ᶠ x in f, p x) (hpq : ∀ᶠ x in f, p x → q x) : ∃ᶠ x in f, q x := mt (fun hq => hq.mp <\| hpq.mono fun _ => mt) h lemma frequently_congr {p q : α → Prop} {f : Filter α} (h : ∀ᶠ x in f, p x ↔ q x) : (∃ᶠ x in f, p x) ↔ ∃ᶠ x in f, q x := ⟨fun h' ↦ h'.mp (h.mono fun _ ↦ Iff.mp), fun h' ↦ h'.mp (h.mono fun _ ↦ Iff.mpr)⟩ theorem Frequently.filter_mono {p : α → Prop} {f g : Filter α} (h : ∃ᶠ x in f, p x) (hle : f ≤ g) : ∃ᶠ x in g, p x := mt (fun h' => h'.filter_mono hle) h theorem Frequently.mono {p q : α → Prop} {f : Filter α} (h : ∃ᶠ x in f, p x) (hpq : ∀ x, p x → q x) : ∃ᶠ x in f, q x := h.mp (Eventually.of_forall hpq) theorem Frequently.and_eventually {p q : α → Prop} {f : Filter α} (hp : ∃ᶠ x in f, p x) (hq : ∀ᶠ x in f, q x) : ∃ᶠ x in f, p x ∧ q x := by refine mt (fun h => hq.mp <\| h.mono ?_) hp exact fun x hpq hq hp => hpq ⟨hp, hq⟩ theorem Eventually.and_frequently {p q : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) (hq : ∃ᶠ x in f, q x) : ∃ᶠ x in f, p x ∧ q x := by simpa only [and_comm] using hq.and_eventually hp theorem Frequently.exists {p : α → Prop} {f : Filter α} (hp : ∃ᶠ x in f, p x) : ∃ x, p x := by by_contra H replace H : ∀ᶠ x in f, ¬p x := Eventually.of_forall (not_exists.1 H) exact hp H theorem Eventually.exists {p : α → Prop} {f : Filter α} [NeBot f] (hp : ∀ᶠ x in f, p x) : ∃ x, p x := hp.frequently.exists lemma frequently_iff_neBot {l : Filter α} {p : α → Prop} : (∃ᶠ x in l, p x) ↔ NeBot (l ⊓ 𝓟 {x \| p x}) := by rw [neBot_iff, Ne, inf_principal_eq_bot]; rfl lemma frequently_mem_iff_neBot {l : Filter α} {s : Set α} : (∃ᶠ x in l, x ∈ s) ↔ NeBot (l ⊓ 𝓟 s) := frequently_iff_neBot theorem frequently_iff_forall_eventually_exists_and {p : α → Prop} {f : Filter α} : (∃ᶠ x in f, p x) ↔ ∀ {q : α → Prop}, (∀ᶠ x in f, q x) → ∃ x, p x ∧ q x := ⟨fun hp _ hq => (hp.and_eventually hq).exists, fun H hp => by simpa only [and_not_self_iff, exists_false] using H hp⟩ theorem frequently_iff {f : Filter α} {P : α → Prop} : (∃ᶠ x in f, P x) ↔ ∀ {U}, U ∈ f → ∃ x ∈ U, P x := by simp only [frequently_iff_forall_eventually_exists_and, @and_comm (P _)] rfl @[simp] theorem not_eventually {p : α → Prop} {f : Filter α} : (¬∀ᶠ x in f, p x) ↔ ∃ᶠ x in f, ¬p x := by simp [Filter.Frequently] @[simp] theorem not_frequently {p : α → Prop} {f : Filter α} : (¬∃ᶠ x in f, p x) ↔ ∀ᶠ x in f, ¬p x := by simp only [Filter.Frequently, not_not] @[simp] theorem frequently_true_iff_neBot (f : Filter α) : (∃ᶠ _ in f, True) ↔ NeBot f := by simp [frequently_iff_neBot] @[simp] theorem frequently_false (f : Filter α) : ¬∃ᶠ _ in f, False := by simp @[simp] theorem frequently_const {f : Filter α} [NeBot f] {p : Prop} : (∃ᶠ _ in f, p) ↔ p := by by_cases p <;> simp [] @[simp] theorem frequently_or_distrib {f : Filter α} {p q : α → Prop} : (∃ᶠ x in f, p x ∨ q x) ↔ (∃ᶠ x in f, p x) ∨ ∃ᶠ x in f, q x := by simp only [Filter.Frequently, ← not_and_or, not_or, eventually_and] theorem frequently_or_distrib_left {f : Filter α} [NeBot f] {p : Prop} {q : α → Prop} : (∃ᶠ x in f, p ∨ q x) ↔ p ∨ ∃ᶠ x in f, q x := by simp theorem frequently_or_distrib_right {f : Filter α} [NeBot f] {p : α → Prop} {q : Prop} : (∃ᶠ x in f, p x ∨ q) ↔ (∃ᶠ x in f, p x) ∨ q := by simp theorem frequently_imp_distrib {f : Filter α} {p q : α → Prop} : (∃ᶠ x in f, p x → q x) ↔ (∀ᶠ x in f, p x) → ∃ᶠ x in f, q x := by simp [imp_iff_not_or] theorem frequently_imp_distrib_left {f : Filter α} [NeBot f] {p : Prop} {q : α → Prop} : (∃ᶠ x in f, p → q x) ↔ p → ∃ᶠ x in f, q x := by simp [frequently_imp_distrib] theorem frequently_imp_distrib_right {f : Filter α} [NeBot f] {p : α → Prop} {q : Prop} : (∃ᶠ x in f, p x → q) ↔ (∀ᶠ x in f, p x) → q := by simp only [frequently_imp_distrib, frequently_const] theorem eventually_imp_distrib_right {f : Filter α} {p : α → Prop} {q : Prop} : (∀ᶠ x in f, p x → q) ↔ (∃ᶠ x in f, p x) → q := by simp only [imp_iff_not_or, eventually_or_distrib_right, not_frequently] @[simp] theorem frequently_and_distrib_left {f : Filter α} {p : Prop} {q : α → Prop} : (∃ᶠ x in f, p ∧ q x) ↔ p ∧ ∃ᶠ x in f, q x := by simp only [Filter.Frequently, not_and, eventually_imp_distrib_left, Classical.not_imp] @[simp] theorem frequently_and_distrib_right {f : Filter α} {p : α → Prop} {q : Prop} : (∃ᶠ x in f, p x ∧ q) ↔ (∃ᶠ x in f, p x) ∧ q := by simp only [@and_comm _ q, frequently_and_distrib_left] @[simp] theorem frequently_bot {p : α → Prop} : ¬∃ᶠ x in ⊥, p x := by simp @[simp] theorem frequently_top {p : α → Prop} : (∃ᶠ x in ⊤, p x) ↔ ∃ x, p x := by simp [Filter.Frequently] @[simp] theorem frequently_principal {a : Set α} {p : α → Prop} : (∃ᶠ x in 𝓟 a, p x) ↔ ∃ x ∈ a, p x := by simp [Filter.Frequently, not_forall] theorem frequently_inf_principal {f : Filter α} {s : Set α} {p : α → Prop} : (∃ᶠ x in f ⊓ 𝓟 s, p x) ↔ ∃ᶠ x in f, x ∈ s ∧ p x := by simp only [Filter.Frequently, eventually_inf_principal, not_and] alias ⟨Frequently.of_inf_principal, Frequently.inf_principal⟩ := frequently_inf_principal theorem frequently_sup {p : α → Prop} {f g : Filter α} : (∃ᶠ x in f ⊔ g, p x) ↔ (∃ᶠ x in f, p x) ∨ ∃ᶠ x in g, p x := by simp only [Filter.Frequently, eventually_sup, not_and_or] @[simp] theorem frequently_sSup {p : α → Prop} {fs : Set (Filter α)} : (∃ᶠ x in sSup fs, p x) ↔ ∃ f ∈ fs, ∃ᶠ x in f, p x := by simp only [Filter.Frequently, not_forall, eventually_sSup, exists_prop] @[simp] theorem frequently_iSup {p : α → Prop} {fs : β → Filter α} : (∃ᶠ x in ⨆ b, fs b, p x) ↔ ∃ b, ∃ᶠ x in fs b, p x := by simp only [Filter.Frequently, eventually_iSup, not_forall] theorem Eventually.choice {r : α → β → Prop} {l : Filter α} [l.NeBot] (h : ∀ᶠ x in l, ∃ y, r x y) : ∃ f : α → β, ∀ᶠ x in l, r x (f x) := by haveI : Nonempty β := let ⟨_, hx⟩ := h.exists; hx.nonempty choose! f hf using fun x (hx : ∃ y, r x y) => hx exact ⟨f, h.mono hf⟩ lemma skolem {ι : Type} {α : ι → Type} [∀ i, Nonempty (α i)] {P : ∀ i : ι, α i → Prop} {F : Filter ι} : (∀ᶠ i in F, ∃ b, P i b) ↔ ∃ b : (Π i, α i), ∀ᶠ i in F, P i (b i) := by classical refine ⟨fun H ↦ ?_, fun ⟨b, hb⟩ ↦ hb.mp (.of_forall fun x a ↦ ⟨_, a⟩)⟩ refine ⟨fun i ↦ if h : ∃ b, P i b then h.choose else Nonempty.some inferInstance, ?_⟩ filter_upwards [H] with i hi exact dif_pos hi ▸ hi.choose_spec /-! ### Relation “eventually equal” -/ section EventuallyEq variable {l : Filter α} {f g : α → β} theorem EventuallyEq.eventually (h : f =ᶠ[l] g) : ∀ᶠ x in l, f x = g x := h @[simp] lemma eventuallyEq_top : f =ᶠ[⊤] g ↔ f = g := by simp [EventuallyEq, funext_iff] theorem EventuallyEq.rw {l : Filter α} {f g : α → β} (h : f =ᶠ[l] g) (p : α → β → Prop) (hf : ∀ᶠ x in l, p x (f x)) : ∀ᶠ x in l, p x (g x) := hf.congr <\| h.mono fun _ hx => hx ▸ Iff.rfl theorem eventuallyEq_set {s t : Set α} {l : Filter α} : s =ᶠ[l] t ↔ ∀ᶠ x in l, x ∈ s ↔ x ∈ t := eventually_congr <\| Eventually.of_forall fun _ ↦ eq_iff_iff alias ⟨EventuallyEq.mem_iff, Eventually.set_eq⟩ := eventuallyEq_set @[simp] theorem eventuallyEq_univ {s : Set α} {l : Filter α} : s =ᶠ[l] univ ↔ s ∈ l := by simp [eventuallyEq_set] theorem EventuallyEq.exists_mem {l : Filter α} {f g : α → β} (h : f =ᶠ[l] g) : ∃ s ∈ l, EqOn f g s := Eventually.exists_mem h theorem eventuallyEq_of_mem {l : Filter α} {f g : α → β} {s : Set α} (hs : s ∈ l) (h : EqOn f g s) : f =ᶠ[l] g := eventually_of_mem hs h theorem eventuallyEq_iff_exists_mem {l : Filter α} {f g : α → β} : f =ᶠ[l] g ↔ ∃ s ∈ l, EqOn f g s := eventually_iff_exists_mem theorem EventuallyEq.filter_mono {l l' : Filter α} {f g : α → β} (h₁ : f =ᶠ[l] g) (h₂ : l' ≤ l) : f =ᶠ[l'] g := h₂ h₁ @[refl, simp] theorem EventuallyEq.refl (l : Filter α) (f : α → β) : f =ᶠ[l] f := Eventually.of_forall fun _ => rfl protected theorem EventuallyEq.rfl {l : Filter α} {f : α → β} : f =ᶠ[l] f := EventuallyEq.refl l f theorem EventuallyEq.of_eq {l : Filter α} {f g : α → β} (h : f = g) : f =ᶠ[l] g := h ▸ .rfl alias _root_.Eq.eventuallyEq := EventuallyEq.of_eq @[symm] theorem EventuallyEq.symm {f g : α → β} {l : Filter α} (H : f =ᶠ[l] g) : g =ᶠ[l] f := H.mono fun _ => Eq.symm lemma eventuallyEq_comm {f g : α → β} {l : Filter α} : f =ᶠ[l] g ↔ g =ᶠ[l] f := ⟨.symm, .symm⟩ @[trans] theorem EventuallyEq.trans {l : Filter α} {f g h : α → β} (H₁ : f =ᶠ[l] g) (H₂ : g =ᶠ[l] h) : f =ᶠ[l] h := H₂.rw (fun x y => f x = y) H₁ theorem EventuallyEq.congr_left {l : Filter α} {f g h : α → β} (H : f =ᶠ[l] g) : f =ᶠ[l] h ↔ g =ᶠ[l] h := ⟨H.symm.trans, H.trans⟩ theorem EventuallyEq.congr_right {l : Filter α} {f g h : α → β} (H : g =ᶠ[l] h) : f =ᶠ[l] g ↔ f =ᶠ[l] h := ⟨(·.trans H), (·.trans H.symm)⟩ instance {l : Filter α} : Trans ((· =ᶠ[l] ·) : (α → β) → (α → β) → Prop) (· =ᶠ[l] ·) (· =ᶠ[l] ·) where trans := EventuallyEq.trans theorem EventuallyEq.prodMk {l} {f f' : α → β} (hf : f =ᶠ[l] f') {g g' : α → γ} (hg : g =ᶠ[l] g') : (fun x => (f x, g x)) =ᶠ[l] fun x => (f' x, g' x) := hf.mp <\| hg.mono <\| by intros simp only [] @[deprecated (since := "2025-03-10")] alias EventuallyEq.prod_mk := EventuallyEq.prodMk -- See `EventuallyEq.comp_tendsto` further below for a similar statement w.r.t. -- composition on the right. theorem EventuallyEq.fun_comp {f g : α → β} {l : Filter α} (H : f =ᶠ[l] g) (h : β → γ) : h ∘ f =ᶠ[l] h ∘ g := H.mono fun _ hx => congr_arg h hx theorem EventuallyEq.comp₂ {δ} {f f' : α → β} {g g' : α → γ} {l} (Hf : f =ᶠ[l] f') (h : β → γ → δ) (Hg : g =ᶠ[l] g') : (fun x => h (f x) (g x)) =ᶠ[l] fun x => h (f' x) (g' x) := (Hf.prodMk Hg).fun_comp (uncurry h) @[to_additive] theorem EventuallyEq.mul [Mul β] {f f' g g' : α → β} {l : Filter α} (h : f =ᶠ[l] g) (h' : f' =ᶠ[l] g') : (fun x => f x * f' x) =ᶠ[l] fun x => g x * g' x := h.comp₂ (· * ·) h' @[to_additive const_smul] theorem EventuallyEq.pow_const {γ} [Pow β γ] {f g : α → β} {l : Filter α} (h : f =ᶠ[l] g) (c : γ) : (fun x => f x ^ c) =ᶠ[l] fun x => g x ^ c := h.fun_comp (· ^ c) @[to_additive] theorem EventuallyEq.inv [Inv β] {f g : α → β} {l : Filter α} (h : f =ᶠ[l] g) : (fun x => (f x)⁻¹) =ᶠ[l] fun x => (g x)⁻¹ := h.fun_comp Inv.inv @[to_additive] theorem EventuallyEq.div [Div β] {f f' g g' : α → β} {l : Filter α} (h : f =ᶠ[l] g) (h' : f' =ᶠ[l] g') : (fun x => f x / f' x) =ᶠ[l] fun x => g x / g' x := h.comp₂ (· / ·) h' attribute [to_additive] EventuallyEq.const_smul @[to_additive] theorem EventuallyEq.smul {𝕜} [SMul 𝕜 β] {l : Filter α} {f f' : α → 𝕜} {g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : (fun x => f x • g x) =ᶠ[l] fun x => f' x • g' x := hf.comp₂ (· • ·) hg theorem EventuallyEq.sup [Max β] {l : Filter α} {f f' g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : (fun x => f x ⊔ g x) =ᶠ[l] fun x => f' x ⊔ g' x := hf.comp₂ (· ⊔ ·) hg theorem EventuallyEq.inf [Min β] {l : Filter α} {f f' g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : (fun x => f x ⊓ g x) =ᶠ[l] fun x => f' x ⊓ g' x := hf.comp₂ (· ⊓ ·) hg theorem EventuallyEq.preimage {l : Filter α} {f g : α → β} (h : f =ᶠ[l] g) (s : Set β) : f ⁻¹' s =ᶠ[l] g ⁻¹' s := h.fun_comp s theorem EventuallyEq.inter {s t s' t' : Set α} {l : Filter α} (h : s =ᶠ[l] t) (h' : s' =ᶠ[l] t') : (s ∩ s' : Set α) =ᶠ[l] (t ∩ t' : Set α) := h.comp₂ (· ∧ ·) h' theorem EventuallyEq.union {s t s' t' : Set α} {l : Filter α} (h : s =ᶠ[l] t) (h' : s' =ᶠ[l] t') : (s ∪ s' : Set α) =ᶠ[l] (t ∪ t' : Set α) := h.comp₂ (· ∨ ·) h' theorem EventuallyEq.compl {s t : Set α} {l : Filter α} (h : s =ᶠ[l] t) : (sᶜ : Set α) =ᶠ[l] (tᶜ : Set α) := h.fun_comp Not theorem EventuallyEq.diff {s t s' t' : Set α} {l : Filter α} (h : s =ᶠ[l] t) (h' : s' =ᶠ[l] t') : (s \ s' : Set α) =ᶠ[l] (t \ t' : Set α) := h.inter h'.compl protected theorem EventuallyEq.symmDiff {s t s' t' : Set α} {l : Filter α} (h : s =ᶠ[l] t) (h' : s' =ᶠ[l] t') : (s ∆ s' : Set α) =ᶠ[l] (t ∆ t' : Set α) := (h.diff h').union (h'.diff h) theorem eventuallyEq_empty {s : Set α} {l : Filter α} : s =ᶠ[l] (∅ : Set α) ↔ ∀ᶠ x in l, x ∉ s := eventuallyEq_set.trans <\| by simp theorem inter_eventuallyEq_left {s t : Set α} {l : Filter α} : (s ∩ t : Set α) =ᶠ[l] s ↔ ∀ᶠ x in l, x ∈ s → x ∈ t := by simp only [eventuallyEq_set, mem_inter_iff, and_iff_left_iff_imp] theorem inter_eventuallyEq_right {s t : Set α} {l : Filter α} : (s ∩ t : Set α) =ᶠ[l] t ↔ ∀ᶠ x in l, x ∈ t → x ∈ s := by rw [inter_comm, inter_eventuallyEq_left] @[simp] theorem eventuallyEq_principal {s : Set α} {f g : α → β} : f =ᶠ[𝓟 s] g ↔ EqOn f g s := Iff.rfl theorem eventuallyEq_inf_principal_iff {F : Filter α} {s : Set α} {f g : α → β} : f =ᶠ[F ⊓ 𝓟 s] g ↔ ∀ᶠ x in F, x ∈ s → f x = g x := eventually_inf_principal theorem EventuallyEq.sub_eq [AddGroup β] {f g : α → β} {l : Filter α} (h : f =ᶠ[l] g) : f - g =ᶠ[l] 0 := by simpa using ((EventuallyEq.refl l f).sub h).symm theorem eventuallyEq_iff_sub [AddGroup β] {f g : α → β} {l : Filter α} : f =ᶠ[l] g ↔ f - g =ᶠ[l] 0 := ⟨fun h => h.sub_eq, fun h => by simpa using h.add (EventuallyEq.refl l g)⟩ theorem eventuallyEq_iff_all_subsets {f g : α → β} {l : Filter α} : f =ᶠ[l] g ↔ ∀ s : Set α, ∀ᶠ x in l, x ∈ s → f x = g x := eventually_iff_all_subsets section LE variable [LE β] {l : Filter α} theorem EventuallyLE.congr {f f' g g' : α → β} (H : f ≤ᶠ[l] g) (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : f' ≤ᶠ[l] g' := H.mp <\| hg.mp <\| hf.mono fun x hf hg H => by rwa [hf, hg] at H theorem eventuallyLE_congr {f f' g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : f ≤ᶠ[l] g ↔ f' ≤ᶠ[l] g' := ⟨fun H => H.congr hf hg, fun H => H.congr hf.symm hg.symm⟩ theorem eventuallyLE_iff_all_subsets {f g : α → β} {l : Filter α} : f ≤ᶠ[l] g ↔ ∀ s : Set α, ∀ᶠ x in l, x ∈ s → f x ≤ g x := eventually_iff_all_subsets end LE section Preorder variable [Preorder β] {l : Filter α} {f g h : α → β} theorem EventuallyEq.le (h : f =ᶠ[l] g) : f ≤ᶠ[l] g := h.mono fun _ => le_of_eq @[refl] theorem EventuallyLE.refl (l : Filter α) (f : α → β) : f ≤ᶠ[l] f := EventuallyEq.rfl.le theorem EventuallyLE.rfl : f ≤ᶠ[l] f := EventuallyLE.refl l f @[trans] theorem EventuallyLE.trans (H₁ : f ≤ᶠ[l] g) (H₂ : g ≤ᶠ[l] h) : f ≤ᶠ[l] h := H₂.mp <\| H₁.mono fun _ => le_trans instance : Trans ((· ≤ᶠ[l] ·) : (α → β) → (α → β) → Prop) (· ≤ᶠ[l] ·) (· ≤ᶠ[l] ·) where trans := EventuallyLE.trans @[trans] theorem EventuallyEq.trans_le (H₁ : f =ᶠ[l] g) (H₂ : g ≤ᶠ[l] h) : f ≤ᶠ[l] h := H₁.le.trans H₂ instance : Trans ((· =ᶠ[l] ·) : (α → β) → (α → β) → Prop) (· ≤ᶠ[l] ·) (· ≤ᶠ[l] ·) where trans := EventuallyEq.trans_le @[trans] theorem EventuallyLE.trans_eq (H₁ : f ≤ᶠ[l] g) (H₂ : g =ᶠ[l] h) : f ≤ᶠ[l] h := H₁.trans H₂.le instance : Trans ((· ≤ᶠ[l] ·) : (α → β) → (α → β) → Prop) (· =ᶠ[l] ·) (· ≤ᶠ[l] ·) where trans := EventuallyLE.trans_eq end Preorder variable {l : Filter α} theorem EventuallyLE.antisymm [PartialOrder β] {l : Filter α} {f g : α → β} (h₁ : f ≤ᶠ[l] g) (h₂ : g ≤ᶠ[l] f) : f =ᶠ[l] g := h₂.mp <\| h₁.mono fun _ => le_antisymm theorem eventuallyLE_antisymm_iff [PartialOrder β] {l : Filter α} {f g : α → β} : f =ᶠ[l] g ↔ f ≤ᶠ[l] g ∧ g ≤ᶠ[l] f := by simp only [EventuallyEq, EventuallyLE, le_antisymm_iff, eventually_and] theorem EventuallyLE.le_iff_eq [PartialOrder β] {l : Filter α} {f g : α → β} (h : f ≤ᶠ[l] g) : g ≤ᶠ[l] f ↔ g =ᶠ[l] f := ⟨fun h' => h'.antisymm h, EventuallyEq.le⟩ theorem Eventually.ne_of_lt [Preorder β] {l : Filter α} {f g : α → β} (h : ∀ᶠ x in l, f x < g x) : ∀ᶠ x in l, f x ≠ g x := h.mono fun _ hx => hx.ne theorem Eventually.ne_top_of_lt [Preorder β] [OrderTop β] {l : Filter α} {f g : α → β} (h : ∀ᶠ x in l, f x < g x) : ∀ᶠ x in l, f x ≠ ⊤ := h.mono fun _ hx => hx.ne_top theorem Eventually.lt_top_of_ne [PartialOrder β] [OrderTop β] {l : Filter α} {f : α → β} (h : ∀ᶠ x in l, f x ≠ ⊤) : ∀ᶠ x in l, f x < ⊤ := h.mono fun _ hx => hx.lt_top theorem Eventually.lt_top_iff_ne_top [PartialOrder β] [OrderTop β] {l : Filter α} {f : α → β} : (∀ᶠ x in l, f x < ⊤) ↔ ∀ᶠ x in l, f x ≠ ⊤ := ⟨Eventually.ne_of_lt, Eventually.lt_top_of_ne⟩ @[mono] theorem EventuallyLE.inter {s t s' t' : Set α} {l : Filter α} (h : s ≤ᶠ[l] t) (h' : s' ≤ᶠ[l] t') : (s ∩ s' : Set α) ≤ᶠ[l] (t ∩ t' : Set α) := h'.mp <\| h.mono fun _ => And.imp @[mono] theorem EventuallyLE.union {s t s' t' : Set α} {l : Filter α} (h : s ≤ᶠ[l] t) (h' : s' ≤ᶠ[l] t') : (s ∪ s' : Set α) ≤ᶠ[l] (t ∪ t' : Set α) := h'.mp <\| h.mono fun _ => Or.imp @[mono] theorem EventuallyLE.compl {s t : Set α} {l : Filter α} (h : s ≤ᶠ[l] t) : (tᶜ : Set α) ≤ᶠ[l] (sᶜ : Set α) := h.mono fun _ => mt @[mono] theorem EventuallyLE.diff {s t s' t' : Set α} {l : Filter α} (h : s ≤ᶠ[l] t) (h' : t' ≤ᶠ[l] s') : (s \ s' : Set α) ≤ᶠ[l] (t \ t' : Set α) := h.inter h'.compl theorem set_eventuallyLE_iff_mem_inf_principal {s t : Set α} {l : Filter α} : s ≤ᶠ[l] t ↔ t ∈ l ⊓ 𝓟 s := eventually_inf_principal.symm theorem set_eventuallyLE_iff_inf_principal_le {s t : Set α} {l : Filter α} : s ≤ᶠ[l] t ↔ l ⊓ 𝓟 s ≤ l ⊓ 𝓟 t := set_eventuallyLE_iff_mem_inf_principal.trans <\| by simp only [le_inf_iff, inf_le_left, true_and, le_principal_iff] theorem set_eventuallyEq_iff_inf_principal {s t : Set α} {l : Filter α} : s =ᶠ[l] t ↔ l ⊓ 𝓟 s = l ⊓ 𝓟 t := by simp only [eventuallyLE_antisymm_iff, le_antisymm_iff, set_eventuallyLE_iff_inf_principal_le] theorem EventuallyLE.sup [SemilatticeSup β] {l : Filter α} {f₁ f₂ g₁ g₂ : α → β} (hf : f₁ ≤ᶠ[l] f₂) (hg : g₁ ≤ᶠ[l] g₂) : f₁ ⊔ g₁ ≤ᶠ[l] f₂ ⊔ g₂ := by filter_upwards [hf, hg] with x hfx hgx using sup_le_sup hfx hgx theorem EventuallyLE.sup_le [SemilatticeSup β] {l : Filter α} {f g h : α → β} (hf : f ≤ᶠ[l] h) (hg : g ≤ᶠ[l] h) : f ⊔ g ≤ᶠ[l] h := by filter_upwards [hf, hg] with x hfx hgx using _root_.sup_le hfx hgx theorem EventuallyLE.le_sup_of_le_left [SemilatticeSup β] {l : Filter α} {f g h : α → β} (hf : h ≤ᶠ[l] f) : h ≤ᶠ[l] f ⊔ g := hf.mono fun _ => _root_.le_sup_of_le_left theorem EventuallyLE.le_sup_of_le_right [SemilatticeSup β] {l : Filter α} {f g h : α → β} (hg : h ≤ᶠ[l] g) : h ≤ᶠ[l] f ⊔ g := hg.mono fun _ => _root_.le_sup_of_le_right theorem join_le {f : Filter (Filter α)} {l : Filter α} (h : ∀ᶠ m in f, m ≤ l) : join f ≤ l := fun _ hs => h.mono fun _ hm => hm hs end EventuallyEq end Filter open Filter theorem Set.EqOn.eventuallyEq {α β} {s : Set α} {f g : α → β} (h : EqOn f g s) : f =ᶠ[𝓟 s] g := h theorem Set.EqOn.eventuallyEq_of_mem {α β} {s : Set α} {l : Filter α} {f g : α → β} (h : EqOn f g s) (hl : s ∈ l) : f =ᶠ[l] g := h.eventuallyEq.filter_mono <\| Filter.le_principal_iff.2 hl theorem HasSubset.Subset.eventuallyLE {α} {l : Filter α} {s t : Set α} (h : s ⊆ t) : s ≤ᶠ[l] t := Filter.Eventually.of_forall h variable {α β : Type*} {F : Filter α} {G : Filter β} namespace Filter lemma compl_mem_comk {p : Set α → Prop} {he hmono hunion s} : sᶜ ∈ comk p he hmono hunion ↔ p s := by simp end Filter		Mathlib/Order/Filter/Basic.lean	2,451	2,456
/- Copyright (c) 2023 Jujian Zhang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jujian Zhang -/ import Mathlib.Algebra.Colimit.Module import Mathlib.LinearAlgebra.TensorProduct.Basic /-! # Tensor product and direct limits commute with each other. Given a family of `R`-modules `Gᵢ` with a family of compatible `R`-linear maps `fᵢⱼ : Gᵢ → Gⱼ` for every `i ≤ j` and another `R`-module `M`, we have `(limᵢ Gᵢ) ⊗ M` and `lim (Gᵢ ⊗ M)` are isomorphic as `R`-modules. ## Main definitions: * `TensorProduct.directLimitLeft : DirectLimit G f ⊗[R] M ≃ₗ[R] DirectLimit (G · ⊗[R] M) (f ▷ M)` * `TensorProduct.directLimitRight : M ⊗[R] DirectLimit G f ≃ₗ[R] DirectLimit (M ⊗[R] G ·) (M ◁ f)` -/ open TensorProduct Module Module.DirectLimit variable {R : Type} [CommSemiring R] variable {ι : Type} variable [DecidableEq ι] [Preorder ι] variable {G : ι → Type} variable [∀ i, AddCommMonoid (G i)] [∀ i, Module R (G i)] variable (f : ∀ i j, i ≤ j → G i →ₗ[R] G j) variable (M : Type) [AddCommMonoid M] [Module R M] -- alluding to the notation in `CategoryTheory.Monoidal` local notation M " ◁ " f => fun i j h ↦ LinearMap.lTensor M (f _ _ h) local notation f " ▷ " N => fun i j h ↦ LinearMap.rTensor N (f _ _ h) namespace TensorProduct /-- the map `limᵢ (Gᵢ ⊗ M) → (limᵢ Gᵢ) ⊗ M` induced by the family of maps `Gᵢ ⊗ M → (limᵢ Gᵢ) ⊗ M` given by `gᵢ ⊗ m ↦ [gᵢ] ⊗ m`. -/ noncomputable def fromDirectLimit : DirectLimit (G · ⊗[R] M) (f ▷ M) →ₗ[R] DirectLimit G f ⊗[R] M := Module.DirectLimit.lift _ _ _ _ (fun _ ↦ (of _ _ _ _ _).rTensor M) fun _ _ _ x ↦ by refine x.induction_on ?_ ?_ ?_ <;> aesop variable {M} in @[simp] lemma fromDirectLimit_of_tmul {i : ι} (g : G i) (m : M) : fromDirectLimit f M (of _ _ _ _ i (g ⊗ₜ m)) = (of _ _ _ f i g) ⊗ₜ m := lift_of (G := (G · ⊗[R] M)) _ _ (g ⊗ₜ m) /-- the map `(limᵢ Gᵢ) ⊗ M → limᵢ (Gᵢ ⊗ M)` from the bilinear map `limᵢ Gᵢ → M → limᵢ (Gᵢ ⊗ M)` given by the family of maps `Gᵢ → M → limᵢ (Gᵢ ⊗ M)` where `gᵢ ↦ m ↦ [gᵢ ⊗ m]` -/ noncomputable def toDirectLimit : DirectLimit G f ⊗[R] M →ₗ[R] DirectLimit (G · ⊗[R] M) (f ▷ M) := TensorProduct.lift <\| Module.DirectLimit.lift _ _ _ _ (fun i ↦ (TensorProduct.mk R _ _).compr₂ (of R ι _ (fun _i _j h ↦ (f _ _ h).rTensor M) i)) fun _ _ _ g ↦ DFunLike.ext _ _ (of_f (G := (G · ⊗[R] M)) (x := g ⊗ₜ ·)) variable {M} in @[simp] lemma toDirectLimit_tmul_of {i : ι} (g : G i) (m : M) : (toDirectLimit f M <\| (of _ _ G f i g) ⊗ₜ m) = (of _ _ _ _ i (g ⊗ₜ m)) := by rw [toDirectLimit, lift.tmul, lift_of] rfl /-- `limᵢ (Gᵢ ⊗ M)` and `(limᵢ Gᵢ) ⊗ M` are isomorphic as modules -/ noncomputable def directLimitLeft : DirectLimit G f ⊗[R] M ≃ₗ[R] DirectLimit (G · ⊗[R] M) (f ▷ M) := by refine LinearEquiv.ofLinear (toDirectLimit f M) (fromDirectLimit f M) ?_ (ext ?_) · ext ⟨x⟩ exact x.induction_on (by simp) (fun i x ↦ x.induction_on (by simp) (fun _ _ ↦ by rw [quotMk_of]; simp) <\| by simp+contextual) (by simp+contextual) · ext ⟨x⟩ m exact x.induction_on (by simp) (fun _ _ ↦ by rw [quotMk_of]; simp) (by simp+contextual) @[simp] lemma directLimitLeft_tmul_of {i : ι} (g : G i) (m : M) : directLimitLeft f M (of _ _ _ _ _ g ⊗ₜ m) = of _ _ _ (f ▷ M) _ (g ⊗ₜ m) := toDirectLimit_tmul_of f g m @[simp] lemma directLimitLeft_symm_of_tmul {i : ι} (g : G i) (m : M) : (directLimitLeft f M).symm (of _ _ _ _ _ (g ⊗ₜ m)) = of _ _ _ f _ g ⊗ₜ m := fromDirectLimit_of_tmul f g m lemma directLimitLeft_rTensor_of {i : ι} (x : G i ⊗[R] M) : directLimitLeft f M (LinearMap.rTensor M (of ..) x) = of _ _ _ (f ▷ M) _ x := x.induction_on (by simp) (by simp+contextual) (by simp+contextual) /-- `M ⊗ (limᵢ Gᵢ)` and `limᵢ (M ⊗ Gᵢ)` are isomorphic as modules -/ noncomputable def directLimitRight : M ⊗[R] DirectLimit G f ≃ₗ[R] DirectLimit (M ⊗[R] G ·) (M ◁ f) := TensorProduct.comm _ _ _ ≪≫ₗ directLimitLeft f M ≪≫ₗ Module.DirectLimit.congr (fun _ ↦ TensorProduct.comm _ _ _)	(fun i j h ↦ TensorProduct.ext <\| DFunLike.ext _ _ <\| by aesop) @[simp] lemma directLimitRight_tmul_of {i : ι} (m : M) (g : G i) :	Mathlib/LinearAlgebra/TensorProduct/DirectLimit.lean	102	104
