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/- Copyright (c) 2021 Kyle Miller. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kyle Miller -/ import Mathlib.CategoryTheory.Filtered.Basic import Mathlib.Topology.Category.TopCat.Limits.Basic /-! # Topological Kőnig's lemma A topological version of Kőnig's lemma is that the inverse limit of nonempty compact Hausdorff spaces is nonempty. (Note: this can be generalized further to inverse limits of nonempty compact T0 spaces, where all the maps are closed maps; see [Stone1979] --- however there is an erratum for Theorem 4 that the element in the inverse limit can have cofinally many components that are not closed points.) We give this in a more general form, which is that cofiltered limits of nonempty compact Hausdorff spaces are nonempty (`nonempty_limitCone_of_compact_t2_cofiltered_system`). This also applies to inverse limits, where `{J : Type u} [Preorder J] [IsDirected J (≤)]` and `F : Jᵒᵖ ⥤ TopCat`. The theorem is specialized to nonempty finite types (which are compact Hausdorff with the discrete topology) in lemmas `nonempty_sections_of_finite_cofiltered_system` and `nonempty_sections_of_finite_inverse_system` in the file `Mathlib.CategoryTheory.CofilteredSystem`. (See <https://stacks.math.columbia.edu/tag/086J> for the Set version.) -/ open CategoryTheory open CategoryTheory.Limits universe v u w noncomputable section namespace TopCat section TopologicalKonig variable {J : Type u} [SmallCategory J] variable (F : J ⥤ TopCat.{v}) private abbrev FiniteDiagramArrow {J : Type u} [SmallCategory J] (G : Finset J) := Σ' (X Y : J) (_ : X ∈ G) (_ : Y ∈ G), X ⟶ Y private abbrev FiniteDiagram (J : Type u) [SmallCategory J] := Σ G : Finset J, Finset (FiniteDiagramArrow G) /-- Partial sections of a cofiltered limit are sections when restricted to a finite subset of objects and morphisms of `J`. -/ def partialSections {J : Type u} [SmallCategory J] (F : J ⥤ TopCat.{v}) {G : Finset J} (H : Finset (FiniteDiagramArrow G)) : Set (∀ j, F.obj j) := {u \| ∀ {f : FiniteDiagramArrow G} (_ : f ∈ H), F.map f.2.2.2.2 (u f.1) = u f.2.1} theorem partialSections.nonempty [IsCofilteredOrEmpty J] [h : ∀ j : J, Nonempty (F.obj j)] {G : Finset J} (H : Finset (FiniteDiagramArrow G)) : (partialSections F H).Nonempty := by classical cases isEmpty_or_nonempty J · exact ⟨isEmptyElim, fun {j} => IsEmpty.elim' inferInstance j.1⟩ haveI : IsCofiltered J := ⟨⟩ use fun j : J => if hj : j ∈ G then F.map (IsCofiltered.infTo G H hj) (h (IsCofiltered.inf G H)).some else (h _).some rintro ⟨X, Y, hX, hY, f⟩ hf dsimp only rwa [dif_pos hX, dif_pos hY, ← comp_app, ← F.map_comp, @IsCofiltered.infTo_commutes _ _ _ G H] theorem partialSections.directed : Directed Superset fun G : FiniteDiagram J => partialSections F G.2 := by classical intro A B let ιA : FiniteDiagramArrow A.1 → FiniteDiagramArrow (A.1 ⊔ B.1) := fun f => ⟨f.1, f.2.1, Finset.mem_union_left _ f.2.2.1, Finset.mem_union_left _ f.2.2.2.1, f.2.2.2.2⟩ let ιB : FiniteDiagramArrow B.1 → FiniteDiagramArrow (A.1 ⊔ B.1) := fun f => ⟨f.1, f.2.1, Finset.mem_union_right _ f.2.2.1, Finset.mem_union_right _ f.2.2.2.1, f.2.2.2.2⟩ refine ⟨⟨A.1 ⊔ B.1, A.2.image ιA ⊔ B.2.image ιB⟩, ?_, ?_⟩ · rintro u hu f hf have : ιA f ∈ A.2.image ιA ⊔ B.2.image ιB := by apply Finset.mem_union_left rw [Finset.mem_image] exact ⟨f, hf, rfl⟩ exact hu this · rintro u hu f hf have : ιB f ∈ A.2.image ιA ⊔ B.2.image ιB := by apply Finset.mem_union_right rw [Finset.mem_image] exact ⟨f, hf, rfl⟩ exact hu this theorem partialSections.closed [∀ j : J, T2Space (F.obj j)] {G : Finset J} (H : Finset (FiniteDiagramArrow G)) : IsClosed (partialSections F H) := by have : partialSections F H = ⋂ (f : FiniteDiagramArrow G) (_ : f ∈ H), {u \| F.map f.2.2.2.2 (u f.1) = u f.2.1} := by ext1 simp only [Set.mem_iInter, Set.mem_setOf_eq] rfl rw [this] apply isClosed_biInter	intro f _ apply isClosed_eq <;> fun_prop /-- Cofiltered limits of nonempty compact Hausdorff spaces are nonempty topological spaces. -/ theorem nonempty_limitCone_of_compact_t2_cofiltered_system (F : J ⥤ TopCat.{max v u}) [IsCofilteredOrEmpty J] [∀ j : J, Nonempty (F.obj j)] [∀ j : J, CompactSpace (F.obj j)] [∀ j : J, T2Space (F.obj j)] : Nonempty (TopCat.limitCone F).pt := by classical obtain ⟨u, hu⟩ := IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed (fun G => partialSections F _) (partialSections.directed F) (fun G => partialSections.nonempty F _) (fun G => IsClosed.isCompact (partialSections.closed F _)) fun G => partialSections.closed F _ use u intro X Y f let G : FiniteDiagram J :=	Mathlib/Topology/Category/TopCat/Limits/Konig.lean	106	123
/- Copyright (c) 2021 Arthur Paulino. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Arthur Paulino, Kyle Miller -/ import Mathlib.Combinatorics.SimpleGraph.Clique import Mathlib.Data.ENat.Lattice import Mathlib.Data.Nat.Lattice import Mathlib.Data.Setoid.Partition import Mathlib.Order.Antichain import Mathlib.Data.Nat.Cast.Order.Ring /-! # Graph Coloring This module defines colorings of simple graphs (also known as proper colorings in the literature). A graph coloring is the attribution of "colors" to all of its vertices such that adjacent vertices have different colors. A coloring can be represented as a homomorphism into a complete graph, whose vertices represent the colors. ## Main definitions * `G.Coloring α` is the type of `α`-colorings of a simple graph `G`, with `α` being the set of available colors. The type is defined to be homomorphisms from `G` into the complete graph on `α`, and colorings have a coercion to `V → α`. * `G.Colorable n` is the proposition that `G` is `n`-colorable, which is whether there exists a coloring with at most n colors. * `G.chromaticNumber` is the minimal `n` such that `G` is `n`-colorable, or `⊤` if it cannot be colored with finitely many colors. (Cardinal-valued chromatic numbers are more niche, so we stick to `ℕ∞`.) We write `G.chromaticNumber ≠ ⊤` to mean a graph is colorable with finitely many colors. * `C.colorClass c` is the set of vertices colored by `c : α` in the coloring `C : G.Coloring α`. * `C.colorClasses` is the set containing all color classes. ## TODO * Gather material from: * https://github.com/leanprover-community/mathlib/blob/simple_graph_matching/src/combinatorics/simple_graph/coloring.lean * https://github.com/kmill/lean-graphcoloring/blob/master/src/graph.lean * Trees * Planar graphs * Chromatic polynomials * develop API for partial colorings, likely as colorings of subgraphs (`H.coe.Coloring α`) -/ assert_not_exists Field open Fintype Function universe u v namespace SimpleGraph variable {V : Type u} (G : SimpleGraph V) {n : ℕ} /-- An `α`-coloring of a simple graph `G` is a homomorphism of `G` into the complete graph on `α`. This is also known as a proper coloring. -/ abbrev Coloring (α : Type v) := G →g (⊤ : SimpleGraph α) variable {G} variable {α β : Type} (C : G.Coloring α) theorem Coloring.valid {v w : V} (h : G.Adj v w) : C v ≠ C w := C.map_rel h /-- Construct a term of `SimpleGraph.Coloring` using a function that assigns vertices to colors and a proof that it is as proper coloring. (Note: this is a definitionally the constructor for `SimpleGraph.Hom`, but with a syntactically better proper coloring hypothesis.) -/ @[match_pattern] def Coloring.mk (color : V → α) (valid : ∀ {v w : V}, G.Adj v w → color v ≠ color w) : G.Coloring α := ⟨color, @valid⟩ /-- The color class of a given color. -/ def Coloring.colorClass (c : α) : Set V := { v : V \| C v = c } /-- The set containing all color classes. -/ def Coloring.colorClasses : Set (Set V) := (Setoid.ker C).classes theorem Coloring.mem_colorClass (v : V) : v ∈ C.colorClass (C v) := rfl theorem Coloring.colorClasses_isPartition : Setoid.IsPartition C.colorClasses := Setoid.isPartition_classes (Setoid.ker C) theorem Coloring.mem_colorClasses {v : V} : C.colorClass (C v) ∈ C.colorClasses := ⟨v, rfl⟩ theorem Coloring.colorClasses_finite [Finite α] : C.colorClasses.Finite := Setoid.finite_classes_ker _ theorem Coloring.card_colorClasses_le [Fintype α] [Fintype C.colorClasses] : Fintype.card C.colorClasses ≤ Fintype.card α := by simp only [colorClasses] convert Setoid.card_classes_ker_le C theorem Coloring.not_adj_of_mem_colorClass {c : α} {v w : V} (hv : v ∈ C.colorClass c) (hw : w ∈ C.colorClass c) : ¬G.Adj v w := fun h => C.valid h (Eq.trans hv (Eq.symm hw)) theorem Coloring.color_classes_independent (c : α) : IsAntichain G.Adj (C.colorClass c) := fun _ hv _ hw _ => C.not_adj_of_mem_colorClass hv hw -- TODO make this computable noncomputable instance [Fintype V] [Fintype α] : Fintype (Coloring G α) := by classical change Fintype (RelHom G.Adj (⊤ : SimpleGraph α).Adj) apply Fintype.ofInjective _ RelHom.coe_fn_injective variable (G) /-- Whether a graph can be colored by at most `n` colors. -/ def Colorable (n : ℕ) : Prop := Nonempty (G.Coloring (Fin n)) /-- The coloring of an empty graph. -/ def coloringOfIsEmpty [IsEmpty V] : G.Coloring α := Coloring.mk isEmptyElim fun {v} => isEmptyElim v theorem colorable_of_isEmpty [IsEmpty V] (n : ℕ) : G.Colorable n := ⟨G.coloringOfIsEmpty⟩ theorem isEmpty_of_colorable_zero (h : G.Colorable 0) : IsEmpty V := by constructor intro v obtain ⟨i, hi⟩ := h.some v exact Nat.not_lt_zero _ hi @[simp] lemma colorable_zero_iff : G.Colorable 0 ↔ IsEmpty V := ⟨G.isEmpty_of_colorable_zero, fun _ ↦ G.colorable_of_isEmpty 0⟩ /-- The "tautological" coloring of a graph, using the vertices of the graph as colors. -/ def selfColoring : G.Coloring V := Coloring.mk id fun {_ _} => G.ne_of_adj /-- The chromatic number of a graph is the minimal number of colors needed to color it. This is `⊤` (infinity) iff `G` isn't colorable with finitely many colors. If `G` is colorable, then `ENat.toNat G.chromaticNumber` is the `ℕ`-valued chromatic number. -/ noncomputable def chromaticNumber : ℕ∞ := ⨅ n ∈ setOf G.Colorable, (n : ℕ∞) lemma chromaticNumber_eq_biInf {G : SimpleGraph V} : G.chromaticNumber = ⨅ n ∈ setOf G.Colorable, (n : ℕ∞) := rfl lemma chromaticNumber_eq_iInf {G : SimpleGraph V} : G.chromaticNumber = ⨅ n : {m \| G.Colorable m}, (n : ℕ∞) := by rw [chromaticNumber, iInf_subtype] lemma Colorable.chromaticNumber_eq_sInf {G : SimpleGraph V} {n} (h : G.Colorable n) : G.chromaticNumber = sInf {n' : ℕ \| G.Colorable n'} := by rw [ENat.coe_sInf, chromaticNumber] exact ⟨_, h⟩ /-- Given an embedding, there is an induced embedding of colorings. -/ def recolorOfEmbedding {α β : Type} (f : α ↪ β) : G.Coloring α ↪ G.Coloring β where toFun C := (Embedding.completeGraph f).toHom.comp C inj' := by -- this was strangely painful; seems like missing lemmas about embeddings intro C C' h dsimp only at h ext v apply (Embedding.completeGraph f).inj'	change ((Embedding.completeGraph f).toHom.comp C) v = _ rw [h] rfl	Mathlib/Combinatorics/SimpleGraph/Coloring.lean	173	175
/- Copyright (c) 2024 David Loeffler. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Loeffler -/ import Mathlib.NumberTheory.LSeries.AbstractFuncEq import Mathlib.NumberTheory.ModularForms.JacobiTheta.Bounds import Mathlib.Analysis.SpecialFunctions.Gamma.Deligne import Mathlib.NumberTheory.LSeries.MellinEqDirichlet import Mathlib.NumberTheory.LSeries.Basic import Mathlib.Analysis.Complex.RemovableSingularity /-! # Even Hurwitz zeta functions In this file we study the functions on `ℂ` which are the meromorphic continuation of the following series (convergent for `1 < re s`), where `a ∈ ℝ` is a parameter: `hurwitzZetaEven a s = 1 / 2 * ∑' n : ℤ, 1 / \|n + a\| ^ s` and `cosZeta a s = ∑' n : ℕ, cos (2 * π * a * n) / \|n\| ^ s`. Note that the term for `n = -a` in the first sum is omitted if `a` is an integer, and the term for `n = 0` is omitted in the second sum (always). Of course, we cannot define these functions by the above formulae (since existence of the meromorphic continuation is not at all obvious); we in fact construct them as Mellin transforms of various versions of the Jacobi theta function. We also define completed versions of these functions with nicer functional equations (satisfying `completedHurwitzZetaEven a s = Gammaℝ s * hurwitzZetaEven a s`, and similarly for `cosZeta`); and modified versions with a subscript `0`, which are entire functions differing from the above by multiples of `1 / s` and `1 / (1 - s)`. ## Main definitions and theorems * `hurwitzZetaEven` and `cosZeta`: the zeta functions * `completedHurwitzZetaEven` and `completedCosZeta`: completed variants * `differentiableAt_hurwitzZetaEven` and `differentiableAt_cosZeta`: differentiability away from `s = 1` * `completedHurwitzZetaEven_one_sub`: the functional equation `completedHurwitzZetaEven a (1 - s) = completedCosZeta a s` * `hasSum_int_hurwitzZetaEven` and `hasSum_nat_cosZeta`: relation between the zeta functions and the corresponding Dirichlet series for `1 < re s`. -/ noncomputable section open Complex Filter Topology Asymptotics Real Set MeasureTheory namespace HurwitzZeta section kernel_defs /-! ## Definitions and elementary properties of kernels -/ /-- Even Hurwitz zeta kernel (function whose Mellin transform will be the even part of the completed Hurwit zeta function). See `evenKernel_def` for the defining formula, and `hasSum_int_evenKernel` for an expression as a sum over `ℤ`. -/ @[irreducible] def evenKernel (a : UnitAddCircle) (x : ℝ) : ℝ := (show Function.Periodic (fun ξ : ℝ ↦ rexp (-π * ξ ^ 2 * x) * re (jacobiTheta₂ (ξ * I * x) (I * x))) 1 by intro ξ simp only [ofReal_add, ofReal_one, add_mul, one_mul, jacobiTheta₂_add_left'] have : cexp (-↑π * I * ((I * ↑x) + 2 * (↑ξ * I * ↑x))) = rexp (π * (x + 2 * ξ * x)) := by ring_nf simp [I_sq] rw [this, re_ofReal_mul, ← mul_assoc, ← Real.exp_add] congr ring).lift a lemma evenKernel_def (a x : ℝ) : ↑(evenKernel ↑a x) = cexp (-π * a ^ 2 * x) * jacobiTheta₂ (a * I * x) (I * x) := by simp [evenKernel, re_eq_add_conj, jacobiTheta₂_conj, ← mul_two, mul_div_cancel_right₀ _ (two_ne_zero' ℂ)] /-- For `x ≤ 0` the defining sum diverges, so the kernel is 0. -/ lemma evenKernel_undef (a : UnitAddCircle) {x : ℝ} (hx : x ≤ 0) : evenKernel a x = 0 := by induction a using QuotientAddGroup.induction_on with \| H a' => simp [← ofReal_inj, evenKernel_def, jacobiTheta₂_undef _ (by simpa : (I * ↑x).im ≤ 0)] /-- Cosine Hurwitz zeta kernel. See `cosKernel_def` for the defining formula, and `hasSum_int_cosKernel` for expression as a sum. -/ @[irreducible] def cosKernel (a : UnitAddCircle) (x : ℝ) : ℝ := (show Function.Periodic (fun ξ : ℝ ↦ re (jacobiTheta₂ ξ (I * x))) 1 by intro ξ; simp [jacobiTheta₂_add_left]).lift a lemma cosKernel_def (a x : ℝ) : ↑(cosKernel ↑a x) = jacobiTheta₂ a (I * x) := by simp [cosKernel, re_eq_add_conj, jacobiTheta₂_conj, ← mul_two, mul_div_cancel_right₀ _ (two_ne_zero' ℂ)] lemma cosKernel_undef (a : UnitAddCircle) {x : ℝ} (hx : x ≤ 0) : cosKernel a x = 0 := by induction a using QuotientAddGroup.induction_on with \| H => simp [← ofReal_inj, cosKernel_def, jacobiTheta₂_undef _ (by simpa : (I * ↑x).im ≤ 0)] /-- For `a = 0`, both kernels agree. -/ lemma evenKernel_eq_cosKernel_of_zero : evenKernel 0 = cosKernel 0 := by ext1 x simp [← QuotientAddGroup.mk_zero, ← ofReal_inj, evenKernel_def, cosKernel_def] @[simp] lemma evenKernel_neg (a : UnitAddCircle) (x : ℝ) : evenKernel (-a) x = evenKernel a x := by induction a using QuotientAddGroup.induction_on with \| H => simp [← QuotientAddGroup.mk_neg, ← ofReal_inj, evenKernel_def, jacobiTheta₂_neg_left] @[simp] lemma cosKernel_neg (a : UnitAddCircle) (x : ℝ) : cosKernel (-a) x = cosKernel a x := by induction a using QuotientAddGroup.induction_on with \| H => simp [← QuotientAddGroup.mk_neg, ← ofReal_inj, cosKernel_def] lemma continuousOn_evenKernel (a : UnitAddCircle) : ContinuousOn (evenKernel a) (Ioi 0) := by induction a using QuotientAddGroup.induction_on with \| H a' => apply continuous_re.comp_continuousOn (f := fun x ↦ (evenKernel a' x : ℂ)) simp only [evenKernel_def] refine continuousOn_of_forall_continuousAt (fun x hx ↦ .mul (by fun_prop) ?_) exact (continuousAt_jacobiTheta₂ (a' * I * x) <\| by simpa).comp (f := fun u : ℝ ↦ (a' * I * u, I * u)) (by fun_prop) lemma continuousOn_cosKernel (a : UnitAddCircle) : ContinuousOn (cosKernel a) (Ioi 0) := by induction a using QuotientAddGroup.induction_on with \| H a' => apply continuous_re.comp_continuousOn (f := fun x ↦ (cosKernel a' x : ℂ)) simp only [cosKernel_def] refine continuousOn_of_forall_continuousAt (fun x hx ↦ ?_) exact (continuousAt_jacobiTheta₂ a' <\| by simpa).comp (f := fun u : ℝ ↦ ((a' : ℂ), I * u)) (by fun_prop)	lemma evenKernel_functional_equation (a : UnitAddCircle) (x : ℝ) : evenKernel a x = 1 / x ^ (1 / 2 : ℝ) * cosKernel a (1 / x) := by rcases le_or_lt x 0 with hx \| hx · rw [evenKernel_undef _ hx, cosKernel_undef, mul_zero] exact div_nonpos_of_nonneg_of_nonpos zero_le_one hx induction a using QuotientAddGroup.induction_on with \| H a => rw [← ofReal_inj, ofReal_mul, evenKernel_def, cosKernel_def, jacobiTheta₂_functional_equation]	Mathlib/NumberTheory/LSeries/HurwitzZetaEven.lean	128	134
/- Copyright (c) 2019 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau -/ import Mathlib.Algebra.CharP.Defs import Mathlib.Algebra.GeomSum import Mathlib.Algebra.MvPolynomial.CommRing import Mathlib.Algebra.MvPolynomial.Equiv import Mathlib.Algebra.Polynomial.BigOperators import Mathlib.RingTheory.Noetherian.Basic /-! # Ring-theoretic supplement of Algebra.Polynomial. ## Main results * `MvPolynomial.isDomain`: If a ring is an integral domain, then so is its polynomial ring over finitely many variables. * `Polynomial.isNoetherianRing`: Hilbert basis theorem, that if a ring is noetherian then so is its polynomial ring. -/ noncomputable section open Polynomial open Finset universe u v w variable {R : Type u} {S : Type} namespace Polynomial section Semiring variable [Semiring R] instance instCharP (p : ℕ) [h : CharP R p] : CharP R[X] p := let ⟨h⟩ := h ⟨fun n => by rw [← map_natCast C, ← C_0, C_inj, h]⟩ instance instExpChar (p : ℕ) [h : ExpChar R p] : ExpChar R[X] p := by cases h; exacts [ExpChar.zero, ExpChar.prime ‹_›] variable (R) /-- The `R`-submodule of `R[X]` consisting of polynomials of degree ≤ `n`. -/ def degreeLE (n : WithBot ℕ) : Submodule R R[X] := ⨅ k : ℕ, ⨅ _ : ↑k > n, LinearMap.ker (lcoeff R k) /-- The `R`-submodule of `R[X]` consisting of polynomials of degree < `n`. -/ def degreeLT (n : ℕ) : Submodule R R[X] := ⨅ k : ℕ, ⨅ (_ : k ≥ n), LinearMap.ker (lcoeff R k) variable {R} theorem mem_degreeLE {n : WithBot ℕ} {f : R[X]} : f ∈ degreeLE R n ↔ degree f ≤ n := by simp only [degreeLE, Submodule.mem_iInf, degree_le_iff_coeff_zero, LinearMap.mem_ker]; rfl @[mono] theorem degreeLE_mono {m n : WithBot ℕ} (H : m ≤ n) : degreeLE R m ≤ degreeLE R n := fun _ hf => mem_degreeLE.2 (le_trans (mem_degreeLE.1 hf) H) theorem degreeLE_eq_span_X_pow [DecidableEq R] {n : ℕ} : degreeLE R n = Submodule.span R ↑((Finset.range (n + 1)).image fun n => (X : R[X]) ^ n) := by apply le_antisymm · intro p hp replace hp := mem_degreeLE.1 hp rw [← Polynomial.sum_monomial_eq p, Polynomial.sum] refine Submodule.sum_mem _ fun k hk => ?_ have := WithBot.coe_le_coe.1 (Finset.sup_le_iff.1 hp k hk) rw [← C_mul_X_pow_eq_monomial, C_mul'] refine Submodule.smul_mem _ _ (Submodule.subset_span <\| Finset.mem_coe.2 <\| Finset.mem_image.2 ⟨_, Finset.mem_range.2 (Nat.lt_succ_of_le this), rfl⟩) rw [Submodule.span_le, Finset.coe_image, Set.image_subset_iff] intro k hk apply mem_degreeLE.2 exact (degree_X_pow_le _).trans (WithBot.coe_le_coe.2 <\| Nat.le_of_lt_succ <\| Finset.mem_range.1 hk) theorem mem_degreeLT {n : ℕ} {f : R[X]} : f ∈ degreeLT R n ↔ degree f < n := by rw [degreeLT, Submodule.mem_iInf] conv_lhs => intro i; rw [Submodule.mem_iInf] rw [degree, Finset.max_eq_sup_coe] rw [Finset.sup_lt_iff ?_] rotate_left · apply WithBot.bot_lt_coe conv_rhs => simp only [mem_support_iff] intro b rw [Nat.cast_withBot, WithBot.coe_lt_coe, lt_iff_not_le, Ne, not_imp_not] rfl @[mono] theorem degreeLT_mono {m n : ℕ} (H : m ≤ n) : degreeLT R m ≤ degreeLT R n := fun _ hf => mem_degreeLT.2 (lt_of_lt_of_le (mem_degreeLT.1 hf) <\| WithBot.coe_le_coe.2 H) theorem degreeLT_eq_span_X_pow [DecidableEq R] {n : ℕ} : degreeLT R n = Submodule.span R ↑((Finset.range n).image fun n => X ^ n : Finset R[X]) := by apply le_antisymm · intro p hp replace hp := mem_degreeLT.1 hp rw [← Polynomial.sum_monomial_eq p, Polynomial.sum] refine Submodule.sum_mem _ fun k hk => ?_ have := WithBot.coe_lt_coe.1 ((Finset.sup_lt_iff <\| WithBot.bot_lt_coe n).1 hp k hk) rw [← C_mul_X_pow_eq_monomial, C_mul'] refine Submodule.smul_mem _ _ (Submodule.subset_span <\| Finset.mem_coe.2 <\| Finset.mem_image.2 ⟨_, Finset.mem_range.2 this, rfl⟩) rw [Submodule.span_le, Finset.coe_image, Set.image_subset_iff] intro k hk apply mem_degreeLT.2 exact lt_of_le_of_lt (degree_X_pow_le _) (WithBot.coe_lt_coe.2 <\| Finset.mem_range.1 hk) /-- The first `n` coefficients on `degreeLT n` form a linear equivalence with `Fin n → R`. -/ def degreeLTEquiv (R) [Semiring R] (n : ℕ) : degreeLT R n ≃ₗ[R] Fin n → R where toFun p n := (↑p : R[X]).coeff n invFun f := ⟨∑ i : Fin n, monomial i (f i), (degreeLT R n).sum_mem fun i _ => mem_degreeLT.mpr (lt_of_le_of_lt (degree_monomial_le i (f i)) (WithBot.coe_lt_coe.mpr i.is_lt))⟩ map_add' p q := by ext dsimp rw [coeff_add] map_smul' x p := by ext dsimp rw [coeff_smul] rfl left_inv := by rintro ⟨p, hp⟩ ext1 simp only [Submodule.coe_mk] by_cases hp0 : p = 0 · subst hp0 simp only [coeff_zero, LinearMap.map_zero, Finset.sum_const_zero] rw [mem_degreeLT, degree_eq_natDegree hp0, Nat.cast_lt] at hp conv_rhs => rw [p.as_sum_range' n hp, ← Fin.sum_univ_eq_sum_range] right_inv f := by ext i simp only [finset_sum_coeff, Submodule.coe_mk] rw [Finset.sum_eq_single i, coeff_monomial, if_pos rfl] · rintro j - hji rw [coeff_monomial, if_neg] rwa [← Fin.ext_iff] · intro h exact (h (Finset.mem_univ _)).elim theorem degreeLTEquiv_eq_zero_iff_eq_zero {n : ℕ} {p : R[X]} (hp : p ∈ degreeLT R n) : degreeLTEquiv _ _ ⟨p, hp⟩ = 0 ↔ p = 0 := by simp theorem eval_eq_sum_degreeLTEquiv {n : ℕ} {p : R[X]} (hp : p ∈ degreeLT R n) (x : R) : p.eval x = ∑ i, degreeLTEquiv _ _ ⟨p, hp⟩ i x ^ (i : ℕ) := by simp_rw [eval_eq_sum] exact (sum_fin _ (by simp_rw [zero_mul, forall_const]) (mem_degreeLT.mp hp)).symm theorem degreeLT_succ_eq_degreeLE {n : ℕ} : degreeLT R (n + 1) = degreeLE R n := by ext x by_cases x_zero : x = 0 · simp_rw [x_zero, Submodule.zero_mem] · rw [mem_degreeLT, mem_degreeLE, ← natDegree_lt_iff_degree_lt (by rwa [ne_eq]), ← natDegree_le_iff_degree_le, Nat.lt_succ] /-- The equivalence between monic polynomials of degree `n` and polynomials of degree less than `n`, formed by adding a term `X ^ n`. -/ def monicEquivDegreeLT [Nontrivial R] (n : ℕ) : { p : R[X] // p.Monic ∧ p.natDegree = n } ≃ degreeLT R n where toFun p := ⟨p.1.eraseLead, by rcases p with ⟨p, hp, rfl⟩ simp only [mem_degreeLT] refine lt_of_lt_of_le ?_ degree_le_natDegree exact degree_eraseLead_lt (ne_zero_of_ne_zero_of_monic one_ne_zero hp)⟩ invFun := fun p => ⟨X^n + p.1, monic_X_pow_add (mem_degreeLT.1 p.2), by rw [natDegree_add_eq_left_of_degree_lt] · simp · simp [mem_degreeLT.1 p.2]⟩ left_inv := by rintro ⟨p, hp, rfl⟩ ext1 simp only conv_rhs => rw [← eraseLead_add_C_mul_X_pow p] simp [Monic.def.1 hp, add_comm] right_inv := by rintro ⟨p, hp⟩ ext1 simp only rw [eraseLead_add_of_degree_lt_left] · simp · simp [mem_degreeLT.1 hp] /-- For every polynomial `p` in the span of a set `s : Set R[X]`, there exists a polynomial of `p' ∈ s` with higher degree. See also `Polynomial.exists_degree_le_of_mem_span_of_finite`. -/ theorem exists_degree_le_of_mem_span {s : Set R[X]} {p : R[X]} (hs : s.Nonempty) (hp : p ∈ Submodule.span R s) : ∃ p' ∈ s, degree p ≤ degree p' := by by_contra! h by_cases hp_zero : p = 0 · rw [hp_zero, degree_zero] at h rcases hs with ⟨x, hx⟩ exact not_lt_bot (h x hx) · have : p ∈ degreeLT R (natDegree p) := by refine (Submodule.span_le.mpr fun p' p'_mem => ?_) hp rw [SetLike.mem_coe, mem_degreeLT, Nat.cast_withBot] exact lt_of_lt_of_le (h p' p'_mem) degree_le_natDegree rwa [mem_degreeLT, Nat.cast_withBot, degree_eq_natDegree hp_zero, Nat.cast_withBot, lt_self_iff_false] at this /-- A stronger version of `Polynomial.exists_degree_le_of_mem_span` under the assumption that the set `s : R[X]` is finite. There exists a polynomial `p' ∈ s` whose degree dominates the degree of every element of `p ∈ span R s`. -/ theorem exists_degree_le_of_mem_span_of_finite {s : Set R[X]} (s_fin : s.Finite) (hs : s.Nonempty) : ∃ p' ∈ s, ∀ (p : R[X]), p ∈ Submodule.span R s → degree p ≤ degree p' := by rcases Set.Finite.exists_maximal_wrt degree s s_fin hs with ⟨a, has, hmax⟩ refine ⟨a, has, fun p hp => ?_⟩ rcases exists_degree_le_of_mem_span hs hp with ⟨p', hp'⟩ by_cases h : degree a ≤ degree p' · rw [← hmax p' hp'.left h] at hp'; exact hp'.right · exact le_trans hp'.right (not_le.mp h).le /-- The span of every finite set of polynomials is contained in a `degreeLE n` for some `n`. -/ theorem span_le_degreeLE_of_finite {s : Set R[X]} (s_fin : s.Finite) : ∃ n : ℕ, Submodule.span R s ≤ degreeLE R n := by by_cases s_emp : s.Nonempty · rcases exists_degree_le_of_mem_span_of_finite s_fin s_emp with ⟨p', _, hp'max⟩ exact ⟨natDegree p', fun p hp => mem_degreeLE.mpr ((hp'max _ hp).trans degree_le_natDegree)⟩ · rw [Set.not_nonempty_iff_eq_empty] at s_emp rw [s_emp, Submodule.span_empty] exact ⟨0, bot_le⟩ /-- The span of every finite set of polynomials is contained in a `degreeLT n` for some `n`. -/ theorem span_of_finite_le_degreeLT {s : Set R[X]} (s_fin : s.Finite) : ∃ n : ℕ, Submodule.span R s ≤ degreeLT R n := by rcases span_le_degreeLE_of_finite s_fin with ⟨n, _⟩ exact ⟨n + 1, by rwa [degreeLT_succ_eq_degreeLE]⟩ /-- If `R` is a nontrivial ring, the polynomials `R[X]` are not finite as an `R`-module. When `R` is a field, this is equivalent to `R[X]` being an infinite-dimensional vector space over `R`. -/ theorem not_finite [Nontrivial R] : ¬ Module.Finite R R[X] := by rw [Module.finite_def, Submodule.fg_def] push_neg intro s hs contra rcases span_le_degreeLE_of_finite hs with ⟨n,hn⟩ have : ((X : R[X]) ^ (n + 1)) ∈ Polynomial.degreeLE R ↑n := by rw [contra] at hn exact hn Submodule.mem_top rw [mem_degreeLE, degree_X_pow, Nat.cast_le, add_le_iff_nonpos_right, nonpos_iff_eq_zero] at this exact one_ne_zero this theorem geom_sum_X_comp_X_add_one_eq_sum (n : ℕ) : (∑ i ∈ range n, (X : R[X]) ^ i).comp (X + 1) = (Finset.range n).sum fun i : ℕ => (n.choose (i + 1) : R[X]) * X ^ i := by ext i trans (n.choose (i + 1) : R); swap · simp only [finset_sum_coeff, ← C_eq_natCast, coeff_C_mul_X_pow] rw [Finset.sum_eq_single i, if_pos rfl] · simp +contextual only [@eq_comm _ i, if_false, eq_self_iff_true, imp_true_iff] · simp +contextual only [Nat.lt_add_one_iff, Nat.choose_eq_zero_of_lt, Nat.cast_zero, Finset.mem_range, not_lt, eq_self_iff_true, if_true, imp_true_iff] induction' n with n ih generalizing i · dsimp; simp only [zero_comp, coeff_zero, Nat.cast_zero] · simp only [geom_sum_succ', ih, add_comp, X_pow_comp, coeff_add, Nat.choose_succ_succ, Nat.cast_add, coeff_X_add_one_pow] theorem Monic.geom_sum {P : R[X]} (hP : P.Monic) (hdeg : 0 < P.natDegree) {n : ℕ} (hn : n ≠ 0) : (∑ i ∈ range n, P ^ i).Monic := by nontriviality R obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero hn rw [geom_sum_succ'] refine (hP.pow _).add_of_left ?_ refine lt_of_le_of_lt (degree_sum_le _ _) ?_ rw [Finset.sup_lt_iff] · simp only [Finset.mem_range, degree_eq_natDegree (hP.pow _).ne_zero] simp only [Nat.cast_lt, hP.natDegree_pow] intro k exact nsmul_lt_nsmul_left hdeg · rw [bot_lt_iff_ne_bot, Ne, degree_eq_bot] exact (hP.pow _).ne_zero theorem Monic.geom_sum' {P : R[X]} (hP : P.Monic) (hdeg : 0 < P.degree) {n : ℕ} (hn : n ≠ 0) : (∑ i ∈ range n, P ^ i).Monic := hP.geom_sum (natDegree_pos_iff_degree_pos.2 hdeg) hn theorem monic_geom_sum_X {n : ℕ} (hn : n ≠ 0) : (∑ i ∈ range n, (X : R[X]) ^ i).Monic := by nontriviality R apply monic_X.geom_sum _ hn simp only [natDegree_X, zero_lt_one] end Semiring section Ring variable [Ring R] /-- Given a polynomial, return the polynomial whose coefficients are in the ring closure of the original coefficients. -/ def restriction (p : R[X]) : Polynomial (Subring.closure (↑p.coeffs : Set R)) := ∑ i ∈ p.support, monomial i (⟨p.coeff i, letI := Classical.decEq R if H : p.coeff i = 0 then H.symm ▸ (Subring.closure _).zero_mem else Subring.subset_closure (p.coeff_mem_coeffs _ H)⟩ : Subring.closure (↑p.coeffs : Set R)) @[simp] theorem coeff_restriction {p : R[X]} {n : ℕ} : ↑(coeff (restriction p) n) = coeff p n := by classical simp only [restriction, coeff_monomial, finset_sum_coeff, mem_support_iff, Finset.sum_ite_eq', Ne, ite_not] split_ifs with h · rw [h] rfl · rfl theorem coeff_restriction' {p : R[X]} {n : ℕ} : (coeff (restriction p) n).1 = coeff p n := by simp @[simp] theorem support_restriction (p : R[X]) : support (restriction p) = support p := by ext i simp only [mem_support_iff, not_iff_not, Ne] conv_rhs => rw [← coeff_restriction] exact ⟨fun H => by rw [H, ZeroMemClass.coe_zero], fun H => Subtype.coe_injective H⟩ @[simp] theorem map_restriction {R : Type u} [CommRing R] (p : R[X]) : p.restriction.map (algebraMap _ _) = p := ext fun n => by rw [coeff_map, Algebra.algebraMap_ofSubring_apply, coeff_restriction] @[simp] theorem degree_restriction {p : R[X]} : (restriction p).degree = p.degree := by simp [degree] @[simp] theorem natDegree_restriction {p : R[X]} : (restriction p).natDegree = p.natDegree := by simp [natDegree] @[simp] theorem monic_restriction {p : R[X]} : Monic (restriction p) ↔ Monic p := by simp only [Monic, leadingCoeff, natDegree_restriction] rw [← @coeff_restriction _ _ p] exact ⟨fun H => by rw [H, OneMemClass.coe_one], fun H => Subtype.coe_injective H⟩ @[simp] theorem restriction_zero : restriction (0 : R[X]) = 0 := by simp only [restriction, Finset.sum_empty, support_zero] @[simp] theorem restriction_one : restriction (1 : R[X]) = 1 := ext fun i => Subtype.eq <\| by rw [coeff_restriction', coeff_one, coeff_one]; split_ifs <;> rfl variable [Semiring S] {f : R →+* S} {x : S} theorem eval₂_restriction {p : R[X]} : eval₂ f x p = eval₂ (f.comp (Subring.subtype (Subring.closure (p.coeffs : Set R)))) x p.restriction := by simp only [eval₂_eq_sum, sum, support_restriction, ← @coeff_restriction _ _ p, RingHom.comp_apply, Subring.coe_subtype] section ToSubring variable (p : R[X]) (T : Subring R) /-- Given a polynomial `p` and a subring `T` that contains the coefficients of `p`, return the corresponding polynomial whose coefficients are in `T`. -/ def toSubring (hp : (↑p.coeffs : Set R) ⊆ T) : T[X] := ∑ i ∈ p.support, monomial i (⟨p.coeff i, letI := Classical.decEq R if H : p.coeff i = 0 then H.symm ▸ T.zero_mem else hp (p.coeff_mem_coeffs _ H)⟩ : T) variable (hp : (↑p.coeffs : Set R) ⊆ T) @[simp] theorem coeff_toSubring {n : ℕ} : ↑(coeff (toSubring p T hp) n) = coeff p n := by classical simp only [toSubring, coeff_monomial, finset_sum_coeff, mem_support_iff, Finset.sum_ite_eq', Ne, ite_not] split_ifs with h · rw [h] rfl · rfl theorem coeff_toSubring' {n : ℕ} : (coeff (toSubring p T hp) n).1 = coeff p n := by simp @[simp] theorem support_toSubring : support (toSubring p T hp) = support p := by ext i simp only [mem_support_iff, not_iff_not, Ne] conv_rhs => rw [← coeff_toSubring p T hp] exact ⟨fun H => by rw [H, ZeroMemClass.coe_zero], fun H => Subtype.coe_injective H⟩ @[simp] theorem degree_toSubring : (toSubring p T hp).degree = p.degree := by simp [degree] @[simp] theorem natDegree_toSubring : (toSubring p T hp).natDegree = p.natDegree := by simp [natDegree] @[simp] theorem monic_toSubring : Monic (toSubring p T hp) ↔ Monic p := by simp_rw [Monic, leadingCoeff, natDegree_toSubring, ← coeff_toSubring p T hp] exact ⟨fun H => by rw [H, OneMemClass.coe_one], fun H => Subtype.coe_injective H⟩ @[simp] theorem toSubring_zero : toSubring (0 : R[X]) T (by simp [coeffs]) = 0 := by ext i simp @[simp] theorem toSubring_one : toSubring (1 : R[X]) T (Set.Subset.trans coeffs_one <\| Finset.singleton_subset_set_iff.2 T.one_mem) = 1 := ext fun i => Subtype.eq <\| by rw [coeff_toSubring', coeff_one, coeff_one, apply_ite Subtype.val, ZeroMemClass.coe_zero, OneMemClass.coe_one] @[simp] theorem map_toSubring : (p.toSubring T hp).map (Subring.subtype T) = p := by ext n simp [coeff_map] end ToSubring variable (T : Subring R) /-- Given a polynomial whose coefficients are in some subring, return the corresponding polynomial whose coefficients are in the ambient ring. -/ def ofSubring (p : T[X]) : R[X] := ∑ i ∈ p.support, monomial i (p.coeff i : R) theorem coeff_ofSubring (p : T[X]) (n : ℕ) : coeff (ofSubring T p) n = (coeff p n : T) := by simp only [ofSubring, coeff_monomial, finset_sum_coeff, mem_support_iff, Finset.sum_ite_eq', ite_eq_right_iff, Ne, ite_not, Classical.not_not, ite_eq_left_iff] intro h rw [h, ZeroMemClass.coe_zero] @[simp] theorem coeffs_ofSubring {p : T[X]} : (↑(p.ofSubring T).coeffs : Set R) ⊆ T := by classical intro i hi simp only [coeffs, Set.mem_image, mem_support_iff, Ne, Finset.mem_coe, (Finset.coe_image)] at hi rcases hi with ⟨n, _, h'n⟩ rw [← h'n, coeff_ofSubring] exact Subtype.mem (coeff p n : T) end Ring end Polynomial namespace Ideal open Polynomial section Semiring variable [Semiring R] /-- Transport an ideal of `R[X]` to an `R`-submodule of `R[X]`. -/ def ofPolynomial (I : Ideal R[X]) : Submodule R R[X] where carrier := I.carrier zero_mem' := I.zero_mem add_mem' := I.add_mem smul_mem' c x H := by rw [← C_mul'] exact I.mul_mem_left _ H variable {I : Ideal R[X]} theorem mem_ofPolynomial (x) : x ∈ I.ofPolynomial ↔ x ∈ I := Iff.rfl variable (I) /-- Given an ideal `I` of `R[X]`, make the `R`-submodule of `I` consisting of polynomials of degree ≤ `n`. -/ def degreeLE (n : WithBot ℕ) : Submodule R R[X] := Polynomial.degreeLE R n ⊓ I.ofPolynomial /-- Given an ideal `I` of `R[X]`, make the ideal in `R` of leading coefficients of polynomials in `I` with degree ≤ `n`. -/ def leadingCoeffNth (n : ℕ) : Ideal R := (I.degreeLE n).map <\| lcoeff R n /-- Given an ideal `I` in `R[X]`, make the ideal in `R` of the leading coefficients in `I`. -/ def leadingCoeff : Ideal R := ⨆ n : ℕ, I.leadingCoeffNth n end Semiring section CommSemiring variable [CommSemiring R] [Semiring S] /-- If every coefficient of a polynomial is in an ideal `I`, then so is the polynomial itself -/ theorem polynomial_mem_ideal_of_coeff_mem_ideal (I : Ideal R[X]) (p : R[X]) (hp : ∀ n : ℕ, p.coeff n ∈ I.comap (C : R →+* R[X])) : p ∈ I := sum_C_mul_X_pow_eq p ▸ Submodule.sum_mem I fun n _ => I.mul_mem_right _ (hp n) /-- The push-forward of an ideal `I` of `R` to `R[X]` via inclusion is exactly the set of polynomials whose coefficients are in `I` -/ theorem mem_map_C_iff {I : Ideal R} {f : R[X]} : f ∈ (Ideal.map (C : R →+* R[X]) I : Ideal R[X]) ↔ ∀ n : ℕ, f.coeff n ∈ I := by constructor · intro hf refine Submodule.span_induction ?_ ?_ ?_ ?_ hf · intro f hf n obtain ⟨x, hx⟩ := (Set.mem_image _ _ _).mp hf rw [← hx.right, coeff_C] by_cases h : n = 0 · simpa [h] using hx.left · simp [h] · simp · exact fun f g _ _ hf hg n => by simp [I.add_mem (hf n) (hg n)] · refine fun f g _ hg n => ?_ rw [smul_eq_mul, coeff_mul] exact I.sum_mem fun c _ => I.mul_mem_left (f.coeff c.fst) (hg c.snd) · intro hf rw [← sum_monomial_eq f] refine (I.map C : Ideal R[X]).sum_mem fun n _ => ?_ simp only [← C_mul_X_pow_eq_monomial, ne_eq] rw [mul_comm] exact (I.map C : Ideal R[X]).mul_mem_left _ (mem_map_of_mem _ (hf n)) theorem _root_.Polynomial.ker_mapRingHom (f : R →+* S) : RingHom.ker (Polynomial.mapRingHom f) = (RingHom.ker f).map (C : R →+* R[X]) := by ext simp only [RingHom.mem_ker, coe_mapRingHom] rw [mem_map_C_iff, Polynomial.ext_iff] simp [RingHom.mem_ker] variable (I : Ideal R[X]) theorem mem_leadingCoeffNth (n : ℕ) (x) : x ∈ I.leadingCoeffNth n ↔ ∃ p ∈ I, degree p ≤ n ∧ p.leadingCoeff = x := by simp only [leadingCoeffNth, degreeLE, Submodule.mem_map, lcoeff_apply, Submodule.mem_inf, mem_degreeLE] constructor · rintro ⟨p, ⟨hpdeg, hpI⟩, rfl⟩ rcases lt_or_eq_of_le hpdeg with hpdeg \| hpdeg · refine ⟨0, I.zero_mem, bot_le, ?_⟩ rw [leadingCoeff_zero, eq_comm] exact coeff_eq_zero_of_degree_lt hpdeg · refine ⟨p, hpI, le_of_eq hpdeg, ?_⟩ rw [Polynomial.leadingCoeff, natDegree, hpdeg, Nat.cast_withBot, WithBot.unbotD_coe] · rintro ⟨p, hpI, hpdeg, rfl⟩ have : natDegree p + (n - natDegree p) = n := add_tsub_cancel_of_le (natDegree_le_of_degree_le hpdeg) refine ⟨p * X ^ (n - natDegree p), ⟨?_, I.mul_mem_right _ hpI⟩, ?_⟩ · apply le_trans (degree_mul_le _ _) _ apply le_trans (add_le_add degree_le_natDegree (degree_X_pow_le _)) _ rw [← Nat.cast_add, this] · rw [Polynomial.leadingCoeff, ← coeff_mul_X_pow p (n - natDegree p), this] theorem mem_leadingCoeffNth_zero (x) : x ∈ I.leadingCoeffNth 0 ↔ C x ∈ I := (mem_leadingCoeffNth _ _ _).trans ⟨fun ⟨p, hpI, hpdeg, hpx⟩ => by rwa [← hpx, Polynomial.leadingCoeff, Nat.eq_zero_of_le_zero (natDegree_le_of_degree_le hpdeg), ← eq_C_of_degree_le_zero hpdeg], fun hx => ⟨C x, hx, degree_C_le, leadingCoeff_C x⟩⟩ theorem leadingCoeffNth_mono {m n : ℕ} (H : m ≤ n) : I.leadingCoeffNth m ≤ I.leadingCoeffNth n := by intro r hr simp only [SetLike.mem_coe, mem_leadingCoeffNth] at hr ⊢ rcases hr with ⟨p, hpI, hpdeg, rfl⟩ refine ⟨p * X ^ (n - m), I.mul_mem_right _ hpI, ?_, leadingCoeff_mul_X_pow⟩ refine le_trans (degree_mul_le _ _) ?_ refine le_trans (add_le_add hpdeg (degree_X_pow_le _)) ?_ rw [← Nat.cast_add, add_tsub_cancel_of_le H] theorem mem_leadingCoeff (x) : x ∈ I.leadingCoeff ↔ ∃ p ∈ I, Polynomial.leadingCoeff p = x := by rw [leadingCoeff, Submodule.mem_iSup_of_directed] · simp only [mem_leadingCoeffNth] constructor · rintro ⟨i, p, hpI, _, rfl⟩ exact ⟨p, hpI, rfl⟩ rintro ⟨p, hpI, rfl⟩ exact ⟨natDegree p, p, hpI, degree_le_natDegree, rfl⟩ intro i j exact ⟨i + j, I.leadingCoeffNth_mono (Nat.le_add_right _ _), I.leadingCoeffNth_mono (Nat.le_add_left _ _)⟩ /-- If `I` is an ideal, and `pᵢ` is a finite family of polynomials each satisfying `∀ k, (pᵢ)ₖ ∈ Iⁿⁱ⁻ᵏ` for some `nᵢ`, then `p = ∏ pᵢ` also satisfies `∀ k, pₖ ∈ Iⁿ⁻ᵏ` with `n = ∑ nᵢ`. -/ theorem _root_.Polynomial.coeff_prod_mem_ideal_pow_tsub {ι : Type} (s : Finset ι) (f : ι → R[X]) (I : Ideal R) (n : ι → ℕ) (h : ∀ i ∈ s, ∀ (k), (f i).coeff k ∈ I ^ (n i - k)) (k : ℕ) : (s.prod f).coeff k ∈ I ^ (s.sum n - k) := by classical induction' s using Finset.induction with a s ha hs generalizing k · rw [sum_empty, prod_empty, coeff_one, zero_tsub, pow_zero, Ideal.one_eq_top] exact Submodule.mem_top · rw [sum_insert ha, prod_insert ha, coeff_mul] apply sum_mem rintro ⟨i, j⟩ e obtain rfl : i + j = k := mem_antidiagonal.mp e apply Ideal.pow_le_pow_right add_tsub_add_le_tsub_add_tsub rw [pow_add] exact Ideal.mul_mem_mul (h _ (Finset.mem_insert.mpr <\| Or.inl rfl) _) (hs (fun i hi k => h _ (Finset.mem_insert.mpr <\| Or.inr hi) _) j) end CommSemiring section Ring variable [Ring R] /-- `R[X]` is never a field for any ring `R`. -/ theorem polynomial_not_isField : ¬IsField R[X] := by nontriviality R intro hR obtain ⟨p, hp⟩ := hR.mul_inv_cancel X_ne_zero have hp0 : p ≠ 0 := right_ne_zero_of_mul_eq_one hp have := degree_lt_degree_mul_X hp0 rw [← X_mul, congr_arg degree hp, degree_one, Nat.WithBot.lt_zero_iff, degree_eq_bot] at this exact hp0 this /-- The only constant in a maximal ideal over a field is `0`. -/ theorem eq_zero_of_constant_mem_of_maximal (hR : IsField R) (I : Ideal R[X]) [hI : I.IsMaximal] (x : R) (hx : C x ∈ I) : x = 0 := by refine Classical.by_contradiction fun hx0 => hI.ne_top ((eq_top_iff_one I).2 ?_) obtain ⟨y, hy⟩ := hR.mul_inv_cancel hx0 convert I.mul_mem_left (C y) hx rw [← C.map_mul, hR.mul_comm y x, hy, RingHom.map_one] end Ring section CommRing variable [CommRing R] /-- If `P` is a prime ideal of `R`, then `P.R[x]` is a prime ideal of `R[x]`. -/ theorem isPrime_map_C_iff_isPrime (P : Ideal R) : IsPrime (map (C : R →+ R[X]) P : Ideal R[X]) ↔ IsPrime P := by -- Note: the following proof avoids quotient rings -- It can be golfed substantially by using something like -- `(Quotient.isDomain_iff_prime (map C P : Ideal R[X]))` constructor · intro H have := comap_isPrime C (map C P) convert this using 1 ext x simp only [mem_comap, mem_map_C_iff] constructor · rintro h (- \| n) · rwa [coeff_C_zero] · simp only [coeff_C_ne_zero (Nat.succ_ne_zero _), Submodule.zero_mem] · intro h simpa only [coeff_C_zero] using h 0 · intro h constructor · rw [Ne, eq_top_iff_one, mem_map_C_iff, not_forall] use 0 rw [coeff_one_zero, ← eq_top_iff_one] exact h.1 · intro f g simp only [mem_map_C_iff] contrapose! rintro ⟨hf, hg⟩ classical let m := Nat.find hf let n := Nat.find hg refine ⟨m + n, ?_⟩ rw [coeff_mul, ← Finset.insert_erase ((Finset.mem_antidiagonal (a := (m,n))).mpr rfl), Finset.sum_insert (Finset.not_mem_erase _ _), (P.add_mem_iff_left _).not] · apply mt h.2 rw [not_or] exact ⟨Nat.find_spec hf, Nat.find_spec hg⟩ apply P.sum_mem rintro ⟨i, j⟩ hij rw [Finset.mem_erase, Finset.mem_antidiagonal] at hij simp only [Ne, Prod.mk_inj, not_and_or] at hij obtain hi \| hj : i < m ∨ j < n := by omega · rw [mul_comm] apply P.mul_mem_left exact Classical.not_not.1 (Nat.find_min hf hi) · apply P.mul_mem_left exact Classical.not_not.1 (Nat.find_min hg hj) /-- If `P` is a prime ideal of `R`, then `P.R[x]` is a prime ideal of `R[x]`. -/ theorem isPrime_map_C_of_isPrime {P : Ideal R} (H : IsPrime P) : IsPrime (map (C : R →+* R[X]) P : Ideal R[X]) := (isPrime_map_C_iff_isPrime P).mpr H	theorem is_fg_degreeLE [IsNoetherianRing R] (I : Ideal R[X]) (n : ℕ) : Submodule.FG (I.degreeLE n) := letI := Classical.decEq R isNoetherian_submodule_left.1 (isNoetherian_of_fg_of_noetherian _ ⟨_, degreeLE_eq_span_X_pow.symm⟩) _ end CommRing end Ideal section Ideal open Submodule Set variable [Semiring R] {f : R[X]} {I : Ideal R[X]}	Mathlib/RingTheory/Polynomial/Basic.lean	700	715
/- Copyright (c) 2018 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin -/ import Mathlib.Algebra.BigOperators.Expect import Mathlib.Algebra.Order.BigOperators.Ring.Finset import Mathlib.Algebra.Order.Field.Canonical import Mathlib.Algebra.Order.Nonneg.Floor import Mathlib.Data.Real.Pointwise import Mathlib.Data.NNReal.Defs import Mathlib.Order.ConditionallyCompleteLattice.Group /-! # Basic results on nonnegative real numbers This file contains all results on `NNReal` that do not directly follow from its basic structure. As a consequence, it is a bit of a random collection of results, and is a good target for cleanup. ## Notations This file uses `ℝ≥0` as a localized notation for `NNReal`. -/ assert_not_exists Star open Function open scoped BigOperators namespace NNReal noncomputable instance : FloorSemiring ℝ≥0 := Nonneg.floorSemiring @[simp, norm_cast] theorem coe_indicator {α} (s : Set α) (f : α → ℝ≥0) (a : α) : ((s.indicator f a : ℝ≥0) : ℝ) = s.indicator (fun x => ↑(f x)) a := (toRealHom : ℝ≥0 →+ ℝ).map_indicator _ _ _ @[norm_cast] theorem coe_list_sum (l : List ℝ≥0) : ((l.sum : ℝ≥0) : ℝ) = (l.map (↑)).sum := map_list_sum toRealHom l @[norm_cast] theorem coe_list_prod (l : List ℝ≥0) : ((l.prod : ℝ≥0) : ℝ) = (l.map (↑)).prod := map_list_prod toRealHom l @[norm_cast] theorem coe_multiset_sum (s : Multiset ℝ≥0) : ((s.sum : ℝ≥0) : ℝ) = (s.map (↑)).sum := map_multiset_sum toRealHom s @[norm_cast] theorem coe_multiset_prod (s : Multiset ℝ≥0) : ((s.prod : ℝ≥0) : ℝ) = (s.map (↑)).prod := map_multiset_prod toRealHom s variable {ι : Type} {s : Finset ι} {f : ι → ℝ} @[simp, norm_cast] theorem coe_sum (s : Finset ι) (f : ι → ℝ≥0) : ∑ i ∈ s, f i = ∑ i ∈ s, (f i : ℝ) := map_sum toRealHom _ _ @[simp, norm_cast] lemma coe_expect (s : Finset ι) (f : ι → ℝ≥0) : 𝔼 i ∈ s, f i = 𝔼 i ∈ s, (f i : ℝ) := map_expect toRealHom .. theorem _root_.Real.toNNReal_sum_of_nonneg (hf : ∀ i ∈ s, 0 ≤ f i) : Real.toNNReal (∑ a ∈ s, f a) = ∑ a ∈ s, Real.toNNReal (f a) := by rw [← coe_inj, NNReal.coe_sum, Real.coe_toNNReal _ (Finset.sum_nonneg hf)] exact Finset.sum_congr rfl fun x hxs => by rw [Real.coe_toNNReal _ (hf x hxs)] @[simp, norm_cast] theorem coe_prod (s : Finset ι) (f : ι → ℝ≥0) : ↑(∏ a ∈ s, f a) = ∏ a ∈ s, (f a : ℝ) := map_prod toRealHom _ _ theorem _root_.Real.toNNReal_prod_of_nonneg (hf : ∀ a, a ∈ s → 0 ≤ f a) : Real.toNNReal (∏ a ∈ s, f a) = ∏ a ∈ s, Real.toNNReal (f a) := by rw [← coe_inj, NNReal.coe_prod, Real.coe_toNNReal _ (Finset.prod_nonneg hf)] exact Finset.prod_congr rfl fun x hxs => by rw [Real.coe_toNNReal _ (hf x hxs)] theorem le_iInf_add_iInf {ι ι' : Sort} [Nonempty ι] [Nonempty ι'] {f : ι → ℝ≥0} {g : ι' → ℝ≥0} {a : ℝ≥0} (h : ∀ i j, a ≤ f i + g j) : a ≤ (⨅ i, f i) + ⨅ j, g j := by rw [← NNReal.coe_le_coe, NNReal.coe_add, coe_iInf, coe_iInf] exact le_ciInf_add_ciInf h theorem mul_finset_sup {α} (r : ℝ≥0) (s : Finset α) (f : α → ℝ≥0) : r * s.sup f = s.sup fun a => r * f a := Finset.comp_sup_eq_sup_comp _ (NNReal.mul_sup r) (mul_zero r) theorem finset_sup_mul {α} (s : Finset α) (f : α → ℝ≥0) (r : ℝ≥0) : s.sup f * r = s.sup fun a => f a * r := Finset.comp_sup_eq_sup_comp (· * r) (fun x y => NNReal.sup_mul x y r) (zero_mul r) theorem finset_sup_div {α} {f : α → ℝ≥0} {s : Finset α} (r : ℝ≥0) : s.sup f / r = s.sup fun a => f a / r := by simp only [div_eq_inv_mul, mul_finset_sup] open Real section Sub /-! ### Lemmas about subtraction In this section we provide a few lemmas about subtraction that do not fit well into any other typeclass. For lemmas about subtraction and addition see lemmas about `OrderedSub` in the file `Mathlib.Algebra.Order.Sub.Basic`. See also `mul_tsub` and `tsub_mul`. -/ theorem sub_div (a b c : ℝ≥0) : (a - b) / c = a / c - b / c := tsub_div _ _ _ end Sub section Csupr open Set variable {ι : Sort} {f : ι → ℝ≥0} theorem iInf_mul (f : ι → ℝ≥0) (a : ℝ≥0) : iInf f a = ⨅ i, f i * a := by rw [← coe_inj, NNReal.coe_mul, coe_iInf, coe_iInf] exact Real.iInf_mul_of_nonneg (NNReal.coe_nonneg _) _ theorem mul_iInf (f : ι → ℝ≥0) (a : ℝ≥0) : a * iInf f = ⨅ i, a * f i := by simpa only [mul_comm] using iInf_mul f a theorem mul_iSup (f : ι → ℝ≥0) (a : ℝ≥0) : (a * ⨆ i, f i) = ⨆ i, a * f i := by rw [← coe_inj, NNReal.coe_mul, NNReal.coe_iSup, NNReal.coe_iSup] exact Real.mul_iSup_of_nonneg (NNReal.coe_nonneg _) _ theorem iSup_mul (f : ι → ℝ≥0) (a : ℝ≥0) : (⨆ i, f i) * a = ⨆ i, f i * a := by rw [mul_comm, mul_iSup] simp_rw [mul_comm] theorem iSup_div (f : ι → ℝ≥0) (a : ℝ≥0) : (⨆ i, f i) / a = ⨆ i, f i / a := by simp only [div_eq_mul_inv, iSup_mul] theorem mul_iSup_le {a : ℝ≥0} {g : ℝ≥0} {h : ι → ℝ≥0} (H : ∀ j, g * h j ≤ a) : g * iSup h ≤ a := by rw [mul_iSup] exact ciSup_le' H theorem iSup_mul_le {a : ℝ≥0} {g : ι → ℝ≥0} {h : ℝ≥0} (H : ∀ i, g i * h ≤ a) : iSup g * h ≤ a := by rw [iSup_mul] exact ciSup_le' H theorem iSup_mul_iSup_le {a : ℝ≥0} {g h : ι → ℝ≥0} (H : ∀ i j, g i * h j ≤ a) : iSup g * iSup h ≤ a := iSup_mul_le fun _ => mul_iSup_le <\| H _ variable [Nonempty ι] theorem le_mul_iInf {a : ℝ≥0} {g : ℝ≥0} {h : ι → ℝ≥0} (H : ∀ j, a ≤ g * h j) : a ≤ g * iInf h := by rw [mul_iInf] exact le_ciInf H theorem le_iInf_mul {a : ℝ≥0} {g : ι → ℝ≥0} {h : ℝ≥0} (H : ∀ i, a ≤ g i * h) : a ≤ iInf g * h := by rw [iInf_mul] exact le_ciInf H theorem le_iInf_mul_iInf {a : ℝ≥0} {g h : ι → ℝ≥0} (H : ∀ i j, a ≤ g i * h j) : a ≤ iInf g * iInf h := le_iInf_mul fun i => le_mul_iInf <\| H i end Csupr end NNReal		Mathlib/Data/NNReal/Basic.lean	918	919
/- Copyright (c) 2020 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Algebra.Order.Group.Pointwise.Interval import Mathlib.LinearAlgebra.BilinearMap import Mathlib.LinearAlgebra.Pi import Mathlib.LinearAlgebra.Prod import Mathlib.Tactic.Abel import Mathlib.Algebra.AddTorsor.Basic import Mathlib.LinearAlgebra.AffineSpace.Defs /-! # Affine maps This file defines affine maps. ## Main definitions * `AffineMap` is the type of affine maps between two affine spaces with the same ring `k`. Various basic examples of affine maps are defined, including `const`, `id`, `lineMap` and `homothety`. ## Notations * `P1 →ᵃ[k] P2` is a notation for `AffineMap k P1 P2`; * `AffineSpace V P`: a localized notation for `AddTorsor V P` defined in `LinearAlgebra.AffineSpace.Basic`. ## Implementation notes `outParam` is used in the definition of `[AddTorsor V P]` to make `V` an implicit argument (deduced from `P`) in most cases. As for modules, `k` is an explicit argument rather than implied by `P` or `V`. This file only provides purely algebraic definitions and results. Those depending on analysis or topology are defined elsewhere; see `Analysis.Normed.Affine.AddTorsor` and `Topology.Algebra.Affine`. ## References * https://en.wikipedia.org/wiki/Affine_space * https://en.wikipedia.org/wiki/Principal_homogeneous_space -/ open Affine /-- An `AffineMap k P1 P2` (notation: `P1 →ᵃ[k] P2`) is a map from `P1` to `P2` that induces a corresponding linear map from `V1` to `V2`. -/ structure AffineMap (k : Type) {V1 : Type} (P1 : Type) {V2 : Type} (P2 : Type) [Ring k] [AddCommGroup V1] [Module k V1] [AffineSpace V1 P1] [AddCommGroup V2] [Module k V2] [AffineSpace V2 P2] where toFun : P1 → P2 linear : V1 →ₗ[k] V2 map_vadd' : ∀ (p : P1) (v : V1), toFun (v +ᵥ p) = linear v +ᵥ toFun p /-- An `AffineMap k P1 P2` (notation: `P1 →ᵃ[k] P2`) is a map from `P1` to `P2` that induces a corresponding linear map from `V1` to `V2`. -/ notation:25 P1 " →ᵃ[" k:25 "] " P2:0 => AffineMap k P1 P2 instance AffineMap.instFunLike (k : Type) {V1 : Type} (P1 : Type) {V2 : Type} (P2 : Type) [Ring k] [AddCommGroup V1] [Module k V1] [AffineSpace V1 P1] [AddCommGroup V2] [Module k V2] [AffineSpace V2 P2] : FunLike (P1 →ᵃ[k] P2) P1 P2 where coe := AffineMap.toFun coe_injective' := fun ⟨f, f_linear, f_add⟩ ⟨g, g_linear, g_add⟩ => fun (h : f = g) => by obtain ⟨p⟩ := (AddTorsor.nonempty : Nonempty P1) congr with v apply vadd_right_cancel (f p) rw [← f_add, h, ← g_add] namespace LinearMap variable {k : Type} {V₁ : Type} {V₂ : Type} [Ring k] [AddCommGroup V₁] [Module k V₁] [AddCommGroup V₂] [Module k V₂] (f : V₁ →ₗ[k] V₂) /-- Reinterpret a linear map as an affine map. -/ def toAffineMap : V₁ →ᵃ[k] V₂ where toFun := f linear := f map_vadd' p v := f.map_add v p @[simp] theorem coe_toAffineMap : ⇑f.toAffineMap = f := rfl @[simp] theorem toAffineMap_linear : f.toAffineMap.linear = f := rfl end LinearMap namespace AffineMap variable {k : Type} {V1 : Type} {P1 : Type} {V2 : Type} {P2 : Type} {V3 : Type} {P3 : Type} {V4 : Type} {P4 : Type} [Ring k] [AddCommGroup V1] [Module k V1] [AffineSpace V1 P1] [AddCommGroup V2] [Module k V2] [AffineSpace V2 P2] [AddCommGroup V3] [Module k V3] [AffineSpace V3 P3] [AddCommGroup V4] [Module k V4] [AffineSpace V4 P4] /-- Constructing an affine map and coercing back to a function produces the same map. -/ @[simp] theorem coe_mk (f : P1 → P2) (linear add) : ((mk f linear add : P1 →ᵃ[k] P2) : P1 → P2) = f := rfl /-- `toFun` is the same as the result of coercing to a function. -/ @[simp] theorem toFun_eq_coe (f : P1 →ᵃ[k] P2) : f.toFun = ⇑f := rfl /-- An affine map on the result of adding a vector to a point produces the same result as the linear map applied to that vector, added to the affine map applied to that point. -/ @[simp] theorem map_vadd (f : P1 →ᵃ[k] P2) (p : P1) (v : V1) : f (v +ᵥ p) = f.linear v +ᵥ f p := f.map_vadd' p v /-- The linear map on the result of subtracting two points is the result of subtracting the result of the affine map on those two points. -/ @[simp] theorem linearMap_vsub (f : P1 →ᵃ[k] P2) (p1 p2 : P1) : f.linear (p1 -ᵥ p2) = f p1 -ᵥ f p2 := by conv_rhs => rw [← vsub_vadd p1 p2, map_vadd, vadd_vsub] /-- Two affine maps are equal if they coerce to the same function. -/ @[ext] theorem ext {f g : P1 →ᵃ[k] P2} (h : ∀ p, f p = g p) : f = g := DFunLike.ext _ _ h theorem coeFn_injective : @Function.Injective (P1 →ᵃ[k] P2) (P1 → P2) (⇑) := DFunLike.coe_injective protected theorem congr_arg (f : P1 →ᵃ[k] P2) {x y : P1} (h : x = y) : f x = f y := congr_arg _ h protected theorem congr_fun {f g : P1 →ᵃ[k] P2} (h : f = g) (x : P1) : f x = g x := h ▸ rfl /-- Two affine maps are equal if they have equal linear maps and are equal at some point. -/ theorem ext_linear {f g : P1 →ᵃ[k] P2} (h₁ : f.linear = g.linear) {p : P1} (h₂ : f p = g p) : f = g := by ext q have hgl : g.linear (q -ᵥ p) = toFun g ((q -ᵥ p) +ᵥ q) -ᵥ toFun g q := by simp have := f.map_vadd' q (q -ᵥ p) rw [h₁, hgl, toFun_eq_coe, map_vadd, linearMap_vsub, h₂] at this simpa /-- Two affine maps are equal if they have equal linear maps and are equal at some point. -/ theorem ext_linear_iff {f g : P1 →ᵃ[k] P2} : f = g ↔ (f.linear = g.linear) ∧ (∃ p, f p = g p) := ⟨fun h ↦ ⟨congrArg _ h, by inhabit P1; exact default, by rw [h]⟩, fun h ↦ Exists.casesOn h.2 fun _ hp ↦ ext_linear h.1 hp⟩ variable (k P1) /-- The constant function as an `AffineMap`. -/ def const (p : P2) : P1 →ᵃ[k] P2 where toFun := Function.const P1 p linear := 0 map_vadd' _ _ := letI : AddAction V2 P2 := inferInstance by simp @[simp] theorem coe_const (p : P2) : ⇑(const k P1 p) = Function.const P1 p := rfl @[simp] theorem const_apply (p : P2) (q : P1) : (const k P1 p) q = p := rfl @[simp] theorem const_linear (p : P2) : (const k P1 p).linear = 0 := rfl variable {k P1} theorem linear_eq_zero_iff_exists_const (f : P1 →ᵃ[k] P2) : f.linear = 0 ↔ ∃ q, f = const k P1 q := by refine ⟨fun h => ?_, fun h => ?_⟩ · use f (Classical.arbitrary P1) ext rw [coe_const, Function.const_apply, ← @vsub_eq_zero_iff_eq V2, ← f.linearMap_vsub, h, LinearMap.zero_apply] · rcases h with ⟨q, rfl⟩ exact const_linear k P1 q instance nonempty : Nonempty (P1 →ᵃ[k] P2) := (AddTorsor.nonempty : Nonempty P2).map <\| const k P1 /-- Construct an affine map by verifying the relation between the map and its linear part at one base point. Namely, this function takes a map `f : P₁ → P₂`, a linear map `f' : V₁ →ₗ[k] V₂`, and a point `p` such that for any other point `p'` we have `f p' = f' (p' -ᵥ p) +ᵥ f p`. -/ def mk' (f : P1 → P2) (f' : V1 →ₗ[k] V2) (p : P1) (h : ∀ p' : P1, f p' = f' (p' -ᵥ p) +ᵥ f p) : P1 →ᵃ[k] P2 where toFun := f linear := f' map_vadd' p' v := by rw [h, h p', vadd_vsub_assoc, f'.map_add, vadd_vadd] @[simp] theorem coe_mk' (f : P1 → P2) (f' : V1 →ₗ[k] V2) (p h) : ⇑(mk' f f' p h) = f := rfl @[simp] theorem mk'_linear (f : P1 → P2) (f' : V1 →ₗ[k] V2) (p h) : (mk' f f' p h).linear = f' := rfl section SMul variable {R : Type} [Monoid R] [DistribMulAction R V2] [SMulCommClass k R V2] /-- The space of affine maps to a module inherits an `R`-action from the action on its codomain. -/ instance mulAction : MulAction R (P1 →ᵃ[k] V2) where smul c f := ⟨c • ⇑f, c • f.linear, fun p v => by simp [smul_add]⟩ one_smul _ := ext fun _ => one_smul _ _ mul_smul _ _ _ := ext fun _ => mul_smul _ _ _ @[simp, norm_cast] theorem coe_smul (c : R) (f : P1 →ᵃ[k] V2) : ⇑(c • f) = c • ⇑f := rfl @[simp] theorem smul_linear (t : R) (f : P1 →ᵃ[k] V2) : (t • f).linear = t • f.linear := rfl instance isCentralScalar [DistribMulAction Rᵐᵒᵖ V2] [IsCentralScalar R V2] : IsCentralScalar R (P1 →ᵃ[k] V2) where op_smul_eq_smul _r _x := ext fun _ => op_smul_eq_smul _ _ end SMul instance : Zero (P1 →ᵃ[k] V2) where zero := ⟨0, 0, fun _ _ => (zero_vadd _ _).symm⟩ instance : Add (P1 →ᵃ[k] V2) where add f g := ⟨f + g, f.linear + g.linear, fun p v => by simp [add_add_add_comm]⟩ instance : Sub (P1 →ᵃ[k] V2) where sub f g := ⟨f - g, f.linear - g.linear, fun p v => by simp [sub_add_sub_comm]⟩ instance : Neg (P1 →ᵃ[k] V2) where neg f := ⟨-f, -f.linear, fun p v => by simp [add_comm, map_vadd f]⟩ @[simp, norm_cast] theorem coe_zero : ⇑(0 : P1 →ᵃ[k] V2) = 0 := rfl @[simp, norm_cast] theorem coe_add (f g : P1 →ᵃ[k] V2) : ⇑(f + g) = f + g := rfl @[simp, norm_cast] theorem coe_neg (f : P1 →ᵃ[k] V2) : ⇑(-f) = -f := rfl @[simp, norm_cast] theorem coe_sub (f g : P1 →ᵃ[k] V2) : ⇑(f - g) = f - g := rfl @[simp] theorem zero_linear : (0 : P1 →ᵃ[k] V2).linear = 0 := rfl @[simp] theorem add_linear (f g : P1 →ᵃ[k] V2) : (f + g).linear = f.linear + g.linear := rfl @[simp] theorem sub_linear (f g : P1 →ᵃ[k] V2) : (f - g).linear = f.linear - g.linear := rfl @[simp] theorem neg_linear (f : P1 →ᵃ[k] V2) : (-f).linear = -f.linear := rfl /-- The set of affine maps to a vector space is an additive commutative group. -/ instance : AddCommGroup (P1 →ᵃ[k] V2) := coeFn_injective.addCommGroup _ coe_zero coe_add coe_neg coe_sub (fun _ _ => coe_smul _ _) fun _ _ => coe_smul _ _ /-- The space of affine maps from `P1` to `P2` is an affine space over the space of affine maps from `P1` to the vector space `V2` corresponding to `P2`. -/ instance : AffineSpace (P1 →ᵃ[k] V2) (P1 →ᵃ[k] P2) where vadd f g := ⟨fun p => f p +ᵥ g p, f.linear + g.linear, fun p v => by simp [vadd_vadd, add_right_comm]⟩ zero_vadd f := ext fun p => zero_vadd _ (f p) add_vadd f₁ f₂ f₃ := ext fun p => add_vadd (f₁ p) (f₂ p) (f₃ p) vsub f g := ⟨fun p => f p -ᵥ g p, f.linear - g.linear, fun p v => by simp [vsub_vadd_eq_vsub_sub, vadd_vsub_assoc, add_sub, sub_add_eq_add_sub]⟩ vsub_vadd' f g := ext fun p => vsub_vadd (f p) (g p) vadd_vsub' f g := ext fun p => vadd_vsub (f p) (g p) @[simp] theorem vadd_apply (f : P1 →ᵃ[k] V2) (g : P1 →ᵃ[k] P2) (p : P1) : (f +ᵥ g) p = f p +ᵥ g p := rfl @[simp] theorem vsub_apply (f g : P1 →ᵃ[k] P2) (p : P1) : (f -ᵥ g : P1 →ᵃ[k] V2) p = f p -ᵥ g p := rfl /-- `Prod.fst` as an `AffineMap`. -/ def fst : P1 × P2 →ᵃ[k] P1 where toFun := Prod.fst linear := LinearMap.fst k V1 V2 map_vadd' _ _ := rfl @[simp] theorem coe_fst : ⇑(fst : P1 × P2 →ᵃ[k] P1) = Prod.fst := rfl @[simp] theorem fst_linear : (fst : P1 × P2 →ᵃ[k] P1).linear = LinearMap.fst k V1 V2 := rfl /-- `Prod.snd` as an `AffineMap`. -/ def snd : P1 × P2 →ᵃ[k] P2 where toFun := Prod.snd linear := LinearMap.snd k V1 V2 map_vadd' _ _ := rfl @[simp] theorem coe_snd : ⇑(snd : P1 × P2 →ᵃ[k] P2) = Prod.snd := rfl @[simp] theorem snd_linear : (snd : P1 × P2 →ᵃ[k] P2).linear = LinearMap.snd k V1 V2 := rfl variable (k P1) /-- Identity map as an affine map. -/ nonrec def id : P1 →ᵃ[k] P1 where toFun := id linear := LinearMap.id map_vadd' _ _ := rfl /-- The identity affine map acts as the identity. -/ @[simp, norm_cast] theorem coe_id : ⇑(id k P1) = _root_.id := rfl @[simp] theorem id_linear : (id k P1).linear = LinearMap.id := rfl variable {P1} /-- The identity affine map acts as the identity. -/ theorem id_apply (p : P1) : id k P1 p = p := rfl variable {k} instance : Inhabited (P1 →ᵃ[k] P1) := ⟨id k P1⟩ /-- Composition of affine maps. -/ def comp (f : P2 →ᵃ[k] P3) (g : P1 →ᵃ[k] P2) : P1 →ᵃ[k] P3 where toFun := f ∘ g linear := f.linear.comp g.linear map_vadd' := by intro p v rw [Function.comp_apply, g.map_vadd, f.map_vadd] rfl /-- Composition of affine maps acts as applying the two functions. -/ @[simp] theorem coe_comp (f : P2 →ᵃ[k] P3) (g : P1 →ᵃ[k] P2) : ⇑(f.comp g) = f ∘ g := rfl /-- Composition of affine maps acts as applying the two functions. -/ theorem comp_apply (f : P2 →ᵃ[k] P3) (g : P1 →ᵃ[k] P2) (p : P1) : f.comp g p = f (g p) := rfl @[simp] theorem comp_id (f : P1 →ᵃ[k] P2) : f.comp (id k P1) = f := ext fun _ => rfl @[simp] theorem id_comp (f : P1 →ᵃ[k] P2) : (id k P2).comp f = f := ext fun _ => rfl theorem comp_assoc (f₃₄ : P3 →ᵃ[k] P4) (f₂₃ : P2 →ᵃ[k] P3) (f₁₂ : P1 →ᵃ[k] P2) : (f₃₄.comp f₂₃).comp f₁₂ = f₃₄.comp (f₂₃.comp f₁₂) := rfl instance : Monoid (P1 →ᵃ[k] P1) where one := id k P1 mul := comp one_mul := id_comp mul_one := comp_id mul_assoc := comp_assoc @[simp] theorem coe_mul (f g : P1 →ᵃ[k] P1) : ⇑(f g) = f ∘ g := rfl @[simp] theorem coe_one : ⇑(1 : P1 →ᵃ[k] P1) = _root_.id := rfl /-- `AffineMap.linear` on endomorphisms is a `MonoidHom`. -/ @[simps] def linearHom : (P1 →ᵃ[k] P1) →* V1 →ₗ[k] V1 where toFun := linear map_one' := rfl map_mul' _ _ := rfl @[simp] theorem linear_injective_iff (f : P1 →ᵃ[k] P2) : Function.Injective f.linear ↔ Function.Injective f := by obtain ⟨p⟩ := (inferInstance : Nonempty P1) have h : ⇑f.linear = (Equiv.vaddConst (f p)).symm ∘ f ∘ Equiv.vaddConst p := by ext v simp [f.map_vadd, vadd_vsub_assoc] rw [h, Equiv.comp_injective, Equiv.injective_comp] @[simp] theorem linear_surjective_iff (f : P1 →ᵃ[k] P2) : Function.Surjective f.linear ↔ Function.Surjective f := by obtain ⟨p⟩ := (inferInstance : Nonempty P1) have h : ⇑f.linear = (Equiv.vaddConst (f p)).symm ∘ f ∘ Equiv.vaddConst p := by ext v simp [f.map_vadd, vadd_vsub_assoc] rw [h, Equiv.comp_surjective, Equiv.surjective_comp] @[simp] theorem linear_bijective_iff (f : P1 →ᵃ[k] P2) : Function.Bijective f.linear ↔ Function.Bijective f := and_congr f.linear_injective_iff f.linear_surjective_iff theorem image_vsub_image {s t : Set P1} (f : P1 →ᵃ[k] P2) : f '' s -ᵥ f '' t = f.linear '' (s -ᵥ t) := by ext v simp only [Set.mem_vsub, Set.mem_image, exists_exists_and_eq_and, exists_and_left, ← f.linearMap_vsub] constructor · rintro ⟨x, hx, y, hy, hv⟩ exact ⟨x -ᵥ y, ⟨x, hx, y, hy, rfl⟩, hv⟩ · rintro ⟨-, ⟨x, hx, y, hy, rfl⟩, rfl⟩ exact ⟨x, hx, y, hy, rfl⟩ /-! ### Definition of `AffineMap.lineMap` and lemmas about it -/ /-- The affine map from `k` to `P1` sending `0` to `p₀` and `1` to `p₁`. -/ def lineMap (p₀ p₁ : P1) : k →ᵃ[k] P1 := ((LinearMap.id : k →ₗ[k] k).smulRight (p₁ -ᵥ p₀)).toAffineMap +ᵥ const k k p₀ theorem coe_lineMap (p₀ p₁ : P1) : (lineMap p₀ p₁ : k → P1) = fun c => c • (p₁ -ᵥ p₀) +ᵥ p₀ := rfl theorem lineMap_apply (p₀ p₁ : P1) (c : k) : lineMap p₀ p₁ c = c • (p₁ -ᵥ p₀) +ᵥ p₀ := rfl theorem lineMap_apply_module' (p₀ p₁ : V1) (c : k) : lineMap p₀ p₁ c = c • (p₁ - p₀) + p₀ := rfl theorem lineMap_apply_module (p₀ p₁ : V1) (c : k) : lineMap p₀ p₁ c = (1 - c) • p₀ + c • p₁ := by simp [lineMap_apply_module', smul_sub, sub_smul]; abel theorem lineMap_apply_ring' (a b c : k) : lineMap a b c = c * (b - a) + a := rfl theorem lineMap_apply_ring (a b c : k) : lineMap a b c = (1 - c) * a + c * b := lineMap_apply_module a b c theorem lineMap_vadd_apply (p : P1) (v : V1) (c : k) : lineMap p (v +ᵥ p) c = c • v +ᵥ p := by rw [lineMap_apply, vadd_vsub] @[simp] theorem lineMap_linear (p₀ p₁ : P1) : (lineMap p₀ p₁ : k →ᵃ[k] P1).linear = LinearMap.id.smulRight (p₁ -ᵥ p₀) := add_zero _ theorem lineMap_same_apply (p : P1) (c : k) : lineMap p p c = p := by simp [lineMap_apply] @[simp] theorem lineMap_same (p : P1) : lineMap p p = const k k p := ext <\| lineMap_same_apply p @[simp] theorem lineMap_apply_zero (p₀ p₁ : P1) : lineMap p₀ p₁ (0 : k) = p₀ := by simp [lineMap_apply] @[simp] theorem lineMap_apply_one (p₀ p₁ : P1) : lineMap p₀ p₁ (1 : k) = p₁ := by simp [lineMap_apply] @[simp] theorem lineMap_eq_lineMap_iff [NoZeroSMulDivisors k V1] {p₀ p₁ : P1} {c₁ c₂ : k} : lineMap p₀ p₁ c₁ = lineMap p₀ p₁ c₂ ↔ p₀ = p₁ ∨ c₁ = c₂ := by rw [lineMap_apply, lineMap_apply, ← @vsub_eq_zero_iff_eq V1, vadd_vsub_vadd_cancel_right, ← sub_smul, smul_eq_zero, sub_eq_zero, vsub_eq_zero_iff_eq, or_comm, eq_comm] @[simp] theorem lineMap_eq_left_iff [NoZeroSMulDivisors k V1] {p₀ p₁ : P1} {c : k} : lineMap p₀ p₁ c = p₀ ↔ p₀ = p₁ ∨ c = 0 := by rw [← @lineMap_eq_lineMap_iff k V1, lineMap_apply_zero] @[simp] theorem lineMap_eq_right_iff [NoZeroSMulDivisors k V1] {p₀ p₁ : P1} {c : k} : lineMap p₀ p₁ c = p₁ ↔ p₀ = p₁ ∨ c = 1 := by rw [← @lineMap_eq_lineMap_iff k V1, lineMap_apply_one] variable (k) in theorem lineMap_injective [NoZeroSMulDivisors k V1] {p₀ p₁ : P1} (h : p₀ ≠ p₁) : Function.Injective (lineMap p₀ p₁ : k → P1) := fun _c₁ _c₂ hc => (lineMap_eq_lineMap_iff.mp hc).resolve_left h @[simp] theorem apply_lineMap (f : P1 →ᵃ[k] P2) (p₀ p₁ : P1) (c : k) : f (lineMap p₀ p₁ c) = lineMap (f p₀) (f p₁) c := by simp [lineMap_apply] @[simp] theorem comp_lineMap (f : P1 →ᵃ[k] P2) (p₀ p₁ : P1) : f.comp (lineMap p₀ p₁) = lineMap (f p₀) (f p₁) := ext <\| f.apply_lineMap p₀ p₁ @[simp] theorem fst_lineMap (p₀ p₁ : P1 × P2) (c : k) : (lineMap p₀ p₁ c).1 = lineMap p₀.1 p₁.1 c := fst.apply_lineMap p₀ p₁ c @[simp] theorem snd_lineMap (p₀ p₁ : P1 × P2) (c : k) : (lineMap p₀ p₁ c).2 = lineMap p₀.2 p₁.2 c := snd.apply_lineMap p₀ p₁ c theorem lineMap_symm (p₀ p₁ : P1) : lineMap p₀ p₁ = (lineMap p₁ p₀).comp (lineMap (1 : k) (0 : k)) := by rw [comp_lineMap] simp theorem lineMap_apply_one_sub (p₀ p₁ : P1) (c : k) : lineMap p₀ p₁ (1 - c) = lineMap p₁ p₀ c := by rw [lineMap_symm p₀, comp_apply] congr simp [lineMap_apply] @[simp] theorem lineMap_vsub_left (p₀ p₁ : P1) (c : k) : lineMap p₀ p₁ c -ᵥ p₀ = c • (p₁ -ᵥ p₀) := vadd_vsub _ _ @[simp]	theorem left_vsub_lineMap (p₀ p₁ : P1) (c : k) : p₀ -ᵥ lineMap p₀ p₁ c = c • (p₀ -ᵥ p₁) := by rw [← neg_vsub_eq_vsub_rev, lineMap_vsub_left, ← smul_neg, neg_vsub_eq_vsub_rev]	Mathlib/LinearAlgebra/AffineSpace/AffineMap.lean	539	540
/- Copyright (c) 2023 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Data.Set.Image import Mathlib.Data.List.Defs /-! # Lemmas about `List`s and `Set.range` In this file we prove lemmas about range of some operations on lists. -/ open List variable {α β : Type*} (l : List α) namespace Set theorem range_list_map (f : α → β) : range (map f) = { l \| ∀ x ∈ l, x ∈ range f } := by refine antisymm (range_subset_iff.2 fun l => forall_mem_map.2 fun y _ => mem_range_self _)	fun l hl => ?_ induction l with \| nil => exact ⟨[], rfl⟩ \| cons a l ihl => rcases ihl fun x hx => hl x <\| subset_cons_self _ _ hx with ⟨l, rfl⟩ rcases hl a mem_cons_self with ⟨a, rfl⟩ exact ⟨a :: l, map_cons⟩	Mathlib/Data/Set/List.lean	24	30
/- Copyright (c) 2022 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.Geometry.RingedSpace.PresheafedSpace.Gluing import Mathlib.AlgebraicGeometry.Cover.Open /-! # Gluing Schemes Given a family of gluing data of schemes, we may glue them together. ## Main definitions * `AlgebraicGeometry.Scheme.GlueData`: A structure containing the family of gluing data. * `AlgebraicGeometry.Scheme.GlueData.glued`: The glued scheme. This is defined as the multicoequalizer of `∐ V i j ⇉ ∐ U i`, so that the general colimit API can be used. * `AlgebraicGeometry.Scheme.GlueData.ι`: The immersion `ι i : U i ⟶ glued` for each `i : J`. * `AlgebraicGeometry.Scheme.GlueData.isoCarrier`: The isomorphism between the underlying space of the glued scheme and the gluing of the underlying topological spaces. * `AlgebraicGeometry.Scheme.OpenCover.gluedCover`: The glue data associated with an open cover. * `AlgebraicGeometry.Scheme.OpenCover.fromGlued`: The canonical morphism `𝒰.gluedCover.glued ⟶ X`. This has an `is_iso` instance. * `AlgebraicGeometry.Scheme.OpenCover.glueMorphisms`: We may glue a family of compatible morphisms defined on an open cover of a scheme. ## Main results * `AlgebraicGeometry.Scheme.GlueData.ι_isOpenImmersion`: The map `ι i : U i ⟶ glued` is an open immersion for each `i : J`. * `AlgebraicGeometry.Scheme.GlueData.ι_jointly_surjective` : The underlying maps of `ι i : U i ⟶ glued` are jointly surjective. * `AlgebraicGeometry.Scheme.GlueData.vPullbackConeIsLimit` : `V i j` is the pullback (intersection) of `U i` and `U j` over the glued space. * `AlgebraicGeometry.Scheme.GlueData.ι_eq_iff` : `ι i x = ι j y` if and only if they coincide when restricted to `V i i`. * `AlgebraicGeometry.Scheme.GlueData.isOpen_iff` : A subset of the glued scheme is open iff all its preimages in `U i` are open. ## Implementation details All the hard work is done in `AlgebraicGeometry/PresheafedSpace/Gluing.lean` where we glue presheafed spaces, sheafed spaces, and locally ringed spaces. -/ noncomputable section universe u open TopologicalSpace CategoryTheory Opposite Topology open CategoryTheory.Limits AlgebraicGeometry.PresheafedSpace open CategoryTheory.GlueData namespace AlgebraicGeometry namespace Scheme /-- A family of gluing data consists of 1. An index type `J` 2. A scheme `U i` for each `i : J`. 3. A scheme `V i j` for each `i j : J`. (Note that this is `J × J → Scheme` rather than `J → J → Scheme` to connect to the limits library easier.) 4. An open immersion `f i j : V i j ⟶ U i` for each `i j : ι`. 5. A transition map `t i j : V i j ⟶ V j i` for each `i j : ι`. such that 6. `f i i` is an isomorphism. 7. `t i i` is the identity. 8. `V i j ×[U i] V i k ⟶ V i j ⟶ V j i` factors through `V j k ×[U j] V j i ⟶ V j i` via some `t' : V i j ×[U i] V i k ⟶ V j k ×[U j] V j i`. 9. `t' i j k ≫ t' j k i ≫ t' k i j = 𝟙 _`. We can then glue the schemes `U i` together by identifying `V i j` with `V j i`, such that the `U i`'s are open subschemes of the glued space. -/ structure GlueData extends CategoryTheory.GlueData Scheme where f_open : ∀ i j, IsOpenImmersion (f i j) attribute [instance] GlueData.f_open namespace GlueData variable (D : GlueData.{u}) local notation "𝖣" => D.toGlueData /-- The glue data of locally ringed spaces associated to a family of glue data of schemes. -/ abbrev toLocallyRingedSpaceGlueData : LocallyRingedSpace.GlueData := { f_open := D.f_open toGlueData := 𝖣.mapGlueData forgetToLocallyRingedSpace } instance (i j : 𝖣.J) : LocallyRingedSpace.IsOpenImmersion ((D.toLocallyRingedSpaceGlueData).toGlueData.f i j) := by apply GlueData.f_open instance (i j : 𝖣.J) : SheafedSpace.IsOpenImmersion (D.toLocallyRingedSpaceGlueData.toSheafedSpaceGlueData.toGlueData.f i j) := by apply GlueData.f_open instance (i j : 𝖣.J) : PresheafedSpace.IsOpenImmersion (D.toLocallyRingedSpaceGlueData.toSheafedSpaceGlueData.toPresheafedSpaceGlueData.toGlueData.f i j) := by apply GlueData.f_open instance (i : 𝖣.J) : LocallyRingedSpace.IsOpenImmersion ((D.toLocallyRingedSpaceGlueData).toGlueData.ι i) := by apply LocallyRingedSpace.GlueData.ι_isOpenImmersion /-- (Implementation). The glued scheme of a glue data. This should not be used outside this file. Use `AlgebraicGeometry.Scheme.GlueData.glued` instead. -/ def gluedScheme : Scheme := by apply LocallyRingedSpace.IsOpenImmersion.scheme D.toLocallyRingedSpaceGlueData.toGlueData.glued intro x obtain ⟨i, y, rfl⟩ := D.toLocallyRingedSpaceGlueData.ι_jointly_surjective x refine ⟨_, ((D.U i).affineCover.map y).toLRSHom ≫ D.toLocallyRingedSpaceGlueData.toGlueData.ι i, ?_⟩ constructor · simp only [LocallyRingedSpace.comp_toShHom, SheafedSpace.comp_base, TopCat.hom_comp, ContinuousMap.coe_comp, Set.range_comp] refine Set.mem_image_of_mem _ ?_ exact (D.U i).affineCover.covers y · infer_instance instance : CreatesColimit 𝖣.diagram.multispan forgetToLocallyRingedSpace := createsColimitOfFullyFaithfulOfIso D.gluedScheme (HasColimit.isoOfNatIso (𝖣.diagramIso forgetToLocallyRingedSpace).symm) instance : PreservesColimit (𝖣.diagram.multispan) forgetToTop := inferInstanceAs (PreservesColimit (𝖣.diagram).multispan (forgetToLocallyRingedSpace ⋙ LocallyRingedSpace.forgetToSheafedSpace ⋙ SheafedSpace.forget CommRingCat)) instance : HasMulticoequalizer 𝖣.diagram := hasColimit_of_created _ forgetToLocallyRingedSpace /-- The glued scheme of a glued space. -/ abbrev glued : Scheme := 𝖣.glued /-- The immersion from `D.U i` into the glued space. -/ abbrev ι (i : D.J) : D.U i ⟶ D.glued := 𝖣.ι i /-- The gluing as sheafed spaces is isomorphic to the gluing as presheafed spaces. -/ abbrev isoLocallyRingedSpace : D.glued.toLocallyRingedSpace ≅ D.toLocallyRingedSpaceGlueData.toGlueData.glued := 𝖣.gluedIso forgetToLocallyRingedSpace theorem ι_isoLocallyRingedSpace_inv (i : D.J) : D.toLocallyRingedSpaceGlueData.toGlueData.ι i ≫ D.isoLocallyRingedSpace.inv = (𝖣.ι i).toLRSHom := 𝖣.ι_gluedIso_inv forgetToLocallyRingedSpace i instance ι_isOpenImmersion (i : D.J) : IsOpenImmersion (𝖣.ι i) := by rw [IsOpenImmersion, ← D.ι_isoLocallyRingedSpace_inv]; infer_instance theorem ι_jointly_surjective (x : 𝖣.glued.carrier) : ∃ (i : D.J) (y : (D.U i).carrier), (D.ι i).base y = x := 𝖣.ι_jointly_surjective (forgetToTop ⋙ forget TopCat) x /-- Promoted to higher priority to short circuit simplifier. -/ @[simp (high), reassoc] theorem glue_condition (i j : D.J) : D.t i j ≫ D.f j i ≫ D.ι j = D.f i j ≫ D.ι i := 𝖣.glue_condition i j /-- The pullback cone spanned by `V i j ⟶ U i` and `V i j ⟶ U j`. This is a pullback diagram (`vPullbackConeIsLimit`). -/ def vPullbackCone (i j : D.J) : PullbackCone (D.ι i) (D.ι j) := PullbackCone.mk (D.f i j) (D.t i j ≫ D.f j i) (by simp) /-- The following diagram is a pullback, i.e. `Vᵢⱼ` is the intersection of `Uᵢ` and `Uⱼ` in `X`. ``` Vᵢⱼ ⟶ Uᵢ \| \| ↓ ↓ Uⱼ ⟶ X ``` -/ def vPullbackConeIsLimit (i j : D.J) : IsLimit (D.vPullbackCone i j) := 𝖣.vPullbackConeIsLimitOfMap forgetToLocallyRingedSpace i j (D.toLocallyRingedSpaceGlueData.vPullbackConeIsLimit _ _) local notation "D_" => TopCat.GlueData.toGlueData <\| D.toLocallyRingedSpaceGlueData.toSheafedSpaceGlueData.toPresheafedSpaceGlueData.toTopGlueData /-- The underlying topological space of the glued scheme is isomorphic to the gluing of the underlying spaces -/ def isoCarrier : D.glued.carrier ≅ (D_).glued := by refine (PresheafedSpace.forget _).mapIso ?_ ≪≫ GlueData.gluedIso _ (PresheafedSpace.forget.{_, _, u} _) refine SheafedSpace.forgetToPresheafedSpace.mapIso ?_ ≪≫ SheafedSpace.GlueData.isoPresheafedSpace _ refine LocallyRingedSpace.forgetToSheafedSpace.mapIso ?_ ≪≫ LocallyRingedSpace.GlueData.isoSheafedSpace _ exact Scheme.GlueData.isoLocallyRingedSpace _ @[simp] theorem ι_isoCarrier_inv (i : D.J) : (D_).ι i ≫ D.isoCarrier.inv = (D.ι i).base := by delta isoCarrier rw [Iso.trans_inv, GlueData.ι_gluedIso_inv_assoc, Functor.mapIso_inv, Iso.trans_inv, Functor.mapIso_inv, Iso.trans_inv, SheafedSpace.forgetToPresheafedSpace_map, forget_map, forget_map, ← PresheafedSpace.comp_base, ← Category.assoc, D.toLocallyRingedSpaceGlueData.toSheafedSpaceGlueData.ι_isoPresheafedSpace_inv i] erw [← Category.assoc, D.toLocallyRingedSpaceGlueData.ι_isoSheafedSpace_inv i] change (_ ≫ D.isoLocallyRingedSpace.inv).base = _ rw [D.ι_isoLocallyRingedSpace_inv i] /-- An equivalence relation on `Σ i, D.U i` that holds iff `𝖣.ι i x = 𝖣.ι j y`. See `AlgebraicGeometry.Scheme.GlueData.ι_eq_iff`. -/ def Rel (a b : Σ i, ((D.U i).carrier : Type _)) : Prop := ∃ x : (D.V (a.1, b.1)).carrier, (D.f _ _).base x = a.2 ∧ (D.t _ _ ≫ D.f _ _).base x = b.2 theorem ι_eq_iff (i j : D.J) (x : (D.U i).carrier) (y : (D.U j).carrier) : (𝖣.ι i).base x = (𝖣.ι j).base y ↔ D.Rel ⟨i, x⟩ ⟨j, y⟩ := by refine Iff.trans ?_ (TopCat.GlueData.ι_eq_iff_rel D.toLocallyRingedSpaceGlueData.toSheafedSpaceGlueData.toPresheafedSpaceGlueData.toTopGlueData i j x y) rw [← ((TopCat.mono_iff_injective D.isoCarrier.inv).mp _).eq_iff, ← ConcreteCategory.comp_apply] · simp_rw [← D.ι_isoCarrier_inv] rfl -- `rfl` was not needed before https://github.com/leanprover-community/mathlib4/pull/13170 · infer_instance theorem isOpen_iff (U : Set D.glued.carrier) : IsOpen U ↔ ∀ i, IsOpen ((D.ι i).base ⁻¹' U) := by rw [← (TopCat.homeoOfIso D.isoCarrier.symm).isOpen_preimage, TopCat.GlueData.isOpen_iff] apply forall_congr' intro i rw [← Set.preimage_comp, ← ι_isoCarrier_inv] rfl /-- The open cover of the glued space given by the glue data. -/ @[simps -isSimp] def openCover (D : Scheme.GlueData) : OpenCover D.glued where J := D.J obj := D.U map := D.ι f x := (D.ι_jointly_surjective x).choose covers x := ⟨_, (D.ι_jointly_surjective x).choose_spec.choose_spec⟩ end GlueData namespace Cover variable {X : Scheme.{u}} (𝒰 : OpenCover.{u} X) /-- (Implementation) the transition maps in the glue data associated with an open cover. -/ def gluedCoverT' (x y z : 𝒰.J) : pullback (pullback.fst (𝒰.map x) (𝒰.map y)) (pullback.fst (𝒰.map x) (𝒰.map z)) ⟶ pullback (pullback.fst (𝒰.map y) (𝒰.map z)) (pullback.fst (𝒰.map y) (𝒰.map x)) := by refine (pullbackRightPullbackFstIso _ _ _).hom ≫ ?_ refine ?_ ≫ (pullbackSymmetry _ _).hom refine ?_ ≫ (pullbackRightPullbackFstIso _ _ _).inv refine pullback.map _ _ _ _ (pullbackSymmetry _ _).hom (𝟙 _) (𝟙 _) ?_ ?_ · simp [pullback.condition] · simp @[simp, reassoc] theorem gluedCoverT'_fst_fst (x y z : 𝒰.J) : 𝒰.gluedCoverT' x y z ≫ pullback.fst _ _ ≫ pullback.fst _ _ = pullback.fst _ _ ≫ pullback.snd _ _ := by delta gluedCoverT'; simp @[simp, reassoc] theorem gluedCoverT'_fst_snd (x y z : 𝒰.J) : gluedCoverT' 𝒰 x y z ≫ pullback.fst _ _ ≫ pullback.snd _ _ = pullback.snd _ _ ≫ pullback.snd _ _ := by delta gluedCoverT'; simp @[simp, reassoc] theorem gluedCoverT'_snd_fst (x y z : 𝒰.J) : gluedCoverT' 𝒰 x y z ≫ pullback.snd _ _ ≫ pullback.fst _ _ = pullback.fst _ _ ≫ pullback.snd _ _ := by delta gluedCoverT'; simp @[simp, reassoc] theorem gluedCoverT'_snd_snd (x y z : 𝒰.J) : gluedCoverT' 𝒰 x y z ≫ pullback.snd _ _ ≫ pullback.snd _ _ = pullback.fst _ _ ≫ pullback.fst _ _ := by delta gluedCoverT'; simp theorem glued_cover_cocycle_fst (x y z : 𝒰.J) : gluedCoverT' 𝒰 x y z ≫ gluedCoverT' 𝒰 y z x ≫ gluedCoverT' 𝒰 z x y ≫ pullback.fst _ _ = pullback.fst _ _ := by apply pullback.hom_ext <;> simp theorem glued_cover_cocycle_snd (x y z : 𝒰.J) : gluedCoverT' 𝒰 x y z ≫ gluedCoverT' 𝒰 y z x ≫ gluedCoverT' 𝒰 z x y ≫ pullback.snd _ _ = pullback.snd _ _ := by apply pullback.hom_ext <;> simp [pullback.condition] theorem glued_cover_cocycle (x y z : 𝒰.J) : gluedCoverT' 𝒰 x y z ≫ gluedCoverT' 𝒰 y z x ≫ gluedCoverT' 𝒰 z x y = 𝟙 _ := by apply pullback.hom_ext <;> simp_rw [Category.id_comp, Category.assoc] · apply glued_cover_cocycle_fst · apply glued_cover_cocycle_snd /-- The glue data associated with an open cover. The canonical isomorphism `𝒰.gluedCover.glued ⟶ X` is provided by `𝒰.fromGlued`. -/ @[simps] def gluedCover : Scheme.GlueData.{u} where J := 𝒰.J U := 𝒰.obj V := fun ⟨x, y⟩ => pullback (𝒰.map x) (𝒰.map y) f _ _ := pullback.fst _ _ f_id _ := inferInstance t _ _ := (pullbackSymmetry _ _).hom t_id x := by simp t' x y z := gluedCoverT' 𝒰 x y z	t_fac x y z := by apply pullback.hom_ext <;> simp -- The `cocycle` field could have been `by tidy` but lean timeouts. cocycle x y z := glued_cover_cocycle 𝒰 x y z f_open _ := inferInstance	Mathlib/AlgebraicGeometry/Gluing.lean	319	322
/- Copyright (c) 2024 David Loeffler. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alex Kontorovich, David Loeffler, Heather Macbeth, Sébastien Gouëzel -/ import Mathlib.Analysis.Calculus.ParametricIntegral import Mathlib.Analysis.Calculus.ContDiff.CPolynomial import Mathlib.Analysis.Fourier.AddCircle import Mathlib.Analysis.Fourier.FourierTransform import Mathlib.Analysis.Calculus.FDeriv.Analytic import Mathlib.Analysis.Calculus.LineDeriv.IntegrationByParts import Mathlib.Analysis.Calculus.ContDiff.Bounds /-! # Derivatives of the Fourier transform In this file we compute the Fréchet derivative of the Fourier transform of `f`, where `f` is a function such that both `f` and `v ↦ ‖v‖ * ‖f v‖` are integrable. Here the Fourier transform is understood as an operator `(V → E) → (W → E)`, where `V` and `W` are normed `ℝ`-vector spaces and the Fourier transform is taken with respect to a continuous `ℝ`-bilinear pairing `L : V × W → ℝ` and a given reference measure `μ`. We also investigate higher derivatives: Assuming that `‖v‖^n * ‖f v‖` is integrable, we show that the Fourier transform of `f` is `C^n`. We also study in a parallel way the Fourier transform of the derivative, which is obtained by tensoring the Fourier transform of the original function with the bilinear form. We also get results for iterated derivatives. A consequence of these results is that, if a function is smooth and all its derivatives are integrable when multiplied by `‖v‖^k`, then the same goes for its Fourier transform, with explicit bounds. We give specialized versions of these results on inner product spaces (where `L` is the scalar product) and on the real line, where we express the one-dimensional derivative in more concrete terms, as the Fourier transform of `-2πI x * f x` (or `(-2πI x)^n * f x` for higher derivatives). ## Main definitions and results We introduce two convenience definitions: * `VectorFourier.fourierSMulRight L f`: given `f : V → E` and `L` a bilinear pairing between `V` and `W`, then this is the function `fun v ↦ -(2 * π * I) (L v ⬝) • f v`, from `V` to `Hom (W, E)`. This is essentially `ContinuousLinearMap.smulRight`, up to the factor `- 2πI` designed to make sure that the Fourier integral of `fourierSMulRight L f` is the derivative of the Fourier integral of `f`. * `VectorFourier.fourierPowSMulRight` is the higher order analogue for higher derivatives: `fourierPowSMulRight L f v n` is informally `(-(2 * π * I))^n (L v ⬝)^n • f v`, in the space of continuous multilinear maps `W [×n]→L[ℝ] E`. With these definitions, the statements read as follows, first in a general context (arbitrary `L` and `μ`): * `VectorFourier.hasFDerivAt_fourierIntegral`: the Fourier integral of `f` is differentiable, with derivative the Fourier integral of `fourierSMulRight L f`. * `VectorFourier.differentiable_fourierIntegral`: the Fourier integral of `f` is differentiable. * `VectorFourier.fderiv_fourierIntegral`: formula for the derivative of the Fourier integral of `f`. * `VectorFourier.fourierIntegral_fderiv`: formula for the Fourier integral of the derivative of `f`. * `VectorFourier.hasFTaylorSeriesUpTo_fourierIntegral`: under suitable integrability conditions, the Fourier integral of `f` has an explicit Taylor series up to order `N`, given by the Fourier integrals of `fun v ↦ fourierPowSMulRight L f v n`. * `VectorFourier.contDiff_fourierIntegral`: under suitable integrability conditions, the Fourier integral of `f` is `C^n`. * `VectorFourier.iteratedFDeriv_fourierIntegral`: under suitable integrability conditions, explicit formula for the `n`-th derivative of the Fourier integral of `f`, as the Fourier integral of `fun v ↦ fourierPowSMulRight L f v n`. * `VectorFourier.pow_mul_norm_iteratedFDeriv_fourierIntegral_le`: explicit bounds for the `n`-th derivative of the Fourier integral, multiplied by a power function, in terms of corresponding integrals for the original function. These statements are then specialized to the case of the usual Fourier transform on finite-dimensional inner product spaces with their canonical Lebesgue measure (covering in particular the case of the real line), replacing the namespace `VectorFourier` by the namespace `Real` in the above statements. We also give specialized versions of the one-dimensional real derivative (and iterated derivative) in `Real.deriv_fourierIntegral` and `Real.iteratedDeriv_fourierIntegral`. -/ noncomputable section open Real Complex MeasureTheory Filter TopologicalSpace open scoped FourierTransform Topology ContDiff -- without this local instance, Lean tries first the instance -- `secondCountableTopologyEither_of_right` (whose priority is 100) and takes a very long time to -- fail. Since we only use the left instance in this file, we make sure it is tried first. attribute [local instance 101] secondCountableTopologyEither_of_left namespace Real lemma hasDerivAt_fourierChar (x : ℝ) : HasDerivAt (𝐞 · : ℝ → ℂ) (2 * π * I * 𝐞 x) x := by have h1 (y : ℝ) : 𝐞 y = fourier 1 (y : UnitAddCircle) := by rw [fourierChar_apply, fourier_coe_apply] push_cast ring_nf simpa only [h1, Int.cast_one, ofReal_one, div_one, mul_one] using hasDerivAt_fourier 1 1 x lemma differentiable_fourierChar : Differentiable ℝ (𝐞 · : ℝ → ℂ) := fun x ↦ (Real.hasDerivAt_fourierChar x).differentiableAt lemma deriv_fourierChar (x : ℝ) : deriv (𝐞 · : ℝ → ℂ) x = 2 * π * I * 𝐞 x := (Real.hasDerivAt_fourierChar x).deriv variable {V W : Type} [NormedAddCommGroup V] [NormedSpace ℝ V] [NormedAddCommGroup W] [NormedSpace ℝ W] (L : V →L[ℝ] W →L[ℝ] ℝ) lemma hasFDerivAt_fourierChar_neg_bilinear_right (v : V) (w : W) : HasFDerivAt (fun w ↦ (𝐞 (-L v w) : ℂ)) ((-2 π * I * 𝐞 (-L v w)) • (ofRealCLM ∘L (L v))) w := by have ha : HasFDerivAt (fun w' : W ↦ L v w') (L v) w := ContinuousLinearMap.hasFDerivAt (L v) convert (hasDerivAt_fourierChar (-L v w)).hasFDerivAt.comp w ha.neg using 1 ext y simp only [neg_mul, ContinuousLinearMap.coe_smul', ContinuousLinearMap.coe_comp', Pi.smul_apply, Function.comp_apply, ofRealCLM_apply, smul_eq_mul, ContinuousLinearMap.comp_neg, ContinuousLinearMap.neg_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.one_apply, real_smul, neg_inj] ring lemma fderiv_fourierChar_neg_bilinear_right_apply (v : V) (w y : W) : fderiv ℝ (fun w ↦ (𝐞 (-L v w) : ℂ)) w y = -2 * π * I * L v y * 𝐞 (-L v w) := by simp only [(hasFDerivAt_fourierChar_neg_bilinear_right L v w).fderiv, neg_mul, ContinuousLinearMap.coe_smul', ContinuousLinearMap.coe_comp', Pi.smul_apply, Function.comp_apply, ofRealCLM_apply, smul_eq_mul, neg_inj] ring lemma differentiable_fourierChar_neg_bilinear_right (v : V) : Differentiable ℝ (fun w ↦ (𝐞 (-L v w) : ℂ)) := fun w ↦ (hasFDerivAt_fourierChar_neg_bilinear_right L v w).differentiableAt lemma hasFDerivAt_fourierChar_neg_bilinear_left (v : V) (w : W) : HasFDerivAt (fun v ↦ (𝐞 (-L v w) : ℂ)) ((-2 * π * I * 𝐞 (-L v w)) • (ofRealCLM ∘L (L.flip w))) v := hasFDerivAt_fourierChar_neg_bilinear_right L.flip w v lemma fderiv_fourierChar_neg_bilinear_left_apply (v y : V) (w : W) : fderiv ℝ (fun v ↦ (𝐞 (-L v w) : ℂ)) v y = -2 * π * I * L y w * 𝐞 (-L v w) := by simp only [(hasFDerivAt_fourierChar_neg_bilinear_left L v w).fderiv, neg_mul, ContinuousLinearMap.coe_smul', ContinuousLinearMap.coe_comp', Pi.smul_apply, Function.comp_apply, ContinuousLinearMap.flip_apply, ofRealCLM_apply, smul_eq_mul, neg_inj] ring lemma differentiable_fourierChar_neg_bilinear_left (w : W) : Differentiable ℝ (fun v ↦ (𝐞 (-L v w) : ℂ)) := fun v ↦ (hasFDerivAt_fourierChar_neg_bilinear_left L v w).differentiableAt end Real variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℂ E] namespace VectorFourier variable {V W : Type} [NormedAddCommGroup V] [NormedSpace ℝ V] [NormedAddCommGroup W] [NormedSpace ℝ W] (L : V →L[ℝ] W →L[ℝ] ℝ) (f : V → E) /-- Send a function `f : V → E` to the function `f : V → Hom (W, E)` given by `v ↦ (w ↦ -2 * π * I * L (v, w) • f v)`. This is designed so that the Fourier transform of `fourierSMulRight L f` is the derivative of the Fourier transform of `f`. -/ def fourierSMulRight (v : V) : (W →L[ℝ] E) := -(2 * π * I) • (L v).smulRight (f v) @[simp] lemma fourierSMulRight_apply (v : V) (w : W) : fourierSMulRight L f v w = -(2 * π * I) • L v w • f v := rfl /-- The `w`-derivative of the Fourier transform integrand. -/ lemma hasFDerivAt_fourierChar_smul (v : V) (w : W) : HasFDerivAt (fun w' ↦ 𝐞 (-L v w') • f v) (𝐞 (-L v w) • fourierSMulRight L f v) w := by have ha : HasFDerivAt (fun w' : W ↦ L v w') (L v) w := ContinuousLinearMap.hasFDerivAt (L v) convert ((hasDerivAt_fourierChar (-L v w)).hasFDerivAt.comp w ha.neg).smul_const (f v) ext w' : 1 simp_rw [fourierSMulRight, ContinuousLinearMap.smul_apply, ContinuousLinearMap.smulRight_apply] rw [ContinuousLinearMap.comp_apply, ContinuousLinearMap.neg_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.one_apply, ← smul_assoc, smul_comm, ← smul_assoc, real_smul, real_smul, Submonoid.smul_def, smul_eq_mul] push_cast ring_nf lemma norm_fourierSMulRight (L : V →L[ℝ] W →L[ℝ] ℝ) (f : V → E) (v : V) : ‖fourierSMulRight L f v‖ = (2 * π) * ‖L v‖ * ‖f v‖ := by rw [fourierSMulRight, norm_smul _ (ContinuousLinearMap.smulRight (L v) (f v)), norm_neg, norm_mul, norm_mul, norm_I, mul_one, Complex.norm_of_nonneg pi_pos.le, Complex.norm_two, ContinuousLinearMap.norm_smulRight_apply, ← mul_assoc] lemma norm_fourierSMulRight_le (L : V →L[ℝ] W →L[ℝ] ℝ) (f : V → E) (v : V) : ‖fourierSMulRight L f v‖ ≤ 2 * π * ‖L‖ * ‖v‖ * ‖f v‖ := calc ‖fourierSMulRight L f v‖ = (2 * π) * ‖L v‖ * ‖f v‖ := norm_fourierSMulRight _ _ _ _ ≤ (2 * π) * (‖L‖ * ‖v‖) * ‖f v‖ := by gcongr; exact L.le_opNorm _ _ = 2 * π * ‖L‖ * ‖v‖ * ‖f v‖ := by ring lemma _root_.MeasureTheory.AEStronglyMeasurable.fourierSMulRight [SecondCountableTopologyEither V (W →L[ℝ] ℝ)] [MeasurableSpace V] [BorelSpace V] {L : V →L[ℝ] W →L[ℝ] ℝ} {f : V → E} {μ : Measure V} (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable (fun v ↦ fourierSMulRight L f v) μ := by apply AEStronglyMeasurable.const_smul' have aux0 : Continuous fun p : (W →L[ℝ] ℝ) × E ↦ p.1.smulRight p.2 := (ContinuousLinearMap.smulRightL ℝ W E).continuous₂ have aux1 : AEStronglyMeasurable (fun v ↦ (L v, f v)) μ := L.continuous.aestronglyMeasurable.prodMk hf -- Elaboration without the expected type is faster here: exact (aux0.comp_aestronglyMeasurable aux1 :) variable {f} /-- Main theorem of this section: if both `f` and `x ↦ ‖x‖ * ‖f x‖` are integrable, then the Fourier transform of `f` has a Fréchet derivative (everywhere in its domain) and its derivative is the Fourier transform of `smulRight L f`. -/ theorem hasFDerivAt_fourierIntegral [MeasurableSpace V] [BorelSpace V] [SecondCountableTopology V] {μ : Measure V} (hf : Integrable f μ) (hf' : Integrable (fun v : V ↦ ‖v‖ * ‖f v‖) μ) (w : W) : HasFDerivAt (fourierIntegral 𝐞 μ L.toLinearMap₂ f) (fourierIntegral 𝐞 μ L.toLinearMap₂ (fourierSMulRight L f) w) w := by let F : W → V → E := fun w' v ↦ 𝐞 (-L v w') • f v let F' : W → V → W →L[ℝ] E := fun w' v ↦ 𝐞 (-L v w') • fourierSMulRight L f v let B : V → ℝ := fun v ↦ 2 * π * ‖L‖ * ‖v‖ * ‖f v‖ have h0 (w' : W) : Integrable (F w') μ := (fourierIntegral_convergent_iff continuous_fourierChar (by apply L.continuous₂ : Continuous (fun p : V × W ↦ L.toLinearMap₂ p.1 p.2)) w').2 hf have h1 : ∀ᶠ w' in 𝓝 w, AEStronglyMeasurable (F w') μ := Eventually.of_forall (fun w' ↦ (h0 w').aestronglyMeasurable) have h3 : AEStronglyMeasurable (F' w) μ := by refine .smul ?_ hf.1.fourierSMulRight refine (continuous_fourierChar.comp ?_).aestronglyMeasurable fun_prop have h4 : (∀ᵐ v ∂μ, ∀ (w' : W), w' ∈ Metric.ball w 1 → ‖F' w' v‖ ≤ B v) := by filter_upwards with v w' _ rw [Circle.norm_smul _ (fourierSMulRight L f v)] exact norm_fourierSMulRight_le L f v have h5 : Integrable B μ := by simpa only [← mul_assoc] using hf'.const_mul (2 * π * ‖L‖) have h6 : ∀ᵐ v ∂μ, ∀ w', w' ∈ Metric.ball w 1 → HasFDerivAt (fun x ↦ F x v) (F' w' v) w' := ae_of_all _ (fun v w' _ ↦ hasFDerivAt_fourierChar_smul L f v w') exact hasFDerivAt_integral_of_dominated_of_fderiv_le one_pos h1 (h0 w) h3 h4 h5 h6 lemma fderiv_fourierIntegral [MeasurableSpace V] [BorelSpace V] [SecondCountableTopology V] {μ : Measure V} (hf : Integrable f μ) (hf' : Integrable (fun v : V ↦ ‖v‖ * ‖f v‖) μ) : fderiv ℝ (fourierIntegral 𝐞 μ L.toLinearMap₂ f) = fourierIntegral 𝐞 μ L.toLinearMap₂ (fourierSMulRight L f) := by ext w : 1 exact (hasFDerivAt_fourierIntegral L hf hf' w).fderiv lemma differentiable_fourierIntegral [MeasurableSpace V] [BorelSpace V] [SecondCountableTopology V] {μ : Measure V} (hf : Integrable f μ) (hf' : Integrable (fun v : V ↦ ‖v‖ * ‖f v‖) μ) : Differentiable ℝ (fourierIntegral 𝐞 μ L.toLinearMap₂ f) := fun w ↦ (hasFDerivAt_fourierIntegral L hf hf' w).differentiableAt /-- The Fourier integral of the derivative of a function is obtained by multiplying the Fourier integral of the original function by `-L w v`. -/ theorem fourierIntegral_fderiv [MeasurableSpace V] [BorelSpace V] [FiniteDimensional ℝ V] {μ : Measure V} [Measure.IsAddHaarMeasure μ] (hf : Integrable f μ) (h'f : Differentiable ℝ f) (hf' : Integrable (fderiv ℝ f) μ) : fourierIntegral 𝐞 μ L.toLinearMap₂ (fderiv ℝ f) = fourierSMulRight (-L.flip) (fourierIntegral 𝐞 μ L.toLinearMap₂ f) := by ext w y let g (v : V) : ℂ := 𝐞 (-L v w) /- First rewrite things in a simplified form, without any real change. -/ suffices ∫ x, g x • fderiv ℝ f x y ∂μ = ∫ x, (2 * ↑π * I * L y w * g x) • f x ∂μ by rw [fourierIntegral_continuousLinearMap_apply' hf'] simpa only [fourierIntegral, ContinuousLinearMap.toLinearMap₂_apply, fourierSMulRight_apply, ContinuousLinearMap.neg_apply, ContinuousLinearMap.flip_apply, ← integral_smul, neg_smul, smul_neg, ← smul_smul, coe_smul, neg_neg] -- Key step: integrate by parts with respect to `y` to switch the derivative from `f` to `g`. have A x : fderiv ℝ g x y = - 2 * ↑π * I * L y w * g x := fderiv_fourierChar_neg_bilinear_left_apply _ _ _ _ rw [integral_smul_fderiv_eq_neg_fderiv_smul_of_integrable, ← integral_neg] · congr with x simp only [A, neg_mul, neg_smul, neg_neg] · have : Integrable (fun x ↦ (-(2 * ↑π * I * ↑((L y) w)) • ((g x : ℂ) • f x))) μ := ((fourierIntegral_convergent_iff' _ _).2 hf).smul _ convert this using 2 with x simp only [A, neg_mul, neg_smul, smul_smul] · exact (fourierIntegral_convergent_iff' _ _).2 (hf'.apply_continuousLinearMap _) · exact (fourierIntegral_convergent_iff' _ _).2 hf · exact differentiable_fourierChar_neg_bilinear_left _ _ · exact h'f /-- The formal multilinear series whose `n`-th term is `(w₁, ..., wₙ) ↦ (-2πI)^n * L v w₁ * ... * L v wₙ • f v`, as a continuous multilinear map in the space `W [×n]→L[ℝ] E`. This is designed so that the Fourier transform of `v ↦ fourierPowSMulRight L f v n` is the `n`-th derivative of the Fourier transform of `f`. -/ def fourierPowSMulRight (f : V → E) (v : V) : FormalMultilinearSeries ℝ W E := fun n ↦ (- (2 * π * I))^n • ((ContinuousMultilinearMap.mkPiRing ℝ (Fin n) (f v)).compContinuousLinearMap (fun _ ↦ L v)) /- Increase the priority to make sure that this lemma is used instead of `FormalMultilinearSeries.apply_eq_prod_smul_coeff` even in dimension 1. -/ @[simp 1100] lemma fourierPowSMulRight_apply {f : V → E} {v : V} {n : ℕ} {m : Fin n → W} : fourierPowSMulRight L f v n m = (- (2 * π * I))^n • (∏ i, L v (m i)) • f v := by simp [fourierPowSMulRight] open ContinuousMultilinearMap /-- Decomposing `fourierPowSMulRight L f v n` as a composition of continuous bilinear and multilinear maps, to deduce easily its continuity and differentiability properties. -/ lemma fourierPowSMulRight_eq_comp {f : V → E} {v : V} {n : ℕ} : fourierPowSMulRight L f v n = (- (2 * π * I))^n • smulRightL ℝ (fun (_ : Fin n) ↦ W) E (compContinuousLinearMapLRight (ContinuousMultilinearMap.mkPiAlgebra ℝ (Fin n) ℝ) (fun _ ↦ L v)) (f v) := rfl @[continuity, fun_prop] lemma _root_.Continuous.fourierPowSMulRight {f : V → E} (hf : Continuous f) (n : ℕ) : Continuous (fun v ↦ fourierPowSMulRight L f v n) := by simp_rw [fourierPowSMulRight_eq_comp] apply Continuous.const_smul apply (smulRightL ℝ (fun (_ : Fin n) ↦ W) E).continuous₂.comp₂ _ hf exact Continuous.comp (map_continuous _) (continuous_pi (fun _ ↦ L.continuous)) lemma _root_.ContDiff.fourierPowSMulRight {f : V → E} {k : WithTop ℕ∞} (hf : ContDiff ℝ k f) (n : ℕ) : ContDiff ℝ k (fun v ↦ fourierPowSMulRight L f v n) := by simp_rw [fourierPowSMulRight_eq_comp] apply ContDiff.const_smul apply (smulRightL ℝ (fun (_ : Fin n) ↦ W) E).isBoundedBilinearMap.contDiff.comp₂ _ hf apply (ContinuousMultilinearMap.contDiff _).comp exact contDiff_pi.2 (fun _ ↦ L.contDiff) lemma norm_fourierPowSMulRight_le (f : V → E) (v : V) (n : ℕ) : ‖fourierPowSMulRight L f v n‖ ≤ (2 * π * ‖L‖) ^ n * ‖v‖ ^ n * ‖f v‖ := by apply ContinuousMultilinearMap.opNorm_le_bound (by positivity) (fun m ↦ ?_) calc ‖fourierPowSMulRight L f v n m‖ = (2 * π) ^ n * ((∏ x : Fin n, \|(L v) (m x)\|) * ‖f v‖) := by simp [abs_of_nonneg pi_nonneg, norm_smul] _ ≤ (2 * π) ^ n * ((∏ x : Fin n, ‖L‖ * ‖v‖ * ‖m x‖) * ‖f v‖) := by gcongr with i _hi exact L.le_opNorm₂ v (m i) _ = (2 * π * ‖L‖) ^ n * ‖v‖ ^ n * ‖f v‖ * ∏ i : Fin n, ‖m i‖ := by simp [Finset.prod_mul_distrib, mul_pow]; ring /-- The iterated derivative of a function multiplied by `(L v ⬝) ^ n` can be controlled in terms of the iterated derivatives of the initial function. -/ lemma norm_iteratedFDeriv_fourierPowSMulRight {f : V → E} {K : WithTop ℕ∞} {C : ℝ} (hf : ContDiff ℝ K f) {n : ℕ} {k : ℕ} (hk : k ≤ K) {v : V} (hv : ∀ i ≤ k, ∀ j ≤ n, ‖v‖ ^ j * ‖iteratedFDeriv ℝ i f v‖ ≤ C) : ‖iteratedFDeriv ℝ k (fun v ↦ fourierPowSMulRight L f v n) v‖ ≤ (2 * π) ^ n * (2 * n + 2) ^ k * ‖L‖ ^ n * C := by /- We write `fourierPowSMulRight L f v n` as a composition of bilinear and multilinear maps, thanks to `fourierPowSMulRight_eq_comp`, and then we control the iterated derivatives of these thanks to general bounds on derivatives of bilinear and multilinear maps. More precisely, `fourierPowSMulRight L f v n m = (- (2 * π * I))^n • (∏ i, L v (m i)) • f v`. Here, `(- (2 * π * I))^n` contributes `(2π)^n` to the bound. The second product is bilinear, so the iterated derivative is controlled as a weighted sum of those of `v ↦ ∏ i, L v (m i)` and of `f`. The harder part is to control the iterated derivatives of `v ↦ ∏ i, L v (m i)`. For this, one argues that this is multilinear in `v`, to apply general bounds for iterated derivatives of multilinear maps. More precisely, we write it as the composition of a multilinear map `T` (making the product operation) and the tuple of linear maps `v ↦ (L v ⬝, ..., L v ⬝)` -/ simp_rw [fourierPowSMulRight_eq_comp] -- first step: controlling the iterated derivatives of `v ↦ ∏ i, L v (m i)`, written below -- as `v ↦ T (fun _ ↦ L v)`, or `T ∘ (ContinuousLinearMap.pi (fun (_ : Fin n) ↦ L))`. let T : (W →L[ℝ] ℝ) [×n]→L[ℝ] (W [×n]→L[ℝ] ℝ) := compContinuousLinearMapLRight (ContinuousMultilinearMap.mkPiAlgebra ℝ (Fin n) ℝ) have I₁ m : ‖iteratedFDeriv ℝ m T (fun _ ↦ L v)‖ ≤ n.descFactorial m * 1 * (‖L‖ * ‖v‖) ^ (n - m) := by have : ‖T‖ ≤ 1 := by apply (norm_compContinuousLinearMapLRight_le _ _).trans simp only [norm_mkPiAlgebra, le_refl] apply (ContinuousMultilinearMap.norm_iteratedFDeriv_le _ _ _).trans simp only [Fintype.card_fin] gcongr refine (pi_norm_le_iff_of_nonneg (by positivity)).mpr (fun _ ↦ ?_) exact ContinuousLinearMap.le_opNorm _ _ have I₂ m : ‖iteratedFDeriv ℝ m (T ∘ (ContinuousLinearMap.pi (fun (_ : Fin n) ↦ L))) v‖ ≤ (n.descFactorial m * 1 * (‖L‖ * ‖v‖) ^ (n - m)) * ‖L‖ ^ m := by rw [ContinuousLinearMap.iteratedFDeriv_comp_right _ (ContinuousMultilinearMap.contDiff _) _ (mod_cast le_top)] apply (norm_compContinuousLinearMap_le _ _).trans simp only [Finset.prod_const, Finset.card_fin] gcongr · exact I₁ m · exact ContinuousLinearMap.norm_pi_le_of_le (fun _ ↦ le_rfl) (norm_nonneg _) have I₃ m : ‖iteratedFDeriv ℝ m (T ∘ (ContinuousLinearMap.pi (fun (_ : Fin n) ↦ L))) v‖ ≤ n.descFactorial m * ‖L‖ ^ n * ‖v‖ ^ (n - m) := by apply (I₂ m).trans (le_of_eq _) rcases le_or_lt m n with hm \| hm · rw [show ‖L‖ ^ n = ‖L‖ ^ (m + (n - m)) by rw [Nat.add_sub_cancel' hm], pow_add] ring · simp only [Nat.descFactorial_eq_zero_iff_lt.mpr hm, CharP.cast_eq_zero, mul_one, zero_mul] -- second step: factor out the `(2 * π) ^ n` factor, and cancel it on both sides. have A : ContDiff ℝ K (fun y ↦ T (fun _ ↦ L y)) := (ContinuousMultilinearMap.contDiff _).comp (contDiff_pi.2 fun _ ↦ L.contDiff) rw [iteratedFDeriv_const_smul_apply' (hf := ((smulRightL ℝ (fun _ ↦ W) E).isBoundedBilinearMap.contDiff.comp₂ (A.of_le hk) (hf.of_le hk)).contDiffAt), norm_smul (β := V [×k]→L[ℝ] (W [×n]→L[ℝ] E))] simp only [mul_assoc, norm_pow, norm_neg, Complex.norm_mul, Complex.norm_ofNat, norm_real, Real.norm_eq_abs, abs_of_nonneg pi_nonneg, norm_I, mul_one, smulRightL_apply, ge_iff_le] gcongr -- third step: argue that the scalar multiplication is bilinear to bound the iterated derivatives -- of `v ↦ (∏ i, L v (m i)) • f v` in terms of those of `v ↦ (∏ i, L v (m i))` and of `f`. -- The former are controlled by the first step, the latter by the assumptions. apply (ContinuousLinearMap.norm_iteratedFDeriv_le_of_bilinear_of_le_one _ A hf _ hk ContinuousMultilinearMap.norm_smulRightL_le).trans calc ∑ i ∈ Finset.range (k + 1), k.choose i * ‖iteratedFDeriv ℝ i (fun (y : V) ↦ T (fun _ ↦ L y)) v‖ * ‖iteratedFDeriv ℝ (k - i) f v‖ ≤ ∑ i ∈ Finset.range (k + 1), k.choose i * (n.descFactorial i * ‖L‖ ^ n * ‖v‖ ^ (n - i)) * ‖iteratedFDeriv ℝ (k - i) f v‖ := by gcongr with i _hi exact I₃ i _ = ∑ i ∈ Finset.range (k + 1), (k.choose i * n.descFactorial i * ‖L‖ ^ n) * (‖v‖ ^ (n - i) * ‖iteratedFDeriv ℝ (k - i) f v‖) := by congr with i ring _ ≤ ∑ i ∈ Finset.range (k + 1), (k.choose i * (n + 1 : ℕ) ^ k * ‖L‖ ^ n) * C := by gcongr with i hi · rw [← Nat.cast_pow, Nat.cast_le] calc n.descFactorial i ≤ n ^ i := Nat.descFactorial_le_pow _ _ _ ≤ (n + 1) ^ i := by gcongr; omega _ ≤ (n + 1) ^ k := by gcongr; exacts [le_add_self, Finset.mem_range_succ_iff.mp hi] · exact hv _ (by omega) _ (by omega) _ = (2 * n + 2) ^ k * (‖L‖^n * C) := by simp only [← Finset.sum_mul, ← Nat.cast_sum, Nat.sum_range_choose, mul_one, ← mul_assoc, Nat.cast_pow, Nat.cast_ofNat, Nat.cast_add, Nat.cast_one, ← mul_pow, mul_add] variable [MeasurableSpace V] [BorelSpace V] {μ : Measure V} section SecondCountableTopology variable [SecondCountableTopology V] lemma _root_.MeasureTheory.AEStronglyMeasurable.fourierPowSMulRight (hf : AEStronglyMeasurable f μ) (n : ℕ) : AEStronglyMeasurable (fun v ↦ fourierPowSMulRight L f v n) μ := by simp_rw [fourierPowSMulRight_eq_comp] apply AEStronglyMeasurable.const_smul' apply (smulRightL ℝ (fun (_ : Fin n) ↦ W) E).continuous₂.comp_aestronglyMeasurable₂ _ hf apply Continuous.aestronglyMeasurable exact Continuous.comp (map_continuous _) (continuous_pi (fun _ ↦ L.continuous)) lemma integrable_fourierPowSMulRight {n : ℕ} (hf : Integrable (fun v ↦ ‖v‖ ^ n * ‖f v‖) μ) (h'f : AEStronglyMeasurable f μ) : Integrable (fun v ↦ fourierPowSMulRight L f v n) μ := by refine (hf.const_mul ((2 * π * ‖L‖) ^ n)).mono' (h'f.fourierPowSMulRight L n) ?_ filter_upwards with v exact (norm_fourierPowSMulRight_le L f v n).trans (le_of_eq (by ring)) lemma hasFTaylorSeriesUpTo_fourierIntegral {N : WithTop ℕ∞} (hf : ∀ (n : ℕ), n ≤ N → Integrable (fun v ↦ ‖v‖^n * ‖f v‖) μ) (h'f : AEStronglyMeasurable f μ) : HasFTaylorSeriesUpTo N (fourierIntegral 𝐞 μ L.toLinearMap₂ f) (fun w n ↦ fourierIntegral 𝐞 μ L.toLinearMap₂ (fun v ↦ fourierPowSMulRight L f v n) w) := by constructor · intro w rw [curry0_apply, Matrix.zero_empty, fourierIntegral_continuousMultilinearMap_apply' (integrable_fourierPowSMulRight L (hf 0 bot_le) h'f)] simp only [fourierPowSMulRight_apply, pow_zero, Finset.univ_eq_empty, Finset.prod_empty, one_smul] · intro n hn w have I₁ : Integrable (fun v ↦ fourierPowSMulRight L f v n) μ := integrable_fourierPowSMulRight L (hf n hn.le) h'f have I₂ : Integrable (fun v ↦ ‖v‖ * ‖fourierPowSMulRight L f v n‖) μ := by apply ((hf (n+1) (ENat.add_one_natCast_le_withTop_of_lt hn)).const_mul ((2 * π * ‖L‖) ^ n)).mono' (continuous_norm.aestronglyMeasurable.mul (h'f.fourierPowSMulRight L n).norm) filter_upwards with v simp only [Pi.mul_apply, norm_mul, norm_norm] calc ‖v‖ * ‖fourierPowSMulRight L f v n‖ ≤ ‖v‖ * ((2 * π * ‖L‖) ^ n * ‖v‖ ^ n * ‖f v‖) := by gcongr; apply norm_fourierPowSMulRight_le _ = (2 * π * ‖L‖) ^ n * (‖v‖ ^ (n + 1) * ‖f v‖) := by rw [pow_succ]; ring have I₃ : Integrable (fun v ↦ fourierPowSMulRight L f v (n + 1)) μ := integrable_fourierPowSMulRight L (hf (n + 1) (ENat.add_one_natCast_le_withTop_of_lt hn)) h'f have I₄ : Integrable (fun v ↦ fourierSMulRight L (fun v ↦ fourierPowSMulRight L f v n) v) μ := by apply (I₂.const_mul ((2 * π * ‖L‖))).mono' (h'f.fourierPowSMulRight L n).fourierSMulRight filter_upwards with v exact (norm_fourierSMulRight_le _ _ _).trans (le_of_eq (by ring)) have E : curryLeft (fourierIntegral 𝐞 μ L.toLinearMap₂ (fun v ↦ fourierPowSMulRight L f v (n + 1)) w) = fourierIntegral 𝐞 μ L.toLinearMap₂ (fourierSMulRight L fun v ↦ fourierPowSMulRight L f v n) w := by ext w' m rw [curryLeft_apply, fourierIntegral_continuousMultilinearMap_apply' I₃, fourierIntegral_continuousLinearMap_apply' I₄, fourierIntegral_continuousMultilinearMap_apply' (I₄.apply_continuousLinearMap _)] congr with v simp only [fourierPowSMulRight_apply, mul_comm, pow_succ, neg_mul, Fin.prod_univ_succ, Fin.cons_zero, Fin.cons_succ, neg_smul, fourierSMulRight_apply, neg_apply, smul_apply, smul_comm (M := ℝ) (N := ℂ) (α := E), smul_smul] exact E ▸ hasFDerivAt_fourierIntegral L I₁ I₂ w · intro n hn apply fourierIntegral_continuous Real.continuous_fourierChar (by apply L.continuous₂) exact integrable_fourierPowSMulRight L (hf n hn) h'f /-- Variant of `hasFTaylorSeriesUpTo_fourierIntegral` in which the smoothness index is restricted to `ℕ∞` (and so are the inequalities in the assumption `hf`). Avoids normcasting in some applications. -/ lemma hasFTaylorSeriesUpTo_fourierIntegral' {N : ℕ∞} (hf : ∀ (n : ℕ), n ≤ N → Integrable (fun v ↦ ‖v‖^n * ‖f v‖) μ) (h'f : AEStronglyMeasurable f μ) : HasFTaylorSeriesUpTo N (fourierIntegral 𝐞 μ L.toLinearMap₂ f) (fun w n ↦ fourierIntegral 𝐞 μ L.toLinearMap₂ (fun v ↦ fourierPowSMulRight L f v n) w) := hasFTaylorSeriesUpTo_fourierIntegral _ (fun n hn ↦ hf n (mod_cast hn)) h'f /-- If `‖v‖^n * ‖f v‖` is integrable for all `n ≤ N`, then the Fourier transform of `f` is `C^N`. -/ theorem contDiff_fourierIntegral {N : ℕ∞} (hf : ∀ (n : ℕ), n ≤ N → Integrable (fun v ↦ ‖v‖ ^ n * ‖f v‖) μ) : ContDiff ℝ N (fourierIntegral 𝐞 μ L.toLinearMap₂ f) := by by_cases h'f : Integrable f μ · exact (hasFTaylorSeriesUpTo_fourierIntegral' L hf h'f.1).contDiff · have : fourierIntegral 𝐞 μ L.toLinearMap₂ f = 0 := by ext w; simp [fourierIntegral, integral, h'f] simpa [this] using contDiff_const /-- If `‖v‖^n * ‖f v‖` is integrable for all `n ≤ N`, then the `n`-th derivative of the Fourier transform of `f` is the Fourier transform of `fourierPowSMulRight L f v n`, i.e., `(L v ⬝) ^ n • f v`. -/ lemma iteratedFDeriv_fourierIntegral {N : ℕ∞} (hf : ∀ (n : ℕ), n ≤ N → Integrable (fun v ↦ ‖v‖^n * ‖f v‖) μ) (h'f : AEStronglyMeasurable f μ) {n : ℕ} (hn : n ≤ N) : iteratedFDeriv ℝ n (fourierIntegral 𝐞 μ L.toLinearMap₂ f) = fourierIntegral 𝐞 μ L.toLinearMap₂ (fun v ↦ fourierPowSMulRight L f v n) := by ext w : 1 exact ((hasFTaylorSeriesUpTo_fourierIntegral' L hf h'f).eq_iteratedFDeriv (mod_cast hn) w).symm end SecondCountableTopology /-- The Fourier integral of the `n`-th derivative of a function is obtained by multiplying the Fourier integral of the original function by `(2πI L w ⬝ )^n`. -/ theorem fourierIntegral_iteratedFDeriv [FiniteDimensional ℝ V] {μ : Measure V} [Measure.IsAddHaarMeasure μ] {N : ℕ∞} (hf : ContDiff ℝ N f) (h'f : ∀ (n : ℕ), n ≤ N → Integrable (iteratedFDeriv ℝ n f) μ) {n : ℕ} (hn : n ≤ N) : fourierIntegral 𝐞 μ L.toLinearMap₂ (iteratedFDeriv ℝ n f) = (fun w ↦ fourierPowSMulRight (-L.flip) (fourierIntegral 𝐞 μ L.toLinearMap₂ f) w n) := by induction n with \| zero => ext w m simp only [iteratedFDeriv_zero_apply, fourierPowSMulRight_apply, pow_zero, Finset.univ_eq_empty, ContinuousLinearMap.neg_apply, ContinuousLinearMap.flip_apply, Finset.prod_empty, one_smul, fourierIntegral_continuousMultilinearMap_apply' ((h'f 0 bot_le))] \| succ n ih => ext w m have J : Integrable (fderiv ℝ (iteratedFDeriv ℝ n f)) μ := by specialize h'f (n + 1) hn rwa [iteratedFDeriv_succ_eq_comp_left, Function.comp_def, LinearIsometryEquiv.integrable_comp_iff (𝕜 := ℝ) (φ := fderiv ℝ (iteratedFDeriv ℝ n f))] at h'f suffices H : (fourierIntegral 𝐞 μ L.toLinearMap₂ (fderiv ℝ (iteratedFDeriv ℝ n f)) w) (m 0) (Fin.tail m) = (-(2 * π * I)) ^ (n + 1) • (∏ x : Fin (n + 1), -L (m x) w) • ∫ v, 𝐞 (-L v w) • f v ∂μ by	rw [fourierIntegral_continuousMultilinearMap_apply' (h'f _ hn)] simp only [iteratedFDeriv_succ_apply_left, fourierPowSMulRight_apply, ContinuousLinearMap.neg_apply, ContinuousLinearMap.flip_apply] rw [← fourierIntegral_continuousMultilinearMap_apply' ((J.apply_continuousLinearMap _)), ← fourierIntegral_continuousLinearMap_apply' J] exact H have h'n : n < N := (Nat.cast_lt.mpr n.lt_succ_self).trans_le hn rw [fourierIntegral_fderiv _ (h'f n h'n.le) (hf.differentiable_iteratedFDeriv (mod_cast h'n)) J] simp only [ih h'n.le, fourierSMulRight_apply, ContinuousLinearMap.neg_apply, ContinuousLinearMap.flip_apply, neg_smul, smul_neg, neg_neg, smul_apply, fourierPowSMulRight_apply, ← coe_smul (E := E), smul_smul] congr 1 simp only [ofReal_prod, ofReal_neg, pow_succ, mul_neg, Fin.prod_univ_succ, neg_mul, ofReal_mul, neg_neg, Fin.tail_def] ring /-- The `k`-th derivative of the Fourier integral of `f`, multiplied by `(L v w) ^ n`, is the Fourier integral of the `n`-th derivative of `(L v w) ^ k * f`. -/ theorem fourierPowSMulRight_iteratedFDeriv_fourierIntegral [FiniteDimensional ℝ V] {μ : Measure V} [Measure.IsAddHaarMeasure μ] {K N : ℕ∞} (hf : ContDiff ℝ N f) (h'f : ∀ (k n : ℕ), k ≤ K → n ≤ N → Integrable (fun v ↦ ‖v‖ ^ k * ‖iteratedFDeriv ℝ n f v‖) μ) {k n : ℕ} (hk : k ≤ K) (hn : n ≤ N) {w : W} : fourierPowSMulRight (-L.flip) (iteratedFDeriv ℝ k (fourierIntegral 𝐞 μ L.toLinearMap₂ f)) w n = fourierIntegral 𝐞 μ L.toLinearMap₂ (iteratedFDeriv ℝ n (fun v ↦ fourierPowSMulRight L f v k)) w := by	Mathlib/Analysis/Fourier/FourierTransformDeriv.lean	549	575
/- Copyright (c) 2016 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Mario Carneiro, Johannes Hölzl, Yuyang Zhao -/ import Mathlib.Algebra.Group.Units.Basic import Mathlib.Algebra.Order.Monoid.Defs import Mathlib.Algebra.Order.Monoid.Unbundled.ExistsOfLE import Mathlib.Algebra.NeZero import Mathlib.Order.BoundedOrder.Basic /-! # Canonically ordered monoids -/ universe u variable {α : Type u} /-- An ordered additive monoid is `CanonicallyOrderedAdd` if the ordering coincides with the subtractibility relation, which is to say, `a ≤ b` iff there exists `c` with `b = a + c`. This is satisfied by the natural numbers, for example, but not the integers or other nontrivial `OrderedAddCommGroup`s. -/ class CanonicallyOrderedAdd (α : Type) [Add α] [LE α] : Prop extends ExistsAddOfLE α where /-- For any `a` and `b`, `a ≤ a + b` -/ protected le_self_add : ∀ a b : α, a ≤ a + b attribute [instance 50] CanonicallyOrderedAdd.toExistsAddOfLE /-- An ordered monoid is `CanonicallyOrderedMul` if the ordering coincides with the divisibility relation, which is to say, `a ≤ b` iff there exists `c` with `b = a c`. Examples seem rare; it seems more likely that the `OrderDual` of a naturally-occurring lattice satisfies this than the lattice itself (for example, dual of the lattice of ideals of a PID or Dedekind domain satisfy this; collections of all things ≤ 1 seem to be more natural that collections of all things ≥ 1). -/ @[to_additive] class CanonicallyOrderedMul (α : Type) [Mul α] [LE α] : Prop extends ExistsMulOfLE α where /-- For any `a` and `b`, `a ≤ a b` -/ protected le_self_mul : ∀ a b : α, a ≤ a * b attribute [instance 50] CanonicallyOrderedMul.toExistsMulOfLE set_option linter.deprecated false in /-- A canonically ordered additive monoid is an ordered commutative additive monoid in which the ordering coincides with the subtractibility relation, which is to say, `a ≤ b` iff there exists `c` with `b = a + c`. This is satisfied by the natural numbers, for example, but not the integers or other nontrivial `OrderedAddCommGroup`s. -/ @[deprecated "Use `[OrderedAddCommMonoid α] [CanonicallyOrderedAdd α]` instead." (since := "2025-01-13")] structure CanonicallyOrderedAddCommMonoid (α : Type) extends OrderedAddCommMonoid α, OrderBot α where /-- For `a ≤ b`, there is a `c` so `b = a + c`. -/ protected exists_add_of_le : ∀ {a b : α}, a ≤ b → ∃ c, b = a + c /-- For any `a` and `b`, `a ≤ a + b` -/ protected le_self_add : ∀ a b : α, a ≤ a + b set_option linter.deprecated false in set_option linter.existingAttributeWarning false in /-- A canonically ordered monoid is an ordered commutative monoid in which the ordering coincides with the divisibility relation, which is to say, `a ≤ b` iff there exists `c` with `b = a c`. Examples seem rare; it seems more likely that the `OrderDual` of a naturally-occurring lattice satisfies this than the lattice	itself (for example, dual of the lattice of ideals of a PID or Dedekind domain satisfy this; collections of all things ≤ 1 seem to be more natural that collections of all things ≥ 1). -/	Mathlib/Algebra/Order/Monoid/Canonical/Defs.lean	70	73