/- Copyright (c) 2023 Yaël Dillies, Bhavik Mehta. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies, Bhavik Mehta -/ import Mathlib.Combinatorics.SimpleGraph.Triangle.Basic /-! # Construct a tripartite graph from its triangles This file contains the construction of a simple graph on `α ⊕ β ⊕ γ` from a list of triangles `(a, b, c)` (with `a` in the first component, `b` in the second, `c` in the third). We call * `t : Finset (α × β × γ)` the set of triangle indices (its elements are not triangles within the graph but instead index them). * explicit a triangle of the constructed graph coming from a triangle index. * accidental a triangle of the constructed graph not coming from a triangle index. The two important properties of this construction are: * `SimpleGraph.TripartiteFromTriangles.ExplicitDisjoint`: Whether the explicit triangles are edge-disjoint. * `SimpleGraph.TripartiteFromTriangles.NoAccidental`: Whether all triangles are explicit. This construction shows up unrelatedly twice in the theory of Roth numbers: * The lower bound of the Ruzsa-Szemerédi problem: From a set `s` in a finite abelian group `G` of odd order, we construct a tripartite graph on `G ⊕ G ⊕ G`. The triangle indices are `(x, x + a, x + 2 * a)` for `x` any element and `a ∈ s`. The explicit triangles are always edge-disjoint and there is no accidental triangle if `s` is 3AP-free. * The proof of the corners theorem from the triangle removal lemma: For a set `s` in a finite abelian group `G`, we construct a tripartite graph on `G ⊕ G ⊕ G`, whose vertices correspond to the horizontal, vertical and diagonal lines in `G × G`. The explicit triangles are `(h, v, d)` where `h`, `v`, `d` are horizontal, vertical, diagonal lines that intersect in an element of `s`. The explicit triangles are always edge-disjoint and there is no accidental triangle if `s` is corner-free. -/ open Finset Function Sum3 variable {α β γ 𝕜 : Type*} [Field 𝕜] [LinearOrder 𝕜] [IsStrictOrderedRing 𝕜] {t : Finset (α × β × γ)} {a a' : α} {b b' : β} {c c' : γ} {x : α × β × γ} namespace SimpleGraph namespace TripartiteFromTriangles /-- The underlying relation of the tripartite-from-triangles graph. Two vertices are related iff there exists a triangle index containing them both. -/ @[mk_iff] inductive Rel (t : Finset (α × β × γ)) : α ⊕ β ⊕ γ → α ⊕ β ⊕ γ → Prop \| in₀₁ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₀ a) (in₁ b) \| in₁₀ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₁ b) (in₀ a) \| in₀₂ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₀ a) (in₂ c) \| in₂₀ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₂ c) (in₀ a) \| in₁₂ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₁ b) (in₂ c) \| in₂₁ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₂ c) (in₁ b) open Rel lemma rel_irrefl : ∀ x, ¬ Rel t x x := fun _x hx ↦ nomatch hx lemma rel_symm : Symmetric (Rel t) := fun x y h ↦ by cases h <;> constructor <;> assumption /-- The tripartite-from-triangles graph. Two vertices are related iff there exists a triangle index containing them both. -/ def graph (t : Finset (α × β × γ)) : SimpleGraph (α ⊕ β ⊕ γ) := ⟨Rel t, rel_symm, rel_irrefl⟩ namespace Graph @[simp] lemma not_in₀₀ : ¬ (graph t).Adj (in₀ a) (in₀ a') := fun h ↦ nomatch h @[simp] lemma not_in₁₁ : ¬ (graph t).Adj (in₁ b) (in₁ b') := fun h ↦ nomatch h @[simp] lemma not_in₂₂ : ¬ (graph t).Adj (in₂ c) (in₂ c') := fun h ↦ nomatch h	@[simp] lemma in₀₁_iff : (graph t).Adj (in₀ a) (in₁ b) ↔ ∃ c, (a, b, c) ∈ t := ⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₀₁ h⟩	Mathlib/Combinatorics/SimpleGraph/Triangle/Tripartite.lean	72	73
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Aurélien Saue, Anne Baanen -/ import Mathlib.Tactic.NormNum.Inv import Mathlib.Tactic.NormNum.Pow import Mathlib.Util.AtomM /-! # `ring` tactic A tactic for solving equations in commutative (semi)rings, where the exponents can also contain variables. Based on <http://www.cs.ru.nl/~freek/courses/tt-2014/read/10.1.1.61.3041.pdf> . More precisely, expressions of the following form are supported: - constants (non-negative integers) - variables - coefficients (any rational number, embedded into the (semi)ring) - addition of expressions - multiplication of expressions (`a * b`) - scalar multiplication of expressions (`n • a`; the multiplier must have type `ℕ`) - exponentiation of expressions (the exponent must have type `ℕ`) - subtraction and negation of expressions (if the base is a full ring) The extension to exponents means that something like `2 * 2^n * b = b * 2^(n+1)` can be proved, even though it is not strictly speaking an equation in the language of commutative rings. ## Implementation notes The basic approach to prove equalities is to normalise both sides and check for equality. The normalisation is guided by building a value in the type `ExSum` at the meta level, together with a proof (at the base level) that the original value is equal to the normalised version. The outline of the file: - Define a mutual inductive family of types `ExSum`, `ExProd`, `ExBase`, which can represent expressions with `+`, ``, `^` and rational numerals. The mutual induction ensures that associativity and distributivity are applied, by restricting which kinds of subexpressions appear as arguments to the various operators. - Represent addition, multiplication and exponentiation in the `ExSum` type, thus allowing us to map expressions to `ExSum` (the `eval` function drives this). We apply associativity and distributivity of the operators here (helped by `Ex` types) and commutativity as well (by sorting the subterms; unfortunately not helped by anything). Any expression not of the above formats is treated as an atom (the same as a variable). There are some details we glossed over which make the plan more complicated: - The order on atoms is not initially obvious. We construct a list containing them in order of initial appearance in the expression, then use the index into the list as a key to order on. - For `pow`, the exponent must be a natural number, while the base can be any semiring `α`. We swap out operations for the base ring `α` with those for the exponent ring `ℕ` as soon as we deal with exponents. ## Caveats and future work The normalized form of an expression is the one that is useful for the tactic, but not as nice to read. To remedy this, the user-facing normalization calls `ringNFCore`. Subtraction cancels out identical terms, but division does not. That is: `a - a = 0 := by ring` solves the goal, but `a / a := 1 by ring` doesn't. Note that `0 / 0` is generally defined to be `0`, so division cancelling out is not true in general. Multiplication of powers can be simplified a little bit further: `2 ^ n * 2 ^ n = 4 ^ n := by ring` could be implemented in a similar way that `2 * a + 2 * a = 4 * a := by ring` already works. This feature wasn't needed yet, so it's not implemented yet. ## Tags ring, semiring, exponent, power -/ assert_not_exists OrderedAddCommMonoid namespace Mathlib.Tactic namespace Ring open Mathlib.Meta Qq NormNum Lean.Meta AtomM attribute [local instance] monadLiftOptionMetaM open Lean (MetaM Expr mkRawNatLit) /-- A shortcut instance for `CommSemiring ℕ` used by ring. -/ def instCommSemiringNat : CommSemiring ℕ := inferInstance /-- A typed expression of type `CommSemiring ℕ` used when we are working on ring subexpressions of type `ℕ`. -/ def sℕ : Q(CommSemiring ℕ) := q(instCommSemiringNat) mutual /-- The base `e` of a normalized exponent expression. -/ inductive ExBase : ∀ {u : Lean.Level} {α : Q(Type u)}, Q(CommSemiring $α) → (e : Q($α)) → Type /-- An atomic expression `e` with id `id`. Atomic expressions are those which `ring` cannot parse any further. For instance, `a + (a % b)` has `a` and `(a % b)` as atoms. The `ring1` tactic does not normalize the subexpressions in atoms, but `ring_nf` does. Atoms in fact represent equivalence classes of expressions, modulo definitional equality. The field `index : ℕ` should be a unique number for each class, while `value : expr` contains a representative of this class. The function `resolve_atom` determines the appropriate atom for a given expression. -/ \| atom {sα} {e} (id : ℕ) : ExBase sα e /-- A sum of monomials. -/ \| sum {sα} {e} (_ : ExSum sα e) : ExBase sα e /-- A monomial, which is a product of powers of `ExBase` expressions, terminated by a (nonzero) constant coefficient. -/ inductive ExProd : ∀ {u : Lean.Level} {α : Q(Type u)}, Q(CommSemiring $α) → (e : Q($α)) → Type /-- A coefficient `value`, which must not be `0`. `e` is a raw rat cast. If `value` is not an integer, then `hyp` should be a proof of `(value.den : α) ≠ 0`. -/ \| const {sα} {e} (value : ℚ) (hyp : Option Expr := none) : ExProd sα e /-- A product `x ^ e * b` is a monomial if `b` is a monomial. Here `x` is an `ExBase` and `e` is an `ExProd` representing a monomial expression in `ℕ` (it is a monomial instead of a polynomial because we eagerly normalize `x ^ (a + b) = x ^ a * x ^ b`.) -/ \| mul {u : Lean.Level} {α : Q(Type u)} {sα} {x : Q($α)} {e : Q(ℕ)} {b : Q($α)} : ExBase sα x → ExProd sℕ e → ExProd sα b → ExProd sα q($x ^ $e * $b) /-- A polynomial expression, which is a sum of monomials. -/ inductive ExSum : ∀ {u : Lean.Level} {α : Q(Type u)}, Q(CommSemiring $α) → (e : Q($α)) → Type /-- Zero is a polynomial. `e` is the expression `0`. -/ \| zero {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} : ExSum sα q(0 : $α) /-- A sum `a + b` is a polynomial if `a` is a monomial and `b` is another polynomial. -/ \| add {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExProd sα a → ExSum sα b → ExSum sα q($a + $b) end mutual -- partial only to speed up compilation /-- Equality test for expressions. This is not a `BEq` instance because it is heterogeneous. -/ partial def ExBase.eq {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExBase sα a → ExBase sα b → Bool \| .atom i, .atom j => i == j \| .sum a, .sum b => a.eq b \| _, _ => false @[inherit_doc ExBase.eq] partial def ExProd.eq {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExProd sα a → ExProd sα b → Bool \| .const i _, .const j _ => i == j \| .mul a₁ a₂ a₃, .mul b₁ b₂ b₃ => a₁.eq b₁ && a₂.eq b₂ && a₃.eq b₃ \| _, _ => false @[inherit_doc ExBase.eq] partial def ExSum.eq {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExSum sα a → ExSum sα b → Bool \| .zero, .zero => true \| .add a₁ a₂, .add b₁ b₂ => a₁.eq b₁ && a₂.eq b₂ \| _, _ => false end mutual -- partial only to speed up compilation /-- A total order on normalized expressions. This is not an `Ord` instance because it is heterogeneous. -/ partial def ExBase.cmp {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExBase sα a → ExBase sα b → Ordering \| .atom i, .atom j => compare i j \| .sum a, .sum b => a.cmp b \| .atom .., .sum .. => .lt \| .sum .., .atom .. => .gt @[inherit_doc ExBase.cmp] partial def ExProd.cmp {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExProd sα a → ExProd sα b → Ordering \| .const i _, .const j _ => compare i j \| .mul a₁ a₂ a₃, .mul b₁ b₂ b₃ => (a₁.cmp b₁).then (a₂.cmp b₂) \|>.then (a₃.cmp b₃) \| .const _ _, .mul .. => .lt \| .mul .., .const _ _ => .gt @[inherit_doc ExBase.cmp] partial def ExSum.cmp {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExSum sα a → ExSum sα b → Ordering \| .zero, .zero => .eq \| .add a₁ a₂, .add b₁ b₂ => (a₁.cmp b₁).then (a₂.cmp b₂) \| .zero, .add .. => .lt \| .add .., .zero => .gt end variable {u : Lean.Level} {α : Q(Type u)} {sα : Q(CommSemiring $α)} instance : Inhabited (Σ e, (ExBase sα) e) := ⟨default, .atom 0⟩ instance : Inhabited (Σ e, (ExSum sα) e) := ⟨_, .zero⟩ instance : Inhabited (Σ e, (ExProd sα) e) := ⟨default, .const 0 none⟩ mutual /-- Converts `ExBase sα` to `ExBase sβ`, assuming `sα` and `sβ` are defeq. -/ partial def ExBase.cast {v : Lean.Level} {β : Q(Type v)} {sβ : Q(CommSemiring $β)} {a : Q($α)} : ExBase sα a → Σ a, ExBase sβ a \| .atom i => ⟨a, .atom i⟩ \| .sum a => let ⟨_, vb⟩ := a.cast; ⟨_, .sum vb⟩ /-- Converts `ExProd sα` to `ExProd sβ`, assuming `sα` and `sβ` are defeq. -/ partial def ExProd.cast {v : Lean.Level} {β : Q(Type v)} {sβ : Q(CommSemiring $β)} {a : Q($α)} : ExProd sα a → Σ a, ExProd sβ a \| .const i h => ⟨a, .const i h⟩ \| .mul a₁ a₂ a₃ => ⟨_, .mul a₁.cast.2 a₂ a₃.cast.2⟩ /-- Converts `ExSum sα` to `ExSum sβ`, assuming `sα` and `sβ` are defeq. -/ partial def ExSum.cast {v : Lean.Level} {β : Q(Type v)} {sβ : Q(CommSemiring $β)} {a : Q($α)} : ExSum sα a → Σ a, ExSum sβ a \| .zero => ⟨_, .zero⟩ \| .add a₁ a₂ => ⟨_, .add a₁.cast.2 a₂.cast.2⟩ end variable {u : Lean.Level} /-- The result of evaluating an (unnormalized) expression `e` into the type family `E` (one of `ExSum`, `ExProd`, `ExBase`) is a (normalized) element `e'` and a representation `E e'` for it, and a proof of `e = e'`. -/ structure Result {α : Q(Type u)} (E : Q($α) → Type) (e : Q($α)) where /-- The normalized result. -/ expr : Q($α) /-- The data associated to the normalization. -/ val : E expr /-- A proof that the original expression is equal to the normalized result. -/ proof : Q($e = $expr) instance {α : Q(Type u)} {E : Q($α) → Type} {e : Q($α)} [Inhabited (Σ e, E e)] : Inhabited (Result E e) := let ⟨e', v⟩ : Σ e, E e := default; ⟨e', v, default⟩ variable {α : Q(Type u)} (sα : Q(CommSemiring $α)) {R : Type} [CommSemiring R] /-- Constructs the expression corresponding to `.const n`. (The `.const` constructor does not check that the expression is correct.) -/ def ExProd.mkNat (n : ℕ) : (e : Q($α)) × ExProd sα e := let lit : Q(ℕ) := mkRawNatLit n ⟨q(($lit).rawCast : $α), .const n none⟩ /-- Constructs the expression corresponding to `.const (-n)`. (The `.const` constructor does not check that the expression is correct.) -/ def ExProd.mkNegNat (_ : Q(Ring $α)) (n : ℕ) : (e : Q($α)) × ExProd sα e := let lit : Q(ℕ) := mkRawNatLit n ⟨q((Int.negOfNat $lit).rawCast : $α), .const (-n) none⟩ /-- Constructs the expression corresponding to `.const q h` for `q = n / d` and `h` a proof that `(d : α) ≠ 0`. (The `.const` constructor does not check that the expression is correct.) -/ def ExProd.mkRat (_ : Q(DivisionRing $α)) (q : ℚ) (n : Q(ℤ)) (d : Q(ℕ)) (h : Expr) : (e : Q($α)) × ExProd sα e := ⟨q(Rat.rawCast $n $d : $α), .const q h⟩ section /-- Embed an exponent (an `ExBase, ExProd` pair) as an `ExProd` by multiplying by 1. -/ def ExBase.toProd {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a : Q($α)} {b : Q(ℕ)} (va : ExBase sα a) (vb : ExProd sℕ b) : ExProd sα q($a ^ $b (nat_lit 1).rawCast) := .mul va vb (.const 1 none) /-- Embed `ExProd` in `ExSum` by adding 0. -/ def ExProd.toSum {sα : Q(CommSemiring $α)} {e : Q($α)} (v : ExProd sα e) : ExSum sα q($e + 0) := .add v .zero /-- Get the leading coefficient of an `ExProd`. -/ def ExProd.coeff {sα : Q(CommSemiring $α)} {e : Q($α)} : ExProd sα e → ℚ \| .const q _ => q \| .mul _ _ v => v.coeff end /-- Two monomials are said to "overlap" if they differ by a constant factor, in which case the constants just add. When this happens, the constant may be either zero (if the monomials cancel) or nonzero (if they add up); the zero case is handled specially. -/ inductive Overlap (e : Q($α)) where /-- The expression `e` (the sum of monomials) is equal to `0`. -/ \| zero (_ : Q(IsNat $e (nat_lit 0))) /-- The expression `e` (the sum of monomials) is equal to another monomial (with nonzero leading coefficient). -/ \| nonzero (_ : Result (ExProd sα) e) variable {a a' a₁ a₂ a₃ b b' b₁ b₂ b₃ c c₁ c₂ : R} theorem add_overlap_pf (x : R) (e) (pq_pf : a + b = c) : x ^ e * a + x ^ e * b = x ^ e * c := by subst_vars; simp [mul_add] theorem add_overlap_pf_zero (x : R) (e) : IsNat (a + b) (nat_lit 0) → IsNat (x ^ e * a + x ^ e * b) (nat_lit 0) \| ⟨h⟩ => ⟨by simp [h, ← mul_add]⟩ -- TODO: decide if this is a good idea globally in -- https://leanprover.zulipchat.com/#narrow/stream/270676-lean4/topic/.60MonadLift.20Option.20.28OptionT.20m.29.60/near/469097834 private local instance {m} [Pure m] : MonadLift Option (OptionT m) where monadLift f := .mk <\| pure f /-- Given monomials `va, vb`, attempts to add them together to get another monomial. If the monomials are not compatible, returns `none`. For example, `xy + 2xy = 3xy` is a `.nonzero` overlap, while `xy + xz` returns `none` and `xy + -xy = 0` is a `.zero` overlap. -/ def evalAddOverlap {a b : Q($α)} (va : ExProd sα a) (vb : ExProd sα b) : OptionT Lean.Core.CoreM (Overlap sα q($a + $b)) := do Lean.Core.checkSystem decl_name%.toString match va, vb with \| .const za ha, .const zb hb => do let ra := Result.ofRawRat za a ha; let rb := Result.ofRawRat zb b hb let res ← NormNum.evalAdd.core q($a + $b) q(HAdd.hAdd) a b ra rb match res with \| .isNat _ (.lit (.natVal 0)) p => pure <\| .zero p \| rc => let ⟨zc, hc⟩ ← rc.toRatNZ let ⟨c, pc⟩ := rc.toRawEq pure <\| .nonzero ⟨c, .const zc hc, pc⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃, .mul vb₁ vb₂ vb₃ => do guard (va₁.eq vb₁ && va₂.eq vb₂) match ← evalAddOverlap va₃ vb₃ with \| .zero p => pure <\| .zero (q(add_overlap_pf_zero $a₁ $a₂ $p) : Expr) \| .nonzero ⟨_, vc, p⟩ => pure <\| .nonzero ⟨_, .mul va₁ va₂ vc, (q(add_overlap_pf $a₁ $a₂ $p) : Expr)⟩ \| _, _ => OptionT.fail theorem add_pf_zero_add (b : R) : 0 + b = b := by simp theorem add_pf_add_zero (a : R) : a + 0 = a := by simp theorem add_pf_add_overlap (_ : a₁ + b₁ = c₁) (_ : a₂ + b₂ = c₂) : (a₁ + a₂ : R) + (b₁ + b₂) = c₁ + c₂ := by subst_vars; simp [add_assoc, add_left_comm] theorem add_pf_add_overlap_zero (h : IsNat (a₁ + b₁) (nat_lit 0)) (h₄ : a₂ + b₂ = c) : (a₁ + a₂ : R) + (b₁ + b₂) = c := by subst_vars; rw [add_add_add_comm, h.1, Nat.cast_zero, add_pf_zero_add] theorem add_pf_add_lt (a₁ : R) (_ : a₂ + b = c) : (a₁ + a₂) + b = a₁ + c := by simp [, add_assoc] theorem add_pf_add_gt (b₁ : R) (_ : a + b₂ = c) : a + (b₁ + b₂) = b₁ + c := by subst_vars; simp [add_left_comm] /-- Adds two polynomials `va, vb` together to get a normalized result polynomial. `0 + b = b` * `a + 0 = a` * `a * x + a * y = a * (x + y)` (for `x`, `y` coefficients; uses `evalAddOverlap`) * `(a₁ + a₂) + (b₁ + b₂) = a₁ + (a₂ + (b₁ + b₂))` (if `a₁.lt b₁`) * `(a₁ + a₂) + (b₁ + b₂) = b₁ + ((a₁ + a₂) + b₂)` (if not `a₁.lt b₁`) -/ partial def evalAdd {a b : Q($α)} (va : ExSum sα a) (vb : ExSum sα b) : Lean.Core.CoreM <\| Result (ExSum sα) q($a + $b) := do Lean.Core.checkSystem decl_name%.toString match va, vb with \| .zero, vb => return ⟨b, vb, q(add_pf_zero_add $b)⟩ \| va, .zero => return ⟨a, va, q(add_pf_add_zero $a)⟩ \| .add (a := a₁) (b := _a₂) va₁ va₂, .add (a := b₁) (b := _b₂) vb₁ vb₂ => match ← (evalAddOverlap sα va₁ vb₁).run with \| some (.nonzero ⟨_, vc₁, pc₁⟩) => let ⟨_, vc₂, pc₂⟩ ← evalAdd va₂ vb₂ return ⟨_, .add vc₁ vc₂, q(add_pf_add_overlap $pc₁ $pc₂)⟩ \| some (.zero pc₁) => let ⟨c₂, vc₂, pc₂⟩ ← evalAdd va₂ vb₂ return ⟨c₂, vc₂, q(add_pf_add_overlap_zero $pc₁ $pc₂)⟩ \| none => if let .lt := va₁.cmp vb₁ then let ⟨_c, vc, (pc : Q($_a₂ + ($b₁ + $_b₂) = $_c))⟩ ← evalAdd va₂ vb return ⟨_, .add va₁ vc, q(add_pf_add_lt $a₁ $pc)⟩ else let ⟨_c, vc, (pc : Q($a₁ + $_a₂ + $_b₂ = $_c))⟩ ← evalAdd va vb₂ return ⟨_, .add vb₁ vc, q(add_pf_add_gt $b₁ $pc)⟩ theorem one_mul (a : R) : (nat_lit 1).rawCast * a = a := by simp [Nat.rawCast] theorem mul_one (a : R) : a * (nat_lit 1).rawCast = a := by simp [Nat.rawCast] theorem mul_pf_left (a₁ : R) (a₂) (_ : a₃ * b = c) : (a₁ ^ a₂ * a₃ : R) * b = a₁ ^ a₂ * c := by subst_vars; rw [mul_assoc] theorem mul_pf_right (b₁ : R) (b₂) (_ : a * b₃ = c) : a * (b₁ ^ b₂ * b₃) = b₁ ^ b₂ * c := by subst_vars; rw [mul_left_comm] theorem mul_pp_pf_overlap {ea eb e : ℕ} (x : R) (_ : ea + eb = e) (_ : a₂ * b₂ = c) : (x ^ ea * a₂ : R) * (x ^ eb * b₂) = x ^ e * c := by subst_vars; simp [pow_add, mul_mul_mul_comm] /-- Multiplies two monomials `va, vb` together to get a normalized result monomial. * `x * y = (x * y)` (for `x`, `y` coefficients) * `x * (b₁ * b₂) = b₁ * (b₂ * x)` (for `x` coefficient) * `(a₁ * a₂) * y = a₁ * (a₂ * y)` (for `y` coefficient) * `(x ^ ea * a₂) * (x ^ eb * b₂) = x ^ (ea + eb) * (a₂ * b₂)` (if `ea` and `eb` are identical except coefficient) * `(a₁ * a₂) * (b₁ * b₂) = a₁ * (a₂ * (b₁ * b₂))` (if `a₁.lt b₁`) * `(a₁ * a₂) * (b₁ * b₂) = b₁ * ((a₁ * a₂) * b₂)` (if not `a₁.lt b₁`) -/ partial def evalMulProd {a b : Q($α)} (va : ExProd sα a) (vb : ExProd sα b) : Lean.Core.CoreM <\| Result (ExProd sα) q($a * $b) := do Lean.Core.checkSystem decl_name%.toString match va, vb with \| .const za ha, .const zb hb => if za = 1 then return ⟨b, .const zb hb, (q(one_mul $b) : Expr)⟩ else if zb = 1 then return ⟨a, .const za ha, (q(mul_one $a) : Expr)⟩ else let ra := Result.ofRawRat za a ha; let rb := Result.ofRawRat zb b hb let rc := (NormNum.evalMul.core q($a * $b) q(HMul.hMul) _ _ q(CommSemiring.toSemiring) ra rb).get! let ⟨zc, hc⟩ := rc.toRatNZ.get! let ⟨c, pc⟩ := rc.toRawEq return ⟨c, .const zc hc, pc⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃, .const _ _ => let ⟨_, vc, pc⟩ ← evalMulProd va₃ vb return ⟨_, .mul va₁ va₂ vc, (q(mul_pf_left $a₁ $a₂ $pc) : Expr)⟩ \| .const _ _, .mul (x := b₁) (e := b₂) vb₁ vb₂ vb₃ => let ⟨_, vc, pc⟩ ← evalMulProd va vb₃ return ⟨_, .mul vb₁ vb₂ vc, (q(mul_pf_right $b₁ $b₂ $pc) : Expr)⟩ \| .mul (x := xa) (e := ea) vxa vea va₂, .mul (x := xb) (e := eb) vxb veb vb₂ => do if vxa.eq vxb then if let some (.nonzero ⟨_, ve, pe⟩) ← (evalAddOverlap sℕ vea veb).run then let ⟨_, vc, pc⟩ ← evalMulProd va₂ vb₂ return ⟨_, .mul vxa ve vc, (q(mul_pp_pf_overlap $xa $pe $pc) : Expr)⟩ if let .lt := (vxa.cmp vxb).then (vea.cmp veb) then let ⟨_, vc, pc⟩ ← evalMulProd va₂ vb return ⟨_, .mul vxa vea vc, (q(mul_pf_left $xa $ea $pc) : Expr)⟩ else let ⟨_, vc, pc⟩ ← evalMulProd va vb₂ return ⟨_, .mul vxb veb vc, (q(mul_pf_right $xb $eb $pc) : Expr)⟩ theorem mul_zero (a : R) : a * 0 = 0 := by simp theorem mul_add {d : R} (_ : (a : R) * b₁ = c₁) (_ : a * b₂ = c₂) (_ : c₁ + 0 + c₂ = d) : a * (b₁ + b₂) = d := by subst_vars; simp [_root_.mul_add] /-- Multiplies a monomial `va` to a polynomial `vb` to get a normalized result polynomial. * `a * 0 = 0` * `a * (b₁ + b₂) = (a * b₁) + (a * b₂)` -/ def evalMul₁ {a b : Q($α)} (va : ExProd sα a) (vb : ExSum sα b) : Lean.Core.CoreM <\| Result (ExSum sα) q($a * $b) := do match vb with \| .zero => return ⟨_, .zero, q(mul_zero $a)⟩ \| .add vb₁ vb₂ => let ⟨_, vc₁, pc₁⟩ ← evalMulProd sα va vb₁ let ⟨_, vc₂, pc₂⟩ ← evalMul₁ va vb₂ let ⟨_, vd, pd⟩ ← evalAdd sα vc₁.toSum vc₂ return ⟨_, vd, q(mul_add $pc₁ $pc₂ $pd)⟩ theorem zero_mul (b : R) : 0 * b = 0 := by simp theorem add_mul {d : R} (_ : (a₁ : R) * b = c₁) (_ : a₂ * b = c₂) (_ : c₁ + c₂ = d) : (a₁ + a₂) * b = d := by subst_vars; simp [_root_.add_mul] /-- Multiplies two polynomials `va, vb` together to get a normalized result polynomial. * `0 * b = 0` * `(a₁ + a₂) * b = (a₁ * b) + (a₂ * b)` -/ def evalMul {a b : Q($α)} (va : ExSum sα a) (vb : ExSum sα b) : Lean.Core.CoreM <\| Result (ExSum sα) q($a * $b) := do match va with \| .zero => return ⟨_, .zero, q(zero_mul $b)⟩ \| .add va₁ va₂ => let ⟨_, vc₁, pc₁⟩ ← evalMul₁ sα va₁ vb let ⟨_, vc₂, pc₂⟩ ← evalMul va₂ vb let ⟨_, vd, pd⟩ ← evalAdd sα vc₁ vc₂ return ⟨_, vd, q(add_mul $pc₁ $pc₂ $pd)⟩ theorem natCast_nat (n) : ((Nat.rawCast n : ℕ) : R) = Nat.rawCast n := by simp theorem natCast_mul {a₁ a₃ : ℕ} (a₂) (_ : ((a₁ : ℕ) : R) = b₁) (_ : ((a₃ : ℕ) : R) = b₃) : ((a₁ ^ a₂ * a₃ : ℕ) : R) = b₁ ^ a₂ * b₃ := by subst_vars; simp theorem natCast_zero : ((0 : ℕ) : R) = 0 := Nat.cast_zero theorem natCast_add {a₁ a₂ : ℕ} (_ : ((a₁ : ℕ) : R) = b₁) (_ : ((a₂ : ℕ) : R) = b₂) : ((a₁ + a₂ : ℕ) : R) = b₁ + b₂ := by subst_vars; simp mutual /-- Applies `Nat.cast` to a nat polynomial to produce a polynomial in `α`. * An atom `e` causes `↑e` to be allocated as a new atom. * A sum delegates to `ExSum.evalNatCast`. -/ partial def ExBase.evalNatCast {a : Q(ℕ)} (va : ExBase sℕ a) : AtomM (Result (ExBase sα) q($a)) := match va with \| .atom _ => do let (i, ⟨b', _⟩) ← addAtomQ q($a) pure ⟨b', ExBase.atom i, q(Eq.refl $b')⟩ \| .sum va => do let ⟨_, vc, p⟩ ← va.evalNatCast pure ⟨_, .sum vc, p⟩ /-- Applies `Nat.cast` to a nat monomial to produce a monomial in `α`. * `↑c = c` if `c` is a numeric literal * `↑(a ^ n * b) = ↑a ^ n * ↑b` -/ partial def ExProd.evalNatCast {a : Q(ℕ)} (va : ExProd sℕ a) : AtomM (Result (ExProd sα) q($a)) := match