/- Copyright (c) 2023 Jireh Loreaux. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jireh Loreaux -/ import Mathlib.Algebra.Algebra.NonUnitalHom import Mathlib.Data.Set.UnionLift import Mathlib.LinearAlgebra.Span.Basic import Mathlib.RingTheory.NonUnitalSubring.Basic /-! # Non-unital Subalgebras over Commutative Semirings In this file we define `NonUnitalSubalgebra`s and the usual operations on them (`map`, `comap`). ## TODO * once we have scalar actions by semigroups (as opposed to monoids), implement the action of a non-unital subalgebra on the larger algebra. -/ universe u u' v v' w w' section NonUnitalSubalgebraClass variable {S R A : Type} [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] variable [SetLike S A] [NonUnitalSubsemiringClass S A] [hSR : SMulMemClass S R A] (s : S) namespace NonUnitalSubalgebraClass /-- Embedding of a non-unital subalgebra into the non-unital algebra. -/ def subtype (s : S) : s →ₙₐ[R] A := { NonUnitalSubsemiringClass.subtype s, SMulMemClass.subtype s with toFun := (↑) } variable {s} in @[simp] lemma subtype_apply (x : s) : subtype s x = x := rfl lemma subtype_injective : Function.Injective (subtype s) := Subtype.coe_injective @[simp] theorem coe_subtype : (subtype s : s → A) = ((↑) : s → A) := rfl @[deprecated (since := "2025-02-18")] alias coeSubtype := coe_subtype end NonUnitalSubalgebraClass end NonUnitalSubalgebraClass /-- A non-unital subalgebra is a sub(semi)ring that is also a submodule. -/ structure NonUnitalSubalgebra (R : Type u) (A : Type v) [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] : Type v extends NonUnitalSubsemiring A, Submodule R A /-- Reinterpret a `NonUnitalSubalgebra` as a `NonUnitalSubsemiring`. -/ add_decl_doc NonUnitalSubalgebra.toNonUnitalSubsemiring /-- Reinterpret a `NonUnitalSubalgebra` as a `Submodule`. -/ add_decl_doc NonUnitalSubalgebra.toSubmodule namespace NonUnitalSubalgebra variable {F : Type v'} {R' : Type u'} {R : Type u} {A : Type v} {B : Type w} {C : Type w'} section NonUnitalNonAssocSemiring variable [CommSemiring R] variable [NonUnitalNonAssocSemiring A] [NonUnitalNonAssocSemiring B] [NonUnitalNonAssocSemiring C] variable [Module R A] [Module R B] [Module R C] instance : SetLike (NonUnitalSubalgebra R A) A where coe s := s.carrier coe_injective' p q h := by cases p; cases q; congr; exact SetLike.coe_injective h /-- The actual `NonUnitalSubalgebra` obtained from an element of a type satisfying `NonUnitalSubsemiringClass` and `SMulMemClass`. -/ @[simps] def ofClass {S R A : Type} [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] [SetLike S A] [NonUnitalSubsemiringClass S A] [SMulMemClass S R A] (s : S) : NonUnitalSubalgebra R A where carrier := s add_mem' := add_mem zero_mem' := zero_mem _ mul_mem' := mul_mem smul_mem' := SMulMemClass.smul_mem instance (priority := 100) : CanLift (Set A) (NonUnitalSubalgebra R A) (↑) (fun s ↦ 0 ∈ s ∧ (∀ {x y}, x ∈ s → y ∈ s → x + y ∈ s) ∧ (∀ {x y}, x ∈ s → y ∈ s → x * y ∈ s) ∧ ∀ (r : R) {x}, x ∈ s → r • x ∈ s) where prf s h := ⟨ { carrier := s zero_mem' := h.1 add_mem' := h.2.1 mul_mem' := h.2.2.1 smul_mem' := h.2.2.2 }, rfl ⟩ instance instNonUnitalSubsemiringClass : NonUnitalSubsemiringClass (NonUnitalSubalgebra R A) A where add_mem {s} := s.add_mem' mul_mem {s} := s.mul_mem' zero_mem {s} := s.zero_mem' instance instSMulMemClass : SMulMemClass (NonUnitalSubalgebra R A) R A where smul_mem := @fun s => s.smul_mem' theorem mem_carrier {s : NonUnitalSubalgebra R A} {x : A} : x ∈ s.carrier ↔ x ∈ s := Iff.rfl @[ext] theorem ext {S T : NonUnitalSubalgebra R A} (h : ∀ x : A, x ∈ S ↔ x ∈ T) : S = T := SetLike.ext h @[simp] theorem mem_toNonUnitalSubsemiring {S : NonUnitalSubalgebra R A} {x} : x ∈ S.toNonUnitalSubsemiring ↔ x ∈ S := Iff.rfl @[simp] theorem coe_toNonUnitalSubsemiring (S : NonUnitalSubalgebra R A) : (↑S.toNonUnitalSubsemiring : Set A) = S := rfl theorem toNonUnitalSubsemiring_injective : Function.Injective (toNonUnitalSubsemiring : NonUnitalSubalgebra R A → NonUnitalSubsemiring A) := fun S T h => ext fun x => by rw [← mem_toNonUnitalSubsemiring, ← mem_toNonUnitalSubsemiring, h] theorem toNonUnitalSubsemiring_inj {S U : NonUnitalSubalgebra R A} : S.toNonUnitalSubsemiring = U.toNonUnitalSubsemiring ↔ S = U := toNonUnitalSubsemiring_injective.eq_iff theorem mem_toSubmodule (S : NonUnitalSubalgebra R A) {x} : x ∈ S.toSubmodule ↔ x ∈ S := Iff.rfl @[simp] theorem coe_toSubmodule (S : NonUnitalSubalgebra R A) : (↑S.toSubmodule : Set A) = S := rfl theorem toSubmodule_injective : Function.Injective (toSubmodule : NonUnitalSubalgebra R A → Submodule R A) := fun S T h => ext fun x => by rw [← mem_toSubmodule, ← mem_toSubmodule, h] theorem toSubmodule_inj {S U : NonUnitalSubalgebra R A} : S.toSubmodule = U.toSubmodule ↔ S = U := toSubmodule_injective.eq_iff /-- Copy of a non-unital subalgebra with a new `carrier` equal to the old one. Useful to fix definitional equalities. -/ protected def copy (S : NonUnitalSubalgebra R A) (s : Set A) (hs : s = ↑S) : NonUnitalSubalgebra R A := { S.toNonUnitalSubsemiring.copy s hs with smul_mem' := fun r a (ha : a ∈ s) => by show r • a ∈ s rw [hs] at ha ⊢ exact S.smul_mem' r ha } @[simp] theorem coe_copy (S : NonUnitalSubalgebra R A) (s : Set A) (hs : s = ↑S) : (S.copy s hs : Set A) = s := rfl theorem copy_eq (S : NonUnitalSubalgebra R A) (s : Set A) (hs : s = ↑S) : S.copy s hs = S := SetLike.coe_injective hs instance (S : NonUnitalSubalgebra R A) : Inhabited S := ⟨(0 : S.toNonUnitalSubsemiring)⟩ end NonUnitalNonAssocSemiring section NonUnitalNonAssocRing variable [CommRing R] variable [NonUnitalNonAssocRing A] [NonUnitalNonAssocRing B] [NonUnitalNonAssocRing C] variable [Module R A] [Module R B] [Module R C] instance instNonUnitalSubringClass : NonUnitalSubringClass (NonUnitalSubalgebra R A) A := { NonUnitalSubalgebra.instNonUnitalSubsemiringClass with neg_mem := @fun _ x hx => neg_one_smul R x ▸ SMulMemClass.smul_mem _ hx } /-- A non-unital subalgebra over a ring is also a `Subring`. -/ def toNonUnitalSubring (S : NonUnitalSubalgebra R A) : NonUnitalSubring A where toNonUnitalSubsemiring := S.toNonUnitalSubsemiring neg_mem' := neg_mem (s := S) @[simp] theorem mem_toNonUnitalSubring {S : NonUnitalSubalgebra R A} {x} : x ∈ S.toNonUnitalSubring ↔ x ∈ S := Iff.rfl @[simp] theorem coe_toNonUnitalSubring (S : NonUnitalSubalgebra R A) : (↑S.toNonUnitalSubring : Set A) = S := rfl theorem toNonUnitalSubring_injective : Function.Injective (toNonUnitalSubring : NonUnitalSubalgebra R A → NonUnitalSubring A) := fun S T h => ext fun x => by rw [← mem_toNonUnitalSubring, ← mem_toNonUnitalSubring, h] theorem toNonUnitalSubring_inj {S U : NonUnitalSubalgebra R A} : S.toNonUnitalSubring = U.toNonUnitalSubring ↔ S = U := toNonUnitalSubring_injective.eq_iff end NonUnitalNonAssocRing section /-! `NonUnitalSubalgebra`s inherit structure from their `NonUnitalSubsemiring` / `Semiring` coercions. -/ instance toNonUnitalNonAssocSemiring [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] (S : NonUnitalSubalgebra R A) : NonUnitalNonAssocSemiring S := inferInstance instance toNonUnitalSemiring [CommSemiring R] [NonUnitalSemiring A] [Module R A] (S : NonUnitalSubalgebra R A) : NonUnitalSemiring S := inferInstance instance toNonUnitalCommSemiring [CommSemiring R] [NonUnitalCommSemiring A] [Module R A] (S : NonUnitalSubalgebra R A) : NonUnitalCommSemiring S := inferInstance instance toNonUnitalNonAssocRing [CommRing R] [NonUnitalNonAssocRing A] [Module R A] (S : NonUnitalSubalgebra R A) : NonUnitalNonAssocRing S := inferInstance instance toNonUnitalRing [CommRing R] [NonUnitalRing A] [Module R A] (S : NonUnitalSubalgebra R A) : NonUnitalRing S := inferInstance instance toNonUnitalCommRing [CommRing R] [NonUnitalCommRing A] [Module R A] (S : NonUnitalSubalgebra R A) : NonUnitalCommRing S := inferInstance end /-- The forgetful map from `NonUnitalSubalgebra` to `Submodule` as an `OrderEmbedding` -/ def toSubmodule' [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] : NonUnitalSubalgebra R A ↪o Submodule R A where toEmbedding := { toFun := fun S => S.toSubmodule inj' := fun S T h => ext <\| by apply SetLike.ext_iff.1 h } map_rel_iff' := SetLike.coe_subset_coe.symm.trans SetLike.coe_subset_coe /-- The forgetful map from `NonUnitalSubalgebra` to `NonUnitalSubsemiring` as an `OrderEmbedding` -/ def toNonUnitalSubsemiring' [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] : NonUnitalSubalgebra R A ↪o NonUnitalSubsemiring A where toEmbedding := { toFun := fun S => S.toNonUnitalSubsemiring inj' := fun S T h => ext <\| by apply SetLike.ext_iff.1 h } map_rel_iff' := SetLike.coe_subset_coe.symm.trans SetLike.coe_subset_coe /-- The forgetful map from `NonUnitalSubalgebra` to `NonUnitalSubsemiring` as an `OrderEmbedding` -/ def toNonUnitalSubring' [CommRing R] [NonUnitalNonAssocRing A] [Module R A] : NonUnitalSubalgebra R A ↪o NonUnitalSubring A where toEmbedding := { toFun := fun S => S.toNonUnitalSubring inj' := fun S T h => ext <\| by apply SetLike.ext_iff.1 h } map_rel_iff' := SetLike.coe_subset_coe.symm.trans SetLike.coe_subset_coe variable [CommSemiring R] variable [NonUnitalNonAssocSemiring A] [NonUnitalNonAssocSemiring B] [NonUnitalNonAssocSemiring C] variable [Module R A] [Module R B] [Module R C] variable {S : NonUnitalSubalgebra R A} section /-! ### `NonUnitalSubalgebra`s inherit structure from their `Submodule` coercions. -/ instance instModule' [Semiring R'] [SMul R' R] [Module R' A] [IsScalarTower R' R A] : Module R' S := SMulMemClass.toModule' _ R' R A S instance instModule : Module R S := S.instModule' instance instIsScalarTower' [Semiring R'] [SMul R' R] [Module R' A] [IsScalarTower R' R A] : IsScalarTower R' R S := S.toSubmodule.isScalarTower instance [IsScalarTower R A A] : IsScalarTower R S S where smul_assoc r x y := Subtype.ext <\| smul_assoc r (x : A) (y : A) instance instSMulCommClass' [Semiring R'] [SMul R' R] [Module R' A] [IsScalarTower R' R A] [SMulCommClass R' R A] : SMulCommClass R' R S where smul_comm r' r s := Subtype.ext <\| smul_comm r' r (s : A) instance instSMulCommClass [SMulCommClass R A A] : SMulCommClass R S S where smul_comm r x y := Subtype.ext <\| smul_comm r (x : A) (y : A) instance noZeroSMulDivisors_bot [NoZeroSMulDivisors R A] : NoZeroSMulDivisors R S := ⟨fun {c x} h => have : c = 0 ∨ (x : A) = 0 := eq_zero_or_eq_zero_of_smul_eq_zero (congr_arg ((↑) : S → A) h) this.imp_right (@Subtype.ext_iff _ _ x 0).mpr⟩ end protected theorem coe_add (x y : S) : (↑(x + y) : A) = ↑x + ↑y := rfl protected theorem coe_mul (x y : S) : (↑(x * y) : A) = ↑x * ↑y := rfl protected theorem coe_zero : ((0 : S) : A) = 0 := rfl protected theorem coe_neg {R : Type u} {A : Type v} [CommRing R] [Ring A] [Algebra R A] {S : NonUnitalSubalgebra R A} (x : S) : (↑(-x) : A) = -↑x := rfl protected theorem coe_sub {R : Type u} {A : Type v} [CommRing R] [Ring A] [Algebra R A] {S : NonUnitalSubalgebra R A} (x y : S) : (↑(x - y) : A) = ↑x - ↑y := rfl @[simp, norm_cast] theorem coe_smul [SMul R' R] [SMul R' A] [IsScalarTower R' R A] (r : R') (x : S) : ↑(r • x) = r • (x : A) := rfl protected theorem coe_eq_zero {x : S} : (x : A) = 0 ↔ x = 0 := ZeroMemClass.coe_eq_zero @[simp] theorem toNonUnitalSubsemiring_subtype : NonUnitalSubsemiringClass.subtype S = NonUnitalSubalgebraClass.subtype (R := R) S := rfl @[simp] theorem toSubring_subtype {R A : Type} [CommRing R] [Ring A] [Algebra R A] (S : NonUnitalSubalgebra R A) : NonUnitalSubringClass.subtype S = NonUnitalSubalgebraClass.subtype (R := R) S := rfl /-- Linear equivalence between `S : Submodule R A` and `S`. Though these types are equal, we define it as a `LinearEquiv` to avoid type equalities. -/ def toSubmoduleEquiv (S : NonUnitalSubalgebra R A) : S.toSubmodule ≃ₗ[R] S := LinearEquiv.ofEq _ _ rfl variable [FunLike F A B] [NonUnitalAlgHomClass F R A B] /-- Transport a non-unital subalgebra via an algebra homomorphism. -/ def map (f : F) (S : NonUnitalSubalgebra R A) : NonUnitalSubalgebra R B := { S.toNonUnitalSubsemiring.map (f : A →ₙ+ B) with smul_mem' := fun r b hb => by rcases hb with ⟨a, ha, rfl⟩ exact map_smulₛₗ f r a ▸ Set.mem_image_of_mem f (S.smul_mem' r ha) } theorem map_mono {S₁ S₂ : NonUnitalSubalgebra R A} {f : F} : S₁ ≤ S₂ → (map f S₁ : NonUnitalSubalgebra R B) ≤ map f S₂ := Set.image_subset f theorem map_injective {f : F} (hf : Function.Injective f) : Function.Injective (map f : NonUnitalSubalgebra R A → NonUnitalSubalgebra R B) := fun _S₁ _S₂ ih => ext <\| Set.ext_iff.1 <\| Set.image_injective.2 hf <\| Set.ext <\| SetLike.ext_iff.mp ih @[simp] theorem map_id (S : NonUnitalSubalgebra R A) : map (NonUnitalAlgHom.id R A) S = S := SetLike.coe_injective <\| Set.image_id _ theorem map_map (S : NonUnitalSubalgebra R A) (g : B →ₙₐ[R] C) (f : A →ₙₐ[R] B) : (S.map f).map g = S.map (g.comp f) := SetLike.coe_injective <\| Set.image_image _ _ _ @[simp] theorem mem_map {S : NonUnitalSubalgebra R A} {f : F} {y : B} : y ∈ map f S ↔ ∃ x ∈ S, f x = y := NonUnitalSubsemiring.mem_map theorem map_toSubmodule {S : NonUnitalSubalgebra R A} {f : F} : -- TODO: introduce a better coercion from `NonUnitalAlgHomClass` to `LinearMap` (map f S).toSubmodule = Submodule.map (LinearMapClass.linearMap f) S.toSubmodule := SetLike.coe_injective rfl theorem map_toNonUnitalSubsemiring {S : NonUnitalSubalgebra R A} {f : F} : (map f S).toNonUnitalSubsemiring = S.toNonUnitalSubsemiring.map (f : A →ₙ+* B) := SetLike.coe_injective rfl @[simp] theorem coe_map (S : NonUnitalSubalgebra R A) (f : F) : (map f S : Set B) = f '' S := rfl /-- Preimage of a non-unital subalgebra under an algebra homomorphism. -/ def comap (f : F) (S : NonUnitalSubalgebra R B) : NonUnitalSubalgebra R A := { S.toNonUnitalSubsemiring.comap (f : A →ₙ+* B) with smul_mem' := fun r a (ha : f a ∈ S) => show f (r • a) ∈ S from (map_smulₛₗ f r a).symm ▸ SMulMemClass.smul_mem r ha } theorem map_le {S : NonUnitalSubalgebra R A} {f : F} {U : NonUnitalSubalgebra R B} : map f S ≤ U ↔ S ≤ comap f U := Set.image_subset_iff theorem gc_map_comap (f : F) : GaloisConnection (map f : NonUnitalSubalgebra R A → NonUnitalSubalgebra R B) (comap f) := fun _ _ => map_le @[simp] theorem mem_comap (S : NonUnitalSubalgebra R B) (f : F) (x : A) : x ∈ comap f S ↔ f x ∈ S := Iff.rfl @[simp, norm_cast] theorem coe_comap (S : NonUnitalSubalgebra R B) (f : F) : (comap f S : Set A) = f ⁻¹' (S : Set B) := rfl instance noZeroDivisors {R A : Type} [CommSemiring R] [NonUnitalSemiring A] [NoZeroDivisors A] [Module R A] (S : NonUnitalSubalgebra R A) : NoZeroDivisors S := NonUnitalSubsemiringClass.noZeroDivisors S end NonUnitalSubalgebra namespace Submodule variable {R A : Type} [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] /-- A submodule closed under multiplication is a non-unital subalgebra. -/ def toNonUnitalSubalgebra (p : Submodule R A) (h_mul : ∀ x y, x ∈ p → y ∈ p → x * y ∈ p) : NonUnitalSubalgebra R A := { p with mul_mem' := h_mul _ _ } @[simp] theorem mem_toNonUnitalSubalgebra {p : Submodule R A} {h_mul} {x} : x ∈ p.toNonUnitalSubalgebra h_mul ↔ x ∈ p := Iff.rfl @[simp] theorem coe_toNonUnitalSubalgebra (p : Submodule R A) (h_mul) : (p.toNonUnitalSubalgebra h_mul : Set A) = p := rfl theorem toNonUnitalSubalgebra_mk (p : Submodule R A) hmul : p.toNonUnitalSubalgebra hmul = NonUnitalSubalgebra.mk ⟨⟨⟨p, p.add_mem⟩, p.zero_mem⟩, hmul _ _⟩ p.smul_mem' := rfl @[simp] theorem toNonUnitalSubalgebra_toSubmodule (p : Submodule R A) (h_mul) : (p.toNonUnitalSubalgebra h_mul).toSubmodule = p := SetLike.coe_injective rfl @[simp] theorem _root_.NonUnitalSubalgebra.toSubmodule_toNonUnitalSubalgebra (S : NonUnitalSubalgebra R A) : (S.toSubmodule.toNonUnitalSubalgebra fun _ _ => mul_mem (s := S)) = S := SetLike.coe_injective rfl end Submodule namespace NonUnitalAlgHom variable {F : Type v'} {R' : Type u'} {R : Type u} {A : Type v} {B : Type w} {C : Type w'} variable [CommSemiring R] variable [NonUnitalNonAssocSemiring A] [Module R A] [NonUnitalNonAssocSemiring B] [Module R B] variable [NonUnitalNonAssocSemiring C] [Module R C] [FunLike F A B] [NonUnitalAlgHomClass F R A B] /-- Range of an `NonUnitalAlgHom` as a non-unital subalgebra. -/ protected def range (φ : F) : NonUnitalSubalgebra R B where toNonUnitalSubsemiring := NonUnitalRingHom.srange (φ : A →ₙ+* B) smul_mem' := fun r a => by rintro ⟨a, rfl⟩; exact ⟨r • a, map_smul φ r a⟩ @[simp] theorem mem_range (φ : F) {y : B} : y ∈ (NonUnitalAlgHom.range φ : NonUnitalSubalgebra R B) ↔ ∃ x : A, φ x = y := NonUnitalRingHom.mem_srange theorem mem_range_self (φ : F) (x : A) : φ x ∈ (NonUnitalAlgHom.range φ : NonUnitalSubalgebra R B) := (NonUnitalAlgHom.mem_range φ).2 ⟨x, rfl⟩ @[simp] theorem coe_range (φ : F) : ((NonUnitalAlgHom.range φ : NonUnitalSubalgebra R B) : Set B) = Set.range (φ : A → B) := by ext rw [SetLike.mem_coe, mem_range] rfl theorem range_comp (f : A →ₙₐ[R] B) (g : B →ₙₐ[R] C) : NonUnitalAlgHom.range (g.comp f) = (NonUnitalAlgHom.range f).map g := SetLike.coe_injective (Set.range_comp g f) theorem range_comp_le_range (f : A →ₙₐ[R] B) (g : B →ₙₐ[R] C) : NonUnitalAlgHom.range (g.comp f) ≤ NonUnitalAlgHom.range g := SetLike.coe_mono (Set.range_comp_subset_range f g) /-- Restrict the codomain of a non-unital algebra homomorphism. -/ def codRestrict (f : F) (S : NonUnitalSubalgebra R B) (hf : ∀ x, f x ∈ S) : A →ₙₐ[R] S := { NonUnitalRingHom.codRestrict (f : A →ₙ+* B) S.toNonUnitalSubsemiring hf with map_smul' := fun r a => Subtype.ext <\| map_smul f r a } @[simp] theorem subtype_comp_codRestrict (f : F) (S : NonUnitalSubalgebra R B) (hf : ∀ x : A, f x ∈ S) : (NonUnitalSubalgebraClass.subtype S).comp (NonUnitalAlgHom.codRestrict f S hf) = f := rfl @[simp] theorem coe_codRestrict (f : F) (S : NonUnitalSubalgebra R B) (hf : ∀ x, f x ∈ S) (x : A) : ↑(NonUnitalAlgHom.codRestrict f S hf x) = f x := rfl theorem injective_codRestrict (f : F) (S : NonUnitalSubalgebra R B) (hf : ∀ x : A, f x ∈ S) : Function.Injective (NonUnitalAlgHom.codRestrict f S hf) ↔ Function.Injective f := ⟨fun H _x _y hxy => H <\| Subtype.eq hxy, fun H _x _y hxy => H (congr_arg Subtype.val hxy :)⟩ /-- Restrict the codomain of an `NonUnitalAlgHom` `f` to `f.range`. This is the bundled version of `Set.rangeFactorization`. -/ abbrev rangeRestrict (f : F) : A →ₙₐ[R] (NonUnitalAlgHom.range f : NonUnitalSubalgebra R B) := NonUnitalAlgHom.codRestrict f (NonUnitalAlgHom.range f) (NonUnitalAlgHom.mem_range_self f) /-- The equalizer of two non-unital `R`-algebra homomorphisms -/ def equalizer (ϕ ψ : F) : NonUnitalSubalgebra R A where carrier := {a \| (ϕ a : B) = ψ a} zero_mem' := by rw [Set.mem_setOf_eq, map_zero, map_zero] add_mem' {x y} (hx : ϕ x = ψ x) (hy : ϕ y = ψ y) := by rw [Set.mem_setOf_eq, map_add, map_add, hx, hy] mul_mem' {x y} (hx : ϕ x = ψ x) (hy : ϕ y = ψ y) := by rw [Set.mem_setOf_eq, map_mul, map_mul, hx, hy] smul_mem' r x (hx : ϕ x = ψ x) := by rw [Set.mem_setOf_eq, map_smul, map_smul, hx] @[simp] theorem mem_equalizer (φ ψ : F) (x : A) : x ∈ NonUnitalAlgHom.equalizer φ ψ ↔ φ x = ψ x := Iff.rfl /-- The range of a morphism of algebras is a fintype, if the domain is a fintype. Note that this instance can cause a diamond with `Subtype.fintype` if `B` is also a fintype. -/ instance fintypeRange [Fintype A] [DecidableEq B] (φ : F) : Fintype (NonUnitalAlgHom.range φ) := Set.fintypeRange φ end NonUnitalAlgHom namespace NonUnitalAlgebra variable {F : Type} (R : Type u) {A : Type v} {B : Type w} variable [CommSemiring R] [NonUnitalNonAssocSemiring A] [Module R A] @[simp] lemma span_eq_toSubmodule (s : NonUnitalSubalgebra R A) : Submodule.span R (s : Set A) = s.toSubmodule := by simp [SetLike.ext'_iff, Submodule.coe_span_eq_self] variable [NonUnitalNonAssocSemiring B] [Module R B] variable [FunLike F A B] [NonUnitalAlgHomClass F R A B] section IsScalarTower variable [IsScalarTower R A A] [SMulCommClass R A A] /-- The minimal non-unital subalgebra that includes `s`. -/ def adjoin (s : Set A) : NonUnitalSubalgebra R A := { Submodule.span R (NonUnitalSubsemiring.closure s : Set A) with mul_mem' := @fun a b (ha : a ∈ Submodule.span R (NonUnitalSubsemiring.closure s : Set A)) (hb : b ∈ Submodule.span R (NonUnitalSubsemiring.closure s : Set A)) => show a b ∈ Submodule.span R (NonUnitalSubsemiring.closure s : Set A) by refine Submodule.span_induction ?_ ?_ ?_ ?_ ha · refine Submodule.span_induction ?_ ?_ ?_ ?_ hb · exact fun x (hx : x ∈ NonUnitalSubsemiring.closure s) y (hy : y ∈ NonUnitalSubsemiring.closure s) => Submodule.subset_span (mul_mem hy hx) · exact fun x _hx => (mul_zero x).symm ▸ Submodule.zero_mem _ · exact fun x y _ _ hx hy z hz => (mul_add z x y).symm ▸ add_mem (hx z hz) (hy z hz) · exact fun r x _ hx y hy => (mul_smul_comm r y x).symm ▸ SMulMemClass.smul_mem r (hx y hy) · exact (zero_mul b).symm ▸ Submodule.zero_mem _ · exact fun x y _ _ => (add_mul x y b).symm ▸ add_mem · exact fun r x _ hx => (smul_mul_assoc r x b).symm ▸ SMulMemClass.smul_mem r hx } theorem adjoin_toSubmodule (s : Set A) : (adjoin R s).toSubmodule = Submodule.span R (NonUnitalSubsemiring.closure s : Set A) := rfl @[aesop safe 20 apply (rule_sets := [SetLike])] theorem subset_adjoin {s : Set A} : s ⊆ adjoin R s := NonUnitalSubsemiring.subset_closure.trans Submodule.subset_span theorem self_mem_adjoin_singleton (x : A) : x ∈ adjoin R ({x} : Set A) := NonUnitalAlgebra.subset_adjoin R (Set.mem_singleton x) variable {R} protected theorem gc : GaloisConnection (adjoin R : Set A → NonUnitalSubalgebra R A) (↑) := fun s S => ⟨fun H => (NonUnitalSubsemiring.subset_closure.trans Submodule.subset_span).trans H, fun H => show Submodule.span R _ ≤ S.toSubmodule from Submodule.span_le.mpr <\| show NonUnitalSubsemiring.closure s ≤ S.toNonUnitalSubsemiring from NonUnitalSubsemiring.closure_le.2 H⟩ /-- Galois insertion between `adjoin` and `Subtype.val`. -/ protected def gi : GaloisInsertion (adjoin R : Set A → NonUnitalSubalgebra R A) (↑) where choice s hs := (adjoin R s).copy s <\| le_antisymm (NonUnitalAlgebra.gc.le_u_l s) hs gc := NonUnitalAlgebra.gc le_l_u S := (NonUnitalAlgebra.gc (S : Set A) (adjoin R S)).1 <\| le_rfl choice_eq _ _ := NonUnitalSubalgebra.copy_eq _ _ _ instance : CompleteLattice (NonUnitalSubalgebra R A) := GaloisInsertion.liftCompleteLattice NonUnitalAlgebra.gi theorem adjoin_le {S : NonUnitalSubalgebra R A} {s : Set A} (hs : s ⊆ S) : adjoin R s ≤ S := NonUnitalAlgebra.gc.l_le hs theorem adjoin_le_iff {S : NonUnitalSubalgebra R A} {s : Set A} : adjoin R s ≤ S ↔ s ⊆ S := NonUnitalAlgebra.gc _ _ theorem adjoin_union (s t : Set A) : adjoin R (s ∪ t) = adjoin R s ⊔ adjoin R t := (NonUnitalAlgebra.gc : GaloisConnection _ ((↑) : NonUnitalSubalgebra R A → Set A)).l_sup lemma adjoin_eq (s : NonUnitalSubalgebra R A) : adjoin R (s : Set A) = s := le_antisymm (adjoin_le le_rfl) (subset_adjoin R) /-- If some predicate holds for all `x ∈ (s : Set A)` and this predicate is closed under the `algebraMap`, addition, multiplication and star operations, then it holds for `a ∈ adjoin R s`. -/ @[elab_as_elim] theorem adjoin_induction {s : Set A} {p : (x : A) → x ∈ adjoin R s → Prop} (mem : ∀ (x) (hx : x ∈ s), p x (subset_adjoin R hx)) (add : ∀ x y hx hy, p x hx → p y hy → p (x + y) (add_mem hx hy)) (zero : p 0 (zero_mem _)) (mul : ∀ x y hx hy, p x hx → p y hy → p (x * y) (mul_mem hx hy)) (smul : ∀ r x hx, p x hx → p (r • x) (SMulMemClass.smul_mem r hx)) {x} (hx : x ∈ adjoin R s) : p x hx := let S : NonUnitalSubalgebra R A := { carrier := { x \| ∃ hx, p x hx } mul_mem' := (Exists.elim · fun _ ha ↦ (Exists.elim · fun _ hb ↦ ⟨_, mul _ _ _ _ ha hb⟩)) add_mem' := (Exists.elim · fun _ ha ↦ (Exists.elim · fun _ hb ↦ ⟨_, add _ _ _ _ ha hb⟩)) smul_mem' := fun r ↦ (Exists.elim · fun _ hb ↦ ⟨_, smul r _ _ hb⟩) zero_mem' := ⟨_, zero⟩ } adjoin_le (S := S) (fun y hy ↦ ⟨subset_adjoin R hy, mem y hy⟩) hx \|>.elim fun _ ↦ id @[elab_as_elim] theorem adjoin_induction₂ {s : Set A} {p : ∀ x y, x ∈ adjoin R s → y ∈ adjoin R s → Prop} (mem_mem : ∀ (x) (y) (hx : x ∈ s) (hy : y ∈ s), p x y (subset_adjoin R hx) (subset_adjoin R hy)) (zero_left : ∀ x hx, p 0 x (zero_mem _) hx) (zero_right : ∀ x hx, p x 0 hx (zero_mem _)) (add_left : ∀ x y z hx hy hz, p x z hx hz → p y z hy hz → p (x + y) z (add_mem hx hy) hz) (add_right : ∀ x y z hx hy hz, p x y hx hy → p x z hx hz → p x (y + z) hx (add_mem hy hz)) (mul_left : ∀ x y z hx hy hz, p x z hx hz → p y z hy hz → p (x * y) z (mul_mem hx hy) hz) (mul_right : ∀ x y z hx hy hz, p x y hx hy → p x z hx hz → p x (y * z) hx (mul_mem hy hz)) (smul_left : ∀ r x y hx hy, p x y hx hy → p (r • x) y (SMulMemClass.smul_mem r hx) hy) (smul_right : ∀ r x y hx hy, p x y hx hy → p x (r • y) hx (SMulMemClass.smul_mem r hy)) {x y : A} (hx : x ∈ adjoin R s) (hy : y ∈ adjoin R s) : p x y hx hy := by induction hy using adjoin_induction with \| mem z hz => induction hx using adjoin_induction with \| mem _ h => exact mem_mem _ _ h hz \| zero => exact zero_left _ _ \| mul _ _ _ _ h₁ h₂ => exact mul_left _ _ _ _ _ _ h₁ h₂ \| add _ _ _ _ h₁ h₂ => exact add_left _ _ _ _ _ _ h₁ h₂ \| smul _ _ _ h => exact smul_left _ _ _ _ _ h \| zero => exact zero_right x hx \| mul _ _ _ _ h₁ h₂ => exact mul_right _ _ _ _ _ _ h₁ h₂ \| add _ _ _ _ h₁ h₂ => exact add_right _ _ _ _ _ _ h₁ h₂ \| smul _ _ _ h => exact smul_right _ _ _ _ _ h open Submodule in lemma adjoin_eq_span (s : Set A) : (adjoin R s).toSubmodule = span R (Subsemigroup.closure s) := by apply le_antisymm · intro x hx induction hx using adjoin_induction with \| mem x hx => exact subset_span <\| Subsemigroup.subset_closure hx \| add x y _ _ hpx hpy => exact add_mem hpx hpy \| zero => exact zero_mem _ \| mul x y _ _ hpx hpy => apply span_induction₂ ?Hs (by simp) (by simp) ?Hadd_l ?Hadd_r ?Hsmul_l ?Hsmul_r hpx hpy case Hs => exact fun x y hx hy ↦ subset_span <\| mul_mem hx hy case Hadd_l => exact fun x y z _ _ _ hxz hyz ↦ by simpa [add_mul] using add_mem hxz hyz case Hadd_r => exact fun x y z _ _ _ hxz hyz ↦ by simpa [mul_add] using add_mem hxz hyz case Hsmul_l => exact fun r x y _ _ hxy ↦ by simpa [smul_mul_assoc] using smul_mem _ _ hxy case Hsmul_r => exact fun r x y _ _ hxy ↦ by simpa [mul_smul_comm] using smul_mem _ _ hxy \| smul r x _ hpx => exact smul_mem _ _ hpx · apply span_le.2 _ show Subsemigroup.closure s ≤ (adjoin R s).toSubsemigroup exact Subsemigroup.closure_le.2 (subset_adjoin R) variable (R A) @[simp] theorem adjoin_empty : adjoin R (∅ : Set A) = ⊥ := show adjoin R ⊥ = ⊥ by apply GaloisConnection.l_bot; exact NonUnitalAlgebra.gc @[simp] theorem adjoin_univ : adjoin R (Set.univ : Set A) = ⊤ := eq_top_iff.2 fun _x hx => subset_adjoin R hx open NonUnitalSubalgebra in lemma _root_.NonUnitalAlgHom.map_adjoin [IsScalarTower R B B] [SMulCommClass R B B] (f : F) (s : Set A) : map f (adjoin R s) = adjoin R (f '' s) := Set.image_preimage.l_comm_of_u_comm (gc_map_comap f) NonUnitalAlgebra.gi.gc NonUnitalAlgebra.gi.gc fun _t => rfl open NonUnitalSubalgebra in @[simp] lemma _root_.NonUnitalAlgHom.map_adjoin_singleton [IsScalarTower R B B] [SMulCommClass R B B] (f : F) (x : A) : map f (adjoin R {x}) = adjoin R {f x} := by simp [NonUnitalAlgHom.map_adjoin] variable {R A} @[simp] theorem coe_top : (↑(⊤ : NonUnitalSubalgebra R A) : Set A) = Set.univ := rfl @[simp] theorem mem_top {x : A} : x ∈ (⊤ : NonUnitalSubalgebra R A) := Set.mem_univ x @[simp] theorem top_toSubmodule : (⊤ : NonUnitalSubalgebra R A).toSubmodule = ⊤ := rfl @[simp] theorem top_toNonUnitalSubsemiring : (⊤ : NonUnitalSubalgebra R A).toNonUnitalSubsemiring = ⊤ := rfl @[simp] theorem top_toSubring {R A : Type} [CommRing R] [NonUnitalNonAssocRing A] [Module R A] [IsScalarTower R A A] [SMulCommClass R A A] : (⊤ : NonUnitalSubalgebra R A).toNonUnitalSubring = ⊤ := rfl @[simp] theorem toSubmodule_eq_top {S : NonUnitalSubalgebra R A} : S.toSubmodule = ⊤ ↔ S = ⊤ := NonUnitalSubalgebra.toSubmodule'.injective.eq_iff' top_toSubmodule @[simp] theorem toNonUnitalSubsemiring_eq_top {S : NonUnitalSubalgebra R A} : S.toNonUnitalSubsemiring = ⊤ ↔ S = ⊤ := NonUnitalSubalgebra.toNonUnitalSubsemiring_injective.eq_iff' top_toNonUnitalSubsemiring @[simp] theorem to_subring_eq_top {R A : Type} [CommRing R] [Ring A] [Algebra R A] {S : NonUnitalSubalgebra R A} : S.toNonUnitalSubring = ⊤ ↔ S = ⊤ := NonUnitalSubalgebra.toNonUnitalSubring_injective.eq_iff' top_toSubring theorem mem_sup_left {S T : NonUnitalSubalgebra R A} : ∀ {x : A}, x ∈ S → x ∈ S ⊔ T := by rw [← SetLike.le_def] exact le_sup_left theorem mem_sup_right {S T : NonUnitalSubalgebra R A} : ∀ {x : A}, x ∈ T → x ∈ S ⊔ T := by rw [← SetLike.le_def] exact le_sup_right theorem mul_mem_sup {S T : NonUnitalSubalgebra R A} {x y : A} (hx : x ∈ S) (hy : y ∈ T) : x * y ∈ S ⊔ T := mul_mem (mem_sup_left hx) (mem_sup_right hy) theorem map_sup [IsScalarTower R B B] [SMulCommClass R B B] (f : F) (S T : NonUnitalSubalgebra R A) : ((S ⊔ T).map f : NonUnitalSubalgebra R B) = S.map f ⊔ T.map f := (NonUnitalSubalgebra.gc_map_comap f).l_sup theorem map_inf [IsScalarTower R B B] [SMulCommClass R B B] (f : F) (hf : Function.Injective f) (S T : NonUnitalSubalgebra R A) : ((S ⊓ T).map f : NonUnitalSubalgebra R B) = S.map f ⊓ T.map f := SetLike.coe_injective (Set.image_inter hf) @[simp, norm_cast] theorem coe_inf (S T : NonUnitalSubalgebra R A) : (↑(S ⊓ T) : Set A) = (S : Set A) ∩ T :=	rfl	Mathlib/Algebra/Algebra/NonUnitalSubalgebra.lean	760	761
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Kim Morrison -/ import Mathlib.Algebra.Group.Indicator import Mathlib.Algebra.Group.InjSurj import Mathlib.Data.Set.Finite.Basic import Mathlib.Tactic.FastInstance import Mathlib.Algebra.Group.Equiv.Defs /-! # Type of functions with finite support For any type `α` and any type `M` with zero, we define the type `Finsupp α M` (notation: `α →₀ M`) of finitely supported functions from `α` to `M`, i.e. the functions which are zero everywhere on `α` except on a finite set. Functions with finite support are used (at least) in the following parts of the library: * `MonoidAlgebra R M` and `AddMonoidAlgebra R M` are defined as `M →₀ R`; * polynomials and multivariate polynomials are defined as `AddMonoidAlgebra`s, hence they use `Finsupp` under the hood; * the linear combination of a family of vectors `v i` with coefficients `f i` (as used, e.g., to define linearly independent family `LinearIndependent`) is defined as a map `Finsupp.linearCombination : (ι → M) → (ι →₀ R) →ₗ[R] M`. Some other constructions are naturally equivalent to `α →₀ M` with some `α` and `M` but are defined in a different way in the library: * `Multiset α ≃+ α →₀ ℕ`; * `FreeAbelianGroup α ≃+ α →₀ ℤ`. Most of the theory assumes that the range is a commutative additive monoid. This gives us the big sum operator as a powerful way to construct `Finsupp` elements, which is defined in `Mathlib.Algebra.BigOperators.Finsupp.Basic`. Many constructions based on `α →₀ M` are `def`s rather than `abbrev`s to avoid reusing unwanted type class instances. E.g., `MonoidAlgebra`, `AddMonoidAlgebra`, and types based on these two have non-pointwise multiplication. ## Main declarations * `Finsupp`: The type of finitely supported functions from `α` to `β`. * `Finsupp.onFinset`: The restriction of a function to a `Finset` as a `Finsupp`. * `Finsupp.mapRange`: Composition of a `ZeroHom` with a `Finsupp`. * `Finsupp.embDomain`: Maps the domain of a `Finsupp` by an embedding. * `Finsupp.zipWith`: Postcomposition of two `Finsupp`s with a function `f` such that `f 0 0 = 0`. ## Notations This file adds `α →₀ M` as a global notation for `Finsupp α M`. We also use the following convention for `Type` variables in this file `α`, `β`, `γ`: types with no additional structure that appear as the first argument to `Finsupp` somewhere in the statement; * `ι` : an auxiliary index type; * `M`, `M'`, `N`, `P`: types with `Zero` or `(Add)(Comm)Monoid` structure; `M` is also used for a (semi)module over a (semi)ring. * `G`, `H`: groups (commutative or not, multiplicative or additive); * `R`, `S`: (semi)rings. ## Implementation notes This file is a `noncomputable theory` and uses classical logic throughout. ## TODO * Expand the list of definitions and important lemmas to the module docstring. -/ assert_not_exists CompleteLattice Submonoid noncomputable section open Finset Function variable {α β γ ι M M' N P G H R S : Type} /-- `Finsupp α M`, denoted `α →₀ M`, is the type of functions `f : α → M` such that `f x = 0` for all but finitely many `x`. -/ structure Finsupp (α : Type) (M : Type) [Zero M] where /-- The support of a finitely supported function (aka `Finsupp`). -/ support : Finset α /-- The underlying function of a bundled finitely supported function (aka `Finsupp`). -/ toFun : α → M /-- The witness that the support of a `Finsupp` is indeed the exact locus where its underlying function is nonzero. -/ mem_support_toFun : ∀ a, a ∈ support ↔ toFun a ≠ 0 @[inherit_doc] infixr:25 " →₀ " => Finsupp namespace Finsupp /-! ### Basic declarations about `Finsupp` -/ section Basic variable [Zero M] instance instFunLike : FunLike (α →₀ M) α M := ⟨toFun, by rintro ⟨s, f, hf⟩ ⟨t, g, hg⟩ (rfl : f = g) congr ext a exact (hf _).trans (hg _).symm⟩ @[ext] theorem ext {f g : α →₀ M} (h : ∀ a, f a = g a) : f = g := DFunLike.ext _ _ h lemma ne_iff {f g : α →₀ M} : f ≠ g ↔ ∃ a, f a ≠ g a := DFunLike.ne_iff @[simp, norm_cast] theorem coe_mk (f : α → M) (s : Finset α) (h : ∀ a, a ∈ s ↔ f a ≠ 0) : ⇑(⟨s, f, h⟩ : α →₀ M) = f := rfl instance instZero : Zero (α →₀ M) := ⟨⟨∅, 0, fun _ => ⟨fun h ↦ (not_mem_empty _ h).elim, fun H => (H rfl).elim⟩⟩⟩ @[simp, norm_cast] lemma coe_zero : ⇑(0 : α →₀ M) = 0 := rfl theorem zero_apply {a : α} : (0 : α →₀ M) a = 0 := rfl @[simp] theorem support_zero : (0 : α →₀ M).support = ∅ := rfl instance instInhabited : Inhabited (α →₀ M) := ⟨0⟩ @[simp] theorem mem_support_iff {f : α →₀ M} : ∀ {a : α}, a ∈ f.support ↔ f a ≠ 0 := @(f.mem_support_toFun) @[simp, norm_cast] theorem fun_support_eq (f : α →₀ M) : Function.support f = f.support := Set.ext fun _x => mem_support_iff.symm theorem not_mem_support_iff {f : α →₀ M} {a} : a ∉ f.support ↔ f a = 0 := not_iff_comm.1 mem_support_iff.symm @[simp, norm_cast] theorem coe_eq_zero {f : α →₀ M} : (f : α → M) = 0 ↔ f = 0 := by rw [← coe_zero, DFunLike.coe_fn_eq] theorem ext_iff' {f g : α →₀ M} : f = g ↔ f.support = g.support ∧ ∀ x ∈ f.support, f x = g x := ⟨fun h => h ▸ ⟨rfl, fun _ _ => rfl⟩, fun ⟨h₁, h₂⟩ => ext fun a => by classical exact if h : a ∈ f.support then h₂ a h else by have hf : f a = 0 := not_mem_support_iff.1 h have hg : g a = 0 := by rwa [h₁, not_mem_support_iff] at h rw [hf, hg]⟩ @[simp] theorem support_eq_empty {f : α →₀ M} : f.support = ∅ ↔ f = 0 := mod_cast @Function.support_eq_empty_iff _ _ _ f theorem support_nonempty_iff {f : α →₀ M} : f.support.Nonempty ↔ f ≠ 0 := by simp only [Finsupp.support_eq_empty, Finset.nonempty_iff_ne_empty, Ne] theorem card_support_eq_zero {f : α →₀ M} : #f.support = 0 ↔ f = 0 := by simp instance instDecidableEq [DecidableEq α] [DecidableEq M] : DecidableEq (α →₀ M) := fun f g => decidable_of_iff (f.support = g.support ∧ ∀ a ∈ f.support, f a = g a) ext_iff'.symm theorem finite_support (f : α →₀ M) : Set.Finite (Function.support f) := f.fun_support_eq.symm ▸ f.support.finite_toSet theorem support_subset_iff {s : Set α} {f : α →₀ M} : ↑f.support ⊆ s ↔ ∀ a ∉ s, f a = 0 := by simp only [Set.subset_def, mem_coe, mem_support_iff]; exact forall_congr' fun a => not_imp_comm /-- Given `Finite α`, `equivFunOnFinite` is the `Equiv` between `α →₀ β` and `α → β`. (All functions on a finite type are finitely supported.) -/ @[simps] def equivFunOnFinite [Finite α] : (α →₀ M) ≃ (α → M) where toFun := (⇑) invFun f := mk (Function.support f).toFinite.toFinset f fun _a => Set.Finite.mem_toFinset _ left_inv _f := ext fun _x => rfl right_inv _f := rfl @[simp] theorem equivFunOnFinite_symm_coe {α} [Finite α] (f : α →₀ M) : equivFunOnFinite.symm f = f := equivFunOnFinite.symm_apply_apply f @[simp] lemma coe_equivFunOnFinite_symm {α} [Finite α] (f : α → M) : ⇑(equivFunOnFinite.symm f) = f := rfl /-- If `α` has a unique term, the type of finitely supported functions `α →₀ β` is equivalent to `β`. -/ @[simps!] noncomputable def _root_.Equiv.finsuppUnique {ι : Type} [Unique ι] : (ι →₀ M) ≃ M := Finsupp.equivFunOnFinite.trans (Equiv.funUnique ι M) @[ext] theorem unique_ext [Unique α] {f g : α →₀ M} (h : f default = g default) : f = g := ext fun a => by rwa [Unique.eq_default a] end Basic /-! ### Declarations about `onFinset` -/ section OnFinset variable [Zero M] /-- `Finsupp.onFinset s f hf` is the finsupp function representing `f` restricted to the finset `s`. The function must be `0` outside of `s`. Use this when the set needs to be filtered anyways, otherwise a better set representation is often available. -/ def onFinset (s : Finset α) (f : α → M) (hf : ∀ a, f a ≠ 0 → a ∈ s) : α →₀ M where support := haveI := Classical.decEq M {a ∈ s \| f a ≠ 0} toFun := f mem_support_toFun := by classical simpa @[simp, norm_cast] lemma coe_onFinset (s : Finset α) (f : α → M) (hf) : onFinset s f hf = f := rfl @[simp] theorem onFinset_apply {s : Finset α} {f : α → M} {hf a} : (onFinset s f hf : α →₀ M) a = f a := rfl @[simp] theorem support_onFinset_subset {s : Finset α} {f : α → M} {hf} : (onFinset s f hf).support ⊆ s := by classical convert filter_subset (f · ≠ 0) s theorem mem_support_onFinset {s : Finset α} {f : α → M} (hf : ∀ a : α, f a ≠ 0 → a ∈ s) {a : α} : a ∈ (Finsupp.onFinset s f hf).support ↔ f a ≠ 0 := by rw [Finsupp.mem_support_iff, Finsupp.onFinset_apply] theorem support_onFinset [DecidableEq M] {s : Finset α} {f : α → M} (hf : ∀ a : α, f a ≠ 0 → a ∈ s) : (Finsupp.onFinset s f hf).support = {a ∈ s \| f a ≠ 0} := by dsimp [onFinset]; congr end OnFinset section OfSupportFinite variable [Zero M] /-- The natural `Finsupp` induced by the function `f` given that it has finite support. -/ noncomputable def ofSupportFinite (f : α → M) (hf : (Function.support f).Finite) : α →₀ M where support := hf.toFinset toFun := f mem_support_toFun _ := hf.mem_toFinset theorem ofSupportFinite_coe {f : α → M} {hf : (Function.support f).Finite} : (ofSupportFinite f hf : α → M) = f := rfl instance instCanLift : CanLift (α → M) (α →₀ M) (⇑) fun f => (Function.support f).Finite where prf f hf := ⟨ofSupportFinite f hf, rfl⟩ end OfSupportFinite /-! ### Declarations about `mapRange` -/ section MapRange variable [Zero M] [Zero N] [Zero P] /-- The composition of `f : M → N` and `g : α →₀ M` is `mapRange f hf g : α →₀ N`, which is well-defined when `f 0 = 0`. This preserves the structure on `f`, and exists in various bundled forms for when `f` is itself bundled (defined in `Mathlib/Data/Finsupp/Basic.lean`): * `Finsupp.mapRange.equiv` * `Finsupp.mapRange.zeroHom` * `Finsupp.mapRange.addMonoidHom` * `Finsupp.mapRange.addEquiv` * `Finsupp.mapRange.linearMap` * `Finsupp.mapRange.linearEquiv` -/ def mapRange (f : M → N) (hf : f 0 = 0) (g : α →₀ M) : α →₀ N := onFinset g.support (f ∘ g) fun a => by rw [mem_support_iff, not_imp_not]; exact fun H => (congr_arg f H).trans hf @[simp] theorem mapRange_apply {f : M → N} {hf : f 0 = 0} {g : α →₀ M} {a : α} : mapRange f hf g a = f (g a) := rfl @[simp] theorem mapRange_zero {f : M → N} {hf : f 0 = 0} : mapRange f hf (0 : α →₀ M) = 0 := ext fun _ => by simp only [hf, zero_apply, mapRange_apply] @[simp] theorem mapRange_id (g : α →₀ M) : mapRange id rfl g = g := ext fun _ => rfl theorem mapRange_comp (f : N → P) (hf : f 0 = 0) (f₂ : M → N) (hf₂ : f₂ 0 = 0) (h : (f ∘ f₂) 0 = 0) (g : α →₀ M) : mapRange (f ∘ f₂) h g = mapRange f hf (mapRange f₂ hf₂ g) := ext fun _ => rfl @[simp] lemma mapRange_mapRange (e₁ : N → P) (e₂ : M → N) (he₁ he₂) (f : α →₀ M) : mapRange e₁ he₁ (mapRange e₂ he₂ f) = mapRange (e₁ ∘ e₂) (by simp []) f := ext fun _ ↦ rfl theorem support_mapRange {f : M → N} {hf : f 0 = 0} {g : α →₀ M} : (mapRange f hf g).support ⊆ g.support := support_onFinset_subset theorem support_mapRange_of_injective {e : M → N} (he0 : e 0 = 0) (f : ι →₀ M) (he : Function.Injective e) : (Finsupp.mapRange e he0 f).support = f.support := by ext simp only [Finsupp.mem_support_iff, Ne, Finsupp.mapRange_apply] exact he.ne_iff' he0 lemma range_mapRange (e : M → N) (he₀ : e 0 = 0) : Set.range (Finsupp.mapRange (α := α) e he₀) = {g \| ∀ i, g i ∈ Set.range e} := by ext g simp only [Set.mem_range, Set.mem_setOf] constructor · rintro ⟨g, rfl⟩ i simp · intro h classical choose f h using h use onFinset g.support (Set.indicator g.support f) (by aesop) ext i simp only [mapRange_apply, onFinset_apply, Set.indicator_apply] split_ifs <;> simp_all /-- `Finsupp.mapRange` of a injective function is injective. -/ lemma mapRange_injective (e : M → N) (he₀ : e 0 = 0) (he : Injective e) : Injective (Finsupp.mapRange (α := α) e he₀) := by intro a b h rw [Finsupp.ext_iff] at h ⊢ simpa only [mapRange_apply, he.eq_iff] using h /-- `Finsupp.mapRange` of a surjective function is surjective. -/ lemma mapRange_surjective (e : M → N) (he₀ : e 0 = 0) (he : Surjective e) : Surjective (Finsupp.mapRange (α := α) e he₀) := by rw [← Set.range_eq_univ, range_mapRange, he.range_eq] simp end MapRange /-! ### Declarations about `embDomain` -/ section EmbDomain variable [Zero M] [Zero N] /-- Given `f : α ↪ β` and `v : α →₀ M`, `Finsupp.embDomain f v : β →₀ M` is the finitely supported function whose value at `f a : β` is `v a`. For a `b : β` outside the range of `f`, it is zero. -/ def embDomain (f : α ↪ β) (v : α →₀ M) : β →₀ M where support := v.support.map f toFun a₂ := haveI := Classical.decEq β if h : a₂ ∈ v.support.map f then v (v.support.choose (fun a₁ => f a₁ = a₂) (by rcases Finset.mem_map.1 h with ⟨a, ha, rfl⟩ exact ExistsUnique.intro a ⟨ha, rfl⟩ fun b ⟨_, hb⟩ => f.injective hb)) else 0 mem_support_toFun a₂ := by dsimp split_ifs with h · simp only [h, true_iff, Ne] rw [← not_mem_support_iff, not_not] classical apply Finset.choose_mem · simp only [h, Ne, ne_self_iff_false, not_true_eq_false] @[simp] theorem support_embDomain (f : α ↪ β) (v : α →₀ M) : (embDomain f v).support = v.support.map f := rfl @[simp] theorem embDomain_zero (f : α ↪ β) : (embDomain f 0 : β →₀ M) = 0 := rfl @[simp] theorem embDomain_apply (f : α ↪ β) (v : α →₀ M) (a : α) : embDomain f v (f a) = v a := by classical simp_rw [embDomain, coe_mk, mem_map'] split_ifs with h · refine congr_arg (v : α → M) (f.inj' ?_) exact Finset.choose_property (fun a₁ => f a₁ = f a) _ _ · exact (not_mem_support_iff.1 h).symm theorem embDomain_notin_range (f : α ↪ β) (v : α →₀ M) (a : β) (h : a ∉ Set.range f) : embDomain f v a = 0 := by classical refine dif_neg (mt (fun h => ?_) h) rcases Finset.mem_map.1 h with ⟨a, _h, rfl⟩ exact Set.mem_range_self a theorem embDomain_injective (f : α ↪ β) : Function.Injective (embDomain f : (α →₀ M) → β →₀ M) := fun l₁ l₂ h => ext fun a => by simpa only [embDomain_apply] using DFunLike.ext_iff.1 h (f a) @[simp] theorem embDomain_inj {f : α ↪ β} {l₁ l₂ : α →₀ M} : embDomain f l₁ = embDomain f l₂ ↔ l₁ = l₂ := (embDomain_injective f).eq_iff @[simp] theorem embDomain_eq_zero {f : α ↪ β} {l : α →₀ M} : embDomain f l = 0 ↔ l = 0 := (embDomain_injective f).eq_iff' <\| embDomain_zero f theorem embDomain_mapRange (f : α ↪ β) (g : M → N) (p : α →₀ M) (hg : g 0 = 0) : embDomain f (mapRange g hg p) = mapRange g hg (embDomain f p) := by ext a by_cases h : a ∈ Set.range f · rcases h with ⟨a', rfl⟩ rw [mapRange_apply, embDomain_apply, embDomain_apply, mapRange_apply] · rw [mapRange_apply, embDomain_notin_range, embDomain_notin_range, ← hg] <;> assumption end EmbDomain /-! ### Declarations about `zipWith` -/ section ZipWith variable [Zero M] [Zero N] [Zero P] /-- Given finitely supported functions `g₁ : α →₀ M` and `g₂ : α →₀ N` and function `f : M → N → P`, `Finsupp.zipWith f hf g₁ g₂` is the finitely supported function `α →₀ P` satisfying `zipWith f hf g₁ g₂ a = f (g₁ a) (g₂ a)`, which is well-defined when `f 0 0 = 0`. -/ def zipWith (f : M → N → P) (hf : f 0 0 = 0) (g₁ : α →₀ M) (g₂ : α →₀ N) : α →₀ P := onFinset (haveI := Classical.decEq α; g₁.support ∪ g₂.support) (fun a => f (g₁ a) (g₂ a)) fun a (H : f _ _ ≠ 0) => by classical rw [mem_union, mem_support_iff, mem_support_iff, ← not_and_or] rintro ⟨h₁, h₂⟩; rw [h₁, h₂] at H; exact H hf @[simp] theorem zipWith_apply {f : M → N → P} {hf : f 0 0 = 0} {g₁ : α →₀ M} {g₂ : α →₀ N} {a : α} : zipWith f hf g₁ g₂ a = f (g₁ a) (g₂ a) := rfl theorem support_zipWith [D : DecidableEq α] {f : M → N → P} {hf : f 0 0 = 0} {g₁ : α →₀ M} {g₂ : α →₀ N} : (zipWith f hf g₁ g₂).support ⊆ g₁.support ∪ g₂.support := by convert support_onFinset_subset end ZipWith /-! ### Additive monoid structure on `α →₀ M` -/ section AddZeroClass variable [AddZeroClass M] instance instAdd : Add (α →₀ M) := ⟨zipWith (· + ·) (add_zero 0)⟩ @[simp, norm_cast] lemma coe_add (f g : α →₀ M) : ⇑(f + g) = f + g := rfl theorem add_apply (g₁ g₂ : α →₀ M) (a : α) : (g₁ + g₂) a = g₁ a + g₂ a := rfl theorem support_add [DecidableEq α] {g₁ g₂ : α →₀ M} : (g₁ + g₂).support ⊆ g₁.support ∪ g₂.support := support_zipWith theorem support_add_eq [DecidableEq α] {g₁ g₂ : α →₀ M} (h : Disjoint g₁.support g₂.support) : (g₁ + g₂).support = g₁.support ∪ g₂.support := le_antisymm support_zipWith fun a ha => (Finset.mem_union.1 ha).elim (fun ha => by have : a ∉ g₂.support := disjoint_left.1 h ha simp only [mem_support_iff, not_not] at ; simpa only [add_apply, this, add_zero] ) fun ha => by have : a ∉ g₁.support := disjoint_right.1 h ha simp only [mem_support_iff, not_not] at ; simpa only [add_apply, this, zero_add] instance instAddZeroClass : AddZeroClass (α →₀ M) := fast_instance% DFunLike.coe_injective.addZeroClass _ coe_zero coe_add instance instIsLeftCancelAdd [IsLeftCancelAdd M] : IsLeftCancelAdd (α →₀ M) where add_left_cancel _ _ _ h := ext fun x => add_left_cancel <\| DFunLike.congr_fun h x /-- When ι is finite and M is an AddMonoid, then Finsupp.equivFunOnFinite gives an AddEquiv -/ noncomputable def addEquivFunOnFinite {ι : Type} [Finite ι] : (ι →₀ M) ≃+ (ι → M) where __ := Finsupp.equivFunOnFinite map_add' _ _ := rfl /-- AddEquiv between (ι →₀ M) and M, when ι has a unique element -/ noncomputable def _root_.AddEquiv.finsuppUnique {ι : Type*} [Unique ι] : (ι →₀ M) ≃+ M where __ := Equiv.finsuppUnique map_add' _ _ := rfl instance instIsRightCancelAdd [IsRightCancelAdd M] : IsRightCancelAdd (α →₀ M) where add_right_cancel _ _ _ h := ext fun x => add_right_cancel <\| DFunLike.congr_fun h x instance instIsCancelAdd [IsCancelAdd M] : IsCancelAdd (α →₀ M) where /-- Evaluation of a function `f : α →₀ M` at a point as an additive monoid homomorphism. See `Finsupp.lapply` in `Mathlib/LinearAlgebra/Finsupp/Defs.lean` for the stronger version as a linear map. -/ @[simps apply] def applyAddHom (a : α) : (α →₀ M) →+ M where toFun g := g a map_zero' := zero_apply map_add' _ _ := add_apply _ _ _ /-- Coercion from a `Finsupp` to a function type is an `AddMonoidHom`. -/ @[simps] noncomputable def coeFnAddHom : (α →₀ M) →+ α → M where toFun := (⇑) map_zero' := coe_zero map_add' := coe_add theorem mapRange_add [AddZeroClass N] {f : M → N} {hf : f 0 = 0} (hf' : ∀ x y, f (x + y) = f x + f y) (v₁ v₂ : α →₀ M) : mapRange f hf (v₁ + v₂) = mapRange f hf v₁ + mapRange f hf v₂ := ext fun _ => by simp only [hf', add_apply, mapRange_apply] theorem mapRange_add' [AddZeroClass N] [FunLike β M N] [AddMonoidHomClass β M N] {f : β} (v₁ v₂ : α →₀ M) : mapRange f (map_zero f) (v₁ + v₂) = mapRange f (map_zero f) v₁ + mapRange f (map_zero f) v₂ := mapRange_add (map_add f) v₁ v₂ /-- Bundle `Finsupp.embDomain f` as an additive map from `α →₀ M` to `β →₀ M`. -/ @[simps] def embDomain.addMonoidHom (f : α ↪ β) : (α →₀ M) →+ β →₀ M where toFun v := embDomain f v map_zero' := by simp map_add' v w := by ext b by_cases h : b ∈ Set.range f · rcases h with ⟨a, rfl⟩ simp · simp only [Set.mem_range, not_exists, coe_add, Pi.add_apply, embDomain_notin_range _ _ _ h, add_zero] @[simp] theorem embDomain_add (f : α ↪ β) (v w : α →₀ M) : embDomain f (v + w) = embDomain f v + embDomain f w := (embDomain.addMonoidHom f).map_add v w end AddZeroClass section AddMonoid variable [AddMonoid M] /-- Note the general `SMul` instance for `Finsupp` doesn't apply as `ℕ` is not distributive unless `β i`'s addition is commutative. -/ instance instNatSMul : SMul ℕ (α →₀ M) := ⟨fun n v => v.mapRange (n • ·) (nsmul_zero _)⟩ instance instAddMonoid : AddMonoid (α →₀ M) := fast_instance% DFunLike.coe_injective.addMonoid _ coe_zero coe_add fun _ _ => rfl end AddMonoid instance instAddCommMonoid [AddCommMonoid M] : AddCommMonoid (α →₀ M) := fast_instance% DFunLike.coe_injective.addCommMonoid DFunLike.coe coe_zero coe_add (fun _ _ => rfl) instance instNeg [NegZeroClass G] : Neg (α →₀ G) := ⟨mapRange Neg.neg neg_zero⟩ @[simp, norm_cast] lemma coe_neg [NegZeroClass G] (g : α →₀ G) : ⇑(-g) = -g := rfl theorem neg_apply [NegZeroClass G] (g : α →₀ G) (a : α) : (-g) a = -g a := rfl theorem mapRange_neg [NegZeroClass G] [NegZeroClass H] {f : G → H} {hf : f 0 = 0} (hf' : ∀ x, f (-x) = -f x) (v : α →₀ G) : mapRange f hf (-v) = -mapRange f hf v := ext fun _ => by simp only [hf', neg_apply, mapRange_apply] theorem mapRange_neg' [AddGroup G] [SubtractionMonoid H] [FunLike β G H] [AddMonoidHomClass β G H] {f : β} (v : α →₀ G) : mapRange f (map_zero f) (-v) = -mapRange f (map_zero f) v := mapRange_neg (map_neg f) v instance instSub [SubNegZeroMonoid G] : Sub (α →₀ G) := ⟨zipWith Sub.sub (sub_zero _)⟩ @[simp, norm_cast] lemma coe_sub [SubNegZeroMonoid G] (g₁ g₂ : α →₀ G) : ⇑(g₁ - g₂) = g₁ - g₂ := rfl theorem sub_apply [SubNegZeroMonoid G] (g₁ g₂ : α →₀ G) (a : α) : (g₁ - g₂) a = g₁ a - g₂ a := rfl theorem mapRange_sub [SubNegZeroMonoid G] [SubNegZeroMonoid H] {f : G → H} {hf : f 0 = 0} (hf' : ∀ x y, f (x - y) = f x - f y) (v₁ v₂ : α →₀ G) : mapRange f hf (v₁ - v₂) = mapRange f hf v₁ - mapRange f hf v₂ := ext fun _ => by simp only [hf', sub_apply, mapRange_apply] theorem mapRange_sub' [AddGroup G] [SubtractionMonoid H] [FunLike β G H] [AddMonoidHomClass β G H] {f : β} (v₁ v₂ : α →₀ G) : mapRange f (map_zero f) (v₁ - v₂) = mapRange f (map_zero f) v₁ - mapRange f (map_zero f) v₂ := mapRange_sub (map_sub f) v₁ v₂ /-- Note the general `SMul` instance for `Finsupp` doesn't apply as `ℤ` is not distributive unless `β i`'s addition is commutative. -/ instance instIntSMul [AddGroup G] : SMul ℤ (α →₀ G) := ⟨fun n v => v.mapRange (n • ·) (zsmul_zero _)⟩ instance instAddGroup [AddGroup G] : AddGroup (α →₀ G) := fast_instance% DFunLike.coe_injective.addGroup DFunLike.coe coe_zero coe_add coe_neg coe_sub (fun _ _ => rfl) fun _ _ => rfl instance instAddCommGroup [AddCommGroup G] : AddCommGroup (α →₀ G) := fast_instance% DFunLike.coe_injective.addCommGroup DFunLike.coe coe_zero coe_add coe_neg coe_sub (fun _ _ => rfl) fun _ _ => rfl @[simp] theorem support_neg [AddGroup G] (f : α →₀ G) : support (-f) = support f := Finset.Subset.antisymm support_mapRange (calc support f = support (- -f) := congr_arg support (neg_neg _).symm _ ⊆ support (-f) := support_mapRange ) theorem support_sub [DecidableEq α] [AddGroup G] {f g : α →₀ G} : support (f - g) ⊆ support f ∪ support g := by rw [sub_eq_add_neg, ← support_neg g] exact support_add end Finsupp		Mathlib/Data/Finsupp/Defs.lean	1,142	1,155
/- Copyright (c) 2023 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.FieldTheory.Minpoly.IsIntegrallyClosed import Mathlib.FieldTheory.PrimitiveElement import Mathlib.FieldTheory.IsAlgClosed.Basic /-! # Results about `minpoly R x / (X - C x)` ## Main definition - `minpolyDiv`: The polynomial `minpoly R x / (X - C x)`. We used the contents of this file to describe the dual basis of a powerbasis under the trace form. See `traceForm_dualBasis_powerBasis_eq`. ## Main results - `span_coeff_minpolyDiv`: The coefficients of `minpolyDiv` spans `R<x>`. -/ open Polynomial Module variable (R K) {L S} [CommRing R] [Field K] [Field L] [CommRing S] [Algebra R S] [Algebra K L] variable (x : S) /-- `minpolyDiv R x : S[X]` for `x : S` is the polynomial `minpoly R x / (X - C x)`. -/ noncomputable def minpolyDiv : S[X] := (minpoly R x).map (algebraMap R S) /ₘ (X - C x) lemma minpolyDiv_spec : minpolyDiv R x * (X - C x) = (minpoly R x).map (algebraMap R S) := by delta minpolyDiv rw [mul_comm, mul_divByMonic_eq_iff_isRoot, IsRoot, eval_map, ← aeval_def, minpoly.aeval] lemma coeff_minpolyDiv (i) : coeff (minpolyDiv R x) i = algebraMap R S (coeff (minpoly R x) (i + 1)) + coeff (minpolyDiv R x) (i + 1) * x := by rw [← coeff_map, ← minpolyDiv_spec R x]; simp [mul_sub] variable {R x} lemma minpolyDiv_eq_zero (hx : ¬IsIntegral R x) : minpolyDiv R x = 0 := by delta minpolyDiv minpoly rw [dif_neg hx, Polynomial.map_zero, zero_divByMonic] lemma eval_minpolyDiv_self : (minpolyDiv R x).eval x = aeval x (derivative <\| minpoly R x) := by rw [aeval_def, ← eval_map, ← derivative_map, ← minpolyDiv_spec R x]; simp lemma minpolyDiv_eval_eq_zero_of_ne_of_aeval_eq_zero [IsDomain S] {y} (hxy : y ≠ x) (hy : aeval y (minpoly R x) = 0) : (minpolyDiv R x).eval y = 0 := by rw [aeval_def, ← eval_map, ← minpolyDiv_spec R x] at hy simp only [eval_mul, eval_sub, eval_X, eval_C, mul_eq_zero] at hy exact hy.resolve_right (by rwa [sub_eq_zero]) lemma eval₂_minpolyDiv_of_eval₂_eq_zero {T} [CommRing T] [IsDomain T] [DecidableEq T] {x y} (σ : S →+* T) (hy : eval₂ (σ.comp (algebraMap R S)) y (minpoly R x) = 0) : eval₂ σ y (minpolyDiv R x) = if σ x = y then σ (aeval x (derivative <\| minpoly R x)) else 0 := by split_ifs with h · rw [← h, eval₂_hom, eval_minpolyDiv_self] · rw [← eval₂_map, ← minpolyDiv_spec] at hy simpa [sub_eq_zero, Ne.symm h] using hy lemma eval₂_minpolyDiv_self {T} [CommRing T] [Algebra R T] [IsDomain T] [DecidableEq T] (x : S) (σ₁ σ₂ : S →ₐ[R] T) : eval₂ σ₁ (σ₂ x) (minpolyDiv R x) = if σ₁ x = σ₂ x then σ₁ (aeval x (derivative <\| minpoly R x)) else 0 := by apply eval₂_minpolyDiv_of_eval₂_eq_zero rw [AlgHom.comp_algebraMap, ← σ₂.comp_algebraMap, ← eval₂_map, ← RingHom.coe_coe, eval₂_hom, eval_map, ← aeval_def, minpoly.aeval, map_zero] lemma eval_minpolyDiv_of_aeval_eq_zero [IsDomain S] [DecidableEq S] {y} (hy : aeval y (minpoly R x) = 0) : (minpolyDiv R x).eval y = if x = y then aeval x (derivative <\| minpoly R x) else 0 := by rw [eval, eval₂_minpolyDiv_of_eval₂_eq_zero, RingHom.id_apply, RingHom.id_apply] simpa [aeval_def] using hy lemma coeff_minpolyDiv_mem_adjoin (x : S) (i) : coeff (minpolyDiv R x) i ∈ Algebra.adjoin R {x} := by by_contra H have : ∀ j, coeff (minpolyDiv R x) (i + j) ∉ Algebra.adjoin R {x} := by intro j; induction j with \| zero => exact H \| succ j IH => intro H; apply IH rw [coeff_minpolyDiv] refine add_mem ?_ (mul_mem H (Algebra.self_mem_adjoin_singleton R x)) exact Subalgebra.algebraMap_mem _ _ apply this (natDegree (minpolyDiv R x) + 1) rw [coeff_eq_zero_of_natDegree_lt] · exact zero_mem _ · refine (Nat.le_add_left _ i).trans_lt ?_ rw [← add_assoc] exact Nat.lt_succ_self _ section IsIntegral variable (hx : IsIntegral R x) include hx lemma minpolyDiv_ne_zero [Nontrivial S] : minpolyDiv R x ≠ 0 := by intro e have := minpolyDiv_spec R x rw [e, zero_mul] at this exact ((minpoly.monic hx).map (algebraMap R S)).ne_zero this.symm lemma minpolyDiv_monic : Monic (minpolyDiv R x) := by nontriviality S	have := congr_arg leadingCoeff (minpolyDiv_spec R x) rw [leadingCoeff_mul', ((minpoly.monic hx).map (algebraMap R S)).leadingCoeff] at this · simpa using this · simpa using minpolyDiv_ne_zero hx lemma natDegree_minpolyDiv_succ [Nontrivial S] : natDegree (minpolyDiv R x) + 1 = natDegree (minpoly R x) := by rw [← (minpoly.monic hx).natDegree_map (algebraMap R S), ← minpolyDiv_spec, natDegree_mul'] · simp · simpa using minpolyDiv_ne_zero hx lemma natDegree_minpolyDiv_lt [Nontrivial S] : natDegree (minpolyDiv R x) < natDegree (minpoly R x) := by rw [← natDegree_minpolyDiv_succ hx] exact Nat.lt_succ_self _ lemma minpolyDiv_eq_of_isIntegrallyClosed [IsDomain R] [IsIntegrallyClosed R] [IsDomain S]	Mathlib/FieldTheory/Minpoly/MinpolyDiv.lean	110	126
/- 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 /-! ## Lemmas about factorizations of primes and prime powers -/ /-- The multiplicity of prime `p` in `p` is `1` -/ @[simp] theorem Prime.factorization_self {p : ℕ} (hp : Prime p) : p.factorization p = 1 := by simp [hp] /-- If the factorization of `n` contains just one number `p` then `n` is a power of `p` -/ theorem eq_pow_of_factorization_eq_single {n p k : ℕ} (hn : n ≠ 0) (h : n.factorization = Finsupp.single p k) : n = p ^ k := by rw [← Nat.factorization_prod_pow_eq_self hn, h] simp /-- The only prime factor of prime `p` is `p` itself. -/ theorem Prime.eq_of_factorization_pos {p q : ℕ} (hp : Prime p) (h : p.factorization q ≠ 0) : p = q := by simpa [hp.factorization, single_apply] using h /-! ### Equivalence between `ℕ+` and `ℕ →₀ ℕ` with support in the primes. -/ theorem eq_factorization_iff {n : ℕ} {f : ℕ →₀ ℕ} (hn : n ≠ 0) (hf : ∀ p ∈ f.support, Prime p) : f = n.factorization ↔ f.prod (· ^ ·) = n := ⟨fun h => by rw [h, factorization_prod_pow_eq_self hn], fun h => by rw [← h, prod_pow_factorization_eq_self hf]⟩ theorem factorizationEquiv_inv_apply {f : ℕ →₀ ℕ} (hf : ∀ p ∈ f.support, Prime p) : (factorizationEquiv.symm ⟨f, hf⟩).1 = f.prod (· ^ ·) := rfl @[simp] theorem ordProj_of_not_prime (n p : ℕ) (hp : ¬p.Prime) : ordProj[p] n = 1 := by simp [factorization_eq_zero_of_non_prime n hp] @[deprecated (since := "2024-10-24")] alias ord_proj_of_not_prime := ordProj_of_not_prime @[simp] theorem ordCompl_of_not_prime (n p : ℕ) (hp : ¬p.Prime) : ordCompl[p] n = n := by simp [factorization_eq_zero_of_non_prime n hp] @[deprecated (since := "2024-10-24")] alias ord_compl_of_not_prime := ordCompl_of_not_prime theorem ordCompl_dvd (n p : ℕ) : ordCompl[p] n ∣ n := div_dvd_of_dvd (ordProj_dvd n p) @[deprecated (since := "2024-10-24")] alias ord_compl_dvd := ordCompl_dvd theorem ordProj_pos (n p : ℕ) : 0 < ordProj[p] n := by if pp : p.Prime then simp [pow_pos pp.pos] else simp [pp] @[deprecated (since := "2024-10-24")] alias ord_proj_pos := ordProj_pos theorem ordProj_le {n : ℕ} (p : ℕ) (hn : n ≠ 0) : ordProj[p] n ≤ n := le_of_dvd hn.bot_lt (Nat.ordProj_dvd n p) @[deprecated (since := "2024-10-24")] alias ord_proj_le := ordProj_le theorem ordCompl_pos {n : ℕ} (p : ℕ) (hn : n ≠ 0) : 0 < ordCompl[p] n := by if pp : p.Prime then exact Nat.div_pos (ordProj_le p hn) (ordProj_pos n p) else simpa [Nat.factorization_eq_zero_of_non_prime n pp] using hn.bot_lt @[deprecated (since := "2024-10-24")] alias ord_compl_pos := ordCompl_pos theorem ordCompl_le (n p : ℕ) : ordCompl[p] n ≤ n := Nat.div_le_self _ _ @[deprecated (since := "2024-10-24")] alias ord_compl_le := ordCompl_le theorem ordProj_mul_ordCompl_eq_self (n p : ℕ) : ordProj[p] n * ordCompl[p] n = n := Nat.mul_div_cancel' (ordProj_dvd n p) @[deprecated (since := "2024-10-24")] alias ord_proj_mul_ord_compl_eq_self := ordProj_mul_ordCompl_eq_self theorem ordProj_mul {a b : ℕ} (p : ℕ) (ha : a ≠ 0) (hb : b ≠ 0) : ordProj[p] (a * b) = ordProj[p] a * ordProj[p] b := by simp [factorization_mul ha hb, pow_add] @[deprecated (since := "2024-10-24")] alias ord_proj_mul := ordProj_mul theorem ordCompl_mul (a b p : ℕ) : ordCompl[p] (a * b) = ordCompl[p] a * ordCompl[p] b := by if ha : a = 0 then simp [ha] else if hb : b = 0 then simp [hb] else simp only [ordProj_mul p ha hb] rw [div_mul_div_comm (ordProj_dvd a p) (ordProj_dvd b p)] @[deprecated (since := "2024-10-24")] alias ord_compl_mul := ordCompl_mul /-! ### Factorization and divisibility -/ /-- A crude upper bound on `n.factorization p` -/ theorem factorization_lt {n : ℕ} (p : ℕ) (hn : n ≠ 0) : n.factorization p < n := by by_cases pp : p.Prime · exact (Nat.pow_lt_pow_iff_right pp.one_lt).1 <\| (ordProj_le p hn).trans_lt <\| Nat.lt_pow_self pp.one_lt · simpa only [factorization_eq_zero_of_non_prime n pp] using hn.bot_lt /-- An upper bound on `n.factorization p` -/ theorem factorization_le_of_le_pow {n p b : ℕ} (hb : n ≤ p ^ b) : n.factorization p ≤ b := by if hn : n = 0 then simp [hn] else if pp : p.Prime then exact (Nat.pow_le_pow_iff_right pp.one_lt).1 ((ordProj_le p hn).trans hb) else simp [factorization_eq_zero_of_non_prime n pp] theorem factorization_prime_le_iff_dvd {d n : ℕ} (hd : d ≠ 0) (hn : n ≠ 0) : (∀ p : ℕ, p.Prime → d.factorization p ≤ n.factorization p) ↔ d ∣ n := by rw [← factorization_le_iff_dvd hd hn] refine ⟨fun h p => (em p.Prime).elim (h p) fun hp => ?_, fun h p _ => h p⟩ simp_rw [factorization_eq_zero_of_non_prime _ hp] rfl theorem factorization_le_factorization_mul_left {a b : ℕ} (hb : b ≠ 0) : a.factorization ≤ (a * b).factorization := by rcases eq_or_ne a 0 with (rfl \| ha) · simp rw [factorization_le_iff_dvd ha <\| mul_ne_zero ha hb] exact Dvd.intro b rfl theorem factorization_le_factorization_mul_right {a b : ℕ} (ha : a ≠ 0) : b.factorization ≤ (a * b).factorization := by rw [mul_comm] apply factorization_le_factorization_mul_left ha theorem Prime.pow_dvd_iff_le_factorization {p k n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ^ k ∣ n ↔ k ≤ n.factorization p := by rw [← factorization_le_iff_dvd (pow_pos pp.pos k).ne' hn, pp.factorization_pow, single_le_iff] theorem Prime.pow_dvd_iff_dvd_ordProj {p k n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ^ k ∣ n ↔ p ^ k ∣ ordProj[p] n := by rw [pow_dvd_pow_iff_le_right pp.one_lt, pp.pow_dvd_iff_le_factorization hn] @[deprecated (since := "2024-10-24")] alias Prime.pow_dvd_iff_dvd_ord_proj := Prime.pow_dvd_iff_dvd_ordProj theorem Prime.dvd_iff_one_le_factorization {p n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ∣ n ↔ 1 ≤ n.factorization p := Iff.trans (by simp) (pp.pow_dvd_iff_le_factorization hn) theorem exists_factorization_lt_of_lt {a b : ℕ} (ha : a ≠ 0) (hab : a < b) : ∃ p : ℕ, a.factorization p < b.factorization p := by have hb : b ≠ 0 := (ha.bot_lt.trans hab).ne' contrapose! hab rw [← Finsupp.le_def, factorization_le_iff_dvd hb ha] at hab exact le_of_dvd ha.bot_lt hab @[simp] theorem factorization_div {d n : ℕ} (h : d ∣ n) : (n / d).factorization = n.factorization - d.factorization := by rcases eq_or_ne d 0 with (rfl \| hd); · simp [zero_dvd_iff.mp h] rcases eq_or_ne n 0 with (rfl \| hn); · simp [tsub_eq_zero_of_le] apply add_left_injective d.factorization simp only rw [tsub_add_cancel_of_le <\| (Nat.factorization_le_iff_dvd hd hn).mpr h, ← Nat.factorization_mul (Nat.div_pos (Nat.le_of_dvd hn.bot_lt h) hd.bot_lt).ne' hd, Nat.div_mul_cancel h] theorem dvd_ordProj_of_dvd {n p : ℕ} (hn : n ≠ 0) (pp : p.Prime) (h : p ∣ n) : p ∣ ordProj[p] n := dvd_pow_self p (Prime.factorization_pos_of_dvd pp hn h).ne' @[deprecated (since := "2024-10-24")] alias dvd_ord_proj_of_dvd := dvd_ordProj_of_dvd theorem not_dvd_ordCompl {n p : ℕ} (hp : Prime p) (hn : n ≠ 0) : ¬p ∣ ordCompl[p] n := by rw [Nat.Prime.dvd_iff_one_le_factorization hp (ordCompl_pos p hn).ne'] rw [Nat.factorization_div (Nat.ordProj_dvd n p)] simp [hp.factorization] @[deprecated (since := "2024-10-24")] alias not_dvd_ord_compl := not_dvd_ordCompl theorem coprime_ordCompl {n p : ℕ} (hp : Prime p) (hn : n ≠ 0) : Coprime p (ordCompl[p] n) := (or_iff_left (not_dvd_ordCompl hp hn)).mp <\| coprime_or_dvd_of_prime hp _ @[deprecated (since := "2024-10-24")] alias coprime_ord_compl := coprime_ordCompl theorem factorization_ordCompl (n p : ℕ) : (ordCompl[p] n).factorization = n.factorization.erase p := by if hn : n = 0 then simp [hn] else if pp : p.Prime then ?_ else simp [pp] ext q rcases eq_or_ne q p with (rfl \| hqp) · simp only [Finsupp.erase_same, factorization_eq_zero_iff, not_dvd_ordCompl pp hn] simp · rw [Finsupp.erase_ne hqp, factorization_div (ordProj_dvd n p)] simp [pp.factorization, hqp.symm] @[deprecated (since := "2024-10-24")] alias factorization_ord_compl := factorization_ordCompl -- `ordCompl[p] n` is the largest divisor of `n` not divisible by `p`. theorem dvd_ordCompl_of_dvd_not_dvd {p d n : ℕ} (hdn : d ∣ n) (hpd : ¬p ∣ d) : d ∣ ordCompl[p] n := by if hn0 : n = 0 then simp [hn0] else if hd0 : d = 0 then simp [hd0] at hpd else rw [← factorization_le_iff_dvd hd0 (ordCompl_pos p hn0).ne', factorization_ordCompl] intro q if hqp : q = p then simp [factorization_eq_zero_iff, hqp, hpd] else simp [hqp, (factorization_le_iff_dvd hd0 hn0).2 hdn q] @[deprecated (since := "2024-10-24")] alias dvd_ord_compl_of_dvd_not_dvd := dvd_ordCompl_of_dvd_not_dvd /-- If `n` is a nonzero natural number and `p ≠ 1`, then there are natural numbers `e` and `n'` such that `n'` is not divisible by `p` and `n = p^e * n'`. -/ theorem exists_eq_pow_mul_and_not_dvd {n : ℕ} (hn : n ≠ 0) (p : ℕ) (hp : p ≠ 1) : ∃ e n' : ℕ, ¬p ∣ n' ∧ n = p ^ e * n' := let ⟨a', h₁, h₂⟩ := (Nat.finiteMultiplicity_iff.mpr ⟨hp, Nat.pos_of_ne_zero hn⟩).exists_eq_pow_mul_and_not_dvd ⟨_, a', h₂, h₁⟩ /-- Any nonzero natural number is the product of an odd part `m` and a power of two `2 ^ k`. -/ theorem exists_eq_two_pow_mul_odd {n : ℕ} (hn : n ≠ 0) : ∃ k m : ℕ, Odd m ∧ n = 2 ^ k * m := let ⟨k, m, hm, hn⟩ := exists_eq_pow_mul_and_not_dvd hn 2 (succ_ne_self 1) ⟨k, m, not_even_iff_odd.1 (mt Even.two_dvd hm), hn⟩ theorem dvd_iff_div_factorization_eq_tsub {d n : ℕ} (hd : d ≠ 0) (hdn : d ≤ n) : d ∣ n ↔ (n / d).factorization = n.factorization - d.factorization := by refine ⟨factorization_div, ?_⟩ rcases eq_or_lt_of_le hdn with (rfl \| hd_lt_n); · simp have h1 : n / d ≠ 0 := by simp [] intro h rw [dvd_iff_le_div_mul n d] by_contra h2 obtain ⟨p, hp⟩ := exists_factorization_lt_of_lt (mul_ne_zero h1 hd) (not_le.mp h2) rwa [factorization_mul h1 hd, add_apply, ← lt_tsub_iff_right, h, tsub_apply, lt_self_iff_false] at hp theorem ordProj_dvd_ordProj_of_dvd {a b : ℕ} (hb0 : b ≠ 0) (hab : a ∣ b) (p : ℕ) : ordProj[p] a ∣ ordProj[p] b := by rcases em' p.Prime with (pp \| pp); · simp [pp] rcases eq_or_ne a 0 with (rfl \| ha0); · simp rw [pow_dvd_pow_iff_le_right pp.one_lt] exact (factorization_le_iff_dvd ha0 hb0).2 hab p @[deprecated (since := "2024-10-24")] alias ord_proj_dvd_ord_proj_of_dvd := ordProj_dvd_ordProj_of_dvd theorem ordProj_dvd_ordProj_iff_dvd {a b : ℕ} (ha0 : a ≠ 0) (hb0 : b ≠ 0) : (∀ p : ℕ, ordProj[p] a ∣ ordProj[p] b) ↔ a ∣ b := by refine ⟨fun h => ?_, fun hab p => ordProj_dvd_ordProj_of_dvd hb0 hab p⟩ rw [← factorization_le_iff_dvd ha0 hb0] intro q rcases le_or_lt q 1 with (hq_le \| hq1) · interval_cases q <;> simp exact (pow_dvd_pow_iff_le_right hq1).1 (h q) @[deprecated (since := "2024-10-24")] alias ord_proj_dvd_ord_proj_iff_dvd := ordProj_dvd_ordProj_iff_dvd theorem ordCompl_dvd_ordCompl_of_dvd {a b : ℕ} (hab : a ∣ b) (p : ℕ) : ordCompl[p] a ∣ ordCompl[p] b := by rcases em' p.Prime with (pp \| pp) · simp [pp, hab] rcases eq_or_ne b 0 with (rfl \| hb0) · simp rcases eq_or_ne a 0 with (rfl \| ha0) · cases hb0 (zero_dvd_iff.1 hab) have ha := (Nat.div_pos (ordProj_le p ha0) (ordProj_pos a p)).ne' have hb := (Nat.div_pos (ordProj_le p hb0) (ordProj_pos b p)).ne' rw [← factorization_le_iff_dvd ha hb, factorization_ordCompl a p, factorization_ordCompl b p] intro q rcases eq_or_ne q p with (rfl \| hqp) · simp simp_rw [erase_ne hqp] exact (factorization_le_iff_dvd ha0 hb0).2 hab q @[deprecated (since := "2024-10-24")] alias ord_compl_dvd_ord_compl_of_dvd := ordCompl_dvd_ordCompl_of_dvd theorem ordCompl_dvd_ordCompl_iff_dvd (a b : ℕ) : (∀ p : ℕ, ordCompl[p] a ∣ ordCompl[p] b) ↔ a ∣ b := by refine ⟨fun h => ?_, fun hab p => ordCompl_dvd_ordCompl_of_dvd hab p⟩ rcases eq_or_ne b 0 with (rfl \| hb0) · simp if pa : a.Prime then ?_ else simpa [pa] using h a if pb : b.Prime then ?_ else simpa [pb] using h b rw [prime_dvd_prime_iff_eq pa pb] by_contra hab apply pa.ne_one rw [← Nat.dvd_one, ← Nat.mul_dvd_mul_iff_left hb0.bot_lt, mul_one] simpa [Prime.factorization_self pb, Prime.factorization pa, hab] using h b @[deprecated (since := "2024-10-24")] alias ord_compl_dvd_ord_compl_iff_dvd := ordCompl_dvd_ordCompl_iff_dvd theorem dvd_iff_prime_pow_dvd_dvd (n d : ℕ) : d ∣ n ↔ ∀ p k : ℕ, Prime p → p ^ k ∣ d → p ^ k ∣ n := by rcases eq_or_ne n 0 with (rfl \| hn) · simp rcases eq_or_ne d 0 with (rfl \| hd) · simp only [zero_dvd_iff, hn, false_iff, not_forall] exact ⟨2, n, prime_two, dvd_zero _, mt (le_of_dvd hn.bot_lt) (n.lt_two_pow_self).not_le⟩ refine ⟨fun h p k _ hpkd => dvd_trans hpkd h, ?_⟩ rw [← factorization_prime_le_iff_dvd hd hn] intro h p pp simp_rw [← pp.pow_dvd_iff_le_factorization hn] exact h p _ pp (ordProj_dvd _ _) theorem prod_primeFactors_dvd (n : ℕ) : ∏ p ∈ n.primeFactors, p ∣ n := by by_cases hn : n = 0 · subst hn simp · simpa [prod_primeFactorsList hn] using (n.primeFactorsList : Multiset ℕ).toFinset_prod_dvd_prod theorem factorization_gcd {a b : ℕ} (ha_pos : a ≠ 0) (hb_pos : b ≠ 0) : (gcd a b).factorization = a.factorization ⊓ b.factorization := by let dfac := a.factorization ⊓ b.factorization let d := dfac.prod (· ^ ·) have dfac_prime : ∀ p : ℕ, p ∈ dfac.support → Prime p := by intro p hp have : p ∈ a.primeFactorsList ∧ p ∈ b.primeFactorsList := by simpa [dfac] using hp exact prime_of_mem_primeFactorsList this.1 have h1 : d.factorization = dfac := prod_pow_factorization_eq_self dfac_prime have hd_pos : d ≠ 0 := (factorizationEquiv.invFun ⟨dfac, dfac_prime⟩).2.ne' suffices d = gcd a b by rwa [← this] apply gcd_greatest · rw [← factorization_le_iff_dvd hd_pos ha_pos, h1] exact inf_le_left · rw [← factorization_le_iff_dvd hd_pos hb_pos, h1] exact inf_le_right · intro e hea heb rcases Decidable.eq_or_ne e 0 with (rfl \| he_pos) · simp only [zero_dvd_iff] at hea contradiction have hea' := (factorization_le_iff_dvd he_pos ha_pos).mpr hea have heb' := (factorization_le_iff_dvd he_pos hb_pos).mpr heb simp [dfac, ← factorization_le_iff_dvd he_pos hd_pos, h1, hea', heb'] theorem factorization_lcm {a b : ℕ} (ha : a ≠ 0) (hb : b ≠ 0) : (a.lcm b).factorization = a.factorization ⊔ b.factorization := by rw [← add_right_inj (a.gcd b).factorization, ← factorization_mul (mt gcd_eq_zero_iff.1 fun h => ha h.1) (lcm_ne_zero ha hb), gcd_mul_lcm, factorization_gcd ha hb, factorization_mul ha hb] ext1 exact (min_add_max _ _).symm variable (a b) @[simp] lemma factorizationLCMLeft_zero_left : factorizationLCMLeft 0 b = 1 := by simp [factorizationLCMLeft] @[simp] lemma factorizationLCMLeft_zero_right : factorizationLCMLeft a 0 = 1 := by simp [factorizationLCMLeft] @[simp] lemma factorizationLCRight_zero_left : factorizationLCMRight 0 b = 1 := by simp [factorizationLCMRight] @[simp] lemma factorizationLCMRight_zero_right : factorizationLCMRight a 0 = 1 := by simp [factorizationLCMRight] lemma factorizationLCMLeft_pos : 0 < factorizationLCMLeft a b := by apply Nat.pos_of_ne_zero rw [factorizationLCMLeft, Finsupp.prod_ne_zero_iff] intro p _ H by_cases h : b.factorization p ≤ a.factorization p · simp only [h, reduceIte, pow_eq_zero_iff', ne_eq] at H simpa [H.1] using H.2 · simp only [h, reduceIte, one_ne_zero] at H lemma factorizationLCMRight_pos : 0 < factorizationLCMRight a b := by apply Nat.pos_of_ne_zero rw [factorizationLCMRight, Finsupp.prod_ne_zero_iff] intro p _ H by_cases h : b.factorization p ≤ a.factorization p · simp only [h, reduceIte, pow_eq_zero_iff', ne_eq, reduceCtorEq] at H · simp only [h, ↓reduceIte, pow_eq_zero_iff', ne_eq] at H simpa [H.1] using H.2 lemma coprime_factorizationLCMLeft_factorizationLCMRight : (factorizationLCMLeft a b).Coprime (factorizationLCMRight a b) := by rw [factorizationLCMLeft, factorizationLCMRight] refine coprime_prod_left_iff.mpr fun p hp ↦ coprime_prod_right_iff.mpr fun q hq ↦ ?_ dsimp only; split_ifs with h h' any_goals simp only [coprime_one_right_eq_true, coprime_one_left_eq_true] refine coprime_pow_primes _ _ (prime_of_mem_primeFactors hp) (prime_of_mem_primeFactors hq) ?_ contrapose! h'; rwa [← h'] variable {a b} lemma factorizationLCMLeft_mul_factorizationLCMRight (ha : a ≠ 0) (hb : b ≠ 0) : (factorizationLCMLeft a b) (factorizationLCMRight a b) = lcm a b := by rw [← factorization_prod_pow_eq_self (lcm_ne_zero ha hb), factorizationLCMLeft, factorizationLCMRight, ← prod_mul] congr; ext p n; split_ifs <;> simp variable (a b) lemma factorizationLCMLeft_dvd_left : factorizationLCMLeft a b ∣ a := by rcases eq_or_ne a 0 with rfl \| ha · simp only [dvd_zero] rcases eq_or_ne b 0 with rfl \| hb · simp [factorizationLCMLeft] nth_rewrite 2 [← factorization_prod_pow_eq_self ha] rw [prod_of_support_subset (s := (lcm a b).factorization.support)] · apply prod_dvd_prod_of_dvd; rintro p -; dsimp only; split_ifs with le · rw [factorization_lcm ha hb]; apply pow_dvd_pow; exact sup_le le_rfl le · apply one_dvd · intro p hp; rw [mem_support_iff] at hp ⊢ rw [factorization_lcm ha hb]; exact (lt_sup_iff.mpr <\| .inl <\| Nat.pos_of_ne_zero hp).ne' · intros; rw [pow_zero] lemma factorizationLCMRight_dvd_right : factorizationLCMRight a b ∣ b := by rcases eq_or_ne a 0 with rfl \| ha · simp [factorizationLCMRight] rcases eq_or_ne b 0 with rfl \| hb · simp only [dvd_zero] nth_rewrite 2 [← factorization_prod_pow_eq_self hb] rw [prod_of_support_subset (s := (lcm a b).factorization.support)] · apply Finset.prod_dvd_prod_of_dvd; rintro p -; dsimp only; split_ifs with le · apply one_dvd · rw [factorization_lcm ha hb]; apply pow_dvd_pow; exact sup_le (not_le.1 le).le le_rfl · intro p hp; rw [mem_support_iff] at hp ⊢ rw [factorization_lcm ha hb]; exact (lt_sup_iff.mpr <\| .inr <\| Nat.pos_of_ne_zero hp).ne' · intros; rw [pow_zero] @[to_additive sum_primeFactors_gcd_add_sum_primeFactors_mul] theorem prod_primeFactors_gcd_mul_prod_primeFactors_mul {β : Type} [CommMonoid β] (m n : ℕ) (f : ℕ → β) : (m.gcd n).primeFactors.prod f (m * n).primeFactors.prod f = m.primeFactors.prod f * n.primeFactors.prod f := by obtain rfl \| hm₀ := eq_or_ne m 0 · simp obtain rfl \| hn₀ := eq_or_ne n 0 · simp · rw [primeFactors_mul hm₀ hn₀, primeFactors_gcd hm₀ hn₀, mul_comm, Finset.prod_union_inter] theorem setOf_pow_dvd_eq_Icc_factorization {n p : ℕ} (pp : p.Prime) (hn : n ≠ 0) : { i : ℕ \| i ≠ 0 ∧ p ^ i ∣ n } = Set.Icc 1 (n.factorization p) := by ext simp [Nat.lt_succ_iff, one_le_iff_ne_zero, pp.pow_dvd_iff_le_factorization hn] /-- The set of positive powers of prime `p` that divide `n` is exactly the set of positive natural numbers up to `n.factorization p`. -/ theorem Icc_factorization_eq_pow_dvd (n : ℕ) {p : ℕ} (pp : Prime p) : Icc 1 (n.factorization p) = {i ∈ Ico 1 n \| p ^ i ∣ n} := by rcases eq_or_ne n 0 with (rfl \| hn) · simp ext x simp only [mem_Icc, Finset.mem_filter, mem_Ico, and_assoc, and_congr_right_iff, pp.pow_dvd_iff_le_factorization hn, iff_and_self] exact fun _ H => lt_of_le_of_lt H (factorization_lt p hn) theorem factorization_eq_card_pow_dvd (n : ℕ) {p : ℕ} (pp : p.Prime) : n.factorization p = #{i ∈ Ico 1 n \| p ^ i ∣ n} := by simp [← Icc_factorization_eq_pow_dvd n pp] theorem Ico_filter_pow_dvd_eq {n p b : ℕ} (pp : p.Prime) (hn : n ≠ 0) (hb : n ≤ p ^ b) : {i ∈ Ico 1 n \| p ^ i ∣ n} = {i ∈ Icc 1 b \| p ^ i ∣ n} := by ext x simp only [Finset.mem_filter, mem_Ico, mem_Icc, and_congr_left_iff, and_congr_right_iff] rintro h1 - exact iff_of_true (lt_of_pow_dvd_right hn pp.two_le h1) <\| (Nat.pow_le_pow_iff_right pp.one_lt).1 <\| (le_of_dvd hn.bot_lt h1).trans hb /-! ### Factorization and coprimes -/ /-- If `p` is a prime factor of `a` then the power of `p` in `a` is the same that in `a * b`, for any `b` coprime to `a`. -/ theorem factorization_eq_of_coprime_left {p a b : ℕ} (hab : Coprime a b) (hpa : p ∈ a.primeFactorsList) : (a * b).factorization p = a.factorization p := by rw [factorization_mul_apply_of_coprime hab, ← primeFactorsList_count_eq, ← primeFactorsList_count_eq, count_eq_zero_of_not_mem (coprime_primeFactorsList_disjoint hab hpa), add_zero] /-- If `p` is a prime factor of `b` then the power of `p` in `b` is the same that in `a * b`, for any `a` coprime to `b`. -/ theorem factorization_eq_of_coprime_right {p a b : ℕ} (hab : Coprime a b) (hpb : p ∈ b.primeFactorsList) : (a * b).factorization p = b.factorization p := by rw [mul_comm] exact factorization_eq_of_coprime_left (coprime_comm.mp hab) hpb /-- Two positive naturals are equal if their prime padic valuations are equal -/ theorem eq_iff_prime_padicValNat_eq (a b : ℕ) (ha : a ≠ 0) (hb : b ≠ 0) : a = b ↔ ∀ p : ℕ, p.Prime → padicValNat p a = padicValNat p b := by constructor · rintro rfl simp · intro h refine eq_of_factorization_eq ha hb fun p => ?_ by_cases pp : p.Prime · simp [factorization_def, pp, h p pp] · simp [factorization_eq_zero_of_non_prime, pp] theorem prod_pow_prime_padicValNat (n : Nat) (hn : n ≠ 0) (m : Nat) (pr : n < m) : ∏ p ∈ range m with p.Prime, p ^ padicValNat p n = n := by nth_rw 2 [← factorization_prod_pow_eq_self hn] rw [eq_comm] apply Finset.prod_subset_one_on_sdiff · exact fun p hp => Finset.mem_filter.mpr ⟨Finset.mem_range.2 <\| pr.trans_le' <\| le_of_mem_primeFactors hp, prime_of_mem_primeFactors hp⟩ · intro p hp obtain ⟨hp1, hp2⟩ := Finset.mem_sdiff.mp hp rw [← factorization_def n (Finset.mem_filter.mp hp1).2] simp [Finsupp.not_mem_support_iff.mp hp2] · intro p hp simp [factorization_def n (prime_of_mem_primeFactors hp)] /-! ### Lemmas about factorizations of particular functions -/ -- TODO: Port lemmas from `Data/Nat/Multiplicity` to here, re-written in terms of `factorization` /-- Exactly `n / p` naturals in `[1, n]` are multiples of `p`. See `Nat.card_multiples'` for an alternative spelling of the statement. -/ theorem card_multiples (n p : ℕ) : #{e ∈ range n \| p ∣ e + 1} = n / p := by induction' n with n hn · simp simp [Nat.succ_div, add_ite, add_zero, Finset.range_succ, filter_insert, apply_ite card, card_insert_of_not_mem, hn] /-- Exactly `n / p` naturals in `(0, n]` are multiples of `p`. -/ theorem Ioc_filter_dvd_card_eq_div (n p : ℕ) : #{x ∈ Ioc 0 n \| p ∣ x} = n / p := by induction' n with n IH · simp -- TODO: Golf away `h1` after Yaël PRs a lemma asserting this have h1 : Ioc 0 n.succ = insert n.succ (Ioc 0 n) := by rcases n.eq_zero_or_pos with (rfl \| hn) · simp simp_rw [← Ico_succ_succ, Ico_insert_right (succ_le_succ hn.le), Ico_succ_right] simp [Nat.succ_div, add_ite, add_zero, h1, filter_insert, apply_ite card, card_insert_eq_ite, IH, Finset.mem_filter, mem_Ioc, not_le.2 (lt_add_one n)] /-- There are exactly `⌊N/n⌋` positive multiples of `n` that are `≤ N`. See `Nat.card_multiples` for a "shifted-by-one" version. -/ lemma card_multiples' (N n : ℕ) : #{k ∈ range N.succ \| k ≠ 0 ∧ n ∣ k} = N / n := by induction N with \| zero => simp [Finset.filter_false_of_mem] \| succ N ih => rw [Finset.range_succ, Finset.filter_insert] by_cases h : n ∣ N.succ · simp [h, succ_div_of_dvd, ih] · simp [h, succ_div_of_not_dvd, ih] end Nat		Mathlib/Data/Nat/Factorization/Basic.lean	829	832
/- Copyright (c) 2024 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne -/ import Mathlib.Probability.Kernel.Disintegration.Density import Mathlib.Probability.Kernel.WithDensity /-! # Radon-Nikodym derivative and Lebesgue decomposition for kernels Let `α` and `γ` be two measurable space, where either `α` is countable or `γ` is countably generated. Let `κ, η : Kernel α γ` be finite kernels. Then there exists a function `Kernel.rnDeriv κ η : α → γ → ℝ≥0∞` jointly measurable on `α × γ` and a kernel `Kernel.singularPart κ η : Kernel α γ` such that * `κ = Kernel.withDensity η (Kernel.rnDeriv κ η) + Kernel.singularPart κ η`, * for all `a : α`, `Kernel.singularPart κ η a ⟂ₘ η a`, * for all `a : α`, `Kernel.singularPart κ η a = 0 ↔ κ a ≪ η a`, * for all `a : α`, `Kernel.withDensity η (Kernel.rnDeriv κ η) a = 0 ↔ κ a ⟂ₘ η a`. Furthermore, the sets `{a \| κ a ≪ η a}` and `{a \| κ a ⟂ₘ η a}` are measurable. When `γ` is countably generated, the construction of the derivative starts from `Kernel.density`: for two finite kernels `κ' : Kernel α (γ × β)` and `η' : Kernel α γ` with `fst κ' ≤ η'`, the function `density κ' η' : α → γ → Set β → ℝ` is jointly measurable in the first two arguments and satisfies that for all `a : α` and all measurable sets `s : Set β` and `A : Set γ`, `∫ x in A, density κ' η' a x s ∂(η' a) = (κ' a (A ×ˢ s)).toReal`. We use that definition for `β = Unit` and `κ' = map κ (fun a ↦ (a, ()))`. We can't choose `η' = η` in general because we might not have `κ ≤ η`, but if we could, we would get a measurable function `f` with the property `κ = withDensity η f`, which is the decomposition we want for `κ ≤ η`. To circumvent that difficulty, we take `η' = κ + η` and thus define `rnDerivAux κ η`. Finally, `rnDeriv κ η a x` is given by `ENNReal.ofReal (rnDerivAux κ (κ + η) a x) / ENNReal.ofReal (1 - rnDerivAux κ (κ + η) a x)`. Up to some conversions between `ℝ` and `ℝ≥0`, the singular part is `withDensity (κ + η) (rnDerivAux κ (κ + η) - (1 - rnDerivAux κ (κ + η)) * rnDeriv κ η)`. The countably generated measurable space assumption is not needed to have a decomposition for measures, but the additional difficulty with kernels is to obtain joint measurability of the derivative. This is why we can't simply define `rnDeriv κ η` by `a ↦ (κ a).rnDeriv (ν a)` everywhere unless `α` is countable (although `rnDeriv κ η` has that value almost everywhere). See the construction of `Kernel.density` for details on how the countably generated hypothesis is used. ## Main definitions * `ProbabilityTheory.Kernel.rnDeriv`: a function `α → γ → ℝ≥0∞` jointly measurable on `α × γ` * `ProbabilityTheory.Kernel.singularPart`: a `Kernel α γ` ## Main statements * `ProbabilityTheory.Kernel.mutuallySingular_singularPart`: for all `a : α`, `Kernel.singularPart κ η a ⟂ₘ η a` * `ProbabilityTheory.Kernel.rnDeriv_add_singularPart`: `Kernel.withDensity η (Kernel.rnDeriv κ η) + Kernel.singularPart κ η = κ` * `ProbabilityTheory.Kernel.measurableSet_absolutelyContinuous` : the set `{a \| κ a ≪ η a}` is Measurable * `ProbabilityTheory.Kernel.measurableSet_mutuallySingular` : the set `{a \| κ a ⟂ₘ η a}` is Measurable Uniqueness results: if `κ = η.withDensity f + ξ` for measurable `f` and `ξ` is such that `ξ a ⟂ₘ η a` for some `a : α` then * `ProbabilityTheory.Kernel.eq_rnDeriv`: `f a =ᵐ[η a] Kernel.rnDeriv κ η a` * `ProbabilityTheory.Kernel.eq_singularPart`: `ξ a = Kernel.singularPart κ η a` ## References Theorem 1.28 in [O. Kallenberg, Random Measures, Theory and Applications][kallenberg2017]. -/ open MeasureTheory Set Filter ENNReal open scoped NNReal MeasureTheory Topology ProbabilityTheory namespace ProbabilityTheory.Kernel variable {α γ : Type} {mα : MeasurableSpace α} {mγ : MeasurableSpace γ} {κ η : Kernel α γ} [hαγ : MeasurableSpace.CountableOrCountablyGenerated α γ] open Classical in /-- Auxiliary function used to define `ProbabilityTheory.Kernel.rnDeriv` and `ProbabilityTheory.Kernel.singularPart`. This has the properties we want for a Radon-Nikodym derivative only if `κ ≪ ν`. The definition of `rnDeriv κ η` will be built from `rnDerivAux κ (κ + η)`. -/ noncomputable def rnDerivAux (κ η : Kernel α γ) (a : α) (x : γ) : ℝ := if hα : Countable α then ((κ a).rnDeriv (η a) x).toReal else haveI := hαγ.countableOrCountablyGenerated.resolve_left hα density (map κ (fun a ↦ (a, ()))) η a x univ lemma rnDerivAux_nonneg (hκη : κ ≤ η) {a : α} {x : γ} : 0 ≤ rnDerivAux κ η a x := by rw [rnDerivAux] split_ifs with hα · exact ENNReal.toReal_nonneg · have := hαγ.countableOrCountablyGenerated.resolve_left hα exact density_nonneg ((fst_map_id_prod _ measurable_const).trans_le hκη) _ _ _ lemma rnDerivAux_le_one [IsFiniteKernel η] (hκη : κ ≤ η) {a : α} : rnDerivAux κ η a ≤ᵐ[η a] 1 := by filter_upwards [Measure.rnDeriv_le_one_of_le (hκη a)] with x hx_le_one simp_rw [rnDerivAux] split_ifs with hα · refine ENNReal.toReal_le_of_le_ofReal zero_le_one ?_ simp only [Pi.one_apply, ENNReal.ofReal_one] exact hx_le_one · have := hαγ.countableOrCountablyGenerated.resolve_left hα exact density_le_one ((fst_map_id_prod _ measurable_const).trans_le hκη) _ _ _ @[fun_prop] lemma measurable_rnDerivAux (κ η : Kernel α γ) : Measurable (fun p : α × γ ↦ Kernel.rnDerivAux κ η p.1 p.2) := by simp_rw [rnDerivAux] split_ifs with hα · refine Measurable.ennreal_toReal ?_ change Measurable ((fun q : γ × α ↦ (κ q.2).rnDeriv (η q.2) q.1) ∘ Prod.swap) refine (measurable_from_prod_countable' (fun a ↦ ?_) ?_).comp measurable_swap · exact Measure.measurable_rnDeriv (κ a) (η a) · intro a a' c ha'_mem_a have h_eq : ∀ κ : Kernel α γ, κ a' = κ a := fun κ ↦ by ext s hs exact mem_of_mem_measurableAtom ha'_mem_a (Kernel.measurable_coe κ hs (measurableSet_singleton (κ a s))) rfl rw [h_eq κ, h_eq η] · have := hαγ.countableOrCountablyGenerated.resolve_left hα exact measurable_density _ η MeasurableSet.univ @[fun_prop] lemma measurable_rnDerivAux_right (κ η : Kernel α γ) (a : α) : Measurable (fun x : γ ↦ rnDerivAux κ η a x) := by fun_prop lemma setLIntegral_rnDerivAux (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) {s : Set γ} (hs : MeasurableSet s) : ∫⁻ x in s, ENNReal.ofReal (rnDerivAux κ (κ + η) a x) ∂(κ + η) a = κ a s := by have h_le : κ ≤ κ + η := le_add_of_nonneg_right bot_le simp_rw [rnDerivAux] split_ifs with hα · have h_ac : κ a ≪ (κ + η) a := Measure.absolutelyContinuous_of_le (h_le a) rw [← Measure.setLIntegral_rnDeriv h_ac] refine setLIntegral_congr_fun hs ?_ filter_upwards [Measure.rnDeriv_lt_top (κ a) ((κ + η) a)] with x hx_lt _ rw [ENNReal.ofReal_toReal hx_lt.ne] · have := hαγ.countableOrCountablyGenerated.resolve_left hα rw [setLIntegral_density ((fst_map_id_prod _ measurable_const).trans_le h_le) _ MeasurableSet.univ hs, map_apply' _ (by fun_prop) _ (hs.prod MeasurableSet.univ)] congr with x simp lemma withDensity_rnDerivAux (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] : withDensity (κ + η) (fun a x ↦ Real.toNNReal (rnDerivAux κ (κ + η) a x)) = κ := by ext a s hs rw [Kernel.withDensity_apply'] swap; · fun_prop simp_rw [ofNNReal_toNNReal] exact setLIntegral_rnDerivAux κ η a hs lemma withDensity_one_sub_rnDerivAux (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] : withDensity (κ + η) (fun a x ↦ Real.toNNReal (1 - rnDerivAux κ (κ + η) a x)) = η := by have h_le : κ ≤ κ + η := le_add_of_nonneg_right bot_le suffices withDensity (κ + η) (fun a x ↦ Real.toNNReal (1 - rnDerivAux κ (κ + η) a x)) + withDensity (κ + η) (fun a x ↦ Real.toNNReal (rnDerivAux κ (κ + η) a x)) = κ + η by ext a s have h : (withDensity (κ + η) (fun a x ↦ Real.toNNReal (1 - rnDerivAux κ (κ + η) a x)) + withDensity (κ + η) (fun a x ↦ Real.toNNReal (rnDerivAux κ (κ + η) a x))) a s = κ a s + η a s := by rw [this] simp simp only [coe_add, Pi.add_apply, Measure.coe_add] at h rwa [withDensity_rnDerivAux, add_comm, ENNReal.add_right_inj (measure_ne_top _ _)] at h simp_rw [ofNNReal_toNNReal, ENNReal.ofReal_sub _ (rnDerivAux_nonneg h_le), ENNReal.ofReal_one] rw [withDensity_sub_add_cancel] · rw [withDensity_one'] · exact measurable_const · fun_prop · intro a filter_upwards [rnDerivAux_le_one h_le] with x hx simp only [ENNReal.ofReal_le_one] exact hx /-- A set of points in `α × γ` related to the absolute continuity / mutual singularity of `κ` and `η`. -/ def mutuallySingularSet (κ η : Kernel α γ) : Set (α × γ) := {p \| 1 ≤ rnDerivAux κ (κ + η) p.1 p.2} /-- A set of points in `α × γ` related to the absolute continuity / mutual singularity of `κ` and `η`. That is, `withDensity η (rnDeriv κ η) a (mutuallySingularSetSlice κ η a) = 0`, * `singularPart κ η a (mutuallySingularSetSlice κ η a)ᶜ = 0`. -/ def mutuallySingularSetSlice (κ η : Kernel α γ) (a : α) : Set γ := {x \| 1 ≤ rnDerivAux κ (κ + η) a x} lemma mem_mutuallySingularSetSlice (κ η : Kernel α γ) (a : α) (x : γ) : x ∈ mutuallySingularSetSlice κ η a ↔ 1 ≤ rnDerivAux κ (κ + η) a x := by rw [mutuallySingularSetSlice, mem_setOf] lemma not_mem_mutuallySingularSetSlice (κ η : Kernel α γ) (a : α) (x : γ) : x ∉ mutuallySingularSetSlice κ η a ↔ rnDerivAux κ (κ + η) a x < 1 := by simp [mutuallySingularSetSlice] lemma measurableSet_mutuallySingularSet (κ η : Kernel α γ) : MeasurableSet (mutuallySingularSet κ η) := measurable_rnDerivAux κ (κ + η) measurableSet_Ici lemma measurableSet_mutuallySingularSetSlice (κ η : Kernel α γ) (a : α) : MeasurableSet (mutuallySingularSetSlice κ η a) := measurable_prodMk_left (measurableSet_mutuallySingularSet κ η) lemma measure_mutuallySingularSetSlice (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : η a (mutuallySingularSetSlice κ η a) = 0 := by suffices withDensity (κ + η) (fun a x ↦ Real.toNNReal (1 - rnDerivAux κ (κ + η) a x)) a {x \| 1 ≤ rnDerivAux κ (κ + η) a x} = 0 by rwa [withDensity_one_sub_rnDerivAux κ η] at this simp_rw [ofNNReal_toNNReal] rw [Kernel.withDensity_apply', lintegral_eq_zero_iff, EventuallyEq, ae_restrict_iff] rotate_left · exact (measurableSet_singleton 0).preimage (by fun_prop) · fun_prop · fun_prop refine ae_of_all _ (fun x hx ↦ ?_) simp only [mem_setOf_eq] at hx simp [hx] /-- Radon-Nikodym derivative of the kernel `κ` with respect to the kernel `η`. -/ noncomputable irreducible_def rnDeriv (κ η : Kernel α γ) (a : α) (x : γ) : ℝ≥0∞ := ENNReal.ofReal (rnDerivAux κ (κ + η) a x) / ENNReal.ofReal (1 - rnDerivAux κ (κ + η) a x) lemma rnDeriv_def' (κ η : Kernel α γ) : rnDeriv κ η = fun a x ↦ ENNReal.ofReal (rnDerivAux κ (κ + η) a x) / ENNReal.ofReal (1 - rnDerivAux κ (κ + η) a x) := by ext; rw [rnDeriv_def] @[fun_prop] lemma measurable_rnDeriv (κ η : Kernel α γ) : Measurable (fun p : α × γ ↦ rnDeriv κ η p.1 p.2) := by simp_rw [rnDeriv_def] exact (measurable_rnDerivAux κ _).ennreal_ofReal.div (measurable_const.sub (measurable_rnDerivAux κ _)).ennreal_ofReal @[fun_prop] lemma measurable_rnDeriv_right (κ η : Kernel α γ) (a : α) : Measurable (fun x : γ ↦ rnDeriv κ η a x) := by fun_prop lemma rnDeriv_eq_top_iff (κ η : Kernel α γ) (a : α) (x : γ) : rnDeriv κ η a x = ∞ ↔ (a, x) ∈ mutuallySingularSet κ η := by simp only [rnDeriv, ENNReal.div_eq_top, ne_eq, ENNReal.ofReal_eq_zero, not_le, tsub_le_iff_right, zero_add, ENNReal.ofReal_ne_top, not_false_eq_true, and_true, or_false, mutuallySingularSet, mem_setOf_eq, and_iff_right_iff_imp] exact fun h ↦ zero_lt_one.trans_le h lemma rnDeriv_eq_top_iff' (κ η : Kernel α γ) (a : α) (x : γ) : rnDeriv κ η a x = ∞ ↔ x ∈ mutuallySingularSetSlice κ η a := by rw [rnDeriv_eq_top_iff, mutuallySingularSet, mutuallySingularSetSlice, mem_setOf, mem_setOf] /-- Singular part of the kernel `κ` with respect to the kernel `η`. -/ noncomputable irreducible_def singularPart (κ η : Kernel α γ) [IsSFiniteKernel κ] [IsSFiniteKernel η] : Kernel α γ := withDensity (κ + η) (fun a x ↦ Real.toNNReal (rnDerivAux κ (κ + η) a x) - Real.toNNReal (1 - rnDerivAux κ (κ + η) a x) * rnDeriv κ η a x) lemma measurable_singularPart_fun (κ η : Kernel α γ) : Measurable (fun p : α × γ ↦ Real.toNNReal (rnDerivAux κ (κ + η) p.1 p.2) - Real.toNNReal (1 - rnDerivAux κ (κ + η) p.1 p.2) * rnDeriv κ η p.1 p.2) := by fun_prop lemma measurable_singularPart_fun_right (κ η : Kernel α γ) (a : α) : Measurable (fun x : γ ↦ Real.toNNReal (rnDerivAux κ (κ + η) a x) - Real.toNNReal (1 - rnDerivAux κ (κ + η) a x) * rnDeriv κ η a x) := by change Measurable ((Function.uncurry fun a b ↦ ENNReal.ofReal (rnDerivAux κ (κ + η) a b) - ENNReal.ofReal (1 - rnDerivAux κ (κ + η) a b) * rnDeriv κ η a b) ∘ (fun b ↦ (a, b))) exact (measurable_singularPart_fun κ η).comp measurable_prodMk_left lemma singularPart_compl_mutuallySingularSetSlice (κ η : Kernel α γ) [IsSFiniteKernel κ] [IsSFiniteKernel η] (a : α) : singularPart κ η a (mutuallySingularSetSlice κ η a)ᶜ = 0 := by rw [singularPart, Kernel.withDensity_apply', lintegral_eq_zero_iff, EventuallyEq, ae_restrict_iff] all_goals simp_rw [ofNNReal_toNNReal] rotate_left · exact measurableSet_preimage (measurable_singularPart_fun_right κ η a) (measurableSet_singleton _) · exact measurable_singularPart_fun_right κ η a · exact measurable_singularPart_fun κ η refine ae_of_all _ (fun x hx ↦ ?_) simp only [mem_compl_iff, mutuallySingularSetSlice, mem_setOf, not_le] at hx simp_rw [rnDeriv] rw [← ENNReal.ofReal_div_of_pos, div_eq_inv_mul, ← ENNReal.ofReal_mul, ← mul_assoc, mul_inv_cancel₀, one_mul, tsub_self, Pi.zero_apply] · simp only [ne_eq, sub_eq_zero, hx.ne', not_false_eq_true] · simp only [sub_nonneg, hx.le] · simp only [sub_pos, hx] lemma singularPart_of_subset_compl_mutuallySingularSetSlice [IsFiniteKernel κ] [IsFiniteKernel η] {a : α} {s : Set γ} (hs : s ⊆ (mutuallySingularSetSlice κ η a)ᶜ) : singularPart κ η a s = 0 := measure_mono_null hs (singularPart_compl_mutuallySingularSetSlice κ η a) lemma singularPart_of_subset_mutuallySingularSetSlice [IsFiniteKernel κ] [IsFiniteKernel η] {a : α} {s : Set γ} (hsm : MeasurableSet s) (hs : s ⊆ mutuallySingularSetSlice κ η a) : singularPart κ η a s = κ a s := by have hs' : ∀ x ∈ s, 1 ≤ rnDerivAux κ (κ + η) a x := fun _ hx ↦ hs hx rw [singularPart, Kernel.withDensity_apply'] swap; · exact measurable_singularPart_fun κ η calc ∫⁻ x in s, ↑(Real.toNNReal (rnDerivAux κ (κ + η) a x)) - ↑(Real.toNNReal (1 - rnDerivAux κ (κ + η) a x)) * rnDeriv κ η a x ∂(κ + η) a = ∫⁻ _ in s, 1 ∂(κ + η) a := by refine setLIntegral_congr_fun hsm ?_ have h_le : κ ≤ κ + η := le_add_of_nonneg_right bot_le filter_upwards [rnDerivAux_le_one h_le] with x hx hxs have h_eq_one : rnDerivAux κ (κ + η) a x = 1 := le_antisymm hx (hs' x hxs) simp [h_eq_one] _ = (κ + η) a s := by simp _ = κ a s := by suffices η a s = 0 by simp [this] exact measure_mono_null hs (measure_mutuallySingularSetSlice κ η a) lemma withDensity_rnDeriv_mutuallySingularSetSlice (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : withDensity η (rnDeriv κ η) a (mutuallySingularSetSlice κ η a) = 0 := by rw [Kernel.withDensity_apply'] · exact setLIntegral_measure_zero _ _ (measure_mutuallySingularSetSlice κ η a) · exact measurable_rnDeriv κ η lemma withDensity_rnDeriv_of_subset_mutuallySingularSetSlice [IsFiniteKernel κ] [IsFiniteKernel η] {a : α} {s : Set γ} (hs : s ⊆ mutuallySingularSetSlice κ η a) : withDensity η (rnDeriv κ η) a s = 0 := measure_mono_null hs (withDensity_rnDeriv_mutuallySingularSetSlice κ η a) lemma withDensity_rnDeriv_of_subset_compl_mutuallySingularSetSlice [IsFiniteKernel κ] [IsFiniteKernel η] {a : α} {s : Set γ} (hsm : MeasurableSet s) (hs : s ⊆ (mutuallySingularSetSlice κ η a)ᶜ) : withDensity η (rnDeriv κ η) a s = κ a s := by have : withDensity η (rnDeriv κ η) = withDensity (withDensity (κ + η) (fun a x ↦ Real.toNNReal (1 - rnDerivAux κ (κ + η) a x))) (rnDeriv κ η) := by rw [rnDeriv_def'] congr exact (withDensity_one_sub_rnDerivAux κ η).symm rw [this, ← withDensity_mul, Kernel.withDensity_apply'] rotate_left · fun_prop · fun_prop · exact measurable_rnDeriv _ _ simp_rw [rnDeriv] have hs' : ∀ x ∈ s, rnDerivAux κ (κ + η) a x < 1 := by simp_rw [← not_mem_mutuallySingularSetSlice] exact fun x hx hx_mem ↦ hs hx hx_mem calc ∫⁻ x in s, ↑(Real.toNNReal (1 - rnDerivAux κ (κ + η) a x)) * (ENNReal.ofReal (rnDerivAux κ (κ + η) a x) / ENNReal.ofReal (1 - rnDerivAux κ (κ + η) a x)) ∂(κ + η) a _ = ∫⁻ x in s, ENNReal.ofReal (rnDerivAux κ (κ + η) a x) ∂(κ + η) a := by refine setLIntegral_congr_fun hsm (ae_of_all _ fun x hx ↦ ?_) rw [ofNNReal_toNNReal, ← ENNReal.ofReal_div_of_pos, div_eq_inv_mul, ← ENNReal.ofReal_mul, ← mul_assoc, mul_inv_cancel₀, one_mul] · rw [ne_eq, sub_eq_zero] exact (hs' x hx).ne' · simp [(hs' x hx).le] · simp [hs' x hx] _ = κ a s := setLIntegral_rnDerivAux κ η a hsm /-- The singular part of `κ` with respect to `η` is mutually singular with `η`. -/ lemma mutuallySingular_singularPart (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : singularPart κ η a ⟂ₘ η a := by symm exact ⟨mutuallySingularSetSlice κ η a, measurableSet_mutuallySingularSetSlice κ η a, measure_mutuallySingularSetSlice κ η a, singularPart_compl_mutuallySingularSetSlice κ η a⟩ /-- Lebesgue decomposition of a finite kernel `κ` with respect to another one `η`. `κ` is the sum of an absolutely continuous part `withDensity η (rnDeriv κ η)` and a singular part `singularPart κ η`. -/ lemma rnDeriv_add_singularPart (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] : withDensity η (rnDeriv κ η) + singularPart κ η = κ := by ext a s hs rw [← inter_union_diff s (mutuallySingularSetSlice κ η a)] simp only [coe_add, Pi.add_apply, Measure.coe_add] have hm := measurableSet_mutuallySingularSetSlice κ η a simp only [measure_union (Disjoint.mono inter_subset_right le_rfl disjoint_sdiff_right) (hs.diff hm)] rw [singularPart_of_subset_mutuallySingularSetSlice (hs.inter hm) inter_subset_right, singularPart_of_subset_compl_mutuallySingularSetSlice (diff_subset_iff.mpr (by simp)), add_zero, withDensity_rnDeriv_of_subset_mutuallySingularSetSlice inter_subset_right, zero_add, withDensity_rnDeriv_of_subset_compl_mutuallySingularSetSlice (hs.diff hm) (diff_subset_iff.mpr (by simp)), add_comm] section EqZeroIff lemma singularPart_eq_zero_iff_apply_eq_zero (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : singularPart κ η a = 0 ↔ singularPart κ η a (mutuallySingularSetSlice κ η a) = 0 := by rw [← Measure.measure_univ_eq_zero] have : univ = (mutuallySingularSetSlice κ η a) ∪ (mutuallySingularSetSlice κ η a)ᶜ := by simp rw [this, measure_union disjoint_compl_right (measurableSet_mutuallySingularSetSlice κ η a).compl, singularPart_compl_mutuallySingularSetSlice, add_zero] lemma withDensity_rnDeriv_eq_zero_iff_apply_eq_zero (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : withDensity η (rnDeriv κ η) a = 0 ↔ withDensity η (rnDeriv κ η) a (mutuallySingularSetSlice κ η a)ᶜ = 0 := by rw [← Measure.measure_univ_eq_zero] have : univ = (mutuallySingularSetSlice κ η a) ∪ (mutuallySingularSetSlice κ η a)ᶜ := by simp rw [this, measure_union disjoint_compl_right (measurableSet_mutuallySingularSetSlice κ η a).compl, withDensity_rnDeriv_mutuallySingularSetSlice, zero_add] lemma singularPart_eq_zero_iff_absolutelyContinuous (κ η : Kernel α γ) [IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : singularPart κ η a = 0 ↔ κ a ≪ η a := by conv_rhs => rw [← rnDeriv_add_singularPart κ η, coe_add, Pi.add_apply] refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rw [h, add_zero] exact withDensity_absolutelyContinuous _ _ rw [Measure.AbsolutelyContinuous.add_left_iff] at h exact Measure.eq_zero_of_absolutelyContinuous_of_mutuallySingular h.2 (mutuallySingular_singularPart _ _ _) lemma withDensity_rnDeriv_eq_zero_iff_mutuallySingular (κ η : Kernel α γ)	[IsFiniteKernel κ] [IsFiniteKernel η] (a : α) : withDensity η (rnDeriv κ η) a = 0 ↔ κ a ⟂ₘ η a := by conv_rhs => rw [← rnDeriv_add_singularPart κ η, coe_add, Pi.add_apply] refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rw [h, zero_add] exact mutuallySingular_singularPart _ _ _ rw [Measure.MutuallySingular.add_left_iff] at h rw [← Measure.MutuallySingular.self_iff]	Mathlib/Probability/Kernel/RadonNikodym.lean	424	431
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Johannes Hölzl, Patrick Massot -/ import Mathlib.Data.Set.Image import Mathlib.Data.SProd /-! # Sets in product and pi types This file proves basic properties of product of sets in `α × β` and in `Π i, α i`, and of the diagonal of a type. ## Main declarations This file contains basic results on the following notions, which are defined in `Set.Operations`. * `Set.prod`: Binary product of sets. For `s : Set α`, `t : Set β`, we have `s.prod t : Set (α × β)`. Denoted by `s ×ˢ t`. * `Set.diagonal`: Diagonal of a type. `Set.diagonal α = {(x, x) \| x : α}`. * `Set.offDiag`: Off-diagonal. `s ×ˢ s` without the diagonal. * `Set.pi`: Arbitrary product of sets. -/ open Function namespace Set /-! ### Cartesian binary product of sets -/ section Prod variable {α β γ δ : Type} {s s₁ s₂ : Set α} {t t₁ t₂ : Set β} {a : α} {b : β} theorem Subsingleton.prod (hs : s.Subsingleton) (ht : t.Subsingleton) : (s ×ˢ t).Subsingleton := fun _x hx _y hy ↦ Prod.ext (hs hx.1 hy.1) (ht hx.2 hy.2) noncomputable instance decidableMemProd [DecidablePred (· ∈ s)] [DecidablePred (· ∈ t)] : DecidablePred (· ∈ s ×ˢ t) := fun x => inferInstanceAs (Decidable (x.1 ∈ s ∧ x.2 ∈ t)) @[gcongr] theorem prod_mono (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) : s₁ ×ˢ t₁ ⊆ s₂ ×ˢ t₂ := fun _ ⟨h₁, h₂⟩ => ⟨hs h₁, ht h₂⟩ @[gcongr] theorem prod_mono_left (hs : s₁ ⊆ s₂) : s₁ ×ˢ t ⊆ s₂ ×ˢ t := prod_mono hs Subset.rfl @[gcongr] theorem prod_mono_right (ht : t₁ ⊆ t₂) : s ×ˢ t₁ ⊆ s ×ˢ t₂ := prod_mono Subset.rfl ht @[simp] theorem prod_self_subset_prod_self : s₁ ×ˢ s₁ ⊆ s₂ ×ˢ s₂ ↔ s₁ ⊆ s₂ := ⟨fun h _ hx => (h (mk_mem_prod hx hx)).1, fun h _ hx => ⟨h hx.1, h hx.2⟩⟩ @[simp] theorem prod_self_ssubset_prod_self : s₁ ×ˢ s₁ ⊂ s₂ ×ˢ s₂ ↔ s₁ ⊂ s₂ := and_congr prod_self_subset_prod_self <\| not_congr prod_self_subset_prod_self theorem prod_subset_iff {P : Set (α × β)} : s ×ˢ t ⊆ P ↔ ∀ x ∈ s, ∀ y ∈ t, (x, y) ∈ P := ⟨fun h _ hx _ hy => h (mk_mem_prod hx hy), fun h ⟨_, _⟩ hp => h _ hp.1 _ hp.2⟩ theorem forall_prod_set {p : α × β → Prop} : (∀ x ∈ s ×ˢ t, p x) ↔ ∀ x ∈ s, ∀ y ∈ t, p (x, y) := prod_subset_iff theorem exists_prod_set {p : α × β → Prop} : (∃ x ∈ s ×ˢ t, p x) ↔ ∃ x ∈ s, ∃ y ∈ t, p (x, y) := by simp [and_assoc] @[simp] theorem prod_empty : s ×ˢ (∅ : Set β) = ∅ := by ext exact iff_of_eq (and_false _) @[simp] theorem empty_prod : (∅ : Set α) ×ˢ t = ∅ := by ext exact iff_of_eq (false_and _) @[simp, mfld_simps] theorem univ_prod_univ : @univ α ×ˢ @univ β = univ := by ext exact iff_of_eq (true_and _) theorem univ_prod {t : Set β} : (univ : Set α) ×ˢ t = Prod.snd ⁻¹' t := by simp [prod_eq] theorem prod_univ {s : Set α} : s ×ˢ (univ : Set β) = Prod.fst ⁻¹' s := by simp [prod_eq] @[simp] lemma prod_eq_univ [Nonempty α] [Nonempty β] : s ×ˢ t = univ ↔ s = univ ∧ t = univ := by simp [eq_univ_iff_forall, forall_and] theorem singleton_prod : ({a} : Set α) ×ˢ t = Prod.mk a '' t := by ext ⟨x, y⟩ simp [and_left_comm, eq_comm] theorem prod_singleton : s ×ˢ ({b} : Set β) = (fun a => (a, b)) '' s := by ext ⟨x, y⟩ simp [and_left_comm, eq_comm] @[simp] theorem singleton_prod_singleton : ({a} : Set α) ×ˢ ({b} : Set β) = {(a, b)} := by ext ⟨c, d⟩; simp @[simp] theorem union_prod : (s₁ ∪ s₂) ×ˢ t = s₁ ×ˢ t ∪ s₂ ×ˢ t := by ext ⟨x, y⟩ simp [or_and_right] @[simp] theorem prod_union : s ×ˢ (t₁ ∪ t₂) = s ×ˢ t₁ ∪ s ×ˢ t₂ := by ext ⟨x, y⟩ simp [and_or_left] theorem inter_prod : (s₁ ∩ s₂) ×ˢ t = s₁ ×ˢ t ∩ s₂ ×ˢ t := by ext ⟨x, y⟩ simp only [← and_and_right, mem_inter_iff, mem_prod] theorem prod_inter : s ×ˢ (t₁ ∩ t₂) = s ×ˢ t₁ ∩ s ×ˢ t₂ := by ext ⟨x, y⟩ simp only [← and_and_left, mem_inter_iff, mem_prod] @[mfld_simps] theorem prod_inter_prod : s₁ ×ˢ t₁ ∩ s₂ ×ˢ t₂ = (s₁ ∩ s₂) ×ˢ (t₁ ∩ t₂) := by ext ⟨x, y⟩ simp [and_assoc, and_left_comm] lemma compl_prod_eq_union {α β : Type} (s : Set α) (t : Set β) : (s ×ˢ t)ᶜ = (sᶜ ×ˢ univ) ∪ (univ ×ˢ tᶜ) := by ext p simp only [mem_compl_iff, mem_prod, not_and, mem_union, mem_univ, and_true, true_and] constructor <;> intro h · by_cases fst_in_s : p.fst ∈ s · exact Or.inr (h fst_in_s) · exact Or.inl fst_in_s · intro fst_in_s simpa only [fst_in_s, not_true, false_or] using h @[simp] theorem disjoint_prod : Disjoint (s₁ ×ˢ t₁) (s₂ ×ˢ t₂) ↔ Disjoint s₁ s₂ ∨ Disjoint t₁ t₂ := by simp_rw [disjoint_left, mem_prod, not_and_or, Prod.forall, and_imp, ← @forall_or_right α, ← @forall_or_left β, ← @forall_or_right (_ ∈ s₁), ← @forall_or_left (_ ∈ t₁)] theorem Disjoint.set_prod_left (hs : Disjoint s₁ s₂) (t₁ t₂ : Set β) : Disjoint (s₁ ×ˢ t₁) (s₂ ×ˢ t₂) := disjoint_left.2 fun ⟨_a, _b⟩ ⟨ha₁, _⟩ ⟨ha₂, _⟩ => disjoint_left.1 hs ha₁ ha₂ theorem Disjoint.set_prod_right (ht : Disjoint t₁ t₂) (s₁ s₂ : Set α) : Disjoint (s₁ ×ˢ t₁) (s₂ ×ˢ t₂) := disjoint_left.2 fun ⟨_a, _b⟩ ⟨_, hb₁⟩ ⟨_, hb₂⟩ => disjoint_left.1 ht hb₁ hb₂ theorem prodMap_image_prod (f : α → β) (g : γ → δ) (s : Set α) (t : Set γ) : (Prod.map f g) '' (s ×ˢ t) = (f '' s) ×ˢ (g '' t) := by ext aesop theorem insert_prod : insert a s ×ˢ t = Prod.mk a '' t ∪ s ×ˢ t := by simp only [insert_eq, union_prod, singleton_prod] theorem prod_insert : s ×ˢ insert b t = (fun a => (a, b)) '' s ∪ s ×ˢ t := by simp only [insert_eq, prod_union, prod_singleton] theorem prod_preimage_eq {f : γ → α} {g : δ → β} : (f ⁻¹' s) ×ˢ (g ⁻¹' t) = (fun p : γ × δ => (f p.1, g p.2)) ⁻¹' s ×ˢ t := rfl theorem prod_preimage_left {f : γ → α} : (f ⁻¹' s) ×ˢ t = (fun p : γ × β => (f p.1, p.2)) ⁻¹' s ×ˢ t := rfl theorem prod_preimage_right {g : δ → β} : s ×ˢ (g ⁻¹' t) = (fun p : α × δ => (p.1, g p.2)) ⁻¹' s ×ˢ t := rfl theorem preimage_prod_map_prod (f : α → β) (g : γ → δ) (s : Set β) (t : Set δ) : Prod.map f g ⁻¹' s ×ˢ t = (f ⁻¹' s) ×ˢ (g ⁻¹' t) := rfl theorem mk_preimage_prod (f : γ → α) (g : γ → β) : (fun x => (f x, g x)) ⁻¹' s ×ˢ t = f ⁻¹' s ∩ g ⁻¹' t := rfl	@[simp] theorem mk_preimage_prod_left (hb : b ∈ t) : (fun a => (a, b)) ⁻¹' s ×ˢ t = s := by ext a simp [hb] @[simp] theorem mk_preimage_prod_right (ha : a ∈ s) : Prod.mk a ⁻¹' s ×ˢ t = t := by ext b simp [ha] @[simp] theorem mk_preimage_prod_left_eq_empty (hb : b ∉ t) : (fun a => (a, b)) ⁻¹' s ×ˢ t = ∅ := by	Mathlib/Data/Set/Prod.lean	185	196
/- 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, Sébastien Gouëzel, Rémy Degenne, David Loeffler -/ import Mathlib.Analysis.SpecialFunctions.Pow.Complex import Qq /-! # Power function on `ℝ` We construct the power functions `x ^ y`, where `x` and `y` are real numbers. -/ noncomputable section open Real ComplexConjugate Finset Set /- ## Definitions -/ namespace Real variable {x y z : ℝ} /-- The real power function `x ^ y`, defined as the real part of the complex power function. For `x > 0`, it is equal to `exp (y log x)`. For `x = 0`, one sets `0 ^ 0=1` and `0 ^ y=0` for `y ≠ 0`. For `x < 0`, the definition is somewhat arbitrary as it depends on the choice of a complex determination of the logarithm. With our conventions, it is equal to `exp (y log x) cos (π y)`. -/ noncomputable def rpow (x y : ℝ) := ((x : ℂ) ^ (y : ℂ)).re noncomputable instance : Pow ℝ ℝ := ⟨rpow⟩ @[simp] theorem rpow_eq_pow (x y : ℝ) : rpow x y = x ^ y := rfl theorem rpow_def (x y : ℝ) : x ^ y = ((x : ℂ) ^ (y : ℂ)).re := rfl theorem rpow_def_of_nonneg {x : ℝ} (hx : 0 ≤ x) (y : ℝ) : x ^ y = if x = 0 then if y = 0 then 1 else 0 else exp (log x * y) := by simp only [rpow_def, Complex.cpow_def]; split_ifs <;> simp_all [(Complex.ofReal_log hx).symm, -Complex.ofReal_mul, (Complex.ofReal_mul _ _).symm, Complex.exp_ofReal_re, Complex.ofReal_eq_zero] theorem rpow_def_of_pos {x : ℝ} (hx : 0 < x) (y : ℝ) : x ^ y = exp (log x * y) := by rw [rpow_def_of_nonneg (le_of_lt hx), if_neg (ne_of_gt hx)] theorem exp_mul (x y : ℝ) : exp (x * y) = exp x ^ y := by rw [rpow_def_of_pos (exp_pos _), log_exp] @[simp, norm_cast] theorem rpow_intCast (x : ℝ) (n : ℤ) : x ^ (n : ℝ) = x ^ n := by simp only [rpow_def, ← Complex.ofReal_zpow, Complex.cpow_intCast, Complex.ofReal_intCast, Complex.ofReal_re] @[simp, norm_cast] theorem rpow_natCast (x : ℝ) (n : ℕ) : x ^ (n : ℝ) = x ^ n := by simpa using rpow_intCast x n @[simp] theorem exp_one_rpow (x : ℝ) : exp 1 ^ x = exp x := by rw [← exp_mul, one_mul] @[simp] lemma exp_one_pow (n : ℕ) : exp 1 ^ n = exp n := by rw [← rpow_natCast, exp_one_rpow] theorem rpow_eq_zero_iff_of_nonneg (hx : 0 ≤ x) : x ^ y = 0 ↔ x = 0 ∧ y ≠ 0 := by simp only [rpow_def_of_nonneg hx] split_ifs <;> simp [, exp_ne_zero] @[simp] lemma rpow_eq_zero (hx : 0 ≤ x) (hy : y ≠ 0) : x ^ y = 0 ↔ x = 0 := by simp [rpow_eq_zero_iff_of_nonneg, ] @[simp] lemma rpow_ne_zero (hx : 0 ≤ x) (hy : y ≠ 0) : x ^ y ≠ 0 ↔ x ≠ 0 := Real.rpow_eq_zero hx hy \|>.not open Real theorem rpow_def_of_neg {x : ℝ} (hx : x < 0) (y : ℝ) : x ^ y = exp (log x * y) * cos (y * π) := by rw [rpow_def, Complex.cpow_def, if_neg] · have : Complex.log x * y = ↑(log (-x) * y) + ↑(y * π) * Complex.I := by simp only [Complex.log, Complex.norm_real, norm_eq_abs, abs_of_neg hx, log_neg_eq_log, Complex.arg_ofReal_of_neg hx, Complex.ofReal_mul] ring rw [this, Complex.exp_add_mul_I, ← Complex.ofReal_exp, ← Complex.ofReal_cos, ← Complex.ofReal_sin, mul_add, ← Complex.ofReal_mul, ← mul_assoc, ← Complex.ofReal_mul, Complex.add_re, Complex.ofReal_re, Complex.mul_re, Complex.I_re, Complex.ofReal_im, Real.log_neg_eq_log] ring · rw [Complex.ofReal_eq_zero] exact ne_of_lt hx theorem rpow_def_of_nonpos {x : ℝ} (hx : x ≤ 0) (y : ℝ) : x ^ y = if x = 0 then if y = 0 then 1 else 0 else exp (log x * y) * cos (y * π) := by split_ifs with h <;> simp [rpow_def, ]; exact rpow_def_of_neg (lt_of_le_of_ne hx h) _ @[bound] theorem rpow_pos_of_pos {x : ℝ} (hx : 0 < x) (y : ℝ) : 0 < x ^ y := by rw [rpow_def_of_pos hx]; apply exp_pos @[simp] theorem rpow_zero (x : ℝ) : x ^ (0 : ℝ) = 1 := by simp [rpow_def] theorem rpow_zero_pos (x : ℝ) : 0 < x ^ (0 : ℝ) := by simp @[simp] theorem zero_rpow {x : ℝ} (h : x ≠ 0) : (0 : ℝ) ^ x = 0 := by simp [rpow_def, ] theorem zero_rpow_eq_iff {x : ℝ} {a : ℝ} : 0 ^ x = a ↔ x ≠ 0 ∧ a = 0 ∨ x = 0 ∧ a = 1 := by constructor · intro hyp simp only [rpow_def, Complex.ofReal_zero] at hyp by_cases h : x = 0 · subst h simp only [Complex.one_re, Complex.ofReal_zero, Complex.cpow_zero] at hyp exact Or.inr ⟨rfl, hyp.symm⟩ · rw [Complex.zero_cpow (Complex.ofReal_ne_zero.mpr h)] at hyp exact Or.inl ⟨h, hyp.symm⟩ · rintro (⟨h, rfl⟩ \| ⟨rfl, rfl⟩) · exact zero_rpow h · exact rpow_zero _ theorem eq_zero_rpow_iff {x : ℝ} {a : ℝ} : a = 0 ^ x ↔ x ≠ 0 ∧ a = 0 ∨ x = 0 ∧ a = 1 := by rw [← zero_rpow_eq_iff, eq_comm] @[simp] theorem rpow_one (x : ℝ) : x ^ (1 : ℝ) = x := by simp [rpow_def] @[simp] theorem one_rpow (x : ℝ) : (1 : ℝ) ^ x = 1 := by simp [rpow_def] theorem zero_rpow_le_one (x : ℝ) : (0 : ℝ) ^ x ≤ 1 := by by_cases h : x = 0 <;> simp [h, zero_le_one] theorem zero_rpow_nonneg (x : ℝ) : 0 ≤ (0 : ℝ) ^ x := by by_cases h : x = 0 <;> simp [h, zero_le_one] @[bound] theorem rpow_nonneg {x : ℝ} (hx : 0 ≤ x) (y : ℝ) : 0 ≤ x ^ y := by rw [rpow_def_of_nonneg hx]; split_ifs <;> simp only [zero_le_one, le_refl, le_of_lt (exp_pos _)] theorem abs_rpow_of_nonneg {x y : ℝ} (hx_nonneg : 0 ≤ x) : \|x ^ y\| = \|x\| ^ y := by have h_rpow_nonneg : 0 ≤ x ^ y := Real.rpow_nonneg hx_nonneg _ rw [abs_eq_self.mpr hx_nonneg, abs_eq_self.mpr h_rpow_nonneg] @[bound] theorem abs_rpow_le_abs_rpow (x y : ℝ) : \|x ^ y\| ≤ \|x\| ^ y := by rcases le_or_lt 0 x with hx \| hx · rw [abs_rpow_of_nonneg hx] · rw [abs_of_neg hx, rpow_def_of_neg hx, rpow_def_of_pos (neg_pos.2 hx), log_neg_eq_log, abs_mul, abs_of_pos (exp_pos _)] exact mul_le_of_le_one_right (exp_pos _).le (abs_cos_le_one _) theorem abs_rpow_le_exp_log_mul (x y : ℝ) : \|x ^ y\| ≤ exp (log x * y) := by refine (abs_rpow_le_abs_rpow x y).trans ?_ by_cases hx : x = 0 · by_cases hy : y = 0 <;> simp [hx, hy, zero_le_one] · rw [rpow_def_of_pos (abs_pos.2 hx), log_abs] lemma rpow_inv_log (hx₀ : 0 < x) (hx₁ : x ≠ 1) : x ^ (log x)⁻¹ = exp 1 := by rw [rpow_def_of_pos hx₀, mul_inv_cancel₀] exact log_ne_zero.2 ⟨hx₀.ne', hx₁, (hx₀.trans' <\| by norm_num).ne'⟩ /-- See `Real.rpow_inv_log` for the equality when `x ≠ 1` is strictly positive. -/ lemma rpow_inv_log_le_exp_one : x ^ (log x)⁻¹ ≤ exp 1 := by calc _ ≤ \|x ^ (log x)⁻¹\| := le_abs_self _ _ ≤ \|x\| ^ (log x)⁻¹ := abs_rpow_le_abs_rpow .. rw [← log_abs] obtain hx \| hx := (abs_nonneg x).eq_or_gt · simp [hx] · rw [rpow_def_of_pos hx] gcongr exact mul_inv_le_one theorem norm_rpow_of_nonneg {x y : ℝ} (hx_nonneg : 0 ≤ x) : ‖x ^ y‖ = ‖x‖ ^ y := by simp_rw [Real.norm_eq_abs] exact abs_rpow_of_nonneg hx_nonneg variable {w x y z : ℝ} theorem rpow_add (hx : 0 < x) (y z : ℝ) : x ^ (y + z) = x ^ y * x ^ z := by simp only [rpow_def_of_pos hx, mul_add, exp_add] theorem rpow_add' (hx : 0 ≤ x) (h : y + z ≠ 0) : x ^ (y + z) = x ^ y * x ^ z := by rcases hx.eq_or_lt with (rfl \| pos) · rw [zero_rpow h, zero_eq_mul] have : y ≠ 0 ∨ z ≠ 0 := not_and_or.1 fun ⟨hy, hz⟩ => h <\| hy.symm ▸ hz.symm ▸ zero_add 0 exact this.imp zero_rpow zero_rpow · exact rpow_add pos _ _ /-- Variant of `Real.rpow_add'` that avoids having to prove `y + z = w` twice. -/ lemma rpow_of_add_eq (hx : 0 ≤ x) (hw : w ≠ 0) (h : y + z = w) : x ^ w = x ^ y * x ^ z := by rw [← h, rpow_add' hx]; rwa [h] theorem rpow_add_of_nonneg (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 ≤ z) : x ^ (y + z) = x ^ y * x ^ z := by rcases hy.eq_or_lt with (rfl \| hy) · rw [zero_add, rpow_zero, one_mul] exact rpow_add' hx (ne_of_gt <\| add_pos_of_pos_of_nonneg hy hz) /-- For `0 ≤ x`, the only problematic case in the equality `x ^ y * x ^ z = x ^ (y + z)` is for `x = 0` and `y + z = 0`, where the right hand side is `1` while the left hand side can vanish. The inequality is always true, though, and given in this lemma. -/ theorem le_rpow_add {x : ℝ} (hx : 0 ≤ x) (y z : ℝ) : x ^ y * x ^ z ≤ x ^ (y + z) := by rcases le_iff_eq_or_lt.1 hx with (H \| pos) · by_cases h : y + z = 0 · simp only [H.symm, h, rpow_zero] calc (0 : ℝ) ^ y * 0 ^ z ≤ 1 * 1 := mul_le_mul (zero_rpow_le_one y) (zero_rpow_le_one z) (zero_rpow_nonneg z) zero_le_one _ = 1 := by simp · simp [rpow_add', ← H, h] · simp [rpow_add pos] theorem rpow_sum_of_pos {ι : Type} {a : ℝ} (ha : 0 < a) (f : ι → ℝ) (s : Finset ι) : (a ^ ∑ x ∈ s, f x) = ∏ x ∈ s, a ^ f x := map_sum (⟨⟨fun (x : ℝ) => (a ^ x : ℝ), rpow_zero a⟩, rpow_add ha⟩ : ℝ →+ (Additive ℝ)) f s theorem rpow_sum_of_nonneg {ι : Type} {a : ℝ} (ha : 0 ≤ a) {s : Finset ι} {f : ι → ℝ} (h : ∀ x ∈ s, 0 ≤ f x) : (a ^ ∑ x ∈ s, f x) = ∏ x ∈ s, a ^ f x := by induction' s using Finset.cons_induction with i s hi ihs · rw [sum_empty, Finset.prod_empty, rpow_zero] · rw [forall_mem_cons] at h rw [sum_cons, prod_cons, ← ihs h.2, rpow_add_of_nonneg ha h.1 (sum_nonneg h.2)] theorem rpow_neg {x : ℝ} (hx : 0 ≤ x) (y : ℝ) : x ^ (-y) = (x ^ y)⁻¹ := by simp only [rpow_def_of_nonneg hx]; split_ifs <;> simp_all [exp_neg] theorem rpow_sub {x : ℝ} (hx : 0 < x) (y z : ℝ) : x ^ (y - z) = x ^ y / x ^ z := by simp only [sub_eq_add_neg, rpow_add hx, rpow_neg (le_of_lt hx), div_eq_mul_inv] theorem rpow_sub' {x : ℝ} (hx : 0 ≤ x) {y z : ℝ} (h : y - z ≠ 0) : x ^ (y - z) = x ^ y / x ^ z := by simp only [sub_eq_add_neg] at h ⊢ simp only [rpow_add' hx h, rpow_neg hx, div_eq_mul_inv] protected theorem _root_.HasCompactSupport.rpow_const {α : Type} [TopologicalSpace α] {f : α → ℝ} (hf : HasCompactSupport f) {r : ℝ} (hr : r ≠ 0) : HasCompactSupport (fun x ↦ f x ^ r) := hf.comp_left (g := (· ^ r)) (Real.zero_rpow hr) end Real /-! ## Comparing real and complex powers -/ namespace Complex theorem ofReal_cpow {x : ℝ} (hx : 0 ≤ x) (y : ℝ) : ((x ^ y : ℝ) : ℂ) = (x : ℂ) ^ (y : ℂ) := by simp only [Real.rpow_def_of_nonneg hx, Complex.cpow_def, ofReal_eq_zero]; split_ifs <;> simp [Complex.ofReal_log hx] theorem ofReal_cpow_of_nonpos {x : ℝ} (hx : x ≤ 0) (y : ℂ) : (x : ℂ) ^ y = (-x : ℂ) ^ y exp (π * I * y) := by rcases hx.eq_or_lt with (rfl \| hlt) · rcases eq_or_ne y 0 with (rfl \| hy) <;> simp [] have hne : (x : ℂ) ≠ 0 := ofReal_ne_zero.mpr hlt.ne rw [cpow_def_of_ne_zero hne, cpow_def_of_ne_zero (neg_ne_zero.2 hne), ← exp_add, ← add_mul, log, log, norm_neg, arg_ofReal_of_neg hlt, ← ofReal_neg, arg_ofReal_of_nonneg (neg_nonneg.2 hx), ofReal_zero, zero_mul, add_zero] lemma cpow_ofReal (x : ℂ) (y : ℝ) : x ^ (y : ℂ) = ↑(‖x‖ ^ y) (Real.cos (arg x * y) + Real.sin (arg x * y) * I) := by rcases eq_or_ne x 0 with rfl \| hx · simp [ofReal_cpow le_rfl] · rw [cpow_def_of_ne_zero hx, exp_eq_exp_re_mul_sin_add_cos, mul_comm (log x)] norm_cast rw [re_ofReal_mul, im_ofReal_mul, log_re, log_im, mul_comm y, mul_comm y, Real.exp_mul, Real.exp_log] rwa [norm_pos_iff] lemma cpow_ofReal_re (x : ℂ) (y : ℝ) : (x ^ (y : ℂ)).re = ‖x‖ ^ y * Real.cos (arg x * y) := by rw [cpow_ofReal]; generalize arg x * y = z; simp [Real.cos] lemma cpow_ofReal_im (x : ℂ) (y : ℝ) : (x ^ (y : ℂ)).im = ‖x‖ ^ y * Real.sin (arg x * y) := by rw [cpow_ofReal]; generalize arg x * y = z; simp [Real.sin] theorem norm_cpow_of_ne_zero {z : ℂ} (hz : z ≠ 0) (w : ℂ) : ‖z ^ w‖ = ‖z‖ ^ w.re / Real.exp (arg z * im w) := by rw [cpow_def_of_ne_zero hz, norm_exp, mul_re, log_re, log_im, Real.exp_sub, Real.rpow_def_of_pos (norm_pos_iff.mpr hz)]	theorem norm_cpow_of_imp {z w : ℂ} (h : z = 0 → w.re = 0 → w = 0) : ‖z ^ w‖ = ‖z‖ ^ w.re / Real.exp (arg z * im w) := by rcases ne_or_eq z 0 with (hz \| rfl) <;> [exact norm_cpow_of_ne_zero hz w; rw [norm_zero]] rcases eq_or_ne w.re 0 with hw \| hw · simp [hw, h rfl hw] · rw [Real.zero_rpow hw, zero_div, zero_cpow, norm_zero] exact ne_of_apply_ne re hw	Mathlib/Analysis/SpecialFunctions/Pow/Real.lean	284	291
/- Copyright (c) 2023 Josha Dekker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Josha Dekker -/ import Mathlib.Topology.Bases import Mathlib.Order.Filter.CountableInter import Mathlib.Topology.Compactness.SigmaCompact /-! # Lindelöf sets and Lindelöf spaces ## Main definitions We define the following properties for sets in a topological space: * `IsLindelof s`: Two definitions are possible here. The more standard definition is that every open cover that contains `s` contains a countable subcover. We choose for the equivalent definition where we require that every nontrivial filter on `s` with the countable intersection property has a clusterpoint. Equivalence is established in `isLindelof_iff_countable_subcover`. * `LindelofSpace X`: `X` is Lindelöf if it is Lindelöf as a set. * `NonLindelofSpace`: a space that is not a Lindëlof space, e.g. the Long Line. ## Main results * `isLindelof_iff_countable_subcover`: A set is Lindelöf iff every open cover has a countable subcover. ## Implementation details * This API is mainly based on the API for IsCompact and follows notation and style as much as possible. -/ open Set Filter Topology TopologicalSpace universe u v variable {X : Type u} {Y : Type v} {ι : Type*} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} section Lindelof /-- A set `s` is Lindelöf if every nontrivial filter `f` with the countable intersection property that contains `s`, has a clusterpoint in `s`. The filter-free definition is given by `isLindelof_iff_countable_subcover`. -/ def IsLindelof (s : Set X) := ∀ ⦃f⦄ [NeBot f] [CountableInterFilter f], f ≤ 𝓟 s → ∃ x ∈ s, ClusterPt x f /-- The complement to a Lindelöf set belongs to a filter `f` with the countable intersection property if it belongs to each filter `𝓝 x ⊓ f`, `x ∈ s`. -/ theorem IsLindelof.compl_mem_sets (hs : IsLindelof s) {f : Filter X} [CountableInterFilter f] (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 inf_le_right /-- The complement to a Lindelöf set belongs to a filter `f` with the countable intersection property if each `x ∈ s` has a neighborhood `t` within `s` such that `tᶜ` belongs to `f`. -/ theorem IsLindelof.compl_mem_sets_of_nhdsWithin (hs : IsLindelof s) {f : Filter X} [CountableInterFilter f] (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx ↦ ?_ rw [← disjoint_principal_right, disjoint_right_comm, (basis_sets _).disjoint_iff_left] exact hf x hx /-- If `p : Set X → Prop` is stable under restriction and union, and each point `x` of a Lindelöf set `s` has a neighborhood `t` within `s` such that `p t`, then `p s` holds. -/ @[elab_as_elim] theorem IsLindelof.induction_on (hs : IsLindelof s) {p : Set X → Prop} (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hcountable_union : ∀ (S : Set (Set X)), S.Countable → (∀ s ∈ S, p s) → p (⋃₀ S)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := ofCountableUnion p hcountable_union (fun t ht _ hsub ↦ hmono hsub ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] /-- The intersection of a Lindelöf set and a closed set is a Lindelöf set. -/ theorem IsLindelof.inter_right (hs : IsLindelof s) (ht : IsClosed t) : IsLindelof (s ∩ t) := by intro f hnf _ hstf rw [← inf_principal, le_inf_iff] at hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs hstf.1 have hxt : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono hstf.2 exact ⟨x, ⟨hsx, hxt⟩, hx⟩ /-- The intersection of a closed set and a Lindelöf set is a Lindelöf set. -/ theorem IsLindelof.inter_left (ht : IsLindelof t) (hs : IsClosed s) : IsLindelof (s ∩ t) := inter_comm t s ▸ ht.inter_right hs /-- The set difference of a Lindelöf set and an open set is a Lindelöf set. -/ theorem IsLindelof.diff (hs : IsLindelof s) (ht : IsOpen t) : IsLindelof (s \ t) := hs.inter_right (isClosed_compl_iff.mpr ht) /-- A closed subset of a Lindelöf set is a Lindelöf set. -/ theorem IsLindelof.of_isClosed_subset (hs : IsLindelof s) (ht : IsClosed t) (h : t ⊆ s) : IsLindelof t := inter_eq_self_of_subset_right h ▸ hs.inter_right ht /-- A continuous image of a Lindelöf set is a Lindelöf set. -/ theorem IsLindelof.image_of_continuousOn {f : X → Y} (hs : IsLindelof s) (hf : ContinuousOn f s) : IsLindelof (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 /-- A continuous image of a Lindelöf set is a Lindelöf set within the codomain. -/ theorem IsLindelof.image {f : X → Y} (hs : IsLindelof s) (hf : Continuous f) : IsLindelof (f '' s) := hs.image_of_continuousOn hf.continuousOn /-- A filter with the countable intersection property that is finer than the principal filter on a Lindelöf set `s` contains any open set that contains all clusterpoints of `s`. -/ theorem IsLindelof.adherence_nhdset {f : Filter X} [CountableInterFilter f] (hs : IsLindelof s) (hf₂ : f ≤ 𝓟 s) (ht₁ : IsOpen t) (ht₂ : ∀ x ∈ s, ClusterPt x f → x ∈ t) : t ∈ f := (eq_or_neBot _).casesOn mem_of_eq_bot fun _ ↦ let ⟨x, hx, hfx⟩ := @hs (f ⊓ 𝓟 tᶜ) _ _ <\| 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 _ (ht₁.mem_nhds 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 /-- For every open cover of a Lindelöf set, there exists a countable subcover. -/ theorem IsLindelof.elim_countable_subcover {ι : Type v} (hs : IsLindelof s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ r : Set ι, r.Countable ∧ (s ⊆ ⋃ i ∈ r, U i) := by have hmono : ∀ ⦃s t : Set X⦄, s ⊆ t → (∃ r : Set ι, r.Countable ∧ t ⊆ ⋃ i ∈ r, U i) → (∃ r : Set ι, r.Countable ∧ s ⊆ ⋃ i ∈ r, U i) := by intro _ _ hst ⟨r, ⟨hrcountable, hsub⟩⟩ exact ⟨r, hrcountable, Subset.trans hst hsub⟩ have hcountable_union : ∀ (S : Set (Set X)), S.Countable → (∀ s ∈ S, ∃ r : Set ι, r.Countable ∧ (s ⊆ ⋃ i ∈ r, U i)) → ∃ r : Set ι, r.Countable ∧ (⋃₀ S ⊆ ⋃ i ∈ r, U i) := by intro S hS hsr choose! r hr using hsr refine ⟨⋃ s ∈ S, r s, hS.biUnion_iff.mpr (fun s hs ↦ (hr s hs).1), ?_⟩ refine sUnion_subset ?h.right.h simp only [mem_iUnion, exists_prop, iUnion_exists, biUnion_and'] exact fun i is x hx ↦ mem_biUnion is ((hr i is).2 hx) have h_nhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, ∃ r : Set ι, r.Countable ∧ (t ⊆ ⋃ i ∈ r, U i) := by intro x hx let ⟨i, hi⟩ := mem_iUnion.1 (hsU hx) refine ⟨U i, mem_nhdsWithin_of_mem_nhds ((hUo i).mem_nhds hi), {i}, by simp, ?_⟩ simp only [mem_singleton_iff, iUnion_iUnion_eq_left] exact Subset.refl _ exact hs.induction_on hmono hcountable_union h_nhds theorem IsLindelof.elim_nhds_subcover' (hs : IsLindelof s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x ‹x ∈ s› ∈ 𝓝 x) : ∃ t : Set s, t.Countable ∧ s ⊆ ⋃ x ∈ t, U (x : s) x.2 := by have := hs.elim_countable_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 _ _⟩ rcases this with ⟨r, ⟨hr, hs⟩⟩ use r, hr apply Subset.trans hs apply iUnion₂_subset intro i hi apply Subset.trans interior_subset exact subset_iUnion_of_subset i (subset_iUnion_of_subset hi (Subset.refl _)) theorem IsLindelof.elim_nhds_subcover (hs : IsLindelof s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Set X, t.Countable ∧ (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := by let ⟨t, ⟨htc, htsub⟩⟩ := hs.elim_nhds_subcover' (fun x _ ↦ U x) hU refine ⟨↑t, Countable.image htc Subtype.val, ?_⟩ constructor · intro _ simp only [mem_image, Subtype.exists, exists_and_right, exists_eq_right, forall_exists_index] tauto · have : ⋃ x ∈ t, U ↑x = ⋃ x ∈ Subtype.val '' t, U x := biUnion_image.symm rwa [← this] /-- For every nonempty open cover of a Lindelöf set, there exists a subcover indexed by ℕ. -/	theorem IsLindelof.indexed_countable_subcover {ι : Type v} [Nonempty ι] (hs : IsLindelof s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ f : ℕ → ι, s ⊆ ⋃ n, U (f n) := by obtain ⟨c, ⟨c_count, c_cov⟩⟩ := hs.elim_countable_subcover U hUo hsU rcases c.eq_empty_or_nonempty with rfl \| c_nonempty · simp only [mem_empty_iff_false, iUnion_of_empty, iUnion_empty] at c_cov simp only [subset_eq_empty c_cov rfl, empty_subset, exists_const] obtain ⟨f, f_surj⟩ := (Set.countable_iff_exists_surjective c_nonempty).mp c_count refine ⟨fun x ↦ f x, c_cov.trans <\| iUnion₂_subset_iff.mpr (?_ : ∀ i ∈ c, U i ⊆ ⋃ n, U (f n))⟩ intro x hx obtain ⟨n, hn⟩ := f_surj ⟨x, hx⟩ exact subset_iUnion_of_subset n <\| subset_of_eq (by rw [hn])	Mathlib/Topology/Compactness/Lindelof.lean	180	191
/- Copyright (c) 2023 Kexing Ying. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kexing Ying -/ import Mathlib.Probability.Kernel.Composition.Comp /-! # Invariance of measures along a kernel We say that a measure `μ` is invariant with respect to a kernel `κ` if its push-forward along the kernel `μ.bind κ` is the same measure. ## Main definitions * `ProbabilityTheory.Kernel.Invariant`: invariance of a given measure with respect to a kernel. ## Useful lemmas * `ProbabilityTheory.Kernel.const_bind_eq_comp_const`, and `ProbabilityTheory.Kernel.comp_const_apply_eq_bind` established the relationship between the push-forward measure and the composition of kernels. -/ open MeasureTheory open scoped MeasureTheory ENNReal ProbabilityTheory namespace ProbabilityTheory variable {α β : Type*} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} namespace Kernel /-! ### Push-forward of measures along a kernel -/ @[deprecated "Use comp_add in Composition/MeasureComp" (since := "2025-02-28")] theorem bind_add (μ ν : Measure α) (κ : Kernel α β) : (μ + ν).bind κ = μ.bind κ + ν.bind κ := by ext1 s hs rw [Measure.bind_apply hs (Kernel.aemeasurable _), lintegral_add_measure, Measure.coe_add, Pi.add_apply, Measure.bind_apply hs (Kernel.aemeasurable _), Measure.bind_apply hs (Kernel.aemeasurable _)] @[deprecated "Use comp_smul in Composition/MeasureComp" (since := "2025-02-28")] theorem bind_smul (κ : Kernel α β) (μ : Measure α) (r : ℝ≥0∞) : (r • μ).bind κ = r • μ.bind κ := by ext1 s hs rw [Measure.bind_apply hs (Kernel.aemeasurable _), lintegral_smul_measure, Measure.coe_smul, Pi.smul_apply, Measure.bind_apply hs (Kernel.aemeasurable _), smul_eq_mul] theorem const_bind_eq_comp_const (κ : Kernel α β) (μ : Measure α) : const α (μ.bind κ) = κ ∘ₖ const α μ := by ext a s hs simp_rw [comp_apply' _ _ _ hs, const_apply, Measure.bind_apply hs (Kernel.aemeasurable _)]	theorem comp_const_apply_eq_bind (κ : Kernel α β) (μ : Measure α) (a : α) : (κ ∘ₖ const α μ) a = μ.bind κ := by rw [← const_apply (μ.bind κ) a, const_bind_eq_comp_const κ μ]	Mathlib/Probability/Kernel/Invariance.lean	57	60