va with \| .const c hc => have n : Q(ℕ) := a.appArg! pure ⟨q(Nat.rawCast $n), .const c hc, (q(natCast_nat (R := $α) $n) : Expr)⟩ \| .mul (e := a₂) va₁ va₂ va₃ => do let ⟨_, vb₁, pb₁⟩ ← va₁.evalNatCast let ⟨_, vb₃, pb₃⟩ ← va₃.evalNatCast pure ⟨_, .mul vb₁ va₂ vb₃, q(natCast_mul $a₂ $pb₁ $pb₃)⟩ /-- Applies `Nat.cast` to a nat polynomial to produce a polynomial in `α`. * `↑0 = 0` * `↑(a + b) = ↑a + ↑b` -/ partial def ExSum.evalNatCast {a : Q(ℕ)} (va : ExSum sℕ a) : AtomM (Result (ExSum sα) q($a)) := match va with \| .zero => pure ⟨_, .zero, q(natCast_zero (R := $α))⟩ \| .add va₁ va₂ => do let ⟨_, vb₁, pb₁⟩ ← va₁.evalNatCast let ⟨_, vb₂, pb₂⟩ ← va₂.evalNatCast pure ⟨_, .add vb₁ vb₂, q(natCast_add $pb₁ $pb₂)⟩ end theorem smul_nat {a b c : ℕ} (_ : (a * b : ℕ) = c) : a • b = c := by subst_vars; simp theorem smul_eq_cast {a : ℕ} (_ : ((a : ℕ) : R) = a') (_ : a' * b = c) : a • b = c := by subst_vars; simp /-- Constructs the scalar multiplication `n • a`, where both `n : ℕ` and `a : α` are normalized polynomial expressions. * `a • b = a * b` if `α = ℕ` * `a • b = ↑a * b` otherwise -/ def evalNSMul {a : Q(ℕ)} {b : Q($α)} (va : ExSum sℕ a) (vb : ExSum sα b) : AtomM (Result (ExSum sα) q($a • $b)) := do if ← isDefEq sα sℕ then let ⟨_, va'⟩ := va.cast have _b : Q(ℕ) := b let ⟨(_c : Q(ℕ)), vc, (pc : Q($a * $_b = $_c))⟩ ← evalMul sα va' vb pure ⟨_, vc, (q(smul_nat $pc) : Expr)⟩ else let ⟨_, va', pa'⟩ ← va.evalNatCast sα let ⟨_, vc, pc⟩ ← evalMul sα va' vb pure ⟨_, vc, (q(smul_eq_cast $pa' $pc) : Expr)⟩ theorem neg_one_mul {R} [Ring R] {a b : R} (_ : (Int.negOfNat (nat_lit 1)).rawCast * a = b) : -a = b := by subst_vars; simp [Int.negOfNat] theorem neg_mul {R} [Ring R] (a₁ : R) (a₂) {a₃ b : R} (_ : -a₃ = b) : -(a₁ ^ a₂ * a₃) = a₁ ^ a₂ * b := by subst_vars; simp /-- Negates a monomial `va` to get another monomial. * `-c = (-c)` (for `c` coefficient) * `-(a₁ * a₂) = a₁ * -a₂` -/ def evalNegProd {a : Q($α)} (rα : Q(Ring $α)) (va : ExProd sα a) : Lean.Core.CoreM <\| Result (ExProd sα) q(-$a) := do Lean.Core.checkSystem decl_name%.toString match va with \| .const za ha => let lit : Q(ℕ) := mkRawNatLit 1 let ⟨m1, _⟩ := ExProd.mkNegNat sα rα 1 let rm := Result.isNegNat rα lit (q(IsInt.of_raw $α (.negOfNat $lit)) : Expr) let ra := Result.ofRawRat za a ha let rb := (NormNum.evalMul.core q($m1 * $a) q(HMul.hMul) _ _ q(CommSemiring.toSemiring) rm ra).get! let ⟨zb, hb⟩ := rb.toRatNZ.get! let ⟨b, (pb : Q((Int.negOfNat (nat_lit 1)).rawCast * $a = $b))⟩ := rb.toRawEq return ⟨b, .const zb hb, (q(neg_one_mul (R := $α) $pb) : Expr)⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃ => let ⟨_, vb, pb⟩ ← evalNegProd rα va₃ return ⟨_, .mul va₁ va₂ vb, (q(neg_mul $a₁ $a₂ $pb) : Expr)⟩ theorem neg_zero {R} [Ring R] : -(0 : R) = 0 := by simp theorem neg_add {R} [Ring R] {a₁ a₂ b₁ b₂ : R} (_ : -a₁ = b₁) (_ : -a₂ = b₂) : -(a₁ + a₂) = b₁ + b₂ := by subst_vars; simp [add_comm] /-- Negates a polynomial `va` to get another polynomial. * `-0 = 0` (for `c` coefficient) * `-(a₁ + a₂) = -a₁ + -a₂` -/ def evalNeg {a : Q($α)} (rα : Q(Ring $α)) (va : ExSum sα a) : Lean.Core.CoreM <\| Result (ExSum sα) q(-$a) := do match va with \| .zero => return ⟨_, .zero, (q(neg_zero (R := $α)) : Expr)⟩ \| .add va₁ va₂ => let ⟨_, vb₁, pb₁⟩ ← evalNegProd sα rα va₁ let ⟨_, vb₂, pb₂⟩ ← evalNeg rα va₂ return ⟨_, .add vb₁ vb₂, (q(neg_add $pb₁ $pb₂) : Expr)⟩ theorem sub_pf {R} [Ring R] {a b c d : R} (_ : -b = c) (_ : a + c = d) : a - b = d := by subst_vars; simp [sub_eq_add_neg] /-- Subtracts two polynomials `va, vb` to get a normalized result polynomial. * `a - b = a + -b` -/ def evalSub {α : Q(Type u)} (sα : Q(CommSemiring $α)) {a b : Q($α)} (rα : Q(Ring $α)) (va : ExSum sα a) (vb : ExSum sα b) : Lean.Core.CoreM <\| Result (ExSum sα) q($a - $b) := do let ⟨_c, vc, pc⟩ ← evalNeg sα rα vb let ⟨d, vd, (pd : Q($a + $_c = $d))⟩ ← evalAdd sα va vc return ⟨d, vd, (q(sub_pf $pc $pd) : Expr)⟩ theorem pow_prod_atom (a : R) (b) : a ^ b = (a + 0) ^ b * (nat_lit 1).rawCast := by simp /-- The fallback case for exponentiating polynomials is to use `ExBase.toProd` to just build an exponent expression. (This has a slightly different normalization than `evalPowAtom` because the input types are different.) * `x ^ e = (x + 0) ^ e * 1` -/ def evalPowProdAtom {a : Q($α)} {b : Q(ℕ)} (va : ExProd sα a) (vb : ExProd sℕ b) : Result (ExProd sα) q($a ^ $b) := ⟨_, (ExBase.sum va.toSum).toProd vb, q(pow_prod_atom $a $b)⟩ theorem pow_atom (a : R) (b) : a ^ b = a ^ b * (nat_lit 1).rawCast + 0 := by simp /-- The fallback case for exponentiating polynomials is to use `ExBase.toProd` to just build an exponent expression. * `x ^ e = x ^ e * 1 + 0` -/ def evalPowAtom {a : Q($α)} {b : Q(ℕ)} (va : ExBase sα a) (vb : ExProd sℕ b) : Result (ExSum sα) q($a ^ $b) := ⟨_, (va.toProd vb).toSum, q(pow_atom $a $b)⟩ theorem const_pos (n : ℕ) (h : Nat.ble 1 n = true) : 0 < (n.rawCast : ℕ) := Nat.le_of_ble_eq_true h theorem mul_exp_pos {a₁ a₂ : ℕ} (n) (h₁ : 0 < a₁) (h₂ : 0 < a₂) : 0 < a₁ ^ n * a₂ := Nat.mul_pos (Nat.pow_pos h₁) h₂ theorem add_pos_left {a₁ : ℕ} (a₂) (h : 0 < a₁) : 0 < a₁ + a₂ := Nat.lt_of_lt_of_le h (Nat.le_add_right ..) theorem add_pos_right {a₂ : ℕ} (a₁) (h : 0 < a₂) : 0 < a₁ + a₂ := Nat.lt_of_lt_of_le h (Nat.le_add_left ..) mutual /-- Attempts to prove that a polynomial expression in `ℕ` is positive. * Atoms are not (necessarily) positive * Sums defer to `ExSum.evalPos` -/ partial def ExBase.evalPos {a : Q(ℕ)} (va : ExBase sℕ a) : Option Q(0 < $a) := match va with \| .atom _ => none \| .sum va => va.evalPos /-- Attempts to prove that a monomial expression in `ℕ` is positive. * `0 < c` (where `c` is a numeral) is true by the normalization invariant (`c` is not zero) * `0 < x ^ e * b` if `0 < x` and `0 < b` -/ partial def ExProd.evalPos {a : Q(ℕ)} (va : ExProd sℕ a) : Option Q(0 < $a) := match va with \| .const _ _ => -- it must be positive because it is a nonzero nat literal have lit : Q(ℕ) := a.appArg! haveI : $a =Q Nat.rawCast $lit := ⟨⟩ haveI p : Nat.ble 1 $lit =Q true := ⟨⟩ some q(const_pos $lit $p) \| .mul (e := ea₁) vxa₁ _ va₂ => do let pa₁ ← vxa₁.evalPos let pa₂ ← va₂.evalPos some q(mul_exp_pos $ea₁ $pa₁ $pa₂) /-- Attempts to prove that a polynomial expression in `ℕ` is positive. * `0 < 0` fails * `0 < a + b` if `0 < a` or `0 < b` -/ partial def ExSum.evalPos {a : Q(ℕ)} (va : ExSum sℕ a) : Option Q(0 < $a) := match va with \| .zero => none \| .add (a := a₁) (b := a₂) va₁ va₂ => do match va₁.evalPos with \| some p => some q(add_pos_left $a₂ $p) \| none => let p ← va₂.evalPos; some q(add_pos_right $a₁ $p) end theorem pow_one (a : R) : a ^ nat_lit 1 = a := by simp theorem pow_bit0 {k : ℕ} (_ : (a : R) ^ k = b) (_ : b * b = c) : a ^ (Nat.mul (nat_lit 2) k) = c := by subst_vars; simp [Nat.succ_mul, pow_add] theorem pow_bit1 {k : ℕ} {d : R} (_ : (a : R) ^ k = b) (_ : b * b = c) (_ : c * a = d) : a ^ (Nat.add (Nat.mul (nat_lit 2) k) (nat_lit 1)) = d := by subst_vars; simp [Nat.succ_mul, pow_add] /-- The main case of exponentiation of ring expressions is when `va` is a polynomial and `n` is a nonzero literal expression, like `(x + y)^5`. In this case we work out the polynomial completely into a sum of monomials. * `x ^ 1 = x` * `x ^ (2n) = x ^ n x ^ n` * `x ^ (2n+1) = x ^ n x ^ n * x` -/ partial def evalPowNat {a : Q($α)} (va : ExSum sα a) (n : Q(ℕ)) : Lean.Core.CoreM <\| Result (ExSum sα) q($a ^ $n) := do let nn := n.natLit! if nn = 1 then return ⟨_, va, (q(pow_one $a) : Expr)⟩ else let nm := nn >>> 1 have m : Q(ℕ) := mkRawNatLit nm if nn &&& 1 = 0 then let ⟨_, vb, pb⟩ ← evalPowNat va m let ⟨_, vc, pc⟩ ← evalMul sα vb vb return ⟨_, vc, (q(pow_bit0 $pb $pc) : Expr)⟩ else let ⟨_, vb, pb⟩ ← evalPowNat va m let ⟨_, vc, pc⟩ ← evalMul sα vb vb let ⟨_, vd, pd⟩ ← evalMul sα vc va return ⟨_, vd, (q(pow_bit1 $pb $pc $pd) : Expr)⟩ theorem one_pow (b : ℕ) : ((nat_lit 1).rawCast : R) ^ b = (nat_lit 1).rawCast := by simp theorem mul_pow {ea₁ b c₁ : ℕ} {xa₁ : R} (_ : ea₁ * b = c₁) (_ : a₂ ^ b = c₂) : (xa₁ ^ ea₁ * a₂ : R) ^ b = xa₁ ^ c₁ * c₂ := by subst_vars; simp [_root_.mul_pow, pow_mul] /-- There are several special cases when exponentiating monomials: * `1 ^ n = 1` * `x ^ y = (x ^ y)` when `x` and `y` are constants * `(a * b) ^ e = a ^ e * b ^ e` In all other cases we use `evalPowProdAtom`. -/ def evalPowProd {a : Q($α)} {b : Q(ℕ)} (va : ExProd sα a) (vb : ExProd sℕ b) : Lean.Core.CoreM <\| Result (ExProd sα) q($a ^ $b) := do Lean.Core.checkSystem decl_name%.toString let res : OptionT Lean.Core.CoreM (Result (ExProd sα) q($a ^ $b)) := do match va, vb with \| .const 1, _ => return ⟨_, va, (q(one_pow (R := $α) $b) : Expr)⟩ \| .const za ha, .const zb hb => assert! 0 ≤ zb let ra := Result.ofRawRat za a ha have lit : Q(ℕ) := b.appArg! let rb := (q(IsNat.of_raw ℕ $lit) : Expr) let rc ← NormNum.evalPow.core q($a ^ $b) q(HPow.hPow) q($a) q($b) lit rb q(CommSemiring.toSemiring) ra let ⟨zc, hc⟩ ← rc.toRatNZ let ⟨c, pc⟩ := rc.toRawEq return ⟨c, .const zc hc, pc⟩ \| .mul vxa₁ vea₁ va₂, vb => let ⟨_, vc₁, pc₁⟩ ← evalMulProd sℕ vea₁ vb let ⟨_, vc₂, pc₂⟩ ← evalPowProd va₂ vb return ⟨_, .mul vxa₁ vc₁ vc₂, q(mul_pow $pc₁ $pc₂)⟩ \| _, _ => OptionT.fail return (← res.run).getD (evalPowProdAtom sα va vb) /-- The result of `extractCoeff` is a numeral and a proof that the original expression factors by this numeral. -/ structure ExtractCoeff (e : Q(ℕ)) where /-- A raw natural number literal. -/ k : Q(ℕ) /-- The result of extracting the coefficient is a monic monomial. -/ e' : Q(ℕ) /-- `e'` is a monomial. -/ ve' : ExProd sℕ e' /-- The proof that `e` splits into the coefficient `k` and the monic monomial `e'`. -/ p : Q($e = $e' * $k) theorem coeff_one (k : ℕ) : k.rawCast = (nat_lit 1).rawCast * k := by simp theorem coeff_mul {a₃ c₂ k : ℕ} (a₁ a₂ : ℕ) (_ : a₃ = c₂ * k) : a₁ ^ a₂ * a₃ = (a₁ ^ a₂ * c₂) * k := by subst_vars; rw [mul_assoc] /-- Given a monomial expression `va`, splits off the leading coefficient `k` and the remainder `e'`, stored in the `ExtractCoeff` structure. * `c = 1 * c` (if `c` is a constant) * `a * b = (a * b') * k` if `b = b' * k` -/ def extractCoeff {a : Q(ℕ)} (va : ExProd sℕ a) : ExtractCoeff a := match va with \| .const _ _ => have k : Q(ℕ) := a.appArg! ⟨k, q((nat_lit 1).rawCast), .const 1, (q(coeff_one $k) : Expr)⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃ => let ⟨k, _, vc, pc⟩ := extractCoeff va₃ ⟨k, _, .mul va₁ va₂ vc, q(coeff_mul $a₁ $a₂ $pc)⟩ theorem pow_one_cast (a : R) : a ^ (nat_lit 1).rawCast = a := by simp theorem zero_pow {b : ℕ} (_ : 0 < b) : (0 : R) ^ b = 0 := match b with \| b+1 => by simp [pow_succ] theorem single_pow {b : ℕ} (_ : (a : R) ^ b = c) : (a + 0) ^ b = c + 0 := by simp [] theorem pow_nat {b c k : ℕ} {d e : R} (_ : b = c k) (_ : a ^ c = d) (_ : d ^ k = e) : (a : R) ^ b = e := by subst_vars; simp [pow_mul] /-- Exponentiates a polynomial `va` by a monomial `vb`, including several special cases. * `a ^ 1 = a` * `0 ^ e = 0` if `0 < e` * `(a + 0) ^ b = a ^ b` computed using `evalPowProd` * `a ^ b = (a ^ b') ^ k` if `b = b' * k` and `k > 1` Otherwise `a ^ b` is just encoded as `a ^ b * 1 + 0` using `evalPowAtom`. -/ partial def evalPow₁ {a : Q($α)} {b : Q(ℕ)} (va : ExSum sα a) (vb : ExProd sℕ b) : Lean.Core.CoreM <\| Result (ExSum sα) q($a ^ $b) := do match va, vb with \| va, .const 1 => haveI : $b =Q Nat.rawCast (nat_lit 1) := ⟨⟩ return ⟨_, va, q(pow_one_cast $a)⟩ \| .zero, vb => match vb.evalPos with \| some p => return ⟨_, .zero, q(zero_pow (R := $α) $p)⟩ \| none => return evalPowAtom sα (.sum .zero) vb \| ExSum.add va .zero, vb => -- TODO: using `.add` here takes a while to compile? let ⟨_, vc, pc⟩ ← evalPowProd sα va vb return ⟨_, vc.toSum, q(single_pow $pc)⟩ \| va, vb => if vb.coeff > 1 then let ⟨k, _, vc, pc⟩ := extractCoeff vb let ⟨_, vd, pd⟩ ← evalPow₁ va vc let ⟨_, ve, pe⟩ ← evalPowNat sα vd k return ⟨_, ve, q(pow_nat $pc $pd $pe)⟩ else return evalPowAtom sα (.sum va) vb theorem pow_zero (a : R) : a ^ 0 = (nat_lit 1).rawCast + 0 := by simp theorem pow_add {b₁ b₂ : ℕ} {d : R} (_ : a ^ b₁ = c₁) (_ : a ^ b₂ = c₂) (_ : c₁ * c₂ = d) : (a : R) ^ (b₁ + b₂) = d := by subst_vars; simp [_root_.pow_add] /-- Exponentiates two polynomials `va, vb`. * `a ^ 0 = 1` * `a ^ (b₁ + b₂) = a ^ b₁ * a ^ b₂` -/ def evalPow {a : Q($α)} {b : Q(ℕ)} (va : ExSum sα a) (vb : ExSum sℕ b) : Lean.Core.CoreM <\| Result (ExSum sα) q($a ^ $b) := do match vb with \| .zero => return ⟨_, (ExProd.mkNat sα 1).2.toSum, q(pow_zero $a)⟩ \| .add vb₁ vb₂ => let ⟨_, vc₁, pc₁⟩ ← evalPow₁ sα va vb₁ let ⟨_, vc₂, pc₂⟩ ← evalPow va vb₂ let ⟨_, vd, pd⟩ ← evalMul sα vc₁ vc₂ return ⟨_, vd, q(pow_add $pc₁ $pc₂ $pd)⟩	/-- This cache contains data required by the `ring` tactic during execution. -/ structure Cache {α : Q(Type u)} (sα : Q(CommSemiring $α)) where /-- A ring instance on `α`, if available. -/ rα : Option Q(Ring $α)	Mathlib/Tactic/Ring/Basic.lean	890	893
/- Copyright (c) 2019 Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Zhouhang Zhou, Sébastien Gouëzel, Frédéric Dupuis -/ import Mathlib.Algebra.BigOperators.Field import Mathlib.Analysis.Complex.Basic import Mathlib.Analysis.InnerProductSpace.Defs import Mathlib.GroupTheory.MonoidLocalization.Basic /-! # Properties of inner product spaces This file proves many basic properties of inner product spaces (real or complex). ## Main results - `inner_mul_inner_self_le`: the Cauchy-Schwartz inequality (one of many variants). - `norm_inner_eq_norm_iff`: the equality criteion in the Cauchy-Schwartz inequality (also in many variants). - `inner_eq_sum_norm_sq_div_four`: the polarization identity. ## Tags inner product space, Hilbert space, norm -/ noncomputable section open RCLike Real Filter Topology ComplexConjugate Finsupp open LinearMap (BilinForm) variable {𝕜 E F : Type} [RCLike 𝕜] section BasicProperties_Seminormed open scoped InnerProductSpace variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y local postfix:90 "†" => starRingEnd _ export InnerProductSpace (norm_sq_eq_re_inner) @[simp] theorem inner_conj_symm (x y : E) : ⟪y, x⟫† = ⟪x, y⟫ := InnerProductSpace.conj_inner_symm _ _ theorem real_inner_comm (x y : F) : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := @inner_conj_symm ℝ _ _ _ _ x y theorem inner_eq_zero_symm {x y : E} : ⟪x, y⟫ = 0 ↔ ⟪y, x⟫ = 0 := by rw [← inner_conj_symm] exact star_eq_zero @[simp] theorem inner_self_im (x : E) : im ⟪x, x⟫ = 0 := by rw [← @ofReal_inj 𝕜, im_eq_conj_sub]; simp theorem inner_add_left (x y z : E) : ⟪x + y, z⟫ = ⟪x, z⟫ + ⟪y, z⟫ := InnerProductSpace.add_left _ _ _ theorem inner_add_right (x y z : E) : ⟪x, y + z⟫ = ⟪x, y⟫ + ⟪x, z⟫ := by rw [← inner_conj_symm, inner_add_left, RingHom.map_add] simp only [inner_conj_symm] theorem inner_re_symm (x y : E) : re ⟪x, y⟫ = re ⟪y, x⟫ := by rw [← inner_conj_symm, conj_re] theorem inner_im_symm (x y : E) : im ⟪x, y⟫ = -im ⟪y, x⟫ := by rw [← inner_conj_symm, conj_im] section Algebra variable {𝕝 : Type} [CommSemiring 𝕝] [StarRing 𝕝] [Algebra 𝕝 𝕜] [Module 𝕝 E] [IsScalarTower 𝕝 𝕜 E] [StarModule 𝕝 𝕜] /-- See `inner_smul_left` for the common special when `𝕜 = 𝕝`. -/ lemma inner_smul_left_eq_star_smul (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r† • ⟪x, y⟫ := by rw [← algebraMap_smul 𝕜 r, InnerProductSpace.smul_left, starRingEnd_apply, starRingEnd_apply, ← algebraMap_star_comm, ← smul_eq_mul, algebraMap_smul] /-- Special case of `inner_smul_left_eq_star_smul` when the acting ring has a trivial star (eg `ℕ`, `ℤ`, `ℚ≥0`, `ℚ`, `ℝ`). -/ lemma inner_smul_left_eq_smul [TrivialStar 𝕝] (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r • ⟪x, y⟫ := by rw [inner_smul_left_eq_star_smul, starRingEnd_apply, star_trivial] /-- See `inner_smul_right` for the common special when `𝕜 = 𝕝`. -/ lemma inner_smul_right_eq_smul (x y : E) (r : 𝕝) : ⟪x, r • y⟫ = r • ⟪x, y⟫ := by rw [← inner_conj_symm, inner_smul_left_eq_star_smul, starRingEnd_apply, starRingEnd_apply, star_smul, star_star, ← starRingEnd_apply, inner_conj_symm] end Algebra /-- See `inner_smul_left_eq_star_smul` for the case of a general algebra action. -/ theorem inner_smul_left (x y : E) (r : 𝕜) : ⟪r • x, y⟫ = r† * ⟪x, y⟫ := inner_smul_left_eq_star_smul .. theorem real_inner_smul_left (x y : F) (r : ℝ) : ⟪r • x, y⟫_ℝ = r * ⟪x, y⟫_ℝ := inner_smul_left _ _ _ theorem inner_smul_real_left (x y : E) (r : ℝ) : ⟪(r : 𝕜) • x, y⟫ = r • ⟪x, y⟫ := by rw [inner_smul_left, conj_ofReal, Algebra.smul_def] /-- See `inner_smul_right_eq_smul` for the case of a general algebra action. -/ theorem inner_smul_right (x y : E) (r : 𝕜) : ⟪x, r • y⟫ = r * ⟪x, y⟫ := inner_smul_right_eq_smul .. theorem real_inner_smul_right (x y : F) (r : ℝ) : ⟪x, r • y⟫_ℝ = r * ⟪x, y⟫_ℝ := inner_smul_right _ _ _ theorem inner_smul_real_right (x y : E) (r : ℝ) : ⟪x, (r : 𝕜) • y⟫ = r • ⟪x, y⟫ := by rw [inner_smul_right, Algebra.smul_def] /-- The inner product as a sesquilinear form. Note that in the case `𝕜 = ℝ` this is a bilinear form. -/ @[simps!] def sesqFormOfInner : E →ₗ[𝕜] E →ₗ⋆[𝕜] 𝕜 := LinearMap.mk₂'ₛₗ (RingHom.id 𝕜) (starRingEnd _) (fun x y => ⟪y, x⟫) (fun _x _y _z => inner_add_right _ _ _) (fun _r _x _y => inner_smul_right _ _ _) (fun _x _y _z => inner_add_left _ _ _) fun _r _x _y => inner_smul_left _ _ _ /-- The real inner product as a bilinear form. Note that unlike `sesqFormOfInner`, this does not reverse the order of the arguments. -/ @[simps!] def bilinFormOfRealInner : BilinForm ℝ F := sesqFormOfInner.flip /-- An inner product with a sum on the left. -/ theorem sum_inner {ι : Type} (s : Finset ι) (f : ι → E) (x : E) : ⟪∑ i ∈ s, f i, x⟫ = ∑ i ∈ s, ⟪f i, x⟫ := map_sum (sesqFormOfInner (𝕜 := 𝕜) (E := E) x) _ _ /-- An inner product with a sum on the right. -/ theorem inner_sum {ι : Type} (s : Finset ι) (f : ι → E) (x : E) : ⟪x, ∑ i ∈ s, f i⟫ = ∑ i ∈ s, ⟪x, f i⟫ := map_sum (LinearMap.flip sesqFormOfInner x) _ _ /-- An inner product with a sum on the left, `Finsupp` version. -/ protected theorem Finsupp.sum_inner {ι : Type} (l : ι →₀ 𝕜) (v : ι → E) (x : E) : ⟪l.sum fun (i : ι) (a : 𝕜) => a • v i, x⟫ = l.sum fun (i : ι) (a : 𝕜) => conj a • ⟪v i, x⟫ := by convert sum_inner (𝕜 := 𝕜) l.support (fun a => l a • v a) x simp only [inner_smul_left, Finsupp.sum, smul_eq_mul] /-- An inner product with a sum on the right, `Finsupp` version. -/ protected theorem Finsupp.inner_sum {ι : Type} (l : ι →₀ 𝕜) (v : ι → E) (x : E) : ⟪x, l.sum fun (i : ι) (a : 𝕜) => a • v i⟫ = l.sum fun (i : ι) (a : 𝕜) => a • ⟪x, v i⟫ := by convert inner_sum (𝕜 := 𝕜) l.support (fun a => l a • v a) x simp only [inner_smul_right, Finsupp.sum, smul_eq_mul] protected theorem DFinsupp.sum_inner {ι : Type} [DecidableEq ι] {α : ι → Type} [∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E) (l : Π₀ i, α i) (x : E) : ⟪l.sum f, x⟫ = l.sum fun i a => ⟪f i a, x⟫ := by simp +contextual only [DFinsupp.sum, sum_inner, smul_eq_mul] protected theorem DFinsupp.inner_sum {ι : Type} [DecidableEq ι] {α : ι → Type} [∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E) (l : Π₀ i, α i) (x : E) : ⟪x, l.sum f⟫ = l.sum fun i a => ⟪x, f i a⟫ := by simp +contextual only [DFinsupp.sum, inner_sum, smul_eq_mul] @[simp] theorem inner_zero_left (x : E) : ⟪0, x⟫ = 0 := by rw [← zero_smul 𝕜 (0 : E), inner_smul_left, RingHom.map_zero, zero_mul] theorem inner_re_zero_left (x : E) : re ⟪0, x⟫ = 0 := by simp only [inner_zero_left, AddMonoidHom.map_zero] @[simp] theorem inner_zero_right (x : E) : ⟪x, 0⟫ = 0 := by rw [← inner_conj_symm, inner_zero_left, RingHom.map_zero] theorem inner_re_zero_right (x : E) : re ⟪x, 0⟫ = 0 := by simp only [inner_zero_right, AddMonoidHom.map_zero] theorem inner_self_nonneg {x : E} : 0 ≤ re ⟪x, x⟫ := PreInnerProductSpace.toCore.re_inner_nonneg x theorem real_inner_self_nonneg {x : F} : 0 ≤ ⟪x, x⟫_ℝ := @inner_self_nonneg ℝ F _ _ _ x @[simp] theorem inner_self_ofReal_re (x : E) : (re ⟪x, x⟫ : 𝕜) = ⟪x, x⟫ := ((RCLike.is_real_TFAE (⟪x, x⟫ : 𝕜)).out 2 3).2 (inner_self_im (𝕜 := 𝕜) x) theorem inner_self_eq_norm_sq_to_K (x : E) : ⟪x, x⟫ = (‖x‖ : 𝕜) ^ 2 := by rw [← inner_self_ofReal_re, ← norm_sq_eq_re_inner, ofReal_pow] theorem inner_self_re_eq_norm (x : E) : re ⟪x, x⟫ = ‖⟪x, x⟫‖ := by conv_rhs => rw [← inner_self_ofReal_re] symm exact norm_of_nonneg inner_self_nonneg theorem inner_self_ofReal_norm (x : E) : (‖⟪x, x⟫‖ : 𝕜) = ⟪x, x⟫ := by rw [← inner_self_re_eq_norm] exact inner_self_ofReal_re _ theorem real_inner_self_abs (x : F) : \|⟪x, x⟫_ℝ\| = ⟪x, x⟫_ℝ := @inner_self_ofReal_norm ℝ F _ _ _ x theorem norm_inner_symm (x y : E) : ‖⟪x, y⟫‖ = ‖⟪y, x⟫‖ := by rw [← inner_conj_symm, norm_conj] @[simp] theorem inner_neg_left (x y : E) : ⟪-x, y⟫ = -⟪x, y⟫ := by rw [← neg_one_smul 𝕜 x, inner_smul_left] simp @[simp] theorem inner_neg_right (x y : E) : ⟪x, -y⟫ = -⟪x, y⟫ := by rw [← inner_conj_symm, inner_neg_left]; simp only [RingHom.map_neg, inner_conj_symm] theorem inner_neg_neg (x y : E) : ⟪-x, -y⟫ = ⟪x, y⟫ := by simp theorem inner_self_conj (x : E) : ⟪x, x⟫† = ⟪x, x⟫ := inner_conj_symm _ _ theorem inner_sub_left (x y z : E) : ⟪x - y, z⟫ = ⟪x, z⟫ - ⟪y, z⟫ := by simp [sub_eq_add_neg, inner_add_left] theorem inner_sub_right (x y z : E) : ⟪x, y - z⟫ = ⟪x, y⟫ - ⟪x, z⟫ := by simp [sub_eq_add_neg, inner_add_right] theorem inner_mul_symm_re_eq_norm (x y : E) : re (⟪x, y⟫ * ⟪y, x⟫) = ‖⟪x, y⟫ * ⟪y, x⟫‖ := by rw [← inner_conj_symm, mul_comm] exact re_eq_norm_of_mul_conj (inner y x) /-- Expand `⟪x + y, x + y⟫` -/ theorem inner_add_add_self (x y : E) : ⟪x + y, x + y⟫ = ⟪x, x⟫ + ⟪x, y⟫ + ⟪y, x⟫ + ⟪y, y⟫ := by simp only [inner_add_left, inner_add_right]; ring /-- Expand `⟪x + y, x + y⟫_ℝ` -/ theorem real_inner_add_add_self (x y : F) : ⟪x + y, x + y⟫_ℝ = ⟪x, x⟫_ℝ + 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl simp only [inner_add_add_self, this, add_left_inj] ring -- Expand `⟪x - y, x - y⟫` theorem inner_sub_sub_self (x y : E) : ⟪x - y, x - y⟫ = ⟪x, x⟫ - ⟪x, y⟫ - ⟪y, x⟫ + ⟪y, y⟫ := by simp only [inner_sub_left, inner_sub_right]; ring /-- Expand `⟪x - y, x - y⟫_ℝ` -/ theorem real_inner_sub_sub_self (x y : F) : ⟪x - y, x - y⟫_ℝ = ⟪x, x⟫_ℝ - 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl simp only [inner_sub_sub_self, this, add_left_inj] ring /-- Parallelogram law -/ theorem parallelogram_law {x y : E} : ⟪x + y, x + y⟫ + ⟪x - y, x - y⟫ = 2 * (⟪x, x⟫ + ⟪y, y⟫) := by simp only [inner_add_add_self, inner_sub_sub_self] ring /-- Cauchy–Schwarz inequality. -/ theorem inner_mul_inner_self_le (x y : E) : ‖⟪x, y⟫‖ * ‖⟪y, x⟫‖ ≤ re ⟪x, x⟫ * re ⟪y, y⟫ := letI cd : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore InnerProductSpace.Core.inner_mul_inner_self_le x y /-- Cauchy–Schwarz inequality for real inner products. -/ theorem real_inner_mul_inner_self_le (x y : F) : ⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ := calc ⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ‖⟪x, y⟫_ℝ‖ * ‖⟪y, x⟫_ℝ‖ := by rw [real_inner_comm y, ← norm_mul] exact le_abs_self _ _ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ := @inner_mul_inner_self_le ℝ _ _ _ _ x y end BasicProperties_Seminormed section BasicProperties variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y export InnerProductSpace (norm_sq_eq_re_inner) @[simp] theorem inner_self_eq_zero {x : E} : ⟪x, x⟫ = 0 ↔ x = 0 := by rw [inner_self_eq_norm_sq_to_K, sq_eq_zero_iff, ofReal_eq_zero, norm_eq_zero] theorem inner_self_ne_zero {x : E} : ⟪x, x⟫ ≠ 0 ↔ x ≠ 0 := inner_self_eq_zero.not variable (𝕜) theorem ext_inner_left {x y : E} (h : ∀ v, ⟪v, x⟫ = ⟪v, y⟫) : x = y := by rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_right, sub_eq_zero, h (x - y)] theorem ext_inner_right {x y : E} (h : ∀ v, ⟪x, v⟫ = ⟪y, v⟫) : x = y := by rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_left, sub_eq_zero, h (x - y)] variable {𝕜} @[simp] theorem re_inner_self_nonpos {x : E} : re ⟪x, x⟫ ≤ 0 ↔ x = 0 := by rw [← norm_sq_eq_re_inner, (sq_nonneg _).le_iff_eq, sq_eq_zero_iff, norm_eq_zero] @[simp] lemma re_inner_self_pos {x : E} : 0 < re ⟪x, x⟫ ↔ x ≠ 0 := by simpa [-re_inner_self_nonpos] using re_inner_self_nonpos (𝕜 := 𝕜) (x := x).not @[deprecated (since := "2025-04-22")] alias inner_self_nonpos := re_inner_self_nonpos @[deprecated (since := "2025-04-22")] alias inner_self_pos := re_inner_self_pos open scoped InnerProductSpace in theorem real_inner_self_nonpos {x : F} : ⟪x, x⟫_ℝ ≤ 0 ↔ x = 0 := re_inner_self_nonpos (𝕜 := ℝ) open scoped InnerProductSpace in theorem real_inner_self_pos {x : F} : 0 < ⟪x, x⟫_ℝ ↔ x ≠ 0 := re_inner_self_pos (𝕜 := ℝ) /-- A family of vectors is linearly independent if they are nonzero and orthogonal. -/ theorem linearIndependent_of_ne_zero_of_inner_eq_zero {ι : Type} {v : ι → E} (hz : ∀ i, v i ≠ 0) (ho : Pairwise fun i j => ⟪v i, v j⟫ = 0) : LinearIndependent 𝕜 v := by rw [linearIndependent_iff'] intro s g hg i hi have h' : g i inner (v i) (v i) = inner (v i) (∑ j ∈ s, g j • v j) := by rw [inner_sum] symm convert Finset.sum_eq_single (M := 𝕜) i ?