/- 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.Algebra.Group.Action.Pi import Mathlib.Algebra.Order.AbsoluteValue.Basic import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Group.MinMax import Mathlib.Algebra.Ring.Pi import Mathlib.Data.Setoid.Basic import Mathlib.GroupTheory.GroupAction.Ring import Mathlib.Tactic.GCongr /-! # Cauchy sequences A basic theory of Cauchy sequences, used in the construction of the reals and p-adic numbers. Where applicable, lemmas that will be reused in other contexts have been stated in extra generality. There are other "versions" of Cauchyness in the library, in particular Cauchy filters in topology. This is a concrete implementation that is useful for simplicity and computability reasons. ## Important definitions * `IsCauSeq`: a predicate that says `f : ℕ → β` is Cauchy. * `CauSeq`: the type of Cauchy sequences valued in type `β` with respect to an absolute value function `abv`. ## Tags sequence, cauchy, abs val, absolute value -/ assert_not_exists Finset Module Submonoid FloorRing Module variable {α β : Type} open IsAbsoluteValue section variable [Field α] [LinearOrder α] [IsStrictOrderedRing α] [Ring β] (abv : β → α) [IsAbsoluteValue abv] theorem rat_add_continuous_lemma {ε : α} (ε0 : 0 < ε) : ∃ δ > 0, ∀ {a₁ a₂ b₁ b₂ : β}, abv (a₁ - b₁) < δ → abv (a₂ - b₂) < δ → abv (a₁ + a₂ - (b₁ + b₂)) < ε := ⟨ε / 2, half_pos ε0, fun {a₁ a₂ b₁ b₂} h₁ h₂ => by simpa [add_halves, sub_eq_add_neg, add_comm, add_left_comm, add_assoc] using lt_of_le_of_lt (abv_add abv _ _) (add_lt_add h₁ h₂)⟩ theorem rat_mul_continuous_lemma {ε K₁ K₂ : α} (ε0 : 0 < ε) : ∃ δ > 0, ∀ {a₁ a₂ b₁ b₂ : β}, abv a₁ < K₁ → abv b₂ < K₂ → abv (a₁ - b₁) < δ → abv (a₂ - b₂) < δ → abv (a₁ a₂ - b₁ * b₂) < ε := by have K0 : (0 : α) < max 1 (max K₁ K₂) := lt_of_lt_of_le zero_lt_one (le_max_left _ _) have εK := div_pos (half_pos ε0) K0 refine ⟨_, εK, fun {a₁ a₂ b₁ b₂} ha₁ hb₂ h₁ h₂ => ?_⟩ replace ha₁ := lt_of_lt_of_le ha₁ (le_trans (le_max_left _ K₂) (le_max_right 1 _)) replace hb₂ := lt_of_lt_of_le hb₂ (le_trans (le_max_right K₁ _) (le_max_right 1 _)) set M := max 1 (max K₁ K₂) have : abv (a₁ - b₁) * abv b₂ + abv (a₂ - b₂) * abv a₁ < ε / 2 / M * M + ε / 2 / M * M := by gcongr rw [← abv_mul abv, mul_comm, div_mul_cancel₀ _ (ne_of_gt K0), ← abv_mul abv, add_halves] at this simpa [sub_eq_add_neg, mul_add, add_mul, add_left_comm] using lt_of_le_of_lt (abv_add abv _ _) this theorem rat_inv_continuous_lemma {β : Type} [DivisionRing β] (abv : β → α) [IsAbsoluteValue abv] {ε K : α} (ε0 : 0 < ε) (K0 : 0 < K) : ∃ δ > 0, ∀ {a b : β}, K ≤ abv a → K ≤ abv b → abv (a - b) < δ → abv (a⁻¹ - b⁻¹) < ε := by refine ⟨K ε * K, mul_pos (mul_pos K0 ε0) K0, fun {a b} ha hb h => ?_⟩ have a0 := K0.trans_le ha have b0 := K0.trans_le hb rw [inv_sub_inv' ((abv_pos abv).1 a0) ((abv_pos abv).1 b0), abv_mul abv, abv_mul abv, abv_inv abv, abv_inv abv, abv_sub abv] refine lt_of_mul_lt_mul_left (lt_of_mul_lt_mul_right ?_ b0.le) a0.le rw [mul_assoc, inv_mul_cancel_right₀ b0.ne', ← mul_assoc, mul_inv_cancel₀ a0.ne', one_mul] refine h.trans_le ?_ gcongr end /-- A sequence is Cauchy if the distance between its entries tends to zero. -/ @[nolint unusedArguments] def IsCauSeq {α : Type} [Field α] [LinearOrder α] [IsStrictOrderedRing α] {β : Type} [Ring β] (abv : β → α) (f : ℕ → β) : Prop := ∀ ε > 0, ∃ i, ∀ j ≥ i, abv (f j - f i) < ε namespace IsCauSeq variable [Field α] [LinearOrder α] [IsStrictOrderedRing α] [Ring β] {abv : β → α} [IsAbsoluteValue abv] {f g : ℕ → β} -- see Note [nolint_ge] --@[nolint ge_or_gt] -- Porting note: restore attribute theorem cauchy₂ (hf : IsCauSeq abv f) {ε : α} (ε0 : 0 < ε) : ∃ i, ∀ j ≥ i, ∀ k ≥ i, abv (f j - f k) < ε := by refine (hf _ (half_pos ε0)).imp fun i hi j ij k ik => ?_ rw [← add_halves ε] refine lt_of_le_of_lt (abv_sub_le abv _ _ _) (add_lt_add (hi _ ij) ?_) rw [abv_sub abv]; exact hi _ ik theorem cauchy₃ (hf : IsCauSeq abv f) {ε : α} (ε0 : 0 < ε) : ∃ i, ∀ j ≥ i, ∀ k ≥ j, abv (f k - f j) < ε := let ⟨i, H⟩ := hf.cauchy₂ ε0 ⟨i, fun _ ij _ jk => H _ (le_trans ij jk) _ ij⟩ lemma bounded (hf : IsCauSeq abv f) : ∃ r, ∀ i, abv (f i) < r := by obtain ⟨i, h⟩ := hf _ zero_lt_one set R : ℕ → α := @Nat.rec (fun _ => α) (abv (f 0)) fun i c => max c (abv (f i.succ)) with hR have : ∀ i, ∀ j ≤ i, abv (f j) ≤ R i := by refine Nat.rec (by simp [hR]) ?_ rintro i hi j (rfl \| hj) · simp [R] · exact (hi j hj).trans (le_max_left _ _) refine ⟨R i + 1, fun j ↦ ?_⟩ obtain hji \| hij := le_total j i · exact (this i _ hji).trans_lt (lt_add_one _) · simpa using (abv_add abv _ _).trans_lt <\| add_lt_add_of_le_of_lt (this i _ le_rfl) (h _ hij) lemma bounded' (hf : IsCauSeq abv f) (x : α) : ∃ r > x, ∀ i, abv (f i) < r := let ⟨r, h⟩ := hf.bounded ⟨max r (x + 1), (lt_add_one x).trans_le (le_max_right _ _), fun i ↦ (h i).trans_le (le_max_left _ _)⟩ lemma const (x : β) : IsCauSeq abv fun _ ↦ x := fun ε ε0 ↦ ⟨0, fun j _ => by simpa [abv_zero] using ε0⟩ theorem add (hf : IsCauSeq abv f) (hg : IsCauSeq abv g) : IsCauSeq abv (f + g) := fun _ ε0 => let ⟨_, δ0, Hδ⟩ := rat_add_continuous_lemma abv ε0 let ⟨i, H⟩ := exists_forall_ge_and (hf.cauchy₃ δ0) (hg.cauchy₃ δ0) ⟨i, fun _ ij => let ⟨H₁, H₂⟩ := H _ le_rfl Hδ (H₁ _ ij) (H₂ _ ij)⟩ lemma mul (hf : IsCauSeq abv f) (hg : IsCauSeq abv g) : IsCauSeq abv (f * g) := fun _ ε0 => let ⟨_, _, hF⟩ := hf.bounded' 0 let ⟨_, _, hG⟩ := hg.bounded' 0 let ⟨_, δ0, Hδ⟩ := rat_mul_continuous_lemma abv ε0 let ⟨i, H⟩ := exists_forall_ge_and (hf.cauchy₃ δ0) (hg.cauchy₃ δ0) ⟨i, fun j ij => let ⟨H₁, H₂⟩ := H _ le_rfl Hδ (hF j) (hG i) (H₁ _ ij) (H₂ _ ij)⟩ @[simp] lemma _root_.isCauSeq_neg : IsCauSeq abv (-f) ↔ IsCauSeq abv f := by simp only [IsCauSeq, Pi.neg_apply, ← neg_sub', abv_neg] protected alias ⟨of_neg, neg⟩ := isCauSeq_neg end IsCauSeq /-- `CauSeq β abv` is the type of `β`-valued Cauchy sequences, with respect to the absolute value function `abv`. -/ def CauSeq {α : Type} [Field α] [LinearOrder α] [IsStrictOrderedRing α] (β : Type) [Ring β] (abv : β → α) : Type _ := { f : ℕ → β // IsCauSeq abv f } namespace CauSeq variable [Field α] [LinearOrder α] [IsStrictOrderedRing α] section Ring variable [Ring β] {abv : β → α} instance : CoeFun (CauSeq β abv) fun _ => ℕ → β := ⟨Subtype.val⟩ @[ext] theorem ext {f g : CauSeq β abv} (h : ∀ i, f i = g i) : f = g := Subtype.eq (funext h) theorem isCauSeq (f : CauSeq β abv) : IsCauSeq abv f := f.2 theorem cauchy (f : CauSeq β abv) : ∀ {ε}, 0 < ε → ∃ i, ∀ j ≥ i, abv (f j - f i) < ε := @f.2 /-- Given a Cauchy sequence `f`, create a Cauchy sequence from a sequence `g` with the same values as `f`. -/ def ofEq (f : CauSeq β abv) (g : ℕ → β) (e : ∀ i, f i = g i) : CauSeq β abv := ⟨g, fun ε => by rw [show g = f from (funext e).symm]; exact f.cauchy⟩ variable [IsAbsoluteValue abv] -- see Note [nolint_ge] -- @[nolint ge_or_gt] -- Porting note: restore attribute theorem cauchy₂ (f : CauSeq β abv) {ε} : 0 < ε → ∃ i, ∀ j ≥ i, ∀ k ≥ i, abv (f j - f k) < ε := f.2.cauchy₂ theorem cauchy₃ (f : CauSeq β abv) {ε} : 0 < ε → ∃ i, ∀ j ≥ i, ∀ k ≥ j, abv (f k - f j) < ε := f.2.cauchy₃ theorem bounded (f : CauSeq β abv) : ∃ r, ∀ i, abv (f i) < r := f.2.bounded theorem bounded' (f : CauSeq β abv) (x : α) : ∃ r > x, ∀ i, abv (f i) < r := f.2.bounded' x instance : Add (CauSeq β abv) := ⟨fun f g => ⟨f + g, f.2.add g.2⟩⟩ @[simp, norm_cast] theorem coe_add (f g : CauSeq β abv) : ⇑(f + g) = (f : ℕ → β) + g := rfl @[simp, norm_cast] theorem add_apply (f g : CauSeq β abv) (i : ℕ) : (f + g) i = f i + g i := rfl variable (abv) in /-- The constant Cauchy sequence. -/ def const (x : β) : CauSeq β abv := ⟨fun _ ↦ x, IsCauSeq.const _⟩ /-- The constant Cauchy sequence -/ local notation "const" => const abv @[simp, norm_cast] theorem coe_const (x : β) : (const x : ℕ → β) = Function.const ℕ x := rfl @[simp, norm_cast] theorem const_apply (x : β) (i : ℕ) : (const x : ℕ → β) i = x := rfl theorem const_inj {x y : β} : (const x : CauSeq β abv) = const y ↔ x = y := ⟨fun h => congr_arg (fun f : CauSeq β abv => (f : ℕ → β) 0) h, congr_arg _⟩ instance : Zero (CauSeq β abv) := ⟨const 0⟩ instance : One (CauSeq β abv) := ⟨const 1⟩ instance : Inhabited (CauSeq β abv) := ⟨0⟩ @[simp, norm_cast] theorem coe_zero : ⇑(0 : CauSeq β abv) = 0 := rfl @[simp, norm_cast] theorem coe_one : ⇑(1 : CauSeq β abv) = 1 := rfl @[simp, norm_cast] theorem zero_apply (i) : (0 : CauSeq β abv) i = 0 := rfl @[simp, norm_cast] theorem one_apply (i) : (1 : CauSeq β abv) i = 1 := rfl @[simp] theorem const_zero : const 0 = 0 := rfl @[simp] theorem const_one : const 1 = 1 := rfl theorem const_add (x y : β) : const (x + y) = const x + const y := rfl instance : Mul (CauSeq β abv) := ⟨fun f g ↦ ⟨f * g, f.2.mul g.2⟩⟩ @[simp, norm_cast] theorem coe_mul (f g : CauSeq β abv) : ⇑(f * g) = (f : ℕ → β) * g := rfl @[simp, norm_cast] theorem mul_apply (f g : CauSeq β abv) (i : ℕ) : (f * g) i = f i * g i := rfl theorem const_mul (x y : β) : const (x * y) = const x * const y := rfl instance : Neg (CauSeq β abv) := ⟨fun f ↦ ⟨-f, f.2.neg⟩⟩ @[simp, norm_cast] theorem coe_neg (f : CauSeq β abv) : ⇑(-f) = -f := rfl @[simp, norm_cast] theorem neg_apply (f : CauSeq β abv) (i) : (-f) i = -f i := rfl theorem const_neg (x : β) : const (-x) = -const x := rfl instance : Sub (CauSeq β abv) := ⟨fun f g => ofEq (f + -g) (fun x => f x - g x) fun i => by simp [sub_eq_add_neg]⟩ @[simp, norm_cast] theorem coe_sub (f g : CauSeq β abv) : ⇑(f - g) = (f : ℕ → β) - g := rfl @[simp, norm_cast] theorem sub_apply (f g : CauSeq β abv) (i : ℕ) : (f - g) i = f i - g i := rfl theorem const_sub (x y : β) : const (x - y) = const x - const y := rfl section SMul variable {G : Type} [SMul G β] [IsScalarTower G β β] instance : SMul G (CauSeq β abv) := ⟨fun a f => (ofEq (const (a • (1 : β)) f) (a • (f : ℕ → β))) fun _ => smul_one_mul _ _⟩ @[simp, norm_cast] theorem coe_smul (a : G) (f : CauSeq β abv) : ⇑(a • f) = a • (f : ℕ → β) := rfl @[simp, norm_cast] theorem smul_apply (a : G) (f : CauSeq β abv) (i : ℕ) : (a • f) i = a • f i := rfl theorem const_smul (a : G) (x : β) : const (a • x) = a • const x := rfl instance : IsScalarTower G (CauSeq β abv) (CauSeq β abv) := ⟨fun a f g => Subtype.ext <\| smul_assoc a (f : ℕ → β) (g : ℕ → β)⟩ end SMul instance addGroup : AddGroup (CauSeq β abv) := Function.Injective.addGroup Subtype.val Subtype.val_injective rfl coe_add coe_neg coe_sub (fun _ _ => coe_smul _ _) fun _ _ => coe_smul _ _ instance instNatCast : NatCast (CauSeq β abv) := ⟨fun n => const n⟩ instance instIntCast : IntCast (CauSeq β abv) := ⟨fun n => const n⟩ instance addGroupWithOne : AddGroupWithOne (CauSeq β abv) := Function.Injective.addGroupWithOne Subtype.val Subtype.val_injective rfl rfl coe_add coe_neg coe_sub (by intros; rfl) (by intros; rfl) (by intros; rfl) (by intros; rfl) instance : Pow (CauSeq β abv) ℕ := ⟨fun f n => (ofEq (npowRec n f) fun i => f i ^ n) <\| by induction n <;> simp [, npowRec, pow_succ]⟩ @[simp, norm_cast] theorem coe_pow (f : CauSeq β abv) (n : ℕ) : ⇑(f ^ n) = (f : ℕ → β) ^ n := rfl @[simp, norm_cast] theorem pow_apply (f : CauSeq β abv) (n i : ℕ) : (f ^ n) i = f i ^ n := rfl theorem const_pow (x : β) (n : ℕ) : const (x ^ n) = const x ^ n := rfl instance ring : Ring (CauSeq β abv) := Function.Injective.ring Subtype.val Subtype.val_injective rfl rfl coe_add coe_mul coe_neg coe_sub (fun _ _ => coe_smul _ _) (fun _ _ => coe_smul _ _) coe_pow (fun _ => rfl) fun _ => rfl instance {β : Type} [CommRing β] {abv : β → α} [IsAbsoluteValue abv] : CommRing (CauSeq β abv) := { CauSeq.ring with mul_comm := fun a b => ext fun n => by simp [mul_left_comm, mul_comm] } /-- `LimZero f` holds when `f` approaches 0. -/ def LimZero {abv : β → α} (f : CauSeq β abv) : Prop := ∀ ε > 0, ∃ i, ∀ j ≥ i, abv (f j) < ε theorem add_limZero {f g : CauSeq β abv} (hf : LimZero f) (hg : LimZero g) : LimZero (f + g) \| ε, ε0 => (exists_forall_ge_and (hf _ <\| half_pos ε0) (hg _ <\| half_pos ε0)).imp fun _ H j ij => by let ⟨H₁, H₂⟩ := H _ ij simpa [add_halves ε] using lt_of_le_of_lt (abv_add abv _ _) (add_lt_add H₁ H₂) theorem mul_limZero_right (f : CauSeq β abv) {g} (hg : LimZero g) : LimZero (f * g) \| ε, ε0 => let ⟨F, F0, hF⟩ := f.bounded' 0 (hg _ <\| div_pos ε0 F0).imp fun _ H j ij => by have := mul_lt_mul' (le_of_lt <\| hF j) (H _ ij) (abv_nonneg abv _) F0 rwa [mul_comm F, div_mul_cancel₀ _ (ne_of_gt F0), ← abv_mul] at this theorem mul_limZero_left {f} (g : CauSeq β abv) (hg : LimZero f) : LimZero (f * g) \| ε, ε0 => let ⟨G, G0, hG⟩ := g.bounded' 0 (hg _ <\| div_pos ε0 G0).imp fun _ H j ij => by have := mul_lt_mul'' (H _ ij) (hG j) (abv_nonneg abv _) (abv_nonneg abv _) rwa [div_mul_cancel₀ _ (ne_of_gt G0), ← abv_mul] at this theorem neg_limZero {f : CauSeq β abv} (hf : LimZero f) : LimZero (-f) := by rw [← neg_one_mul f] exact mul_limZero_right _ hf theorem sub_limZero {f g : CauSeq β abv} (hf : LimZero f) (hg : LimZero g) : LimZero (f - g) := by simpa only [sub_eq_add_neg] using add_limZero hf (neg_limZero hg) theorem limZero_sub_rev {f g : CauSeq β abv} (hfg : LimZero (f - g)) : LimZero (g - f) := by simpa using neg_limZero hfg theorem zero_limZero : LimZero (0 : CauSeq β abv) \| ε, ε0 => ⟨0, fun j _ => by simpa [abv_zero abv] using ε0⟩ theorem const_limZero {x : β} : LimZero (const x) ↔ x = 0 := ⟨fun H => (abv_eq_zero abv).1 <\| (eq_of_le_of_forall_lt_imp_le_of_dense (abv_nonneg abv _)) fun _ ε0 => let ⟨_, hi⟩ := H _ ε0 le_of_lt <\| hi _ le_rfl, fun e => e.symm ▸ zero_limZero⟩ instance equiv : Setoid (CauSeq β abv) := ⟨fun f g => LimZero (f - g), ⟨fun f => by simp [zero_limZero], fun f ε hε => by simpa using neg_limZero f ε hε, fun fg gh => by simpa using add_limZero fg gh⟩⟩ theorem add_equiv_add {f1 f2 g1 g2 : CauSeq β abv} (hf : f1 ≈ f2) (hg : g1 ≈ g2) : f1 + g1 ≈ f2 + g2 := by simpa only [← add_sub_add_comm] using add_limZero hf hg theorem neg_equiv_neg {f g : CauSeq β abv} (hf : f ≈ g) : -f ≈ -g := by simpa only [neg_sub'] using neg_limZero hf theorem sub_equiv_sub {f1 f2 g1 g2 : CauSeq β abv} (hf : f1 ≈ f2) (hg : g1 ≈ g2) : f1 - g1 ≈ f2 - g2 := by simpa only [sub_eq_add_neg] using add_equiv_add hf (neg_equiv_neg hg) theorem equiv_def₃ {f g : CauSeq β abv} (h : f ≈ g) {ε : α} (ε0 : 0 < ε) : ∃ i, ∀ j ≥ i, ∀ k ≥ j, abv (f k - g j) < ε := (exists_forall_ge_and (h _ <\| half_pos ε0) (f.cauchy₃ <\| half_pos ε0)).imp fun _ H j ij k jk => by let ⟨h₁, h₂⟩ := H _ ij have := lt_of_le_of_lt (abv_add abv (f j - g j) _) (add_lt_add h₁ (h₂ _ jk)) rwa [sub_add_sub_cancel', add_halves] at this theorem limZero_congr {f g : CauSeq β abv} (h : f ≈ g) : LimZero f ↔ LimZero g := ⟨fun l => by simpa using add_limZero (Setoid.symm h) l, fun l => by simpa using add_limZero h l⟩ theorem abv_pos_of_not_limZero {f : CauSeq β abv} (hf : ¬LimZero f) : ∃ K > 0, ∃ i, ∀ j ≥ i, K ≤ abv (f j) := by haveI := Classical.propDecidable	by_contra nk refine hf fun ε ε0 => ?_ simp? [not_forall] at nk says simp only [gt_iff_lt, ge_iff_le, not_exists, not_and, not_forall, Classical.not_imp, not_le] at nk obtain ⟨i, hi⟩ := f.cauchy₃ (half_pos ε0)	Mathlib/Algebra/Order/CauSeq/Basic.lean	437	442
/- 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 @[simp] lemma ofReal_eq_ofNat {r : ℝ} {n : ℕ} [n.AtLeastTwo] : ENNReal.ofReal r = ofNat(n) ↔ r = OfNat.ofNat n := ofReal_eq_natCast (NeZero.ne n) theorem ofReal_le_iff_le_toReal {a : ℝ} {b : ℝ≥0∞} (hb : b ≠ ∞) : ENNReal.ofReal a ≤ b ↔ a ≤ ENNReal.toReal b := by lift b to ℝ≥0 using hb simpa [ENNReal.ofReal, ENNReal.toReal] using Real.toNNReal_le_iff_le_coe theorem ofReal_lt_iff_lt_toReal {a : ℝ} {b : ℝ≥0∞} (ha : 0 ≤ a) (hb : b ≠ ∞) : ENNReal.ofReal a < b ↔ a < ENNReal.toReal b := by lift b to ℝ≥0 using hb simpa [ENNReal.ofReal, ENNReal.toReal] using Real.toNNReal_lt_iff_lt_coe ha theorem ofReal_lt_coe_iff {a : ℝ} {b : ℝ≥0} (ha : 0 ≤ a) : ENNReal.ofReal a < b ↔ a < b := (ofReal_lt_iff_lt_toReal ha coe_ne_top).trans <\| by rw [coe_toReal] theorem le_ofReal_iff_toReal_le {a : ℝ≥0∞} {b : ℝ} (ha : a ≠ ∞) (hb : 0 ≤ b) : a ≤ ENNReal.ofReal b ↔ ENNReal.toReal a ≤ b := by lift a to ℝ≥0 using ha simpa [ENNReal.ofReal, ENNReal.toReal] using Real.le_toNNReal_iff_coe_le hb theorem toReal_le_of_le_ofReal {a : ℝ≥0∞} {b : ℝ} (hb : 0 ≤ b) (h : a ≤ ENNReal.ofReal b) : ENNReal.toReal a ≤ b := have ha : a ≠ ∞ := ne_top_of_le_ne_top ofReal_ne_top h (le_ofReal_iff_toReal_le ha hb).1 h theorem lt_ofReal_iff_toReal_lt {a : ℝ≥0∞} {b : ℝ} (ha : a ≠ ∞) : a < ENNReal.ofReal b ↔ ENNReal.toReal a < b := by lift a to ℝ≥0 using ha simpa [ENNReal.ofReal, ENNReal.toReal] using Real.lt_toNNReal_iff_coe_lt theorem toReal_lt_of_lt_ofReal {b : ℝ} (h : a < ENNReal.ofReal b) : ENNReal.toReal a < b := (lt_ofReal_iff_toReal_lt h.ne_top).1 h theorem ofReal_mul {p q : ℝ} (hp : 0 ≤ p) : ENNReal.ofReal (p * q) = ENNReal.ofReal p * ENNReal.ofReal q := by simp only [ENNReal.ofReal, ← coe_mul, Real.toNNReal_mul hp] theorem ofReal_mul' {p q : ℝ} (hq : 0 ≤ q) : ENNReal.ofReal (p * q) = ENNReal.ofReal p * ENNReal.ofReal q := by rw [mul_comm, ofReal_mul hq, mul_comm] theorem ofReal_pow {p : ℝ} (hp : 0 ≤ p) (n : ℕ) : ENNReal.ofReal (p ^ n) = ENNReal.ofReal p ^ n := by rw [ofReal_eq_coe_nnreal hp, ← coe_pow, ← ofReal_coe_nnreal, NNReal.coe_pow, NNReal.coe_mk] theorem ofReal_nsmul {x : ℝ} {n : ℕ} : ENNReal.ofReal (n • x) = n • ENNReal.ofReal x := by simp only [nsmul_eq_mul, ← ofReal_natCast n, ← ofReal_mul n.cast_nonneg] @[simp] theorem toNNReal_mul {a b : ℝ≥0∞} : (a * b).toNNReal = a.toNNReal * b.toNNReal := WithTop.untopD_zero_mul a b theorem toNNReal_mul_top (a : ℝ≥0∞) : ENNReal.toNNReal (a * ∞) = 0 := by simp theorem toNNReal_top_mul (a : ℝ≥0∞) : ENNReal.toNNReal (∞ * a) = 0 := by simp /-- `ENNReal.toNNReal` as a `MonoidHom`. -/ def toNNRealHom : ℝ≥0∞ →₀ ℝ≥0 where toFun := ENNReal.toNNReal map_one' := toNNReal_coe _ map_mul' _ _ := toNNReal_mul map_zero' := toNNReal_zero @[simp] theorem toNNReal_pow (a : ℝ≥0∞) (n : ℕ) : (a ^ n).toNNReal = a.toNNReal ^ n := toNNRealHom.map_pow a n /-- `ENNReal.toReal` as a `MonoidHom`. -/ def toRealHom : ℝ≥0∞ →₀ ℝ := (NNReal.toRealHom : ℝ≥0 →₀ ℝ).comp toNNRealHom @[simp] theorem toReal_mul : (a b).toReal = a.toReal * b.toReal := toRealHom.map_mul a b theorem toReal_nsmul (a : ℝ≥0∞) (n : ℕ) : (n • a).toReal = n • a.toReal := by simp @[simp] theorem toReal_pow (a : ℝ≥0∞) (n : ℕ) : (a ^ n).toReal = a.toReal ^ n := toRealHom.map_pow a n theorem toReal_ofReal_mul (c : ℝ) (a : ℝ≥0∞) (h : 0 ≤ c) : ENNReal.toReal (ENNReal.ofReal c * a) = c * ENNReal.toReal a := by rw [ENNReal.toReal_mul, ENNReal.toReal_ofReal h] theorem toReal_mul_top (a : ℝ≥0∞) : ENNReal.toReal (a * ∞) = 0 := by rw [toReal_mul, toReal_top, mul_zero] theorem toReal_top_mul (a : ℝ≥0∞) : ENNReal.toReal (∞ * a) = 0 := by rw [mul_comm] exact toReal_mul_top _ theorem toReal_eq_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 simp only [coe_inj, NNReal.coe_inj, coe_toReal] protected theorem trichotomy (p : ℝ≥0∞) : p = 0 ∨ p = ∞ ∨ 0 < p.toReal := by simpa only [or_iff_not_imp_left] using toReal_pos protected theorem trichotomy₂ {p q : ℝ≥0∞} (hpq : p ≤ q) : p = 0 ∧ q = 0 ∨ p = 0 ∧ q = ∞ ∨ p = 0 ∧ 0 < q.toReal ∨ p = ∞ ∧ q = ∞ ∨ 0 < p.toReal ∧ q = ∞ ∨ 0 < p.toReal ∧ 0 < q.toReal ∧ p.toReal ≤ q.toReal := by rcases eq_or_lt_of_le (bot_le : 0 ≤ p) with ((rfl : 0 = p) \| (hp : 0 < p)) · simpa using q.trichotomy rcases eq_or_lt_of_le (le_top : q ≤ ∞) with (rfl \| hq) · simpa using p.trichotomy repeat' right have hq' : 0 < q := lt_of_lt_of_le hp hpq have hp' : p < ∞ := lt_of_le_of_lt hpq hq simp [ENNReal.toReal_mono hq.ne hpq, ENNReal.toReal_pos_iff, hp, hp', hq', hq] protected theorem dichotomy (p : ℝ≥0∞) [Fact (1 ≤ p)] : p = ∞ ∨ 1 ≤ p.toReal := haveI : p = ⊤ ∨ 0 < p.toReal ∧ 1 ≤ p.toReal := by simpa using ENNReal.trichotomy₂ (Fact.out : 1 ≤ p) this.imp_right fun h => h.2 theorem toReal_pos_iff_ne_top (p : ℝ≥0∞) [Fact (1 ≤ p)] : 0 < p.toReal ↔ p ≠ ∞ := ⟨fun h hp => have : (0 : ℝ) ≠ 0 := toReal_top ▸ (hp ▸ h.ne : 0 ≠ ∞.toReal) this rfl, fun h => zero_lt_one.trans_le (p.dichotomy.resolve_left h)⟩ end Real section iInf variable {ι : Sort*} {f g : ι → ℝ≥0∞} variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} theorem toNNReal_iInf (hf : ∀ i, f i ≠ ∞) : (iInf f).toNNReal = ⨅ i, (f i).toNNReal := by cases isEmpty_or_nonempty ι · rw [iInf_of_empty, toNNReal_top, NNReal.iInf_empty] · lift f to ι → ℝ≥0 using hf simp_rw [← coe_iInf, toNNReal_coe] theorem toNNReal_sInf (s : Set ℝ≥0∞) (hs : ∀ r ∈ s, r ≠ ∞) : (sInf s).toNNReal = sInf (ENNReal.toNNReal '' s) := by have hf : ∀ i, ((↑) : s → ℝ≥0∞) i ≠ ∞ := fun ⟨r, rs⟩ => hs r rs simpa only [← sInf_range, ← image_eq_range, Subtype.range_coe_subtype] using (toNNReal_iInf hf) theorem toNNReal_iSup (hf : ∀ i, f i ≠ ∞) : (iSup f).toNNReal = ⨆ i, (f i).toNNReal := by lift f to ι → ℝ≥0 using hf simp_rw [toNNReal_coe] by_cases h : BddAbove (range f) · rw [← coe_iSup h, toNNReal_coe] · rw [NNReal.iSup_of_not_bddAbove h, iSup_coe_eq_top.2 h, toNNReal_top] theorem toNNReal_sSup (s : Set ℝ≥0∞) (hs : ∀ r ∈ s, r ≠ ∞) : (sSup s).toNNReal = sSup (ENNReal.toNNReal '' s) := by have hf : ∀ i, ((↑) : s → ℝ≥0∞) i ≠ ∞ := fun ⟨r, rs⟩ => hs r rs simpa only [← sSup_range, ← image_eq_range, Subtype.range_coe_subtype] using (toNNReal_iSup hf) theorem toReal_iInf (hf : ∀ i, f i ≠ ∞) : (iInf f).toReal = ⨅ i, (f i).toReal := by simp only [ENNReal.toReal, toNNReal_iInf hf, NNReal.coe_iInf] theorem toReal_sInf (s : Set ℝ≥0∞) (hf : ∀ r ∈ s, r ≠ ∞) : (sInf s).toReal = sInf (ENNReal.toReal '' s) := by simp only [ENNReal.toReal, toNNReal_sInf s hf, NNReal.coe_sInf, Set.image_image] theorem toReal_iSup (hf : ∀ i, f i ≠ ∞) : (iSup f).toReal = ⨆ i, (f i).toReal := by simp only [ENNReal.toReal, toNNReal_iSup hf, NNReal.coe_iSup] theorem toReal_sSup (s : Set ℝ≥0∞) (hf : ∀ r ∈ s, r ≠ ∞) : (sSup s).toReal = sSup (ENNReal.toReal '' s) := by simp only [ENNReal.toReal, toNNReal_sSup s hf, NNReal.coe_sSup, Set.image_image] @[simp] lemma ofReal_iInf [Nonempty ι] (f : ι → ℝ) : ENNReal.ofReal (⨅ i, f i) = ⨅ i, ENNReal.ofReal (f i) := by obtain ⟨i, hi⟩ \| h := em (∃ i, f i ≤ 0) · rw [(iInf_eq_bot _).2 fun _ _ ↦ ⟨i, by simpa [ofReal_of_nonpos hi]⟩] simp [Real.iInf_nonpos' ⟨i, hi⟩] replace h i : 0 ≤ f i := le_of_not_le fun hi ↦ h ⟨i, hi⟩ refine eq_of_forall_le_iff fun a ↦ ?_ obtain rfl \| ha := eq_or_ne a ∞ · simp rw [le_iInf_iff, le_ofReal_iff_toReal_le ha, le_ciInf_iff ⟨0, by simpa [mem_lowerBounds]⟩] · exact forall_congr' fun i ↦ (le_ofReal_iff_toReal_le ha (h _)).symm · exact Real.iInf_nonneg h theorem iInf_add : iInf f + a = ⨅ i, f i + a := le_antisymm (le_iInf fun _ => add_le_add (iInf_le _ _) <\| le_rfl) (tsub_le_iff_right.1 <\| le_iInf fun _ => tsub_le_iff_right.2 <\| iInf_le _ _) theorem iSup_sub : (⨆ i, f i) - a = ⨆ i, f i - a := le_antisymm (tsub_le_iff_right.2 <\| iSup_le fun i => tsub_le_iff_right.1 <\| le_iSup (f · - a) i) (iSup_le fun _ => tsub_le_tsub (le_iSup _ _) (le_refl a)) theorem sub_iInf : (a - ⨅ i, f i) = ⨆ i, a - f i := by refine eq_of_forall_ge_iff fun c => ?_ rw [tsub_le_iff_right, add_comm, iInf_add] simp [tsub_le_iff_right, sub_eq_add_neg, add_comm] theorem sInf_add {s : Set ℝ≥0∞} : sInf s + a = ⨅ b ∈ s, b + a := by simp [sInf_eq_iInf, iInf_add] theorem add_iInf {a : ℝ≥0∞} : a + iInf f = ⨅ b, a + f b := by rw [add_comm, iInf_add]; simp [add_comm] theorem iInf_add_iInf (h : ∀ i j, ∃ k, f k + g k ≤ f i + g j) : iInf f + iInf g = ⨅ a, f a + g a := suffices ⨅ a, f a + g a ≤ iInf f + iInf g from le_antisymm (le_iInf fun _ => add_le_add (iInf_le _ _) (iInf_le _ _)) this calc ⨅ a, f a + g a ≤ ⨅ (a) (a'), f a + g a' := le_iInf₂ fun a a' => let ⟨k, h⟩ := h a a'; iInf_le_of_le k h _ = iInf f + iInf g := by simp_rw [iInf_add, add_iInf] end iInf theorem sup_eq_zero {a b : ℝ≥0∞} : a ⊔ b = 0 ↔ a = 0 ∧ b = 0 := sup_eq_bot_iff end ENNReal namespace Mathlib.Meta.Positivity open Lean Meta Qq /-- Extension for the `positivity` tactic: `ENNReal.ofReal`. -/ @[positivity ENNReal.ofReal _] def evalENNRealOfReal : PositivityExt where eval {u α} _zα _pα e := do match u, α, e with \| 0, ~q(ℝ≥0∞), ~q(ENNReal.ofReal $a) => let ra ← core q(inferInstance) q(inferInstance) a assertInstancesCommute match ra with \| .positive pa => pure (.positive q(Iff.mpr (@ENNReal.ofReal_pos $a) $pa)) \| _ => pure .none \| _, _, _ => throwError "not ENNReal.ofReal" end Mathlib.Meta.Positivity		Mathlib/Data/ENNReal/Real.lean	510	511
/- Copyright (c) 2014 Parikshit Khanna. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Parikshit Khanna, Jeremy Avigad, Leonardo de Moura, Floris van Doorn, Mario Carneiro -/ import Mathlib.Control.Basic import Mathlib.Data.Nat.Basic import Mathlib.Data.Option.Basic import Mathlib.Data.List.Defs import Mathlib.Data.List.Monad import Mathlib.Logic.OpClass import Mathlib.Logic.Unique import Mathlib.Order.Basic import Mathlib.Tactic.Common /-! # Basic properties of lists -/ assert_not_exists GroupWithZero assert_not_exists Lattice assert_not_exists Prod.swap_eq_iff_eq_swap assert_not_exists Ring assert_not_exists Set.range open Function open Nat hiding one_pos namespace List universe u v w variable {ι : Type} {α : Type u} {β : Type v} {γ : Type w} {l₁ l₂ : List α} /-- There is only one list of an empty type -/ instance uniqueOfIsEmpty [IsEmpty α] : Unique (List α) := { instInhabitedList with uniq := fun l => match l with \| [] => rfl \| a :: _ => isEmptyElim a } instance : Std.LawfulIdentity (α := List α) Append.append [] where left_id := nil_append right_id := append_nil instance : Std.Associative (α := List α) Append.append where assoc := append_assoc @[simp] theorem cons_injective {a : α} : Injective (cons a) := fun _ _ => tail_eq_of_cons_eq theorem singleton_injective : Injective fun a : α => [a] := fun _ _ h => (cons_eq_cons.1 h).1 theorem set_of_mem_cons (l : List α) (a : α) : { x \| x ∈ a :: l } = insert a { x \| x ∈ l } := Set.ext fun _ => mem_cons /-! ### mem -/ theorem _root_.Decidable.List.eq_or_ne_mem_of_mem [DecidableEq α] {a b : α} {l : List α} (h : a ∈ b :: l) : a = b ∨ a ≠ b ∧ a ∈ l := by by_cases hab : a = b · exact Or.inl hab · exact ((List.mem_cons.1 h).elim Or.inl (fun h => Or.inr ⟨hab, h⟩)) lemma mem_pair {a b c : α} : a ∈ [b, c] ↔ a = b ∨ a = c := by rw [mem_cons, mem_singleton] -- The simpNF linter says that the LHS can be simplified via `List.mem_map`. -- However this is a higher priority lemma. -- It seems the side condition `hf` is not applied by `simpNF`. -- https://github.com/leanprover/std4/issues/207 @[simp 1100, nolint simpNF] theorem mem_map_of_injective {f : α → β} (H : Injective f) {a : α} {l : List α} : f a ∈ map f l ↔ a ∈ l := ⟨fun m => let ⟨_, m', e⟩ := exists_of_mem_map m; H e ▸ m', mem_map_of_mem⟩ @[simp] theorem _root_.Function.Involutive.exists_mem_and_apply_eq_iff {f : α → α} (hf : Function.Involutive f) (x : α) (l : List α) : (∃ y : α, y ∈ l ∧ f y = x) ↔ f x ∈ l := ⟨by rintro ⟨y, h, rfl⟩; rwa [hf y], fun h => ⟨f x, h, hf _⟩⟩ theorem mem_map_of_involutive {f : α → α} (hf : Involutive f) {a : α} {l : List α} : a ∈ map f l ↔ f a ∈ l := by rw [mem_map, hf.exists_mem_and_apply_eq_iff] /-! ### length -/ alias ⟨_, length_pos_of_ne_nil⟩ := length_pos_iff theorem length_pos_iff_ne_nil {l : List α} : 0 < length l ↔ l ≠ [] := ⟨ne_nil_of_length_pos, length_pos_of_ne_nil⟩ theorem exists_of_length_succ {n} : ∀ l : List α, l.length = n + 1 → ∃ h t, l = h :: t \| [], H => absurd H.symm <\| succ_ne_zero n \| h :: t, _ => ⟨h, t, rfl⟩ @[simp] lemma length_injective_iff : Injective (List.length : List α → ℕ) ↔ Subsingleton α := by constructor · intro h; refine ⟨fun x y => ?_⟩; (suffices [x] = [y] by simpa using this); apply h; rfl · intros hα l1 l2 hl induction l1 generalizing l2 <;> cases l2 · rfl · cases hl · cases hl · next ih _ _ => congr · subsingleton · apply ih; simpa using hl @[simp default+1] -- Raise priority above `length_injective_iff`. lemma length_injective [Subsingleton α] : Injective (length : List α → ℕ) := length_injective_iff.mpr inferInstance theorem length_eq_two {l : List α} : l.length = 2 ↔ ∃ a b, l = [a, b] := ⟨fun _ => let [a, b] := l; ⟨a, b, rfl⟩, fun ⟨_, _, e⟩ => e ▸ rfl⟩ theorem length_eq_three {l : List α} : l.length = 3 ↔ ∃ a b c, l = [a, b, c] := ⟨fun _ => let [a, b, c] := l; ⟨a, b, c, rfl⟩, fun ⟨_, _, _, e⟩ => e ▸ rfl⟩ /-! ### set-theoretic notation of lists -/ instance instSingletonList : Singleton α (List α) := ⟨fun x => [x]⟩ instance [DecidableEq α] : Insert α (List α) := ⟨List.insert⟩ instance [DecidableEq α] : LawfulSingleton α (List α) := { insert_empty_eq := fun x => show (if x ∈ ([] : List α) then [] else [x]) = [x] from if_neg not_mem_nil } theorem singleton_eq (x : α) : ({x} : List α) = [x] := rfl theorem insert_neg [DecidableEq α] {x : α} {l : List α} (h : x ∉ l) : Insert.insert x l = x :: l := insert_of_not_mem h theorem insert_pos [DecidableEq α] {x : α} {l : List α} (h : x ∈ l) : Insert.insert x l = l := insert_of_mem h theorem doubleton_eq [DecidableEq α] {x y : α} (h : x ≠ y) : ({x, y} : List α) = [x, y] := by rw [insert_neg, singleton_eq] rwa [singleton_eq, mem_singleton] /-! ### bounded quantifiers over lists -/ theorem forall_mem_of_forall_mem_cons {p : α → Prop} {a : α} {l : List α} (h : ∀ x ∈ a :: l, p x) : ∀ x ∈ l, p x := (forall_mem_cons.1 h).2 theorem exists_mem_cons_of {p : α → Prop} {a : α} (l : List α) (h : p a) : ∃ x ∈ a :: l, p x := ⟨a, mem_cons_self, h⟩ theorem exists_mem_cons_of_exists {p : α → Prop} {a : α} {l : List α} : (∃ x ∈ l, p x) → ∃ x ∈ a :: l, p x := fun ⟨x, xl, px⟩ => ⟨x, mem_cons_of_mem _ xl, px⟩ theorem or_exists_of_exists_mem_cons {p : α → Prop} {a : α} {l : List α} : (∃ x ∈ a :: l, p x) → p a ∨ ∃ x ∈ l, p x := fun ⟨x, xal, px⟩ => Or.elim (eq_or_mem_of_mem_cons xal) (fun h : x = a => by rw [← h]; left; exact px) fun h : x ∈ l => Or.inr ⟨x, h, px⟩ theorem exists_mem_cons_iff (p : α → Prop) (a : α) (l : List α) : (∃ x ∈ a :: l, p x) ↔ p a ∨ ∃ x ∈ l, p x := Iff.intro or_exists_of_exists_mem_cons fun h => Or.elim h (exists_mem_cons_of l) exists_mem_cons_of_exists /-! ### list subset -/ theorem cons_subset_of_subset_of_mem {a : α} {l m : List α} (ainm : a ∈ m) (lsubm : l ⊆ m) : a::l ⊆ m := cons_subset.2 ⟨ainm, lsubm⟩ theorem append_subset_of_subset_of_subset {l₁ l₂ l : List α} (l₁subl : l₁ ⊆ l) (l₂subl : l₂ ⊆ l) : l₁ ++ l₂ ⊆ l := fun _ h ↦ (mem_append.1 h).elim (@l₁subl _) (@l₂subl _) theorem map_subset_iff {l₁ l₂ : List α} (f : α → β) (h : Injective f) : map f l₁ ⊆ map f l₂ ↔ l₁ ⊆ l₂ := by refine ⟨?_, map_subset f⟩; intro h2 x hx rcases mem_map.1 (h2 (mem_map_of_mem hx)) with ⟨x', hx', hxx'⟩ cases h hxx'; exact hx' /-! ### append -/ theorem append_eq_has_append {L₁ L₂ : List α} : List.append L₁ L₂ = L₁ ++ L₂ := rfl theorem append_right_injective (s : List α) : Injective fun t ↦ s ++ t := fun _ _ ↦ append_cancel_left theorem append_left_injective (t : List α) : Injective fun s ↦ s ++ t := fun _ _ ↦ append_cancel_right /-! ### replicate -/ theorem eq_replicate_length {a : α} : ∀ {l : List α}, l = replicate l.length a ↔ ∀ b ∈ l, b = a \| [] => by simp \| (b :: l) => by simp [eq_replicate_length, replicate_succ] theorem replicate_add (m n) (a : α) : replicate (m + n) a = replicate m a ++ replicate n a := by rw [replicate_append_replicate] theorem replicate_subset_singleton (n) (a : α) : replicate n a ⊆ [a] := fun _ h => mem_singleton.2 (eq_of_mem_replicate h) theorem subset_singleton_iff {a : α} {L : List α} : L ⊆ [a] ↔ ∃ n, L = replicate n a := by simp only [eq_replicate_iff, subset_def, mem_singleton, exists_eq_left'] theorem replicate_right_injective {n : ℕ} (hn : n ≠ 0) : Injective (@replicate α n) := fun _ _ h => (eq_replicate_iff.1 h).2 _ <\| mem_replicate.2 ⟨hn, rfl⟩ theorem replicate_right_inj {a b : α} {n : ℕ} (hn : n ≠ 0) : replicate n a = replicate n b ↔ a = b := (replicate_right_injective hn).eq_iff theorem replicate_right_inj' {a b : α} : ∀ {n}, replicate n a = replicate n b ↔ n = 0 ∨ a = b \| 0 => by simp \| n + 1 => (replicate_right_inj n.succ_ne_zero).trans <\| by simp only [n.succ_ne_zero, false_or] theorem replicate_left_injective (a : α) : Injective (replicate · a) := LeftInverse.injective (length_replicate (n := ·)) theorem replicate_left_inj {a : α} {n m : ℕ} : replicate n a = replicate m a ↔ n = m := (replicate_left_injective a).eq_iff @[simp] theorem head?_flatten_replicate {n : ℕ} (h : n ≠ 0) (l : List α) : (List.replicate n l).flatten.head? = l.head? := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero h induction l <;> simp [replicate] @[simp] theorem getLast?_flatten_replicate {n : ℕ} (h : n ≠ 0) (l : List α) : (List.replicate n l).flatten.getLast? = l.getLast? := by rw [← List.head?_reverse, ← List.head?_reverse, List.reverse_flatten, List.map_replicate, List.reverse_replicate, head?_flatten_replicate h] /-! ### pure -/ theorem mem_pure (x y : α) : x ∈ (pure y : List α) ↔ x = y := by simp /-! ### bind -/ @[simp] theorem bind_eq_flatMap {α β} (f : α → List β) (l : List α) : l >>= f = l.flatMap f := rfl /-! ### concat -/ /-! ### reverse -/ theorem reverse_cons' (a : α) (l : List α) : reverse (a :: l) = concat (reverse l) a := by simp only [reverse_cons, concat_eq_append] theorem reverse_concat' (l : List α) (a : α) : (l ++ [a]).reverse = a :: l.reverse := by rw [reverse_append]; rfl @[simp] theorem reverse_singleton (a : α) : reverse [a] = [a] := rfl @[simp] theorem reverse_involutive : Involutive (@reverse α) := reverse_reverse @[simp] theorem reverse_injective : Injective (@reverse α) := reverse_involutive.injective theorem reverse_surjective : Surjective (@reverse α) := reverse_involutive.surjective theorem reverse_bijective : Bijective (@reverse α) := reverse_involutive.bijective theorem concat_eq_reverse_cons (a : α) (l : List α) : concat l a = reverse (a :: reverse l) := by simp only [concat_eq_append, reverse_cons, reverse_reverse] theorem map_reverseAux (f : α → β) (l₁ l₂ : List α) : map f (reverseAux l₁ l₂) = reverseAux (map f l₁) (map f l₂) := by simp only [reverseAux_eq, map_append, map_reverse] -- TODO: Rename `List.reverse_perm` to `List.reverse_perm_self` @[simp] lemma reverse_perm' : l₁.reverse ~ l₂ ↔ l₁ ~ l₂ where mp := l₁.reverse_perm.symm.trans mpr := l₁.reverse_perm.trans @[simp] lemma perm_reverse : l₁ ~ l₂.reverse ↔ l₁ ~ l₂ where mp hl := hl.trans l₂.reverse_perm mpr hl := hl.trans l₂.reverse_perm.symm /-! ### getLast -/ attribute [simp] getLast_cons theorem getLast_append_singleton {a : α} (l : List α) : getLast (l ++ [a]) (append_ne_nil_of_right_ne_nil l (cons_ne_nil a _)) = a := by simp [getLast_append] theorem getLast_append_of_right_ne_nil (l₁ l₂ : List α) (h : l₂ ≠ []) : getLast (l₁ ++ l₂) (append_ne_nil_of_right_ne_nil l₁ h) = getLast l₂ h := by induction l₁ with \| nil => simp \| cons _ _ ih => simp only [cons_append]; rw [List.getLast_cons]; exact ih @[deprecated (since := "2025-02-06")] alias getLast_append' := getLast_append_of_right_ne_nil theorem getLast_concat' {a : α} (l : List α) : getLast (concat l a) (by simp) = a := by simp @[simp] theorem getLast_singleton' (a : α) : getLast [a] (cons_ne_nil a []) = a := rfl @[simp] theorem getLast_cons_cons (a₁ a₂ : α) (l : List α) : getLast (a₁ :: a₂ :: l) (cons_ne_nil _ _) = getLast (a₂ :: l) (cons_ne_nil a₂ l) := rfl theorem dropLast_append_getLast : ∀ {l : List α} (h : l ≠ []), dropLast l ++ [getLast l h] = l \| [], h => absurd rfl h \| [_], _ => rfl \| a :: b :: l, h => by rw [dropLast_cons₂, cons_append, getLast_cons (cons_ne_nil _ _)] congr exact dropLast_append_getLast (cons_ne_nil b l) theorem getLast_congr {l₁ l₂ : List α} (h₁ : l₁ ≠ []) (h₂ : l₂ ≠ []) (h₃ : l₁ = l₂) : getLast l₁ h₁ = getLast l₂ h₂ := by subst l₁; rfl theorem getLast_replicate_succ (m : ℕ) (a : α) : (replicate (m + 1) a).getLast (ne_nil_of_length_eq_add_one length_replicate) = a := by simp only [replicate_succ'] exact getLast_append_singleton _ @[deprecated (since := "2025-02-07")] alias getLast_filter' := getLast_filter_of_pos /-! ### getLast? -/ theorem mem_getLast?_eq_getLast : ∀ {l : List α} {x : α}, x ∈ l.getLast? → ∃ h, x = getLast l h \| [], x, hx => False.elim <\| by simp at hx \| [a], x, hx => have : a = x := by simpa using hx this ▸ ⟨cons_ne_nil a [], rfl⟩ \| a :: b :: l, x, hx => by rw [getLast?_cons_cons] at hx rcases mem_getLast?_eq_getLast hx with ⟨_, h₂⟩ use cons_ne_nil _ _ assumption theorem getLast?_eq_getLast_of_ne_nil : ∀ {l : List α} (h : l ≠ []), l.getLast? = some (l.getLast h) \| [], h => (h rfl).elim \| [_], _ => rfl \| _ :: b :: l, _ => @getLast?_eq_getLast_of_ne_nil (b :: l) (cons_ne_nil _ _) theorem mem_getLast?_cons {x y : α} : ∀ {l : List α}, x ∈ l.getLast? → x ∈ (y :: l).getLast? \| [], _ => by contradiction \| _ :: _, h => h theorem dropLast_append_getLast? : ∀ {l : List α}, ∀ a ∈ l.getLast?, dropLast l ++ [a] = l \| [], a, ha => (Option.not_mem_none a ha).elim \| [a], _, rfl => rfl \| a :: b :: l, c, hc => by rw [getLast?_cons_cons] at hc rw [dropLast_cons₂, cons_append, dropLast_append_getLast? _ hc] theorem getLastI_eq_getLast? [Inhabited α] : ∀ l : List α, l.getLastI = l.getLast?.iget \| [] => by simp [getLastI, Inhabited.default] \| [_] => rfl \| [_, _] => rfl \| [_, _, _] => rfl \| _ :: _ :: c :: l => by simp [getLastI, getLastI_eq_getLast? (c :: l)] theorem getLast?_append_cons : ∀ (l₁ : List α) (a : α) (l₂ : List α), getLast? (l₁ ++ a :: l₂) = getLast? (a :: l₂) \| [], _, _ => rfl \| [_], _, _ => rfl \| b :: c :: l₁, a, l₂ => by rw [cons_append, cons_append, getLast?_cons_cons, ← cons_append, getLast?_append_cons (c :: l₁)] theorem getLast?_append_of_ne_nil (l₁ : List α) : ∀ {l₂ : List α} (_ : l₂ ≠ []), getLast? (l₁ ++ l₂) = getLast? l₂ \| [], hl₂ => by contradiction \| b :: l₂, _ => getLast?_append_cons l₁ b l₂ theorem mem_getLast?_append_of_mem_getLast? {l₁ l₂ : List α} {x : α} (h : x ∈ l₂.getLast?) : x ∈ (l₁ ++ l₂).getLast? := by cases l₂ · contradiction · rw [List.getLast?_append_cons] exact h /-! ### head(!?) and tail -/ @[simp] theorem head!_nil [Inhabited α] : ([] : List α).head! = default := rfl @[simp] theorem head_cons_tail (x : List α) (h : x ≠ []) : x.head h :: x.tail = x := by cases x <;> simp at h ⊢ theorem head_eq_getElem_zero {l : List α} (hl : l ≠ []) : l.head hl = l[0]'(length_pos_iff.2 hl) := (getElem_zero _).symm theorem head!_eq_head? [Inhabited α] (l : List α) : head! l = (head? l).iget := by cases l <;> rfl theorem surjective_head! [Inhabited α] : Surjective (@head! α _) := fun x => ⟨[x], rfl⟩ theorem surjective_head? : Surjective (@head? α) := Option.forall.2 ⟨⟨[], rfl⟩, fun x => ⟨[x], rfl⟩⟩ theorem surjective_tail : Surjective (@tail α) \| [] => ⟨[], rfl⟩ \| a :: l => ⟨a :: a :: l, rfl⟩ theorem eq_cons_of_mem_head? {x : α} : ∀ {l : List α}, x ∈ l.head? → l = x :: tail l \| [], h => (Option.not_mem_none _ h).elim \| a :: l, h => by simp only [head?, Option.mem_def, Option.some_inj] at h exact h ▸ rfl @[simp] theorem head!_cons [Inhabited α] (a : α) (l : List α) : head! (a :: l) = a := rfl @[simp] theorem head!_append [Inhabited α] (t : List α) {s : List α} (h : s ≠ []) : head! (s ++ t) = head! s := by induction s · contradiction · rfl theorem mem_head?_append_of_mem_head? {s t : List α} {x : α} (h : x ∈ s.head?) : x ∈ (s ++ t).head? := by cases s · contradiction · exact h theorem head?_append_of_ne_nil : ∀ (l₁ : List α) {l₂ : List α} (_ : l₁ ≠ []), head? (l₁ ++ l₂) = head? l₁ \| _ :: _, _, _ => rfl theorem tail_append_singleton_of_ne_nil {a : α} {l : List α} (h : l ≠ nil) : tail (l ++ [a]) = tail l ++ [a] := by induction l · contradiction · rw [tail, cons_append, tail] theorem cons_head?_tail : ∀ {l : List α} {a : α}, a ∈ head? l → a :: tail l = l \| [], a, h => by contradiction \| b :: l, a, h => by simp? at h says simp only [head?_cons, Option.mem_def, Option.some.injEq] at h simp [h] theorem head!_mem_head? [Inhabited α] : ∀ {l : List α}, l ≠ [] → head! l ∈ head? l \| [], h => by contradiction \| _ :: _, _ => rfl theorem cons_head!_tail [Inhabited α] {l : List α} (h : l ≠ []) : head! l :: tail l = l := cons_head?_tail (head!_mem_head? h) theorem head!_mem_self [Inhabited α] {l : List α} (h : l ≠ nil) : l.head! ∈ l := by have h' : l.head! ∈ l.head! :: l.tail := mem_cons_self rwa [cons_head!_tail h] at h' theorem get_eq_getElem? (l : List α) (i : Fin l.length) : l.get i = l[i]?.get (by simp [getElem?_eq_getElem]) := by simp @[deprecated (since := "2025-02-15")] alias get_eq_get? := get_eq_getElem? theorem exists_mem_iff_getElem {l : List α} {p : α → Prop} : (∃ x ∈ l, p x) ↔ ∃ (i : ℕ) (_ : i < l.length), p l[i] := by simp only [mem_iff_getElem] exact ⟨fun ⟨_x, ⟨i, hi, hix⟩, hxp⟩ ↦ ⟨i, hi, hix ▸ hxp⟩, fun ⟨i, hi, hp⟩ ↦ ⟨_, ⟨i, hi, rfl⟩, hp⟩⟩ theorem forall_mem_iff_getElem {l : List α} {p : α → Prop} : (∀ x ∈ l, p x) ↔ ∀ (i : ℕ) (_ : i < l.length), p l[i] := by simp [mem_iff_getElem, @forall_swap α] theorem get_tail (l : List α) (i) (h : i < l.tail.length) (h' : i + 1 < l.length := (by simp only [length_tail] at h; omega)) : l.tail.get ⟨i, h⟩ = l.get ⟨i + 1, h'⟩ := by cases l <;> [cases h; rfl] /-! ### sublists -/ attribute [refl] List.Sublist.refl theorem Sublist.cons_cons {l₁ l₂ : List α} (a : α) (s : l₁ <+ l₂) : a :: l₁ <+ a :: l₂ := Sublist.cons₂ _ s lemma cons_sublist_cons' {a b : α} : a :: l₁ <+ b :: l₂ ↔ a :: l₁ <+ l₂ ∨ a = b ∧ l₁ <+ l₂ := by constructor · rintro (_ \| _) · exact Or.inl ‹_› · exact Or.inr ⟨rfl, ‹_›⟩ · rintro (h \| ⟨rfl, h⟩) · exact h.cons _ · rwa [cons_sublist_cons] theorem sublist_cons_of_sublist (a : α) (h : l₁ <+ l₂) : l₁ <+ a :: l₂ := h.cons _ @[deprecated (since := "2025-02-07")] alias sublist_nil_iff_eq_nil := sublist_nil @[simp] lemma sublist_singleton {l : List α} {a : α} : l <+ [a] ↔ l = [] ∨ l = [a] := by constructor <;> rintro (_ \| _) <;> aesop theorem Sublist.antisymm (s₁ : l₁ <+ l₂) (s₂ : l₂ <+ l₁) : l₁ = l₂ := s₁.eq_of_length_le s₂.length_le /-- If the first element of two lists are different, then a sublist relation can be reduced. -/ theorem Sublist.of_cons_of_ne {a b} (h₁ : a ≠ b) (h₂ : a :: l₁ <+ b :: l₂) : a :: l₁ <+ l₂ := match h₁, h₂ with \| _, .cons _ h => h /-! ### indexOf -/ section IndexOf variable [DecidableEq α] theorem idxOf_cons_eq {a b : α} (l : List α) : b = a → idxOf a (b :: l) = 0 \| e => by rw [← e]; exact idxOf_cons_self @[deprecated (since := "2025-01-30")] alias indexOf_cons_eq := idxOf_cons_eq @[simp] theorem idxOf_cons_ne {a b : α} (l : List α) : b ≠ a → idxOf a (b :: l) = succ (idxOf a l) \| h => by simp only [idxOf_cons, Bool.cond_eq_ite, beq_iff_eq, if_neg h] @[deprecated (since := "2025-01-30")] alias indexOf_cons_ne := idxOf_cons_ne theorem idxOf_eq_length_iff {a : α} {l : List α} : idxOf a l = length l ↔ a ∉ l := by induction l with \| nil => exact iff_of_true rfl not_mem_nil \| cons b l ih => simp only [length, mem_cons, idxOf_cons, eq_comm] rw [cond_eq_if] split_ifs with h <;> simp at h · exact iff_of_false (by rintro ⟨⟩) fun H => H <\| Or.inl h.symm · simp only [Ne.symm h, false_or] rw [← ih] exact succ_inj @[simp] theorem idxOf_of_not_mem {l : List α} {a : α} : a ∉ l → idxOf a l = length l := idxOf_eq_length_iff.2 @[deprecated (since := "2025-01-30")] alias indexOf_of_not_mem := idxOf_of_not_mem theorem idxOf_le_length {a : α} {l : List α} : idxOf a l ≤ length l := by induction l with \| nil => rfl \| cons b l ih => ?_ simp only [length, idxOf_cons, cond_eq_if, beq_iff_eq] by_cases h : b = a · rw [if_pos h]; exact Nat.zero_le _ · rw [if_neg h]; exact succ_le_succ ih @[deprecated (since := "2025-01-30")] alias indexOf_le_length := idxOf_le_length theorem idxOf_lt_length_iff {a} {l : List α} : idxOf a l < length l ↔ a ∈ l := ⟨fun h => Decidable.byContradiction fun al => Nat.ne_of_lt h <\| idxOf_eq_length_iff.2 al, fun al => (lt_of_le_of_ne idxOf_le_length) fun h => idxOf_eq_length_iff.1 h al⟩ @[deprecated (since := "2025-01-30")] alias indexOf_lt_length_iff := idxOf_lt_length_iff theorem idxOf_append_of_mem {a : α} (h : a ∈ l₁) : idxOf a (l₁ ++ l₂) = idxOf a l₁ := by induction l₁ with \| nil => exfalso exact not_mem_nil h \| cons d₁ t₁ ih => rw [List.cons_append] by_cases hh : d₁ = a · iterate 2 rw [idxOf_cons_eq _ hh] rw [idxOf_cons_ne _ hh, idxOf_cons_ne _ hh, ih (mem_of_ne_of_mem (Ne.symm hh) h)] @[deprecated (since := "2025-01-30")] alias indexOf_append_of_mem := idxOf_append_of_mem theorem idxOf_append_of_not_mem {a : α} (h : a ∉ l₁) : idxOf a (l₁ ++ l₂) = l₁.length + idxOf a l₂ := by induction l₁ with \| nil => rw [List.nil_append, List.length, Nat.zero_add] \| cons d₁ t₁ ih => rw [List.cons_append, idxOf_cons_ne _ (ne_of_not_mem_cons h).symm, List.length, ih (not_mem_of_not_mem_cons h), Nat.succ_add] @[deprecated (since := "2025-01-30")] alias indexOf_append_of_not_mem := idxOf_append_of_not_mem end IndexOf /-! ### nth element -/ section deprecated @[simp] theorem getElem?_length (l : List α) : l[l.length]? = none := getElem?_eq_none le_rfl /-- A version of `getElem_map` that can be used for rewriting. -/ theorem getElem_map_rev (f : α → β) {l} {n : Nat} {h : n < l.length} : f l[n] = (map f l)[n]'((l.length_map f).symm ▸ h) := Eq.symm (getElem_map _) theorem get_length_sub_one {l : List α} (h : l.length - 1 < l.length) : l.get ⟨l.length - 1, h⟩ = l.getLast (by rintro rfl; exact Nat.lt_irrefl 0 h) := (getLast_eq_getElem _).symm theorem take_one_drop_eq_of_lt_length {l : List α} {n : ℕ} (h : n < l.length) : (l.drop n).take 1 = [l.get ⟨n, h⟩] := by rw [drop_eq_getElem_cons h, take, take] simp theorem ext_getElem?' {l₁ l₂ : List α} (h' : ∀ n < max l₁.length l₂.length, l₁[n]? = l₂[n]?) : l₁ = l₂ := by apply ext_getElem? intro n rcases Nat.lt_or_ge n <\| max l₁.length l₂.length with hn \| hn · exact h' n hn · simp_all [Nat.max_le, getElem?_eq_none] @[deprecated (since := "2025-02-15")] alias ext_get?' := ext_getElem?' @[deprecated (since := "2025-02-15")] alias ext_get?_iff := List.ext_getElem?_iff theorem ext_get_iff {l₁ l₂ : List α} : l₁ = l₂ ↔ l₁.length = l₂.length ∧ ∀ n h₁ h₂, get l₁ ⟨n, h₁⟩ = get l₂ ⟨n, h₂⟩ := by constructor · rintro rfl exact ⟨rfl, fun _ _ _ ↦ rfl⟩ · intro ⟨h₁, h₂⟩ exact ext_get h₁ h₂ theorem ext_getElem?_iff' {l₁ l₂ : List α} : l₁ = l₂ ↔ ∀ n < max l₁.length l₂.length, l₁[n]? = l₂[n]? := ⟨by rintro rfl _ _; rfl, ext_getElem?'⟩ @[deprecated (since := "2025-02-15")] alias ext_get?_iff' := ext_getElem?_iff' /-- If two lists `l₁` and `l₂` are the same length and `l₁[n]! = l₂[n]!` for all `n`, then the lists are equal. -/ theorem ext_getElem! [Inhabited α] (hl : length l₁ = length l₂) (h : ∀ n : ℕ, l₁[n]! = l₂[n]!) : l₁ = l₂ := ext_getElem hl fun n h₁ h₂ ↦ by simpa only [← getElem!_pos] using h n @[simp] theorem getElem_idxOf [DecidableEq α] {a : α} : ∀ {l : List α} (h : idxOf a l < l.length), l[idxOf a l] = a \| b :: l, h => by by_cases h' : b = a <;> simp [h', if_pos, if_false, getElem_idxOf] @[deprecated (since := "2025-01-30")] alias getElem_indexOf := getElem_idxOf -- This is incorrectly named and should be `get_idxOf`; -- this already exists, so will require a deprecation dance. theorem idxOf_get [DecidableEq α] {a : α} {l : List α} (h) : get l ⟨idxOf a l, h⟩ = a := by simp @[deprecated (since := "2025-01-30")] alias indexOf_get := idxOf_get @[simp] theorem getElem?_idxOf [DecidableEq α] {a : α} {l : List α} (h : a ∈ l) : l[idxOf a l]? = some a := by rw [getElem?_eq_getElem, getElem_idxOf (idxOf_lt_length_iff.2 h)] @[deprecated (since := "2025-01-30")] alias getElem?_indexOf := getElem?_idxOf @[deprecated (since := "2025-02-15")] alias idxOf_get? := getElem?_idxOf @[deprecated (since := "2025-01-30")] alias indexOf_get? := getElem?_idxOf theorem idxOf_inj [DecidableEq α] {l : List α} {x y : α} (hx : x ∈ l) (hy : y ∈ l) : idxOf x l = idxOf y l ↔ x = y := ⟨fun h => by have x_eq_y : get l ⟨idxOf x l, idxOf_lt_length_iff.2 hx⟩ = get l ⟨idxOf y l, idxOf_lt_length_iff.2 hy⟩ := by simp only [h] simp only [idxOf_get] at x_eq_y; exact x_eq_y, fun h => by subst h; rfl⟩ @[deprecated (since := "2025-01-30")] alias indexOf_inj := idxOf_inj theorem get_reverse' (l : List α) (n) (hn') : l.reverse.get n = l.get ⟨l.length - 1 - n, hn'⟩ := by simp theorem eq_cons_of_length_one {l : List α} (h : l.length = 1) : l = [l.get ⟨0, by omega⟩] := by refine ext_get (by convert h) fun n h₁ h₂ => ?_ simp congr omega end deprecated @[simp] theorem getElem_set_of_ne {l : List α} {i j : ℕ} (h : i ≠ j) (a : α) (hj : j < (l.set i a).length) : (l.set i a)[j] = l[j]'(by simpa using hj) := by rw [← Option.some_inj, ← List.getElem?_eq_getElem, List.getElem?_set_ne h, List.getElem?_eq_getElem] /-! ### map -/ -- `List.map_const` (the version with `Function.const` instead of a lambda) is already tagged -- `simp` in Core -- TODO: Upstream the tagging to Core? attribute [simp] map_const' theorem flatMap_pure_eq_map (f : α → β) (l : List α) : l.flatMap (pure ∘ f) = map f l := .symm <\| map_eq_flatMap .. theorem flatMap_congr {l : List α} {f g : α → List β} (h : ∀ x ∈ l, f x = g x) : l.flatMap f = l.flatMap g := (congr_arg List.flatten <\| map_congr_left h :) theorem infix_flatMap_of_mem {a : α} {as : List α} (h : a ∈ as) (f : α → List α) : f a <:+: as.flatMap f := infix_of_mem_flatten (mem_map_of_mem h) @[simp] theorem map_eq_map {α β} (f : α → β) (l : List α) : f <$> l = map f l := rfl /-- A single `List.map` of a composition of functions is equal to composing a `List.map` with another `List.map`, fully applied. This is the reverse direction of `List.map_map`. -/ theorem comp_map (h : β → γ) (g : α → β) (l : List α) : map (h ∘ g) l = map h (map g l) := map_map.symm /-- Composing a `List.map` with another `List.map` is equal to a single `List.map` of composed functions. -/ @[simp] theorem map_comp_map (g : β → γ) (f : α → β) : map g ∘ map f = map (g ∘ f) := by ext l; rw [comp_map, Function.comp_apply] section map_bijectivity theorem _root_.Function.LeftInverse.list_map {f : α → β} {g : β → α} (h : LeftInverse f g) : LeftInverse (map f) (map g) \| [] => by simp_rw [map_nil] \| x :: xs => by simp_rw [map_cons, h x, h.list_map xs] nonrec theorem _root_.Function.RightInverse.list_map {f : α → β} {g : β → α} (h : RightInverse f g) : RightInverse (map f) (map g) := h.list_map nonrec theorem _root_.Function.Involutive.list_map {f : α → α} (h : Involutive f) : Involutive (map f) := Function.LeftInverse.list_map h @[simp] theorem map_leftInverse_iff {f : α → β} {g : β → α} : LeftInverse (map f) (map g) ↔ LeftInverse f g := ⟨fun h x => by injection h [x], (·.list_map)⟩ @[simp] theorem map_rightInverse_iff {f : α → β} {g : β → α} : RightInverse (map f) (map g) ↔ RightInverse f g := map_leftInverse_iff @[simp] theorem map_involutive_iff {f : α → α} : Involutive (map f) ↔ Involutive f := map_leftInverse_iff theorem _root_.Function.Injective.list_map {f : α → β} (h : Injective f) : Injective (map f) \| [], [], _ => rfl \| x :: xs, y :: ys, hxy => by injection hxy with hxy hxys rw [h hxy, h.list_map hxys] @[simp] theorem map_injective_iff {f : α → β} : Injective (map f) ↔ Injective f := by refine ⟨fun h x y hxy => ?_, (·.list_map)⟩ suffices [x] = [y] by simpa using this apply h simp [hxy] theorem _root_.Function.Surjective.list_map {f : α → β} (h : Surjective f) : Surjective (map f) := let ⟨_, h⟩ := h.hasRightInverse; h.list_map.surjective @[simp] theorem map_surjective_iff {f : α → β} : Surjective (map f) ↔ Surjective f := by refine ⟨fun h x => ?_, (·.list_map)⟩ let ⟨[y], hxy⟩ := h [x] exact ⟨_, List.singleton_injective hxy⟩ theorem _root_.Function.Bijective.list_map {f : α → β} (h : Bijective f) : Bijective (map f) := ⟨h.1.list_map, h.2.list_map⟩ @[simp] theorem map_bijective_iff {f : α → β} : Bijective (map f) ↔ Bijective f := by simp_rw [Function.Bijective, map_injective_iff, map_surjective_iff] end map_bijectivity theorem eq_of_mem_map_const {b₁ b₂ : β} {l : List α} (h : b₁ ∈ map (const α b₂) l) : b₁ = b₂ := by rw [map_const] at h; exact eq_of_mem_replicate h /-- `eq_nil_or_concat` in simp normal form -/ lemma eq_nil_or_concat' (l : List α) : l = [] ∨ ∃ L b, l = L ++ [b] := by simpa using l.eq_nil_or_concat /-! ### foldl, foldr -/ theorem foldl_ext (f g : α → β → α) (a : α) {l : List β} (H : ∀ a : α, ∀ b ∈ l, f a b = g a b) : foldl f a l = foldl g a l := by induction l generalizing a with \| nil => rfl \| cons hd tl ih => unfold foldl rw [ih _ fun a b bin => H a b <\| mem_cons_of_mem _ bin, H a hd mem_cons_self] theorem foldr_ext (f g : α → β → β) (b : β) {l : List α} (H : ∀ a ∈ l, ∀ b : β, f a b = g a b) : foldr f b l = foldr g b l := by induction l with \| nil => rfl \| cons hd tl ih => ?_ simp only [mem_cons, or_imp, forall_and, forall_eq] at H simp only [foldr, ih H.2, H.1] theorem foldl_concat (f : β → α → β) (b : β) (x : α) (xs : List α) : List.foldl f b (xs ++ [x]) = f (List.foldl f b xs) x := by simp only [List.foldl_append, List.foldl] theorem foldr_concat (f : α → β → β) (b : β) (x : α) (xs : List α) : List.foldr f b (xs ++ [x]) = (List.foldr f (f x b) xs) := by simp only [List.foldr_append, List.foldr] theorem foldl_fixed' {f : α → β → α} {a : α} (hf : ∀ b, f a b = a) : ∀ l : List β, foldl f a l = a \| [] => rfl \| b :: l => by rw [foldl_cons, hf b, foldl_fixed' hf l] theorem foldr_fixed' {f : α → β → β} {b : β} (hf : ∀ a, f a b = b) : ∀ l : List α, foldr f b l = b \| [] => rfl \| a :: l => by rw [foldr_cons, foldr_fixed' hf l, hf a] @[simp] theorem foldl_fixed {a : α} : ∀ l : List β, foldl (fun a _ => a) a l = a := foldl_fixed' fun _ => rfl @[simp] theorem foldr_fixed {b : β} : ∀ l : List α, foldr (fun _ b => b) b l = b := foldr_fixed' fun _ => rfl @[deprecated foldr_cons_nil (since := "2025-02-10")] theorem foldr_eta (l : List α) : foldr cons [] l = l := foldr_cons_nil theorem reverse_foldl {l : List α} : reverse (foldl (fun t h => h :: t) [] l) = l := by simp theorem foldl_hom₂ (l : List ι) (f : α → β → γ) (op₁ : α → ι → α) (op₂ : β → ι → β) (op₃ : γ → ι → γ) (a : α) (b : β) (h : ∀ a b i, f (op₁ a i) (op₂ b i) = op₃ (f a b) i) : foldl op₃ (f a b) l = f (foldl op₁ a l) (foldl op₂ b l) := Eq.symm <\| by revert a b induction l <;> intros <;> [rfl; simp only [, foldl]] theorem foldr_hom₂ (l : List ι) (f : α → β → γ) (op₁ : ι → α → α) (op₂ : ι → β → β) (op₃ : ι → γ → γ) (a : α) (b : β) (h : ∀ a b i, f (op₁ i a) (op₂ i b) = op₃ i (f a b)) : foldr op₃ (f a b) l = f (foldr op₁ a l) (foldr op₂ b l) := by revert a induction l <;> intros <;> [rfl; simp only [, foldr]] theorem injective_foldl_comp {l : List (α → α)} {f : α → α} (hl : ∀ f ∈ l, Function.Injective f) (hf : Function.Injective f) : Function.Injective (@List.foldl (α → α) (α → α) Function.comp f l) := by induction l generalizing f with \| nil => exact hf \| cons lh lt l_ih => apply l_ih fun _ h => hl _ (List.mem_cons_of_mem _ h) apply Function.Injective.comp hf apply hl _ mem_cons_self /-- Consider two lists `l₁` and `l₂` with designated elements `a₁` and `a₂` somewhere in them: `l₁ = x₁ ++ [a₁] ++ z₁` and `l₂ = x₂ ++ [a₂] ++ z₂`. Assume the designated element `a₂` is present in neither `x₁` nor `z₁`. We conclude that the lists are equal (`l₁ = l₂`) if and only if their respective parts are equal (`x₁ = x₂ ∧ a₁ = a₂ ∧ z₁ = z₂`). -/ lemma append_cons_inj_of_not_mem {x₁ x₂ z₁ z₂ : List α} {a₁ a₂ : α} (notin_x : a₂ ∉ x₁) (notin_z : a₂ ∉ z₁) : x₁ ++ a₁ :: z₁ = x₂ ++ a₂ :: z₂ ↔ x₁ = x₂ ∧ a₁ = a₂ ∧ z₁ = z₂ := by constructor · simp only [append_eq_append_iff, cons_eq_append_iff, cons_eq_cons] rintro (⟨c, rfl, ⟨rfl, rfl, rfl⟩ \| ⟨d, rfl, rfl⟩⟩ \| ⟨c, rfl, ⟨rfl, rfl, rfl⟩ \| ⟨d, rfl, rfl⟩⟩) <;> simp_all · rintro ⟨rfl, rfl, rfl⟩ rfl section FoldlEqFoldr -- foldl and foldr coincide when f is commutative and associative variable {f : α → α → α} theorem foldl1_eq_foldr1 [hassoc : Std.Associative f] : ∀ a b l, foldl f a (l ++ [b]) = foldr f b (a :: l) \| _, _, nil => rfl \| a, b, c :: l => by simp only [cons_append, foldl_cons, foldr_cons, foldl1_eq_foldr1 _ _ l] rw [hassoc.assoc] theorem foldl_eq_of_comm_of_assoc [hcomm : Std.Commutative f] [hassoc : Std.Associative f] : ∀ a b l, foldl f a (b :: l) = f b (foldl f a l) \| a, b, nil => hcomm.comm a b \| a, b, c :: l => by simp only [foldl_cons] have : RightCommutative f := inferInstance rw [← foldl_eq_of_comm_of_assoc .., this.right_comm, foldl_cons] theorem foldl_eq_foldr [Std.Commutative f] [Std.Associative f] : ∀ a l, foldl f a l = foldr f a l \| _, nil => rfl \| a, b :: l => by simp only [foldr_cons, foldl_eq_of_comm_of_assoc] rw [foldl_eq_foldr a l] end FoldlEqFoldr section FoldlEqFoldlr' variable {f : α → β → α} variable (hf : ∀ a b c, f (f a b) c = f (f a c) b) include hf theorem foldl_eq_of_comm' : ∀ a b l, foldl f a (b :: l) = f (foldl f a l) b \| _, _, [] => rfl \| a, b, c :: l => by rw [foldl, foldl, foldl, ← foldl_eq_of_comm' .., foldl, hf] theorem foldl_eq_foldr' : ∀ a l, foldl f a l = foldr (flip f) a l \| _, [] => rfl \| a, b :: l => by rw [foldl_eq_of_comm' hf, foldr, foldl_eq_foldr' ..]; rfl end FoldlEqFoldlr' section FoldlEqFoldlr' variable {f : α → β → β} theorem foldr_eq_of_comm' (hf : ∀ a b c, f a (f b c) = f b (f a c)) : ∀ a b l, foldr f a (b :: l) = foldr f (f b a) l \| _, _, [] => rfl \| a, b, c :: l => by rw [foldr, foldr, foldr, hf, ← foldr_eq_of_comm' hf ..]; rfl end FoldlEqFoldlr' section variable {op : α → α → α} [ha : Std.Associative op] /-- Notation for `op a b`. -/ local notation a " ⋆ " b => op a b /-- Notation for `foldl op a l`. -/ local notation l " <> " a => foldl op a l theorem foldl_op_eq_op_foldr_assoc : ∀ {l : List α} {a₁ a₂}, ((l <> a₁) ⋆ a₂) = a₁ ⋆ l.foldr (· ⋆ ·) a₂ \| [], _, _ => rfl \| a :: l, a₁, a₂ => by simp only [foldl_cons, foldr_cons, foldl_assoc, ha.assoc]; rw [foldl_op_eq_op_foldr_assoc] variable [hc : Std.Commutative op] theorem foldl_assoc_comm_cons {l : List α} {a₁ a₂} : ((a₁ :: l) <> a₂) = a₁ ⋆ l <> a₂ := by rw [foldl_cons, hc.comm, foldl_assoc] end /-! ### foldlM, foldrM, mapM -/ section FoldlMFoldrM variable {m : Type v → Type w} [Monad m] variable [LawfulMonad m] theorem foldrM_eq_foldr (f : α → β → m β) (b l) : foldrM f b l = foldr (fun a mb => mb >>= f a) (pure b) l := by induction l <;> simp [] theorem foldlM_eq_foldl (f : β → α → m β) (b l) : List.foldlM f b l = foldl (fun mb a => mb >>= fun b => f b a) (pure b) l := by suffices h : ∀ mb : m β, (mb >>= fun b => List.foldlM f b l) = foldl (fun mb a => mb >>= fun b => f b a) mb l by simp [← h (pure b)] induction l with \| nil => intro; simp \| cons _ _ l_ih => intro; simp only [List.foldlM, foldl, ← l_ih, functor_norm] end FoldlMFoldrM /-! ### intersperse -/ @[deprecated (since := "2025-02-07")] alias intersperse_singleton := intersperse_single @[deprecated (since := "2025-02-07")] alias intersperse_cons_cons := intersperse_cons₂ /-! ### map for partial functions -/ @[deprecated "Deprecated without replacement." (since := "2025-02-07")] theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {l : List α} (hx : x ∈ l) : SizeOf.sizeOf x < SizeOf.sizeOf l := by induction l with \| nil => ?_ \| cons h t ih => ?_ <;> cases hx <;> rw [cons.sizeOf_spec] · omega · specialize ih ‹_› omega /-! ### filter -/ theorem length_eq_length_filter_add {l : List (α)} (f : α → Bool) : l.length = (l.filter f).length + (l.filter (! f ·)).length := by simp_rw [← List.countP_eq_length_filter, l.length_eq_countP_add_countP f, Bool.not_eq_true, Bool.decide_eq_false] /-! ### filterMap -/ theorem filterMap_eq_flatMap_toList (f : α → Option β) (l : List α) : l.filterMap f = l.flatMap fun a ↦ (f a).toList := by induction l with \| nil => ?_ \| cons a l ih => ?_ <;> simp [filterMap_cons] rcases f a <;> simp [ih] theorem filterMap_congr {f g : α → Option β} {l : List α} (h : ∀ x ∈ l, f x = g x) : l.filterMap f = l.filterMap g := by induction l <;> simp_all [filterMap_cons] theorem filterMap_eq_map_iff_forall_eq_some {f : α → Option β} {g : α → β} {l : List α} : l.filterMap f = l.map g ↔ ∀ x ∈ l, f x = some (g x) where mp := by induction l with \| nil => simp \| cons a l ih => ?_ rcases ha : f a with - \| b <;> simp [ha, filterMap_cons] · intro h simpa [show (filterMap f l).length = l.length + 1 from by simp[h], Nat.add_one_le_iff] using List.length_filterMap_le f l · rintro rfl h exact ⟨rfl, ih h⟩ mpr h := Eq.trans (filterMap_congr <\| by simpa) (congr_fun filterMap_eq_map _) /-! ### filter -/ section Filter variable {p : α → Bool} theorem filter_singleton {a : α} : [a].filter p = bif p a then [a] else [] := rfl theorem filter_eq_foldr (p : α → Bool) (l : List α) : filter p l = foldr (fun a out => bif p a then a :: out else out) [] l := by induction l <;> simp [, filter]; rfl #adaptation_note /-- nightly-2024-07-27 This has to be temporarily renamed to avoid an unintentional collision. The prime should be removed at nightly-2024-07-27. -/ @[simp] theorem filter_subset' (l : List α) : filter p l ⊆ l := filter_sublist.subset theorem of_mem_filter {a : α} {l} (h : a ∈ filter p l) : p a := (mem_filter.1 h).2 theorem mem_of_mem_filter {a : α} {l} (h : a ∈ filter p l) : a ∈ l := filter_subset' l h theorem mem_filter_of_mem {a : α} {l} (h₁ : a ∈ l) (h₂ : p a) : a ∈ filter p l := mem_filter.2 ⟨h₁, h₂⟩ @[deprecated (since := "2025-02-07")] alias monotone_filter_left := filter_subset variable (p) theorem monotone_filter_right (l : List α) ⦃p q : α → Bool⦄ (h : ∀ a, p a → q a) : l.filter p <+ l.filter q := by induction l with \| nil => rfl \| cons hd tl IH => by_cases hp : p hd · rw [filter_cons_of_pos hp, filter_cons_of_pos (h _ hp)] exact IH.cons_cons hd · rw [filter_cons_of_neg hp] by_cases hq : q hd · rw [filter_cons_of_pos hq] exact sublist_cons_of_sublist hd IH · rw [filter_cons_of_neg hq] exact IH lemma map_filter {f : α → β} (hf : Injective f) (l : List α) [DecidablePred fun b => ∃ a, p a ∧ f a = b] : (l.filter p).map f = (l.map f).filter fun b => ∃ a, p a ∧ f a = b := by simp [comp_def, filter_map, hf.eq_iff] @[deprecated (since := "2025-02-07")] alias map_filter' := map_filter lemma filter_attach' (l : List α) (p : {a // a ∈ l} → Bool) [DecidableEq α] : l.attach.filter p = (l.filter fun x => ∃ h, p ⟨x, h⟩).attach.map (Subtype.map id fun _ => mem_of_mem_filter) := by classical refine map_injective_iff.2 Subtype.coe_injective ?_ simp [comp_def, map_filter _ Subtype.coe_injective] lemma filter_attach (l : List α) (p : α → Bool) : (l.attach.filter fun x => p x : List {x // x ∈ l}) = (l.filter p).attach.map (Subtype.map id fun _ => mem_of_mem_filter) := map_injective_iff.2 Subtype.coe_injective <\| by simp_rw [map_map, comp_def, Subtype.map, id, ← Function.comp_apply (g := Subtype.val), ← filter_map, attach_map_subtype_val] lemma filter_comm (q) (l : List α) : filter p (filter q l) = filter q (filter p l) := by simp [Bool.and_comm] @[simp] theorem filter_true (l : List α) : filter (fun _ => true) l = l := by induction l <;> simp [, filter] @[simp] theorem filter_false (l : List α) : filter (fun _ => false) l = [] := by induction l <;> simp [, filter] end Filter /-! ### eraseP -/ section eraseP variable {p : α → Bool} @[simp] theorem length_eraseP_add_one {l : List α} {a} (al : a ∈ l) (pa : p a) : (l.eraseP p).length + 1 = l.length := by let ⟨_, l₁, l₂, _, _, h₁, h₂⟩ := exists_of_eraseP al pa rw [h₂, h₁, length_append, length_append] rfl end eraseP /-! ### erase -/ section Erase variable [DecidableEq α] @[simp] theorem length_erase_add_one {a : α} {l : List α} (h : a ∈ l) : (l.erase a).length + 1 = l.length := by rw [erase_eq_eraseP, length_eraseP_add_one h (decide_eq_true rfl)] theorem map_erase [DecidableEq β] {f : α → β} (finj : Injective f) {a : α} (l : List α) : map f (l.erase a) = (map f l).erase (f a) := by have this : (a == ·) = (f a == f ·) := by ext b; simp [beq_eq_decide, finj.eq_iff] rw [erase_eq_eraseP, erase_eq_eraseP, eraseP_map, this]; rfl theorem map_foldl_erase [DecidableEq β] {f : α → β} (finj : Injective f) {l₁ l₂ : List α} : map f (foldl List.erase l₁ l₂) = foldl (fun l a => l.erase (f a)) (map f l₁) l₂ := by induction l₂ generalizing l₁ <;> [rfl; simp only [foldl_cons, map_erase finj, ]] theorem erase_getElem [DecidableEq ι] {l : List ι} {i : ℕ} (hi : i < l.length) : Perm (l.erase l[i]) (l.eraseIdx i) := by induction l generalizing i with \| nil => simp \| cons a l IH => cases i with \| zero => simp \| succ i => have hi' : i < l.length := by simpa using hi if ha : a = l[i] then simpa [ha] using .trans (perm_cons_erase (getElem_mem _)) (.cons _ (IH hi')) else simpa [ha] using IH hi' theorem length_eraseIdx_add_one {l : List ι} {i : ℕ} (h : i < l.length) : (l.eraseIdx i).length + 1 = l.length := by rw [length_eraseIdx] split <;> omega end Erase /-! ### diff -/ section Diff variable [DecidableEq α] @[simp] theorem map_diff [DecidableEq β] {f : α → β} (finj : Injective f) {l₁ l₂ : List α} : map f (l₁.diff l₂) = (map f l₁).diff (map f l₂) := by simp only [diff_eq_foldl, foldl_map, map_foldl_erase finj] @[deprecated (since := "2025-04-10")] alias erase_diff_erase_sublist_of_sublist := Sublist.erase_diff_erase_sublist end Diff section Choose variable (p : α → Prop) [DecidablePred p] (l : List α) theorem choose_spec (hp : ∃ a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) := (chooseX p l hp).property theorem choose_mem (hp : ∃ a, a ∈ l ∧ p a) : choose p l hp ∈ l := (choose_spec _ _ _).1 theorem choose_property (hp : ∃ a, a ∈ l ∧ p a) : p (choose p l hp) := (choose_spec _ _ _).2 end Choose /-! ### Forall -/ section Forall variable {p q : α → Prop} {l : List α} @[simp] theorem forall_cons (p : α → Prop) (x : α) : ∀ l : List α, Forall p (x :: l) ↔ p x ∧ Forall p l \| [] => (and_iff_left_of_imp fun _ ↦ trivial).symm \| _ :: _ => Iff.rfl @[simp] theorem forall_append {p : α → Prop} : ∀ {xs ys : List α}, Forall p (xs ++ ys) ↔ Forall p xs ∧ Forall p ys \| [] => by simp \| _ :: _ => by simp [forall_append, and_assoc] theorem forall_iff_forall_mem : ∀ {l : List α}, Forall p l ↔ ∀ x ∈ l, p x \| [] => (iff_true_intro <\| forall_mem_nil _).symm \| x :: l => by rw [forall_mem_cons, forall_cons, forall_iff_forall_mem] theorem Forall.imp (h : ∀ x, p x → q x) : ∀ {l : List α}, Forall p l → Forall q l \| [] => id \| x :: l => by simp only [forall_cons, and_imp] rw [← and_imp] exact And.imp (h x) (Forall.imp h) @[simp] theorem forall_map_iff {p : β → Prop} (f : α → β) : Forall p (l.map f) ↔ Forall (p ∘ f) l := by induction l <;> simp [] instance (p : α → Prop) [DecidablePred p] : DecidablePred (Forall p) := fun _ => decidable_of_iff' _ forall_iff_forall_mem end Forall /-! ### Miscellaneous lemmas -/ theorem get_attach (l : List α) (i) : (l.attach.get i).1 = l.get ⟨i, length_attach (l := l) ▸ i.2⟩ := by simp section Disjoint /-- The images of disjoint lists under a partially defined map are disjoint -/ theorem disjoint_pmap {p : α → Prop} {f : ∀ a : α, p a → β} {s t : List α} (hs : ∀ a ∈ s, p a) (ht : ∀ a ∈ t, p a) (hf : ∀ (a a' : α) (ha : p a) (ha' : p a'), f a ha = f a' ha' → a = a') (h : Disjoint s t) : Disjoint (s.pmap f hs) (t.pmap f ht) := by simp only [Disjoint, mem_pmap] rintro b ⟨a, ha, rfl⟩ ⟨a', ha', ha''⟩ apply h ha rwa [hf a a' (hs a ha) (ht a' ha') ha''.symm] /-- The images of disjoint lists under an injective map are disjoint -/ theorem disjoint_map {f : α → β} {s t : List α} (hf : Function.Injective f) (h : Disjoint s t) : Disjoint (s.map f) (t.map f) := by rw [← pmap_eq_map (fun _ _ ↦ trivial), ← pmap_eq_map (fun _ _ ↦ trivial)] exact disjoint_pmap _ _ (fun _ _ _ _ h' ↦ hf h') h alias Disjoint.map := disjoint_map theorem Disjoint.of_map {f : α → β} {s t : List α} (h : Disjoint (s.map f) (t.map f)) : Disjoint s t := fun _a has hat ↦ h (mem_map_of_mem has) (mem_map_of_mem hat) theorem Disjoint.map_iff {f : α → β} {s t : List α} (hf : Function.Injective f) : Disjoint (s.map f) (t.map f) ↔ Disjoint s t := ⟨fun h ↦ h.of_map, fun h ↦ h.map hf⟩ theorem Perm.disjoint_left {l₁ l₂ l : List α} (p : List.Perm l₁ l₂) : Disjoint l₁ l ↔ Disjoint l₂ l := by simp_rw [List.disjoint_left, p.mem_iff] theorem Perm.disjoint_right {l₁ l₂ l : List α} (p : List.Perm l₁ l₂) : Disjoint l l₁ ↔ Disjoint l l₂ := by simp_rw [List.disjoint_right, p.mem_iff] @[simp] theorem disjoint_reverse_left {l₁ l₂ : List α} : Disjoint l₁.reverse l₂ ↔ Disjoint l₁ l₂ := reverse_perm _ \|>.disjoint_left @[simp] theorem disjoint_reverse_right {l₁ l₂ : List α} : Disjoint l₁ l₂.reverse ↔ Disjoint l₁ l₂ := reverse_perm _ \|>.disjoint_right end Disjoint section lookup variable [BEq α] [LawfulBEq α] lemma lookup_graph (f : α → β) {a : α} {as : List α} (h : a ∈ as) : lookup a (as.map fun x => (x, f x)) = some (f a) := by induction as with \| nil => exact (not_mem_nil h).elim \| cons a' as ih => by_cases ha : a = a' · simp [ha, lookup_cons] · simpa [lookup_cons, beq_false_of_ne ha] using ih (List.mem_of_ne_of_mem ha h) end lookup section range' @[simp] lemma range'_0 (a b : ℕ) : range' a b 0 = replicate b a := by induction b with \| zero => simp \| succ b ih => simp [range'_succ, ih, replicate_succ] lemma left_le_of_mem_range' {a b s x : ℕ} (hx : x ∈ List.range' a b s) : a ≤ x := by obtain ⟨i, _, rfl⟩ := List.mem_range'.mp hx exact le_add_right a (s i) end range' end List		Mathlib/Data/List/Basic.lean	1,681	1,681
/- Copyright (c) 2020 Jean Lo, Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jean Lo, Yury Kudryashov -/ import Mathlib.Algebra.GroupWithZero.Action.Pointwise.Set import Mathlib.Algebra.Ring.Action.Pointwise.Set import Mathlib.Topology.Bornology.Basic /-! # Absorption of sets Let `M` act on `α`, let `A` and `B` be sets in `α`. We say that `A` absorbs `B` if for sufficiently large `a : M`, we have `B ⊆ a • A`. Formally, "for sufficiently large `a : M`" means "for all but a bounded set of `a`". Traditionally, this definition is formulated for the action of a (semi)normed ring on a module over that ring. We formulate it in a more general settings for two reasons: - this way we don't have to depend on metric spaces, normed rings etc; - some proofs look nicer with this definition than with something like `∃ r : ℝ, ∀ a : R, r ≤ ‖a‖ → B ⊆ a • A`. If `M` is a `GroupWithZero` (e.g., a division ring), the sets absorbing a given set form a filter, see `Filter.absorbing`. ## Implementation notes For now, all theorems assume that we deal with (a generalization of) a module over a division ring. Some lemmas have multiplicative versions for `MulDistribMulAction`s. They can be added later when someone needs them. ## Keywords absorbs, absorbent -/ assert_not_exists Real open Set Bornology Filter open scoped Pointwise section Defs variable (M : Type) {α : Type} [Bornology M] [SMul M α] /-- A set `s` absorbs another set `t` if `t` is contained in all scalings of `s` by all but a bounded set of elements. -/ def Absorbs (s t : Set α) : Prop := ∀ᶠ a in cobounded M, t ⊆ a • s /-- A set is absorbent if it absorbs every singleton. -/ def Absorbent (s : Set α) : Prop := ∀ x, Absorbs M s {x} end Defs namespace Absorbs section SMul variable {M α : Type} [Bornology M] [SMul M α] {s s₁ s₂ t t₁ t₂ : Set α} {S T : Set (Set α)} protected lemma empty : Absorbs M s ∅ := by simp [Absorbs] protected lemma eventually (h : Absorbs M s t) : ∀ᶠ a in cobounded M, t ⊆ a • s := h @[simp] lemma of_boundedSpace [BoundedSpace M] : Absorbs M s t := by simp [Absorbs] lemma mono_left (h : Absorbs M s₁ t) (hs : s₁ ⊆ s₂) : Absorbs M s₂ t := h.mono fun _a ha ↦ ha.trans <\| smul_set_mono hs lemma mono_right (h : Absorbs M s t₁) (ht : t₂ ⊆ t₁) : Absorbs M s t₂ := h.mono fun _ ↦ ht.trans lemma mono (h : Absorbs M s₁ t₁) (hs : s₁ ⊆ s₂) (ht : t₂ ⊆ t₁) : Absorbs M s₂ t₂ := (h.mono_left hs).mono_right ht @[simp] lemma _root_.absorbs_union : Absorbs M s (t₁ ∪ t₂) ↔ Absorbs M s t₁ ∧ Absorbs M s t₂ := by simp [Absorbs] protected lemma union (h₁ : Absorbs M s t₁) (h₂ : Absorbs M s t₂) : Absorbs M s (t₁ ∪ t₂) := absorbs_union.2 ⟨h₁, h₂⟩ lemma _root_.Set.Finite.absorbs_sUnion {T : Set (Set α)} (hT : T.Finite) : Absorbs M s (⋃₀ T) ↔ ∀ t ∈ T, Absorbs M s t := by simp [Absorbs, hT] protected lemma sUnion (hT : T.Finite) (hs : ∀ t ∈ T, Absorbs M s t) : Absorbs M s (⋃₀ T) := hT.absorbs_sUnion.2 hs @[simp] lemma _root_.absorbs_iUnion {ι : Sort} [Finite ι] {t : ι → Set α} : Absorbs M s (⋃ i, t i) ↔ ∀ i, Absorbs M s (t i) := (finite_range t).absorbs_sUnion.trans forall_mem_range protected alias ⟨_, iUnion⟩ := absorbs_iUnion lemma _root_.Set.Finite.absorbs_biUnion {ι : Type} {t : ι → Set α} {I : Set ι} (hI : I.Finite) : Absorbs M s (⋃ i ∈ I, t i) ↔ ∀ i ∈ I, Absorbs M s (t i) := by simp [Absorbs, hI] protected alias ⟨_, biUnion⟩ := Set.Finite.absorbs_biUnion @[simp] lemma _root_.absorbs_biUnion_finset {ι : Type} {t : ι → Set α} {I : Finset ι} : Absorbs M s (⋃ i ∈ I, t i) ↔ ∀ i ∈ I, Absorbs M s (t i) := I.finite_toSet.absorbs_biUnion protected alias ⟨_, biUnion_finset⟩ := absorbs_biUnion_finset end SMul section AddZero variable {M E : Type} [Bornology M] {s₁ s₂ t₁ t₂ : Set E} protected lemma add [AddZeroClass E] [DistribSMul M E] (h₁ : Absorbs M s₁ t₁) (h₂ : Absorbs M s₂ t₂) : Absorbs M (s₁ + s₂) (t₁ + t₂) := h₂.mp <\| h₁.eventually.mono fun x hx₁ hx₂ ↦ by rw [smul_add]; exact add_subset_add hx₁ hx₂ protected lemma zero [Zero E] [SMulZeroClass M E] {s : Set E} (hs : 0 ∈ s) : Absorbs M s 0 := Eventually.of_forall fun _ ↦ zero_subset.2 <\| zero_mem_smul_set hs end AddZero end Absorbs section GroupWithZero variable {G₀ α : Type} [GroupWithZero G₀] [Bornology G₀] [MulAction G₀ α] {s t u : Set α} {S : Set (Set α)} @[simp] protected lemma Absorbs.univ : Absorbs G₀ univ s := (eventually_ne_cobounded 0).mono fun a ha ↦ by rw [smul_set_univ₀ ha]; apply subset_univ lemma absorbs_iff_eventually_cobounded_mapsTo : Absorbs G₀ s t ↔ ∀ᶠ c in cobounded G₀, MapsTo (c⁻¹ • ·) t s := eventually_congr <\| (eventually_ne_cobounded 0).mono fun c hc ↦ by rw [← preimage_smul_inv₀ hc]; rfl alias ⟨eventually_cobounded_mapsTo, _⟩ := absorbs_iff_eventually_cobounded_mapsTo @[simp] lemma absorbs_inter : Absorbs G₀ (s ∩ t) u ↔ Absorbs G₀ s u ∧ Absorbs G₀ t u := by simp only [absorbs_iff_eventually_cobounded_mapsTo, mapsTo_inter, eventually_and] protected lemma Absorbs.inter (hs : Absorbs G₀ s u) (ht : Absorbs G₀ t u) : Absorbs G₀ (s ∩ t) u := absorbs_inter.2 ⟨hs, ht⟩ variable (G₀ u) in /-- The filter of sets that absorb `u`. -/ def Filter.absorbing : Filter α where sets := {s \| Absorbs G₀ s u} univ_sets := .univ sets_of_superset h := h.mono_left inter_sets := .inter @[simp] lemma Filter.mem_absorbing : s ∈ absorbing G₀ u ↔ Absorbs G₀ s u := .rfl lemma Set.Finite.absorbs_sInter (hS : S.Finite) : Absorbs G₀ (⋂₀ S) t ↔ ∀ s ∈ S, Absorbs G₀ s t := sInter_mem (f := absorbing G₀ t) hS protected alias ⟨_, Absorbs.sInter⟩ := Set.Finite.absorbs_sInter @[simp] lemma absorbs_iInter {ι : Sort} [Finite ι] {s : ι → Set α} : Absorbs G₀ (⋂ i, s i) t ↔ ∀ i, Absorbs G₀ (s i) t := iInter_mem (f := absorbing G₀ t) protected alias ⟨_, Absorbs.iInter⟩ := absorbs_iInter lemma Set.Finite.absorbs_biInter {ι : Type} {I : Set ι} (hI : I.Finite) {s : ι → Set α} : Absorbs G₀ (⋂ i ∈ I, s i) t ↔ ∀ i ∈ I, Absorbs G₀ (s i) t := biInter_mem (f := absorbing G₀ t) hI protected alias ⟨_, Absorbs.biInter⟩ := Set.Finite.absorbs_biInter @[simp]	lemma absorbs_zero_iff [NeBot (cobounded G₀)] {E : Type*} [AddMonoid E] [DistribMulAction G₀ E] {s : Set E} : Absorbs G₀ s 0 ↔ 0 ∈ s := by	Mathlib/Topology/Bornology/Absorbs.lean	187	189
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Aaron Anderson, Yakov Pechersky -/ import Mathlib.Data.Fintype.Card import Mathlib.Algebra.Group.Commute.Basic import Mathlib.Algebra.Group.End import Mathlib.Data.Finset.NoncommProd /-! # support of a permutation ## Main definitions In the following, `f g : Equiv.Perm α`. * `Equiv.Perm.Disjoint`: two permutations `f` and `g` are `Disjoint` if every element is fixed either by `f`, or by `g`. Equivalently, `f` and `g` are `Disjoint` iff their `support` are disjoint. * `Equiv.Perm.IsSwap`: `f = swap x y` for `x ≠ y`. * `Equiv.Perm.support`: the elements `x : α` that are not fixed by `f`. Assume `α` is a Fintype: * `Equiv.Perm.fixed_point_card_lt_of_ne_one f` says that `f` has strictly less than `Fintype.card α - 1` fixed points, unless `f = 1`. (Equivalently, `f.support` has at least 2 elements.) -/ open Equiv Finset Function namespace Equiv.Perm variable {α : Type} section Disjoint /-- Two permutations `f` and `g` are `Disjoint` if their supports are disjoint, i.e., every element is fixed either by `f`, or by `g`. -/ def Disjoint (f g : Perm α) := ∀ x, f x = x ∨ g x = x variable {f g h : Perm α} @[symm] theorem Disjoint.symm : Disjoint f g → Disjoint g f := by simp only [Disjoint, or_comm, imp_self] theorem Disjoint.symmetric : Symmetric (@Disjoint α) := fun _ _ => Disjoint.symm instance : IsSymm (Perm α) Disjoint := ⟨Disjoint.symmetric⟩ theorem disjoint_comm : Disjoint f g ↔ Disjoint g f := ⟨Disjoint.symm, Disjoint.symm⟩ theorem Disjoint.commute (h : Disjoint f g) : Commute f g := Equiv.ext fun x => (h x).elim (fun hf => (h (g x)).elim (fun hg => by simp [mul_apply, hf, hg]) fun hg => by simp [mul_apply, hf, g.injective hg]) fun hg => (h (f x)).elim (fun hf => by simp [mul_apply, f.injective hf, hg]) fun hf => by simp [mul_apply, hf, hg] @[simp] theorem disjoint_one_left (f : Perm α) : Disjoint 1 f := fun _ => Or.inl rfl @[simp] theorem disjoint_one_right (f : Perm α) : Disjoint f 1 := fun _ => Or.inr rfl theorem disjoint_iff_eq_or_eq : Disjoint f g ↔ ∀ x : α, f x = x ∨ g x = x := Iff.rfl @[simp] theorem disjoint_refl_iff : Disjoint f f ↔ f = 1 := by refine ⟨fun h => ?_, fun h => h.symm ▸ disjoint_one_left 1⟩ ext x rcases h x with hx \| hx <;> simp [hx] theorem Disjoint.inv_left (h : Disjoint f g) : Disjoint f⁻¹ g := by intro x rw [inv_eq_iff_eq, eq_comm] exact h x theorem Disjoint.inv_right (h : Disjoint f g) : Disjoint f g⁻¹ := h.symm.inv_left.symm @[simp] theorem disjoint_inv_left_iff : Disjoint f⁻¹ g ↔ Disjoint f g := by refine ⟨fun h => ?_, Disjoint.inv_left⟩ convert h.inv_left @[simp] theorem disjoint_inv_right_iff : Disjoint f g⁻¹ ↔ Disjoint f g := by rw [disjoint_comm, disjoint_inv_left_iff, disjoint_comm] theorem Disjoint.mul_left (H1 : Disjoint f h) (H2 : Disjoint g h) : Disjoint (f g) h := fun x => by cases H1 x <;> cases H2 x <;> simp [] theorem Disjoint.mul_right (H1 : Disjoint f g) (H2 : Disjoint f h) : Disjoint f (g h) := by rw [disjoint_comm] exact H1.symm.mul_left H2.symm -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11215): TODO: make it `@[simp]` theorem disjoint_conj (h : Perm α) : Disjoint (h * f * h⁻¹) (h * g * h⁻¹) ↔ Disjoint f g := (h⁻¹).forall_congr fun {_} ↦ by simp only [mul_apply, eq_inv_iff_eq] theorem Disjoint.conj (H : Disjoint f g) (h : Perm α) : Disjoint (h * f * h⁻¹) (h * g * h⁻¹) := (disjoint_conj h).2 H theorem disjoint_prod_right (l : List (Perm α)) (h : ∀ g ∈ l, Disjoint f g) : Disjoint f l.prod := by induction' l with g l ih · exact disjoint_one_right _ · rw [List.prod_cons] exact (h _ List.mem_cons_self).mul_right (ih fun g hg => h g (List.mem_cons_of_mem _ hg)) theorem disjoint_noncommProd_right {ι : Type} {k : ι → Perm α} {s : Finset ι} (hs : Set.Pairwise s fun i j ↦ Commute (k i) (k j)) (hg : ∀ i ∈ s, g.Disjoint (k i)) : Disjoint g (s.noncommProd k (hs)) := noncommProd_induction s k hs g.Disjoint (fun _ _ ↦ Disjoint.mul_right) (disjoint_one_right g) hg open scoped List in theorem disjoint_prod_perm {l₁ l₂ : List (Perm α)} (hl : l₁.Pairwise Disjoint) (hp : l₁ ~ l₂) : l₁.prod = l₂.prod := hp.prod_eq' <\| hl.imp Disjoint.commute theorem nodup_of_pairwise_disjoint {l : List (Perm α)} (h1 : (1 : Perm α) ∉ l) (h2 : l.Pairwise Disjoint) : l.Nodup := by refine List.Pairwise.imp_of_mem ?_ h2 intro τ σ h_mem _ h_disjoint _ subst τ suffices (σ : Perm α) = 1 by rw [this] at h_mem exact h1 h_mem exact ext fun a => or_self_iff.mp (h_disjoint a) theorem pow_apply_eq_self_of_apply_eq_self {x : α} (hfx : f x = x) : ∀ n : ℕ, (f ^ n) x = x \| 0 => rfl \| n + 1 => by rw [pow_succ, mul_apply, hfx, pow_apply_eq_self_of_apply_eq_self hfx n] theorem zpow_apply_eq_self_of_apply_eq_self {x : α} (hfx : f x = x) : ∀ n : ℤ, (f ^ n) x = x \| (n : ℕ) => pow_apply_eq_self_of_apply_eq_self hfx n \| Int.negSucc n => by rw [zpow_negSucc, inv_eq_iff_eq, pow_apply_eq_self_of_apply_eq_self hfx] theorem pow_apply_eq_of_apply_apply_eq_self {x : α} (hffx : f (f x) = x) : ∀ n : ℕ, (f ^ n) x = x ∨ (f ^ n) x = f x \| 0 => Or.inl rfl \| n + 1 => (pow_apply_eq_of_apply_apply_eq_self hffx n).elim (fun h => Or.inr (by rw [pow_succ', mul_apply, h])) fun h => Or.inl (by rw [pow_succ', mul_apply, h, hffx]) theorem zpow_apply_eq_of_apply_apply_eq_self {x : α} (hffx : f (f x) = x) : ∀ i : ℤ, (f ^ i) x = x ∨ (f ^ i) x = f x \| (n : ℕ) => pow_apply_eq_of_apply_apply_eq_self hffx n \| Int.negSucc n => by rw [zpow_negSucc, inv_eq_iff_eq, ← f.injective.eq_iff, ← mul_apply, ← pow_succ', eq_comm, inv_eq_iff_eq, ← mul_apply, ← pow_succ, @eq_comm _ x, or_comm] exact pow_apply_eq_of_apply_apply_eq_self hffx _ theorem Disjoint.mul_apply_eq_iff {σ τ : Perm α} (hστ : Disjoint σ τ) {a : α} : (σ τ) a = a ↔ σ a = a ∧ τ a = a := by refine ⟨fun h => ?_, fun h => by rw [mul_apply, h.2, h.1]⟩ rcases hστ a with hσ \| hτ · exact ⟨hσ, σ.injective (h.trans hσ.symm)⟩ · exact ⟨(congr_arg σ hτ).symm.trans h, hτ⟩ theorem Disjoint.mul_eq_one_iff {σ τ : Perm α} (hστ : Disjoint σ τ) : σ * τ = 1 ↔ σ = 1 ∧ τ = 1 := by simp_rw [Perm.ext_iff, one_apply, hστ.mul_apply_eq_iff, forall_and] theorem Disjoint.zpow_disjoint_zpow {σ τ : Perm α} (hστ : Disjoint σ τ) (m n : ℤ) : Disjoint (σ ^ m) (τ ^ n) := fun x => Or.imp (fun h => zpow_apply_eq_self_of_apply_eq_self h m) (fun h => zpow_apply_eq_self_of_apply_eq_self h n) (hστ x) theorem Disjoint.pow_disjoint_pow {σ τ : Perm α} (hστ : Disjoint σ τ) (m n : ℕ) : Disjoint (σ ^ m) (τ ^ n) := hστ.zpow_disjoint_zpow m n end Disjoint section IsSwap variable [DecidableEq α] /-- `f.IsSwap` indicates that the permutation `f` is a transposition of two elements. -/ def IsSwap (f : Perm α) : Prop := ∃ x y, x ≠ y ∧ f = swap x y @[simp] theorem ofSubtype_swap_eq {p : α → Prop} [DecidablePred p] (x y : Subtype p) : ofSubtype (Equiv.swap x y) = Equiv.swap ↑x ↑y := Equiv.ext fun z => by by_cases hz : p z · rw [swap_apply_def, ofSubtype_apply_of_mem _ hz] split_ifs with hzx hzy · simp_rw [hzx, Subtype.coe_eta, swap_apply_left] · simp_rw [hzy, Subtype.coe_eta, swap_apply_right] · rw [swap_apply_of_ne_of_ne] <;> simp [Subtype.ext_iff, ] · rw [ofSubtype_apply_of_not_mem _ hz, swap_apply_of_ne_of_ne] · intro h apply hz rw [h] exact Subtype.prop x intro h apply hz rw [h] exact Subtype.prop y theorem IsSwap.of_subtype_isSwap {p : α → Prop} [DecidablePred p] {f : Perm (Subtype p)} (h : f.IsSwap) : (ofSubtype f).IsSwap := let ⟨⟨x, hx⟩, ⟨y, hy⟩, hxy⟩ := h ⟨x, y, by simp only [Ne, Subtype.ext_iff] at hxy exact hxy.1, by rw [hxy.2, ofSubtype_swap_eq]⟩ theorem ne_and_ne_of_swap_mul_apply_ne_self {f : Perm α} {x y : α} (hy : (swap x (f x) f) y ≠ y) : f y ≠ y ∧ y ≠ x := by simp only [swap_apply_def, mul_apply, f.injective.eq_iff] at * by_cases h : f y = x · constructor <;> intro <;> simp_all only [if_true, eq_self_iff_true, not_true, Ne] · split_ifs at hy with h <;> try { simp [] at } end IsSwap section support section Set variable (p q : Perm α) theorem set_support_inv_eq : { x \| p⁻¹ x ≠ x } = { x \| p x ≠ x } := by ext x simp only [Set.mem_setOf_eq, Ne] rw [inv_def, symm_apply_eq, eq_comm] theorem set_support_apply_mem {p : Perm α} {a : α} : p a ∈ { x \| p x ≠ x } ↔ a ∈ { x \| p x ≠ x } := by simp theorem set_support_zpow_subset (n : ℤ) : { x \| (p ^ n) x ≠ x } ⊆ { x \| p x ≠ x } := by intro x simp only [Set.mem_setOf_eq, Ne] intro hx H simp [zpow_apply_eq_self_of_apply_eq_self H] at hx theorem set_support_mul_subset : { x \| (p * q) x ≠ x } ⊆ { x \| p x ≠ x } ∪ { x \| q x ≠ x } := by intro x simp only [Perm.coe_mul, Function.comp_apply, Ne, Set.mem_union, Set.mem_setOf_eq] by_cases hq : q x = x <;> simp [hq] end Set @[simp] theorem apply_pow_apply_eq_iff (f : Perm α) (n : ℕ) {x : α} : f ((f ^ n) x) = (f ^ n) x ↔ f x = x := by rw [← mul_apply, Commute.self_pow f, mul_apply, apply_eq_iff_eq] @[simp] theorem apply_zpow_apply_eq_iff (f : Perm α) (n : ℤ) {x : α} : f ((f ^ n) x) = (f ^ n) x ↔ f x = x := by rw [← mul_apply, Commute.self_zpow f, mul_apply, apply_eq_iff_eq] variable [DecidableEq α] [Fintype α] {f g : Perm α} /-- The `Finset` of nonfixed points of a permutation. -/ def support (f : Perm α) : Finset α := {x \| f x ≠ x} @[simp] theorem mem_support {x : α} : x ∈ f.support ↔ f x ≠ x := by rw [support, mem_filter, and_iff_right (mem_univ x)] theorem not_mem_support {x : α} : x ∉ f.support ↔ f x = x := by simp theorem coe_support_eq_set_support (f : Perm α) : (f.support : Set α) = { x \| f x ≠ x } := by ext simp @[simp] theorem support_eq_empty_iff {σ : Perm α} : σ.support = ∅ ↔ σ = 1 := by simp_rw [Finset.ext_iff, mem_support, Finset.not_mem_empty, iff_false, not_not, Equiv.Perm.ext_iff, one_apply] @[simp] theorem support_one : (1 : Perm α).support = ∅ := by rw [support_eq_empty_iff] @[simp] theorem support_refl : support (Equiv.refl α) = ∅ := support_one theorem support_congr (h : f.support ⊆ g.support) (h' : ∀ x ∈ g.support, f x = g x) : f = g := by ext x by_cases hx : x ∈ g.support · exact h' x hx · rw [not_mem_support.mp hx, ← not_mem_support] exact fun H => hx (h H) /-- If g and c commute, then g stabilizes the support of c -/ theorem mem_support_iff_of_commute {g c : Perm α} (hgc : Commute g c) (x : α) : x ∈ c.support ↔ g x ∈ c.support := by simp only [mem_support, not_iff_not, ← mul_apply] rw [← hgc, mul_apply, Equiv.apply_eq_iff_eq] theorem support_mul_le (f g : Perm α) : (f * g).support ≤ f.support ⊔ g.support := fun x => by simp only [sup_eq_union] rw [mem_union, mem_support, mem_support, mem_support, mul_apply, ← not_and_or, not_imp_not] rintro ⟨hf, hg⟩ rw [hg, hf] theorem exists_mem_support_of_mem_support_prod {l : List (Perm α)} {x : α} (hx : x ∈ l.prod.support) : ∃ f : Perm α, f ∈ l ∧ x ∈ f.support := by contrapose! hx simp_rw [mem_support, not_not] at hx ⊢ induction' l with f l ih · rfl · rw [List.prod_cons, mul_apply, ih, hx] · simp only [List.find?, List.mem_cons, true_or] intros f' hf' refine hx f' ?_ simp only [List.find?, List.mem_cons] exact Or.inr hf' theorem support_pow_le (σ : Perm α) (n : ℕ) : (σ ^ n).support ≤ σ.support := fun _ h1 => mem_support.mpr fun h2 => mem_support.mp h1 (pow_apply_eq_self_of_apply_eq_self h2 n) @[simp] theorem support_inv (σ : Perm α) : support σ⁻¹ = σ.support := by simp_rw [Finset.ext_iff, mem_support, not_iff_not, inv_eq_iff_eq.trans eq_comm, imp_true_iff] theorem apply_mem_support {x : α} : f x ∈ f.support ↔ x ∈ f.support := by rw [mem_support, mem_support, Ne, Ne, apply_eq_iff_eq] /-- The support of a permutation is invariant -/ theorem isInvariant_of_support_le {c : Perm α} {s : Finset α} (hcs : c.support ≤ s) (x : α) : x ∈ s ↔ c x ∈ s := by by_cases hx' : x ∈ c.support · simp only [hcs hx', true_iff, hcs (apply_mem_support.mpr hx')] · rw [not_mem_support.mp hx'] /-- A permutation c is the extension of a restriction of g to s iff its support is contained in s and its restriction is that of g -/ lemma ofSubtype_eq_iff {g c : Equiv.Perm α} {s : Finset α} (hg : ∀ x, x ∈ s ↔ g x ∈ s) : ofSubtype (g.subtypePerm hg) = c ↔ c.support ≤ s ∧ ∀ (hc' : ∀ x, x ∈ s ↔ c x ∈ s), c.subtypePerm hc' = g.subtypePerm hg := by simp only [Equiv.ext_iff, subtypePerm_apply, Subtype.mk.injEq, Subtype.forall] constructor · intro h constructor · intro a ha by_contra ha' rw [mem_support, ← h a, ofSubtype_apply_of_not_mem (p := (· ∈ s)) _ ha'] at ha exact ha rfl · intro _ a ha rw [← h a, ofSubtype_apply_of_mem (p := (· ∈ s)) _ ha, subtypePerm_apply] · rintro ⟨hc, h⟩ a specialize h (isInvariant_of_support_le hc) by_cases ha : a ∈ s · rw [h a ha, ofSubtype_apply_of_mem (p := (· ∈ s)) _ ha, subtypePerm_apply] · rw [ofSubtype_apply_of_not_mem (p := (· ∈ s)) _ ha, eq_comm, ← not_mem_support] exact Finset.not_mem_mono hc ha theorem support_ofSubtype {p : α → Prop} [DecidablePred p] (u : Perm (Subtype p)) : (ofSubtype u).support = u.support.map (Function.Embedding.subtype p) := by ext x simp only [mem_support, ne_eq, Finset.mem_map, Function.Embedding.coe_subtype, Subtype.exists, exists_and_right, exists_eq_right, not_iff_comm, not_exists, not_not] by_cases hx : p x · simp only [forall_prop_of_true hx, ofSubtype_apply_of_mem u hx, ← Subtype.coe_inj] · simp only [forall_prop_of_false hx, true_iff, ofSubtype_apply_of_not_mem u hx] theorem mem_support_of_mem_noncommProd_support {α β : Type} [DecidableEq β] [Fintype β] {s : Finset α} {f : α → Perm β} {comm : (s : Set α).Pairwise (Commute on f)} {x : β} (hx : x ∈ (s.noncommProd f comm).support) : ∃ a ∈ s, x ∈ (f a).support := by contrapose! hx classical revert hx comm s apply Finset.induction · simp · intro a s ha ih comm hs rw [Finset.noncommProd_insert_of_not_mem s a f comm ha] apply mt (Finset.mem_of_subset (support_mul_le _ _)) rw [Finset.sup_eq_union, Finset.not_mem_union] exact ⟨hs a (s.mem_insert_self a), ih (fun a ha ↦ hs a (Finset.mem_insert_of_mem ha))⟩ theorem pow_apply_mem_support {n : ℕ} {x : α} : (f ^ n) x ∈ f.support ↔ x ∈ f.support := by simp only [mem_support, ne_eq, apply_pow_apply_eq_iff] theorem zpow_apply_mem_support {n : ℤ} {x : α} : (f ^ n) x ∈ f.support ↔ x ∈ f.support := by simp only [mem_support, ne_eq, apply_zpow_apply_eq_iff] theorem pow_eq_on_of_mem_support (h : ∀ x ∈ f.support ∩ g.support, f x = g x) (k : ℕ) : ∀ x ∈ f.support ∩ g.support, (f ^ k) x = (g ^ k) x := by induction' k with k hk · simp · intro x hx rw [pow_succ, mul_apply, pow_succ, mul_apply, h _ hx, hk] rwa [mem_inter, apply_mem_support, ← h _ hx, apply_mem_support, ← mem_inter] theorem disjoint_iff_disjoint_support : Disjoint f g ↔ _root_.Disjoint f.support g.support := by simp [disjoint_iff_eq_or_eq, disjoint_iff, disjoint_iff, Finset.ext_iff, not_and_or, imp_iff_not_or] theorem Disjoint.disjoint_support (h : Disjoint f g) : _root_.Disjoint f.support g.support := disjoint_iff_disjoint_support.1 h theorem Disjoint.support_mul (h : Disjoint f g) : (f g).support = f.support ∪ g.support := by refine le_antisymm (support_mul_le _ _) fun a => ?_ rw [mem_union, mem_support, mem_support, mem_support, mul_apply, ← not_and_or, not_imp_not] exact (h a).elim (fun hf h => ⟨hf, f.apply_eq_iff_eq.mp (h.trans hf.symm)⟩) fun hg h => ⟨(congr_arg f hg).symm.trans h, hg⟩ theorem support_prod_of_pairwise_disjoint (l : List (Perm α)) (h : l.Pairwise Disjoint) : l.prod.support = (l.map support).foldr (· ⊔ ·) ⊥ := by induction' l with hd tl hl · simp · rw [List.pairwise_cons] at h have : Disjoint hd tl.prod := disjoint_prod_right _ h.left simp [this.support_mul, hl h.right] theorem support_noncommProd {ι : Type} {k : ι → Perm α} {s : Finset ι} (hs : Set.Pairwise s fun i j ↦ Disjoint (k i) (k j)) : (s.noncommProd k (hs.imp (fun _ _ ↦ Perm.Disjoint.commute))).support = s.biUnion fun i ↦ (k i).support := by classical induction s using Finset.induction_on with \| empty => simp \| insert i s hi hrec => have hs' : (s : Set ι).Pairwise fun i j ↦ Disjoint (k i) (k j) := hs.mono (by simp only [Finset.coe_insert, Set.subset_insert]) rw [Finset.noncommProd_insert_of_not_mem _ _ _ _ hi, Finset.biUnion_insert] rw [Equiv.Perm.Disjoint.support_mul, hrec hs'] apply disjoint_noncommProd_right intro j hj apply hs _ _ (ne_of_mem_of_not_mem hj hi).symm <;> simp only [Finset.coe_insert, Set.mem_insert_iff, Finset.mem_coe, hj, or_true, true_or] theorem support_prod_le (l : List (Perm α)) : l.prod.support ≤ (l.map support).foldr (· ⊔ ·) ⊥ := by induction' l with hd tl hl · simp · rw [List.prod_cons, List.map_cons, List.foldr_cons] refine (support_mul_le hd tl.prod).trans ?_ exact sup_le_sup le_rfl hl theorem support_zpow_le (σ : Perm α) (n : ℤ) : (σ ^ n).support ≤ σ.support := fun _ h1 => mem_support.mpr fun h2 => mem_support.mp h1 (zpow_apply_eq_self_of_apply_eq_self h2 n) @[simp] theorem support_swap {x y : α} (h : x ≠ y) : support (swap x y) = {x, y} := by ext z by_cases hx : z = x any_goals simpa [hx] using h.symm by_cases hy : z = y · simpa [swap_apply_of_ne_of_ne, hx, hy] using h · simp [swap_apply_of_ne_of_ne, hx, hy] theorem support_swap_iff (x y : α) : support (swap x y) = {x, y} ↔ x ≠ y := by refine ⟨fun h => ?_, fun h => support_swap h⟩ rintro rfl simp [Finset.ext_iff] at h theorem support_swap_mul_swap {x y z : α} (h : List.Nodup [x, y, z]) : support (swap x y swap y z) = {x, y, z} := by simp only [List.not_mem_nil, and_true, List.mem_cons, not_false_iff, List.nodup_cons, List.mem_singleton, and_self_iff, List.nodup_nil] at h push_neg at h apply le_antisymm · convert support_mul_le (swap x y) (swap y z) using 1 rw [support_swap h.left.left, support_swap h.right.left] simp [Finset.ext_iff] · intro simp only [mem_insert, mem_singleton] rintro (rfl \| rfl \| rfl \| _) <;> simp [swap_apply_of_ne_of_ne, h.left.left, h.left.left.symm, h.left.right.symm, h.left.right.left.symm, h.right.left.symm] theorem support_swap_mul_ge_support_diff (f : Perm α) (x y : α) : f.support \ {x, y} ≤ (swap x y * f).support := by intro simp only [and_imp, Perm.coe_mul, Function.comp_apply, Ne, mem_support, mem_insert, mem_sdiff, mem_singleton] push_neg rintro ha ⟨hx, hy⟩ H rw [swap_apply_eq_iff, swap_apply_of_ne_of_ne hx hy] at H exact ha H theorem support_swap_mul_eq (f : Perm α) (x : α) (h : f (f x) ≠ x) : (swap x (f x) * f).support = f.support \ {x} := by by_cases hx : f x = x · simp [hx, sdiff_singleton_eq_erase, not_mem_support.mpr hx, erase_eq_of_not_mem] ext z by_cases hzx : z = x · simp [hzx] by_cases hzf : z = f x	· simp [hzf, hx, h, swap_apply_of_ne_of_ne] by_cases hzfx : f z = x · simp [Ne.symm hzx, hzx, Ne.symm hzf, hzfx] · simp [Ne.symm hzx, hzx, Ne.symm hzf, hzfx, f.injective.ne hzx, swap_apply_of_ne_of_ne] theorem mem_support_swap_mul_imp_mem_support_ne {x y : α} (hy : y ∈ support (swap x (f x) * f)) : y ∈ support f ∧ y ≠ x := by simp only [mem_support, swap_apply_def, mul_apply, f.injective.eq_iff] at * by_cases h : f y = x · constructor <;> intro <;> simp_all only [if_true, eq_self_iff_true, not_true, Ne] · split_ifs at hy with heq · subst heq; exact ⟨h, hy⟩ · exact ⟨hy, heq⟩	Mathlib/GroupTheory/Perm/Support.lean	505	517
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Algebra.Order.Group.Abs import Mathlib.Algebra.Order.Ring.Int import Mathlib.Data.Nat.Cast.Order.Ring /-! # Order properties of cast of integers This file proves additional properties about the canonical homomorphism from the integers into an additive group with a one (`Int.cast`), particularly results involving algebraic homomorphisms or the order structure on `ℤ` which were not available in the import dependencies of `Mathlib.Data.Int.Cast.Basic`. ## TODO Move order lemmas about `Nat.cast`, `Rat.cast`, `NNRat.cast` here. -/ open Function Nat variable {R : Type*} namespace Int section OrderedAddCommGroupWithOne variable [AddCommGroupWithOne R] [PartialOrder R] [AddLeftMono R] variable [ZeroLEOneClass R] lemma cast_mono : Monotone (Int.cast : ℤ → R) := by intro m n h rw [← sub_nonneg] at h lift n - m to ℕ using h with k hk rw [← sub_nonneg, ← cast_sub, ← hk, cast_natCast] exact k.cast_nonneg' @[gcongr] protected lemma GCongr.intCast_mono {m n : ℤ} (hmn : m ≤ n) : (m : R) ≤ n := cast_mono hmn variable [NeZero (1 : R)] {m n : ℤ} @[simp] lemma cast_nonneg : ∀ {n : ℤ}, (0 : R) ≤ n ↔ 0 ≤ n \| (n : ℕ) => by simp \| -[n+1] => by have : -(n : R) < 1 := lt_of_le_of_lt (by simp) zero_lt_one simpa [(negSucc_lt_zero n).not_le, ← sub_eq_add_neg, le_neg] using this.not_le @[simp, norm_cast] lemma cast_le : (m : R) ≤ n ↔ m ≤ n := by rw [← sub_nonneg, ← cast_sub, cast_nonneg, sub_nonneg] lemma cast_strictMono : StrictMono (fun x : ℤ => (x : R)) := strictMono_of_le_iff_le fun _ _ => cast_le.symm @[simp, norm_cast] lemma cast_lt : (m : R) < n ↔ m < n := cast_strictMono.lt_iff_lt @[gcongr] protected alias ⟨_, GCongr.intCast_strictMono⟩ := Int.cast_lt @[simp] lemma cast_nonpos : (n : R) ≤ 0 ↔ n ≤ 0 := by rw [← cast_zero, cast_le] @[simp] lemma cast_pos : (0 : R) < n ↔ 0 < n := by rw [← cast_zero, cast_lt] @[simp] lemma cast_lt_zero : (n : R) < 0 ↔ n < 0 := by rw [← cast_zero, cast_lt] end OrderedAddCommGroupWithOne section LinearOrderedRing variable [Ring R] [LinearOrder R] [IsStrictOrderedRing R] {a b n : ℤ} {x : R} @[simp, norm_cast] lemma cast_min : ↑(min a b) = (min a b : R) := Monotone.map_min cast_mono @[simp, norm_cast] lemma cast_max : (↑(max a b) : R) = max (a : R) (b : R) := Monotone.map_max cast_mono @[simp, norm_cast] lemma cast_abs : (↑\|a\| : R) = \|(a : R)\| := by simp [abs_eq_max_neg] lemma cast_one_le_of_pos (h : 0 < a) : (1 : R) ≤ a := mod_cast Int.add_one_le_of_lt h lemma cast_le_neg_one_of_neg (h : a < 0) : (a : R) ≤ -1 := by rw [← Int.cast_one, ← Int.cast_neg, cast_le] exact Int.le_sub_one_of_lt h variable (R) in lemma cast_le_neg_one_or_one_le_cast_of_ne_zero (hn : n ≠ 0) : (n : R) ≤ -1 ∨ 1 ≤ (n : R) := hn.lt_or_lt.imp cast_le_neg_one_of_neg cast_one_le_of_pos	lemma nneg_mul_add_sq_of_abs_le_one (n : ℤ) (hx : \|x\| ≤ 1) : (0 : R) ≤ n * x + n * n := by have hnx : 0 < n → 0 ≤ x + n := fun hn => by	Mathlib/Algebra/Order/Ring/Cast.lean	89	91
/- 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.LinearAlgebra.CliffordAlgebra.Conjugation import Mathlib.LinearAlgebra.CliffordAlgebra.Even import Mathlib.LinearAlgebra.QuadraticForm.Prod import Mathlib.Tactic.LiftLets /-! # Isomorphisms with the even subalgebra of a Clifford algebra This file provides some notable isomorphisms regarding the even subalgebra, `CliffordAlgebra.even`. ## Main definitions * `CliffordAlgebra.equivEven`: Every Clifford algebra is isomorphic as an algebra to the even subalgebra of a Clifford algebra with one more dimension. * `CliffordAlgebra.EquivEven.Q'`: The quadratic form used by this "one-up" algebra. * `CliffordAlgebra.toEven`: The simp-normal form of the forward direction of this isomorphism. * `CliffordAlgebra.ofEven`: The simp-normal form of the reverse direction of this isomorphism. * `CliffordAlgebra.evenEquivEvenNeg`: Every even subalgebra is isomorphic to the even subalgebra of the Clifford algebra with negated quadratic form. * `CliffordAlgebra.evenToNeg`: The simp-normal form of each direction of this isomorphism. ## Main results * `CliffordAlgebra.coe_toEven_reverse_involute`: the behavior of `CliffordAlgebra.toEven` on the "Clifford conjugate", that is `CliffordAlgebra.reverse` composed with `CliffordAlgebra.involute`. -/ namespace CliffordAlgebra variable {R M : Type} [CommRing R] [AddCommGroup M] [Module R M] variable (Q : QuadraticForm R M) /-! ### Constructions needed for `CliffordAlgebra.equivEven` -/ namespace EquivEven /-- The quadratic form on the augmented vector space `M × R` sending `v + r•e0` to `Q v - r^2`. -/ abbrev Q' : QuadraticForm R (M × R) := Q.prod <\| -QuadraticMap.sq (R := R) theorem Q'_apply (m : M × R) : Q' Q m = Q m.1 - m.2 m.2 := (sub_eq_add_neg _ _).symm /-- The unit vector in the new dimension -/ def e0 : CliffordAlgebra (Q' Q) := ι (Q' Q) (0, 1) /-- The embedding from the existing vector space -/ def v : M →ₗ[R] CliffordAlgebra (Q' Q) := ι (Q' Q) ∘ₗ LinearMap.inl _ _ _ theorem ι_eq_v_add_smul_e0 (m : M) (r : R) : ι (Q' Q) (m, r) = v Q m + r • e0 Q := by rw [e0, v, LinearMap.comp_apply, LinearMap.inl_apply, ← LinearMap.map_smul, Prod.smul_mk, smul_zero, smul_eq_mul, mul_one, ← LinearMap.map_add, Prod.mk_add_mk, zero_add, add_zero] theorem e0_mul_e0 : e0 Q * e0 Q = -1 := (ι_sq_scalar _ _).trans <\| by simp theorem v_sq_scalar (m : M) : v Q m * v Q m = algebraMap _ _ (Q m) := (ι_sq_scalar _ _).trans <\| by simp theorem neg_e0_mul_v (m : M) : -(e0 Q * v Q m) = v Q m * e0 Q := by refine neg_eq_of_add_eq_zero_right ((ι_mul_ι_add_swap _ _).trans ?_) dsimp [QuadraticMap.polar] simp only [add_zero, mul_zero, mul_one, zero_add, neg_zero, QuadraticMap.map_zero, add_sub_cancel_right, sub_self, map_zero, zero_sub] theorem neg_v_mul_e0 (m : M) : -(v Q m * e0 Q) = e0 Q * v Q m := by rw [neg_eq_iff_eq_neg] exact (neg_e0_mul_v _ m).symm @[simp] theorem e0_mul_v_mul_e0 (m : M) : e0 Q * v Q m * e0 Q = v Q m := by rw [← neg_v_mul_e0, ← neg_mul, mul_assoc, e0_mul_e0, mul_neg_one, neg_neg] @[simp] theorem reverse_v (m : M) : reverse (Q := Q' Q) (v Q m) = v Q m := reverse_ι _ @[simp] theorem involute_v (m : M) : involute (v Q m) = -v Q m := involute_ι _ @[simp] theorem reverse_e0 : reverse (Q := Q' Q) (e0 Q) = e0 Q :=	reverse_ι _	Mathlib/LinearAlgebra/CliffordAlgebra/EvenEquiv.lean	95	96
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Sébastien Gouëzel, Yury Kudryashov -/ import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.LinearAlgebra.Determinant import Mathlib.LinearAlgebra.Matrix.Diagonal import Mathlib.LinearAlgebra.Matrix.Transvection import Mathlib.MeasureTheory.Group.LIntegral import Mathlib.MeasureTheory.Integral.Marginal import Mathlib.MeasureTheory.Measure.Stieltjes import Mathlib.MeasureTheory.Measure.Haar.OfBasis /-! # Lebesgue measure on the real line and on `ℝⁿ` We show that the Lebesgue measure on the real line (constructed as a particular case of additive Haar measure on inner product spaces) coincides with the Stieltjes measure associated to the function `x ↦ x`. We deduce properties of this measure on `ℝ`, and then of the product Lebesgue measure on `ℝⁿ`. In particular, we prove that they are translation invariant. We show that, on `ℝⁿ`, a linear map acts on Lebesgue measure by rescaling it through the absolute value of its determinant, in `Real.map_linearMap_volume_pi_eq_smul_volume_pi`. More properties of the Lebesgue measure are deduced from this in `Mathlib/MeasureTheory/Measure/Lebesgue/EqHaar.lean`, where they are proved more generally for any additive Haar measure on a finite-dimensional real vector space. -/ assert_not_exists MeasureTheory.integral noncomputable section open Set Filter MeasureTheory MeasureTheory.Measure TopologicalSpace open ENNReal (ofReal) open scoped ENNReal NNReal Topology /-! ### Definition of the Lebesgue measure and lengths of intervals -/ namespace Real variable {ι : Type} [Fintype ι] /-- The volume on the real line (as a particular case of the volume on a finite-dimensional inner product space) coincides with the Stieltjes measure coming from the identity function. -/ theorem volume_eq_stieltjes_id : (volume : Measure ℝ) = StieltjesFunction.id.measure := by haveI : IsAddLeftInvariant StieltjesFunction.id.measure := ⟨fun a => Eq.symm <\| Real.measure_ext_Ioo_rat fun p q => by simp only [Measure.map_apply (measurable_const_add a) measurableSet_Ioo, sub_sub_sub_cancel_right, StieltjesFunction.measure_Ioo, StieltjesFunction.id_leftLim, StieltjesFunction.id_apply, id, preimage_const_add_Ioo]⟩ have A : StieltjesFunction.id.measure (stdOrthonormalBasis ℝ ℝ).toBasis.parallelepiped = 1 := by change StieltjesFunction.id.measure (parallelepiped (stdOrthonormalBasis ℝ ℝ)) = 1 rcases parallelepiped_orthonormalBasis_one_dim (stdOrthonormalBasis ℝ ℝ) with (H \| H) <;> simp only [H, StieltjesFunction.measure_Icc, StieltjesFunction.id_apply, id, tsub_zero, StieltjesFunction.id_leftLim, sub_neg_eq_add, zero_add, ENNReal.ofReal_one] conv_rhs => rw [addHaarMeasure_unique StieltjesFunction.id.measure (stdOrthonormalBasis ℝ ℝ).toBasis.parallelepiped, A] simp only [volume, Basis.addHaar, one_smul] theorem volume_val (s) : volume s = StieltjesFunction.id.measure s := by simp [volume_eq_stieltjes_id] @[simp] theorem volume_Ico {a b : ℝ} : volume (Ico a b) = ofReal (b - a) := by simp [volume_val] @[simp] theorem volume_real_Ico {a b : ℝ} : volume.real (Ico a b) = max (b - a) 0 := by simp [measureReal_def, ENNReal.toReal_ofReal'] theorem volume_real_Ico_of_le {a b : ℝ} (hab : a ≤ b) : volume.real (Ico a b) = b - a := by simp [hab] @[simp] theorem volume_Icc {a b : ℝ} : volume (Icc a b) = ofReal (b - a) := by simp [volume_val] @[simp] theorem volume_real_Icc {a b : ℝ} : volume.real (Icc a b) = max (b - a) 0 := by simp [measureReal_def, ENNReal.toReal_ofReal'] theorem volume_real_Icc_of_le {a b : ℝ} (hab : a ≤ b) : volume.real (Icc a b) = b - a := by simp [hab] @[simp] theorem volume_Ioo {a b : ℝ} : volume (Ioo a b) = ofReal (b - a) := by simp [volume_val] @[simp] theorem volume_real_Ioo {a b : ℝ} : volume.real (Ioo a b) = max (b - a) 0 := by simp [measureReal_def, ENNReal.toReal_ofReal'] theorem volume_real_Ioo_of_le {a b : ℝ} (hab : a ≤ b) : volume.real (Ioo a b) = b - a := by simp [hab] @[simp] theorem volume_Ioc {a b : ℝ} : volume (Ioc a b) = ofReal (b - a) := by simp [volume_val] @[simp] theorem volume_real_Ioc {a b : ℝ} : volume.real (Ioc a b) = max (b - a) 0 := by simp [measureReal_def, ENNReal.toReal_ofReal'] theorem volume_real_Ioc_of_le {a b : ℝ} (hab : a ≤ b) : volume.real (Ioc a b) = b - a := by simp [hab] theorem volume_singleton {a : ℝ} : volume ({a} : Set ℝ) = 0 := by simp [volume_val] theorem volume_univ : volume (univ : Set ℝ) = ∞ := ENNReal.eq_top_of_forall_nnreal_le fun r => calc (r : ℝ≥0∞) = volume (Icc (0 : ℝ) r) := by simp _ ≤ volume univ := measure_mono (subset_univ _) @[simp] theorem volume_ball (a r : ℝ) : volume (Metric.ball a r) = ofReal (2 r) := by rw [ball_eq_Ioo, volume_Ioo, ← sub_add, add_sub_cancel_left, two_mul] @[simp] theorem volume_real_ball {a r : ℝ} (hr : 0 ≤ r) : volume.real (Metric.ball a r) = 2 * r := by simp [measureReal_def, hr] @[simp] theorem volume_closedBall (a r : ℝ) : volume (Metric.closedBall a r) = ofReal (2 * r) := by rw [closedBall_eq_Icc, volume_Icc, ← sub_add, add_sub_cancel_left, two_mul] @[simp] theorem volume_real_closedBall {a r : ℝ} (hr : 0 ≤ r) : volume.real (Metric.closedBall a r) = 2 * r := by simp [measureReal_def, hr] @[simp] theorem volume_emetric_ball (a : ℝ) (r : ℝ≥0∞) : volume (EMetric.ball a r) = 2 * r := by rcases eq_or_ne r ∞ with (rfl \| hr) · rw [Metric.emetric_ball_top, volume_univ, two_mul, _root_.top_add] · lift r to ℝ≥0 using hr rw [Metric.emetric_ball_nnreal, volume_ball, two_mul, ← NNReal.coe_add, ENNReal.ofReal_coe_nnreal, ENNReal.coe_add, two_mul] @[simp] theorem volume_emetric_closedBall (a : ℝ) (r : ℝ≥0∞) : volume (EMetric.closedBall a r) = 2 * r := by rcases eq_or_ne r ∞ with (rfl \| hr) · rw [EMetric.closedBall_top, volume_univ, two_mul, _root_.top_add] · lift r to ℝ≥0 using hr rw [Metric.emetric_closedBall_nnreal, volume_closedBall, two_mul, ← NNReal.coe_add, ENNReal.ofReal_coe_nnreal, ENNReal.coe_add, two_mul] instance noAtoms_volume : NoAtoms (volume : Measure ℝ) := ⟨fun _ => volume_singleton⟩ @[simp] theorem volume_interval {a b : ℝ} : volume (uIcc a b) = ofReal \|b - a\| := by rw [← Icc_min_max, volume_Icc, max_sub_min_eq_abs] @[simp] theorem volume_real_interval {a b : ℝ} : volume.real (uIcc a b) = \|b - a\| := by simp [measureReal_def] @[simp] theorem volume_Ioi {a : ℝ} : volume (Ioi a) = ∞ := top_unique <\| le_of_tendsto' ENNReal.tendsto_nat_nhds_top fun n => calc (n : ℝ≥0∞) = volume (Ioo a (a + n)) := by simp _ ≤ volume (Ioi a) := measure_mono Ioo_subset_Ioi_self @[simp] theorem volume_Ici {a : ℝ} : volume (Ici a) = ∞ := by rw [← measure_congr Ioi_ae_eq_Ici]; simp @[simp] theorem volume_Iio {a : ℝ} : volume (Iio a) = ∞ := top_unique <\| le_of_tendsto' ENNReal.tendsto_nat_nhds_top fun n => calc (n : ℝ≥0∞) = volume (Ioo (a - n) a) := by simp _ ≤ volume (Iio a) := measure_mono Ioo_subset_Iio_self @[simp] theorem volume_Iic {a : ℝ} : volume (Iic a) = ∞ := by rw [← measure_congr Iio_ae_eq_Iic]; simp instance locallyFinite_volume : IsLocallyFiniteMeasure (volume : Measure ℝ) := ⟨fun x => ⟨Ioo (x - 1) (x + 1), IsOpen.mem_nhds isOpen_Ioo ⟨sub_lt_self _ zero_lt_one, lt_add_of_pos_right _ zero_lt_one⟩, by simp only [Real.volume_Ioo, ENNReal.ofReal_lt_top]⟩⟩ instance isFiniteMeasure_restrict_Icc (x y : ℝ) : IsFiniteMeasure (volume.restrict (Icc x y)) := ⟨by simp⟩ instance isFiniteMeasure_restrict_Ico (x y : ℝ) : IsFiniteMeasure (volume.restrict (Ico x y)) := ⟨by simp⟩ instance isFiniteMeasure_restrict_Ioc (x y : ℝ) : IsFiniteMeasure (volume.restrict (Ioc x y)) := ⟨by simp⟩ instance isFiniteMeasure_restrict_Ioo (x y : ℝ) : IsFiniteMeasure (volume.restrict (Ioo x y)) := ⟨by simp⟩ theorem volume_le_diam (s : Set ℝ) : volume s ≤ EMetric.diam s := by by_cases hs : Bornology.IsBounded s · rw [Real.ediam_eq hs, ← volume_Icc] exact volume.mono hs.subset_Icc_sInf_sSup · rw [Metric.ediam_of_unbounded hs]; exact le_top theorem _root_.Filter.Eventually.volume_pos_of_nhds_real {p : ℝ → Prop} {a : ℝ} (h : ∀ᶠ x in 𝓝 a, p x) : (0 : ℝ≥0∞) < volume { x \| p x } := by rcases h.exists_Ioo_subset with ⟨l, u, hx, hs⟩ refine lt_of_lt_of_le ?_ (measure_mono hs) simpa [-mem_Ioo] using hx.1.trans hx.2 /-! ### Volume of a box in `ℝⁿ` -/ theorem volume_Icc_pi {a b : ι → ℝ} : volume (Icc a b) = ∏ i, ENNReal.ofReal (b i - a i) := by rw [← pi_univ_Icc, volume_pi_pi] simp only [Real.volume_Icc] @[simp] theorem volume_Icc_pi_toReal {a b : ι → ℝ} (h : a ≤ b) : (volume (Icc a b)).toReal = ∏ i, (b i - a i) := by simp only [volume_Icc_pi, ENNReal.toReal_prod, ENNReal.toReal_ofReal (sub_nonneg.2 (h _))] theorem volume_pi_Ioo {a b : ι → ℝ} : volume (pi univ fun i => Ioo (a i) (b i)) = ∏ i, ENNReal.ofReal (b i - a i) := (measure_congr Measure.univ_pi_Ioo_ae_eq_Icc).trans volume_Icc_pi @[simp] theorem volume_pi_Ioo_toReal {a b : ι → ℝ} (h : a ≤ b) : (volume (pi univ fun i => Ioo (a i) (b i))).toReal = ∏ i, (b i - a i) := by simp only [volume_pi_Ioo, ENNReal.toReal_prod, ENNReal.toReal_ofReal (sub_nonneg.2 (h _))] theorem volume_pi_Ioc {a b : ι → ℝ} : volume (pi univ fun i => Ioc (a i) (b i)) = ∏ i, ENNReal.ofReal (b i - a i) := (measure_congr Measure.univ_pi_Ioc_ae_eq_Icc).trans volume_Icc_pi @[simp] theorem volume_pi_Ioc_toReal {a b : ι → ℝ} (h : a ≤ b) : (volume (pi univ fun i => Ioc (a i) (b i))).toReal = ∏ i, (b i - a i) := by simp only [volume_pi_Ioc, ENNReal.toReal_prod, ENNReal.toReal_ofReal (sub_nonneg.2 (h _))] theorem volume_pi_Ico {a b : ι → ℝ} : volume (pi univ fun i => Ico (a i) (b i)) = ∏ i, ENNReal.ofReal (b i - a i) := (measure_congr Measure.univ_pi_Ico_ae_eq_Icc).trans volume_Icc_pi @[simp] theorem volume_pi_Ico_toReal {a b : ι → ℝ} (h : a ≤ b) : (volume (pi univ fun i => Ico (a i) (b i))).toReal = ∏ i, (b i - a i) := by simp only [volume_pi_Ico, ENNReal.toReal_prod, ENNReal.toReal_ofReal (sub_nonneg.2 (h _))] @[simp] nonrec theorem volume_pi_ball (a : ι → ℝ) {r : ℝ} (hr : 0 < r) : volume (Metric.ball a r) = ENNReal.ofReal ((2 * r) ^ Fintype.card ι) := by simp only [MeasureTheory.volume_pi_ball a hr, volume_ball, Finset.prod_const] exact (ENNReal.ofReal_pow (mul_nonneg zero_le_two hr.le) _).symm @[simp] nonrec theorem volume_pi_closedBall (a : ι → ℝ) {r : ℝ} (hr : 0 ≤ r) : volume (Metric.closedBall a r) = ENNReal.ofReal ((2 * r) ^ Fintype.card ι) := by simp only [MeasureTheory.volume_pi_closedBall a hr, volume_closedBall, Finset.prod_const] exact (ENNReal.ofReal_pow (mul_nonneg zero_le_two hr) _).symm theorem volume_pi_le_prod_diam (s : Set (ι → ℝ)) : volume s ≤ ∏ i : ι, EMetric.diam (Function.eval i '' s) := calc volume s ≤ volume (pi univ fun i => closure (Function.eval i '' s)) := volume.mono <\| Subset.trans (subset_pi_eval_image univ s) <\| pi_mono fun _ _ => subset_closure _ = ∏ i, volume (closure <\| Function.eval i '' s) := volume_pi_pi _ _ ≤ ∏ i : ι, EMetric.diam (Function.eval i '' s) := Finset.prod_le_prod' fun _ _ => (volume_le_diam _).trans_eq (EMetric.diam_closure _) theorem volume_pi_le_diam_pow (s : Set (ι → ℝ)) : volume s ≤ EMetric.diam s ^ Fintype.card ι := calc volume s ≤ ∏ i : ι, EMetric.diam (Function.eval i '' s) := volume_pi_le_prod_diam s _ ≤ ∏ _i : ι, (1 : ℝ≥0) * EMetric.diam s := (Finset.prod_le_prod' fun i _ => (LipschitzWith.eval i).ediam_image_le s) _ = EMetric.diam s ^ Fintype.card ι := by simp only [ENNReal.coe_one, one_mul, Finset.prod_const, Fintype.card] /-! ### Images of the Lebesgue measure under multiplication in ℝ -/ theorem smul_map_volume_mul_left {a : ℝ} (h : a ≠ 0) : ENNReal.ofReal \|a\| • Measure.map (a * ·) volume = volume := by refine (Real.measure_ext_Ioo_rat fun p q => ?_).symm rcases lt_or_gt_of_ne h with h \| h · simp only [Real.volume_Ioo, Measure.smul_apply, ← ENNReal.ofReal_mul (le_of_lt <\| neg_pos.2 h), Measure.map_apply (measurable_const_mul a) measurableSet_Ioo, neg_sub_neg, neg_mul, preimage_const_mul_Ioo_of_neg _ _ h, abs_of_neg h, mul_sub, smul_eq_mul, mul_div_cancel₀ _ (ne_of_lt h)] · simp only [Real.volume_Ioo, Measure.smul_apply, ← ENNReal.ofReal_mul (le_of_lt h), Measure.map_apply (measurable_const_mul a) measurableSet_Ioo, preimage_const_mul_Ioo _ _ h, abs_of_pos h, mul_sub, mul_div_cancel₀ _ (ne_of_gt h), smul_eq_mul] theorem map_volume_mul_left {a : ℝ} (h : a ≠ 0) : Measure.map (a * ·) volume = ENNReal.ofReal \|a⁻¹\| • volume := by conv_rhs => rw [← Real.smul_map_volume_mul_left h, smul_smul, ← ENNReal.ofReal_mul (abs_nonneg _), ← abs_mul, inv_mul_cancel₀ h, abs_one, ENNReal.ofReal_one, one_smul] @[simp] theorem volume_preimage_mul_left {a : ℝ} (h : a ≠ 0) (s : Set ℝ) : volume ((a * ·) ⁻¹' s) = ENNReal.ofReal (abs a⁻¹) * volume s := calc volume ((a * ·) ⁻¹' s) = Measure.map (a * ·) volume s := ((Homeomorph.mulLeft₀ a h).toMeasurableEquiv.map_apply s).symm _ = ENNReal.ofReal (abs a⁻¹) * volume s := by rw [map_volume_mul_left h]; rfl theorem smul_map_volume_mul_right {a : ℝ} (h : a ≠ 0) : ENNReal.ofReal \|a\| • Measure.map (· * a) volume = volume := by simpa only [mul_comm] using Real.smul_map_volume_mul_left h theorem map_volume_mul_right {a : ℝ} (h : a ≠ 0) : Measure.map (· * a) volume = ENNReal.ofReal \|a⁻¹\| • volume := by simpa only [mul_comm] using Real.map_volume_mul_left h @[simp] theorem volume_preimage_mul_right {a : ℝ} (h : a ≠ 0) (s : Set ℝ) : volume ((· * a) ⁻¹' s) = ENNReal.ofReal (abs a⁻¹) * volume s := calc volume ((· * a) ⁻¹' s) = Measure.map (· * a) volume s := ((Homeomorph.mulRight₀ a h).toMeasurableEquiv.map_apply s).symm _ = ENNReal.ofReal (abs a⁻¹) * volume s := by rw [map_volume_mul_right h]; rfl /-! ### Images of the Lebesgue measure under translation/linear maps in ℝⁿ -/ open Matrix /-- A diagonal matrix rescales Lebesgue according to its determinant. This is a special case of `Real.map_matrix_volume_pi_eq_smul_volume_pi`, that one should use instead (and whose proof uses this particular case). -/ theorem smul_map_diagonal_volume_pi [DecidableEq ι] {D : ι → ℝ} (h : det (diagonal D) ≠ 0) : ENNReal.ofReal (abs (det (diagonal D))) • Measure.map (toLin' (diagonal D)) volume = volume := by refine (Measure.pi_eq fun s hs => ?_).symm simp only [det_diagonal, Measure.coe_smul, Algebra.id.smul_eq_mul, Pi.smul_apply] rw [Measure.map_apply _ (MeasurableSet.univ_pi hs)] swap; · exact Continuous.measurable (LinearMap.continuous_on_pi _) have : (Matrix.toLin' (diagonal D) ⁻¹' Set.pi Set.univ fun i : ι => s i) = Set.pi Set.univ fun i : ι => (D i * ·) ⁻¹' s i := by ext f simp only [LinearMap.coe_proj, Algebra.id.smul_eq_mul, LinearMap.smul_apply, mem_univ_pi, mem_preimage, LinearMap.pi_apply, diagonal_toLin'] have B : ∀ i, ofReal (abs (D i)) * volume ((D i * ·) ⁻¹' s i) = volume (s i) := by intro i have A : D i ≠ 0 := by simp only [det_diagonal, Ne] at h exact Finset.prod_ne_zero_iff.1 h i (Finset.mem_univ i) rw [volume_preimage_mul_left A, ← mul_assoc, ← ENNReal.ofReal_mul (abs_nonneg _), ← abs_mul, mul_inv_cancel₀ A, abs_one, ENNReal.ofReal_one, one_mul] rw [this, volume_pi_pi, Finset.abs_prod, ENNReal.ofReal_prod_of_nonneg fun i _ => abs_nonneg (D i), ← Finset.prod_mul_distrib] simp only [B] /-- A transvection preserves Lebesgue measure. -/ theorem volume_preserving_transvectionStruct [DecidableEq ι] (t : TransvectionStruct ι ℝ) : MeasurePreserving (toLin' t.toMatrix) := by /- We use `lmarginal` to conveniently use Fubini's theorem. Along the coordinate where there is a shearing, it acts like a translation, and therefore preserves Lebesgue. -/ have ht : Measurable (toLin' t.toMatrix) := (toLin' t.toMatrix).continuous_of_finiteDimensional.measurable refine ⟨ht, ?_⟩ refine (pi_eq fun s hs ↦ ?_).symm have h2s : MeasurableSet (univ.pi s) := .pi countable_univ fun i _ ↦ hs i simp_rw [← pi_pi, ← lintegral_indicator_one h2s] rw [lintegral_map (measurable_one.indicator h2s) ht, volume_pi] refine lintegral_eq_of_lmarginal_eq {t.i} ((measurable_one.indicator h2s).comp ht) (measurable_one.indicator h2s) ?_ simp_rw [lmarginal_singleton] ext x cases t with \| mk t_i t_j t_hij t_c => simp [transvection, mulVec_stdBasisMatrix, t_hij.symm, ← Function.update_add, lintegral_add_right_eq_self fun xᵢ ↦ indicator (univ.pi s) 1 (Function.update x t_i xᵢ)] /-- Any invertible matrix rescales Lebesgue measure through the absolute value of its determinant. -/ theorem map_matrix_volume_pi_eq_smul_volume_pi [DecidableEq ι] {M : Matrix ι ι ℝ} (hM : det M ≠ 0) : Measure.map (toLin' M) volume = ENNReal.ofReal (abs (det M)⁻¹) • volume := by -- This follows from the cases we have already proved, of diagonal matrices and transvections, -- as these matrices generate all invertible matrices. apply diagonal_transvection_induction_of_det_ne_zero _ M hM · intro D hD conv_rhs => rw [← smul_map_diagonal_volume_pi hD] rw [smul_smul, ← ENNReal.ofReal_mul (abs_nonneg _), ← abs_mul, inv_mul_cancel₀ hD, abs_one, ENNReal.ofReal_one, one_smul] · intro t simp_rw [Matrix.TransvectionStruct.det, _root_.inv_one, abs_one, ENNReal.ofReal_one, one_smul, (volume_preserving_transvectionStruct _).map_eq] · intro A B _ _ IHA IHB rw [toLin'_mul, det_mul, LinearMap.coe_comp, ← Measure.map_map, IHB, Measure.map_smul, IHA, smul_smul, ← ENNReal.ofReal_mul (abs_nonneg _), ← abs_mul, mul_comm, mul_inv] · apply Continuous.measurable apply LinearMap.continuous_on_pi · apply Continuous.measurable apply LinearMap.continuous_on_pi /-- Any invertible linear map rescales Lebesgue measure through the absolute value of its determinant. -/ theorem map_linearMap_volume_pi_eq_smul_volume_pi {f : (ι → ℝ) →ₗ[ℝ] ι → ℝ} (hf : LinearMap.det f ≠ 0) : Measure.map f volume = ENNReal.ofReal (abs (LinearMap.det f)⁻¹) • volume := by classical -- this is deduced from the matrix case let M := LinearMap.toMatrix' f have A : LinearMap.det f = det M := by simp only [M, LinearMap.det_toMatrix'] have B : f = toLin' M := by simp only [M, toLin'_toMatrix'] rw [A, B] apply map_matrix_volume_pi_eq_smul_volume_pi rwa [A] at hf end Real section regionBetween variable {α : Type*} /-- The region between two real-valued functions on an arbitrary set. -/ def regionBetween (f g : α → ℝ) (s : Set α) : Set (α × ℝ) := { p : α × ℝ \| p.1 ∈ s ∧ p.2 ∈ Ioo (f p.1) (g p.1) } theorem regionBetween_subset (f g : α → ℝ) (s : Set α) : regionBetween f g s ⊆ s ×ˢ univ := by simpa only [prod_univ, regionBetween, Set.preimage, setOf_subset_setOf] using fun a => And.left variable [MeasurableSpace α] {μ : Measure α} {f g : α → ℝ} {s : Set α} /-- The region between two measurable functions on a measurable set is measurable. -/ theorem measurableSet_regionBetween (hf : Measurable f) (hg : Measurable g) (hs : MeasurableSet s) : MeasurableSet (regionBetween f g s) := by dsimp only [regionBetween, Ioo, mem_setOf_eq, setOf_and] refine MeasurableSet.inter ?_ ((measurableSet_lt (hf.comp measurable_fst) measurable_snd).inter (measurableSet_lt measurable_snd (hg.comp measurable_fst))) exact measurable_fst hs /-- The region between two measurable functions on a measurable set is measurable; a version for the region together with the graph of the upper function. -/ theorem measurableSet_region_between_oc (hf : Measurable f) (hg : Measurable g) (hs : MeasurableSet s) : MeasurableSet { p : α × ℝ \| p.fst ∈ s ∧ p.snd ∈ Ioc (f p.fst) (g p.fst) } := by dsimp only [regionBetween, Ioc, mem_setOf_eq, setOf_and] refine MeasurableSet.inter ?_ ((measurableSet_lt (hf.comp measurable_fst) measurable_snd).inter (measurableSet_le measurable_snd (hg.comp measurable_fst))) exact measurable_fst hs /-- The region between two measurable functions on a measurable set is measurable; a version for the region together with the graph of the lower function. -/ theorem measurableSet_region_between_co (hf : Measurable f) (hg : Measurable g) (hs : MeasurableSet s) : MeasurableSet { p : α × ℝ \| p.fst ∈ s ∧ p.snd ∈ Ico (f p.fst) (g p.fst) } := by dsimp only [regionBetween, Ico, mem_setOf_eq, setOf_and] refine MeasurableSet.inter ?_ ((measurableSet_le (hf.comp measurable_fst) measurable_snd).inter (measurableSet_lt measurable_snd (hg.comp measurable_fst))) exact measurable_fst hs /-- The region between two measurable functions on a measurable set is measurable; a version for the region together with the graphs of both functions. -/ theorem measurableSet_region_between_cc (hf : Measurable f) (hg : Measurable g) (hs : MeasurableSet s) : MeasurableSet { p : α × ℝ \| p.fst ∈ s ∧ p.snd ∈ Icc (f p.fst) (g p.fst) } := by dsimp only [regionBetween, Icc, mem_setOf_eq, setOf_and] refine MeasurableSet.inter ?_ ((measurableSet_le (hf.comp measurable_fst) measurable_snd).inter (measurableSet_le measurable_snd (hg.comp measurable_fst))) exact measurable_fst hs /-- The graph of a measurable function is a measurable set. -/ theorem measurableSet_graph (hf : Measurable f) : MeasurableSet { p : α × ℝ \| p.snd = f p.fst } := by simpa using measurableSet_region_between_cc hf hf MeasurableSet.univ theorem volume_regionBetween_eq_lintegral' (hf : Measurable f) (hg : Measurable g) (hs : MeasurableSet s) : μ.prod volume (regionBetween f g s) = ∫⁻ y in s, ENNReal.ofReal ((g - f) y) ∂μ := by classical rw [Measure.prod_apply] · have h : (fun x => volume { a \| x ∈ s ∧ a ∈ Ioo (f x) (g x) }) = s.indicator fun x => ENNReal.ofReal (g x - f x) := by funext x rw [indicator_apply] split_ifs with h · have hx : { a \| x ∈ s ∧ a ∈ Ioo (f x) (g x) } = Ioo (f x) (g x) := by simp [h, Ioo] simp only [hx, Real.volume_Ioo, sub_zero] · have hx : { a \| x ∈ s ∧ a ∈ Ioo (f x) (g x) } = ∅ := by simp [h] simp only [hx, measure_empty] dsimp only [regionBetween, preimage_setOf_eq] rw [h, lintegral_indicator] <;> simp only [hs, Pi.sub_apply] · exact measurableSet_regionBetween hf hg hs /-- The volume of the region between two almost everywhere measurable functions on a measurable set can be represented as a Lebesgue integral. -/ theorem volume_regionBetween_eq_lintegral [SFinite μ] (hf : AEMeasurable f (μ.restrict s)) (hg : AEMeasurable g (μ.restrict s)) (hs : MeasurableSet s) : μ.prod volume (regionBetween f g s) = ∫⁻ y in s, ENNReal.ofReal ((g - f) y) ∂μ := by have h₁ : (fun y => ENNReal.ofReal ((g - f) y)) =ᵐ[μ.restrict s] fun y => ENNReal.ofReal ((AEMeasurable.mk g hg - AEMeasurable.mk f hf) y) := (hg.ae_eq_mk.sub hf.ae_eq_mk).fun_comp ENNReal.ofReal have h₂ : (μ.restrict s).prod volume (regionBetween f g s) = (μ.restrict s).prod volume (regionBetween (AEMeasurable.mk f hf) (AEMeasurable.mk g hg) s) := by apply measure_congr apply EventuallyEq.rfl.inter exact ((quasiMeasurePreserving_fst.ae_eq_comp hf.ae_eq_mk).comp₂ _ EventuallyEq.rfl).inter (EventuallyEq.rfl.comp₂ _ <\| quasiMeasurePreserving_fst.ae_eq_comp hg.ae_eq_mk) rw [lintegral_congr_ae h₁, ← volume_regionBetween_eq_lintegral' hf.measurable_mk hg.measurable_mk hs] convert h₂ using 1 · rw [Measure.restrict_prod_eq_prod_univ] exact (Measure.restrict_eq_self _ (regionBetween_subset f g s)).symm · rw [Measure.restrict_prod_eq_prod_univ] exact (Measure.restrict_eq_self _ (regionBetween_subset (AEMeasurable.mk f hf) (AEMeasurable.mk g hg) s)).symm /-- The region between two a.e.-measurable functions on a null-measurable set is null-measurable. -/ lemma nullMeasurableSet_regionBetween (μ : Measure α) {f g : α → ℝ} (f_mble : AEMeasurable f μ) (g_mble : AEMeasurable g μ) {s : Set α} (s_mble : NullMeasurableSet s μ) : NullMeasurableSet {p : α × ℝ \| p.1 ∈ s ∧ p.snd ∈ Ioo (f p.fst) (g p.fst)} (μ.prod volume) := by refine NullMeasurableSet.inter (s_mble.preimage quasiMeasurePreserving_fst) (NullMeasurableSet.inter ?_ ?_) · exact nullMeasurableSet_lt (AEMeasurable.fst f_mble) measurable_snd.aemeasurable · exact nullMeasurableSet_lt measurable_snd.aemeasurable (AEMeasurable.fst g_mble) /-- The region between two a.e.-measurable functions on a null-measurable set is null-measurable; a version for the region together with the graph of the upper function. -/ lemma nullMeasurableSet_region_between_oc (μ : Measure α) {f g : α → ℝ} (f_mble : AEMeasurable f μ) (g_mble : AEMeasurable g μ) {s : Set α} (s_mble : NullMeasurableSet s μ) : NullMeasurableSet {p : α × ℝ \| p.1 ∈ s ∧ p.snd ∈ Ioc (f p.fst) (g p.fst)} (μ.prod volume) := by refine NullMeasurableSet.inter (s_mble.preimage quasiMeasurePreserving_fst) (NullMeasurableSet.inter ?_ ?_) · exact nullMeasurableSet_lt (AEMeasurable.fst f_mble) measurable_snd.aemeasurable · change NullMeasurableSet {p : α × ℝ \| p.snd ≤ g p.fst} (μ.prod volume) rw [show {p : α × ℝ \| p.snd ≤ g p.fst} = {p : α × ℝ \| g p.fst < p.snd}ᶜ by ext p simp only [mem_setOf_eq, mem_compl_iff, not_lt]] exact (nullMeasurableSet_lt (AEMeasurable.fst g_mble) measurable_snd.aemeasurable).compl /-- The region between two a.e.-measurable functions on a null-measurable set is null-measurable; a version for the region together with the graph of the lower function. -/ lemma nullMeasurableSet_region_between_co (μ : Measure α) {f g : α → ℝ} (f_mble : AEMeasurable f μ) (g_mble : AEMeasurable g μ) {s : Set α} (s_mble : NullMeasurableSet s μ) : NullMeasurableSet {p : α × ℝ \| p.1 ∈ s ∧ p.snd ∈ Ico (f p.fst) (g p.fst)} (μ.prod volume) := by refine NullMeasurableSet.inter (s_mble.preimage quasiMeasurePreserving_fst) (NullMeasurableSet.inter ?_ ?_) · change NullMeasurableSet {p : α × ℝ \| f p.fst ≤ p.snd} (μ.prod volume) rw [show {p : α × ℝ \| f p.fst ≤ p.snd} = {p : α × ℝ \| p.snd < f p.fst}ᶜ by ext p simp only [mem_setOf_eq, mem_compl_iff, not_lt]] exact (nullMeasurableSet_lt measurable_snd.aemeasurable (AEMeasurable.fst f_mble)).compl · exact nullMeasurableSet_lt measurable_snd.aemeasurable (AEMeasurable.fst g_mble) /-- The region between two a.e.-measurable functions on a null-measurable set is null-measurable; a version for the region together with the graphs of both functions. -/ lemma nullMeasurableSet_region_between_cc (μ : Measure α) {f g : α → ℝ} (f_mble : AEMeasurable f μ) (g_mble : AEMeasurable g μ) {s : Set α} (s_mble : NullMeasurableSet s μ) : NullMeasurableSet {p : α × ℝ \| p.1 ∈ s ∧ p.snd ∈ Icc (f p.fst) (g p.fst)} (μ.prod volume) := by refine NullMeasurableSet.inter (s_mble.preimage quasiMeasurePreserving_fst) (NullMeasurableSet.inter ?_ ?_) · change NullMeasurableSet {p : α × ℝ \| f p.fst ≤ p.snd} (μ.prod volume) rw [show {p : α × ℝ \| f p.fst ≤ p.snd} = {p : α × ℝ \| p.snd < f p.fst}ᶜ by ext p simp only [mem_setOf_eq, mem_compl_iff, not_lt]] exact (nullMeasurableSet_lt measurable_snd.aemeasurable (AEMeasurable.fst f_mble)).compl · change NullMeasurableSet {p : α × ℝ \| p.snd ≤ g p.fst} (μ.prod volume) rw [show {p : α × ℝ \| p.snd ≤ g p.fst} = {p : α × ℝ \| g p.fst < p.snd}ᶜ by ext p simp only [mem_setOf_eq, mem_compl_iff, not_lt]] exact (nullMeasurableSet_lt (AEMeasurable.fst g_mble) measurable_snd.aemeasurable).compl end regionBetween	/-- Consider a real set `s`. If a property is true almost everywhere in `s ∩ (a, b)` for all `a, b ∈ s`, then it is true almost everywhere in `s`. Formulated with `μ.restrict`. See also `ae_of_mem_of_ae_of_mem_inter_Ioo`. -/ theorem ae_restrict_of_ae_restrict_inter_Ioo {μ : Measure ℝ} [NoAtoms μ] {s : Set ℝ} {p : ℝ → Prop} (h : ∀ a b, a ∈ s → b ∈ s → a < b → ∀ᵐ x ∂μ.restrict (s ∩ Ioo a b), p x) : ∀ᵐ x ∂μ.restrict s, p x := by /- By second-countability, we cover `s` by countably many intervals `(a, b)` (except maybe for two endpoints, which don't matter since `μ` does not have any atom). -/ let T : s × s → Set ℝ := fun p => Ioo p.1 p.2 let u := ⋃ i : ↥s × ↥s, T i have hfinite : (s \ u).Finite := s.finite_diff_iUnion_Ioo' obtain ⟨A, A_count, hA⟩ : ∃ A : Set (↥s × ↥s), A.Countable ∧ ⋃ i ∈ A, T i = ⋃ i : ↥s × ↥s, T i := isOpen_iUnion_countable _ fun p => isOpen_Ioo have : s ⊆ s \ u ∪ ⋃ p ∈ A, s ∩ T p := by intro x hx by_cases h'x : x ∈ ⋃ i : ↥s × ↥s, T i	Mathlib/MeasureTheory/Measure/Lebesgue/Basic.lean	600	617