_ ?_ · rw [inner_smul_right] · intro j _hj hji rw [inner_smul_right, ho hji.symm, mul_zero] · exact fun h => False.elim (h hi) simpa [hg, hz] using h' end BasicProperties section Norm_Seminormed open scoped InnerProductSpace variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y local notation "IK" => @RCLike.I 𝕜 _ theorem norm_eq_sqrt_re_inner (x : E) : ‖x‖ = √(re ⟪x, x⟫) := calc ‖x‖ = √(‖x‖ ^ 2) := (sqrt_sq (norm_nonneg _)).symm _ = √(re ⟪x, x⟫) := congr_arg _ (norm_sq_eq_re_inner _) @[deprecated (since := "2025-04-22")] alias norm_eq_sqrt_inner := norm_eq_sqrt_re_inner theorem norm_eq_sqrt_real_inner (x : F) : ‖x‖ = √⟪x, x⟫_ℝ := @norm_eq_sqrt_re_inner ℝ _ _ _ _ x theorem inner_self_eq_norm_mul_norm (x : E) : re ⟪x, x⟫ = ‖x‖ * ‖x‖ := by rw [@norm_eq_sqrt_re_inner 𝕜, ← sqrt_mul inner_self_nonneg (re ⟪x, x⟫), sqrt_mul_self inner_self_nonneg] theorem inner_self_eq_norm_sq (x : E) : re ⟪x, x⟫ = ‖x‖ ^ 2 := by rw [pow_two, inner_self_eq_norm_mul_norm] theorem real_inner_self_eq_norm_mul_norm (x : F) : ⟪x, x⟫_ℝ = ‖x‖ * ‖x‖ := by have h := @inner_self_eq_norm_mul_norm ℝ F _ _ _ x simpa using h theorem real_inner_self_eq_norm_sq (x : F) : ⟪x, x⟫_ℝ = ‖x‖ ^ 2 := by rw [pow_two, real_inner_self_eq_norm_mul_norm] /-- Expand the square -/ theorem norm_add_sq (x y : E) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by repeat' rw [sq (M := ℝ), ← @inner_self_eq_norm_mul_norm 𝕜] rw [inner_add_add_self, two_mul] simp only [add_assoc, add_left_inj, add_right_inj, AddMonoidHom.map_add] rw [← inner_conj_symm, conj_re] alias norm_add_pow_two := norm_add_sq /-- Expand the square -/ theorem norm_add_sq_real (x y : F) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 := by have h := @norm_add_sq ℝ _ _ _ _ x y simpa using h alias norm_add_pow_two_real := norm_add_sq_real /-- Expand the square -/ theorem norm_add_mul_self (x y : E) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by repeat' rw [← sq (M := ℝ)] exact norm_add_sq _ _ /-- Expand the square -/ theorem norm_add_mul_self_real (x y : F) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by have h := @norm_add_mul_self ℝ _ _ _ _ x y simpa using h /-- Expand the square -/ theorem norm_sub_sq (x y : E) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by rw [sub_eq_add_neg, @norm_add_sq 𝕜 _ _ _ _ x (-y), norm_neg, inner_neg_right, map_neg, mul_neg, sub_eq_add_neg] alias norm_sub_pow_two := norm_sub_sq /-- Expand the square -/ theorem norm_sub_sq_real (x y : F) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 := @norm_sub_sq ℝ _ _ _ _ _ _ alias norm_sub_pow_two_real := norm_sub_sq_real /-- Expand the square -/ theorem norm_sub_mul_self (x y : E) : ‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by repeat' rw [← sq (M := ℝ)] exact norm_sub_sq _ _ /-- Expand the square -/ theorem norm_sub_mul_self_real (x y : F) : ‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by have h := @norm_sub_mul_self ℝ _ _ _ _ x y simpa using h /-- Cauchy–Schwarz inequality with norm -/ theorem norm_inner_le_norm (x y : E) : ‖⟪x, y⟫‖ ≤ ‖x‖ * ‖y‖ := by rw [norm_eq_sqrt_re_inner (𝕜 := 𝕜) x, norm_eq_sqrt_re_inner (𝕜 := 𝕜) y] letI : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore exact InnerProductSpace.Core.norm_inner_le_norm x y theorem nnnorm_inner_le_nnnorm (x y : E) : ‖⟪x, y⟫‖₊ ≤ ‖x‖₊ * ‖y‖₊ := norm_inner_le_norm x y theorem re_inner_le_norm (x y : E) : re ⟪x, y⟫ ≤ ‖x‖ * ‖y‖ := le_trans (re_le_norm (inner x y)) (norm_inner_le_norm x y) /-- Cauchy–Schwarz inequality with norm -/ theorem abs_real_inner_le_norm (x y : F) : \|⟪x, y⟫_ℝ\| ≤ ‖x‖ * ‖y‖ := (Real.norm_eq_abs _).ge.trans (norm_inner_le_norm x y) /-- Cauchy–Schwarz inequality with norm -/ theorem real_inner_le_norm (x y : F) : ⟪x, y⟫_ℝ ≤ ‖x‖ * ‖y‖ := le_trans (le_abs_self _) (abs_real_inner_le_norm _ _) lemma inner_eq_zero_of_left {x : E} (y : E) (h : ‖x‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by rw [← norm_eq_zero] refine le_antisymm ?_ (by positivity) exact norm_inner_le_norm _ _ \|>.trans <\| by simp [h] lemma inner_eq_zero_of_right (x : E) {y : E} (h : ‖y‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by rw [inner_eq_zero_symm, inner_eq_zero_of_left _ h] variable (𝕜) include 𝕜 in theorem parallelogram_law_with_norm (x y : E) : ‖x + y‖ * ‖x + y‖ + ‖x - y‖ * ‖x - y‖ = 2 * (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) := by simp only [← @inner_self_eq_norm_mul_norm 𝕜] rw [← re.map_add, parallelogram_law, two_mul, two_mul] simp only [re.map_add] include 𝕜 in theorem parallelogram_law_with_nnnorm (x y : E) : ‖x + y‖₊ * ‖x + y‖₊ + ‖x - y‖₊ * ‖x - y‖₊ = 2 * (‖x‖₊ * ‖x‖₊ + ‖y‖₊ * ‖y‖₊) := Subtype.ext <\| parallelogram_law_with_norm 𝕜 x y variable {𝕜} /-- Polarization identity: The real part of the inner product, in terms of the norm. -/ theorem re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : E) : re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 := by rw [@norm_add_mul_self 𝕜] ring /-- Polarization identity: The real part of the inner product, in terms of the norm. -/ theorem re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : E) : re ⟪x, y⟫ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 := by rw [@norm_sub_mul_self 𝕜] ring /-- Polarization identity: The real part of the inner product, in terms of the norm. -/ theorem re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four (x y : E) : re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x - y‖ * ‖x - y‖) / 4 := by rw [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜] ring /-- Polarization identity: The imaginary part of the inner product, in terms of the norm. -/ theorem im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four (x y : E) : im ⟪x, y⟫ = (‖x - IK • y‖ * ‖x - IK • y‖ - ‖x + IK • y‖ * ‖x + IK • y‖) / 4 := by simp only [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜, inner_smul_right, I_mul_re] ring /-- Polarization identity: The inner product, in terms of the norm. -/ theorem inner_eq_sum_norm_sq_div_four (x y : E) : ⟪x, y⟫ = ((‖x + y‖ : 𝕜) ^ 2 - (‖x - y‖ : 𝕜) ^ 2 + ((‖x - IK • y‖ : 𝕜) ^ 2 - (‖x + IK • y‖ : 𝕜) ^ 2) * IK) / 4 := by rw [← re_add_im ⟪x, y⟫, re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four, im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four] push_cast simp only [sq, ← mul_div_right_comm, ← add_div] /-- Polarization identity: The real inner product, in terms of the norm. -/ theorem real_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : F) : ⟪x, y⟫_ℝ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 := re_to_real.symm.trans <\| re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two x y /-- Polarization identity: The real inner product, in terms of the norm. -/ theorem real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : F) : ⟪x, y⟫_ℝ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 := re_to_real.symm.trans <\| re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two x y /-- Pythagorean theorem, if-and-only-if vector inner product form. -/ theorem norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by rw [@norm_add_mul_self ℝ, add_right_cancel_iff, add_eq_left, mul_eq_zero] norm_num /-- Pythagorean theorem, if-and-if vector inner product form using square roots. -/ theorem norm_add_eq_sqrt_iff_real_inner_eq_zero {x y : F} : ‖x + y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by rw [← norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq, eq_comm] <;> positivity /-- Pythagorean theorem, vector inner product form. -/ theorem norm_add_sq_eq_norm_sq_add_norm_sq_of_inner_eq_zero (x y : E) (h : ⟪x, y⟫ = 0) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := by rw [@norm_add_mul_self 𝕜, add_right_cancel_iff, add_eq_left, mul_eq_zero] apply Or.inr simp only [h, zero_re'] /-- Pythagorean theorem, vector inner product form. -/ theorem norm_add_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := (norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h /-- Pythagorean theorem, subtracting vectors, if-and-only-if vector inner product form. -/ theorem norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) : ‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by rw [@norm_sub_mul_self ℝ, add_right_cancel_iff, sub_eq_add_neg, add_eq_left, neg_eq_zero, mul_eq_zero] norm_num /-- Pythagorean theorem, subtracting vectors, if-and-if vector inner product form using square roots. -/ theorem norm_sub_eq_sqrt_iff_real_inner_eq_zero {x y : F} : ‖x - y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by rw [← norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq, eq_comm] <;> positivity /-- Pythagorean theorem, subtracting vectors, vector inner product form. -/ theorem norm_sub_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) : ‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := (norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h /-- The sum and difference of two vectors are orthogonal if and only if they have the same norm. -/ theorem real_inner_add_sub_eq_zero_iff (x y : F) : ⟪x + y, x - y⟫_ℝ = 0 ↔ ‖x‖ = ‖y‖ := by conv_rhs => rw [← mul_self_inj_of_nonneg (norm_nonneg _) (norm_nonneg _)] simp only [← @inner_self_eq_norm_mul_norm ℝ, inner_add_left, inner_sub_right, real_inner_comm y x, sub_eq_zero, re_to_real] constructor · intro h rw [add_comm] at h linarith · intro h linarith /-- Given two orthogonal vectors, their sum and difference have equal norms. -/ theorem norm_sub_eq_norm_add {v w : E} (h : ⟪v, w⟫ = 0) : ‖w - v‖ = ‖w + v‖ := by rw [← mul_self_inj_of_nonneg (norm_nonneg _) (norm_nonneg _)] simp only [h, ← @inner_self_eq_norm_mul_norm 𝕜, sub_neg_eq_add, sub_zero, map_sub, zero_re', zero_sub, add_zero, map_add, inner_add_right, inner_sub_left, inner_sub_right, inner_re_symm, zero_add] /-- The real inner product of two vectors, divided by the product of their norms, has absolute value at most 1. -/ theorem abs_real_inner_div_norm_mul_norm_le_one (x y : F) : \|⟪x, y⟫_ℝ / (‖x‖ * ‖y‖)\| ≤ 1 := by rw [abs_div, abs_mul, abs_norm, abs_norm] exact div_le_one_of_le₀ (abs_real_inner_le_norm x y) (by positivity) /-- The inner product of a vector with a multiple of itself. -/ theorem real_inner_smul_self_left (x : F) (r : ℝ) : ⟪r • x, x⟫_ℝ = r * (‖x‖ * ‖x‖) := by rw [real_inner_smul_left, ← real_inner_self_eq_norm_mul_norm] /-- The inner product of a vector with a multiple of itself. -/ theorem real_inner_smul_self_right (x : F) (r : ℝ) : ⟪x, r • x⟫_ℝ = r * (‖x‖ * ‖x‖) := by rw [inner_smul_right, ← real_inner_self_eq_norm_mul_norm] /-- The inner product of two weighted sums, where the weights in each sum add to 0, in terms of the norms of pairwise differences. -/ theorem inner_sum_smul_sum_smul_of_sum_eq_zero {ι₁ : Type} {s₁ : Finset ι₁} {w₁ : ι₁ → ℝ} (v₁ : ι₁ → F) (h₁ : ∑ i ∈ s₁, w₁ i = 0) {ι₂ : Type} {s₂ : Finset ι₂} {w₂ : ι₂ → ℝ} (v₂ : ι₂ → F) (h₂ : ∑ i ∈ s₂, w₂ i = 0) : ⟪∑ i₁ ∈ s₁, w₁ i₁ • v₁ i₁, ∑ i₂ ∈ s₂, w₂ i₂ • v₂ i₂⟫_ℝ = (-∑ i₁ ∈ s₁, ∑ i₂ ∈ s₂, w₁ i₁ * w₂ i₂ * (‖v₁ i₁ - v₂ i₂‖ * ‖v₁ i₁ - v₂ i₂‖)) / 2 := by simp_rw [sum_inner, inner_sum, real_inner_smul_left, real_inner_smul_right, real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two, ← div_sub_div_same, ← div_add_div_same, mul_sub_left_distrib, left_distrib, Finset.sum_sub_distrib, Finset.sum_add_distrib, ← Finset.mul_sum, ← Finset.sum_mul, h₁, h₂, zero_mul, mul_zero, Finset.sum_const_zero, zero_add, zero_sub, Finset.mul_sum, neg_div, Finset.sum_div, mul_div_assoc, mul_assoc] end Norm_Seminormed section Norm open scoped InnerProductSpace variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace ℝ F] variable {ι : Type} local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y /-- Formula for the distance between the images of two nonzero points under an inversion with center zero. See also `EuclideanGeometry.dist_inversion_inversion` for inversions around a general point. -/ theorem dist_div_norm_sq_smul {x y : F} (hx : x ≠ 0) (hy : y ≠ 0) (R : ℝ) : dist ((R / ‖x‖) ^ 2 • x) ((R / ‖y‖) ^ 2 • y) = R ^ 2 / (‖x‖ ‖y‖) * dist x y := calc dist ((R / ‖x‖) ^ 2 • x) ((R / ‖y‖) ^ 2 • y) = √(‖(R / ‖x‖) ^ 2 • x - (R / ‖y‖) ^ 2 • y‖ ^ 2) := by rw [dist_eq_norm, sqrt_sq (norm_nonneg _)] _ = √((R ^ 2 / (‖x‖ * ‖y‖)) ^ 2 * ‖x - y‖ ^ 2) := congr_arg sqrt <\| by field_simp [sq, norm_sub_mul_self_real, norm_smul, real_inner_smul_left, inner_smul_right, Real.norm_of_nonneg (mul_self_nonneg _)] ring _ = R ^ 2 / (‖x‖ * ‖y‖) * dist x y := by rw [sqrt_mul, sqrt_sq, sqrt_sq, dist_eq_norm] <;> positivity /-- The inner product of a nonzero vector with a nonzero multiple of itself, divided by the product of their norms, has absolute value 1. -/ theorem norm_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul {x : E} {r : 𝕜} (hx : x ≠ 0) (hr : r ≠ 0) : ‖⟪x, r • x⟫‖ / (‖x‖ * ‖r • x‖) = 1 := by have hx' : ‖x‖ ≠ 0 := by simp [hx] have hr' : ‖r‖ ≠ 0 := by simp [hr] rw [inner_smul_right, norm_mul, ← inner_self_re_eq_norm, inner_self_eq_norm_mul_norm, norm_smul] rw [← mul_assoc, ← div_div, mul_div_cancel_right₀ _ hx', ← div_div, mul_comm, mul_div_cancel_right₀ _ hr', div_self hx'] /-- The inner product of a nonzero vector with a nonzero multiple of itself, divided by the product of their norms, has absolute value 1. -/ theorem abs_real_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul {x : F} {r : ℝ} (hx : x ≠ 0) (hr : r ≠ 0) : \|⟪x, r • x⟫_ℝ\| / (‖x‖ * ‖r • x‖) = 1 := norm_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul hx hr /-- The inner product of a nonzero vector with a positive multiple of itself, divided by the product of their norms, has value 1. -/ theorem real_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_pos_mul {x : F} {r : ℝ} (hx : x ≠ 0) (hr : 0 < r) : ⟪x, r • x⟫_ℝ / (‖x‖ * ‖r • x‖) = 1 := by rw [real_inner_smul_self_right, norm_smul, Real.norm_eq_abs, ← mul_assoc ‖x‖, mul_comm _ \|r\|, mul_assoc, abs_of_nonneg hr.le, div_self] exact mul_ne_zero hr.ne' (mul_self_ne_zero.2 (norm_ne_zero_iff.2 hx)) /-- The inner product of a nonzero vector with a negative multiple of itself, divided by the product of their norms, has value -1. -/ theorem real_inner_div_norm_mul_norm_eq_neg_one_of_ne_zero_of_neg_mul {x : F} {r : ℝ} (hx : x ≠ 0) (hr : r < 0) : ⟪x, r • x⟫_ℝ / (‖x‖ * ‖r • x‖) = -1 := by rw [real_inner_smul_self_right, norm_smul, Real.norm_eq_abs, ← mul_assoc ‖x‖, mul_comm _ \|r\|, mul_assoc, abs_of_neg hr, neg_mul, div_neg_eq_neg_div, div_self] exact mul_ne_zero hr.ne (mul_self_ne_zero.2 (norm_ne_zero_iff.2 hx)) theorem norm_inner_eq_norm_tfae (x y : E) : List.TFAE [‖⟪x, y⟫‖ = ‖x‖ * ‖y‖, x = 0 ∨ y = (⟪x, y⟫ / ⟪x, x⟫) • x, x = 0 ∨ ∃ r : 𝕜, y = r • x, x = 0 ∨ y ∈ 𝕜 ∙ x] := by tfae_have 1 → 2 := by refine fun h => or_iff_not_imp_left.2 fun hx₀ => ?_ have : ‖x‖ ^ 2 ≠ 0 := pow_ne_zero _ (norm_ne_zero_iff.2 hx₀) rw [← sq_eq_sq₀, mul_pow, ← mul_right_inj' this, eq_comm, ← sub_eq_zero, ← mul_sub] at h <;> try positivity simp only [@norm_sq_eq_re_inner 𝕜] at h letI : InnerProductSpace.Core 𝕜 E := InnerProductSpace.toCore erw [← InnerProductSpace.Core.cauchy_schwarz_aux (𝕜 := 𝕜) (F := E)] at h rw [InnerProductSpace.Core.normSq_eq_zero, sub_eq_zero] at h rw [div_eq_inv_mul, mul_smul, h, inv_smul_smul₀] rwa [inner_self_ne_zero] tfae_have 2 → 3 := fun h => h.imp_right fun h' => ⟨_, h'⟩ tfae_have 3 → 1 := by rintro (rfl \| ⟨r, rfl⟩) <;> simp [inner_smul_right, norm_smul, inner_self_eq_norm_sq_to_K, inner_self_eq_norm_mul_norm, sq, mul_left_comm] tfae_have 3 ↔ 4 := by simp only [Submodule.mem_span_singleton, eq_comm] tfae_finish /-- If the inner product of two vectors is equal to the product of their norms, then the two vectors are multiples of each other. One form of the equality case for Cauchy-Schwarz. Compare `inner_eq_norm_mul_iff`, which takes the stronger hypothesis `⟪x, y⟫ = ‖x‖ * ‖y‖`. -/ theorem norm_inner_eq_norm_iff {x y : E} (hx₀ : x ≠ 0) (hy₀ : y ≠ 0) : ‖⟪x, y⟫‖ = ‖x‖ * ‖y‖ ↔ ∃ r : 𝕜, r ≠ 0 ∧ y = r • x := calc ‖⟪x, y⟫‖ = ‖x‖ * ‖y‖ ↔ x = 0 ∨ ∃ r : 𝕜, y = r • x := (@norm_inner_eq_norm_tfae 𝕜 _ _ _ _ x y).out 0 2 _ ↔ ∃ r : 𝕜, y = r • x := or_iff_right hx₀ _ ↔ ∃ r : 𝕜, r ≠ 0 ∧ y = r • x := ⟨fun ⟨r, h⟩ => ⟨r, fun hr₀ => hy₀ <\| h.symm ▸ smul_eq_zero.2 <\| Or.inl hr₀, h⟩, fun ⟨r, _hr₀, h⟩ => ⟨r, h⟩⟩ /-- The inner product of two vectors, divided by the product of their norms, has absolute value 1 if and only if they are nonzero and one is a multiple of the other. One form of equality case for Cauchy-Schwarz. -/ theorem norm_inner_div_norm_mul_norm_eq_one_iff (x y : E) : ‖⟪x, y⟫ / (‖x‖ * ‖y‖)‖ = 1 ↔ x ≠ 0 ∧ ∃ r : 𝕜, r ≠ 0 ∧ y = r • x := by constructor · intro h have hx₀ : x ≠ 0 := fun h₀ => by simp [h₀] at h have hy₀ : y ≠ 0 := fun h₀ => by simp [h₀] at h refine ⟨hx₀, (norm_inner_eq_norm_iff hx₀ hy₀).1 <\| eq_of_div_eq_one ?_⟩ simpa using h · rintro ⟨hx, ⟨r, ⟨hr, rfl⟩⟩⟩ simp only [norm_div, norm_mul, norm_ofReal, abs_norm] exact norm_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul hx hr /-- The inner product of two vectors, divided by the product of their norms, has absolute value 1 if and only if they are nonzero and one is a multiple of the other. One form of equality case for Cauchy-Schwarz. -/ theorem abs_real_inner_div_norm_mul_norm_eq_one_iff (x y : F) : \|⟪x, y⟫_ℝ / (‖x‖ * ‖y‖)\| = 1 ↔ x ≠ 0 ∧ ∃ r : ℝ, r ≠ 0 ∧ y = r • x := @norm_inner_div_norm_mul_norm_eq_one_iff ℝ F _ _ _ x y theorem inner_eq_norm_mul_iff_div {x y : E} (h₀ : x ≠ 0) : ⟪x, y⟫ = (‖x‖ : 𝕜) * ‖y‖ ↔ (‖y‖ / ‖x‖ : 𝕜) • x = y := by have h₀' := h₀ rw [← norm_ne_zero_iff, Ne, ← @ofReal_eq_zero 𝕜] at h₀' constructor <;> intro h · have : x = 0 ∨ y = (⟪x, y⟫ / ⟪x, x⟫ : 𝕜) • x := ((@norm_inner_eq_norm_tfae 𝕜 _ _ _ _ x y).out 0 1).1 (by simp [h]) rw [this.resolve_left h₀, h] simp [norm_smul, inner_self_ofReal_norm, mul_div_cancel_right₀ _ h₀'] · conv_lhs => rw [← h, inner_smul_right, inner_self_eq_norm_sq_to_K] field_simp [sq, mul_left_comm] /-- If the inner product of two vectors is equal to the product of their norms (i.e., `⟪x, y⟫ = ‖x‖ * ‖y‖`), then the two vectors are nonnegative real multiples of each other. One form of the equality case for Cauchy-Schwarz. Compare `norm_inner_eq_norm_iff`, which takes the weaker hypothesis `abs ⟪x, y⟫ = ‖x‖ * ‖y‖`. -/ theorem inner_eq_norm_mul_iff {x y : E} : ⟪x, y⟫ = (‖x‖ : 𝕜) * ‖y‖ ↔ (‖y‖ : 𝕜) • x = (‖x‖ : 𝕜) • y := by rcases eq_or_ne x 0 with (rfl \| h₀) · simp · rw [inner_eq_norm_mul_iff_div h₀, div_eq_inv_mul, mul_smul, inv_smul_eq_iff₀] rwa [Ne, ofReal_eq_zero, norm_eq_zero] /-- If the inner product of two vectors is equal to the product of their norms (i.e., `⟪x, y⟫ = ‖x‖ * ‖y‖`), then the two vectors are nonnegative real multiples of each other. One form of the equality case for Cauchy-Schwarz. Compare `norm_inner_eq_norm_iff`, which takes the weaker hypothesis `abs ⟪x, y⟫ = ‖x‖ * ‖y‖`. -/ theorem inner_eq_norm_mul_iff_real {x y : F} : ⟪x, y⟫_ℝ = ‖x‖ * ‖y‖ ↔ ‖y‖ • x = ‖x‖ • y := inner_eq_norm_mul_iff /-- The inner product of two vectors, divided by the product of their norms, has value 1 if and only if they are nonzero and one is a positive multiple of the other. -/ theorem real_inner_div_norm_mul_norm_eq_one_iff (x y : F) : ⟪x, y⟫_ℝ / (‖x‖ * ‖y‖) = 1 ↔ x ≠ 0 ∧ ∃ r : ℝ, 0 < r ∧ y = r • x := by constructor · intro h have hx₀ : x ≠ 0 := fun h₀ => by simp [h₀] at h have hy₀ : y ≠ 0 := fun h₀ => by simp [h₀] at h refine ⟨hx₀, ‖y‖ / ‖x‖, div_pos (norm_pos_iff.2 hy₀) (norm_pos_iff.2 hx₀), ?_⟩ exact ((inner_eq_norm_mul_iff_div hx₀).1 (eq_of_div_eq_one h)).symm · rintro ⟨hx, ⟨r, ⟨hr, rfl⟩⟩⟩ exact real_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_pos_mul hx hr /-- The inner product of two vectors, divided by the product of their norms, has value -1 if and only if they are nonzero and one is a negative multiple of the other. -/ theorem real_inner_div_norm_mul_norm_eq_neg_one_iff (x y : F) : ⟪x, y⟫_ℝ / (‖x‖ * ‖y‖) = -1 ↔ x ≠ 0 ∧ ∃ r : ℝ, r < 0 ∧ y = r • x := by rw [← neg_eq_iff_eq_neg, ← neg_div, ← inner_neg_right, ← norm_neg y, real_inner_div_norm_mul_norm_eq_one_iff, (@neg_surjective ℝ _).exists] refine Iff.rfl.and (exists_congr fun r => ?_) rw [neg_pos, neg_smul, neg_inj] /-- If the inner product of two unit vectors is `1`, then the two vectors are equal. One form of the equality case for Cauchy-Schwarz. -/ theorem inner_eq_one_iff_of_norm_one {x y : E} (hx : ‖x‖ = 1) (hy : ‖y‖ = 1) : ⟪x, y⟫ = 1 ↔ x = y := by convert inner_eq_norm_mul_iff (𝕜 := 𝕜) (E := E) using 2 <;> simp [hx, hy] theorem inner_lt_norm_mul_iff_real {x y : F} : ⟪x, y⟫_ℝ < ‖x‖ * ‖y‖ ↔ ‖y‖ • x ≠ ‖x‖ • y := calc ⟪x, y⟫_ℝ < ‖x‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ ≠ ‖x‖ * ‖y‖ := ⟨ne_of_lt, lt_of_le_of_ne (real_inner_le_norm _ _)⟩ _ ↔ ‖y‖ • x ≠ ‖x‖ • y := not_congr inner_eq_norm_mul_iff_real /-- If the inner product of two unit vectors is strictly less than `1`, then the two vectors are distinct. One form of the equality case for Cauchy-Schwarz. -/ theorem inner_lt_one_iff_real_of_norm_one {x y : F} (hx : ‖x‖ = 1) (hy : ‖y‖ = 1) : ⟪x, y⟫_ℝ < 1 ↔ x ≠ y := by convert inner_lt_norm_mul_iff_real (F := F) <;> simp [hx, hy] /-- The sphere of radius `r = ‖y‖` is tangent to the plane `⟪x, y⟫ = ‖y‖ ^ 2` at `x = y`. -/ theorem eq_of_norm_le_re_inner_eq_norm_sq {x y : E} (hle : ‖x‖ ≤ ‖y‖) (h : re ⟪x, y⟫ = ‖y‖ ^ 2) : x = y := by suffices H : re ⟪x - y, x - y⟫ ≤ 0 by rwa [re_inner_self_nonpos, sub_eq_zero] at H have H₁ : ‖x‖ ^ 2 ≤ ‖y‖ ^ 2 := by gcongr have H₂ : re ⟪y, x⟫ = ‖y‖ ^ 2 := by rwa [← inner_conj_symm, conj_re] simpa [inner_sub_left, inner_sub_right, ← norm_sq_eq_re_inner, h, H₂] using H₁ end Norm section RCLike local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y /-- A field `𝕜` satisfying `RCLike` is itself a `𝕜`-inner product space. -/ instance RCLike.innerProductSpace : InnerProductSpace 𝕜 𝕜 where inner x y := y * conj x norm_sq_eq_re_inner x := by simp only [inner, mul_conj, ← ofReal_pow, ofReal_re] conj_inner_symm x y := by simp only [mul_comm, map_mul, starRingEnd_self_apply] add_left x y z := by simp only [mul_add, map_add] smul_left x y z := by simp only [mul_comm (conj z), mul_assoc, smul_eq_mul, map_mul] @[simp] theorem RCLike.inner_apply (x y : 𝕜) : ⟪x, y⟫ = y * conj x := rfl /-- A version of `RCLike.inner_apply` that swaps the order of multiplication. -/ theorem RCLike.inner_apply' (x y : 𝕜) : ⟪x, y⟫ = conj x * y := mul_comm _ _ end RCLike section RCLikeToReal open scoped InnerProductSpace variable {G : Type} variable (𝕜 E) variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y /-- A general inner product implies a real inner product. This is not registered as an instance since `𝕜` does not appear in the return type `Inner ℝ E`. -/ def Inner.rclikeToReal : Inner ℝ E where inner x y := re ⟪x, y⟫ /-- A general inner product space structure implies a real inner product structure. This is not registered as an instance since `𝕜` does not appear in the return type `InnerProductSpace ℝ E`, * It is likely to create instance diamonds, as it builds upon the diamond-prone `NormedSpace.restrictScalars`. However, it can be used in a proof to obtain a real inner product space structure from a given `𝕜`-inner product space structure. -/ -- See note [reducible non instances] abbrev InnerProductSpace.rclikeToReal : InnerProductSpace ℝ E := { Inner.rclikeToReal 𝕜 E, NormedSpace.restrictScalars ℝ 𝕜 E with norm_sq_eq_re_inner := norm_sq_eq_re_inner conj_inner_symm := fun _ _ => inner_re_symm _ _ add_left := fun x y z => by change re ⟪x + y, z⟫ = re ⟪x, z⟫ + re ⟪y, z⟫ simp only [inner_add_left, map_add] smul_left := fun x y r => by change re ⟪(r : 𝕜) • x, y⟫ = r * re ⟪x, y⟫ simp only [inner_smul_left, conj_ofReal, re_ofReal_mul] } variable {E} theorem real_inner_eq_re_inner (x y : E) : @Inner.inner ℝ E (Inner.rclikeToReal 𝕜 E) x y = re ⟪x, y⟫ := rfl theorem real_inner_I_smul_self (x : E) : @Inner.inner ℝ E (Inner.rclikeToReal 𝕜 E) x ((I : 𝕜) • x) = 0 := by simp [real_inner_eq_re_inner 𝕜, inner_smul_right] /-- A complex inner product implies a real inner product. This cannot be an instance since it creates a diamond with `PiLp.innerProductSpace` because `re (sum i, inner (x i) (y i))` and `sum i, re (inner (x i) (y i))` are not defeq. -/ def InnerProductSpace.complexToReal [SeminormedAddCommGroup G] [InnerProductSpace ℂ G] : InnerProductSpace ℝ G := InnerProductSpace.rclikeToReal ℂ G instance : InnerProductSpace ℝ ℂ := InnerProductSpace.complexToReal @[simp] protected theorem Complex.inner (w z : ℂ) : ⟪w, z⟫_ℝ = (z * conj w).re := rfl end RCLikeToReal /-- An `RCLike` field is a real inner product space. -/ noncomputable instance RCLike.toInnerProductSpaceReal : InnerProductSpace ℝ 𝕜 where __ := Inner.rclikeToReal 𝕜 𝕜 norm_sq_eq_re_inner := norm_sq_eq_re_inner conj_inner_symm x y := inner_re_symm .. add_left x y z := show re (_ * _) = re (_ * _) + re (_ * _) by simp only [map_add, mul_re, conj_re, conj_im]; ring smul_left x y r := show re (_ * _) = _ * re (_ * _) by simp only [mul_re, conj_re, conj_im, conj_trivial, smul_re, smul_im]; ring -- The instance above does not create diamonds for concrete `𝕜`: example : (innerProductSpace : InnerProductSpace ℝ ℝ) = RCLike.toInnerProductSpaceReal := rfl example : (instInnerProductSpaceRealComplex : InnerProductSpace ℝ ℂ) = RCLike.toInnerProductSpaceReal := rfl		Mathlib/Analysis/InnerProductSpace/Basic.lean	1,703	1,705