/- Copyright (c) 2023 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne -/ import Mathlib.MeasureTheory.Measure.Decomposition.RadonNikodym /-! # Exponentially tilted measures The exponential tilting of a measure `μ` on `α` by a function `f : α → ℝ` is the measure with density `x ↦ exp (f x) / ∫ y, exp (f y) ∂μ` with respect to `μ`. This is sometimes also called the Esscher transform. The definition is mostly used for `f` linear, in which case the exponentially tilted measure belongs to the natural exponential family of the base measure. Exponentially tilted measures for general `f` can be used for example to establish variational expressions for the Kullback-Leibler divergence. ## Main definitions * `Measure.tilted μ f`: exponential tilting of `μ` by `f`, equal to `μ.withDensity (fun x ↦ ENNReal.ofReal (exp (f x) / ∫ x, exp (f x) ∂μ))`. -/ open Real open scoped ENNReal NNReal namespace MeasureTheory variable {α : Type} {mα : MeasurableSpace α} {μ : Measure α} {f : α → ℝ} /-- Exponentially tilted measure. When `x ↦ exp (f x)` is integrable, `μ.tilted f` is the probability measure with density with respect to `μ` proportional to `exp (f x)`. Otherwise it is 0. -/ noncomputable def Measure.tilted (μ : Measure α) (f : α → ℝ) : Measure α := μ.withDensity (fun x ↦ ENNReal.ofReal (exp (f x) / ∫ x, exp (f x) ∂μ)) @[simp] lemma tilted_of_not_integrable (hf : ¬ Integrable (fun x ↦ exp (f x)) μ) : μ.tilted f = 0 := by rw [Measure.tilted, integral_undef hf] simp @[simp] lemma tilted_of_not_aemeasurable (hf : ¬ AEMeasurable f μ) : μ.tilted f = 0 := by refine tilted_of_not_integrable ?_ suffices ¬ AEMeasurable (fun x ↦ exp (f x)) μ by exact fun h ↦ this h.1.aemeasurable exact fun h ↦ hf (aemeasurable_of_aemeasurable_exp h) @[simp] lemma tilted_zero_measure (f : α → ℝ) : (0 : Measure α).tilted f = 0 := by simp [Measure.tilted] @[simp] lemma tilted_const' (μ : Measure α) (c : ℝ) : μ.tilted (fun _ ↦ c) = (μ Set.univ)⁻¹ • μ := by cases eq_zero_or_neZero μ with \| inl h => rw [h]; simp \| inr h0 => simp only [Measure.tilted, withDensity_const, integral_const, smul_eq_mul] by_cases h_univ : μ Set.univ = ∞ · simp only [measureReal_def, h_univ, ENNReal.toReal_top, zero_mul, div_zero, ENNReal.ofReal_zero, zero_smul, ENNReal.inv_top] congr rw [div_eq_mul_inv, mul_inv, mul_comm, mul_assoc, inv_mul_cancel₀ (exp_pos _).ne', mul_one, measureReal_def, ← ENNReal.toReal_inv, ENNReal.ofReal_toReal] simp [h0.out] lemma tilted_const (μ : Measure α) [IsProbabilityMeasure μ] (c : ℝ) : μ.tilted (fun _ ↦ c) = μ := by simp @[simp] lemma tilted_zero' (μ : Measure α) : μ.tilted 0 = (μ Set.univ)⁻¹ • μ := by change μ.tilted (fun _ ↦ 0) = (μ Set.univ)⁻¹ • μ simp lemma tilted_zero (μ : Measure α) [IsProbabilityMeasure μ] : μ.tilted 0 = μ := by simp lemma tilted_congr {g : α → ℝ} (hfg : f =ᵐ[μ] g) : μ.tilted f = μ.tilted g := by have h_int_eq : ∫ x, exp (f x) ∂μ = ∫ x, exp (g x) ∂μ := by refine integral_congr_ae ?_ filter_upwards [hfg] with x hx rw [hx] refine withDensity_congr_ae ?_ filter_upwards [hfg] with x hx rw [h_int_eq, hx] lemma tilted_eq_withDensity_nnreal (μ : Measure α) (f : α → ℝ) : μ.tilted f = μ.withDensity (fun x ↦ ((↑) : ℝ≥0 → ℝ≥0∞) (⟨exp (f x) / ∫ x, exp (f x) ∂μ, by positivity⟩ : ℝ≥0)) := by rw [Measure.tilted] congr with x rw [ENNReal.ofReal_eq_coe_nnreal] lemma tilted_apply' (μ : Measure α) (f : α → ℝ) {s : Set α} (hs : MeasurableSet s) : μ.tilted f s = ∫⁻ a in s, ENNReal.ofReal (exp (f a) / ∫ x, exp (f x) ∂μ) ∂μ := by rw [Measure.tilted, withDensity_apply _ hs] lemma tilted_apply (μ : Measure α) [SFinite μ] (f : α → ℝ) (s : Set α) : μ.tilted f s = ∫⁻ a in s, ENNReal.ofReal (exp (f a) / ∫ x, exp (f x) ∂μ) ∂μ := by rw [Measure.tilted, withDensity_apply' _ s] lemma tilted_apply_eq_ofReal_integral' {s : Set α} (f : α → ℝ) (hs : MeasurableSet s) : μ.tilted f s = ENNReal.ofReal (∫ a in s, exp (f a) / ∫ x, exp (f x) ∂μ ∂μ) := by by_cases hf : Integrable (fun x ↦ exp (f x)) μ · rw [tilted_apply' _ _ hs, ← ofReal_integral_eq_lintegral_ofReal] · exact hf.integrableOn.div_const _ · exact ae_of_all _ (fun _ ↦ by positivity) · simp only [hf, not_false_eq_true, tilted_of_not_integrable, Measure.coe_zero, Pi.zero_apply, integral_undef hf, div_zero, integral_zero, ENNReal.ofReal_zero] lemma tilted_apply_eq_ofReal_integral [SFinite μ] (f : α → ℝ) (s : Set α) : μ.tilted f s = ENNReal.ofReal (∫ a in s, exp (f a) / ∫ x, exp (f x) ∂μ ∂μ) := by by_cases hf : Integrable (fun x ↦ exp (f x)) μ · rw [tilted_apply _ _, ← ofReal_integral_eq_lintegral_ofReal] · exact hf.integrableOn.div_const _ · exact ae_of_all _ (fun _ ↦ by positivity) · simp [tilted_of_not_integrable hf, integral_undef hf] lemma isProbabilityMeasure_tilted [NeZero μ] (hf : Integrable (fun x ↦ exp (f x)) μ) : IsProbabilityMeasure (μ.tilted f) := by constructor simp_rw [tilted_apply' _ _ MeasurableSet.univ, setLIntegral_univ, ENNReal.ofReal_div_of_pos (integral_exp_pos hf), div_eq_mul_inv] rw [lintegral_mul_const'' _ hf.1.aemeasurable.ennreal_ofReal, ← ofReal_integral_eq_lintegral_ofReal hf (ae_of_all _ fun _ ↦ (exp_pos _).le), ENNReal.mul_inv_cancel] · simp only [ne_eq, ENNReal.ofReal_eq_zero, not_le] exact integral_exp_pos hf · simp instance isZeroOrProbabilityMeasure_tilted : IsZeroOrProbabilityMeasure (μ.tilted f) := by rcases eq_zero_or_neZero μ with hμ \| hμ · simp only [hμ, tilted_zero_measure] infer_instance by_cases hf : Integrable (fun x ↦ exp (f x)) μ · have := isProbabilityMeasure_tilted hf infer_instance · simp only [hf, not_false_eq_true, tilted_of_not_integrable] infer_instance section lintegral lemma setLIntegral_tilted' (f : α → ℝ) (g : α → ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : ∫⁻ x in s, g x ∂(μ.tilted f) = ∫⁻ x in s, ENNReal.ofReal (exp (f x) / ∫ x, exp (f x) ∂μ) g x ∂μ := by by_cases hf : AEMeasurable f μ · rw [Measure.tilted, setLIntegral_withDensity_eq_setLIntegral_mul_non_measurable₀] · simp only [Pi.mul_apply] · refine AEMeasurable.restrict ?_ exact ((measurable_exp.comp_aemeasurable hf).div_const _).ennreal_ofReal · exact hs · filter_upwards simp only [ENNReal.ofReal_lt_top, implies_true] · have hf' : ¬ Integrable (fun x ↦ exp (f x)) μ := by exact fun h ↦ hf (aemeasurable_of_aemeasurable_exp h.1.aemeasurable) simp only [hf, not_false_eq_true, tilted_of_not_aemeasurable, Measure.restrict_zero, lintegral_zero_measure] rw [integral_undef hf'] simp lemma setLIntegral_tilted [SFinite μ] (f : α → ℝ) (g : α → ℝ≥0∞) (s : Set α) : ∫⁻ x in s, g x ∂(μ.tilted f) = ∫⁻ x in s, ENNReal.ofReal (exp (f x) / ∫ x, exp (f x) ∂μ) * g x ∂μ := by by_cases hf : AEMeasurable f μ · rw [Measure.tilted, setLIntegral_withDensity_eq_setLIntegral_mul_non_measurable₀'] · simp only [Pi.mul_apply] · refine AEMeasurable.restrict ?_ exact ((measurable_exp.comp_aemeasurable hf).div_const _).ennreal_ofReal · filter_upwards simp only [ENNReal.ofReal_lt_top, implies_true] · have hf' : ¬ Integrable (fun x ↦ exp (f x)) μ := by exact fun h ↦ hf (aemeasurable_of_aemeasurable_exp h.1.aemeasurable) simp only [hf, not_false_eq_true, tilted_of_not_aemeasurable, Measure.restrict_zero, lintegral_zero_measure] rw [integral_undef hf'] simp lemma lintegral_tilted (f : α → ℝ) (g : α → ℝ≥0∞) : ∫⁻ x, g x ∂(μ.tilted f) = ∫⁻ x, ENNReal.ofReal (exp (f x) / ∫ x, exp (f x) ∂μ) * (g x) ∂μ := by rw [← setLIntegral_univ, setLIntegral_tilted' f g MeasurableSet.univ, setLIntegral_univ] end lintegral section integral variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] lemma setIntegral_tilted' (f : α → ℝ) (g : α → E) {s : Set α} (hs : MeasurableSet s) : ∫ x in s, g x ∂(μ.tilted f) = ∫ x in s, (exp (f x) / ∫ x, exp (f x) ∂μ) • (g x) ∂μ := by by_cases hf : AEMeasurable f μ · rw [tilted_eq_withDensity_nnreal, setIntegral_withDensity_eq_setIntegral_smul₀ _ _ hs] · congr · suffices AEMeasurable (fun x ↦ exp (f x) / ∫ x, exp (f x) ∂μ) μ by rw [← aemeasurable_coe_nnreal_real_iff] refine AEMeasurable.restrict ?_ simpa only [NNReal.coe_mk] exact (measurable_exp.comp_aemeasurable hf).div_const _ · have hf' : ¬ Integrable (fun x ↦ exp (f x)) μ := by exact fun h ↦ hf (aemeasurable_of_aemeasurable_exp h.1.aemeasurable) simp only [hf, not_false_eq_true, tilted_of_not_aemeasurable, Measure.restrict_zero, integral_zero_measure] rw [integral_undef hf'] simp lemma setIntegral_tilted [SFinite μ] (f : α → ℝ) (g : α → E) (s : Set α) : ∫ x in s, g x ∂(μ.tilted f) = ∫ x in s, (exp (f x) / ∫ x, exp (f x) ∂μ) • (g x) ∂μ := by by_cases hf : AEMeasurable f μ · rw [tilted_eq_withDensity_nnreal, setIntegral_withDensity_eq_setIntegral_smul₀'] · congr · suffices AEMeasurable (fun x ↦ exp (f x) / ∫ x, exp (f x) ∂μ) μ by rw [← aemeasurable_coe_nnreal_real_iff] refine AEMeasurable.restrict ?_ simpa only [NNReal.coe_mk] exact (measurable_exp.comp_aemeasurable hf).div_const _ · have hf' : ¬ Integrable (fun x ↦ exp (f x)) μ := by exact fun h ↦ hf (aemeasurable_of_aemeasurable_exp h.1.aemeasurable) simp only [hf, not_false_eq_true, tilted_of_not_aemeasurable, Measure.restrict_zero, integral_zero_measure] rw [integral_undef hf'] simp lemma integral_tilted (f : α → ℝ) (g : α → E) : ∫ x, g x ∂(μ.tilted f) = ∫ x, (exp (f x) / ∫ x, exp (f x) ∂μ) • (g x) ∂μ := by rw [← setIntegral_univ, setIntegral_tilted' f g MeasurableSet.univ, setIntegral_univ] end integral lemma integral_exp_tilted (f g : α → ℝ) : ∫ x, exp (g x) ∂(μ.tilted f) = (∫ x, exp ((f + g) x) ∂μ) / ∫ x, exp (f x) ∂μ := by cases eq_zero_or_neZero μ with \| inl h => rw [h]; simp \| inr h0 => rw [integral_tilted f] simp_rw [smul_eq_mul] have : ∀ x, (exp (f x) / ∫ x, exp (f x) ∂μ) exp (g x) = (exp ((f + g) x) / ∫ x, exp (f x) ∂μ) := by intro x rw [Pi.add_apply, exp_add] ring simp_rw [this, div_eq_mul_inv] rw [integral_mul_const] lemma tilted_tilted (hf : Integrable (fun x ↦ exp (f x)) μ) (g : α → ℝ) : (μ.tilted f).tilted g = μ.tilted (f + g) := by cases eq_zero_or_neZero μ with \| inl h => simp [h] \| inr h0 => ext1 s hs rw [tilted_apply' _ _ hs, tilted_apply' _ _ hs, setLIntegral_tilted' f _ hs] congr with x rw [← ENNReal.ofReal_mul (by positivity), integral_exp_tilted f, Pi.add_apply, exp_add]	congr 1 simp only [Pi.add_apply] field_simp ring_nf congr 1 rw [mul_assoc, mul_inv_cancel₀, mul_one] exact (integral_exp_pos hf).ne' lemma tilted_comm (hf : Integrable (fun x ↦ exp (f x)) μ) {g : α → ℝ} (hg : Integrable (fun x ↦ exp (g x)) μ) : (μ.tilted f).tilted g = (μ.tilted g).tilted f := by rw [tilted_tilted hf, add_comm, tilted_tilted hg] @[simp] lemma tilted_neg_same' (hf : Integrable (fun x ↦ exp (f x)) μ) : (μ.tilted f).tilted (-f) = (μ Set.univ)⁻¹ • μ := by rw [tilted_tilted hf]; simp	Mathlib/MeasureTheory/Measure/Tilted.lean	257	273
/- Copyright (c) 2022 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.AlgebraicTopology.DoldKan.PInfty /-! # Decomposition of the Q endomorphisms In this file, we obtain a lemma `decomposition_Q` which expresses explicitly the projection `(Q q).f (n+1) : X _⦋n+1⦌ ⟶ X _⦋n+1⦌` (`X : SimplicialObject C` with `C` a preadditive category) as a sum of terms which are postcompositions with degeneracies. (TODO @joelriou: when `C` is abelian, define the degenerate subcomplex of the alternating face map complex of `X` and show that it is a complement to the normalized Moore complex.) Then, we introduce an ad hoc structure `MorphComponents X n Z` which can be used in order to define morphisms `X _⦋n+1⦌ ⟶ Z` using the decomposition provided by `decomposition_Q`. This shall play a critical role in the proof that the functor `N₁ : SimplicialObject C ⥤ Karoubi (ChainComplex C ℕ))` reflects isomorphisms. (See `Equivalence.lean` for the general strategy of proof of the Dold-Kan equivalence.) -/ open CategoryTheory CategoryTheory.Category CategoryTheory.Preadditive Opposite Simplicial noncomputable section namespace AlgebraicTopology namespace DoldKan variable {C : Type*} [Category C] [Preadditive C] {X X' : SimplicialObject C} /-- In each positive degree, this lemma decomposes the idempotent endomorphism `Q q` as a sum of morphisms which are postcompositions with suitable degeneracies. As `Q q` is the complement projection to `P q`, this implies that in the case of simplicial abelian groups, any $(n+1)$-simplex $x$ can be decomposed as $x = x' + \sum (i=0}^{q-1} σ_{n-i}(y_i)$ where $x'$ is in the image of `P q` and the $y_i$ are in degree $n$. -/ theorem decomposition_Q (n q : ℕ) : ((Q q).f (n + 1) : X _⦋n + 1⦌ ⟶ X _⦋n + 1⦌) =	∑ i : Fin (n + 1) with i.val < q, (P i).f (n + 1) ≫ X.δ i.rev.succ ≫ X.σ (Fin.rev i) := by induction' q with q hq · simp only [Q_zero, HomologicalComplex.zero_f_apply, Nat.not_lt_zero, Finset.filter_False, Finset.sum_empty] · by_cases hqn : q + 1 ≤ n + 1 swap · rw [Q_is_eventually_constant (show n + 1 ≤ q by omega), hq] congr 1 ext ⟨x, hx⟩ simp only [Nat.succ_eq_add_one, Finset.mem_filter, Finset.mem_univ, true_and] omega · obtain ⟨a, ha⟩ := Nat.le.dest (Nat.succ_le_succ_iff.mp hqn) rw [Q_succ, HomologicalComplex.sub_f_apply, HomologicalComplex.comp_f, hq] symm conv_rhs => rw [sub_eq_add_neg, add_comm] let q' : Fin (n + 1) := ⟨q, Nat.succ_le_iff.mp hqn⟩ rw [← @Finset.add_sum_erase _ _ _ _ _ _ q' (by simp [q'])] congr · have hnaq' : n = a + q := by omega simp only [Fin.val_mk, (HigherFacesVanish.of_P q n).comp_Hσ_eq hnaq', q'.rev_eq hnaq', neg_neg] rfl · ext ⟨i, hi⟩ simp only [q', Nat.succ_eq_add_one, Nat.lt_succ_iff_lt_or_eq, Finset.mem_univ, forall_true_left, Finset.mem_filter, lt_self_iff_false, or_true, and_self, not_true, Finset.mem_erase, ne_eq, Fin.mk.injEq, true_and] aesop variable (X)	Mathlib/AlgebraicTopology/DoldKan/Decomposition.lean	52	81
/- 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.Group.Nat.Defs import Mathlib.CategoryTheory.Category.Preorder import Mathlib.CategoryTheory.EqToHom import Mathlib.CategoryTheory.Functor.Const import Mathlib.Order.Fin.Basic import Mathlib.Tactic.FinCases import Mathlib.Tactic.SuppressCompilation /-! # Composable arrows If `C` is a category, the type of `n`-simplices in the nerve of `C` identifies to the type of functors `Fin (n + 1) ⥤ C`, which can be thought as families of `n` composable arrows in `C`. In this file, we introduce and study this category `ComposableArrows C n` of `n` composable arrows in `C`. If `F : ComposableArrows C n`, we define `F.left` as the leftmost object, `F.right` as the rightmost object, and `F.hom : F.left ⟶ F.right` is the canonical map. The most significant definition in this file is the constructor `F.precomp f : ComposableArrows C (n + 1)` for `F : ComposableArrows C n` and `f : X ⟶ F.left`: "it shifts `F` towards the right and inserts `f` on the left". This `precomp` has good definitional properties. In the namespace `CategoryTheory.ComposableArrows`, we provide constructors like `mk₁ f`, `mk₂ f g`, `mk₃ f g h` for `ComposableArrows C n` for small `n`. TODO (@joelriou): * redefine `Arrow C` as `ComposableArrow C 1`? * construct some elements in `ComposableArrows m (Fin (n + 1))` for small `n` the precomposition with which shall induce functors `ComposableArrows C n ⥤ ComposableArrows C m` which correspond to simplicial operations (specifically faces) with good definitional properties (this might be necessary for up to `n = 7` in order to formalize spectral sequences following Verdier) -/ /-! New `simprocs` that run even in `dsimp` have caused breakages in this file. (e.g. `dsimp` can now simplify `2 + 3` to `5`) For now, we just turn off simprocs in this file. We'll soon provide finer grained options here, e.g. to turn off simprocs only in `dsimp`, etc. However, hopefully it is possible to refactor the material here so that no backwards compatibility `set_option`s are required at all -/ set_option simprocs false namespace CategoryTheory open Category variable (C : Type*) [Category C] /-- `ComposableArrows C n` is the type of functors `Fin (n + 1) ⥤ C`. -/ abbrev ComposableArrows (n : ℕ) := Fin (n + 1) ⥤ C namespace ComposableArrows variable {C} {n m : ℕ} variable (F G : ComposableArrows C n) /-- A wrapper for `omega` which prefaces it with some quick and useful attempts -/ macro "valid" : tactic => `(tactic\| first \| assumption \| apply zero_le \| apply le_rfl \| transitivity <;> assumption \| omega) /-- The `i`th object (with `i : ℕ` such that `i ≤ n`) of `F : ComposableArrows C n`. -/ @[simp] abbrev obj' (i : ℕ) (hi : i ≤ n := by valid) : C := F.obj ⟨i, by omega⟩ /-- The map `F.obj' i ⟶ F.obj' j` when `F : ComposableArrows C n`, and `i` and `j` are natural numbers such that `i ≤ j ≤ n`. -/ @[simp] abbrev map' (i j : ℕ) (hij : i ≤ j := by valid) (hjn : j ≤ n := by valid) : F.obj ⟨i, by omega⟩ ⟶ F.obj ⟨j, by omega⟩ := F.map (homOfLE (by simp only [Fin.mk_le_mk] valid)) lemma map'_self (i : ℕ) (hi : i ≤ n := by valid) : F.map' i i = 𝟙 _ := F.map_id _ lemma map'_comp (i j k : ℕ) (hij : i ≤ j := by valid) (hjk : j ≤ k := by valid) (hk : k ≤ n := by valid) : F.map' i k = F.map' i j ≫ F.map' j k := F.map_comp _ _ /-- The leftmost object of `F : ComposableArrows C n`. -/ abbrev left := obj' F 0 /-- The rightmost object of `F : ComposableArrows C n`. -/ abbrev right := obj' F n /-- The canonical map `F.left ⟶ F.right` for `F : ComposableArrows C n`. -/ abbrev hom : F.left ⟶ F.right := map' F 0 n variable {F G} /-- The map `F.obj' i ⟶ G.obj' i` induced on `i`th objects by a morphism `F ⟶ G` in `ComposableArrows C n` when `i` is a natural number such that `i ≤ n`. -/ @[simp] abbrev app' (φ : F ⟶ G) (i : ℕ) (hi : i ≤ n := by valid) : F.obj' i ⟶ G.obj' i := φ.app _ @[reassoc] lemma naturality' (φ : F ⟶ G) (i j : ℕ) (hij : i ≤ j := by valid) (hj : j ≤ n := by valid) : F.map' i j ≫ app' φ j = app' φ i ≫ G.map' i j := φ.naturality _ /-- Constructor for `ComposableArrows C 0`. -/ @[simps!] def mk₀ (X : C) : ComposableArrows C 0 := (Functor.const (Fin 1)).obj X namespace Mk₁ variable (X₀ X₁ : C) /-- The map which sends `0 : Fin 2` to `X₀` and `1` to `X₁`. -/ @[simp] def obj : Fin 2 → C \| ⟨0, _⟩ => X₀ \| ⟨1, _⟩ => X₁ variable {X₀ X₁} variable (f : X₀ ⟶ X₁) /-- The obvious map `obj X₀ X₁ i ⟶ obj X₀ X₁ j` whenever `i j : Fin 2` satisfy `i ≤ j`. -/ @[simp] def map : ∀ (i j : Fin 2) (_ : i ≤ j), obj X₀ X₁ i ⟶ obj X₀ X₁ j \| ⟨0, _⟩, ⟨0, _⟩, _ => 𝟙 _ \| ⟨0, _⟩, ⟨1, _⟩, _ => f \| ⟨1, _⟩, ⟨1, _⟩, _ => 𝟙 _ lemma map_id (i : Fin 2) : map f i i (by simp) = 𝟙 _ := match i with \| 0 => rfl \| 1 => rfl lemma map_comp {i j k : Fin 2} (hij : i ≤ j) (hjk : j ≤ k) : map f i k (hij.trans hjk) = map f i j hij ≫ map f j k hjk := by obtain rfl \| rfl : i = j ∨ j = k := by omega · rw [map_id, id_comp] · rw [map_id, comp_id] end Mk₁ /-- Constructor for `ComposableArrows C 1`. -/ @[simps] def mk₁ {X₀ X₁ : C} (f : X₀ ⟶ X₁) : ComposableArrows C 1 where obj := Mk₁.obj X₀ X₁ map g := Mk₁.map f _ _ (leOfHom g) map_id := Mk₁.map_id f map_comp g g' := Mk₁.map_comp f (leOfHom g) (leOfHom g') /-- Constructor for morphisms `F ⟶ G` in `ComposableArrows C n` which takes as inputs a family of morphisms `F.obj i ⟶ G.obj i` and the naturality condition only for the maps in `Fin (n + 1)` given by inequalities of the form `i ≤ i + 1`. -/ @[simps] def homMk {F G : ComposableArrows C n} (app : ∀ i, F.obj i ⟶ G.obj i) (w : ∀ (i : ℕ) (hi : i < n), F.map' i (i + 1) ≫ app _ = app _ ≫ G.map' i (i + 1)) : F ⟶ G where app := app naturality := by suffices ∀ (k i j : ℕ) (hj : i + k = j) (hj' : j ≤ n), F.map' i j ≫ app _ = app _ ≫ G.map' i j by rintro ⟨i, hi⟩ ⟨j, hj⟩ hij have hij' := leOfHom hij simp only [Fin.mk_le_mk] at hij' obtain ⟨k, hk⟩ := Nat.le.dest hij' exact this k i j hk (by valid) intro k induction' k with k hk · intro i j hj hj' simp only [add_zero] at hj obtain rfl := hj rw [F.map'_self i, G.map'_self i, id_comp, comp_id] · intro i j hj hj' rw [← add_assoc] at hj subst hj rw [F.map'_comp i (i + k) (i + k + 1), G.map'_comp i (i + k) (i + k + 1), assoc, w (i + k) (by valid), reassoc_of% (hk i (i + k) rfl (by valid))] /-- Constructor for isomorphisms `F ≅ G` in `ComposableArrows C n` which takes as inputs a family of isomorphisms `F.obj i ≅ G.obj i` and the naturality condition only for the maps in `Fin (n + 1)` given by inequalities of the form `i ≤ i + 1`. -/ @[simps] def isoMk {F G : ComposableArrows C n} (app : ∀ i, F.obj i ≅ G.obj i) (w : ∀ (i : ℕ) (hi : i < n), F.map' i (i + 1) ≫ (app _).hom = (app _).hom ≫ G.map' i (i + 1)) : F ≅ G where hom := homMk (fun i => (app i).hom) w inv := homMk (fun i => (app i).inv) (fun i hi => by dsimp only rw [← cancel_epi ((app _).hom), ← reassoc_of% (w i hi), Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc]) lemma ext {F G : ComposableArrows C n} (h : ∀ i, F.obj i = G.obj i) (w : ∀ (i : ℕ) (hi : i < n), F.map' i (i + 1) = eqToHom (h _) ≫ G.map' i (i + 1) ≫ eqToHom (h _).symm) : F = G := Functor.ext_of_iso (isoMk (fun i => eqToIso (h i)) (fun i hi => by simp [w i hi])) h (fun _ => rfl) /-- Constructor for morphisms in `ComposableArrows C 0`. -/ @[simps!] def homMk₀ {F G : ComposableArrows C 0} (f : F.obj' 0 ⟶ G.obj' 0) : F ⟶ G := homMk (fun i => match i with \| ⟨0, _⟩ => f) (fun i hi => by simp at hi) @[ext] lemma hom_ext₀ {F G : ComposableArrows C 0} {φ φ' : F ⟶ G} (h : app' φ 0 = app' φ' 0) : φ = φ' := by ext i fin_cases i exact h /-- Constructor for isomorphisms in `ComposableArrows C 0`. -/ @[simps!] def isoMk₀ {F G : ComposableArrows C 0} (e : F.obj' 0 ≅ G.obj' 0) : F ≅ G where hom := homMk₀ e.hom inv := homMk₀ e.inv lemma ext₀ {F G : ComposableArrows C 0} (h : F.obj' 0 = G.obj 0) : F = G := ext (fun i => match i with \| ⟨0, _⟩ => h) (fun i hi => by simp at hi) lemma mk₀_surjective (F : ComposableArrows C 0) : ∃ (X : C), F = mk₀ X := ⟨F.obj' 0, ext₀ rfl⟩ /-- Constructor for morphisms in `ComposableArrows C 1`. -/ @[simps!] def homMk₁ {F G : ComposableArrows C 1} (left : F.obj' 0 ⟶ G.obj' 0) (right : F.obj' 1 ⟶ G.obj' 1) (w : F.map' 0 1 ≫ right = left ≫ G.map' 0 1 := by aesop_cat) : F ⟶ G := homMk (fun i => match i with \| ⟨0, _⟩ => left \| ⟨1, _⟩ => right) (by intro i hi obtain rfl : i = 0 := by simpa using hi exact w) @[ext] lemma hom_ext₁ {F G : ComposableArrows C 1} {φ φ' : F ⟶ G} (h₀ : app' φ 0 = app' φ' 0) (h₁ : app' φ 1 = app' φ' 1) : φ = φ' := by ext i match i with \| 0 => exact h₀ \| 1 => exact h₁ /-- Constructor for isomorphisms in `ComposableArrows C 1`. -/ @[simps!] def isoMk₁ {F G : ComposableArrows C 1} (left : F.obj' 0 ≅ G.obj' 0) (right : F.obj' 1 ≅ G.obj' 1) (w : F.map' 0 1 ≫ right.hom = left.hom ≫ G.map' 0 1 := by aesop_cat) : F ≅ G where hom := homMk₁ left.hom right.hom w inv := homMk₁ left.inv right.inv (by rw [← cancel_mono right.hom, assoc, assoc, w, right.inv_hom_id, left.inv_hom_id_assoc] apply comp_id) lemma map'_eq_hom₁ (F : ComposableArrows C 1) : F.map' 0 1 = F.hom := rfl lemma ext₁ {F G : ComposableArrows C 1} (left : F.left = G.left) (right : F.right = G.right) (w : F.hom = eqToHom left ≫ G.hom ≫ eqToHom right.symm) : F = G := Functor.ext_of_iso (isoMk₁ (eqToIso left) (eqToIso right) (by simp [map'_eq_hom₁, w])) (fun i => by fin_cases i <;> assumption) (fun i => by fin_cases i <;> rfl) lemma mk₁_surjective (X : ComposableArrows C 1) : ∃ (X₀ X₁ : C) (f : X₀ ⟶ X₁), X = mk₁ f := ⟨_, _, X.map' 0 1, ext₁ rfl rfl (by simp)⟩ variable (F) namespace Precomp variable (X : C) /-- The map `Fin (n + 1 + 1) → C` which "shifts" `F.obj'` to the right and inserts `X` in the zeroth position. -/ def obj : Fin (n + 1 + 1) → C \| ⟨0, _⟩ => X \| ⟨i + 1, hi⟩ => F.obj' i @[simp] lemma obj_zero : obj F X 0 = X := rfl @[simp] lemma obj_one : obj F X 1 = F.obj' 0 := rfl @[simp] lemma obj_succ (i : ℕ) (hi : i + 1 < n + 1 + 1) : obj F X ⟨i + 1, hi⟩ = F.obj' i := rfl variable {X} (f : X ⟶ F.left) /-- Auxiliary definition for the action on maps of the functor `F.precomp f`. It sends `0 ≤ 1` to `f` and `i + 1 ≤ j + 1` to `F.map' i j`. -/ def map : ∀ (i j : Fin (n + 1 + 1)) (_ : i ≤ j), obj F X i ⟶ obj F X j \| ⟨0, _⟩, ⟨0, _⟩, _ => 𝟙 X \| ⟨0, _⟩, ⟨1, _⟩, _ => f \| ⟨0, _⟩, ⟨j + 2, hj⟩, _ => f ≫ F.map' 0 (j + 1) \| ⟨i + 1, hi⟩, ⟨j + 1, hj⟩, hij => F.map' i j (by simpa using hij) @[simp] lemma map_zero_zero : map F f 0 0 (by simp) = 𝟙 X := rfl @[simp] lemma map_one_one : map F f 1 1 (by simp) = F.map (𝟙 _) := rfl @[simp] lemma map_zero_one : map F f 0 1 (by simp) = f := rfl @[simp] lemma map_zero_one' : map F f 0 ⟨0 + 1, by simp⟩ (by simp) = f := rfl @[simp] lemma map_zero_succ_succ (j : ℕ) (hj : j + 2 < n + 1 + 1) : map F f 0 ⟨j + 2, hj⟩ (by simp) = f ≫ F.map' 0 (j+1) := rfl @[simp] lemma map_succ_succ (i j : ℕ) (hi : i + 1 < n + 1 + 1) (hj : j + 1 < n + 1 + 1) (hij : i + 1 ≤ j + 1) : map F f ⟨i + 1, hi⟩ ⟨j + 1, hj⟩ hij = F.map' i j := rfl @[simp] lemma map_one_succ (j : ℕ) (hj : j + 1 < n + 1 + 1) : map F f 1 ⟨j + 1, hj⟩ (by simp [Fin.le_def]) = F.map' 0 j := rfl lemma map_id (i : Fin (n + 1 + 1)) : map F f i i (by simp) = 𝟙 _ := by obtain ⟨_\|_, hi⟩ := i <;> simp lemma map_comp {i j k : Fin (n + 1 + 1)} (hij : i ≤ j) (hjk : j ≤ k) : map F f i k (hij.trans hjk) = map F f i j hij ≫ map F f j k hjk := by obtain ⟨i, hi⟩ := i obtain ⟨j, hj⟩ := j obtain ⟨k, hk⟩ := k cases i · obtain _ \| _ \| j := j · dsimp rw [id_comp] · obtain _ \| _ \| k := k · simp [Nat.succ.injEq] at hjk · simp · rfl · obtain _ \| _ \| k := k · simp [Fin.ext_iff] at hjk · simp [Fin.le_def] at hjk omega · dsimp rw [assoc, ← F.map_comp, homOfLE_comp] · obtain _ \| j := j · simp [Fin.ext_iff] at hij · obtain _ \| k := k · simp [Fin.ext_iff] at hjk · dsimp rw [← F.map_comp, homOfLE_comp] end Precomp /-- "Precomposition" of `F : ComposableArrows C n` by a morphism `f : X ⟶ F.left`. -/ @[simps] def precomp {X : C} (f : X ⟶ F.left) : ComposableArrows C (n + 1) where obj := Precomp.obj F X map g := Precomp.map F f _ _ (leOfHom g) map_id := Precomp.map_id F f map_comp g g' := Precomp.map_comp F f (leOfHom g) (leOfHom g') /-- Constructor for `ComposableArrows C 2`. -/ @[simp] def mk₂ {X₀ X₁ X₂ : C} (f : X₀ ⟶ X₁) (g : X₁ ⟶ X₂) : ComposableArrows C 2 := (mk₁ g).precomp f /-- Constructor for `ComposableArrows C 3`. -/ @[simp] def mk₃ {X₀ X₁ X₂ X₃ : C} (f : X₀ ⟶ X₁) (g : X₁ ⟶ X₂) (h : X₂ ⟶ X₃) : ComposableArrows C 3 := (mk₂ g h).precomp f /-- Constructor for `ComposableArrows C 4`. -/ @[simp] def mk₄ {X₀ X₁ X₂ X₃ X₄ : C} (f : X₀ ⟶ X₁) (g : X₁ ⟶ X₂) (h : X₂ ⟶ X₃) (i : X₃ ⟶ X₄) : ComposableArrows C 4 := (mk₃ g h i).precomp f /-- Constructor for `ComposableArrows C 5`. -/ @[simp] def mk₅ {X₀ X₁ X₂ X₃ X₄ X₅ : C} (f : X₀ ⟶ X₁) (g : X₁ ⟶ X₂) (h : X₂ ⟶ X₃) (i : X₃ ⟶ X₄) (j : X₄ ⟶ X₅) : ComposableArrows C 5 := (mk₄ g h i j).precomp f section variable {X₀ X₁ X₂ X₃ X₄ : C} (f : X₀ ⟶ X₁) (g : X₁ ⟶ X₂) (h : X₂ ⟶ X₃) (i : X₃ ⟶ X₄) /-! These examples are meant to test the good definitional properties of `precomp`, and that `dsimp` can see through. -/ example : map' (mk₂ f g) 0 1 = f := by dsimp example : map' (mk₂ f g) 1 2 = g := by dsimp example : map' (mk₂ f g) 0 2 = f ≫ g := by dsimp example : (mk₂ f g).hom = f ≫ g := by dsimp example : map' (mk₂ f g) 0 0 = 𝟙 _ := by dsimp example : map' (mk₂ f g) 1 1 = 𝟙 _ := by dsimp example : map' (mk₂ f g) 2 2 = 𝟙 _ := by dsimp example : map' (mk₃ f g h) 0 1 = f := by dsimp example : map' (mk₃ f g h) 1 2 = g := by dsimp example : map' (mk₃ f g h) 2 3 = h := by dsimp example : map' (mk₃ f g h) 0 3 = f ≫ g ≫ h := by dsimp example : (mk₃ f g h).hom = f ≫ g ≫ h := by dsimp example : map' (mk₃ f g h) 0 2 = f ≫ g := by dsimp example : map' (mk₃ f g h) 1 3 = g ≫ h := by dsimp end /-- The map `ComposableArrows C m → ComposableArrows C n` obtained by precomposition with a functor `Fin (n + 1) ⥤ Fin (m + 1)`. -/ @[simps!] def whiskerLeft (F : ComposableArrows C m) (Φ : Fin (n + 1) ⥤ Fin (m + 1)) : ComposableArrows C n := Φ ⋙ F /-- The functor `ComposableArrows C m ⥤ ComposableArrows C n` obtained by precomposition with a functor `Fin (n + 1) ⥤ Fin (m + 1)`. -/ @[simps!] def whiskerLeftFunctor (Φ : Fin (n + 1) ⥤ Fin (m + 1)) : ComposableArrows C m ⥤ ComposableArrows C n where obj F := F.whiskerLeft Φ map f := CategoryTheory.whiskerLeft Φ f /-- The functor `Fin n ⥤ Fin (n + 1)` which sends `i` to `i.succ`. -/ @[simps] def _root_.Fin.succFunctor (n : ℕ) : Fin n ⥤ Fin (n + 1) where obj i := i.succ map {_ _} hij := homOfLE (Fin.succ_le_succ_iff.2 (leOfHom hij)) /-- The functor `ComposableArrows C (n + 1) ⥤ ComposableArrows C n` which forgets the first arrow. -/ @[simps!] def δ₀Functor : ComposableArrows C (n + 1) ⥤ ComposableArrows C n := whiskerLeftFunctor (Fin.succFunctor (n + 1)) /-- The `ComposableArrows C n` obtained by forgetting the first arrow. -/ abbrev δ₀ (F : ComposableArrows C (n + 1)) := δ₀Functor.obj F @[simp] lemma precomp_δ₀ {X : C} (f : X ⟶ F.left) : (F.precomp f).δ₀ = F := rfl /-- The functor `Fin n ⥤ Fin (n + 1)` which sends `i` to `i.castSucc`. -/ @[simps] def _root_.Fin.castSuccFunctor (n : ℕ) : Fin n ⥤ Fin (n + 1) where obj i := i.castSucc map hij := hij /-- The functor `ComposableArrows C (n + 1) ⥤ ComposableArrows C n` which forgets the last arrow. -/ @[simps!] def δlastFunctor : ComposableArrows C (n + 1) ⥤ ComposableArrows C n := whiskerLeftFunctor (Fin.castSuccFunctor (n + 1)) /-- The `ComposableArrows C n` obtained by forgetting the first arrow. -/ abbrev δlast (F : ComposableArrows C (n + 1)) := δlastFunctor.obj F section variable {F G : ComposableArrows C (n + 1)} /-- Inductive construction of morphisms in `ComposableArrows C (n + 1)`: in order to construct a morphism `F ⟶ G`, it suffices to provide `α : F.obj' 0 ⟶ G.obj' 0` and `β : F.δ₀ ⟶ G.δ₀` such that `F.map' 0 1 ≫ app' β 0 = α ≫ G.map' 0 1`. -/ def homMkSucc (α : F.obj' 0 ⟶ G.obj' 0) (β : F.δ₀ ⟶ G.δ₀) (w : F.map' 0 1 ≫ app' β 0 = α ≫ G.map' 0 1) : F ⟶ G := homMk (fun i => match i with \| ⟨0, _⟩ => α \| ⟨i + 1, hi⟩ => app' β i) (fun i hi => by obtain _ \| i := i · exact w · exact naturality' β i (i + 1)) variable (α : F.obj' 0 ⟶ G.obj' 0) (β : F.δ₀ ⟶ G.δ₀) (w : F.map' 0 1 ≫ app' β 0 = α ≫ G.map' 0 1) @[simp] lemma homMkSucc_app_zero : (homMkSucc α β w).app 0 = α := rfl @[simp] lemma homMkSucc_app_succ (i : ℕ) (hi : i + 1 < n + 1 + 1) : (homMkSucc α β w).app ⟨i + 1, hi⟩ = app' β i := rfl end lemma hom_ext_succ {F G : ComposableArrows C (n + 1)} {f g : F ⟶ G} (h₀ : app' f 0 = app' g 0) (h₁ : δ₀Functor.map f = δ₀Functor.map g) : f = g := by ext ⟨i, hi⟩ obtain _ \| i := i · exact h₀ · exact congr_app h₁ ⟨i, by valid⟩ /-- Inductive construction of isomorphisms in `ComposableArrows C (n + 1)`: in order to construct an isomorphism `F ≅ G`, it suffices to provide `α : F.obj' 0 ≅ G.obj' 0` and `β : F.δ₀ ≅ G.δ₀` such that `F.map' 0 1 ≫ app' β.hom 0 = α.hom ≫ G.map' 0 1`. -/ @[simps] def isoMkSucc {F G : ComposableArrows C (n + 1)} (α : F.obj' 0 ≅ G.obj' 0) (β : F.δ₀ ≅ G.δ₀) (w : F.map' 0 1 ≫ app' β.hom 0 = α.hom ≫ G.map' 0 1) : F ≅ G where hom := homMkSucc α.hom β.hom w inv := homMkSucc α.inv β.inv (by rw [← cancel_epi α.hom, ← reassoc_of% w, α.hom_inv_id_assoc, β.hom_inv_id_app] dsimp rw [comp_id]) hom_inv_id := by apply hom_ext_succ · simp · ext ⟨i, hi⟩ simp inv_hom_id := by apply hom_ext_succ · simp · ext ⟨i, hi⟩ simp lemma ext_succ {F G : ComposableArrows C (n + 1)} (h₀ : F.obj' 0 = G.obj' 0) (h : F.δ₀ = G.δ₀) (w : F.map' 0 1 = eqToHom h₀ ≫ G.map' 0 1 ≫ eqToHom (Functor.congr_obj h.symm 0)) : F = G := by have : ∀ i, F.obj i = G.obj i := by intro ⟨i, hi⟩ rcases i with - \| i · exact h₀ · exact Functor.congr_obj h ⟨i, by valid⟩ exact Functor.ext_of_iso (isoMkSucc (eqToIso h₀) (eqToIso h) (by rw [w] dsimp [app'] rw [eqToHom_app, assoc, assoc, eqToHom_trans, eqToHom_refl, comp_id])) this (by rintro ⟨_\|_, hi⟩ <;> simp) lemma precomp_surjective (F : ComposableArrows C (n + 1)) : ∃ (F₀ : ComposableArrows C n) (X₀ : C) (f₀ : X₀ ⟶ F₀.left), F = F₀.precomp f₀ := ⟨F.δ₀, _, F.map' 0 1, ext_succ rfl (by simp) (by simp)⟩ section variable {f g : ComposableArrows C 2} (app₀ : f.obj' 0 ⟶ g.obj' 0) (app₁ : f.obj' 1 ⟶ g.obj' 1) (app₂ : f.obj' 2 ⟶ g.obj' 2) (w₀ : f.map' 0 1 ≫ app₁ = app₀ ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂ = app₁ ≫ g.map' 1 2) /-- Constructor for morphisms in `ComposableArrows C 2`. -/ def homMk₂ : f ⟶ g := homMkSucc app₀ (homMk₁ app₁ app₂ w₁) w₀ @[simp] lemma homMk₂_app_zero : (homMk₂ app₀ app₁ app₂ w₀ w₁).app 0 = app₀ := rfl @[simp] lemma homMk₂_app_one : (homMk₂ app₀ app₁ app₂ w₀ w₁).app 1 = app₁ := rfl @[simp] lemma homMk₂_app_two : (homMk₂ app₀ app₁ app₂ w₀ w₁).app ⟨2, by valid⟩ = app₂ := rfl end @[ext] lemma hom_ext₂ {f g : ComposableArrows C 2} {φ φ' : f ⟶ g} (h₀ : app' φ 0 = app' φ' 0) (h₁ : app' φ 1 = app' φ' 1) (h₂ : app' φ 2 = app' φ' 2) : φ = φ' := hom_ext_succ h₀ (hom_ext₁ h₁ h₂) /-- Constructor for isomorphisms in `ComposableArrows C 2`. -/ @[simps] def isoMk₂ {f g : ComposableArrows C 2} (app₀ : f.obj' 0 ≅ g.obj' 0) (app₁ : f.obj' 1 ≅ g.obj' 1) (app₂ : f.obj' 2 ≅ g.obj' 2) (w₀ : f.map' 0 1 ≫ app₁.hom = app₀.hom ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂.hom = app₁.hom ≫ g.map' 1 2) : f ≅ g where hom := homMk₂ app₀.hom app₁.hom app₂.hom w₀ w₁ inv := homMk₂ app₀.inv app₁.inv app₂.inv (by rw [← cancel_epi app₀.hom, ← reassoc_of% w₀, app₁.hom_inv_id, comp_id, app₀.hom_inv_id_assoc]) (by rw [← cancel_epi app₁.hom, ← reassoc_of% w₁, app₂.hom_inv_id, comp_id, app₁.hom_inv_id_assoc]) lemma ext₂ {f g : ComposableArrows C 2} (h₀ : f.obj' 0 = g.obj' 0) (h₁ : f.obj' 1 = g.obj' 1) (h₂ : f.obj' 2 = g.obj' 2) (w₀ : f.map' 0 1 = eqToHom h₀ ≫ g.map' 0 1 ≫ eqToHom h₁.symm) (w₁ : f.map' 1 2 = eqToHom h₁ ≫ g.map' 1 2 ≫ eqToHom h₂.symm) : f = g := ext_succ h₀ (ext₁ h₁ h₂ w₁) w₀ lemma mk₂_surjective (X : ComposableArrows C 2) : ∃ (X₀ X₁ X₂ : C) (f₀ : X₀ ⟶ X₁) (f₁ : X₁ ⟶ X₂), X = mk₂ f₀ f₁ := ⟨_, _, _, X.map' 0 1, X.map' 1 2, ext₂ rfl rfl rfl (by simp) (by simp)⟩ section variable {f g : ComposableArrows C 3} (app₀ : f.obj' 0 ⟶ g.obj' 0) (app₁ : f.obj' 1 ⟶ g.obj' 1) (app₂ : f.obj' 2 ⟶ g.obj' 2) (app₃ : f.obj' 3 ⟶ g.obj' 3) (w₀ : f.map' 0 1 ≫ app₁ = app₀ ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂ = app₁ ≫ g.map' 1 2) (w₂ : f.map' 2 3 ≫ app₃ = app₂ ≫ g.map' 2 3) /-- Constructor for morphisms in `ComposableArrows C 3`. -/ def homMk₃ : f ⟶ g := homMkSucc app₀ (homMk₂ app₁ app₂ app₃ w₁ w₂) w₀ @[simp] lemma homMk₃_app_zero : (homMk₃ app₀ app₁ app₂ app₃ w₀ w₁ w₂).app 0 = app₀ := rfl @[simp] lemma homMk₃_app_one : (homMk₃ app₀ app₁ app₂ app₃ w₀ w₁ w₂).app 1 = app₁ := rfl @[simp] lemma homMk₃_app_two : (homMk₃ app₀ app₁ app₂ app₃ w₀ w₁ w₂).app ⟨2, by valid⟩ = app₂ := rfl @[simp] lemma homMk₃_app_three : (homMk₃ app₀ app₁ app₂ app₃ w₀ w₁ w₂).app ⟨3, by valid⟩ = app₃ := rfl end @[ext] lemma hom_ext₃ {f g : ComposableArrows C 3} {φ φ' : f ⟶ g} (h₀ : app' φ 0 = app' φ' 0) (h₁ : app' φ 1 = app' φ' 1) (h₂ : app' φ 2 = app' φ' 2) (h₃ : app' φ 3 = app' φ' 3) : φ = φ' := hom_ext_succ h₀ (hom_ext₂ h₁ h₂ h₃) /-- Constructor for isomorphisms in `ComposableArrows C 3`. -/ @[simps] def isoMk₃ {f g : ComposableArrows C 3} (app₀ : f.obj' 0 ≅ g.obj' 0) (app₁ : f.obj' 1 ≅ g.obj' 1) (app₂ : f.obj' 2 ≅ g.obj' 2) (app₃ : f.obj' 3 ≅ g.obj' 3) (w₀ : f.map' 0 1 ≫ app₁.hom = app₀.hom ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂.hom = app₁.hom ≫ g.map' 1 2) (w₂ : f.map' 2 3 ≫ app₃.hom = app₂.hom ≫ g.map' 2 3) : f ≅ g where hom := homMk₃ app₀.hom app₁.hom app₂.hom app₃.hom w₀ w₁ w₂ inv := homMk₃ app₀.inv app₁.inv app₂.inv app₃.inv (by rw [← cancel_epi app₀.hom, ← reassoc_of% w₀, app₁.hom_inv_id, comp_id, app₀.hom_inv_id_assoc]) (by rw [← cancel_epi app₁.hom, ← reassoc_of% w₁, app₂.hom_inv_id, comp_id, app₁.hom_inv_id_assoc]) (by rw [← cancel_epi app₂.hom, ← reassoc_of% w₂, app₃.hom_inv_id, comp_id, app₂.hom_inv_id_assoc]) lemma ext₃ {f g : ComposableArrows C 3} (h₀ : f.obj' 0 = g.obj' 0) (h₁ : f.obj' 1 = g.obj' 1) (h₂ : f.obj' 2 = g.obj' 2) (h₃ : f.obj' 3 = g.obj' 3) (w₀ : f.map' 0 1 = eqToHom h₀ ≫ g.map' 0 1 ≫ eqToHom h₁.symm) (w₁ : f.map' 1 2 = eqToHom h₁ ≫ g.map' 1 2 ≫ eqToHom h₂.symm) (w₂ : f.map' 2 3 = eqToHom h₂ ≫ g.map' 2 3 ≫ eqToHom h₃.symm) : f = g := ext_succ h₀ (ext₂ h₁ h₂ h₃ w₁ w₂) w₀ lemma mk₃_surjective (X : ComposableArrows C 3) : ∃ (X₀ X₁ X₂ X₃ : C) (f₀ : X₀ ⟶ X₁) (f₁ : X₁ ⟶ X₂) (f₂ : X₂ ⟶ X₃), X = mk₃ f₀ f₁ f₂ := ⟨_, _, _, _, X.map' 0 1, X.map' 1 2, X.map' 2 3, ext₃ rfl rfl rfl rfl (by simp) (by simp) (by simp)⟩ section variable {f g : ComposableArrows C 4} (app₀ : f.obj' 0 ⟶ g.obj' 0) (app₁ : f.obj' 1 ⟶ g.obj' 1) (app₂ : f.obj' 2 ⟶ g.obj' 2) (app₃ : f.obj' 3 ⟶ g.obj' 3) (app₄ : f.obj' 4 ⟶ g.obj' 4) (w₀ : f.map' 0 1 ≫ app₁ = app₀ ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂ = app₁ ≫ g.map' 1 2) (w₂ : f.map' 2 3 ≫ app₃ = app₂ ≫ g.map' 2 3) (w₃ : f.map' 3 4 ≫ app₄ = app₃ ≫ g.map' 3 4) /-- Constructor for morphisms in `ComposableArrows C 4`. -/ def homMk₄ : f ⟶ g := homMkSucc app₀ (homMk₃ app₁ app₂ app₃ app₄ w₁ w₂ w₃) w₀ @[simp] lemma homMk₄_app_zero : (homMk₄ app₀ app₁ app₂ app₃ app₄ w₀ w₁ w₂ w₃).app 0 = app₀ := rfl @[simp] lemma homMk₄_app_one : (homMk₄ app₀ app₁ app₂ app₃ app₄ w₀ w₁ w₂ w₃).app 1 = app₁ := rfl @[simp] lemma homMk₄_app_two : (homMk₄ app₀ app₁ app₂ app₃ app₄ w₀ w₁ w₂ w₃).app ⟨2, by valid⟩ = app₂ := rfl @[simp] lemma homMk₄_app_three : (homMk₄ app₀ app₁ app₂ app₃ app₄ w₀ w₁ w₂ w₃).app ⟨3, by valid⟩ = app₃ := rfl @[simp] lemma homMk₄_app_four : (homMk₄ app₀ app₁ app₂ app₃ app₄ w₀ w₁ w₂ w₃).app ⟨4, by valid⟩ = app₄ := rfl end @[ext] lemma hom_ext₄ {f g : ComposableArrows C 4} {φ φ' : f ⟶ g} (h₀ : app' φ 0 = app' φ' 0) (h₁ : app' φ 1 = app' φ' 1) (h₂ : app' φ 2 = app' φ' 2) (h₃ : app' φ 3 = app' φ' 3) (h₄ : app' φ 4 = app' φ' 4) : φ = φ' := hom_ext_succ h₀ (hom_ext₃ h₁ h₂ h₃ h₄) lemma map'_inv_eq_inv_map' {n m : ℕ} (h : n+1 ≤ m) {f g : ComposableArrows C m} (app : f.obj' n ≅ g.obj' n) (app' : f.obj' (n+1) ≅ g.obj' (n+1)) (w : f.map' n (n+1) ≫ app'.hom = app.hom ≫ g.map' n (n+1)) : map' g n (n+1) ≫ app'.inv = app.inv ≫ map' f n (n+1) := by rw [← cancel_epi app.hom, ← reassoc_of% w, app'.hom_inv_id, comp_id, app.hom_inv_id_assoc] /-- Constructor for isomorphisms in `ComposableArrows C 4`. -/ @[simps] def isoMk₄ {f g : ComposableArrows C 4} (app₀ : f.obj' 0 ≅ g.obj' 0) (app₁ : f.obj' 1 ≅ g.obj' 1) (app₂ : f.obj' 2 ≅ g.obj' 2) (app₃ : f.obj' 3 ≅ g.obj' 3) (app₄ : f.obj' 4 ≅ g.obj' 4) (w₀ : f.map' 0 1 ≫ app₁.hom = app₀.hom ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂.hom = app₁.hom ≫ g.map' 1 2) (w₂ : f.map' 2 3 ≫ app₃.hom = app₂.hom ≫ g.map' 2 3) (w₃ : f.map' 3 4 ≫ app₄.hom = app₃.hom ≫ g.map' 3 4) : f ≅ g where hom := homMk₄ app₀.hom app₁.hom app₂.hom app₃.hom app₄.hom w₀ w₁ w₂ w₃ inv := homMk₄ app₀.inv app₁.inv app₂.inv app₃.inv app₄.inv (by rw [map'_inv_eq_inv_map' (by valid) app₀ app₁ w₀]) (by rw [map'_inv_eq_inv_map' (by valid) app₁ app₂ w₁]) (by rw [map'_inv_eq_inv_map' (by valid) app₂ app₃ w₂]) (by rw [map'_inv_eq_inv_map' (by valid) app₃ app₄ w₃]) lemma ext₄ {f g : ComposableArrows C 4} (h₀ : f.obj' 0 = g.obj' 0) (h₁ : f.obj' 1 = g.obj' 1) (h₂ : f.obj' 2 = g.obj' 2) (h₃ : f.obj' 3 = g.obj' 3) (h₄ : f.obj' 4 = g.obj' 4) (w₀ : f.map' 0 1 = eqToHom h₀ ≫ g.map' 0 1 ≫ eqToHom h₁.symm) (w₁ : f.map' 1 2 = eqToHom h₁ ≫ g.map' 1 2 ≫ eqToHom h₂.symm) (w₂ : f.map' 2 3 = eqToHom h₂ ≫ g.map' 2 3 ≫ eqToHom h₃.symm) (w₃ : f.map' 3 4 = eqToHom h₃ ≫ g.map' 3 4 ≫ eqToHom h₄.symm) : f = g := ext_succ h₀ (ext₃ h₁ h₂ h₃ h₄ w₁ w₂ w₃) w₀ lemma mk₄_surjective (X : ComposableArrows C 4) : ∃ (X₀ X₁ X₂ X₃ X₄ : C) (f₀ : X₀ ⟶ X₁) (f₁ : X₁ ⟶ X₂) (f₂ : X₂ ⟶ X₃) (f₃ : X₃ ⟶ X₄), X = mk₄ f₀ f₁ f₂ f₃ := ⟨_, _, _, _, _, X.map' 0 1, X.map' 1 2, X.map' 2 3, X.map' 3 4, ext₄ rfl rfl rfl rfl rfl (by simp) (by simp) (by simp) (by simp)⟩ section variable {f g : ComposableArrows C 5} (app₀ : f.obj' 0 ⟶ g.obj' 0) (app₁ : f.obj' 1 ⟶ g.obj' 1) (app₂ : f.obj' 2 ⟶ g.obj' 2) (app₃ : f.obj' 3 ⟶ g.obj' 3) (app₄ : f.obj' 4 ⟶ g.obj' 4) (app₅ : f.obj' 5 ⟶ g.obj' 5) (w₀ : f.map' 0 1 ≫ app₁ = app₀ ≫ g.map' 0 1) (w₁ : f.map' 1 2 ≫ app₂ = app₁ ≫ g.map' 1 2) (w₂ : f.map' 2 3 ≫ app₃ = app₂ ≫ g.map' 2 3) (w₃ : f.map' 3 4 ≫ app₄ = app₃ ≫ g.map' 3 4) (w₄ : f.map' 4 5 ≫ app₅ = app₄ ≫ g.map' 4 5) /-- Constructor for morphisms in `ComposableArrows C 5`. -/ def homMk₅ : f ⟶ g := homMkSucc app₀ (homMk₄ app₁ app₂ app₃ app₄ app₅ w₁ w₂ w₃ w₄) w₀ @[simp] lemma homMk₅_app_zero : (homMk₅ app₀ app₁ app₂ app₃ app₄ app₅ w₀ w₁ w₂ w₃ w₄).app 0 = app₀ := rfl @[simp] lemma homMk₅_app_one : (homMk₅ app₀ app₁ app₂ app₃ app₄ app₅ w₀ w₁ w₂ w₃ w₄).app 1 = app₁ := rfl @[simp] lemma homMk₅_app_two : (homMk₅ app₀ app₁ app₂ app₃ app₄ app₅ w₀ w₁ w₂ w₃ w₄).app ⟨2, by valid⟩ = app₂ := rfl @[simp] lemma homMk₅_app_three : (homMk₅ app₀ app₁ app₂ app₃ app₄ app₅ w₀ w₁ w₂ w₃ w₄).app ⟨3, by valid⟩ = app₃ := rfl @[simp] lemma homMk₅_app_four : (homMk₅ app₀ app₁ app₂ app₃ app₄ app₅ w₀ w₁ w₂ w₃ w₄).app ⟨4, by valid⟩ = app₄ := rfl @[simp] lemma homMk₅_app_five : (homMk₅ app₀ app₁ app₂ app₃ app₄ app₅ w₀ w₁ w₂ w₃ w₄).app ⟨5, by valid⟩ = app₅ := rfl end @[ext] lemma hom_ext₅ {f g : ComposableArrows C 5} {φ φ' : f ⟶ g} (h₀ : app' φ 0 = app' φ' 0) (h₁ : app' φ 1 = app' φ' 1) (h₂ : app' φ 2 = app' φ' 2) (h₃ : app' φ 3 = app' φ' 3) (h₄ : app' φ 4 = app' φ' 4) (h₅ : app' φ 5 = app' φ' 5) : φ = φ' := hom_ext_succ h₀ (hom_ext₄ h₁ h₂ h₃ h₄ h₅)	/-- Constructor for isomorphisms in `ComposableArrows C 5`. -/ @[simps]	Mathlib/CategoryTheory/ComposableArrows.lean	792	794
/- Copyright (c) 2022 David Loeffler. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Loeffler -/ import Mathlib.NumberTheory.BernoulliPolynomials import Mathlib.MeasureTheory.Integral.IntervalIntegral.Basic import Mathlib.Analysis.Calculus.Deriv.Polynomial import Mathlib.Analysis.Fourier.AddCircle import Mathlib.Analysis.PSeries /-! # Critical values of the Riemann zeta function In this file we prove formulae for the critical values of `ζ(s)`, and more generally of Hurwitz zeta functions, in terms of Bernoulli polynomials. ## Main results: * `hasSum_zeta_nat`: the final formula for zeta values, $$\zeta(2k) = \frac{(-1)^{(k + 1)} 2 ^ {2k - 1} \pi^{2k} B_{2 k}}{(2 k)!}.$$ * `hasSum_zeta_two` and `hasSum_zeta_four`: special cases given explicitly. * `hasSum_one_div_nat_pow_mul_cos`: a formula for the sum `∑ (n : ℕ), cos (2 π i n x) / n ^ k` as an explicit multiple of `Bₖ(x)`, for any `x ∈ [0, 1]` and `k ≥ 2` even. * `hasSum_one_div_nat_pow_mul_sin`: a formula for the sum `∑ (n : ℕ), sin (2 π i n x) / n ^ k` as an explicit multiple of `Bₖ(x)`, for any `x ∈ [0, 1]` and `k ≥ 3` odd. -/ noncomputable section open scoped Nat Real Interval open Complex MeasureTheory Set intervalIntegral local notation "𝕌" => UnitAddCircle section BernoulliFunProps /-! Simple properties of the Bernoulli polynomial, as a function `ℝ → ℝ`. -/ /-- The function `x ↦ Bₖ(x) : ℝ → ℝ`. -/ def bernoulliFun (k : ℕ) (x : ℝ) : ℝ := (Polynomial.map (algebraMap ℚ ℝ) (Polynomial.bernoulli k)).eval x theorem bernoulliFun_eval_zero (k : ℕ) : bernoulliFun k 0 = bernoulli k := by rw [bernoulliFun, Polynomial.eval_zero_map, Polynomial.bernoulli_eval_zero, eq_ratCast] theorem bernoulliFun_endpoints_eq_of_ne_one {k : ℕ} (hk : k ≠ 1) : bernoulliFun k 1 = bernoulliFun k 0 := by rw [bernoulliFun_eval_zero, bernoulliFun, Polynomial.eval_one_map, Polynomial.bernoulli_eval_one, bernoulli_eq_bernoulli'_of_ne_one hk, eq_ratCast] theorem bernoulliFun_eval_one (k : ℕ) : bernoulliFun k 1 = bernoulliFun k 0 + ite (k = 1) 1 0 := by rw [bernoulliFun, bernoulliFun_eval_zero, Polynomial.eval_one_map, Polynomial.bernoulli_eval_one] split_ifs with h · rw [h, bernoulli_one, bernoulli'_one, eq_ratCast] push_cast; ring · rw [bernoulli_eq_bernoulli'_of_ne_one h, add_zero, eq_ratCast] theorem hasDerivAt_bernoulliFun (k : ℕ) (x : ℝ) : HasDerivAt (bernoulliFun k) (k * bernoulliFun (k - 1) x) x := by convert ((Polynomial.bernoulli k).map <\| algebraMap ℚ ℝ).hasDerivAt x using 1 simp only [bernoulliFun, Polynomial.derivative_map, Polynomial.derivative_bernoulli k, Polynomial.map_mul, Polynomial.map_natCast, Polynomial.eval_mul, Polynomial.eval_natCast] theorem antideriv_bernoulliFun (k : ℕ) (x : ℝ) : HasDerivAt (fun x => bernoulliFun (k + 1) x / (k + 1)) (bernoulliFun k x) x := by convert (hasDerivAt_bernoulliFun (k + 1) x).div_const _ using 1 field_simp [Nat.cast_add_one_ne_zero k] theorem integral_bernoulliFun_eq_zero {k : ℕ} (hk : k ≠ 0) : ∫ x : ℝ in (0)..1, bernoulliFun k x = 0 := by rw [integral_eq_sub_of_hasDerivAt (fun x _ => antideriv_bernoulliFun k x) ((Polynomial.continuous _).intervalIntegrable _ _)] rw [bernoulliFun_eval_one] split_ifs with h · exfalso; exact hk (Nat.succ_inj.mp h) · simp end BernoulliFunProps section BernoulliFourierCoeffs /-! Compute the Fourier coefficients of the Bernoulli functions via integration by parts. -/ /-- The `n`-th Fourier coefficient of the `k`-th Bernoulli function on the interval `[0, 1]`. -/ def bernoulliFourierCoeff (k : ℕ) (n : ℤ) : ℂ := fourierCoeffOn zero_lt_one (fun x => bernoulliFun k x) n /-- Recurrence relation (in `k`) for the `n`-th Fourier coefficient of `Bₖ`. -/ theorem bernoulliFourierCoeff_recurrence (k : ℕ) {n : ℤ} (hn : n ≠ 0) : bernoulliFourierCoeff k n = 1 / (-2 * π * I * n) * (ite (k = 1) 1 0 - k * bernoulliFourierCoeff (k - 1) n) := by unfold bernoulliFourierCoeff rw [fourierCoeffOn_of_hasDerivAt zero_lt_one hn (fun x _ => (hasDerivAt_bernoulliFun k x).ofReal_comp) ((continuous_ofReal.comp <\| continuous_const.mul <\| Polynomial.continuous _).intervalIntegrable _ _)] simp_rw [ofReal_one, ofReal_zero, sub_zero, one_mul] rw [QuotientAddGroup.mk_zero, fourier_eval_zero, one_mul, ← ofReal_sub, bernoulliFun_eval_one, add_sub_cancel_left] congr 2 · split_ifs <;> simp only [ofReal_one, ofReal_zero, one_mul] · simp_rw [ofReal_mul, ofReal_natCast, fourierCoeffOn.const_mul] /-- The Fourier coefficients of `B₀(x) = 1`. -/ theorem bernoulli_zero_fourier_coeff {n : ℤ} (hn : n ≠ 0) : bernoulliFourierCoeff 0 n = 0 := by simpa using bernoulliFourierCoeff_recurrence 0 hn /-- The `0`-th Fourier coefficient of `Bₖ(x)`. -/ theorem bernoulliFourierCoeff_zero {k : ℕ} (hk : k ≠ 0) : bernoulliFourierCoeff k 0 = 0 := by simp_rw [bernoulliFourierCoeff, fourierCoeffOn_eq_integral, neg_zero, fourier_zero, sub_zero, div_one, one_smul, intervalIntegral.integral_ofReal, integral_bernoulliFun_eq_zero hk, ofReal_zero] theorem bernoulliFourierCoeff_eq {k : ℕ} (hk : k ≠ 0) (n : ℤ) : bernoulliFourierCoeff k n = -k ! / (2 * π * I * n) ^ k := by rcases eq_or_ne n 0 with (rfl \| hn) · rw [bernoulliFourierCoeff_zero hk, Int.cast_zero, mul_zero, zero_pow hk, div_zero] refine Nat.le_induction ?_ (fun k hk h'k => ?_) k (Nat.one_le_iff_ne_zero.mpr hk) · rw [bernoulliFourierCoeff_recurrence 1 hn] simp only [Nat.cast_one, tsub_self, neg_mul, one_mul, eq_self_iff_true, if_true, Nat.factorial_one, pow_one, inv_I, mul_neg] rw [bernoulli_zero_fourier_coeff hn, sub_zero, mul_one, div_neg, neg_div] · rw [bernoulliFourierCoeff_recurrence (k + 1) hn, Nat.add_sub_cancel k 1] split_ifs with h · exfalso; exact (ne_of_gt (Nat.lt_succ_iff.mpr hk)) h · rw [h'k, Nat.factorial_succ, zero_sub, Nat.cast_mul, pow_add, pow_one, neg_div, mul_neg, mul_neg, mul_neg, neg_neg, neg_mul, neg_mul, neg_mul, div_neg] field_simp [Int.cast_ne_zero.mpr hn, I_ne_zero] ring_nf end BernoulliFourierCoeffs section BernoulliPeriodized /-! In this section we use the above evaluations of the Fourier coefficients of Bernoulli polynomials, together with the theorem `has_pointwise_sum_fourier_series_of_summable` from Fourier theory, to obtain an explicit formula for `∑ (n:ℤ), 1 / n ^ k * fourier n x`. -/ /-- The Bernoulli polynomial, extended from `[0, 1)` to the unit circle. -/ def periodizedBernoulli (k : ℕ) : 𝕌 → ℝ := AddCircle.liftIco 1 0 (bernoulliFun k) theorem periodizedBernoulli.continuous {k : ℕ} (hk : k ≠ 1) : Continuous (periodizedBernoulli k) := AddCircle.liftIco_zero_continuous (mod_cast (bernoulliFun_endpoints_eq_of_ne_one hk).symm) (Polynomial.continuous _).continuousOn theorem fourierCoeff_bernoulli_eq {k : ℕ} (hk : k ≠ 0) (n : ℤ) : fourierCoeff ((↑) ∘ periodizedBernoulli k : 𝕌 → ℂ) n = -k ! / (2 * π * I * n) ^ k := by have : ((↑) ∘ periodizedBernoulli k : 𝕌 → ℂ) = AddCircle.liftIco 1 0 ((↑) ∘ bernoulliFun k) := by ext1 x; rfl rw [this, fourierCoeff_liftIco_eq] simpa only [zero_add] using bernoulliFourierCoeff_eq hk n theorem summable_bernoulli_fourier {k : ℕ} (hk : 2 ≤ k) : Summable (fun n => -k ! / (2 * π * I * n) ^ k : ℤ → ℂ) := by have : ∀ n : ℤ, -(k ! : ℂ) / (2 * π * I * n) ^ k = -k ! / (2 * π * I) ^ k * (1 / (n : ℂ) ^ k) := by intro n; rw [mul_one_div, div_div, ← mul_pow] simp_rw [this] refine Summable.mul_left _ <\| .of_norm ?_ have : (fun x : ℤ => ‖1 / (x : ℂ) ^ k‖) = fun x : ℤ => \|1 / (x : ℝ) ^ k\| := by ext1 x simp only [one_div, norm_inv, norm_pow, norm_intCast, pow_abs, abs_inv] simp_rw [this] rwa [summable_abs_iff, Real.summable_one_div_int_pow] theorem hasSum_one_div_pow_mul_fourier_mul_bernoulliFun {k : ℕ} (hk : 2 ≤ k) {x : ℝ} (hx : x ∈ Icc (0 : ℝ) 1) : HasSum (fun n : ℤ => 1 / (n : ℂ) ^ k * fourier n (x : 𝕌)) (-(2 * π * I) ^ k / k ! * bernoulliFun k x) := by -- first show it suffices to prove result for `Ico 0 1` suffices ∀ {y : ℝ}, y ∈ Ico (0 : ℝ) 1 → HasSum (fun (n : ℤ) ↦ 1 / (n : ℂ) ^ k * fourier n y) (-(2 * (π : ℂ) * I) ^ k / k ! * bernoulliFun k y) by rw [← Ico_insert_right (zero_le_one' ℝ), mem_insert_iff, or_comm] at hx rcases hx with (hx \| rfl) · exact this hx · convert this (left_mem_Ico.mpr zero_lt_one) using 1 · rw [AddCircle.coe_period, QuotientAddGroup.mk_zero] · rw [bernoulliFun_endpoints_eq_of_ne_one (by omega : k ≠ 1)] intro y hy let B : C(𝕌, ℂ) := ContinuousMap.mk ((↑) ∘ periodizedBernoulli k) (continuous_ofReal.comp (periodizedBernoulli.continuous (by omega))) have step1 : ∀ n : ℤ, fourierCoeff B n = -k ! / (2 * π * I * n) ^ k := by rw [ContinuousMap.coe_mk]; exact fourierCoeff_bernoulli_eq (by omega : k ≠ 0) have step2 := has_pointwise_sum_fourier_series_of_summable ((summable_bernoulli_fourier hk).congr fun n => (step1 n).symm) y simp_rw [step1] at step2 convert step2.mul_left (-(2 * ↑π * I) ^ k / (k ! : ℂ)) using 2 with n · rw [smul_eq_mul, ← mul_assoc, mul_div, mul_neg, div_mul_cancel₀, neg_neg, mul_pow _ (n : ℂ), ← div_div, div_self] · rw [Ne, pow_eq_zero_iff', not_and_or] exact Or.inl two_pi_I_ne_zero · exact Nat.cast_ne_zero.mpr (Nat.factorial_ne_zero _) · rw [ContinuousMap.coe_mk, Function.comp_apply, ofReal_inj, periodizedBernoulli, AddCircle.liftIco_coe_apply (show y ∈ Ico 0 (0 + 1) by rwa [zero_add])] end BernoulliPeriodized section Cleanup -- This section is just reformulating the results in a nicer form. theorem hasSum_one_div_nat_pow_mul_fourier {k : ℕ} (hk : 2 ≤ k) {x : ℝ} (hx : x ∈ Icc (0 : ℝ) 1) : HasSum (fun n : ℕ => (1 : ℂ) / (n : ℂ) ^ k * (fourier n (x : 𝕌) + (-1 : ℂ) ^ k * fourier (-n) (x : 𝕌))) (-(2 * π * I) ^ k / k ! * bernoulliFun k x) := by convert (hasSum_one_div_pow_mul_fourier_mul_bernoulliFun hk hx).nat_add_neg using 1 · ext1 n rw [Int.cast_neg, mul_add, ← mul_assoc] conv_rhs => rw [neg_eq_neg_one_mul, mul_pow, ← div_div] congr 2 rw [div_mul_eq_mul_div₀, one_mul] congr 1 rw [eq_div_iff, ← mul_pow, ← neg_eq_neg_one_mul, neg_neg, one_pow] apply pow_ne_zero; rw [neg_ne_zero]; exact one_ne_zero · rw [Int.cast_zero, zero_pow (by positivity : k ≠ 0), div_zero, zero_mul, add_zero] theorem hasSum_one_div_nat_pow_mul_cos {k : ℕ} (hk : k ≠ 0) {x : ℝ} (hx : x ∈ Icc (0 : ℝ) 1) : HasSum (fun n : ℕ => 1 / (n : ℝ) ^ (2 * k) * Real.cos (2 * π * n * x)) ((-1 : ℝ) ^ (k + 1) * (2 * π) ^ (2 * k) / 2 / (2 * k)! * (Polynomial.map (algebraMap ℚ ℝ) (Polynomial.bernoulli (2 * k))).eval x) := by have :	HasSum (fun n : ℕ => 1 / (n : ℂ) ^ (2 * k) * (fourier n (x : 𝕌) + fourier (-n) (x : 𝕌))) ((-1 : ℂ) ^ (k + 1) * (2 * (π : ℂ)) ^ (2 * k) / (2 * k)! * bernoulliFun (2 * k) x) := by convert hasSum_one_div_nat_pow_mul_fourier (by omega : 2 ≤ 2 * k) hx using 3 · rw [pow_mul (-1 : ℂ), neg_one_sq, one_pow, one_mul] · rw [pow_add, pow_one] conv_rhs => rw [mul_pow] congr congr · skip · rw [pow_mul, I_sq] ring have ofReal_two : ((2 : ℝ) : ℂ) = 2 := by norm_cast	Mathlib/NumberTheory/ZetaValues.lean	234	248
/- Copyright (c) 2023 Yaël Dillies, Vladimir Ivanov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies, Vladimir Ivanov -/ import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Algebra.BigOperators.Ring.Finset import Mathlib.Algebra.Order.BigOperators.Group.Finset import Mathlib.Algebra.Order.Field.Basic import Mathlib.Data.Finset.Sups import Mathlib.Tactic.FieldSimp import Mathlib.Tactic.Ring import Mathlib.Algebra.BigOperators.Group.Finset.Powerset /-! # The Ahlswede-Zhang identity This file proves the Ahlswede-Zhang identity, which is a nontrivial relation between the size of the "truncated unions" of a set family. It sharpens the Lubell-Yamamoto-Meshalkin inequality `Finset.lubell_yamamoto_meshalkin_inequality_sum_card_div_choose`, by making explicit the correction term. For a set family `𝒜` over a ground set of size `n`, the Ahlswede-Zhang identity states that the sum of `\|⋂ B ∈ 𝒜, B ⊆ A, B\|/(\|A\| * n.choose \|A\|)` over all set `A` is exactly `1`. This implies the LYM inequality since for an antichain `𝒜` and every `A ∈ 𝒜` we have `\|⋂ B ∈ 𝒜, B ⊆ A, B\|/(\|A\| * n.choose \|A\|) = 1 / n.choose \|A\|`. ## Main declarations * `Finset.truncatedSup`: `s.truncatedSup a` is the supremum of all `b ≥ a` in `𝒜` if there are some, or `⊤` if there are none. * `Finset.truncatedInf`: `s.truncatedInf a` is the infimum of all `b ≤ a` in `𝒜` if there are some, or `⊥` if there are none. * `AhlswedeZhang.infSum`: LHS of the Ahlswede-Zhang identity. * `AhlswedeZhang.le_infSum`: The sum of `1 / n.choose \|A\|` over an antichain is less than the RHS of the Ahlswede-Zhang identity. * `AhlswedeZhang.infSum_eq_one`: Ahlswede-Zhang identity. ## References * [R. Ahlswede, Z. Zhang, An identity in combinatorial extremal theory](https://doi.org/10.1016/0001-8708(90)90023-G) * [D. T. Tru, An AZ-style identity and Bollobás deficiency](https://doi.org/10.1016/j.jcta.2007.03.005) -/ section variable (α : Type) [Fintype α] [Nonempty α] {m n : ℕ} open Finset Fintype Nat private lemma binomial_sum_eq (h : n < m) : ∑ i ∈ range (n + 1), (n.choose i (m - n) / ((m - i) * m.choose i) : ℚ) = 1 := by set f : ℕ → ℚ := fun i ↦ n.choose i * (m.choose i : ℚ)⁻¹ with hf suffices ∀ i ∈ range (n + 1), f i - f (i + 1) = n.choose i * (m - n) / ((m - i) * m.choose i) by rw [← sum_congr rfl this, sum_range_sub', hf] simp [choose_self, choose_zero_right, choose_eq_zero_of_lt h] intro i h₁ rw [mem_range] at h₁ have h₁ := le_of_lt_succ h₁ have h₂ := h₁.trans_lt h have h₃ := h₂.le have hi₄ : (i + 1 : ℚ) ≠ 0 := i.cast_add_one_ne_zero have := congr_arg ((↑) : ℕ → ℚ) (choose_succ_right_eq m i) push_cast at this dsimp [f, hf] rw [(eq_mul_inv_iff_mul_eq₀ hi₄).mpr this] have := congr_arg ((↑) : ℕ → ℚ) (choose_succ_right_eq n i) push_cast at this rw [(eq_mul_inv_iff_mul_eq₀ hi₄).mpr this] have : (m - i : ℚ) ≠ 0 := sub_ne_zero_of_ne (cast_lt.mpr h₂).ne' have : (m.choose i : ℚ) ≠ 0 := cast_ne_zero.2 (choose_pos h₂.le).ne' field_simp ring private lemma Fintype.sum_div_mul_card_choose_card : ∑ s : Finset α, (card α / ((card α - #s) * (card α).choose #s) : ℚ) = card α * ∑ k ∈ range (card α), (↑k)⁻¹ + 1 := by rw [← powerset_univ, powerset_card_disjiUnion, sum_disjiUnion] have : ∀ {x : ℕ}, ∀ s ∈ powersetCard x (univ : Finset α), (card α / ((card α - #s) * (card α).choose #s) : ℚ) = card α / ((card α - x) * (card α).choose x) := by intros n s hs rw [mem_powersetCard_univ.1 hs] simp_rw [sum_congr rfl this, sum_const, card_powersetCard, card_univ, nsmul_eq_mul, mul_div, mul_comm, ← mul_div] rw [← mul_sum, ← mul_inv_cancel₀ (cast_ne_zero.mpr card_ne_zero : (card α : ℚ) ≠ 0), ← mul_add, add_comm _ ((card α)⁻¹ : ℚ), ← sum_insert (f := fun x : ℕ ↦ (x⁻¹ : ℚ)) not_mem_range_self, ← range_succ] have (n) (hn : n ∈ range (card α + 1)) : ((card α).choose n / ((card α - n) * (card α).choose n) : ℚ) = (card α - n : ℚ)⁻¹ := by rw [div_mul_cancel_right₀] exact cast_ne_zero.2 (choose_pos <\| mem_range_succ_iff.1 hn).ne' simp only [sum_congr rfl this, mul_eq_mul_left_iff, cast_eq_zero] convert Or.inl <\| sum_range_reflect _ _ with a ha rw [add_tsub_cancel_right, cast_sub (mem_range_succ_iff.mp ha)] end open scoped FinsetFamily namespace Finset variable {α β : Type} /-! ### Truncated supremum, truncated infimum -/ section SemilatticeSup variable [SemilatticeSup α] [SemilatticeSup β] [BoundedOrder β] {s t : Finset α} {a : α} private lemma sup_aux [DecidableLE α] : a ∈ lowerClosure s → {b ∈ s \| a ≤ b}.Nonempty := fun ⟨b, hb, hab⟩ ↦ ⟨b, mem_filter.2 ⟨hb, hab⟩⟩ private lemma lower_aux [DecidableEq α] : a ∈ lowerClosure ↑(s ∪ t) ↔ a ∈ lowerClosure s ∨ a ∈ lowerClosure t := by rw [coe_union, lowerClosure_union, LowerSet.mem_sup_iff] variable [DecidableLE α] [OrderTop α] /-- The supremum of the elements of `s` less than `a` if there are some, otherwise `⊤`. -/ def truncatedSup (s : Finset α) (a : α) : α := if h : a ∈ lowerClosure s then {b ∈ s \| a ≤ b}.sup' (sup_aux h) id else ⊤ lemma truncatedSup_of_mem (h : a ∈ lowerClosure s) : truncatedSup s a = {b ∈ s \| a ≤ b}.sup' (sup_aux h) id := dif_pos h lemma truncatedSup_of_not_mem (h : a ∉ lowerClosure s) : truncatedSup s a = ⊤ := dif_neg h @[simp] lemma truncatedSup_empty (a : α) : truncatedSup ∅ a = ⊤ := truncatedSup_of_not_mem (by simp) @[simp] lemma truncatedSup_singleton (b a : α) : truncatedSup {b} a = if a ≤ b then b else ⊤ := by simp [truncatedSup]; split_ifs <;> simp [Finset.filter_true_of_mem, ] lemma le_truncatedSup : a ≤ truncatedSup s a := by rw [truncatedSup] split_ifs with h · obtain ⟨ℬ, hb, h⟩ := h exact h.trans <\| le_sup' id <\| mem_filter.2 ⟨hb, h⟩ · exact le_top lemma map_truncatedSup [DecidableLE β] (e : α ≃o β) (s : Finset α) (a : α) : e (truncatedSup s a) = truncatedSup (s.map e.toEquiv.toEmbedding) (e a) := by have : e a ∈ lowerClosure (s.map e.toEquiv.toEmbedding : Set β) ↔ a ∈ lowerClosure s := by simp simp_rw [truncatedSup, apply_dite e, map_finset_sup', map_top, this] congr with h simp only [filter_map, Function.comp_def, Equiv.coe_toEmbedding, RelIso.coe_fn_toEquiv, OrderIso.le_iff_le, id, sup'_map] lemma truncatedSup_of_isAntichain (hs : IsAntichain (· ≤ ·) (s : Set α)) (ha : a ∈ s) : truncatedSup s a = a := by refine le_antisymm ?_ le_truncatedSup simp_rw [truncatedSup_of_mem (subset_lowerClosure ha), sup'_le_iff, mem_filter] rintro b ⟨hb, hab⟩ exact (hs.eq ha hb hab).ge variable [DecidableEq α] lemma truncatedSup_union (hs : a ∈ lowerClosure s) (ht : a ∈ lowerClosure t) : truncatedSup (s ∪ t) a = truncatedSup s a ⊔ truncatedSup t a := by simpa only [truncatedSup_of_mem, hs, ht, lower_aux.2 (Or.inl hs), filter_union] using sup'_union _ _ _ lemma truncatedSup_union_left (hs : a ∈ lowerClosure s) (ht : a ∉ lowerClosure t) : truncatedSup (s ∪ t) a = truncatedSup s a := by simp only [mem_lowerClosure, mem_coe, exists_prop, not_exists, not_and] at ht simp only [truncatedSup_of_mem, hs, filter_union, filter_false_of_mem ht, union_empty, lower_aux.2 (Or.inl hs), ht] lemma truncatedSup_union_right (hs : a ∉ lowerClosure s) (ht : a ∈ lowerClosure t) : truncatedSup (s ∪ t) a = truncatedSup t a := by rw [union_comm, truncatedSup_union_left ht hs] lemma truncatedSup_union_of_not_mem (hs : a ∉ lowerClosure s) (ht : a ∉ lowerClosure t) : truncatedSup (s ∪ t) a = ⊤ := truncatedSup_of_not_mem fun h ↦ (lower_aux.1 h).elim hs ht end SemilatticeSup section SemilatticeInf variable [SemilatticeInf α] [SemilatticeInf β] [BoundedOrder β] [DecidableLE β] {s t : Finset α} {a : α} private lemma inf_aux [DecidableLE α] : a ∈ upperClosure s → {b ∈ s \| b ≤ a}.Nonempty := fun ⟨b, hb, hab⟩ ↦ ⟨b, mem_filter.2 ⟨hb, hab⟩⟩ private lemma upper_aux [DecidableEq α] : a ∈ upperClosure ↑(s ∪ t) ↔ a ∈ upperClosure s ∨ a ∈ upperClosure t := by rw [coe_union, upperClosure_union, UpperSet.mem_inf_iff] variable [DecidableLE α] [BoundedOrder α] /-- The infimum of the elements of `s` less than `a` if there are some, otherwise `⊥`. -/ def truncatedInf (s : Finset α) (a : α) : α := if h : a ∈ upperClosure s then {b ∈ s \| b ≤ a}.inf' (inf_aux h) id else ⊥ lemma truncatedInf_of_mem (h : a ∈ upperClosure s) : truncatedInf s a = {b ∈ s \| b ≤ a}.inf' (inf_aux h) id := dif_pos h lemma truncatedInf_of_not_mem (h : a ∉ upperClosure s) : truncatedInf s a = ⊥ := dif_neg h lemma truncatedInf_le : truncatedInf s a ≤ a := by unfold truncatedInf split_ifs with h · obtain ⟨b, hb, hba⟩ := h exact hba.trans' <\| inf'_le id <\| mem_filter.2 ⟨hb, ‹_›⟩ · exact bot_le @[simp] lemma truncatedInf_empty (a : α) : truncatedInf ∅ a = ⊥ := truncatedInf_of_not_mem (by simp) @[simp] lemma truncatedInf_singleton (b a : α) : truncatedInf {b} a = if b ≤ a then b else ⊥ := by simp only [truncatedInf, coe_singleton, upperClosure_singleton, UpperSet.mem_Ici_iff, filter_congr_decidable, id_eq] split_ifs <;> simp [Finset.filter_true_of_mem, ] lemma map_truncatedInf (e : α ≃o β) (s : Finset α) (a : α) : e (truncatedInf s a) = truncatedInf (s.map e.toEquiv.toEmbedding) (e a) := by have : e a ∈ upperClosure (s.map e.toEquiv.toEmbedding) ↔ a ∈ upperClosure s := by simp simp_rw [truncatedInf, apply_dite e, map_finset_inf', map_bot, this] congr with h simp only [filter_map, Function.comp_def, Equiv.coe_toEmbedding, RelIso.coe_fn_toEquiv, OrderIso.le_iff_le, id, inf'_map] lemma truncatedInf_of_isAntichain (hs : IsAntichain (· ≤ ·) (s : Set α)) (ha : a ∈ s) : truncatedInf s a = a := by refine le_antisymm truncatedInf_le ?_ simp_rw [truncatedInf_of_mem (subset_upperClosure ha), le_inf'_iff, mem_filter] rintro b ⟨hb, hba⟩ exact (hs.eq hb ha hba).ge variable [DecidableEq α] lemma truncatedInf_union (hs : a ∈ upperClosure s) (ht : a ∈ upperClosure t) : truncatedInf (s ∪ t) a = truncatedInf s a ⊓ truncatedInf t a := by simpa only [truncatedInf_of_mem, hs, ht, upper_aux.2 (Or.inl hs), filter_union] using inf'_union _ _ _ lemma truncatedInf_union_left (hs : a ∈ upperClosure s) (ht : a ∉ upperClosure t) : truncatedInf (s ∪ t) a = truncatedInf s a := by simp only [mem_upperClosure, mem_coe, exists_prop, not_exists, not_and] at ht simp only [truncatedInf_of_mem, hs, filter_union, filter_false_of_mem ht, union_empty, upper_aux.2 (Or.inl hs), ht] lemma truncatedInf_union_right (hs : a ∉ upperClosure s) (ht : a ∈ upperClosure t) : truncatedInf (s ∪ t) a = truncatedInf t a := by rw [union_comm, truncatedInf_union_left ht hs] lemma truncatedInf_union_of_not_mem (hs : a ∉ upperClosure s) (ht : a ∉ upperClosure t) : truncatedInf (s ∪ t) a = ⊥ := truncatedInf_of_not_mem <\| by rw [coe_union, upperClosure_union]; exact fun h ↦ h.elim hs ht end SemilatticeInf section DistribLattice variable [DistribLattice α] [DecidableEq α] {s t : Finset α} {a : α} private lemma infs_aux : a ∈ lowerClosure ↑(s ⊼ t) ↔ a ∈ lowerClosure s ∧ a ∈ lowerClosure t := by rw [coe_infs, lowerClosure_infs, LowerSet.mem_inf_iff] private lemma sups_aux : a ∈ upperClosure ↑(s ⊻ t) ↔ a ∈ upperClosure s ∧ a ∈ upperClosure t := by rw [coe_sups, upperClosure_sups, UpperSet.mem_sup_iff] variable [DecidableLE α] [BoundedOrder α] lemma truncatedSup_infs (hs : a ∈ lowerClosure s) (ht : a ∈ lowerClosure t) : truncatedSup (s ⊼ t) a = truncatedSup s a ⊓ truncatedSup t a := by simp only [truncatedSup_of_mem, hs, ht, infs_aux.2 ⟨hs, ht⟩, sup'_inf_sup', filter_infs_le] simp_rw [← image_inf_product] rw [sup'_image] simp [Function.uncurry_def] lemma truncatedInf_sups (hs : a ∈ upperClosure s) (ht : a ∈ upperClosure t) : truncatedInf (s ⊻ t) a = truncatedInf s a ⊔ truncatedInf t a := by simp only [truncatedInf_of_mem, hs, ht, sups_aux.2 ⟨hs, ht⟩, inf'_sup_inf', filter_sups_le] simp_rw [← image_sup_product] rw [inf'_image] simp [Function.uncurry_def] lemma truncatedSup_infs_of_not_mem (ha : a ∉ lowerClosure s ⊓ lowerClosure t) : truncatedSup (s ⊼ t) a = ⊤ := truncatedSup_of_not_mem <\| by rwa [coe_infs, lowerClosure_infs] lemma truncatedInf_sups_of_not_mem (ha : a ∉ upperClosure s ⊔ upperClosure t) : truncatedInf (s ⊻ t) a = ⊥ := truncatedInf_of_not_mem <\| by rwa [coe_sups, upperClosure_sups] end DistribLattice section BooleanAlgebra variable [BooleanAlgebra α] [DecidableLE α] @[simp] lemma compl_truncatedSup (s : Finset α) (a : α) : (truncatedSup s a)ᶜ = truncatedInf sᶜˢ aᶜ := map_truncatedSup (OrderIso.compl α) _ _ @[simp] lemma compl_truncatedInf (s : Finset α) (a : α) : (truncatedInf s a)ᶜ = truncatedSup sᶜˢ aᶜ := map_truncatedInf (OrderIso.compl α) _ _ end BooleanAlgebra variable [DecidableEq α] [Fintype α] lemma card_truncatedSup_union_add_card_truncatedSup_infs (𝒜 ℬ : Finset (Finset α)) (s : Finset α) : #(truncatedSup (𝒜 ∪ ℬ) s) + #(truncatedSup (𝒜 ⊼ ℬ) s) = #(truncatedSup 𝒜 s) + #(truncatedSup ℬ s) := by by_cases h𝒜 : s ∈ lowerClosure (𝒜 : Set <\| Finset α) <;> by_cases hℬ : s ∈ lowerClosure (ℬ : Set <\| Finset α) · rw [truncatedSup_union h𝒜 hℬ, truncatedSup_infs h𝒜 hℬ] exact card_union_add_card_inter _ _ · rw [truncatedSup_union_left h𝒜 hℬ, truncatedSup_of_not_mem hℬ, truncatedSup_infs_of_not_mem fun h ↦ hℬ h.2] · rw [truncatedSup_union_right h𝒜 hℬ, truncatedSup_of_not_mem h𝒜, truncatedSup_infs_of_not_mem fun h ↦ h𝒜 h.1, add_comm] · rw [truncatedSup_of_not_mem h𝒜, truncatedSup_of_not_mem hℬ, truncatedSup_union_of_not_mem h𝒜 hℬ, truncatedSup_infs_of_not_mem fun h ↦ h𝒜 h.1] lemma card_truncatedInf_union_add_card_truncatedInf_sups (𝒜 ℬ : Finset (Finset α)) (s : Finset α) : #(truncatedInf (𝒜 ∪ ℬ) s) + #(truncatedInf (𝒜 ⊻ ℬ) s) = #(truncatedInf 𝒜 s) + #(truncatedInf ℬ s) := by by_cases h𝒜 : s ∈ upperClosure (𝒜 : Set <\| Finset α) <;> by_cases hℬ : s ∈ upperClosure (ℬ : Set <\| Finset α) · rw [truncatedInf_union h𝒜 hℬ, truncatedInf_sups h𝒜 hℬ] exact card_inter_add_card_union _ _ · rw [truncatedInf_union_left h𝒜 hℬ, truncatedInf_of_not_mem hℬ, truncatedInf_sups_of_not_mem fun h ↦ hℬ h.2] · rw [truncatedInf_union_right h𝒜 hℬ, truncatedInf_of_not_mem h𝒜, truncatedInf_sups_of_not_mem fun h ↦ h𝒜 h.1, add_comm] · rw [truncatedInf_of_not_mem h𝒜, truncatedInf_of_not_mem hℬ, truncatedInf_union_of_not_mem h𝒜 hℬ, truncatedInf_sups_of_not_mem fun h ↦ h𝒜 h.1] end Finset open Finset hiding card open Fintype Nat namespace AhlswedeZhang variable {α : Type} [Fintype α] [DecidableEq α] {𝒜 : Finset (Finset α)} {s : Finset α} /-- Weighted sum of the size of the truncated infima of a set family. Relevant to the Ahlswede-Zhang identity. -/ def infSum (𝒜 : Finset (Finset α)) : ℚ := ∑ s, #(truncatedInf 𝒜 s) / (#s * (card α).choose #s) /-- Weighted sum of the size of the truncated suprema of a set family. Relevant to the Ahlswede-Zhang identity. -/ def supSum (𝒜 : Finset (Finset α)) : ℚ := ∑ s, #(truncatedSup 𝒜 s) / ((card α - #s) * (card α).choose #s) lemma supSum_union_add_supSum_infs (𝒜 ℬ : Finset (Finset α)) : supSum (𝒜 ∪ ℬ) + supSum (𝒜 ⊼ ℬ) = supSum 𝒜 + supSum ℬ := by unfold supSum rw [← sum_add_distrib, ← sum_add_distrib, sum_congr rfl fun s _ ↦ _] simp_rw [div_add_div_same, ← Nat.cast_add, card_truncatedSup_union_add_card_truncatedSup_infs] simp lemma infSum_union_add_infSum_sups (𝒜 ℬ : Finset (Finset α)) : infSum (𝒜 ∪ ℬ) + infSum (𝒜 ⊻ ℬ) = infSum 𝒜 + infSum ℬ := by unfold infSum rw [← sum_add_distrib, ← sum_add_distrib, sum_congr rfl fun s _ ↦ _] simp_rw [div_add_div_same, ← Nat.cast_add, card_truncatedInf_union_add_card_truncatedInf_sups] simp lemma IsAntichain.le_infSum (h𝒜 : IsAntichain (· ⊆ ·) (𝒜 : Set (Finset α))) (h𝒜₀ : ∅ ∉ 𝒜) : ∑ s ∈ 𝒜, ((card α).choose #s : ℚ)⁻¹ ≤ infSum 𝒜 := by calc _ = ∑ s ∈ 𝒜, #(truncatedInf 𝒜 s) / (#s * (card α).choose #s : ℚ) := ?_ _ ≤ _ := sum_le_univ_sum_of_nonneg fun s ↦ by positivity refine sum_congr rfl fun s hs ↦ ?_ rw [truncatedInf_of_isAntichain h𝒜 hs, div_mul_cancel_left₀] have := (nonempty_iff_ne_empty.2 <\| ne_of_mem_of_not_mem hs h𝒜₀).card_pos positivity variable [Nonempty α] @[simp] lemma supSum_singleton (hs : s ≠ univ) : supSum ({s} : Finset (Finset α)) = card α * ∑ k ∈ range (card α), (k : ℚ)⁻¹ := by have : ∀ t : Finset α, (card α - #(truncatedSup {s} t) : ℚ) / ((card α - #t) * (card α).choose #t) = if t ⊆ s then (card α - #s : ℚ) / ((card α - #t) * (card α).choose #t) else 0 := by rintro t simp_rw [truncatedSup_singleton, le_iff_subset] split_ifs <;> simp simp_rw [← sub_eq_of_eq_add (Fintype.sum_div_mul_card_choose_card α), eq_sub_iff_add_eq, ← eq_sub_iff_add_eq', supSum, ← sum_sub_distrib, ← sub_div] rw [sum_congr rfl fun t _ ↦ this t, sum_ite, sum_const_zero, add_zero, filter_subset_univ, sum_powerset, ← binomial_sum_eq ((card_lt_iff_ne_univ _).2 hs), eq_comm] refine sum_congr rfl fun n _ ↦ ?_ rw [mul_div_assoc, ← nsmul_eq_mul] exact sum_powersetCard n s fun m ↦ (card α - #s : ℚ) / ((card α - m) * (card α).choose m) /-- The Ahlswede-Zhang Identity. -/ lemma infSum_compls_add_supSum (𝒜 : Finset (Finset α)) : infSum 𝒜ᶜˢ + supSum 𝒜 = card α * ∑ k ∈ range (card α), (k : ℚ)⁻¹ + 1 := by unfold infSum supSum rw [← @map_univ_of_surjective (Finset α) _ _ _ ⟨compl, compl_injective⟩ compl_surjective, sum_map] simp only [Function.Embedding.coeFn_mk, univ_map_embedding, ← compl_truncatedSup, ← sum_add_distrib, card_compl, cast_sub (card_le_univ _), choose_symm (card_le_univ _), div_add_div_same, sub_add_cancel, Fintype.sum_div_mul_card_choose_card] lemma supSum_of_not_univ_mem (h𝒜₁ : 𝒜.Nonempty) (h𝒜₂ : univ ∉ 𝒜) : supSum 𝒜 = card α * ∑ k ∈ range (card α), (k : ℚ)⁻¹ := by set m := 𝒜.card with hm clear_value m induction m using Nat.strongRecOn generalizing 𝒜 with \| ind m ih => _ replace ih := fun 𝒜 h𝒜 h𝒜₁ h𝒜₂ ↦ @ih _ h𝒜 𝒜 h𝒜₁ h𝒜₂ rfl obtain ⟨a, rfl⟩ \| h𝒜₃ := h𝒜₁.exists_eq_singleton_or_nontrivial · refine supSum_singleton ?_ simpa [eq_comm] using h𝒜₂ cases m · cases h𝒜₁.card_pos.ne hm obtain ⟨s, 𝒜, hs, rfl, rfl⟩ := card_eq_succ.1 hm.symm have h𝒜 : 𝒜.Nonempty := nonempty_iff_ne_empty.2 (by rintro rfl; simp at h𝒜₃) rw [insert_eq, eq_sub_of_add_eq (supSum_union_add_supSum_infs _ _), singleton_infs, supSum_singleton (ne_of_mem_of_not_mem (mem_insert_self _ _) h𝒜₂), ih, ih, add_sub_cancel_right] · exact card_image_le.trans_lt (lt_add_one _) · exact h𝒜.image _ · simpa using fun _ ↦ ne_of_mem_of_not_mem (mem_insert_self _ _) h𝒜₂	· exact lt_add_one _ · exact h𝒜 · exact fun h ↦ h𝒜₂ (mem_insert_of_mem h) /-- The Ahlswede-Zhang Identity. -/	Mathlib/Combinatorics/SetFamily/AhlswedeZhang.lean	411	415
/- 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.Basic import Mathlib.MeasureTheory.Integral.IntervalIntegral.FundThmCalculus import Mathlib.MeasureTheory.Integral.IntervalIntegral.IntegrationByParts deprecated_module (since := "2025-04-13")		Mathlib/MeasureTheory/Integral/IntervalIntegral.lean	600	602
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison -/ import Mathlib.Algebra.MvPolynomial.PDeriv import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.Derivative import Mathlib.Algebra.Polynomial.Eval.SMul import Mathlib.Data.Nat.Choose.Sum import Mathlib.LinearAlgebra.LinearIndependent.Lemmas import Mathlib.RingTheory.Polynomial.Pochhammer /-! # Bernstein polynomials The definition of the Bernstein polynomials ``` bernsteinPolynomial (R : Type) [CommRing R] (n ν : ℕ) : R[X] := (choose n ν) X^ν * (1 - X)^(n - ν) ``` and the fact that for `ν : Fin (n+1)` these are linearly independent over `ℚ`. We prove the basic identities * `(Finset.range (n + 1)).sum (fun ν ↦ bernsteinPolynomial R n ν) = 1` * `(Finset.range (n + 1)).sum (fun ν ↦ ν • bernsteinPolynomial R n ν) = n • X` * `(Finset.range (n + 1)).sum (fun ν ↦ (ν * (ν-1)) • bernsteinPolynomial R n ν) = (n * (n-1)) • X^2` ## Notes See also `Mathlib.Analysis.SpecialFunctions.Bernstein`, which defines the Bernstein approximations of a continuous function `f : C([0,1], ℝ)`, and shows that these converge uniformly to `f`. -/ noncomputable section open Nat (choose) open Polynomial (X) open scoped Polynomial variable (R : Type) [CommRing R] /-- `bernsteinPolynomial R n ν` is `(choose n ν) X^ν * (1 - X)^(n - ν)`. Although the coefficients are integers, it is convenient to work over an arbitrary commutative ring. -/ def bernsteinPolynomial (n ν : ℕ) : R[X] := (choose n ν : R[X]) * X ^ ν * (1 - X) ^ (n - ν) example : bernsteinPolynomial ℤ 3 2 = 3 * X ^ 2 - 3 * X ^ 3 := by norm_num [bernsteinPolynomial, choose] ring namespace bernsteinPolynomial theorem eq_zero_of_lt {n ν : ℕ} (h : n < ν) : bernsteinPolynomial R n ν = 0 := by simp [bernsteinPolynomial, Nat.choose_eq_zero_of_lt h] section variable {R} {S : Type} [CommRing S] @[simp] theorem map (f : R →+ S) (n ν : ℕ) : (bernsteinPolynomial R n ν).map f = bernsteinPolynomial S n ν := by simp [bernsteinPolynomial] end theorem flip (n ν : ℕ) (h : ν ≤ n) : (bernsteinPolynomial R n ν).comp (1 - X) = bernsteinPolynomial R n (n - ν) := by simp [bernsteinPolynomial, h, tsub_tsub_assoc, mul_right_comm] theorem flip' (n ν : ℕ) (h : ν ≤ n) : bernsteinPolynomial R n ν = (bernsteinPolynomial R n (n - ν)).comp (1 - X) := by simp [← flip _ _ _ h, Polynomial.comp_assoc] theorem eval_at_0 (n ν : ℕ) : (bernsteinPolynomial R n ν).eval 0 = if ν = 0 then 1 else 0 := by rw [bernsteinPolynomial] split_ifs with h · subst h; simp · simp [zero_pow h]	theorem eval_at_1 (n ν : ℕ) : (bernsteinPolynomial R n ν).eval 1 = if ν = n then 1 else 0 := by rw [bernsteinPolynomial] split_ifs with h · subst h; simp · obtain hνn \| hnν := Ne.lt_or_lt h	Mathlib/RingTheory/Polynomial/Bernstein.lean	86	90
/- 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 ?_ congr with i simp [Complex.norm_pow] _ ≤ Real.exp ‖x‖ - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by gcongr exact Real.sum_le_exp_of_nonneg (norm_nonneg _) _ lemma norm_exp_le_exp_norm (x : ℂ) : ‖exp x‖ ≤ Real.exp ‖x‖ := by convert norm_exp_sub_sum_le_exp_norm_sub_sum x 0 using 1 <;> simp lemma norm_exp_sub_sum_le_norm_mul_exp (x : ℂ) (n : ℕ) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * Real.exp ‖x‖ := 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] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ _ 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 * (‖x‖ ^ (m - n) / (m - n).factorial) := by simp_rw [Complex.norm_mul, Complex.norm_pow, Complex.norm_div, norm_natCast] gcongr with i hi · rw [Complex.norm_pow] · simp _ = ‖x‖ ^ n * ∑ m ∈ range j with n ≤ m, (‖x‖ ^ (m - n) / (m - n).factorial) := by rw [← mul_sum] _ = ‖x‖ ^ n * ∑ m ∈ range (j - n), (‖x‖ ^ m / m.factorial) := by congr 1 refine (sum_bij (fun m hm ↦ m + n) ?_ ?_ ?_ ?_).symm · intro a ha simp only [mem_filter, mem_range, le_add_iff_nonneg_left, zero_le, and_true] simp only [mem_range] at ha rwa [← lt_tsub_iff_right] · intro a ha b hb hab simpa using hab · intro b hb simp only [mem_range, exists_prop] simp only [mem_filter, mem_range] at hb refine ⟨b - n, ?_, ?_⟩ · rw [tsub_lt_tsub_iff_right hb.2] exact hb.1 · rw [tsub_add_cancel_of_le hb.2] · simp _ ≤ ‖x‖ ^ n * Real.exp ‖x‖ := by gcongr refine Real.sum_le_exp_of_nonneg ?_ _ exact norm_nonneg _ @[deprecated (since := "2025-02-16")] alias abs_exp_sub_one_le := norm_exp_sub_one_le @[deprecated (since := "2025-02-16")] alias abs_exp_sub_one_sub_id_le := norm_exp_sub_one_sub_id_le @[deprecated (since := "2025-02-16")] alias abs_exp_sub_sum_le_exp_abs_sub_sum := norm_exp_sub_sum_le_exp_norm_sub_sum @[deprecated (since := "2025-02-16")] alias abs_exp_le_exp_abs := norm_exp_le_exp_norm @[deprecated (since := "2025-02-16")] alias abs_exp_sub_sum_le_abs_mul_exp := norm_exp_sub_sum_le_norm_mul_exp end Complex namespace Real open Complex Finset nonrec theorem exp_bound {x : ℝ} (hx : \|x\| ≤ 1) {n : ℕ} (hn : 0 < n) : \|exp x - ∑ m ∈ range n, x ^ m / m.factorial\| ≤ \|x\| ^ n * (n.succ / (n.factorial * n)) := by have hxc : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx convert exp_bound hxc hn using 2 <;> norm_cast theorem exp_bound' {x : ℝ} (h1 : 0 ≤ x) (h2 : x ≤ 1) {n : ℕ} (hn : 0 < n) : Real.exp x ≤ (∑ m ∈ Finset.range n, x ^ m / m.factorial) + x ^ n * (n + 1) / (n.factorial * n) := by have h3 : \|x\| = x := by simpa have h4 : \|x\| ≤ 1 := by rwa [h3] have h' := Real.exp_bound h4 hn rw [h3] at h' have h'' := (abs_sub_le_iff.1 h').1 have t := sub_le_iff_le_add'.1 h'' simpa [mul_div_assoc] using t theorem abs_exp_sub_one_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1\| ≤ 2 * \|x\| := by have : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx exact_mod_cast Complex.norm_exp_sub_one_le (x := x) this theorem abs_exp_sub_one_sub_id_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1 - x\| ≤ x ^ 2 := by rw [← sq_abs] have : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx exact_mod_cast Complex.norm_exp_sub_one_sub_id_le this /-- A finite initial segment of the exponential series, followed by an arbitrary tail. For fixed `n` this is just a linear map wrt `r`, and each map is a simple linear function of the previous (see `expNear_succ`), with `expNear n x r ⟶ exp x` as `n ⟶ ∞`, for any `r`. -/ noncomputable def expNear (n : ℕ) (x r : ℝ) : ℝ := (∑ m ∈ range n, x ^ m / m.factorial) + x ^ n / n.factorial * r @[simp] theorem expNear_zero (x r) : expNear 0 x r = r := by simp [expNear] @[simp] theorem expNear_succ (n x r) : expNear (n + 1) x r = expNear n x (1 + x / (n + 1) * r) := by simp [expNear, range_succ, mul_add, add_left_comm, add_assoc, pow_succ, div_eq_mul_inv, mul_inv, Nat.factorial] ac_rfl theorem expNear_sub (n x r₁ r₂) : expNear n x r₁ - expNear n x r₂ = x ^ n / n.factorial * (r₁ - r₂) := by simp [expNear, mul_sub] theorem exp_approx_end (n m : ℕ) (x : ℝ) (e₁ : n + 1 = m) (h : \|x\| ≤ 1) : \|exp x - expNear m x 0\| ≤ \|x\| ^ m / m.factorial * ((m + 1) / m) := by simp only [expNear, mul_zero, add_zero] convert exp_bound (n := m) h ?_ using 1 · field_simp [mul_comm] · omega theorem exp_approx_succ {n} {x a₁ b₁ : ℝ} (m : ℕ) (e₁ : n + 1 = m) (a₂ b₂ : ℝ) (e : \|1 + x / m * a₂ - a₁\| ≤ b₁ - \|x\| / m * b₂) (h : \|exp x - expNear m x a₂\| ≤ \|x\| ^ m / m.factorial * b₂) : \|exp x - expNear n x a₁\| ≤ \|x\| ^ n / n.factorial * b₁ := by refine (abs_sub_le _ _ _).trans ((add_le_add_right h _).trans ?_) subst e₁; rw [expNear_succ, expNear_sub, abs_mul] convert mul_le_mul_of_nonneg_left (a := \|x\| ^ n / ↑(Nat.factorial n)) (le_sub_iff_add_le'.1 e) ?_ using 1 · simp [mul_add, pow_succ', div_eq_mul_inv, abs_mul, abs_inv, ← pow_abs, mul_inv, Nat.factorial] ac_rfl · simp [div_nonneg, abs_nonneg] theorem exp_approx_end' {n} {x a b : ℝ} (m : ℕ) (e₁ : n + 1 = m) (rm : ℝ) (er : ↑m = rm) (h : \|x\| ≤ 1) (e : \|1 - a\| ≤ b - \|x\| / rm * ((rm + 1) / rm)) : \|exp x - expNear n x a\| ≤ \|x\| ^ n / n.factorial * b := by subst er exact exp_approx_succ _ e₁ _ _ (by simpa using e) (exp_approx_end _ _ _ e₁ h) theorem exp_1_approx_succ_eq {n} {a₁ b₁ : ℝ} {m : ℕ} (en : n + 1 = m) {rm : ℝ} (er : ↑m = rm) (h : \|exp 1 - expNear m 1 ((a₁ - 1) * rm)\| ≤ \|1\| ^ m / m.factorial * (b₁ * rm)) : \|exp 1 - expNear n 1 a₁\| ≤ \|1\| ^ n / n.factorial * b₁ := by subst er refine exp_approx_succ _ en _ _ ?_ h field_simp [show (m : ℝ) ≠ 0 by norm_cast; omega] theorem exp_approx_start (x a b : ℝ) (h : \|exp x - expNear 0 x a\| ≤ \|x\| ^ 0 / Nat.factorial 0 * b) : \|exp x - a\| ≤ b := by simpa using h theorem exp_bound_div_one_sub_of_interval' {x : ℝ} (h1 : 0 < x) (h2 : x < 1) : Real.exp x < 1 / (1 - x) := by have H : 0 < 1 - (1 + x + x ^ 2) * (1 - x) := calc 0 < x ^ 3 := by positivity _ = 1 - (1 + x + x ^ 2) * (1 - x) := by ring calc exp x ≤ _ := exp_bound' h1.le h2.le zero_lt_three _ ≤ 1 + x + x ^ 2 := by -- Porting note: was `norm_num [Finset.sum] <;> nlinarith` -- This proof should be restored after the norm_num plugin for big operators is ported. -- (It may also need the positivity extensions in https://github.com/leanprover-community/mathlib4/pull/3907.) rw [show 3 = 1 + 1 + 1 from rfl] repeat rw [Finset.sum_range_succ] norm_num [Nat.factorial] nlinarith _ < 1 / (1 - x) := by rw [lt_div_iff₀] <;> nlinarith theorem exp_bound_div_one_sub_of_interval {x : ℝ} (h1 : 0 ≤ x) (h2 : x < 1) : Real.exp x ≤ 1 / (1 - x) := by rcases eq_or_lt_of_le h1 with (rfl \| h1) · simp · exact (exp_bound_div_one_sub_of_interval' h1 h2).le theorem add_one_lt_exp {x : ℝ} (hx : x ≠ 0) : x + 1 < Real.exp x := by obtain hx \| hx := hx.symm.lt_or_lt · exact add_one_lt_exp_of_pos hx obtain h' \| h' := le_or_lt 1 (-x) · linarith [x.exp_pos] have hx' : 0 < x + 1 := by linarith simpa [add_comm, exp_neg, inv_lt_inv₀ (exp_pos _) hx'] using exp_bound_div_one_sub_of_interval' (neg_pos.2 hx) h' theorem add_one_le_exp (x : ℝ) : x + 1 ≤ Real.exp x := by obtain rfl \| hx := eq_or_ne x 0 · simp · exact (add_one_lt_exp hx).le lemma one_sub_lt_exp_neg {x : ℝ} (hx : x ≠ 0) : 1 - x < exp (-x) := (sub_eq_neg_add _ _).trans_lt <\| add_one_lt_exp <\| neg_ne_zero.2 hx lemma one_sub_le_exp_neg (x : ℝ) : 1 - x ≤ exp (-x) := (sub_eq_neg_add _ _).trans_le <\| add_one_le_exp _ theorem one_sub_div_pow_le_exp_neg {n : ℕ} {t : ℝ} (ht' : t ≤ n) : (1 - t / n) ^ n ≤ exp (-t) := by rcases eq_or_ne n 0 with (rfl \| hn) · simp rwa [Nat.cast_zero] at ht' calc (1 - t / n) ^ n ≤ rexp (-(t / n)) ^ n := by gcongr · exact sub_nonneg.2 <\| div_le_one_of_le₀ ht' n.cast_nonneg · exact one_sub_le_exp_neg _ _ = rexp (-t) := by rw [← Real.exp_nat_mul, mul_neg, mul_comm, div_mul_cancel₀]; positivity lemma le_inv_mul_exp (x : ℝ) {c : ℝ} (hc : 0 < c) : x ≤ c⁻¹ * exp (c * x) := by rw [le_inv_mul_iff₀ hc] calc c * x _ ≤ c * x + 1 := le_add_of_nonneg_right zero_le_one _ ≤ _ := Real.add_one_le_exp (c * x) end Real namespace Mathlib.Meta.Positivity open Lean.Meta Qq /-- Extension for the `positivity` tactic: `Real.exp` is always positive. -/ @[positivity Real.exp _] def evalExp : PositivityExt where eval {u α} _ _ e := do match u, α, e with \| 0, ~q(ℝ), ~q(Real.exp $a) => assertInstancesCommute pure (.positive q(Real.exp_pos $a)) \| _, _, _ => throwError "not Real.exp" end Mathlib.Meta.Positivity namespace Complex @[simp] theorem norm_exp_ofReal (x : ℝ) : ‖exp x‖ = Real.exp x := by rw [← ofReal_exp] exact Complex.norm_of_nonneg (le_of_lt (Real.exp_pos _)) @[deprecated (since := "2025-02-16")] alias abs_exp_ofReal := norm_exp_ofReal end Complex		Mathlib/Data/Complex/Exponential.lean	899	900
/- Copyright (c) 2020 Eric Wieser. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Eric Wieser -/ import Mathlib.LinearAlgebra.CliffordAlgebra.Grading import Mathlib.Algebra.Module.Opposite /-! # Conjugations This file defines the grade reversal and grade involution functions on multivectors, `reverse` and `involute`. Together, these operations compose to form the "Clifford conjugate", hence the name of this file. https://en.wikipedia.org/wiki/Clifford_algebra#Antiautomorphisms ## Main definitions * `CliffordAlgebra.involute`: the grade involution, negating each basis vector * `CliffordAlgebra.reverse`: the grade reversion, reversing the order of a product of vectors ## Main statements * `CliffordAlgebra.involute_involutive` * `CliffordAlgebra.reverse_involutive` * `CliffordAlgebra.reverse_involute_commute` * `CliffordAlgebra.involute_mem_evenOdd_iff` * `CliffordAlgebra.reverse_mem_evenOdd_iff` -/ variable {R : Type} [CommRing R] variable {M : Type} [AddCommGroup M] [Module R M] variable {Q : QuadraticForm R M} namespace CliffordAlgebra section Involute /-- Grade involution, inverting the sign of each basis vector. -/ def involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q := CliffordAlgebra.lift Q ⟨-ι Q, fun m => by simp⟩ @[simp] theorem involute_ι (m : M) : involute (ι Q m) = -ι Q m := lift_ι_apply _ _ m @[simp] theorem involute_comp_involute : involute.comp involute = AlgHom.id R (CliffordAlgebra Q) := by ext; simp theorem involute_involutive : Function.Involutive (involute : _ → CliffordAlgebra Q) := AlgHom.congr_fun involute_comp_involute @[simp] theorem involute_involute : ∀ a : CliffordAlgebra Q, involute (involute a) = a := involute_involutive /-- `CliffordAlgebra.involute` as an `AlgEquiv`. -/ @[simps!] def involuteEquiv : CliffordAlgebra Q ≃ₐ[R] CliffordAlgebra Q := AlgEquiv.ofAlgHom involute involute (AlgHom.ext <\| involute_involute) (AlgHom.ext <\| involute_involute) end Involute section Reverse open MulOpposite /-- `CliffordAlgebra.reverse` as an `AlgHom` to the opposite algebra -/ def reverseOp : CliffordAlgebra Q →ₐ[R] (CliffordAlgebra Q)ᵐᵒᵖ := CliffordAlgebra.lift Q ⟨(MulOpposite.opLinearEquiv R).toLinearMap ∘ₗ ι Q, fun m => unop_injective <\| by simp⟩ @[simp] theorem reverseOp_ι (m : M) : reverseOp (ι Q m) = op (ι Q m) := lift_ι_apply _ _ _ /-- `CliffordAlgebra.reverseEquiv` as an `AlgEquiv` to the opposite algebra -/ @[simps! apply] def reverseOpEquiv : CliffordAlgebra Q ≃ₐ[R] (CliffordAlgebra Q)ᵐᵒᵖ := AlgEquiv.ofAlgHom reverseOp (AlgHom.opComm reverseOp) (AlgHom.unop.injective <\| hom_ext <\| LinearMap.ext fun _ => by simp) (hom_ext <\| LinearMap.ext fun _ => by simp) @[simp] theorem reverseOpEquiv_opComm : AlgEquiv.opComm (reverseOpEquiv (Q := Q)) = reverseOpEquiv.symm := rfl /-- Grade reversion, inverting the multiplication order of basis vectors. Also called transpose in some literature. -/ def reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q := (opLinearEquiv R).symm.toLinearMap.comp reverseOp.toLinearMap @[simp] theorem unop_reverseOp (x : CliffordAlgebra Q) : (reverseOp x).unop = reverse x := rfl @[simp] theorem op_reverse (x : CliffordAlgebra Q) : op (reverse x) = reverseOp x := rfl @[simp] theorem reverse_ι (m : M) : reverse (ι Q m) = ι Q m := by simp [reverse] @[simp] theorem reverse.commutes (r : R) : reverse (algebraMap R (CliffordAlgebra Q) r) = algebraMap R _ r := op_injective <\| reverseOp.commutes r @[simp] protected theorem reverse.map_one : reverse (1 : CliffordAlgebra Q) = 1 := op_injective (map_one reverseOp) @[simp] protected theorem reverse.map_mul (a b : CliffordAlgebra Q) : reverse (a * b) = reverse b * reverse a := op_injective (map_mul reverseOp a b) @[simp] theorem reverse_involutive : Function.Involutive (reverse (Q := Q)) := AlgHom.congr_fun reverseOpEquiv.symm_comp @[simp] theorem reverse_comp_reverse : reverse.comp reverse = (LinearMap.id : _ →ₗ[R] CliffordAlgebra Q) := LinearMap.ext reverse_involutive @[simp] theorem reverse_reverse : ∀ a : CliffordAlgebra Q, reverse (reverse a) = a := reverse_involutive /-- `CliffordAlgebra.reverse` as a `LinearEquiv`. -/ @[simps!] def reverseEquiv : CliffordAlgebra Q ≃ₗ[R] CliffordAlgebra Q := LinearEquiv.ofInvolutive reverse reverse_involutive theorem reverse_comp_involute : reverse.comp involute.toLinearMap = (involute.toLinearMap.comp reverse : _ →ₗ[R] CliffordAlgebra Q) := by ext x simp only [LinearMap.comp_apply, AlgHom.toLinearMap_apply] induction x using CliffordAlgebra.induction with \| algebraMap => simp \| ι => simp \| mul a b ha hb => simp only [ha, hb, reverse.map_mul, map_mul] \| add a b ha hb => simp only [ha, hb, reverse.map_add, map_add] /-- `CliffordAlgebra.reverse` and `CliffordAlgebra.involute` commute. Note that the composition is sometimes referred to as the "clifford conjugate". -/ theorem reverse_involute_commute : Function.Commute (reverse (Q := Q)) involute := LinearMap.congr_fun reverse_comp_involute theorem reverse_involute : ∀ a : CliffordAlgebra Q, reverse (involute a) = involute (reverse a) := reverse_involute_commute end Reverse /-! ### Statements about conjugations of products of lists -/ section List /-- Taking the reverse of the product a list of $n$ vectors lifted via `ι` is equivalent to taking the product of the reverse of that list. -/ theorem reverse_prod_map_ι : ∀ l : List M, reverse (l.map <\| ι Q).prod = (l.map <\| ι Q).reverse.prod \| [] => by simp \| x::xs => by simp [reverse_prod_map_ι xs] /-- Taking the involute of the product a list of $n$ vectors lifted via `ι` is equivalent to premultiplying by ${-1}^n$. -/ theorem involute_prod_map_ι : ∀ l : List M, involute (l.map <\| ι Q).prod = (-1 : R) ^ l.length • (l.map <\| ι Q).prod \| [] => by simp \| x::xs => by simp [pow_succ, involute_prod_map_ι xs] end List /-! ### Statements about `Submodule.map` and `Submodule.comap` -/ section Submodule variable (Q) section Involute theorem submodule_map_involute_eq_comap (p : Submodule R (CliffordAlgebra Q)) : p.map (involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q).toLinearMap = p.comap (involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q).toLinearMap := Submodule.map_equiv_eq_comap_symm involuteEquiv.toLinearEquiv _ @[simp] theorem ι_range_map_involute : (LinearMap.range (ι Q)).map (involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q).toLinearMap = LinearMap.range (ι Q) := (ι_range_map_lift _ _).trans (LinearMap.range_neg _) @[simp] theorem ι_range_comap_involute : (LinearMap.range (ι Q)).comap (involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q).toLinearMap = LinearMap.range (ι Q) := by rw [← submodule_map_involute_eq_comap, ι_range_map_involute] @[simp] theorem evenOdd_map_involute (n : ZMod 2) : (evenOdd Q n).map (involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q).toLinearMap = evenOdd Q n := by simp_rw [evenOdd, Submodule.map_iSup, Submodule.map_pow, ι_range_map_involute] @[simp] theorem evenOdd_comap_involute (n : ZMod 2) : (evenOdd Q n).comap (involute : CliffordAlgebra Q →ₐ[R] CliffordAlgebra Q).toLinearMap = evenOdd Q n := by rw [← submodule_map_involute_eq_comap, evenOdd_map_involute] end Involute section Reverse theorem submodule_map_reverse_eq_comap (p : Submodule R (CliffordAlgebra Q)) : p.map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = p.comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) := Submodule.map_equiv_eq_comap_symm (reverseEquiv : _ ≃ₗ[R] _) _ @[simp] theorem ι_range_map_reverse : (LinearMap.range (ι Q)).map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = LinearMap.range (ι Q) := by rw [reverse, reverseOp, Submodule.map_comp, ι_range_map_lift, LinearMap.range_comp, ← Submodule.map_comp] exact Submodule.map_id _ @[simp] theorem ι_range_comap_reverse : (LinearMap.range (ι Q)).comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = LinearMap.range (ι Q) := by rw [← submodule_map_reverse_eq_comap, ι_range_map_reverse] /-- Like `Submodule.map_mul`, but with the multiplication reversed. -/ theorem submodule_map_mul_reverse (p q : Submodule R (CliffordAlgebra Q)) : (p * q).map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = q.map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) * p.map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) := by simp_rw [reverse, Submodule.map_comp, Submodule.map_mul, Submodule.map_unop_mul] theorem submodule_comap_mul_reverse (p q : Submodule R (CliffordAlgebra Q)) : (p * q).comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = q.comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) * p.comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) := by simp_rw [← submodule_map_reverse_eq_comap, submodule_map_mul_reverse] /-- Like `Submodule.map_pow` -/ theorem submodule_map_pow_reverse (p : Submodule R (CliffordAlgebra Q)) (n : ℕ) : (p ^ n).map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = p.map (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) ^ n := by simp_rw [reverse, Submodule.map_comp, Submodule.map_pow, Submodule.map_unop_pow] theorem submodule_comap_pow_reverse (p : Submodule R (CliffordAlgebra Q)) (n : ℕ) : (p ^ n).comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) = p.comap (reverse : CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q) ^ n := by	simp_rw [← submodule_map_reverse_eq_comap, submodule_map_pow_reverse] @[simp] theorem evenOdd_map_reverse (n : ZMod 2) :	Mathlib/LinearAlgebra/CliffordAlgebra/Conjugation.lean	267	270
/- Copyright (c) 2021 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Data.Finset.Lattice.Fold import Mathlib.Data.Set.Pairwise.List /-! # Relations holding pairwise on finite sets In this file we prove a few results about the interaction of `Set.PairwiseDisjoint` and `Finset`, as well as the interaction of `List.Pairwise Disjoint` and the condition of `Disjoint` on `List.toFinset`, in `Set` form. -/ open Finset variable {α ι ι' : Type*} instance [DecidableEq α] {r : α → α → Prop} [DecidableRel r] {s : Finset α} : Decidable ((s : Set α).Pairwise r) := decidable_of_iff' (∀ a ∈ s, ∀ b ∈ s, a ≠ b → r a b) Iff.rfl theorem Finset.pairwiseDisjoint_range_singleton : (Set.range (singleton : α → Finset α)).PairwiseDisjoint id := by rintro _ ⟨a, rfl⟩ _ ⟨b, rfl⟩ h exact disjoint_singleton.2 (ne_of_apply_ne _ h) namespace Set theorem PairwiseDisjoint.elim_finset {s : Set ι} {f : ι → Finset α} (hs : s.PairwiseDisjoint f) {i j : ι} (hi : i ∈ s) (hj : j ∈ s) (a : α) (hai : a ∈ f i) (haj : a ∈ f j) : i = j := hs.elim hi hj (Finset.not_disjoint_iff.2 ⟨a, hai, haj⟩) section SemilatticeInf variable [SemilatticeInf α] [OrderBot α] {s : Finset ι} {f : ι → α} theorem PairwiseDisjoint.image_finset_of_le [DecidableEq ι] {s : Finset ι} {f : ι → α} (hs : (s : Set ι).PairwiseDisjoint f) {g : ι → ι} (hf : ∀ a, f (g a) ≤ f a) : (s.image g : Set ι).PairwiseDisjoint f := by rw [coe_image] exact hs.image_of_le hf theorem PairwiseDisjoint.attach (hs : (s : Set ι).PairwiseDisjoint f) : (s.attach : Set { x // x ∈ s }).PairwiseDisjoint (f ∘ Subtype.val) := fun i _ j _ hij => hs i.2 j.2 <\| mt Subtype.ext_val hij end SemilatticeInf variable [Lattice α] [OrderBot α] /-- Bind operation for `Set.PairwiseDisjoint`. In a complete lattice, you can use `Set.PairwiseDisjoint.biUnion`. -/ theorem PairwiseDisjoint.biUnion_finset {s : Set ι'} {g : ι' → Finset ι} {f : ι → α} (hs : s.PairwiseDisjoint fun i' : ι' => (g i').sup f) (hg : ∀ i ∈ s, (g i : Set ι).PairwiseDisjoint f) : (⋃ i ∈ s, ↑(g i)).PairwiseDisjoint f := by rintro a ha b hb hab simp_rw [Set.mem_iUnion] at ha hb	obtain ⟨c, hc, ha⟩ := ha obtain ⟨d, hd, hb⟩ := hb obtain hcd \| hcd := eq_or_ne (g c) (g d) · exact hg d hd (by rwa [hcd] at ha) hb hab · exact (hs hc hd (ne_of_apply_ne _ hcd)).mono (Finset.le_sup ha) (Finset.le_sup hb) end Set namespace List	Mathlib/Data/Finset/Pairwise.lean	62	71
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Kim Morrison -/ import Mathlib.Algebra.BigOperators.Finsupp.Basic import Mathlib.Algebra.BigOperators.Group.Finset.Preimage import Mathlib.Algebra.Module.Defs import Mathlib.Data.Rat.BigOperators /-! # Miscellaneous definitions, lemmas, and constructions using finsupp ## Main declarations * `Finsupp.graph`: the finset of input and output pairs with non-zero outputs. * `Finsupp.mapRange.equiv`: `Finsupp.mapRange` as an equiv. * `Finsupp.mapDomain`: maps the domain of a `Finsupp` by a function and by summing. * `Finsupp.comapDomain`: postcomposition of a `Finsupp` with a function injective on the preimage of its support. * `Finsupp.some`: restrict a finitely supported function on `Option α` to a finitely supported function on `α`. * `Finsupp.filter`: `filter p f` is the finitely supported function that is `f a` if `p a` is true and 0 otherwise. * `Finsupp.frange`: the image of a finitely supported function on its support. * `Finsupp.subtype_domain`: the restriction of a finitely supported function `f` to a subtype. ## Implementation notes This file is a `noncomputable theory` and uses classical logic throughout. ## TODO * This file is currently ~1600 lines long and is quite a miscellany of definitions and lemmas, so it should be divided into smaller pieces. * Expand the list of definitions and important lemmas to the module docstring. -/ noncomputable section open Finset Function variable {α β γ ι M M' N P G H R S : Type} namespace Finsupp /-! ### Declarations about `graph` -/ section Graph variable [Zero M] /-- The graph of a finitely supported function over its support, i.e. the finset of input and output pairs with non-zero outputs. -/ def graph (f : α →₀ M) : Finset (α × M) := f.support.map ⟨fun a => Prod.mk a (f a), fun _ _ h => (Prod.mk.inj h).1⟩ theorem mk_mem_graph_iff {a : α} {m : M} {f : α →₀ M} : (a, m) ∈ f.graph ↔ f a = m ∧ m ≠ 0 := by simp_rw [graph, mem_map, mem_support_iff] constructor · rintro ⟨b, ha, rfl, -⟩ exact ⟨rfl, ha⟩ · rintro ⟨rfl, ha⟩ exact ⟨a, ha, rfl⟩ @[simp] theorem mem_graph_iff {c : α × M} {f : α →₀ M} : c ∈ f.graph ↔ f c.1 = c.2 ∧ c.2 ≠ 0 := by cases c exact mk_mem_graph_iff theorem mk_mem_graph (f : α →₀ M) {a : α} (ha : a ∈ f.support) : (a, f a) ∈ f.graph := mk_mem_graph_iff.2 ⟨rfl, mem_support_iff.1 ha⟩ theorem apply_eq_of_mem_graph {a : α} {m : M} {f : α →₀ M} (h : (a, m) ∈ f.graph) : f a = m := (mem_graph_iff.1 h).1 @[simp 1100] -- Higher priority shortcut instance for `mem_graph_iff`. theorem not_mem_graph_snd_zero (a : α) (f : α →₀ M) : (a, (0 : M)) ∉ f.graph := fun h => (mem_graph_iff.1 h).2.irrefl @[simp] theorem image_fst_graph [DecidableEq α] (f : α →₀ M) : f.graph.image Prod.fst = f.support := by classical simp only [graph, map_eq_image, image_image, Embedding.coeFn_mk, Function.comp_def, image_id'] theorem graph_injective (α M) [Zero M] : Injective (@graph α M _) := by intro f g h classical have hsup : f.support = g.support := by rw [← image_fst_graph, h, image_fst_graph] refine ext_iff'.2 ⟨hsup, fun x hx => apply_eq_of_mem_graph <\| h.symm ▸ ?_⟩ exact mk_mem_graph _ (hsup ▸ hx) @[simp] theorem graph_inj {f g : α →₀ M} : f.graph = g.graph ↔ f = g := (graph_injective α M).eq_iff @[simp] theorem graph_zero : graph (0 : α →₀ M) = ∅ := by simp [graph] @[simp] theorem graph_eq_empty {f : α →₀ M} : f.graph = ∅ ↔ f = 0 := (graph_injective α M).eq_iff' graph_zero end Graph end Finsupp /-! ### Declarations about `mapRange` -/ section MapRange namespace Finsupp section Equiv variable [Zero M] [Zero N] [Zero P] /-- `Finsupp.mapRange` as an equiv. -/ @[simps apply] def mapRange.equiv (f : M ≃ N) (hf : f 0 = 0) (hf' : f.symm 0 = 0) : (α →₀ M) ≃ (α →₀ N) where toFun := (mapRange f hf : (α →₀ M) → α →₀ N) invFun := (mapRange f.symm hf' : (α →₀ N) → α →₀ M) left_inv x := by rw [← mapRange_comp _ _ _ _] <;> simp_rw [Equiv.symm_comp_self] · exact mapRange_id _ · rfl right_inv x := by rw [← mapRange_comp _ _ _ _] <;> simp_rw [Equiv.self_comp_symm] · exact mapRange_id _ · rfl @[simp] theorem mapRange.equiv_refl : mapRange.equiv (Equiv.refl M) rfl rfl = Equiv.refl (α →₀ M) := Equiv.ext mapRange_id theorem mapRange.equiv_trans (f : M ≃ N) (hf : f 0 = 0) (hf') (f₂ : N ≃ P) (hf₂ : f₂ 0 = 0) (hf₂') : (mapRange.equiv (f.trans f₂) (by rw [Equiv.trans_apply, hf, hf₂]) (by rw [Equiv.symm_trans_apply, hf₂', hf']) : (α →₀ _) ≃ _) = (mapRange.equiv f hf hf').trans (mapRange.equiv f₂ hf₂ hf₂') := Equiv.ext <\| mapRange_comp f₂ hf₂ f hf ((congrArg f₂ hf).trans hf₂) @[simp] theorem mapRange.equiv_symm (f : M ≃ N) (hf hf') : ((mapRange.equiv f hf hf').symm : (α →₀ _) ≃ _) = mapRange.equiv f.symm hf' hf := Equiv.ext fun _ => rfl end Equiv section ZeroHom variable [Zero M] [Zero N] [Zero P] /-- Composition with a fixed zero-preserving homomorphism is itself a zero-preserving homomorphism on functions. -/ @[simps] def mapRange.zeroHom (f : ZeroHom M N) : ZeroHom (α →₀ M) (α →₀ N) where toFun := (mapRange f f.map_zero : (α →₀ M) → α →₀ N) map_zero' := mapRange_zero @[simp] theorem mapRange.zeroHom_id : mapRange.zeroHom (ZeroHom.id M) = ZeroHom.id (α →₀ M) := ZeroHom.ext mapRange_id theorem mapRange.zeroHom_comp (f : ZeroHom N P) (f₂ : ZeroHom M N) : (mapRange.zeroHom (f.comp f₂) : ZeroHom (α →₀ _) _) = (mapRange.zeroHom f).comp (mapRange.zeroHom f₂) := ZeroHom.ext <\| mapRange_comp f (map_zero f) f₂ (map_zero f₂) (by simp only [comp_apply, map_zero]) end ZeroHom section AddMonoidHom variable [AddCommMonoid M] [AddCommMonoid N] [AddCommMonoid P] variable {F : Type} [FunLike F M N] [AddMonoidHomClass F M N] /-- Composition with a fixed additive homomorphism is itself an additive homomorphism on functions. -/ @[simps] def mapRange.addMonoidHom (f : M →+ N) : (α →₀ M) →+ α →₀ N where toFun := (mapRange f f.map_zero : (α →₀ M) → α →₀ N) map_zero' := mapRange_zero -- Porting note: need either `dsimp only` or to specify `hf`: -- see also: https://github.com/leanprover-community/mathlib4/issues/12129 map_add' := mapRange_add (hf := f.map_zero) f.map_add @[simp] theorem mapRange.addMonoidHom_id : mapRange.addMonoidHom (AddMonoidHom.id M) = AddMonoidHom.id (α →₀ M) := AddMonoidHom.ext mapRange_id theorem mapRange.addMonoidHom_comp (f : N →+ P) (f₂ : M →+ N) : (mapRange.addMonoidHom (f.comp f₂) : (α →₀ _) →+ _) = (mapRange.addMonoidHom f).comp (mapRange.addMonoidHom f₂) := AddMonoidHom.ext <\| mapRange_comp f (map_zero f) f₂ (map_zero f₂) (by simp only [comp_apply, map_zero]) @[simp] theorem mapRange.addMonoidHom_toZeroHom (f : M →+ N) : (mapRange.addMonoidHom f).toZeroHom = (mapRange.zeroHom f.toZeroHom : ZeroHom (α →₀ _) _) := ZeroHom.ext fun _ => rfl theorem mapRange_multiset_sum (f : F) (m : Multiset (α →₀ M)) : mapRange f (map_zero f) m.sum = (m.map fun x => mapRange f (map_zero f) x).sum := (mapRange.addMonoidHom (f : M →+ N) : (α →₀ _) →+ _).map_multiset_sum _ theorem mapRange_finset_sum (f : F) (s : Finset ι) (g : ι → α →₀ M) : mapRange f (map_zero f) (∑ x ∈ s, g x) = ∑ x ∈ s, mapRange f (map_zero f) (g x) := map_sum (mapRange.addMonoidHom (f : M →+ N)) _ _ /-- `Finsupp.mapRange.AddMonoidHom` as an equiv. -/ @[simps apply] def mapRange.addEquiv (f : M ≃+ N) : (α →₀ M) ≃+ (α →₀ N) := { mapRange.addMonoidHom f.toAddMonoidHom with toFun := (mapRange f f.map_zero : (α →₀ M) → α →₀ N) invFun := (mapRange f.symm f.symm.map_zero : (α →₀ N) → α →₀ M) left_inv := fun x => by rw [← mapRange_comp _ _ _ _] <;> simp_rw [AddEquiv.symm_comp_self] · exact mapRange_id _ · rfl right_inv := fun x => by rw [← mapRange_comp _ _ _ _] <;> simp_rw [AddEquiv.self_comp_symm] · exact mapRange_id _ · rfl } @[simp] theorem mapRange.addEquiv_refl : mapRange.addEquiv (AddEquiv.refl M) = AddEquiv.refl (α →₀ M) := AddEquiv.ext mapRange_id theorem mapRange.addEquiv_trans (f : M ≃+ N) (f₂ : N ≃+ P) : (mapRange.addEquiv (f.trans f₂) : (α →₀ M) ≃+ (α →₀ P)) = (mapRange.addEquiv f).trans (mapRange.addEquiv f₂) := AddEquiv.ext (mapRange_comp _ f₂.map_zero _ f.map_zero (by simp)) @[simp] theorem mapRange.addEquiv_symm (f : M ≃+ N) : ((mapRange.addEquiv f).symm : (α →₀ _) ≃+ _) = mapRange.addEquiv f.symm := AddEquiv.ext fun _ => rfl @[simp] theorem mapRange.addEquiv_toAddMonoidHom (f : M ≃+ N) : ((mapRange.addEquiv f : (α →₀ _) ≃+ _) : _ →+ _) = (mapRange.addMonoidHom f.toAddMonoidHom : (α →₀ _) →+ _) := AddMonoidHom.ext fun _ => rfl @[simp] theorem mapRange.addEquiv_toEquiv (f : M ≃+ N) : ↑(mapRange.addEquiv f : (α →₀ _) ≃+ _) = (mapRange.equiv (f : M ≃ N) f.map_zero f.symm.map_zero : (α →₀ _) ≃ _) := Equiv.ext fun _ => rfl end AddMonoidHom end Finsupp end MapRange /-! ### Declarations about `equivCongrLeft` -/ section EquivCongrLeft variable [Zero M] namespace Finsupp /-- Given `f : α ≃ β`, we can map `l : α →₀ M` to `equivMapDomain f l : β →₀ M` (computably) by mapping the support forwards and the function backwards. -/ def equivMapDomain (f : α ≃ β) (l : α →₀ M) : β →₀ M where support := l.support.map f.toEmbedding toFun a := l (f.symm a) mem_support_toFun a := by simp only [Finset.mem_map_equiv, mem_support_toFun]; rfl @[simp] theorem equivMapDomain_apply (f : α ≃ β) (l : α →₀ M) (b : β) : equivMapDomain f l b = l (f.symm b) := rfl theorem equivMapDomain_symm_apply (f : α ≃ β) (l : β →₀ M) (a : α) : equivMapDomain f.symm l a = l (f a) := rfl @[simp] theorem equivMapDomain_refl (l : α →₀ M) : equivMapDomain (Equiv.refl _) l = l := by ext x; rfl theorem equivMapDomain_refl' : equivMapDomain (Equiv.refl _) = @id (α →₀ M) := by ext x; rfl theorem equivMapDomain_trans (f : α ≃ β) (g : β ≃ γ) (l : α →₀ M) : equivMapDomain (f.trans g) l = equivMapDomain g (equivMapDomain f l) := by ext x; rfl theorem equivMapDomain_trans' (f : α ≃ β) (g : β ≃ γ) : @equivMapDomain _ _ M _ (f.trans g) = equivMapDomain g ∘ equivMapDomain f := by ext x; rfl @[simp] theorem equivMapDomain_single (f : α ≃ β) (a : α) (b : M) : equivMapDomain f (single a b) = single (f a) b := by classical ext x simp only [single_apply, Equiv.apply_eq_iff_eq_symm_apply, equivMapDomain_apply] @[simp] theorem equivMapDomain_zero {f : α ≃ β} : equivMapDomain f (0 : α →₀ M) = (0 : β →₀ M) := by ext; simp only [equivMapDomain_apply, coe_zero, Pi.zero_apply] @[to_additive (attr := simp)] theorem prod_equivMapDomain [CommMonoid N] (f : α ≃ β) (l : α →₀ M) (g : β → M → N) : prod (equivMapDomain f l) g = prod l (fun a m => g (f a) m) := by simp [prod, equivMapDomain] /-- Given `f : α ≃ β`, the finitely supported function spaces are also in bijection: `(α →₀ M) ≃ (β →₀ M)`. This is the finitely-supported version of `Equiv.piCongrLeft`. -/ def equivCongrLeft (f : α ≃ β) : (α →₀ M) ≃ (β →₀ M) := by refine ⟨equivMapDomain f, equivMapDomain f.symm, fun f => ?_, fun f => ?_⟩ <;> ext x <;> simp only [equivMapDomain_apply, Equiv.symm_symm, Equiv.symm_apply_apply, Equiv.apply_symm_apply] @[simp] theorem equivCongrLeft_apply (f : α ≃ β) (l : α →₀ M) : equivCongrLeft f l = equivMapDomain f l := rfl @[simp] theorem equivCongrLeft_symm (f : α ≃ β) : (@equivCongrLeft _ _ M _ f).symm = equivCongrLeft f.symm := rfl end Finsupp end EquivCongrLeft section CastFinsupp variable [Zero M] (f : α →₀ M) namespace Nat @[simp, norm_cast] theorem cast_finsuppProd [CommSemiring R] (g : α → M → ℕ) : (↑(f.prod g) : R) = f.prod fun a b => ↑(g a b) := Nat.cast_prod _ _ @[deprecated (since := "2025-04-06")] alias cast_finsupp_prod := cast_finsuppProd @[simp, norm_cast] theorem cast_finsupp_sum [AddCommMonoidWithOne R] (g : α → M → ℕ) : (↑(f.sum g) : R) = f.sum fun a b => ↑(g a b) := Nat.cast_sum _ _ end Nat namespace Int @[simp, norm_cast] theorem cast_finsuppProd [CommRing R] (g : α → M → ℤ) : (↑(f.prod g) : R) = f.prod fun a b => ↑(g a b) := Int.cast_prod _ _ @[deprecated (since := "2025-04-06")] alias cast_finsupp_prod := cast_finsuppProd @[simp, norm_cast] theorem cast_finsupp_sum [AddCommGroupWithOne R] (g : α → M → ℤ) : (↑(f.sum g) : R) = f.sum fun a b => ↑(g a b) := Int.cast_sum _ _ end Int namespace Rat @[simp, norm_cast] theorem cast_finsupp_sum [DivisionRing R] [CharZero R] (g : α → M → ℚ) : (↑(f.sum g) : R) = f.sum fun a b => ↑(g a b) := cast_sum _ _ @[simp, norm_cast] theorem cast_finsuppProd [Field R] [CharZero R] (g : α → M → ℚ) : (↑(f.prod g) : R) = f.prod fun a b => ↑(g a b) := cast_prod _ _ @[deprecated (since := "2025-04-06")] alias cast_finsupp_prod := cast_finsuppProd end Rat end CastFinsupp /-! ### Declarations about `mapDomain` -/ namespace Finsupp section MapDomain variable [AddCommMonoid M] {v v₁ v₂ : α →₀ M} /-- Given `f : α → β` and `v : α →₀ M`, `mapDomain f v : β →₀ M` is the finitely supported function whose value at `a : β` is the sum of `v x` over all `x` such that `f x = a`. -/ def mapDomain (f : α → β) (v : α →₀ M) : β →₀ M := v.sum fun a => single (f a) theorem mapDomain_apply {f : α → β} (hf : Function.Injective f) (x : α →₀ M) (a : α) : mapDomain f x (f a) = x a := by rw [mapDomain, sum_apply, sum_eq_single a, single_eq_same] · intro b _ hba exact single_eq_of_ne (hf.ne hba) · intro _ rw [single_zero, coe_zero, Pi.zero_apply] theorem mapDomain_notin_range {f : α → β} (x : α →₀ M) (a : β) (h : a ∉ Set.range f) : mapDomain f x a = 0 := by rw [mapDomain, sum_apply, sum] exact Finset.sum_eq_zero fun a' _ => single_eq_of_ne fun eq => h <\| eq ▸ Set.mem_range_self _ @[simp] theorem mapDomain_id : mapDomain id v = v := sum_single _ theorem mapDomain_comp {f : α → β} {g : β → γ} : mapDomain (g ∘ f) v = mapDomain g (mapDomain f v) := by refine ((sum_sum_index ?_ ?_).trans ?_).symm · intro exact single_zero _ · intro exact single_add _ refine sum_congr fun _ _ => sum_single_index ?_ exact single_zero _ @[simp] theorem mapDomain_single {f : α → β} {a : α} {b : M} : mapDomain f (single a b) = single (f a) b := sum_single_index <\| single_zero _ @[simp] theorem mapDomain_zero {f : α → β} : mapDomain f (0 : α →₀ M) = (0 : β →₀ M) := sum_zero_index theorem mapDomain_congr {f g : α → β} (h : ∀ x ∈ v.support, f x = g x) : v.mapDomain f = v.mapDomain g := Finset.sum_congr rfl fun _ H => by simp only [h _ H] theorem mapDomain_add {f : α → β} : mapDomain f (v₁ + v₂) = mapDomain f v₁ + mapDomain f v₂ := sum_add_index' (fun _ => single_zero _) fun _ => single_add _ @[simp] theorem mapDomain_equiv_apply {f : α ≃ β} (x : α →₀ M) (a : β) : mapDomain f x a = x (f.symm a) := by conv_lhs => rw [← f.apply_symm_apply a] exact mapDomain_apply f.injective _ _ /-- `Finsupp.mapDomain` is an `AddMonoidHom`. -/ @[simps] def mapDomain.addMonoidHom (f : α → β) : (α →₀ M) →+ β →₀ M where toFun := mapDomain f map_zero' := mapDomain_zero map_add' _ _ := mapDomain_add @[simp] theorem mapDomain.addMonoidHom_id : mapDomain.addMonoidHom id = AddMonoidHom.id (α →₀ M) := AddMonoidHom.ext fun _ => mapDomain_id theorem mapDomain.addMonoidHom_comp (f : β → γ) (g : α → β) : (mapDomain.addMonoidHom (f ∘ g) : (α →₀ M) →+ γ →₀ M) = (mapDomain.addMonoidHom f).comp (mapDomain.addMonoidHom g) := AddMonoidHom.ext fun _ => mapDomain_comp theorem mapDomain_finset_sum {f : α → β} {s : Finset ι} {v : ι → α →₀ M} : mapDomain f (∑ i ∈ s, v i) = ∑ i ∈ s, mapDomain f (v i) := map_sum (mapDomain.addMonoidHom f) _ _ theorem mapDomain_sum [Zero N] {f : α → β} {s : α →₀ N} {v : α → N → α →₀ M} : mapDomain f (s.sum v) = s.sum fun a b => mapDomain f (v a b) := map_finsuppSum (mapDomain.addMonoidHom f : (α →₀ M) →+ β →₀ M) _ _ theorem mapDomain_support [DecidableEq β] {f : α → β} {s : α →₀ M} : (s.mapDomain f).support ⊆ s.support.image f := Finset.Subset.trans support_sum <\| Finset.Subset.trans (Finset.biUnion_mono fun _ _ => support_single_subset) <\| by rw [Finset.biUnion_singleton] theorem mapDomain_apply' (S : Set α) {f : α → β} (x : α →₀ M) (hS : (x.support : Set α) ⊆ S) (hf : Set.InjOn f S) {a : α} (ha : a ∈ S) : mapDomain f x (f a) = x a := by classical rw [mapDomain, sum_apply, sum] simp_rw [single_apply] by_cases hax : a ∈ x.support · rw [← Finset.add_sum_erase _ _ hax, if_pos rfl] convert add_zero (x a) refine Finset.sum_eq_zero fun i hi => if_neg ?_ exact (hf.mono hS).ne (Finset.mem_of_mem_erase hi) hax (Finset.ne_of_mem_erase hi) · rw [not_mem_support_iff.1 hax] refine Finset.sum_eq_zero fun i hi => if_neg ?_ exact hf.ne (hS hi) ha (ne_of_mem_of_not_mem hi hax) theorem mapDomain_support_of_injOn [DecidableEq β] {f : α → β} (s : α →₀ M) (hf : Set.InjOn f s.support) : (mapDomain f s).support = Finset.image f s.support := Finset.Subset.antisymm mapDomain_support <\| by intro x hx simp only [mem_image, exists_prop, mem_support_iff, Ne] at hx rcases hx with ⟨hx_w, hx_h_left, rfl⟩ simp only [mem_support_iff, Ne] rw [mapDomain_apply' (↑s.support : Set _) _ _ hf] · exact hx_h_left · simp only [mem_coe, mem_support_iff, Ne] exact hx_h_left · exact Subset.refl _ theorem mapDomain_support_of_injective [DecidableEq β] {f : α → β} (hf : Function.Injective f) (s : α →₀ M) : (mapDomain f s).support = Finset.image f s.support := mapDomain_support_of_injOn s hf.injOn @[to_additive] theorem prod_mapDomain_index [CommMonoid N] {f : α → β} {s : α →₀ M} {h : β → M → N} (h_zero : ∀ b, h b 0 = 1) (h_add : ∀ b m₁ m₂, h b (m₁ + m₂) = h b m₁ * h b m₂) : (mapDomain f s).prod h = s.prod fun a m => h (f a) m := (prod_sum_index h_zero h_add).trans <\| prod_congr fun _ _ => prod_single_index (h_zero _) -- Note that in `prod_mapDomain_index`, `M` is still an additive monoid, -- so there is no analogous version in terms of `MonoidHom`. /-- A version of `sum_mapDomain_index` that takes a bundled `AddMonoidHom`, rather than separate linearity hypotheses. -/ @[simp] theorem sum_mapDomain_index_addMonoidHom [AddCommMonoid N] {f : α → β} {s : α →₀ M} (h : β → M →+ N) : ((mapDomain f s).sum fun b m => h b m) = s.sum fun a m => h (f a) m := sum_mapDomain_index (fun b => (h b).map_zero) (fun b _ _ => (h b).map_add _ _) theorem embDomain_eq_mapDomain (f : α ↪ β) (v : α →₀ M) : embDomain f v = mapDomain f v := by ext a by_cases h : a ∈ Set.range f · rcases h with ⟨a, rfl⟩ rw [mapDomain_apply f.injective, embDomain_apply] · rw [mapDomain_notin_range, embDomain_notin_range] <;> assumption @[to_additive] theorem prod_mapDomain_index_inj [CommMonoid N] {f : α → β} {s : α →₀ M} {h : β → M → N} (hf : Function.Injective f) : (s.mapDomain f).prod h = s.prod fun a b => h (f a) b := by rw [← Function.Embedding.coeFn_mk f hf, ← embDomain_eq_mapDomain, prod_embDomain] theorem mapDomain_injective {f : α → β} (hf : Function.Injective f) : Function.Injective (mapDomain f : (α →₀ M) → β →₀ M) := by intro v₁ v₂ eq ext a have : mapDomain f v₁ (f a) = mapDomain f v₂ (f a) := by rw [eq] rwa [mapDomain_apply hf, mapDomain_apply hf] at this /-- When `f` is an embedding we have an embedding `(α →₀ ℕ) ↪ (β →₀ ℕ)` given by `mapDomain`. -/ @[simps] def mapDomainEmbedding {α β : Type} (f : α ↪ β) : (α →₀ ℕ) ↪ β →₀ ℕ := ⟨Finsupp.mapDomain f, Finsupp.mapDomain_injective f.injective⟩ theorem mapDomain.addMonoidHom_comp_mapRange [AddCommMonoid N] (f : α → β) (g : M →+ N) : (mapDomain.addMonoidHom f).comp (mapRange.addMonoidHom g) = (mapRange.addMonoidHom g).comp (mapDomain.addMonoidHom f) := by ext simp only [AddMonoidHom.coe_comp, Finsupp.mapRange_single, Finsupp.mapDomain.addMonoidHom_apply, Finsupp.singleAddHom_apply, eq_self_iff_true, Function.comp_apply, Finsupp.mapDomain_single, Finsupp.mapRange.addMonoidHom_apply] /-- When `g` preserves addition, `mapRange` and `mapDomain` commute. -/ theorem mapDomain_mapRange [AddCommMonoid N] (f : α → β) (v : α →₀ M) (g : M → N) (h0 : g 0 = 0) (hadd : ∀ x y, g (x + y) = g x + g y) : mapDomain f (mapRange g h0 v) = mapRange g h0 (mapDomain f v) := let g' : M →+ N := { toFun := g map_zero' := h0 map_add' := hadd } DFunLike.congr_fun (mapDomain.addMonoidHom_comp_mapRange f g') v theorem sum_update_add [AddZeroClass α] [AddCommMonoid β] (f : ι →₀ α) (i : ι) (a : α) (g : ι → α → β) (hg : ∀ i, g i 0 = 0) (hgg : ∀ (j : ι) (a₁ a₂ : α), g j (a₁ + a₂) = g j a₁ + g j a₂) : (f.update i a).sum g + g i (f i) = f.sum g + g i a := by rw [update_eq_erase_add_single, sum_add_index' hg hgg] conv_rhs => rw [← Finsupp.update_self f i] rw [update_eq_erase_add_single, sum_add_index' hg hgg, add_assoc, add_assoc] congr 1 rw [add_comm, sum_single_index (hg _), sum_single_index (hg _)] theorem mapDomain_injOn (S : Set α) {f : α → β} (hf : Set.InjOn f S) : Set.InjOn (mapDomain f : (α →₀ M) → β →₀ M) { w \| (w.support : Set α) ⊆ S } := by intro v₁ hv₁ v₂ hv₂ eq ext a classical by_cases h : a ∈ v₁.support ∪ v₂.support · rw [← mapDomain_apply' S _ hv₁ hf _, ← mapDomain_apply' S _ hv₂ hf _, eq] <;> · apply Set.union_subset hv₁ hv₂ exact mod_cast h · simp only [not_or, mem_union, not_not, mem_support_iff] at h simp [h] theorem equivMapDomain_eq_mapDomain {M} [AddCommMonoid M] (f : α ≃ β) (l : α →₀ M) : equivMapDomain f l = mapDomain f l := by ext x; simp [mapDomain_equiv_apply] end MapDomain /-! ### Declarations about `comapDomain` -/ section ComapDomain /-- Given `f : α → β`, `l : β →₀ M` and a proof `hf` that `f` is injective on the preimage of `l.support`, `comapDomain f l hf` is the finitely supported function from `α` to `M` given by composing `l` with `f`. -/ @[simps support] def comapDomain [Zero M] (f : α → β) (l : β →₀ M) (hf : Set.InjOn f (f ⁻¹' ↑l.support)) : α →₀ M where support := l.support.preimage f hf toFun a := l (f a) mem_support_toFun := by intro a simp only [Finset.mem_def.symm, Finset.mem_preimage] exact l.mem_support_toFun (f a) @[simp] theorem comapDomain_apply [Zero M] (f : α → β) (l : β →₀ M) (hf : Set.InjOn f (f ⁻¹' ↑l.support)) (a : α) : comapDomain f l hf a = l (f a) := rfl theorem sum_comapDomain [Zero M] [AddCommMonoid N] (f : α → β) (l : β →₀ M) (g : β → M → N) (hf : Set.BijOn f (f ⁻¹' ↑l.support) ↑l.support) : (comapDomain f l hf.injOn).sum (g ∘ f) = l.sum g := by simp only [sum, comapDomain_apply, (· ∘ ·), comapDomain] exact Finset.sum_preimage_of_bij f _ hf fun x => g x (l x) theorem eq_zero_of_comapDomain_eq_zero [Zero M] (f : α → β) (l : β →₀ M) (hf : Set.BijOn f (f ⁻¹' ↑l.support) ↑l.support) : comapDomain f l hf.injOn = 0 → l = 0 := by rw [← support_eq_empty, ← support_eq_empty, comapDomain] simp only [Finset.ext_iff, Finset.not_mem_empty, iff_false, mem_preimage] intro h a ha obtain ⟨b, hb⟩ := hf.2.2 ha exact h b (hb.2.symm ▸ ha) section FInjective section Zero variable [Zero M] lemma embDomain_comapDomain {f : α ↪ β} {g : β →₀ M} (hg : ↑g.support ⊆ Set.range f) : embDomain f (comapDomain f g f.injective.injOn) = g := by ext b by_cases hb : b ∈ Set.range f · obtain ⟨a, rfl⟩ := hb rw [embDomain_apply, comapDomain_apply] · replace hg : g b = 0 := not_mem_support_iff.mp <\| mt (hg ·) hb rw [embDomain_notin_range _ _ _ hb, hg] /-- Note the `hif` argument is needed for this to work in `rw`. -/ @[simp] theorem comapDomain_zero (f : α → β) (hif : Set.InjOn f (f ⁻¹' ↑(0 : β →₀ M).support) := Finset.coe_empty ▸ (Set.injOn_empty f)) : comapDomain f (0 : β →₀ M) hif = (0 : α →₀ M) := by ext rfl @[simp] theorem comapDomain_single (f : α → β) (a : α) (m : M) (hif : Set.InjOn f (f ⁻¹' (single (f a) m).support)) : comapDomain f (Finsupp.single (f a) m) hif = Finsupp.single a m := by rcases eq_or_ne m 0 with (rfl \| hm) · simp only [single_zero, comapDomain_zero] · rw [eq_single_iff, comapDomain_apply, comapDomain_support, ← Finset.coe_subset, coe_preimage, support_single_ne_zero _ hm, coe_singleton, coe_singleton, single_eq_same] rw [support_single_ne_zero _ hm, coe_singleton] at hif exact ⟨fun x hx => hif hx rfl hx, rfl⟩ end Zero section AddZeroClass variable [AddZeroClass M] {f : α → β} theorem comapDomain_add (v₁ v₂ : β →₀ M) (hv₁ : Set.InjOn f (f ⁻¹' ↑v₁.support)) (hv₂ : Set.InjOn f (f ⁻¹' ↑v₂.support)) (hv₁₂ : Set.InjOn f (f ⁻¹' ↑(v₁ + v₂).support)) : comapDomain f (v₁ + v₂) hv₁₂ = comapDomain f v₁ hv₁ + comapDomain f v₂ hv₂ := by ext simp only [comapDomain_apply, coe_add, Pi.add_apply] /-- A version of `Finsupp.comapDomain_add` that's easier to use. -/ theorem comapDomain_add_of_injective (hf : Function.Injective f) (v₁ v₂ : β →₀ M) : comapDomain f (v₁ + v₂) hf.injOn = comapDomain f v₁ hf.injOn + comapDomain f v₂ hf.injOn := comapDomain_add _ _ _ _ _ /-- `Finsupp.comapDomain` is an `AddMonoidHom`. -/ @[simps] def comapDomain.addMonoidHom (hf : Function.Injective f) : (β →₀ M) →+ α →₀ M where toFun x := comapDomain f x hf.injOn map_zero' := comapDomain_zero f map_add' := comapDomain_add_of_injective hf end AddZeroClass variable [AddCommMonoid M] (f : α → β) theorem mapDomain_comapDomain (hf : Function.Injective f) (l : β →₀ M) (hl : ↑l.support ⊆ Set.range f) : mapDomain f (comapDomain f l hf.injOn) = l := by conv_rhs => rw [← embDomain_comapDomain (f := ⟨f, hf⟩) hl (M := M), embDomain_eq_mapDomain] rfl end FInjective end ComapDomain /-! ### Declarations about finitely supported functions whose support is an `Option` type -/ section Option /-- Restrict a finitely supported function on `Option α` to a finitely supported function on `α`. -/ def some [Zero M] (f : Option α →₀ M) : α →₀ M := f.comapDomain Option.some fun _ => by simp @[simp] theorem some_apply [Zero M] (f : Option α →₀ M) (a : α) : f.some a = f (Option.some a) := rfl @[simp] theorem some_zero [Zero M] : (0 : Option α →₀ M).some = 0 := by ext simp @[simp] theorem some_add [AddZeroClass M] (f g : Option α →₀ M) : (f + g).some = f.some + g.some := by ext simp @[simp] theorem some_single_none [Zero M] (m : M) : (single none m : Option α →₀ M).some = 0 := by ext simp @[simp] theorem some_single_some [Zero M] (a : α) (m : M) : (single (Option.some a) m : Option α →₀ M).some = single a m := by classical ext b simp [single_apply] @[to_additive] theorem prod_option_index [AddZeroClass M] [CommMonoid N] (f : Option α →₀ M) (b : Option α → M → N) (h_zero : ∀ o, b o 0 = 1) (h_add : ∀ o m₁ m₂, b o (m₁ + m₂) = b o m₁ b o m₂) : f.prod b = b none (f none) * f.some.prod fun a => b (Option.some a) := by classical induction f using induction_linear with \| zero => simp [some_zero, h_zero] \| add f₁ f₂ h₁ h₂ => rw [Finsupp.prod_add_index, h₁, h₂, some_add, Finsupp.prod_add_index] · simp only [h_add, Pi.add_apply, Finsupp.coe_add] rw [mul_mul_mul_comm] all_goals simp [h_zero, h_add] \| single a m => cases a <;> simp [h_zero, h_add] theorem sum_option_index_smul [Semiring R] [AddCommMonoid M] [Module R M] (f : Option α →₀ R) (b : Option α → M) : (f.sum fun o r => r • b o) = f none • b none + f.some.sum fun a r => r • b (Option.some a) := f.sum_option_index _ (fun _ => zero_smul _ _) fun _ _ _ => add_smul _ _ _ theorem eq_option_embedding_update_none_iff [Zero M] {n : Option α →₀ M} {m : α →₀ M} {i : M} : (n = (embDomain Embedding.some m).update none i) ↔ n none = i ∧ n.some = m := by classical rw [Finsupp.ext_iff, Option.forall, Finsupp.ext_iff] apply and_congr · simp · apply forall_congr' intro simp only [coe_update, ne_eq, reduceCtorEq, not_false_eq_true, update_of_ne, some_apply] rw [← Embedding.some_apply, embDomain_apply, Embedding.some_apply] @[simp] lemma some_embDomain_some [Zero M] (f : α →₀ M) : (f.embDomain .some).some = f := by ext; rw [some_apply]; exact embDomain_apply _ _ _ @[simp] lemma embDomain_some_none [Zero M] (f : α →₀ M) : f.embDomain .some .none = 0 := embDomain_notin_range _ _ _ (by simp) end Option /-! ### Declarations about `Finsupp.filter` -/ section Filter section Zero variable [Zero M] (p : α → Prop) [DecidablePred p] (f : α →₀ M) /-- `Finsupp.filter p f` is the finitely supported function that is `f a` if `p a` is true and `0` otherwise. -/ def filter (p : α → Prop) [DecidablePred p] (f : α →₀ M) : α →₀ M where toFun a := if p a then f a else 0 support := f.support.filter p mem_support_toFun a := by split_ifs with h <;> · simp only [h, mem_filter, mem_support_iff] tauto theorem filter_apply (a : α) : f.filter p a = if p a then f a else 0 := rfl theorem filter_eq_indicator : ⇑(f.filter p) = Set.indicator { x \| p x } f := by ext simp [filter_apply, Set.indicator_apply] theorem filter_eq_zero_iff : f.filter p = 0 ↔ ∀ x, p x → f x = 0 := by simp only [DFunLike.ext_iff, filter_eq_indicator, zero_apply, Set.indicator_apply_eq_zero, Set.mem_setOf_eq] theorem filter_eq_self_iff : f.filter p = f ↔ ∀ x, f x ≠ 0 → p x := by simp only [DFunLike.ext_iff, filter_eq_indicator, Set.indicator_apply_eq_self, Set.mem_setOf_eq, not_imp_comm] @[simp] theorem filter_apply_pos {a : α} (h : p a) : f.filter p a = f a := if_pos h @[simp] theorem filter_apply_neg {a : α} (h : ¬p a) : f.filter p a = 0 := if_neg h @[simp] theorem support_filter : (f.filter p).support = {x ∈ f.support \| p x} := rfl theorem filter_zero : (0 : α →₀ M).filter p = 0 := by classical rw [← support_eq_empty, support_filter, support_zero, Finset.filter_empty] @[simp] theorem filter_single_of_pos {a : α} {b : M} (h : p a) : (single a b).filter p = single a b := (filter_eq_self_iff _ _).2 fun _ hx => (single_apply_ne_zero.1 hx).1.symm ▸ h @[simp] theorem filter_single_of_neg {a : α} {b : M} (h : ¬p a) : (single a b).filter p = 0 := (filter_eq_zero_iff _ _).2 fun _ hpx => single_apply_eq_zero.2 fun hxa => absurd hpx (hxa.symm ▸ h) @[to_additive] theorem prod_filter_index [CommMonoid N] (g : α → M → N) : (f.filter p).prod g = ∏ x ∈ (f.filter p).support, g x (f x) := by classical refine Finset.prod_congr rfl fun x hx => ?_ rw [support_filter, Finset.mem_filter] at hx rw [filter_apply_pos _ _ hx.2] @[to_additive (attr := simp)] theorem prod_filter_mul_prod_filter_not [CommMonoid N] (g : α → M → N) : (f.filter p).prod g * (f.filter fun a => ¬p a).prod g = f.prod g := by classical simp_rw [prod_filter_index, support_filter, Finset.prod_filter_mul_prod_filter_not, Finsupp.prod] @[to_additive (attr := simp)] theorem prod_div_prod_filter [CommGroup G] (g : α → M → G) : f.prod g / (f.filter p).prod g = (f.filter fun a => ¬p a).prod g := div_eq_of_eq_mul' (prod_filter_mul_prod_filter_not _ _ _).symm end Zero theorem filter_pos_add_filter_neg [AddZeroClass M] (f : α →₀ M) (p : α → Prop) [DecidablePred p] : (f.filter p + f.filter fun a => ¬p a) = f := DFunLike.coe_injective <\| by simp only [coe_add, filter_eq_indicator] exact Set.indicator_self_add_compl { x \| p x } f end Filter /-! ### Declarations about `frange` -/ section Frange variable [Zero M] /-- `frange f` is the image of `f` on the support of `f`. -/ def frange (f : α →₀ M) : Finset M := haveI := Classical.decEq M Finset.image f f.support theorem mem_frange {f : α →₀ M} {y : M} : y ∈ f.frange ↔ y ≠ 0 ∧ ∃ x, f x = y := by rw [frange, @Finset.mem_image _ _ (Classical.decEq _) _ f.support] exact ⟨fun ⟨x, hx1, hx2⟩ => ⟨hx2 ▸ mem_support_iff.1 hx1, x, hx2⟩, fun ⟨hy, x, hx⟩ => ⟨x, mem_support_iff.2 (hx.symm ▸ hy), hx⟩⟩ theorem zero_not_mem_frange {f : α →₀ M} : (0 : M) ∉ f.frange := fun H => (mem_frange.1 H).1 rfl theorem frange_single {x : α} {y : M} : frange (single x y) ⊆ {y} := fun r hr => let ⟨t, ht1, ht2⟩ := mem_frange.1 hr ht2 ▸ by classical rw [single_apply] at ht2 ⊢ split_ifs at ht2 ⊢ · exact Finset.mem_singleton_self _ · exact (t ht2.symm).elim end Frange /-! ### Declarations about `Finsupp.subtypeDomain` -/ section SubtypeDomain section Zero variable [Zero M] {p : α → Prop} /-- `subtypeDomain p f` is the restriction of the finitely supported function `f` to subtype `p`. -/ def subtypeDomain (p : α → Prop) (f : α →₀ M) : Subtype p →₀ M where support := haveI := Classical.decPred p f.support.subtype p toFun := f ∘ Subtype.val mem_support_toFun a := by simp only [@mem_subtype _ _ (Classical.decPred p), mem_support_iff]; rfl @[simp] theorem support_subtypeDomain [D : DecidablePred p] {f : α →₀ M} : (subtypeDomain p f).support = f.support.subtype p := by rw [Subsingleton.elim D] <;> rfl @[simp] theorem subtypeDomain_apply {a : Subtype p} {v : α →₀ M} : (subtypeDomain p v) a = v a.val := rfl @[simp] theorem subtypeDomain_zero : subtypeDomain p (0 : α →₀ M) = 0 := rfl theorem subtypeDomain_eq_iff_forall {f g : α →₀ M} : f.subtypeDomain p = g.subtypeDomain p ↔ ∀ x, p x → f x = g x := by simp_rw [DFunLike.ext_iff, subtypeDomain_apply, Subtype.forall] theorem subtypeDomain_eq_iff {f g : α →₀ M} (hf : ∀ x ∈ f.support, p x) (hg : ∀ x ∈ g.support, p x) : f.subtypeDomain p = g.subtypeDomain p ↔ f = g := subtypeDomain_eq_iff_forall.trans ⟨fun H ↦ Finsupp.ext fun _a ↦ (em _).elim (H _ <\| hf _ ·) fun haf ↦ (em _).elim (H _ <\| hg _ ·) fun hag ↦ (not_mem_support_iff.mp haf).trans (not_mem_support_iff.mp hag).symm, fun H _ _ ↦ congr($H _)⟩ theorem subtypeDomain_eq_zero_iff' {f : α →₀ M} : f.subtypeDomain p = 0 ↔ ∀ x, p x → f x = 0 := subtypeDomain_eq_iff_forall (g := 0) theorem subtypeDomain_eq_zero_iff {f : α →₀ M} (hf : ∀ x ∈ f.support, p x) : f.subtypeDomain p = 0 ↔ f = 0 := subtypeDomain_eq_iff (g := 0) hf (by simp) @[to_additive] theorem prod_subtypeDomain_index [CommMonoid N] {v : α →₀ M} {h : α → M → N} (hp : ∀ x ∈ v.support, p x) : (v.subtypeDomain p).prod (fun a b ↦ h a b) = v.prod h := by refine Finset.prod_bij (fun p _ ↦ p) ?_ ?_ ?_ ?_ <;> aesop end Zero section AddZeroClass	variable [AddZeroClass M] {p : α → Prop} {v v' : α →₀ M} @[simp] theorem subtypeDomain_add {v v' : α →₀ M} :	Mathlib/Data/Finsupp/Basic.lean	956	960