/- 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.Inverse import Mathlib.Analysis.SpecialFunctions.Trigonometric.Deriv /-! # derivatives of the inverse trigonometric functions Derivatives of `arcsin` and `arccos`. -/ noncomputable section open scoped Topology Filter Real ContDiff open Set namespace Real section Arcsin theorem deriv_arcsin_aux {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) : HasStrictDerivAt arcsin (1 / √(1 - x ^ 2)) x ∧ ContDiffAt ℝ ω arcsin x := by rcases h₁.lt_or_lt with h₁ \| h₁ · have : 1 - x ^ 2 < 0 := by nlinarith [h₁] rw [sqrt_eq_zero'.2 this.le, div_zero] have : arcsin =ᶠ[𝓝 x] fun _ => -(π / 2) :=	(gt_mem_nhds h₁).mono fun y hy => arcsin_of_le_neg_one hy.le exact ⟨(hasStrictDerivAt_const x _).congr_of_eventuallyEq this.symm, contDiffAt_const.congr_of_eventuallyEq this⟩ rcases h₂.lt_or_lt with h₂ \| h₂ · have : 0 < √(1 - x ^ 2) := sqrt_pos.2 (by nlinarith [h₁, h₂]) simp only [← cos_arcsin, one_div] at this ⊢ exact ⟨sinPartialHomeomorph.hasStrictDerivAt_symm ⟨h₁, h₂⟩ this.ne' (hasStrictDerivAt_sin _), sinPartialHomeomorph.contDiffAt_symm_deriv this.ne' ⟨h₁, h₂⟩ (hasDerivAt_sin _) contDiff_sin.contDiffAt⟩ · have : 1 - x ^ 2 < 0 := by nlinarith [h₂] rw [sqrt_eq_zero'.2 this.le, div_zero] have : arcsin =ᶠ[𝓝 x] fun _ => π / 2 := (lt_mem_nhds h₂).mono fun y hy => arcsin_of_one_le hy.le exact ⟨(hasStrictDerivAt_const x _).congr_of_eventuallyEq this.symm, contDiffAt_const.congr_of_eventuallyEq this⟩ theorem hasStrictDerivAt_arcsin {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) : HasStrictDerivAt arcsin (1 / √(1 - x ^ 2)) x := (deriv_arcsin_aux h₁ h₂).1 theorem hasDerivAt_arcsin {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) :	Mathlib/Analysis/SpecialFunctions/Trigonometric/InverseDeriv.lean	30	49
/- Copyright (c) 2020 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen, Peter Nelson -/ import Mathlib.Algebra.BigOperators.Fin import Mathlib.Algebra.GeomSum import Mathlib.LinearAlgebra.Matrix.Block import Mathlib.LinearAlgebra.Matrix.Determinant.Basic import Mathlib.LinearAlgebra.Matrix.Nondegenerate import Mathlib.RingTheory.Localization.FractionRing /-! # Vandermonde matrix This file defines the `vandermonde` matrix and gives its determinant. For each `CommRing R`, and function `v : Fin n → R` the matrix `vandermonde v` is defined to be `Fin n` by `Fin n` matrix `V` whose `i`th row is `[1, (v i), (v i)^2, ...]`. This matrix has determinant equal to the product of `v i - v j` over all unordered pairs `i,j`, and therefore is nonsingular if and only if `v` is injective. `vandermonde v` is a special case of two more general matrices we also define. For a type `α` and functions `v w : α → R`, we write `rectVandermonde v w n` for the `α × Fin n` matrix with `i`th row `[(w i) ^ (n-1), (v i) * (w i)^(n-2), ..., (v i)^(n-1)]`. `projVandermonde v w = rectVandermonde v w n` is the square matrix case, where `α = Fin n`. The determinant of `projVandermonde v w` is the product of `v j * w i - v i * w j`, taken over all pairs `i,j` with `i < j`, which gives a similar characterization of when it it nonsingular. Since `vandermonde v w = projVandermonde v 1`, we can derive most of the API for the former in terms of the latter. These extensions of Vandermonde matrices arise in the study of complete arcs in finite geometry, coding theory, and representations of uniform matroids over finite fields. ## Main definitions * `vandermonde v`: a square matrix with the `i, j`th entry equal to `v i ^ j`. * `rectVandermonde v w n`: an `α × Fin n` matrix whose `i, j`-th entry is `(v i) ^ j * (w i) ^ (n-1-j)`. * `projVandermonde v w`: a square matrix whose `i, j`-th entry is `(v i) ^ j * (w i) ^ (n-1-j)`. ## Main results * `det_vandermonde`: `det (vandermonde v)` is the product of `v j - v i`, where `(i, j)` ranges over the set of pairs with `i < j`. * `det_projVandermonde`: `det (projVandermonde v w)` is the product of `v j * w i - v i * w j`, taken over all pairs with `i < j`. ## Implementation notes We derive the `det_vandermonde` formula from `det_projVandermonde`, which is proved using an induction argument involving row operations and division. To circumvent issues with non-invertible elements while still maintaining the generality of rings, we first prove it for fields using the private lemma `det_projVandermonde_of_field`, and then use an algebraic workaround to generalize to the ring case, stating the strictly more general form as `det_projVandermonde`. ## TODO Characterize when `rectVandermonde v w n` has linearly independent rows. -/ variable {R K : Type} [CommRing R] [Field K] {n : ℕ} open Equiv Finset open Matrix Fin namespace Matrix /-- A matrix with rows all having the form `[b^(n-1), a b^(n-2), ..., a ^ (n-1)]` -/ def rectVandermonde {α : Type} (v w : α → R) (n : ℕ) : Matrix α (Fin n) R := .of fun i j ↦ (v i) ^ j.1 (w i) ^ j.rev.1 /-- A square matrix with rows all having the form `[b^(n-1), a * b^(n-2), ..., a ^ (n-1)]` -/ def projVandermonde (v w : Fin n → R) : Matrix (Fin n) (Fin n) R := rectVandermonde v w n /-- `vandermonde v` is the square matrix with `i`th row equal to `1, v i, v i ^ 2, v i ^ 3, ...`. -/ def vandermonde (v : Fin n → R) : Matrix (Fin n) (Fin n) R := .of fun i j ↦ (v i) ^ j.1 lemma vandermonde_eq_projVandermonde (v : Fin n → R) : vandermonde v = projVandermonde v 1 := by simp [projVandermonde, rectVandermonde, vandermonde] /-- We don't mark this as `@[simp]` because the RHS is not simp-nf, and simplifying the RHS gives a bothersome `Nat` subtraction. -/ theorem projVandermonde_apply {v w : Fin n → R} {i j : Fin n} : projVandermonde v w i j = (v i) ^ j.1 * (w i) ^ j.rev.1 := rfl theorem rectVandermonde_apply {α : Type} {v w : α → R} {i : α} {j : Fin n} : rectVandermonde v w n i j = (v i) ^ j.1 (w i) ^ j.rev.1 := rfl @[simp] theorem vandermonde_apply (v : Fin n → R) (i j) : vandermonde v i j = v i ^ (j : ℕ) := rfl @[simp] theorem vandermonde_cons (v0 : R) (v : Fin n → R) : vandermonde (Fin.cons v0 v : Fin n.succ → R) = Fin.cons (fun (j : Fin n.succ) => v0 ^ (j : ℕ)) fun i => Fin.cons 1 fun j => v i * vandermonde v i j := by ext i j refine Fin.cases (by simp) (fun i => ?_) i refine Fin.cases (by simp) (fun j => ?_) j simp [pow_succ'] theorem vandermonde_succ (v : Fin n.succ → R) : vandermonde v = .of Fin.cons (fun (j : Fin n.succ) => v 0 ^ (j : ℕ)) fun i => Fin.cons 1 fun j => v i.succ * vandermonde (Fin.tail v) i j := by conv_lhs => rw [← Fin.cons_self_tail v, vandermonde_cons] rfl theorem vandermonde_mul_vandermonde_transpose (v w : Fin n → R) (i j) : (vandermonde v * (vandermonde w)ᵀ) i j = ∑ k : Fin n, (v i * w j) ^ (k : ℕ) := by simp only [vandermonde_apply, Matrix.mul_apply, Matrix.transpose_apply, mul_pow] theorem vandermonde_transpose_mul_vandermonde (v : Fin n → R) (i j) : ((vandermonde v)ᵀ * vandermonde v) i j = ∑ k : Fin n, v k ^ (i + j : ℕ) := by simp only [vandermonde_apply, Matrix.mul_apply, Matrix.transpose_apply, pow_add] theorem rectVandermonde_apply_zero_right {α : Type} {v w : α → R} {i : α} (hw : w i = 0) : rectVandermonde v w (n + 1) i = Pi.single (Fin.last n) ((v i) ^ n) := by ext j obtain rfl \| hlt := j.le_last.eq_or_lt · simp [rectVandermonde_apply] rw [rectVandermonde_apply, Pi.single_eq_of_ne hlt.ne, hw, zero_pow, mul_zero] simpa [Nat.sub_eq_zero_iff_le] using hlt theorem projVandermonde_apply_of_ne_zero {v w : Fin (n + 1) → K} {i j : Fin (n + 1)} (hw : w i ≠ 0) : projVandermonde v w i j = (v i) ^ j.1 (w i) ^ n / (w i) ^ j.1 := by rw [projVandermonde_apply, eq_div_iff (by simp [hw]), mul_assoc, ← pow_add, rev_add_cast] theorem projVandermonde_apply_zero_right {v w : Fin (n + 1) → R} {i : Fin (n + 1)} (hw : w i = 0) : projVandermonde v w i = Pi.single (Fin.last n) ((v i) ^ n) := by ext j obtain rfl \| hlt := j.le_last.eq_or_lt · simp [projVandermonde_apply] rw [projVandermonde_apply, Pi.single_eq_of_ne hlt.ne, hw, zero_pow, mul_zero] simpa [Nat.sub_eq_zero_iff_le] using hlt theorem projVandermonde_comp {v w : Fin n → R} (f : Fin n → Fin n) : projVandermonde (v ∘ f) (w ∘ f) = (projVandermonde v w).submatrix f id := rfl theorem projVandermonde_map {R' : Type} [CommRing R'] (φ : R →+ R') (v w : Fin n → R) : projVandermonde (fun i ↦ φ (v i)) (fun i ↦ φ (w i)) = φ.mapMatrix (projVandermonde v w) := by ext i j simp [projVandermonde_apply] private theorem det_projVandermonde_of_field (v w : Fin n → K) : (projVandermonde v w).det = ∏ i : Fin n, ∏ j ∈ Finset.Ioi i, (v j * w i - v i * w j) := by induction n with \| zero => simp \| succ n ih => /- We can assume not all `w i` are zero, and therefore that `w 0 ≠ 0`, since otherwise we can swap row `0` with another nonzero row. -/ wlog h0 : w 0 ≠ 0 generalizing v w with aux · obtain h0' \| ⟨i₀, hi₀ : w i₀ ≠ 0⟩ := forall_or_exists_not (w · = 0) · obtain rfl \| hne := eq_or_ne n 0 · simp [projVandermonde_apply]	rw [det_eq_zero_of_column_eq_zero 0 (fun i ↦ by simpa [projVandermonde_apply, h0']), Finset.prod_sigma', Finset.prod_eq_zero (i := ⟨0, Fin.last n⟩) (by simpa) (by simp [h0'])] rw [← mul_right_inj' (a := ((Equiv.swap 0 i₀).sign : K))	Mathlib/LinearAlgebra/Vandermonde.lean	160	162
/- Copyright (c) 2019 Gabriel Ebner. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Gabriel Ebner, Anatole Dedecker, Yury Kudryashov -/ import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.Analysis.Calculus.FDeriv.Mul import Mathlib.Analysis.Calculus.FDeriv.Add /-! # Derivative of `f x * g x` In this file we prove formulas for `(f x * g x)'` and `(f x • g x)'`. For a more detailed overview of one-dimensional derivatives in mathlib, see the module docstring of `Analysis/Calculus/Deriv/Basic`. ## Keywords derivative, multiplication -/ universe u v w noncomputable section open scoped Topology Filter ENNReal open Filter Asymptotics Set open ContinuousLinearMap (smulRight smulRight_one_eq_iff) variable {𝕜 : Type u} [NontriviallyNormedField 𝕜] variable {F : Type v} [NormedAddCommGroup F] [NormedSpace 𝕜 F] variable {E : Type w} [NormedAddCommGroup E] [NormedSpace 𝕜 E] variable {G : Type} [NormedAddCommGroup G] [NormedSpace 𝕜 G] variable {f : 𝕜 → F} variable {f' : F} variable {x : 𝕜} variable {s : Set 𝕜} variable {L : Filter 𝕜} /-! ### Derivative of bilinear maps -/ namespace ContinuousLinearMap variable {B : E →L[𝕜] F →L[𝕜] G} {u : 𝕜 → E} {v : 𝕜 → F} {u' : E} {v' : F} theorem hasDerivWithinAt_of_bilinear (hu : HasDerivWithinAt u u' s x) (hv : HasDerivWithinAt v v' s x) : HasDerivWithinAt (fun x ↦ B (u x) (v x)) (B (u x) v' + B u' (v x)) s x := by simpa using (B.hasFDerivWithinAt_of_bilinear hu.hasFDerivWithinAt hv.hasFDerivWithinAt).hasDerivWithinAt theorem hasDerivAt_of_bilinear (hu : HasDerivAt u u' x) (hv : HasDerivAt v v' x) : HasDerivAt (fun x ↦ B (u x) (v x)) (B (u x) v' + B u' (v x)) x := by simpa using (B.hasFDerivAt_of_bilinear hu.hasFDerivAt hv.hasFDerivAt).hasDerivAt theorem hasStrictDerivAt_of_bilinear (hu : HasStrictDerivAt u u' x) (hv : HasStrictDerivAt v v' x) : HasStrictDerivAt (fun x ↦ B (u x) (v x)) (B (u x) v' + B u' (v x)) x := by simpa using (B.hasStrictFDerivAt_of_bilinear hu.hasStrictFDerivAt hv.hasStrictFDerivAt).hasStrictDerivAt theorem derivWithin_of_bilinear (hu : DifferentiableWithinAt 𝕜 u s x) (hv : DifferentiableWithinAt 𝕜 v s x) : derivWithin (fun y => B (u y) (v y)) s x = B (u x) (derivWithin v s x) + B (derivWithin u s x) (v x) := by by_cases hsx : UniqueDiffWithinAt 𝕜 s x · exact (B.hasDerivWithinAt_of_bilinear hu.hasDerivWithinAt hv.hasDerivWithinAt).derivWithin hsx · simp [derivWithin_zero_of_not_uniqueDiffWithinAt hsx] theorem deriv_of_bilinear (hu : DifferentiableAt 𝕜 u x) (hv : DifferentiableAt 𝕜 v x) : deriv (fun y => B (u y) (v y)) x = B (u x) (deriv v x) + B (deriv u x) (v x) := (B.hasDerivAt_of_bilinear hu.hasDerivAt hv.hasDerivAt).deriv end ContinuousLinearMap section SMul /-! ### Derivative of the multiplication of a scalar function and a vector function -/ variable {𝕜' : Type} [NontriviallyNormedField 𝕜'] [NormedAlgebra 𝕜 𝕜'] [NormedSpace 𝕜' F] [IsScalarTower 𝕜 𝕜' F] {c : 𝕜 → 𝕜'} {c' : 𝕜'} theorem HasDerivWithinAt.smul (hc : HasDerivWithinAt c c' s x) (hf : HasDerivWithinAt f f' s x) : HasDerivWithinAt (fun y => c y • f y) (c x • f' + c' • f x) s x := by simpa using (HasFDerivWithinAt.smul hc hf).hasDerivWithinAt theorem HasDerivAt.smul (hc : HasDerivAt c c' x) (hf : HasDerivAt f f' x) : HasDerivAt (fun y => c y • f y) (c x • f' + c' • f x) x := by rw [← hasDerivWithinAt_univ] at * exact hc.smul hf nonrec theorem HasStrictDerivAt.smul (hc : HasStrictDerivAt c c' x) (hf : HasStrictDerivAt f f' x) : HasStrictDerivAt (fun y => c y • f y) (c x • f' + c' • f x) x := by simpa using (hc.smul hf).hasStrictDerivAt theorem derivWithin_smul (hc : DifferentiableWithinAt 𝕜 c s x) (hf : DifferentiableWithinAt 𝕜 f s x) : derivWithin (fun y => c y • f y) s x = c x • derivWithin f s x + derivWithin c s x • f x := by by_cases hsx : UniqueDiffWithinAt 𝕜 s x · exact (hc.hasDerivWithinAt.smul hf.hasDerivWithinAt).derivWithin hsx · simp [derivWithin_zero_of_not_uniqueDiffWithinAt hsx] theorem deriv_smul (hc : DifferentiableAt 𝕜 c x) (hf : DifferentiableAt 𝕜 f x) : deriv (fun y => c y • f y) x = c x • deriv f x + deriv c x • f x := (hc.hasDerivAt.smul hf.hasDerivAt).deriv theorem HasStrictDerivAt.smul_const (hc : HasStrictDerivAt c c' x) (f : F) : HasStrictDerivAt (fun y => c y • f) (c' • f) x := by have := hc.smul (hasStrictDerivAt_const x f) rwa [smul_zero, zero_add] at this theorem HasDerivWithinAt.smul_const (hc : HasDerivWithinAt c c' s x) (f : F) : HasDerivWithinAt (fun y => c y • f) (c' • f) s x := by have := hc.smul (hasDerivWithinAt_const x s f) rwa [smul_zero, zero_add] at this theorem HasDerivAt.smul_const (hc : HasDerivAt c c' x) (f : F) : HasDerivAt (fun y => c y • f) (c' • f) x := by rw [← hasDerivWithinAt_univ] at * exact hc.smul_const f theorem derivWithin_smul_const (hc : DifferentiableWithinAt 𝕜 c s x) (f : F) : derivWithin (fun y => c y • f) s x = derivWithin c s x • f := by by_cases hsx : UniqueDiffWithinAt 𝕜 s x · exact (hc.hasDerivWithinAt.smul_const f).derivWithin hsx · simp [derivWithin_zero_of_not_uniqueDiffWithinAt hsx] theorem deriv_smul_const (hc : DifferentiableAt 𝕜 c x) (f : F) : deriv (fun y => c y • f) x = deriv c x • f := (hc.hasDerivAt.smul_const f).deriv end SMul section ConstSMul variable {R : Type} [Semiring R] [Module R F] [SMulCommClass 𝕜 R F] [ContinuousConstSMul R F] nonrec theorem HasStrictDerivAt.const_smul (c : R) (hf : HasStrictDerivAt f f' x) : HasStrictDerivAt (fun y => c • f y) (c • f') x := by simpa using (hf.const_smul c).hasStrictDerivAt nonrec theorem HasDerivAtFilter.const_smul (c : R) (hf : HasDerivAtFilter f f' x L) : HasDerivAtFilter (fun y => c • f y) (c • f') x L := by simpa using (hf.const_smul c).hasDerivAtFilter nonrec theorem HasDerivWithinAt.const_smul (c : R) (hf : HasDerivWithinAt f f' s x) : HasDerivWithinAt (fun y => c • f y) (c • f') s x := hf.const_smul c nonrec theorem HasDerivAt.const_smul (c : R) (hf : HasDerivAt f f' x) : HasDerivAt (fun y => c • f y) (c • f') x := hf.const_smul c theorem derivWithin_const_smul (c : R) (hf : DifferentiableWithinAt 𝕜 f s x) : derivWithin (fun y => c • f y) s x = c • derivWithin f s x := by by_cases hsx : UniqueDiffWithinAt 𝕜 s x · exact (hf.hasDerivWithinAt.const_smul c).derivWithin hsx · simp [derivWithin_zero_of_not_uniqueDiffWithinAt hsx] theorem deriv_const_smul (c : R) (hf : DifferentiableAt 𝕜 f x) : deriv (fun y => c • f y) x = c • deriv f x := (hf.hasDerivAt.const_smul c).deriv /-- A variant of `deriv_const_smul` without differentiability assumption when the scalar multiplication is by field elements. -/ lemma deriv_const_smul' {f : 𝕜 → F} {x : 𝕜} {R : Type} [Field R] [Module R F] [SMulCommClass 𝕜 R F] [ContinuousConstSMul R F] (c : R) : deriv (fun y ↦ c • f y) x = c • deriv f x := by by_cases hf : DifferentiableAt 𝕜 f x · exact deriv_const_smul c hf · rcases eq_or_ne c 0 with rfl \| hc · simp only [zero_smul, deriv_const'] · have H : ¬DifferentiableAt 𝕜 (fun y ↦ c • f y) x := by contrapose! hf conv => enter [2, y]; rw [← inv_smul_smul₀ hc (f y)] exact DifferentiableAt.const_smul hf c⁻¹ rw [deriv_zero_of_not_differentiableAt hf, deriv_zero_of_not_differentiableAt H, smul_zero] end ConstSMul section Mul /-! ### Derivative of the multiplication of two functions -/ variable {𝕜' 𝔸 : Type} [NormedField 𝕜'] [NormedRing 𝔸] [NormedAlgebra 𝕜 𝕜'] [NormedAlgebra 𝕜 𝔸] {c d : 𝕜 → 𝔸} {c' d' : 𝔸} {u v : 𝕜 → 𝕜'} theorem HasDerivWithinAt.mul (hc : HasDerivWithinAt c c' s x) (hd : HasDerivWithinAt d d' s x) : HasDerivWithinAt (fun y => c y d y) (c' * d x + c x * d') s x := by have := (HasFDerivWithinAt.mul' hc hd).hasDerivWithinAt rwa [ContinuousLinearMap.add_apply, ContinuousLinearMap.smul_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.one_apply, one_smul, one_smul, add_comm] at this theorem HasDerivAt.mul (hc : HasDerivAt c c' x) (hd : HasDerivAt d d' x) : HasDerivAt (fun y => c y * d y) (c' * d x + c x * d') x := by rw [← hasDerivWithinAt_univ] at * exact hc.mul hd theorem HasStrictDerivAt.mul (hc : HasStrictDerivAt c c' x) (hd : HasStrictDerivAt d d' x) : HasStrictDerivAt (fun y => c y * d y) (c' * d x + c x * d') x := by have := (HasStrictFDerivAt.mul' hc hd).hasStrictDerivAt rwa [ContinuousLinearMap.add_apply, ContinuousLinearMap.smul_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.one_apply, one_smul, one_smul, add_comm] at this theorem derivWithin_mul (hc : DifferentiableWithinAt 𝕜 c s x) (hd : DifferentiableWithinAt 𝕜 d s x) :	derivWithin (fun y => c y * d y) s x = derivWithin c s x * d x + c x * derivWithin d s x := by by_cases hsx : UniqueDiffWithinAt 𝕜 s x · exact (hc.hasDerivWithinAt.mul hd.hasDerivWithinAt).derivWithin hsx · simp [derivWithin_zero_of_not_uniqueDiffWithinAt hsx]	Mathlib/Analysis/Calculus/Deriv/Mul.lean	215	218
/- Copyright (c) 2021 Stuart Presnell. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Stuart Presnell -/ import Mathlib.Data.Nat.PrimeFin import Mathlib.Data.Nat.Factorization.Defs import Mathlib.Data.Nat.GCD.BigOperators import Mathlib.Order.Interval.Finset.Nat import Mathlib.Tactic.IntervalCases /-! # Basic lemmas on prime factorizations -/ open Finset List Finsupp namespace Nat variable {a b m n p : ℕ} /-! ### Basic facts about factorization -/ /-! ## Lemmas characterising when `n.factorization p = 0` -/ theorem factorization_eq_zero_of_lt {n p : ℕ} (h : n < p) : n.factorization p = 0 := Finsupp.not_mem_support_iff.mp (mt le_of_mem_primeFactors (not_le_of_lt h)) @[simp] theorem factorization_one_right (n : ℕ) : n.factorization 1 = 0 := factorization_eq_zero_of_non_prime _ not_prime_one theorem dvd_of_factorization_pos {n p : ℕ} (hn : n.factorization p ≠ 0) : p ∣ n := dvd_of_mem_primeFactorsList <\| mem_primeFactors_iff_mem_primeFactorsList.1 <\| mem_support_iff.2 hn theorem factorization_eq_zero_iff_remainder {p r : ℕ} (i : ℕ) (pp : p.Prime) (hr0 : r ≠ 0) : ¬p ∣ r ↔ (p * i + r).factorization p = 0 := by refine ⟨factorization_eq_zero_of_remainder i, fun h => ?_⟩ rw [factorization_eq_zero_iff] at h contrapose! h refine ⟨pp, ?_, ?_⟩ · rwa [← Nat.dvd_add_iff_right (dvd_mul_right p i)] · contrapose! hr0 exact (add_eq_zero.1 hr0).2 /-- The only numbers with empty prime factorization are `0` and `1` -/ theorem factorization_eq_zero_iff' (n : ℕ) : n.factorization = 0 ↔ n = 0 ∨ n = 1 := by rw [factorization_eq_primeFactorsList_multiset n] simp [factorization, AddEquiv.map_eq_zero_iff, Multiset.coe_eq_zero] /-! ## Lemmas about factorizations of products and powers -/ /-- A product over `n.factorization` can be written as a product over `n.primeFactors`; -/ lemma prod_factorization_eq_prod_primeFactors {β : Type} [CommMonoid β] (f : ℕ → ℕ → β) : n.factorization.prod f = ∏ p ∈ n.primeFactors, f p (n.factorization p) := rfl /-- A product over `n.primeFactors` can be written as a product over `n.factorization`; -/ lemma prod_primeFactors_prod_factorization {β : Type} [CommMonoid β] (f : ℕ → β) :	∏ p ∈ n.primeFactors, f p = n.factorization.prod (fun p _ ↦ f p) := rfl	Mathlib/Data/Nat/Factorization/Basic.lean	60	61