/- Copyright (c) 2023 Jujian Zhang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jujian Zhang, Junyan Xu -/ import Mathlib.Algebra.Category.ModuleCat.Basic import Mathlib.Algebra.Category.Grp.Injective import Mathlib.Topology.Instances.AddCircle import Mathlib.LinearAlgebra.Isomorphisms /-! # Character module of a module For commutative ring `R` and an `R`-module `M` and an injective module `D`, its character module `M⋆` is defined to be `R`-linear maps `M ⟶ D`. `M⋆` also has an `R`-module structure given by `(r • f) m = f (r • m)`. ## Main results - `CharacterModuleFunctor` : the contravariant functor of `R`-modules where `M ↦ M⋆` and an `R`-linear map `l : M ⟶ N` induces an `R`-linear map `l⋆ : f ↦ f ∘ l` where `f : N⋆`. - `LinearMap.dual_surjective_of_injective` : If `l` is injective then `l⋆` is surjective, in another word taking character module as a functor sends monos to epis. - `CharacterModule.homEquiv` : there is a bijection between linear map `Hom(N, M⋆)` and `(N ⊗ M)⋆` given by `curry` and `uncurry`. -/ open CategoryTheory universe uR uA uB variable (R : Type uR) [CommRing R] variable (A : Type uA) [AddCommGroup A] variable (A' : Type) [AddCommGroup A'] variable (B : Type uB) [AddCommGroup B] /-- The character module of an abelian group `A` in the unit rational circle is `A⋆ := Hom_ℤ(A, ℚ ⧸ ℤ)`. -/ def CharacterModule : Type uA := A →+ AddCircle (1 : ℚ) namespace CharacterModule instance : FunLike (CharacterModule A) A (AddCircle (1 : ℚ)) where coe c := c.toFun coe_injective' _ _ _ := by aesop instance : LinearMapClass (CharacterModule A) ℤ A (AddCircle (1 : ℚ)) where map_add _ _ _ := by rw [AddMonoidHom.map_add] map_smulₛₗ _ _ _ := by rw [AddMonoidHom.map_zsmul, RingHom.id_apply] instance : AddCommGroup (CharacterModule A) := inferInstanceAs (AddCommGroup (A →+ _)) @[ext] theorem ext {c c' : CharacterModule A} (h : ∀ x, c x = c' x) : c = c' := DFunLike.ext _ _ h section module variable [Module R A] [Module R A'] [Module R B] instance : Module R (CharacterModule A) := Module.compHom (A →+ _) (RingEquiv.toOpposite _ \|>.toRingHom : R →+ Rᵈᵐᵃ) variable {R A B} @[simp] lemma smul_apply (c : CharacterModule A) (r : R) (a : A) : (r • c) a = c (r • a) := rfl /-- Given an abelian group homomorphism `f : A → B`, `f⋆(L) := L ∘ f` defines a linear map from `B⋆` to `A⋆`. -/ @[simps] def dual (f : A →ₗ[R] B) : CharacterModule B →ₗ[R] CharacterModule A where toFun L := L.comp f.toAddMonoidHom map_add' := by aesop map_smul' r c := by ext x; exact congr(c $(f.map_smul r x)).symm @[simp] lemma dual_zero : dual (0 : A →ₗ[R] B) = 0 := by ext f exact map_zero f lemma dual_comp {C : Type*} [AddCommGroup C] [Module R C] (f : A →ₗ[R] B) (g : B →ₗ[R] C) : dual (g.comp f) = (dual f).comp (dual g) := by ext rfl lemma dual_injective_of_surjective (f : A →ₗ[R] B) (hf : Function.Surjective f) : Function.Injective (dual f) := by intro φ ψ eq ext x obtain ⟨y, rfl⟩ := hf x change (dual f) φ _ = (dual f) ψ _ rw [eq] lemma dual_surjective_of_injective (f : A →ₗ[R] B) (hf : Function.Injective f) : Function.Surjective (dual f) := (Module.Baer.of_divisible _).extension_property_addMonoidHom _ hf /-- Two isomorphic modules have isomorphic character modules. -/ def congr (e : A ≃ₗ[R] B) : CharacterModule A ≃ₗ[R] CharacterModule B := .ofLinear (dual e.symm) (dual e) (by ext c _; exact congr(c $(e.right_inv _))) (by ext c _; exact congr(c $(e.left_inv _))) open TensorProduct /-- Any linear map `L : A → B⋆` induces a character in `(A ⊗ B)⋆` by `a ⊗ b ↦ L a b`. -/ @[simps] noncomputable def uncurry : (A →ₗ[R] CharacterModule B) →ₗ[R] CharacterModule (A ⊗[R] B) where toFun c := TensorProduct.liftAddHom c.toAddMonoidHom fun r a b ↦ congr($(c.map_smul r a) b) map_add' c c' := DFunLike.ext _ _ fun x ↦ by refine x.induction_on ?_ ?_ ?_ <;> aesop map_smul' r c := DFunLike.ext _ _ fun x ↦ x.induction_on (by simp_rw [map_zero]) (fun a b ↦ congr($(c.map_smul r a) b).symm) (by aesop) /-- Any character `c` in `(A ⊗ B)⋆` induces a linear map `A → B⋆` by `a ↦ b ↦ c (a ⊗ b)`. -/ @[simps] noncomputable def curry : CharacterModule (A ⊗[R] B) →ₗ[R] (A →ₗ[R] CharacterModule B) where toFun c := { toFun := (c.comp <\| TensorProduct.mk R A B ·) map_add' := fun _ _ ↦ DFunLike.ext _ _ fun b ↦ congr(c <\| $(map_add (mk R A B) _ _) b).trans (c.map_add _ _) map_smul' := fun r a ↦ by ext; exact congr(c $(TensorProduct.tmul_smul _ _ _)).symm } map_add' _ _ := rfl map_smul' r c := by ext; exact congr(c $(TensorProduct.tmul_smul _ _ _)).symm /-- Linear maps into a character module are exactly characters of the tensor product. -/ @[simps!] noncomputable def homEquiv :	(A →ₗ[R] CharacterModule B) ≃ₗ[R] CharacterModule (A ⊗[R] B) := .ofLinear uncurry curry (by ext _ z; refine z.induction_on ?_ ?_ ?_ <;> aesop) (by aesop) theorem dual_rTensor_conj_homEquiv (f : A →ₗ[R] A') : homEquiv.symm.toLinearMap ∘ₗ dual (f.rTensor B) ∘ₗ homEquiv.toLinearMap = f.lcomp R _ := rfl	Mathlib/Algebra/Module/CharacterModule.lean	139	144
/- Copyright (c) 2020 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Computability.Halting import Mathlib.Computability.TuringMachine import Mathlib.Data.Num.Lemmas import Mathlib.Tactic.DeriveFintype import Mathlib.Computability.TMConfig /-! # Modelling partial recursive functions using Turing machines The files `TMConfig` and `TMToPartrec` define a simplified basis for partial recursive functions, and a `Turing.TM2` model Turing machine for evaluating these functions. This amounts to a constructive proof that every `Partrec` function can be evaluated by a Turing machine. ## Main definitions * `PartrecToTM2.tr`: A TM2 turing machine which can evaluate `code` programs -/ open List (Vector) open Function (update) open Relation namespace Turing /-! ## Simulating sequentialized partial recursive functions in TM2 At this point we have a sequential model of partial recursive functions: the `Cfg` type and `step : Cfg → Option Cfg` function from `TMConfig.lean`. The key feature of this model is that it does a finite amount of computation (in fact, an amount which is statically bounded by the size of the program) between each step, and no individual step can diverge (unlike the compositional semantics, where every sub-part of the computation is potentially divergent). So we can utilize the same techniques as in the other TM simulations in `Computability.TuringMachine` to prove that each step corresponds to a finite number of steps in a lower level model. (We don't prove it here, but in anticipation of the complexity class P, the simulation is actually polynomial-time as well.) The target model is `Turing.TM2`, which has a fixed finite set of stacks, a bit of local storage, with programs selected from a potentially infinite (but finitely accessible) set of program positions, or labels `Λ`, each of which executes a finite sequence of basic stack commands. For this program we will need four stacks, each on an alphabet `Γ'` like so: inductive Γ' \| consₗ \| cons \| bit0 \| bit1 We represent a number as a bit sequence, lists of numbers by putting `cons` after each element, and lists of lists of natural numbers by putting `consₗ` after each list. For example: 0 ~> [] 1 ~> [bit1] 6 ~> [bit0, bit1, bit1] [1, 2] ~> [bit1, cons, bit0, bit1, cons] [[], [1, 2]] ~> [consₗ, bit1, cons, bit0, bit1, cons, consₗ] The four stacks are `main`, `rev`, `aux`, `stack`. In normal mode, `main` contains the input to the current program (a `List ℕ`) and `stack` contains data (a `List (List ℕ)`) associated to the current continuation, and in `ret` mode `main` contains the value that is being passed to the continuation and `stack` contains the data for the continuation. The `rev` and `aux` stacks are usually empty; `rev` is used to store reversed data when e.g. moving a value from one stack to another, while `aux` is used as a temporary for a `main`/`stack` swap that happens during `cons₁` evaluation. The only local store we need is `Option Γ'`, which stores the result of the last pop operation. (Most of our working data are natural numbers, which are too large to fit in the local store.) The continuations from the previous section are data-carrying, containing all the values that have been computed and are awaiting other arguments. In order to have only a finite number of continuations appear in the program so that they can be used in machine states, we separate the data part (anything with type `List ℕ`) from the `Cont` type, producing a `Cont'` type that lacks this information. The data is kept on the `stack` stack. Because we want to have subroutines for e.g. moving an entire stack to another place, we use an infinite inductive type `Λ'` so that we can execute a program and then return to do something else without having to define too many different kinds of intermediate states. (We must nevertheless prove that only finitely many labels are accessible.) The labels are: * `move p k₁ k₂ q`: move elements from stack `k₁` to `k₂` while `p` holds of the value being moved. The last element, that fails `p`, is placed in neither stack but left in the local store. At the end of the operation, `k₂` will have the elements of `k₁` in reverse order. Then do `q`. * `clear p k q`: delete elements from stack `k` until `p` is true. Like `move`, the last element is left in the local storage. Then do `q`. * `copy q`: Move all elements from `rev` to both `main` and `stack` (in reverse order), then do `q`. That is, it takes `(a, b, c, d)` to `(b.reverse ++ a, [], c, b.reverse ++ d)`. * `push k f q`: push `f s`, where `s` is the local store, to stack `k`, then do `q`. This is a duplicate of the `push` instruction that is part of the TM2 model, but by having a subroutine just for this purpose we can build up programs to execute inside a `goto` statement, where we have the flexibility to be general recursive. * `read (f : Option Γ' → Λ')`: go to state `f s` where `s` is the local store. Again this is only here for convenience. * `succ q`: perform a successor operation. Assuming `[n]` is encoded on `main` before, `[n+1]` will be on main after. This implements successor for binary natural numbers. * `pred q₁ q₂`: perform a predecessor operation or `case` statement. If `[]` is encoded on `main` before, then we transition to `q₁` with `[]` on main; if `(0 :: v)` is on `main` before then `v` will be on `main` after and we transition to `q₁`; and if `(n+1 :: v)` is on `main` before then `n :: v` will be on `main` after and we transition to `q₂`. * `ret k`: call continuation `k`. Each continuation has its own interpretation of the data in `stack` and sets up the data for the next continuation. * `ret (cons₁ fs k)`: `v :: KData` on `stack` and `ns` on `main`, and the next step expects `v` on `main` and `ns :: KData` on `stack`. So we have to do a little dance here with six reverse-moves using the `aux` stack to perform a three-point swap, each of which involves two reversals. * `ret (cons₂ k)`: `ns :: KData` is on `stack` and `v` is on `main`, and we have to put `ns.headI :: v` on `main` and `KData` on `stack`. This is done using the `head` subroutine. * `ret (fix f k)`: This stores no data, so we just check if `main` starts with `0` and if so, remove it and call `k`, otherwise `clear` the first value and call `f`. * `ret halt`: the stack is empty, and `main` has the output. Do nothing and halt. In addition to these basic states, we define some additional subroutines that are used in the above: * `push'`, `peek'`, `pop'` are special versions of the builtins that use the local store to supply inputs and outputs. * `unrev`: special case `move false rev main` to move everything from `rev` back to `main`. Used as a cleanup operation in several functions. * `moveExcl p k₁ k₂ q`: same as `move` but pushes the last value read back onto the source stack. * `move₂ p k₁ k₂ q`: double `move`, so that the result comes out in the right order at the target stack. Implemented as `moveExcl p k rev; move false rev k₂`. Assumes that neither `k₁` nor `k₂` is `rev` and `rev` is initially empty. * `head k q`: get the first natural number from stack `k` and reverse-move it to `rev`, then clear the rest of the list at `k` and then `unrev` to reverse-move the head value to `main`. This is used with `k = main` to implement regular `head`, i.e. if `v` is on `main` before then `[v.headI]` will be on `main` after; and also with `k = stack` for the `cons` operation, which has `v` on `main` and `ns :: KData` on `stack`, and results in `KData` on `stack` and `ns.headI :: v` on `main`. * `trNormal` is the main entry point, defining states that perform a given `code` computation. It mostly just dispatches to functions written above. The main theorem of this section is `tr_eval`, which asserts that for each that for each code `c`, the state `init c v` steps to `halt v'` in finitely many steps if and only if `Code.eval c v = some v'`. -/ namespace PartrecToTM2 section open ToPartrec /-- The alphabet for the stacks in the program. `bit0` and `bit1` are used to represent `ℕ` values as lists of binary digits, `cons` is used to separate `List ℕ` values, and `consₗ` is used to separate `List (List ℕ)` values. See the section documentation. -/ inductive Γ' \| consₗ \| cons \| bit0 \| bit1 deriving DecidableEq, Inhabited, Fintype /-- The four stacks used by the program. `main` is used to store the input value in `trNormal` mode and the output value in `Λ'.ret` mode, while `stack` is used to keep all the data for the continuations. `rev` is used to store reversed lists when transferring values between stacks, and `aux` is only used once in `cons₁`. See the section documentation. -/ inductive K' \| main \| rev \| aux \| stack deriving DecidableEq, Inhabited open K' /-- Continuations as in `ToPartrec.Cont` but with the data removed. This is done because we want the set of all continuations in the program to be finite (so that it can ultimately be encoded into the finite state machine of a Turing machine), but a continuation can handle a potentially infinite number of data values during execution. -/ inductive Cont' \| halt \| cons₁ : Code → Cont' → Cont' \| cons₂ : Cont' → Cont' \| comp : Code → Cont' → Cont' \| fix : Code → Cont' → Cont' deriving DecidableEq, Inhabited /-- The set of program positions. We make extensive use of inductive types here to let us describe "subroutines"; for example `clear p k q` is a program that clears stack `k`, then does `q` where `q` is another label. In order to prevent this from resulting in an infinite number of distinct accessible states, we are careful to be non-recursive (although loops are okay). See the section documentation for a description of all the programs. -/ inductive Λ' \| move (p : Γ' → Bool) (k₁ k₂ : K') (q : Λ') \| clear (p : Γ' → Bool) (k : K') (q : Λ') \| copy (q : Λ') \| push (k : K') (s : Option Γ' → Option Γ') (q : Λ') \| read (f : Option Γ' → Λ') \| succ (q : Λ') \| pred (q₁ q₂ : Λ') \| ret (k : Cont') compile_inductive% Code compile_inductive% Cont' compile_inductive% K' compile_inductive% Λ' instance Λ'.instInhabited : Inhabited Λ' := ⟨Λ'.ret Cont'.halt⟩ instance Λ'.instDecidableEq : DecidableEq Λ' := fun a b => by induction a generalizing b <;> cases b <;> first \| apply Decidable.isFalse; rintro ⟨⟨⟩⟩; done \| exact decidable_of_iff' _ (by simp [funext_iff]; rfl) /-- The type of TM2 statements used by this machine. -/ def Stmt' := TM2.Stmt (fun _ : K' => Γ') Λ' (Option Γ') deriving Inhabited /-- The type of TM2 configurations used by this machine. -/ def Cfg' := TM2.Cfg (fun _ : K' => Γ') Λ' (Option Γ') deriving Inhabited open TM2.Stmt /-- A predicate that detects the end of a natural number, either `Γ'.cons` or `Γ'.consₗ` (or implicitly the end of the list), for use in predicate-taking functions like `move` and `clear`. -/ @[simp] def natEnd : Γ' → Bool \| Γ'.consₗ => true \| Γ'.cons => true \| _ => false attribute [nolint simpNF] natEnd.eq_3 /-- Pop a value from the stack and place the result in local store. -/ @[simp] def pop' (k : K') : Stmt' → Stmt' := pop k fun _ v => v /-- Peek a value from the stack and place the result in local store. -/ @[simp] def peek' (k : K') : Stmt' → Stmt' := peek k fun _ v => v /-- Push the value in the local store to the given stack. -/ @[simp] def push' (k : K') : Stmt' → Stmt' := push k fun x => x.iget /-- Move everything from the `rev` stack to the `main` stack (reversed). -/ def unrev := Λ'.move (fun _ => false) rev main /-- Move elements from `k₁` to `k₂` while `p` holds, with the last element being left on `k₁`. -/ def moveExcl (p k₁ k₂ q) := Λ'.move p k₁ k₂ <\| Λ'.push k₁ id q /-- Move elements from `k₁` to `k₂` without reversion, by performing a double move via the `rev` stack. -/ def move₂ (p k₁ k₂ q) := moveExcl p k₁ rev <\| Λ'.move (fun _ => false) rev k₂ q /-- Assuming `trList v` is on the front of stack `k`, remove it, and push `v.headI` onto `main`. See the section documentation. -/ def head (k : K') (q : Λ') : Λ' := Λ'.move natEnd k rev <\| (Λ'.push rev fun _ => some Γ'.cons) <\| Λ'.read fun s => (if s = some Γ'.consₗ then id else Λ'.clear (fun x => x = Γ'.consₗ) k) <\| unrev q /-- The program that evaluates code `c` with continuation `k`. This expects an initial state where `trList v` is on `main`, `trContStack k` is on `stack`, and `aux` and `rev` are empty. See the section documentation for details. -/ @[simp] def trNormal : Code → Cont' → Λ' \| Code.zero', k => (Λ'.push main fun _ => some Γ'.cons) <\| Λ'.ret k \| Code.succ, k => head main <\| Λ'.succ <\| Λ'.ret k \| Code.tail, k => Λ'.clear natEnd main <\| Λ'.ret k \| Code.cons f fs, k => (Λ'.push stack fun _ => some Γ'.consₗ) <\| Λ'.move (fun _ => false) main rev <\| Λ'.copy <\| trNormal f (Cont'.cons₁ fs k) \| Code.comp f g, k => trNormal g (Cont'.comp f k) \| Code.case f g, k => Λ'.pred (trNormal f k) (trNormal g k) \| Code.fix f, k => trNormal f (Cont'.fix f k) /-- The main program. See the section documentation for details. -/ def tr : Λ' → Stmt' \| Λ'.move p k₁ k₂ q => pop' k₁ <\| branch (fun s => s.elim true p) (goto fun _ => q) (push' k₂ <\| goto fun _ => Λ'.move p k₁ k₂ q) \| Λ'.push k f q => branch (fun s => (f s).isSome) ((push k fun s => (f s).iget) <\| goto fun _ => q) (goto fun _ => q) \| Λ'.read q => goto q \| Λ'.clear p k q => pop' k <\| branch (fun s => s.elim true p) (goto fun _ => q) (goto fun _ => Λ'.clear p k q) \| Λ'.copy q => pop' rev <\| branch Option.isSome (push' main <\| push' stack <\| goto fun _ => Λ'.copy q) (goto fun _ => q) \| Λ'.succ q => pop' main <\| branch (fun s => s = some Γ'.bit1) ((push rev fun _ => Γ'.bit0) <\| goto fun _ => Λ'.succ q) <\| branch (fun s => s = some Γ'.cons) ((push main fun _ => Γ'.cons) <\| (push main fun _ => Γ'.bit1) <\| goto fun _ => unrev q) ((push main fun _ => Γ'.bit1) <\| goto fun _ => unrev q) \| Λ'.pred q₁ q₂ => pop' main <\| branch (fun s => s = some Γ'.bit0) ((push rev fun _ => Γ'.bit1) <\| goto fun _ => Λ'.pred q₁ q₂) <\| branch (fun s => natEnd s.iget) (goto fun _ => q₁) (peek' main <\| branch (fun s => natEnd s.iget) (goto fun _ => unrev q₂) ((push rev fun _ => Γ'.bit0) <\| goto fun _ => unrev q₂)) \| Λ'.ret (Cont'.cons₁ fs k) => goto fun _ => move₂ (fun _ => false) main aux <\| move₂ (fun s => s = Γ'.consₗ) stack main <\| move₂ (fun _ => false) aux stack <\| trNormal fs (Cont'.cons₂ k) \| Λ'.ret (Cont'.cons₂ k) => goto fun _ => head stack <\| Λ'.ret k \| Λ'.ret (Cont'.comp f k) => goto fun _ => trNormal f k \| Λ'.ret (Cont'.fix f k) => pop' main <\| goto fun s => cond (natEnd s.iget) (Λ'.ret k) <\| Λ'.clear natEnd main <\| trNormal f (Cont'.fix f k) \| Λ'.ret Cont'.halt => (load fun _ => none) <\| halt @[simp] theorem tr_move (p k₁ k₂ q) : tr (Λ'.move p k₁ k₂ q) = pop' k₁ (branch (fun s => s.elim true p) (goto fun _ => q) (push' k₂ <\| goto fun _ => Λ'.move p k₁ k₂ q)) := rfl @[simp] theorem tr_push (k f q) : tr (Λ'.push k f q) = branch (fun s => (f s).isSome) ((push k fun s => (f s).iget) <\| goto fun _ => q) (goto fun _ => q) := rfl @[simp] theorem tr_read (q) : tr (Λ'.read q) = goto q := rfl @[simp] theorem tr_clear (p k q) : tr (Λ'.clear p k q) = pop' k (branch (fun s => s.elim true p) (goto fun _ => q) (goto fun _ => Λ'.clear p k q)) := rfl @[simp] theorem tr_copy (q) : tr (Λ'.copy q) = pop' rev (branch Option.isSome (push' main <\| push' stack <\| goto fun _ => Λ'.copy q) (goto fun _ => q)) := rfl @[simp] theorem tr_succ (q) : tr (Λ'.succ q) = pop' main (branch (fun s => s = some Γ'.bit1) ((push rev fun _ => Γ'.bit0) <\| goto fun _ => Λ'.succ q) <\| branch (fun s => s = some Γ'.cons) ((push main fun _ => Γ'.cons) <\| (push main fun _ => Γ'.bit1) <\| goto fun _ => unrev q) ((push main fun _ => Γ'.bit1) <\| goto fun _ => unrev q)) := rfl @[simp] theorem tr_pred (q₁ q₂) : tr (Λ'.pred q₁ q₂) = pop' main (branch (fun s => s = some Γ'.bit0) ((push rev fun _ => Γ'.bit1) <\| goto fun _ => Λ'.pred q₁ q₂) <\| branch (fun s => natEnd s.iget) (goto fun _ => q₁) (peek' main <\| branch (fun s => natEnd s.iget) (goto fun _ => unrev q₂) ((push rev fun _ => Γ'.bit0) <\| goto fun _ => unrev q₂))) := rfl @[simp] theorem tr_ret_cons₁ (fs k) : tr (Λ'.ret (Cont'.cons₁ fs k)) = goto fun _ => move₂ (fun _ => false) main aux <\| move₂ (fun s => s = Γ'.consₗ) stack main <\| move₂ (fun _ => false) aux stack <\| trNormal fs (Cont'.cons₂ k) := rfl @[simp] theorem tr_ret_cons₂ (k) : tr (Λ'.ret (Cont'.cons₂ k)) = goto fun _ => head stack <\| Λ'.ret k := rfl @[simp] theorem tr_ret_comp (f k) : tr (Λ'.ret (Cont'.comp f k)) = goto fun _ => trNormal f k := rfl @[simp] theorem tr_ret_fix (f k) : tr (Λ'.ret (Cont'.fix f k)) = pop' main (goto fun s => cond (natEnd s.iget) (Λ'.ret k) <\| Λ'.clear natEnd main <\| trNormal f (Cont'.fix f k)) := rfl @[simp] theorem tr_ret_halt : tr (Λ'.ret Cont'.halt) = (load fun _ => none) halt := rfl /-- Translating a `Cont` continuation to a `Cont'` continuation simply entails dropping all the data. This data is instead encoded in `trContStack` in the configuration. -/ def trCont : Cont → Cont' \| Cont.halt => Cont'.halt \| Cont.cons₁ c _ k => Cont'.cons₁ c (trCont k) \| Cont.cons₂ _ k => Cont'.cons₂ (trCont k) \| Cont.comp c k => Cont'.comp c (trCont k) \| Cont.fix c k => Cont'.fix c (trCont k) /-- We use `PosNum` to define the translation of binary natural numbers. A natural number is represented as a little-endian list of `bit0` and `bit1` elements: 1 = [bit1] 2 = [bit0, bit1] 3 = [bit1, bit1] 4 = [bit0, bit0, bit1] In particular, this representation guarantees no trailing `bit0`'s at the end of the list. -/ def trPosNum : PosNum → List Γ' \| PosNum.one => [Γ'.bit1] \| PosNum.bit0 n => Γ'.bit0 :: trPosNum n \| PosNum.bit1 n => Γ'.bit1 :: trPosNum n /-- We use `Num` to define the translation of binary natural numbers. Positive numbers are translated using `trPosNum`, and `trNum 0 = []`. So there are never any trailing `bit0`'s in a translated `Num`. 0 = [] 1 = [bit1] 2 = [bit0, bit1] 3 = [bit1, bit1] 4 = [bit0, bit0, bit1] -/ def trNum : Num → List Γ' \| Num.zero => [] \| Num.pos n => trPosNum n /-- Because we use binary encoding, we define `trNat` in terms of `trNum`, using `Num`, which are binary natural numbers. (We could also use `Nat.binaryRecOn`, but `Num` and `PosNum` make for easy inductions.) -/ def trNat (n : ℕ) : List Γ' := trNum n @[simp] theorem trNat_zero : trNat 0 = [] := by rw [trNat, Nat.cast_zero]; rfl theorem trNat_default : trNat default = [] := trNat_zero /-- Lists are translated with a `cons` after each encoded number. For example: [] = [] [0] = [cons] [1] = [bit1, cons] [6, 0] = [bit0, bit1, bit1, cons, cons] -/ @[simp] def trList : List ℕ → List Γ' \| [] => [] \| n::ns => trNat n ++ Γ'.cons :: trList ns /-- Lists of lists are translated with a `consₗ` after each encoded list. For example: [] = [] [[]] = [consₗ] [[], []] = [consₗ, consₗ] [[0]] = [cons, consₗ] [[1, 2], [0]] = [bit1, cons, bit0, bit1, cons, consₗ, cons, consₗ] -/ @[simp] def trLList : List (List ℕ) → List Γ' \| [] => [] \| l::ls => trList l ++ Γ'.consₗ :: trLList ls /-- The data part of a continuation is a list of lists, which is encoded on the `stack` stack using `trLList`. -/ @[simp] def contStack : Cont → List (List ℕ) \| Cont.halt => [] \| Cont.cons₁ _ ns k => ns :: contStack k \| Cont.cons₂ ns k => ns :: contStack k \| Cont.comp _ k => contStack k \| Cont.fix _ k => contStack k /-- The data part of a continuation is a list of lists, which is encoded on the `stack` stack using `trLList`. -/ def trContStack (k : Cont) := trLList (contStack k) /-- This is the nondependent eliminator for `K'`, but we use it specifically here in order to represent the stack data as four lists rather than as a function `K' → List Γ'`, because this makes rewrites easier. The theorems `K'.elim_update_main` et. al. show how such a function is updated after an `update` to one of the components. -/ def K'.elim (a b c d : List Γ') : K' → List Γ' \| K'.main => a \| K'.rev => b \| K'.aux => c \| K'.stack => d -- The equation lemma of `elim` simplifies to `match` structures. theorem K'.elim_main (a b c d) : K'.elim a b c d K'.main = a := rfl theorem K'.elim_rev (a b c d) : K'.elim a b c d K'.rev = b := rfl theorem K'.elim_aux (a b c d) : K'.elim a b c d K'.aux = c := rfl theorem K'.elim_stack (a b c d) : K'.elim a b c d K'.stack = d := rfl attribute [simp] K'.elim @[simp] theorem K'.elim_update_main {a b c d a'} : update (K'.elim a b c d) main a' = K'.elim a' b c d := by funext x; cases x <;> rfl @[simp] theorem K'.elim_update_rev {a b c d b'} : update (K'.elim a b c d) rev b' = K'.elim a b' c d := by funext x; cases x <;> rfl @[simp] theorem K'.elim_update_aux {a b c d c'} : update (K'.elim a b c d) aux c' = K'.elim a b c' d := by funext x; cases x <;> rfl @[simp] theorem K'.elim_update_stack {a b c d d'} : update (K'.elim a b c d) stack d' = K'.elim a b c d' := by funext x; cases x <;> rfl /-- The halting state corresponding to a `List ℕ` output value. -/ def halt (v : List ℕ) : Cfg' := ⟨none, none, K'.elim (trList v) [] [] []⟩ /-- The `Cfg` states map to `Cfg'` states almost one to one, except that in normal operation the local store contains an arbitrary garbage value. To make the final theorem cleaner we explicitly clear it in the halt state so that there is exactly one configuration corresponding to output `v`. -/ def TrCfg : Cfg → Cfg' → Prop \| Cfg.ret k v, c' => ∃ s, c' = ⟨some (Λ'.ret (trCont k)), s, K'.elim (trList v) [] [] (trContStack k)⟩ \| Cfg.halt v, c' => c' = halt v /-- This could be a general list definition, but it is also somewhat specialized to this application. `splitAtPred p L` will search `L` for the first element satisfying `p`. If it is found, say `L = l₁ ++ a :: l₂` where `a` satisfies `p` but `l₁` does not, then it returns `(l₁, some a, l₂)`. Otherwise, if there is no such element, it returns `(L, none, [])`. -/ def splitAtPred {α} (p : α → Bool) : List α → List α × Option α × List α \| [] => ([], none, []) \| a :: as => cond (p a) ([], some a, as) <\| let ⟨l₁, o, l₂⟩ := splitAtPred p as ⟨a::l₁, o, l₂⟩ theorem splitAtPred_eq {α} (p : α → Bool) : ∀ L l₁ o l₂, (∀ x ∈ l₁, p x = false) → Option.elim' (L = l₁ ∧ l₂ = []) (fun a => p a = true ∧ L = l₁ ++ a::l₂) o → splitAtPred p L = (l₁, o, l₂) \| [], _, none, _, _, ⟨rfl, rfl⟩ => rfl \| [], l₁, some o, l₂, _, ⟨_, h₃⟩ => by simp at h₃ \| a :: L, l₁, o, l₂, h₁, h₂ => by rw [splitAtPred] have IH := splitAtPred_eq p L rcases o with - \| o · rcases l₁ with - \| ⟨a', l₁⟩ <;> rcases h₂ with ⟨⟨⟩, rfl⟩ rw [h₁ a (List.Mem.head _), cond, IH L none [] _ ⟨rfl, rfl⟩] exact fun x h => h₁ x (List.Mem.tail _ h) · rcases l₁ with - \| ⟨a', l₁⟩ <;> rcases h₂ with ⟨h₂, ⟨⟩⟩ · rw [h₂, cond] rw [h₁ a (List.Mem.head _), cond, IH l₁ (some o) l₂ _ ⟨h₂, _⟩] <;> try rfl exact fun x h => h₁ x (List.Mem.tail _ h) theorem splitAtPred_false {α} (L : List α) : splitAtPred (fun _ => false) L = (L, none, []) := splitAtPred_eq _ _ _ _ _ (fun _ _ => rfl) ⟨rfl, rfl⟩ theorem move_ok {p k₁ k₂ q s L₁ o L₂} {S : K' → List Γ'} (h₁ : k₁ ≠ k₂) (e : splitAtPred p (S k₁) = (L₁, o, L₂)) : Reaches₁ (TM2.step tr) ⟨some (Λ'.move p k₁ k₂ q), s, S⟩ ⟨some q, o, update (update S k₁ L₂) k₂ (L₁.reverseAux (S k₂))⟩ := by induction' L₁ with a L₁ IH generalizing S s · rw [(_ : [].reverseAux _ = _), Function.update_eq_self] swap · rw [Function.update_of_ne h₁.symm, List.reverseAux_nil] refine TransGen.head' rfl ?_ rw [tr]; simp only [pop', TM2.stepAux] revert e; rcases S k₁ with - \| ⟨a, Sk⟩ <;> intro e · cases e rfl simp only [splitAtPred, Option.elim, List.head?, List.tail_cons, Option.iget_some] at e ⊢ revert e; cases p a <;> intro e <;> simp only [cond_false, cond_true, Prod.mk.injEq, true_and, false_and, reduceCtorEq] at e ⊢ simp only [e] rfl · refine TransGen.head rfl ?_ rw [tr]; simp only [pop', Option.elim, TM2.stepAux, push'] rcases e₁ : S k₁ with - \| ⟨a', Sk⟩ <;> rw [e₁, splitAtPred] at e · cases e cases e₂ : p a' <;> simp only [e₂, cond] at e swap · cases e rcases e₃ : splitAtPred p Sk with ⟨_, _, _⟩ rw [e₃] at e cases e simp only [List.head?_cons, e₂, List.tail_cons, ne_eq, cond_false] convert @IH _ (update (update S k₁ Sk) k₂ (a :: S k₂)) _ using 2 <;> simp [Function.update_of_ne, h₁, h₁.symm, e₃, List.reverseAux] simp [Function.update_comm h₁.symm] theorem unrev_ok {q s} {S : K' → List Γ'} : Reaches₁ (TM2.step tr) ⟨some (unrev q), s, S⟩ ⟨some q, none, update (update S rev []) main (List.reverseAux (S rev) (S main))⟩ := move_ok (by decide) <\| splitAtPred_false _ theorem move₂_ok {p k₁ k₂ q s L₁ o L₂} {S : K' → List Γ'} (h₁ : k₁ ≠ rev ∧ k₂ ≠ rev ∧ k₁ ≠ k₂) (h₂ : S rev = []) (e : splitAtPred p (S k₁) = (L₁, o, L₂)) : Reaches₁ (TM2.step tr) ⟨some (move₂ p k₁ k₂ q), s, S⟩ ⟨some q, none, update (update S k₁ (o.elim id List.cons L₂)) k₂ (L₁ ++ S k₂)⟩ := by refine (move_ok h₁.1 e).trans (TransGen.head rfl ?_) simp only [TM2.step, Option.mem_def, TM2.stepAux, id_eq, ne_eq, Option.elim] cases o <;> simp only [Option.elim] <;> rw [tr] <;> simp only [id, TM2.stepAux, Option.isSome, cond_true, cond_false] · convert move_ok h₁.2.1.symm (splitAtPred_false _) using 2 simp only [Function.update_comm h₁.1, Function.update_idem] rw [show update S rev [] = S by rw [← h₂, Function.update_eq_self]] simp only [Function.update_of_ne h₁.2.2.symm, Function.update_of_ne h₁.2.1, Function.update_of_ne h₁.1.symm, List.reverseAux_eq, h₂, Function.update_self, List.append_nil, List.reverse_reverse] · convert move_ok h₁.2.1.symm (splitAtPred_false _) using 2 simp only [h₂, Function.update_comm h₁.1, List.reverseAux_eq, Function.update_self, List.append_nil, Function.update_idem] rw [show update S rev [] = S by rw [← h₂, Function.update_eq_self]] simp only [Function.update_of_ne h₁.1.symm, Function.update_of_ne h₁.2.2.symm, Function.update_of_ne h₁.2.1, Function.update_self, List.reverse_reverse] theorem clear_ok {p k q s L₁ o L₂} {S : K' → List Γ'} (e : splitAtPred p (S k) = (L₁, o, L₂)) : Reaches₁ (TM2.step tr) ⟨some (Λ'.clear p k q), s, S⟩ ⟨some q, o, update S k L₂⟩ := by induction' L₁ with a L₁ IH generalizing S s · refine TransGen.head' rfl ?_ rw [tr]; simp only [pop', TM2.step, Option.mem_def, TM2.stepAux, Option.elim] revert e; rcases S k with - \| ⟨a, Sk⟩ <;> intro e · cases e rfl simp only [splitAtPred, Option.elim, List.head?, List.tail_cons] at e ⊢ revert e; cases p a <;> intro e <;> simp only [cond_false, cond_true, Prod.mk.injEq, true_and, false_and, reduceCtorEq] at e ⊢ rcases e with ⟨e₁, e₂⟩ rw [e₁, e₂] · refine TransGen.head rfl ?_ rw [tr]; simp only [pop', TM2.step, Option.mem_def, TM2.stepAux, Option.elim] rcases e₁ : S k with - \| ⟨a', Sk⟩ <;> rw [e₁, splitAtPred] at e · cases e cases e₂ : p a' <;> simp only [e₂, cond] at e swap · cases e rcases e₃ : splitAtPred p Sk with ⟨_, _, _⟩ rw [e₃] at e cases e simp only [List.head?_cons, e₂, List.tail_cons, cond_false] convert @IH _ (update S k Sk) _ using 2 <;> simp [e₃] theorem copy_ok (q s a b c d) : Reaches₁ (TM2.step tr) ⟨some (Λ'.copy q), s, K'.elim a b c d⟩ ⟨some q, none, K'.elim (List.reverseAux b a) [] c (List.reverseAux b d)⟩ := by induction' b with x b IH generalizing a d s · refine TransGen.single ?_ simp refine TransGen.head rfl ?_ rw [tr] simp only [TM2.step, Option.mem_def, TM2.stepAux, elim_rev, List.head?_cons, Option.isSome_some, List.tail_cons, elim_update_rev, ne_eq, Function.update_of_ne, elim_main, elim_update_main, elim_stack, elim_update_stack, cond_true, List.reverseAux_cons, pop', push'] exact IH _ _ _ theorem trPosNum_natEnd : ∀ (n), ∀ x ∈ trPosNum n, natEnd x = false \| PosNum.one, _, List.Mem.head _ => rfl \| PosNum.bit0 _, _, List.Mem.head _ => rfl \| PosNum.bit0 n, _, List.Mem.tail _ h => trPosNum_natEnd n _ h \| PosNum.bit1 _, _, List.Mem.head _ => rfl \| PosNum.bit1 n, _, List.Mem.tail _ h => trPosNum_natEnd n _ h theorem trNum_natEnd : ∀ (n), ∀ x ∈ trNum n, natEnd x = false \| Num.pos n, x, h => trPosNum_natEnd n x h theorem trNat_natEnd (n) : ∀ x ∈ trNat n, natEnd x = false := trNum_natEnd _ theorem trList_ne_consₗ : ∀ (l), ∀ x ∈ trList l, x ≠ Γ'.consₗ \| a :: l, x, h => by simp only [trList, List.mem_append, List.mem_cons] at h obtain h \| rfl \| h := h · rintro rfl cases trNat_natEnd _ _ h · rintro ⟨⟩ · exact trList_ne_consₗ l _ h theorem head_main_ok {q s L} {c d : List Γ'} : Reaches₁ (TM2.step tr) ⟨some (head main q), s, K'.elim (trList L) [] c d⟩ ⟨some q, none, K'.elim (trList [L.headI]) [] c d⟩ := by let o : Option Γ' := List.casesOn L none fun _ _ => some Γ'.cons refine (move_ok (by decide) (splitAtPred_eq _ _ (trNat L.headI) o (trList L.tail) (trNat_natEnd _) ?_)).trans (TransGen.head rfl (TransGen.head rfl ?_)) · cases L <;> simp [o] rw [tr] simp only [TM2.step, Option.mem_def, TM2.stepAux, elim_update_main, elim_rev, elim_update_rev, Function.update_self, trList] rw [if_neg (show o ≠ some Γ'.consₗ by cases L <;> simp [o])] refine (clear_ok (splitAtPred_eq _ _ _ none [] ?_ ⟨rfl, rfl⟩)).trans ?_ · exact fun x h => Bool.decide_false (trList_ne_consₗ _ _ h) convert unrev_ok using 2; simp [List.reverseAux_eq] theorem head_stack_ok {q s L₁ L₂ L₃} : Reaches₁ (TM2.step tr) ⟨some (head stack q), s, K'.elim (trList L₁) [] [] (trList L₂ ++ Γ'.consₗ :: L₃)⟩ ⟨some q, none, K'.elim (trList (L₂.headI :: L₁)) [] [] L₃⟩ := by rcases L₂ with - \| ⟨a, L₂⟩ · refine TransGen.trans (move_ok (by decide) (splitAtPred_eq _ _ [] (some Γ'.consₗ) L₃ (by rintro _ ⟨⟩) ⟨rfl, rfl⟩)) (TransGen.head rfl (TransGen.head rfl ?_)) rw [tr] simp only [TM2.step, Option.mem_def, TM2.stepAux, ite_true, id_eq, trList, List.nil_append, elim_update_stack, elim_rev, List.reverseAux_nil, elim_update_rev, Function.update_self, List.headI_nil, trNat_default] convert unrev_ok using 2 simp · refine TransGen.trans (move_ok (by decide) (splitAtPred_eq _ _ (trNat a) (some Γ'.cons) (trList L₂ ++ Γ'.consₗ :: L₃) (trNat_natEnd _) ⟨rfl, by simp⟩)) (TransGen.head rfl (TransGen.head rfl ?_)) simp only [TM2.step, Option.mem_def, TM2.stepAux, ite_false, trList, List.append_assoc, List.cons_append, elim_update_stack, elim_rev, elim_update_rev, Function.update_self, List.headI_cons] refine TransGen.trans (clear_ok (splitAtPred_eq _ _ (trList L₂) (some Γ'.consₗ) L₃ (fun x h => Bool.decide_false (trList_ne_consₗ _ _ h)) ⟨rfl, by simp⟩)) ?_ convert unrev_ok using 2 simp [List.reverseAux_eq] theorem succ_ok {q s n} {c d : List Γ'} : Reaches₁ (TM2.step tr) ⟨some (Λ'.succ q), s, K'.elim (trList [n]) [] c d⟩ ⟨some q, none, K'.elim (trList [n.succ]) [] c d⟩ := by simp only [TM2.step, trList, trNat.eq_1, Nat.cast_succ, Num.add_one] rcases (n : Num) with - \| a · refine TransGen.head rfl ?_ simp only [Option.mem_def, TM2.stepAux, elim_main, decide_false, elim_update_main, ne_eq, Function.update_of_ne, elim_rev, elim_update_rev, decide_true, Function.update_self, cond_true, cond_false] convert unrev_ok using 1 simp only [elim_update_rev, elim_rev, elim_main, List.reverseAux_nil, elim_update_main] rfl simp only [trNum, Num.succ, Num.succ'] suffices ∀ l₁, ∃ l₁' l₂' s', List.reverseAux l₁ (trPosNum a.succ) = List.reverseAux l₁' l₂' ∧ Reaches₁ (TM2.step tr) ⟨some q.succ, s, K'.elim (trPosNum a ++ [Γ'.cons]) l₁ c d⟩ ⟨some (unrev q), s', K'.elim (l₂' ++ [Γ'.cons]) l₁' c d⟩ by obtain ⟨l₁', l₂', s', e, h⟩ := this [] simp? [List.reverseAux] at e says simp only [List.reverseAux, List.reverseAux_eq] at e refine h.trans ?_ convert unrev_ok using 2 simp [e, List.reverseAux_eq] induction' a with m IH m _ generalizing s <;> intro l₁ · refine ⟨Γ'.bit0 :: l₁, [Γ'.bit1], some Γ'.cons, rfl, TransGen.head rfl (TransGen.single ?_)⟩ simp [trPosNum] · obtain ⟨l₁', l₂', s', e, h⟩ := IH (Γ'.bit0 :: l₁) refine ⟨l₁', l₂', s', e, TransGen.head ?_ h⟩ simp [PosNum.succ, trPosNum] rfl · refine ⟨l₁, _, some Γ'.bit0, rfl, TransGen.single ?_⟩ simp only [TM2.step]; rw [tr] simp only [TM2.stepAux, pop', elim_main, elim_update_main, ne_eq, Function.update_of_ne, elim_rev, elim_update_rev, Function.update_self, Option.mem_def, Option.some.injEq] rfl theorem pred_ok (q₁ q₂ s v) (c d : List Γ') : ∃ s', Reaches₁ (TM2.step tr) ⟨some (Λ'.pred q₁ q₂), s, K'.elim (trList v) [] c d⟩ (v.headI.rec ⟨some q₁, s', K'.elim (trList v.tail) [] c d⟩ fun n _ => ⟨some q₂, s', K'.elim (trList (n::v.tail)) [] c d⟩) := by rcases v with (_ \| ⟨_ \| n, v⟩) · refine ⟨none, TransGen.single ?_⟩ simp · refine ⟨some Γ'.cons, TransGen.single ?_⟩ simp refine ⟨none, ?_⟩ simp only [TM2.step, trList, trNat.eq_1, trNum, Nat.cast_succ, Num.add_one, Num.succ, List.tail_cons, List.headI_cons] rcases (n : Num) with - \| a · simp only [trPosNum, Num.succ', List.singleton_append, List.nil_append] refine TransGen.head rfl ?_ rw [tr]; simp only [pop', TM2.stepAux, cond_false] convert unrev_ok using 2 simp simp only [Num.succ'] suffices ∀ l₁, ∃ l₁' l₂' s', List.reverseAux l₁ (trPosNum a) = List.reverseAux l₁' l₂' ∧ Reaches₁ (TM2.step tr) ⟨some (q₁.pred q₂), s, K'.elim (trPosNum a.succ ++ Γ'.cons :: trList v) l₁ c d⟩ ⟨some (unrev q₂), s', K'.elim (l₂' ++ Γ'.cons :: trList v) l₁' c d⟩ by obtain ⟨l₁', l₂', s', e, h⟩ := this [] simp only [List.reverseAux] at e refine h.trans ?_ convert unrev_ok using 2 simp [e, List.reverseAux_eq] induction' a with m IH m IH generalizing s <;> intro l₁ · refine ⟨Γ'.bit1::l₁, [], some Γ'.cons, rfl, TransGen.head rfl (TransGen.single ?_)⟩ simp [trPosNum, show PosNum.one.succ = PosNum.one.bit0 from rfl] · obtain ⟨l₁', l₂', s', e, h⟩ := IH (some Γ'.bit0) (Γ'.bit1 :: l₁) refine ⟨l₁', l₂', s', e, TransGen.head ?_ h⟩ simp rfl · obtain ⟨a, l, e, h⟩ : ∃ a l, (trPosNum m = a::l) ∧ natEnd a = false := by cases m <;> refine ⟨_, _, rfl, rfl⟩ refine ⟨Γ'.bit0 :: l₁, _, some a, rfl, TransGen.single ?_⟩ simp [trPosNum, PosNum.succ, e, h, show some Γ'.bit1 ≠ some Γ'.bit0 by decide, Option.iget, -natEnd] rfl theorem trNormal_respects (c k v s) : ∃ b₂, TrCfg (stepNormal c k v) b₂ ∧ Reaches₁ (TM2.step tr) ⟨some (trNormal c (trCont k)), s, K'.elim (trList v) [] [] (trContStack k)⟩ b₂ := by induction c generalizing k v s with \| zero' => refine ⟨_, ⟨s, rfl⟩, TransGen.single ?_⟩; simp \| succ => refine ⟨_, ⟨none, rfl⟩, head_main_ok.trans succ_ok⟩ \| tail => let o : Option Γ' := List.casesOn v none fun _ _ => some Γ'.cons refine ⟨_, ⟨o, rfl⟩, ?_⟩; convert clear_ok _ using 2 · simp; rfl swap refine splitAtPred_eq _ _ (trNat v.headI) _ _ (trNat_natEnd _) ?_ cases v <;> simp [o] \| cons f fs IHf _ => obtain ⟨c, h₁, h₂⟩ := IHf (Cont.cons₁ fs v k) v none refine ⟨c, h₁, TransGen.head rfl <\| (move_ok (by decide) (splitAtPred_false _)).trans ?_⟩ simp only [TM2.step, Option.mem_def, elim_stack, elim_update_stack, elim_update_main, ne_eq, Function.update_of_ne, elim_main, elim_rev, elim_update_rev] refine (copy_ok _ none [] (trList v).reverse _ _).trans ?_ convert h₂ using 2 simp [List.reverseAux_eq, trContStack] \| comp f _ _ IHg => exact IHg (Cont.comp f k) v s \| case f g IHf IHg => rw [stepNormal] simp only obtain ⟨s', h⟩ := pred_ok _ _ s v _ _ revert h; rcases v.headI with - \| n <;> intro h · obtain ⟨c, h₁, h₂⟩ := IHf k _ s' exact ⟨_, h₁, h.trans h₂⟩ · obtain ⟨c, h₁, h₂⟩ := IHg k _ s' exact ⟨_, h₁, h.trans h₂⟩ \| fix f IH => apply IH theorem tr_ret_respects (k v s) : ∃ b₂, TrCfg (stepRet k v) b₂ ∧ Reaches₁ (TM2.step tr) ⟨some (Λ'.ret (trCont k)), s, K'.elim (trList v) [] [] (trContStack k)⟩ b₂ := by induction k generalizing v s with \| halt => exact ⟨_, rfl, TransGen.single rfl⟩ \| cons₁ fs as k _ => obtain ⟨s', h₁, h₂⟩ := trNormal_respects fs (Cont.cons₂ v k) as none refine ⟨s', h₁, TransGen.head rfl ?_⟩; simp refine (move₂_ok (by decide) ?_ (splitAtPred_false _)).trans ?_; · rfl simp only [TM2.step, Option.mem_def, Option.elim, id_eq, elim_update_main, elim_main, elim_aux, List.append_nil, elim_update_aux] refine (move₂_ok (L₁ := ?_) (o := ?_) (L₂ := ?_) (by decide) rfl ?_).trans ?_ pick_goal 4 · exact splitAtPred_eq _ _ _ (some Γ'.consₗ) _ (fun x h => Bool.decide_false (trList_ne_consₗ _ _ h)) ⟨rfl, rfl⟩ refine (move₂_ok (by decide) ?_ (splitAtPred_false _)).trans ?_; · rfl simp only [TM2.step, Option.mem_def, Option.elim, elim_update_stack, elim_main, List.append_nil, elim_update_main, id_eq, elim_update_aux, ne_eq, Function.update_of_ne, elim_aux, elim_stack] exact h₂ \| cons₂ ns k IH => obtain ⟨c, h₁, h₂⟩ := IH (ns.headI :: v) none exact ⟨c, h₁, TransGen.head rfl <\| head_stack_ok.trans h₂⟩ \| comp f k _ => obtain ⟨s', h₁, h₂⟩ := trNormal_respects f k v s exact ⟨_, h₁, TransGen.head rfl h₂⟩ \| fix f k IH => rw [stepRet] have : if v.headI = 0 then natEnd (trList v).head?.iget = true ∧ (trList v).tail = trList v.tail else natEnd (trList v).head?.iget = false ∧ (trList v).tail = (trNat v.headI).tail ++ Γ'.cons :: trList v.tail := by obtain - \| n := v · exact ⟨rfl, rfl⟩ rcases n with - \| n · simp rw [trList, List.headI, trNat, Nat.cast_succ, Num.add_one, Num.succ, List.tail] cases (n : Num).succ' <;> exact ⟨rfl, rfl⟩ by_cases h : v.headI = 0 <;> simp only [h, ite_true, ite_false] at this ⊢ · obtain ⟨c, h₁, h₂⟩ := IH v.tail (trList v).head? refine ⟨c, h₁, TransGen.head rfl ?_⟩ rw [trCont, tr]; simp only [pop', TM2.stepAux, elim_main, this, elim_update_main] exact h₂ · obtain ⟨s', h₁, h₂⟩ := trNormal_respects f (Cont.fix f k) v.tail (some Γ'.cons) refine ⟨_, h₁, TransGen.head rfl <\| TransGen.trans ?_ h₂⟩ rw [trCont, tr]; simp only [pop', TM2.stepAux, elim_main, this.1] convert clear_ok (splitAtPred_eq _ _ (trNat v.headI).tail (some Γ'.cons) _ _ _) using 2 · simp convert rfl · exact fun x h => trNat_natEnd _ _ (List.tail_subset _ h) · exact ⟨rfl, this.2⟩ theorem tr_respects : Respects step (TM2.step tr) TrCfg \| Cfg.ret _ _, _, ⟨_, rfl⟩ => tr_ret_respects _ _ _ \| Cfg.halt _, _, rfl => rfl /-- The initial state, evaluating function `c` on input `v`. -/ def init (c : Code) (v : List ℕ) : Cfg' := ⟨some (trNormal c Cont'.halt), none, K'.elim (trList v) [] [] []⟩ theorem tr_init (c v) : ∃ b, TrCfg (stepNormal c Cont.halt v) b ∧ Reaches₁ (TM2.step tr) (init c v) b := trNormal_respects _ _ _ _ theorem tr_eval (c v) : eval (TM2.step tr) (init c v) = halt <$> Code.eval c v := by obtain ⟨i, h₁, h₂⟩ := tr_init c v refine Part.ext fun x => ?_ rw [reaches_eval h₂.to_reflTransGen]; simp only [Part.map_eq_map, Part.mem_map_iff] refine ⟨fun h => ?_, ?_⟩ · obtain ⟨c, hc₁, hc₂⟩ := tr_eval_rev tr_respects h₁ h simp [stepNormal_eval] at hc₂ obtain ⟨v', hv, rfl⟩ := hc₂ exact ⟨_, hv, hc₁.symm⟩ · rintro ⟨v', hv, rfl⟩ have := Turing.tr_eval (b₁ := Cfg.halt v') tr_respects h₁ simp only [stepNormal_eval, Part.map_eq_map, Part.mem_map_iff, Cfg.halt.injEq, exists_eq_right] at this obtain ⟨_, ⟨⟩, h⟩ := this hv exact h /-- The set of machine states reachable via downward label jumps, discounting jumps via `ret`. -/ def trStmts₁ : Λ' → Finset Λ' \| Q@(Λ'.move _ _ _ q) => insert Q <\| trStmts₁ q \| Q@(Λ'.push _ _ q) => insert Q <\| trStmts₁ q \| Q@(Λ'.read q) => insert Q <\| Finset.univ.biUnion fun s => trStmts₁ (q s) \| Q@(Λ'.clear _ _ q) => insert Q <\| trStmts₁ q \| Q@(Λ'.copy q) => insert Q <\| trStmts₁ q \| Q@(Λ'.succ q) => insert Q <\| insert (unrev q) <\| trStmts₁ q \| Q@(Λ'.pred q₁ q₂) => insert Q <\| trStmts₁ q₁ ∪ insert (unrev q₂) (trStmts₁ q₂) \| Q@(Λ'.ret _) => {Q} theorem trStmts₁_trans {q q'} : q' ∈ trStmts₁ q → trStmts₁ q' ⊆ trStmts₁ q := by induction q with \| move _ _ _ q q_ih => _ \| clear _ _ q q_ih => _ \| copy q q_ih => _ \| push _ _ q q_ih => _ \| read q q_ih => _ \| succ q q_ih => _ \| pred q₁ q₂ q₁_ih q₂_ih => _ \| ret => _ <;> all_goals simp +contextual only [trStmts₁, Finset.mem_insert, Finset.mem_union, or_imp, Finset.mem_singleton, Finset.Subset.refl, imp_true_iff, true_and] repeat exact fun h => Finset.Subset.trans (q_ih h) (Finset.subset_insert _ _) · simp intro s h x h' simp only [Finset.mem_biUnion, Finset.mem_univ, true_and, Finset.mem_insert] exact Or.inr ⟨_, q_ih s h h'⟩ · constructor · rintro rfl apply Finset.subset_insert · intro h x h' simp only [Finset.mem_insert] exact Or.inr (Or.inr <\| q_ih h h') · refine ⟨fun h x h' => ?_, fun _ x h' => ?_, fun h x h' => ?_⟩ <;> simp · exact Or.inr (Or.inr <\| Or.inl <\| q₁_ih h h') · rcases Finset.mem_insert.1 h' with h' \| h' <;> simp [h', unrev] · exact Or.inr (Or.inr <\| Or.inr <\| q₂_ih h h') theorem trStmts₁_self (q) : q ∈ trStmts₁ q := by induction q <;> · first \|apply Finset.mem_singleton_self\|apply Finset.mem_insert_self /-- The (finite!) set of machine states visited during the course of evaluation of `c`, including the state `ret k` but not any states after that (that is, the states visited while evaluating `k`). -/ def codeSupp' : Code → Cont' → Finset Λ' \| c@Code.zero', k => trStmts₁ (trNormal c k) \| c@Code.succ, k => trStmts₁ (trNormal c k) \| c@Code.tail, k => trStmts₁ (trNormal c k) \| c@(Code.cons f fs), k => trStmts₁ (trNormal c k) ∪ (codeSupp' f (Cont'.cons₁ fs k) ∪ (trStmts₁ (move₂ (fun _ => false) main aux <\| move₂ (fun s => s = Γ'.consₗ) stack main <\| move₂ (fun _ => false) aux stack <\| trNormal fs (Cont'.cons₂ k)) ∪ (codeSupp' fs (Cont'.cons₂ k) ∪ trStmts₁ (head stack <\| Λ'.ret k)))) \| c@(Code.comp f g), k => trStmts₁ (trNormal c k) ∪ (codeSupp' g (Cont'.comp f k) ∪ (trStmts₁ (trNormal f k) ∪ codeSupp' f k)) \| c@(Code.case f g), k => trStmts₁ (trNormal c k) ∪ (codeSupp' f k ∪ codeSupp' g k) \| c@(Code.fix f), k => trStmts₁ (trNormal c k) ∪ (codeSupp' f (Cont'.fix f k) ∪ (trStmts₁ (Λ'.clear natEnd main <\| trNormal f (Cont'.fix f k)) ∪ {Λ'.ret k})) @[simp] theorem codeSupp'_self (c k) : trStmts₁ (trNormal c k) ⊆ codeSupp' c k := by cases c <;> first \| rfl \| exact Finset.union_subset_left (fun _ a ↦ a) /-- The (finite!) set of machine states visited during the course of evaluation of a continuation `k`, not including the initial state `ret k`. -/ def contSupp : Cont' → Finset Λ' \| Cont'.cons₁ fs k => trStmts₁ (move₂ (fun _ => false) main aux <\| move₂ (fun s => s = Γ'.consₗ) stack main <\| move₂ (fun _ => false) aux stack <\| trNormal fs (Cont'.cons₂ k)) ∪ (codeSupp' fs (Cont'.cons₂ k) ∪ (trStmts₁ (head stack <\| Λ'.ret k) ∪ contSupp k)) \| Cont'.cons₂ k => trStmts₁ (head stack <\| Λ'.ret k) ∪ contSupp k \| Cont'.comp f k => codeSupp' f k ∪ contSupp k \| Cont'.fix f k => codeSupp' (Code.fix f) k ∪ contSupp k \| Cont'.halt => ∅ /-- The (finite!) set of machine states visited during the course of evaluation of `c` in continuation `k`. This is actually closed under forward simulation (see `tr_supports`), and the existence of this set means that the machine constructed in this section is in fact a proper Turing machine, with a finite set of states. -/ def codeSupp (c : Code) (k : Cont') : Finset Λ' := codeSupp' c k ∪ contSupp k @[simp] theorem codeSupp_self (c k) : trStmts₁ (trNormal c k) ⊆ codeSupp c k := Finset.Subset.trans (codeSupp'_self _ _) (Finset.union_subset_left fun _ a ↦ a) @[simp] theorem codeSupp_zero (k) : codeSupp Code.zero' k = trStmts₁ (trNormal Code.zero' k) ∪ contSupp k := rfl @[simp] theorem codeSupp_succ (k) : codeSupp Code.succ k = trStmts₁ (trNormal Code.succ k) ∪ contSupp k := rfl @[simp] theorem codeSupp_tail (k) : codeSupp Code.tail k = trStmts₁ (trNormal Code.tail k) ∪ contSupp k := rfl @[simp] theorem codeSupp_cons (f fs k) : codeSupp (Code.cons f fs) k = trStmts₁ (trNormal (Code.cons f fs) k) ∪ codeSupp f (Cont'.cons₁ fs k) := by simp [codeSupp, codeSupp', contSupp, Finset.union_assoc] @[simp] theorem codeSupp_comp (f g k) : codeSupp (Code.comp f g) k = trStmts₁ (trNormal (Code.comp f g) k) ∪ codeSupp g (Cont'.comp f k) := by simp only [codeSupp, codeSupp', trNormal, Finset.union_assoc, contSupp] rw [← Finset.union_assoc _ _ (contSupp k), Finset.union_eq_right.2 (codeSupp'_self _ _)] @[simp] theorem codeSupp_case (f g k) : codeSupp (Code.case f g) k = trStmts₁ (trNormal (Code.case f g) k) ∪ (codeSupp f k ∪ codeSupp g k) := by simp [codeSupp, codeSupp', contSupp, Finset.union_assoc, Finset.union_left_comm] @[simp] theorem codeSupp_fix (f k) : codeSupp (Code.fix f) k = trStmts₁ (trNormal (Code.fix f) k) ∪ codeSupp f (Cont'.fix f k) := by simp [codeSupp, codeSupp', contSupp, Finset.union_assoc, Finset.union_left_comm, Finset.union_left_idem] @[simp] theorem contSupp_cons₁ (fs k) : contSupp (Cont'.cons₁ fs k) = trStmts₁ (move₂ (fun _ => false) main aux <\| move₂ (fun s => s = Γ'.consₗ) stack main <\| move₂ (fun _ => false) aux stack <\| trNormal fs (Cont'.cons₂ k)) ∪ codeSupp fs (Cont'.cons₂ k) := by simp [codeSupp, codeSupp', contSupp, Finset.union_assoc] @[simp] theorem contSupp_cons₂ (k) : contSupp (Cont'.cons₂ k) = trStmts₁ (head stack <\| Λ'.ret k) ∪ contSupp k := rfl @[simp] theorem contSupp_comp (f k) : contSupp (Cont'.comp f k) = codeSupp f k := rfl theorem contSupp_fix (f k) : contSupp (Cont'.fix f k) = codeSupp f (Cont'.fix f k) := by simp +contextual [codeSupp, codeSupp', contSupp, Finset.union_assoc, Finset.subset_iff] @[simp] theorem contSupp_halt : contSupp Cont'.halt = ∅ := rfl /-- The statement `Λ'.Supports S q` means that `contSupp k ⊆ S` for any `ret k` reachable from `q`. (This is a technical condition used in the proof that the machine is supported.) -/ def Λ'.Supports (S : Finset Λ') : Λ' → Prop \| Λ'.move _ _ _ q => Λ'.Supports S q \| Λ'.push _ _ q => Λ'.Supports S q \| Λ'.read q => ∀ s, Λ'.Supports S (q s) \| Λ'.clear _ _ q => Λ'.Supports S q \| Λ'.copy q => Λ'.Supports S q \| Λ'.succ q => Λ'.Supports S q \| Λ'.pred q₁ q₂ => Λ'.Supports S q₁ ∧ Λ'.Supports S q₂ \| Λ'.ret k => contSupp k ⊆ S /-- A shorthand for the predicate that we are proving in the main theorems `trStmts₁_supports`, `codeSupp'_supports`, `contSupp_supports`, `codeSupp_supports`. The set `S` is fixed throughout the proof, and denotes the full set of states in the machine, while `K` is a subset that we are currently proving a property about. The predicate asserts that every state in `K` is closed in `S` under forward simulation, i.e. stepping forward through evaluation starting from any state in `K` stays entirely within `S`. -/ def Supports (K S : Finset Λ') := ∀ q ∈ K, TM2.SupportsStmt S (tr q) theorem supports_insert {K S q} : Supports (insert q K) S ↔ TM2.SupportsStmt S (tr q) ∧ Supports K S := by simp [Supports] theorem supports_singleton {S q} : Supports {q} S ↔ TM2.SupportsStmt S (tr q) := by simp [Supports] theorem supports_union {K₁ K₂ S} : Supports (K₁ ∪ K₂) S ↔ Supports K₁ S ∧ Supports K₂ S := by simp [Supports, or_imp, forall_and] theorem supports_biUnion {K : Option Γ' → Finset Λ'} {S} : Supports (Finset.univ.biUnion K) S ↔ ∀ a, Supports (K a) S := by simpa [Supports] using forall_swap theorem head_supports {S k q} (H : (q : Λ').Supports S) : (head k q).Supports S := fun _ => by dsimp only; split_ifs <;> exact H theorem ret_supports {S k} (H₁ : contSupp k ⊆ S) : TM2.SupportsStmt S (tr (Λ'.ret k)) := by have W := fun {q} => trStmts₁_self q cases k with \| halt => trivial \| cons₁ => rw [contSupp_cons₁, Finset.union_subset_iff] at H₁; exact fun _ => H₁.1 W \| cons₂ => rw [contSupp_cons₂, Finset.union_subset_iff] at H₁; exact fun _ => H₁.1 W \| comp => rw [contSupp_comp] at H₁; exact fun _ => H₁ (codeSupp_self _ _ W) \| fix => rw [contSupp_fix] at H₁ have L := @Finset.mem_union_left; have R := @Finset.mem_union_right intro s; dsimp only; cases natEnd s.iget · refine H₁ (R _ <\| L _ <\| R _ <\| R _ <\| L _ W) · exact H₁ (R _ <\| L _ <\| R _ <\| R _ <\| R _ <\| Finset.mem_singleton_self _) theorem trStmts₁_supports {S q} (H₁ : (q : Λ').Supports S) (HS₁ : trStmts₁ q ⊆ S) : Supports (trStmts₁ q) S := by have W := fun {q} => trStmts₁_self q induction q with \| move _ _ _ q q_ih => _ \| clear _ _ q q_ih => _ \| copy q q_ih => _ \| push _ _ q q_ih => _ \| read q q_ih => _ \| succ q q_ih => _ \| pred q₁ q₂ q₁_ih q₂_ih => _ \| ret => _ <;> simp [trStmts₁, -Finset.singleton_subset_iff] at HS₁ ⊢ any_goals obtain ⟨h₁, h₂⟩ := Finset.insert_subset_iff.1 HS₁ first \| have h₃ := h₂ W \| try simp [Finset.subset_iff] at h₂ · exact supports_insert.2 ⟨⟨fun _ => h₃, fun _ => h₁⟩, q_ih H₁ h₂⟩ -- move · exact supports_insert.2 ⟨⟨fun _ => h₃, fun _ => h₁⟩, q_ih H₁ h₂⟩ -- clear · exact supports_insert.2 ⟨⟨fun _ => h₁, fun _ => h₃⟩, q_ih H₁ h₂⟩ -- copy · exact supports_insert.2 ⟨⟨fun _ => h₃, fun _ => h₃⟩, q_ih H₁ h₂⟩ -- push · refine supports_insert.2 ⟨fun _ => h₂ _ W, ?_⟩ -- read exact supports_biUnion.2 fun _ => q_ih _ (H₁ _) fun _ h => h₂ _ h · refine supports_insert.2 ⟨⟨fun _ => h₁, fun _ => h₂.1, fun _ => h₂.1⟩, ?_⟩ -- succ exact supports_insert.2 ⟨⟨fun _ => h₂.2 _ W, fun _ => h₂.1⟩, q_ih H₁ h₂.2⟩ · refine -- pred supports_insert.2 ⟨⟨fun _ => h₁, fun _ => h₂.2 _ (Or.inl W), fun _ => h₂.1, fun _ => h₂.1⟩, ?_⟩ refine supports_insert.2 ⟨⟨fun _ => h₂.2 _ (Or.inr W), fun _ => h₂.1⟩, ?_⟩ refine supports_union.2 ⟨?_, ?_⟩ · exact q₁_ih H₁.1 fun _ h => h₂.2 _ (Or.inl h) · exact q₂_ih H₁.2 fun _ h => h₂.2 _ (Or.inr h) · exact supports_singleton.2 (ret_supports H₁) -- ret theorem trStmts₁_supports' {S q K} (H₁ : (q : Λ').Supports S) (H₂ : trStmts₁ q ∪ K ⊆ S) (H₃ : K ⊆ S → Supports K S) : Supports (trStmts₁ q ∪ K) S := by simp only [Finset.union_subset_iff] at H₂ exact supports_union.2 ⟨trStmts₁_supports H₁ H₂.1, H₃ H₂.2⟩ theorem trNormal_supports {S c k} (Hk : codeSupp c k ⊆ S) : (trNormal c k).Supports S := by induction c generalizing k with simp [Λ'.Supports, head] \| zero' => exact Finset.union_subset_right Hk \| succ => intro; split_ifs <;> exact Finset.union_subset_right Hk \| tail => exact Finset.union_subset_right Hk \| cons f fs IHf _ => apply IHf rw [codeSupp_cons] at Hk exact Finset.union_subset_right Hk \| comp f g _ IHg => apply IHg; rw [codeSupp_comp] at Hk; exact Finset.union_subset_right Hk \| case f g IHf IHg => simp only [codeSupp_case, Finset.union_subset_iff] at Hk exact ⟨IHf Hk.2.1, IHg Hk.2.2⟩ \| fix f IHf => apply IHf; rw [codeSupp_fix] at Hk; exact Finset.union_subset_right Hk theorem codeSupp'_supports {S c k} (H : codeSupp c k ⊆ S) : Supports (codeSupp' c k) S := by induction c generalizing k with \| cons f fs IHf IHfs => have H' := H; simp only [codeSupp_cons, Finset.union_subset_iff] at H' refine trStmts₁_supports' (trNormal_supports H) (Finset.union_subset_left H) fun h => ?_ refine supports_union.2 ⟨IHf H'.2, ?_⟩ refine trStmts₁_supports' (trNormal_supports ?_) (Finset.union_subset_right h) fun h => ?_ · simp only [codeSupp, Finset.union_subset_iff, contSupp] at h H ⊢ exact ⟨h.2.2.1, h.2.2.2, H.2⟩ refine supports_union.2 ⟨IHfs ?_, ?_⟩ · rw [codeSupp, contSupp_cons₁] at H' exact Finset.union_subset_right (Finset.union_subset_right H'.2) exact trStmts₁_supports (head_supports <\| Finset.union_subset_right H) (Finset.union_subset_right h) \| comp f g IHf IHg => have H' := H; rw [codeSupp_comp] at H'; have H' := Finset.union_subset_right H' refine trStmts₁_supports' (trNormal_supports H) (Finset.union_subset_left H) fun h => ?_ refine supports_union.2 ⟨IHg H', ?_⟩ refine trStmts₁_supports' (trNormal_supports ?_) (Finset.union_subset_right h) fun _ => ?_ · simp only [codeSupp', codeSupp, Finset.union_subset_iff, contSupp] at h H ⊢ exact ⟨h.2.2, H.2⟩ exact IHf (Finset.union_subset_right H') \| case f g IHf IHg => have H' := H; simp only [codeSupp_case, Finset.union_subset_iff] at H' refine trStmts₁_supports' (trNormal_supports H) (Finset.union_subset_left H) fun _ => ?_ exact supports_union.2 ⟨IHf H'.2.1, IHg H'.2.2⟩ \| fix f IHf => have H' := H; simp only [codeSupp_fix, Finset.union_subset_iff] at H' refine trStmts₁_supports' (trNormal_supports H) (Finset.union_subset_left H) fun h => ?_ refine supports_union.2 ⟨IHf H'.2, ?_⟩ refine trStmts₁_supports' (trNormal_supports ?_) (Finset.union_subset_right h) fun _ => ?_ · simp only [codeSupp', codeSupp, Finset.union_subset_iff, contSupp, trStmts₁, Finset.insert_subset_iff] at h H ⊢ exact ⟨h.1, ⟨H.1.1, h⟩, H.2⟩ exact supports_singleton.2 (ret_supports <\| Finset.union_subset_right H) \| _ => exact trStmts₁_supports (trNormal_supports H) (Finset.Subset.trans (codeSupp_self _ _) H) theorem contSupp_supports {S k} (H : contSupp k ⊆ S) : Supports (contSupp k) S := by induction k with \| halt => simp [contSupp_halt, Supports] \| cons₁ f k IH => have H₁ := H; rw [contSupp_cons₁] at H₁; have H₂ := Finset.union_subset_right H₁ refine trStmts₁_supports' (trNormal_supports H₂) H₁ fun h => ?_ refine supports_union.2 ⟨codeSupp'_supports H₂, ?_⟩ simp only [codeSupp, contSupp_cons₂, Finset.union_subset_iff] at H₂ exact trStmts₁_supports' (head_supports H₂.2.2) (Finset.union_subset_right h) IH \| cons₂ k IH => have H' := H; rw [contSupp_cons₂] at H' exact trStmts₁_supports' (head_supports <\| Finset.union_subset_right H') H' IH \| comp f k IH => have H' := H; rw [contSupp_comp] at H'; have H₂ := Finset.union_subset_right H' exact supports_union.2 ⟨codeSupp'_supports H', IH H₂⟩ \| fix f k IH => rw [contSupp] at H exact supports_union.2 ⟨codeSupp'_supports H, IH (Finset.union_subset_right H)⟩ theorem codeSupp_supports {S c k} (H : codeSupp c k ⊆ S) : Supports (codeSupp c k) S := supports_union.2 ⟨codeSupp'_supports H, contSupp_supports (Finset.union_subset_right H)⟩ /-- The set `codeSupp c k` is a finite set that witnesses the effective finiteness of the `tr` Turing machine. Starting from the initial state `trNormal c k`, forward simulation uses only states in `codeSupp c k`, so this is a finite state machine. Even though the underlying type of state labels `Λ'` is infinite, for a given partial recursive function `c` and continuation `k`, only finitely many states are accessed, corresponding roughly to subterms of `c`. -/ theorem tr_supports (c k) : @TM2.Supports _ _ _ _ ⟨trNormal c k⟩ tr (codeSupp c k) := ⟨codeSupp_self _ _ (trStmts₁_self _), fun _ => codeSupp_supports (Finset.Subset.refl _) _⟩ end end PartrecToTM2 end Turing		Mathlib/Computability/TMToPartrec.lean	1,928	1,929
/- 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.MeasureTheory.MeasurableSpace.MeasurablyGenerated import Mathlib.MeasureTheory.Measure.NullMeasurable import Mathlib.Order.Interval.Set.Monotone /-! # Measure spaces The definition of a measure and a measure space are in `MeasureTheory.MeasureSpaceDef`, with only a few basic properties. This file provides many more properties of these objects. This separation allows the measurability tactic to import only the file `MeasureSpaceDef`, and to be available in `MeasureSpace` (through `MeasurableSpace`). Given a measurable space `α`, a measure on `α` is a function that sends measurable sets to the extended nonnegative reals that satisfies the following conditions: 1. `μ ∅ = 0`; 2. `μ` is countably additive. This means that the measure of a countable union of pairwise disjoint sets is equal to the measure of the individual sets. Every measure can be canonically extended to an outer measure, so that it assigns values to all subsets, not just the measurable subsets. On the other hand, a measure that is countably additive on measurable sets can be restricted to measurable sets to obtain a measure. In this file a measure is defined to be an outer measure that is countably additive on measurable sets, with the additional assumption that the outer measure is the canonical extension of the restricted measure. Measures on `α` form a complete lattice, and are closed under scalar multiplication with `ℝ≥0∞`. Given a measure, the null sets are the sets where `μ s = 0`, where `μ` denotes the corresponding outer measure (so `s` might not be measurable). We can then define the completion of `μ` as the measure on the least `σ`-algebra that also contains all null sets, by defining the measure to be `0` on the null sets. ## Main statements * `completion` is the completion of a measure to all null measurable sets. * `Measure.ofMeasurable` and `OuterMeasure.toMeasure` are two important ways to define a measure. ## Implementation notes Given `μ : Measure α`, `μ s` is the value of the outer measure applied to `s`. This conveniently allows us to apply the measure to sets without proving that they are measurable. We get countable subadditivity for all sets, but only countable additivity for measurable sets. You often don't want to define a measure via its constructor. Two ways that are sometimes more convenient: * `Measure.ofMeasurable` is a way to define a measure by only giving its value on measurable sets and proving the properties (1) and (2) mentioned above. * `OuterMeasure.toMeasure` is a way of obtaining a measure from an outer measure by showing that all measurable sets in the measurable space are Carathéodory measurable. To prove that two measures are equal, there are multiple options: * `ext`: two measures are equal if they are equal on all measurable sets. * `ext_of_generateFrom_of_iUnion`: two measures are equal if they are equal on a π-system generating the measurable sets, if the π-system contains a spanning increasing sequence of sets where the measures take finite value (in particular the measures are σ-finite). This is a special case of the more general `ext_of_generateFrom_of_cover` * `ext_of_generate_finite`: two finite measures are equal if they are equal on a π-system generating the measurable sets. This is a special case of `ext_of_generateFrom_of_iUnion` using `C ∪ {univ}`, but is easier to work with. A `MeasureSpace` is a class that is a measurable space with a canonical measure. The measure is denoted `volume`. ## References * <https://en.wikipedia.org/wiki/Measure_(mathematics)> * <https://en.wikipedia.org/wiki/Complete_measure> * <https://en.wikipedia.org/wiki/Almost_everywhere> ## Tags measure, almost everywhere, measure space, completion, null set, null measurable set -/ noncomputable section open Set open Filter hiding map open Function MeasurableSpace Topology Filter ENNReal NNReal Interval MeasureTheory open scoped symmDiff variable {α β γ δ ι R R' : Type} namespace MeasureTheory section variable {m : MeasurableSpace α} {μ μ₁ μ₂ : Measure α} {s s₁ s₂ t : Set α} instance ae_isMeasurablyGenerated : IsMeasurablyGenerated (ae μ) := ⟨fun _s hs => let ⟨t, hst, htm, htμ⟩ := exists_measurable_superset_of_null hs ⟨tᶜ, compl_mem_ae_iff.2 htμ, htm.compl, compl_subset_comm.1 hst⟩⟩ /-- See also `MeasureTheory.ae_restrict_uIoc_iff`. -/ theorem ae_uIoc_iff [LinearOrder α] {a b : α} {P : α → Prop} : (∀ᵐ x ∂μ, x ∈ Ι a b → P x) ↔ (∀ᵐ x ∂μ, x ∈ Ioc a b → P x) ∧ ∀ᵐ x ∂μ, x ∈ Ioc b a → P x := by simp only [uIoc_eq_union, mem_union, or_imp, eventually_and] theorem measure_union (hd : Disjoint s₁ s₂) (h : MeasurableSet s₂) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀ h.nullMeasurableSet hd.aedisjoint theorem measure_union' (hd : Disjoint s₁ s₂) (h : MeasurableSet s₁) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀' h.nullMeasurableSet hd.aedisjoint theorem measure_inter_add_diff (s : Set α) (ht : MeasurableSet t) : μ (s ∩ t) + μ (s \ t) = μ s := measure_inter_add_diff₀ _ ht.nullMeasurableSet theorem measure_diff_add_inter (s : Set α) (ht : MeasurableSet t) : μ (s \ t) + μ (s ∩ t) = μ s := (add_comm _ _).trans (measure_inter_add_diff s ht) theorem measure_diff_eq_top (hs : μ s = ∞) (ht : μ t ≠ ∞) : μ (s \ t) = ∞ := by contrapose! hs exact ((measure_mono (subset_diff_union s t)).trans_lt ((measure_union_le _ _).trans_lt (ENNReal.add_lt_top.2 ⟨hs.lt_top, ht.lt_top⟩))).ne theorem measure_union_add_inter (s : Set α) (ht : MeasurableSet t) : μ (s ∪ t) + μ (s ∩ t) = μ s + μ t := by rw [← measure_inter_add_diff (s ∪ t) ht, Set.union_inter_cancel_right, union_diff_right, ← measure_inter_add_diff s ht] ac_rfl theorem measure_union_add_inter' (hs : MeasurableSet s) (t : Set α) : μ (s ∪ t) + μ (s ∩ t) = μ s + μ t := by rw [union_comm, inter_comm, measure_union_add_inter t hs, add_comm] lemma measure_symmDiff_eq (hs : NullMeasurableSet s μ) (ht : NullMeasurableSet t μ) : μ (s ∆ t) = μ (s \ t) + μ (t \ s) := by simpa only [symmDiff_def, sup_eq_union] using measure_union₀ (ht.diff hs) disjoint_sdiff_sdiff.aedisjoint lemma measure_symmDiff_le (s t u : Set α) : μ (s ∆ u) ≤ μ (s ∆ t) + μ (t ∆ u) := le_trans (μ.mono <\| symmDiff_triangle s t u) (measure_union_le (s ∆ t) (t ∆ u)) theorem measure_symmDiff_eq_top (hs : μ s ≠ ∞) (ht : μ t = ∞) : μ (s ∆ t) = ∞ := measure_mono_top subset_union_right (measure_diff_eq_top ht hs) theorem measure_add_measure_compl (h : MeasurableSet s) : μ s + μ sᶜ = μ univ := measure_add_measure_compl₀ h.nullMeasurableSet theorem measure_biUnion₀ {s : Set β} {f : β → Set α} (hs : s.Countable) (hd : s.Pairwise (AEDisjoint μ on f)) (h : ∀ b ∈ s, NullMeasurableSet (f b) μ) : μ (⋃ b ∈ s, f b) = ∑' p : s, μ (f p) := by haveI := hs.toEncodable rw [biUnion_eq_iUnion] exact measure_iUnion₀ (hd.on_injective Subtype.coe_injective fun x => x.2) fun x => h x x.2 theorem measure_biUnion {s : Set β} {f : β → Set α} (hs : s.Countable) (hd : s.PairwiseDisjoint f) (h : ∀ b ∈ s, MeasurableSet (f b)) : μ (⋃ b ∈ s, f b) = ∑' p : s, μ (f p) := measure_biUnion₀ hs hd.aedisjoint fun b hb => (h b hb).nullMeasurableSet theorem measure_sUnion₀ {S : Set (Set α)} (hs : S.Countable) (hd : S.Pairwise (AEDisjoint μ)) (h : ∀ s ∈ S, NullMeasurableSet s μ) : μ (⋃₀ S) = ∑' s : S, μ s := by rw [sUnion_eq_biUnion, measure_biUnion₀ hs hd h] theorem measure_sUnion {S : Set (Set α)} (hs : S.Countable) (hd : S.Pairwise Disjoint) (h : ∀ s ∈ S, MeasurableSet s) : μ (⋃₀ S) = ∑' s : S, μ s := by rw [sUnion_eq_biUnion, measure_biUnion hs hd h] theorem measure_biUnion_finset₀ {s : Finset ι} {f : ι → Set α} (hd : Set.Pairwise (↑s) (AEDisjoint μ on f)) (hm : ∀ b ∈ s, NullMeasurableSet (f b) μ) : μ (⋃ b ∈ s, f b) = ∑ p ∈ s, μ (f p) := by rw [← Finset.sum_attach, Finset.attach_eq_univ, ← tsum_fintype] exact measure_biUnion₀ s.countable_toSet hd hm theorem measure_biUnion_finset {s : Finset ι} {f : ι → Set α} (hd : PairwiseDisjoint (↑s) f) (hm : ∀ b ∈ s, MeasurableSet (f b)) : μ (⋃ b ∈ s, f b) = ∑ p ∈ s, μ (f p) := measure_biUnion_finset₀ hd.aedisjoint fun b hb => (hm b hb).nullMeasurableSet /-- The measure of an a.e. disjoint union (even uncountable) of null-measurable sets is at least the sum of the measures of the sets. -/ theorem tsum_meas_le_meas_iUnion_of_disjoint₀ {ι : Type} {_ : MeasurableSpace α} (μ : Measure α) {As : ι → Set α} (As_mble : ∀ i : ι, NullMeasurableSet (As i) μ) (As_disj : Pairwise (AEDisjoint μ on As)) : (∑' i, μ (As i)) ≤ μ (⋃ i, As i) := by rw [ENNReal.tsum_eq_iSup_sum, iSup_le_iff] intro s simp only [← measure_biUnion_finset₀ (fun _i _hi _j _hj hij => As_disj hij) fun i _ => As_mble i] gcongr exact iUnion_subset fun _ ↦ Subset.rfl /-- The measure of a disjoint union (even uncountable) of measurable sets is at least the sum of the measures of the sets. -/ theorem tsum_meas_le_meas_iUnion_of_disjoint {ι : Type*} {_ : MeasurableSpace α} (μ : Measure α) {As : ι → Set α} (As_mble : ∀ i : ι, MeasurableSet (As i)) (As_disj : Pairwise (Disjoint on As)) : (∑' i, μ (As i)) ≤ μ (⋃ i, As i) := tsum_meas_le_meas_iUnion_of_disjoint₀ μ (fun i ↦ (As_mble i).nullMeasurableSet) (fun _ _ h ↦ Disjoint.aedisjoint (As_disj h)) /-- If `s` is a countable set, then the measure of its preimage can be found as the sum of measures of the fibers `f ⁻¹' {y}`. -/ theorem tsum_measure_preimage_singleton {s : Set β} (hs : s.Countable) {f : α → β} (hf : ∀ y ∈ s, MeasurableSet (f ⁻¹' {y})) : (∑' b : s, μ (f ⁻¹' {↑b})) = μ (f ⁻¹' s) := by rw [← Set.biUnion_preimage_singleton, measure_biUnion hs (pairwiseDisjoint_fiber f s) hf] lemma measure_preimage_eq_zero_iff_of_countable {s : Set β} {f : α → β} (hs : s.Countable) : μ (f ⁻¹' s) = 0 ↔ ∀ x ∈ s, μ (f ⁻¹' {x}) = 0 := by rw [← biUnion_preimage_singleton, measure_biUnion_null_iff hs] /-- If `s` is a `Finset`, then the measure of its preimage can be found as the sum of measures of the fibers `f ⁻¹' {y}`. -/ theorem sum_measure_preimage_singleton (s : Finset β) {f : α → β} (hf : ∀ y ∈ s, MeasurableSet (f ⁻¹' {y})) : (∑ b ∈ s, μ (f ⁻¹' {b})) = μ (f ⁻¹' ↑s) := by simp only [← measure_biUnion_finset (pairwiseDisjoint_fiber f s) hf, Finset.set_biUnion_preimage_singleton] @[simp] lemma sum_measure_singleton {s : Finset α} [MeasurableSingletonClass α] : ∑ x ∈ s, μ {x} = μ s := by trans ∑ x ∈ s, μ (id ⁻¹' {x}) · simp rw [sum_measure_preimage_singleton] · simp · simp theorem measure_diff_null' (h : μ (s₁ ∩ s₂) = 0) : μ (s₁ \ s₂) = μ s₁ := measure_congr <\| diff_ae_eq_self.2 h theorem measure_add_diff (hs : NullMeasurableSet s μ) (t : Set α) : μ s + μ (t \ s) = μ (s ∪ t) := by rw [← measure_union₀' hs disjoint_sdiff_right.aedisjoint, union_diff_self] theorem measure_diff' (s : Set α) (hm : NullMeasurableSet t μ) (h_fin : μ t ≠ ∞) : μ (s \ t) = μ (s ∪ t) - μ t := ENNReal.eq_sub_of_add_eq h_fin <\| by rw [add_comm, measure_add_diff hm, union_comm] theorem measure_diff (h : s₂ ⊆ s₁) (h₂ : NullMeasurableSet s₂ μ) (h_fin : μ s₂ ≠ ∞) : μ (s₁ \ s₂) = μ s₁ - μ s₂ := by rw [measure_diff' _ h₂ h_fin, union_eq_self_of_subset_right h] theorem le_measure_diff : μ s₁ - μ s₂ ≤ μ (s₁ \ s₂) := tsub_le_iff_left.2 <\| (measure_le_inter_add_diff μ s₁ s₂).trans <\| by gcongr; apply inter_subset_right /-- If the measure of the symmetric difference of two sets is finite, then one has infinite measure if and only if the other one does. -/ theorem measure_eq_top_iff_of_symmDiff (hμst : μ (s ∆ t) ≠ ∞) : μ s = ∞ ↔ μ t = ∞ := by suffices h : ∀ u v, μ (u ∆ v) ≠ ∞ → μ u = ∞ → μ v = ∞ from ⟨h s t hμst, h t s (symmDiff_comm s t ▸ hμst)⟩ intro u v hμuv hμu by_contra! hμv apply hμuv rw [Set.symmDiff_def, eq_top_iff] calc ∞ = μ u - μ v := by rw [ENNReal.sub_eq_top_iff.2 ⟨hμu, hμv⟩] _ ≤ μ (u \ v) := le_measure_diff _ ≤ μ (u \ v ∪ v \ u) := measure_mono subset_union_left /-- If the measure of the symmetric difference of two sets is finite, then one has finite measure if and only if the other one does. -/ theorem measure_ne_top_iff_of_symmDiff (hμst : μ (s ∆ t) ≠ ∞) : μ s ≠ ∞ ↔ μ t ≠ ∞ := (measure_eq_top_iff_of_symmDiff hμst).ne theorem measure_diff_lt_of_lt_add (hs : NullMeasurableSet s μ) (hst : s ⊆ t) (hs' : μ s ≠ ∞) {ε : ℝ≥0∞} (h : μ t < μ s + ε) : μ (t \ s) < ε := by rw [measure_diff hst hs hs']; rw [add_comm] at h exact ENNReal.sub_lt_of_lt_add (measure_mono hst) h theorem measure_diff_le_iff_le_add (hs : NullMeasurableSet s μ) (hst : s ⊆ t) (hs' : μ s ≠ ∞) {ε : ℝ≥0∞} : μ (t \ s) ≤ ε ↔ μ t ≤ μ s + ε := by rw [measure_diff hst hs hs', tsub_le_iff_left] theorem measure_eq_measure_of_null_diff {s t : Set α} (hst : s ⊆ t) (h_nulldiff : μ (t \ s) = 0) : μ s = μ t := measure_congr <\| EventuallyLE.antisymm (HasSubset.Subset.eventuallyLE hst) (ae_le_set.mpr h_nulldiff) theorem measure_eq_measure_of_between_null_diff {s₁ s₂ s₃ : Set α} (h12 : s₁ ⊆ s₂) (h23 : s₂ ⊆ s₃) (h_nulldiff : μ (s₃ \ s₁) = 0) : μ s₁ = μ s₂ ∧ μ s₂ = μ s₃ := by have le12 : μ s₁ ≤ μ s₂ := measure_mono h12 have le23 : μ s₂ ≤ μ s₃ := measure_mono h23 have key : μ s₃ ≤ μ s₁ := calc μ s₃ = μ (s₃ \ s₁ ∪ s₁) := by rw [diff_union_of_subset (h12.trans h23)] _ ≤ μ (s₃ \ s₁) + μ s₁ := measure_union_le _ _ _ = μ s₁ := by simp only [h_nulldiff, zero_add] exact ⟨le12.antisymm (le23.trans key), le23.antisymm (key.trans le12)⟩ theorem measure_eq_measure_smaller_of_between_null_diff {s₁ s₂ s₃ : Set α} (h12 : s₁ ⊆ s₂) (h23 : s₂ ⊆ s₃) (h_nulldiff : μ (s₃ \ s₁) = 0) : μ s₁ = μ s₂ := (measure_eq_measure_of_between_null_diff h12 h23 h_nulldiff).1 theorem measure_eq_measure_larger_of_between_null_diff {s₁ s₂ s₃ : Set α} (h12 : s₁ ⊆ s₂) (h23 : s₂ ⊆ s₃) (h_nulldiff : μ (s₃ \ s₁) = 0) : μ s₂ = μ s₃ := (measure_eq_measure_of_between_null_diff h12 h23 h_nulldiff).2 lemma measure_compl₀ (h : NullMeasurableSet s μ) (hs : μ s ≠ ∞) : μ sᶜ = μ Set.univ - μ s := by rw [← measure_add_measure_compl₀ h, ENNReal.add_sub_cancel_left hs] theorem measure_compl (h₁ : MeasurableSet s) (h_fin : μ s ≠ ∞) : μ sᶜ = μ univ - μ s := measure_compl₀ h₁.nullMeasurableSet h_fin lemma measure_inter_conull' (ht : μ (s \ t) = 0) : μ (s ∩ t) = μ s := by rw [← diff_compl, measure_diff_null']; rwa [← diff_eq] lemma measure_inter_conull (ht : μ tᶜ = 0) : μ (s ∩ t) = μ s := by rw [← diff_compl, measure_diff_null ht] @[simp] theorem union_ae_eq_left_iff_ae_subset : (s ∪ t : Set α) =ᵐ[μ] s ↔ t ≤ᵐ[μ] s := by rw [ae_le_set] refine ⟨fun h => by simpa only [union_diff_left] using (ae_eq_set.mp h).1, fun h => eventuallyLE_antisymm_iff.mpr ⟨by rwa [ae_le_set, union_diff_left], HasSubset.Subset.eventuallyLE subset_union_left⟩⟩ @[simp] theorem union_ae_eq_right_iff_ae_subset : (s ∪ t : Set α) =ᵐ[μ] t ↔ s ≤ᵐ[μ] t := by rw [union_comm, union_ae_eq_left_iff_ae_subset] theorem ae_eq_of_ae_subset_of_measure_ge (h₁ : s ≤ᵐ[μ] t) (h₂ : μ t ≤ μ s) (hsm : NullMeasurableSet s μ) (ht : μ t ≠ ∞) : s =ᵐ[μ] t := by	refine eventuallyLE_antisymm_iff.mpr ⟨h₁, ae_le_set.mpr ?_⟩ replace h₂ : μ t = μ s := h₂.antisymm (measure_mono_ae h₁) replace ht : μ s ≠ ∞ := h₂ ▸ ht rw [measure_diff' t hsm ht, measure_congr (union_ae_eq_left_iff_ae_subset.mpr h₁), h₂, tsub_self] /-- If `s ⊆ t`, `μ t ≤ μ s`, `μ t ≠ ∞`, and `s` is measurable, then `s =ᵐ[μ] t`. -/ theorem ae_eq_of_subset_of_measure_ge (h₁ : s ⊆ t) (h₂ : μ t ≤ μ s) (hsm : NullMeasurableSet s μ)	Mathlib/MeasureTheory/Measure/MeasureSpace.lean	319	325
/- Copyright (c) 2022 Markus Himmel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Markus Himmel -/ import Mathlib.Data.Opposite import Mathlib.Data.Set.Operations /-! # The opposite of a set The opposite of a set `s` is simply the set obtained by taking the opposite of each member of `s`. -/ variable {α : Type*} open Opposite namespace Set /-- The opposite of a set `s` is the set obtained by taking the opposite of each member of `s`. -/ protected def op (s : Set α) : Set αᵒᵖ := unop ⁻¹' s /-- The unop of a set `s` is the set obtained by taking the unop of each member of `s`. -/ protected def unop (s : Set αᵒᵖ) : Set α := op ⁻¹' s @[simp] theorem mem_op {s : Set α} {a : αᵒᵖ} : a ∈ s.op ↔ unop a ∈ s := Iff.rfl @[simp 1100] theorem op_mem_op {s : Set α} {a : α} : op a ∈ s.op ↔ a ∈ s := by rfl @[simp] theorem mem_unop {s : Set αᵒᵖ} {a : α} : a ∈ s.unop ↔ op a ∈ s := Iff.rfl @[simp 1100] theorem unop_mem_unop {s : Set αᵒᵖ} {a : αᵒᵖ} : unop a ∈ s.unop ↔ a ∈ s := by rfl @[simp] theorem op_unop (s : Set α) : s.op.unop = s := rfl @[simp] theorem unop_op (s : Set αᵒᵖ) : s.unop.op = s := rfl /-- The members of the opposite of a set are in bijection with the members of the set itself. -/ @[simps] def opEquiv_self (s : Set α) : s.op ≃ s := ⟨fun x ↦ ⟨unop x, x.2⟩, fun x ↦ ⟨op x, x.2⟩, fun _ ↦ rfl, fun _ ↦ rfl⟩ /-- Taking opposites as an equivalence of powersets. -/ @[simps] def opEquiv : Set α ≃ Set αᵒᵖ := ⟨Set.op, Set.unop, op_unop, unop_op⟩ @[simp] theorem singleton_op (x : α) : ({x} : Set α).op = {op x} := by ext constructor · apply unop_injective · apply op_injective @[simp] theorem singleton_unop (x : αᵒᵖ) : ({x} : Set αᵒᵖ).unop = {unop x} := by ext constructor · apply op_injective · apply unop_injective @[simp 1100] theorem singleton_op_unop (x : α) : ({op x} : Set αᵒᵖ).unop = {x} := by ext	constructor · apply op_injective · apply unop_injective @[simp 1100]	Mathlib/Data/Set/Opposite.lean	76	80
/- Copyright (c) 2023 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne, Peter Pfaffelhuber, Yaël Dillies, Kin Yau James Wong -/ import Mathlib.MeasureTheory.MeasurableSpace.Constructions import Mathlib.MeasureTheory.PiSystem import Mathlib.Topology.Constructions /-! # π-systems of cylinders and square cylinders The instance `MeasurableSpace.pi` on `∀ i, α i`, where each `α i` has a `MeasurableSpace` `m i`, is defined as `⨆ i, (m i).comap (fun a => a i)`. That is, a function `g : β → ∀ i, α i` is measurable iff for all `i`, the function `b ↦ g b i` is measurable. We define two π-systems generating `MeasurableSpace.pi`, cylinders and square cylinders. ## Main definitions Given a finite set `s` of indices, a cylinder is the product of a set of `∀ i : s, α i` and of `univ` on the other indices. A square cylinder is a cylinder for which the set on `∀ i : s, α i` is a product set. * `cylinder s S`: cylinder with base set `S : Set (∀ i : s, α i)` where `s` is a `Finset` * `squareCylinders C` with `C : ∀ i, Set (Set (α i))`: set of all square cylinders such that for all `i` in the finset defining the box, the projection to `α i` belongs to `C i`. The main application of this is with `C i = {s : Set (α i) \| MeasurableSet s}`. * `measurableCylinders`: set of all cylinders with measurable base sets. * `cylinderEvents Δ`: The σ-algebra of cylinder events on `Δ`. It is the smallest σ-algebra making the projections on the `i`-th coordinate continuous for all `i ∈ Δ`. ## Main statements * `generateFrom_squareCylinders`: square cylinders formed from measurable sets generate the product σ-algebra * `generateFrom_measurableCylinders`: cylinders formed from measurable sets generate the product σ-algebra -/ open Function Set namespace MeasureTheory variable {ι : Type _} {α : ι → Type _} section squareCylinders /-- Given a finite set `s` of indices, a square cylinder is the product of a set `S` of `∀ i : s, α i` and of `univ` on the other indices. The set `S` is a product of sets `t i` such that for all `i : s`, `t i ∈ C i`. `squareCylinders` is the set of all such squareCylinders. -/ def squareCylinders (C : ∀ i, Set (Set (α i))) : Set (Set (∀ i, α i)) := {S \| ∃ s : Finset ι, ∃ t ∈ univ.pi C, S = (s : Set ι).pi t} theorem squareCylinders_eq_iUnion_image (C : ∀ i, Set (Set (α i))) : squareCylinders C = ⋃ s : Finset ι, (fun t ↦ (s : Set ι).pi t) '' univ.pi C := by ext1 f simp only [squareCylinders, mem_iUnion, mem_image, mem_univ_pi, exists_prop, mem_setOf_eq, eq_comm (a := f)] theorem isPiSystem_squareCylinders {C : ∀ i, Set (Set (α i))} (hC : ∀ i, IsPiSystem (C i)) (hC_univ : ∀ i, univ ∈ C i) : IsPiSystem (squareCylinders C) := by rintro S₁ ⟨s₁, t₁, h₁, rfl⟩ S₂ ⟨s₂, t₂, h₂, rfl⟩ hst_nonempty classical let t₁' := s₁.piecewise t₁ (fun i ↦ univ) let t₂' := s₂.piecewise t₂ (fun i ↦ univ) have h1 : ∀ i ∈ (s₁ : Set ι), t₁ i = t₁' i := fun i hi ↦ (Finset.piecewise_eq_of_mem _ _ _ hi).symm have h1' : ∀ i ∉ (s₁ : Set ι), t₁' i = univ := fun i hi ↦ Finset.piecewise_eq_of_not_mem _ _ _ hi have h2 : ∀ i ∈ (s₂ : Set ι), t₂ i = t₂' i := fun i hi ↦ (Finset.piecewise_eq_of_mem _ _ _ hi).symm have h2' : ∀ i ∉ (s₂ : Set ι), t₂' i = univ := fun i hi ↦ Finset.piecewise_eq_of_not_mem _ _ _ hi rw [Set.pi_congr rfl h1, Set.pi_congr rfl h2, ← union_pi_inter h1' h2'] refine ⟨s₁ ∪ s₂, fun i ↦ t₁' i ∩ t₂' i, ?_, ?_⟩ · rw [mem_univ_pi] intro i have : (t₁' i ∩ t₂' i).Nonempty := by obtain ⟨f, hf⟩ := hst_nonempty rw [Set.pi_congr rfl h1, Set.pi_congr rfl h2, mem_inter_iff, mem_pi, mem_pi] at hf refine ⟨f i, ⟨?_, ?_⟩⟩ · by_cases hi₁ : i ∈ s₁ · exact hf.1 i hi₁ · rw [h1' i hi₁] exact mem_univ _ · by_cases hi₂ : i ∈ s₂ · exact hf.2 i hi₂ · rw [h2' i hi₂] exact mem_univ _ refine hC i _ ?_ _ ?_ this · by_cases hi₁ : i ∈ s₁ · rw [← h1 i hi₁] exact h₁ i (mem_univ _) · rw [h1' i hi₁] exact hC_univ i · by_cases hi₂ : i ∈ s₂ · rw [← h2 i hi₂] exact h₂ i (mem_univ _) · rw [h2' i hi₂] exact hC_univ i · rw [Finset.coe_union] theorem comap_eval_le_generateFrom_squareCylinders_singleton (α : ι → Type*) [m : ∀ i, MeasurableSpace (α i)] (i : ι) : MeasurableSpace.comap (Function.eval i) (m i) ≤ MeasurableSpace.generateFrom ((fun t ↦ ({i} : Set ι).pi t) '' univ.pi fun i ↦ {s : Set (α i) \| MeasurableSet s}) := by simp only [Function.eval, singleton_pi] rw [MeasurableSpace.comap_eq_generateFrom] refine MeasurableSpace.generateFrom_mono fun S ↦ ?_ simp only [mem_setOf_eq, mem_image, mem_univ_pi, forall_exists_index, and_imp] intro t ht h classical refine ⟨fun j ↦ if hji : j = i then by convert t else univ, fun j ↦ ?_, ?_⟩ · by_cases hji : j = i · simp only [hji, eq_self_iff_true, eq_mpr_eq_cast, dif_pos] convert ht simp only [id_eq, cast_heq] · simp only [hji, not_false_iff, dif_neg, MeasurableSet.univ] · simp only [id_eq, eq_mpr_eq_cast, ← h] ext1 x simp only [singleton_pi, Function.eval, cast_eq, dite_eq_ite, ite_true, mem_preimage] /-- The square cylinders formed from measurable sets generate the product σ-algebra. -/ theorem generateFrom_squareCylinders [∀ i, MeasurableSpace (α i)] : MeasurableSpace.generateFrom (squareCylinders fun i ↦ {s : Set (α i) \| MeasurableSet s}) = MeasurableSpace.pi := by apply le_antisymm · rw [MeasurableSpace.generateFrom_le_iff] rintro S ⟨s, t, h, rfl⟩ simp only [mem_univ_pi, mem_setOf_eq] at h exact MeasurableSet.pi (Finset.countable_toSet _) (fun i _ ↦ h i) · refine iSup_le fun i ↦ ?_ refine (comap_eval_le_generateFrom_squareCylinders_singleton α i).trans ?_ refine MeasurableSpace.generateFrom_mono ?_ rw [← Finset.coe_singleton, squareCylinders_eq_iUnion_image] exact subset_iUnion (fun (s : Finset ι) ↦ (fun t : ∀ i, Set (α i) ↦ (s : Set ι).pi t) '' univ.pi (fun i ↦ setOf MeasurableSet)) ({i} : Finset ι) end squareCylinders section cylinder /-- Given a finite set `s` of indices, a cylinder is the preimage of a set `S` of `∀ i : s, α i` by the projection from `∀ i, α i` to `∀ i : s, α i`. -/ def cylinder (s : Finset ι) (S : Set (∀ i : s, α i)) : Set (∀ i, α i) := s.restrict ⁻¹' S @[simp] theorem mem_cylinder (s : Finset ι) (S : Set (∀ i : s, α i)) (f : ∀ i, α i) : f ∈ cylinder s S ↔ s.restrict f ∈ S := mem_preimage @[simp] theorem cylinder_empty (s : Finset ι) : cylinder s (∅ : Set (∀ i : s, α i)) = ∅ := by rw [cylinder, preimage_empty] @[simp] theorem cylinder_univ (s : Finset ι) : cylinder s (univ : Set (∀ i : s, α i)) = univ := by rw [cylinder, preimage_univ] @[simp] theorem cylinder_eq_empty_iff [h_nonempty : Nonempty (∀ i, α i)] (s : Finset ι) (S : Set (∀ i : s, α i)) : cylinder s S = ∅ ↔ S = ∅ := by refine ⟨fun h ↦ ?_, fun h ↦ by (rw [h]; exact cylinder_empty _)⟩ by_contra hS rw [← Ne, ← nonempty_iff_ne_empty] at hS let f := hS.some have hf : f ∈ S := hS.choose_spec classical let f' : ∀ i, α i := fun i ↦ if hi : i ∈ s then f ⟨i, hi⟩ else h_nonempty.some i have hf' : f' ∈ cylinder s S := by rw [mem_cylinder] simpa only [Finset.restrict_def, Finset.coe_mem, dif_pos, f'] rw [h] at hf' exact not_mem_empty _ hf' theorem inter_cylinder (s₁ s₂ : Finset ι) (S₁ : Set (∀ i : s₁, α i)) (S₂ : Set (∀ i : s₂, α i)) [DecidableEq ι] : cylinder s₁ S₁ ∩ cylinder s₂ S₂ = cylinder (s₁ ∪ s₂) (Finset.restrict₂ Finset.subset_union_left ⁻¹' S₁ ∩ Finset.restrict₂ Finset.subset_union_right ⁻¹' S₂) := by ext1 f; simp only [mem_inter_iff, mem_cylinder, mem_setOf_eq]; rfl theorem inter_cylinder_same (s : Finset ι) (S₁ : Set (∀ i : s, α i)) (S₂ : Set (∀ i : s, α i)) : cylinder s S₁ ∩ cylinder s S₂ = cylinder s (S₁ ∩ S₂) := by classical rw [inter_cylinder]; rfl theorem union_cylinder (s₁ s₂ : Finset ι) (S₁ : Set (∀ i : s₁, α i)) (S₂ : Set (∀ i : s₂, α i)) [DecidableEq ι] : cylinder s₁ S₁ ∪ cylinder s₂ S₂ = cylinder (s₁ ∪ s₂) (Finset.restrict₂ Finset.subset_union_left ⁻¹' S₁ ∪ Finset.restrict₂ Finset.subset_union_right ⁻¹' S₂) := by ext1 f; simp only [mem_union, mem_cylinder, mem_setOf_eq]; rfl theorem union_cylinder_same (s : Finset ι) (S₁ : Set (∀ i : s, α i)) (S₂ : Set (∀ i : s, α i)) : cylinder s S₁ ∪ cylinder s S₂ = cylinder s (S₁ ∪ S₂) := by classical rw [union_cylinder]; rfl theorem compl_cylinder (s : Finset ι) (S : Set (∀ i : s, α i)) : (cylinder s S)ᶜ = cylinder s (Sᶜ) := by ext1 f; simp only [mem_compl_iff, mem_cylinder] theorem diff_cylinder_same (s : Finset ι) (S T : Set (∀ i : s, α i)) : cylinder s S \ cylinder s T = cylinder s (S \ T) := by ext1 f; simp only [mem_diff, mem_cylinder]	theorem eq_of_cylinder_eq_of_subset [h_nonempty : Nonempty (∀ i, α i)] {I J : Finset ι} {S : Set (∀ i : I, α i)} {T : Set (∀ i : J, α i)} (h_eq : cylinder I S = cylinder J T) (hJI : J ⊆ I) : S = Finset.restrict₂ hJI ⁻¹' T := by rw [Set.ext_iff] at h_eq simp only [mem_cylinder] at h_eq ext1 f simp only [mem_preimage] classical specialize h_eq fun i ↦ if hi : i ∈ I then f ⟨i, hi⟩ else h_nonempty.some i have h_mem : ∀ j : J, ↑j ∈ I := fun j ↦ hJI j.prop simpa only [Finset.restrict_def, Finset.coe_mem, dite_true, h_mem] using h_eq	Mathlib/MeasureTheory/Constructions/Cylinders.lean	217	229
/- Copyright (c) 2023 Sophie Morel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sophie Morel -/ import Mathlib.Analysis.Analytic.Constructions import Mathlib.Analysis.Analytic.CPolynomialDef /-! # Properties of continuously polynomial functions We expand the API around continuously polynomial functions. Notably, we show that this class is stable under the usual operations (addition, subtraction, negation). We also prove that continuous multilinear maps are continuously polynomial, and so are continuous linear maps into continuous multilinear maps. In particular, such maps are analytic. -/ variable {𝕜 E F G : Type} [NontriviallyNormedField 𝕜] [NormedAddCommGroup E] [NormedSpace 𝕜 E] [NormedAddCommGroup F] [NormedSpace 𝕜 F] [NormedAddCommGroup G] [NormedSpace 𝕜 G] open scoped Topology open Set Filter Asymptotics NNReal ENNReal variable {f g : E → F} {p pf pg : FormalMultilinearSeries 𝕜 E F} {x : E} {r r' : ℝ≥0∞} {n m : ℕ} theorem hasFiniteFPowerSeriesOnBall_const {c : F} {e : E} : HasFiniteFPowerSeriesOnBall (fun _ => c) (constFormalMultilinearSeries 𝕜 E c) e 1 ⊤ := ⟨hasFPowerSeriesOnBall_const, fun n hn ↦ constFormalMultilinearSeries_apply (id hn : 0 < n).ne'⟩ theorem hasFiniteFPowerSeriesAt_const {c : F} {e : E} : HasFiniteFPowerSeriesAt (fun _ => c) (constFormalMultilinearSeries 𝕜 E c) e 1 := ⟨⊤, hasFiniteFPowerSeriesOnBall_const⟩ theorem CPolynomialAt_const {v : F} : CPolynomialAt 𝕜 (fun _ => v) x := ⟨constFormalMultilinearSeries 𝕜 E v, 1, hasFiniteFPowerSeriesAt_const⟩ theorem CPolynomialOn_const {v : F} {s : Set E} : CPolynomialOn 𝕜 (fun _ => v) s := fun _ _ => CPolynomialAt_const theorem HasFiniteFPowerSeriesOnBall.add (hf : HasFiniteFPowerSeriesOnBall f pf x n r) (hg : HasFiniteFPowerSeriesOnBall g pg x m r) : HasFiniteFPowerSeriesOnBall (f + g) (pf + pg) x (max n m) r := ⟨hf.1.add hg.1, fun N hN ↦ by rw [Pi.add_apply, hf.finite _ ((le_max_left n m).trans hN), hg.finite _ ((le_max_right n m).trans hN), zero_add]⟩ theorem HasFiniteFPowerSeriesAt.add (hf : HasFiniteFPowerSeriesAt f pf x n) (hg : HasFiniteFPowerSeriesAt g pg x m) : HasFiniteFPowerSeriesAt (f + g) (pf + pg) x (max n m) := by rcases (hf.eventually.and hg.eventually).exists with ⟨r, hr⟩ exact ⟨r, hr.1.add hr.2⟩ theorem CPolynomialAt.add (hf : CPolynomialAt 𝕜 f x) (hg : CPolynomialAt 𝕜 g x) : CPolynomialAt 𝕜 (f + g) x := let ⟨_, _, hpf⟩ := hf let ⟨_, _, hqf⟩ := hg (hpf.add hqf).cpolynomialAt theorem HasFiniteFPowerSeriesOnBall.neg (hf : HasFiniteFPowerSeriesOnBall f pf x n r) : HasFiniteFPowerSeriesOnBall (-f) (-pf) x n r := ⟨hf.1.neg, fun m hm ↦ by rw [Pi.neg_apply, hf.finite m hm, neg_zero]⟩ theorem HasFiniteFPowerSeriesAt.neg (hf : HasFiniteFPowerSeriesAt f pf x n) : HasFiniteFPowerSeriesAt (-f) (-pf) x n := let ⟨_, hrf⟩ := hf hrf.neg.hasFiniteFPowerSeriesAt theorem CPolynomialAt.neg (hf : CPolynomialAt 𝕜 f x) : CPolynomialAt 𝕜 (-f) x := let ⟨_, _, hpf⟩ := hf hpf.neg.cpolynomialAt theorem HasFiniteFPowerSeriesOnBall.sub (hf : HasFiniteFPowerSeriesOnBall f pf x n r) (hg : HasFiniteFPowerSeriesOnBall g pg x m r) : HasFiniteFPowerSeriesOnBall (f - g) (pf - pg) x (max n m) r := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem HasFiniteFPowerSeriesAt.sub (hf : HasFiniteFPowerSeriesAt f pf x n) (hg : HasFiniteFPowerSeriesAt g pg x m) : HasFiniteFPowerSeriesAt (f - g) (pf - pg) x (max n m) := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem CPolynomialAt.sub (hf : CPolynomialAt 𝕜 f x) (hg : CPolynomialAt 𝕜 g x) : CPolynomialAt 𝕜 (f - g) x := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem CPolynomialOn.add {s : Set E} (hf : CPolynomialOn 𝕜 f s) (hg : CPolynomialOn 𝕜 g s) : CPolynomialOn 𝕜 (f + g) s := fun z hz => (hf z hz).add (hg z hz) theorem CPolynomialOn.sub {s : Set E} (hf : CPolynomialOn 𝕜 f s) (hg : CPolynomialOn 𝕜 g s) : CPolynomialOn 𝕜 (f - g) s := fun z hz => (hf z hz).sub (hg z hz) /-! ### Continuous multilinear maps We show that continuous multilinear maps are continuously polynomial, and therefore analytic. -/ namespace ContinuousMultilinearMap variable {ι : Type} {Em : ι → Type} [∀ i, NormedAddCommGroup (Em i)] [∀ i, NormedSpace 𝕜 (Em i)] [Fintype ι] (f : ContinuousMultilinearMap 𝕜 Em F) {x : Π i, Em i} {s : Set (Π i, Em i)} open FormalMultilinearSeries protected theorem hasFiniteFPowerSeriesOnBall : HasFiniteFPowerSeriesOnBall f f.toFormalMultilinearSeries 0 (Fintype.card ι + 1) ⊤ := .mk' (fun _ hm ↦ dif_neg (Nat.succ_le_iff.mp hm).ne) ENNReal.zero_lt_top fun y _ ↦ by rw [Finset.sum_eq_single_of_mem _ (Finset.self_mem_range_succ _), zero_add] · rw [toFormalMultilinearSeries, dif_pos rfl]; rfl · intro m _ ne; rw [toFormalMultilinearSeries, dif_neg ne.symm]; rfl lemma cpolynomialAt : CPolynomialAt 𝕜 f x := f.hasFiniteFPowerSeriesOnBall.cpolynomialAt_of_mem (by simp only [Metric.emetric_ball_top, Set.mem_univ]) lemma cpolynomialOn : CPolynomialOn 𝕜 f s := fun _ _ ↦ f.cpolynomialAt @[deprecated (since := "2025-02-15")] alias cpolyomialOn := cpolynomialOn lemma analyticOnNhd : AnalyticOnNhd 𝕜 f s := f.cpolynomialOn.analyticOnNhd lemma analyticOn : AnalyticOn 𝕜 f s := f.analyticOnNhd.analyticOn lemma analyticAt : AnalyticAt 𝕜 f x := f.cpolynomialAt.analyticAt lemma analyticWithinAt : AnalyticWithinAt 𝕜 f s x := f.analyticAt.analyticWithinAt end ContinuousMultilinearMap /-! ### Continuous linear maps into continuous multilinear maps We show that a continuous linear map into continuous multilinear maps is continuously polynomial (as a function of two variables, i.e., uncurried). Therefore, it is also analytic. -/ namespace ContinuousLinearMap variable {ι : Type} {Em : ι → Type*} [∀ i, NormedAddCommGroup (Em i)] [∀ i, NormedSpace 𝕜 (Em i)] [Fintype ι] (f : G →L[𝕜] ContinuousMultilinearMap 𝕜 Em F) {s : Set (G × (Π i, Em i))} {x : G × (Π i, Em i)} /-- Formal multilinear series associated to a linear map into multilinear maps. -/ noncomputable def toFormalMultilinearSeriesOfMultilinear : FormalMultilinearSeries 𝕜 (G × (Π i, Em i)) F := fun n ↦ if h : Fintype.card (Option ι) = n then (f.continuousMultilinearMapOption).domDomCongr (Fintype.equivFinOfCardEq h) else 0 protected theorem hasFiniteFPowerSeriesOnBall_uncurry_of_multilinear : HasFiniteFPowerSeriesOnBall (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) f.toFormalMultilinearSeriesOfMultilinear 0 (Fintype.card (Option ι) + 1) ⊤ := by apply HasFiniteFPowerSeriesOnBall.mk' ?_ ENNReal.zero_lt_top ?_ · intro m hm apply dif_neg exact Nat.ne_of_lt hm · intro y _ rw [Finset.sum_eq_single_of_mem _ (Finset.self_mem_range_succ _), zero_add] · rw [toFormalMultilinearSeriesOfMultilinear, dif_pos rfl]; rfl · intro m _ ne; rw [toFormalMultilinearSeriesOfMultilinear, dif_neg ne.symm]; rfl lemma cpolynomialAt_uncurry_of_multilinear : CPolynomialAt 𝕜 (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) x := f.hasFiniteFPowerSeriesOnBall_uncurry_of_multilinear.cpolynomialAt_of_mem (by simp only [Metric.emetric_ball_top, Set.mem_univ]) lemma cpolyomialOn_uncurry_of_multilinear : CPolynomialOn 𝕜 (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) s := fun _ _ ↦ f.cpolynomialAt_uncurry_of_multilinear lemma analyticOnNhd_uncurry_of_multilinear : AnalyticOnNhd 𝕜 (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) s := f.cpolyomialOn_uncurry_of_multilinear.analyticOnNhd lemma analyticOn_uncurry_of_multilinear : AnalyticOn 𝕜 (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) s := f.analyticOnNhd_uncurry_of_multilinear.analyticOn lemma analyticAt_uncurry_of_multilinear : AnalyticAt 𝕜 (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) x := f.cpolynomialAt_uncurry_of_multilinear.analyticAt lemma analyticWithinAt_uncurry_of_multilinear : AnalyticWithinAt 𝕜 (fun (p : G × (Π i, Em i)) ↦ f p.1 p.2) s x := f.analyticAt_uncurry_of_multilinear.analyticWithinAt end ContinuousLinearMap		Mathlib/Analysis/Analytic/CPolynomial.lean	338	339
/- Copyright (c) 2024 Mitchell Lee. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mitchell Lee, Junyan Xu -/ import Mathlib.LinearAlgebra.TensorProduct.RightExactness import Mathlib.LinearAlgebra.TensorProduct.Finiteness import Mathlib.LinearAlgebra.DirectSum.Finsupp /-! # Vanishing of elements in a tensor product of two modules Let $M$ and $N$ be modules over a commutative ring $R$. Recall that every element of $M \otimes N$ can be written as a finite sum $\sum_{i} m_i \otimes n_i$ of pure tensors (`TensorProduct.exists_finset`). We would like to determine under what circumstances such an expression vanishes. Let us say that an expression $\sum_{i \in \iota} m_i \otimes n_i$ in $M \otimes N$ vanishes trivially (`TensorProduct.VanishesTrivially`) if there exist a finite index type $\kappa$ = `Fin k`, elements $(y_j)_{j \in \kappa}$ of $N$, and elements $(a_{ij})_{i \in \iota, j \in \kappa}$ of $R$ such that for all $i$, $$n_i = \sum_j a_{ij} y_j$$ and for all $j$, $$\sum_i a_{ij} m_i = 0.$$ (The terminology "trivial" comes from [Stacks 00HK](https://stacks.math.columbia.edu/tag/00HK).) It is not difficult to show (`TensorProduct.sum_tmul_eq_zero_of_vanishesTrivially`) that if $\sum_i m_i \otimes n_i$ vanishes trivially, then it vanishes; that is, $\sum_i m_i \otimes n_i = 0$. The equational criterion for vanishing (`TensorProduct.vanishesTrivially_iff_sum_tmul_eq_zero`), which appears as [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term], states that if the elements $m_i$ generate the module $M$, then $\sum_i m_i \otimes n_i = 0$ if and only if the expression $\sum_i m_i \otimes n_i$ vanishes trivially. We also prove the following generalization (`TensorProduct.vanishesTrivially_iff_sum_tmul_eq_zero_of_rTensor_injective`). If the submodule $M' \subseteq M$ generated by the $m_i$ satisfies the property that the induced map $M' \otimes N \to M \otimes N$ is injective, then $\sum_i m_i \otimes n_i = 0$ if and only if the expression $\sum_i m_i \otimes n_i$ vanishes trivially. (In the case that $M = R$, this yields the equational criterion for flatness `Module.Flat.iff_forall_isTrivialRelation`.) Conversely (`TensorProduct.rTensor_injective_of_forall_vanishesTrivially`), suppose that for every equation $\sum_i m_i \otimes n_i = 0$, the expression $\sum_i m_i \otimes n_i$ vanishes trivially. Then the induced map $M' \otimes N \to M \otimes N$ is injective for every submodule $M' \subseteq M$. ## References * [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term] ## TODO * Prove the same theorems with $M$ and $N$ swapped. -/ variable (R : Type) [CommRing R] variable {M : Type} [AddCommGroup M] [Module R M] variable {N : Type} [AddCommGroup N] [Module R N] open DirectSum LinearMap Function Submodule Finsupp namespace TensorProduct variable {ι : Type} [Fintype ι] {m : ι → M} {n : ι → N} variable (m n) in /-- An expression $\sum_i m_i \otimes n_i$ in $M \otimes N$ vanishes trivially if there exist a finite index type $\kappa$ = `Fin k`, elements $(y_j)_{j \in \kappa}$ of $N$, and elements $(a_{ij})_{i \in \iota, j \in \kappa}$ of $R$ such that for all $i$, $$n_i = \sum_j a_{ij} y_j$$ and for all $j$, $$\sum_i a_{ij} m_i = 0.$$ Note that this condition is not symmetric in $M$ and $N$. (The terminology "trivial" comes from [Stacks 00HK](https://stacks.math.columbia.edu/tag/00HK).) -/ abbrev VanishesTrivially : Prop := ∃ (k : ℕ) (a : ι → Fin k → R) (y : Fin k → N), (∀ i, n i = ∑ j, a i j • y j) ∧ ∀ j, ∑ i, a i j • m i = 0 variable {R} theorem VanishesTrivially.of_fintype {κ} [Fintype κ] (a : ι → κ → R) (y : κ → N) (hay : ∀ i, n i = ∑ j, a i j • y j) (ham : ∀ j, ∑ i, a i j • m i = 0) : VanishesTrivially R m n := have e := (Fintype.equivFin κ).symm ⟨Fintype.card κ, (a · ∘ e), y ∘ e, by simpa only [← e.sum_comp] using hay, by rwa [← e.forall_congr_right] at ham⟩ theorem _root_.Equiv.vanishesTrivially_comp {κ} [Fintype κ] (e : κ ≃ ι) : VanishesTrivially R (m ∘ e) (n ∘ e) ↔ VanishesTrivially R m n := by simp [VanishesTrivially, ← e.forall_congr_right, ← (e.arrowCongr (.refl _)).exists_congr_right, ← e.sum_comp] variable (R) /-- Equational criterion for vanishing [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term], backward direction. If the expression $\sum_i m_i \otimes n_i$ vanishes trivially, then it vanishes. That is, $\sum_i m_i \otimes n_i = 0$. -/ theorem sum_tmul_eq_zero_of_vanishesTrivially (hmn : VanishesTrivially R m n) : ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N) := by obtain ⟨k, a, y, h₁, h₂⟩ := hmn simp_rw [h₁, tmul_sum, tmul_smul] rw [Finset.sum_comm] simp_rw [← tmul_smul, ← smul_tmul, ← sum_tmul, h₂, zero_tmul, Finset.sum_const_zero] /-- Equational criterion for vanishing [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term], forward direction. Assume that the $m_i$ generate $M$. If the expression $\sum_i m_i \otimes n_i$ vanishes, then it vanishes trivially. -/ theorem vanishesTrivially_of_sum_tmul_eq_zero (hm : Submodule.span R (Set.range m) = ⊤) (hmn : ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N)) : VanishesTrivially R m n := by -- Define a map $G \colon R^\iota \to M$ whose matrix entries are the $m_i$. It is surjective. set G : (ι →₀ R) →ₗ[R] M := Finsupp.linearCombination R m with hG have G_basis_eq (i : ι) : G (Finsupp.single i 1) = m i := by simp [hG, toModule_lof] have G_surjective : Surjective G := by apply LinearMap.range_eq_top.mp apply top_le_iff.mp rw [← hm] apply Submodule.span_le.mpr rintro _ ⟨i, rfl⟩ use Finsupp.single i 1, G_basis_eq i /- Consider the element $\sum_i e_i \otimes n_i$ of $R^\iota \otimes N$. It is in the kernel of $R^\iota \otimes N \to M \otimes N$. -/ set en : (ι →₀ R) ⊗[R] N := ∑ i, Finsupp.single i 1 ⊗ₜ n i with hen have en_mem_ker : en ∈ ker (rTensor N G) := by simp [hen, G_basis_eq, hmn] -- We have an exact sequence $\ker G \to R^\iota \to M \to 0$. have exact_ker_subtype : Exact (ker G).subtype G := G.exact_subtype_ker_map -- Tensor the exact sequence with $N$. have exact_rTensor_ker_subtype : Exact (rTensor N (ker G).subtype) (rTensor N G) := rTensor_exact (M := ↥(ker G)) N exact_ker_subtype G_surjective /- We conclude that $\sum_i e_i \otimes n_i$ is in the range of $\ker G \otimes N \to R^\iota \otimes N$. -/ have en_mem_range : en ∈ range (rTensor N (ker G).subtype) := exact_rTensor_ker_subtype.linearMap_ker_eq ▸ en_mem_ker /- There is an element of in $\ker G \otimes N$ that maps to $\sum_i e_i \otimes n_i$. Write it as a finite sum of pure tensors. -/ obtain ⟨kn, hkn⟩ := en_mem_range obtain ⟨ma, rfl : kn = ∑ kj ∈ ma, kj.1 ⊗ₜ[R] kj.2⟩ := exists_finset kn /- Let $\sum_j k_j \otimes y_j$ be the sum obtained in the previous step. In order to show that $\sum_i m_i \otimes n_i$ vanishes trivially, it suffices to prove that there exist $(a_{ij})_{i, j}$ such that for all $i$, $$n_i = \sum_j a_{ij} y_j$$ and for all $j$, $$\sum_i a_{ij} m_i = 0.$$ For this, take $a_{ij}$ to be the coefficient of $e_i$ in $k_j$. -/ refine .of_fintype (κ := ma) (fun i ⟨⟨kj, _⟩, _⟩ ↦ (kj : ι →₀ R) i) (fun ⟨⟨_, yj⟩, _⟩ ↦ yj) ?_ ?_ · intro i classical apply_fun finsuppScalarLeft R N ι at hkn apply_fun (· i) at hkn symm at hkn simp only [map_sum, finsuppScalarLeft_apply_tmul, zero_smul, Finsupp.single_zero, Finsupp.sum_single_index, one_smul, Finsupp.finset_sum_apply, Finsupp.single_apply, Finset.sum_ite_eq', Finset.mem_univ, ↓reduceIte, rTensor_tmul, coe_subtype, Finsupp.sum_apply, Finsupp.sum_ite_eq', Finsupp.mem_support_iff, ne_eq, ite_not, en] at hkn simp only [Finset.univ_eq_attach, Finset.sum_attach ma (fun x ↦ (x.1 : ι →₀ R) i • x.2)] convert hkn using 2 with x _ split · next h'x => rw [h'x, zero_smul] · rfl · rintro ⟨⟨⟨k, hk⟩, _⟩, _⟩ simpa only [hG, linearCombination_apply, zero_smul, implies_true, Finsupp.sum_fintype] using mem_ker.mp hk /-- Equational criterion for vanishing [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term]. Assume that the $m_i$ generate $M$. Then the expression $\sum_i m_i \otimes n_i$ vanishes trivially if and only if it vanishes. -/ theorem vanishesTrivially_iff_sum_tmul_eq_zero (hm : Submodule.span R (Set.range m) = ⊤) : VanishesTrivially R m n ↔ ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N) := ⟨sum_tmul_eq_zero_of_vanishesTrivially R, vanishesTrivially_of_sum_tmul_eq_zero R hm⟩ /-- Equational criterion for vanishing [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term], forward direction, generalization. Assume that the submodule $M' \subseteq M$ generated by the $m_i$ satisfies the property that the map $M' \otimes N \to M \otimes N$ is injective. If the expression $\sum_i m_i \otimes n_i$ vanishes, then it vanishes trivially. -/ theorem vanishesTrivially_of_sum_tmul_eq_zero_of_rTensor_injective (hm : Injective (rTensor N (span R (Set.range m)).subtype)) (hmn : ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N)) : VanishesTrivially R m n := by -- Restrict `m` on the codomain to $M'$, then apply `vanishesTrivially_of_sum_tmul_eq_zero`. have mem_M' i : m i ∈ span R (Set.range m) := subset_span ⟨i, rfl⟩ set m' : ι → span R (Set.range m) := Subtype.coind m mem_M' with m'_eq have hm' : span R (Set.range m') = ⊤ := by apply map_injective_of_injective (injective_subtype (span R (Set.range m))) rw [Submodule.map_span, Submodule.map_top, range_subtype, coe_subtype, ← Set.range_comp] rfl have hm'n : ∑ i, m' i ⊗ₜ n i = (0 : span R (Set.range m) ⊗[R] N) := by apply hm simp only [m'_eq, map_sum, rTensor_tmul, coe_subtype, Subtype.coind_coe, map_zero, hmn] have : VanishesTrivially R m' n := vanishesTrivially_of_sum_tmul_eq_zero R hm' hm'n unfold VanishesTrivially at this ⊢ convert this with κ _ a y j convert (injective_iff_map_eq_zero' _).mp (injective_subtype (span R (Set.range m))) _ simp [m'_eq] /-- Equational criterion for vanishing [A. Altman and S. Kleiman, A term of commutative algebra (Lemma 8.16)][altman2021term], generalization. Assume that the submodule $M' \subseteq M$ generated by the $m_i$ satisfies the property that the map $M' \otimes N \to M \otimes N$ is injective. Then the expression $\sum_i m_i \otimes n_i$ vanishes trivially if and only if it vanishes. -/ theorem vanishesTrivially_iff_sum_tmul_eq_zero_of_rTensor_injective (hm : Injective (rTensor N (span R (Set.range m)).subtype)) : VanishesTrivially R m n ↔ ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N) := ⟨sum_tmul_eq_zero_of_vanishesTrivially R, vanishesTrivially_of_sum_tmul_eq_zero_of_rTensor_injective R hm⟩ /-- Converse of `TensorProduct.vanishesTrivially_of_sum_tmul_eq_zero_of_rTensor_injective`. Assume that every expression $\sum_i m_i \otimes n_i$ which vanishes also vanishes trivially. Then, for every submodule $M' \subseteq M$, the map $M' \otimes N \to M \otimes N$ is injective. -/ theorem rTensor_injective_of_forall_vanishesTrivially (hMN : ∀ {l : ℕ} {m : Fin l → M} {n : Fin l → N}, ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N) → VanishesTrivially R m n) (M' : Submodule R M) : Injective (rTensor N M'.subtype) := by apply (injective_iff_map_eq_zero _).mpr rintro x hx obtain ⟨s, rfl⟩ := exists_finset x rw [← Finset.sum_attach] apply sum_tmul_eq_zero_of_vanishesTrivially simp only [map_sum, rTensor_tmul, coe_subtype] at hx have e := (Fintype.equivFin s).symm rw [← Finset.sum_coe_sort, ← e.sum_comp] at hx have := hMN hx rw [← e.vanishesTrivially_comp] unfold VanishesTrivially at this ⊢ convert this symm convert (injective_iff_map_eq_zero' _).mp (injective_subtype M') _ simp	/-- Every expression $\sum_i m_i \otimes n_i$ which vanishes also vanishes trivially if and only if for every submodule $M' \subseteq M$, the map $M' \otimes N \to M \otimes N$ is injective. -/ theorem forall_vanishesTrivially_iff_forall_rTensor_injective : (∀ {l : ℕ} {m : Fin l → M} {n : Fin l → N}, ∑ i, m i ⊗ₜ n i = (0 : M ⊗[R] N) → VanishesTrivially R m n) ↔ ∀ M' : Submodule R M, Injective (rTensor N M'.subtype) := by constructor · intro h exact rTensor_injective_of_forall_vanishesTrivially R h · intro h k m n hmn	Mathlib/LinearAlgebra/TensorProduct/Vanishing.lean	243	252
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura, Jeremy Avigad, Minchao Wu, Mario Carneiro -/ import Mathlib.Data.Finset.Attach import Mathlib.Data.Finset.Disjoint import Mathlib.Data.Finset.Erase import Mathlib.Data.Finset.Filter import Mathlib.Data.Finset.Range import Mathlib.Data.Finset.SDiff import Mathlib.Data.Multiset.Basic import Mathlib.Logic.Equiv.Set import Mathlib.Order.Directed import Mathlib.Order.Interval.Set.Defs import Mathlib.Data.Set.SymmDiff /-! # Basic lemmas on finite sets This file contains lemmas on the interaction of various definitions on the `Finset` type. For an explanation of `Finset` design decisions, please see `Mathlib/Data/Finset/Defs.lean`. ## Main declarations ### Main definitions * `Finset.choose`: Given a proof `h` of existence and uniqueness of a certain element satisfying a predicate, `choose s h` returns the element of `s` satisfying that predicate. ### Equivalences between finsets * The `Mathlib/Logic/Equiv/Defs.lean` file describes a general type of equivalence, so look in there for any lemmas. There is some API for rewriting sums and products from `s` to `t` given that `s ≃ t`. TODO: examples ## Tags finite sets, finset -/ -- Assert that we define `Finset` without the material on `List.sublists`. -- Note that we cannot use `List.sublists` itself as that is defined very early. assert_not_exists List.sublistsLen Multiset.powerset CompleteLattice Monoid open Multiset Subtype Function universe u variable {α : Type} {β : Type} {γ : Type} namespace Finset -- TODO: these should be global attributes, but this will require fixing other files attribute [local trans] Subset.trans Superset.trans set_option linter.deprecated false in @[deprecated "Deprecated without replacement." (since := "2025-02-07")] theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Finset α} (hx : x ∈ s) : SizeOf.sizeOf x < SizeOf.sizeOf s := by cases s dsimp [SizeOf.sizeOf, SizeOf.sizeOf, Multiset.sizeOf] rw [Nat.add_comm] refine lt_trans ?_ (Nat.lt_succ_self _) exact Multiset.sizeOf_lt_sizeOf_of_mem hx /-! ### Lattice structure -/ section Lattice variable [DecidableEq α] {s s₁ s₂ t t₁ t₂ u v : Finset α} {a b : α} /-! #### union -/ @[simp] theorem disjUnion_eq_union (s t h) : @disjUnion α s t h = s ∪ t := ext fun a => by simp @[simp] theorem disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := by simp only [disjoint_left, mem_union, or_imp, forall_and] @[simp] theorem disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := by simp only [disjoint_right, mem_union, or_imp, forall_and] /-! #### inter -/ theorem not_disjoint_iff_nonempty_inter : ¬Disjoint s t ↔ (s ∩ t).Nonempty := not_disjoint_iff.trans <\| by simp [Finset.Nonempty] alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter theorem disjoint_or_nonempty_inter (s t : Finset α) : Disjoint s t ∨ (s ∩ t).Nonempty := by rw [← not_disjoint_iff_nonempty_inter] exact em _ omit [DecidableEq α] in theorem disjoint_of_subset_iff_left_eq_empty (h : s ⊆ t) : Disjoint s t ↔ s = ∅ := disjoint_of_le_iff_left_eq_bot h lemma pairwiseDisjoint_iff {ι : Type} {s : Set ι} {f : ι → Finset α} : s.PairwiseDisjoint f ↔ ∀ ⦃i⦄, i ∈ s → ∀ ⦃j⦄, j ∈ s → (f i ∩ f j).Nonempty → i = j := by simp [Set.PairwiseDisjoint, Set.Pairwise, Function.onFun, not_imp_comm (a := _ = _), not_disjoint_iff_nonempty_inter] end Lattice instance isDirected_le : IsDirected (Finset α) (· ≤ ·) := by classical infer_instance instance isDirected_subset : IsDirected (Finset α) (· ⊆ ·) := isDirected_le /-! ### erase -/ section Erase variable [DecidableEq α] {s t u v : Finset α} {a b : α} @[simp] theorem erase_empty (a : α) : erase ∅ a = ∅ := rfl protected lemma Nontrivial.erase_nonempty (hs : s.Nontrivial) : (s.erase a).Nonempty := (hs.exists_ne a).imp <\| by aesop @[simp] lemma erase_nonempty (ha : a ∈ s) : (s.erase a).Nonempty ↔ s.Nontrivial := by simp only [Finset.Nonempty, mem_erase, and_comm (b := _ ∈ _)] refine ⟨?_, fun hs ↦ hs.exists_ne a⟩ rintro ⟨b, hb, hba⟩ exact ⟨_, hb, _, ha, hba⟩ @[simp] theorem erase_singleton (a : α) : ({a} : Finset α).erase a = ∅ := by ext x simp @[simp] theorem erase_insert_eq_erase (s : Finset α) (a : α) : (insert a s).erase a = s.erase a := ext fun x => by simp +contextual only [mem_erase, mem_insert, and_congr_right_iff, false_or, iff_self, imp_true_iff] theorem erase_insert {a : α} {s : Finset α} (h : a ∉ s) : erase (insert a s) a = s := by rw [erase_insert_eq_erase, erase_eq_of_not_mem h] theorem erase_insert_of_ne {a b : α} {s : Finset α} (h : a ≠ b) : erase (insert a s) b = insert a (erase s b) := ext fun x => by have : x ≠ b ∧ x = a ↔ x = a := and_iff_right_of_imp fun hx => hx.symm ▸ h simp only [mem_erase, mem_insert, and_or_left, this] theorem erase_cons_of_ne {a b : α} {s : Finset α} (ha : a ∉ s) (hb : a ≠ b) : erase (cons a s ha) b = cons a (erase s b) fun h => ha <\| erase_subset _ _ h := by simp only [cons_eq_insert, erase_insert_of_ne hb] @[simp] theorem insert_erase (h : a ∈ s) : insert a (erase s a) = s := ext fun x => by simp only [mem_insert, mem_erase, or_and_left, dec_em, true_and] apply or_iff_right_of_imp rintro rfl exact h lemma erase_eq_iff_eq_insert (hs : a ∈ s) (ht : a ∉ t) : erase s a = t ↔ s = insert a t := by aesop lemma insert_erase_invOn : Set.InvOn (insert a) (fun s ↦ erase s a) {s : Finset α \| a ∈ s} {s : Finset α \| a ∉ s} := ⟨fun _s ↦ insert_erase, fun _s ↦ erase_insert⟩ theorem erase_ssubset {a : α} {s : Finset α} (h : a ∈ s) : s.erase a ⊂ s := calc s.erase a ⊂ insert a (s.erase a) := ssubset_insert <\| not_mem_erase _ _ _ = _ := insert_erase h theorem ssubset_iff_exists_subset_erase {s t : Finset α} : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t.erase a := by refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_subset_of_ssubset h <\| erase_ssubset ha⟩ obtain ⟨a, ht, hs⟩ := not_subset.1 h.2 exact ⟨a, ht, subset_erase.2 ⟨h.1, hs⟩⟩ theorem erase_ssubset_insert (s : Finset α) (a : α) : s.erase a ⊂ insert a s := ssubset_iff_exists_subset_erase.2 ⟨a, mem_insert_self _ _, erase_subset_erase _ <\| subset_insert _ _⟩ theorem erase_cons {s : Finset α} {a : α} (h : a ∉ s) : (s.cons a h).erase a = s := by rw [cons_eq_insert, erase_insert_eq_erase, erase_eq_of_not_mem h] theorem subset_insert_iff {a : α} {s t : Finset α} : s ⊆ insert a t ↔ erase s a ⊆ t := by simp only [subset_iff, or_iff_not_imp_left, mem_erase, mem_insert, and_imp] exact forall_congr' fun x => forall_swap theorem erase_insert_subset (a : α) (s : Finset α) : erase (insert a s) a ⊆ s := subset_insert_iff.1 <\| Subset.rfl theorem insert_erase_subset (a : α) (s : Finset α) : s ⊆ insert a (erase s a) := subset_insert_iff.2 <\| Subset.rfl theorem subset_insert_iff_of_not_mem (h : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := by rw [subset_insert_iff, erase_eq_of_not_mem h] theorem erase_subset_iff_of_mem (h : a ∈ t) : s.erase a ⊆ t ↔ s ⊆ t := by rw [← subset_insert_iff, insert_eq_of_mem h] theorem erase_injOn' (a : α) : { s : Finset α \| a ∈ s }.InjOn fun s => erase s a := fun s hs t ht (h : s.erase a = _) => by rw [← insert_erase hs, ← insert_erase ht, h] end Erase lemma Nontrivial.exists_cons_eq {s : Finset α} (hs : s.Nontrivial) : ∃ t a ha b hb hab, (cons b t hb).cons a (mem_cons.not.2 <\| not_or_intro hab ha) = s := by classical obtain ⟨a, ha, b, hb, hab⟩ := hs have : b ∈ s.erase a := mem_erase.2 ⟨hab.symm, hb⟩ refine ⟨(s.erase a).erase b, a, ?_, b, ?_, ?_, ?_⟩ <;> simp [insert_erase this, insert_erase ha, ] /-! ### sdiff -/ section Sdiff variable [DecidableEq α] {s t u v : Finset α} {a b : α} lemma erase_sdiff_erase (hab : a ≠ b) (hb : b ∈ s) : s.erase a \ s.erase b = {b} := by ext; aesop -- TODO: Do we want to delete this lemma and `Finset.disjUnion_singleton`, -- or instead add `Finset.union_singleton`/`Finset.singleton_union`? theorem sdiff_singleton_eq_erase (a : α) (s : Finset α) : s \ {a} = erase s a := by ext rw [mem_erase, mem_sdiff, mem_singleton, and_comm] -- This lemma matches `Finset.insert_eq` in functionality. theorem erase_eq (s : Finset α) (a : α) : s.erase a = s \ {a} := (sdiff_singleton_eq_erase _ _).symm theorem disjoint_erase_comm : Disjoint (s.erase a) t ↔ Disjoint s (t.erase a) := by simp_rw [erase_eq, disjoint_sdiff_comm] lemma disjoint_insert_erase (ha : a ∉ t) : Disjoint (s.erase a) (insert a t) ↔ Disjoint s t := by rw [disjoint_erase_comm, erase_insert ha] lemma disjoint_erase_insert (ha : a ∉ s) : Disjoint (insert a s) (t.erase a) ↔ Disjoint s t := by rw [← disjoint_erase_comm, erase_insert ha] theorem disjoint_of_erase_left (ha : a ∉ t) (hst : Disjoint (s.erase a) t) : Disjoint s t := by rw [← erase_insert ha, ← disjoint_erase_comm, disjoint_insert_right] exact ⟨not_mem_erase _ _, hst⟩ theorem disjoint_of_erase_right (ha : a ∉ s) (hst : Disjoint s (t.erase a)) : Disjoint s t := by rw [← erase_insert ha, disjoint_erase_comm, disjoint_insert_left] exact ⟨not_mem_erase _ _, hst⟩ theorem inter_erase (a : α) (s t : Finset α) : s ∩ t.erase a = (s ∩ t).erase a := by simp only [erase_eq, inter_sdiff_assoc] @[simp] theorem erase_inter (a : α) (s t : Finset α) : s.erase a ∩ t = (s ∩ t).erase a := by simpa only [inter_comm t] using inter_erase a t s theorem erase_sdiff_comm (s t : Finset α) (a : α) : s.erase a \ t = (s \ t).erase a := by simp_rw [erase_eq, sdiff_right_comm] theorem erase_inter_comm (s t : Finset α) (a : α) : s.erase a ∩ t = s ∩ t.erase a := by rw [erase_inter, inter_erase] theorem erase_union_distrib (s t : Finset α) (a : α) : (s ∪ t).erase a = s.erase a ∪ t.erase a := by simp_rw [erase_eq, union_sdiff_distrib] theorem insert_inter_distrib (s t : Finset α) (a : α) : insert a (s ∩ t) = insert a s ∩ insert a t := by simp_rw [insert_eq, union_inter_distrib_left] theorem erase_sdiff_distrib (s t : Finset α) (a : α) : (s \ t).erase a = s.erase a \ t.erase a := by simp_rw [erase_eq, sdiff_sdiff, sup_sdiff_eq_sup le_rfl, sup_comm] theorem erase_union_of_mem (ha : a ∈ t) (s : Finset α) : s.erase a ∪ t = s ∪ t := by rw [← insert_erase (mem_union_right s ha), erase_union_distrib, ← union_insert, insert_erase ha] theorem union_erase_of_mem (ha : a ∈ s) (t : Finset α) : s ∪ t.erase a = s ∪ t := by rw [← insert_erase (mem_union_left t ha), erase_union_distrib, ← insert_union, insert_erase ha] theorem sdiff_union_erase_cancel (hts : t ⊆ s) (ha : a ∈ t) : s \ t ∪ t.erase a = s.erase a := by simp_rw [erase_eq, sdiff_union_sdiff_cancel hts (singleton_subset_iff.2 ha)] theorem sdiff_insert (s t : Finset α) (x : α) : s \ insert x t = (s \ t).erase x := by simp_rw [← sdiff_singleton_eq_erase, insert_eq, sdiff_sdiff_left', sdiff_union_distrib, inter_comm] theorem sdiff_insert_insert_of_mem_of_not_mem {s t : Finset α} {x : α} (hxs : x ∈ s) (hxt : x ∉ t) : insert x (s \ insert x t) = s \ t := by rw [sdiff_insert, insert_erase (mem_sdiff.mpr ⟨hxs, hxt⟩)] theorem sdiff_erase (h : a ∈ s) : s \ t.erase a = insert a (s \ t) := by rw [← sdiff_singleton_eq_erase, sdiff_sdiff_eq_sdiff_union (singleton_subset_iff.2 h), insert_eq, union_comm] theorem sdiff_erase_self (ha : a ∈ s) : s \ s.erase a = {a} := by rw [sdiff_erase ha, Finset.sdiff_self, insert_empty_eq] theorem erase_eq_empty_iff (s : Finset α) (a : α) : s.erase a = ∅ ↔ s = ∅ ∨ s = {a} := by rw [← sdiff_singleton_eq_erase, sdiff_eq_empty_iff_subset, subset_singleton_iff] --TODO@Yaël: Kill lemmas duplicate with `BooleanAlgebra` theorem sdiff_disjoint : Disjoint (t \ s) s := disjoint_left.2 fun _a ha => (mem_sdiff.1 ha).2 theorem disjoint_sdiff : Disjoint s (t \ s) := sdiff_disjoint.symm theorem disjoint_sdiff_inter (s t : Finset α) : Disjoint (s \ t) (s ∩ t) := disjoint_of_subset_right inter_subset_right sdiff_disjoint end Sdiff /-! ### attach -/ @[simp] theorem attach_empty : attach (∅ : Finset α) = ∅ := rfl @[simp] theorem attach_nonempty_iff {s : Finset α} : s.attach.Nonempty ↔ s.Nonempty := by simp [Finset.Nonempty] @[aesop safe apply (rule_sets := [finsetNonempty])] protected alias ⟨_, Nonempty.attach⟩ := attach_nonempty_iff @[simp] theorem attach_eq_empty_iff {s : Finset α} : s.attach = ∅ ↔ s = ∅ := by simp [eq_empty_iff_forall_not_mem] /-! ### filter -/ section Filter variable (p q : α → Prop) [DecidablePred p] [DecidablePred q] {s t : Finset α} theorem filter_singleton (a : α) : filter p {a} = if p a then {a} else ∅ := by classical ext x simp only [mem_singleton, forall_eq, mem_filter] split_ifs with h <;> by_cases h' : x = a <;> simp [h, h'] theorem filter_cons_of_pos (a : α) (s : Finset α) (ha : a ∉ s) (hp : p a) : filter p (cons a s ha) = cons a (filter p s) ((mem_of_mem_filter _).mt ha) := eq_of_veq <\| Multiset.filter_cons_of_pos s.val hp theorem filter_cons_of_neg (a : α) (s : Finset α) (ha : a ∉ s) (hp : ¬p a) : filter p (cons a s ha) = filter p s := eq_of_veq <\| Multiset.filter_cons_of_neg s.val hp theorem disjoint_filter {s : Finset α} {p q : α → Prop} [DecidablePred p] [DecidablePred q] : Disjoint (s.filter p) (s.filter q) ↔ ∀ x ∈ s, p x → ¬q x := by constructor <;> simp +contextual [disjoint_left] theorem disjoint_filter_filter' (s t : Finset α) {p q : α → Prop} [DecidablePred p] [DecidablePred q] (h : Disjoint p q) : Disjoint (s.filter p) (t.filter q) := by simp_rw [disjoint_left, mem_filter] rintro a ⟨_, hp⟩ ⟨_, hq⟩ rw [Pi.disjoint_iff] at h simpa [hp, hq] using h a theorem disjoint_filter_filter_neg (s t : Finset α) (p : α → Prop) [DecidablePred p] [∀ x, Decidable (¬p x)] : Disjoint (s.filter p) (t.filter fun a => ¬p a) := disjoint_filter_filter' s t disjoint_compl_right theorem filter_disj_union (s : Finset α) (t : Finset α) (h : Disjoint s t) : filter p (disjUnion s t h) = (filter p s).disjUnion (filter p t) (disjoint_filter_filter h) := eq_of_veq <\| Multiset.filter_add _ _ _ theorem filter_cons {a : α} (s : Finset α) (ha : a ∉ s) : filter p (cons a s ha) = if p a then cons a (filter p s) ((mem_of_mem_filter _).mt ha) else filter p s := by split_ifs with h · rw [filter_cons_of_pos _ _ _ ha h] · rw [filter_cons_of_neg _ _ _ ha h] section variable [DecidableEq α] theorem filter_union (s₁ s₂ : Finset α) : (s₁ ∪ s₂).filter p = s₁.filter p ∪ s₂.filter p := ext fun _ => by simp only [mem_filter, mem_union, or_and_right] theorem filter_union_right (s : Finset α) : s.filter p ∪ s.filter q = s.filter fun x => p x ∨ q x := ext fun x => by simp [mem_filter, mem_union, ← and_or_left] theorem filter_mem_eq_inter {s t : Finset α} [∀ i, Decidable (i ∈ t)] : (s.filter fun i => i ∈ t) = s ∩ t := ext fun i => by simp [mem_filter, mem_inter] theorem filter_inter_distrib (s t : Finset α) : (s ∩ t).filter p = s.filter p ∩ t.filter p := by ext simp [mem_filter, mem_inter, and_assoc] theorem filter_inter (s t : Finset α) : filter p s ∩ t = filter p (s ∩ t) := by ext simp only [mem_inter, mem_filter, and_right_comm] theorem inter_filter (s t : Finset α) : s ∩ filter p t = filter p (s ∩ t) := by rw [inter_comm, filter_inter, inter_comm] theorem filter_insert (a : α) (s : Finset α) : filter p (insert a s) = if p a then insert a (filter p s) else filter p s := by ext x split_ifs with h <;> by_cases h' : x = a <;> simp [h, h'] theorem filter_erase (a : α) (s : Finset α) : filter p (erase s a) = erase (filter p s) a := by ext x simp only [and_assoc, mem_filter, iff_self, mem_erase] theorem filter_or (s : Finset α) : (s.filter fun a => p a ∨ q a) = s.filter p ∪ s.filter q := ext fun _ => by simp [mem_filter, mem_union, and_or_left] theorem filter_and (s : Finset α) : (s.filter fun a => p a ∧ q a) = s.filter p ∩ s.filter q := ext fun _ => by simp [mem_filter, mem_inter, and_comm, and_left_comm, and_self_iff, and_assoc] theorem filter_not (s : Finset α) : (s.filter fun a => ¬p a) = s \ s.filter p := ext fun a => by simp only [Bool.decide_coe, Bool.not_eq_true', mem_filter, and_comm, mem_sdiff, not_and_or, Bool.not_eq_true, and_or_left, and_not_self, or_false] lemma filter_and_not (s : Finset α) (p q : α → Prop) [DecidablePred p] [DecidablePred q] : s.filter (fun a ↦ p a ∧ ¬ q a) = s.filter p \ s.filter q := by rw [filter_and, filter_not, ← inter_sdiff_assoc, inter_eq_left.2 (filter_subset _ _)] theorem sdiff_eq_filter (s₁ s₂ : Finset α) : s₁ \ s₂ = filter (· ∉ s₂) s₁ := ext fun _ => by simp [mem_sdiff, mem_filter] theorem subset_union_elim {s : Finset α} {t₁ t₂ : Set α} (h : ↑s ⊆ t₁ ∪ t₂) : ∃ s₁ s₂ : Finset α, s₁ ∪ s₂ = s ∧ ↑s₁ ⊆ t₁ ∧ ↑s₂ ⊆ t₂ \ t₁ := by classical refine ⟨s.filter (· ∈ t₁), s.filter (· ∉ t₁), ?_, ?_, ?_⟩ · simp [filter_union_right, em] · intro x simp · intro x simp only [not_not, coe_filter, Set.mem_setOf_eq, Set.mem_diff, and_imp] intro hx hx₂ exact ⟨Or.resolve_left (h hx) hx₂, hx₂⟩ -- This is not a good simp lemma, as it would prevent `Finset.mem_filter` from firing -- on, e.g. `x ∈ s.filter (Eq b)`. /-- After filtering out everything that does not equal a given value, at most that value remains. This is equivalent to `filter_eq'` with the equality the other way. -/ theorem filter_eq [DecidableEq β] (s : Finset β) (b : β) : s.filter (Eq b) = ite (b ∈ s) {b} ∅ := by split_ifs with h · ext simp only [mem_filter, mem_singleton, decide_eq_true_eq] refine ⟨fun h => h.2.symm, ?_⟩ rintro rfl exact ⟨h, rfl⟩ · ext simp only [mem_filter, not_and, iff_false, not_mem_empty, decide_eq_true_eq] rintro m rfl exact h m /-- After filtering out everything that does not equal a given value, at most that value remains. This is equivalent to `filter_eq` with the equality the other way. -/ theorem filter_eq' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a = b) = ite (b ∈ s) {b} ∅ := _root_.trans (filter_congr fun _ _ => by simp_rw [@eq_comm _ b]) (filter_eq s b) theorem filter_ne [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => b ≠ a) = s.erase b := by ext simp only [mem_filter, mem_erase, Ne, decide_not, Bool.not_eq_true', decide_eq_false_iff_not] tauto theorem filter_ne' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a ≠ b) = s.erase b := _root_.trans (filter_congr fun _ _ => by simp_rw [@ne_comm _ b]) (filter_ne s b) theorem filter_union_filter_of_codisjoint (s : Finset α) (h : Codisjoint p q) : s.filter p ∪ s.filter q = s := (filter_or _ _ _).symm.trans <\| filter_true_of_mem fun x _ => h.top_le x trivial theorem filter_union_filter_neg_eq [∀ x, Decidable (¬p x)] (s : Finset α) : (s.filter p ∪ s.filter fun a => ¬p a) = s := filter_union_filter_of_codisjoint _ _ _ <\| @codisjoint_hnot_right _ _ p end end Filter /-! ### range -/ section Range open Nat variable {n m l : ℕ} @[simp] theorem range_filter_eq {n m : ℕ} : (range n).filter (· = m) = if m < n then {m} else ∅ := by convert filter_eq (range n) m using 2 · ext rw [eq_comm] · simp end Range end Finset /-! ### dedup on list and multiset -/ namespace Multiset variable [DecidableEq α] {s t : Multiset α} @[simp] theorem toFinset_add (s t : Multiset α) : toFinset (s + t) = toFinset s ∪ toFinset t := Finset.ext <\| by simp @[simp] theorem toFinset_inter (s t : Multiset α) : toFinset (s ∩ t) = toFinset s ∩ toFinset t := Finset.ext <\| by simp @[simp] theorem toFinset_union (s t : Multiset α) : (s ∪ t).toFinset = s.toFinset ∪ t.toFinset := by ext; simp @[simp] theorem toFinset_eq_empty {m : Multiset α} : m.toFinset = ∅ ↔ m = 0 := Finset.val_inj.symm.trans Multiset.dedup_eq_zero @[simp] theorem toFinset_nonempty : s.toFinset.Nonempty ↔ s ≠ 0 := by simp only [toFinset_eq_empty, Ne, Finset.nonempty_iff_ne_empty] @[aesop safe apply (rule_sets := [finsetNonempty])] protected alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty @[simp] theorem toFinset_filter (s : Multiset α) (p : α → Prop) [DecidablePred p] : Multiset.toFinset (s.filter p) = s.toFinset.filter p := by ext; simp end Multiset namespace List variable [DecidableEq α] {l l' : List α} {a : α} {f : α → β} {s : Finset α} {t : Set β} {t' : Finset β} @[simp] theorem toFinset_union (l l' : List α) : (l ∪ l').toFinset = l.toFinset ∪ l'.toFinset := by ext simp @[simp] theorem toFinset_inter (l l' : List α) : (l ∩ l').toFinset = l.toFinset ∩ l'.toFinset := by ext simp @[aesop safe apply (rule_sets := [finsetNonempty])] alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty_iff @[simp] theorem toFinset_filter (s : List α) (p : α → Bool) : (s.filter p).toFinset = s.toFinset.filter (p ·) := by ext; simp [List.mem_filter] end List namespace Finset section ToList @[simp] theorem toList_eq_nil {s : Finset α} : s.toList = [] ↔ s = ∅ := Multiset.toList_eq_nil.trans val_eq_zero theorem empty_toList {s : Finset α} : s.toList.isEmpty ↔ s = ∅ := by simp @[simp] theorem toList_empty : (∅ : Finset α).toList = [] := toList_eq_nil.mpr rfl theorem Nonempty.toList_ne_nil {s : Finset α} (hs : s.Nonempty) : s.toList ≠ [] := mt toList_eq_nil.mp hs.ne_empty theorem Nonempty.not_empty_toList {s : Finset α} (hs : s.Nonempty) : ¬s.toList.isEmpty := mt empty_toList.mp hs.ne_empty end ToList /-! ### choose -/ section Choose variable (p : α → Prop) [DecidablePred p] (l : Finset α) /-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of `l` satisfying `p` this unique element, as an element of the corresponding subtype. -/ def chooseX (hp : ∃! a, a ∈ l ∧ p a) : { a // a ∈ l ∧ p a } := Multiset.chooseX p l.val hp /-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of `l` satisfying `p` this unique element, as an element of the ambient type. -/ def choose (hp : ∃! a, a ∈ l ∧ p a) : α := chooseX p l hp theorem choose_spec (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) := (chooseX p l hp).property theorem choose_mem (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l := (choose_spec _ _ _).1 theorem choose_property (hp : ∃! a, a ∈ l ∧ p a) : p (choose p l hp) := (choose_spec _ _ _).2 end Choose end Finset namespace Equiv variable [DecidableEq α] {s t : Finset α} open Finset /-- The disjoint union of finsets is a sum -/ def Finset.union (s t : Finset α) (h : Disjoint s t) : s ⊕ t ≃ (s ∪ t : Finset α) := Equiv.setCongr (coe_union _ _) \|>.trans (Equiv.Set.union (disjoint_coe.mpr h)) \|>.symm @[simp] theorem Finset.union_symm_inl (h : Disjoint s t) (x : s) : Equiv.Finset.union s t h (Sum.inl x) = ⟨x, Finset.mem_union.mpr <\| Or.inl x.2⟩ := rfl @[simp] theorem Finset.union_symm_inr (h : Disjoint s t) (y : t) : Equiv.Finset.union s t h (Sum.inr y) = ⟨y, Finset.mem_union.mpr <\| Or.inr y.2⟩ := rfl /-- The type of dependent functions on the disjoint union of finsets `s ∪ t` is equivalent to the type of pairs of functions on `s` and on `t`. This is similar to `Equiv.sumPiEquivProdPi`. -/ def piFinsetUnion {ι} [DecidableEq ι] (α : ι → Type) {s t : Finset ι} (h : Disjoint s t) : ((∀ i : s, α i) × ∀ i : t, α i) ≃ ∀ i : (s ∪ t : Finset ι), α i := let e := Equiv.Finset.union s t h sumPiEquivProdPi (fun b ↦ α (e b)) \|>.symm.trans (.piCongrLeft (fun i : ↥(s ∪ t) ↦ α i) e) /-- A finset is equivalent to its coercion as a set. -/ def _root_.Finset.equivToSet (s : Finset α) : s ≃ s.toSet where toFun a := ⟨a.1, mem_coe.2 a.2⟩ invFun a := ⟨a.1, mem_coe.1 a.2⟩ left_inv := fun _ ↦ rfl right_inv := fun _ ↦ rfl end Equiv namespace Multiset variable [DecidableEq α] @[simp] lemma toFinset_replicate (n : ℕ) (a : α) : (replicate n a).toFinset = if n = 0 then ∅ else {a} := by ext x simp only [mem_toFinset, Finset.mem_singleton, mem_replicate] split_ifs with hn <;> simp [hn] end Multiset		Mathlib/Data/Finset/Basic.lean	2,884	2,886
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Yaël Dillies, David Loeffler -/ import Mathlib.Order.PartialSups import Mathlib.Order.Interval.Finset.Fin /-! # Making a sequence disjoint This file defines the way to make a sequence of sets - or, more generally, a map from a partially ordered type `ι` into a (generalized) Boolean algebra `α` - into a pairwise disjoint sequence with the same partial sups. For a sequence `f : ℕ → α`, this new sequence will be `f 0`, `f 1 \ f 0`, `f 2 \ (f 0 ⊔ f 1) ⋯`. It is actually unique, as `disjointed_unique` shows. ## Main declarations * `disjointed f`: The map sending `i` to `f i \ (⨆ j < i, f j)`. We require the index type to be a `LocallyFiniteOrderBot` to ensure that the supremum is well defined. * `partialSups_disjointed`: `disjointed f` has the same partial sups as `f`. * `disjoint_disjointed`: The elements of `disjointed f` are pairwise disjoint. * `disjointed_unique`: `disjointed f` is the only pairwise disjoint sequence having the same partial sups as `f`. * `Fintype.sup_disjointed` (for finite `ι`) or `iSup_disjointed` (for complete `α`): `disjointed f` has the same supremum as `f`. Limiting case of `partialSups_disjointed`. * `Fintype.exists_disjointed_le`: for any finite family `f : ι → α`, there exists a pairwise disjoint family `g : ι → α` which is bounded above by `f` and has the same supremum. This is an analogue of `disjointed` for arbitrary finite index types (but without any uniqueness). We also provide set notation variants of some lemmas. -/ assert_not_exists SuccAddOrder open Finset Order variable {α ι : Type} open scoped Function -- required for scoped `on` notation section GeneralizedBooleanAlgebra variable [GeneralizedBooleanAlgebra α] section Preorder -- the index type* is a preorder variable [Preorder ι] [LocallyFiniteOrderBot ι] /-- The function mapping `i` to `f i \ (⨆ j < i, f j)`. When `ι` is a partial order, this is the unique function `g` having the same `partialSups` as `f` and such that `g i` and `g j` are disjoint whenever `i < j`. -/ def disjointed (f : ι → α) (i : ι) : α := f i \ (Iio i).sup f lemma disjointed_apply (f : ι → α) (i : ι) : disjointed f i = f i \ (Iio i).sup f := rfl lemma disjointed_of_isMin (f : ι → α) {i : ι} (hn : IsMin i) : disjointed f i = f i := by have : Iio i = ∅ := by rwa [← Finset.coe_eq_empty, coe_Iio, Set.Iio_eq_empty_iff] simp only [disjointed_apply, this, sup_empty, sdiff_bot] @[simp] lemma disjointed_bot [OrderBot ι] (f : ι → α) : disjointed f ⊥ = f ⊥ := disjointed_of_isMin _ isMin_bot theorem disjointed_le_id : disjointed ≤ (id : (ι → α) → ι → α) := fun _ _ ↦ sdiff_le theorem disjointed_le (f : ι → α) : disjointed f ≤ f := disjointed_le_id f theorem disjoint_disjointed_of_lt (f : ι → α) {i j : ι} (h : i < j) : Disjoint (disjointed f i) (disjointed f j) := (disjoint_sdiff_self_right.mono_left <\| le_sup (mem_Iio.mpr h)).mono_left (disjointed_le f i) lemma disjointed_eq_self {f : ι → α} {i : ι} (hf : ∀ j < i, Disjoint (f j) (f i)) : disjointed f i = f i := by rw [disjointed_apply, sdiff_eq_left, disjoint_iff, sup_inf_distrib_left, sup_congr rfl <\| fun j hj ↦ disjoint_iff.mp <\| (hf _ (mem_Iio.mp hj)).symm] exact sup_bot _ /- NB: The original statement for `ι = ℕ` was a `def` and worked for `p : α → Sort`. I couldn't prove the `Sort` version for general `ι`, but all instances of `disjointedRec` in the library are for Prop anyway. -/ /-- An induction principle for `disjointed`. To prove something about `disjointed f i`, it's enough to prove it for `f i` and being able to extend through diffs. -/ lemma disjointedRec {f : ι → α} {p : α → Prop} (hdiff : ∀ ⦃t i⦄, p t → p (t \ f i)) : ∀ ⦃i⦄, p (f i) → p (disjointed f i) := by classical intro i hpi rw [disjointed] suffices ∀ (s : Finset ι), p (f i \ s.sup f) from this _ intro s induction s using Finset.induction with \| empty => simpa only [sup_empty, sdiff_bot] using hpi \| insert _ _ ht IH => rw [sup_insert, sup_comm, ← sdiff_sdiff] exact hdiff IH end Preorder section PartialOrder -- the index type is a partial order variable [PartialOrder ι] [LocallyFiniteOrderBot ι] @[simp] theorem partialSups_disjointed (f : ι → α) : partialSups (disjointed f) = partialSups f := by -- This seems to be much more awkward than the case of linear orders, because the supremum -- in the definition of `disjointed` can involve multiple "paths" through the poset.	classical -- We argue by induction on the size of `Iio i`. suffices ∀ r i (hi : #(Iio i) ≤ r), partialSups (disjointed f) i = partialSups f i from OrderHom.ext _ _ (funext fun i ↦ this _ i le_rfl) intro r i hi	Mathlib/Order/Disjointed.lean	114	118
/- Copyright (c) 2022 Julian Berman. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Julian Berman -/ import Mathlib.GroupTheory.PGroup import Mathlib.LinearAlgebra.Quotient.Defs /-! # Torsion groups This file defines torsion groups, i.e. groups where all elements have finite order. ## Main definitions * `Monoid.IsTorsion` a predicate asserting `G` is torsion, i.e. that all elements are of finite order. * `CommGroup.torsion G`, the torsion subgroup of an abelian group `G` * `CommMonoid.torsion G`, the above stated for commutative monoids * `Monoid.IsTorsionFree`, asserting no nontrivial elements have finite order in `G` * `AddMonoid.IsTorsion` and `AddMonoid.IsTorsionFree` the additive versions of the above ## Implementation All torsion monoids are really groups (which is proven here as `Monoid.IsTorsion.group`), but since the definition can be stated on monoids it is implemented on `Monoid` to match other declarations in the group theory library. ## Tags periodic group, aperiodic group, torsion subgroup, torsion abelian group ## Future work * generalize to π-torsion(-free) groups for a set of primes π * free, free solvable and free abelian groups are torsion free * complete direct and free products of torsion free groups are torsion free * groups which are residually finite p-groups with respect to 2 distinct primes are torsion free -/ variable {G H : Type} namespace Monoid variable (G) [Monoid G] /-- A predicate on a monoid saying that all elements are of finite order. -/ @[to_additive "A predicate on an additive monoid saying that all elements are of finite order."] def IsTorsion := ∀ g : G, IsOfFinOrder g /-- A monoid is not a torsion monoid if it has an element of infinite order. -/ @[to_additive (attr := simp) "An additive monoid is not a torsion monoid if it has an element of infinite order."] theorem not_isTorsion_iff : ¬IsTorsion G ↔ ∃ g : G, ¬IsOfFinOrder g := by rw [IsTorsion, not_forall] end Monoid open Monoid /-- Torsion monoids are really groups. -/ @[to_additive "Torsion additive monoids are really additive groups"] noncomputable def IsTorsion.group [Monoid G] (tG : IsTorsion G) : Group G := { ‹Monoid G› with inv := fun g => g ^ (orderOf g - 1) inv_mul_cancel := fun g => by rw [← pow_succ, tsub_add_cancel_of_le, pow_orderOf_eq_one] exact (tG g).orderOf_pos } section Group variable [Group G] {N : Subgroup G} [Group H] /-- Subgroups of torsion groups are torsion groups. -/ @[to_additive "Subgroups of additive torsion groups are additive torsion groups."] theorem IsTorsion.subgroup (tG : IsTorsion G) (H : Subgroup G) : IsTorsion H := fun h => Submonoid.isOfFinOrder_coe.1 <\| tG h /-- The image of a surjective torsion group homomorphism is torsion. -/ @[to_additive AddIsTorsion.of_surjective "The image of a surjective additive torsion group homomorphism is torsion."] theorem IsTorsion.of_surjective {f : G → H} (hf : Function.Surjective f) (tG : IsTorsion G) : IsTorsion H := fun h => by obtain ⟨g, hg⟩ := hf h rw [← hg] exact f.isOfFinOrder (tG g) /-- Torsion groups are closed under extensions. -/ @[to_additive AddIsTorsion.extension_closed "Additive torsion groups are closed under extensions."] theorem IsTorsion.extension_closed {f : G →* H} (hN : N = f.ker) (tH : IsTorsion H) (tN : IsTorsion N) : IsTorsion G := fun g => by obtain ⟨ngn, ngnpos, hngn⟩ := (tH <\| f g).exists_pow_eq_one have hmem := MonoidHom.mem_ker.mpr ((f.map_pow g ngn).trans hngn) lift g ^ ngn to N using hN.symm ▸ hmem with gn h obtain ⟨nn, nnpos, hnn⟩ := (tN gn).exists_pow_eq_one exact isOfFinOrder_iff_pow_eq_one.mpr <\| ⟨ngn * nn, mul_pos ngnpos nnpos, by rw [pow_mul, ← h, ← Subgroup.coe_pow, hnn, Subgroup.coe_one]⟩ /-- The image of a quotient is torsion iff the group is torsion. -/ @[to_additive AddIsTorsion.quotient_iff "The image of a quotient is additively torsion iff the group is torsion."] theorem IsTorsion.quotient_iff {f : G →* H} (hf : Function.Surjective f) (hN : N = f.ker) (tN : IsTorsion N) : IsTorsion H ↔ IsTorsion G := ⟨fun tH => IsTorsion.extension_closed hN tH tN, fun tG => IsTorsion.of_surjective hf tG⟩ /-- If a group exponent exists, the group is torsion. -/ @[to_additive ExponentExists.is_add_torsion "If a group exponent exists, the group is additively torsion."] theorem ExponentExists.isTorsion (h : ExponentExists G) : IsTorsion G := fun g => by obtain ⟨n, npos, hn⟩ := h exact isOfFinOrder_iff_pow_eq_one.mpr ⟨n, npos, hn g⟩ /-- The group exponent exists for any bounded torsion group. -/ @[to_additive IsAddTorsion.exponentExists "The group exponent exists for any bounded additive torsion group."] theorem IsTorsion.exponentExists (tG : IsTorsion G) (bounded : (Set.range fun g : G => orderOf g).Finite) : ExponentExists G := exponent_ne_zero.mp <\| (exponent_ne_zero_iff_range_orderOf_finite fun g => (tG g).orderOf_pos).mpr bounded /-- Finite groups are torsion groups. -/ @[to_additive is_add_torsion_of_finite "Finite additive groups are additive torsion groups."] theorem isTorsion_of_finite [Finite G] : IsTorsion G := ExponentExists.isTorsion .of_finite end Group section Module -- A (semi/)ring of scalars and a commutative monoid of elements variable (R M : Type) [AddCommMonoid M] namespace AddMonoid /-- A module whose scalars are additively torsion is additively torsion. -/ theorem IsTorsion.module_of_torsion [Semiring R] [Module R M] (tR : IsTorsion R) : IsTorsion M := fun f => isOfFinAddOrder_iff_nsmul_eq_zero.mpr <\| by obtain ⟨n, npos, hn⟩ := (tR 1).exists_nsmul_eq_zero exact ⟨n, npos, by simp only [← Nat.cast_smul_eq_nsmul R _ f, ← nsmul_one, hn, zero_smul]⟩ /-- A module with a finite ring of scalars is additively torsion. -/ theorem IsTorsion.module_of_finite [Ring R] [Finite R] [Module R M] : IsTorsion M := (is_add_torsion_of_finite : IsTorsion R).module_of_torsion _ _ end AddMonoid end Module section CommMonoid variable (G) [CommMonoid G] namespace CommMonoid /-- The torsion submonoid of a commutative monoid. (Note that by `Monoid.IsTorsion.group` torsion monoids are truthfully groups.) -/ @[to_additive addTorsion "The torsion submonoid of an additive commutative monoid."] def torsion : Submonoid G where carrier := { x \| IsOfFinOrder x } one_mem' := IsOfFinOrder.one mul_mem' hx hy := hx.mul hy variable {G} /-- Torsion submonoids are torsion. -/ @[to_additive "Additive torsion submonoids are additively torsion."] theorem torsion.isTorsion : IsTorsion <\| torsion G := fun ⟨x, n, npos, hn⟩ => ⟨n, npos, Subtype.ext <\| by dsimp rw [mul_left_iterate] change _ 1 = 1 rw [_root_.mul_one, SubmonoidClass.coe_pow, Subtype.coe_mk, (isPeriodicPt_mul_iff_pow_eq_one _).mp hn]⟩ variable (G) (p : ℕ) [hp : Fact p.Prime] /-- The `p`-primary component is the submonoid of elements with order prime-power of `p`. -/ @[to_additive (attr := simps) "The `p`-primary component is the submonoid of elements with additive order prime-power of `p`."] def primaryComponent : Submonoid G where carrier := { g \| ∃ n : ℕ, orderOf g = p ^ n } one_mem' := ⟨0, by rw [pow_zero, orderOf_one]⟩ mul_mem' hg₁ hg₂ := exists_orderOf_eq_prime_pow_iff.mpr <\| by obtain ⟨m, hm⟩ := exists_orderOf_eq_prime_pow_iff.mp hg₁ obtain ⟨n, hn⟩ := exists_orderOf_eq_prime_pow_iff.mp hg₂ exact ⟨m + n, by rw [mul_pow, pow_add, pow_mul, hm, one_pow, Monoid.one_mul, mul_comm, pow_mul, hn, one_pow]⟩ variable {G} {p} /-- Elements of the `p`-primary component have order `p^n` for some `n`. -/ @[to_additive primaryComponent.exists_orderOf_eq_prime_nsmul "Elements of the `p`-primary component have additive order `p^n` for some `n`"] theorem primaryComponent.exists_orderOf_eq_prime_pow (g : CommMonoid.primaryComponent G p) : ∃ n : ℕ, orderOf g = p ^ n := by obtain ⟨_, hn⟩ := g.property rw [orderOf_submonoid g] at hn exact ⟨_, hn⟩ /-- The `p`- and `q`-primary components are disjoint for `p ≠ q`. -/ @[to_additive "The `p`- and `q`-primary components are disjoint for `p ≠ q`."] theorem primaryComponent.disjoint {p' : ℕ} [hp' : Fact p'.Prime] (hne : p ≠ p') : Disjoint (CommMonoid.primaryComponent G p) (CommMonoid.primaryComponent G p') := Submonoid.disjoint_def.mpr <\| by rintro g ⟨_ \| n, hn⟩ ⟨n', hn'⟩ · rwa [pow_zero, orderOf_eq_one_iff] at hn · exact absurd (eq_of_prime_pow_eq hp.out.prime hp'.out.prime n.succ_pos (hn.symm.trans hn')) hne end CommMonoid open CommMonoid (torsion) namespace Monoid.IsTorsion variable {G} /-- The torsion submonoid of a torsion monoid is `⊤`. -/ @[to_additive (attr := simp) "The additive torsion submonoid of an additive torsion monoid is `⊤`."] theorem torsion_eq_top (tG : IsTorsion G) : torsion G = ⊤ := by ext; tauto /-- A torsion monoid is isomorphic to its torsion submonoid. -/ @[to_additive "An additive torsion monoid is isomorphic to its torsion submonoid."] def torsionMulEquiv (tG : IsTorsion G) : torsion G ≃* G := (MulEquiv.submonoidCongr tG.torsion_eq_top).trans Submonoid.topEquiv @[to_additive] theorem torsionMulEquiv_apply (tG : IsTorsion G) (a : torsion G) : tG.torsionMulEquiv a = MulEquiv.submonoidCongr tG.torsion_eq_top a := rfl @[to_additive] theorem torsionMulEquiv_symm_apply_coe (tG : IsTorsion G) (a : G) : tG.torsionMulEquiv.symm a = ⟨Submonoid.topEquiv.symm a, tG _⟩ := rfl end Monoid.IsTorsion /-- Torsion submonoids of a torsion submonoid are isomorphic to the submonoid. -/ @[to_additive (attr := simp) AddCommMonoid.Torsion.ofTorsion "Additive torsion submonoids of an additive torsion submonoid are isomorphic to the submonoid."] def Torsion.ofTorsion : torsion (torsion G) ≃* torsion G := Monoid.IsTorsion.torsionMulEquiv CommMonoid.torsion.isTorsion end CommMonoid section CommGroup variable (G) [CommGroup G] namespace CommGroup /-- The torsion subgroup of an abelian group. -/ @[to_additive "The torsion subgroup of an additive abelian group."] def torsion : Subgroup G := { CommMonoid.torsion G with inv_mem' := fun hx => IsOfFinOrder.inv hx } /-- The torsion submonoid of an abelian group equals the torsion subgroup as a submonoid. -/ @[to_additive add_torsion_eq_add_torsion_submonoid "The additive torsion submonoid of an abelian group equals the torsion subgroup as a submonoid."] theorem torsion_eq_torsion_submonoid : CommMonoid.torsion G = (torsion G).toSubmonoid := rfl @[to_additive] theorem mem_torsion (g : G) : g ∈ torsion G ↔ IsOfFinOrder g := Iff.rfl variable (p : ℕ) [hp : Fact p.Prime] /-- The `p`-primary component is the subgroup of elements with order prime-power of `p`. -/ @[to_additive (attr := simps!) "The `p`-primary component is the subgroup of elements with additive order prime-power of `p`."] def primaryComponent : Subgroup G := { CommMonoid.primaryComponent G p with inv_mem' := fun {g} ⟨n, hn⟩ => ⟨n, (orderOf_inv g).trans hn⟩ } variable {G} {p} /-- The `p`-primary component is a `p` group. -/ theorem primaryComponent.isPGroup : IsPGroup p <\| primaryComponent G p := fun g => (propext exists_orderOf_eq_prime_pow_iff.symm).mpr (CommMonoid.primaryComponent.exists_orderOf_eq_prime_pow g) end CommGroup end CommGroup namespace Monoid section Monoid variable (G) [Monoid G] /-- A predicate on a monoid saying that only 1 is of finite order. This definition is mathematically incorrect for monoids which are not groups. Please use `IsMulTorsionFree` instead. -/ @[to_additive "A predicate on an additive monoid saying that only 0 is of finite order. This definition is mathematically incorrect for monoids which are not groups. Please use `IsAddTorsionFree` instead. "] def IsTorsionFree := ∀ g : G, g ≠ 1 → ¬IsOfFinOrder g variable {G} /-- A nontrivial monoid is not torsion-free if any nontrivial element has finite order. -/ @[to_additive (attr := simp) "An additive monoid is not torsion free if any nontrivial element has finite order."] theorem not_isTorsionFree_iff : ¬IsTorsionFree G ↔ ∃ g : G, g ≠ 1 ∧ IsOfFinOrder g := by simp_rw [IsTorsionFree, Ne, not_forall, Classical.not_not, exists_prop] @[to_additive (attr := simp)] lemma isTorsionFree_of_subsingleton [Subsingleton G] : IsTorsionFree G := fun _a ha _ => ha <\| Subsingleton.elim _ _ @[to_additive] lemma isTorsionFree_iff_torsion_eq_bot {G} [CommGroup G] : IsTorsionFree G ↔ CommGroup.torsion G = ⊥ := by rw [IsTorsionFree, eq_bot_iff, SetLike.le_def] simp [not_imp_not, CommGroup.mem_torsion] end Monoid section Group variable [Group G] /-- A nontrivial torsion group is not torsion-free. -/ @[to_additive "A nontrivial additive torsion group is not torsion-free."] theorem IsTorsion.not_torsion_free [hN : Nontrivial G] : IsTorsion G → ¬IsTorsionFree G := fun tG => not_isTorsionFree_iff.mpr <\| by obtain ⟨x, hx⟩ := (nontrivial_iff_exists_ne (1 : G)).mp hN exact ⟨x, hx, tG x⟩ /-- A nontrivial torsion-free group is not torsion. -/ @[to_additive "A nontrivial torsion-free additive group is not torsion."] theorem IsTorsionFree.not_torsion [hN : Nontrivial G] : IsTorsionFree G → ¬IsTorsion G := fun tfG => (not_isTorsion_iff _).mpr <\| by obtain ⟨x, hx⟩ := (nontrivial_iff_exists_ne (1 : G)).mp hN exact ⟨x, (tfG x) hx⟩ /-- Subgroups of torsion-free groups are torsion-free. -/ @[to_additive "Subgroups of additive torsion-free groups are additively torsion-free."] theorem IsTorsionFree.subgroup (tG : IsTorsionFree G) (H : Subgroup G) : IsTorsionFree H := fun h hne ↦ Submonoid.isOfFinOrder_coe.not.1 <\| tG h <\| by norm_cast /-- Direct products of torsion free groups are torsion free. -/ @[to_additive AddMonoid.IsTorsionFree.prod "Direct products of additive torsion free groups are torsion free."] theorem IsTorsionFree.prod {η : Type} {Gs : η → Type} [∀ i, Group (Gs i)] (tfGs : ∀ i, IsTorsionFree (Gs i)) : IsTorsionFree <\| ∀ i, Gs i := fun w hne h => hne <\| funext fun i => Classical.not_not.mp <\| mt (tfGs i (w i)) <\| Classical.not_not.mpr <\| h.apply i end Group section CommGroup open Monoid (IsTorsionFree) open CommGroup (torsion) variable (G) [CommGroup G] /-- Quotienting a group by its torsion subgroup yields a torsion free group. -/ @[to_additive "Quotienting a group by its additive torsion subgroup yields an additive torsion free group."] theorem IsTorsionFree.quotient_torsion : IsTorsionFree <\| G ⧸ torsion G := fun g hne hfin => hne <\| by induction' g using QuotientGroup.induction_on with g obtain ⟨m, mpos, hm⟩ := hfin.exists_pow_eq_one obtain ⟨n, npos, hn⟩ := ((QuotientGroup.eq_one_iff _).mp hm).exists_pow_eq_one exact (QuotientGroup.eq_one_iff g).mpr (isOfFinOrder_iff_pow_eq_one.mpr ⟨m * n, mul_pos mpos npos, (pow_mul g m n).symm ▸ hn⟩) end CommGroup end Monoid namespace AddMonoid lemma isTorsionFree_iff_noZeroSMulDivisors_nat {M : Type*} [AddMonoid M] :	IsTorsionFree M ↔ NoZeroSMulDivisors ℕ M := by simp_rw [AddMonoid.IsTorsionFree, isOfFinAddOrder_iff_nsmul_eq_zero, not_exists, not_and, pos_iff_ne_zero, noZeroSMulDivisors_iff, forall_swap (β := ℕ)] exact forall₂_congr fun _ _ ↦ by tauto	Mathlib/GroupTheory/Torsion.lean	393	396
/- 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 ?_ congr with i simp [Complex.norm_pow] _ ≤ Real.exp ‖x‖ - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by gcongr exact Real.sum_le_exp_of_nonneg (norm_nonneg _) _ lemma norm_exp_le_exp_norm (x : ℂ) : ‖exp x‖ ≤ Real.exp ‖x‖ := by convert norm_exp_sub_sum_le_exp_norm_sub_sum x 0 using 1 <;> simp lemma norm_exp_sub_sum_le_norm_mul_exp (x : ℂ) (n : ℕ) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * Real.exp ‖x‖ := 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] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ _ 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 * (‖x‖ ^ (m - n) / (m - n).factorial) := by simp_rw [Complex.norm_mul, Complex.norm_pow, Complex.norm_div, norm_natCast] gcongr with i hi · rw [Complex.norm_pow] · simp _ = ‖x‖ ^ n * ∑ m ∈ range j with n ≤ m, (‖x‖ ^ (m - n) / (m - n).factorial) := by rw [← mul_sum] _ = ‖x‖ ^ n * ∑ m ∈ range (j - n), (‖x‖ ^ m / m.factorial) := by congr 1 refine (sum_bij (fun m hm ↦ m + n) ?_ ?_ ?_ ?_).symm · intro a ha simp only [mem_filter, mem_range, le_add_iff_nonneg_left, zero_le, and_true] simp only [mem_range] at ha rwa [← lt_tsub_iff_right] · intro a ha b hb hab simpa using hab · intro b hb simp only [mem_range, exists_prop] simp only [mem_filter, mem_range] at hb refine ⟨b - n, ?_, ?_⟩ · rw [tsub_lt_tsub_iff_right hb.2] exact hb.1 · rw [tsub_add_cancel_of_le hb.2] · simp _ ≤ ‖x‖ ^ n * Real.exp ‖x‖ := by gcongr refine Real.sum_le_exp_of_nonneg ?_ _ exact norm_nonneg _ @[deprecated (since := "2025-02-16")] alias abs_exp_sub_one_le := norm_exp_sub_one_le @[deprecated (since := "2025-02-16")] alias abs_exp_sub_one_sub_id_le := norm_exp_sub_one_sub_id_le @[deprecated (since := "2025-02-16")] alias abs_exp_sub_sum_le_exp_abs_sub_sum := norm_exp_sub_sum_le_exp_norm_sub_sum @[deprecated (since := "2025-02-16")] alias abs_exp_le_exp_abs := norm_exp_le_exp_norm @[deprecated (since := "2025-02-16")] alias abs_exp_sub_sum_le_abs_mul_exp := norm_exp_sub_sum_le_norm_mul_exp end Complex namespace Real open Complex Finset nonrec theorem exp_bound {x : ℝ} (hx : \|x\| ≤ 1) {n : ℕ} (hn : 0 < n) : \|exp x - ∑ m ∈ range n, x ^ m / m.factorial\| ≤ \|x\| ^ n * (n.succ / (n.factorial * n)) := by have hxc : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx convert exp_bound hxc hn using 2 <;> norm_cast theorem exp_bound' {x : ℝ} (h1 : 0 ≤ x) (h2 : x ≤ 1) {n : ℕ} (hn : 0 < n) : Real.exp x ≤ (∑ m ∈ Finset.range n, x ^ m / m.factorial) + x ^ n * (n + 1) / (n.factorial * n) := by have h3 : \|x\| = x := by simpa have h4 : \|x\| ≤ 1 := by rwa [h3] have h' := Real.exp_bound h4 hn rw [h3] at h' have h'' := (abs_sub_le_iff.1 h').1 have t := sub_le_iff_le_add'.1 h'' simpa [mul_div_assoc] using t theorem abs_exp_sub_one_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1\| ≤ 2 * \|x\| := by have : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx exact_mod_cast Complex.norm_exp_sub_one_le (x := x) this theorem abs_exp_sub_one_sub_id_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1 - x\| ≤ x ^ 2 := by rw [← sq_abs] have : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx exact_mod_cast Complex.norm_exp_sub_one_sub_id_le this /-- A finite initial segment of the exponential series, followed by an arbitrary tail. For fixed `n` this is just a linear map wrt `r`, and each map is a simple linear function of the previous (see `expNear_succ`), with `expNear n x r ⟶ exp x` as `n ⟶ ∞`, for any `r`. -/ noncomputable def expNear (n : ℕ) (x r : ℝ) : ℝ := (∑ m ∈ range n, x ^ m / m.factorial) + x ^ n / n.factorial * r @[simp] theorem expNear_zero (x r) : expNear 0 x r = r := by simp [expNear] @[simp] theorem expNear_succ (n x r) : expNear (n + 1) x r = expNear n x (1 + x / (n + 1) * r) := by simp [expNear, range_succ, mul_add, add_left_comm, add_assoc, pow_succ, div_eq_mul_inv, mul_inv, Nat.factorial] ac_rfl theorem expNear_sub (n x r₁ r₂) : expNear n x r₁ - expNear n x r₂ = x ^ n / n.factorial * (r₁ - r₂) := by simp [expNear, mul_sub] theorem exp_approx_end (n m : ℕ) (x : ℝ) (e₁ : n + 1 = m) (h : \|x\| ≤ 1) : \|exp x - expNear m x 0\| ≤ \|x\| ^ m / m.factorial * ((m + 1) / m) := by simp only [expNear, mul_zero, add_zero] convert exp_bound (n := m) h ?_ using 1 · field_simp [mul_comm] · omega theorem exp_approx_succ {n} {x a₁ b₁ : ℝ} (m : ℕ) (e₁ : n + 1 = m) (a₂ b₂ : ℝ) (e : \|1 + x / m * a₂ - a₁\| ≤ b₁ - \|x\| / m * b₂) (h : \|exp x - expNear m x a₂\| ≤ \|x\| ^ m / m.factorial * b₂) : \|exp x - expNear n x a₁\| ≤ \|x\| ^ n / n.factorial * b₁ := by refine (abs_sub_le _ _ _).trans ((add_le_add_right h _).trans ?_) subst e₁; rw [expNear_succ, expNear_sub, abs_mul] convert mul_le_mul_of_nonneg_left (a := \|x\| ^ n / ↑(Nat.factorial n)) (le_sub_iff_add_le'.1 e) ?_ using 1 · simp [mul_add, pow_succ', div_eq_mul_inv, abs_mul, abs_inv, ← pow_abs, mul_inv, Nat.factorial] ac_rfl · simp [div_nonneg, abs_nonneg] theorem exp_approx_end' {n} {x a b : ℝ} (m : ℕ) (e₁ : n + 1 = m) (rm : ℝ) (er : ↑m = rm) (h : \|x\| ≤ 1) (e : \|1 - a\| ≤ b - \|x\| / rm * ((rm + 1) / rm)) : \|exp x - expNear n x a\| ≤ \|x\| ^ n / n.factorial * b := by subst er exact exp_approx_succ _ e₁ _ _ (by simpa using e) (exp_approx_end _ _ _ e₁ h) theorem exp_1_approx_succ_eq {n} {a₁ b₁ : ℝ} {m : ℕ} (en : n + 1 = m) {rm : ℝ} (er : ↑m = rm) (h : \|exp 1 - expNear m 1 ((a₁ - 1) * rm)\| ≤ \|1\| ^ m / m.factorial * (b₁ * rm)) : \|exp 1 - expNear n 1 a₁\| ≤ \|1\| ^ n / n.factorial * b₁ := by subst er refine exp_approx_succ _ en _ _ ?_ h field_simp [show (m : ℝ) ≠ 0 by norm_cast; omega] theorem exp_approx_start (x a b : ℝ) (h : \|exp x - expNear 0 x a\| ≤ \|x\| ^ 0 / Nat.factorial 0 * b) : \|exp x - a\| ≤ b := by simpa using h theorem exp_bound_div_one_sub_of_interval' {x : ℝ} (h1 : 0 < x) (h2 : x < 1) : Real.exp x < 1 / (1 - x) := by have H : 0 < 1 - (1 + x + x ^ 2) * (1 - x) := calc 0 < x ^ 3 := by positivity _ = 1 - (1 + x + x ^ 2) * (1 - x) := by ring calc exp x ≤ _ := exp_bound' h1.le h2.le zero_lt_three _ ≤ 1 + x + x ^ 2 := by -- Porting note: was `norm_num [Finset.sum] <;> nlinarith` -- This proof should be restored after the norm_num plugin for big operators is ported. -- (It may also need the positivity extensions in https://github.com/leanprover-community/mathlib4/pull/3907.) rw [show 3 = 1 + 1 + 1 from rfl] repeat rw [Finset.sum_range_succ] norm_num [Nat.factorial] nlinarith _ < 1 / (1 - x) := by rw [lt_div_iff₀] <;> nlinarith theorem exp_bound_div_one_sub_of_interval {x : ℝ} (h1 : 0 ≤ x) (h2 : x < 1) : Real.exp x ≤ 1 / (1 - x) := by rcases eq_or_lt_of_le h1 with (rfl \| h1) · simp · exact (exp_bound_div_one_sub_of_interval' h1 h2).le theorem add_one_lt_exp {x : ℝ} (hx : x ≠ 0) : x + 1 < Real.exp x := by obtain hx \| hx := hx.symm.lt_or_lt · exact add_one_lt_exp_of_pos hx obtain h' \| h' := le_or_lt 1 (-x) · linarith [x.exp_pos] have hx' : 0 < x + 1 := by linarith simpa [add_comm, exp_neg, inv_lt_inv₀ (exp_pos _) hx'] using exp_bound_div_one_sub_of_interval' (neg_pos.2 hx) h' theorem add_one_le_exp (x : ℝ) : x + 1 ≤ Real.exp x := by obtain rfl \| hx := eq_or_ne x 0 · simp · exact (add_one_lt_exp hx).le lemma one_sub_lt_exp_neg {x : ℝ} (hx : x ≠ 0) : 1 - x < exp (-x) := (sub_eq_neg_add _ _).trans_lt <\| add_one_lt_exp <\| neg_ne_zero.2 hx lemma one_sub_le_exp_neg (x : ℝ) : 1 - x ≤ exp (-x) := (sub_eq_neg_add _ _).trans_le <\| add_one_le_exp _ theorem one_sub_div_pow_le_exp_neg {n : ℕ} {t : ℝ} (ht' : t ≤ n) : (1 - t / n) ^ n ≤ exp (-t) := by rcases eq_or_ne n 0 with (rfl \| hn) · simp rwa [Nat.cast_zero] at ht' calc (1 - t / n) ^ n ≤ rexp (-(t / n)) ^ n := by gcongr · exact sub_nonneg.2 <\| div_le_one_of_le₀ ht' n.cast_nonneg · exact one_sub_le_exp_neg _ _ = rexp (-t) := by rw [← Real.exp_nat_mul, mul_neg, mul_comm, div_mul_cancel₀]; positivity lemma le_inv_mul_exp (x : ℝ) {c : ℝ} (hc : 0 < c) : x ≤ c⁻¹ * exp (c * x) := by rw [le_inv_mul_iff₀ hc] calc c * x _ ≤ c * x + 1 := le_add_of_nonneg_right zero_le_one _ ≤ _ := Real.add_one_le_exp (c * x) end Real namespace Mathlib.Meta.Positivity open Lean.Meta Qq /-- Extension for the `positivity` tactic: `Real.exp` is always positive. -/ @[positivity Real.exp _] def evalExp : PositivityExt where eval {u α} _ _ e := do match u, α, e with \| 0, ~q(ℝ), ~q(Real.exp $a) => assertInstancesCommute pure (.positive q(Real.exp_pos $a)) \| _, _, _ => throwError "not Real.exp" end Mathlib.Meta.Positivity namespace Complex @[simp] theorem norm_exp_ofReal (x : ℝ) : ‖exp x‖ = Real.exp x := by rw [← ofReal_exp] exact Complex.norm_of_nonneg (le_of_lt (Real.exp_pos _)) @[deprecated (since := "2025-02-16")] alias abs_exp_ofReal := norm_exp_ofReal end Complex		Mathlib/Data/Complex/Exponential.lean	1,092	1,092
/- Copyright (c) 2021 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash, Eric Wieser -/ import Mathlib.Topology.Algebra.InfiniteSum.Basic import Mathlib.Topology.Algebra.Ring.Basic import Mathlib.Topology.Algebra.Star import Mathlib.LinearAlgebra.Matrix.NonsingularInverse import Mathlib.LinearAlgebra.Matrix.Trace /-! # Topological properties of matrices This file is a place to collect topological results about matrices. ## Main definitions: * `Matrix.topologicalRing`: square matrices form a topological ring ## Main results * Continuity: * `Continuous.matrix_det`: the determinant is continuous over a topological ring. * `Continuous.matrix_adjugate`: the adjugate is continuous over a topological ring. * Infinite sums * `Matrix.transpose_tsum`: transpose commutes with infinite sums * `Matrix.diagonal_tsum`: diagonal commutes with infinite sums * `Matrix.blockDiagonal_tsum`: block diagonal commutes with infinite sums * `Matrix.blockDiagonal'_tsum`: non-uniform block diagonal commutes with infinite sums -/ open Matrix variable {X α l m n p S R : Type} {m' n' : l → Type} instance [TopologicalSpace R] : TopologicalSpace (Matrix m n R) := Pi.topologicalSpace instance [TopologicalSpace R] [T2Space R] : T2Space (Matrix m n R) := Pi.t2Space /-! ### Lemmas about continuity of operations -/ section Continuity variable [TopologicalSpace X] [TopologicalSpace R] instance [SMul α R] [ContinuousConstSMul α R] : ContinuousConstSMul α (Matrix m n R) := inferInstanceAs (ContinuousConstSMul α (m → n → R)) instance [TopologicalSpace α] [SMul α R] [ContinuousSMul α R] : ContinuousSMul α (Matrix m n R) := inferInstanceAs (ContinuousSMul α (m → n → R)) instance [Add R] [ContinuousAdd R] : ContinuousAdd (Matrix m n R) := Pi.continuousAdd instance [Neg R] [ContinuousNeg R] : ContinuousNeg (Matrix m n R) := Pi.continuousNeg instance [AddGroup R] [IsTopologicalAddGroup R] : IsTopologicalAddGroup (Matrix m n R) := Pi.topologicalAddGroup /-- To show a function into matrices is continuous it suffices to show the coefficients of the resulting matrix are continuous -/ @[continuity] theorem continuous_matrix [TopologicalSpace α] {f : α → Matrix m n R} (h : ∀ i j, Continuous fun a => f a i j) : Continuous f := continuous_pi fun _ => continuous_pi fun _ => h _ _ theorem Continuous.matrix_elem {A : X → Matrix m n R} (hA : Continuous A) (i : m) (j : n) : Continuous fun x => A x i j := (continuous_apply_apply i j).comp hA @[continuity, fun_prop] theorem Continuous.matrix_map [TopologicalSpace S] {A : X → Matrix m n S} {f : S → R} (hA : Continuous A) (hf : Continuous f) : Continuous fun x => (A x).map f := continuous_matrix fun _ _ => hf.comp <\| hA.matrix_elem _ _ @[continuity, fun_prop] theorem Continuous.matrix_transpose {A : X → Matrix m n R} (hA : Continuous A) : Continuous fun x => (A x)ᵀ := continuous_matrix fun i j => hA.matrix_elem j i @[continuity, fun_prop] theorem Continuous.matrix_conjTranspose [Star R] [ContinuousStar R] {A : X → Matrix m n R} (hA : Continuous A) : Continuous fun x => (A x)ᴴ := hA.matrix_transpose.matrix_map continuous_star instance [Star R] [ContinuousStar R] : ContinuousStar (Matrix m m R) := ⟨continuous_id.matrix_conjTranspose⟩ @[continuity, fun_prop] theorem Continuous.matrix_replicateCol {ι : Type} {A : X → n → R} (hA : Continuous A) : Continuous fun x => replicateCol ι (A x) := continuous_matrix fun i _ => (continuous_apply i).comp hA @[deprecated (since := "2025-03-15")] alias Continuous.matrix_col := Continuous.matrix_replicateCol @[continuity, fun_prop] theorem Continuous.matrix_replicateRow {ι : Type} {A : X → n → R} (hA : Continuous A) : Continuous fun x => replicateRow ι (A x) := continuous_matrix fun _ _ => (continuous_apply _).comp hA @[deprecated (since := "2025-03-15")] alias Continuous.matrix_row := Continuous.matrix_replicateRow @[continuity, fun_prop] theorem Continuous.matrix_diagonal [Zero R] [DecidableEq n] {A : X → n → R} (hA : Continuous A) : Continuous fun x => diagonal (A x) := continuous_matrix fun i _ => ((continuous_apply i).comp hA).if_const _ continuous_zero @[continuity, fun_prop] theorem Continuous.matrix_dotProduct [Fintype n] [Mul R] [AddCommMonoid R] [ContinuousAdd R] [ContinuousMul R] {A : X → n → R} {B : X → n → R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => dotProduct (A x) (B x) := continuous_finset_sum _ fun i _ => ((continuous_apply i).comp hA).mul ((continuous_apply i).comp hB) /-- For square matrices the usual `continuous_mul` can be used. -/ @[continuity, fun_prop] theorem Continuous.matrix_mul [Fintype n] [Mul R] [AddCommMonoid R] [ContinuousAdd R] [ContinuousMul R] {A : X → Matrix m n R} {B : X → Matrix n p R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => A x * B x := continuous_matrix fun _ _ => continuous_finset_sum _ fun _ _ => (hA.matrix_elem _ _).mul (hB.matrix_elem _ _) instance [Fintype n] [Mul R] [AddCommMonoid R] [ContinuousAdd R] [ContinuousMul R] : ContinuousMul (Matrix n n R) := ⟨continuous_fst.matrix_mul continuous_snd⟩ instance [Fintype n] [NonUnitalNonAssocSemiring R] [IsTopologicalSemiring R] : IsTopologicalSemiring (Matrix n n R) where instance Matrix.topologicalRing [Fintype n] [NonUnitalNonAssocRing R] [IsTopologicalRing R] : IsTopologicalRing (Matrix n n R) where @[continuity, fun_prop] theorem Continuous.matrix_vecMulVec [Mul R] [ContinuousMul R] {A : X → m → R} {B : X → n → R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => vecMulVec (A x) (B x) := continuous_matrix fun _ _ => ((continuous_apply _).comp hA).mul ((continuous_apply _).comp hB) @[continuity, fun_prop] theorem Continuous.matrix_mulVec [NonUnitalNonAssocSemiring R] [ContinuousAdd R] [ContinuousMul R] [Fintype n] {A : X → Matrix m n R} {B : X → n → R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => A x ᵥ B x := continuous_pi fun i => ((continuous_apply i).comp hA).matrix_dotProduct hB @[continuity, fun_prop] theorem Continuous.matrix_vecMul [NonUnitalNonAssocSemiring R] [ContinuousAdd R] [ContinuousMul R] [Fintype m] {A : X → m → R} {B : X → Matrix m n R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => A x ᵥ B x := continuous_pi fun _i => hA.matrix_dotProduct <\| continuous_pi fun _j => hB.matrix_elem _ _ @[continuity, fun_prop] theorem Continuous.matrix_submatrix {A : X → Matrix l n R} (hA : Continuous A) (e₁ : m → l) (e₂ : p → n) : Continuous fun x => (A x).submatrix e₁ e₂ := continuous_matrix fun _i _j => hA.matrix_elem _ _ @[continuity, fun_prop] theorem Continuous.matrix_reindex {A : X → Matrix l n R} (hA : Continuous A) (e₁ : l ≃ m) (e₂ : n ≃ p) : Continuous fun x => reindex e₁ e₂ (A x) := hA.matrix_submatrix _ _ @[continuity, fun_prop] theorem Continuous.matrix_diag {A : X → Matrix n n R} (hA : Continuous A) : Continuous fun x => Matrix.diag (A x) := continuous_pi fun _ => hA.matrix_elem _ _ -- note this doesn't elaborate well from the above theorem continuous_matrix_diag : Continuous (Matrix.diag : Matrix n n R → n → R) := show Continuous fun x : Matrix n n R => Matrix.diag x from continuous_id.matrix_diag @[continuity, fun_prop] theorem Continuous.matrix_trace [Fintype n] [AddCommMonoid R] [ContinuousAdd R] {A : X → Matrix n n R} (hA : Continuous A) : Continuous fun x => trace (A x) := continuous_finset_sum _ fun _ _ => hA.matrix_elem _ _ @[continuity, fun_prop] theorem Continuous.matrix_det [Fintype n] [DecidableEq n] [CommRing R] [IsTopologicalRing R] {A : X → Matrix n n R} (hA : Continuous A) : Continuous fun x => (A x).det := by simp_rw [Matrix.det_apply] refine continuous_finset_sum _ fun l _ => Continuous.const_smul ?_ _ exact continuous_finset_prod _ fun l _ => hA.matrix_elem _ _ @[continuity, fun_prop] theorem Continuous.matrix_updateCol [DecidableEq n] (i : n) {A : X → Matrix m n R} {B : X → m → R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => (A x).updateCol i (B x) := continuous_matrix fun _j k => (continuous_apply k).comp <\| ((continuous_apply _).comp hA).update i ((continuous_apply _).comp hB) @[deprecated (since := "2024-12-11")] alias Continuous.matrix_updateColumn := Continuous.matrix_updateCol @[continuity, fun_prop] theorem Continuous.matrix_updateRow [DecidableEq m] (i : m) {A : X → Matrix m n R} {B : X → n → R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => (A x).updateRow i (B x) := hA.update i hB @[continuity, fun_prop] theorem Continuous.matrix_cramer [Fintype n] [DecidableEq n] [CommRing R] [IsTopologicalRing R] {A : X → Matrix n n R} {B : X → n → R} (hA : Continuous A) (hB : Continuous B) : Continuous fun x => cramer (A x) (B x) := continuous_pi fun _ => (hA.matrix_updateCol _ hB).matrix_det @[continuity, fun_prop] theorem Continuous.matrix_adjugate [Fintype n] [DecidableEq n] [CommRing R] [IsTopologicalRing R] {A : X → Matrix n n R} (hA : Continuous A) : Continuous fun x => (A x).adjugate := continuous_matrix fun _j k => (hA.matrix_transpose.matrix_updateCol k continuous_const).matrix_det /-- When `Ring.inverse` is continuous at the determinant (such as in a `NormedRing`, or a topological field), so is `Matrix.inv`. -/ theorem continuousAt_matrix_inv [Fintype n] [DecidableEq n] [CommRing R] [IsTopologicalRing R] (A : Matrix n n R) (h : ContinuousAt Ring.inverse A.det) : ContinuousAt Inv.inv A := (h.comp continuous_id.matrix_det.continuousAt).smul continuous_id.matrix_adjugate.continuousAt -- lemmas about functions in `Data/Matrix/Block.lean` section BlockMatrices @[continuity, fun_prop] theorem Continuous.matrix_fromBlocks {A : X → Matrix n l R} {B : X → Matrix n m R} {C : X → Matrix p l R} {D : X → Matrix p m R} (hA : Continuous A) (hB : Continuous B) (hC : Continuous C) (hD : Continuous D) : Continuous fun x => Matrix.fromBlocks (A x) (B x) (C x) (D x) := continuous_matrix <\| by rintro (i \| i) (j \| j) <;> refine Continuous.matrix_elem ?_ i j <;> assumption @[continuity, fun_prop] theorem Continuous.matrix_blockDiagonal [Zero R] [DecidableEq p] {A : X → p → Matrix m n R} (hA : Continuous A) : Continuous fun x => blockDiagonal (A x) := continuous_matrix fun ⟨i₁, i₂⟩ ⟨j₁, _j₂⟩ => (((continuous_apply i₂).comp hA).matrix_elem i₁ j₁).if_const _ continuous_zero @[continuity, fun_prop] theorem Continuous.matrix_blockDiag {A : X → Matrix (m × p) (n × p) R} (hA : Continuous A) : Continuous fun x => blockDiag (A x) := continuous_pi fun _i => continuous_matrix fun _j _k => hA.matrix_elem _ _ @[continuity, fun_prop] theorem Continuous.matrix_blockDiagonal' [Zero R] [DecidableEq l] {A : X → ∀ i, Matrix (m' i) (n' i) R} (hA : Continuous A) : Continuous fun x => blockDiagonal' (A x) := continuous_matrix fun ⟨i₁, i₂⟩ ⟨j₁, j₂⟩ => by dsimp only [blockDiagonal'_apply'] split_ifs with h · subst h exact ((continuous_apply i₁).comp hA).matrix_elem i₂ j₂ · exact continuous_const @[continuity, fun_prop] theorem Continuous.matrix_blockDiag' {A : X → Matrix (Σ i, m' i) (Σ i, n' i) R} (hA : Continuous A) : Continuous fun x => blockDiag' (A x) := continuous_pi fun _i => continuous_matrix fun _j _k => hA.matrix_elem _ _ end BlockMatrices end Continuity /-! ### Lemmas about infinite sums -/	section tsum variable [AddCommMonoid R] [TopologicalSpace R] theorem HasSum.matrix_transpose {f : X → Matrix m n R} {a : Matrix m n R} (hf : HasSum f a) : HasSum (fun x => (f x)ᵀ) aᵀ := (hf.map (Matrix.transposeAddEquiv m n R) continuous_id.matrix_transpose :)	Mathlib/Topology/Instances/Matrix.lean	265	273
/- Copyright (c) 2022 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Data.Finset.Card import Mathlib.Data.Finset.Lattice.Fold /-! # Down-compressions This file defines down-compression. Down-compressing `𝒜 : Finset (Finset α)` along `a : α` means removing `a` from the elements of `𝒜`, when the resulting set is not already in `𝒜`. ## Main declarations * `Finset.nonMemberSubfamily`: `𝒜.nonMemberSubfamily a` is the subfamily of sets not containing `a`. * `Finset.memberSubfamily`: `𝒜.memberSubfamily a` is the image of the subfamily of sets containing `a` under removing `a`. * `Down.compression`: Down-compression. ## Notation `𝓓 a 𝒜` is notation for `Down.compress a 𝒜` in locale `SetFamily`. ## References * https://github.com/b-mehta/maths-notes/blob/master/iii/mich/combinatorics.pdf ## Tags compression, down-compression -/ variable {α : Type} [DecidableEq α] {𝒜 : Finset (Finset α)} {s : Finset α} {a : α} namespace Finset /-- Elements of `𝒜` that do not contain `a`. -/ def nonMemberSubfamily (a : α) (𝒜 : Finset (Finset α)) : Finset (Finset α) := {s ∈ 𝒜 \| a ∉ s} /-- Image of the elements of `𝒜` which contain `a` under removing `a`. Finsets that do not contain `a` such that `insert a s ∈ 𝒜`. -/ def memberSubfamily (a : α) (𝒜 : Finset (Finset α)) : Finset (Finset α) := {s ∈ 𝒜 \| a ∈ s}.image fun s => erase s a @[simp] theorem mem_nonMemberSubfamily : s ∈ 𝒜.nonMemberSubfamily a ↔ s ∈ 𝒜 ∧ a ∉ s := by simp [nonMemberSubfamily] @[simp] theorem mem_memberSubfamily : s ∈ 𝒜.memberSubfamily a ↔ insert a s ∈ 𝒜 ∧ a ∉ s := by simp_rw [memberSubfamily, mem_image, mem_filter] refine ⟨?_, fun h => ⟨insert a s, ⟨h.1, by simp⟩, erase_insert h.2⟩⟩ rintro ⟨s, ⟨hs1, hs2⟩, rfl⟩ rw [insert_erase hs2] exact ⟨hs1, not_mem_erase _ _⟩ theorem nonMemberSubfamily_inter (a : α) (𝒜 ℬ : Finset (Finset α)) : (𝒜 ∩ ℬ).nonMemberSubfamily a = 𝒜.nonMemberSubfamily a ∩ ℬ.nonMemberSubfamily a := filter_inter_distrib _ _ _ theorem memberSubfamily_inter (a : α) (𝒜 ℬ : Finset (Finset α)) : (𝒜 ∩ ℬ).memberSubfamily a = 𝒜.memberSubfamily a ∩ ℬ.memberSubfamily a := by unfold memberSubfamily rw [filter_inter_distrib, image_inter_of_injOn _ _ ((erase_injOn' _).mono _)] simp theorem nonMemberSubfamily_union (a : α) (𝒜 ℬ : Finset (Finset α)) : (𝒜 ∪ ℬ).nonMemberSubfamily a = 𝒜.nonMemberSubfamily a ∪ ℬ.nonMemberSubfamily a := filter_union _ _ _ theorem memberSubfamily_union (a : α) (𝒜 ℬ : Finset (Finset α)) : (𝒜 ∪ ℬ).memberSubfamily a = 𝒜.memberSubfamily a ∪ ℬ.memberSubfamily a := by simp_rw [memberSubfamily, filter_union, image_union] theorem card_memberSubfamily_add_card_nonMemberSubfamily (a : α) (𝒜 : Finset (Finset α)) : #(𝒜.memberSubfamily a) + #(𝒜.nonMemberSubfamily a) = #𝒜 := by rw [memberSubfamily, nonMemberSubfamily, card_image_of_injOn] · conv_rhs => rw [← filter_card_add_filter_neg_card_eq_card (fun s => (a ∈ s))] · apply (erase_injOn' _).mono simp theorem memberSubfamily_union_nonMemberSubfamily (a : α) (𝒜 : Finset (Finset α)) : 𝒜.memberSubfamily a ∪ 𝒜.nonMemberSubfamily a = 𝒜.image fun s => s.erase a := by ext s simp only [mem_union, mem_memberSubfamily, mem_nonMemberSubfamily, mem_image, exists_prop] constructor · rintro (h \| h) · exact ⟨_, h.1, erase_insert h.2⟩ · exact ⟨_, h.1, erase_eq_of_not_mem h.2⟩ · rintro ⟨s, hs, rfl⟩ by_cases ha : a ∈ s · exact Or.inl ⟨by rwa [insert_erase ha], not_mem_erase _ _⟩ · exact Or.inr ⟨by rwa [erase_eq_of_not_mem ha], not_mem_erase _ _⟩ @[simp] theorem memberSubfamily_memberSubfamily : (𝒜.memberSubfamily a).memberSubfamily a = ∅ := by ext simp @[simp] theorem memberSubfamily_nonMemberSubfamily : (𝒜.nonMemberSubfamily a).memberSubfamily a = ∅ := by ext simp @[simp] theorem nonMemberSubfamily_memberSubfamily : (𝒜.memberSubfamily a).nonMemberSubfamily a = 𝒜.memberSubfamily a := by ext simp @[simp] theorem nonMemberSubfamily_nonMemberSubfamily : (𝒜.nonMemberSubfamily a).nonMemberSubfamily a = 𝒜.nonMemberSubfamily a := by ext simp lemma memberSubfamily_image_insert (h𝒜 : ∀ s ∈ 𝒜, a ∉ s) : (𝒜.image <\| insert a).memberSubfamily a = 𝒜 := by ext s simp only [mem_memberSubfamily, mem_image] refine ⟨?_, fun hs ↦ ⟨⟨s, hs, rfl⟩, h𝒜 _ hs⟩⟩ rintro ⟨⟨t, ht, hts⟩, hs⟩ rwa [← insert_erase_invOn.2.injOn (h𝒜 _ ht) hs hts] @[simp] lemma nonMemberSubfamily_image_insert : (𝒜.image <\| insert a).nonMemberSubfamily a = ∅ := by simp [eq_empty_iff_forall_not_mem] @[simp] lemma memberSubfamily_image_erase : (𝒜.image (erase · a)).memberSubfamily a = ∅ := by simp [eq_empty_iff_forall_not_mem, (ne_of_mem_of_not_mem' (mem_insert_self _ _) (not_mem_erase _ _)).symm] lemma image_insert_memberSubfamily (𝒜 : Finset (Finset α)) (a : α) : (𝒜.memberSubfamily a).image (insert a) = {s ∈ 𝒜 \| a ∈ s} := by ext s simp only [mem_memberSubfamily, mem_image, mem_filter] refine ⟨?_, fun ⟨hs, ha⟩ ↦ ⟨erase s a, ⟨?_, not_mem_erase _ _⟩, insert_erase ha⟩⟩ · rintro ⟨s, ⟨hs, -⟩, rfl⟩ exact ⟨hs, mem_insert_self _ _⟩ · rwa [insert_erase ha] /-- Induction principle for finset families. To prove a statement for every finset family, it suffices to prove it for the empty finset family. * the finset family which only contains the empty finset. * `ℬ ∪ {s ∪ {a} \| s ∈ 𝒞}` assuming the property for `ℬ` and `𝒞`, where `a` is an element of the ground type and `𝒜` and `ℬ` are families of finsets not containing `a`. Note that instead of giving `ℬ` and `𝒞`, the `subfamily` case gives you `𝒜 = ℬ ∪ {s ∪ {a} \| s ∈ 𝒞}`, so that `ℬ = 𝒜.nonMemberSubfamily` and `𝒞 = 𝒜.memberSubfamily`. This is a way of formalising induction on `n` where `𝒜` is a finset family on `n` elements. See also `Finset.family_induction_on.` -/ @[elab_as_elim] lemma memberFamily_induction_on {p : Finset (Finset α) → Prop} (𝒜 : Finset (Finset α)) (empty : p ∅) (singleton_empty : p {∅}) (subfamily : ∀ (a : α) ⦃𝒜 : Finset (Finset α)⦄, p (𝒜.nonMemberSubfamily a) → p (𝒜.memberSubfamily a) → p 𝒜) : p 𝒜 := by set u := 𝒜.sup id have hu : ∀ s ∈ 𝒜, s ⊆ u := fun s ↦ le_sup (f := id) clear_value u induction u using Finset.induction generalizing 𝒜 with \| empty => simp_rw [subset_empty] at hu rw [← subset_singleton_iff', subset_singleton_iff] at hu obtain rfl \| rfl := hu <;> assumption \| insert a u _ ih => refine subfamily a (ih _ ?_) (ih _ ?_) · simp only [mem_nonMemberSubfamily, and_imp] exact fun s hs has ↦ (subset_insert_iff_of_not_mem has).1 <\| hu _ hs · simp only [mem_memberSubfamily, and_imp] exact fun s hs ha ↦ (insert_subset_insert_iff ha).1 <\| hu _ hs /-- Induction principle for finset families. To prove a statement for every finset family, it suffices to prove it for * the empty finset family. * the finset family which only contains the empty finset. * `{s ∪ {a} \| s ∈ 𝒜}` assuming the property for `𝒜` a family of finsets not containing `a`. * `ℬ ∪ 𝒞` assuming the property for `ℬ` and `𝒞`, where `a` is an element of the ground type and `ℬ`is a family of finsets not containing `a` and `𝒞` a family of finsets containing `a`. Note that instead of giving `ℬ` and `𝒞`, the `subfamily` case gives you `𝒜 = ℬ ∪ 𝒞`, so that `ℬ = {s ∈ 𝒜 \| a ∉ s}` and `𝒞 = {s ∈ 𝒜 \| a ∈ s}`. This is a way of formalising induction on `n` where `𝒜` is a finset family on `n` elements. See also `Finset.memberFamily_induction_on.` -/ @[elab_as_elim]	protected lemma family_induction_on {p : Finset (Finset α) → Prop} (𝒜 : Finset (Finset α)) (empty : p ∅) (singleton_empty : p {∅}) (image_insert : ∀ (a : α) ⦃𝒜 : Finset (Finset α)⦄, (∀ s ∈ 𝒜, a ∉ s) → p 𝒜 → p (𝒜.image <\| insert a)) (subfamily : ∀ (a : α) ⦃𝒜 : Finset (Finset α)⦄, p {s ∈ 𝒜 \| a ∉ s} → p {s ∈ 𝒜 \| a ∈ s} → p 𝒜) : p 𝒜 := by refine memberFamily_induction_on 𝒜 empty singleton_empty fun a 𝒜 h𝒜₀ h𝒜₁ ↦ subfamily a h𝒜₀ ?_ rw [← image_insert_memberSubfamily] exact image_insert _ (by simp) h𝒜₁ end Finset open Finset -- The namespace is here to distinguish from other compressions. namespace Down /-- `a`-down-compressing `𝒜` means removing `a` from the elements of `𝒜` that contain it, when the resulting Finset is not already in `𝒜`. -/ def compression (a : α) (𝒜 : Finset (Finset α)) : Finset (Finset α) := {s ∈ 𝒜 \| erase s a ∈ 𝒜}.disjUnion {s ∈ 𝒜.image fun s ↦ erase s a \| s ∉ 𝒜} <\| disjoint_left.2 fun _s h₁ h₂ ↦ (mem_filter.1 h₂).2 (mem_filter.1 h₁).1	Mathlib/Combinatorics/SetFamily/Compression/Down.lean	193	215
/- Copyright (c) 2020 Frédéric Dupuis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Frédéric Dupuis -/ import Mathlib.Algebra.Algebra.Field import Mathlib.Algebra.BigOperators.Balance import Mathlib.Algebra.Order.BigOperators.Expect import Mathlib.Algebra.Order.Star.Basic import Mathlib.Analysis.CStarAlgebra.Basic import Mathlib.Analysis.Normed.Operator.ContinuousLinearMap import Mathlib.Data.Real.Sqrt import Mathlib.LinearAlgebra.Basis.VectorSpace /-! # `RCLike`: a typeclass for ℝ or ℂ This file defines the typeclass `RCLike` intended to have only two instances: ℝ and ℂ. It is meant for definitions and theorems which hold for both the real and the complex case, and in particular when the real case follows directly from the complex case by setting `re` to `id`, `im` to zero and so on. Its API follows closely that of ℂ. Applications include defining inner products and Hilbert spaces for both the real and complex case. One typically produces the definitions and proof for an arbitrary field of this typeclass, which basically amounts to doing the complex case, and the two cases then fall out immediately from the two instances of the class. The instance for `ℝ` is registered in this file. The instance for `ℂ` is declared in `Mathlib/Analysis/Complex/Basic.lean`. ## Implementation notes The coercion from reals into an `RCLike` field is done by registering `RCLike.ofReal` as a `CoeTC`. For this to work, we must proceed carefully to avoid problems involving circular coercions in the case `K=ℝ`; in particular, we cannot use the plain `Coe` and must set priorities carefully. This problem was already solved for `ℕ`, and we copy the solution detailed in `Mathlib/Data/Nat/Cast/Defs.lean`. See also Note [coercion into rings] for more details. In addition, several lemmas need to be set at priority 900 to make sure that they do not override their counterparts in `Mathlib/Analysis/Complex/Basic.lean` (which causes linter errors). A few lemmas requiring heavier imports are in `Mathlib/Analysis/RCLike/Lemmas.lean`. -/ open Fintype open scoped BigOperators ComplexConjugate section local notation "𝓚" => algebraMap ℝ _ /-- This typeclass captures properties shared by ℝ and ℂ, with an API that closely matches that of ℂ. -/ class RCLike (K : semiOutParam Type) extends DenselyNormedField K, StarRing K, NormedAlgebra ℝ K, CompleteSpace K where /-- The real part as an additive monoid homomorphism -/ re : K →+ ℝ /-- The imaginary part as an additive monoid homomorphism -/ im : K →+ ℝ /-- Imaginary unit in `K`. Meant to be set to `0` for `K = ℝ`. -/ I : K I_re_ax : re I = 0 I_mul_I_ax : I = 0 ∨ I I = -1 re_add_im_ax : ∀ z : K, 𝓚 (re z) + 𝓚 (im z) * I = z ofReal_re_ax : ∀ r : ℝ, re (𝓚 r) = r ofReal_im_ax : ∀ r : ℝ, im (𝓚 r) = 0 mul_re_ax : ∀ z w : K, re (z * w) = re z * re w - im z * im w mul_im_ax : ∀ z w : K, im (z * w) = re z * im w + im z * re w conj_re_ax : ∀ z : K, re (conj z) = re z conj_im_ax : ∀ z : K, im (conj z) = -im z conj_I_ax : conj I = -I norm_sq_eq_def_ax : ∀ z : K, ‖z‖ ^ 2 = re z * re z + im z * im z mul_im_I_ax : ∀ z : K, im z * im I = im z /-- only an instance in the `ComplexOrder` locale -/ [toPartialOrder : PartialOrder K] le_iff_re_im {z w : K} : z ≤ w ↔ re z ≤ re w ∧ im z = im w -- note we cannot put this in the `extends` clause [toDecidableEq : DecidableEq K] scoped[ComplexOrder] attribute [instance 100] RCLike.toPartialOrder attribute [instance 100] RCLike.toDecidableEq end variable {K E : Type} [RCLike K] namespace RCLike /-- Coercion from `ℝ` to an `RCLike` field. -/ @[coe] abbrev ofReal : ℝ → K := Algebra.cast /- The priority must be set at 900 to ensure that coercions are tried in the right order. See Note [coercion into rings], or `Mathlib/Data/Nat/Cast/Basic.lean` for more details. -/ noncomputable instance (priority := 900) algebraMapCoe : CoeTC ℝ K := ⟨ofReal⟩ theorem ofReal_alg (x : ℝ) : (x : K) = x • (1 : K) := Algebra.algebraMap_eq_smul_one x theorem real_smul_eq_coe_mul (r : ℝ) (z : K) : r • z = (r : K) z := Algebra.smul_def r z theorem real_smul_eq_coe_smul [AddCommGroup E] [Module K E] [Module ℝ E] [IsScalarTower ℝ K E] (r : ℝ) (x : E) : r • x = (r : K) • x := by rw [RCLike.ofReal_alg, smul_one_smul] theorem algebraMap_eq_ofReal : ⇑(algebraMap ℝ K) = ofReal := rfl @[simp, rclike_simps] theorem re_add_im (z : K) : (re z : K) + im z * I = z := RCLike.re_add_im_ax z @[simp, norm_cast, rclike_simps] theorem ofReal_re : ∀ r : ℝ, re (r : K) = r := RCLike.ofReal_re_ax @[simp, norm_cast, rclike_simps] theorem ofReal_im : ∀ r : ℝ, im (r : K) = 0 := RCLike.ofReal_im_ax @[simp, rclike_simps] theorem mul_re : ∀ z w : K, re (z * w) = re z * re w - im z * im w := RCLike.mul_re_ax @[simp, rclike_simps] theorem mul_im : ∀ z w : K, im (z * w) = re z * im w + im z * re w := RCLike.mul_im_ax theorem ext_iff {z w : K} : z = w ↔ re z = re w ∧ im z = im w := ⟨fun h => h ▸ ⟨rfl, rfl⟩, fun ⟨h₁, h₂⟩ => re_add_im z ▸ re_add_im w ▸ h₁ ▸ h₂ ▸ rfl⟩ theorem ext {z w : K} (hre : re z = re w) (him : im z = im w) : z = w := ext_iff.2 ⟨hre, him⟩ @[norm_cast] theorem ofReal_zero : ((0 : ℝ) : K) = 0 := algebraMap.coe_zero @[rclike_simps] theorem zero_re' : re (0 : K) = (0 : ℝ) := map_zero re @[norm_cast] theorem ofReal_one : ((1 : ℝ) : K) = 1 := map_one (algebraMap ℝ K) @[simp, rclike_simps] theorem one_re : re (1 : K) = 1 := by rw [← ofReal_one, ofReal_re] @[simp, rclike_simps] theorem one_im : im (1 : K) = 0 := by rw [← ofReal_one, ofReal_im] theorem ofReal_injective : Function.Injective ((↑) : ℝ → K) := (algebraMap ℝ K).injective @[norm_cast] theorem ofReal_inj {z w : ℝ} : (z : K) = (w : K) ↔ z = w := algebraMap.coe_inj -- replaced by `RCLike.ofNat_re` -- replaced by `RCLike.ofNat_im` theorem ofReal_eq_zero {x : ℝ} : (x : K) = 0 ↔ x = 0 := algebraMap.lift_map_eq_zero_iff x theorem ofReal_ne_zero {x : ℝ} : (x : K) ≠ 0 ↔ x ≠ 0 := ofReal_eq_zero.not @[rclike_simps, norm_cast] theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : K) = r + s := algebraMap.coe_add _ _ -- replaced by `RCLike.ofReal_ofNat` @[rclike_simps, norm_cast] theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : K) = -r := algebraMap.coe_neg r @[rclike_simps, norm_cast] theorem ofReal_sub (r s : ℝ) : ((r - s : ℝ) : K) = r - s := map_sub (algebraMap ℝ K) r s @[rclike_simps, norm_cast] theorem ofReal_sum {α : Type} (s : Finset α) (f : α → ℝ) : ((∑ i ∈ s, f i : ℝ) : K) = ∑ i ∈ s, (f i : K) := map_sum (algebraMap ℝ K) _ _ @[simp, rclike_simps, norm_cast] theorem ofReal_finsupp_sum {α M : Type} [Zero M] (f : α →₀ M) (g : α → M → ℝ) : ((f.sum fun a b => g a b : ℝ) : K) = f.sum fun a b => (g a b : K) := map_finsuppSum (algebraMap ℝ K) f g @[rclike_simps, norm_cast] theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : K) = r * s := algebraMap.coe_mul _ _ @[rclike_simps, norm_cast] theorem ofReal_pow (r : ℝ) (n : ℕ) : ((r ^ n : ℝ) : K) = (r : K) ^ n := map_pow (algebraMap ℝ K) r n @[rclike_simps, norm_cast] theorem ofReal_prod {α : Type} (s : Finset α) (f : α → ℝ) : ((∏ i ∈ s, f i : ℝ) : K) = ∏ i ∈ s, (f i : K) := map_prod (algebraMap ℝ K) _ _ @[simp, rclike_simps, norm_cast] theorem ofReal_finsuppProd {α M : Type} [Zero M] (f : α →₀ M) (g : α → M → ℝ) : ((f.prod fun a b => g a b : ℝ) : K) = f.prod fun a b => (g a b : K) := map_finsuppProd _ f g @[deprecated (since := "2025-04-06")] alias ofReal_finsupp_prod := ofReal_finsuppProd @[simp, norm_cast, rclike_simps] theorem real_smul_ofReal (r x : ℝ) : r • (x : K) = (r : K) * (x : K) := real_smul_eq_coe_mul _ _ @[rclike_simps] theorem re_ofReal_mul (r : ℝ) (z : K) : re (↑r * z) = r * re z := by simp only [mul_re, ofReal_im, zero_mul, ofReal_re, sub_zero] @[rclike_simps] theorem im_ofReal_mul (r : ℝ) (z : K) : im (↑r * z) = r * im z := by simp only [add_zero, ofReal_im, zero_mul, ofReal_re, mul_im] @[rclike_simps] theorem smul_re (r : ℝ) (z : K) : re (r • z) = r * re z := by rw [real_smul_eq_coe_mul, re_ofReal_mul] @[rclike_simps] theorem smul_im (r : ℝ) (z : K) : im (r • z) = r * im z := by rw [real_smul_eq_coe_mul, im_ofReal_mul] @[rclike_simps, norm_cast] theorem norm_ofReal (r : ℝ) : ‖(r : K)‖ = \|r\| := norm_algebraMap' K r /-! ### Characteristic zero -/ -- see Note [lower instance priority] /-- ℝ and ℂ are both of characteristic zero. -/ instance (priority := 100) charZero_rclike : CharZero K := (RingHom.charZero_iff (algebraMap ℝ K).injective).1 inferInstance @[rclike_simps, norm_cast] lemma ofReal_expect {α : Type} (s : Finset α) (f : α → ℝ) : 𝔼 i ∈ s, f i = 𝔼 i ∈ s, (f i : K) := map_expect (algebraMap ..) .. @[norm_cast] lemma ofReal_balance {ι : Type} [Fintype ι] (f : ι → ℝ) (i : ι) : ((balance f i : ℝ) : K) = balance ((↑) ∘ f) i := map_balance (algebraMap ..) .. @[simp] lemma ofReal_comp_balance {ι : Type} [Fintype ι] (f : ι → ℝ) : ofReal ∘ balance f = balance (ofReal ∘ f : ι → K) := funext <\| ofReal_balance _ /-! ### The imaginary unit, `I` -/ /-- The imaginary unit. -/ @[simp, rclike_simps] theorem I_re : re (I : K) = 0 := I_re_ax @[simp, rclike_simps] theorem I_im (z : K) : im z im (I : K) = im z := mul_im_I_ax z @[simp, rclike_simps] theorem I_im' (z : K) : im (I : K) * im z = im z := by rw [mul_comm, I_im] @[rclike_simps] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11119): was `simp` theorem I_mul_re (z : K) : re (I * z) = -im z := by simp only [I_re, zero_sub, I_im', zero_mul, mul_re] theorem I_mul_I : (I : K) = 0 ∨ (I : K) * I = -1 := I_mul_I_ax variable (𝕜) in lemma I_eq_zero_or_im_I_eq_one : (I : K) = 0 ∨ im (I : K) = 1 := I_mul_I (K := K) \|>.imp_right fun h ↦ by simpa [h] using (I_mul_re (I : K)).symm @[simp, rclike_simps] theorem conj_re (z : K) : re (conj z) = re z := RCLike.conj_re_ax z @[simp, rclike_simps] theorem conj_im (z : K) : im (conj z) = -im z := RCLike.conj_im_ax z @[simp, rclike_simps] theorem conj_I : conj (I : K) = -I := RCLike.conj_I_ax @[simp, rclike_simps] theorem conj_ofReal (r : ℝ) : conj (r : K) = (r : K) := by rw [ext_iff] simp only [ofReal_im, conj_im, eq_self_iff_true, conj_re, and_self_iff, neg_zero] -- replaced by `RCLike.conj_ofNat` theorem conj_nat_cast (n : ℕ) : conj (n : K) = n := map_natCast _ _ theorem conj_ofNat (n : ℕ) [n.AtLeastTwo] : conj (ofNat(n) : K) = ofNat(n) := map_ofNat _ _ @[rclike_simps, simp] theorem conj_neg_I : conj (-I) = (I : K) := by rw [map_neg, conj_I, neg_neg] theorem conj_eq_re_sub_im (z : K) : conj z = re z - im z * I := (congr_arg conj (re_add_im z).symm).trans <\| by rw [map_add, map_mul, conj_I, conj_ofReal, conj_ofReal, mul_neg, sub_eq_add_neg] theorem sub_conj (z : K) : z - conj z = 2 * im z * I := calc z - conj z = re z + im z * I - (re z - im z * I) := by rw [re_add_im, ← conj_eq_re_sub_im] _ = 2 * im z * I := by rw [add_sub_sub_cancel, ← two_mul, mul_assoc] @[rclike_simps] theorem conj_smul (r : ℝ) (z : K) : conj (r • z) = r • conj z := by rw [conj_eq_re_sub_im, conj_eq_re_sub_im, smul_re, smul_im, ofReal_mul, ofReal_mul, real_smul_eq_coe_mul r (_ - _), mul_sub, mul_assoc] theorem add_conj (z : K) : z + conj z = 2 * re z := calc z + conj z = re z + im z * I + (re z - im z * I) := by rw [re_add_im, conj_eq_re_sub_im] _ = 2 * re z := by rw [add_add_sub_cancel, two_mul] theorem re_eq_add_conj (z : K) : ↑(re z) = (z + conj z) / 2 := by rw [add_conj, mul_div_cancel_left₀ (re z : K) two_ne_zero] theorem im_eq_conj_sub (z : K) : ↑(im z) = I * (conj z - z) / 2 := by rw [← neg_inj, ← ofReal_neg, ← I_mul_re, re_eq_add_conj, map_mul, conj_I, ← neg_div, ← mul_neg, neg_sub, mul_sub, neg_mul, sub_eq_add_neg] open List in /-- There are several equivalent ways to say that a number `z` is in fact a real number. -/ theorem is_real_TFAE (z : K) : TFAE [conj z = z, ∃ r : ℝ, (r : K) = z, ↑(re z) = z, im z = 0] := by tfae_have 1 → 4 \| h => by rw [← @ofReal_inj K, im_eq_conj_sub, h, sub_self, mul_zero, zero_div, ofReal_zero] tfae_have 4 → 3 \| h => by conv_rhs => rw [← re_add_im z, h, ofReal_zero, zero_mul, add_zero] tfae_have 3 → 2 := fun h => ⟨_, h⟩ tfae_have 2 → 1 := fun ⟨r, hr⟩ => hr ▸ conj_ofReal _ tfae_finish theorem conj_eq_iff_real {z : K} : conj z = z ↔ ∃ r : ℝ, z = (r : K) := calc _ ↔ ∃ r : ℝ, (r : K) = z := (is_real_TFAE z).out 0 1 _ ↔ _ := by simp only [eq_comm] theorem conj_eq_iff_re {z : K} : conj z = z ↔ (re z : K) = z := (is_real_TFAE z).out 0 2 theorem conj_eq_iff_im {z : K} : conj z = z ↔ im z = 0 := (is_real_TFAE z).out 0 3 @[simp] theorem star_def : (Star.star : K → K) = conj := rfl variable (K) /-- Conjugation as a ring equivalence. This is used to convert the inner product into a sesquilinear product. -/ abbrev conjToRingEquiv : K ≃+* Kᵐᵒᵖ := starRingEquiv variable {K} {z : K} /-- The norm squared function. -/ def normSq : K →₀ ℝ where toFun z := re z re z + im z * im z map_zero' := by simp only [add_zero, mul_zero, map_zero] map_one' := by simp only [one_im, add_zero, mul_one, one_re, mul_zero] map_mul' z w := by simp only [mul_im, mul_re] ring theorem normSq_apply (z : K) : normSq z = re z * re z + im z * im z := rfl theorem norm_sq_eq_def {z : K} : ‖z‖ ^ 2 = re z * re z + im z * im z := norm_sq_eq_def_ax z theorem normSq_eq_def' (z : K) : normSq z = ‖z‖ ^ 2 := norm_sq_eq_def.symm @[rclike_simps] theorem normSq_zero : normSq (0 : K) = 0 := normSq.map_zero @[rclike_simps] theorem normSq_one : normSq (1 : K) = 1 := normSq.map_one theorem normSq_nonneg (z : K) : 0 ≤ normSq z := add_nonneg (mul_self_nonneg _) (mul_self_nonneg _) @[rclike_simps] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11119): was `simp` theorem normSq_eq_zero {z : K} : normSq z = 0 ↔ z = 0 := map_eq_zero _ @[simp, rclike_simps] theorem normSq_pos {z : K} : 0 < normSq z ↔ z ≠ 0 := by rw [lt_iff_le_and_ne, Ne, eq_comm]; simp [normSq_nonneg] @[simp, rclike_simps] theorem normSq_neg (z : K) : normSq (-z) = normSq z := by simp only [normSq_eq_def', norm_neg] @[simp, rclike_simps] theorem normSq_conj (z : K) : normSq (conj z) = normSq z := by simp only [normSq_apply, neg_mul, mul_neg, neg_neg, rclike_simps] @[rclike_simps] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11119): was `simp` theorem normSq_mul (z w : K) : normSq (z * w) = normSq z * normSq w := map_mul _ z w theorem normSq_add (z w : K) : normSq (z + w) = normSq z + normSq w + 2 * re (z * conj w) := by simp only [normSq_apply, map_add, rclike_simps] ring theorem re_sq_le_normSq (z : K) : re z * re z ≤ normSq z := le_add_of_nonneg_right (mul_self_nonneg _) theorem im_sq_le_normSq (z : K) : im z * im z ≤ normSq z := le_add_of_nonneg_left (mul_self_nonneg _) theorem mul_conj (z : K) : z * conj z = ‖z‖ ^ 2 := by apply ext <;> simp [← ofReal_pow, norm_sq_eq_def, mul_comm] theorem conj_mul (z : K) : conj z * z = ‖z‖ ^ 2 := by rw [mul_comm, mul_conj] lemma inv_eq_conj (hz : ‖z‖ = 1) : z⁻¹ = conj z := inv_eq_of_mul_eq_one_left <\| by simp_rw [conj_mul, hz, algebraMap.coe_one, one_pow] theorem normSq_sub (z w : K) : normSq (z - w) = normSq z + normSq w - 2 * re (z * conj w) := by simp only [normSq_add, sub_eq_add_neg, map_neg, mul_neg, normSq_neg, map_neg] theorem sqrt_normSq_eq_norm {z : K} : √(normSq z) = ‖z‖ := by rw [normSq_eq_def', Real.sqrt_sq (norm_nonneg _)] /-! ### Inversion -/ @[rclike_simps, norm_cast] theorem ofReal_inv (r : ℝ) : ((r⁻¹ : ℝ) : K) = (r : K)⁻¹ := map_inv₀ _ r theorem inv_def (z : K) : z⁻¹ = conj z * ((‖z‖ ^ 2)⁻¹ : ℝ) := by rcases eq_or_ne z 0 with (rfl \| h₀) · simp · apply inv_eq_of_mul_eq_one_right rw [← mul_assoc, mul_conj, ofReal_inv, ofReal_pow, mul_inv_cancel₀] simpa @[simp, rclike_simps] theorem inv_re (z : K) : re z⁻¹ = re z / normSq z := by rw [inv_def, normSq_eq_def', mul_comm, re_ofReal_mul, conj_re, div_eq_inv_mul] @[simp, rclike_simps] theorem inv_im (z : K) : im z⁻¹ = -im z / normSq z := by rw [inv_def, normSq_eq_def', mul_comm, im_ofReal_mul, conj_im, div_eq_inv_mul] theorem div_re (z w : K) : re (z / w) = re z * re w / normSq w + im z * im w / normSq w := by simp only [div_eq_mul_inv, mul_assoc, sub_eq_add_neg, neg_mul, mul_neg, neg_neg, map_neg, rclike_simps] theorem div_im (z w : K) : im (z / w) = im z * re w / normSq w - re z * im w / normSq w := by simp only [div_eq_mul_inv, mul_assoc, sub_eq_add_neg, add_comm, neg_mul, mul_neg, map_neg, rclike_simps] @[rclike_simps] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11119): was `simp` theorem conj_inv (x : K) : conj x⁻¹ = (conj x)⁻¹ := star_inv₀ _ lemma conj_div (x y : K) : conj (x / y) = conj x / conj y := map_div' conj conj_inv _ _ --TODO: Do we rather want the map as an explicit definition? lemma exists_norm_eq_mul_self (x : K) : ∃ c, ‖c‖ = 1 ∧ ↑‖x‖ = c * x := by obtain rfl \| hx := eq_or_ne x 0 · exact ⟨1, by simp⟩ · exact ⟨‖x‖ / x, by simp [norm_ne_zero_iff.2, hx]⟩ lemma exists_norm_mul_eq_self (x : K) : ∃ c, ‖c‖ = 1 ∧ c * ‖x‖ = x := by obtain rfl \| hx := eq_or_ne x 0 · exact ⟨1, by simp⟩ · exact ⟨x / ‖x‖, by simp [norm_ne_zero_iff.2, hx]⟩ @[rclike_simps, norm_cast] theorem ofReal_div (r s : ℝ) : ((r / s : ℝ) : K) = r / s := map_div₀ (algebraMap ℝ K) r s theorem div_re_ofReal {z : K} {r : ℝ} : re (z / r) = re z / r := by rw [div_eq_inv_mul, div_eq_inv_mul, ← ofReal_inv, re_ofReal_mul] @[rclike_simps, norm_cast] theorem ofReal_zpow (r : ℝ) (n : ℤ) : ((r ^ n : ℝ) : K) = (r : K) ^ n := map_zpow₀ (algebraMap ℝ K) r n theorem I_mul_I_of_nonzero : (I : K) ≠ 0 → (I : K) * I = -1 := I_mul_I_ax.resolve_left @[simp, rclike_simps] theorem inv_I : (I : K)⁻¹ = -I := by by_cases h : (I : K) = 0 · simp [h] · field_simp [I_mul_I_of_nonzero h] @[simp, rclike_simps] theorem div_I (z : K) : z / I = -(z * I) := by rw [div_eq_mul_inv, inv_I, mul_neg] @[rclike_simps] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11119): was `simp` theorem normSq_inv (z : K) : normSq z⁻¹ = (normSq z)⁻¹ := map_inv₀ normSq z @[rclike_simps] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11119): was `simp` theorem normSq_div (z w : K) : normSq (z / w) = normSq z / normSq w := map_div₀ normSq z w @[simp 1100, rclike_simps] theorem norm_conj (z : K) : ‖conj z‖ = ‖z‖ := by simp only [← sqrt_normSq_eq_norm, normSq_conj] @[simp, rclike_simps] lemma nnnorm_conj (z : K) : ‖conj z‖₊ = ‖z‖₊ := by simp [nnnorm] @[simp, rclike_simps] lemma enorm_conj (z : K) : ‖conj z‖ₑ = ‖z‖ₑ := by simp [enorm] instance (priority := 100) : CStarRing K where norm_mul_self_le x := le_of_eq <\| ((norm_mul _ _).trans <\| congr_arg (· * ‖x‖) (norm_conj _)).symm instance : StarModule ℝ K where star_smul r a := by apply RCLike.ext <;> simp [RCLike.smul_re, RCLike.smul_im] /-! ### Cast lemmas -/ @[rclike_simps, norm_cast] theorem ofReal_natCast (n : ℕ) : ((n : ℝ) : K) = n := map_natCast (algebraMap ℝ K) n @[rclike_simps, norm_cast] lemma ofReal_nnratCast (q : ℚ≥0) : ((q : ℝ) : K) = q := map_nnratCast (algebraMap ℝ K) _ @[simp, rclike_simps] -- Porting note: removed `norm_cast` theorem natCast_re (n : ℕ) : re (n : K) = n := by rw [← ofReal_natCast, ofReal_re] @[simp, rclike_simps, norm_cast] theorem natCast_im (n : ℕ) : im (n : K) = 0 := by rw [← ofReal_natCast, ofReal_im] @[simp, rclike_simps] theorem ofNat_re (n : ℕ) [n.AtLeastTwo] : re (ofNat(n) : K) = ofNat(n) := natCast_re n @[simp, rclike_simps] theorem ofNat_im (n : ℕ) [n.AtLeastTwo] : im (ofNat(n) : K) = 0 := natCast_im n @[rclike_simps, norm_cast] theorem ofReal_ofNat (n : ℕ) [n.AtLeastTwo] : ((ofNat(n) : ℝ) : K) = ofNat(n) := ofReal_natCast n theorem ofNat_mul_re (n : ℕ) [n.AtLeastTwo] (z : K) : re (ofNat(n) * z) = ofNat(n) * re z := by rw [← ofReal_ofNat, re_ofReal_mul] theorem ofNat_mul_im (n : ℕ) [n.AtLeastTwo] (z : K) : im (ofNat(n) * z) = ofNat(n) * im z := by rw [← ofReal_ofNat, im_ofReal_mul] @[rclike_simps, norm_cast] theorem ofReal_intCast (n : ℤ) : ((n : ℝ) : K) = n := map_intCast _ n @[simp, rclike_simps] -- Porting note: removed `norm_cast` theorem intCast_re (n : ℤ) : re (n : K) = n := by rw [← ofReal_intCast, ofReal_re] @[simp, rclike_simps, norm_cast] theorem intCast_im (n : ℤ) : im (n : K) = 0 := by rw [← ofReal_intCast, ofReal_im] @[rclike_simps, norm_cast] theorem ofReal_ratCast (n : ℚ) : ((n : ℝ) : K) = n := map_ratCast _ n @[simp, rclike_simps] -- Porting note: removed `norm_cast` theorem ratCast_re (q : ℚ) : re (q : K) = q := by rw [← ofReal_ratCast, ofReal_re] @[simp, rclike_simps, norm_cast] theorem ratCast_im (q : ℚ) : im (q : K) = 0 := by rw [← ofReal_ratCast, ofReal_im] /-! ### Norm -/ theorem norm_of_nonneg {r : ℝ} (h : 0 ≤ r) : ‖(r : K)‖ = r := (norm_ofReal _).trans (abs_of_nonneg h) @[simp, rclike_simps, norm_cast] theorem norm_natCast (n : ℕ) : ‖(n : K)‖ = n := by rw [← ofReal_natCast] exact norm_of_nonneg (Nat.cast_nonneg n) @[simp, rclike_simps, norm_cast] lemma nnnorm_natCast (n : ℕ) : ‖(n : K)‖₊ = n := by simp [nnnorm] @[simp, rclike_simps] theorem norm_ofNat (n : ℕ) [n.AtLeastTwo] : ‖(ofNat(n) : K)‖ = ofNat(n) := norm_natCast n @[simp, rclike_simps] lemma nnnorm_ofNat (n : ℕ) [n.AtLeastTwo] : ‖(ofNat(n) : K)‖₊ = ofNat(n) := nnnorm_natCast n lemma norm_two : ‖(2 : K)‖ = 2 := norm_ofNat 2 lemma nnnorm_two : ‖(2 : K)‖₊ = 2 := nnnorm_ofNat 2 @[simp, rclike_simps, norm_cast] lemma norm_nnratCast (q : ℚ≥0) : ‖(q : K)‖ = q := by rw [← ofReal_nnratCast]; exact norm_of_nonneg q.cast_nonneg @[simp, rclike_simps, norm_cast] lemma nnnorm_nnratCast (q : ℚ≥0) : ‖(q : K)‖₊ = q := by simp [nnnorm] variable (K) in lemma norm_nsmul [NormedAddCommGroup E] [NormedSpace K E] (n : ℕ) (x : E) : ‖n • x‖ = n • ‖x‖ := by simpa [Nat.cast_smul_eq_nsmul] using norm_smul (n : K) x variable (K) in lemma nnnorm_nsmul [NormedAddCommGroup E] [NormedSpace K E] (n : ℕ) (x : E) : ‖n • x‖₊ = n • ‖x‖₊ := by simpa [Nat.cast_smul_eq_nsmul] using nnnorm_smul (n : K) x section NormedField variable [NormedField E] [CharZero E] [NormedSpace K E] include K variable (K) in lemma norm_nnqsmul (q : ℚ≥0) (x : E) : ‖q • x‖ = q • ‖x‖ := by simpa [NNRat.cast_smul_eq_nnqsmul] using norm_smul (q : K) x variable (K) in lemma nnnorm_nnqsmul (q : ℚ≥0) (x : E) : ‖q • x‖₊ = q • ‖x‖₊ := by simpa [NNRat.cast_smul_eq_nnqsmul] using nnnorm_smul (q : K) x @[bound] lemma norm_expect_le {ι : Type} {s : Finset ι} {f : ι → E} : ‖𝔼 i ∈ s, f i‖ ≤ 𝔼 i ∈ s, ‖f i‖ := Finset.le_expect_of_subadditive norm_zero norm_add_le fun _ _ ↦ by rw [norm_nnqsmul K] end NormedField theorem mul_self_norm (z : K) : ‖z‖ ‖z‖ = normSq z := by rw [normSq_eq_def', sq] attribute [rclike_simps] norm_zero norm_one norm_eq_zero abs_norm norm_inv norm_div theorem abs_re_le_norm (z : K) : \|re z\| ≤ ‖z‖ := by rw [mul_self_le_mul_self_iff (abs_nonneg _) (norm_nonneg _), abs_mul_abs_self, mul_self_norm] apply re_sq_le_normSq theorem abs_im_le_norm (z : K) : \|im z\| ≤ ‖z‖ := by rw [mul_self_le_mul_self_iff (abs_nonneg _) (norm_nonneg _), abs_mul_abs_self, mul_self_norm] apply im_sq_le_normSq theorem norm_re_le_norm (z : K) : ‖re z‖ ≤ ‖z‖ := abs_re_le_norm z theorem norm_im_le_norm (z : K) : ‖im z‖ ≤ ‖z‖ := abs_im_le_norm z theorem re_le_norm (z : K) : re z ≤ ‖z‖ := (abs_le.1 (abs_re_le_norm z)).2 theorem im_le_norm (z : K) : im z ≤ ‖z‖ := (abs_le.1 (abs_im_le_norm _)).2 theorem im_eq_zero_of_le {a : K} (h : ‖a‖ ≤ re a) : im a = 0 := by simpa only [mul_self_norm a, normSq_apply, left_eq_add, mul_self_eq_zero] using congr_arg (fun z => z * z) ((re_le_norm a).antisymm h) theorem re_eq_self_of_le {a : K} (h : ‖a‖ ≤ re a) : (re a : K) = a := by rw [← conj_eq_iff_re, conj_eq_iff_im, im_eq_zero_of_le h] open IsAbsoluteValue theorem abs_re_div_norm_le_one (z : K) : \|re z / ‖z‖\| ≤ 1 := by rw [abs_div, abs_norm] exact div_le_one_of_le₀ (abs_re_le_norm _) (norm_nonneg _) theorem abs_im_div_norm_le_one (z : K) : \|im z / ‖z‖\| ≤ 1 := by rw [abs_div, abs_norm] exact div_le_one_of_le₀ (abs_im_le_norm _) (norm_nonneg _) theorem norm_I_of_ne_zero (hI : (I : K) ≠ 0) : ‖(I : K)‖ = 1 := by rw [← mul_self_inj_of_nonneg (norm_nonneg I) zero_le_one, one_mul, ← norm_mul, I_mul_I_of_nonzero hI, norm_neg, norm_one] theorem re_eq_norm_of_mul_conj (x : K) : re (x * conj x) = ‖x * conj x‖ := by rw [mul_conj, ← ofReal_pow]; simp [-map_pow] theorem norm_sq_re_add_conj (x : K) : ‖x + conj x‖ ^ 2 = re (x + conj x) ^ 2 := by rw [add_conj, ← ofReal_ofNat, ← ofReal_mul, norm_ofReal, sq_abs, ofReal_re] theorem norm_sq_re_conj_add (x : K) : ‖conj x + x‖ ^ 2 = re (conj x + x) ^ 2 := by rw [add_comm, norm_sq_re_add_conj] /-! ### Cauchy sequences -/ theorem isCauSeq_re (f : CauSeq K norm) : IsCauSeq abs fun n => re (f n) := fun _ ε0 => (f.cauchy ε0).imp fun i H j ij => lt_of_le_of_lt (by simpa only [map_sub] using abs_re_le_norm (f j - f i)) (H _ ij) theorem isCauSeq_im (f : CauSeq K norm) : IsCauSeq abs fun n => im (f n) := fun _ ε0 => (f.cauchy ε0).imp fun i H j ij => lt_of_le_of_lt (by simpa only [map_sub] using abs_im_le_norm (f j - f i)) (H _ ij) /-- The real part of a K Cauchy sequence, as a real Cauchy sequence. -/ noncomputable def cauSeqRe (f : CauSeq K norm) : CauSeq ℝ abs := ⟨_, isCauSeq_re f⟩ /-- The imaginary part of a K Cauchy sequence, as a real Cauchy sequence. -/ noncomputable def cauSeqIm (f : CauSeq K norm) : CauSeq ℝ abs := ⟨_, isCauSeq_im f⟩ theorem isCauSeq_norm {f : ℕ → K} (hf : IsCauSeq norm f) : IsCauSeq abs (norm ∘ f) := fun ε ε0 => let ⟨i, hi⟩ := hf ε ε0 ⟨i, fun j hj => lt_of_le_of_lt (abs_norm_sub_norm_le _ _) (hi j hj)⟩ end RCLike section Instances noncomputable instance Real.instRCLike : RCLike ℝ where re := AddMonoidHom.id ℝ im := 0 I := 0 I_re_ax := by simp only [AddMonoidHom.map_zero] I_mul_I_ax := Or.intro_left _ rfl re_add_im_ax z := by simp only [add_zero, mul_zero, Algebra.id.map_eq_id, RingHom.id_apply, AddMonoidHom.id_apply] ofReal_re_ax _ := rfl ofReal_im_ax _ := rfl mul_re_ax z w := by simp only [sub_zero, mul_zero, AddMonoidHom.zero_apply, AddMonoidHom.id_apply] mul_im_ax z w := by simp only [add_zero, zero_mul, mul_zero, AddMonoidHom.zero_apply] conj_re_ax z := by simp only [starRingEnd_apply, star_id_of_comm] conj_im_ax _ := by simp only [neg_zero, AddMonoidHom.zero_apply] conj_I_ax := by simp only [RingHom.map_zero, neg_zero] norm_sq_eq_def_ax z := by simp only [sq, Real.norm_eq_abs, ← abs_mul, abs_mul_self z, add_zero, mul_zero, AddMonoidHom.zero_apply, AddMonoidHom.id_apply] mul_im_I_ax _ := by simp only [mul_zero, AddMonoidHom.zero_apply] le_iff_re_im := (and_iff_left rfl).symm end Instances namespace RCLike section Order open scoped ComplexOrder variable {z w : K} theorem lt_iff_re_im : z < w ↔ re z < re w ∧ im z = im w := by simp_rw [lt_iff_le_and_ne, @RCLike.le_iff_re_im K] constructor · rintro ⟨⟨hr, hi⟩, heq⟩ exact ⟨⟨hr, mt (fun hreq => ext hreq hi) heq⟩, hi⟩ · rintro ⟨⟨hr, hrn⟩, hi⟩ exact ⟨⟨hr, hi⟩, ne_of_apply_ne _ hrn⟩ theorem nonneg_iff : 0 ≤ z ↔ 0 ≤ re z ∧ im z = 0 := by simpa only [map_zero, eq_comm] using le_iff_re_im (z := 0) (w := z) theorem pos_iff : 0 < z ↔ 0 < re z ∧ im z = 0 := by simpa only [map_zero, eq_comm] using lt_iff_re_im (z := 0) (w := z) theorem nonpos_iff : z ≤ 0 ↔ re z ≤ 0 ∧ im z = 0 := by simpa only [map_zero] using le_iff_re_im (z := z) (w := 0) theorem neg_iff : z < 0 ↔ re z < 0 ∧ im z = 0 := by simpa only [map_zero] using lt_iff_re_im (z := z) (w := 0) lemma nonneg_iff_exists_ofReal : 0 ≤ z ↔ ∃ x ≥ (0 : ℝ), x = z := by simp_rw [nonneg_iff (K := K), ext_iff (K := K)]; aesop lemma pos_iff_exists_ofReal : 0 < z ↔ ∃ x > (0 : ℝ), x = z := by simp_rw [pos_iff (K := K), ext_iff (K := K)]; aesop lemma nonpos_iff_exists_ofReal : z ≤ 0 ↔ ∃ x ≤ (0 : ℝ), x = z := by simp_rw [nonpos_iff (K := K), ext_iff (K := K)]; aesop lemma neg_iff_exists_ofReal : z < 0 ↔ ∃ x < (0 : ℝ), x = z := by simp_rw [neg_iff (K := K), ext_iff (K := K)]; aesop @[simp, norm_cast] lemma ofReal_le_ofReal {x y : ℝ} : (x : K) ≤ (y : K) ↔ x ≤ y := by rw [le_iff_re_im] simp @[simp, norm_cast] lemma ofReal_lt_ofReal {x y : ℝ} : (x : K) < (y : K) ↔ x < y := by rw [lt_iff_re_im] simp @[simp, norm_cast] lemma ofReal_nonneg {x : ℝ} : 0 ≤ (x : K) ↔ 0 ≤ x := by rw [← ofReal_zero, ofReal_le_ofReal] @[simp, norm_cast] lemma ofReal_nonpos {x : ℝ} : (x : K) ≤ 0 ↔ x ≤ 0 := by rw [← ofReal_zero, ofReal_le_ofReal] @[simp, norm_cast] lemma ofReal_pos {x : ℝ} : 0 < (x : K) ↔ 0 < x := by rw [← ofReal_zero, ofReal_lt_ofReal] @[simp, norm_cast] lemma ofReal_lt_zero {x : ℝ} : (x : K) < 0 ↔ x < 0 := by rw [← ofReal_zero, ofReal_lt_ofReal] protected lemma inv_pos_of_pos (hz : 0 < z) : 0 < z⁻¹ := by rw [pos_iff_exists_ofReal] at hz obtain ⟨x, hx, hx'⟩ := hz rw [← hx', ← ofReal_inv, ofReal_pos] exact inv_pos_of_pos hx protected lemma inv_pos : 0 < z⁻¹ ↔ 0 < z := by refine ⟨fun h => ?_, fun h => RCLike.inv_pos_of_pos h⟩ rw [← inv_inv z] exact RCLike.inv_pos_of_pos h /-- With `z ≤ w` iff `w - z` is real and nonnegative, `ℝ` and `ℂ` are star ordered rings. (That is, a star ring in which the nonnegative elements are those of the form `star z * z`.) Note this is only an instance with `open scoped ComplexOrder`. -/ lemma toStarOrderedRing : StarOrderedRing K := StarOrderedRing.of_nonneg_iff' (h_add := fun {x y} hxy z => by rw [RCLike.le_iff_re_im] at * simpa [map_add, add_le_add_iff_left, add_right_inj] using hxy) (h_nonneg_iff := fun x => by rw [nonneg_iff] refine ⟨fun h ↦ ⟨√(re x), by simp [ext_iff (K := K), h.1, h.2]⟩, ?_⟩ rintro ⟨s, rfl⟩ simp [mul_comm, mul_self_nonneg, add_nonneg]) scoped[ComplexOrder] attribute [instance] RCLike.toStarOrderedRing lemma toZeroLEOneClass : ZeroLEOneClass K where zero_le_one := by simp [@RCLike.le_iff_re_im K] scoped[ComplexOrder] attribute [instance] RCLike.toZeroLEOneClass lemma toIsOrderedAddMonoid : IsOrderedAddMonoid K where add_le_add_left _ _ := add_le_add_left scoped[ComplexOrder] attribute [instance] RCLike.toIsOrderedAddMonoid /-- With `z ≤ w` iff `w - z` is real and nonnegative, `ℝ` and `ℂ` are strictly ordered rings. Note this is only an instance with `open scoped ComplexOrder`. -/ lemma toIsStrictOrderedRing : IsStrictOrderedRing K := .of_mul_pos fun z w hz hw ↦ by rw [lt_iff_re_im, map_zero] at hz hw ⊢ simp [mul_re, mul_im, ← hz.2, ← hw.2, mul_pos hz.1 hw.1] scoped[ComplexOrder] attribute [instance] RCLike.toIsStrictOrderedRing theorem toOrderedSMul : OrderedSMul ℝ K := OrderedSMul.mk' fun a b r hab hr => by replace hab := hab.le rw [RCLike.le_iff_re_im] at hab rw [RCLike.le_iff_re_im, smul_re, smul_re, smul_im, smul_im] exact hab.imp (fun h => mul_le_mul_of_nonneg_left h hr.le) (congr_arg _) scoped[ComplexOrder] attribute [instance] RCLike.toOrderedSMul /-- A star algebra over `K` has a scalar multiplication that respects the order. -/ lemma _root_.StarModule.instOrderedSMul {A : Type} [NonUnitalRing A] [StarRing A] [PartialOrder A] [StarOrderedRing A] [Module K A] [StarModule K A] [IsScalarTower K A A] [SMulCommClass K A A] : OrderedSMul K A where smul_lt_smul_of_pos {_ _ _} hxy hc := StarModule.smul_lt_smul_of_pos hxy hc lt_of_smul_lt_smul_of_pos {x y c} hxy hc := by have : c⁻¹ • c • x < c⁻¹ • c • y := StarModule.smul_lt_smul_of_pos hxy (RCLike.inv_pos_of_pos hc) simpa [smul_smul, inv_mul_cancel₀ hc.ne'] using this instance {A : Type} [NonUnitalRing A] [StarRing A] [PartialOrder A] [StarOrderedRing A] [Module ℝ A] [StarModule ℝ A] [IsScalarTower ℝ A A] [SMulCommClass ℝ A A] : OrderedSMul ℝ A := StarModule.instOrderedSMul scoped[ComplexOrder] attribute [instance] StarModule.instOrderedSMul theorem ofReal_mul_pos_iff (x : ℝ) (z : K) : 0 < x * z ↔ (x < 0 ∧ z < 0) ∨ (0 < x ∧ 0 < z) := by simp only [pos_iff (K := K), neg_iff (K := K), re_ofReal_mul, im_ofReal_mul] obtain hx \| hx \| hx := lt_trichotomy x 0 · simp only [mul_pos_iff, not_lt_of_gt hx, false_and, hx, true_and, false_or, mul_eq_zero, hx.ne, or_false] · simp only [hx, zero_mul, lt_self_iff_false, false_and, false_or] · simp only [mul_pos_iff, hx, true_and, not_lt_of_gt hx, false_and, or_false, mul_eq_zero, hx.ne', false_or] theorem ofReal_mul_neg_iff (x : ℝ) (z : K) : x * z < 0 ↔ (x < 0 ∧ 0 < z) ∨ (0 < x ∧ z < 0) := by simpa only [mul_neg, neg_pos, neg_neg_iff_pos] using ofReal_mul_pos_iff x (-z)	lemma instPosMulReflectLE : PosMulReflectLE K where elim a b c h := by	Mathlib/Analysis/RCLike/Basic.lean	898	900
/- 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, Johan Commelin -/ import Mathlib.Algebra.Polynomial.BigOperators import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.Data.Set.Finite.Lemmas import Mathlib.RingTheory.Coprime.Lemmas import Mathlib.RingTheory.Localization.FractionRing import Mathlib.SetTheory.Cardinal.Order /-! # Theory of univariate polynomials We define the multiset of roots of a polynomial, and prove basic results about it. ## Main definitions * `Polynomial.roots p`: The multiset containing all the roots of `p`, including their multiplicities. * `Polynomial.rootSet p E`: The set of distinct roots of `p` in an algebra `E`. ## Main statements * `Polynomial.C_leadingCoeff_mul_prod_multiset_X_sub_C`: If a polynomial has as many roots as its degree, it can be written as the product of its leading coefficient with `∏ (X - a)` where `a` ranges through its roots. -/ assert_not_exists Ideal open Multiset Finset noncomputable section namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section CommRing variable [CommRing R] [IsDomain R] {p q : R[X]} section Roots /-- `roots p` noncomputably gives a multiset containing all the roots of `p`, including their multiplicities. -/ noncomputable def roots (p : R[X]) : Multiset R := haveI := Classical.decEq R haveI := Classical.dec (p = 0) if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) theorem roots_def [DecidableEq R] (p : R[X]) [Decidable (p = 0)] : p.roots = if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) := by rename_i iR ip0 obtain rfl := Subsingleton.elim iR (Classical.decEq R) obtain rfl := Subsingleton.elim ip0 (Classical.dec (p = 0)) rfl @[simp] theorem roots_zero : (0 : R[X]).roots = 0 := dif_pos rfl theorem card_roots (hp0 : p ≠ 0) : (Multiset.card (roots p) : WithBot ℕ) ≤ degree p := by classical unfold roots rw [dif_neg hp0] exact (Classical.choose_spec (exists_multiset_roots hp0)).1 theorem card_roots' (p : R[X]) : Multiset.card p.roots ≤ natDegree p := by by_cases hp0 : p = 0 · simp [hp0] exact WithBot.coe_le_coe.1 (le_trans (card_roots hp0) (le_of_eq <\| degree_eq_natDegree hp0)) theorem card_roots_sub_C {p : R[X]} {a : R} (hp0 : 0 < degree p) : (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree p := calc (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree (p - C a) := card_roots <\| mt sub_eq_zero.1 fun h => not_le_of_gt hp0 <\| h.symm ▸ degree_C_le _ = degree p := by rw [sub_eq_add_neg, ← C_neg]; exact degree_add_C hp0 theorem card_roots_sub_C' {p : R[X]} {a : R} (hp0 : 0 < degree p) : Multiset.card (p - C a).roots ≤ natDegree p := WithBot.coe_le_coe.1 (le_trans (card_roots_sub_C hp0) (le_of_eq <\| degree_eq_natDegree fun h => by simp_all [lt_irrefl])) @[simp] theorem count_roots [DecidableEq R] (p : R[X]) : p.roots.count a = rootMultiplicity a p := by classical by_cases hp : p = 0 · simp [hp] rw [roots_def, dif_neg hp] exact (Classical.choose_spec (exists_multiset_roots hp)).2 a @[simp] theorem mem_roots' : a ∈ p.roots ↔ p ≠ 0 ∧ IsRoot p a := by classical rw [← count_pos, count_roots p, rootMultiplicity_pos'] theorem mem_roots (hp : p ≠ 0) : a ∈ p.roots ↔ IsRoot p a := mem_roots'.trans <\| and_iff_right hp theorem ne_zero_of_mem_roots (h : a ∈ p.roots) : p ≠ 0 := (mem_roots'.1 h).1 theorem isRoot_of_mem_roots (h : a ∈ p.roots) : IsRoot p a := (mem_roots'.1 h).2 theorem mem_roots_map_of_injective [Semiring S] {p : S[X]} {f : S →+* R} (hf : Function.Injective f) {x : R} (hp : p ≠ 0) : x ∈ (p.map f).roots ↔ p.eval₂ f x = 0 := by rw [mem_roots ((Polynomial.map_ne_zero_iff hf).mpr hp), IsRoot, eval_map] lemma mem_roots_iff_aeval_eq_zero {x : R} (w : p ≠ 0) : x ∈ roots p ↔ aeval x p = 0 := by rw [aeval_def, ← mem_roots_map_of_injective (FaithfulSMul.algebraMap_injective _ _) w, Algebra.id.map_eq_id, map_id] theorem card_le_degree_of_subset_roots {p : R[X]} {Z : Finset R} (h : Z.val ⊆ p.roots) : #Z ≤ p.natDegree := (Multiset.card_le_card (Finset.val_le_iff_val_subset.2 h)).trans (Polynomial.card_roots' p) theorem finite_setOf_isRoot {p : R[X]} (hp : p ≠ 0) : Set.Finite { x \| IsRoot p x } := by classical simpa only [← Finset.setOf_mem, Multiset.mem_toFinset, mem_roots hp] using p.roots.toFinset.finite_toSet theorem eq_zero_of_infinite_isRoot (p : R[X]) (h : Set.Infinite { x \| IsRoot p x }) : p = 0 := not_imp_comm.mp finite_setOf_isRoot h theorem exists_max_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x ≤ x₀ := Set.exists_upper_bound_image _ _ <\| finite_setOf_isRoot hp theorem exists_min_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x₀ ≤ x := Set.exists_lower_bound_image _ _ <\| finite_setOf_isRoot hp theorem eq_of_infinite_eval_eq (p q : R[X]) (h : Set.Infinite { x \| eval x p = eval x q }) : p = q := by rw [← sub_eq_zero] apply eq_zero_of_infinite_isRoot simpa only [IsRoot, eval_sub, sub_eq_zero] theorem roots_mul {p q : R[X]} (hpq : p * q ≠ 0) : (p * q).roots = p.roots + q.roots := by classical exact Multiset.ext.mpr fun r => by rw [count_add, count_roots, count_roots, count_roots, rootMultiplicity_mul hpq] theorem roots.le_of_dvd (h : q ≠ 0) : p ∣ q → roots p ≤ roots q := by rintro ⟨k, rfl⟩ exact Multiset.le_iff_exists_add.mpr ⟨k.roots, roots_mul h⟩ theorem mem_roots_sub_C' {p : R[X]} {a x : R} : x ∈ (p - C a).roots ↔ p ≠ C a ∧ p.eval x = a := by rw [mem_roots', IsRoot.def, sub_ne_zero, eval_sub, sub_eq_zero, eval_C] theorem mem_roots_sub_C {p : R[X]} {a x : R} (hp0 : 0 < degree p) : x ∈ (p - C a).roots ↔ p.eval x = a := mem_roots_sub_C'.trans <\| and_iff_right fun hp => hp0.not_le <\| hp.symm ▸ degree_C_le @[simp] theorem roots_X_sub_C (r : R) : roots (X - C r) = {r} := by classical ext s rw [count_roots, rootMultiplicity_X_sub_C, count_singleton] @[simp] theorem roots_X_add_C (r : R) : roots (X + C r) = {-r} := by simpa using roots_X_sub_C (-r) @[simp] theorem roots_X : roots (X : R[X]) = {0} := by rw [← roots_X_sub_C, C_0, sub_zero] @[simp] theorem roots_C (x : R) : (C x).roots = 0 := by classical exact if H : x = 0 then by rw [H, C_0, roots_zero] else Multiset.ext.mpr fun r => (by rw [count_roots, count_zero, rootMultiplicity_eq_zero (not_isRoot_C _ _ H)]) @[simp] theorem roots_one : (1 : R[X]).roots = ∅ := roots_C 1 @[simp] theorem roots_C_mul (p : R[X]) (ha : a ≠ 0) : (C a * p).roots = p.roots := by by_cases hp : p = 0 <;> simp only [roots_mul, , Ne, mul_eq_zero, C_eq_zero, or_self_iff, not_false_iff, roots_C, zero_add, mul_zero] @[simp] theorem roots_smul_nonzero (p : R[X]) (ha : a ≠ 0) : (a • p).roots = p.roots := by rw [smul_eq_C_mul, roots_C_mul _ ha] @[simp] lemma roots_neg (p : R[X]) : (-p).roots = p.roots := by rw [← neg_one_smul R p, roots_smul_nonzero p (neg_ne_zero.mpr one_ne_zero)] @[simp] theorem roots_C_mul_X_sub_C_of_IsUnit (b : R) (a : Rˣ) : (C (a : R) X - C b).roots = {a⁻¹ * b} := by rw [← roots_C_mul _ (Units.ne_zero a⁻¹), mul_sub, ← mul_assoc, ← C_mul, ← C_mul, Units.inv_mul, C_1, one_mul] exact roots_X_sub_C (a⁻¹ * b) @[simp] theorem roots_C_mul_X_add_C_of_IsUnit (b : R) (a : Rˣ) : (C (a : R) * X + C b).roots = {-(a⁻¹ * b)} := by rw [← sub_neg_eq_add, ← C_neg, roots_C_mul_X_sub_C_of_IsUnit, mul_neg] theorem roots_list_prod (L : List R[X]) : (0 : R[X]) ∉ L → L.prod.roots = (L : Multiset R[X]).bind roots := List.recOn L (fun _ => roots_one) fun hd tl ih H => by rw [List.mem_cons, not_or] at H rw [List.prod_cons, roots_mul (mul_ne_zero (Ne.symm H.1) <\| List.prod_ne_zero H.2), ← Multiset.cons_coe, Multiset.cons_bind, ih H.2] theorem roots_multiset_prod (m : Multiset R[X]) : (0 : R[X]) ∉ m → m.prod.roots = m.bind roots := by rcases m with ⟨L⟩ simpa only [Multiset.prod_coe, quot_mk_to_coe''] using roots_list_prod L theorem roots_prod {ι : Type*} (f : ι → R[X]) (s : Finset ι) : s.prod f ≠ 0 → (s.prod f).roots = s.val.bind fun i => roots (f i) := by rcases s with ⟨m, hm⟩ simpa [Multiset.prod_eq_zero_iff, Multiset.bind_map] using roots_multiset_prod (m.map f) @[simp] theorem roots_pow (p : R[X]) (n : ℕ) : (p ^ n).roots = n • p.roots := by induction n with \| zero => rw [pow_zero, roots_one, zero_smul, empty_eq_zero] \| succ n ihn => rcases eq_or_ne p 0 with (rfl \| hp) · rw [zero_pow n.succ_ne_zero, roots_zero, smul_zero] · rw [pow_succ, roots_mul (mul_ne_zero (pow_ne_zero _ hp) hp), ihn, add_smul, one_smul] theorem roots_X_pow (n : ℕ) : (X ^ n : R[X]).roots = n • ({0} : Multiset R) := by rw [roots_pow, roots_X] theorem roots_C_mul_X_pow (ha : a ≠ 0) (n : ℕ) :	Polynomial.roots (C a * X ^ n) = n • ({0} : Multiset R) := by rw [roots_C_mul _ ha, roots_X_pow] @[simp]	Mathlib/Algebra/Polynomial/Roots.lean	241	244
/- 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.Algebra.Quaternion import Mathlib.Tactic.Ring /-! # Basis on a quaternion-like algebra ## Main definitions * `QuaternionAlgebra.Basis A c₁ c₂ c₃`: a basis for a subspace of an `R`-algebra `A` that has the same algebra structure as `ℍ[R,c₁,c₂,c₃]`. * `QuaternionAlgebra.Basis.self R`: the canonical basis for `ℍ[R,c₁,c₂,c₃]`. * `QuaternionAlgebra.Basis.compHom b f`: transform a basis `b` by an AlgHom `f`. * `QuaternionAlgebra.lift`: Define an `AlgHom` out of `ℍ[R,c₁,c₂,c₃]` by its action on the basis elements `i`, `j`, and `k`. In essence, this is a universal property. Analogous to `Complex.lift`, but takes a bundled `QuaternionAlgebra.Basis` instead of just a `Subtype` as the amount of data / proves is non-negligible. -/ open Quaternion namespace QuaternionAlgebra /-- A quaternion basis contains the information both sufficient and necessary to construct an `R`-algebra homomorphism from `ℍ[R,c₁,c₂,c₃]` to `A`; or equivalently, a surjective `R`-algebra homomorphism from `ℍ[R,c₁,c₂,c₃]` to an `R`-subalgebra of `A`. Note that for definitional convenience, `k` is provided as a field even though `i_mul_j` fully determines it. -/ structure Basis {R : Type} (A : Type) [CommRing R] [Ring A] [Algebra R A] (c₁ c₂ c₃ : R) where /-- The first imaginary unit -/ i : A /-- The second imaginary unit -/ j : A /-- The third imaginary unit -/ k : A i_mul_i : i * i = c₁ • (1 : A) + c₂ • i j_mul_j : j * j = c₃ • (1 : A) i_mul_j : i * j = k j_mul_i : j * i = c₂ • j - k variable {R : Type} {A B : Type} [CommRing R] [Ring A] [Ring B] [Algebra R A] [Algebra R B] variable {c₁ c₂ c₃ : R} namespace Basis /-- Since `k` is redundant, it is not necessary to show `q₁.k = q₂.k` when showing `q₁ = q₂`. -/ @[ext] protected theorem ext ⦃q₁ q₂ : Basis A c₁ c₂ c₃⦄ (hi : q₁.i = q₂.i) (hj : q₁.j = q₂.j) : q₁ = q₂ := by cases q₁; rename_i q₁_i_mul_j _ cases q₂; rename_i q₂_i_mul_j _ congr rw [← q₁_i_mul_j, ← q₂_i_mul_j] congr variable (R) in /-- There is a natural quaternionic basis for the `QuaternionAlgebra`. -/ @[simps i j k] protected def self : Basis ℍ[R,c₁,c₂,c₃] c₁ c₂ c₃ where i := ⟨0, 1, 0, 0⟩ i_mul_i := by ext <;> simp j := ⟨0, 0, 1, 0⟩ j_mul_j := by ext <;> simp k := ⟨0, 0, 0, 1⟩ i_mul_j := by ext <;> simp j_mul_i := by ext <;> simp instance : Inhabited (Basis ℍ[R,c₁,c₂,c₃] c₁ c₂ c₃) := ⟨Basis.self R⟩ variable (q : Basis A c₁ c₂ c₃) attribute [simp] i_mul_i j_mul_j i_mul_j j_mul_i @[simp] theorem i_mul_k : q.i * q.k = c₁ • q.j + c₂ • q.k := by rw [← i_mul_j, ← mul_assoc, i_mul_i, add_mul, smul_mul_assoc, one_mul, smul_mul_assoc] @[simp] theorem k_mul_i : q.k * q.i = -c₁ • q.j := by rw [← i_mul_j, mul_assoc, j_mul_i, mul_sub, i_mul_k, neg_smul, mul_smul_comm, i_mul_j] linear_combination (norm := module) @[simp] theorem k_mul_j : q.k * q.j = c₃ • q.i := by rw [← i_mul_j, mul_assoc, j_mul_j, mul_smul_comm, mul_one] @[simp] theorem j_mul_k : q.j * q.k = (c₂ * c₃) • 1 - c₃ • q.i := by rw [← i_mul_j, ← mul_assoc, j_mul_i, sub_mul, smul_mul_assoc, j_mul_j, ← smul_assoc, k_mul_j] rfl	@[simp] theorem k_mul_k : q.k * q.k = -((c₁ * c₃) • (1 : A)) := by	Mathlib/Algebra/QuaternionBasis.lean	99	100
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov, Mario Carneiro, Sean Leather -/ import Mathlib.Data.Finset.Card import Mathlib.Data.Finset.Union /-! # Finite sets in `Option α` In this file we define * `Option.toFinset`: construct an empty or singleton `Finset α` from an `Option α`; * `Finset.insertNone`: given `s : Finset α`, lift it to a finset on `Option α` using `Option.some` and then insert `Option.none`; * `Finset.eraseNone`: given `s : Finset (Option α)`, returns `t : Finset α` such that `x ∈ t ↔ some x ∈ s`. Then we prove some basic lemmas about these definitions. ## Tags finset, option -/ variable {α β : Type*} open Function namespace Option /-- Construct an empty or singleton finset from an `Option` -/ def toFinset (o : Option α) : Finset α := o.elim ∅ singleton @[simp] theorem toFinset_none : none.toFinset = (∅ : Finset α) := rfl @[simp] theorem toFinset_some {a : α} : (some a).toFinset = {a} := rfl @[simp] theorem mem_toFinset {a : α} {o : Option α} : a ∈ o.toFinset ↔ a ∈ o := by cases o <;> simp [eq_comm] theorem card_toFinset (o : Option α) : o.toFinset.card = o.elim 0 1 := by cases o <;> rfl	end Option	Mathlib/Data/Finset/Option.lean	51	52
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Yury Kudryashov -/ import Mathlib.Algebra.Algebra.Rat import Mathlib.Data.Nat.Prime.Int import Mathlib.Data.Rat.Sqrt import Mathlib.Data.Real.Sqrt import Mathlib.RingTheory.Algebraic.Basic import Mathlib.Tactic.IntervalCases /-! # Irrational real numbers In this file we define a predicate `Irrational` on `ℝ`, prove that the `n`-th root of an integer number is irrational if it is not integer, and that `√(q : ℚ)` is irrational if and only if `¬IsSquare q ∧ 0 ≤ q`. We also provide dot-style constructors like `Irrational.add_rat`, `Irrational.rat_sub` etc. With the `Decidable` instances in this file, is possible to prove `Irrational √n` using `decide`, when `n` is a numeric literal or cast; but this only works if you `unseal Nat.sqrt.iter in` before the theorem where you use this proof. -/ open Rat Real /-- A real number is irrational if it is not equal to any rational number. -/ def Irrational (x : ℝ) := x ∉ Set.range ((↑) : ℚ → ℝ) theorem irrational_iff_ne_rational (x : ℝ) : Irrational x ↔ ∀ a b : ℤ, x ≠ a / b := by simp only [Irrational, Rat.forall, cast_mk, not_exists, Set.mem_range, cast_intCast, cast_div, eq_comm] /-- A transcendental real number is irrational. -/ theorem Transcendental.irrational {r : ℝ} (tr : Transcendental ℚ r) : Irrational r := by rintro ⟨a, rfl⟩ exact tr (isAlgebraic_algebraMap a) /-! ### Irrationality of roots of integer and rational numbers -/ /-- If `x^n`, `n > 0`, is integer and is not the `n`-th power of an integer, then `x` is irrational. -/ theorem irrational_nrt_of_notint_nrt {x : ℝ} (n : ℕ) (m : ℤ) (hxr : x ^ n = m) (hv : ¬∃ y : ℤ, x = y) (hnpos : 0 < n) : Irrational x := by rintro ⟨⟨N, D, P, C⟩, rfl⟩ rw [← cast_pow] at hxr have c1 : ((D : ℤ) : ℝ) ≠ 0 := by rw [Int.cast_ne_zero, Int.natCast_ne_zero] exact P have c2 : ((D : ℤ) : ℝ) ^ n ≠ 0 := pow_ne_zero _ c1 rw [mk'_eq_divInt, cast_pow, cast_mk, div_pow, div_eq_iff_mul_eq c2, ← Int.cast_pow, ← Int.cast_pow, ← Int.cast_mul, Int.cast_inj] at hxr have hdivn : (D : ℤ) ^ n ∣ N ^ n := Dvd.intro_left m hxr rw [← Int.dvd_natAbs, ← Int.natCast_pow, Int.natCast_dvd_natCast, Int.natAbs_pow, Nat.pow_dvd_pow_iff hnpos.ne'] at hdivn obtain rfl : D = 1 := by rw [← Nat.gcd_eq_right hdivn, C.gcd_eq_one] refine hv ⟨N, ?_⟩ rw [mk'_eq_divInt, Int.ofNat_one, divInt_one, cast_intCast] /-- If `x^n = m` is an integer and `n` does not divide the `multiplicity p m`, then `x` is irrational. -/ theorem irrational_nrt_of_n_not_dvd_multiplicity {x : ℝ} (n : ℕ) {m : ℤ} (hm : m ≠ 0) (p : ℕ) [hp : Fact p.Prime] (hxr : x ^ n = m) (hv : multiplicity (p : ℤ) m % n ≠ 0) : Irrational x := by rcases Nat.eq_zero_or_pos n with (rfl \| hnpos) · rw [eq_comm, pow_zero, ← Int.cast_one, Int.cast_inj] at hxr simp [hxr, multiplicity_of_one_right (mt isUnit_iff_dvd_one.1 (mt Int.natCast_dvd_natCast.1 hp.1.not_dvd_one)), Nat.zero_mod] at hv refine irrational_nrt_of_notint_nrt _ _ hxr ?_ hnpos rintro ⟨y, rfl⟩ rw [← Int.cast_pow, Int.cast_inj] at hxr subst m have : y ≠ 0 := by rintro rfl; rw [zero_pow hnpos.ne'] at hm; exact hm rfl rw [(Int.finiteMultiplicity_iff.2 ⟨by simp [hp.1.ne_one], this⟩).multiplicity_pow (Nat.prime_iff_prime_int.1 hp.1), Nat.mul_mod_right] at hv exact hv rfl theorem irrational_sqrt_of_multiplicity_odd (m : ℤ) (hm : 0 < m) (p : ℕ) [hp : Fact p.Prime] (Hpv : multiplicity (p : ℤ) m % 2 = 1) : Irrational (√m) := @irrational_nrt_of_n_not_dvd_multiplicity _ 2 _ (Ne.symm (ne_of_lt hm)) p hp (sq_sqrt (Int.cast_nonneg.2 <\| le_of_lt hm)) (by rw [Hpv]; exact one_ne_zero) @[simp] theorem not_irrational_zero : ¬Irrational 0 := not_not_intro ⟨0, Rat.cast_zero⟩ @[simp] theorem not_irrational_one : ¬Irrational 1 := not_not_intro ⟨1, Rat.cast_one⟩ theorem irrational_sqrt_ratCast_iff_of_nonneg {q : ℚ} (hq : 0 ≤ q) : Irrational (√q) ↔ ¬IsSquare q := by refine Iff.not (?_ : Exists _ ↔ Exists _) constructor · rintro ⟨y, hy⟩ refine ⟨y, Rat.cast_injective (α := ℝ) ?_⟩ rw [Rat.cast_mul, hy, mul_self_sqrt (Rat.cast_nonneg.2 hq)] · rintro ⟨q', rfl⟩ exact ⟨\|q'\|, mod_cast (sqrt_mul_self_eq_abs q').symm⟩ theorem irrational_sqrt_ratCast_iff {q : ℚ} : Irrational (√q) ↔ ¬IsSquare q ∧ 0 ≤ q := by obtain hq \| hq := le_or_lt 0 q · simp_rw [irrational_sqrt_ratCast_iff_of_nonneg hq, and_iff_left hq] · rw [sqrt_eq_zero_of_nonpos (Rat.cast_nonpos.2 hq.le)] simp_rw [not_irrational_zero, false_iff, not_and, not_le, hq, implies_true] theorem irrational_sqrt_intCast_iff_of_nonneg {z : ℤ} (hz : 0 ≤ z) : Irrational (√z) ↔ ¬IsSquare z := by rw [← Rat.isSquare_intCast_iff, ← irrational_sqrt_ratCast_iff_of_nonneg (mod_cast hz), Rat.cast_intCast] theorem irrational_sqrt_intCast_iff {z : ℤ} : Irrational (√z) ↔ ¬IsSquare z ∧ 0 ≤ z := by rw [← Rat.cast_intCast, irrational_sqrt_ratCast_iff, Rat.isSquare_intCast_iff, Int.cast_nonneg] theorem irrational_sqrt_natCast_iff {n : ℕ} : Irrational (√n) ↔ ¬IsSquare n := by rw [← Rat.isSquare_natCast_iff, ← irrational_sqrt_ratCast_iff_of_nonneg n.cast_nonneg, Rat.cast_natCast] theorem irrational_sqrt_ofNat_iff {n : ℕ} [n.AtLeastTwo] : Irrational √(ofNat(n)) ↔ ¬IsSquare ofNat(n) := irrational_sqrt_natCast_iff	theorem Nat.Prime.irrational_sqrt {p : ℕ} (hp : Nat.Prime p) : Irrational (√p) := irrational_sqrt_natCast_iff.mpr hp.not_isSquare	Mathlib/Data/Real/Irrational.lean	129	131
/- 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.Algebra.Ring.Pointwise.Set import Mathlib.Order.Filter.AtTopBot.CompleteLattice import Mathlib.Order.Filter.AtTopBot.Group import Mathlib.Topology.Order.Basic /-! # Neighborhoods to the left and to the right on an `OrderTopology` We've seen some properties of left and right neighborhood of a point in an `OrderClosedTopology`. In an `OrderTopology`, such neighborhoods can be characterized as the sets containing suitable intervals to the right or to the left of `a`. We give now these characterizations. -/ open Set Filter TopologicalSpace Topology Function open OrderDual (toDual ofDual) variable {α β γ : Type*} section LinearOrder variable [TopologicalSpace α] [LinearOrder α] section OrderTopology variable [OrderTopology α] open List in /-- The following statements are equivalent: 0. `s` is a neighborhood of `a` within `(a, +∞)`; 1. `s` is a neighborhood of `a` within `(a, b]`; 2. `s` is a neighborhood of `a` within `(a, b)`; 3. `s` includes `(a, u)` for some `u ∈ (a, b]`; 4. `s` includes `(a, u)` for some `u > a`. -/ theorem TFAE_mem_nhdsGT {a b : α} (hab : a < b) (s : Set α) : TFAE [s ∈ 𝓝[>] a, s ∈ 𝓝[Ioc a b] a, s ∈ 𝓝[Ioo a b] a, ∃ u ∈ Ioc a b, Ioo a u ⊆ s, ∃ u ∈ Ioi a, Ioo a u ⊆ s] := by tfae_have 1 ↔ 2 := by rw [nhdsWithin_Ioc_eq_nhdsGT hab] tfae_have 1 ↔ 3 := by rw [nhdsWithin_Ioo_eq_nhdsGT hab] tfae_have 4 → 5 := fun ⟨u, umem, hu⟩ => ⟨u, umem.1, hu⟩ tfae_have 5 → 1 \| ⟨u, hau, hu⟩ => mem_of_superset (Ioo_mem_nhdsGT hau) hu tfae_have 1 → 4 \| h => by rcases mem_nhdsWithin_iff_exists_mem_nhds_inter.1 h with ⟨v, va, hv⟩ rcases exists_Ico_subset_of_mem_nhds' va hab with ⟨u, au, hu⟩ exact ⟨u, au, fun x hx => hv ⟨hu ⟨le_of_lt hx.1, hx.2⟩, hx.1⟩⟩ tfae_finish @[deprecated (since := "2024-12-22")] alias TFAE_mem_nhdsWithin_Ioi := TFAE_mem_nhdsGT theorem mem_nhdsGT_iff_exists_mem_Ioc_Ioo_subset {a u' : α} {s : Set α} (hu' : a < u') : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioc a u', Ioo a u ⊆ s := (TFAE_mem_nhdsGT hu' s).out 0 3 @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ioi_iff_exists_mem_Ioc_Ioo_subset := mem_nhdsGT_iff_exists_mem_Ioc_Ioo_subset /-- A set is a neighborhood of `a` within `(a, +∞)` if and only if it contains an interval `(a, u)` with `a < u < u'`, provided `a` is not a top element. -/ theorem mem_nhdsGT_iff_exists_Ioo_subset' {a u' : α} {s : Set α} (hu' : a < u') : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioi a, Ioo a u ⊆ s := (TFAE_mem_nhdsGT hu' s).out 0 4 @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ioi_iff_exists_Ioo_subset' := mem_nhdsGT_iff_exists_Ioo_subset' theorem nhdsGT_basis_of_exists_gt {a : α} (h : ∃ b, a < b) : (𝓝[>] a).HasBasis (a < ·) (Ioo a) := let ⟨_, h⟩ := h ⟨fun _ => mem_nhdsGT_iff_exists_Ioo_subset' h⟩ @[deprecated (since := "2024-12-22")] alias nhdsWithin_Ioi_basis' := nhdsGT_basis_of_exists_gt lemma nhdsGT_basis [NoMaxOrder α] (a : α) : (𝓝[>] a).HasBasis (a < ·) (Ioo a) := nhdsGT_basis_of_exists_gt <\| exists_gt a @[deprecated (since := "2024-12-22")] alias nhdsWithin_Ioi_basis := nhdsGT_basis theorem nhdsGT_eq_bot_iff {a : α} : 𝓝[>] a = ⊥ ↔ IsTop a ∨ ∃ b, a ⋖ b := by by_cases ha : IsTop a · simp [ha, ha.isMax.Ioi_eq] · simp only [ha, false_or] rw [isTop_iff_isMax, not_isMax_iff] at ha simp only [(nhdsGT_basis_of_exists_gt ha).eq_bot_iff, covBy_iff_Ioo_eq] @[deprecated (since := "2024-12-22")] alias nhdsWithin_Ioi_eq_bot_iff := nhdsGT_eq_bot_iff /-- A set is a neighborhood of `a` within `(a, +∞)` if and only if it contains an interval `(a, u)` with `a < u`. -/ theorem mem_nhdsGT_iff_exists_Ioo_subset [NoMaxOrder α] {a : α} {s : Set α} : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioi a, Ioo a u ⊆ s := let ⟨_u', hu'⟩ := exists_gt a mem_nhdsGT_iff_exists_Ioo_subset' hu' @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ioi_iff_exists_Ioo_subset := mem_nhdsGT_iff_exists_Ioo_subset /-- The set of points which are isolated on the right is countable when the space is second-countable. -/ theorem countable_setOf_isolated_right [SecondCountableTopology α] : { x : α \| 𝓝[>] x = ⊥ }.Countable := by simp only [nhdsGT_eq_bot_iff, setOf_or] exact (subsingleton_isTop α).countable.union countable_setOf_covBy_right /-- The set of points which are isolated on the left is countable when the space is second-countable. -/ theorem countable_setOf_isolated_left [SecondCountableTopology α] : { x : α \| 𝓝[<] x = ⊥ }.Countable := countable_setOf_isolated_right (α := αᵒᵈ) /-- A set is a neighborhood of `a` within `(a, +∞)` if and only if it contains an interval `(a, u]` with `a < u`. -/ theorem mem_nhdsGT_iff_exists_Ioc_subset [NoMaxOrder α] [DenselyOrdered α] {a : α} {s : Set α} : s ∈ 𝓝[>] a ↔ ∃ u ∈ Ioi a, Ioc a u ⊆ s := by rw [mem_nhdsGT_iff_exists_Ioo_subset] constructor · rintro ⟨u, au, as⟩ rcases exists_between au with ⟨v, hv⟩ exact ⟨v, hv.1, fun x hx => as ⟨hx.1, lt_of_le_of_lt hx.2 hv.2⟩⟩ · rintro ⟨u, au, as⟩ exact ⟨u, au, Subset.trans Ioo_subset_Ioc_self as⟩ @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ioi_iff_exists_Ioc_subset := mem_nhdsGT_iff_exists_Ioc_subset open List in /-- The following statements are equivalent: 0. `s` is a neighborhood of `b` within `(-∞, b)` 1. `s` is a neighborhood of `b` within `[a, b)` 2. `s` is a neighborhood of `b` within `(a, b)` 3. `s` includes `(l, b)` for some `l ∈ [a, b)` 4. `s` includes `(l, b)` for some `l < b` -/ theorem TFAE_mem_nhdsLT {a b : α} (h : a < b) (s : Set α) : TFAE [s ∈ 𝓝[<] b,-- 0 : `s` is a neighborhood of `b` within `(-∞, b)` s ∈ 𝓝[Ico a b] b,-- 1 : `s` is a neighborhood of `b` within `[a, b)` s ∈ 𝓝[Ioo a b] b,-- 2 : `s` is a neighborhood of `b` within `(a, b)` ∃ l ∈ Ico a b, Ioo l b ⊆ s,-- 3 : `s` includes `(l, b)` for some `l ∈ [a, b)` ∃ l ∈ Iio b, Ioo l b ⊆ s] := by-- 4 : `s` includes `(l, b)` for some `l < b` simpa using TFAE_mem_nhdsGT h.dual (ofDual ⁻¹' s) @[deprecated (since := "2024-12-22")] alias TFAE_mem_nhdsWithin_Iio := TFAE_mem_nhdsLT theorem mem_nhdsLT_iff_exists_mem_Ico_Ioo_subset {a l' : α} {s : Set α} (hl' : l' < a) : s ∈ 𝓝[<] a ↔ ∃ l ∈ Ico l' a, Ioo l a ⊆ s := (TFAE_mem_nhdsLT hl' s).out 0 3 @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iio_iff_exists_mem_Ico_Ioo_subset := mem_nhdsLT_iff_exists_mem_Ico_Ioo_subset /-- A set is a neighborhood of `a` within `(-∞, a)` if and only if it contains an interval `(l, a)` with `l < a`, provided `a` is not a bottom element. -/ theorem mem_nhdsLT_iff_exists_Ioo_subset' {a l' : α} {s : Set α} (hl' : l' < a) : s ∈ 𝓝[<] a ↔ ∃ l ∈ Iio a, Ioo l a ⊆ s := (TFAE_mem_nhdsLT hl' s).out 0 4 @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iio_iff_exists_Ioo_subset' := mem_nhdsLT_iff_exists_Ioo_subset' /-- A set is a neighborhood of `a` within `(-∞, a)` if and only if it contains an interval `(l, a)` with `l < a`. -/ theorem mem_nhdsLT_iff_exists_Ioo_subset [NoMinOrder α] {a : α} {s : Set α} : s ∈ 𝓝[<] a ↔ ∃ l ∈ Iio a, Ioo l a ⊆ s := let ⟨_, h⟩ := exists_lt a mem_nhdsLT_iff_exists_Ioo_subset' h @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iio_iff_exists_Ioo_subset := mem_nhdsLT_iff_exists_Ioo_subset /-- A set is a neighborhood of `a` within `(-∞, a)` if and only if it contains an interval `[l, a)` with `l < a`. -/ theorem mem_nhdsLT_iff_exists_Ico_subset [NoMinOrder α] [DenselyOrdered α] {a : α} {s : Set α} : s ∈ 𝓝[<] a ↔ ∃ l ∈ Iio a, Ico l a ⊆ s := by have : ofDual ⁻¹' s ∈ 𝓝[>] toDual a ↔ _ := mem_nhdsGT_iff_exists_Ioc_subset simpa using this @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iio_iff_exists_Ico_subset := mem_nhdsLT_iff_exists_Ico_subset theorem nhdsLT_basis_of_exists_lt {a : α} (h : ∃ b, b < a) : (𝓝[<] a).HasBasis (· < a) (Ioo · a) := let ⟨_, h⟩ := h ⟨fun _ => mem_nhdsLT_iff_exists_Ioo_subset' h⟩ @[deprecated (since := "2024-12-22")] alias nhdsWithin_Iio_basis' := nhdsLT_basis_of_exists_lt theorem nhdsLT_basis [NoMinOrder α] (a : α) : (𝓝[<] a).HasBasis (· < a) (Ioo · a) := nhdsLT_basis_of_exists_lt <\| exists_lt a @[deprecated (since := "2024-12-22")] alias nhdsWithin_Iio_basis := nhdsLT_basis theorem nhdsLT_eq_bot_iff {a : α} : 𝓝[<] a = ⊥ ↔ IsBot a ∨ ∃ b, b ⋖ a := by convert (config := { preTransparency := .default }) nhdsGT_eq_bot_iff (a := OrderDual.toDual a) using 4 exact ofDual_covBy_ofDual_iff @[deprecated (since := "2024-12-22")] alias nhdsWithin_Iio_eq_bot_iff := nhdsLT_eq_bot_iff open List in /-- The following statements are equivalent: 0. `s` is a neighborhood of `a` within `[a, +∞)`; 1. `s` is a neighborhood of `a` within `[a, b]`; 2. `s` is a neighborhood of `a` within `[a, b)`; 3. `s` includes `[a, u)` for some `u ∈ (a, b]`; 4. `s` includes `[a, u)` for some `u > a`. -/ theorem TFAE_mem_nhdsGE {a b : α} (hab : a < b) (s : Set α) : TFAE [s ∈ 𝓝[≥] a, s ∈ 𝓝[Icc a b] a, s ∈ 𝓝[Ico a b] a, ∃ u ∈ Ioc a b, Ico a u ⊆ s, ∃ u ∈ Ioi a , Ico a u ⊆ s] := by tfae_have 1 ↔ 2 := by rw [nhdsWithin_Icc_eq_nhdsGE hab] tfae_have 1 ↔ 3 := by rw [nhdsWithin_Ico_eq_nhdsGE hab] tfae_have 1 ↔ 5 := (nhdsGE_basis_of_exists_gt ⟨b, hab⟩).mem_iff tfae_have 4 → 5 := fun ⟨u, umem, hu⟩ => ⟨u, umem.1, hu⟩ tfae_have 5 → 4 \| ⟨u, hua, hus⟩ => ⟨min u b, ⟨lt_min hua hab, min_le_right _ _⟩, (Ico_subset_Ico_right <\| min_le_left _ _).trans hus⟩ tfae_finish @[deprecated (since := "2024-12-22")] alias TFAE_mem_nhdsWithin_Ici := TFAE_mem_nhdsGE theorem mem_nhdsGE_iff_exists_mem_Ioc_Ico_subset {a u' : α} {s : Set α} (hu' : a < u') : s ∈ 𝓝[≥] a ↔ ∃ u ∈ Ioc a u', Ico a u ⊆ s := (TFAE_mem_nhdsGE hu' s).out 0 3 (by norm_num) (by norm_num) @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ici_iff_exists_mem_Ioc_Ico_subset := mem_nhdsGE_iff_exists_mem_Ioc_Ico_subset /-- A set is a neighborhood of `a` within `[a, +∞)` if and only if it contains an interval `[a, u)` with `a < u < u'`, provided `a` is not a top element. -/ theorem mem_nhdsGE_iff_exists_Ico_subset' {a u' : α} {s : Set α} (hu' : a < u') : s ∈ 𝓝[≥] a ↔ ∃ u ∈ Ioi a, Ico a u ⊆ s := (TFAE_mem_nhdsGE hu' s).out 0 4 (by norm_num) (by norm_num) @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ici_iff_exists_Ico_subset' := mem_nhdsGE_iff_exists_Ico_subset' /-- A set is a neighborhood of `a` within `[a, +∞)` if and only if it contains an interval `[a, u)` with `a < u`. -/ theorem mem_nhdsGE_iff_exists_Ico_subset [NoMaxOrder α] {a : α} {s : Set α} : s ∈ 𝓝[≥] a ↔ ∃ u ∈ Ioi a, Ico a u ⊆ s := let ⟨_, hu'⟩ := exists_gt a mem_nhdsGE_iff_exists_Ico_subset' hu' @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ici_iff_exists_Ico_subset := mem_nhdsGE_iff_exists_Ico_subset theorem nhdsGE_basis_Ico [NoMaxOrder α] (a : α) : (𝓝[≥] a).HasBasis (fun u => a < u) (Ico a) := ⟨fun _ => mem_nhdsGE_iff_exists_Ico_subset⟩ @[deprecated (since := "2024-12-22")] alias nhdsWithin_Ici_basis_Ico := nhdsGE_basis_Ico /-- The filter of right neighborhoods has a basis of closed intervals. -/ theorem nhdsGE_basis_Icc [NoMaxOrder α] [DenselyOrdered α] {a : α} : (𝓝[≥] a).HasBasis (a < ·) (Icc a) := (nhdsGE_basis _).to_hasBasis (fun _u hu ↦ (exists_between hu).imp fun _v hv ↦ hv.imp_right Icc_subset_Ico_right) fun u hu ↦ ⟨u, hu, Ico_subset_Icc_self⟩ @[deprecated (since := "2024-12-22")] alias nhdsWithin_Ici_basis_Icc := nhdsGE_basis_Icc /-- A set is a neighborhood of `a` within `[a, +∞)` if and only if it contains an interval `[a, u]` with `a < u`. -/ theorem mem_nhdsGE_iff_exists_Icc_subset [NoMaxOrder α] [DenselyOrdered α] {a : α} {s : Set α} : s ∈ 𝓝[≥] a ↔ ∃ u, a < u ∧ Icc a u ⊆ s := nhdsGE_basis_Icc.mem_iff @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Ici_iff_exists_Icc_subset := mem_nhdsGE_iff_exists_Icc_subset open List in /-- The following statements are equivalent: 0. `s` is a neighborhood of `b` within `(-∞, b]` 1. `s` is a neighborhood of `b` within `[a, b]` 2. `s` is a neighborhood of `b` within `(a, b]` 3. `s` includes `(l, b]` for some `l ∈ [a, b)` 4. `s` includes `(l, b]` for some `l < b` -/ theorem TFAE_mem_nhdsLE {a b : α} (h : a < b) (s : Set α) : TFAE [s ∈ 𝓝[≤] b,-- 0 : `s` is a neighborhood of `b` within `(-∞, b]` s ∈ 𝓝[Icc a b] b,-- 1 : `s` is a neighborhood of `b` within `[a, b]` s ∈ 𝓝[Ioc a b] b,-- 2 : `s` is a neighborhood of `b` within `(a, b]` ∃ l ∈ Ico a b, Ioc l b ⊆ s,-- 3 : `s` includes `(l, b]` for some `l ∈ [a, b)` ∃ l ∈ Iio b, Ioc l b ⊆ s] := by-- 4 : `s` includes `(l, b]` for some `l < b` simpa using TFAE_mem_nhdsGE h.dual (ofDual ⁻¹' s) @[deprecated (since := "2024-12-22")] alias TFAE_mem_nhdsWithin_Iic := TFAE_mem_nhdsLE theorem mem_nhdsLE_iff_exists_mem_Ico_Ioc_subset {a l' : α} {s : Set α} (hl' : l' < a) : s ∈ 𝓝[≤] a ↔ ∃ l ∈ Ico l' a, Ioc l a ⊆ s := (TFAE_mem_nhdsLE hl' s).out 0 3 (by norm_num) (by norm_num) @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iic_iff_exists_mem_Ico_Ioc_subset := mem_nhdsLE_iff_exists_mem_Ico_Ioc_subset /-- A set is a neighborhood of `a` within `(-∞, a]` if and only if it contains an interval `(l, a]` with `l < a`, provided `a` is not a bottom element. -/ theorem mem_nhdsLE_iff_exists_Ioc_subset' {a l' : α} {s : Set α} (hl' : l' < a) : s ∈ 𝓝[≤] a ↔ ∃ l ∈ Iio a, Ioc l a ⊆ s := (TFAE_mem_nhdsLE hl' s).out 0 4 (by norm_num) (by norm_num) @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iic_iff_exists_Ioc_subset' := mem_nhdsLE_iff_exists_Ioc_subset' /-- A set is a neighborhood of `a` within `(-∞, a]` if and only if it contains an interval `(l, a]` with `l < a`. -/ theorem mem_nhdsLE_iff_exists_Ioc_subset [NoMinOrder α] {a : α} {s : Set α} : s ∈ 𝓝[≤] a ↔ ∃ l ∈ Iio a, Ioc l a ⊆ s := let ⟨_, hl'⟩ := exists_lt a mem_nhdsLE_iff_exists_Ioc_subset' hl' @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iic_iff_exists_Ioc_subset := mem_nhdsLE_iff_exists_Ioc_subset /-- A set is a neighborhood of `a` within `(-∞, a]` if and only if it contains an interval `[l, a]` with `l < a`. -/ theorem mem_nhdsLE_iff_exists_Icc_subset [NoMinOrder α] [DenselyOrdered α] {a : α} {s : Set α} : s ∈ 𝓝[≤] a ↔ ∃ l, l < a ∧ Icc l a ⊆ s := calc s ∈ 𝓝[≤] a ↔ ofDual ⁻¹' s ∈ 𝓝[≥] (toDual a) := Iff.rfl _ ↔ ∃ u : α, toDual a < toDual u ∧ Icc (toDual a) (toDual u) ⊆ ofDual ⁻¹' s := mem_nhdsGE_iff_exists_Icc_subset _ ↔ ∃ l, l < a ∧ Icc l a ⊆ s := by simp @[deprecated (since := "2024-12-22")] alias mem_nhdsWithin_Iic_iff_exists_Icc_subset := mem_nhdsLE_iff_exists_Icc_subset	/-- The filter of left neighborhoods has a basis of closed intervals. -/ theorem nhdsLE_basis_Icc [NoMinOrder α] [DenselyOrdered α] {a : α} : (𝓝[≤] a).HasBasis (· < a) (Icc · a) := ⟨fun _ ↦ mem_nhdsLE_iff_exists_Icc_subset⟩	Mathlib/Topology/Order/LeftRightNhds.lean	354	357