/- 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.Algebra.BigOperators.Group.Finset.Sigma import Mathlib.Algebra.Order.Interval.Finset.Basic import Mathlib.Order.Interval.Finset.Nat import Mathlib.Tactic.Linarith /-! # Results about big operators over intervals We prove results about big operators over intervals. -/ open Nat variable {α M : Type} namespace Finset section PartialOrder variable [PartialOrder α] [CommMonoid M] {f : α → M} {a b : α} section LocallyFiniteOrder variable [LocallyFiniteOrder α] @[to_additive] lemma mul_prod_Ico_eq_prod_Icc (h : a ≤ b) : f b ∏ x ∈ Ico a b, f x = ∏ x ∈ Icc a b, f x := by rw [Icc_eq_cons_Ico h, prod_cons] @[to_additive] lemma prod_Ico_mul_eq_prod_Icc (h : a ≤ b) : (∏ x ∈ Ico a b, f x) * f b = ∏ x ∈ Icc a b, f x := by rw [mul_comm, mul_prod_Ico_eq_prod_Icc h] @[to_additive] lemma mul_prod_Ioc_eq_prod_Icc (h : a ≤ b) : f a * ∏ x ∈ Ioc a b, f x = ∏ x ∈ Icc a b, f x := by	rw [Icc_eq_cons_Ioc h, prod_cons] @[to_additive]	Mathlib/Algebra/BigOperators/Intervals.lean	38	40
/- 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.Order.Filter.Tendsto import Mathlib.Data.Set.Accumulate import Mathlib.Topology.Bornology.Basic import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Ultrafilter import Mathlib.Topology.Defs.Ultrafilter /-! # Compact sets and compact spaces ## Main results * `isCompact_univ_pi`: Tychonov's theorem - an arbitrary product of compact sets is compact. -/ open Set Filter Topology TopologicalSpace Function universe u v variable {X : Type u} {Y : Type v} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} {f : X → Y} -- compact sets section Compact lemma IsCompact.exists_clusterPt (hs : IsCompact s) {f : Filter X} [NeBot f] (hf : f ≤ 𝓟 s) : ∃ x ∈ s, ClusterPt x f := hs hf lemma IsCompact.exists_mapClusterPt {ι : Type} (hs : IsCompact s) {f : Filter ι} [NeBot f] {u : ι → X} (hf : Filter.map u f ≤ 𝓟 s) : ∃ x ∈ s, MapClusterPt x f u := hs hf lemma IsCompact.exists_clusterPt_of_frequently {l : Filter X} (hs : IsCompact s) (hl : ∃ᶠ x in l, x ∈ s) : ∃ a ∈ s, ClusterPt a l := let ⟨a, has, ha⟩ := @hs _ (frequently_mem_iff_neBot.mp hl) inf_le_right ⟨a, has, ha.mono inf_le_left⟩ lemma IsCompact.exists_mapClusterPt_of_frequently {l : Filter ι} {f : ι → X} (hs : IsCompact s) (hf : ∃ᶠ x in l, f x ∈ s) : ∃ a ∈ s, MapClusterPt a l f := hs.exists_clusterPt_of_frequently hf /-- The complement to a compact set belongs to a filter `f` if it belongs to each filter `𝓝 x ⊓ f`, `x ∈ s`. -/ theorem IsCompact.compl_mem_sets (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, sᶜ ∈ 𝓝 x ⊓ f) : sᶜ ∈ f := by contrapose! hf simp only [not_mem_iff_inf_principal_compl, compl_compl, inf_assoc] at hf ⊢ exact @hs _ hf inf_le_right /-- The complement to a compact set belongs to a filter `f` if each `x ∈ s` has a neighborhood `t` within `s` such that `tᶜ` belongs to `f`. -/ theorem IsCompact.compl_mem_sets_of_nhdsWithin (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx => ?_ rcases hf x hx with ⟨t, ht, hst⟩ replace ht := mem_inf_principal.1 ht apply mem_inf_of_inter ht hst rintro x ⟨h₁, h₂⟩ hs exact h₂ (h₁ hs) /-- If `p : Set X → Prop` is stable under restriction and union, and each point `x` of a compact set `s` has a neighborhood `t` within `s` such that `p t`, then `p s` holds. -/ @[elab_as_elim] theorem IsCompact.induction_on (hs : IsCompact s) {p : Set X → Prop} (he : p ∅) (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hunion : ∀ ⦃s t⦄, p s → p t → p (s ∪ t)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := comk p he (fun _t ht _s hsub ↦ hmono hsub ht) (fun _s hs _t ht ↦ hunion hs ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] /-- The intersection of a compact set and a closed set is a compact set. -/ theorem IsCompact.inter_right (hs : IsCompact s) (ht : IsClosed t) : IsCompact (s ∩ t) := by intro f hnf hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs (le_trans hstf (le_principal_iff.2 inter_subset_left)) have : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono <\| le_trans hstf (le_principal_iff.2 inter_subset_right) exact ⟨x, ⟨hsx, this⟩, hx⟩ /-- The intersection of a closed set and a compact set is a compact set. -/ theorem IsCompact.inter_left (ht : IsCompact t) (hs : IsClosed s) : IsCompact (s ∩ t) := inter_comm t s ▸ ht.inter_right hs /-- The set difference of a compact set and an open set is a compact set. -/ theorem IsCompact.diff (hs : IsCompact s) (ht : IsOpen t) : IsCompact (s \ t) := hs.inter_right (isClosed_compl_iff.mpr ht) /-- A closed subset of a compact set is a compact set. -/ theorem IsCompact.of_isClosed_subset (hs : IsCompact s) (ht : IsClosed t) (h : t ⊆ s) : IsCompact t := inter_eq_self_of_subset_right h ▸ hs.inter_right ht theorem IsCompact.image_of_continuousOn {f : X → Y} (hs : IsCompact s) (hf : ContinuousOn f s) : IsCompact (f '' s) := by intro l lne ls have : NeBot (l.comap f ⊓ 𝓟 s) := comap_inf_principal_neBot_of_image_mem lne (le_principal_iff.1 ls) obtain ⟨x, hxs, hx⟩ : ∃ x ∈ s, ClusterPt x (l.comap f ⊓ 𝓟 s) := @hs _ this inf_le_right haveI := hx.neBot use f x, mem_image_of_mem f hxs have : Tendsto f (𝓝 x ⊓ (comap f l ⊓ 𝓟 s)) (𝓝 (f x) ⊓ l) := by convert (hf x hxs).inf (@tendsto_comap _ _ f l) using 1 rw [nhdsWithin] ac_rfl exact this.neBot theorem IsCompact.image {f : X → Y} (hs : IsCompact s) (hf : Continuous f) : IsCompact (f '' s) := hs.image_of_continuousOn hf.continuousOn theorem IsCompact.adherence_nhdset {f : Filter X} (hs : IsCompact s) (hf₂ : f ≤ 𝓟 s) (ht₁ : IsOpen t) (ht₂ : ∀ x ∈ s, ClusterPt x f → x ∈ t) : t ∈ f := Classical.by_cases mem_of_eq_bot fun (this : f ⊓ 𝓟 tᶜ ≠ ⊥) => let ⟨x, hx, (hfx : ClusterPt x <\| f ⊓ 𝓟 tᶜ)⟩ := @hs _ ⟨this⟩ <\| inf_le_of_left_le hf₂ have : x ∈ t := ht₂ x hx hfx.of_inf_left have : tᶜ ∩ t ∈ 𝓝[tᶜ] x := inter_mem_nhdsWithin _ (IsOpen.mem_nhds ht₁ this) have A : 𝓝[tᶜ] x = ⊥ := empty_mem_iff_bot.1 <\| compl_inter_self t ▸ this have : 𝓝[tᶜ] x ≠ ⊥ := hfx.of_inf_right.ne absurd A this theorem isCompact_iff_ultrafilter_le_nhds : IsCompact s ↔ ∀ f : Ultrafilter X, ↑f ≤ 𝓟 s → ∃ x ∈ s, ↑f ≤ 𝓝 x := by refine (forall_neBot_le_iff ?_).trans ?_ · rintro f g hle ⟨x, hxs, hxf⟩ exact ⟨x, hxs, hxf.mono hle⟩ · simp only [Ultrafilter.clusterPt_iff] alias ⟨IsCompact.ultrafilter_le_nhds, _⟩ := isCompact_iff_ultrafilter_le_nhds theorem isCompact_iff_ultrafilter_le_nhds' : IsCompact s ↔ ∀ f : Ultrafilter X, s ∈ f → ∃ x ∈ s, ↑f ≤ 𝓝 x := by simp only [isCompact_iff_ultrafilter_le_nhds, le_principal_iff, Ultrafilter.mem_coe] alias ⟨IsCompact.ultrafilter_le_nhds', _⟩ := isCompact_iff_ultrafilter_le_nhds' /-- If a compact set belongs to a filter and this filter has a unique cluster point `y` in this set, then the filter is less than or equal to `𝓝 y`. -/ lemma IsCompact.le_nhds_of_unique_clusterPt (hs : IsCompact s) {l : Filter X} {y : X} (hmem : s ∈ l) (h : ∀ x ∈ s, ClusterPt x l → x = y) : l ≤ 𝓝 y := by refine le_iff_ultrafilter.2 fun f hf ↦ ?_ rcases hs.ultrafilter_le_nhds' f (hf hmem) with ⟨x, hxs, hx⟩ convert ← hx exact h x hxs (.mono (.of_le_nhds hx) hf) /-- If values of `f : Y → X` belong to a compact set `s` eventually along a filter `l` and `y` is a unique `MapClusterPt` for `f` along `l` in `s`, then `f` tends to `𝓝 y` along `l`. -/ lemma IsCompact.tendsto_nhds_of_unique_mapClusterPt {Y} {l : Filter Y} {y : X} {f : Y → X} (hs : IsCompact s) (hmem : ∀ᶠ x in l, f x ∈ s) (h : ∀ x ∈ s, MapClusterPt x l f → x = y) : Tendsto f l (𝓝 y) := hs.le_nhds_of_unique_clusterPt (mem_map.2 hmem) h /-- For every open directed cover of a compact set, there exists a single element of the cover which itself includes the set. -/ theorem IsCompact.elim_directed_cover {ι : Type v} [hι : Nonempty ι] (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) (hdU : Directed (· ⊆ ·) U) : ∃ i, s ⊆ U i := hι.elim fun i₀ => IsCompact.induction_on hs ⟨i₀, empty_subset _⟩ (fun _ _ hs ⟨i, hi⟩ => ⟨i, hs.trans hi⟩) (fun _ _ ⟨i, hi⟩ ⟨j, hj⟩ => let ⟨k, hki, hkj⟩ := hdU i j ⟨k, union_subset (Subset.trans hi hki) (Subset.trans hj hkj)⟩) fun _x hx => let ⟨i, hi⟩ := mem_iUnion.1 (hsU hx) ⟨U i, mem_nhdsWithin_of_mem_nhds (IsOpen.mem_nhds (hUo i) hi), i, Subset.refl _⟩ /-- For every open cover of a compact set, there exists a finite subcover. -/ theorem IsCompact.elim_finite_subcover {ι : Type v} (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := hs.elim_directed_cover _ (fun _ => isOpen_biUnion fun i _ => hUo i) (iUnion_eq_iUnion_finset U ▸ hsU) (directed_of_isDirected_le fun _ _ h => biUnion_subset_biUnion_left h) lemma IsCompact.elim_nhds_subcover_nhdsSet' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x hx, U x hx ∈ 𝓝 x) : ∃ t : Finset s, (⋃ x ∈ t, U x.1 x.2) ∈ 𝓝ˢ s := by rcases hs.elim_finite_subcover (fun x : s ↦ interior (U x x.2)) (fun _ ↦ isOpen_interior) fun x hx ↦ mem_iUnion.2 ⟨⟨x, hx⟩, mem_interior_iff_mem_nhds.2 <\| hU _ _⟩ with ⟨t, hst⟩ refine ⟨t, mem_nhdsSet_iff_forall.2 fun x hx ↦ ?_⟩ rcases mem_iUnion₂.1 (hst hx) with ⟨y, hyt, hy⟩ refine mem_of_superset ?_ (subset_biUnion_of_mem hyt) exact mem_interior_iff_mem_nhds.1 hy lemma IsCompact.elim_nhds_subcover_nhdsSet (hs : IsCompact s) {U : X → Set X} (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ (⋃ x ∈ t, U x) ∈ 𝓝ˢ s := by let ⟨t, ht⟩ := hs.elim_nhds_subcover_nhdsSet' (fun x _ => U x) hU classical exact ⟨t.image (↑), fun x hx => let ⟨y, _, hyx⟩ := Finset.mem_image.1 hx hyx ▸ y.2, by rwa [Finset.set_biUnion_finset_image]⟩ theorem IsCompact.elim_nhds_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x ‹x ∈ s› ∈ 𝓝 x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U (x : s) x.2 := (hs.elim_nhds_subcover_nhdsSet' U hU).imp fun _ ↦ subset_of_mem_nhdsSet theorem IsCompact.elim_nhds_subcover (hs : IsCompact s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := (hs.elim_nhds_subcover_nhdsSet hU).imp fun _ h ↦ h.imp_right subset_of_mem_nhdsSet theorem IsCompact.elim_nhdsWithin_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x hx ∈ 𝓝[s] x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U x x.2 := by choose V V_nhds hV using fun x hx => mem_nhdsWithin_iff_exists_mem_nhds_inter.1 (hU x hx) refine (hs.elim_nhds_subcover' V V_nhds).imp fun t ht => subset_trans ?_ (iUnion₂_mono fun x _ => hV x x.2) simpa [← iUnion_inter, ← iUnion_coe_set] theorem IsCompact.elim_nhdsWithin_subcover (hs : IsCompact s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝[s] x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := by choose! V V_nhds hV using fun x hx => mem_nhdsWithin_iff_exists_mem_nhds_inter.1 (hU x hx) refine (hs.elim_nhds_subcover V V_nhds).imp fun t ⟨t_sub_s, ht⟩ => ⟨t_sub_s, subset_trans ?_ (iUnion₂_mono fun x hx => hV x (t_sub_s x hx))⟩ simpa [← iUnion_inter] /-- The neighborhood filter of a compact set is disjoint with a filter `l` if and only if the neighborhood filter of each point of this set is disjoint with `l`. -/ theorem IsCompact.disjoint_nhdsSet_left {l : Filter X} (hs : IsCompact s) : Disjoint (𝓝ˢ s) l ↔ ∀ x ∈ s, Disjoint (𝓝 x) l := by refine ⟨fun h x hx => h.mono_left <\| nhds_le_nhdsSet hx, fun H => ?_⟩ choose! U hxU hUl using fun x hx => (nhds_basis_opens x).disjoint_iff_left.1 (H x hx) choose hxU hUo using hxU rcases hs.elim_nhds_subcover U fun x hx => (hUo x hx).mem_nhds (hxU x hx) with ⟨t, hts, hst⟩ refine (hasBasis_nhdsSet _).disjoint_iff_left.2 ⟨⋃ x ∈ t, U x, ⟨isOpen_biUnion fun x hx => hUo x (hts x hx), hst⟩, ?_⟩ rw [compl_iUnion₂, biInter_finset_mem] exact fun x hx => hUl x (hts x hx) /-- A filter `l` is disjoint with the neighborhood filter of a compact set if and only if it is disjoint with the neighborhood filter of each point of this set. -/ theorem IsCompact.disjoint_nhdsSet_right {l : Filter X} (hs : IsCompact s) : Disjoint l (𝓝ˢ s) ↔ ∀ x ∈ s, Disjoint l (𝓝 x) := by simpa only [disjoint_comm] using hs.disjoint_nhdsSet_left -- TODO: reformulate using `Disjoint` /-- For every directed family of closed sets whose intersection avoids a compact set, there exists a single element of the family which itself avoids this compact set. -/ theorem IsCompact.elim_directed_family_closed {ι : Type v} [Nonempty ι] (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) (hdt : Directed (· ⊇ ·) t) : ∃ i : ι, s ∩ t i = ∅ := let ⟨t, ht⟩ := hs.elim_directed_cover (compl ∘ t) (fun i => (htc i).isOpen_compl) (by simpa only [subset_def, not_forall, eq_empty_iff_forall_not_mem, mem_iUnion, exists_prop, mem_inter_iff, not_and, mem_iInter, mem_compl_iff] using hst) (hdt.mono_comp _ fun _ _ => compl_subset_compl.mpr) ⟨t, by simpa only [subset_def, not_forall, eq_empty_iff_forall_not_mem, mem_iUnion, exists_prop, mem_inter_iff, not_and, mem_iInter, mem_compl_iff] using ht⟩ -- TODO: reformulate using `Disjoint` /-- For every family of closed sets whose intersection avoids a compact set, there exists a finite subfamily whose intersection avoids this compact set. -/ theorem IsCompact.elim_finite_subfamily_closed {ι : Type v} (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) : ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅ := hs.elim_directed_family_closed _ (fun _ ↦ isClosed_biInter fun _ _ ↦ htc _) (by rwa [← iInter_eq_iInter_finset]) (directed_of_isDirected_le fun _ _ h ↦ biInter_subset_biInter_left h) /-- To show that a compact set intersects the intersection of a family of closed sets, it is sufficient to show that it intersects every finite subfamily. -/ theorem IsCompact.inter_iInter_nonempty {ι : Type v} (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : ∀ u : Finset ι, (s ∩ ⋂ i ∈ u, t i).Nonempty) : (s ∩ ⋂ i, t i).Nonempty := by contrapose! hst exact hs.elim_finite_subfamily_closed t htc hst /-- Cantor's intersection theorem for `iInter`: the intersection of a directed family of nonempty compact closed sets is nonempty. -/ theorem IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed {ι : Type v} [hι : Nonempty ι] (t : ι → Set X) (htd : Directed (· ⊇ ·) t) (htn : ∀ i, (t i).Nonempty) (htc : ∀ i, IsCompact (t i)) (htcl : ∀ i, IsClosed (t i)) : (⋂ i, t i).Nonempty := by let i₀ := hι.some suffices (t i₀ ∩ ⋂ i, t i).Nonempty by rwa [inter_eq_right.mpr (iInter_subset _ i₀)] at this simp only [nonempty_iff_ne_empty] at htn ⊢ apply mt ((htc i₀).elim_directed_family_closed t htcl) push_neg simp only [← nonempty_iff_ne_empty] at htn ⊢ refine ⟨htd, fun i => ?_⟩ rcases htd i₀ i with ⟨j, hji₀, hji⟩ exact (htn j).mono (subset_inter hji₀ hji) /-- Cantor's intersection theorem for `sInter`: the intersection of a directed family of nonempty compact closed sets is nonempty. -/ theorem IsCompact.nonempty_sInter_of_directed_nonempty_isCompact_isClosed {S : Set (Set X)} [hS : Nonempty S] (hSd : DirectedOn (· ⊇ ·) S) (hSn : ∀ U ∈ S, U.Nonempty) (hSc : ∀ U ∈ S, IsCompact U) (hScl : ∀ U ∈ S, IsClosed U) : (⋂₀ S).Nonempty := by rw [sInter_eq_iInter] exact IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed _ (DirectedOn.directed_val hSd) (fun i ↦ hSn i i.2) (fun i ↦ hSc i i.2) (fun i ↦ hScl i i.2) /-- Cantor's intersection theorem for sequences indexed by `ℕ`: the intersection of a decreasing sequence of nonempty compact closed sets is nonempty. -/ theorem IsCompact.nonempty_iInter_of_sequence_nonempty_isCompact_isClosed (t : ℕ → Set X) (htd : ∀ i, t (i + 1) ⊆ t i) (htn : ∀ i, (t i).Nonempty) (ht0 : IsCompact (t 0)) (htcl : ∀ i, IsClosed (t i)) : (⋂ i, t i).Nonempty := have tmono : Antitone t := antitone_nat_of_succ_le htd have htd : Directed (· ⊇ ·) t := tmono.directed_ge have : ∀ i, t i ⊆ t 0 := fun i => tmono <\| Nat.zero_le i have htc : ∀ i, IsCompact (t i) := fun i => ht0.of_isClosed_subset (htcl i) (this i) IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed t htd htn htc htcl /-- For every open cover of a compact set, there exists a finite subcover. -/ theorem IsCompact.elim_finite_subcover_image {b : Set ι} {c : ι → Set X} (hs : IsCompact s) (hc₁ : ∀ i ∈ b, IsOpen (c i)) (hc₂ : s ⊆ ⋃ i ∈ b, c i) : ∃ b', b' ⊆ b ∧ Set.Finite b' ∧ s ⊆ ⋃ i ∈ b', c i := by simp only [Subtype.forall', biUnion_eq_iUnion] at hc₁ hc₂ rcases hs.elim_finite_subcover (fun i => c i : b → Set X) hc₁ hc₂ with ⟨d, hd⟩ refine ⟨Subtype.val '' d.toSet, ?_, d.finite_toSet.image _, ?_⟩ · simp · rwa [biUnion_image] /-- A set `s` is compact if for every open cover of `s`, there exists a finite subcover. -/ theorem isCompact_of_finite_subcover (h : ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i) : IsCompact s := fun f hf hfs => by contrapose! h simp only [ClusterPt, not_neBot, ← disjoint_iff, SetCoe.forall', (nhds_basis_opens _).disjoint_iff_left] at h choose U hU hUf using h refine ⟨s, U, fun x => (hU x).2, fun x hx => mem_iUnion.2 ⟨⟨x, hx⟩, (hU _).1⟩, fun t ht => ?_⟩ refine compl_not_mem (le_principal_iff.1 hfs) ?_ refine mem_of_superset ((biInter_finset_mem t).2 fun x _ => hUf x) ?_ rw [subset_compl_comm, compl_iInter₂] simpa only [compl_compl] -- TODO: reformulate using `Disjoint` /-- A set `s` is compact if for every family of closed sets whose intersection avoids `s`, there exists a finite subfamily whose intersection avoids `s`. -/ theorem isCompact_of_finite_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅) : IsCompact s := isCompact_of_finite_subcover fun U hUo hsU => by rw [← disjoint_compl_right_iff_subset, compl_iUnion, disjoint_iff] at hsU rcases h (fun i => (U i)ᶜ) (fun i => (hUo _).isClosed_compl) hsU with ⟨t, ht⟩ refine ⟨t, ?_⟩ rwa [← disjoint_compl_right_iff_subset, compl_iUnion₂, disjoint_iff] /-- A set `s` is compact if and only if for every open cover of `s`, there exists a finite subcover. -/ theorem isCompact_iff_finite_subcover : IsCompact s ↔ ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := ⟨fun hs => hs.elim_finite_subcover, isCompact_of_finite_subcover⟩ /-- A set `s` is compact if and only if for every family of closed sets whose intersection avoids `s`, there exists a finite subfamily whose intersection avoids `s`. -/ theorem isCompact_iff_finite_subfamily_closed : IsCompact s ↔ ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅ := ⟨fun hs => hs.elim_finite_subfamily_closed, isCompact_of_finite_subfamily_closed⟩ /-- If `s : Set (X × Y)` belongs to `𝓝 x ×ˢ l` for all `x` from a compact set `K`, then it belongs to `(𝓝ˢ K) ×ˢ l`, i.e., there exist an open `U ⊇ K` and `t ∈ l` such that `U ×ˢ t ⊆ s`. -/ theorem IsCompact.mem_nhdsSet_prod_of_forall {K : Set X} {Y} {l : Filter Y} {s : Set (X × Y)} (hK : IsCompact K) (hs : ∀ x ∈ K, s ∈ 𝓝 x ×ˢ l) : s ∈ (𝓝ˢ K) ×ˢ l := by refine hK.induction_on (by simp) (fun t t' ht hs ↦ ?_) (fun t t' ht ht' ↦ ?_) fun x hx ↦ ?_ · exact prod_mono (nhdsSet_mono ht) le_rfl hs · simp [sup_prod, ] · rcases ((nhds_basis_opens _).prod l.basis_sets).mem_iff.1 (hs x hx) with ⟨⟨u, v⟩, ⟨⟨hx, huo⟩, hv⟩, hs⟩ refine ⟨u, nhdsWithin_le_nhds (huo.mem_nhds hx), mem_of_superset ?_ hs⟩ exact prod_mem_prod (huo.mem_nhdsSet.2 Subset.rfl) hv theorem IsCompact.nhdsSet_prod_eq_biSup {K : Set X} (hK : IsCompact K) {Y} (l : Filter Y) : (𝓝ˢ K) ×ˢ l = ⨆ x ∈ K, 𝓝 x ×ˢ l := le_antisymm (fun s hs ↦ hK.mem_nhdsSet_prod_of_forall <\| by simpa using hs) (iSup₂_le fun _ hx ↦ prod_mono (nhds_le_nhdsSet hx) le_rfl) theorem IsCompact.prod_nhdsSet_eq_biSup {K : Set Y} (hK : IsCompact K) {X} (l : Filter X) : l ×ˢ (𝓝ˢ K) = ⨆ y ∈ K, l ×ˢ 𝓝 y := by simp only [prod_comm (f := l), hK.nhdsSet_prod_eq_biSup, map_iSup] /-- If `s : Set (X × Y)` belongs to `l ×ˢ 𝓝 y` for all `y` from a compact set `K`, then it belongs to `l ×ˢ (𝓝ˢ K)`, i.e., there exist `t ∈ l` and an open `U ⊇ K` such that `t ×ˢ U ⊆ s`. -/ theorem IsCompact.mem_prod_nhdsSet_of_forall {K : Set Y} {X} {l : Filter X} {s : Set (X × Y)} (hK : IsCompact K) (hs : ∀ y ∈ K, s ∈ l ×ˢ 𝓝 y) : s ∈ l ×ˢ 𝓝ˢ K := (hK.prod_nhdsSet_eq_biSup l).symm ▸ by simpa using hs -- TODO: Is there a way to prove directly the `inf` version and then deduce the `Prod` one ? -- That would seem a bit more natural. theorem IsCompact.nhdsSet_inf_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter X) : (𝓝ˢ K) ⊓ l = ⨆ x ∈ K, 𝓝 x ⊓ l := by have : ∀ f : Filter X, f ⊓ l = comap (fun x ↦ (x, x)) (f ×ˢ l) := fun f ↦ by simpa only [comap_prod] using congrArg₂ (· ⊓ ·) comap_id.symm comap_id.symm simp_rw [this, ← comap_iSup, hK.nhdsSet_prod_eq_biSup] theorem IsCompact.inf_nhdsSet_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter X) : l ⊓ (𝓝ˢ K) = ⨆ x ∈ K, l ⊓ 𝓝 x := by simp only [inf_comm l, hK.nhdsSet_inf_eq_biSup] /-- If `s : Set X` belongs to `𝓝 x ⊓ l` for all `x` from a compact set `K`, then it belongs to `(𝓝ˢ K) ⊓ l`, i.e., there exist an open `U ⊇ K` and `T ∈ l` such that `U ∩ T ⊆ s`. -/ theorem IsCompact.mem_nhdsSet_inf_of_forall {K : Set X} {l : Filter X} {s : Set X} (hK : IsCompact K) (hs : ∀ x ∈ K, s ∈ 𝓝 x ⊓ l) : s ∈ (𝓝ˢ K) ⊓ l := (hK.nhdsSet_inf_eq_biSup l).symm ▸ by simpa using hs /-- If `s : Set S` belongs to `l ⊓ 𝓝 x` for all `x` from a compact set `K`, then it belongs to `l ⊓ (𝓝ˢ K)`, i.e., there exist `T ∈ l` and an open `U ⊇ K` such that `T ∩ U ⊆ s`. -/ theorem IsCompact.mem_inf_nhdsSet_of_forall {K : Set X} {l : Filter X} {s : Set X} (hK : IsCompact K) (hs : ∀ y ∈ K, s ∈ l ⊓ 𝓝 y) : s ∈ l ⊓ 𝓝ˢ K := (hK.inf_nhdsSet_eq_biSup l).symm ▸ by simpa using hs /-- To show that `∀ y ∈ K, P x y` holds for `x` close enough to `x₀` when `K` is compact, it is sufficient to show that for all `y₀ ∈ K` there `P x y` holds for `(x, y)` close enough to `(x₀, y₀)`. Provided for backwards compatibility, see `IsCompact.mem_prod_nhdsSet_of_forall` for a stronger statement. -/ theorem IsCompact.eventually_forall_of_forall_eventually {x₀ : X} {K : Set Y} (hK : IsCompact K) {P : X → Y → Prop} (hP : ∀ y ∈ K, ∀ᶠ z : X × Y in 𝓝 (x₀, y), P z.1 z.2) : ∀ᶠ x in 𝓝 x₀, ∀ y ∈ K, P x y := by simp only [nhds_prod_eq, ← eventually_iSup, ← hK.prod_nhdsSet_eq_biSup] at hP exact hP.curry.mono fun _ h ↦ h.self_of_nhdsSet theorem isCompact_empty : IsCompact (∅ : Set X) := fun _f hnf hsf => Not.elim hnf.ne <\| empty_mem_iff_bot.1 <\| le_principal_iff.1 hsf theorem isCompact_singleton {x : X} : IsCompact ({x} : Set X) := fun _ hf hfa => ⟨x, rfl, ClusterPt.of_le_nhds' (hfa.trans <\| by simpa only [principal_singleton] using pure_le_nhds x) hf⟩ theorem Set.Subsingleton.isCompact (hs : s.Subsingleton) : IsCompact s := Subsingleton.induction_on hs isCompact_empty fun _ => isCompact_singleton theorem Set.Finite.isCompact_biUnion {s : Set ι} {f : ι → Set X} (hs : s.Finite) (hf : ∀ i ∈ s, IsCompact (f i)) : IsCompact (⋃ i ∈ s, f i) := isCompact_iff_ultrafilter_le_nhds'.2 fun l hl => by rw [Ultrafilter.finite_biUnion_mem_iff hs] at hl rcases hl with ⟨i, his, hi⟩ rcases (hf i his).ultrafilter_le_nhds _ (le_principal_iff.2 hi) with ⟨x, hxi, hlx⟩ exact ⟨x, mem_iUnion₂.2 ⟨i, his, hxi⟩, hlx⟩ theorem Finset.isCompact_biUnion (s : Finset ι) {f : ι → Set X} (hf : ∀ i ∈ s, IsCompact (f i)) : IsCompact (⋃ i ∈ s, f i) := s.finite_toSet.isCompact_biUnion hf theorem isCompact_accumulate {K : ℕ → Set X} (hK : ∀ n, IsCompact (K n)) (n : ℕ) : IsCompact (Accumulate K n) := (finite_le_nat n).isCompact_biUnion fun k _ => hK k theorem Set.Finite.isCompact_sUnion {S : Set (Set X)} (hf : S.Finite) (hc : ∀ s ∈ S, IsCompact s) : IsCompact (⋃₀ S) := by rw [sUnion_eq_biUnion]; exact hf.isCompact_biUnion hc theorem isCompact_iUnion {ι : Sort} {f : ι → Set X} [Finite ι] (h : ∀ i, IsCompact (f i)) : IsCompact (⋃ i, f i) := (finite_range f).isCompact_sUnion <\| forall_mem_range.2 h @[simp] theorem Set.Finite.isCompact (hs : s.Finite) : IsCompact s := biUnion_of_singleton s ▸ hs.isCompact_biUnion fun _ _ => isCompact_singleton theorem IsCompact.finite_of_discrete [DiscreteTopology X] (hs : IsCompact s) : s.Finite := by have : ∀ x : X, ({x} : Set X) ∈ 𝓝 x := by simp [nhds_discrete] rcases hs.elim_nhds_subcover (fun x => {x}) fun x _ => this x with ⟨t, _, hst⟩ simp only [← t.set_biUnion_coe, biUnion_of_singleton] at hst exact t.finite_toSet.subset hst theorem isCompact_iff_finite [DiscreteTopology X] : IsCompact s ↔ s.Finite := ⟨fun h => h.finite_of_discrete, fun h => h.isCompact⟩ theorem IsCompact.union (hs : IsCompact s) (ht : IsCompact t) : IsCompact (s ∪ t) := by rw [union_eq_iUnion]; exact isCompact_iUnion fun b => by cases b <;> assumption protected theorem IsCompact.insert (hs : IsCompact s) (a) : IsCompact (insert a s) := isCompact_singleton.union hs -- TODO: reformulate using `𝓝ˢ` /-- If `V : ι → Set X` is a decreasing family of closed compact sets then any neighborhood of `⋂ i, V i` contains some `V i`. We assume each `V i` is compact and closed because `X` is not assumed to be Hausdorff. See `exists_subset_nhd_of_compact` for version assuming this. -/ theorem exists_subset_nhds_of_isCompact' [Nonempty ι] {V : ι → Set X} (hV : Directed (· ⊇ ·) V) (hV_cpct : ∀ i, IsCompact (V i)) (hV_closed : ∀ i, IsClosed (V i)) {U : Set X} (hU : ∀ x ∈ ⋂ i, V i, U ∈ 𝓝 x) : ∃ i, V i ⊆ U := by obtain ⟨W, hsubW, W_op, hWU⟩ := exists_open_set_nhds hU suffices ∃ i, V i ⊆ W from this.imp fun i hi => hi.trans hWU by_contra! H replace H : ∀ i, (V i ∩ Wᶜ).Nonempty := fun i => Set.inter_compl_nonempty_iff.mpr (H i) have : (⋂ i, V i ∩ Wᶜ).Nonempty := by refine IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed _ (fun i j => ?