/- Copyright (c) 2024 Theodore Hwa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Kim Morrison, Violeta Hernández Palacios, Junyan Xu, Theodore Hwa -/ import Mathlib.Logic.Hydra import Mathlib.SetTheory.Surreal.Basic /-! ### Surreal multiplication In this file, we show that multiplication of surreal numbers is well-defined, and thus the surreal numbers form a linear ordered commutative ring. An inductive argument proves the following three main theorems: * P1: being numeric is closed under multiplication, * P2: multiplying a numeric pregame by equivalent numeric pregames results in equivalent pregames, * P3: the product of two positive numeric pregames is positive (`mul_pos`). This is Theorem 8 in [Conway2001], or Theorem 3.8 in [SchleicherStoll]. P1 allows us to define multiplication as an operation on numeric pregames, P2 says that this is well-defined as an operation on the quotient by `PGame.Equiv`, namely the surreal numbers, and P3 is an axiom that needs to be satisfied for the surreals to be a `OrderedRing`. We follow the proof in [SchleicherStoll], except that we use the well-foundedness of the hydra relation `CutExpand` on `Multiset PGame` instead of the argument based on a depth function in the paper. In the argument, P3 is stated with four variables `x₁`, `x₂`, `y₁`, `y₂` satisfying `x₁ < x₂` and `y₁ < y₂`, and says that `x₁ * y₂ + x₂ * x₁ < x₁ * y₁ + x₂ * y₂`, which is equivalent to `0 < x₂ - x₁ → 0 < y₂ - y₁ → 0 < (x₂ - x₁) * (y₂ - y₁)`, i.e. `@mul_pos PGame _ (x₂ - x₁) (y₂ - y₁)`. It has to be stated in this form and not in terms of `mul_pos` because we need to show P1, P2 and (a specialized form of) P3 simultaneously, and for example `P1 x y` will be deduced from P3 with variables taking values simpler than `x` or `y` (among other induction hypotheses), but if you subtract two pregames simpler than `x` or `y`, the result may no longer be simpler. The specialized version of P3 is called P4, which takes only three arguments `x₁`, `x₂`, `y` and requires that `y₂ = y` or `-y` and that `y₁` is a left option of `y₂`. After P1, P2 and P4 are shown, a further inductive argument (this time using the `GameAdd` relation) proves P3 in full. Implementation strategy of the inductive argument: we * extract specialized versions (`IH1`, `IH2`, `IH3`, `IH4` and `IH24`) of the induction hypothesis that are easier to apply (taking `IsOption` arguments directly), and * show they are invariant under certain symmetries (permutation and negation of arguments) and that the induction hypothesis indeed implies the specialized versions. * utilize the symmetries to minimize calculation. The whole proof features a clear separation into lemmas of different roles: * verification of symmetry properties of P and IH (`P3_comm`, `ih1_neg_left`, etc.), * calculations that connect P1, P2, P3, and inequalities between the product of two surreals and its options (`mulOption_lt_iff_P1`, etc.), * specializations of the induction hypothesis (`numeric_option_mul`, `ih1`, `ih1_swap`, `ih₁₂`, `ih4`, etc.), * application of specialized induction hypothesis (`P1_of_ih`, `mul_right_le_of_equiv`, `P3_of_lt`, etc.). ## References * [Conway, On numbers and games][Conway2001] * [Schleicher, Stoll, An introduction to Conway's games and numbers][SchleicherStoll] -/ universe u open SetTheory Game PGame WellFounded namespace Surreal.Multiplication /-- The nontrivial part of P1 in [SchleicherStoll] says that the left options of `x * y` are less than the right options, and this is the general form of these statements. -/ def P1 (x₁ x₂ x₃ y₁ y₂ y₃ : PGame) := ⟦x₁ * y₁⟧ + ⟦x₂ * y₂⟧ - ⟦x₁ * y₂⟧ < ⟦x₃ * y₁⟧ + ⟦x₂ * y₃⟧ - (⟦x₃ * y₃⟧ : Game) /-- The proposition P2, without numericity assumptions. -/ def P2 (x₁ x₂ y : PGame) := x₁ ≈ x₂ → ⟦x₁ * y⟧ = (⟦x₂ * y⟧ : Game) /-- The proposition P3, without the `x₁ < x₂` and `y₁ < y₂` assumptions. -/ def P3 (x₁ x₂ y₁ y₂ : PGame) := ⟦x₁ * y₂⟧ + ⟦x₂ * y₁⟧ < ⟦x₁ * y₁⟧ + (⟦x₂ * y₂⟧ : Game) /-- The proposition P4, without numericity assumptions. In the references, the second part of the conjunction is stated as `∀ j, P3 x₁ x₂ y (y.moveRight j)`, which is equivalent to our statement by `P3_comm` and `P3_neg`. We choose to state everything in terms of left options for uniform treatment. -/ def P4 (x₁ x₂ y : PGame) := x₁ < x₂ → (∀ i, P3 x₁ x₂ (y.moveLeft i) y) ∧ ∀ j, P3 x₁ x₂ ((-y).moveLeft j) (-y) /-- The conjunction of P2 and P4. -/ def P24 (x₁ x₂ y : PGame) : Prop := P2 x₁ x₂ y ∧ P4 x₁ x₂ y variable {x x₁ x₂ x₃ x' y y₁ y₂ y₃ y' : PGame.{u}} /-! #### Symmetry properties of P1, P2, P3, and P4 -/ lemma P3_comm : P3 x₁ x₂ y₁ y₂ ↔ P3 y₁ y₂ x₁ x₂ := by rw [P3, P3, add_comm] congr! 2 <;> rw [quot_mul_comm] lemma P3.trans (h₁ : P3 x₁ x₂ y₁ y₂) (h₂ : P3 x₂ x₃ y₁ y₂) : P3 x₁ x₃ y₁ y₂ := by rw [P3] at h₁ h₂ rw [P3, ← add_lt_add_iff_left (⟦x₂ * y₁⟧ + ⟦x₂ * y₂⟧)] convert add_lt_add h₁ h₂ using 1 <;> abel lemma P3_neg : P3 x₁ x₂ y₁ y₂ ↔ P3 (-x₂) (-x₁) y₁ y₂ := by simp_rw [P3, quot_neg_mul] rw [← _root_.neg_lt_neg_iff] abel_nf lemma P2_neg_left : P2 x₁ x₂ y ↔ P2 (-x₂) (-x₁) y := by rw [P2, P2] constructor · rw [quot_neg_mul, quot_neg_mul, eq_comm, neg_inj, neg_equiv_neg_iff, PGame.equiv_comm] exact (· ·) · rw [PGame.equiv_comm, neg_equiv_neg_iff, quot_neg_mul, quot_neg_mul, neg_inj, eq_comm] exact (· ·) lemma P2_neg_right : P2 x₁ x₂ y ↔ P2 x₁ x₂ (-y) := by rw [P2, P2, quot_mul_neg, quot_mul_neg, neg_inj] lemma P4_neg_left : P4 x₁ x₂ y ↔ P4 (-x₂) (-x₁) y := by simp_rw [P4, PGame.neg_lt_neg_iff, moveLeft_neg, ← P3_neg] lemma P4_neg_right : P4 x₁ x₂ y ↔ P4 x₁ x₂ (-y) := by rw [P4, P4, neg_neg, and_comm] lemma P24_neg_left : P24 x₁ x₂ y ↔ P24 (-x₂) (-x₁) y := by rw [P24, P24, P2_neg_left, P4_neg_left] lemma P24_neg_right : P24 x₁ x₂ y ↔ P24 x₁ x₂ (-y) := by rw [P24, P24, P2_neg_right, P4_neg_right] /-! #### Explicit calculations necessary for the main proof -/ lemma mulOption_lt_iff_P1 {i j k l} : (⟦mulOption x y i k⟧ : Game) < -⟦mulOption x (-y) j l⟧ ↔ P1 (x.moveLeft i) x (x.moveLeft j) y (y.moveLeft k) (-(-y).moveLeft l) := by dsimp only [P1, mulOption, quot_sub, quot_add] simp_rw [neg_sub', neg_add, quot_mul_neg, neg_neg] lemma mulOption_lt_mul_iff_P3 {i j} : ⟦mulOption x y i j⟧ < (⟦x * y⟧ : Game) ↔ P3 (x.moveLeft i) x (y.moveLeft j) y := by dsimp only [mulOption, quot_sub, quot_add] exact sub_lt_iff_lt_add' lemma P1_of_eq (he : x₁ ≈ x₃) (h₁ : P2 x₁ x₃ y₁) (h₃ : P2 x₁ x₃ y₃) (h3 : P3 x₁ x₂ y₂ y₃) : P1 x₁ x₂ x₃ y₁ y₂ y₃ := by rw [P1, ← h₁ he, ← h₃ he, sub_lt_sub_iff] convert add_lt_add_left h3 ⟦x₁ * y₁⟧ using 1 <;> abel lemma P1_of_lt (h₁ : P3 x₃ x₂ y₂ y₃) (h₂ : P3 x₁ x₃ y₂ y₁) : P1 x₁ x₂ x₃ y₁ y₂ y₃ := by rw [P1, sub_lt_sub_iff, ← add_lt_add_iff_left ⟦x₃ * y₂⟧] convert add_lt_add h₁ h₂ using 1 <;> abel /-- The type of lists of arguments for P1, P2, and P4. -/ inductive Args : Type (u + 1) \| P1 (x y : PGame.{u}) : Args \| P24 (x₁ x₂ y : PGame.{u}) : Args /-- The multiset associated to a list of arguments. -/ def Args.toMultiset : Args → Multiset PGame \| (Args.P1 x y) => {x, y} \| (Args.P24 x₁ x₂ y) => {x₁, x₂, y} /-- A list of arguments is numeric if all the arguments are. -/ def Args.Numeric (a : Args) := ∀ x ∈ a.toMultiset, SetTheory.PGame.Numeric x lemma Args.numeric_P1 {x y} : (Args.P1 x y).Numeric ↔ x.Numeric ∧ y.Numeric := by simp [Args.Numeric, Args.toMultiset] lemma Args.numeric_P24 {x₁ x₂ y} : (Args.P24 x₁ x₂ y).Numeric ↔ x₁.Numeric ∧ x₂.Numeric ∧ y.Numeric := by simp [Args.Numeric, Args.toMultiset] open Relation /-- The relation specifying when a list of (pregame) arguments is considered simpler than another: `ArgsRel a₁ a₂` is true if `a₁`, considered as a multiset, can be obtained from `a₂` by repeatedly removing a pregame from `a₂` and adding back one or two options of the pregame. -/ def ArgsRel := InvImage (TransGen <\| CutExpand IsOption) Args.toMultiset /-- `ArgsRel` is well-founded. -/ theorem argsRel_wf : WellFounded ArgsRel := InvImage.wf _ wf_isOption.cutExpand.transGen /-- The statement that we will show by induction using the well-founded relation `ArgsRel`. -/ def P124 : Args → Prop \| (Args.P1 x y) => Numeric (x * y) \| (Args.P24 x₁ x₂ y) => P24 x₁ x₂ y /-- The property that all arguments are numeric is leftward-closed under `ArgsRel`. -/ lemma ArgsRel.numeric_closed {a' a} : ArgsRel a' a → a.Numeric → a'.Numeric := TransGen.closed' <\| @cutExpand_closed _ IsOption ⟨wf_isOption.isIrrefl.1⟩ _ Numeric.isOption /-- A specialized induction hypothesis used to prove P1. -/ def IH1 (x y : PGame) : Prop := ∀ ⦃x₁ x₂ y'⦄, IsOption x₁ x → IsOption x₂ x → (y' = y ∨ IsOption y' y) → P24 x₁ x₂ y' /-! #### Symmetry properties of `IH1` -/ lemma ih1_neg_left : IH1 x y → IH1 (-x) y := fun h x₁ x₂ y' h₁ h₂ hy ↦ by rw [isOption_neg] at h₁ h₂ exact P24_neg_left.2 (h h₂ h₁ hy) lemma ih1_neg_right : IH1 x y → IH1 x (-y) := fun h x₁ x₂ y' ↦ by rw [← neg_eq_iff_eq_neg, isOption_neg, P24_neg_right] apply h /-! #### Specialize `ih` to obtain specialized induction hypotheses for P1 -/ lemma numeric_option_mul (ih : ∀ a, ArgsRel a (Args.P1 x y) → P124 a) (h : IsOption x' x) : (x' * y).Numeric := ih (Args.P1 x' y) (TransGen.single <\| cutExpand_pair_left h) lemma numeric_mul_option (ih : ∀ a, ArgsRel a (Args.P1 x y) → P124 a) (h : IsOption y' y) : (x * y').Numeric := ih (Args.P1 x y') (TransGen.single <\| cutExpand_pair_right h) lemma numeric_option_mul_option (ih : ∀ a, ArgsRel a (Args.P1 x y) → P124 a) (hx : IsOption x' x) (hy : IsOption y' y) : (x' * y').Numeric := ih (Args.P1 x' y') ((TransGen.single <\| cutExpand_pair_right hy).tail <\| cutExpand_pair_left hx) lemma ih1 (ih : ∀ a, ArgsRel a (Args.P1 x y) → P124 a) : IH1 x y := by rintro x₁ x₂ y' h₁ h₂ (rfl\|hy) <;> apply ih (Args.P24 _ _ _) on_goal 2 => refine TransGen.tail ?_ (cutExpand_pair_right hy) all_goals exact TransGen.single (cutExpand_double_left h₁ h₂) lemma ih1_swap (ih : ∀ a, ArgsRel a (Args.P1 x y) → P124 a) : IH1 y x := ih1 <\| by simp_rw [ArgsRel, InvImage, Args.toMultiset, Multiset.pair_comm] at ih ⊢ exact ih lemma P3_of_ih (hy : Numeric y) (ihyx : IH1 y x) (i k l) : P3 (x.moveLeft i) x (y.moveLeft k) (-(-y).moveLeft l) := P3_comm.2 <\| ((ihyx (IsOption.moveLeft k) (isOption_neg.1 <\| .moveLeft l) <\| Or.inl rfl).2 (by rw [moveLeft_neg, neg_neg]; apply hy.left_lt_right)).1 i lemma P24_of_ih (ihxy : IH1 x y) (i j) : P24 (x.moveLeft i) (x.moveLeft j) y := ihxy (IsOption.moveLeft i) (IsOption.moveLeft j) (Or.inl rfl) section lemma mulOption_lt_of_lt (hy : y.Numeric) (ihxy : IH1 x y) (ihyx : IH1 y x) (i j k l) (h : x.moveLeft i < x.moveLeft j) : (⟦mulOption x y i k⟧ : Game) < -⟦mulOption x (-y) j l⟧ := mulOption_lt_iff_P1.2 <\| P1_of_lt (P3_of_ih hy ihyx j k l) <\| ((P24_of_ih ihxy i j).2 h).1 k lemma mulOption_lt (hx : x.Numeric) (hy : y.Numeric) (ihxy : IH1 x y) (ihyx : IH1 y x) (i j k l) : (⟦mulOption x y i k⟧ : Game) < -⟦mulOption x (-y) j l⟧ := by obtain (h\|h\|h) := lt_or_equiv_or_gt (hx.moveLeft i) (hx.moveLeft j) · exact mulOption_lt_of_lt hy ihxy ihyx i j k l h · have ml := @IsOption.moveLeft exact mulOption_lt_iff_P1.2 (P1_of_eq h (P24_of_ih ihxy i j).1 (ihxy (ml i) (ml j) <\| Or.inr <\| isOption_neg.1 <\| ml l).1 <\| P3_of_ih hy ihyx i k l) · rw [mulOption_neg_neg, lt_neg] exact mulOption_lt_of_lt hy.neg (ih1_neg_right ihxy) (ih1_neg_left ihyx) j i l _ h end /-- P1 follows from the induction hypothesis. -/ theorem P1_of_ih (ih : ∀ a, ArgsRel a (Args.P1 x y) → P124 a) (hx : x.Numeric) (hy : y.Numeric) : (x * y).Numeric := by have ihxy := ih1 ih have ihyx := ih1_swap ih have ihxyn := ih1_neg_left (ih1_neg_right ihxy) have ihyxn := ih1_neg_left (ih1_neg_right ihyx) refine numeric_def.mpr ⟨?_, ?_, ?_⟩ · simp_rw [lt_iff_game_lt] intro i rw [rightMoves_mul_iff] constructor <;> (intro j l; revert i; rw [leftMoves_mul_iff (_ > ·)]; constructor <;> intro i k) · apply mulOption_lt hx hy ihxy ihyx · simp_rw [← mulOption_symm (-y), mulOption_neg_neg x] apply mulOption_lt hy.neg hx.neg ihyxn ihxyn · simp only [← mulOption_symm y] apply mulOption_lt hy hx ihyx ihxy · rw [mulOption_neg_neg y] apply mulOption_lt hx.neg hy.neg ihxyn ihyxn all_goals cases x; cases y rintro (⟨i,j⟩\|⟨i,j⟩) <;> refine ((numeric_option_mul ih ?_).add <\| numeric_mul_option ih ?_).sub (numeric_option_mul_option ih ?_ ?_) <;> solve_by_elim [IsOption.mk_left, IsOption.mk_right] /-- A specialized induction hypothesis used to prove P2 and P4. -/ def IH24 (x₁ x₂ y : PGame) : Prop := ∀ ⦃z⦄, (IsOption z x₁ → P24 z x₂ y) ∧ (IsOption z x₂ → P24 x₁ z y) ∧ (IsOption z y → P24 x₁ x₂ z) /-- A specialized induction hypothesis used to prove P4. -/ def IH4 (x₁ x₂ y : PGame) : Prop := ∀ ⦃z w⦄, IsOption w y → (IsOption z x₁ → P2 z x₂ w) ∧ (IsOption z x₂ → P2 x₁ z w) /-! #### Specialize `ih'` to obtain specialized induction hypotheses for P2 and P4 -/ lemma ih₁₂ (ih' : ∀ a, ArgsRel a (Args.P24 x₁ x₂ y) → P124 a) : IH24 x₁ x₂ y := by rw [IH24] refine fun z ↦ ⟨?_, ?_, ?_⟩ <;> refine fun h ↦ ih' (Args.P24 _ _ _) (TransGen.single ?_) · exact (cutExpand_add_right {y}).2 (cutExpand_pair_left h) · exact (cutExpand_add_left {x₁}).2 (cutExpand_pair_left h) · exact (cutExpand_add_left {x₁}).2 (cutExpand_pair_right h) lemma ih₂₁ (ih' : ∀ a, ArgsRel a (Args.P24 x₁ x₂ y) → P124 a) : IH24 x₂ x₁ y := ih₁₂ <\| by simp_rw [ArgsRel, InvImage, Args.toMultiset, Multiset.pair_comm] at ih' ⊢ suffices {x₁, y, x₂} = {x₂, y, x₁} by rwa [← this] dsimp only [Multiset.insert_eq_cons, ← Multiset.singleton_add] at ih' ⊢ abel lemma ih4 (ih' : ∀ a, ArgsRel a (Args.P24 x₁ x₂ y) → P124 a) : IH4 x₁ x₂ y := by refine fun z w h ↦ ⟨?_, ?_⟩ all_goals intro h' apply (ih' (Args.P24 _ _ _) <\| (TransGen.single _).tail <\| (cutExpand_add_left {x₁}).2 <\| cutExpand_pair_right h).1 try exact (cutExpand_add_right {w}).2 <\| cutExpand_pair_left h' try exact (cutExpand_add_right {w}).2 <\| cutExpand_pair_right h' lemma numeric_of_ih (ih' : ∀ a, ArgsRel a (Args.P24 x₁ x₂ y) → P124 a) : (x₁ * y).Numeric ∧ (x₂ * y).Numeric := by constructor <;> refine ih' (Args.P1 _ _) (TransGen.single ?_) · exact (cutExpand_add_right {y}).2 <\| (cutExpand_add_left {x₁}).2 cutExpand_zero · exact (cutExpand_add_right {x₂, y}).2 cutExpand_zero /-- Symmetry properties of `IH24`. -/ lemma ih24_neg : IH24 x₁ x₂ y → IH24 (-x₂) (-x₁) y ∧ IH24 x₁ x₂ (-y) := by simp_rw [IH24, ← P24_neg_right, isOption_neg] refine fun h ↦ ⟨fun z ↦ ⟨?_, ?_, ?_⟩, fun z ↦ ⟨(@h z).1, (@h z).2.1, P24_neg_right.2 ∘ (@h <\| -z).2.2⟩⟩ all_goals rw [P24_neg_left] simp only [neg_neg] first \| exact (@h <\| -z).2.1 \| exact (@h <\| -z).1 \| exact (@h z).2.2 /-- Symmetry properties of `IH4`. -/ lemma ih4_neg : IH4 x₁ x₂ y → IH4 (-x₂) (-x₁) y ∧ IH4 x₁ x₂ (-y) := by simp_rw [IH4, isOption_neg] refine fun h ↦ ⟨fun z w h' ↦ ?_, fun z w h' ↦ ?_⟩ · convert (h h').symm using 2 <;> rw [P2_neg_left, neg_neg] · convert h h' using 2 <;> rw [P2_neg_right] lemma mulOption_lt_mul_of_equiv (hn : x₁.Numeric) (h : IH24 x₁ x₂ y) (he : x₁ ≈ x₂) (i j) :	⟦mulOption x₁ y i j⟧ < (⟦x₂ * y⟧ : Game) := by convert sub_lt_iff_lt_add'.2 ((((@h _).1 <\| IsOption.moveLeft i).2 _).1 j) using 1 · rw [← ((@h _).2.2 <\| IsOption.moveLeft j).1 he] rfl · rw [← lt_congr_right he] apply hn.moveLeft_lt	Mathlib/SetTheory/Surreal/Multiplication.lean	340	346
/- 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.LinearAlgebra.LinearPMap import Mathlib.Topology.Algebra.Module.Basic /-! # Partially defined linear operators over topological vector spaces We define basic notions of partially defined linear operators, which we call unbounded operators for short. In this file we prove all elementary properties of unbounded operators that do not assume that the underlying spaces are normed. ## Main definitions * `LinearPMap.IsClosed`: An unbounded operator is closed iff its graph is closed. * `LinearPMap.IsClosable`: An unbounded operator is closable iff the closure of its graph is a graph. * `LinearPMap.closure`: For a closable unbounded operator `f : LinearPMap R E F` the closure is the smallest closed extension of `f`. If `f` is not closable, then `f.closure` is defined as `f`. * `LinearPMap.HasCore`: a submodule contained in the domain is a core if restricting to the core does not lose information about the unbounded operator. ## Main statements * `LinearPMap.closable_iff_exists_closed_extension`: an unbounded operator is closable iff it has a closed extension. * `LinearPMap.closable.existsUnique`: there exists a unique closure * `LinearPMap.closureHasCore`: the domain of `f` is a core of its closure ## References * [J. Weidmann, Linear Operators in Hilbert Spaces][weidmann_linear] ## Tags Unbounded operators, closed operators -/ open Topology variable {R E F : Type*} variable [CommRing R] [AddCommGroup E] [AddCommGroup F] variable [Module R E] [Module R F] variable [TopologicalSpace E] [TopologicalSpace F] namespace LinearPMap /-! ### Closed and closable operators -/ /-- An unbounded operator is closed iff its graph is closed. -/ def IsClosed (f : E →ₗ.[R] F) : Prop := _root_.IsClosed (f.graph : Set (E × F)) variable [ContinuousAdd E] [ContinuousAdd F] variable [TopologicalSpace R] [ContinuousSMul R E] [ContinuousSMul R F] /-- An unbounded operator is closable iff the closure of its graph is a graph. -/ def IsClosable (f : E →ₗ.[R] F) : Prop := ∃ f' : LinearPMap R E F, f.graph.topologicalClosure = f'.graph /-- A closed operator is trivially closable. -/ theorem IsClosed.isClosable {f : E →ₗ.[R] F} (hf : f.IsClosed) : f.IsClosable := ⟨f, hf.submodule_topologicalClosure_eq⟩ /-- If `g` has a closable extension `f`, then `g` itself is closable. -/ theorem IsClosable.leIsClosable {f g : E →ₗ.[R] F} (hf : f.IsClosable) (hfg : g ≤ f) : g.IsClosable := by obtain ⟨f', hf⟩ := hf have : g.graph.topologicalClosure ≤ f'.graph := by rw [← hf] exact Submodule.topologicalClosure_mono (le_graph_of_le hfg) use g.graph.topologicalClosure.toLinearPMap rw [Submodule.toLinearPMap_graph_eq] exact fun _ hx hx' => f'.graph_fst_eq_zero_snd (this hx) hx' /-- The closure is unique. -/ theorem IsClosable.existsUnique {f : E →ₗ.[R] F} (hf : f.IsClosable) : ∃! f' : E →ₗ.[R] F, f.graph.topologicalClosure = f'.graph := by refine existsUnique_of_exists_of_unique hf fun _ _ hy₁ hy₂ => eq_of_eq_graph ?_ rw [← hy₁, ← hy₂] open Classical in /-- If `f` is closable, then `f.closure` is the closure. Otherwise it is defined as `f.closure = f`. -/ noncomputable def closure (f : E →ₗ.[R] F) : E →ₗ.[R] F := if hf : f.IsClosable then hf.choose else f theorem closure_def {f : E →ₗ.[R] F} (hf : f.IsClosable) : f.closure = hf.choose := by simp [closure, hf] theorem closure_def' {f : E →ₗ.[R] F} (hf : ¬f.IsClosable) : f.closure = f := by simp [closure, hf] /-- The closure (as a submodule) of the graph is equal to the graph of the closure (as a `LinearPMap`). -/ theorem IsClosable.graph_closure_eq_closure_graph {f : E →ₗ.[R] F} (hf : f.IsClosable) : f.graph.topologicalClosure = f.closure.graph := by rw [closure_def hf] exact hf.choose_spec /-- A `LinearPMap` is contained in its closure. -/ theorem le_closure (f : E →ₗ.[R] F) : f ≤ f.closure := by by_cases hf : f.IsClosable · refine le_of_le_graph ?_ rw [← hf.graph_closure_eq_closure_graph] exact (graph f).le_topologicalClosure rw [closure_def' hf] theorem IsClosable.closure_mono {f g : E →ₗ.[R] F} (hg : g.IsClosable) (h : f ≤ g) : f.closure ≤ g.closure := by refine le_of_le_graph ?_ rw [← (hg.leIsClosable h).graph_closure_eq_closure_graph] rw [← hg.graph_closure_eq_closure_graph] exact Submodule.topologicalClosure_mono (le_graph_of_le h) /-- If `f` is closable, then the closure is closed. -/ theorem IsClosable.closure_isClosed {f : E →ₗ.[R] F} (hf : f.IsClosable) : f.closure.IsClosed := by rw [IsClosed, ← hf.graph_closure_eq_closure_graph] exact f.graph.isClosed_topologicalClosure /-- If `f` is closable, then the closure is closable. -/ theorem IsClosable.closureIsClosable {f : E →ₗ.[R] F} (hf : f.IsClosable) : f.closure.IsClosable := hf.closure_isClosed.isClosable theorem isClosable_iff_exists_closed_extension {f : E →ₗ.[R] F} : f.IsClosable ↔ ∃ g : E →ₗ.[R] F, g.IsClosed ∧ f ≤ g := ⟨fun h => ⟨f.closure, h.closure_isClosed, f.le_closure⟩, fun ⟨_, hg, h⟩ => hg.isClosable.leIsClosable h⟩ /-! ### The core of a linear operator -/	/-- A submodule `S` is a core of `f` if the closure of the restriction of `f` to `S` is `f`. -/	Mathlib/Topology/Algebra/Module/LinearPMap.lean	136	138
/- Copyright (c) 2022 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Analysis.SpecialFunctions.Gaussian.GaussianIntegral import Mathlib.Analysis.Complex.CauchyIntegral import Mathlib.MeasureTheory.Integral.Pi import Mathlib.Analysis.Fourier.FourierTransform /-! # Fourier transform of the Gaussian We prove that the Fourier transform of the Gaussian function is another Gaussian: * `integral_cexp_quadratic`: general formula for `∫ (x : ℝ), exp (b * x ^ 2 + c * x + d)` * `fourierIntegral_gaussian`: for all complex `b` and `t` with `0 < re b`, we have `∫ x:ℝ, exp (I * t * x) * exp (-b * x^2) = (π / b) ^ (1 / 2) * exp (-t ^ 2 / (4 * b))`. * `fourierIntegral_gaussian_pi`: a variant with `b` and `t` scaled to give a more symmetric statement, and formulated in terms of the Fourier transform operator `𝓕`. We also give versions of these formulas in finite-dimensional inner product spaces, see `integral_cexp_neg_mul_sq_norm_add` and `fourierIntegral_gaussian_innerProductSpace`. -/ /-! ## Fourier integral of Gaussian functions -/ open Real Set MeasureTheory Filter Asymptotics intervalIntegral open scoped Real Topology FourierTransform RealInnerProductSpace open Complex hiding exp continuous_exp abs_of_nonneg sq_abs noncomputable section namespace GaussianFourier variable {b : ℂ} /-- The integral of the Gaussian function over the vertical edges of a rectangle with vertices at `(±T, 0)` and `(±T, c)`. -/ def verticalIntegral (b : ℂ) (c T : ℝ) : ℂ := ∫ y : ℝ in (0 : ℝ)..c, I * (cexp (-b * (T + y * I) ^ 2) - cexp (-b * (T - y * I) ^ 2)) /-- Explicit formula for the norm of the Gaussian function along the vertical edges. -/ theorem norm_cexp_neg_mul_sq_add_mul_I (b : ℂ) (c T : ℝ) : ‖cexp (-b * (T + c * I) ^ 2)‖ = exp (-(b.re * T ^ 2 - 2 * b.im * c * T - b.re * c ^ 2)) := by rw [Complex.norm_exp, neg_mul, neg_re, ← re_add_im b] simp only [sq, re_add_im, mul_re, mul_im, add_re, add_im, ofReal_re, ofReal_im, I_re, I_im] ring_nf theorem norm_cexp_neg_mul_sq_add_mul_I' (hb : b.re ≠ 0) (c T : ℝ) : ‖cexp (-b * (T + c * I) ^ 2)‖ = exp (-(b.re * (T - b.im * c / b.re) ^ 2 - c ^ 2 * (b.im ^ 2 / b.re + b.re))) := by	have : b.re * T ^ 2 - 2 * b.im * c * T - b.re * c ^ 2 = b.re * (T - b.im * c / b.re) ^ 2 - c ^ 2 * (b.im ^ 2 / b.re + b.re) := by field_simp; ring rw [norm_cexp_neg_mul_sq_add_mul_I, this] theorem verticalIntegral_norm_le (hb : 0 < b.re) (c : ℝ) {T : ℝ} (hT : 0 ≤ T) : ‖verticalIntegral b c T‖ ≤	Mathlib/Analysis/SpecialFunctions/Gaussian/FourierTransform.lean	59	66
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou, Johan Commelin -/ import Mathlib.Algebra.Ring.Int.Parity import Mathlib.Algebra.Ring.Int.Units import Mathlib.Data.ZMod.IntUnitsPower /-! # Integer powers of (-1) This file defines the map `negOnePow : ℤ → ℤˣ` which sends `n` to `(-1 : ℤˣ) ^ n`. The definition of `negOnePow` and some lemmas first appeared in contributions by Johan Commelin to the Liquid Tensor Experiment. -/ assert_not_exists Field assert_not_exists TwoSidedIdeal namespace Int /-- The map `ℤ → ℤˣ` which sends `n` to `(-1 : ℤˣ) ^ n`. -/ def negOnePow (n : ℤ) : ℤˣ := (-1 : ℤˣ) ^ n lemma negOnePow_def (n : ℤ) : n.negOnePow = (-1 : ℤˣ) ^ n := rfl lemma negOnePow_add (n₁ n₂ : ℤ) : (n₁ + n₂).negOnePow = n₁.negOnePow * n₂.negOnePow := zpow_add _ _ _ @[simp] lemma negOnePow_zero : negOnePow 0 = 1 := rfl @[simp] lemma negOnePow_one : negOnePow 1 = -1 := rfl lemma negOnePow_succ (n : ℤ) : (n + 1).negOnePow = - n.negOnePow := by rw [negOnePow_add, negOnePow_one, mul_neg, mul_one] lemma negOnePow_even (n : ℤ) (hn : Even n) : n.negOnePow = 1 := by obtain ⟨k, rfl⟩ := hn rw [negOnePow_add, units_mul_self] @[simp] lemma negOnePow_two_mul (n : ℤ) : (2 * n).negOnePow = 1 := negOnePow_even _ ⟨n, two_mul n⟩ lemma negOnePow_odd (n : ℤ) (hn : Odd n) : n.negOnePow = -1 := by obtain ⟨k, rfl⟩ := hn simp only [negOnePow_add, negOnePow_two_mul, negOnePow_one, mul_neg, mul_one] @[simp] lemma negOnePow_two_mul_add_one (n : ℤ) : (2 * n + 1).negOnePow = -1 := negOnePow_odd _ ⟨n, rfl⟩ lemma negOnePow_eq_one_iff (n : ℤ) : n.negOnePow = 1 ↔ Even n := by constructor · intro h rw [← Int.not_odd_iff_even] intro h'	simp only [negOnePow_odd _ h'] at h contradiction · exact negOnePow_even n lemma negOnePow_eq_neg_one_iff (n : ℤ) : n.negOnePow = -1 ↔ Odd n := by constructor · intro h rw [← Int.not_even_iff_odd]	Mathlib/Algebra/Ring/NegOnePow.lean	64	71
/- 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.Algebra.Order.Ring.Nat import Mathlib.Logic.Encodable.Pi import Mathlib.Logic.Function.Iterate /-! # The primitive recursive functions The primitive recursive functions are the least collection of functions `ℕ → ℕ` which are closed under projections (using the `pair` pairing function), composition, zero, successor, and primitive recursion (i.e. `Nat.rec` where the motive is `C n := ℕ`). We can extend this definition to a large class of basic types by using canonical encodings of types as natural numbers (Gödel numbering), which we implement through the type class `Encodable`. (More precisely, we need that the composition of encode with decode yields a primitive recursive function, so we have the `Primcodable` type class for this.) In the above, the pairing function is primitive recursive by definition. This deviates from the textbook definition of primitive recursive functions, which instead work with `n`-ary functions. We formalize the textbook definition in `Nat.Primrec'`. `Nat.Primrec'.prim_iff` then proves it is equivalent to our chosen formulation. For more discussionn of this and other design choices in this formalization, see [carneiro2019]. ## Main definitions - `Nat.Primrec f`: `f` is primitive recursive, for functions `f : ℕ → ℕ` - `Primrec f`: `f` is primitive recursive, for functions between `Primcodable` types - `Primcodable α`: well-behaved encoding of `α` into `ℕ`, i.e. one such that roundtripping through the encoding functions adds no computational power ## References * [Mario Carneiro, Formalizing computability theory via partial recursive functions][carneiro2019] -/ open List (Vector) open Denumerable Encodable Function namespace Nat /-- Calls the given function on a pair of entries `n`, encoded via the pairing function. -/ @[simp, reducible] def unpaired {α} (f : ℕ → ℕ → α) (n : ℕ) : α := f n.unpair.1 n.unpair.2 /-- The primitive recursive functions `ℕ → ℕ`. -/ protected inductive Primrec : (ℕ → ℕ) → Prop \| zero : Nat.Primrec fun _ => 0 \| protected succ : Nat.Primrec succ \| left : Nat.Primrec fun n => n.unpair.1 \| right : Nat.Primrec fun n => n.unpair.2 \| pair {f g} : Nat.Primrec f → Nat.Primrec g → Nat.Primrec fun n => pair (f n) (g n) \| comp {f g} : Nat.Primrec f → Nat.Primrec g → Nat.Primrec fun n => f (g n) \| prec {f g} : Nat.Primrec f → Nat.Primrec g → Nat.Primrec (unpaired fun z n => n.rec (f z) fun y IH => g <\| pair z <\| pair y IH) namespace Primrec theorem of_eq {f g : ℕ → ℕ} (hf : Nat.Primrec f) (H : ∀ n, f n = g n) : Nat.Primrec g := (funext H : f = g) ▸ hf theorem const : ∀ n : ℕ, Nat.Primrec fun _ => n \| 0 => zero \| n + 1 => Primrec.succ.comp (const n) protected theorem id : Nat.Primrec id := (left.pair right).of_eq fun n => by simp theorem prec1 {f} (m : ℕ) (hf : Nat.Primrec f) : Nat.Primrec fun n => n.rec m fun y IH => f <\| Nat.pair y IH := ((prec (const m) (hf.comp right)).comp (zero.pair Primrec.id)).of_eq fun n => by simp theorem casesOn1 {f} (m : ℕ) (hf : Nat.Primrec f) : Nat.Primrec (Nat.casesOn · m f) := (prec1 m (hf.comp left)).of_eq <\| by simp -- Porting note: `Nat.Primrec.casesOn` is already declared as a recursor. theorem casesOn' {f g} (hf : Nat.Primrec f) (hg : Nat.Primrec g) : Nat.Primrec (unpaired fun z n => n.casesOn (f z) fun y => g <\| Nat.pair z y) := (prec hf (hg.comp (pair left (left.comp right)))).of_eq fun n => by simp protected theorem swap : Nat.Primrec (unpaired (swap Nat.pair)) := (pair right left).of_eq fun n => by simp theorem swap' {f} (hf : Nat.Primrec (unpaired f)) : Nat.Primrec (unpaired (swap f)) := (hf.comp .swap).of_eq fun n => by simp theorem pred : Nat.Primrec pred := (casesOn1 0 Primrec.id).of_eq fun n => by cases n <;> simp [] theorem add : Nat.Primrec (unpaired (· + ·)) := (prec .id ((Primrec.succ.comp right).comp right)).of_eq fun p => by simp; induction p.unpair.2 <;> simp [, Nat.add_assoc] theorem sub : Nat.Primrec (unpaired (· - ·)) := (prec .id ((pred.comp right).comp right)).of_eq fun p => by simp; induction p.unpair.2 <;> simp [, Nat.sub_add_eq] theorem mul : Nat.Primrec (unpaired (· ·)) := (prec zero (add.comp (pair left (right.comp right)))).of_eq fun p => by simp; induction p.unpair.2 <;> simp [, mul_succ, add_comm _ (unpair p).fst] theorem pow : Nat.Primrec (unpaired (· ^ ·)) := (prec (const 1) (mul.comp (pair (right.comp right) left))).of_eq fun p => by simp; induction p.unpair.2 <;> simp [, Nat.pow_succ] end Primrec end Nat /-- A `Primcodable` type is, essentially, an `Encodable` type for which the encode/decode functions are primitive recursive. However, such a definition is circular. Instead, we ask that the composition of `decode : ℕ → Option α` with `encode : Option α → ℕ` is primitive recursive. Said composition is the identity function, restricted to the image of `encode`. Thus, in a way, the added requirement ensures that no predicates can be smuggled in through a cunning choice of the subset of `ℕ` into which the type is encoded. -/ class Primcodable (α : Type) extends Encodable α where -- Porting note: was `prim [] `. -- This means that `prim` does not take the type explicitly in Lean 4 prim : Nat.Primrec fun n => Encodable.encode (decode n) namespace Primcodable open Nat.Primrec instance (priority := 10) ofDenumerable (α) [Denumerable α] : Primcodable α := ⟨Nat.Primrec.succ.of_eq <\| by simp⟩ /-- Builds a `Primcodable` instance from an equivalence to a `Primcodable` type. -/ def ofEquiv (α) {β} [Primcodable α] (e : β ≃ α) : Primcodable β := { __ := Encodable.ofEquiv α e prim := (@Primcodable.prim α _).of_eq fun n => by rw [decode_ofEquiv] cases (@decode α _ n) <;> simp [encode_ofEquiv] } instance empty : Primcodable Empty := ⟨zero⟩ instance unit : Primcodable PUnit := ⟨(casesOn1 1 zero).of_eq fun n => by cases n <;> simp⟩ instance option {α : Type} [h : Primcodable α] : Primcodable (Option α) := ⟨(casesOn1 1 ((casesOn1 0 (.comp .succ .succ)).comp (@Primcodable.prim α _))).of_eq fun n => by cases n with \| zero => rfl \| succ n => rw [decode_option_succ] cases H : @decode α _ n <;> simp [H]⟩ instance bool : Primcodable Bool := ⟨(casesOn1 1 (casesOn1 2 zero)).of_eq fun n => match n with \| 0 => rfl \| 1 => rfl \| (n + 2) => by rw [decode_ge_two] <;> simp⟩ end Primcodable /-- `Primrec f` means `f` is primitive recursive (after encoding its input and output as natural numbers). -/ def Primrec {α β} [Primcodable α] [Primcodable β] (f : α → β) : Prop := Nat.Primrec fun n => encode ((@decode α _ n).map f) namespace Primrec variable {α : Type} {β : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable σ] open Nat.Primrec protected theorem encode : Primrec (@encode α _) := (@Primcodable.prim α _).of_eq fun n => by cases @decode α _ n <;> rfl protected theorem decode : Primrec (@decode α _) := Nat.Primrec.succ.comp (@Primcodable.prim α _) theorem dom_denumerable {α β} [Denumerable α] [Primcodable β] {f : α → β} : Primrec f ↔ Nat.Primrec fun n => encode (f (ofNat α n)) := ⟨fun h => (pred.comp h).of_eq fun n => by simp, fun h => (Nat.Primrec.succ.comp h).of_eq fun n => by simp⟩ theorem nat_iff {f : ℕ → ℕ} : Primrec f ↔ Nat.Primrec f := dom_denumerable theorem encdec : Primrec fun n => encode (@decode α _ n) := nat_iff.2 Primcodable.prim theorem option_some : Primrec (@some α) := ((casesOn1 0 (Nat.Primrec.succ.comp .succ)).comp (@Primcodable.prim α _)).of_eq fun n => by cases @decode α _ n <;> simp theorem of_eq {f g : α → σ} (hf : Primrec f) (H : ∀ n, f n = g n) : Primrec g := (funext H : f = g) ▸ hf theorem const (x : σ) : Primrec fun _ : α => x := ((casesOn1 0 (.const (encode x).succ)).comp (@Primcodable.prim α _)).of_eq fun n => by cases @decode α _ n <;> rfl protected theorem id : Primrec (@id α) := (@Primcodable.prim α).of_eq <\| by simp theorem comp {f : β → σ} {g : α → β} (hf : Primrec f) (hg : Primrec g) : Primrec fun a => f (g a) := ((casesOn1 0 (.comp hf (pred.comp hg))).comp (@Primcodable.prim α _)).of_eq fun n => by cases @decode α _ n <;> simp [encodek] theorem succ : Primrec Nat.succ := nat_iff.2 Nat.Primrec.succ theorem pred : Primrec Nat.pred := nat_iff.2 Nat.Primrec.pred theorem encode_iff {f : α → σ} : (Primrec fun a => encode (f a)) ↔ Primrec f := ⟨fun h => Nat.Primrec.of_eq h fun n => by cases @decode α _ n <;> rfl, Primrec.encode.comp⟩ theorem ofNat_iff {α β} [Denumerable α] [Primcodable β] {f : α → β} : Primrec f ↔ Primrec fun n => f (ofNat α n) := dom_denumerable.trans <\| nat_iff.symm.trans encode_iff protected theorem ofNat (α) [Denumerable α] : Primrec (ofNat α) := ofNat_iff.1 Primrec.id theorem option_some_iff {f : α → σ} : (Primrec fun a => some (f a)) ↔ Primrec f := ⟨fun h => encode_iff.1 <\| pred.comp <\| encode_iff.2 h, option_some.comp⟩ theorem of_equiv {β} {e : β ≃ α} : haveI := Primcodable.ofEquiv α e Primrec e := letI : Primcodable β := Primcodable.ofEquiv α e encode_iff.1 Primrec.encode theorem of_equiv_symm {β} {e : β ≃ α} : haveI := Primcodable.ofEquiv α e Primrec e.symm := letI := Primcodable.ofEquiv α e encode_iff.1 (show Primrec fun a => encode (e (e.symm a)) by simp [Primrec.encode]) theorem of_equiv_iff {β} (e : β ≃ α) {f : σ → β} : haveI := Primcodable.ofEquiv α e (Primrec fun a => e (f a)) ↔ Primrec f := letI := Primcodable.ofEquiv α e ⟨fun h => (of_equiv_symm.comp h).of_eq fun a => by simp, of_equiv.comp⟩ theorem of_equiv_symm_iff {β} (e : β ≃ α) {f : σ → α} : haveI := Primcodable.ofEquiv α e (Primrec fun a => e.symm (f a)) ↔ Primrec f := letI := Primcodable.ofEquiv α e ⟨fun h => (of_equiv.comp h).of_eq fun a => by simp, of_equiv_symm.comp⟩ end Primrec namespace Primcodable open Nat.Primrec instance prod {α β} [Primcodable α] [Primcodable β] : Primcodable (α × β) := ⟨((casesOn' zero ((casesOn' zero .succ).comp (pair right ((@Primcodable.prim β).comp left)))).comp (pair right ((@Primcodable.prim α).comp left))).of_eq fun n => by simp only [Nat.unpaired, Nat.unpair_pair, decode_prod_val] cases @decode α _ n.unpair.1; · simp cases @decode β _ n.unpair.2 <;> simp⟩ end Primcodable namespace Primrec variable {α : Type} [Primcodable α] open Nat.Primrec theorem fst {α β} [Primcodable α] [Primcodable β] : Primrec (@Prod.fst α β) := ((casesOn' zero ((casesOn' zero (Nat.Primrec.succ.comp left)).comp (pair right ((@Primcodable.prim β).comp left)))).comp (pair right ((@Primcodable.prim α).comp left))).of_eq fun n => by simp only [Nat.unpaired, Nat.unpair_pair, decode_prod_val] cases @decode α _ n.unpair.1 <;> simp cases @decode β _ n.unpair.2 <;> simp theorem snd {α β} [Primcodable α] [Primcodable β] : Primrec (@Prod.snd α β) := ((casesOn' zero ((casesOn' zero (Nat.Primrec.succ.comp right)).comp (pair right ((@Primcodable.prim β).comp left)))).comp (pair right ((@Primcodable.prim α).comp left))).of_eq fun n => by simp only [Nat.unpaired, Nat.unpair_pair, decode_prod_val] cases @decode α _ n.unpair.1 <;> simp cases @decode β _ n.unpair.2 <;> simp theorem pair {α β γ} [Primcodable α] [Primcodable β] [Primcodable γ] {f : α → β} {g : α → γ} (hf : Primrec f) (hg : Primrec g) : Primrec fun a => (f a, g a) := ((casesOn1 0 (Nat.Primrec.succ.comp <\| .pair (Nat.Primrec.pred.comp hf) (Nat.Primrec.pred.comp hg))).comp (@Primcodable.prim α _)).of_eq fun n => by cases @decode α _ n <;> simp [encodek] theorem unpair : Primrec Nat.unpair := (pair (nat_iff.2 .left) (nat_iff.2 .right)).of_eq fun n => by simp theorem list_getElem?₁ : ∀ l : List α, Primrec (l[·]? : ℕ → Option α) \| [] => dom_denumerable.2 zero \| a :: l => dom_denumerable.2 <\| (casesOn1 (encode a).succ <\| dom_denumerable.1 <\| list_getElem?₁ l).of_eq fun n => by cases n <;> simp @[deprecated (since := "2025-02-14")] alias list_get?₁ := list_getElem?₁ end Primrec /-- `Primrec₂ f` means `f` is a binary primitive recursive function. This is technically unnecessary since we can always curry all the arguments together, but there are enough natural two-arg functions that it is convenient to express this directly. -/ def Primrec₂ {α β σ} [Primcodable α] [Primcodable β] [Primcodable σ] (f : α → β → σ) := Primrec fun p : α × β => f p.1 p.2 /-- `PrimrecPred p` means `p : α → Prop` is a (decidable) primitive recursive predicate, which is to say that `decide ∘ p : α → Bool` is primitive recursive. -/ def PrimrecPred {α} [Primcodable α] (p : α → Prop) [DecidablePred p] := Primrec fun a => decide (p a) /-- `PrimrecRel p` means `p : α → β → Prop` is a (decidable) primitive recursive relation, which is to say that `decide ∘ p : α → β → Bool` is primitive recursive. -/ def PrimrecRel {α β} [Primcodable α] [Primcodable β] (s : α → β → Prop) [∀ a b, Decidable (s a b)] := Primrec₂ fun a b => decide (s a b) namespace Primrec₂ variable {α : Type} {β : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable σ] theorem mk {f : α → β → σ} (hf : Primrec fun p : α × β => f p.1 p.2) : Primrec₂ f := hf theorem of_eq {f g : α → β → σ} (hg : Primrec₂ f) (H : ∀ a b, f a b = g a b) : Primrec₂ g := (by funext a b; apply H : f = g) ▸ hg theorem const (x : σ) : Primrec₂ fun (_ : α) (_ : β) => x := Primrec.const _ protected theorem pair : Primrec₂ (@Prod.mk α β) := Primrec.pair .fst .snd theorem left : Primrec₂ fun (a : α) (_ : β) => a := .fst theorem right : Primrec₂ fun (_ : α) (b : β) => b := .snd theorem natPair : Primrec₂ Nat.pair := by simp [Primrec₂, Primrec]; constructor theorem unpaired {f : ℕ → ℕ → α} : Primrec (Nat.unpaired f) ↔ Primrec₂ f := ⟨fun h => by simpa using h.comp natPair, fun h => h.comp Primrec.unpair⟩ theorem unpaired' {f : ℕ → ℕ → ℕ} : Nat.Primrec (Nat.unpaired f) ↔ Primrec₂ f := Primrec.nat_iff.symm.trans unpaired theorem encode_iff {f : α → β → σ} : (Primrec₂ fun a b => encode (f a b)) ↔ Primrec₂ f := Primrec.encode_iff theorem option_some_iff {f : α → β → σ} : (Primrec₂ fun a b => some (f a b)) ↔ Primrec₂ f := Primrec.option_some_iff theorem ofNat_iff {α β σ} [Denumerable α] [Denumerable β] [Primcodable σ] {f : α → β → σ} : Primrec₂ f ↔ Primrec₂ fun m n : ℕ => f (ofNat α m) (ofNat β n) := (Primrec.ofNat_iff.trans <\| by simp).trans unpaired theorem uncurry {f : α → β → σ} : Primrec (Function.uncurry f) ↔ Primrec₂ f := by rw [show Function.uncurry f = fun p : α × β => f p.1 p.2 from funext fun ⟨a, b⟩ => rfl]; rfl theorem curry {f : α × β → σ} : Primrec₂ (Function.curry f) ↔ Primrec f := by rw [← uncurry, Function.uncurry_curry] end Primrec₂ section Comp variable {α : Type} {β : Type} {γ : Type} {δ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable δ] [Primcodable σ] theorem Primrec.comp₂ {f : γ → σ} {g : α → β → γ} (hf : Primrec f) (hg : Primrec₂ g) : Primrec₂ fun a b => f (g a b) := hf.comp hg theorem Primrec₂.comp {f : β → γ → σ} {g : α → β} {h : α → γ} (hf : Primrec₂ f) (hg : Primrec g) (hh : Primrec h) : Primrec fun a => f (g a) (h a) := Primrec.comp hf (hg.pair hh) theorem Primrec₂.comp₂ {f : γ → δ → σ} {g : α → β → γ} {h : α → β → δ} (hf : Primrec₂ f) (hg : Primrec₂ g) (hh : Primrec₂ h) : Primrec₂ fun a b => f (g a b) (h a b) := hf.comp hg hh theorem PrimrecPred.comp {p : β → Prop} [DecidablePred p] {f : α → β} : PrimrecPred p → Primrec f → PrimrecPred fun a => p (f a) := Primrec.comp theorem PrimrecRel.comp {R : β → γ → Prop} [∀ a b, Decidable (R a b)] {f : α → β} {g : α → γ} : PrimrecRel R → Primrec f → Primrec g → PrimrecPred fun a => R (f a) (g a) := Primrec₂.comp theorem PrimrecRel.comp₂ {R : γ → δ → Prop} [∀ a b, Decidable (R a b)] {f : α → β → γ} {g : α → β → δ} : PrimrecRel R → Primrec₂ f → Primrec₂ g → PrimrecRel fun a b => R (f a b) (g a b) := PrimrecRel.comp end Comp theorem PrimrecPred.of_eq {α} [Primcodable α] {p q : α → Prop} [DecidablePred p] [DecidablePred q] (hp : PrimrecPred p) (H : ∀ a, p a ↔ q a) : PrimrecPred q := Primrec.of_eq hp fun a => Bool.decide_congr (H a) theorem PrimrecRel.of_eq {α β} [Primcodable α] [Primcodable β] {r s : α → β → Prop} [∀ a b, Decidable (r a b)] [∀ a b, Decidable (s a b)] (hr : PrimrecRel r) (H : ∀ a b, r a b ↔ s a b) : PrimrecRel s := Primrec₂.of_eq hr fun a b => Bool.decide_congr (H a b) namespace Primrec₂ variable {α : Type} {β : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable σ] open Nat.Primrec theorem swap {f : α → β → σ} (h : Primrec₂ f) : Primrec₂ (swap f) := h.comp₂ Primrec₂.right Primrec₂.left theorem nat_iff {f : α → β → σ} : Primrec₂ f ↔ Nat.Primrec (.unpaired fun m n => encode <\| (@decode α _ m).bind fun a => (@decode β _ n).map (f a)) := by have : ∀ (a : Option α) (b : Option β), Option.map (fun p : α × β => f p.1 p.2) (Option.bind a fun a : α => Option.map (Prod.mk a) b) = Option.bind a fun a => Option.map (f a) b := fun a b => by cases a <;> cases b <;> rfl simp [Primrec₂, Primrec, this] theorem nat_iff' {f : α → β → σ} : Primrec₂ f ↔ Primrec₂ fun m n : ℕ => (@decode α _ m).bind fun a => Option.map (f a) (@decode β _ n) := nat_iff.trans <\| unpaired'.trans encode_iff end Primrec₂ namespace Primrec variable {α : Type} {β : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable σ] theorem to₂ {f : α × β → σ} (hf : Primrec f) : Primrec₂ fun a b => f (a, b) := hf.of_eq fun _ => rfl theorem nat_rec {f : α → β} {g : α → ℕ × β → β} (hf : Primrec f) (hg : Primrec₂ g) : Primrec₂ fun a (n : ℕ) => n.rec (motive := fun _ => β) (f a) fun n IH => g a (n, IH) := Primrec₂.nat_iff.2 <\| ((Nat.Primrec.casesOn' .zero <\| (Nat.Primrec.prec hf <\| .comp hg <\| Nat.Primrec.left.pair <\| (Nat.Primrec.left.comp .right).pair <\| Nat.Primrec.pred.comp <\| Nat.Primrec.right.comp .right).comp <\| Nat.Primrec.right.pair <\| Nat.Primrec.right.comp Nat.Primrec.left).comp <\| Nat.Primrec.id.pair <\| (@Primcodable.prim α).comp Nat.Primrec.left).of_eq fun n => by simp only [Nat.unpaired, id_eq, Nat.unpair_pair, decode_prod_val, decode_nat, Option.some_bind, Option.map_map, Option.map_some'] rcases @decode α _ n.unpair.1 with - \| a; · rfl simp only [Nat.pred_eq_sub_one, encode_some, Nat.succ_eq_add_one, encodek, Option.map_some', Option.some_bind, Option.map_map] induction' n.unpair.2 with m <;> simp [encodek] simp [, encodek] theorem nat_rec' {f : α → ℕ} {g : α → β} {h : α → ℕ × β → β} (hf : Primrec f) (hg : Primrec g) (hh : Primrec₂ h) : Primrec fun a => (f a).rec (motive := fun _ => β) (g a) fun n IH => h a (n, IH) := (nat_rec hg hh).comp .id hf theorem nat_rec₁ {f : ℕ → α → α} (a : α) (hf : Primrec₂ f) : Primrec (Nat.rec a f) := nat_rec' .id (const a) <\| comp₂ hf Primrec₂.right theorem nat_casesOn' {f : α → β} {g : α → ℕ → β} (hf : Primrec f) (hg : Primrec₂ g) : Primrec₂ fun a (n : ℕ) => (n.casesOn (f a) (g a) : β) := nat_rec hf <\| hg.comp₂ Primrec₂.left <\| comp₂ fst Primrec₂.right theorem nat_casesOn {f : α → ℕ} {g : α → β} {h : α → ℕ → β} (hf : Primrec f) (hg : Primrec g) (hh : Primrec₂ h) : Primrec fun a => ((f a).casesOn (g a) (h a) : β) := (nat_casesOn' hg hh).comp .id hf theorem nat_casesOn₁ {f : ℕ → α} (a : α) (hf : Primrec f) : Primrec (fun (n : ℕ) => (n.casesOn a f : α)) := nat_casesOn .id (const a) (comp₂ hf .right) theorem nat_iterate {f : α → ℕ} {g : α → β} {h : α → β → β} (hf : Primrec f) (hg : Primrec g) (hh : Primrec₂ h) : Primrec fun a => (h a)^[f a] (g a) := (nat_rec' hf hg (hh.comp₂ Primrec₂.left <\| snd.comp₂ Primrec₂.right)).of_eq fun a => by induction f a <;> simp [, -Function.iterate_succ, Function.iterate_succ'] theorem option_casesOn {o : α → Option β} {f : α → σ} {g : α → β → σ} (ho : Primrec o) (hf : Primrec f) (hg : Primrec₂ g) : @Primrec _ σ _ _ fun a => Option.casesOn (o a) (f a) (g a) := encode_iff.1 <\| (nat_casesOn (encode_iff.2 ho) (encode_iff.2 hf) <\| pred.comp₂ <\| Primrec₂.encode_iff.2 <\| (Primrec₂.nat_iff'.1 hg).comp₂ ((@Primrec.encode α _).comp fst).to₂ Primrec₂.right).of_eq fun a => by rcases o a with - \| b <;> simp [encodek] theorem option_bind {f : α → Option β} {g : α → β → Option σ} (hf : Primrec f) (hg : Primrec₂ g) : Primrec fun a => (f a).bind (g a) := (option_casesOn hf (const none) hg).of_eq fun a => by cases f a <;> rfl theorem option_bind₁ {f : α → Option σ} (hf : Primrec f) : Primrec fun o => Option.bind o f := option_bind .id (hf.comp snd).to₂ theorem option_map {f : α → Option β} {g : α → β → σ} (hf : Primrec f) (hg : Primrec₂ g) : Primrec fun a => (f a).map (g a) := (option_bind hf (option_some.comp₂ hg)).of_eq fun x => by cases f x <;> rfl theorem option_map₁ {f : α → σ} (hf : Primrec f) : Primrec (Option.map f) := option_map .id (hf.comp snd).to₂ theorem option_iget [Inhabited α] : Primrec (@Option.iget α _) := (option_casesOn .id (const <\| @default α _) .right).of_eq fun o => by cases o <;> rfl theorem option_isSome : Primrec (@Option.isSome α) := (option_casesOn .id (const false) (const true).to₂).of_eq fun o => by cases o <;> rfl theorem option_getD : Primrec₂ (@Option.getD α) := Primrec.of_eq (option_casesOn Primrec₂.left Primrec₂.right .right) fun ⟨o, a⟩ => by cases o <;> rfl theorem bind_decode_iff {f : α → β → Option σ} : (Primrec₂ fun a n => (@decode β _ n).bind (f a)) ↔ Primrec₂ f := ⟨fun h => by simpa [encodek] using h.comp fst ((@Primrec.encode β _).comp snd), fun h => option_bind (Primrec.decode.comp snd) <\| h.comp (fst.comp fst) snd⟩ theorem map_decode_iff {f : α → β → σ} : (Primrec₂ fun a n => (@decode β _ n).map (f a)) ↔ Primrec₂ f := by simp only [Option.map_eq_bind] exact bind_decode_iff.trans Primrec₂.option_some_iff theorem nat_add : Primrec₂ ((· + ·) : ℕ → ℕ → ℕ) := Primrec₂.unpaired'.1 Nat.Primrec.add theorem nat_sub : Primrec₂ ((· - ·) : ℕ → ℕ → ℕ) := Primrec₂.unpaired'.1 Nat.Primrec.sub theorem nat_mul : Primrec₂ ((· * ·) : ℕ → ℕ → ℕ) := Primrec₂.unpaired'.1 Nat.Primrec.mul theorem cond {c : α → Bool} {f : α → σ} {g : α → σ} (hc : Primrec c) (hf : Primrec f) (hg : Primrec g) : Primrec fun a => bif (c a) then (f a) else (g a) := (nat_casesOn (encode_iff.2 hc) hg (hf.comp fst).to₂).of_eq fun a => by cases c a <;> rfl theorem ite {c : α → Prop} [DecidablePred c] {f : α → σ} {g : α → σ} (hc : PrimrecPred c) (hf : Primrec f) (hg : Primrec g) : Primrec fun a => if c a then f a else g a := by simpa [Bool.cond_decide] using cond hc hf hg theorem nat_le : PrimrecRel ((· ≤ ·) : ℕ → ℕ → Prop) := (nat_casesOn nat_sub (const true) (const false).to₂).of_eq fun p => by dsimp [swap] rcases e : p.1 - p.2 with - \| n · simp [Nat.sub_eq_zero_iff_le.1 e] · simp [not_le.2 (Nat.lt_of_sub_eq_succ e)] theorem nat_min : Primrec₂ (@min ℕ _) := ite nat_le fst snd theorem nat_max : Primrec₂ (@max ℕ _) := ite (nat_le.comp fst snd) snd fst theorem dom_bool (f : Bool → α) : Primrec f := (cond .id (const (f true)) (const (f false))).of_eq fun b => by cases b <;> rfl theorem dom_bool₂ (f : Bool → Bool → α) : Primrec₂ f := (cond fst ((dom_bool (f true)).comp snd) ((dom_bool (f false)).comp snd)).of_eq fun ⟨a, b⟩ => by cases a <;> rfl protected theorem not : Primrec not := dom_bool _ protected theorem and : Primrec₂ and := dom_bool₂ _ protected theorem or : Primrec₂ or := dom_bool₂ _ theorem _root_.PrimrecPred.not {p : α → Prop} [DecidablePred p] (hp : PrimrecPred p) : PrimrecPred fun a => ¬p a := (Primrec.not.comp hp).of_eq fun n => by simp theorem _root_.PrimrecPred.and {p q : α → Prop} [DecidablePred p] [DecidablePred q] (hp : PrimrecPred p) (hq : PrimrecPred q) : PrimrecPred fun a => p a ∧ q a := (Primrec.and.comp hp hq).of_eq fun n => by simp theorem _root_.PrimrecPred.or {p q : α → Prop} [DecidablePred p] [DecidablePred q] (hp : PrimrecPred p) (hq : PrimrecPred q) : PrimrecPred fun a => p a ∨ q a := (Primrec.or.comp hp hq).of_eq fun n => by simp protected theorem beq [DecidableEq α] : Primrec₂ (@BEq.beq α _) := have : PrimrecRel fun a b : ℕ => a = b := (PrimrecPred.and nat_le nat_le.swap).of_eq fun a => by simp [le_antisymm_iff] (this.comp₂ (Primrec.encode.comp₂ Primrec₂.left) (Primrec.encode.comp₂ Primrec₂.right)).of_eq fun _ _ => encode_injective.eq_iff protected theorem eq [DecidableEq α] : PrimrecRel (@Eq α) := Primrec.beq theorem nat_lt : PrimrecRel ((· < ·) : ℕ → ℕ → Prop) := (nat_le.comp snd fst).not.of_eq fun p => by simp theorem option_guard {p : α → β → Prop} [∀ a b, Decidable (p a b)] (hp : PrimrecRel p) {f : α → β} (hf : Primrec f) : Primrec fun a => Option.guard (p a) (f a) := ite (hp.comp Primrec.id hf) (option_some_iff.2 hf) (const none) theorem option_orElse : Primrec₂ ((· <\|> ·) : Option α → Option α → Option α) := (option_casesOn fst snd (fst.comp fst).to₂).of_eq fun ⟨o₁, o₂⟩ => by cases o₁ <;> cases o₂ <;> rfl protected theorem decode₂ : Primrec (decode₂ α) := option_bind .decode <\| option_guard (Primrec.beq.comp₂ (by exact encode_iff.mpr snd) (by exact fst.comp fst)) snd theorem list_findIdx₁ {p : α → β → Bool} (hp : Primrec₂ p) : ∀ l : List β, Primrec fun a => l.findIdx (p a) \| [] => const 0 \| a :: l => (cond (hp.comp .id (const a)) (const 0) (succ.comp (list_findIdx₁ hp l))).of_eq fun n => by simp [List.findIdx_cons] theorem list_idxOf₁ [DecidableEq α] (l : List α) : Primrec fun a => l.idxOf a := list_findIdx₁ (.swap .beq) l @[deprecated (since := "2025-01-30")] alias list_indexOf₁ := list_idxOf₁ theorem dom_fintype [Finite α] (f : α → σ) : Primrec f := let ⟨l, _, m⟩ := Finite.exists_univ_list α option_some_iff.1 <\| by haveI := decidableEqOfEncodable α refine ((list_getElem?₁ (l.map f)).comp (list_idxOf₁ l)).of_eq fun a => ?_ rw [List.getElem?_map, List.getElem?_idxOf (m a), Option.map_some'] -- Porting note: These are new lemmas -- I added it because it actually simplified the proofs -- and because I couldn't understand the original proof /-- A function is `PrimrecBounded` if its size is bounded by a primitive recursive function -/ def PrimrecBounded (f : α → β) : Prop := ∃ g : α → ℕ, Primrec g ∧ ∀ x, encode (f x) ≤ g x theorem nat_findGreatest {f : α → ℕ} {p : α → ℕ → Prop} [∀ x n, Decidable (p x n)] (hf : Primrec f) (hp : PrimrecRel p) : Primrec fun x => (f x).findGreatest (p x) := (nat_rec' (h := fun x nih => if p x (nih.1 + 1) then nih.1 + 1 else nih.2) hf (const 0) (ite (hp.comp fst (snd \|> fst.comp \|> succ.comp)) (snd \|> fst.comp \|> succ.comp) (snd.comp snd))).of_eq fun x => by induction f x <;> simp [Nat.findGreatest, ] /-- To show a function `f : α → ℕ` is primitive recursive, it is enough to show that the function is bounded by a primitive recursive function and that its graph is primitive recursive -/ theorem of_graph {f : α → ℕ} (h₁ : PrimrecBounded f) (h₂ : PrimrecRel fun a b => f a = b) : Primrec f := by rcases h₁ with ⟨g, pg, hg : ∀ x, f x ≤ g x⟩ refine (nat_findGreatest pg h₂).of_eq fun n => ?_ exact (Nat.findGreatest_spec (P := fun b => f n = b) (hg n) rfl).symm -- We show that division is primitive recursive by showing that the graph is theorem nat_div : Primrec₂ ((· / ·) : ℕ → ℕ → ℕ) := by refine of_graph ⟨_, fst, fun p => Nat.div_le_self _ _⟩ ?_ have : PrimrecRel fun (a : ℕ × ℕ) (b : ℕ) => (a.2 = 0 ∧ b = 0) ∨ (0 < a.2 ∧ b a.2 ≤ a.1 ∧ a.1 < (b + 1) * a.2) := PrimrecPred.or (.and (const 0 \|> Primrec.eq.comp (fst \|> snd.comp)) (const 0 \|> Primrec.eq.comp snd)) (.and (nat_lt.comp (const 0) (fst \|> snd.comp)) <\| .and (nat_le.comp (nat_mul.comp snd (fst \|> snd.comp)) (fst \|> fst.comp)) (nat_lt.comp (fst.comp fst) (nat_mul.comp (Primrec.succ.comp snd) (snd.comp fst)))) refine this.of_eq ?_ rintro ⟨a, k⟩ q if H : k = 0 then simp [H, eq_comm] else have : q * k ≤ a ∧ a < (q + 1) * k ↔ q = a / k := by rw [le_antisymm_iff, ← (@Nat.lt_succ _ q), Nat.le_div_iff_mul_le (Nat.pos_of_ne_zero H), Nat.div_lt_iff_lt_mul (Nat.pos_of_ne_zero H)] simpa [H, zero_lt_iff, eq_comm (b := q)] theorem nat_mod : Primrec₂ ((· % ·) : ℕ → ℕ → ℕ) := (nat_sub.comp fst (nat_mul.comp snd nat_div)).to₂.of_eq fun m n => by apply Nat.sub_eq_of_eq_add simp [add_comm (m % n), Nat.div_add_mod] theorem nat_bodd : Primrec Nat.bodd := (Primrec.beq.comp (nat_mod.comp .id (const 2)) (const 1)).of_eq fun n => by cases H : n.bodd <;> simp [Nat.mod_two_of_bodd, H] theorem nat_div2 : Primrec Nat.div2 := (nat_div.comp .id (const 2)).of_eq fun n => n.div2_val.symm theorem nat_double : Primrec (fun n : ℕ => 2 * n) := nat_mul.comp (const _) Primrec.id theorem nat_double_succ : Primrec (fun n : ℕ => 2 * n + 1) := nat_double \|> Primrec.succ.comp end Primrec section variable {α : Type} {β : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable σ] variable (H : Nat.Primrec fun n => Encodable.encode (@decode (List β) _ n)) open Primrec private def prim : Primcodable (List β) := ⟨H⟩ private theorem list_casesOn' {f : α → List β} {g : α → σ} {h : α → β × List β → σ} (hf : haveI := prim H; Primrec f) (hg : Primrec g) (hh : haveI := prim H; Primrec₂ h) : @Primrec _ σ _ _ fun a => List.casesOn (f a) (g a) fun b l => h a (b, l) := letI := prim H have : @Primrec _ (Option σ) _ _ fun a => (@decode (Option (β × List β)) _ (encode (f a))).map fun o => Option.casesOn o (g a) (h a) := ((@map_decode_iff _ (Option (β × List β)) _ _ _ _ _).2 <\| to₂ <\| option_casesOn snd (hg.comp fst) (hh.comp₂ (fst.comp₂ Primrec₂.left) Primrec₂.right)).comp .id (encode_iff.2 hf) option_some_iff.1 <\| this.of_eq fun a => by rcases f a with - \| ⟨b, l⟩ <;> simp [encodek] private theorem list_foldl' {f : α → List β} {g : α → σ} {h : α → σ × β → σ} (hf : haveI := prim H; Primrec f) (hg : Primrec g) (hh : haveI := prim H; Primrec₂ h) : Primrec fun a => (f a).foldl (fun s b => h a (s, b)) (g a) := by letI := prim H let G (a : α) (IH : σ × List β) : σ × List β := List.casesOn IH.2 IH fun b l => (h a (IH.1, b), l) have hG : Primrec₂ G := list_casesOn' H (snd.comp snd) snd <\| to₂ <\| pair (hh.comp (fst.comp fst) <\| pair ((fst.comp snd).comp fst) (fst.comp snd)) (snd.comp snd) let F := fun (a : α) (n : ℕ) => (G a)^[n] (g a, f a) have hF : Primrec fun a => (F a (encode (f a))).1 := (fst.comp <\| nat_iterate (encode_iff.2 hf) (pair hg hf) <\| hG) suffices ∀ a n, F a n = (((f a).take n).foldl (fun s b => h a (s, b)) (g a), (f a).drop n) by refine hF.of_eq fun a => ?_ rw [this, List.take_of_length_le (length_le_encode _)] introv dsimp only [F] generalize f a = l generalize g a = x induction n generalizing l x with \| zero => rfl \| succ n IH => simp only [iterate_succ, comp_apply] rcases l with - \| ⟨b, l⟩ <;> simp [G, IH] private theorem list_cons' : (haveI := prim H; Primrec₂ (@List.cons β)) := letI := prim H encode_iff.1 (succ.comp <\| Primrec₂.natPair.comp (encode_iff.2 fst) (encode_iff.2 snd)) private theorem list_reverse' : haveI := prim H Primrec (@List.reverse β) := letI := prim H (list_foldl' H .id (const []) <\| to₂ <\| ((list_cons' H).comp snd fst).comp snd).of_eq (suffices ∀ l r, List.foldl (fun (s : List β) (b : β) => b :: s) r l = List.reverseAux l r from fun l => this l [] fun l => by induction l <;> simp [, List.reverseAux]) end namespace Primcodable variable {α : Type} {β : Type} variable [Primcodable α] [Primcodable β] open Primrec instance sum : Primcodable (α ⊕ β) := ⟨Primrec.nat_iff.1 <\| (encode_iff.2 (cond nat_bodd (((@Primrec.decode β _).comp nat_div2).option_map <\| to₂ <\| nat_double_succ.comp (Primrec.encode.comp snd)) (((@Primrec.decode α _).comp nat_div2).option_map <\| to₂ <\| nat_double.comp (Primrec.encode.comp snd)))).of_eq fun n => show _ = encode (decodeSum n) by simp only [decodeSum, Nat.boddDiv2_eq] cases Nat.bodd n <;> simp [decodeSum] · cases @decode α _ n.div2 <;> rfl · cases @decode β _ n.div2 <;> rfl⟩ instance list : Primcodable (List α) := ⟨letI H := @Primcodable.prim (List ℕ) _ have : Primrec₂ fun (a : α) (o : Option (List ℕ)) => o.map (List.cons (encode a)) := option_map snd <\| (list_cons' H).comp ((@Primrec.encode α _).comp (fst.comp fst)) snd have : Primrec fun n => (ofNat (List ℕ) n).reverse.foldl (fun o m => (@decode α _ m).bind fun a => o.map (List.cons (encode a))) (some []) := list_foldl' H ((list_reverse' H).comp (.ofNat (List ℕ))) (const (some [])) (Primrec.comp₂ (bind_decode_iff.2 <\| .swap this) Primrec₂.right) nat_iff.1 <\| (encode_iff.2 this).of_eq fun n => by rw [List.foldl_reverse] apply Nat.case_strong_induction_on n; · simp intro n IH; simp rcases @decode α _ n.unpair.1 with - \| a; · rfl simp only [decode_eq_ofNat, Option.some.injEq, Option.some_bind, Option.map_some'] suffices ∀ (o : Option (List ℕ)) (p), encode o = encode p → encode (Option.map (List.cons (encode a)) o) = encode (Option.map (List.cons a) p) from this _ _ (IH _ (Nat.unpair_right_le n)) intro o p IH cases o <;> cases p · rfl · injection IH · injection IH · exact congr_arg (fun k => (Nat.pair (encode a) k).succ.succ) (Nat.succ.inj IH)⟩ end Primcodable namespace Primrec variable {α : Type} {β : Type} {γ : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable γ] [Primcodable σ] theorem sumInl : Primrec (@Sum.inl α β) := encode_iff.1 <\| nat_double.comp Primrec.encode theorem sumInr : Primrec (@Sum.inr α β) := encode_iff.1 <\| nat_double_succ.comp Primrec.encode @[deprecated (since := "2025-02-21")] alias sum_inl := Primrec.sumInl @[deprecated (since := "2025-02-21")] alias sum_inr := Primrec.sumInr theorem sumCasesOn {f : α → β ⊕ γ} {g : α → β → σ} {h : α → γ → σ} (hf : Primrec f) (hg : Primrec₂ g) (hh : Primrec₂ h) : @Primrec _ 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 (Primrec.decode.comp <\| nat_div2.comp <\| encode_iff.2 hf) hh) (option_map (Primrec.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, encodek] @[deprecated (since := "2025-02-21")] alias sum_casesOn := Primrec.sumCasesOn theorem list_cons : Primrec₂ (@List.cons α) := list_cons' Primcodable.prim theorem list_casesOn {f : α → List β} {g : α → σ} {h : α → β × List β → σ} : Primrec f → Primrec g → Primrec₂ h → @Primrec _ σ _ _ fun a => List.casesOn (f a) (g a) fun b l => h a (b, l) := list_casesOn' Primcodable.prim theorem list_foldl {f : α → List β} {g : α → σ} {h : α → σ × β → σ} : Primrec f → Primrec g → Primrec₂ h → Primrec fun a => (f a).foldl (fun s b => h a (s, b)) (g a) := list_foldl' Primcodable.prim theorem list_reverse : Primrec (@List.reverse α) := list_reverse' Primcodable.prim theorem list_foldr {f : α → List β} {g : α → σ} {h : α → β × σ → σ} (hf : Primrec f) (hg : Primrec g) (hh : Primrec₂ h) : Primrec fun a => (f a).foldr (fun b s => h a (b, s)) (g a) := (list_foldl (list_reverse.comp hf) hg <\| to₂ <\| hh.comp fst <\| (pair snd fst).comp snd).of_eq fun a => by simp [List.foldl_reverse] theorem list_head? : Primrec (@List.head? α) := (list_casesOn .id (const none) (option_some_iff.2 <\| fst.comp snd).to₂).of_eq fun l => by cases l <;> rfl theorem list_headI [Inhabited α] : Primrec (@List.headI α _) := (option_iget.comp list_head?).of_eq fun l => l.head!_eq_head?.symm theorem list_tail : Primrec (@List.tail α) := (list_casesOn .id (const []) (snd.comp snd).to₂).of_eq fun l => by cases l <;> rfl theorem list_rec {f : α → List β} {g : α → σ} {h : α → β × List β × σ → σ} (hf : Primrec f) (hg : Primrec g) (hh : Primrec₂ h) : @Primrec _ σ _ _ fun a => List.recOn (f a) (g a) fun b l IH => h a (b, l, IH) := let F (a : α) := (f a).foldr (fun (b : β) (s : List β × σ) => (b :: s.1, h a (b, s))) ([], g a) have : Primrec F := list_foldr hf (pair (const []) hg) <\| to₂ <\| pair ((list_cons.comp fst (fst.comp snd)).comp snd) hh (snd.comp this).of_eq fun a => by suffices F a = (f a, List.recOn (f a) (g a) fun b l IH => h a (b, l, IH)) by rw [this] dsimp [F] induction' f a with b l IH <;> simp [] theorem list_getElem? : Primrec₂ ((·[·]? : List α → ℕ → Option α)) := let F (l : List α) (n : ℕ) := l.foldl (fun (s : ℕ ⊕ α) (a : α) => Sum.casesOn s (@Nat.casesOn (fun _ => ℕ ⊕ α) · (Sum.inr a) Sum.inl) Sum.inr) (Sum.inl n) have hF : Primrec₂ F := (list_foldl fst (sumInl.comp snd) ((sumCasesOn fst (nat_casesOn snd (sumInr.comp <\| snd.comp fst) (sumInl.comp snd).to₂).to₂ (sumInr.comp snd).to₂).comp snd).to₂).to₂ have : @Primrec _ (Option α) _ _ fun p : List α × ℕ => Sum.casesOn (F p.1 p.2) (fun _ => none) some := sumCasesOn hF (const none).to₂ (option_some.comp snd).to₂ this.to₂.of_eq fun l n => by dsimp; symm induction' l with a l IH generalizing n; · rfl rcases n with - \| n · dsimp [F] clear IH induction' l with _ l IH <;> simp_all · simpa using IH .. @[deprecated (since := "2025-02-14")] alias list_get? := list_getElem? theorem list_getD (d : α) : Primrec₂ fun l n => List.getD l n d := by simp only [List.getD_eq_getElem?_getD] exact option_getD.comp₂ list_getElem? (const _) theorem list_getI [Inhabited α] : Primrec₂ (@List.getI α _) := list_getD _ theorem list_append : Primrec₂ ((· ++ ·) : List α → List α → List α) := (list_foldr fst snd <\| to₂ <\| comp (@list_cons α _) snd).to₂.of_eq fun l₁ l₂ => by induction l₁ <;> simp [] theorem list_concat : Primrec₂ fun l (a : α) => l ++ [a] := list_append.comp fst (list_cons.comp snd (const [])) theorem list_map {f : α → List β} {g : α → β → σ} (hf : Primrec f) (hg : Primrec₂ g) : Primrec fun a => (f a).map (g a) := (list_foldr hf (const []) <\| to₂ <\| list_cons.comp (hg.comp fst (fst.comp snd)) (snd.comp snd)).of_eq fun a => by induction f a <;> simp [] theorem list_range : Primrec List.range := (nat_rec' .id (const []) ((list_concat.comp snd fst).comp snd).to₂).of_eq fun n => by simp; induction n <;> simp [, List.range_succ] theorem list_flatten : Primrec (@List.flatten α) := (list_foldr .id (const []) <\| to₂ <\| comp (@list_append α _) snd).of_eq fun l => by dsimp; induction l <;> simp [] theorem list_flatMap {f : α → List β} {g : α → β → List σ} (hf : Primrec f) (hg : Primrec₂ g) : Primrec (fun a => (f a).flatMap (g a)) := list_flatten.comp (list_map hf hg) theorem optionToList : Primrec (Option.toList : Option α → List α) := (option_casesOn Primrec.id (const []) ((list_cons.comp Primrec.id (const [])).comp₂ Primrec₂.right)).of_eq (fun o => by rcases o <;> simp) theorem listFilterMap {f : α → List β} {g : α → β → Option σ} (hf : Primrec f) (hg : Primrec₂ g) : Primrec fun a => (f a).filterMap (g a) := (list_flatMap hf (comp₂ optionToList hg)).of_eq fun _ ↦ Eq.symm <\| List.filterMap_eq_flatMap_toList _ _ theorem list_length : Primrec (@List.length α) := (list_foldr (@Primrec.id (List α) _) (const 0) <\| to₂ <\| (succ.comp <\| snd.comp snd).to₂).of_eq fun l => by dsimp; induction l <;> simp [] theorem list_findIdx {f : α → List β} {p : α → β → Bool} (hf : Primrec f) (hp : Primrec₂ p) : Primrec fun a => (f a).findIdx (p a) := (list_foldr hf (const 0) <\| to₂ <\| cond (hp.comp fst <\| fst.comp snd) (const 0) (succ.comp <\| snd.comp snd)).of_eq fun a => by dsimp; induction f a <;> simp [List.findIdx_cons, ] theorem list_idxOf [DecidableEq α] : Primrec₂ (@List.idxOf α _) := to₂ <\| list_findIdx snd <\| Primrec.beq.comp₂ snd.to₂ (fst.comp fst).to₂ @[deprecated (since := "2025-01-30")] alias list_indexOf := list_idxOf theorem nat_strong_rec (f : α → ℕ → σ) {g : α → List σ → Option σ} (hg : Primrec₂ g) (H : ∀ a n, g a ((List.range n).map (f a)) = some (f a n)) : Primrec₂ f := suffices Primrec₂ fun a n => (List.range n).map (f a) from Primrec₂.option_some_iff.1 <\| (list_getElem?.comp (this.comp fst (succ.comp snd)) snd).to₂.of_eq fun a n => by simp [List.getElem?_range (Nat.lt_succ_self n)] Primrec₂.option_some_iff.1 <\| (nat_rec (const (some [])) (to₂ <\| option_bind (snd.comp snd) <\| to₂ <\| option_map (hg.comp (fst.comp fst) snd) (to₂ <\| list_concat.comp (snd.comp fst) snd))).of_eq fun a n => by induction n with \| zero => rfl \| succ n IH => simp [IH, H, List.range_succ] theorem listLookup [DecidableEq α] : Primrec₂ (List.lookup : α → List (α × β) → Option β) := (to₂ <\| list_rec snd (const none) <\| to₂ <\| cond (Primrec.beq.comp (fst.comp fst) (fst.comp <\| fst.comp snd)) (option_some.comp <\| snd.comp <\| fst.comp snd) (snd.comp <\| snd.comp snd)).of_eq fun a ps => by induction' ps with p ps ih <;> simp [List.lookup, ] cases ha : a == p.1 <;> simp [ha] theorem nat_omega_rec' (f : β → σ) {m : β → ℕ} {l : β → List β} {g : β → List σ → Option σ} (hm : Primrec m) (hl : Primrec l) (hg : Primrec₂ g) (Ord : ∀ b, ∀ b' ∈ l b, m b' < m b) (H : ∀ b, g b ((l b).map f) = some (f b)) : Primrec f := by haveI : DecidableEq β := Encodable.decidableEqOfEncodable β let mapGraph (M : List (β × σ)) (bs : List β) : List σ := bs.flatMap (Option.toList <\| M.lookup ·) let bindList (b : β) : ℕ → List β := fun n ↦ n.rec [b] fun _ bs ↦ bs.flatMap l let graph (b : β) : ℕ → List (β × σ) := fun i ↦ i.rec [] fun i ih ↦ (bindList b (m b - i)).filterMap fun b' ↦ (g b' <\| mapGraph ih (l b')).map (b', ·) have mapGraph_primrec : Primrec₂ mapGraph := to₂ <\| list_flatMap snd <\| optionToList.comp₂ <\| listLookup.comp₂ .right (fst.comp₂ .left) have bindList_primrec : Primrec₂ (bindList) := nat_rec' snd (list_cons.comp fst (const [])) (to₂ <\| list_flatMap (snd.comp snd) (hl.comp₂ .right)) have graph_primrec : Primrec₂ (graph) := to₂ <\| nat_rec' snd (const []) <\| to₂ <\| listFilterMap (bindList_primrec.comp (fst.comp fst) (nat_sub.comp (hm.comp <\| fst.comp fst) (fst.comp snd))) <\| to₂ <\| option_map (hg.comp snd (mapGraph_primrec.comp (snd.comp <\| snd.comp fst) (hl.comp snd))) (Primrec₂.pair.comp₂ (snd.comp₂ .left) .right) have : Primrec (fun b => (graph b (m b + 1))[0]?.map Prod.snd) := option_map (list_getElem?.comp (graph_primrec.comp Primrec.id (succ.comp hm)) (const 0)) (snd.comp₂ Primrec₂.right) exact option_some_iff.mp <\| this.of_eq <\| fun b ↦ by have graph_eq_map_bindList (i : ℕ) (hi : i ≤ m b + 1) : graph b i = (bindList b (m b + 1 - i)).map fun x ↦ (x, f x) := by have bindList_eq_nil : bindList b (m b + 1) = [] := have bindList_m_lt (k : ℕ) : ∀ b' ∈ bindList b k, m b' < m b + 1 - k := by induction' k with k ih <;> simp [bindList] intro a₂ a₁ ha₁ ha₂ have : k ≤ m b := Nat.lt_succ.mp (by simpa using Nat.add_lt_of_lt_sub <\| Nat.zero_lt_of_lt (ih a₁ ha₁)) have : m a₁ ≤ m b - k := Nat.lt_succ.mp (by rw [← Nat.succ_sub this]; simpa using ih a₁ ha₁) exact lt_of_lt_of_le (Ord a₁ a₂ ha₂) this List.eq_nil_iff_forall_not_mem.mpr (by intro b' ha'; by_contra; simpa using bindList_m_lt (m b + 1) b' ha') have mapGraph_graph {bs bs' : List β} (has : bs' ⊆ bs) : mapGraph (bs.map <\| fun x => (x, f x)) bs' = bs'.map f := by induction' bs' with b bs' ih <;> simp [mapGraph] · have : b ∈ bs ∧ bs' ⊆ bs := by simpa using has rcases this with ⟨ha, has'⟩ simpa [List.lookup_graph f ha] using ih has' have graph_succ : ∀ i, graph b (i + 1) = (bindList b (m b - i)).filterMap fun b' => (g b' <\| mapGraph (graph b i) (l b')).map (b', ·) := fun _ => rfl have bindList_succ : ∀ i, bindList b (i + 1) = (bindList b i).flatMap l := fun _ => rfl induction' i with i ih · symm; simpa [graph] using bindList_eq_nil · simp only [graph_succ, ih (Nat.le_of_lt hi), Nat.succ_sub (Nat.lt_succ.mp hi), Nat.succ_eq_add_one, bindList_succ, Nat.reduceSubDiff] apply List.filterMap_eq_map_iff_forall_eq_some.mpr intro b' ha'; simp; rw [mapGraph_graph] · exact H b' · exact (List.infix_flatMap_of_mem ha' l).subset simp [graph_eq_map_bindList (m b + 1) (Nat.le_refl _), bindList] theorem nat_omega_rec (f : α → β → σ) {m : α → β → ℕ} {l : α → β → List β} {g : α → β × List σ → Option σ} (hm : Primrec₂ m) (hl : Primrec₂ l) (hg : Primrec₂ g) (Ord : ∀ a b, ∀ b' ∈ l a b, m a b' < m a b) (H : ∀ a b, g a (b, (l a b).map (f a)) = some (f a b)) : Primrec₂ f := Primrec₂.uncurry.mp <\| nat_omega_rec' (Function.uncurry f) (Primrec₂.uncurry.mpr hm) (list_map (hl.comp fst snd) (Primrec₂.pair.comp₂ (fst.comp₂ .left) .right)) (hg.comp₂ (fst.comp₂ .left) (Primrec₂.pair.comp₂ (snd.comp₂ .left) .right)) (by simpa using Ord) (by simpa [Function.comp] using H) end Primrec namespace Primcodable variable {α : Type} [Primcodable α] open Primrec /-- A subtype of a primitive recursive predicate is `Primcodable`. -/ def subtype {p : α → Prop} [DecidablePred p] (hp : PrimrecPred p) : Primcodable (Subtype p) := ⟨have : Primrec fun n => (@decode α _ n).bind fun a => Option.guard p a := option_bind .decode (option_guard (hp.comp snd).to₂ snd) nat_iff.1 <\| (encode_iff.2 this).of_eq fun n => show _ = encode ((@decode α _ n).bind fun _ => _) by rcases @decode α _ n with - \| a; · rfl dsimp [Option.guard] by_cases h : p a <;> simp [h]; rfl⟩ instance fin {n} : Primcodable (Fin n) := @ofEquiv _ _ (subtype <\| nat_lt.comp .id (const n)) Fin.equivSubtype instance vector {n} : Primcodable (List.Vector α n) := subtype ((@Primrec.eq ℕ _ _).comp list_length (const _)) instance finArrow {n} : Primcodable (Fin n → α) := ofEquiv _ (Equiv.vectorEquivFin _ _).symm section ULower attribute [local instance] Encodable.decidableRangeEncode Encodable.decidableEqOfEncodable theorem mem_range_encode : PrimrecPred (fun n => n ∈ Set.range (encode : α → ℕ)) := have : PrimrecPred fun n => Encodable.decode₂ α n ≠ none := .not (Primrec.eq.comp (.option_bind .decode (.ite (Primrec.eq.comp (Primrec.encode.comp .snd) .fst) (Primrec.option_some.comp .snd) (.const _))) (.const _)) this.of_eq fun _ => decode₂_ne_none_iff instance ulower : Primcodable (ULower α) := Primcodable.subtype mem_range_encode end ULower end Primcodable namespace Primrec variable {α : Type} {β : Type} {σ : Type} variable [Primcodable α] [Primcodable β] [Primcodable σ] theorem subtype_val {p : α → Prop} [DecidablePred p] {hp : PrimrecPred p} : haveI := Primcodable.subtype hp Primrec (@Subtype.val α p) := by letI := Primcodable.subtype hp refine (@Primcodable.prim (Subtype p)).of_eq fun n => ?_ rcases @decode (Subtype p) _ n with (_ \| ⟨a, h⟩) <;> rfl theorem subtype_val_iff {p : β → Prop} [DecidablePred p] {hp : PrimrecPred p} {f : α → Subtype p} : haveI := Primcodable.subtype hp (Primrec fun a => (f a).1) ↔ Primrec f := by	letI := Primcodable.subtype hp refine ⟨fun h => ?_, fun hf => subtype_val.comp hf⟩ refine Nat.Primrec.of_eq h fun n => ?_ rcases @decode α _ n with - \| a; · rfl simp; rfl theorem subtype_mk {p : β → Prop} [DecidablePred p] {hp : PrimrecPred p} {f : α → β} {h : ∀ a, p (f a)} (hf : Primrec f) : haveI := Primcodable.subtype hp Primrec fun a => @Subtype.mk β p (f a) (h a) := subtype_val_iff.1 hf theorem option_get {f : α → Option β} {h : ∀ a, (f a).isSome} : Primrec f → Primrec fun a => (f a).get (h a) := by intro hf refine (Nat.Primrec.pred.comp hf).of_eq fun n => ?_	Mathlib/Computability/Primrec.lean	1,148	1,163
/- Copyright (c) 2024 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Order.Hom.Ring import Mathlib.Data.ENat.Basic import Mathlib.SetTheory.Cardinal.Basic /-! # Conversion between `Cardinal` and `ℕ∞` In this file we define a coercion `Cardinal.ofENat : ℕ∞ → Cardinal` and a projection `Cardinal.toENat : Cardinal →+*o ℕ∞`. We also prove basic theorems about these definitions. ## Implementation notes We define `Cardinal.ofENat` as a function instead of a bundled homomorphism so that we can use it as a coercion and delaborate its application to `↑n`. We define `Cardinal.toENat` as a bundled homomorphism so that we can use all the theorems about homomorphisms without specializing them to this function. Since it is not registered as a coercion, the argument about delaboration does not apply. ## Keywords set theory, cardinals, extended natural numbers -/ assert_not_exists Field open Function Set universe u v namespace Cardinal /-- Coercion `ℕ∞ → Cardinal`. It sends natural numbers to natural numbers and `⊤` to `ℵ₀`. See also `Cardinal.ofENatHom` for a bundled homomorphism version. -/ @[coe] def ofENat : ℕ∞ → Cardinal \| (n : ℕ) => n \| ⊤ => ℵ₀ instance : Coe ENat Cardinal := ⟨Cardinal.ofENat⟩ @[simp, norm_cast] lemma ofENat_top : ofENat ⊤ = ℵ₀ := rfl @[simp, norm_cast] lemma ofENat_nat (n : ℕ) : ofENat n = n := rfl @[simp, norm_cast] lemma ofENat_zero : ofENat 0 = 0 := rfl @[simp, norm_cast] lemma ofENat_one : ofENat 1 = 1 := rfl @[simp, norm_cast] lemma ofENat_ofNat (n : ℕ) [n.AtLeastTwo] : ((ofNat(n) : ℕ∞) : Cardinal) = OfNat.ofNat n := rfl lemma ofENat_strictMono : StrictMono ofENat := WithTop.strictMono_iff.2 ⟨Nat.strictMono_cast, nat_lt_aleph0⟩ @[simp, norm_cast] lemma ofENat_lt_ofENat {m n : ℕ∞} : (m : Cardinal) < n ↔ m < n := ofENat_strictMono.lt_iff_lt @[gcongr, mono] alias ⟨_, ofENat_lt_ofENat_of_lt⟩ := ofENat_lt_ofENat @[simp, norm_cast] lemma ofENat_lt_aleph0 {m : ℕ∞} : (m : Cardinal) < ℵ₀ ↔ m < ⊤ := ofENat_lt_ofENat (n := ⊤) @[simp] lemma ofENat_lt_nat {m : ℕ∞} {n : ℕ} : ofENat m < n ↔ m < n := by norm_cast @[simp] lemma ofENat_lt_ofNat {m : ℕ∞} {n : ℕ} [n.AtLeastTwo] : ofENat m < ofNat(n) ↔ m < OfNat.ofNat n := ofENat_lt_nat @[simp] lemma nat_lt_ofENat {m : ℕ} {n : ℕ∞} : (m : Cardinal) < n ↔ m < n := by norm_cast @[simp] lemma ofENat_pos {m : ℕ∞} : 0 < (m : Cardinal) ↔ 0 < m := by norm_cast @[simp] lemma one_lt_ofENat {m : ℕ∞} : 1 < (m : Cardinal) ↔ 1 < m := by norm_cast @[simp, norm_cast] lemma ofNat_lt_ofENat {m : ℕ} [m.AtLeastTwo] {n : ℕ∞} : (ofNat(m) : Cardinal) < n ↔ OfNat.ofNat m < n := nat_lt_ofENat lemma ofENat_mono : Monotone ofENat := ofENat_strictMono.monotone @[simp, norm_cast] lemma ofENat_le_ofENat {m n : ℕ∞} : (m : Cardinal) ≤ n ↔ m ≤ n := ofENat_strictMono.le_iff_le @[gcongr, mono] alias ⟨_, ofENat_le_ofENat_of_le⟩ := ofENat_le_ofENat @[simp] lemma ofENat_le_aleph0 (n : ℕ∞) : ↑n ≤ ℵ₀ := ofENat_le_ofENat.2 le_top @[simp] lemma ofENat_le_nat {m : ℕ∞} {n : ℕ} : ofENat m ≤ n ↔ m ≤ n := by norm_cast @[simp] lemma ofENat_le_one {m : ℕ∞} : ofENat m ≤ 1 ↔ m ≤ 1 := by norm_cast @[simp] lemma ofENat_le_ofNat {m : ℕ∞} {n : ℕ} [n.AtLeastTwo] : ofENat m ≤ ofNat(n) ↔ m ≤ OfNat.ofNat n := ofENat_le_nat @[simp] lemma nat_le_ofENat {m : ℕ} {n : ℕ∞} : (m : Cardinal) ≤ n ↔ m ≤ n := by norm_cast @[simp] lemma one_le_ofENat {n : ℕ∞} : 1 ≤ (n : Cardinal) ↔ 1 ≤ n := by norm_cast @[simp] lemma ofNat_le_ofENat {m : ℕ} [m.AtLeastTwo] {n : ℕ∞} : (ofNat(m) : Cardinal) ≤ n ↔ OfNat.ofNat m ≤ n := nat_le_ofENat lemma ofENat_injective : Injective ofENat := ofENat_strictMono.injective @[simp, norm_cast] lemma ofENat_inj {m n : ℕ∞} : (m : Cardinal) = n ↔ m = n := ofENat_injective.eq_iff @[simp] lemma ofENat_eq_nat {m : ℕ∞} {n : ℕ} : (m : Cardinal) = n ↔ m = n := by norm_cast @[simp] lemma nat_eq_ofENat {m : ℕ} {n : ℕ∞} : (m : Cardinal) = n ↔ m = n := by norm_cast @[simp] lemma ofENat_eq_zero {m : ℕ∞} : (m : Cardinal) = 0 ↔ m = 0 := by norm_cast @[simp] lemma zero_eq_ofENat {m : ℕ∞} : 0 = (m : Cardinal) ↔ m = 0 := by norm_cast; apply eq_comm @[simp] lemma ofENat_eq_one {m : ℕ∞} : (m : Cardinal) = 1 ↔ m = 1 := by norm_cast @[simp] lemma one_eq_ofENat {m : ℕ∞} : 1 = (m : Cardinal) ↔ m = 1 := by norm_cast; apply eq_comm @[simp] lemma ofENat_eq_ofNat {m : ℕ∞} {n : ℕ} [n.AtLeastTwo] : (m : Cardinal) = ofNat(n) ↔ m = OfNat.ofNat n := ofENat_eq_nat @[simp] lemma ofNat_eq_ofENat {m : ℕ} {n : ℕ∞} [m.AtLeastTwo] : ofNat(m) = (n : Cardinal) ↔ OfNat.ofNat m = n := nat_eq_ofENat @[simp, norm_cast] lemma lift_ofENat : ∀ m : ℕ∞, lift.{u, v} m = m \| (m : ℕ) => lift_natCast m \| ⊤ => lift_aleph0 @[simp] lemma lift_lt_ofENat {x : Cardinal.{v}} {m : ℕ∞} : lift.{u} x < m ↔ x < m := by rw [← lift_ofENat.{u, v}, lift_lt] @[simp] lemma lift_le_ofENat {x : Cardinal.{v}} {m : ℕ∞} : lift.{u} x ≤ m ↔ x ≤ m := by rw [← lift_ofENat.{u, v}, lift_le] @[simp] lemma lift_eq_ofENat {x : Cardinal.{v}} {m : ℕ∞} : lift.{u} x = m ↔ x = m := by rw [← lift_ofENat.{u, v}, lift_inj] @[simp] lemma ofENat_lt_lift {x : Cardinal.{v}} {m : ℕ∞} : m < lift.{u} x ↔ m < x := by rw [← lift_ofENat.{u, v}, lift_lt] @[simp] lemma ofENat_le_lift {x : Cardinal.{v}} {m : ℕ∞} : m ≤ lift.{u} x ↔ m ≤ x := by rw [← lift_ofENat.{u, v}, lift_le] @[simp] lemma ofENat_eq_lift {x : Cardinal.{v}} {m : ℕ∞} : m = lift.{u} x ↔ m = x := by rw [← lift_ofENat.{u, v}, lift_inj] @[simp] lemma range_ofENat : range ofENat = Iic ℵ₀ := by refine (range_subset_iff.2 ofENat_le_aleph0).antisymm fun x (hx : x ≤ ℵ₀) ↦ ?_ rcases hx.lt_or_eq with hlt \| rfl · lift x to ℕ using hlt exact mem_range_self (x : ℕ∞) · exact mem_range_self (⊤ : ℕ∞) instance : CanLift Cardinal ℕ∞ (↑) (· ≤ ℵ₀) where prf x := (Set.ext_iff.1 range_ofENat x).2 /-- Unbundled version of `Cardinal.toENat`. -/ noncomputable def toENatAux : Cardinal.{u} → ℕ∞ := extend Nat.cast Nat.cast fun _ ↦ ⊤ lemma toENatAux_nat (n : ℕ) : toENatAux n = n := Nat.cast_injective.extend_apply .. lemma toENatAux_zero : toENatAux 0 = 0 := toENatAux_nat 0 lemma toENatAux_eq_top {a : Cardinal} (ha : ℵ₀ ≤ a) : toENatAux a = ⊤ := extend_apply' _ _ _ fun ⟨n, hn⟩ ↦ ha.not_lt <\| hn ▸ nat_lt_aleph0 n lemma toENatAux_ofENat : ∀ n : ℕ∞, toENatAux n = n \| (n : ℕ) => toENatAux_nat n \| ⊤ => toENatAux_eq_top le_rfl attribute [local simp] toENatAux_nat toENatAux_zero toENatAux_ofENat lemma toENatAux_gc : GaloisConnection (↑) toENatAux := fun n x ↦ by cases lt_or_le x ℵ₀ with \| inl hx => lift x to ℕ using hx; simp	\| inr hx => simp [toENatAux_eq_top hx, (ofENat_le_aleph0 n).trans hx] theorem toENatAux_le_nat {x : Cardinal} {n : ℕ} : toENatAux x ≤ n ↔ x ≤ n := by cases lt_or_le x ℵ₀ with	Mathlib/SetTheory/Cardinal/ENat.lean	173	176
/- Copyright (c) 2021 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen -/ import Mathlib.Order.Interval.Finset.Fin import Mathlib.Data.Vector.Basic /-! # The structure of `Fintype (Fin n)` This file contains some basic results about the `Fintype` instance for `Fin`, especially properties of `Finset.univ : Finset (Fin n)`. -/ open List (Vector) open Finset open Fintype namespace Fin variable {α β : Type*} {n : ℕ}	theorem map_valEmbedding_univ : (Finset.univ : Finset (Fin n)).map Fin.valEmbedding = Iio n := by ext	Mathlib/Data/Fintype/Fin.lean	25	27
/- Copyright (c) 2022 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.RingTheory.FiniteStability import Mathlib.RingTheory.Ideal.Quotient.Nilpotent import Mathlib.RingTheory.Kaehler.Basic import Mathlib.RingTheory.Localization.Away.AdjoinRoot /-! # Unramified morphisms An `R`-algebra `A` is formally unramified if `Ω[A⁄R]` is trivial. This is equivalent to the standard definition "for every `R`-algebra, every square-zero ideal `I : Ideal B` and `f : A →ₐ[R] B ⧸ I`, there exists at most one lift `A →ₐ[R] B`". It is unramified if it is formally unramified and of finite type. Note that there are multiple definitions in the literature. The definition we give is equivalent to the one in the Stacks Project https://stacks.math.columbia.edu/tag/00US. Note that in EGA unramified is defined as formally unramified and of finite presentation. We show that the property extends onto nilpotent ideals, and that it is stable under `R`-algebra homomorphisms and compositions. We show that unramified is stable under algebra isomorphisms, composition and localization at an element. -/ -- Porting note: added to make the syntax work below. open scoped TensorProduct universe u v w namespace Algebra section variable (R : Type v) (A : Type u) [CommRing R] [CommRing A] [Algebra R A] /-- An `R`-algebra `A` is formally unramified if `Ω[A⁄R]` is trivial. This is equivalent to "for every `R`-algebra, every square-zero ideal `I : Ideal B` and `f : A →ₐ[R] B ⧸ I`, there exists at most one lift `A →ₐ[R] B`". See `Algebra.FormallyUnramified.iff_comp_injective`. -/ @[mk_iff, stacks 00UM] class FormallyUnramified : Prop where subsingleton_kaehlerDifferential : Subsingleton (Ω[A⁄R]) attribute [instance] FormallyUnramified.subsingleton_kaehlerDifferential end namespace FormallyUnramified section variable {R : Type v} [CommRing R] variable {A : Type u} [CommRing A] [Algebra R A] variable {B : Type w} [CommRing B] [Algebra R B] (I : Ideal B) theorem comp_injective [FormallyUnramified R A] (hI : I ^ 2 = ⊥) : Function.Injective ((Ideal.Quotient.mkₐ R I).comp : (A →ₐ[R] B) → A →ₐ[R] B ⧸ I) := by intro f₁ f₂ e letI := f₁.toRingHom.toAlgebra haveI := IsScalarTower.of_algebraMap_eq' f₁.comp_algebraMap.symm have := ((KaehlerDifferential.linearMapEquivDerivation R A).toEquiv.trans (derivationToSquareZeroEquivLift I hI)).surjective.subsingleton exact Subtype.ext_iff.mp (@Subsingleton.elim _ this ⟨f₁, rfl⟩ ⟨f₂, e.symm⟩) theorem iff_comp_injective : FormallyUnramified R A ↔ ∀ ⦃B : Type u⦄ [CommRing B], ∀ [Algebra R B] (I : Ideal B) (_ : I ^ 2 = ⊥), Function.Injective ((Ideal.Quotient.mkₐ R I).comp : (A →ₐ[R] B) → A →ₐ[R] B ⧸ I) := by constructor · intros; exact comp_injective _ ‹_› · intro H constructor rw [← not_nontrivial_iff_subsingleton] intro h obtain ⟨f₁, f₂, e⟩ := (KaehlerDifferential.endEquiv R A).injective.nontrivial apply e ext1 refine H (RingHom.ker (TensorProduct.lmul' R (S := A)).kerSquareLift.toRingHom) ?_ ?_ · rw [AlgHom.ker_kerSquareLift] exact Ideal.cotangentIdeal_square _ · ext x apply RingHom.kerLift_injective (TensorProduct.lmul' R (S := A)).kerSquareLift.toRingHom simpa using DFunLike.congr_fun (f₁.2.trans f₂.2.symm) x theorem lift_unique [FormallyUnramified R A] (I : Ideal B) (hI : IsNilpotent I) (g₁ g₂ : A →ₐ[R] B) (h : (Ideal.Quotient.mkₐ R I).comp g₁ = (Ideal.Quotient.mkₐ R I).comp g₂) : g₁ = g₂ := by revert g₁ g₂ change Function.Injective (Ideal.Quotient.mkₐ R I).comp revert ‹Algebra R B› apply Ideal.IsNilpotent.induction_on (S := B) I hI · intro B _ I hI _; exact FormallyUnramified.comp_injective I hI · intro B _ I J hIJ h₁ h₂ _ g₁ g₂ e apply h₁ apply h₂ ext x replace e := AlgHom.congr_fun e x dsimp only [AlgHom.comp_apply, Ideal.Quotient.mkₐ_eq_mk] at e ⊢ rwa [Ideal.Quotient.eq, ← map_sub, Ideal.mem_quotient_iff_mem hIJ, ← Ideal.Quotient.eq] theorem ext [FormallyUnramified R A] (hI : IsNilpotent I) {g₁ g₂ : A →ₐ[R] B} (H : ∀ x, Ideal.Quotient.mk I (g₁ x) = Ideal.Quotient.mk I (g₂ x)) : g₁ = g₂ := FormallyUnramified.lift_unique I hI g₁ g₂ (AlgHom.ext H) theorem lift_unique_of_ringHom [FormallyUnramified R A] {C : Type} [Ring C] (f : B →+ C) (hf : IsNilpotent <\| RingHom.ker f) (g₁ g₂ : A →ₐ[R] B) (h : f.comp ↑g₁ = f.comp (g₂ : A →+* B)) : g₁ = g₂ := FormallyUnramified.lift_unique _ hf _ _ (by ext x have := RingHom.congr_fun h x simpa only [Ideal.Quotient.eq, Function.comp_apply, AlgHom.coe_comp, Ideal.Quotient.mkₐ_eq_mk, RingHom.mem_ker, map_sub, sub_eq_zero]) theorem ext' [FormallyUnramified R A] {C : Type} [Ring C] (f : B →+ C) (hf : IsNilpotent <\| RingHom.ker f) (g₁ g₂ : A →ₐ[R] B) (h : ∀ x, f (g₁ x) = f (g₂ x)) : g₁ = g₂ := FormallyUnramified.lift_unique_of_ringHom f hf g₁ g₂ (RingHom.ext h) theorem lift_unique' [FormallyUnramified R A] {C : Type} [Ring C] [Algebra R C] (f : B →ₐ[R] C) (hf : IsNilpotent <\| RingHom.ker (f : B →+ C)) (g₁ g₂ : A →ₐ[R] B) (h : f.comp g₁ = f.comp g₂) : g₁ = g₂ := FormallyUnramified.ext' _ hf g₁ g₂ (AlgHom.congr_fun h)	theorem ext_of_iInf [FormallyUnramified R A] (hI : ⨅ i, I ^ i = ⊥) {g₁ g₂ : A →ₐ[R] B} (H : ∀ x, Ideal.Quotient.mk I (g₁ x) = Ideal.Quotient.mk I (g₂ x)) : g₁ = g₂ := by have (i : ℕ) : (Ideal.Quotient.mkₐ R (I ^ i)).comp g₁ = (Ideal.Quotient.mkₐ R (I ^ i)).comp g₂ := by by_cases hi : i = 0 · ext x have : Subsingleton (B ⧸ I ^ i) := by rw [hi, pow_zero, Ideal.one_eq_top] infer_instance exact Subsingleton.elim _ _ apply ext (I.map (algebraMap _ _)) ⟨i, by simp [← Ideal.map_pow]⟩ intro x dsimp rw [Ideal.Quotient.eq, ← map_sub, ← Ideal.mem_comap, Ideal.comap_map_of_surjective',	Mathlib/RingTheory/Unramified/Basic.lean	138	151
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Floris van Doorn -/ import Mathlib.Geometry.Manifold.MFDeriv.SpecificFunctions /-! # Differentiability of models with corners and (extended) charts In this file, we analyse the differentiability of charts, models with corners and extended charts. We show that * models with corners are differentiable * charts are differentiable on their source * `mdifferentiableOn_extChartAt`: `extChartAt` is differentiable on its source Suppose a partial homeomorphism `e` is differentiable. This file shows * `PartialHomeomorph.MDifferentiable.mfderiv`: its derivative is a continuous linear equivalence * `PartialHomeomorph.MDifferentiable.mfderiv_bijective`: its derivative is bijective; there are also spelling with trivial kernel and full range In particular, (extended) charts have bijective differential. ## Tags charts, differentiable, bijective -/ noncomputable section open scoped Manifold ContDiff open Bundle Set Topology variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] {I : ModelWithCorners 𝕜 E H} {M : Type} [TopologicalSpace M] [ChartedSpace H M] {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] {I' : ModelWithCorners 𝕜 E' H'} {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] {I'' : ModelWithCorners 𝕜 E'' H''} {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] section ModelWithCorners namespace ModelWithCorners /- In general, the model with corner `I` is implicit in most theorems in differential geometry, but this section is about `I` as a map, not as a parameter. Therefore, we make it explicit. -/ variable (I) /-! #### Model with corners -/ protected theorem hasMFDerivAt {x} : HasMFDerivAt I 𝓘(𝕜, E) I x (ContinuousLinearMap.id _ _) := ⟨I.continuousAt, (hasFDerivWithinAt_id _ _).congr' I.rightInvOn (mem_range_self _)⟩ protected theorem hasMFDerivWithinAt {s x} : HasMFDerivWithinAt I 𝓘(𝕜, E) I s x (ContinuousLinearMap.id _ _) := I.hasMFDerivAt.hasMFDerivWithinAt protected theorem mdifferentiableWithinAt {s x} : MDifferentiableWithinAt I 𝓘(𝕜, E) I s x := I.hasMFDerivWithinAt.mdifferentiableWithinAt protected theorem mdifferentiableAt {x} : MDifferentiableAt I 𝓘(𝕜, E) I x := I.hasMFDerivAt.mdifferentiableAt protected theorem mdifferentiableOn {s} : MDifferentiableOn I 𝓘(𝕜, E) I s := fun _ _ => I.mdifferentiableWithinAt protected theorem mdifferentiable : MDifferentiable I 𝓘(𝕜, E) I := fun _ => I.mdifferentiableAt theorem hasMFDerivWithinAt_symm {x} (hx : x ∈ range I) : HasMFDerivWithinAt 𝓘(𝕜, E) I I.symm (range I) x (ContinuousLinearMap.id _ _) := ⟨I.continuousWithinAt_symm, (hasFDerivWithinAt_id _ _).congr' (fun _y hy => I.rightInvOn hy.1) ⟨hx, mem_range_self _⟩⟩ theorem mdifferentiableOn_symm : MDifferentiableOn 𝓘(𝕜, E) I I.symm (range I) := fun _x hx => (I.hasMFDerivWithinAt_symm hx).mdifferentiableWithinAt theorem mdifferentiableWithinAt_symm {z : E} (hz : z ∈ range I) : MDifferentiableWithinAt 𝓘(𝕜, E) I I.symm (range I) z := I.mdifferentiableOn_symm z hz end ModelWithCorners end ModelWithCorners section Charts variable [IsManifold I 1 M] [IsManifold I' 1 M'] [IsManifold I'' 1 M''] {e : PartialHomeomorph M H} theorem mdifferentiableAt_atlas (h : e ∈ atlas H M) {x : M} (hx : x ∈ e.source) : MDifferentiableAt I I e x := by rw [mdifferentiableAt_iff] refine ⟨(e.continuousOn x hx).continuousAt (e.open_source.mem_nhds hx), ?_⟩ have mem : I ((chartAt H x : M → H) x) ∈ I.symm ⁻¹' ((chartAt H x).symm ≫ₕ e).source ∩ range I := by simp only [hx, mfld_simps] have : (chartAt H x).symm.trans e ∈ contDiffGroupoid 1 I := HasGroupoid.compatible (chart_mem_atlas H x) h have A : ContDiffOn 𝕜 1 (I ∘ (chartAt H x).symm.trans e ∘ I.symm) (I.symm ⁻¹' ((chartAt H x).symm.trans e).source ∩ range I) := this.1 have B := A.differentiableOn le_rfl (I ((chartAt H x : M → H) x)) mem simp only [mfld_simps] at B rw [inter_comm, differentiableWithinAt_inter] at B · simpa only [mfld_simps] · apply IsOpen.mem_nhds ((PartialHomeomorph.open_source _).preimage I.continuous_symm) mem.1 theorem mdifferentiableOn_atlas (h : e ∈ atlas H M) : MDifferentiableOn I I e e.source := fun _x hx => (mdifferentiableAt_atlas h hx).mdifferentiableWithinAt theorem mdifferentiableAt_atlas_symm (h : e ∈ atlas H M) {x : H} (hx : x ∈ e.target) : MDifferentiableAt I I e.symm x := by	rw [mdifferentiableAt_iff] refine ⟨(e.continuousOn_symm x hx).continuousAt (e.open_target.mem_nhds hx), ?_⟩ have mem : I x ∈ I.symm ⁻¹' (e.symm ≫ₕ chartAt H (e.symm x)).source ∩ range I := by simp only [hx, mfld_simps] have : e.symm.trans (chartAt H (e.symm x)) ∈ contDiffGroupoid 1 I := HasGroupoid.compatible h (chart_mem_atlas H _) have A : ContDiffOn 𝕜 1 (I ∘ e.symm.trans (chartAt H (e.symm x)) ∘ I.symm) (I.symm ⁻¹' (e.symm.trans (chartAt H (e.symm x))).source ∩ range I) := this.1 have B := A.differentiableOn le_rfl (I x) mem simp only [mfld_simps] at B rw [inter_comm, differentiableWithinAt_inter] at B · simpa only [mfld_simps] · apply IsOpen.mem_nhds ((PartialHomeomorph.open_source _).preimage I.continuous_symm) mem.1 theorem mdifferentiableOn_atlas_symm (h : e ∈ atlas H M) : MDifferentiableOn I I e.symm e.target :=	Mathlib/Geometry/Manifold/MFDeriv/Atlas.lean	113	129
/- Copyright (c) 2022 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.AlgebraicGeometry.Cover.Open import Mathlib.AlgebraicGeometry.GammaSpecAdjunction import Mathlib.AlgebraicGeometry.Restrict import Mathlib.CategoryTheory.Limits.Opposites import Mathlib.RingTheory.Localization.InvSubmonoid import Mathlib.RingTheory.RingHom.Surjective import Mathlib.Topology.Sheaves.CommRingCat /-! # Affine schemes We define the category of `AffineScheme`s as the essential image of `Spec`. We also define predicates about affine schemes and affine open sets. ## Main definitions * `AlgebraicGeometry.AffineScheme`: The category of affine schemes. * `AlgebraicGeometry.IsAffine`: A scheme is affine if the canonical map `X ⟶ Spec Γ(X)` is an isomorphism. * `AlgebraicGeometry.Scheme.isoSpec`: The canonical isomorphism `X ≅ Spec Γ(X)` for an affine scheme. * `AlgebraicGeometry.AffineScheme.equivCommRingCat`: The equivalence of categories `AffineScheme ≌ CommRingᵒᵖ` given by `AffineScheme.Spec : CommRingᵒᵖ ⥤ AffineScheme` and `AffineScheme.Γ : AffineSchemeᵒᵖ ⥤ CommRingCat`. * `AlgebraicGeometry.IsAffineOpen`: An open subset of a scheme is affine if the open subscheme is affine. * `AlgebraicGeometry.IsAffineOpen.fromSpec`: The immersion `Spec 𝒪ₓ(U) ⟶ X` for an affine `U`. -/ -- Explicit universe annotations were used in this file to improve performance https://github.com/leanprover-community/mathlib4/issues/12737 noncomputable section open CategoryTheory CategoryTheory.Limits Opposite TopologicalSpace universe u namespace AlgebraicGeometry open Spec (structureSheaf) /-- The category of affine schemes -/ def AffineScheme := Scheme.Spec.EssImageSubcategory deriving Category /-- A Scheme is affine if the canonical map `X ⟶ Spec Γ(X)` is an isomorphism. -/ class IsAffine (X : Scheme) : Prop where affine : IsIso X.toSpecΓ attribute [instance] IsAffine.affine instance (X : Scheme.{u}) [IsAffine X] : IsIso (ΓSpec.adjunction.unit.app X) := @IsAffine.affine X _ /-- The canonical isomorphism `X ≅ Spec Γ(X)` for an affine scheme. -/ @[simps! -isSimp hom] def Scheme.isoSpec (X : Scheme) [IsAffine X] : X ≅ Spec Γ(X, ⊤) := asIso X.toSpecΓ @[reassoc] theorem Scheme.isoSpec_hom_naturality {X Y : Scheme} [IsAffine X] [IsAffine Y] (f : X ⟶ Y) : X.isoSpec.hom ≫ Spec.map (f.appTop) = f ≫ Y.isoSpec.hom := by simp only [isoSpec, asIso_hom, Scheme.toSpecΓ_naturality] @[reassoc] theorem Scheme.isoSpec_inv_naturality {X Y : Scheme} [IsAffine X] [IsAffine Y] (f : X ⟶ Y) : Spec.map (f.appTop) ≫ Y.isoSpec.inv = X.isoSpec.inv ≫ f := by rw [Iso.eq_inv_comp, isoSpec, asIso_hom, ← Scheme.toSpecΓ_naturality_assoc, isoSpec, asIso_inv, IsIso.hom_inv_id, Category.comp_id] @[reassoc (attr := simp)] lemma Scheme.toSpecΓ_isoSpec_inv (X : Scheme.{u}) [IsAffine X] : X.toSpecΓ ≫ X.isoSpec.inv = 𝟙 _ := X.isoSpec.hom_inv_id @[reassoc (attr := simp)] lemma Scheme.isoSpec_inv_toSpecΓ (X : Scheme.{u}) [IsAffine X] : X.isoSpec.inv ≫ X.toSpecΓ = 𝟙 _ := X.isoSpec.inv_hom_id /-- Construct an affine scheme from a scheme and the information that it is affine. Also see `AffineScheme.of` for a typeclass version. -/ @[simps] def AffineScheme.mk (X : Scheme) (_ : IsAffine X) : AffineScheme := ⟨X, ΓSpec.adjunction.mem_essImage_of_unit_isIso _⟩ /-- Construct an affine scheme from a scheme. Also see `AffineScheme.mk` for a non-typeclass version. -/ def AffineScheme.of (X : Scheme) [h : IsAffine X] : AffineScheme := AffineScheme.mk X h /-- Type check a morphism of schemes as a morphism in `AffineScheme`. -/ def AffineScheme.ofHom {X Y : Scheme} [IsAffine X] [IsAffine Y] (f : X ⟶ Y) : AffineScheme.of X ⟶ AffineScheme.of Y := f @[simp] theorem essImage_Spec {X : Scheme} : Scheme.Spec.essImage X ↔ IsAffine X := ⟨fun h => ⟨Functor.essImage.unit_isIso h⟩, fun _ => ΓSpec.adjunction.mem_essImage_of_unit_isIso _⟩ @[deprecated (since := "2025-04-08")] alias mem_Spec_essImage := essImage_Spec instance isAffine_affineScheme (X : AffineScheme.{u}) : IsAffine X.obj := ⟨Functor.essImage.unit_isIso X.property⟩ instance (R : CommRingCatᵒᵖ) : IsAffine (Scheme.Spec.obj R) := AlgebraicGeometry.isAffine_affineScheme ⟨_, Scheme.Spec.obj_mem_essImage R⟩ instance isAffine_Spec (R : CommRingCat) : IsAffine (Spec R) := AlgebraicGeometry.isAffine_affineScheme ⟨_, Scheme.Spec.obj_mem_essImage (op R)⟩ theorem IsAffine.of_isIso {X Y : Scheme} (f : X ⟶ Y) [IsIso f] [h : IsAffine Y] : IsAffine X := by rw [← essImage_Spec] at h ⊢; exact Functor.essImage.ofIso (asIso f).symm h @[deprecated (since := "2025-03-31")] alias isAffine_of_isIso := IsAffine.of_isIso /-- If `f : X ⟶ Y` is a morphism between affine schemes, the corresponding arrow is isomorphic to the arrow of the morphism on prime spectra induced by the map on global sections. -/ noncomputable def arrowIsoSpecΓOfIsAffine {X Y : Scheme} [IsAffine X] [IsAffine Y] (f : X ⟶ Y) : Arrow.mk f ≅ Arrow.mk (Spec.map f.appTop) := Arrow.isoMk X.isoSpec Y.isoSpec (ΓSpec.adjunction.unit_naturality _) /-- If `f : A ⟶ B` is a ring homomorphism, the corresponding arrow is isomorphic to the arrow of the morphism induced on global sections by the map on prime spectra. -/ def arrowIsoΓSpecOfIsAffine {A B : CommRingCat} (f : A ⟶ B) : Arrow.mk f ≅ Arrow.mk ((Spec.map f).appTop) := Arrow.isoMk (Scheme.ΓSpecIso _).symm (Scheme.ΓSpecIso _).symm (Scheme.ΓSpecIso_inv_naturality f).symm theorem Scheme.isoSpec_Spec (R : CommRingCat.{u}) : (Spec R).isoSpec = Scheme.Spec.mapIso (Scheme.ΓSpecIso R).op := Iso.ext (SpecMap_ΓSpecIso_hom R).symm @[simp] theorem Scheme.isoSpec_Spec_hom (R : CommRingCat.{u}) : (Spec R).isoSpec.hom = Spec.map (Scheme.ΓSpecIso R).hom := (SpecMap_ΓSpecIso_hom R).symm @[simp] theorem Scheme.isoSpec_Spec_inv (R : CommRingCat.{u}) : (Spec R).isoSpec.inv = Spec.map (Scheme.ΓSpecIso R).inv := congr($(isoSpec_Spec R).inv) lemma ext_of_isAffine {X Y : Scheme} [IsAffine Y] {f g : X ⟶ Y} (e : f.appTop = g.appTop) : f = g := by rw [← cancel_mono Y.toSpecΓ, Scheme.toSpecΓ_naturality, Scheme.toSpecΓ_naturality, e] namespace AffineScheme /-- The `Spec` functor into the category of affine schemes. -/ def Spec : CommRingCatᵒᵖ ⥤ AffineScheme := Scheme.Spec.toEssImage /-! We copy over instances from `Scheme.Spec.toEssImage`. -/ instance Spec_full : Spec.Full := Functor.Full.toEssImage _ instance Spec_faithful : Spec.Faithful := Functor.Faithful.toEssImage _ instance Spec_essSurj : Spec.EssSurj := Functor.EssSurj.toEssImage (F := _) /-- The forgetful functor `AffineScheme ⥤ Scheme`. -/ @[simps!] def forgetToScheme : AffineScheme ⥤ Scheme := Scheme.Spec.essImage.ι /-! We copy over instances from `Scheme.Spec.essImageInclusion`. -/ instance forgetToScheme_full : forgetToScheme.Full := inferInstanceAs Scheme.Spec.essImage.ι.Full instance forgetToScheme_faithful : forgetToScheme.Faithful := inferInstanceAs Scheme.Spec.essImage.ι.Faithful /-- The global section functor of an affine scheme. -/ def Γ : AffineSchemeᵒᵖ ⥤ CommRingCat := forgetToScheme.op ⋙ Scheme.Γ /-- The category of affine schemes is equivalent to the category of commutative rings. -/ def equivCommRingCat : AffineScheme ≌ CommRingCatᵒᵖ := equivEssImageOfReflective.symm instance : Γ.{u}.rightOp.IsEquivalence := equivCommRingCat.isEquivalence_functor instance : Γ.{u}.rightOp.op.IsEquivalence := equivCommRingCat.op.isEquivalence_functor instance ΓIsEquiv : Γ.{u}.IsEquivalence := inferInstanceAs (Γ.{u}.rightOp.op ⋙ (opOpEquivalence _).functor).IsEquivalence instance hasColimits : HasColimits AffineScheme.{u} := haveI := Adjunction.has_limits_of_equivalence.{u} Γ.{u} Adjunction.has_colimits_of_equivalence.{u} (opOpEquivalence AffineScheme.{u}).inverse instance hasLimits : HasLimits AffineScheme.{u} := by haveI := Adjunction.has_colimits_of_equivalence Γ.{u} haveI : HasLimits AffineScheme.{u}ᵒᵖᵒᵖ := Limits.hasLimits_op_of_hasColimits exact Adjunction.has_limits_of_equivalence (opOpEquivalence AffineScheme.{u}).inverse noncomputable instance Γ_preservesLimits : PreservesLimits Γ.{u}.rightOp := inferInstance noncomputable instance forgetToScheme_preservesLimits : PreservesLimits forgetToScheme := by apply (config := { allowSynthFailures := true }) @preservesLimits_of_natIso _ _ _ _ _ _ (isoWhiskerRight equivCommRingCat.unitIso forgetToScheme).symm change PreservesLimits (equivCommRingCat.functor ⋙ Scheme.Spec) infer_instance end AffineScheme /-- An open subset of a scheme is affine if the open subscheme is affine. -/ def IsAffineOpen {X : Scheme} (U : X.Opens) : Prop := IsAffine U /-- The set of affine opens as a subset of `opens X`. -/ def Scheme.affineOpens (X : Scheme) : Set X.Opens := {U : X.Opens \| IsAffineOpen U} instance {Y : Scheme.{u}} (U : Y.affineOpens) : IsAffine U := U.property theorem isAffineOpen_opensRange {X Y : Scheme} [IsAffine X] (f : X ⟶ Y) [H : IsOpenImmersion f] : IsAffineOpen (Scheme.Hom.opensRange f) := by refine .of_isIso (IsOpenImmersion.isoOfRangeEq f (Y.ofRestrict _) ?_).inv exact Subtype.range_val.symm theorem isAffineOpen_top (X : Scheme) [IsAffine X] : IsAffineOpen (⊤ : X.Opens) := by convert isAffineOpen_opensRange (𝟙 X) ext1 exact Set.range_id.symm instance Scheme.isAffine_affineCover (X : Scheme) (i : X.affineCover.J) : IsAffine (X.affineCover.obj i) := isAffine_Spec _ instance Scheme.isAffine_affineBasisCover (X : Scheme) (i : X.affineBasisCover.J) : IsAffine (X.affineBasisCover.obj i) := isAffine_Spec _ instance Scheme.isAffine_affineOpenCover (X : Scheme) (𝒰 : X.AffineOpenCover) (i : 𝒰.J) : IsAffine (𝒰.openCover.obj i) := inferInstanceAs (IsAffine (Spec (𝒰.obj i))) instance {X} [IsAffine X] (i) : IsAffine ((Scheme.coverOfIsIso (P := @IsOpenImmersion) (𝟙 X)).obj i) := by dsimp; infer_instance theorem isBasis_affine_open (X : Scheme) : Opens.IsBasis X.affineOpens := by rw [Opens.isBasis_iff_nbhd] rintro U x (hU : x ∈ (U : Set X)) obtain ⟨S, hS, hxS, hSU⟩ := X.affineBasisCover_is_basis.exists_subset_of_mem_open hU U.isOpen refine ⟨⟨S, X.affineBasisCover_is_basis.isOpen hS⟩, ?_, hxS, hSU⟩ rcases hS with ⟨i, rfl⟩ exact isAffineOpen_opensRange _ theorem iSup_affineOpens_eq_top (X : Scheme) : ⨆ i : X.affineOpens, (i : X.Opens) = ⊤ := by apply Opens.ext rw [Opens.coe_iSup] apply IsTopologicalBasis.sUnion_eq rw [← Set.image_eq_range] exact isBasis_affine_open X theorem Scheme.map_PrimeSpectrum_basicOpen_of_affine (X : Scheme) [IsAffine X] (f : Γ(X, ⊤)) : X.isoSpec.hom ⁻¹ᵁ PrimeSpectrum.basicOpen f = X.basicOpen f := Scheme.toSpecΓ_preimage_basicOpen _ _ theorem isBasis_basicOpen (X : Scheme) [IsAffine X] : Opens.IsBasis (Set.range (X.basicOpen : Γ(X, ⊤) → X.Opens)) := by delta Opens.IsBasis convert PrimeSpectrum.isBasis_basic_opens.isInducing (TopCat.homeoOfIso (Scheme.forgetToTop.mapIso X.isoSpec)).isInducing using 1 ext simp only [Set.mem_image, exists_exists_eq_and] constructor · rintro ⟨_, ⟨x, rfl⟩, rfl⟩ refine ⟨_, ⟨_, ⟨x, rfl⟩, rfl⟩, ?_⟩ exact congr_arg Opens.carrier (Scheme.toSpecΓ_preimage_basicOpen _ _) · rintro ⟨_, ⟨_, ⟨x, rfl⟩, rfl⟩, rfl⟩ refine ⟨_, ⟨x, rfl⟩, ?_⟩ exact congr_arg Opens.carrier (Scheme.toSpecΓ_preimage_basicOpen _ _).symm /-- The canonical map `U ⟶ Spec Γ(X, U)` for an open `U ⊆ X`. -/ noncomputable def Scheme.Opens.toSpecΓ {X : Scheme.{u}} (U : X.Opens) : U.toScheme ⟶ Spec Γ(X, U) := U.toScheme.toSpecΓ ≫ Spec.map U.topIso.inv @[reassoc (attr := simp)] lemma Scheme.Opens.toSpecΓ_SpecMap_map {X : Scheme} (U V : X.Opens) (h : U ≤ V) : U.toSpecΓ ≫ Spec.map (X.presheaf.map (homOfLE h).op) = X.homOfLE h ≫ V.toSpecΓ := by delta Scheme.Opens.toSpecΓ simp [← Spec.map_comp, ← X.presheaf.map_comp, toSpecΓ_naturality_assoc] @[simp] lemma Scheme.Opens.toSpecΓ_top {X : Scheme} : (⊤ : X.Opens).toSpecΓ = (⊤ : X.Opens).ι ≫ X.toSpecΓ := by simp [Scheme.Opens.toSpecΓ, toSpecΓ_naturality]; rfl @[reassoc] lemma Scheme.Opens.toSpecΓ_appTop {X : Scheme.{u}} (U : X.Opens) : U.toSpecΓ.appTop = (Scheme.ΓSpecIso Γ(X, U)).hom ≫ U.topIso.inv := by simp [Scheme.Opens.toSpecΓ] namespace IsAffineOpen variable {X Y : Scheme.{u}} {U : X.Opens} (hU : IsAffineOpen U) (f : Γ(X, U)) attribute [-simp] eqToHom_op in /-- The isomorphism `U ≅ Spec Γ(X, U)` for an affine `U`. -/ @[simps! -isSimp inv] def isoSpec : ↑U ≅ Spec Γ(X, U) := haveI : IsAffine U := hU U.toScheme.isoSpec ≪≫ Scheme.Spec.mapIso U.topIso.symm.op lemma isoSpec_hom : hU.isoSpec.hom = U.toSpecΓ := rfl @[reassoc (attr := simp)] lemma toSpecΓ_isoSpec_inv : U.toSpecΓ ≫ hU.isoSpec.inv = 𝟙 _ := hU.isoSpec.hom_inv_id @[reassoc (attr := simp)] lemma isoSpec_inv_toSpecΓ : hU.isoSpec.inv ≫ U.toSpecΓ = 𝟙 _ := hU.isoSpec.inv_hom_id open IsLocalRing in lemma isoSpec_hom_base_apply (x : U) : hU.isoSpec.hom.base x = (Spec.map (X.presheaf.germ U x x.2)).base (closedPoint _) := by dsimp [IsAffineOpen.isoSpec_hom, Scheme.isoSpec_hom, Scheme.toSpecΓ_base, Scheme.Opens.toSpecΓ] rw [← Scheme.comp_base_apply, ← Spec.map_comp, (Iso.eq_comp_inv _).mpr (Scheme.Opens.germ_stalkIso_hom U (V := ⊤) x trivial), X.presheaf.germ_res_assoc, Spec.map_comp, Scheme.comp_base_apply] congr 1 exact IsLocalRing.comap_closedPoint (U.stalkIso x).inv.hom lemma isoSpec_inv_appTop : hU.isoSpec.inv.appTop = U.topIso.hom ≫ (Scheme.ΓSpecIso Γ(X, U)).inv := by simp_rw [Scheme.Opens.toScheme_presheaf_obj, isoSpec_inv, Scheme.isoSpec, asIso_inv, Scheme.comp_app, Scheme.Opens.topIso_hom, Scheme.ΓSpecIso_inv_naturality, Scheme.inv_appTop, -- `check_compositions` reports defeq problems starting after this step. IsIso.inv_comp_eq] rw [Scheme.toSpecΓ_appTop] -- We need `erw` here because the goal has -- `Scheme.ΓSpecIso Γ(↑U, ⊤)).hom ≫ Scheme.ΓSpecIso Γ(X, U.ι ''ᵁ ⊤)).inv` -- and `Γ(X, U.ι ''ᵁ ⊤)` is non-reducibly defeq to `Γ(↑U, ⊤)`. erw [Iso.hom_inv_id_assoc] simp only [Opens.map_top] lemma isoSpec_hom_appTop : hU.isoSpec.hom.appTop = (Scheme.ΓSpecIso Γ(X, U)).hom ≫ U.topIso.inv := by have := congr(inv $hU.isoSpec_inv_appTop) rw [IsIso.inv_comp, IsIso.Iso.inv_inv, IsIso.Iso.inv_hom] at this have := (Scheme.Γ.map_inv hU.isoSpec.inv.op).trans this rwa [← op_inv, IsIso.Iso.inv_inv] at this @[deprecated (since := "2024-11-16")] alias isoSpec_inv_app_top := isoSpec_inv_appTop @[deprecated (since := "2024-11-16")] alias isoSpec_hom_app_top := isoSpec_hom_appTop /-- The open immersion `Spec Γ(X, U) ⟶ X` for an affine `U`. -/ def fromSpec : Spec Γ(X, U) ⟶ X := haveI : IsAffine U := hU hU.isoSpec.inv ≫ U.ι instance isOpenImmersion_fromSpec : IsOpenImmersion hU.fromSpec := by delta fromSpec infer_instance @[reassoc (attr := simp)] lemma isoSpec_inv_ι : hU.isoSpec.inv ≫ U.ι = hU.fromSpec := rfl @[reassoc (attr := simp)] lemma toSpecΓ_fromSpec : U.toSpecΓ ≫ hU.fromSpec = U.ι := toSpecΓ_isoSpec_inv_assoc _ _ @[simp] theorem range_fromSpec : Set.range hU.fromSpec.base = (U : Set X) := by delta IsAffineOpen.fromSpec; dsimp [IsAffineOpen.isoSpec_inv] rw [Set.range_comp, Set.range_eq_univ.mpr, Set.image_univ] · exact Subtype.range_coe rw [← TopCat.coe_comp, ← TopCat.epi_iff_surjective] infer_instance @[simp] theorem opensRange_fromSpec : hU.fromSpec.opensRange = U := Opens.ext (range_fromSpec hU) @[reassoc (attr := simp)] theorem map_fromSpec {V : X.Opens} (hV : IsAffineOpen V) (f : op U ⟶ op V) : Spec.map (X.presheaf.map f) ≫ hU.fromSpec = hV.fromSpec := by have : IsAffine U := hU haveI : IsAffine _ := hV conv_rhs => rw [fromSpec, ← X.homOfLE_ι (V := U) f.unop.le, isoSpec_inv, Category.assoc, ← Scheme.isoSpec_inv_naturality_assoc, ← Spec.map_comp_assoc, Scheme.homOfLE_appTop, ← Functor.map_comp] rw [fromSpec, isoSpec_inv, Category.assoc, ← Spec.map_comp_assoc, ← Functor.map_comp] rfl @[reassoc] lemma Spec_map_appLE_fromSpec (f : X ⟶ Y) {V : X.Opens} {U : Y.Opens} (hU : IsAffineOpen U) (hV : IsAffineOpen V) (i : V ≤ f ⁻¹ᵁ U) : Spec.map (f.appLE U V i) ≫ hU.fromSpec = hV.fromSpec ≫ f := by have : IsAffine U := hU simp only [IsAffineOpen.fromSpec, Category.assoc, isoSpec_inv] simp_rw [← Scheme.homOfLE_ι _ i] rw [Category.assoc, ← morphismRestrict_ι, ← Category.assoc _ (f ∣_ U) U.ι, ← @Scheme.isoSpec_inv_naturality_assoc, ← Spec.map_comp_assoc, ← Spec.map_comp_assoc, Scheme.comp_appTop, morphismRestrict_appTop, Scheme.homOfLE_appTop, Scheme.Hom.app_eq_appLE, Scheme.Hom.appLE_map, Scheme.Hom.appLE_map, Scheme.Hom.appLE_map, Scheme.Hom.map_appLE] lemma fromSpec_top [IsAffine X] : (isAffineOpen_top X).fromSpec = X.isoSpec.inv := by rw [fromSpec, isoSpec_inv, Category.assoc, ← @Scheme.isoSpec_inv_naturality, ← Spec.map_comp_assoc, Scheme.Opens.ι_appTop, ← X.presheaf.map_comp, ← op_comp, eqToHom_comp_homOfLE, ← eqToHom_eq_homOfLE rfl, eqToHom_refl, op_id, X.presheaf.map_id, Spec.map_id, Category.id_comp] lemma fromSpec_app_of_le (V : X.Opens) (h : U ≤ V) : hU.fromSpec.app V = X.presheaf.map (homOfLE h).op ≫ (Scheme.ΓSpecIso Γ(X, U)).inv ≫ (Spec _).presheaf.map (homOfLE le_top).op := by have : U.ι ⁻¹ᵁ V = ⊤ := eq_top_iff.mpr fun x _ ↦ h x.2 rw [IsAffineOpen.fromSpec, Scheme.comp_app, Scheme.Opens.ι_app, Scheme.app_eq _ this, ← Scheme.Hom.appTop, IsAffineOpen.isoSpec_inv_appTop] simp only [Scheme.Opens.toScheme_presheaf_map, Scheme.Opens.topIso_hom, Category.assoc, ← X.presheaf.map_comp_assoc] rfl include hU in protected theorem isCompact : IsCompact (U : Set X) := by convert @IsCompact.image _ _ _ _ Set.univ hU.fromSpec.base PrimeSpectrum.compactSpace.1 (by fun_prop) convert hU.range_fromSpec.symm exact Set.image_univ include hU in theorem image_of_isOpenImmersion (f : X ⟶ Y) [H : IsOpenImmersion f] : IsAffineOpen (f ''ᵁ U) := by have : IsAffine _ := hU convert isAffineOpen_opensRange (U.ι ≫ f) ext1 exact Set.image_eq_range _ _ theorem preimage_of_isIso {U : Y.Opens} (hU : IsAffineOpen U) (f : X ⟶ Y) [IsIso f] : IsAffineOpen (f ⁻¹ᵁ U) := haveI : IsAffine _ := hU .of_isIso (f ∣_ U) theorem _root_.AlgebraicGeometry.Scheme.Hom.isAffineOpen_iff_of_isOpenImmersion (f : AlgebraicGeometry.Scheme.Hom X Y) [H : IsOpenImmersion f] {U : X.Opens} : IsAffineOpen (f ''ᵁ U) ↔ IsAffineOpen U where mp hU := by refine .of_isIso (IsOpenImmersion.isoOfRangeEq (X.ofRestrict U.isOpenEmbedding ≫ f) (Y.ofRestrict _) ?_).hom (h := hU) rw [Scheme.comp_base, TopCat.coe_comp, Set.range_comp] dsimp [Opens.coe_inclusion', Scheme.restrict] rw [Subtype.range_coe, Subtype.range_coe] rfl mpr hU := hU.image_of_isOpenImmersion f /-- The affine open sets of an open subscheme corresponds to the affine open sets containing in the image. -/ @[simps] def _root_.AlgebraicGeometry.IsOpenImmersion.affineOpensEquiv (f : X ⟶ Y) [H : IsOpenImmersion f] : X.affineOpens ≃ { U : Y.affineOpens // U ≤ f.opensRange } where toFun U := ⟨⟨f ''ᵁ U, U.2.image_of_isOpenImmersion f⟩, Set.image_subset_range _ _⟩ invFun U := ⟨f ⁻¹ᵁ U, f.isAffineOpen_iff_of_isOpenImmersion.mp (by rw [show f ''ᵁ f ⁻¹ᵁ U = U from Opens.ext (Set.image_preimage_eq_of_subset U.2)]; exact U.1.2)⟩ left_inv _ := Subtype.ext (Opens.ext (Set.preimage_image_eq _ H.base_open.injective)) right_inv U := Subtype.ext (Subtype.ext (Opens.ext (Set.image_preimage_eq_of_subset U.2))) /-- The affine open sets of an open subscheme corresponds to the affine open sets containing in the subset. -/ @[simps! apply_coe_coe] def _root_.AlgebraicGeometry.affineOpensRestrict {X : Scheme.{u}} (U : X.Opens) : U.toScheme.affineOpens ≃ { V : X.affineOpens // V ≤ U } := (IsOpenImmersion.affineOpensEquiv U.ι).trans (Equiv.subtypeEquivProp (by simp)) @[simp] lemma _root_.AlgebraicGeometry.affineOpensRestrict_symm_apply_coe {X : Scheme.{u}} (U : X.Opens) (V) : ((affineOpensRestrict U).symm V).1 = U.ι ⁻¹ᵁ V := rfl instance (priority := 100) _root_.AlgebraicGeometry.Scheme.compactSpace_of_isAffine (X : Scheme) [IsAffine X] : CompactSpace X := ⟨(isAffineOpen_top X).isCompact⟩ @[simp] theorem fromSpec_preimage_self : hU.fromSpec ⁻¹ᵁ U = ⊤ := by ext1 rw [Opens.map_coe, Opens.coe_top, ← hU.range_fromSpec, ← Set.image_univ] exact Set.preimage_image_eq _ PresheafedSpace.IsOpenImmersion.base_open.injective theorem ΓSpecIso_hom_fromSpec_app : (Scheme.ΓSpecIso Γ(X, U)).hom ≫ hU.fromSpec.app U = (Spec Γ(X, U)).presheaf.map (eqToHom hU.fromSpec_preimage_self).op := by simp only [fromSpec, Scheme.comp_coeBase, Opens.map_comp_obj, Scheme.comp_app, Scheme.Opens.ι_app_self, eqToHom_op, Scheme.app_eq _ U.ι_preimage_self, Scheme.Opens.toScheme_presheaf_map, eqToHom_unop, eqToHom_map U.ι.opensFunctor, Opens.map_top, isoSpec_inv_appTop, Scheme.Opens.topIso_hom, Category.assoc, ← Functor.map_comp_assoc, eqToHom_trans, eqToHom_refl, X.presheaf.map_id, Category.id_comp, Iso.hom_inv_id_assoc] @[elementwise] theorem fromSpec_app_self : hU.fromSpec.app U = (Scheme.ΓSpecIso Γ(X, U)).inv ≫ (Spec Γ(X, U)).presheaf.map (eqToHom hU.fromSpec_preimage_self).op := by rw [← hU.ΓSpecIso_hom_fromSpec_app, Iso.inv_hom_id_assoc] theorem fromSpec_preimage_basicOpen' : hU.fromSpec ⁻¹ᵁ X.basicOpen f = (Spec Γ(X, U)).basicOpen ((Scheme.ΓSpecIso Γ(X, U)).inv f) := by rw [Scheme.preimage_basicOpen, hU.fromSpec_app_self] exact Scheme.basicOpen_res_eq _ _ (eqToHom hU.fromSpec_preimage_self).op theorem fromSpec_preimage_basicOpen : hU.fromSpec ⁻¹ᵁ X.basicOpen f = PrimeSpectrum.basicOpen f := by rw [fromSpec_preimage_basicOpen', ← basicOpen_eq_of_affine] theorem fromSpec_image_basicOpen : hU.fromSpec ''ᵁ (PrimeSpectrum.basicOpen f) = X.basicOpen f := by rw [← hU.fromSpec_preimage_basicOpen] ext1 change hU.fromSpec.base '' (hU.fromSpec.base ⁻¹' (X.basicOpen f : Set X)) = _ rw [Set.image_preimage_eq_inter_range, Set.inter_eq_left, hU.range_fromSpec] exact Scheme.basicOpen_le _ _ @[simp] theorem basicOpen_fromSpec_app : (Spec Γ(X, U)).basicOpen (hU.fromSpec.app U f) = PrimeSpectrum.basicOpen f := by rw [← hU.fromSpec_preimage_basicOpen, Scheme.preimage_basicOpen] include hU in theorem basicOpen : IsAffineOpen (X.basicOpen f) := by rw [← hU.fromSpec_image_basicOpen, Scheme.Hom.isAffineOpen_iff_of_isOpenImmersion] convert isAffineOpen_opensRange (Spec.map (CommRingCat.ofHom <\| algebraMap Γ(X, U) (Localization.Away f))) exact Opens.ext (PrimeSpectrum.localization_away_comap_range (Localization.Away f) f).symm lemma Spec_basicOpen {R : CommRingCat} (f : R) : IsAffineOpen (X := Spec R) (PrimeSpectrum.basicOpen f) := basicOpen_eq_of_affine f ▸ (isAffineOpen_top (Spec (.of R))).basicOpen _ instance [IsAffine X] (r : Γ(X, ⊤)) : IsAffine (X.basicOpen r) := (isAffineOpen_top X).basicOpen _ include hU in theorem ι_basicOpen_preimage (r : Γ(X, ⊤)) : IsAffineOpen ((X.basicOpen r).ι ⁻¹ᵁ U) := by apply (X.basicOpen r).ι.isAffineOpen_iff_of_isOpenImmersion.mp dsimp [Scheme.Hom.opensFunctor, LocallyRingedSpace.IsOpenImmersion.opensFunctor] rw [Opens.functor_obj_map_obj, Opens.isOpenEmbedding_obj_top, inf_comm, ← Scheme.basicOpen_res _ _ (homOfLE le_top).op] exact hU.basicOpen _ include hU in theorem exists_basicOpen_le {V : X.Opens} (x : V) (h : ↑x ∈ U) : ∃ f : Γ(X, U), X.basicOpen f ≤ V ∧ ↑x ∈ X.basicOpen f := by have : IsAffine _ := hU obtain ⟨_, ⟨_, ⟨r, rfl⟩, rfl⟩, h₁, h₂⟩ := (isBasis_basicOpen U).exists_subset_of_mem_open (x.2 : (⟨x, h⟩ : U) ∈ _) ((Opens.map U.inclusion').obj V).isOpen have : U.ι ''ᵁ (U.toScheme.basicOpen r) = X.basicOpen (X.presheaf.map (eqToHom U.isOpenEmbedding_obj_top.symm).op r) := by refine (Scheme.image_basicOpen U.ι r).trans ?_ rw [Scheme.basicOpen_res_eq] simp only [Scheme.Opens.toScheme_presheaf_obj, Scheme.Opens.ι_appIso, Iso.refl_inv, CommRingCat.id_apply] use X.presheaf.map (eqToHom U.isOpenEmbedding_obj_top.symm).op r rw [← this] exact ⟨Set.image_subset_iff.mpr h₂, ⟨_, h⟩, h₁, rfl⟩ noncomputable instance {R : CommRingCat} {U} : Algebra R Γ(Spec R, U) := ((Scheme.ΓSpecIso R).inv ≫ (Spec R).presheaf.map (homOfLE le_top).op).hom.toAlgebra @[simp] lemma algebraMap_Spec_obj {R : CommRingCat} {U} : algebraMap R Γ(Spec R, U) = ((Scheme.ΓSpecIso R).inv ≫ (Spec R).presheaf.map (homOfLE le_top).op).hom := rfl instance {R : CommRingCat} {f : R} : IsLocalization.Away f Γ(Spec R, PrimeSpectrum.basicOpen f) := inferInstanceAs (IsLocalization.Away f ((Spec.structureSheaf R).val.obj (op <\| PrimeSpectrum.basicOpen f))) /-- Given an affine open U and some `f : U`, this is the canonical map `Γ(𝒪ₓ, D(f)) ⟶ Γ(Spec 𝒪ₓ(U), D(f))` This is an isomorphism, as witnessed by an `IsIso` instance. -/ def basicOpenSectionsToAffine : Γ(X, X.basicOpen f) ⟶ Γ(Spec Γ(X, U), PrimeSpectrum.basicOpen f) := hU.fromSpec.c.app (op <\| X.basicOpen f) ≫ (Spec Γ(X, U)).presheaf.map (eqToHom <\| (hU.fromSpec_preimage_basicOpen f).symm).op instance basicOpenSectionsToAffine_isIso : IsIso (basicOpenSectionsToAffine hU f) := by delta basicOpenSectionsToAffine refine IsIso.comp_isIso' ?_ inferInstance apply PresheafedSpace.IsOpenImmersion.isIso_of_subset rw [hU.range_fromSpec] exact RingedSpace.basicOpen_le _ _ include hU in theorem isLocalization_basicOpen : IsLocalization.Away f Γ(X, X.basicOpen f) := by apply (IsLocalization.isLocalization_iff_of_ringEquiv (Submonoid.powers f) (asIso <\| basicOpenSectionsToAffine hU f).commRingCatIsoToRingEquiv).mpr convert StructureSheaf.IsLocalization.to_basicOpen _ f using 1 -- Porting note: more hand holding is required here, the next 3 lines were not necessary congr 1 dsimp [CommRingCat.ofHom, RingHom.algebraMap_toAlgebra, ← CommRingCat.hom_comp, basicOpenSectionsToAffine] rw [hU.fromSpec.naturality_assoc, hU.fromSpec_app_self] simp only [Category.assoc, ← Functor.map_comp, ← op_comp] exact CommRingCat.hom_ext_iff.mp (StructureSheaf.toOpen_res _ _ _ _) instance _root_.AlgebraicGeometry.isLocalization_away_of_isAffine [IsAffine X] (r : Γ(X, ⊤)) : IsLocalization.Away r Γ(X, X.basicOpen r) := isLocalization_basicOpen (isAffineOpen_top X) r lemma appLE_eq_away_map {X Y : Scheme.{u}} (f : X ⟶ Y) {U : Y.Opens} (hU : IsAffineOpen U) {V : X.Opens} (hV : IsAffineOpen V) (e) (r : Γ(Y, U)) : letI := hU.isLocalization_basicOpen r letI := hV.isLocalization_basicOpen (f.appLE U V e r) f.appLE (Y.basicOpen r) (X.basicOpen (f.appLE U V e r)) (by simp [Scheme.Hom.appLE]) = CommRingCat.ofHom (IsLocalization.Away.map _ _ (f.appLE U V e).hom r) := by letI := hU.isLocalization_basicOpen r letI := hV.isLocalization_basicOpen (f.appLE U V e r) ext : 1 apply IsLocalization.ringHom_ext (.powers r) rw [IsLocalization.Away.map, CommRingCat.hom_ofHom, IsLocalization.map_comp, RingHom.algebraMap_toAlgebra, RingHom.algebraMap_toAlgebra, ← CommRingCat.hom_comp,	← CommRingCat.hom_comp, Scheme.Hom.appLE_map, Scheme.Hom.map_appLE] lemma app_basicOpen_eq_away_map {X Y : Scheme.{u}} (f : X ⟶ Y) {U : Y.Opens} (hU : IsAffineOpen U) (h : IsAffineOpen (f ⁻¹ᵁ U)) (r : Γ(Y, U)) : haveI := hU.isLocalization_basicOpen r haveI := h.isLocalization_basicOpen (f.app U r) f.app (Y.basicOpen r) = (CommRingCat.ofHom (IsLocalization.Away.map Γ(Y, Y.basicOpen r) Γ(X, X.basicOpen (f.app U r)) (f.app U).hom r) ≫ X.presheaf.map (eqToHom (by simp)).op) := by haveI := hU.isLocalization_basicOpen r haveI := h.isLocalization_basicOpen (f.app U r) ext : 1 apply IsLocalization.ringHom_ext (.powers r) rw [IsLocalization.Away.map, CommRingCat.hom_comp, RingHom.comp_assoc, CommRingCat.hom_ofHom, IsLocalization.map_comp, RingHom.algebraMap_toAlgebra, RingHom.algebraMap_toAlgebra, ← RingHom.comp_assoc, ← CommRingCat.hom_comp, ← CommRingCat.hom_comp, ← X.presheaf.map_comp] simp /-- `f.app (Y.basicOpen r)` is isomorphic to map induced on localizations `Γ(Y, Y.basicOpen r) ⟶ Γ(X, X.basicOpen (f.app U r))` -/ def appBasicOpenIsoAwayMap {X Y : Scheme.{u}} (f : X ⟶ Y) {U : Y.Opens} (hU : IsAffineOpen U) (h : IsAffineOpen (f ⁻¹ᵁ U)) (r : Γ(Y, U)) : haveI := hU.isLocalization_basicOpen r haveI := h.isLocalization_basicOpen (f.app U r) Arrow.mk (f.app (Y.basicOpen r)) ≅ Arrow.mk (CommRingCat.ofHom (IsLocalization.Away.map Γ(Y, Y.basicOpen r) Γ(X, X.basicOpen (f.app U r)) (f.app U).hom r)) :=	Mathlib/AlgebraicGeometry/AffineScheme.lean	641	669
/- Copyright (c) 2018 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Mario Carneiro, Simon Hudon -/ import Mathlib.Data.Fin.Fin2 import Mathlib.Logic.Function.Basic import Mathlib.Tactic.Common /-! # Tuples of types, and their categorical structure. ## Features * `TypeVec n` - n-tuples of types * `α ⟹ β` - n-tuples of maps * `f ⊚ g` - composition Also, support functions for operating with n-tuples of types, such as: * `append1 α β` - append type `β` to n-tuple `α` to obtain an (n+1)-tuple * `drop α` - drops the last element of an (n+1)-tuple * `last α` - returns the last element of an (n+1)-tuple * `appendFun f g` - appends a function g to an n-tuple of functions * `dropFun f` - drops the last function from an n+1-tuple * `lastFun f` - returns the last function of a tuple. Since e.g. `append1 α.drop α.last` is propositionally equal to `α` but not definitionally equal to it, we need support functions and lemmas to mediate between constructions. -/ universe u v w /-- n-tuples of types, as a category -/ @[pp_with_univ] def TypeVec (n : ℕ) := Fin2 n → Type* instance {n} : Inhabited (TypeVec.{u} n) := ⟨fun _ => PUnit⟩ namespace TypeVec variable {n : ℕ} /-- arrow in the category of `TypeVec` -/ def Arrow (α β : TypeVec n) := ∀ i : Fin2 n, α i → β i @[inherit_doc] scoped[MvFunctor] infixl:40 " ⟹ " => TypeVec.Arrow open MvFunctor /-- Extensionality for arrows -/ @[ext] theorem Arrow.ext {α β : TypeVec n} (f g : α ⟹ β) : (∀ i, f i = g i) → f = g := by intro h; funext i; apply h instance Arrow.inhabited (α β : TypeVec n) [∀ i, Inhabited (β i)] : Inhabited (α ⟹ β) := ⟨fun _ _ => default⟩ /-- identity of arrow composition -/ def id {α : TypeVec n} : α ⟹ α := fun _ x => x /-- arrow composition in the category of `TypeVec` -/ def comp {α β γ : TypeVec n} (g : β ⟹ γ) (f : α ⟹ β) : α ⟹ γ := fun i x => g i (f i x) @[inherit_doc] scoped[MvFunctor] infixr:80 " ⊚ " => TypeVec.comp -- type as \oo @[simp] theorem id_comp {α β : TypeVec n} (f : α ⟹ β) : id ⊚ f = f := rfl @[simp] theorem comp_id {α β : TypeVec n} (f : α ⟹ β) : f ⊚ id = f := rfl theorem comp_assoc {α β γ δ : TypeVec n} (h : γ ⟹ δ) (g : β ⟹ γ) (f : α ⟹ β) : (h ⊚ g) ⊚ f = h ⊚ g ⊚ f := rfl /-- Support for extending a `TypeVec` by one element. -/ def append1 (α : TypeVec n) (β : Type) : TypeVec (n + 1) \| Fin2.fs i => α i \| Fin2.fz => β @[inherit_doc] infixl:67 " ::: " => append1 /-- retain only a `n-length` prefix of the argument -/ def drop (α : TypeVec.{u} (n + 1)) : TypeVec n := fun i => α i.fs /-- take the last value of a `(n+1)-length` vector -/ def last (α : TypeVec.{u} (n + 1)) : Type _ := α Fin2.fz instance last.inhabited (α : TypeVec (n + 1)) [Inhabited (α Fin2.fz)] : Inhabited (last α) := ⟨show α Fin2.fz from default⟩ theorem drop_append1 {α : TypeVec n} {β : Type} {i : Fin2 n} : drop (append1 α β) i = α i := rfl theorem drop_append1' {α : TypeVec n} {β : Type} : drop (append1 α β) = α := funext fun _ => drop_append1 theorem last_append1 {α : TypeVec n} {β : Type} : last (append1 α β) = β := rfl @[simp] theorem append1_drop_last (α : TypeVec (n + 1)) : append1 (drop α) (last α) = α := funext fun i => by cases i <;> rfl /-- cases on `(n+1)-length` vectors -/ @[elab_as_elim] def append1Cases {C : TypeVec (n + 1) → Sort u} (H : ∀ α β, C (append1 α β)) (γ) : C γ := by rw [← @append1_drop_last _ γ]; apply H @[simp] theorem append1_cases_append1 {C : TypeVec (n + 1) → Sort u} (H : ∀ α β, C (append1 α β)) (α β) : @append1Cases _ C H (append1 α β) = H α β := rfl /-- append an arrow and a function for arbitrary source and target type vectors -/ def splitFun {α α' : TypeVec (n + 1)} (f : drop α ⟹ drop α') (g : last α → last α') : α ⟹ α' \| Fin2.fs i => f i \| Fin2.fz => g /-- append an arrow and a function as well as their respective source and target types / typevecs -/ def appendFun {α α' : TypeVec n} {β β' : Type} (f : α ⟹ α') (g : β → β') : append1 α β ⟹ append1 α' β' := splitFun f g @[inherit_doc] infixl:0 " ::: " => appendFun /-- split off the prefix of an arrow -/ def dropFun {α β : TypeVec (n + 1)} (f : α ⟹ β) : drop α ⟹ drop β := fun i => f i.fs /-- split off the last function of an arrow -/ def lastFun {α β : TypeVec (n + 1)} (f : α ⟹ β) : last α → last β := f Fin2.fz /-- arrow in the category of `0-length` vectors -/ def nilFun {α : TypeVec 0} {β : TypeVec 0} : α ⟹ β := fun i => by apply Fin2.elim0 i theorem eq_of_drop_last_eq {α β : TypeVec (n + 1)} {f g : α ⟹ β} (h₀ : dropFun f = dropFun g) (h₁ : lastFun f = lastFun g) : f = g := by refine funext (fun x => ?_) cases x · apply h₁ · apply congr_fun h₀ @[simp] theorem dropFun_splitFun {α α' : TypeVec (n + 1)} (f : drop α ⟹ drop α') (g : last α → last α') : dropFun (splitFun f g) = f := rfl /-- turn an equality into an arrow -/ def Arrow.mp {α β : TypeVec n} (h : α = β) : α ⟹ β \| _ => Eq.mp (congr_fun h _) /-- turn an equality into an arrow, with reverse direction -/ def Arrow.mpr {α β : TypeVec n} (h : α = β) : β ⟹ α \| _ => Eq.mpr (congr_fun h _) /-- decompose a vector into its prefix appended with its last element -/ def toAppend1DropLast {α : TypeVec (n + 1)} : α ⟹ (drop α ::: last α) := Arrow.mpr (append1_drop_last _) /-- stitch two bits of a vector back together -/ def fromAppend1DropLast {α : TypeVec (n + 1)} : (drop α ::: last α) ⟹ α := Arrow.mp (append1_drop_last _) @[simp] theorem lastFun_splitFun {α α' : TypeVec (n + 1)} (f : drop α ⟹ drop α') (g : last α → last α') : lastFun (splitFun f g) = g := rfl @[simp] theorem dropFun_appendFun {α α' : TypeVec n} {β β' : Type} (f : α ⟹ α') (g : β → β') : dropFun (f ::: g) = f := rfl @[simp] theorem lastFun_appendFun {α α' : TypeVec n} {β β' : Type} (f : α ⟹ α') (g : β → β') : lastFun (f ::: g) = g := rfl theorem split_dropFun_lastFun {α α' : TypeVec (n + 1)} (f : α ⟹ α') : splitFun (dropFun f) (lastFun f) = f := eq_of_drop_last_eq rfl rfl theorem splitFun_inj {α α' : TypeVec (n + 1)} {f f' : drop α ⟹ drop α'} {g g' : last α → last α'} (H : splitFun f g = splitFun f' g') : f = f' ∧ g = g' := by rw [← dropFun_splitFun f g, H, ← lastFun_splitFun f g, H]; simp theorem appendFun_inj {α α' : TypeVec n} {β β' : Type} {f f' : α ⟹ α'} {g g' : β → β'} : (f ::: g : (α ::: β) ⟹ _) = (f' ::: g' : (α ::: β) ⟹ _) → f = f' ∧ g = g' := splitFun_inj theorem splitFun_comp {α₀ α₁ α₂ : TypeVec (n + 1)} (f₀ : drop α₀ ⟹ drop α₁) (f₁ : drop α₁ ⟹ drop α₂) (g₀ : last α₀ → last α₁) (g₁ : last α₁ → last α₂) : splitFun (f₁ ⊚ f₀) (g₁ ∘ g₀) = splitFun f₁ g₁ ⊚ splitFun f₀ g₀ := eq_of_drop_last_eq rfl rfl theorem appendFun_comp_splitFun {α γ : TypeVec n} {β δ : Type} {ε : TypeVec (n + 1)} (f₀ : drop ε ⟹ α) (f₁ : α ⟹ γ) (g₀ : last ε → β) (g₁ : β → δ) : appendFun f₁ g₁ ⊚ splitFun f₀ g₀ = splitFun (α' := γ.append1 δ) (f₁ ⊚ f₀) (g₁ ∘ g₀) := (splitFun_comp _ _ _ _).symm theorem appendFun_comp {α₀ α₁ α₂ : TypeVec n} {β₀ β₁ β₂ : Type} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) (g₀ : β₀ → β₁) (g₁ : β₁ → β₂) : (f₁ ⊚ f₀ ::: g₁ ∘ g₀) = (f₁ ::: g₁) ⊚ (f₀ ::: g₀) := eq_of_drop_last_eq rfl rfl theorem appendFun_comp' {α₀ α₁ α₂ : TypeVec n} {β₀ β₁ β₂ : Type} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) (g₀ : β₀ → β₁) (g₁ : β₁ → β₂) : (f₁ ::: g₁) ⊚ (f₀ ::: g₀) = (f₁ ⊚ f₀ ::: g₁ ∘ g₀) := eq_of_drop_last_eq rfl rfl theorem nilFun_comp {α₀ : TypeVec 0} (f₀ : α₀ ⟹ Fin2.elim0) : nilFun ⊚ f₀ = f₀ := funext Fin2.elim0 theorem appendFun_comp_id {α : TypeVec n} {β₀ β₁ β₂ : Type u} (g₀ : β₀ → β₁) (g₁ : β₁ → β₂) : (@id _ α ::: g₁ ∘ g₀) = (id ::: g₁) ⊚ (id ::: g₀) := eq_of_drop_last_eq rfl rfl @[simp] theorem dropFun_comp {α₀ α₁ α₂ : TypeVec (n + 1)} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) : dropFun (f₁ ⊚ f₀) = dropFun f₁ ⊚ dropFun f₀ := rfl @[simp] theorem lastFun_comp {α₀ α₁ α₂ : TypeVec (n + 1)} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) : lastFun (f₁ ⊚ f₀) = lastFun f₁ ∘ lastFun f₀ := rfl theorem appendFun_aux {α α' : TypeVec n} {β β' : Type} (f : (α ::: β) ⟹ (α' ::: β')) : (dropFun f ::: lastFun f) = f := eq_of_drop_last_eq rfl rfl theorem appendFun_id_id {α : TypeVec n} {β : Type} : (@TypeVec.id n α ::: @_root_.id β) = TypeVec.id := eq_of_drop_last_eq rfl rfl instance subsingleton0 : Subsingleton (TypeVec 0) := ⟨fun _ _ => funext Fin2.elim0⟩ -- See `Mathlib.Tactic.Attr.Register` for `register_simp_attr typevec` /-- cases distinction for 0-length type vector -/ protected def casesNil {β : TypeVec 0 → Sort} (f : β Fin2.elim0) : ∀ v, β v := fun v => cast (by congr; funext i; cases i) f /-- cases distinction for (n+1)-length type vector -/ protected def casesCons (n : ℕ) {β : TypeVec (n + 1) → Sort} (f : ∀ (t) (v : TypeVec n), β (v ::: t)) : ∀ v, β v := fun v : TypeVec (n + 1) => cast (by simp) (f v.last v.drop) protected theorem casesNil_append1 {β : TypeVec 0 → Sort} (f : β Fin2.elim0) : TypeVec.casesNil f Fin2.elim0 = f := rfl	protected theorem casesCons_append1 (n : ℕ) {β : TypeVec (n + 1) → Sort*}	Mathlib/Data/TypeVec.lean	266	267