_) H (fun i => (hV_cpct i).inter_right W_op.isClosed_compl) fun i => (hV_closed i).inter W_op.isClosed_compl rcases hV i j with ⟨k, hki, hkj⟩ refine ⟨k, ⟨fun x => ?_, fun x => ?_⟩⟩ <;> simp only [and_imp, mem_inter_iff, mem_compl_iff] <;> tauto have : ¬⋂ i : ι, V i ⊆ W := by simpa [← iInter_inter, inter_compl_nonempty_iff] contradiction namespace Filter theorem hasBasis_cocompact : (cocompact X).HasBasis IsCompact compl := hasBasis_biInf_principal' (fun s hs t ht => ⟨s ∪ t, hs.union ht, compl_subset_compl.2 subset_union_left, compl_subset_compl.2 subset_union_right⟩) ⟨∅, isCompact_empty⟩ theorem mem_cocompact : s ∈ cocompact X ↔ ∃ t, IsCompact t ∧ tᶜ ⊆ s := hasBasis_cocompact.mem_iff theorem mem_cocompact' : s ∈ cocompact X ↔ ∃ t, IsCompact t ∧ sᶜ ⊆ t := mem_cocompact.trans <\| exists_congr fun _ => and_congr_right fun _ => compl_subset_comm theorem _root_.IsCompact.compl_mem_cocompact (hs : IsCompact s) : sᶜ ∈ Filter.cocompact X := hasBasis_cocompact.mem_of_mem hs theorem cocompact_le_cofinite : cocompact X ≤ cofinite := fun s hs => compl_compl s ▸ hs.isCompact.compl_mem_cocompact theorem cocompact_eq_cofinite (X : Type) [TopologicalSpace X] [DiscreteTopology X] : cocompact X = cofinite := by simp only [cocompact, hasBasis_cofinite.eq_biInf, isCompact_iff_finite] /-- A filter is disjoint from the cocompact filter if and only if it contains a compact set. -/ theorem disjoint_cocompact_left (f : Filter X) : Disjoint (Filter.cocompact X) f ↔ ∃ K ∈ f, IsCompact K := by simp_rw [hasBasis_cocompact.disjoint_iff_left, compl_compl] tauto /-- A filter is disjoint from the cocompact filter if and only if it contains a compact set. -/ theorem disjoint_cocompact_right (f : Filter X) : Disjoint f (Filter.cocompact X) ↔ ∃ K ∈ f, IsCompact K := by simp_rw [hasBasis_cocompact.disjoint_iff_right, compl_compl] tauto theorem Tendsto.isCompact_insert_range_of_cocompact {f : X → Y} {y} (hf : Tendsto f (cocompact X) (𝓝 y)) (hfc : Continuous f) : IsCompact (insert y (range f)) := by intro l hne hle by_cases hy : ClusterPt y l · exact ⟨y, Or.inl rfl, hy⟩ simp only [clusterPt_iff_nonempty, not_forall, ← not_disjoint_iff_nonempty_inter, not_not] at hy rcases hy with ⟨s, hsy, t, htl, hd⟩ rcases mem_cocompact.1 (hf hsy) with ⟨K, hKc, hKs⟩ have : f '' K ∈ l := by filter_upwards [htl, le_principal_iff.1 hle] with y hyt hyf rcases hyf with (rfl \| ⟨x, rfl⟩) exacts [(hd.le_bot ⟨mem_of_mem_nhds hsy, hyt⟩).elim, mem_image_of_mem _ (not_not.1 fun hxK => hd.le_bot ⟨hKs hxK, hyt⟩)] rcases hKc.image hfc (le_principal_iff.2 this) with ⟨y, hy, hyl⟩ exact ⟨y, Or.inr <\| image_subset_range _ _ hy, hyl⟩ theorem Tendsto.isCompact_insert_range_of_cofinite {f : ι → X} {x} (hf : Tendsto f cofinite (𝓝 x)) : IsCompact (insert x (range f)) := by letI : TopologicalSpace ι := ⊥; haveI h : DiscreteTopology ι := ⟨rfl⟩ rw [← cocompact_eq_cofinite ι] at hf exact hf.isCompact_insert_range_of_cocompact continuous_of_discreteTopology theorem Tendsto.isCompact_insert_range {f : ℕ → X} {x} (hf : Tendsto f atTop (𝓝 x)) : IsCompact (insert x (range f)) := Filter.Tendsto.isCompact_insert_range_of_cofinite <\| Nat.cofinite_eq_atTop.symm ▸ hf theorem hasBasis_coclosedCompact : (Filter.coclosedCompact X).HasBasis (fun s => IsClosed s ∧ IsCompact s) compl := by simp only [Filter.coclosedCompact, iInf_and'] refine hasBasis_biInf_principal' ?_ ⟨∅, isClosed_empty, isCompact_empty⟩ rintro s ⟨hs₁, hs₂⟩ t ⟨ht₁, ht₂⟩ exact ⟨s ∪ t, ⟨⟨hs₁.union ht₁, hs₂.union ht₂⟩, compl_subset_compl.2 subset_union_left, compl_subset_compl.2 subset_union_right⟩⟩ /-- A set belongs to `coclosedCompact` if and only if the closure of its complement is compact. -/ theorem mem_coclosedCompact_iff : s ∈ coclosedCompact X ↔ IsCompact (closure sᶜ) := by refine hasBasis_coclosedCompact.mem_iff.trans ⟨?_, fun h ↦ ?_⟩ · rintro ⟨t, ⟨htcl, htco⟩, hst⟩ exact htco.of_isClosed_subset isClosed_closure <\| closure_minimal (compl_subset_comm.2 hst) htcl · exact ⟨closure sᶜ, ⟨isClosed_closure, h⟩, compl_subset_comm.2 subset_closure⟩ /-- Complement of a set belongs to `coclosedCompact` if and only if its closure is compact. -/ theorem compl_mem_coclosedCompact : sᶜ ∈ coclosedCompact X ↔ IsCompact (closure s) := by rw [mem_coclosedCompact_iff, compl_compl] theorem cocompact_le_coclosedCompact : cocompact X ≤ coclosedCompact X := iInf_mono fun _ => le_iInf fun _ => le_rfl end Filter theorem IsCompact.compl_mem_coclosedCompact_of_isClosed (hs : IsCompact s) (hs' : IsClosed s) : sᶜ ∈ Filter.coclosedCompact X := hasBasis_coclosedCompact.mem_of_mem ⟨hs', hs⟩ namespace Bornology variable (X) in /-- Sets that are contained in a compact set form a bornology. Its `cobounded` filter is `Filter.cocompact`. See also `Bornology.relativelyCompact` the bornology of sets with compact closure. -/ def inCompact : Bornology X where cobounded' := Filter.cocompact X le_cofinite' := Filter.cocompact_le_cofinite theorem inCompact.isBounded_iff : @IsBounded _ (inCompact X) s ↔ ∃ t, IsCompact t ∧ s ⊆ t := by change sᶜ ∈ Filter.cocompact X ↔ _ rw [Filter.mem_cocompact] simp end Bornology /-- If `s` and `t` are compact sets, then the set neighborhoods filter of `s ×ˢ t` is the product of set neighborhoods filters for `s` and `t`. For general sets, only the `≤` inequality holds, see `nhdsSet_prod_le`. -/ theorem IsCompact.nhdsSet_prod_eq {t : Set Y} (hs : IsCompact s) (ht : IsCompact t) : 𝓝ˢ (s ×ˢ t) = 𝓝ˢ s ×ˢ 𝓝ˢ t := by simp_rw [hs.nhdsSet_prod_eq_biSup, ht.prod_nhdsSet_eq_biSup, nhdsSet, sSup_image, biSup_prod, nhds_prod_eq] theorem nhdsSet_prod_le_of_disjoint_cocompact {f : Filter Y} (hs : IsCompact s) (hf : Disjoint f (Filter.cocompact Y)) : 𝓝ˢ s ×ˢ f ≤ 𝓝ˢ (s ×ˢ Set.univ) := by obtain ⟨K, hKf, hK⟩ := (disjoint_cocompact_right f).mp hf calc 𝓝ˢ s ×ˢ f _ ≤ 𝓝ˢ s ×ˢ 𝓟 K := Filter.prod_mono_right _ (Filter.le_principal_iff.mpr hKf) _ ≤ 𝓝ˢ s ×ˢ 𝓝ˢ K := Filter.prod_mono_right _ principal_le_nhdsSet _ = 𝓝ˢ (s ×ˢ K) := (hs.nhdsSet_prod_eq hK).symm _ ≤ 𝓝ˢ (s ×ˢ Set.univ) := nhdsSet_mono (prod_mono_right le_top) theorem prod_nhdsSet_le_of_disjoint_cocompact {t : Set Y} {f : Filter X} (ht : IsCompact t) (hf : Disjoint f (Filter.cocompact X)) : f ×ˢ 𝓝ˢ t ≤ 𝓝ˢ (Set.univ ×ˢ t) := by obtain ⟨K, hKf, hK⟩ := (disjoint_cocompact_right f).mp hf calc f ×ˢ 𝓝ˢ t _ ≤ (𝓟 K) ×ˢ 𝓝ˢ t := Filter.prod_mono_left _ (Filter.le_principal_iff.mpr hKf) _ ≤ 𝓝ˢ K ×ˢ 𝓝ˢ t := Filter.prod_mono_left _ principal_le_nhdsSet _ = 𝓝ˢ (K ×ˢ t) := (hK.nhdsSet_prod_eq ht).symm _ ≤ 𝓝ˢ (Set.univ ×ˢ t) := nhdsSet_mono (prod_mono_left le_top) theorem nhds_prod_le_of_disjoint_cocompact {f : Filter Y} (x : X) (hf : Disjoint f (Filter.cocompact Y)) : 𝓝 x ×ˢ f ≤ 𝓝ˢ ({x} ×ˢ Set.univ) := by simpa using nhdsSet_prod_le_of_disjoint_cocompact isCompact_singleton hf theorem prod_nhds_le_of_disjoint_cocompact {f : Filter X} (y : Y) (hf : Disjoint f (Filter.cocompact X)) : f ×ˢ 𝓝 y ≤ 𝓝ˢ (Set.univ ×ˢ {y}) := by simpa using prod_nhdsSet_le_of_disjoint_cocompact isCompact_singleton hf /-- If `s` and `t` are compact sets and `n` is an open neighborhood of `s × t`, then there exist open neighborhoods `u ⊇ s` and `v ⊇ t` such that `u × v ⊆ n`. See also `IsCompact.nhdsSet_prod_eq`. -/ theorem generalized_tube_lemma (hs : IsCompact s) {t : Set Y} (ht : IsCompact t) {n : Set (X × Y)} (hn : IsOpen n) (hp : s ×ˢ t ⊆ n) : ∃ (u : Set X) (v : Set Y), IsOpen u ∧ IsOpen v ∧ s ⊆ u ∧ t ⊆ v ∧ u ×ˢ v ⊆ n := by rw [← hn.mem_nhdsSet, hs.nhdsSet_prod_eq ht, ((hasBasis_nhdsSet _).prod (hasBasis_nhdsSet _)).mem_iff] at hp rcases hp with ⟨⟨u, v⟩, ⟨⟨huo, hsu⟩, hvo, htv⟩, hn⟩ exact ⟨u, v, huo, hvo, hsu, htv, hn⟩ -- see Note [lower instance priority] instance (priority := 10) Subsingleton.compactSpace [Subsingleton X] : CompactSpace X := ⟨subsingleton_univ.isCompact⟩ theorem isCompact_univ_iff : IsCompact (univ : Set X) ↔ CompactSpace X := ⟨fun h => ⟨h⟩, fun h => h.1⟩ theorem isCompact_univ [h : CompactSpace X] : IsCompact (univ : Set X) := h.isCompact_univ theorem exists_clusterPt_of_compactSpace [CompactSpace X] (f : Filter X) [NeBot f] : ∃ x, ClusterPt x f := by simpa using isCompact_univ (show f ≤ 𝓟 univ by simp) nonrec theorem Ultrafilter.le_nhds_lim [CompactSpace X] (F : Ultrafilter X) : ↑F ≤ 𝓝 F.lim := by rcases isCompact_univ.ultrafilter_le_nhds F (by simp) with ⟨x, -, h⟩ exact le_nhds_lim ⟨x, h⟩ theorem CompactSpace.elim_nhds_subcover [CompactSpace X] (U : X → Set X) (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Finset X, ⋃ x ∈ t, U x = ⊤ := by obtain ⟨t, -, s⟩ := IsCompact.elim_nhds_subcover isCompact_univ U fun x _ => hU x exact ⟨t, top_unique s⟩ theorem compactSpace_of_finite_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → ⋂ i, t i = ∅ → ∃ u : Finset ι, ⋂ i ∈ u, t i = ∅) : CompactSpace X where isCompact_univ := isCompact_of_finite_subfamily_closed fun t => by simpa using h t theorem IsClosed.isCompact [CompactSpace X] (h : IsClosed s) : IsCompact s := isCompact_univ.of_isClosed_subset h (subset_univ _) /-- If a filter has a unique cluster point `y` in a compact topological space, then the filter is less than or equal to `𝓝 y`. -/ lemma le_nhds_of_unique_clusterPt [CompactSpace X] {l : Filter X} {y : X} (h : ∀ x, ClusterPt x l → x = y) : l ≤ 𝓝 y := isCompact_univ.le_nhds_of_unique_clusterPt univ_mem fun x _ ↦ h x /-- If `y` is a unique `MapClusterPt` for `f` along `l` and the codomain of `f` is a compact space, then `f` tends to `𝓝 y` along `l`. -/ lemma tendsto_nhds_of_unique_mapClusterPt [CompactSpace X] {Y} {l : Filter Y} {y : X} {f : Y → X} (h : ∀ x, MapClusterPt x l f → x = y) : Tendsto f l (𝓝 y) := le_nhds_of_unique_clusterPt h lemma noncompact_univ (X : Type) [TopologicalSpace X] [NoncompactSpace X] : ¬IsCompact (univ : Set X) := NoncompactSpace.noncompact_univ theorem IsCompact.ne_univ [NoncompactSpace X] (hs : IsCompact s) : s ≠ univ := fun h => noncompact_univ X (h ▸ hs) instance [NoncompactSpace X] : NeBot (Filter.cocompact X) := by refine Filter.hasBasis_cocompact.neBot_iff.2 fun hs => ?_ contrapose hs; rw [not_nonempty_iff_eq_empty, compl_empty_iff] at hs rw [hs]; exact noncompact_univ X @[simp] theorem Filter.cocompact_eq_bot [CompactSpace X] : Filter.cocompact X = ⊥ := Filter.hasBasis_cocompact.eq_bot_iff.mpr ⟨Set.univ, isCompact_univ, Set.compl_univ⟩ instance [NoncompactSpace X] : NeBot (Filter.coclosedCompact X) := neBot_of_le Filter.cocompact_le_coclosedCompact theorem noncompactSpace_of_neBot (_ : NeBot (Filter.cocompact X)) : NoncompactSpace X := ⟨fun h' => (Filter.nonempty_of_mem h'.compl_mem_cocompact).ne_empty compl_univ⟩ theorem Filter.cocompact_neBot_iff : NeBot (Filter.cocompact X) ↔ NoncompactSpace X := ⟨noncompactSpace_of_neBot, fun _ => inferInstance⟩ theorem not_compactSpace_iff : ¬CompactSpace X ↔ NoncompactSpace X := ⟨fun h₁ => ⟨fun h₂ => h₁ ⟨h₂⟩⟩, fun ⟨h₁⟩ ⟨h₂⟩ => h₁ h₂⟩ instance : NoncompactSpace ℤ := noncompactSpace_of_neBot <\| by simp only [Filter.cocompact_eq_cofinite, Filter.cofinite_neBot] -- Note: We can't make this into an instance because it loops with `Finite.compactSpace`. /-- A compact discrete space is finite. -/ theorem finite_of_compact_of_discrete [CompactSpace X] [DiscreteTopology X] : Finite X := Finite.of_finite_univ <\| isCompact_univ.finite_of_discrete lemma Set.Infinite.exists_accPt_cofinite_inf_principal_of_subset_isCompact {K : Set X} (hs : s.Infinite) (hK : IsCompact K) (hsub : s ⊆ K) : ∃ x ∈ K, AccPt x (cofinite ⊓ 𝓟 s) := (@hK _ hs.cofinite_inf_principal_neBot (inf_le_right.trans <\| principal_mono.2 hsub)).imp fun x hx ↦ by rwa [accPt_iff_clusterPt, inf_comm, inf_right_comm, (finite_singleton _).cofinite_inf_principal_compl] lemma Set.Infinite.exists_accPt_of_subset_isCompact {K : Set X} (hs : s.Infinite) (hK : IsCompact K) (hsub : s ⊆ K) : ∃ x ∈ K, AccPt x (𝓟 s) := let ⟨x, hxK, hx⟩ := hs.exists_accPt_cofinite_inf_principal_of_subset_isCompact hK hsub ⟨x, hxK, hx.mono inf_le_right⟩ lemma Set.Infinite.exists_accPt_cofinite_inf_principal [CompactSpace X] (hs : s.Infinite) : ∃ x, AccPt x (cofinite ⊓ 𝓟 s) := by simpa only [mem_univ, true_and] using hs.exists_accPt_cofinite_inf_principal_of_subset_isCompact isCompact_univ s.subset_univ lemma Set.Infinite.exists_accPt_principal [CompactSpace X] (hs : s.Infinite) : ∃ x, AccPt x (𝓟 s) := hs.exists_accPt_cofinite_inf_principal.imp fun _x hx ↦ hx.mono inf_le_right theorem exists_nhds_ne_neBot (X : Type) [TopologicalSpace X] [CompactSpace X] [Infinite X] : ∃ z : X, (𝓝[≠] z).NeBot := by simpa [AccPt] using (@infinite_univ X _).exists_accPt_principal theorem finite_cover_nhds_interior [CompactSpace X] {U : X → Set X} (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Finset X, ⋃ x ∈ t, interior (U x) = univ := let ⟨t, ht⟩ := isCompact_univ.elim_finite_subcover (fun x => interior (U x)) (fun _ => isOpen_interior) fun x _ => mem_iUnion.2 ⟨x, mem_interior_iff_mem_nhds.2 (hU x)⟩ ⟨t, univ_subset_iff.1 ht⟩ theorem finite_cover_nhds [CompactSpace X] {U : X → Set X} (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Finset X, ⋃ x ∈ t, U x = univ := let ⟨t, ht⟩ := finite_cover_nhds_interior hU ⟨t, univ_subset_iff.1 <\| ht.symm.subset.trans <\| iUnion₂_mono fun _ _ => interior_subset⟩ /-- The comap of the cocompact filter on `Y` by a continuous function `f : X → Y` is less than or equal to the cocompact filter on `X`. This is a reformulation of the fact that images of compact sets are compact. -/ theorem Filter.comap_cocompact_le {f : X → Y} (hf : Continuous f) : (Filter.cocompact Y).comap f ≤ Filter.cocompact X := by rw [(Filter.hasBasis_cocompact.comap f).le_basis_iff Filter.hasBasis_cocompact] intro t ht refine ⟨f '' t, ht.image hf, ?_⟩ simpa using t.subset_preimage_image f /-- If a filter is disjoint from the cocompact filter, so is its image under any continuous function. -/ theorem disjoint_map_cocompact {g : X → Y} {f : Filter X} (hg : Continuous g) (hf : Disjoint f (Filter.cocompact X)) : Disjoint (map g f) (Filter.cocompact Y) := by rw [← Filter.disjoint_comap_iff_map, disjoint_iff_inf_le] calc f ⊓ (comap g (cocompact Y)) _ ≤ f ⊓ Filter.cocompact X := inf_le_inf_left f (Filter.comap_cocompact_le hg) _ = ⊥ := disjoint_iff.mp hf theorem isCompact_range [CompactSpace X] {f : X → Y} (hf : Continuous f) : IsCompact (range f) := by rw [← image_univ]; exact isCompact_univ.image hf theorem isCompact_diagonal [CompactSpace X] : IsCompact (diagonal X) := @range_diag X ▸ isCompact_range (continuous_id.prodMk continuous_id) /-- If `X` is a compact topological space, then `Prod.snd : X × Y → Y` is a closed map. -/ theorem isClosedMap_snd_of_compactSpace [CompactSpace X] : IsClosedMap (Prod.snd : X × Y → Y) := fun s hs => by rw [← isOpen_compl_iff, isOpen_iff_mem_nhds] intro y hy have : univ ×ˢ {y} ⊆ sᶜ := by exact fun (x, y') ⟨_, rfl⟩ hs => hy ⟨(x, y'), hs, rfl⟩ rcases generalized_tube_lemma isCompact_univ isCompact_singleton hs.isOpen_compl this with ⟨U, V, -, hVo, hU, hV, hs⟩ refine mem_nhds_iff.2 ⟨V, ?_, hVo, hV rfl⟩ rintro _ hzV ⟨z, hzs, rfl⟩ exact hs ⟨hU trivial, hzV⟩ hzs /-- If `Y` is a compact topological space, then `Prod.fst : X × Y → X` is a closed map. -/ theorem isClosedMap_fst_of_compactSpace [CompactSpace Y] : IsClosedMap (Prod.fst : X × Y → X) := isClosedMap_snd_of_compactSpace.comp isClosedMap_swap theorem exists_subset_nhds_of_compactSpace [CompactSpace X] [Nonempty ι] {V : ι → Set X} (hV : Directed (· ⊇ ·) V) (hV_closed : ∀ i, IsClosed (V i)) {U : Set X} (hU : ∀ x ∈ ⋂ i, V i, U ∈ 𝓝 x) : ∃ i, V i ⊆ U := exists_subset_nhds_of_isCompact' hV (fun i => (hV_closed i).isCompact) hV_closed hU /-- If `f : X → Y` is an inducing map, the image `f '' s` of a set `s` is compact if and only if `s` is compact. -/ theorem Topology.IsInducing.isCompact_iff {f : X → Y} (hf : IsInducing f) : IsCompact s ↔ IsCompact (f '' s) := by refine ⟨fun hs => hs.image hf.continuous, fun hs F F_ne_bot F_le => ?_⟩ obtain ⟨_, ⟨x, x_in : x ∈ s, rfl⟩, hx : ClusterPt (f x) (map f F)⟩ := hs ((map_mono F_le).trans_eq map_principal) exact ⟨x, x_in, hf.mapClusterPt_iff.1 hx⟩ @[deprecated (since := "2024-10-28")] alias Inducing.isCompact_iff := IsInducing.isCompact_iff /-- If `f : X → Y` is an embedding, the image `f '' s` of a set `s` is compact if and only if `s` is compact. -/ theorem Topology.IsEmbedding.isCompact_iff {f : X → Y} (hf : IsEmbedding f) : IsCompact s ↔ IsCompact (f '' s) := hf.isInducing.isCompact_iff @[deprecated (since := "2024-10-26")] alias Embedding.isCompact_iff := IsEmbedding.isCompact_iff /-- The preimage of a compact set under an inducing map is a compact set. -/ theorem Topology.IsInducing.isCompact_preimage (hf : IsInducing f) (hf' : IsClosed (range f)) {K : Set Y} (hK : IsCompact K) : IsCompact (f ⁻¹' K) := by replace hK := hK.inter_right hf' rwa [hf.isCompact_iff, image_preimage_eq_inter_range] @[deprecated (since := "2024-10-28")] alias Inducing.isCompact_preimage := IsInducing.isCompact_preimage lemma Topology.IsInducing.isCompact_preimage_iff {f : X → Y} (hf : IsInducing f) {K : Set Y} (Kf : K ⊆ range f) : IsCompact (f ⁻¹' K) ↔ IsCompact K := by rw [hf.isCompact_iff, image_preimage_eq_of_subset Kf] @[deprecated (since := "2024-10-28")] alias Inducing.isCompact_preimage_iff := IsInducing.isCompact_preimage_iff /-- The preimage of a compact set in the image of an inducing map is compact. -/ lemma Topology.IsInducing.isCompact_preimage' (hf : IsInducing f) {K : Set Y} (hK : IsCompact K) (Kf : K ⊆ range f) : IsCompact (f ⁻¹' K) := (hf.isCompact_preimage_iff Kf).2 hK @[deprecated (since := "2024-10-28")] alias Inducing.isCompact_preimage' := IsInducing.isCompact_preimage' /-- The preimage of a compact set under a closed embedding is a compact set. -/ theorem Topology.IsClosedEmbedding.isCompact_preimage (hf : IsClosedEmbedding f) {K : Set Y} (hK : IsCompact K) : IsCompact (f ⁻¹' K) := hf.isInducing.isCompact_preimage (hf.isClosed_range) hK /-- A closed embedding is proper, ie, inverse images of compact sets are contained in compacts. Moreover, the preimage of a compact set is compact, see `IsClosedEmbedding.isCompact_preimage`. -/ theorem Topology.IsClosedEmbedding.tendsto_cocompact (hf : IsClosedEmbedding f) : Tendsto f (Filter.cocompact X) (Filter.cocompact Y) := Filter.hasBasis_cocompact.tendsto_right_iff.mpr fun _K hK => (hf.isCompact_preimage hK).compl_mem_cocompact /-- Sets of subtype are compact iff the image under a coercion is. -/ theorem Subtype.isCompact_iff {p : X → Prop} {s : Set { x // p x }} : IsCompact s ↔ IsCompact ((↑) '' s : Set X) := IsEmbedding.subtypeVal.isCompact_iff theorem isCompact_iff_isCompact_univ : IsCompact s ↔ IsCompact (univ : Set s) := by rw [Subtype.isCompact_iff, image_univ, Subtype.range_coe] theorem isCompact_iff_compactSpace : IsCompact s ↔ CompactSpace s := isCompact_iff_isCompact_univ.trans isCompact_univ_iff theorem IsCompact.finite (hs : IsCompact s) (hs' : DiscreteTopology s) : s.Finite := finite_coe_iff.mp (@finite_of_compact_of_discrete _ _ (isCompact_iff_compactSpace.mp hs) hs') theorem exists_nhds_ne_inf_principal_neBot (hs : IsCompact s) (hs' : s.Infinite) : ∃ z ∈ s, (𝓝[≠] z ⊓ 𝓟 s).NeBot := hs'.exists_accPt_of_subset_isCompact hs Subset.rfl protected theorem Topology.IsClosedEmbedding.noncompactSpace [NoncompactSpace X] {f : X → Y} (hf : IsClosedEmbedding f) : NoncompactSpace Y := noncompactSpace_of_neBot hf.tendsto_cocompact.neBot protected theorem Topology.IsClosedEmbedding.compactSpace [h : CompactSpace Y] {f : X → Y} (hf : IsClosedEmbedding f) : CompactSpace X := ⟨by rw [hf.isInducing.isCompact_iff, image_univ]; exact hf.isClosed_range.isCompact⟩ theorem IsCompact.prod {t : Set Y} (hs : IsCompact s) (ht : IsCompact t) : IsCompact (s ×ˢ t) := by rw [isCompact_iff_ultrafilter_le_nhds'] at hs ht ⊢ intro f hfs obtain ⟨x : X, sx : x ∈ s, hx : map Prod.fst f.1 ≤ 𝓝 x⟩ := hs (f.map Prod.fst) (mem_map.2 <\| mem_of_superset hfs fun x => And.left) obtain ⟨y : Y, ty : y ∈ t, hy : map Prod.snd f.1 ≤ 𝓝 y⟩ := ht (f.map Prod.snd) (mem_map.2 <\| mem_of_superset hfs fun x => And.right) rw [map_le_iff_le_comap] at hx hy refine ⟨⟨x, y⟩, ⟨sx, ty⟩, ?_⟩ rw [nhds_prod_eq]; exact le_inf hx hy /-- Finite topological spaces are compact. -/ instance (priority := 100) Finite.compactSpace [Finite X] : CompactSpace X where isCompact_univ := finite_univ.isCompact instance ULift.compactSpace [CompactSpace X] : CompactSpace (ULift.{v} X) := IsClosedEmbedding.uliftDown.compactSpace /-- The product of two compact spaces is compact. -/ instance [CompactSpace X] [CompactSpace Y] : CompactSpace (X × Y) := ⟨by rw [← univ_prod_univ]; exact isCompact_univ.prod isCompact_univ⟩ /-- The disjoint union of two compact spaces is compact. -/ instance [CompactSpace X] [CompactSpace Y] : CompactSpace (X ⊕ Y) := ⟨by rw [← range_inl_union_range_inr] exact (isCompact_range continuous_inl).union (isCompact_range continuous_inr)⟩ instance {X : ι → Type} [Finite ι] [∀ i, TopologicalSpace (X i)] [∀ i, CompactSpace (X i)] : CompactSpace (Σi, X i) := by refine ⟨?_⟩ rw [Sigma.univ] exact isCompact_iUnion fun i => isCompact_range continuous_sigmaMk /-- The coproduct of the cocompact filters on two topological spaces is the cocompact filter on their product. -/ theorem Filter.coprod_cocompact : (Filter.cocompact X).coprod (Filter.cocompact Y) = Filter.cocompact (X × Y) := by apply le_antisymm · exact sup_le (comap_cocompact_le continuous_fst) (comap_cocompact_le continuous_snd) · refine (hasBasis_cocompact.coprod hasBasis_cocompact).ge_iff.2 fun K hK ↦ ?_ rw [← univ_prod, ← prod_univ, ← compl_prod_eq_union] exact (hK.1.prod hK.2).compl_mem_cocompact theorem Prod.noncompactSpace_iff : NoncompactSpace (X × Y) ↔ NoncompactSpace X ∧ Nonempty Y ∨ Nonempty X ∧ NoncompactSpace Y := by simp [← Filter.cocompact_neBot_iff, ← Filter.coprod_cocompact, Filter.coprod_neBot_iff] -- See Note [lower instance priority] instance (priority := 100) Prod.noncompactSpace_left [NoncompactSpace X] [Nonempty Y] : NoncompactSpace (X × Y) := Prod.noncompactSpace_iff.2 (Or.inl ⟨‹_›, ‹_›⟩) -- See Note [lower instance priority] instance (priority := 100) Prod.noncompactSpace_right [Nonempty X] [NoncompactSpace Y] : NoncompactSpace (X × Y) := Prod.noncompactSpace_iff.2 (Or.inr ⟨‹_›, ‹_›⟩) section Tychonoff variable {X : ι → Type} [∀ i, TopologicalSpace (X i)] /-- Tychonoff's theorem: product of compact sets is compact. -/ theorem isCompact_pi_infinite {s : ∀ i, Set (X i)} : (∀ i, IsCompact (s i)) → IsCompact { x : ∀ i, X i \| ∀ i, x i ∈ s i } := by simp only [isCompact_iff_ultrafilter_le_nhds, nhds_pi, le_pi, le_principal_iff] intro h f hfs have : ∀ i : ι, ∃ x, x ∈ s i ∧ Tendsto (Function.eval i) f (𝓝 x) := by refine fun i => h i (f.map _) (mem_map.2 ?_) exact mem_of_superset hfs fun x hx => hx i choose x hx using this exact ⟨x, fun i => (hx i).left, fun i => (hx i).right⟩ /-- Tychonoff's theorem* formulated using `Set.pi`: product of compact sets is compact. -/ theorem isCompact_univ_pi {s : ∀ i, Set (X i)} (h : ∀ i, IsCompact (s i)) : IsCompact (pi univ s) := by convert isCompact_pi_infinite h simp only [← mem_univ_pi, setOf_mem_eq] instance Pi.compactSpace [∀ i, CompactSpace (X i)] : CompactSpace (∀ i, X i) := ⟨by rw [← pi_univ univ]; exact isCompact_univ_pi fun i => isCompact_univ⟩ instance Function.compactSpace [CompactSpace Y] : CompactSpace (ι → Y) := Pi.compactSpace lemma Pi.isCompact_iff_of_isClosed {s : Set (Π i, X i)} (hs : IsClosed s) : IsCompact s ↔ ∀ i, IsCompact (eval i '' s) := by constructor <;> intro H · exact fun i ↦ H.image <\| continuous_apply i · exact IsCompact.of_isClosed_subset (isCompact_univ_pi H) hs (subset_pi_eval_image univ s) protected lemma Pi.exists_compact_superset_iff {s : Set (Π i, X i)} : (∃ K, IsCompact K ∧ s ⊆ K) ↔ ∀ i, ∃ Ki, IsCompact Ki ∧ s ⊆ eval i ⁻¹' Ki := by constructor · intro ⟨K, hK, hsK⟩ i exact ⟨eval i '' K, hK.image <\| continuous_apply i, hsK.trans <\| K.subset_preimage_image _⟩ · intro H choose K hK hsK using H exact ⟨pi univ K, isCompact_univ_pi hK, fun _ hx i _ ↦ hsK i hx⟩ /-- Tychonoff's theorem formulated in terms of filters: `Filter.cocompact` on an indexed product type `Π d, X d` the `Filter.coprodᵢ` of filters `Filter.cocompact` on `X d`. -/ theorem Filter.coprodᵢ_cocompact {X : ι → Type*} [∀ d, TopologicalSpace (X d)] : (Filter.coprodᵢ fun d => Filter.cocompact (X d)) = Filter.cocompact (∀ d, X d) := by refine le_antisymm (iSup_le fun i => Filter.comap_cocompact_le (continuous_apply i)) ?_ refine compl_surjective.forall.2 fun s H => ?_ simp only [compl_mem_coprodᵢ, Filter.mem_cocompact, compl_subset_compl, image_subset_iff] at H ⊢ choose K hKc htK using H exact ⟨Set.pi univ K, isCompact_univ_pi hKc, fun f hf i _ => htK i hf⟩ end Tychonoff instance Quot.compactSpace {r : X → X → Prop} [CompactSpace X] : CompactSpace (Quot r) := ⟨by rw [← range_quot_mk] exact isCompact_range continuous_quot_mk⟩ instance Quotient.compactSpace {s : Setoid X} [CompactSpace X] : CompactSpace (Quotient s) := Quot.compactSpace theorem IsClosed.exists_minimal_nonempty_closed_subset [CompactSpace X] {S : Set X} (hS : IsClosed S) (hne : S.Nonempty) : ∃ V : Set X, V ⊆ S ∧ V.Nonempty ∧ IsClosed V ∧ ∀ V' : Set X, V' ⊆ V → V'.Nonempty → IsClosed V' → V' = V := by let opens := { U : Set X \| Sᶜ ⊆ U ∧ IsOpen U ∧ Uᶜ.Nonempty } obtain ⟨U, h⟩ := zorn_subset opens fun c hc hz => by by_cases hcne : c.Nonempty · obtain ⟨U₀, hU₀⟩ := hcne haveI : Nonempty { U // U ∈ c } := ⟨⟨U₀, hU₀⟩⟩ obtain ⟨U₀compl, -, -⟩ := hc hU₀ use ⋃₀ c refine ⟨⟨?_, ?_, ?_⟩, fun U hU _ hx => ⟨U, hU, hx⟩⟩ · exact fun _ hx => ⟨U₀, hU₀, U₀compl hx⟩ · exact isOpen_sUnion fun _ h => (hc h).2.1 · convert_to (⋂ U : { U // U ∈ c }, U.1ᶜ).Nonempty · ext simp only [not_exists, exists_prop, not_and, Set.mem_iInter, Subtype.forall, mem_setOf_eq, mem_compl_iff, mem_sUnion] apply IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed · rintro ⟨U, hU⟩ ⟨U', hU'⟩ obtain ⟨V, hVc, hVU, hVU'⟩ := hz.directedOn U hU U' hU' exact ⟨⟨V, hVc⟩, Set.compl_subset_compl.mpr hVU, Set.compl_subset_compl.mpr hVU'⟩ · exact fun U => (hc U.2).2.2 · exact fun U => (hc U.2).2.1.isClosed_compl.isCompact · exact fun U => (hc U.2).2.1.isClosed_compl · use Sᶜ refine ⟨⟨Set.Subset.refl _, isOpen_compl_iff.mpr hS, ?_⟩, fun U Uc => (hcne ⟨U, Uc⟩).elim⟩ rw [compl_compl] exact hne obtain ⟨Uc, Uo, Ucne⟩ := h.prop refine ⟨Uᶜ, Set.compl_subset_comm.mp Uc, Ucne, Uo.isClosed_compl, ?_⟩ intro V' V'sub V'ne V'cls have : V'ᶜ = U := by refine h.eq_of_ge ⟨?_, isOpen_compl_iff.mpr V'cls, ?_⟩ (subset_compl_comm.2 V'sub) · exact Set.Subset.trans Uc (Set.subset_compl_comm.mp V'sub) · simp only [compl_compl, V'ne] rw [← this, compl_compl] end Compact		Mathlib/Topology/Compactness/Compact.lean	1,169	1,176
/- Copyright (c) 2018 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Markus Himmel -/ import Mathlib.CategoryTheory.EpiMono import Mathlib.CategoryTheory.Limits.HasLimits /-! # Equalizers and coequalizers This file defines (co)equalizers as special cases of (co)limits. An equalizer is the categorical generalization of the subobject {a ∈ A \| f(a) = g(a)} known from abelian groups or modules. It is a limit cone over the diagram formed by `f` and `g`. A coequalizer is the dual concept. ## Main definitions * `WalkingParallelPair` is the indexing category used for (co)equalizer_diagrams * `parallelPair` is a functor from `WalkingParallelPair` to our category `C`. * a `fork` is a cone over a parallel pair. * there is really only one interesting morphism in a fork: the arrow from the vertex of the fork to the domain of f and g. It is called `fork.ι`. * an `equalizer` is now just a `limit (parallelPair f g)` Each of these has a dual. ## Main statements * `equalizer.ι_mono` states that every equalizer map is a monomorphism * `isIso_limit_cone_parallelPair_of_self` states that the identity on the domain of `f` is an equalizer of `f` and `f`. ## Implementation notes As with the other special shapes in the limits library, all the definitions here are given as `abbreviation`s of the general statements for limits, so all the `simp` lemmas and theorems about general limits can be used. ## References * [F. Borceux, Handbook of Categorical Algebra 1][borceux-vol1] -/ section open CategoryTheory Opposite namespace CategoryTheory.Limits universe v v₂ u u₂ /-- The type of objects for the diagram indexing a (co)equalizer. -/ inductive WalkingParallelPair : Type \| zero \| one deriving DecidableEq, Inhabited open WalkingParallelPair -- Don't generate unnecessary `sizeOf_spec` lemma which the `simpNF` linter will complain about. set_option genSizeOfSpec false in /-- The type family of morphisms for the diagram indexing a (co)equalizer. -/ inductive WalkingParallelPairHom : WalkingParallelPair → WalkingParallelPair → Type \| left : WalkingParallelPairHom zero one \| right : WalkingParallelPairHom zero one \| id (X : WalkingParallelPair) : WalkingParallelPairHom X X deriving DecidableEq /-- Satisfying the inhabited linter -/ instance : Inhabited (WalkingParallelPairHom zero one) where default := WalkingParallelPairHom.left open WalkingParallelPairHom /-- Composition of morphisms in the indexing diagram for (co)equalizers. -/ def WalkingParallelPairHom.comp : -- Porting note: changed X Y Z to implicit to match comp fields in precategory ∀ {X Y Z : WalkingParallelPair} (_ : WalkingParallelPairHom X Y) (_ : WalkingParallelPairHom Y Z), WalkingParallelPairHom X Z \| _, _, _, id _, h => h \| _, _, _, left, id one => left \| _, _, _, right, id one => right -- Porting note: adding these since they are simple and aesop couldn't directly prove them theorem WalkingParallelPairHom.id_comp {X Y : WalkingParallelPair} (g : WalkingParallelPairHom X Y) : comp (id X) g = g := rfl theorem WalkingParallelPairHom.comp_id {X Y : WalkingParallelPair} (f : WalkingParallelPairHom X Y) : comp f (id Y) = f := by cases f <;> rfl theorem WalkingParallelPairHom.assoc {X Y Z W : WalkingParallelPair} (f : WalkingParallelPairHom X Y) (g : WalkingParallelPairHom Y Z) (h : WalkingParallelPairHom Z W) : comp (comp f g) h = comp f (comp g h) := by cases f <;> cases g <;> cases h <;> rfl instance walkingParallelPairHomCategory : SmallCategory WalkingParallelPair where Hom := WalkingParallelPairHom id := id comp := comp comp_id := comp_id id_comp := id_comp assoc := assoc @[simp] theorem walkingParallelPairHom_id (X : WalkingParallelPair) : WalkingParallelPairHom.id X = 𝟙 X := rfl /-- The functor `WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ` sending left to left and right to right. -/ def walkingParallelPairOp : WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ where obj x := op <\| by cases x; exacts [one, zero] map f := by cases f <;> apply Quiver.Hom.op exacts [left, right, WalkingParallelPairHom.id _] map_comp := by rintro _ _ _ (_\|_\|_) g <;> cases g <;> rfl @[simp] theorem walkingParallelPairOp_zero : walkingParallelPairOp.obj zero = op one := rfl @[simp] theorem walkingParallelPairOp_one : walkingParallelPairOp.obj one = op zero := rfl @[simp] theorem walkingParallelPairOp_left : walkingParallelPairOp.map left = @Quiver.Hom.op _ _ zero one left := rfl @[simp] theorem walkingParallelPairOp_right : walkingParallelPairOp.map right = @Quiver.Hom.op _ _ zero one right := rfl /-- The equivalence `WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ` sending left to left and right to right. -/ @[simps functor inverse] def walkingParallelPairOpEquiv : WalkingParallelPair ≌ WalkingParallelPairᵒᵖ where functor := walkingParallelPairOp inverse := walkingParallelPairOp.leftOp unitIso := NatIso.ofComponents (fun j => eqToIso (by cases j <;> rfl)) (by rintro _ _ (_ \| _ \| _) <;> simp) counitIso := NatIso.ofComponents (fun j => eqToIso (by induction' j with X cases X <;> rfl)) (fun {i} {j} f => by induction' i with i induction' j with j let g := f.unop have : f = g.op := rfl rw [this] cases i <;> cases j <;> cases g <;> rfl) functor_unitIso_comp := fun j => by cases j <;> rfl @[simp] theorem walkingParallelPairOpEquiv_unitIso_zero : walkingParallelPairOpEquiv.unitIso.app zero = Iso.refl zero := rfl @[simp] theorem walkingParallelPairOpEquiv_unitIso_one : walkingParallelPairOpEquiv.unitIso.app one = Iso.refl one := rfl @[simp] theorem walkingParallelPairOpEquiv_counitIso_zero : walkingParallelPairOpEquiv.counitIso.app (op zero) = Iso.refl (op zero) := rfl @[simp] theorem walkingParallelPairOpEquiv_counitIso_one : walkingParallelPairOpEquiv.counitIso.app (op one) = Iso.refl (op one) := rfl variable {C : Type u} [Category.{v} C] variable {X Y : C} /-- `parallelPair f g` is the diagram in `C` consisting of the two morphisms `f` and `g` with common domain and codomain. -/ def parallelPair (f g : X ⟶ Y) : WalkingParallelPair ⥤ C where obj x := match x with \| zero => X \| one => Y map h := match h with \| WalkingParallelPairHom.id _ => 𝟙 _ \| left => f \| right => g -- `sorry` can cope with this, but it's too slow: map_comp := by rintro _ _ _ ⟨⟩ g <;> cases g <;> {dsimp; simp} @[simp] theorem parallelPair_obj_zero (f g : X ⟶ Y) : (parallelPair f g).obj zero = X := rfl @[simp] theorem parallelPair_obj_one (f g : X ⟶ Y) : (parallelPair f g).obj one = Y := rfl @[simp] theorem parallelPair_map_left (f g : X ⟶ Y) : (parallelPair f g).map left = f := rfl @[simp] theorem parallelPair_map_right (f g : X ⟶ Y) : (parallelPair f g).map right = g := rfl @[simp] theorem parallelPair_functor_obj {F : WalkingParallelPair ⥤ C} (j : WalkingParallelPair) : (parallelPair (F.map left) (F.map right)).obj j = F.obj j := by cases j <;> rfl /-- Every functor indexing a (co)equalizer is naturally isomorphic (actually, equal) to a `parallelPair` -/ @[simps!] def diagramIsoParallelPair (F : WalkingParallelPair ⥤ C) : F ≅ parallelPair (F.map left) (F.map right) := NatIso.ofComponents (fun j => eqToIso <\| by cases j <;> rfl) (by rintro _ _ (_\|_\|_) <;> simp) /-- Construct a morphism between parallel pairs. -/ def parallelPairHom {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : parallelPair f g ⟶ parallelPair f' g' where app j := match j with \| zero => p \| one => q naturality := by rintro _ _ ⟨⟩ <;> {dsimp; simp [wf,wg]} @[simp] theorem parallelPairHom_app_zero {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : (parallelPairHom f g f' g' p q wf wg).app zero = p := rfl @[simp] theorem parallelPairHom_app_one {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : (parallelPairHom f g f' g' p q wf wg).app one = q := rfl /-- Construct a natural isomorphism between functors out of the walking parallel pair from its components. -/ @[simps!] def parallelPair.ext {F G : WalkingParallelPair ⥤ C} (zero : F.obj zero ≅ G.obj zero) (one : F.obj one ≅ G.obj one) (left : F.map left ≫ one.hom = zero.hom ≫ G.map left) (right : F.map right ≫ one.hom = zero.hom ≫ G.map right) : F ≅ G := NatIso.ofComponents (by rintro ⟨j⟩ exacts [zero, one]) (by rintro _ _ ⟨_⟩ <;> simp [left, right]) /-- Construct a natural isomorphism between `parallelPair f g` and `parallelPair f' g'` given equalities `f = f'` and `g = g'`. -/ @[simps!] def parallelPair.eqOfHomEq {f g f' g' : X ⟶ Y} (hf : f = f') (hg : g = g') : parallelPair f g ≅ parallelPair f' g' := parallelPair.ext (Iso.refl _) (Iso.refl _) (by simp [hf]) (by simp [hg]) /-- A fork on `f` and `g` is just a `Cone (parallelPair f g)`. -/ abbrev Fork (f g : X ⟶ Y) := Cone (parallelPair f g) /-- A cofork on `f` and `g` is just a `Cocone (parallelPair f g)`. -/ abbrev Cofork (f g : X ⟶ Y) := Cocone (parallelPair f g) variable {f g : X ⟶ Y} /-- A fork `t` on the parallel pair `f g : X ⟶ Y` consists of two morphisms `t.π.app zero : t.pt ⟶ X` and `t.π.app one : t.pt ⟶ Y`. Of these, only the first one is interesting, and we give it the shorter name `Fork.ι t`. -/ def Fork.ι (t : Fork f g) := t.π.app zero @[simp] theorem Fork.app_zero_eq_ι (t : Fork f g) : t.π.app zero = t.ι := rfl /-- A cofork `t` on the parallelPair `f g : X ⟶ Y` consists of two morphisms `t.ι.app zero : X ⟶ t.pt` and `t.ι.app one : Y ⟶ t.pt`. Of these, only the second one is interesting, and we give it the shorter name `Cofork.π t`. -/ def Cofork.π (t : Cofork f g) := t.ι.app one @[simp] theorem Cofork.app_one_eq_π (t : Cofork f g) : t.ι.app one = t.π := rfl @[simp] theorem Fork.app_one_eq_ι_comp_left (s : Fork f g) : s.π.app one = s.ι ≫ f := by rw [← s.app_zero_eq_ι, ← s.w left, parallelPair_map_left] @[reassoc] theorem Fork.app_one_eq_ι_comp_right (s : Fork f g) : s.π.app one = s.ι ≫ g := by rw [← s.app_zero_eq_ι, ← s.w right, parallelPair_map_right] @[simp] theorem Cofork.app_zero_eq_comp_π_left (s : Cofork f g) : s.ι.app zero = f ≫ s.π := by rw [← s.app_one_eq_π, ← s.w left, parallelPair_map_left] @[reassoc] theorem Cofork.app_zero_eq_comp_π_right (s : Cofork f g) : s.ι.app zero = g ≫ s.π := by rw [← s.app_one_eq_π, ← s.w right, parallelPair_map_right] /-- A fork on `f g : X ⟶ Y` is determined by the morphism `ι : P ⟶ X` satisfying `ι ≫ f = ι ≫ g`. -/ @[simps] def Fork.ofι {P : C} (ι : P ⟶ X) (w : ι ≫ f = ι ≫ g) : Fork f g where pt := P π := { app := fun X => by cases X · exact ι · exact ι ≫ f naturality := fun {X} {Y} f => by cases X <;> cases Y <;> cases f <;> dsimp <;> simp; assumption } /-- A cofork on `f g : X ⟶ Y` is determined by the morphism `π : Y ⟶ P` satisfying `f ≫ π = g ≫ π`. -/ @[simps] def Cofork.ofπ {P : C} (π : Y ⟶ P) (w : f ≫ π = g ≫ π) : Cofork f g where pt := P ι := { app := fun X => WalkingParallelPair.casesOn X (f ≫ π) π naturality := fun i j f => by cases f <;> dsimp <;> simp [w] } -- See note [dsimp, simp] @[simp] theorem Fork.ι_ofι {P : C} (ι : P ⟶ X) (w : ι ≫ f = ι ≫ g) : (Fork.ofι ι w).ι = ι := rfl @[simp] theorem Cofork.π_ofπ {P : C} (π : Y ⟶ P) (w : f ≫ π = g ≫ π) : (Cofork.ofπ π w).π = π := rfl @[reassoc (attr := simp)] theorem Fork.condition (t : Fork f g) : t.ι ≫ f = t.ι ≫ g := by rw [← t.app_one_eq_ι_comp_left, ← t.app_one_eq_ι_comp_right] @[reassoc (attr := simp)] theorem Cofork.condition (t : Cofork f g) : f ≫ t.π = g ≫ t.π := by rw [← t.app_zero_eq_comp_π_left, ← t.app_zero_eq_comp_π_right] /-- To check whether two maps are equalized by both maps of a fork, it suffices to check it for the first map -/ theorem Fork.equalizer_ext (s : Fork f g) {W : C} {k l : W ⟶ s.pt} (h : k ≫ s.ι = l ≫ s.ι) : ∀ j : WalkingParallelPair, k ≫ s.π.app j = l ≫ s.π.app j \| zero => h \| one => by have : k ≫ ι s ≫ f = l ≫ ι s ≫ f := by simp only [← Category.assoc]; exact congrArg (· ≫ f) h rw [s.app_one_eq_ι_comp_left, this] /-- To check whether two maps are coequalized by both maps of a cofork, it suffices to check it for the second map -/ theorem Cofork.coequalizer_ext (s : Cofork f g) {W : C} {k l : s.pt ⟶ W} (h : Cofork.π s ≫ k = Cofork.π s ≫ l) : ∀ j : WalkingParallelPair, s.ι.app j ≫ k = s.ι.app j ≫ l \| zero => by simp only [s.app_zero_eq_comp_π_left, Category.assoc, h] \| one => h theorem Fork.IsLimit.hom_ext {s : Fork f g} (hs : IsLimit s) {W : C} {k l : W ⟶ s.pt} (h : k ≫ Fork.ι s = l ≫ Fork.ι s) : k = l := hs.hom_ext <\| Fork.equalizer_ext _ h theorem Cofork.IsColimit.hom_ext {s : Cofork f g} (hs : IsColimit s) {W : C} {k l : s.pt ⟶ W} (h : Cofork.π s ≫ k = Cofork.π s ≫ l) : k = l := hs.hom_ext <\| Cofork.coequalizer_ext _ h @[reassoc (attr := simp)] theorem Fork.IsLimit.lift_ι {s t : Fork f g} (hs : IsLimit s) : hs.lift t ≫ s.ι = t.ι := hs.fac _ _ @[reassoc (attr := simp)] theorem Cofork.IsColimit.π_desc {s t : Cofork f g} (hs : IsColimit s) : s.π ≫ hs.desc t = t.π := hs.fac _ _ -- Porting note: `Fork.IsLimit.lift` was added in order to ease the port /-- If `s` is a limit fork over `f` and `g`, then a morphism `k : W ⟶ X` satisfying `k ≫ f = k ≫ g` induces a morphism `l : W ⟶ s.pt` such that `l ≫ fork.ι s = k`. -/ def Fork.IsLimit.lift {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : W ⟶ s.pt := hs.lift (Fork.ofι _ h) @[reassoc (attr := simp)] lemma Fork.IsLimit.lift_ι' {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : Fork.IsLimit.lift hs k h ≫ Fork.ι s = k := hs.fac _ _ /-- If `s` is a limit fork over `f` and `g`, then a morphism `k : W ⟶ X` satisfying `k ≫ f = k ≫ g` induces a morphism `l : W ⟶ s.pt` such that `l ≫ fork.ι s = k`. -/ def Fork.IsLimit.lift' {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : { l : W ⟶ s.pt // l ≫ Fork.ι s = k } := ⟨Fork.IsLimit.lift hs k h, by simp⟩ -- Porting note: `Cofork.IsColimit.desc` was added in order to ease the port /-- If `s` is a colimit cofork over `f` and `g`, then a morphism `k : Y ⟶ W` satisfying `f ≫ k = g ≫ k` induces a morphism `l : s.pt ⟶ W` such that `cofork.π s ≫ l = k`. -/ def Cofork.IsColimit.desc {s : Cofork f g} (hs : IsColimit s) {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : s.pt ⟶ W := hs.desc (Cofork.ofπ _ h)	@[reassoc (attr := simp)] lemma Cofork.IsColimit.π_desc' {s : Cofork f g} (hs : IsColimit s) {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : Cofork.π s ≫ Cofork.IsColimit.desc hs k h = k := hs.fac _ _ /-- If `s` is a colimit cofork over `f` and `g`, then a morphism `k : Y ⟶ W` satisfying `f ≫ k = g ≫ k` induces a morphism `l : s.pt ⟶ W` such that `cofork.π s ≫ l = k`. -/	Mathlib/CategoryTheory/Limits/Shapes/Equalizers.lean	403	409
/- Copyright (c) 2020 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen -/ import Mathlib.RingTheory.IntegralClosure.IntegrallyClosed import Mathlib.RingTheory.Localization.NumDen import Mathlib.RingTheory.Polynomial.ScaleRoots /-! # Rational root theorem and integral root theorem This file contains the rational root theorem and integral root theorem. The rational root theorem (`num_dvd_of_is_root` and `den_dvd_of_is_root`) for a unique factorization domain `A` with localization `S`, states that the roots of `p : A[X]` in `A`'s field of fractions are of the form `x / y` with `x y : A`, `x ∣ p.coeff 0` and `y ∣ p.leadingCoeff`. The corollary is the integral root theorem `isInteger_of_is_root_of_monic`: if `p` is monic, its roots must be integers. Finally, we use this to show unique factorization domains are integrally closed. ## References * https://en.wikipedia.org/wiki/Rational_root_theorem -/ open scoped Polynomial section ScaleRoots variable {A K R S : Type} [CommRing A] [Field K] [CommRing R] [CommRing S] variable {M : Submonoid A} [Algebra A S] [IsLocalization M S] [Algebra A K] [IsFractionRing A K] open Finsupp IsFractionRing IsLocalization Polynomial theorem scaleRoots_aeval_eq_zero_of_aeval_mk'_eq_zero {p : A[X]} {r : A} {s : M} (hr : aeval (mk' S r s) p = 0) : aeval (algebraMap A S r) (scaleRoots p s) = 0 := by convert scaleRoots_eval₂_eq_zero (algebraMap A S) hr -- Porting note: added funext rw [aeval_def, mk'_spec' _ r s] variable [IsDomain A] theorem num_isRoot_scaleRoots_of_aeval_eq_zero [UniqueFactorizationMonoid A] {p : A[X]} {x : K} (hr : aeval x p = 0) : IsRoot (scaleRoots p (den A x)) (num A x) := by apply isRoot_of_eval₂_map_eq_zero (IsFractionRing.injective A K) refine scaleRoots_aeval_eq_zero_of_aeval_mk'_eq_zero ?_ rw [mk'_num_den] exact hr end ScaleRoots section RationalRootTheorem variable {A K : Type} [CommRing A] [IsDomain A] [UniqueFactorizationMonoid A] [Field K] variable [Algebra A K] [IsFractionRing A K] open IsFractionRing IsLocalization Polynomial UniqueFactorizationMonoid /-- Rational root theorem part 1: if `r : f.codomain` is a root of a polynomial over the ufd `A`, then the numerator of `r` divides the constant coefficient -/ theorem num_dvd_of_is_root {p : A[X]} {r : K} (hr : aeval r p = 0) : num A r ∣ p.coeff 0 := by suffices num A r ∣ (scaleRoots p (den A r)).coeff 0 by simp only [coeff_scaleRoots, tsub_zero] at this haveI inst := Classical.propDecidable by_cases hr : num A r = 0 · simp_all [nonZeroDivisors.coe_ne_zero] · refine dvd_of_dvd_mul_left_of_no_prime_factors hr ?_ this intro q dvd_num dvd_denom_pow hq apply hq.not_unit exact num_den_reduced A r dvd_num (hq.dvd_of_dvd_pow dvd_denom_pow) convert dvd_term_of_isRoot_of_dvd_terms 0 (num_isRoot_scaleRoots_of_aeval_eq_zero hr) _ · rw [pow_zero, mul_one] intro j hj apply dvd_mul_of_dvd_right convert pow_dvd_pow (num A r) (Nat.succ_le_of_lt (bot_lt_iff_ne_bot.mpr hj)) exact (pow_one _).symm /-- Rational root theorem part 2: if `r : f.codomain` is a root of a polynomial over the ufd `A`, then the denominator of `r` divides the leading coefficient -/ theorem den_dvd_of_is_root {p : A[X]} {r : K} (hr : aeval r p = 0) : (den A r : A) ∣ p.leadingCoeff := by suffices (den A r : A) ∣ p.leadingCoeff * num A r ^ p.natDegree by refine dvd_of_dvd_mul_left_of_no_prime_factors (mem_nonZeroDivisors_iff_ne_zero.mp (den A r).2) ?_ this	intro q dvd_den dvd_num_pow hq apply hq.not_unit exact num_den_reduced A r (hq.dvd_of_dvd_pow dvd_num_pow) dvd_den rw [← coeff_scaleRoots_natDegree] apply dvd_term_of_isRoot_of_dvd_terms _ (num_isRoot_scaleRoots_of_aeval_eq_zero hr) intro j hj by_cases h : j < p.natDegree · rw [coeff_scaleRoots] refine (dvd_mul_of_dvd_right ?_ _).mul_right _ convert pow_dvd_pow (den A r : A) (Nat.succ_le_iff.mpr (lt_tsub_iff_left.mpr _)) · exact (pow_one _).symm simpa using h rw [← natDegree_scaleRoots p (den A r)] at * rw [coeff_eq_zero_of_natDegree_lt (lt_of_le_of_ne (le_of_not_gt h) hj.symm), zero_mul] exact dvd_zero _ /-- Integral root theorem: if `r : f.codomain` is a root of a monic polynomial over the ufd `A`, then `r` is an integer -/ theorem isInteger_of_is_root_of_monic {p : A[X]} (hp : Monic p) {r : K} (hr : aeval r p = 0) : IsInteger A r :=	Mathlib/RingTheory/Polynomial/RationalRoot.lean	92	113

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