/- 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 /-! ## Lemmas about factorizations of primes and prime powers -/ /-- The multiplicity of prime `p` in `p` is `1` -/ @[simp] theorem Prime.factorization_self {p : ℕ} (hp : Prime p) : p.factorization p = 1 := by simp [hp] /-- If the factorization of `n` contains just one number `p` then `n` is a power of `p` -/ theorem eq_pow_of_factorization_eq_single {n p k : ℕ} (hn : n ≠ 0) (h : n.factorization = Finsupp.single p k) : n = p ^ k := by rw [← Nat.factorization_prod_pow_eq_self hn, h] simp /-- The only prime factor of prime `p` is `p` itself. -/ theorem Prime.eq_of_factorization_pos {p q : ℕ} (hp : Prime p) (h : p.factorization q ≠ 0) : p = q := by simpa [hp.factorization, single_apply] using h /-! ### Equivalence between `ℕ+` and `ℕ →₀ ℕ` with support in the primes. -/ theorem eq_factorization_iff {n : ℕ} {f : ℕ →₀ ℕ} (hn : n ≠ 0) (hf : ∀ p ∈ f.support, Prime p) : f = n.factorization ↔ f.prod (· ^ ·) = n := ⟨fun h => by rw [h, factorization_prod_pow_eq_self hn], fun h => by rw [← h, prod_pow_factorization_eq_self hf]⟩ theorem factorizationEquiv_inv_apply {f : ℕ →₀ ℕ} (hf : ∀ p ∈ f.support, Prime p) : (factorizationEquiv.symm ⟨f, hf⟩).1 = f.prod (· ^ ·) := rfl @[simp] theorem ordProj_of_not_prime (n p : ℕ) (hp : ¬p.Prime) : ordProj[p] n = 1 := by simp [factorization_eq_zero_of_non_prime n hp] @[deprecated (since := "2024-10-24")] alias ord_proj_of_not_prime := ordProj_of_not_prime @[simp] theorem ordCompl_of_not_prime (n p : ℕ) (hp : ¬p.Prime) : ordCompl[p] n = n := by simp [factorization_eq_zero_of_non_prime n hp] @[deprecated (since := "2024-10-24")] alias ord_compl_of_not_prime := ordCompl_of_not_prime theorem ordCompl_dvd (n p : ℕ) : ordCompl[p] n ∣ n := div_dvd_of_dvd (ordProj_dvd n p) @[deprecated (since := "2024-10-24")] alias ord_compl_dvd := ordCompl_dvd theorem ordProj_pos (n p : ℕ) : 0 < ordProj[p] n := by if pp : p.Prime then simp [pow_pos pp.pos] else simp [pp] @[deprecated (since := "2024-10-24")] alias ord_proj_pos := ordProj_pos theorem ordProj_le {n : ℕ} (p : ℕ) (hn : n ≠ 0) : ordProj[p] n ≤ n := le_of_dvd hn.bot_lt (Nat.ordProj_dvd n p) @[deprecated (since := "2024-10-24")] alias ord_proj_le := ordProj_le theorem ordCompl_pos {n : ℕ} (p : ℕ) (hn : n ≠ 0) : 0 < ordCompl[p] n := by if pp : p.Prime then exact Nat.div_pos (ordProj_le p hn) (ordProj_pos n p) else simpa [Nat.factorization_eq_zero_of_non_prime n pp] using hn.bot_lt @[deprecated (since := "2024-10-24")] alias ord_compl_pos := ordCompl_pos theorem ordCompl_le (n p : ℕ) : ordCompl[p] n ≤ n := Nat.div_le_self _ _ @[deprecated (since := "2024-10-24")] alias ord_compl_le := ordCompl_le theorem ordProj_mul_ordCompl_eq_self (n p : ℕ) : ordProj[p] n * ordCompl[p] n = n := Nat.mul_div_cancel' (ordProj_dvd n p) @[deprecated (since := "2024-10-24")] alias ord_proj_mul_ord_compl_eq_self := ordProj_mul_ordCompl_eq_self theorem ordProj_mul {a b : ℕ} (p : ℕ) (ha : a ≠ 0) (hb : b ≠ 0) : ordProj[p] (a * b) = ordProj[p] a * ordProj[p] b := by simp [factorization_mul ha hb, pow_add] @[deprecated (since := "2024-10-24")] alias ord_proj_mul := ordProj_mul theorem ordCompl_mul (a b p : ℕ) : ordCompl[p] (a * b) = ordCompl[p] a * ordCompl[p] b := by if ha : a = 0 then simp [ha] else if hb : b = 0 then simp [hb] else simp only [ordProj_mul p ha hb] rw [div_mul_div_comm (ordProj_dvd a p) (ordProj_dvd b p)] @[deprecated (since := "2024-10-24")] alias ord_compl_mul := ordCompl_mul /-! ### Factorization and divisibility -/ /-- A crude upper bound on `n.factorization p` -/ theorem factorization_lt {n : ℕ} (p : ℕ) (hn : n ≠ 0) : n.factorization p < n := by by_cases pp : p.Prime · exact (Nat.pow_lt_pow_iff_right pp.one_lt).1 <\| (ordProj_le p hn).trans_lt <\| Nat.lt_pow_self pp.one_lt · simpa only [factorization_eq_zero_of_non_prime n pp] using hn.bot_lt /-- An upper bound on `n.factorization p` -/ theorem factorization_le_of_le_pow {n p b : ℕ} (hb : n ≤ p ^ b) : n.factorization p ≤ b := by if hn : n = 0 then simp [hn] else if pp : p.Prime then exact (Nat.pow_le_pow_iff_right pp.one_lt).1 ((ordProj_le p hn).trans hb) else simp [factorization_eq_zero_of_non_prime n pp] theorem factorization_prime_le_iff_dvd {d n : ℕ} (hd : d ≠ 0) (hn : n ≠ 0) : (∀ p : ℕ, p.Prime → d.factorization p ≤ n.factorization p) ↔ d ∣ n := by rw [← factorization_le_iff_dvd hd hn] refine ⟨fun h p => (em p.Prime).elim (h p) fun hp => ?_, fun h p _ => h p⟩ simp_rw [factorization_eq_zero_of_non_prime _ hp] rfl theorem factorization_le_factorization_mul_left {a b : ℕ} (hb : b ≠ 0) : a.factorization ≤ (a * b).factorization := by rcases eq_or_ne a 0 with (rfl \| ha) · simp rw [factorization_le_iff_dvd ha <\| mul_ne_zero ha hb] exact Dvd.intro b rfl theorem factorization_le_factorization_mul_right {a b : ℕ} (ha : a ≠ 0) : b.factorization ≤ (a * b).factorization := by rw [mul_comm] apply factorization_le_factorization_mul_left ha theorem Prime.pow_dvd_iff_le_factorization {p k n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ^ k ∣ n ↔ k ≤ n.factorization p := by rw [← factorization_le_iff_dvd (pow_pos pp.pos k).ne' hn, pp.factorization_pow, single_le_iff] theorem Prime.pow_dvd_iff_dvd_ordProj {p k n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ^ k ∣ n ↔ p ^ k ∣ ordProj[p] n := by rw [pow_dvd_pow_iff_le_right pp.one_lt, pp.pow_dvd_iff_le_factorization hn] @[deprecated (since := "2024-10-24")] alias Prime.pow_dvd_iff_dvd_ord_proj := Prime.pow_dvd_iff_dvd_ordProj theorem Prime.dvd_iff_one_le_factorization {p n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ∣ n ↔ 1 ≤ n.factorization p := Iff.trans (by simp) (pp.pow_dvd_iff_le_factorization hn) theorem exists_factorization_lt_of_lt {a b : ℕ} (ha : a ≠ 0) (hab : a < b) : ∃ p : ℕ, a.factorization p < b.factorization p := by have hb : b ≠ 0 := (ha.bot_lt.trans hab).ne' contrapose! hab rw [← Finsupp.le_def, factorization_le_iff_dvd hb ha] at hab exact le_of_dvd ha.bot_lt hab @[simp] theorem factorization_div {d n : ℕ} (h : d ∣ n) : (n / d).factorization = n.factorization - d.factorization := by rcases eq_or_ne d 0 with (rfl \| hd); · simp [zero_dvd_iff.mp h] rcases eq_or_ne n 0 with (rfl \| hn); · simp [tsub_eq_zero_of_le] apply add_left_injective d.factorization simp only rw [tsub_add_cancel_of_le <\| (Nat.factorization_le_iff_dvd hd hn).mpr h, ← Nat.factorization_mul (Nat.div_pos (Nat.le_of_dvd hn.bot_lt h) hd.bot_lt).ne' hd, Nat.div_mul_cancel h] theorem dvd_ordProj_of_dvd {n p : ℕ} (hn : n ≠ 0) (pp : p.Prime) (h : p ∣ n) : p ∣ ordProj[p] n := dvd_pow_self p (Prime.factorization_pos_of_dvd pp hn h).ne' @[deprecated (since := "2024-10-24")] alias dvd_ord_proj_of_dvd := dvd_ordProj_of_dvd theorem not_dvd_ordCompl {n p : ℕ} (hp : Prime p) (hn : n ≠ 0) : ¬p ∣ ordCompl[p] n := by rw [Nat.Prime.dvd_iff_one_le_factorization hp (ordCompl_pos p hn).ne'] rw [Nat.factorization_div (Nat.ordProj_dvd n p)] simp [hp.factorization] @[deprecated (since := "2024-10-24")] alias not_dvd_ord_compl := not_dvd_ordCompl theorem coprime_ordCompl {n p : ℕ} (hp : Prime p) (hn : n ≠ 0) : Coprime p (ordCompl[p] n) := (or_iff_left (not_dvd_ordCompl hp hn)).mp <\| coprime_or_dvd_of_prime hp _ @[deprecated (since := "2024-10-24")] alias coprime_ord_compl := coprime_ordCompl theorem factorization_ordCompl (n p : ℕ) : (ordCompl[p] n).factorization = n.factorization.erase p := by if hn : n = 0 then simp [hn] else if pp : p.Prime then ?_ else simp [pp] ext q rcases eq_or_ne q p with (rfl \| hqp) · simp only [Finsupp.erase_same, factorization_eq_zero_iff, not_dvd_ordCompl pp hn] simp · rw [Finsupp.erase_ne hqp, factorization_div (ordProj_dvd n p)] simp [pp.factorization, hqp.symm] @[deprecated (since := "2024-10-24")] alias factorization_ord_compl := factorization_ordCompl -- `ordCompl[p] n` is the largest divisor of `n` not divisible by `p`. theorem dvd_ordCompl_of_dvd_not_dvd {p d n : ℕ} (hdn : d ∣ n) (hpd : ¬p ∣ d) : d ∣ ordCompl[p] n := by if hn0 : n = 0 then simp [hn0] else if hd0 : d = 0 then simp [hd0] at hpd else rw [← factorization_le_iff_dvd hd0 (ordCompl_pos p hn0).ne', factorization_ordCompl] intro q if hqp : q = p then simp [factorization_eq_zero_iff, hqp, hpd] else simp [hqp, (factorization_le_iff_dvd hd0 hn0).2 hdn q] @[deprecated (since := "2024-10-24")] alias dvd_ord_compl_of_dvd_not_dvd := dvd_ordCompl_of_dvd_not_dvd /-- If `n` is a nonzero natural number and `p ≠ 1`, then there are natural numbers `e` and `n'` such that `n'` is not divisible by `p` and `n = p^e * n'`. -/ theorem exists_eq_pow_mul_and_not_dvd {n : ℕ} (hn : n ≠ 0) (p : ℕ) (hp : p ≠ 1) : ∃ e n' : ℕ, ¬p ∣ n' ∧ n = p ^ e * n' := let ⟨a', h₁, h₂⟩ := (Nat.finiteMultiplicity_iff.mpr ⟨hp, Nat.pos_of_ne_zero hn⟩).exists_eq_pow_mul_and_not_dvd ⟨_, a', h₂, h₁⟩ /-- Any nonzero natural number is the product of an odd part `m` and a power of two `2 ^ k`. -/ theorem exists_eq_two_pow_mul_odd {n : ℕ} (hn : n ≠ 0) : ∃ k m : ℕ, Odd m ∧ n = 2 ^ k * m := let ⟨k, m, hm, hn⟩ := exists_eq_pow_mul_and_not_dvd hn 2 (succ_ne_self 1) ⟨k, m, not_even_iff_odd.1 (mt Even.two_dvd hm), hn⟩ theorem dvd_iff_div_factorization_eq_tsub {d n : ℕ} (hd : d ≠ 0) (hdn : d ≤ n) : d ∣ n ↔ (n / d).factorization = n.factorization - d.factorization := by refine ⟨factorization_div, ?_⟩ rcases eq_or_lt_of_le hdn with (rfl \| hd_lt_n); · simp have h1 : n / d ≠ 0 := by simp [] intro h rw [dvd_iff_le_div_mul n d] by_contra h2 obtain ⟨p, hp⟩ := exists_factorization_lt_of_lt (mul_ne_zero h1 hd) (not_le.mp h2) rwa [factorization_mul h1 hd, add_apply, ← lt_tsub_iff_right, h, tsub_apply, lt_self_iff_false] at hp theorem ordProj_dvd_ordProj_of_dvd {a b : ℕ} (hb0 : b ≠ 0) (hab : a ∣ b) (p : ℕ) : ordProj[p] a ∣ ordProj[p] b := by rcases em' p.Prime with (pp \| pp); · simp [pp] rcases eq_or_ne a 0 with (rfl \| ha0); · simp rw [pow_dvd_pow_iff_le_right pp.one_lt] exact (factorization_le_iff_dvd ha0 hb0).2 hab p @[deprecated (since := "2024-10-24")] alias ord_proj_dvd_ord_proj_of_dvd := ordProj_dvd_ordProj_of_dvd theorem ordProj_dvd_ordProj_iff_dvd {a b : ℕ} (ha0 : a ≠ 0) (hb0 : b ≠ 0) : (∀ p : ℕ, ordProj[p] a ∣ ordProj[p] b) ↔ a ∣ b := by refine ⟨fun h => ?_, fun hab p => ordProj_dvd_ordProj_of_dvd hb0 hab p⟩ rw [← factorization_le_iff_dvd ha0 hb0] intro q rcases le_or_lt q 1 with (hq_le \| hq1) · interval_cases q <;> simp exact (pow_dvd_pow_iff_le_right hq1).1 (h q) @[deprecated (since := "2024-10-24")] alias ord_proj_dvd_ord_proj_iff_dvd := ordProj_dvd_ordProj_iff_dvd theorem ordCompl_dvd_ordCompl_of_dvd {a b : ℕ} (hab : a ∣ b) (p : ℕ) : ordCompl[p] a ∣ ordCompl[p] b := by rcases em' p.Prime with (pp \| pp) · simp [pp, hab] rcases eq_or_ne b 0 with (rfl \| hb0) · simp rcases eq_or_ne a 0 with (rfl \| ha0) · cases hb0 (zero_dvd_iff.1 hab) have ha := (Nat.div_pos (ordProj_le p ha0) (ordProj_pos a p)).ne' have hb := (Nat.div_pos (ordProj_le p hb0) (ordProj_pos b p)).ne' rw [← factorization_le_iff_dvd ha hb, factorization_ordCompl a p, factorization_ordCompl b p] intro q rcases eq_or_ne q p with (rfl \| hqp) · simp simp_rw [erase_ne hqp] exact (factorization_le_iff_dvd ha0 hb0).2 hab q @[deprecated (since := "2024-10-24")] alias ord_compl_dvd_ord_compl_of_dvd := ordCompl_dvd_ordCompl_of_dvd theorem ordCompl_dvd_ordCompl_iff_dvd (a b : ℕ) : (∀ p : ℕ, ordCompl[p] a ∣ ordCompl[p] b) ↔ a ∣ b := by refine ⟨fun h => ?_, fun hab p => ordCompl_dvd_ordCompl_of_dvd hab p⟩ rcases eq_or_ne b 0 with (rfl \| hb0) · simp if pa : a.Prime then ?_ else simpa [pa] using h a if pb : b.Prime then ?_ else simpa [pb] using h b rw [prime_dvd_prime_iff_eq pa pb] by_contra hab apply pa.ne_one rw [← Nat.dvd_one, ← Nat.mul_dvd_mul_iff_left hb0.bot_lt, mul_one] simpa [Prime.factorization_self pb, Prime.factorization pa, hab] using h b @[deprecated (since := "2024-10-24")] alias ord_compl_dvd_ord_compl_iff_dvd := ordCompl_dvd_ordCompl_iff_dvd theorem dvd_iff_prime_pow_dvd_dvd (n d : ℕ) : d ∣ n ↔ ∀ p k : ℕ, Prime p → p ^ k ∣ d → p ^ k ∣ n := by rcases eq_or_ne n 0 with (rfl \| hn) · simp rcases eq_or_ne d 0 with (rfl \| hd) · simp only [zero_dvd_iff, hn, false_iff, not_forall] exact ⟨2, n, prime_two, dvd_zero _, mt (le_of_dvd hn.bot_lt) (n.lt_two_pow_self).not_le⟩ refine ⟨fun h p k _ hpkd => dvd_trans hpkd h, ?_⟩ rw [← factorization_prime_le_iff_dvd hd hn] intro h p pp simp_rw [← pp.pow_dvd_iff_le_factorization hn] exact h p _ pp (ordProj_dvd _ _) theorem prod_primeFactors_dvd (n : ℕ) : ∏ p ∈ n.primeFactors, p ∣ n := by by_cases hn : n = 0 · subst hn simp · simpa [prod_primeFactorsList hn] using (n.primeFactorsList : Multiset ℕ).toFinset_prod_dvd_prod theorem factorization_gcd {a b : ℕ} (ha_pos : a ≠ 0) (hb_pos : b ≠ 0) : (gcd a b).factorization = a.factorization ⊓ b.factorization := by let dfac := a.factorization ⊓ b.factorization let d := dfac.prod (· ^ ·) have dfac_prime : ∀ p : ℕ, p ∈ dfac.support → Prime p := by intro p hp have : p ∈ a.primeFactorsList ∧ p ∈ b.primeFactorsList := by simpa [dfac] using hp exact prime_of_mem_primeFactorsList this.1 have h1 : d.factorization = dfac := prod_pow_factorization_eq_self dfac_prime have hd_pos : d ≠ 0 := (factorizationEquiv.invFun ⟨dfac, dfac_prime⟩).2.ne' suffices d = gcd a b by rwa [← this] apply gcd_greatest · rw [← factorization_le_iff_dvd hd_pos ha_pos, h1] exact inf_le_left · rw [← factorization_le_iff_dvd hd_pos hb_pos, h1] exact inf_le_right · intro e hea heb rcases Decidable.eq_or_ne e 0 with (rfl \| he_pos) · simp only [zero_dvd_iff] at hea contradiction have hea' := (factorization_le_iff_dvd he_pos ha_pos).mpr hea have heb' := (factorization_le_iff_dvd he_pos hb_pos).mpr heb simp [dfac, ← factorization_le_iff_dvd he_pos hd_pos, h1, hea', heb'] theorem factorization_lcm {a b : ℕ} (ha : a ≠ 0) (hb : b ≠ 0) : (a.lcm b).factorization = a.factorization ⊔ b.factorization := by rw [← add_right_inj (a.gcd b).factorization, ← factorization_mul (mt gcd_eq_zero_iff.1 fun h => ha h.1) (lcm_ne_zero ha hb), gcd_mul_lcm, factorization_gcd ha hb, factorization_mul ha hb] ext1 exact (min_add_max _ _).symm variable (a b) @[simp] lemma factorizationLCMLeft_zero_left : factorizationLCMLeft 0 b = 1 := by simp [factorizationLCMLeft] @[simp] lemma factorizationLCMLeft_zero_right : factorizationLCMLeft a 0 = 1 := by simp [factorizationLCMLeft] @[simp] lemma factorizationLCRight_zero_left : factorizationLCMRight 0 b = 1 := by simp [factorizationLCMRight] @[simp] lemma factorizationLCMRight_zero_right : factorizationLCMRight a 0 = 1 := by simp [factorizationLCMRight] lemma factorizationLCMLeft_pos : 0 < factorizationLCMLeft a b := by apply Nat.pos_of_ne_zero rw [factorizationLCMLeft, Finsupp.prod_ne_zero_iff] intro p _ H by_cases h : b.factorization p ≤ a.factorization p · simp only [h, reduceIte, pow_eq_zero_iff', ne_eq] at H simpa [H.1] using H.2 · simp only [h, reduceIte, one_ne_zero] at H lemma factorizationLCMRight_pos : 0 < factorizationLCMRight a b := by apply Nat.pos_of_ne_zero rw [factorizationLCMRight, Finsupp.prod_ne_zero_iff] intro p _ H by_cases h : b.factorization p ≤ a.factorization p · simp only [h, reduceIte, pow_eq_zero_iff', ne_eq, reduceCtorEq] at H · simp only [h, ↓reduceIte, pow_eq_zero_iff', ne_eq] at H simpa [H.1] using H.2 lemma coprime_factorizationLCMLeft_factorizationLCMRight : (factorizationLCMLeft a b).Coprime (factorizationLCMRight a b) := by rw [factorizationLCMLeft, factorizationLCMRight] refine coprime_prod_left_iff.mpr fun p hp ↦ coprime_prod_right_iff.mpr fun q hq ↦ ?_ dsimp only; split_ifs with h h' any_goals simp only [coprime_one_right_eq_true, coprime_one_left_eq_true] refine coprime_pow_primes _ _ (prime_of_mem_primeFactors hp) (prime_of_mem_primeFactors hq) ?_ contrapose! h'; rwa [← h'] variable {a b} lemma factorizationLCMLeft_mul_factorizationLCMRight (ha : a ≠ 0) (hb : b ≠ 0) : (factorizationLCMLeft a b) (factorizationLCMRight a b) = lcm a b := by rw [← factorization_prod_pow_eq_self (lcm_ne_zero ha hb), factorizationLCMLeft, factorizationLCMRight, ← prod_mul] congr; ext p n; split_ifs <;> simp variable (a b) lemma factorizationLCMLeft_dvd_left : factorizationLCMLeft a b ∣ a := by rcases eq_or_ne a 0 with rfl \| ha · simp only [dvd_zero] rcases eq_or_ne b 0 with rfl \| hb · simp [factorizationLCMLeft] nth_rewrite 2 [← factorization_prod_pow_eq_self ha] rw [prod_of_support_subset (s := (lcm a b).factorization.support)] · apply prod_dvd_prod_of_dvd; rintro p -; dsimp only; split_ifs with le · rw [factorization_lcm ha hb]; apply pow_dvd_pow; exact sup_le le_rfl le · apply one_dvd · intro p hp; rw [mem_support_iff] at hp ⊢ rw [factorization_lcm ha hb]; exact (lt_sup_iff.mpr <\| .inl <\| Nat.pos_of_ne_zero hp).ne' · intros; rw [pow_zero] lemma factorizationLCMRight_dvd_right : factorizationLCMRight a b ∣ b := by rcases eq_or_ne a 0 with rfl \| ha · simp [factorizationLCMRight] rcases eq_or_ne b 0 with rfl \| hb · simp only [dvd_zero] nth_rewrite 2 [← factorization_prod_pow_eq_self hb] rw [prod_of_support_subset (s := (lcm a b).factorization.support)] · apply Finset.prod_dvd_prod_of_dvd; rintro p -; dsimp only; split_ifs with le · apply one_dvd · rw [factorization_lcm ha hb]; apply pow_dvd_pow; exact sup_le (not_le.1 le).le le_rfl · intro p hp; rw [mem_support_iff] at hp ⊢ rw [factorization_lcm ha hb]; exact (lt_sup_iff.mpr <\| .inr <\| Nat.pos_of_ne_zero hp).ne' · intros; rw [pow_zero] @[to_additive sum_primeFactors_gcd_add_sum_primeFactors_mul] theorem prod_primeFactors_gcd_mul_prod_primeFactors_mul {β : Type} [CommMonoid β] (m n : ℕ) (f : ℕ → β) : (m.gcd n).primeFactors.prod f (m * n).primeFactors.prod f = m.primeFactors.prod f * n.primeFactors.prod f := by obtain rfl \| hm₀ := eq_or_ne m 0 · simp obtain rfl \| hn₀ := eq_or_ne n 0 · simp · rw [primeFactors_mul hm₀ hn₀, primeFactors_gcd hm₀ hn₀, mul_comm, Finset.prod_union_inter] theorem setOf_pow_dvd_eq_Icc_factorization {n p : ℕ} (pp : p.Prime) (hn : n ≠ 0) : { i : ℕ \| i ≠ 0 ∧ p ^ i ∣ n } = Set.Icc 1 (n.factorization p) := by ext simp [Nat.lt_succ_iff, one_le_iff_ne_zero, pp.pow_dvd_iff_le_factorization hn] /-- The set of positive powers of prime `p` that divide `n` is exactly the set of positive natural numbers up to `n.factorization p`. -/ theorem Icc_factorization_eq_pow_dvd (n : ℕ) {p : ℕ} (pp : Prime p) : Icc 1 (n.factorization p) = {i ∈ Ico 1 n \| p ^ i ∣ n} := by rcases eq_or_ne n 0 with (rfl \| hn) · simp ext x simp only [mem_Icc, Finset.mem_filter, mem_Ico, and_assoc, and_congr_right_iff, pp.pow_dvd_iff_le_factorization hn, iff_and_self] exact fun _ H => lt_of_le_of_lt H (factorization_lt p hn) theorem factorization_eq_card_pow_dvd (n : ℕ) {p : ℕ} (pp : p.Prime) : n.factorization p = #{i ∈ Ico 1 n \| p ^ i ∣ n} := by simp [← Icc_factorization_eq_pow_dvd n pp] theorem Ico_filter_pow_dvd_eq {n p b : ℕ} (pp : p.Prime) (hn : n ≠ 0) (hb : n ≤ p ^ b) : {i ∈ Ico 1 n \| p ^ i ∣ n} = {i ∈ Icc 1 b \| p ^ i ∣ n} := by ext x simp only [Finset.mem_filter, mem_Ico, mem_Icc, and_congr_left_iff, and_congr_right_iff] rintro h1 - exact iff_of_true (lt_of_pow_dvd_right hn pp.two_le h1) <\| (Nat.pow_le_pow_iff_right pp.one_lt).1 <\| (le_of_dvd hn.bot_lt h1).trans hb /-! ### Factorization and coprimes -/ /-- If `p` is a prime factor of `a` then the power of `p` in `a` is the same that in `a * b`, for any `b` coprime to `a`. -/ theorem factorization_eq_of_coprime_left {p a b : ℕ} (hab : Coprime a b) (hpa : p ∈ a.primeFactorsList) : (a * b).factorization p = a.factorization p := by rw [factorization_mul_apply_of_coprime hab, ← primeFactorsList_count_eq, ← primeFactorsList_count_eq, count_eq_zero_of_not_mem (coprime_primeFactorsList_disjoint hab hpa), add_zero] /-- If `p` is a prime factor of `b` then the power of `p` in `b` is the same that in `a * b`, for any `a` coprime to `b`. -/ theorem factorization_eq_of_coprime_right {p a b : ℕ} (hab : Coprime a b) (hpb : p ∈ b.primeFactorsList) : (a * b).factorization p = b.factorization p := by rw [mul_comm] exact factorization_eq_of_coprime_left (coprime_comm.mp hab) hpb /-- Two positive naturals are equal if their prime padic valuations are equal -/ theorem eq_iff_prime_padicValNat_eq (a b : ℕ) (ha : a ≠ 0) (hb : b ≠ 0) : a = b ↔ ∀ p : ℕ, p.Prime → padicValNat p a = padicValNat p b := by constructor · rintro rfl simp · intro h refine eq_of_factorization_eq ha hb fun p => ?_ by_cases pp : p.Prime · simp [factorization_def, pp, h p pp] · simp [factorization_eq_zero_of_non_prime, pp] theorem prod_pow_prime_padicValNat (n : Nat) (hn : n ≠ 0) (m : Nat) (pr : n < m) : ∏ p ∈ range m with p.Prime, p ^ padicValNat p n = n := by nth_rw 2 [← factorization_prod_pow_eq_self hn] rw [eq_comm] apply Finset.prod_subset_one_on_sdiff · exact fun p hp => Finset.mem_filter.mpr ⟨Finset.mem_range.2 <\| pr.trans_le' <\| le_of_mem_primeFactors hp, prime_of_mem_primeFactors hp⟩ · intro p hp obtain ⟨hp1, hp2⟩ := Finset.mem_sdiff.mp hp rw [← factorization_def n (Finset.mem_filter.mp hp1).2] simp [Finsupp.not_mem_support_iff.mp hp2] · intro p hp simp [factorization_def n (prime_of_mem_primeFactors hp)] /-! ### Lemmas about factorizations of particular functions -/ -- TODO: Port lemmas from `Data/Nat/Multiplicity` to here, re-written in terms of `factorization` /-- Exactly `n / p` naturals in `[1, n]` are multiples of `p`. See `Nat.card_multiples'` for an alternative spelling of the statement. -/ theorem card_multiples (n p : ℕ) : #{e ∈ range n \| p ∣ e + 1} = n / p := by induction' n with n hn · simp simp [Nat.succ_div, add_ite, add_zero, Finset.range_succ, filter_insert, apply_ite card, card_insert_of_not_mem, hn] /-- Exactly `n / p` naturals in `(0, n]` are multiples of `p`. -/ theorem Ioc_filter_dvd_card_eq_div (n p : ℕ) : #{x ∈ Ioc 0 n \| p ∣ x} = n / p := by induction' n with n IH · simp -- TODO: Golf away `h1` after Yaël PRs a lemma asserting this have h1 : Ioc 0 n.succ = insert n.succ (Ioc 0 n) := by rcases n.eq_zero_or_pos with (rfl \| hn) · simp simp_rw [← Ico_succ_succ, Ico_insert_right (succ_le_succ hn.le), Ico_succ_right] simp [Nat.succ_div, add_ite, add_zero, h1, filter_insert, apply_ite card, card_insert_eq_ite, IH, Finset.mem_filter, mem_Ioc, not_le.2 (lt_add_one n)] /-- There are exactly `⌊N/n⌋` positive multiples of `n` that are `≤ N`. See `Nat.card_multiples` for a "shifted-by-one" version. -/ lemma card_multiples' (N n : ℕ) : #{k ∈ range N.succ \| k ≠ 0 ∧ n ∣ k} = N / n := by induction N with \| zero => simp [Finset.filter_false_of_mem] \| succ N ih => rw [Finset.range_succ, Finset.filter_insert] by_cases h : n ∣ N.succ · simp [h, succ_div_of_dvd, ih] · simp [h, succ_div_of_not_dvd, ih] end Nat		Mathlib/Data/Nat/Factorization/Basic.lean	767	775
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Group.Pi.Basic import Mathlib.Data.Set.BooleanAlgebra import Mathlib.Data.Set.Piecewise import Mathlib.Order.Interval.Set.Basic import Mathlib.Order.Interval.Set.UnorderedInterval /-! # Intervals in `pi`-space In this we prove various simple lemmas about intervals in `Π i, α i`. Closed intervals (`Ici x`, `Iic x`, `Icc x y`) are equal to products of their projections to `α i`, while (semi-)open intervals usually include the corresponding products as proper subsets. -/ -- Porting note: Added, since dot notation no longer works on `Function.update` open Function variable {ι : Type} {α : ι → Type} namespace Set section PiPreorder variable [∀ i, Preorder (α i)] (x y : ∀ i, α i) @[simp] theorem pi_univ_Ici : (pi univ fun i ↦ Ici (x i)) = Ici x := ext fun y ↦ by simp [Pi.le_def] @[simp] theorem pi_univ_Iic : (pi univ fun i ↦ Iic (x i)) = Iic x := ext fun y ↦ by simp [Pi.le_def] @[simp] theorem pi_univ_Icc : (pi univ fun i ↦ Icc (x i) (y i)) = Icc x y := ext fun y ↦ by simp [Pi.le_def, forall_and]	theorem piecewise_mem_Icc {s : Set ι} [∀ j, Decidable (j ∈ s)] {f₁ f₂ g₁ g₂ : ∀ i, α i} (h₁ : ∀ i ∈ s, f₁ i ∈ Icc (g₁ i) (g₂ i)) (h₂ : ∀ i ∉ s, f₂ i ∈ Icc (g₁ i) (g₂ i)) :	Mathlib/Order/Interval/Set/Pi.lean	43	44
/- Copyright (c) 2021 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash -/ import Mathlib.Algebra.Ring.Divisibility.Lemmas import Mathlib.Algebra.Lie.Nilpotent import Mathlib.Algebra.Lie.Engel import Mathlib.LinearAlgebra.Eigenspace.Pi import Mathlib.RingTheory.Artinian.Module import Mathlib.LinearAlgebra.Trace import Mathlib.LinearAlgebra.FreeModule.PID /-! # Weight spaces of Lie modules of nilpotent Lie algebras Just as a key tool when studying the behaviour of a linear operator is to decompose the space on which it acts into a sum of (generalised) eigenspaces, a key tool when studying a representation `M` of Lie algebra `L` is to decompose `M` into a sum of simultaneous eigenspaces of `x` as `x` ranges over `L`. These simultaneous generalised eigenspaces are known as the weight spaces of `M`. When `L` is nilpotent, it follows from the binomial theorem that weight spaces are Lie submodules. Basic definitions and properties of the above ideas are provided in this file. ## Main definitions * `LieModule.genWeightSpaceOf` * `LieModule.genWeightSpace` * `LieModule.Weight` * `LieModule.posFittingCompOf` * `LieModule.posFittingComp` * `LieModule.iSup_ucs_eq_genWeightSpace_zero` * `LieModule.iInf_lowerCentralSeries_eq_posFittingComp` * `LieModule.isCompl_genWeightSpace_zero_posFittingComp` * `LieModule.iSupIndep_genWeightSpace` * `LieModule.iSup_genWeightSpace_eq_top` ## References * [N. Bourbaki, Lie Groups and Lie Algebras, Chapters 7--9](bourbaki1975b) ## Tags lie character, eigenvalue, eigenspace, weight, weight vector, root, root vector -/ variable {K R L M : Type} [CommRing R] [LieRing L] [LieAlgebra R L] [AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M] namespace LieModule open Set Function TensorProduct LieModule variable (M) in /-- If `M` is a representation of a Lie algebra `L` and `χ : L → R` is a family of scalars, then `weightSpace M χ` is the intersection of the `χ x`-eigenspaces of the action of `x` on `M` as `x` ranges over `L`. -/ def weightSpace (χ : L → R) : LieSubmodule R L M where __ := ⨅ x : L, (toEnd R L M x).eigenspace (χ x) lie_mem {x m} hm := by simp_all [smul_comm (χ x)] lemma mem_weightSpace (χ : L → R) (m : M) : m ∈ weightSpace M χ ↔ ∀ x, ⁅x, m⁆ = χ x • m := by simp [weightSpace] section notation_genWeightSpaceOf /-- Until we define `LieModule.genWeightSpaceOf`, it is useful to have some notation as follows: -/ local notation3 "𝕎("M", " χ", " x")" => (toEnd R L M x).maxGenEigenspace χ /-- See also `bourbaki1975b` Chapter VII §1.1, Proposition 2 (ii). -/ protected theorem weight_vector_multiplication (M₁ M₂ M₃ : Type) [AddCommGroup M₁] [Module R M₁] [LieRingModule L M₁] [LieModule R L M₁] [AddCommGroup M₂] [Module R M₂] [LieRingModule L M₂] [LieModule R L M₂] [AddCommGroup M₃] [Module R M₃] [LieRingModule L M₃] [LieModule R L M₃] (g : M₁ ⊗[R] M₂ →ₗ⁅R,L⁆ M₃) (χ₁ χ₂ : R) (x : L) : LinearMap.range ((g : M₁ ⊗[R] M₂ →ₗ[R] M₃).comp (mapIncl 𝕎(M₁, χ₁, x) 𝕎(M₂, χ₂, x))) ≤ 𝕎(M₃, χ₁ + χ₂, x) := by -- Unpack the statement of the goal. intro m₃ simp only [TensorProduct.mapIncl, LinearMap.mem_range, LinearMap.coe_comp, LieModuleHom.coe_toLinearMap, Function.comp_apply, Pi.add_apply, exists_imp, Module.End.mem_maxGenEigenspace] rintro t rfl -- Set up some notation. let F : Module.End R M₃ := toEnd R L M₃ x - (χ₁ + χ₂) • ↑1 -- The goal is linear in `t` so use induction to reduce to the case that `t` is a pure tensor. refine t.induction_on ?_ ?_ ?_ · use 0; simp only [LinearMap.map_zero, LieModuleHom.map_zero] swap · rintro t₁ t₂ ⟨k₁, hk₁⟩ ⟨k₂, hk₂⟩; use max k₁ k₂ simp only [LieModuleHom.map_add, LinearMap.map_add, Module.End.pow_map_zero_of_le (le_max_left k₁ k₂) hk₁, Module.End.pow_map_zero_of_le (le_max_right k₁ k₂) hk₂, add_zero] -- Now the main argument: pure tensors. rintro ⟨m₁, hm₁⟩ ⟨m₂, hm₂⟩ change ∃ k, (F ^ k) ((g : M₁ ⊗[R] M₂ →ₗ[R] M₃) (m₁ ⊗ₜ m₂)) = (0 : M₃) -- Eliminate `g` from the picture. let f₁ : Module.End R (M₁ ⊗[R] M₂) := (toEnd R L M₁ x - χ₁ • ↑1).rTensor M₂ let f₂ : Module.End R (M₁ ⊗[R] M₂) := (toEnd R L M₂ x - χ₂ • ↑1).lTensor M₁ have h_comm_square : F ∘ₗ ↑g = (g : M₁ ⊗[R] M₂ →ₗ[R] M₃).comp (f₁ + f₂) := by ext m₁ m₂ simp only [f₁, f₂, F, ← g.map_lie x (m₁ ⊗ₜ m₂), add_smul, sub_tmul, tmul_sub, smul_tmul, lie_tmul_right, tmul_smul, toEnd_apply_apply, LieModuleHom.map_smul, Module.End.one_apply, LieModuleHom.coe_toLinearMap, LinearMap.smul_apply, Function.comp_apply, LinearMap.coe_comp, LinearMap.rTensor_tmul, LieModuleHom.map_add, LinearMap.add_apply, LieModuleHom.map_sub, LinearMap.sub_apply, LinearMap.lTensor_tmul, AlgebraTensorModule.curry_apply, TensorProduct.curry_apply, LinearMap.toFun_eq_coe, LinearMap.coe_restrictScalars] abel rsuffices ⟨k, hk⟩ : ∃ k : ℕ, ((f₁ + f₂) ^ k) (m₁ ⊗ₜ m₂) = 0 · use k change (F ^ k) (g.toLinearMap (m₁ ⊗ₜ[R] m₂)) = 0 rw [← LinearMap.comp_apply, Module.End.commute_pow_left_of_commute h_comm_square, LinearMap.comp_apply, hk, LinearMap.map_zero] -- Unpack the information we have about `m₁`, `m₂`. simp only [Module.End.mem_maxGenEigenspace] at hm₁ hm₂ obtain ⟨k₁, hk₁⟩ := hm₁ obtain ⟨k₂, hk₂⟩ := hm₂ have hf₁ : (f₁ ^ k₁) (m₁ ⊗ₜ m₂) = 0 := by simp only [f₁, hk₁, zero_tmul, LinearMap.rTensor_tmul, LinearMap.rTensor_pow] have hf₂ : (f₂ ^ k₂) (m₁ ⊗ₜ m₂) = 0 := by simp only [f₂, hk₂, tmul_zero, LinearMap.lTensor_tmul, LinearMap.lTensor_pow] -- It's now just an application of the binomial theorem. use k₁ + k₂ - 1 have hf_comm : Commute f₁ f₂ := by ext m₁ m₂ simp only [f₁, f₂, Module.End.mul_apply, LinearMap.rTensor_tmul, LinearMap.lTensor_tmul, AlgebraTensorModule.curry_apply, LinearMap.toFun_eq_coe, LinearMap.lTensor_tmul, TensorProduct.curry_apply, LinearMap.coe_restrictScalars] rw [hf_comm.add_pow'] simp only [TensorProduct.mapIncl, Submodule.subtype_apply, Finset.sum_apply, Submodule.coe_mk, LinearMap.coeFn_sum, TensorProduct.map_tmul, LinearMap.smul_apply] -- The required sum is zero because each individual term is zero. apply Finset.sum_eq_zero rintro ⟨i, j⟩ hij -- Eliminate the binomial coefficients from the picture. suffices (f₁ ^ i * f₂ ^ j) (m₁ ⊗ₜ m₂) = 0 by rw [this]; apply smul_zero -- Finish off with appropriate case analysis. rcases Nat.le_or_le_of_add_eq_add_pred (Finset.mem_antidiagonal.mp hij) with hi \| hj · rw [(hf_comm.pow_pow i j).eq, Module.End.mul_apply, Module.End.pow_map_zero_of_le hi hf₁, LinearMap.map_zero] · rw [Module.End.mul_apply, Module.End.pow_map_zero_of_le hj hf₂, LinearMap.map_zero] lemma lie_mem_maxGenEigenspace_toEnd {χ₁ χ₂ : R} {x y : L} {m : M} (hy : y ∈ 𝕎(L, χ₁, x)) (hm : m ∈ 𝕎(M, χ₂, x)) : ⁅y, m⁆ ∈ 𝕎(M, χ₁ + χ₂, x) := by apply LieModule.weight_vector_multiplication L M M (toModuleHom R L M) χ₁ χ₂ simp only [LieModuleHom.coe_toLinearMap, Function.comp_apply, LinearMap.coe_comp, TensorProduct.mapIncl, LinearMap.mem_range] use ⟨y, hy⟩ ⊗ₜ ⟨m, hm⟩ simp only [Submodule.subtype_apply, toModuleHom_apply, TensorProduct.map_tmul] variable (M) /-- If `M` is a representation of a nilpotent Lie algebra `L`, `χ` is a scalar, and `x : L`, then `genWeightSpaceOf M χ x` is the maximal generalized `χ`-eigenspace of the action of `x` on `M`. It is a Lie submodule because `L` is nilpotent. -/ def genWeightSpaceOf [LieRing.IsNilpotent L] (χ : R) (x : L) : LieSubmodule R L M := { 𝕎(M, χ, x) with lie_mem := by intro y m hm simp only [AddSubsemigroup.mem_carrier, AddSubmonoid.mem_toSubsemigroup, Submodule.mem_toAddSubmonoid] at hm ⊢ rw [← zero_add χ] exact lie_mem_maxGenEigenspace_toEnd (by simp) hm } end notation_genWeightSpaceOf variable (M) variable [LieRing.IsNilpotent L] theorem mem_genWeightSpaceOf (χ : R) (x : L) (m : M) : m ∈ genWeightSpaceOf M χ x ↔ ∃ k : ℕ, ((toEnd R L M x - χ • ↑1) ^ k) m = 0 := by simp [genWeightSpaceOf] theorem coe_genWeightSpaceOf_zero (x : L) : ↑(genWeightSpaceOf M (0 : R) x) = ⨆ k, LinearMap.ker (toEnd R L M x ^ k) := by simp [genWeightSpaceOf, ← Module.End.iSup_genEigenspace_eq] /-- If `M` is a representation of a nilpotent Lie algebra `L` and `χ : L → R` is a family of scalars, then `genWeightSpace M χ` is the intersection of the maximal generalized `χ x`-eigenspaces of the action of `x` on `M` as `x` ranges over `L`. It is a Lie submodule because `L` is nilpotent. -/ def genWeightSpace (χ : L → R) : LieSubmodule R L M := ⨅ x, genWeightSpaceOf M (χ x) x theorem mem_genWeightSpace (χ : L → R) (m : M) : m ∈ genWeightSpace M χ ↔ ∀ x, ∃ k : ℕ, ((toEnd R L M x - χ x • ↑1) ^ k) m = 0 := by simp [genWeightSpace, mem_genWeightSpaceOf] lemma genWeightSpace_le_genWeightSpaceOf (x : L) (χ : L → R) : genWeightSpace M χ ≤ genWeightSpaceOf M (χ x) x := iInf_le _ x lemma weightSpace_le_genWeightSpace (χ : L → R) : weightSpace M χ ≤ genWeightSpace M χ := by apply le_iInf intro x rw [← (LieSubmodule.toSubmodule_orderEmbedding R L M).le_iff_le] apply (iInf_le _ x).trans exact ((toEnd R L M x).genEigenspace (χ x)).monotone le_top variable (R L) in /-- A weight of a Lie module is a map `L → R` such that the corresponding weight space is non-trivial. -/ structure Weight where /-- The family of eigenvalues corresponding to a weight. -/ toFun : L → R genWeightSpace_ne_bot' : genWeightSpace M toFun ≠ ⊥ namespace Weight instance instFunLike : FunLike (Weight R L M) L R where coe χ := χ.1 coe_injective' χ₁ χ₂ h := by cases χ₁; cases χ₂; simp_all @[simp] lemma coe_weight_mk (χ : L → R) (h) : (↑(⟨χ, h⟩ : Weight R L M) : L → R) = χ := rfl lemma genWeightSpace_ne_bot (χ : Weight R L M) : genWeightSpace M χ ≠ ⊥ := χ.genWeightSpace_ne_bot' variable {M} @[ext] lemma ext {χ₁ χ₂ : Weight R L M} (h : ∀ x, χ₁ x = χ₂ x) : χ₁ = χ₂ := by obtain ⟨f₁, _⟩ := χ₁; obtain ⟨f₂, _⟩ := χ₂; aesop lemma ext_iff' {χ₁ χ₂ : Weight R L M} : (χ₁ : L → R) = χ₂ ↔ χ₁ = χ₂ := by simp lemma exists_ne_zero (χ : Weight R L M) : ∃ x ∈ genWeightSpace M χ, x ≠ 0 := by simpa [LieSubmodule.eq_bot_iff] using χ.genWeightSpace_ne_bot instance [Subsingleton M] : IsEmpty (Weight R L M) := ⟨fun h ↦ h.2 (Subsingleton.elim _ _)⟩ instance [Nontrivial (genWeightSpace M (0 : L → R))] : Zero (Weight R L M) := ⟨0, fun e ↦ not_nontrivial (⊥ : LieSubmodule R L M) (e ▸ ‹_›)⟩ @[simp] lemma coe_zero [Nontrivial (genWeightSpace M (0 : L → R))] : ((0 : Weight R L M) : L → R) = 0 := rfl lemma zero_apply [Nontrivial (genWeightSpace M (0 : L → R))] (x) : (0 : Weight R L M) x = 0 := rfl /-- The proposition that a weight of a Lie module is zero. We make this definition because we cannot define a `Zero (Weight R L M)` instance since the weight space of the zero function can be trivial. -/ def IsZero (χ : Weight R L M) := (χ : L → R) = 0 @[simp] lemma IsZero.eq {χ : Weight R L M} (hχ : χ.IsZero) : (χ : L → R) = 0 := hχ @[simp] lemma coe_eq_zero_iff (χ : Weight R L M) : (χ : L → R) = 0 ↔ χ.IsZero := Iff.rfl lemma isZero_iff_eq_zero [Nontrivial (genWeightSpace M (0 : L → R))] {χ : Weight R L M} : χ.IsZero ↔ χ = 0 := Weight.ext_iff' (χ₂ := 0) lemma isZero_zero [Nontrivial (genWeightSpace M (0 : L → R))] : IsZero (0 : Weight R L M) := rfl /-- The proposition that a weight of a Lie module is non-zero. -/ abbrev IsNonZero (χ : Weight R L M) := ¬ IsZero (χ : Weight R L M) lemma isNonZero_iff_ne_zero [Nontrivial (genWeightSpace M (0 : L → R))] {χ : Weight R L M} : χ.IsNonZero ↔ χ ≠ 0 := isZero_iff_eq_zero.not noncomputable instance : DecidablePred (IsNonZero (R := R) (L := L) (M := M)) := Classical.decPred _ variable (R L M) in /-- The set of weights is equivalent to a subtype. -/ def equivSetOf : Weight R L M ≃ {χ : L → R \| genWeightSpace M χ ≠ ⊥} where toFun w := ⟨w.1, w.2⟩ invFun w := ⟨w.1, w.2⟩ left_inv w := by simp right_inv w := by simp lemma genWeightSpaceOf_ne_bot (χ : Weight R L M) (x : L) : genWeightSpaceOf M (χ x) x ≠ ⊥ := by have : ⨅ x, genWeightSpaceOf M (χ x) x ≠ ⊥ := χ.genWeightSpace_ne_bot contrapose! this rw [eq_bot_iff] exact le_of_le_of_eq (iInf_le _ _) this lemma hasEigenvalueAt (χ : Weight R L M) (x : L) : (toEnd R L M x).HasEigenvalue (χ x) := by obtain ⟨k : ℕ, hk : (toEnd R L M x).genEigenspace (χ x) k ≠ ⊥⟩ := by simpa [genWeightSpaceOf, ← Module.End.iSup_genEigenspace_eq] using χ.genWeightSpaceOf_ne_bot x exact Module.End.hasEigenvalue_of_hasGenEigenvalue hk lemma apply_eq_zero_of_isNilpotent [NoZeroSMulDivisors R M] [IsReduced R] (x : L) (h : _root_.IsNilpotent (toEnd R L M x)) (χ : Weight R L M) : χ x = 0 := ((χ.hasEigenvalueAt x).isNilpotent_of_isNilpotent h).eq_zero	end Weight /-- See also the more useful form `LieModule.zero_genWeightSpace_eq_top_of_nilpotent`. -/ @[simp] theorem zero_genWeightSpace_eq_top_of_nilpotent' [IsNilpotent L M] : genWeightSpace M (0 : L → R) = ⊤ := by ext	Mathlib/Algebra/Lie/Weights/Basic.lean	296	303
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Analysis.BoxIntegral.DivergenceTheorem import Mathlib.Analysis.BoxIntegral.Integrability import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.Analysis.Calculus.FDeriv.Equiv import Mathlib.MeasureTheory.Integral.Prod import Mathlib.MeasureTheory.Integral.IntervalIntegral.Basic /-! # Divergence theorem for Bochner integral In this file we prove the Divergence theorem for Bochner integral on a box in `ℝⁿ⁺¹ = Fin (n + 1) → ℝ`. More precisely, we prove the following theorem. Let `E` be a complete normed space. If `f : ℝⁿ⁺¹ → Eⁿ⁺¹` is continuous on a rectangular box `[a, b] : Set ℝⁿ⁺¹`, `a ≤ b`, differentiable on its interior with derivative `f' : ℝⁿ⁺¹ → ℝⁿ⁺¹ →L[ℝ] Eⁿ⁺¹`, and the divergence `fun x ↦ ∑ i, f' x eᵢ i` is integrable on `[a, b]`, where `eᵢ = Pi.single i 1` is the `i`-th basis vector, then its integral is equal to the sum of integrals of `f` over the faces of `[a, b]`, taken with appropriate signs. Moreover, the same is true if the function is not differentiable at countably many points of the interior of `[a, b]`. Once we prove the general theorem, we deduce corollaries for functions `ℝ → E` and pairs of functions `(ℝ × ℝ) → E`. ## Notations We use the following local notation to make the statement more readable. Note that the documentation website shows the actual terms, not those abbreviated using local notations. Porting note (Yury Kudryashov): I disabled some of these notations because I failed to make them work with Lean 4. * `ℝⁿ`, `ℝⁿ⁺¹`, `Eⁿ⁺¹`: `Fin n → ℝ`, `Fin (n + 1) → ℝ`, `Fin (n + 1) → E`; * `face i`: the `i`-th face of the box `[a, b]` as a closed segment in `ℝⁿ`, namely `[a ∘ Fin.succAbove i, b ∘ Fin.succAbove i]`; * `e i` : `i`-th basis vector `Pi.single i 1`; * `frontFace i`, `backFace i`: embeddings `ℝⁿ → ℝⁿ⁺¹` corresponding to the front face `{x \| x i = b i}` and back face `{x \| x i = a i}` of the box `[a, b]`, respectively. They are given by `Fin.insertNth i (b i)` and `Fin.insertNth i (a i)`. ## TODO * Add a version that assumes existence and integrability of partial derivatives. * Restore local notations for find another way to make the statements more readable. ## Tags divergence theorem, Bochner integral -/ open Set Finset TopologicalSpace Function BoxIntegral MeasureTheory Filter open scoped Topology Interval universe u namespace MeasureTheory variable {E : Type u} [NormedAddCommGroup E] [NormedSpace ℝ E] section variable {n : ℕ} local macro:arg t:term:max noWs "ⁿ" : term => `(Fin n → $t) local macro:arg t:term:max noWs "ⁿ⁺¹" : term => `(Fin (n + 1) → $t) local notation "e " i => Pi.single i 1 section /-! ### Divergence theorem for functions on `ℝⁿ⁺¹ = Fin (n + 1) → ℝ`. In this section we use the divergence theorem for a Henstock-Kurzweil-like integral `BoxIntegral.hasIntegral_GP_divergence_of_forall_hasDerivWithinAt` to prove the divergence theorem for Bochner integral. The divergence theorem for Bochner integral `MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable` assumes that the function itself is continuous on a closed box, differentiable at all but countably many points of its interior, and the divergence is integrable on the box. This statement differs from `BoxIntegral.hasIntegral_GP_divergence_of_forall_hasDerivWithinAt` in several aspects. * We use Bochner integral instead of a Henstock-Kurzweil integral. This modification is done in `MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable_aux₁`. As a side effect of this change, we need to assume that the divergence is integrable. * We don't assume differentiability on the boundary of the box. This modification is done in `MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable_aux₂`. To prove it, we choose an increasing sequence of smaller boxes that cover the interior of the original box, then apply the previous lemma to these smaller boxes and take the limit of both sides of the equation. * We assume `a ≤ b` instead of `∀ i, a i < b i`. This is the last step of the proof, and it is done in the main theorem `MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable`. -/ /-- An auxiliary lemma for `MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable`. This is exactly `BoxIntegral.hasIntegral_GP_divergence_of_forall_hasDerivWithinAt` reformulated for the Bochner integral. -/ theorem integral_divergence_of_hasFDerivWithinAt_off_countable_aux₁ (I : Box (Fin (n + 1))) (f : ℝⁿ⁺¹ → Eⁿ⁺¹)	(f' : ℝⁿ⁺¹ → ℝⁿ⁺¹ →L[ℝ] Eⁿ⁺¹) (s : Set ℝⁿ⁺¹) (hs : s.Countable) (Hc : ContinuousOn f (Box.Icc I)) (Hd : ∀ x ∈ (Box.Icc I) \ s, HasFDerivWithinAt f (f' x) (Box.Icc I) x) (Hi : IntegrableOn (fun x => ∑ i, f' x (e i) i) (Box.Icc I)) : (∫ x in Box.Icc I, ∑ i, f' x (e i) i) = ∑ i : Fin (n + 1), ((∫ x in Box.Icc (I.face i), f (i.insertNth (I.upper i) x) i) - ∫ x in Box.Icc (I.face i), f (i.insertNth (I.lower i) x) i) := by wlog hE : CompleteSpace E generalizing · simp [integral, hE] simp only [← setIntegral_congr_set (Box.coe_ae_eq_Icc _)] have A := (Hi.mono_set Box.coe_subset_Icc).hasBoxIntegral ⊥ rfl have B := hasIntegral_GP_divergence_of_forall_hasDerivWithinAt I f f' (s ∩ Box.Icc I) (hs.mono inter_subset_left) (fun x hx => Hc _ hx.2) fun x hx => Hd _ ⟨hx.1, fun h => hx.2 ⟨h, hx.1⟩⟩ rw [continuousOn_pi] at Hc refine (A.unique B).trans (sum_congr rfl fun i _ => ?_) refine congr_arg₂ Sub.sub ?_ ?_ · have := Box.continuousOn_face_Icc (Hc i) (Set.right_mem_Icc.2 (I.lower_le_upper i)) have := (this.integrableOn_compact (μ := volume) (Box.isCompact_Icc _)).mono_set Box.coe_subset_Icc exact (this.hasBoxIntegral ⊥ rfl).integral_eq · have := Box.continuousOn_face_Icc (Hc i) (Set.left_mem_Icc.2 (I.lower_le_upper i)) have := (this.integrableOn_compact (μ := volume) (Box.isCompact_Icc _)).mono_set Box.coe_subset_Icc exact (this.hasBoxIntegral ⊥ rfl).integral_eq	Mathlib/MeasureTheory/Integral/DivergenceTheorem.lean	111	137
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mitchell Lee -/ import Mathlib.Algebra.BigOperators.Group.Finset.Indicator import Mathlib.Data.Fintype.BigOperators import Mathlib.Topology.Algebra.InfiniteSum.Defs import Mathlib.Topology.Algebra.Monoid.Defs /-! # Lemmas on infinite sums and products in topological monoids This file contains many simple lemmas on `tsum`, `HasSum` etc, which are placed here in order to keep the basic file of definitions as short as possible. Results requiring a group (rather than monoid) structure on the target should go in `Group.lean`. -/ noncomputable section open Filter Finset Function Topology variable {α β γ : Type*} section HasProd variable [CommMonoid α] [TopologicalSpace α] variable {f g : β → α} {a b : α} /-- Constant one function has product `1` -/ @[to_additive "Constant zero function has sum `0`"] theorem hasProd_one : HasProd (fun _ ↦ 1 : β → α) 1 := by simp [HasProd, tendsto_const_nhds] @[to_additive] theorem hasProd_empty [IsEmpty β] : HasProd f 1 := by convert @hasProd_one α β _ _ @[to_additive] theorem multipliable_one : Multipliable (fun _ ↦ 1 : β → α) := hasProd_one.multipliable @[to_additive] theorem multipliable_empty [IsEmpty β] : Multipliable f := hasProd_empty.multipliable /-- See `multipliable_congr_cofinite` for a version allowing the functions to disagree on a finite set. -/ @[to_additive "See `summable_congr_cofinite` for a version allowing the functions to disagree on a finite set."] theorem multipliable_congr (hfg : ∀ b, f b = g b) : Multipliable f ↔ Multipliable g := iff_of_eq (congr_arg Multipliable <\| funext hfg) /-- See `Multipliable.congr_cofinite` for a version allowing the functions to disagree on a finite set. -/ @[to_additive "See `Summable.congr_cofinite` for a version allowing the functions to disagree on a finite set."] theorem Multipliable.congr (hf : Multipliable f) (hfg : ∀ b, f b = g b) : Multipliable g := (multipliable_congr hfg).mp hf @[to_additive] lemma HasProd.congr_fun (hf : HasProd f a) (h : ∀ x : β, g x = f x) : HasProd g a := (funext h : g = f) ▸ hf @[to_additive] theorem HasProd.hasProd_of_prod_eq {g : γ → α} (h_eq : ∀ u : Finset γ, ∃ v : Finset β, ∀ v', v ⊆ v' → ∃ u', u ⊆ u' ∧ ∏ x ∈ u', g x = ∏ b ∈ v', f b) (hf : HasProd g a) : HasProd f a := le_trans (map_atTop_finset_prod_le_of_prod_eq h_eq) hf @[to_additive] theorem hasProd_iff_hasProd {g : γ → α} (h₁ : ∀ u : Finset γ, ∃ v : Finset β, ∀ v', v ⊆ v' → ∃ u', u ⊆ u' ∧ ∏ x ∈ u', g x = ∏ b ∈ v', f b) (h₂ : ∀ v : Finset β, ∃ u : Finset γ, ∀ u', u ⊆ u' → ∃ v', v ⊆ v' ∧ ∏ b ∈ v', f b = ∏ x ∈ u', g x) : HasProd f a ↔ HasProd g a := ⟨HasProd.hasProd_of_prod_eq h₂, HasProd.hasProd_of_prod_eq h₁⟩ @[to_additive] theorem Function.Injective.multipliable_iff {g : γ → β} (hg : Injective g) (hf : ∀ x ∉ Set.range g, f x = 1) : Multipliable (f ∘ g) ↔ Multipliable f := exists_congr fun _ ↦ hg.hasProd_iff hf @[to_additive (attr := simp)] theorem hasProd_extend_one {g : β → γ} (hg : Injective g) : HasProd (extend g f 1) a ↔ HasProd f a := by rw [← hg.hasProd_iff, extend_comp hg] exact extend_apply' _ _ @[to_additive (attr := simp)] theorem multipliable_extend_one {g : β → γ} (hg : Injective g) : Multipliable (extend g f 1) ↔ Multipliable f := exists_congr fun _ ↦ hasProd_extend_one hg @[to_additive] theorem hasProd_subtype_iff_mulIndicator {s : Set β} : HasProd (f ∘ (↑) : s → α) a ↔ HasProd (s.mulIndicator f) a := by rw [← Set.mulIndicator_range_comp, Subtype.range_coe, hasProd_subtype_iff_of_mulSupport_subset Set.mulSupport_mulIndicator_subset] @[to_additive] theorem multipliable_subtype_iff_mulIndicator {s : Set β} : Multipliable (f ∘ (↑) : s → α) ↔ Multipliable (s.mulIndicator f) := exists_congr fun _ ↦ hasProd_subtype_iff_mulIndicator @[to_additive (attr := simp)] theorem hasProd_subtype_mulSupport : HasProd (f ∘ (↑) : mulSupport f → α) a ↔ HasProd f a := hasProd_subtype_iff_of_mulSupport_subset <\| Set.Subset.refl _ @[to_additive] protected theorem Finset.multipliable (s : Finset β) (f : β → α) : Multipliable (f ∘ (↑) : (↑s : Set β) → α) := (s.hasProd f).multipliable @[to_additive] protected theorem Set.Finite.multipliable {s : Set β} (hs : s.Finite) (f : β → α) : Multipliable (f ∘ (↑) : s → α) := by have := hs.toFinset.multipliable f rwa [hs.coe_toFinset] at this @[to_additive] theorem multipliable_of_finite_mulSupport (h : (mulSupport f).Finite) : Multipliable f := by apply multipliable_of_ne_finset_one (s := h.toFinset); simp @[to_additive] lemma Multipliable.of_finite [Finite β] {f : β → α} : Multipliable f := multipliable_of_finite_mulSupport <\| Set.finite_univ.subset (Set.subset_univ _) @[to_additive] theorem hasProd_single {f : β → α} (b : β) (hf : ∀ (b') (_ : b' ≠ b), f b' = 1) : HasProd f (f b) := suffices HasProd f (∏ b' ∈ {b}, f b') by simpa using this hasProd_prod_of_ne_finset_one <\| by simpa [hf] @[to_additive (attr := simp)] lemma hasProd_unique [Unique β] (f : β → α) : HasProd f (f default) := hasProd_single default (fun _ hb ↦ False.elim <\| hb <\| Unique.uniq ..) @[to_additive (attr := simp)] lemma hasProd_singleton (m : β) (f : β → α) : HasProd (({m} : Set β).restrict f) (f m) := hasProd_unique (Set.restrict {m} f) @[to_additive] theorem hasProd_ite_eq (b : β) [DecidablePred (· = b)] (a : α) : HasProd (fun b' ↦ if b' = b then a else 1) a := by convert @hasProd_single _ _ _ _ (fun b' ↦ if b' = b then a else 1) b (fun b' hb' ↦ if_neg hb') exact (if_pos rfl).symm @[to_additive] theorem Equiv.hasProd_iff (e : γ ≃ β) : HasProd (f ∘ e) a ↔ HasProd f a := e.injective.hasProd_iff <\| by simp @[to_additive] theorem Function.Injective.hasProd_range_iff {g : γ → β} (hg : Injective g) : HasProd (fun x : Set.range g ↦ f x) a ↔ HasProd (f ∘ g) a := (Equiv.ofInjective g hg).hasProd_iff.symm @[to_additive] theorem Equiv.multipliable_iff (e : γ ≃ β) : Multipliable (f ∘ e) ↔ Multipliable f := exists_congr fun _ ↦ e.hasProd_iff @[to_additive] theorem Equiv.hasProd_iff_of_mulSupport {g : γ → α} (e : mulSupport f ≃ mulSupport g) (he : ∀ x : mulSupport f, g (e x) = f x) : HasProd f a ↔ HasProd g a := by have : (g ∘ (↑)) ∘ e = f ∘ (↑) := funext he rw [← hasProd_subtype_mulSupport, ← this, e.hasProd_iff, hasProd_subtype_mulSupport] @[to_additive] theorem hasProd_iff_hasProd_of_ne_one_bij {g : γ → α} (i : mulSupport g → β) (hi : Injective i) (hf : mulSupport f ⊆ Set.range i) (hfg : ∀ x, f (i x) = g x) : HasProd f a ↔ HasProd g a := Iff.symm <\| Equiv.hasProd_iff_of_mulSupport (Equiv.ofBijective (fun x ↦ ⟨i x, fun hx ↦ x.coe_prop <\| hfg x ▸ hx⟩) ⟨fun _ _ h ↦ hi <\| Subtype.ext_iff.1 h, fun y ↦ (hf y.coe_prop).imp fun _ hx ↦ Subtype.ext hx⟩)	hfg @[to_additive] theorem Equiv.multipliable_iff_of_mulSupport {g : γ → α} (e : mulSupport f ≃ mulSupport g)	Mathlib/Topology/Algebra/InfiniteSum/Basic.lean	176	179
/- Copyright (c) 2024 David Kurniadi Angdinata. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Kurniadi Angdinata -/ import Mathlib.Data.Nat.EvenOddRec import Mathlib.Tactic.Linarith import Mathlib.Tactic.LinearCombination /-! # Elliptic divisibility sequences This file defines the type of an elliptic divisibility sequence (EDS) and a few examples. ## Mathematical background Let `R` be a commutative ring. An elliptic sequence is a sequence `W : ℤ → R` satisfying `W(m + n)W(m - n)W(r)² = W(m + r)W(m - r)W(n)² - W(n + r)W(n - r)W(m)²` for any `m, n, r ∈ ℤ`. A divisibility sequence is a sequence `W : ℤ → R` satisfying `W(m) ∣ W(n)` for any `m, n ∈ ℤ` such that `m ∣ n`. An elliptic divisibility sequence is simply a divisibility sequence that is elliptic. Some examples of EDSs include * the identity sequence, * certain terms of Lucas sequences, and * division polynomials of elliptic curves. ## Main definitions * `IsEllSequence`: a sequence indexed by integers is an elliptic sequence. * `IsDivSequence`: a sequence indexed by integers is a divisibility sequence. * `IsEllDivSequence`: a sequence indexed by integers is an EDS. * `preNormEDS'`: the auxiliary sequence for a normalised EDS indexed by `ℕ`. * `preNormEDS`: the auxiliary sequence for a normalised EDS indexed by `ℤ`. * `normEDS`: the canonical example of a normalised EDS indexed by `ℤ`. ## Main statements * TODO: prove that `normEDS` satisfies `IsEllDivSequence`. * TODO: prove that a normalised sequence satisfying `IsEllDivSequence` can be given by `normEDS`. ## Implementation notes The normalised EDS `normEDS b c d n` is defined in terms of the auxiliary sequence `preNormEDS (b ^ 4) c d n`, which are equal when `n` is odd, and which differ by a factor of `b` when `n` is even. This coincides with the definition in the references since both agree for `normEDS b c d 2` and for `normEDS b c d 4`, and the correct factors of `b` are removed in `normEDS b c d (2 * (m + 2) + 1)` and in `normEDS b c d (2 * (m + 3))`. One reason is to avoid the necessity for ring division by `b` in the inductive definition of `normEDS b c d (2 * (m + 3))`. The idea is that, it can be shown that `normEDS b c d (2 * (m + 3))` always contains a factor of `b`, so it is possible to remove a factor of `b` a posteriori, but stating this lemma requires first defining `normEDS b c d (2 * (m + 3))`, which requires having this factor of `b` a priori. Another reason is to allow the definition of univariate `n`-division polynomials of elliptic curves, omitting a factor of the bivariate `2`-division polynomial. ## References M Ward, Memoir on Elliptic Divisibility Sequences ## Tags elliptic, divisibility, sequence -/ universe u v variable {R : Type u} [CommRing R] section IsEllDivSequence variable (W : ℤ → R) /-- The proposition that a sequence indexed by integers is an elliptic sequence. -/ def IsEllSequence : Prop := ∀ m n r : ℤ, W (m + n) * W (m - n) * W r ^ 2 = W (m + r) * W (m - r) * W n ^ 2 - W (n + r) * W (n - r) * W m ^ 2 /-- The proposition that a sequence indexed by integers is a divisibility sequence. -/ def IsDivSequence : Prop := ∀ m n : ℕ, m ∣ n → W m ∣ W n /-- The proposition that a sequence indexed by integers is an EDS. -/ def IsEllDivSequence : Prop := IsEllSequence W ∧ IsDivSequence W lemma isEllSequence_id : IsEllSequence id := fun _ _ _ => by simp only [id_eq]; ring1 lemma isDivSequence_id : IsDivSequence id := fun _ _ => Int.ofNat_dvd.mpr /-- The identity sequence is an EDS. -/ theorem isEllDivSequence_id : IsEllDivSequence id := ⟨isEllSequence_id, isDivSequence_id⟩ variable {W} lemma IsEllSequence.smul (h : IsEllSequence W) (x : R) : IsEllSequence (x • W) := fun m n r => by linear_combination (norm := (simp only [Pi.smul_apply, smul_eq_mul]; ring1)) x ^ 4 * h m n r lemma IsDivSequence.smul (h : IsDivSequence W) (x : R) : IsDivSequence (x • W) := fun m n r => mul_dvd_mul_left x <\| h m n r lemma IsEllDivSequence.smul (h : IsEllDivSequence W) (x : R) : IsEllDivSequence (x • W) := ⟨h.left.smul x, h.right.smul x⟩ end IsEllDivSequence /-- Strong recursion principle for a normalised EDS: if we have * `P 0`, `P 1`, `P 2`, `P 3`, and `P 4`, * for all `m : ℕ` we can prove `P (2 * (m + 3))` from `P k` for all `k < 2 * (m + 3)`, and * for all `m : ℕ` we can prove `P (2 * (m + 2) + 1)` from `P k` for all `k < 2 * (m + 2) + 1`, then we have `P n` for all `n : ℕ`. -/ @[elab_as_elim] noncomputable def normEDSRec' {P : ℕ → Sort u} (zero : P 0) (one : P 1) (two : P 2) (three : P 3) (four : P 4) (even : ∀ m : ℕ, (∀ k < 2 * (m + 3), P k) → P (2 * (m + 3))) (odd : ∀ m : ℕ, (∀ k < 2 * (m + 2) + 1, P k) → P (2 * (m + 2) + 1)) (n : ℕ) : P n := n.evenOddStrongRec (by rintro (_ \| _ \| _ \| _) h; exacts [zero, two, four, even _ h]) (by rintro (_ \| _ \| _) h; exacts [one, three, odd _ h]) /-- Recursion principle for a normalised EDS: if we have * `P 0`, `P 1`, `P 2`, `P 3`, and `P 4`, * for all `m : ℕ` we can prove `P (2 * (m + 3))` from `P (m + 1)`, `P (m + 2)`, `P (m + 3)`, `P (m + 4)`, and `P (m + 5)`, and * for all `m : ℕ` we can prove `P (2 * (m + 2) + 1)` from `P (m + 1)`, `P (m + 2)`, `P (m + 3)`, and `P (m + 4)`, then we have `P n` for all `n : ℕ`. -/ @[elab_as_elim] noncomputable def normEDSRec {P : ℕ → Sort u} (zero : P 0) (one : P 1) (two : P 2) (three : P 3) (four : P 4) (even : ∀ m : ℕ, P (m + 1) → P (m + 2) → P (m + 3) → P (m + 4) → P (m + 5) → P (2 * (m + 3))) (odd : ∀ m : ℕ, P (m + 1) → P (m + 2) → P (m + 3) → P (m + 4) → P (2 * (m + 2) + 1)) (n : ℕ) : P n := normEDSRec' zero one two three four (fun _ ih => by apply even <;> exact ih _ <\| by linarith only) (fun _ ih => by apply odd <;> exact ih _ <\| by linarith only) n variable (b c d : R) section PreNormEDS /-- The auxiliary sequence for a normalised EDS `W : ℕ → R`, with initial values `W(0) = 0`, `W(1) = 1`, `W(2) = 1`, `W(3) = c`, and `W(4) = d` and extra parameter `b`. -/ def preNormEDS' (b c d : R) : ℕ → R \| 0 => 0 \| 1 => 1	\| 2 => 1 \| 3 => c \| 4 => d \| (n + 5) => let m := n / 2 have h4 : m + 4 < n + 5 := Nat.lt_succ.mpr <\| add_le_add_right (n.div_le_self 2) 4	Mathlib/NumberTheory/EllipticDivisibilitySequence.lean	149	153
/- Copyright (c) 2020 Bhavik Mehta. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Bhavik Mehta -/ import Mathlib.CategoryTheory.Limits.Preserves.Finite import Mathlib.CategoryTheory.Limits.Preserves.Shapes.BinaryProducts import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Products /-! # Constructing finite products from binary products and terminal. If a category has binary products and a terminal object then it has finite products. If a functor preserves binary products and the terminal object then it preserves finite products. ## TODO Provide the dual results. Show the analogous results for functors which reflect or create (co)limits. -/ universe v v' u u' noncomputable section open CategoryTheory CategoryTheory.Category CategoryTheory.Limits namespace CategoryTheory variable {J : Type v} [SmallCategory J] variable {C : Type u} [Category.{v} C] variable {D : Type u'} [Category.{v'} D] /-- Given `n+1` objects of `C`, a fan for the last `n` with point `c₁.pt` and a binary fan on `c₁.pt` and `f 0`, we can build a fan for all `n+1`. In `extendFanIsLimit` we show that if the two given fans are limits, then this fan is also a limit. -/ @[simps!] def extendFan {n : ℕ} {f : Fin (n + 1) → C} (c₁ : Fan fun i : Fin n => f i.succ) (c₂ : BinaryFan (f 0) c₁.pt) : Fan f := Fan.mk c₂.pt (by refine Fin.cases ?_ ?_ · apply c₂.fst · intro i apply c₂.snd ≫ c₁.π.app ⟨i⟩) /-- Show that if the two given fans in `extendFan` are limits, then the constructed fan is also a limit. -/ def extendFanIsLimit {n : ℕ} (f : Fin (n + 1) → C) {c₁ : Fan fun i : Fin n => f i.succ} {c₂ : BinaryFan (f 0) c₁.pt} (t₁ : IsLimit c₁) (t₂ : IsLimit c₂) : IsLimit (extendFan c₁ c₂) where lift s := by apply (BinaryFan.IsLimit.lift' t₂ (s.π.app ⟨0⟩) _).1 apply t₁.lift ⟨_, Discrete.natTrans fun ⟨i⟩ => s.π.app ⟨i.succ⟩⟩ fac := fun s ⟨j⟩ => by refine Fin.inductionOn j ?_ ?_ · apply (BinaryFan.IsLimit.lift' t₂ _ _).2.1 · rintro i - dsimp only [extendFan_π_app] rw [Fin.cases_succ, ← assoc, (BinaryFan.IsLimit.lift' t₂ _ _).2.2, t₁.fac] rfl uniq s m w := by apply BinaryFan.IsLimit.hom_ext t₂ · rw [(BinaryFan.IsLimit.lift' t₂ _ _).2.1] apply w ⟨0⟩ · rw [(BinaryFan.IsLimit.lift' t₂ _ _).2.2] apply t₁.uniq ⟨_, _⟩ rintro ⟨j⟩ rw [assoc] dsimp only [Discrete.natTrans_app] rw [← w ⟨j.succ⟩] dsimp only [extendFan_π_app] rw [Fin.cases_succ] section variable [HasBinaryProducts C] [HasTerminal C] /-- If `C` has a terminal object and binary products, then it has a product for objects indexed by `Fin n`. This is a helper lemma for `hasFiniteProductsOfHasBinaryAndTerminal`, which is more general than this. -/ private theorem hasProduct_fin : ∀ (n : ℕ) (f : Fin n → C), HasProduct f \| 0 => fun _ => letI : HasLimitsOfShape (Discrete (Fin 0)) C := hasLimitsOfShape_of_equivalence (Discrete.equivalence.{0} finZeroEquiv'.symm) inferInstance \| n + 1 => fun f => haveI := hasProduct_fin n HasLimit.mk ⟨_, extendFanIsLimit f (limit.isLimit _) (limit.isLimit _)⟩ /-- If `C` has a terminal object and binary products, then it has finite products. -/ theorem hasFiniteProducts_of_has_binary_and_terminal : HasFiniteProducts C := ⟨fun n => ⟨fun K => by let that : (Discrete.functor fun n => K.obj ⟨n⟩) ≅ K := Discrete.natIso fun ⟨_⟩ => Iso.refl _ rw [← hasLimit_iff_of_iso that] apply hasProduct_fin⟩⟩	end section Preserves	Mathlib/CategoryTheory/Limits/Constructions/FiniteProductsOfBinaryProducts.lean	106	110
/- Copyright (c) 2024 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash -/ import Mathlib.Algebra.Module.Torsion import Mathlib.FieldTheory.Perfect import Mathlib.LinearAlgebra.AnnihilatingPolynomial import Mathlib.RingTheory.Artinian.Instances import Mathlib.RingTheory.Ideal.Quotient.Nilpotent import Mathlib.RingTheory.SimpleModule.Basic /-! # Semisimple linear endomorphisms Given an `R`-module `M` together with an `R`-linear endomorphism `f : M → M`, the following two conditions are equivalent: 1. Every `f`-invariant submodule of `M` has an `f`-invariant complement. 2. `M` is a semisimple `R[X]`-module, where the action of the polynomial ring is induced by `f`. A linear endomorphism `f` satisfying these equivalent conditions is known as a semisimple endomorphism. We provide basic definitions and results about such endomorphisms in this file. ## Main definitions / results: * `Module.End.IsSemisimple`: the definition that a linear endomorphism is semisimple * `Module.End.isSemisimple_iff`: the characterisation of semisimplicity in terms of invariant submodules. * `Module.End.eq_zero_of_isNilpotent_isSemisimple`: the zero endomorphism is the only endomorphism that is both nilpotent and semisimple. * `Module.End.isSemisimple_of_squarefree_aeval_eq_zero`: an endomorphism that is a root of a square-free polynomial is semisimple (in finite dimensions over a field). * `Module.End.IsSemisimple.minpoly_squarefree`: the minimal polynomial of a semisimple endomorphism is squarefree. * `IsSemisimple.of_mem_adjoin_pair`: every endomorphism in the subalgebra generated by two commuting semisimple endomorphisms is semisimple, if the base field is perfect. ## TODO In finite dimensions over a field: * Triangularizable iff diagonalisable for semisimple endomorphisms -/ open Set Function Polynomial variable {R M : Type} [CommRing R] [AddCommGroup M] [Module R M] namespace Module.End section CommRing variable (f : End R M) /-- A linear endomorphism of an `R`-module `M` is called semisimple* if the induced `R[X]`-module structure on `M` is semisimple. This is equivalent to saying that every `f`-invariant `R`-submodule of `M` has an `f`-invariant complement: see `Module.End.isSemisimple_iff`. -/ def IsSemisimple := IsSemisimpleModule R[X] (AEval' f) /-- A weaker version of semisimplicity that only prescribes behaviour on finitely-generated submodules. -/ def IsFinitelySemisimple : Prop := ∀ p (hp : p ∈ invtSubmodule f), Module.Finite R p → IsSemisimple (LinearMap.restrict f hp) variable {f} /-- A linear endomorphism is semisimple if every invariant submodule has in invariant complement. See also `Module.End.isSemisimple_iff`. -/ lemma isSemisimple_iff' : f.IsSemisimple ↔ ∀ p : invtSubmodule f, ∃ q : invtSubmodule f, IsCompl p q := by rw [IsSemisimple, IsSemisimpleModule, (AEval.mapSubmodule R M f).symm.complementedLattice_iff, complementedLattice_iff] rfl lemma isSemisimple_iff : f.IsSemisimple ↔ ∀ p ∈ invtSubmodule f, ∃ q ∈ invtSubmodule f, IsCompl p q := by simp [isSemisimple_iff'] lemma isSemisimple_restrict_iff (p) (hp : p ∈ invtSubmodule f) : IsSemisimple (LinearMap.restrict f hp) ↔ ∀ q ∈ f.invtSubmodule, q ≤ p → ∃ r ≤ p, r ∈ f.invtSubmodule ∧ Disjoint q r ∧ q ⊔ r = p := by let e : Submodule R[X] (AEval' (f.restrict hp)) ≃o Iic (AEval.mapSubmodule R M f ⟨p, hp⟩) := (Submodule.orderIsoMapComap <\| AEval.restrict_equiv_mapSubmodule f p hp).trans (Submodule.mapIic _) simp_rw [IsSemisimple, IsSemisimpleModule, e.complementedLattice_iff, disjoint_iff, ← (OrderIso.Iic _ _).complementedLattice_iff, Iic.complementedLattice_iff, Subtype.forall, Subtype.exists, Subtype.mk_le_mk, Sublattice.mk_inf_mk, Sublattice.mk_sup_mk, Subtype.mk.injEq, exists_and_left, exists_and_right, invtSubmodule.mk_eq_bot_iff, exists_prop, and_assoc] rfl /-- A linear endomorphism is finitely semisimple if it is semisimple on every finitely-generated invariant submodule. See also `Module.End.isFinitelySemisimple_iff`. -/ lemma isFinitelySemisimple_iff' : f.IsFinitelySemisimple ↔ ∀ p (hp : p ∈ invtSubmodule f), Module.Finite R p → IsSemisimple (LinearMap.restrict f hp) := Iff.rfl /-- A characterisation of `Module.End.IsFinitelySemisimple` using only the lattice of submodules of `M` (thus avoiding submodules of submodules). -/ lemma isFinitelySemisimple_iff : f.IsFinitelySemisimple ↔ ∀ p ∈ invtSubmodule f, Module.Finite R p → ∀ q ∈ invtSubmodule f, q ≤ p → ∃ r, r ≤ p ∧ r ∈ invtSubmodule f ∧ Disjoint q r ∧ q ⊔ r = p := by simp_rw [isFinitelySemisimple_iff', isSemisimple_restrict_iff] @[simp] lemma isSemisimple_zero [IsSemisimpleModule R M] : IsSemisimple (0 : Module.End R M) := by simpa [isSemisimple_iff] using exists_isCompl @[simp] lemma isSemisimple_id [IsSemisimpleModule R M] : IsSemisimple (LinearMap.id : Module.End R M) := by simpa [isSemisimple_iff] using exists_isCompl @[simp] lemma isSemisimple_neg : (-f).IsSemisimple ↔ f.IsSemisimple := by simp [isSemisimple_iff, mem_invtSubmodule] variable (f) in protected lemma _root_.LinearEquiv.isSemisimple_iff {M₂ : Type*} [AddCommGroup M₂] [Module R M₂] (g : End R M₂) (e : M ≃ₗ[R] M₂) (he : e ∘ₗ f = g ∘ₗ e) : f.IsSemisimple ↔ g.IsSemisimple := by let e : AEval' f ≃ₗ[R[X]] AEval' g := LinearEquiv.ofAEval _ (e.trans (AEval'.of g)) fun x ↦ by simpa [AEval'.X_smul_of] using LinearMap.congr_fun he x exact (Submodule.orderIsoMapComap e).complementedLattice_iff lemma eq_zero_of_isNilpotent_isSemisimple (hn : IsNilpotent f) (hs : f.IsSemisimple) : f = 0 := by have ⟨n, h0⟩ := hn rw [← aeval_X (R := R) f]; rw [← aeval_X_pow (R := R) f] at h0 rw [← RingHom.mem_ker, ← AEval.annihilator_eq_ker_aeval (M := M)] at h0 ⊢ exact hs.annihilator_isRadical _ _ ⟨n, h0⟩ lemma eq_zero_of_isNilpotent_of_isFinitelySemisimple (hn : IsNilpotent f) (hs : IsFinitelySemisimple f) : f = 0 := by have (p) (hp₁ : p ∈ f.invtSubmodule) (hp₂ : Module.Finite R p) : f.restrict hp₁ = 0 := by specialize hs p hp₁ hp₂ replace hn : IsNilpotent (f.restrict hp₁) := isNilpotent.restrict hp₁ hn exact eq_zero_of_isNilpotent_isSemisimple hn hs ext x obtain ⟨k : ℕ, hk : f ^ k = 0⟩ := hn let p := Submodule.span R {(f ^ i) x \| (i : ℕ) (_ : i ≤ k)} have hp₁ : p ∈ f.invtSubmodule := by simp only [mem_invtSubmodule, p, Submodule.span_le] rintro - ⟨i, hi, rfl⟩ apply Submodule.subset_span rcases lt_or_eq_of_le hi with hik \| rfl	· exact ⟨i + 1, hik, by simpa [Module.End.pow_apply] using iterate_succ_apply' f i x⟩ · exact ⟨i, by simp [hk]⟩ have hp₂ : Module.Finite R p := by let g : ℕ → M := fun i ↦ (f ^ i) x have hg : {(f ^ i) x \| (i : ℕ) (_ : i ≤ k)} = g '' Iic k := by ext; simp [g] exact Module.Finite.span_of_finite _ <\| hg ▸ toFinite (g '' Iic k) simpa [LinearMap.restrict_apply, Subtype.ext_iff] using LinearMap.congr_fun (this p hp₁ hp₂) ⟨x, Submodule.subset_span ⟨0, k.zero_le, rfl⟩⟩ @[simp] lemma isSemisimple_sub_algebraMap_iff {μ : R} :	Mathlib/LinearAlgebra/Semisimple.lean	145	155
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon, Kim Morrison -/ import Mathlib.CategoryTheory.EqToHom import Mathlib.CategoryTheory.NatIso import Mathlib.CategoryTheory.Products.Basic /-! # Categories of indexed families of objects. We define the pointwise category structure on indexed families of objects in a category (and also the dependent generalization). -/ namespace CategoryTheory universe w₀ w₁ w₂ v₁ v₂ v₃ u₁ u₂ u₃ variable {I : Type w₀} {J : Type w₁} (C : I → Type u₁) [∀ i, Category.{v₁} (C i)] /-- `pi C` gives the cartesian product of an indexed family of categories. -/ instance pi : Category.{max w₀ v₁} (∀ i, C i) where Hom X Y := ∀ i, X i ⟶ Y i id X i := 𝟙 (X i) comp f g i := f i ≫ g i namespace Pi @[simp] theorem id_apply (X : ∀ i, C i) (i) : (𝟙 X : ∀ i, X i ⟶ X i) i = 𝟙 (X i) := rfl @[simp] theorem comp_apply {X Y Z : ∀ i, C i} (f : X ⟶ Y) (g : Y ⟶ Z) (i) : (f ≫ g : ∀ i, X i ⟶ Z i) i = f i ≫ g i := rfl @[ext] lemma ext {X Y : ∀ i, C i} {f g : X ⟶ Y} (w : ∀ i, f i = g i) : f = g := funext (w ·) /-- The evaluation functor at `i : I`, sending an `I`-indexed family of objects to the object over `i`. -/ @[simps] def eval (i : I) : (∀ i, C i) ⥤ C i where obj f := f i map α := α i section variable {J : Type w₁} /- Porting note: add this because Lean cannot see directly through the `∘` for `Function.comp` -/ instance (f : J → I) : (j : J) → Category ((C ∘ f) j) := by dsimp infer_instance /-- Pull back an `I`-indexed family of objects to a `J`-indexed family, along a function `J → I`. -/ @[simps] def comap (h : J → I) : (∀ i, C i) ⥤ (∀ j, C (h j)) where obj f i := f (h i) map α i := α (h i) variable (I) /-- The natural isomorphism between pulling back a grading along the identity function, and the identity functor. -/ @[simps] def comapId : comap C (id : I → I) ≅ 𝟭 (∀ i, C i) where hom := { app := fun X => 𝟙 X } inv := { app := fun X => 𝟙 X } example (g : J → I) : (j : J) → Category (C (g j)) := by infer_instance variable {I} variable {K : Type w₂} /-- The natural isomorphism comparing between pulling back along two successive functions, and pulling back along their composition -/ @[simps!] def comapComp (f : K → J) (g : J → I) : comap C g ⋙ comap (C ∘ g) f ≅ comap C (g ∘ f) where hom := { app := fun X b => 𝟙 (X (g (f b))) naturality := fun X Y f' => by simp only [comap, Function.comp]; funext; simp } inv := { app := fun X b => 𝟙 (X (g (f b))) naturality := fun X Y f' => by simp only [comap, Function.comp]; funext; simp } /-- The natural isomorphism between pulling back then evaluating, and just evaluating. -/ @[simps!] def comapEvalIsoEval (h : J → I) (j : J) : comap C h ⋙ eval (C ∘ h) j ≅ eval C (h j) := NatIso.ofComponents (fun _ => Iso.refl _) (by simp only [Iso.refl]; simp) end section variable {J : Type w₀} {D : J → Type u₁} [∀ j, Category.{v₁} (D j)] /- Porting note: maybe mixing up universes -/ instance sumElimCategory : ∀ s : I ⊕ J, Category.{v₁} (Sum.elim C D s) \| Sum.inl i => by dsimp infer_instance \| Sum.inr j => by dsimp infer_instance /- Porting note: replaced `Sum.rec` with `match`'s per the error about current state of code generation -/ /-- The bifunctor combining an `I`-indexed family of objects with a `J`-indexed family of objects to obtain an `I ⊕ J`-indexed family of objects. -/ @[simps] def sum : (∀ i, C i) ⥤ (∀ j, D j) ⥤ ∀ s : I ⊕ J, Sum.elim C D s where obj X := { obj := fun Y s => match s with \| .inl i => X i \| .inr j => Y j map := fun {_} {_} f s => match s with \| .inl i => 𝟙 (X i) \| .inr j => f j } map {X} {X'} f := { app := fun Y s => match s with \| .inl i => f i \| .inr j => 𝟙 (Y j) } end variable {C} /-- An isomorphism between `I`-indexed objects gives an isomorphism between each pair of corresponding components. -/ @[simps] def isoApp {X Y : ∀ i, C i} (f : X ≅ Y) (i : I) : X i ≅ Y i := ⟨f.hom i, f.inv i, by rw [← comp_apply, Iso.hom_inv_id, id_apply], by rw [← comp_apply, Iso.inv_hom_id, id_apply]⟩ @[simp] theorem isoApp_refl (X : ∀ i, C i) (i : I) : isoApp (Iso.refl X) i = Iso.refl (X i) := rfl @[simp] theorem isoApp_symm {X Y : ∀ i, C i} (f : X ≅ Y) (i : I) : isoApp f.symm i = (isoApp f i).symm := rfl @[simp] theorem isoApp_trans {X Y Z : ∀ i, C i} (f : X ≅ Y) (g : Y ≅ Z) (i : I) : isoApp (f ≪≫ g) i = isoApp f i ≪≫ isoApp g i := rfl end Pi namespace Functor variable {C} variable {D : I → Type u₂} [∀ i, Category.{v₂} (D i)] {A : Type u₃} [Category.{v₃} A] /-- Assemble an `I`-indexed family of functors into a functor between the pi types. -/ @[simps] def pi (F : ∀ i, C i ⥤ D i) : (∀ i, C i) ⥤ ∀ i, D i where obj f i := (F i).obj (f i) map α i := (F i).map (α i) /-- Similar to `pi`, but all functors come from the same category `A` -/ @[simps] def pi' (f : ∀ i, A ⥤ C i) : A ⥤ ∀ i, C i where obj a i := (f i).obj a map h i := (f i).map h /-- The projections of `Functor.pi' F` are isomorphic to the functors of the family `F` -/ @[simps!] def pi'CompEval {A : Type} [Category A] (F : ∀ i, A ⥤ C i) (i : I) : pi' F ⋙ Pi.eval C i ≅ F i := Iso.refl _ section EqToHom @[simp] theorem eqToHom_proj {x x' : ∀ i, C i} (h : x = x') (i : I) : (eqToHom h : x ⟶ x') i = eqToHom (funext_iff.mp h i) := by subst h rfl end EqToHom -- One could add some natural isomorphisms showing -- how `Functor.pi` commutes with `Pi.eval` and `Pi.comap`. @[simp] theorem pi'_eval (f : ∀ i, A ⥤ C i) (i : I) : pi' f ⋙ Pi.eval C i = f i := by apply Functor.ext · intro _ _ _ simp · intro _ rfl /-- Two functors to a product category are equal iff they agree on every coordinate. -/ theorem pi_ext (f f' : A ⥤ ∀ i, C i) (h : ∀ i, f ⋙ (Pi.eval C i) = f' ⋙ (Pi.eval C i)) : f = f' := by apply Functor.ext; rotate_left · intro X ext i specialize h i have := congr_obj h X simpa · intro X Y g dsimp funext i specialize h i have := congr_hom h g simpa end Functor namespace NatTrans variable {C} variable {D : I → Type u₂} [∀ i, Category.{v₂} (D i)] variable {F G : ∀ i, C i ⥤ D i} /-- Assemble an `I`-indexed family of natural transformations into a single natural transformation. -/ @[simps!] def pi (α : ∀ i, F i ⟶ G i) : Functor.pi F ⟶ Functor.pi G where app f i := (α i).app (f i) /-- Assemble an `I`-indexed family of natural transformations into a single natural transformation. -/ @[simps] def pi' {E : Type} [Category E] {F G : E ⥤ ∀ i, C i} (τ : ∀ i, F ⋙ Pi.eval C i ⟶ G ⋙ Pi.eval C i) : F ⟶ G where app := fun X i => (τ i).app X naturality _ _ f := by ext i exact (τ i).naturality f end NatTrans namespace NatIso variable {C} variable {D : I → Type u₂} [∀ i, Category.{v₂} (D i)] variable {F G : ∀ i, C i ⥤ D i} /-- Assemble an `I`-indexed family of natural isomorphisms into a single natural isomorphism. -/ @[simps] def pi (e : ∀ i, F i ≅ G i) : Functor.pi F ≅ Functor.pi G where hom := NatTrans.pi (fun i => (e i).hom) inv := NatTrans.pi (fun i => (e i).inv) /-- Assemble an `I`-indexed family of natural isomorphisms into a single natural isomorphism. -/ @[simps] def pi' {E : Type*} [Category E] {F G : E ⥤ ∀ i, C i} (e : ∀ i, F ⋙ Pi.eval C i ≅ G ⋙ Pi.eval C i) : F ≅ G where hom := NatTrans.pi' (fun i => (e i).hom) inv := NatTrans.pi' (fun i => (e i).inv) end NatIso variable {C} lemma isIso_pi_iff {X Y : ∀ i, C i} (f : X ⟶ Y) : IsIso f ↔ ∀ i, IsIso (f i) := by constructor · intro _ i exact (Pi.isoApp (asIso f) i).isIso_hom · intro exact ⟨fun i => inv (f i), by aesop_cat, by aesop_cat⟩ variable (C) /-- For a family of categories `C i` indexed by `I`, an equality `i = j` in `I` induces an equivalence `C i ≌ C j`. -/ def Pi.eqToEquivalence {i j : I} (h : i = j) : C i ≌ C j := by subst h; rfl /-- When `i = j`, projections `Pi.eval C i` and `Pi.eval C j` are related by the equivalence `Pi.eqToEquivalence C h : C i ≌ C j`. -/ @[simps!] def Pi.evalCompEqToEquivalenceFunctor {i j : I} (h : i = j) : Pi.eval C i ⋙ (Pi.eqToEquivalence C h).functor ≅ Pi.eval C j := eqToIso (by subst h; rfl) /-- The equivalences given by `Pi.eqToEquivalence` are compatible with reindexing. -/ @[simps!] def Pi.eqToEquivalenceFunctorIso (f : J → I) {i' j' : J} (h : i' = j') : (Pi.eqToEquivalence C (congr_arg f h)).functor ≅ (Pi.eqToEquivalence (fun i' => C (f i')) h).functor := eqToIso (by subst h; rfl) attribute [local simp] eqToHom_map /-- Reindexing a family of categories gives equivalent `Pi` categories. -/	@[simps] noncomputable def Pi.equivalenceOfEquiv (e : J ≃ I) : (∀ j, C (e j)) ≌ (∀ i, C i) where functor := Functor.pi' (fun i => Pi.eval _ (e.symm i) ⋙ (Pi.eqToEquivalence C (by simp)).functor) inverse := Functor.pi' (fun i' => Pi.eval _ (e i')) unitIso := NatIso.pi' (fun i' => Functor.leftUnitor _ ≪≫	Mathlib/CategoryTheory/Pi/Basic.lean	314	320
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Patrick Stevens -/ import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Algebra.BigOperators.NatAntidiagonal import Mathlib.Algebra.BigOperators.Ring.Finset import Mathlib.Algebra.Order.BigOperators.Group.Finset import Mathlib.Tactic.Linarith import Mathlib.Tactic.Ring /-! # Sums of binomial coefficients This file includes variants of the binomial theorem and other results on sums of binomial coefficients. Theorems whose proofs depend on such sums may also go in this file for import reasons. -/ open Nat Finset variable {R : Type} namespace Commute variable [Semiring R] {x y : R} /-- A version of the binomial theorem* for commuting elements in noncommutative semirings. -/ theorem add_pow (h : Commute x y) (n : ℕ) : (x + y) ^ n = ∑ m ∈ range (n + 1), x ^ m * y ^ (n - m) * n.choose m := by let t : ℕ → ℕ → R := fun n m ↦ x ^ m * y ^ (n - m) * n.choose m change (x + y) ^ n = ∑ m ∈ range (n + 1), t n m have h_first : ∀ n, t n 0 = y ^ n := fun n ↦ by simp only [t, choose_zero_right, pow_zero, cast_one, mul_one, one_mul, tsub_zero] have h_last : ∀ n, t n n.succ = 0 := fun n ↦ by simp only [t, choose_succ_self, cast_zero, mul_zero] have h_middle : ∀ n i : ℕ, i ∈ range n.succ → (t n.succ i.succ) = x * t n i + y * t n i.succ := by intro n i h_mem have h_le : i ≤ n := le_of_lt_succ (mem_range.mp h_mem) dsimp only [t] rw [choose_succ_succ, cast_add, mul_add] congr 1 · rw [pow_succ' x, succ_sub_succ, mul_assoc, mul_assoc, mul_assoc] · rw [← mul_assoc y, ← mul_assoc y, (h.symm.pow_right i.succ).eq] by_cases h_eq : i = n · rw [h_eq, choose_succ_self, cast_zero, mul_zero, mul_zero] · rw [succ_sub (lt_of_le_of_ne h_le h_eq)] rw [pow_succ' y, mul_assoc, mul_assoc, mul_assoc, mul_assoc] induction n with \| zero => rw [pow_zero, sum_range_succ, range_zero, sum_empty, zero_add] dsimp only [t] rw [pow_zero, pow_zero, choose_self, cast_one, mul_one, mul_one] \| succ n ih => rw [sum_range_succ', h_first, sum_congr rfl (h_middle n), sum_add_distrib, add_assoc, pow_succ' (x + y), ih, add_mul, mul_sum, mul_sum] congr 1 rw [sum_range_succ', sum_range_succ, h_first, h_last, mul_zero, add_zero, _root_.pow_succ'] /-- A version of `Commute.add_pow` that avoids ℕ-subtraction by summing over the antidiagonal and also with the binomial coefficient applied via scalar action of ℕ. -/ theorem add_pow' (h : Commute x y) (n : ℕ) : (x + y) ^ n = ∑ m ∈ antidiagonal n, n.choose m.1 • (x ^ m.1 * y ^ m.2) := by simp_rw [Nat.sum_antidiagonal_eq_sum_range_succ fun m p ↦ n.choose m • (x ^ m * y ^ p), nsmul_eq_mul, cast_comm, h.add_pow] end Commute /-- The binomial theorem -/ theorem add_pow [CommSemiring R] (x y : R) (n : ℕ) : (x + y) ^ n = ∑ m ∈ range (n + 1), x ^ m * y ^ (n - m) * n.choose m := (Commute.all x y).add_pow n /-- A special case of the binomial theorem -/ theorem sub_pow [CommRing R] (x y : R) (n : ℕ) : (x - y) ^ n = ∑ m ∈ range (n + 1), (-1) ^ (m + n) * x ^ m * y ^ (n - m) * n.choose m := by rw [sub_eq_add_neg, add_pow] congr! 1 with m hm have : (-1 : R) ^ (n - m) = (-1) ^ (n + m) := by rw [mem_range] at hm simp [show n + m = n - m + 2 * m by omega, pow_add] rw [neg_pow, this] ring namespace Nat /-- The sum of entries in a row of Pascal's triangle -/ theorem sum_range_choose (n : ℕ) : (∑ m ∈ range (n + 1), n.choose m) = 2 ^ n := by have := (add_pow 1 1 n).symm simpa [one_add_one_eq_two] using this theorem sum_range_choose_halfway (m : ℕ) : (∑ i ∈ range (m + 1), (2 * m + 1).choose i) = 4 ^ m := have : (∑ i ∈ range (m + 1), (2 * m + 1).choose (2 * m + 1 - i)) = ∑ i ∈ range (m + 1), (2 * m + 1).choose i := sum_congr rfl fun i hi ↦ choose_symm <\| by linarith [mem_range.1 hi] mul_right_injective₀ two_ne_zero <\| calc (2 * ∑ i ∈ range (m + 1), (2 * m + 1).choose i) = (∑ i ∈ range (m + 1), (2 * m + 1).choose i) + ∑ i ∈ range (m + 1), (2 * m + 1).choose (2 * m + 1 - i) := by rw [two_mul, this] _ = (∑ i ∈ range (m + 1), (2 * m + 1).choose i) + ∑ i ∈ Ico (m + 1) (2 * m + 2), (2 * m + 1).choose i := by rw [range_eq_Ico, sum_Ico_reflect _ _ (by omega)] congr omega _ = ∑ i ∈ range (2 * m + 2), (2 * m + 1).choose i := sum_range_add_sum_Ico _ (by omega) _ = 2 ^ (2 * m + 1) := sum_range_choose (2 * m + 1) _ = 2 * 4 ^ m := by rw [pow_succ, pow_mul, mul_comm]; rfl theorem choose_middle_le_pow (n : ℕ) : (2 * n + 1).choose n ≤ 4 ^ n := by have t : (2 * n + 1).choose n ≤ ∑ i ∈ range (n + 1), (2 * n + 1).choose i := single_le_sum (fun x _ ↦ by omega) (self_mem_range_succ n) simpa [sum_range_choose_halfway n] using t theorem four_pow_le_two_mul_add_one_mul_central_binom (n : ℕ) :	4 ^ n ≤ (2 * n + 1) * (2 * n).choose n := calc 4 ^ n = (1 + 1) ^ (2 * n) := by norm_num [pow_mul] _ = ∑ m ∈ range (2 * n + 1), (2 * n).choose m := by set_option simprocs false in simp [add_pow]	Mathlib/Data/Nat/Choose/Sum.lean	118	121
/- Copyright (c) 2022 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Patrick Massot, Yury Kudryashov, Kevin H. Wilson, Heather Macbeth -/ import Mathlib.Order.Filter.Tendsto /-! # Product and coproduct filters In this file we define `Filter.prod f g` (notation: `f ×ˢ g`) and `Filter.coprod f g`. The product of two filters is the largest filter `l` such that `Filter.Tendsto Prod.fst l f` and `Filter.Tendsto Prod.snd l g`. ## Implementation details The product filter cannot be defined using the monad structure on filters. For example: ```lean F := do {x ← seq, y ← top, return (x, y)} G := do {y ← top, x ← seq, return (x, y)} ``` hence: ```lean s ∈ F ↔ ∃ n, [n..∞] × univ ⊆ s s ∈ G ↔ ∀ i:ℕ, ∃ n, [n..∞] × {i} ⊆ s ``` Now `⋃ i, [i..∞] × {i}` is in `G` but not in `F`. As product filter we want to have `F` as result. ## Notations * `f ×ˢ g` : `Filter.prod f g`, localized in `Filter`. -/ open Set open Filter namespace Filter variable {α β γ δ : Type} {ι : Sort} section Prod variable {s : Set α} {t : Set β} {f : Filter α} {g : Filter β} theorem prod_mem_prod (hs : s ∈ f) (ht : t ∈ g) : s ×ˢ t ∈ f ×ˢ g := inter_mem_inf (preimage_mem_comap hs) (preimage_mem_comap ht) theorem mem_prod_iff {s : Set (α × β)} {f : Filter α} {g : Filter β} : s ∈ f ×ˢ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, t₁ ×ˢ t₂ ⊆ s := by constructor · rintro ⟨t₁, ⟨s₁, hs₁, hts₁⟩, t₂, ⟨s₂, hs₂, hts₂⟩, rfl⟩ exact ⟨s₁, hs₁, s₂, hs₂, fun p ⟨h, h'⟩ => ⟨hts₁ h, hts₂ h'⟩⟩ · rintro ⟨t₁, ht₁, t₂, ht₂, h⟩ exact mem_inf_of_inter (preimage_mem_comap ht₁) (preimage_mem_comap ht₂) h @[simp] theorem compl_diagonal_mem_prod {l₁ l₂ : Filter α} : (diagonal α)ᶜ ∈ l₁ ×ˢ l₂ ↔ Disjoint l₁ l₂ := by simp only [mem_prod_iff, Filter.disjoint_iff, prod_subset_compl_diagonal_iff_disjoint] @[simp] theorem prod_mem_prod_iff [f.NeBot] [g.NeBot] : s ×ˢ t ∈ f ×ˢ g ↔ s ∈ f ∧ t ∈ g := ⟨fun h => let ⟨_s', hs', _t', ht', H⟩ := mem_prod_iff.1 h (prod_subset_prod_iff.1 H).elim (fun ⟨hs's, ht't⟩ => ⟨mem_of_superset hs' hs's, mem_of_superset ht' ht't⟩) fun h => h.elim (fun hs'e => absurd hs'e (nonempty_of_mem hs').ne_empty) fun ht'e => absurd ht'e (nonempty_of_mem ht').ne_empty, fun h => prod_mem_prod h.1 h.2⟩ theorem mem_prod_principal {s : Set (α × β)} : s ∈ f ×ˢ 𝓟 t ↔ { a \| ∀ b ∈ t, (a, b) ∈ s } ∈ f := by rw [← @exists_mem_subset_iff _ f, mem_prod_iff] refine exists_congr fun u => Iff.rfl.and ⟨?_, fun h => ⟨t, mem_principal_self t, ?_⟩⟩ · rintro ⟨v, v_in, hv⟩ a a_in b b_in exact hv (mk_mem_prod a_in <\| v_in b_in) · rintro ⟨x, y⟩ ⟨hx, hy⟩ exact h hx y hy theorem mem_prod_top {s : Set (α × β)} : s ∈ f ×ˢ (⊤ : Filter β) ↔ { a \| ∀ b, (a, b) ∈ s } ∈ f := by rw [← principal_univ, mem_prod_principal] simp only [mem_univ, forall_true_left] theorem eventually_prod_principal_iff {p : α × β → Prop} {s : Set β} : (∀ᶠ x : α × β in f ×ˢ 𝓟 s, p x) ↔ ∀ᶠ x : α in f, ∀ y : β, y ∈ s → p (x, y) := by rw [eventually_iff, eventually_iff, mem_prod_principal] simp only [mem_setOf_eq] theorem comap_prod (f : α → β × γ) (b : Filter β) (c : Filter γ) : comap f (b ×ˢ c) = comap (Prod.fst ∘ f) b ⊓ comap (Prod.snd ∘ f) c := by rw [prod_eq_inf, comap_inf, Filter.comap_comap, Filter.comap_comap] theorem comap_prodMap_prod (f : α → β) (g : γ → δ) (lb : Filter β) (ld : Filter δ) : comap (Prod.map f g) (lb ×ˢ ld) = comap f lb ×ˢ comap g ld := by simp [prod_eq_inf, comap_comap, Function.comp_def] theorem prod_top : f ×ˢ (⊤ : Filter β) = f.comap Prod.fst := by rw [prod_eq_inf, comap_top, inf_top_eq] theorem top_prod : (⊤ : Filter α) ×ˢ g = g.comap Prod.snd := by rw [prod_eq_inf, comap_top, top_inf_eq] theorem sup_prod (f₁ f₂ : Filter α) (g : Filter β) : (f₁ ⊔ f₂) ×ˢ g = (f₁ ×ˢ g) ⊔ (f₂ ×ˢ g) := by simp only [prod_eq_inf, comap_sup, inf_sup_right] theorem prod_sup (f : Filter α) (g₁ g₂ : Filter β) : f ×ˢ (g₁ ⊔ g₂) = (f ×ˢ g₁) ⊔ (f ×ˢ g₂) := by simp only [prod_eq_inf, comap_sup, inf_sup_left] theorem eventually_prod_iff {p : α × β → Prop} : (∀ᶠ x in f ×ˢ g, p x) ↔ ∃ pa : α → Prop, (∀ᶠ x in f, pa x) ∧ ∃ pb : β → Prop, (∀ᶠ y in g, pb y) ∧ ∀ {x}, pa x → ∀ {y}, pb y → p (x, y) := by simpa only [Set.prod_subset_iff] using @mem_prod_iff α β p f g theorem tendsto_fst : Tendsto Prod.fst (f ×ˢ g) f := tendsto_inf_left tendsto_comap theorem tendsto_snd : Tendsto Prod.snd (f ×ˢ g) g := tendsto_inf_right tendsto_comap /-- If a function tends to a product `g ×ˢ h` of filters, then its first component tends to `g`. See also `Filter.Tendsto.fst_nhds` for the special case of converging to a point in a product of two topological spaces. -/ theorem Tendsto.fst {h : Filter γ} {m : α → β × γ} (H : Tendsto m f (g ×ˢ h)) : Tendsto (fun a ↦ (m a).1) f g := tendsto_fst.comp H /-- If a function tends to a product `g ×ˢ h` of filters, then its second component tends to `h`. See also `Filter.Tendsto.snd_nhds` for the special case of converging to a point in a product of two topological spaces. -/ theorem Tendsto.snd {h : Filter γ} {m : α → β × γ} (H : Tendsto m f (g ×ˢ h)) : Tendsto (fun a ↦ (m a).2) f h := tendsto_snd.comp H theorem Tendsto.prodMk {h : Filter γ} {m₁ : α → β} {m₂ : α → γ} (h₁ : Tendsto m₁ f g) (h₂ : Tendsto m₂ f h) : Tendsto (fun x => (m₁ x, m₂ x)) f (g ×ˢ h) := tendsto_inf.2 ⟨tendsto_comap_iff.2 h₁, tendsto_comap_iff.2 h₂⟩ @[deprecated (since := "2025-03-10")] alias Tendsto.prod_mk := Tendsto.prodMk theorem tendsto_prod_swap : Tendsto (Prod.swap : α × β → β × α) (f ×ˢ g) (g ×ˢ f) := tendsto_snd.prodMk tendsto_fst theorem Eventually.prod_inl {la : Filter α} {p : α → Prop} (h : ∀ᶠ x in la, p x) (lb : Filter β) : ∀ᶠ x in la ×ˢ lb, p (x : α × β).1 := tendsto_fst.eventually h theorem Eventually.prod_inr {lb : Filter β} {p : β → Prop} (h : ∀ᶠ x in lb, p x) (la : Filter α) : ∀ᶠ x in la ×ˢ lb, p (x : α × β).2 := tendsto_snd.eventually h theorem Eventually.prod_mk {la : Filter α} {pa : α → Prop} (ha : ∀ᶠ x in la, pa x) {lb : Filter β} {pb : β → Prop} (hb : ∀ᶠ y in lb, pb y) : ∀ᶠ p in la ×ˢ lb, pa (p : α × β).1 ∧ pb p.2 := (ha.prod_inl lb).and (hb.prod_inr la) theorem EventuallyEq.prodMap {δ} {la : Filter α} {fa ga : α → γ} (ha : fa =ᶠ[la] ga) {lb : Filter β} {fb gb : β → δ} (hb : fb =ᶠ[lb] gb) : Prod.map fa fb =ᶠ[la ×ˢ lb] Prod.map ga gb := (Eventually.prod_mk ha hb).mono fun _ h => Prod.ext h.1 h.2 @[deprecated (since := "2025-03-10")] alias EventuallyEq.prod_map := EventuallyEq.prodMap theorem EventuallyLE.prodMap {δ} [LE γ] [LE δ] {la : Filter α} {fa ga : α → γ} (ha : fa ≤ᶠ[la] ga) {lb : Filter β} {fb gb : β → δ} (hb : fb ≤ᶠ[lb] gb) : Prod.map fa fb ≤ᶠ[la ×ˢ lb] Prod.map ga gb := Eventually.prod_mk ha hb @[deprecated (since := "2025-03-10")] alias EventuallyLE.prod_map := EventuallyLE.prodMap theorem Eventually.curry {la : Filter α} {lb : Filter β} {p : α × β → Prop} (h : ∀ᶠ x in la ×ˢ lb, p x) : ∀ᶠ x in la, ∀ᶠ y in lb, p (x, y) := by rcases eventually_prod_iff.1 h with ⟨pa, ha, pb, hb, h⟩ exact ha.mono fun a ha => hb.mono fun b hb => h ha hb protected lemma Frequently.uncurry {la : Filter α} {lb : Filter β} {p : α → β → Prop} (h : ∃ᶠ x in la, ∃ᶠ y in lb, p x y) : ∃ᶠ xy in la ×ˢ lb, p xy.1 xy.2 := mt (fun h ↦ by simpa only [not_frequently] using h.curry) h lemma Frequently.of_curry {la : Filter α} {lb : Filter β} {p : α × β → Prop} (h : ∃ᶠ x in la, ∃ᶠ y in lb, p (x, y)) : ∃ᶠ xy in la ×ˢ lb, p xy := h.uncurry /-- A fact that is eventually true about all pairs `l ×ˢ l` is eventually true about all diagonal pairs `(i, i)` -/ theorem Eventually.diag_of_prod {p : α × α → Prop} (h : ∀ᶠ i in f ×ˢ f, p i) : ∀ᶠ i in f, p (i, i) := by obtain ⟨t, ht, s, hs, hst⟩ := eventually_prod_iff.1 h apply (ht.and hs).mono fun x hx => hst hx.1 hx.2 theorem Eventually.diag_of_prod_left {f : Filter α} {g : Filter γ} {p : (α × α) × γ → Prop} : (∀ᶠ x in (f ×ˢ f) ×ˢ g, p x) → ∀ᶠ x : α × γ in f ×ˢ g, p ((x.1, x.1), x.2) := by intro h obtain ⟨t, ht, s, hs, hst⟩ := eventually_prod_iff.1 h exact (ht.diag_of_prod.prod_mk hs).mono fun x hx => by simp only [hst hx.1 hx.2] theorem Eventually.diag_of_prod_right {f : Filter α} {g : Filter γ} {p : α × γ × γ → Prop} : (∀ᶠ x in f ×ˢ (g ×ˢ g), p x) → ∀ᶠ x : α × γ in f ×ˢ g, p (x.1, x.2, x.2) := by intro h obtain ⟨t, ht, s, hs, hst⟩ := eventually_prod_iff.1 h exact (ht.prod_mk hs.diag_of_prod).mono fun x hx => by simp only [hst hx.1 hx.2] theorem tendsto_diag : Tendsto (fun i => (i, i)) f (f ×ˢ f) := tendsto_iff_eventually.mpr fun _ hpr => hpr.diag_of_prod theorem prod_iInf_left [Nonempty ι] {f : ι → Filter α} {g : Filter β} : (⨅ i, f i) ×ˢ g = ⨅ i, f i ×ˢ g := by simp only [prod_eq_inf, comap_iInf, iInf_inf] theorem prod_iInf_right [Nonempty ι] {f : Filter α} {g : ι → Filter β} : (f ×ˢ ⨅ i, g i) = ⨅ i, f ×ˢ g i := by simp only [prod_eq_inf, comap_iInf, inf_iInf] @[mono, gcongr] theorem prod_mono {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} (hf : f₁ ≤ f₂) (hg : g₁ ≤ g₂) : f₁ ×ˢ g₁ ≤ f₂ ×ˢ g₂ := inf_le_inf (comap_mono hf) (comap_mono hg) @[gcongr] theorem prod_mono_left (g : Filter β) {f₁ f₂ : Filter α} (hf : f₁ ≤ f₂) : f₁ ×ˢ g ≤ f₂ ×ˢ g := Filter.prod_mono hf rfl.le @[gcongr] theorem prod_mono_right (f : Filter α) {g₁ g₂ : Filter β} (hf : g₁ ≤ g₂) : f ×ˢ g₁ ≤ f ×ˢ g₂ := Filter.prod_mono rfl.le hf theorem prod_comap_comap_eq.{u, v, w, x} {α₁ : Type u} {α₂ : Type v} {β₁ : Type w} {β₂ : Type x} {f₁ : Filter α₁} {f₂ : Filter α₂} {m₁ : β₁ → α₁} {m₂ : β₂ → α₂} : comap m₁ f₁ ×ˢ comap m₂ f₂ = comap (fun p : β₁ × β₂ => (m₁ p.1, m₂ p.2)) (f₁ ×ˢ f₂) := by simp only [prod_eq_inf, comap_comap, comap_inf, Function.comp_def] theorem prod_comm' : f ×ˢ g = comap Prod.swap (g ×ˢ f) := by simp only [prod_eq_inf, comap_comap, Function.comp_def, inf_comm, Prod.swap, comap_inf] theorem prod_comm : f ×ˢ g = map (fun p : β × α => (p.2, p.1)) (g ×ˢ f) := by rw [prod_comm', ← map_swap_eq_comap_swap] rfl theorem mem_prod_iff_left {s : Set (α × β)} : s ∈ f ×ˢ g ↔ ∃ t ∈ f, ∀ᶠ y in g, ∀ x ∈ t, (x, y) ∈ s := by simp only [mem_prod_iff, prod_subset_iff] refine exists_congr fun _ => Iff.rfl.and <\| Iff.trans ?_ exists_mem_subset_iff exact exists_congr fun _ => Iff.rfl.and forall₂_swap theorem mem_prod_iff_right {s : Set (α × β)} : s ∈ f ×ˢ g ↔ ∃ t ∈ g, ∀ᶠ x in f, ∀ y ∈ t, (x, y) ∈ s := by rw [prod_comm, mem_map, mem_prod_iff_left]; rfl @[simp] theorem map_fst_prod (f : Filter α) (g : Filter β) [NeBot g] : map Prod.fst (f ×ˢ g) = f := by ext s simp only [mem_map, mem_prod_iff_left, mem_preimage, eventually_const, ← subset_def, exists_mem_subset_iff] @[simp] theorem map_snd_prod (f : Filter α) (g : Filter β) [NeBot f] : map Prod.snd (f ×ˢ g) = g := by rw [prod_comm, map_map]; apply map_fst_prod @[simp] theorem prod_le_prod {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} [NeBot f₁] [NeBot g₁] : f₁ ×ˢ g₁ ≤ f₂ ×ˢ g₂ ↔ f₁ ≤ f₂ ∧ g₁ ≤ g₂ := ⟨fun h => ⟨map_fst_prod f₁ g₁ ▸ tendsto_fst.mono_left h, map_snd_prod f₁ g₁ ▸ tendsto_snd.mono_left h⟩, fun h => prod_mono h.1 h.2⟩ @[simp] theorem prod_inj {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} [NeBot f₁] [NeBot g₁] : f₁ ×ˢ g₁ = f₂ ×ˢ g₂ ↔ f₁ = f₂ ∧ g₁ = g₂ := by refine ⟨fun h => ?_, fun h => h.1 ▸ h.2 ▸ rfl⟩ have hle : f₁ ≤ f₂ ∧ g₁ ≤ g₂ := prod_le_prod.1 h.le haveI := neBot_of_le hle.1; haveI := neBot_of_le hle.2 exact ⟨hle.1.antisymm <\| (prod_le_prod.1 h.ge).1, hle.2.antisymm <\| (prod_le_prod.1 h.ge).2⟩ theorem eventually_swap_iff {p : α × β → Prop} : (∀ᶠ x : α × β in f ×ˢ g, p x) ↔ ∀ᶠ y : β × α in g ×ˢ f, p y.swap := by rw [prod_comm]; rfl theorem prod_assoc (f : Filter α) (g : Filter β) (h : Filter γ) : map (Equiv.prodAssoc α β γ) ((f ×ˢ g) ×ˢ h) = f ×ˢ (g ×ˢ h) := by simp_rw [← comap_equiv_symm, prod_eq_inf, comap_inf, comap_comap, inf_assoc, Function.comp_def, Equiv.prodAssoc_symm_apply] theorem prod_assoc_symm (f : Filter α) (g : Filter β) (h : Filter γ) : map (Equiv.prodAssoc α β γ).symm (f ×ˢ (g ×ˢ h)) = (f ×ˢ g) ×ˢ h := by simp_rw [map_equiv_symm, prod_eq_inf, comap_inf, comap_comap, inf_assoc, Function.comp_def, Equiv.prodAssoc_apply] theorem tendsto_prodAssoc {h : Filter γ} : Tendsto (Equiv.prodAssoc α β γ) ((f ×ˢ g) ×ˢ h) (f ×ˢ (g ×ˢ h)) := (prod_assoc f g h).le theorem tendsto_prodAssoc_symm {h : Filter γ} : Tendsto (Equiv.prodAssoc α β γ).symm (f ×ˢ (g ×ˢ h)) ((f ×ˢ g) ×ˢ h) := (prod_assoc_symm f g h).le /-- A useful lemma when dealing with uniformities. -/ theorem map_swap4_prod {h : Filter γ} {k : Filter δ} : map (fun p : (α × β) × γ × δ => ((p.1.1, p.2.1), (p.1.2, p.2.2))) ((f ×ˢ g) ×ˢ (h ×ˢ k)) = (f ×ˢ h) ×ˢ (g ×ˢ k) := by simp_rw [map_swap4_eq_comap, prod_eq_inf, comap_inf, comap_comap]; ac_rfl theorem tendsto_swap4_prod {h : Filter γ} {k : Filter δ} : Tendsto (fun p : (α × β) × γ × δ => ((p.1.1, p.2.1), (p.1.2, p.2.2))) ((f ×ˢ g) ×ˢ (h ×ˢ k)) ((f ×ˢ h) ×ˢ (g ×ˢ k)) := map_swap4_prod.le theorem prod_map_map_eq.{u, v, w, x} {α₁ : Type u} {α₂ : Type v} {β₁ : Type w} {β₂ : Type x} {f₁ : Filter α₁} {f₂ : Filter α₂} {m₁ : α₁ → β₁} {m₂ : α₂ → β₂} : map m₁ f₁ ×ˢ map m₂ f₂ = map (fun p : α₁ × α₂ => (m₁ p.1, m₂ p.2)) (f₁ ×ˢ f₂) := le_antisymm (fun s hs => let ⟨s₁, hs₁, s₂, hs₂, h⟩ := mem_prod_iff.mp hs mem_of_superset (prod_mem_prod (image_mem_map hs₁) (image_mem_map hs₂)) <\| by rwa [prod_image_image_eq, image_subset_iff]) ((tendsto_map.comp tendsto_fst).prodMk (tendsto_map.comp tendsto_snd)) theorem prod_map_map_eq' {α₁ : Type} {α₂ : Type} {β₁ : Type} {β₂ : Type} (f : α₁ → α₂) (g : β₁ → β₂) (F : Filter α₁) (G : Filter β₁) : map f F ×ˢ map g G = map (Prod.map f g) (F ×ˢ G) := prod_map_map_eq theorem prod_map_left (f : α → β) (F : Filter α) (G : Filter γ) : map f F ×ˢ G = map (Prod.map f id) (F ×ˢ G) := by rw [← prod_map_map_eq', map_id] theorem prod_map_right (f : β → γ) (F : Filter α) (G : Filter β) : F ×ˢ map f G = map (Prod.map id f) (F ×ˢ G) := by rw [← prod_map_map_eq', map_id] theorem le_prod_map_fst_snd {f : Filter (α × β)} : f ≤ map Prod.fst f ×ˢ map Prod.snd f := le_inf le_comap_map le_comap_map theorem Tendsto.prodMap {δ : Type} {f : α → γ} {g : β → δ} {a : Filter α} {b : Filter β} {c : Filter γ} {d : Filter δ} (hf : Tendsto f a c) (hg : Tendsto g b d) : Tendsto (Prod.map f g) (a ×ˢ b) (c ×ˢ d) := by rw [Tendsto, Prod.map_def, ← prod_map_map_eq] exact Filter.prod_mono hf hg @[deprecated (since := "2025-03-10")] alias Tendsto.prod_map := Tendsto.prodMap protected theorem map_prod (m : α × β → γ) (f : Filter α) (g : Filter β) : map m (f ×ˢ g) = (f.map fun a b => m (a, b)).seq g := by simp only [Filter.ext_iff, mem_map, mem_prod_iff, mem_map_seq_iff, exists_and_left] intro s constructor · exact fun ⟨t, ht, s, hs, h⟩ => ⟨s, hs, t, ht, fun x hx y hy => @h ⟨x, y⟩ ⟨hx, hy⟩⟩ · exact fun ⟨s, hs, t, ht, h⟩ => ⟨t, ht, s, hs, fun ⟨x, y⟩ ⟨hx, hy⟩ => h x hx y hy⟩ theorem prod_eq : f ×ˢ g = (f.map Prod.mk).seq g := f.map_prod id g theorem prod_inf_prod {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} : (f₁ ×ˢ g₁) ⊓ (f₂ ×ˢ g₂) = (f₁ ⊓ f₂) ×ˢ (g₁ ⊓ g₂) := by simp only [prod_eq_inf, comap_inf, inf_comm, inf_assoc, inf_left_comm] theorem inf_prod {f₁ f₂ : Filter α} : (f₁ ⊓ f₂) ×ˢ g = (f₁ ×ˢ g) ⊓ (f₂ ×ˢ g) := by rw [prod_inf_prod, inf_idem] theorem prod_inf {g₁ g₂ : Filter β} : f ×ˢ (g₁ ⊓ g₂) = (f ×ˢ g₁) ⊓ (f ×ˢ g₂) := by rw [prod_inf_prod, inf_idem] @[simp] theorem prod_principal_principal {s : Set α} {t : Set β} : 𝓟 s ×ˢ 𝓟 t = 𝓟 (s ×ˢ t) := by simp only [prod_eq_inf, comap_principal, principal_eq_iff_eq, comap_principal, inf_principal]; rfl @[simp] theorem pure_prod {a : α} {f : Filter β} : pure a ×ˢ f = map (Prod.mk a) f := by rw [prod_eq, map_pure, pure_seq_eq_map] theorem map_pure_prod (f : α → β → γ) (a : α) (B : Filter β) : map (Function.uncurry f) (pure a ×ˢ B) = map (f a) B := by rw [Filter.pure_prod]; rfl @[simp] theorem prod_pure {b : β} : f ×ˢ pure b = map (fun a => (a, b)) f := by rw [prod_eq, seq_pure, map_map]; rfl theorem prod_pure_pure {a : α} {b : β} : (pure a : Filter α) ×ˢ (pure b : Filter β) = pure (a, b) := by simp @[simp] theorem prod_eq_bot : f ×ˢ g = ⊥ ↔ f = ⊥ ∨ g = ⊥ := by simp_rw [← empty_mem_iff_bot, mem_prod_iff, subset_empty_iff, prod_eq_empty_iff, ← exists_prop, Subtype.exists', exists_or, exists_const, Subtype.exists, exists_prop, exists_eq_right] @[simp] theorem prod_bot : f ×ˢ (⊥ : Filter β) = ⊥ := prod_eq_bot.2 <\| Or.inr rfl @[simp] theorem bot_prod : (⊥ : Filter α) ×ˢ g = ⊥ := prod_eq_bot.2 <\| Or.inl rfl theorem prod_neBot : NeBot (f ×ˢ g) ↔ NeBot f ∧ NeBot g := by simp only [neBot_iff, Ne, prod_eq_bot, not_or] protected theorem NeBot.prod (hf : NeBot f) (hg : NeBot g) : NeBot (f ×ˢ g) := prod_neBot.2 ⟨hf, hg⟩ instance prod.instNeBot [hf : NeBot f] [hg : NeBot g] : NeBot (f ×ˢ g) := hf.prod hg @[simp] lemma disjoint_prod {f' : Filter α} {g' : Filter β} : Disjoint (f ×ˢ g) (f' ×ˢ g') ↔ Disjoint f f' ∨ Disjoint g g' := by simp only [disjoint_iff, prod_inf_prod, prod_eq_bot] /-- `p ∧ q` occurs frequently along the product of two filters iff both `p` and `q` occur frequently along the corresponding filters. -/ theorem frequently_prod_and {p : α → Prop} {q : β → Prop} : (∃ᶠ x in f ×ˢ g, p x.1 ∧ q x.2) ↔ (∃ᶠ a in f, p a) ∧ ∃ᶠ b in g, q b := by simp only [frequently_iff_neBot, ← prod_neBot, ← prod_inf_prod, prod_principal_principal] rfl theorem tendsto_prod_iff {f : α × β → γ} {x : Filter α} {y : Filter β} {z : Filter γ} : Tendsto f (x ×ˢ y) z ↔ ∀ W ∈ z, ∃ U ∈ x, ∃ V ∈ y, ∀ x y, x ∈ U → y ∈ V → f (x, y) ∈ W := by simp only [tendsto_def, mem_prod_iff, prod_sub_preimage_iff, exists_prop] theorem tendsto_prod_iff' {g' : Filter γ} {s : α → β × γ} : Tendsto s f (g ×ˢ g') ↔ Tendsto (fun n => (s n).1) f g ∧ Tendsto (fun n => (s n).2) f g' := by simp only [prod_eq_inf, tendsto_inf, tendsto_comap_iff, Function.comp_def] theorem le_prod {f : Filter (α × β)} {g : Filter α} {g' : Filter β} : (f ≤ g ×ˢ g') ↔ Tendsto Prod.fst f g ∧ Tendsto Prod.snd f g' := tendsto_prod_iff' end Prod /-! ### Coproducts of filters -/ section Coprod variable {f : Filter α} {g : Filter β} theorem coprod_eq_prod_top_sup_top_prod (f : Filter α) (g : Filter β) : Filter.coprod f g = f ×ˢ ⊤ ⊔ ⊤ ×ˢ g := by rw [prod_top, top_prod] rfl theorem mem_coprod_iff {s : Set (α × β)} {f : Filter α} {g : Filter β} : s ∈ f.coprod g ↔ (∃ t₁ ∈ f, Prod.fst ⁻¹' t₁ ⊆ s) ∧ ∃ t₂ ∈ g, Prod.snd ⁻¹' t₂ ⊆ s := by simp [Filter.coprod] @[simp] theorem bot_coprod (l : Filter β) : (⊥ : Filter α).coprod l = comap Prod.snd l := by simp [Filter.coprod] @[simp] theorem coprod_bot (l : Filter α) : l.coprod (⊥ : Filter β) = comap Prod.fst l := by simp [Filter.coprod] theorem bot_coprod_bot : (⊥ : Filter α).coprod (⊥ : Filter β) = ⊥ := by simp theorem compl_mem_coprod {s : Set (α × β)} {la : Filter α} {lb : Filter β} : sᶜ ∈ la.coprod lb ↔ (Prod.fst '' s)ᶜ ∈ la ∧ (Prod.snd '' s)ᶜ ∈ lb := by simp only [Filter.coprod, mem_sup, compl_mem_comap] @[mono] theorem coprod_mono {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} (hf : f₁ ≤ f₂) (hg : g₁ ≤ g₂) : f₁.coprod g₁ ≤ f₂.coprod g₂ := sup_le_sup (comap_mono hf) (comap_mono hg) theorem coprod_neBot_iff : (f.coprod g).NeBot ↔ f.NeBot ∧ Nonempty β ∨ Nonempty α ∧ g.NeBot := by simp [Filter.coprod] @[instance] theorem coprod_neBot_left [NeBot f] [Nonempty β] : (f.coprod g).NeBot := coprod_neBot_iff.2 (Or.inl ⟨‹_›, ‹_›⟩) @[instance] theorem coprod_neBot_right [NeBot g] [Nonempty α] : (f.coprod g).NeBot := coprod_neBot_iff.2 (Or.inr ⟨‹_›, ‹_›⟩) theorem coprod_inf_prod_le (f₁ f₂ : Filter α) (g₁ g₂ : Filter β) : f₁.coprod g₁ ⊓ f₂ ×ˢ g₂ ≤ f₁ ×ˢ g₂ ⊔ f₂ ×ˢ g₁ := calc f₁.coprod g₁ ⊓ f₂ ×ˢ g₂ _ = (f₁ ×ˢ ⊤ ⊔ ⊤ ×ˢ g₁) ⊓ f₂ ×ˢ g₂ := by rw [coprod_eq_prod_top_sup_top_prod] _ = f₁ ×ˢ ⊤ ⊓ f₂ ×ˢ g₂ ⊔ ⊤ ×ˢ g₁ ⊓ f₂ ×ˢ g₂ := inf_sup_right _ _ _ _ = (f₁ ⊓ f₂) ×ˢ g₂ ⊔ f₂ ×ˢ (g₁ ⊓ g₂) := by simp [prod_inf_prod] _ ≤ f₁ ×ˢ g₂ ⊔ f₂ ×ˢ g₁ := sup_le_sup (prod_mono inf_le_left le_rfl) (prod_mono le_rfl inf_le_left) theorem principal_coprod_principal (s : Set α) (t : Set β) : (𝓟 s).coprod (𝓟 t) = 𝓟 (sᶜ ×ˢ tᶜ)ᶜ := by rw [Filter.coprod, comap_principal, comap_principal, sup_principal, Set.prod_eq, compl_inter, preimage_compl, preimage_compl, compl_compl, compl_compl] -- this inequality can be strict; see `map_const_principal_coprod_map_id_principal` and -- `map_prodMap_const_id_principal_coprod_principal` below. theorem map_prodMap_coprod_le.{u, v, w, x} {α₁ : Type u} {α₂ : Type v} {β₁ : Type w} {β₂ : Type x} {f₁ : Filter α₁} {f₂ : Filter α₂} {m₁ : α₁ → β₁} {m₂ : α₂ → β₂} : map (Prod.map m₁ m₂) (f₁.coprod f₂) ≤ (map m₁ f₁).coprod (map m₂ f₂) := by intro s simp only [mem_map, mem_coprod_iff] rintro ⟨⟨u₁, hu₁, h₁⟩, u₂, hu₂, h₂⟩ refine ⟨⟨m₁ ⁻¹' u₁, hu₁, fun _ hx => h₁ ?_⟩, ⟨m₂ ⁻¹' u₂, hu₂, fun _ hx => h₂ ?_⟩⟩ <;> convert hx @[deprecated (since := "2025-03-10")] alias map_prod_map_coprod_le := map_prodMap_coprod_le /-- Characterization of the coproduct of the `Filter.map`s of two principal filters `𝓟 {a}` and `𝓟 {i}`, the first under the constant function `fun a => b` and the second under the identity function. Together with the next lemma, `map_prodMap_const_id_principal_coprod_principal`, this provides an example showing that the inequality in the lemma `map_prodMap_coprod_le` can be strict. -/ theorem map_const_principal_coprod_map_id_principal {α β ι : Type} (a : α) (b : β) (i : ι) : (map (fun _ => b) (𝓟 {a})).coprod (map id (𝓟 {i})) = 𝓟 ((({b} : Set β) ×ˢ univ) ∪ (univ ×ˢ ({i} : Set ι))) := by simp only [map_principal, Filter.coprod, comap_principal, sup_principal, image_singleton, image_id, prod_univ, univ_prod, id] /-- Characterization of the `Filter.map` of the coproduct of two principal filters `𝓟 {a}` and `𝓟 {i}`, under the `Prod.map` of two functions, respectively the constant function `fun a => b` and the identity function. Together with the previous lemma, `map_const_principal_coprod_map_id_principal`, this provides an example showing that the inequality in the lemma `map_prodMap_coprod_le` can be strict. -/ theorem map_prodMap_const_id_principal_coprod_principal {α β ι : Type} (a : α) (b : β) (i : ι) : map (Prod.map (fun _ : α => b) id) ((𝓟 {a}).coprod (𝓟 {i})) = 𝓟 (({b} : Set β) ×ˢ (univ : Set ι)) := by rw [principal_coprod_principal, map_principal] congr ext ⟨b', i'⟩ constructor · rintro ⟨⟨a'', i''⟩, _, h₂, h₃⟩ simp · rintro ⟨h₁, _⟩ use (a, i') simpa using h₁.symm @[deprecated (since := "2025-03-10")] alias map_prod_map_const_id_principal_coprod_principal := map_prodMap_const_id_principal_coprod_principal theorem Tendsto.prodMap_coprod {δ : Type} {f : α → γ} {g : β → δ} {a : Filter α} {b : Filter β} {c : Filter γ} {d : Filter δ} (hf : Tendsto f a c) (hg : Tendsto g b d) : Tendsto (Prod.map f g) (a.coprod b) (c.coprod d) := map_prodMap_coprod_le.trans (coprod_mono hf hg) @[deprecated (since := "2025-03-10")] alias Tendsto.prod_map_coprod := Tendsto.prodMap_coprod end Coprod end Filter		Mathlib/Order/Filter/Prod.lean	573	577
/- 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.Tape import Mathlib.Data.Fintype.Option import Mathlib.Data.Fintype.Prod import Mathlib.Data.Fintype.Pi import Mathlib.Data.PFun import Mathlib.Computability.PostTuringMachine /-! # Turing machines The files `PostTuringMachine.lean` and `TuringMachine.lean` define a sequence of simple machine languages, starting with Turing machines and working up to more complex languages based on Wang B-machines. `PostTuringMachine.lean` covers the TM0 model and TM1 model; `TuringMachine.lean` adds the TM2 model. ## Naming conventions Each model of computation in this file shares a naming convention for the elements of a model of computation. These are the parameters for the language: * `Γ` is the alphabet on the tape. * `Λ` is the set of labels, or internal machine states. * `σ` is the type of internal memory, not on the tape. This does not exist in the TM0 model, and later models achieve this by mixing it into `Λ`. * `K` is used in the TM2 model, which has multiple stacks, and denotes the number of such stacks. All of these variables denote "essentially finite" types, but for technical reasons it is convenient to allow them to be infinite anyway. When using an infinite type, we will be interested to prove that only finitely many values of the type are ever interacted with. Given these parameters, there are a few common structures for the model that arise: * `Stmt` is the set of all actions that can be performed in one step. For the TM0 model this set is finite, and for later models it is an infinite inductive type representing "possible program texts". * `Cfg` is the set of instantaneous configurations, that is, the state of the machine together with its environment. * `Machine` is the set of all machines in the model. Usually this is approximately a function `Λ → Stmt`, although different models have different ways of halting and other actions. * `step : Cfg → Option Cfg` is the function that describes how the state evolves over one step. If `step c = none`, then `c` is a terminal state, and the result of the computation is read off from `c`. Because of the type of `step`, these models are all deterministic by construction. * `init : Input → Cfg` sets up the initial state. The type `Input` depends on the model; in most cases it is `List Γ`. * `eval : Machine → Input → Part Output`, given a machine `M` and input `i`, starts from `init i`, runs `step` until it reaches an output, and then applies a function `Cfg → Output` to the final state to obtain the result. The type `Output` depends on the model. * `Supports : Machine → Finset Λ → Prop` asserts that a machine `M` starts in `S : Finset Λ`, and can only ever jump to other states inside `S`. This implies that the behavior of `M` on any input cannot depend on its values outside `S`. We use this to allow `Λ` to be an infinite set when convenient, and prove that only finitely many of these states are actually accessible. This formalizes "essentially finite" mentioned above. -/ assert_not_exists MonoidWithZero open List (Vector) open Relation open Nat (iterate) open Function (update iterate_succ iterate_succ_apply iterate_succ' iterate_succ_apply' iterate_zero_apply) namespace Turing /-! ## The TM2 model The TM2 model removes the tape entirely from the TM1 model, replacing it with an arbitrary (finite) collection of stacks, each with elements of different types (the alphabet of stack `k : K` is `Γ k`). The statements are: * `push k (f : σ → Γ k) q` puts `f a` on the `k`-th stack, then does `q`. * `pop k (f : σ → Option (Γ k) → σ) q` changes the state to `f a (S k).head`, where `S k` is the value of the `k`-th stack, and removes this element from the stack, then does `q`. * `peek k (f : σ → Option (Γ k) → σ) q` changes the state to `f a (S k).head`, where `S k` is the value of the `k`-th stack, then does `q`. * `load (f : σ → σ) q` reads nothing but applies `f` to the internal state, then does `q`. * `branch (f : σ → Bool) qtrue qfalse` does `qtrue` or `qfalse` according to `f a`. * `goto (f : σ → Λ)` jumps to label `f a`. * `halt` halts on the next step. The configuration is a tuple `(l, var, stk)` where `l : Option Λ` is the current label to run or `none` for the halting state, `var : σ` is the (finite) internal state, and `stk : ∀ k, List (Γ k)` is the collection of stacks. (Note that unlike the `TM0` and `TM1` models, these are not `ListBlank`s, they have definite ends that can be detected by the `pop` command.) Given a designated stack `k` and a value `L : List (Γ k)`, the initial configuration has all the stacks empty except the designated "input" stack; in `eval` this designated stack also functions as the output stack. -/ namespace TM2 variable {K : Type} -- Index type of stacks variable (Γ : K → Type) -- Type of stack elements variable (Λ : Type) -- Type of function labels variable (σ : Type) -- Type of variable settings /-- The TM2 model removes the tape entirely from the TM1 model, replacing it with an arbitrary (finite) collection of stacks. The operation `push` puts an element on one of the stacks, and `pop` removes an element from a stack (and modifying the internal state based on the result). `peek` modifies the internal state but does not remove an element. -/ inductive Stmt \| push : ∀ k, (σ → Γ k) → Stmt → Stmt \| peek : ∀ k, (σ → Option (Γ k) → σ) → Stmt → Stmt \| pop : ∀ k, (σ → Option (Γ k) → σ) → Stmt → Stmt \| load : (σ → σ) → Stmt → Stmt \| branch : (σ → Bool) → Stmt → Stmt → Stmt \| goto : (σ → Λ) → Stmt \| halt : Stmt open Stmt instance Stmt.inhabited : Inhabited (Stmt Γ Λ σ) := ⟨halt⟩ /-- A configuration in the TM2 model is a label (or `none` for the halt state), the state of local variables, and the stacks. (Note that the stacks are not `ListBlank`s, they have a definite size.) -/ structure Cfg where /-- The current label to run (or `none` for the halting state) -/ l : Option Λ /-- The internal state -/ var : σ /-- The (finite) collection of internal stacks -/ stk : ∀ k, List (Γ k) instance Cfg.inhabited [Inhabited σ] : Inhabited (Cfg Γ Λ σ) := ⟨⟨default, default, default⟩⟩ variable {Γ Λ σ} section variable [DecidableEq K] /-- The step function for the TM2 model. -/ def stepAux : Stmt Γ Λ σ → σ → (∀ k, List (Γ k)) → Cfg Γ Λ σ \| push k f q, v, S => stepAux q v (update S k (f v :: S k)) \| peek k f q, v, S => stepAux q (f v (S k).head?) S \| pop k f q, v, S => stepAux q (f v (S k).head?) (update S k (S k).tail) \| load a q, v, S => stepAux q (a v) S \| branch f q₁ q₂, v, S => cond (f v) (stepAux q₁ v S) (stepAux q₂ v S) \| goto f, v, S => ⟨some (f v), v, S⟩ \| halt, v, S => ⟨none, v, S⟩ /-- The step function for the TM2 model. -/ def step (M : Λ → Stmt Γ Λ σ) : Cfg Γ Λ σ → Option (Cfg Γ Λ σ) \| ⟨none, _, _⟩ => none \| ⟨some l, v, S⟩ => some (stepAux (M l) v S) attribute [simp] stepAux.eq_1 stepAux.eq_2 stepAux.eq_3 stepAux.eq_4 stepAux.eq_5 stepAux.eq_6 stepAux.eq_7 step.eq_1 step.eq_2 /-- The (reflexive) reachability relation for the TM2 model. -/ def Reaches (M : Λ → Stmt Γ Λ σ) : Cfg Γ Λ σ → Cfg Γ Λ σ → Prop := ReflTransGen fun a b ↦ b ∈ step M a end /-- Given a set `S` of states, `SupportsStmt S q` means that `q` only jumps to states in `S`. -/ def SupportsStmt (S : Finset Λ) : Stmt Γ Λ σ → Prop \| push _ _ q => SupportsStmt S q \| peek _ _ q => SupportsStmt S q \| pop _ _ q => SupportsStmt S q \| load _ q => SupportsStmt S q \| branch _ q₁ q₂ => SupportsStmt S q₁ ∧ SupportsStmt S q₂ \| goto l => ∀ v, l v ∈ S \| halt => True section open scoped Classical in /-- The set of subtree statements in a statement. -/ noncomputable def stmts₁ : Stmt Γ Λ σ → Finset (Stmt Γ Λ σ) \| Q@(push _ _ q) => insert Q (stmts₁ q) \| Q@(peek _ _ q) => insert Q (stmts₁ q) \| Q@(pop _ _ q) => insert Q (stmts₁ q) \| Q@(load _ q) => insert Q (stmts₁ q) \| Q@(branch _ q₁ q₂) => insert Q (stmts₁ q₁ ∪ stmts₁ q₂) \| Q@(goto _) => {Q} \| Q@halt => {Q} theorem stmts₁_self {q : Stmt Γ Λ σ} : q ∈ stmts₁ q := by cases q <;> simp only [Finset.mem_insert_self, Finset.mem_singleton_self, stmts₁] theorem stmts₁_trans {q₁ q₂ : Stmt Γ Λ σ} : q₁ ∈ stmts₁ q₂ → stmts₁ q₁ ⊆ stmts₁ q₂ := by classical intro h₁₂ q₀ h₀₁ induction q₂ with ( simp only [stmts₁] at h₁₂ ⊢ simp only [Finset.mem_insert, Finset.mem_singleton, Finset.mem_union] at h₁₂) \| branch f q₁ q₂ IH₁ IH₂ => rcases h₁₂ with (rfl \| h₁₂ \| h₁₂) · unfold stmts₁ at h₀₁ exact h₀₁ · exact Finset.mem_insert_of_mem (Finset.mem_union_left _ (IH₁ h₁₂)) · exact Finset.mem_insert_of_mem (Finset.mem_union_right _ (IH₂ h₁₂)) \| goto l => subst h₁₂; exact h₀₁ \| halt => subst h₁₂; exact h₀₁ \| load _ q IH \| _ _ _ q IH => rcases h₁₂ with (rfl \| h₁₂) · unfold stmts₁ at h₀₁ exact h₀₁ · exact Finset.mem_insert_of_mem (IH h₁₂) theorem stmts₁_supportsStmt_mono {S : Finset Λ} {q₁ q₂ : Stmt Γ Λ σ} (h : q₁ ∈ stmts₁ q₂) (hs : SupportsStmt S q₂) : SupportsStmt S q₁ := by induction q₂ with simp only [stmts₁, SupportsStmt, Finset.mem_insert, Finset.mem_union, Finset.mem_singleton] at h hs \| branch f q₁ q₂ IH₁ IH₂ => rcases h with (rfl \| h \| h); exacts [hs, IH₁ h hs.1, IH₂ h hs.2] \| goto l => subst h; exact hs \| halt => subst h; trivial \| load _ _ IH \| _ _ _ _ IH => rcases h with (rfl \| h) <;> [exact hs; exact IH h hs] open scoped Classical in /-- The set of statements accessible from initial set `S` of labels. -/ noncomputable def stmts (M : Λ → Stmt Γ Λ σ) (S : Finset Λ) : Finset (Option (Stmt Γ Λ σ)) := Finset.insertNone (S.biUnion fun q ↦ stmts₁ (M q)) theorem stmts_trans {M : Λ → Stmt Γ Λ σ} {S : Finset Λ} {q₁ q₂ : Stmt Γ Λ σ} (h₁ : q₁ ∈ stmts₁ q₂) : some q₂ ∈ stmts M S → some q₁ ∈ stmts M S := by simp only [stmts, Finset.mem_insertNone, Finset.mem_biUnion, Option.mem_def, Option.some.injEq, forall_eq', exists_imp, and_imp] exact fun l ls h₂ ↦ ⟨_, ls, stmts₁_trans h₂ h₁⟩ end variable [Inhabited Λ] /-- Given a TM2 machine `M` and a set `S` of states, `Supports M S` means that all states in `S` jump only to other states in `S`. -/ def Supports (M : Λ → Stmt Γ Λ σ) (S : Finset Λ) := default ∈ S ∧ ∀ q ∈ S, SupportsStmt S (M q) theorem stmts_supportsStmt {M : Λ → Stmt Γ Λ σ} {S : Finset Λ} {q : Stmt Γ Λ σ} (ss : Supports M S) : some q ∈ stmts M S → SupportsStmt S q := by simp only [stmts, Finset.mem_insertNone, Finset.mem_biUnion, Option.mem_def, Option.some.injEq, forall_eq', exists_imp, and_imp] exact fun l ls h ↦ stmts₁_supportsStmt_mono h (ss.2 _ ls) variable [DecidableEq K] theorem step_supports (M : Λ → Stmt Γ Λ σ) {S : Finset Λ} (ss : Supports M S) : ∀ {c c' : Cfg Γ Λ σ}, c' ∈ step M c → c.l ∈ Finset.insertNone S → c'.l ∈ Finset.insertNone S \| ⟨some l₁, v, T⟩, c', h₁, h₂ => by replace h₂ := ss.2 _ (Finset.some_mem_insertNone.1 h₂) simp only [step, Option.mem_def, Option.some.injEq] at h₁; subst c' revert h₂; induction M l₁ generalizing v T with intro hs \| branch p q₁' q₂' IH₁ IH₂ => unfold stepAux; cases p v · exact IH₂ _ _ hs.2 · exact IH₁ _ _ hs.1 \| goto => exact Finset.some_mem_insertNone.2 (hs _) \| halt => apply Multiset.mem_cons_self \| load _ _ IH \| _ _ _ _ IH => exact IH _ _ hs variable [Inhabited σ] /-- The initial state of the TM2 model. The input is provided on a designated stack. -/ def init (k : K) (L : List (Γ k)) : Cfg Γ Λ σ := ⟨some default, default, update (fun _ ↦ []) k L⟩ /-- Evaluates a TM2 program to completion, with the output on the same stack as the input. -/ def eval (M : Λ → Stmt Γ Λ σ) (k : K) (L : List (Γ k)) : Part (List (Γ k)) := (Turing.eval (step M) (init k L)).map fun c ↦ c.stk k end TM2 /-! ## TM2 emulator in TM1 To prove that TM2 computable functions are TM1 computable, we need to reduce each TM2 program to a TM1 program. So suppose a TM2 program is given. This program has to maintain a whole collection of stacks, but we have only one tape, so we must "multiplex" them all together. Pictorially, if stack 1 contains `[a, b]` and stack 2 contains `[c, d, e, f]` then the tape looks like this: ``` bottom: ... \| _ \| T \| _ \| _ \| _ \| _ \| ... stack 1: ... \| _ \| b \| a \| _ \| _ \| _ \| ... stack 2: ... \| _ \| f \| e \| d \| c \| _ \| ... ``` where a tape element is a vertical slice through the diagram. Here the alphabet is `Γ' := Bool × ∀ k, Option (Γ k)`, where: * `bottom : Bool` is marked only in one place, the initial position of the TM, and represents the tail of all stacks. It is never modified. * `stk k : Option (Γ k)` is the value of the `k`-th stack, if in range, otherwise `none` (which is the blank value). Note that the head of the stack is at the far end; this is so that push and pop don't have to do any shifting. In "resting" position, the TM is sitting at the position marked `bottom`. For non-stack actions, it operates in place, but for the stack actions `push`, `peek`, and `pop`, it must shuttle to the end of the appropriate stack, make its changes, and then return to the bottom. So the states are: * `normal (l : Λ)`: waiting at `bottom` to execute function `l` * `go k (s : StAct k) (q : Stmt₂)`: travelling to the right to get to the end of stack `k` in order to perform stack action `s`, and later continue with executing `q` * `ret (q : Stmt₂)`: travelling to the left after having performed a stack action, and executing `q` once we arrive Because of the shuttling, emulation overhead is `O(n)`, where `n` is the current maximum of the length of all stacks. Therefore a program that takes `k` steps to run in TM2 takes `O((m+k)k)` steps to run when emulated in TM1, where `m` is the length of the input. -/ namespace TM2to1 -- A displaced lemma proved in unnecessary generality theorem stk_nth_val {K : Type} {Γ : K → Type} {L : ListBlank (∀ k, Option (Γ k))} {k S} (n) (hL : ListBlank.map (proj k) L = ListBlank.mk (List.map some S).reverse) : L.nth n k = S.reverse[n]? := by rw [← proj_map_nth, hL, ← List.map_reverse, ListBlank.nth_mk, List.getI_eq_iget_getElem?, List.getElem?_map] cases S.reverse[n]? <;> rfl variable (K : Type) variable (Γ : K → Type) variable {Λ σ : Type*} /-- The alphabet of the TM2 simulator on TM1 is a marker for the stack bottom, plus a vector of stack elements for each stack, or none if the stack does not extend this far. -/ def Γ' := Bool × ∀ k, Option (Γ k) variable {K Γ} instance Γ'.inhabited : Inhabited (Γ' K Γ) := ⟨⟨false, fun _ ↦ none⟩⟩ instance Γ'.fintype [DecidableEq K] [Fintype K] [∀ k, Fintype (Γ k)] : Fintype (Γ' K Γ) := instFintypeProd _ _ /-- The bottom marker is fixed throughout the calculation, so we use the `addBottom` function to express the program state in terms of a tape with only the stacks themselves. -/ def addBottom (L : ListBlank (∀ k, Option (Γ k))) : ListBlank (Γ' K Γ) := ListBlank.cons (true, L.head) (L.tail.map ⟨Prod.mk false, rfl⟩) theorem addBottom_map (L : ListBlank (∀ k, Option (Γ k))) : (addBottom L).map ⟨Prod.snd, by rfl⟩ = L := by simp only [addBottom, ListBlank.map_cons] convert ListBlank.cons_head_tail L generalize ListBlank.tail L = L' refine L'.induction_on fun l ↦ ?_; simp theorem addBottom_modifyNth (f : (∀ k, Option (Γ k)) → ∀ k, Option (Γ k)) (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) : (addBottom L).modifyNth (fun a ↦ (a.1, f a.2)) n = addBottom (L.modifyNth f n) := by cases n <;> simp only [addBottom, ListBlank.head_cons, ListBlank.modifyNth, ListBlank.tail_cons] congr; symm; apply ListBlank.map_modifyNth; intro; rfl theorem addBottom_nth_snd (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) : ((addBottom L).nth n).2 = L.nth n := by conv => rhs; rw [← addBottom_map L, ListBlank.nth_map] theorem addBottom_nth_succ_fst (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) : ((addBottom L).nth (n + 1)).1 = false := by rw [ListBlank.nth_succ, addBottom, ListBlank.tail_cons, ListBlank.nth_map] theorem addBottom_head_fst (L : ListBlank (∀ k, Option (Γ k))) : (addBottom L).head.1 = true := by rw [addBottom, ListBlank.head_cons] variable (K Γ σ) in /-- A stack action is a command that interacts with the top of a stack. Our default position is at the bottom of all the stacks, so we have to hold on to this action while going to the end to modify the stack. -/ inductive StAct (k : K) \| push : (σ → Γ k) → StAct k \| peek : (σ → Option (Γ k) → σ) → StAct k \| pop : (σ → Option (Γ k) → σ) → StAct k instance StAct.inhabited {k : K} : Inhabited (StAct K Γ σ k) := ⟨StAct.peek fun s _ ↦ s⟩ section open StAct /-- The TM2 statement corresponding to a stack action. -/ def stRun {k : K} : StAct K Γ σ k → TM2.Stmt Γ Λ σ → TM2.Stmt Γ Λ σ \| push f => TM2.Stmt.push k f \| peek f => TM2.Stmt.peek k f \| pop f => TM2.Stmt.pop k f /-- The effect of a stack action on the local variables, given the value of the stack. -/ def stVar {k : K} (v : σ) (l : List (Γ k)) : StAct K Γ σ k → σ \| push _ => v \| peek f => f v l.head? \| pop f => f v l.head? /-- The effect of a stack action on the stack. -/ def stWrite {k : K} (v : σ) (l : List (Γ k)) : StAct K Γ σ k → List (Γ k) \| push f => f v :: l \| peek _ => l \| pop _ => l.tail /-- We have partitioned the TM2 statements into "stack actions", which require going to the end of the stack, and all other actions, which do not. This is a modified recursor which lumps the stack actions into one. -/ @[elab_as_elim] def stmtStRec.{l} {motive : TM2.Stmt Γ Λ σ → Sort l} (run : ∀ (k) (s : StAct K Γ σ k) (q) (_ : motive q), motive (stRun s q)) (load : ∀ (a q) (_ : motive q), motive (TM2.Stmt.load a q)) (branch : ∀ (p q₁ q₂) (_ : motive q₁) (_ : motive q₂), motive (TM2.Stmt.branch p q₁ q₂)) (goto : ∀ l, motive (TM2.Stmt.goto l)) (halt : motive TM2.Stmt.halt) : ∀ n, motive n \| TM2.Stmt.push _ f q => run _ (push f) _ (stmtStRec run load branch goto halt q) \| TM2.Stmt.peek _ f q => run _ (peek f) _ (stmtStRec run load branch goto halt q) \| TM2.Stmt.pop _ f q => run _ (pop f) _ (stmtStRec run load branch goto halt q) \| TM2.Stmt.load _ q => load _ _ (stmtStRec run load branch goto halt q) \| TM2.Stmt.branch _ q₁ q₂ => branch _ _ _ (stmtStRec run load branch goto halt q₁) (stmtStRec run load branch goto halt q₂) \| TM2.Stmt.goto _ => goto _ \| TM2.Stmt.halt => halt theorem supports_run (S : Finset Λ) {k : K} (s : StAct K Γ σ k) (q : TM2.Stmt Γ Λ σ) : TM2.SupportsStmt S (stRun s q) ↔ TM2.SupportsStmt S q := by cases s <;> rfl end variable (K Γ Λ σ) /-- The machine states of the TM2 emulator. We can either be in a normal state when waiting for the next TM2 action, or we can be in the "go" and "return" states to go to the top of the stack and return to the bottom, respectively. -/ inductive Λ' \| normal : Λ → Λ' \| go (k : K) : StAct K Γ σ k → TM2.Stmt Γ Λ σ → Λ' \| ret : TM2.Stmt Γ Λ σ → Λ' variable {K Γ Λ σ} open Λ' instance Λ'.inhabited [Inhabited Λ] : Inhabited (Λ' K Γ Λ σ) := ⟨normal default⟩ open TM1.Stmt section variable [DecidableEq K] /-- The program corresponding to state transitions at the end of a stack. Here we start out just after the top of the stack, and should end just after the new top of the stack. -/ def trStAct {k : K} (q : TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ) : StAct K Γ σ k → TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ \| StAct.push f => (write fun a s ↦ (a.1, update a.2 k <\| some <\| f s)) <\| move Dir.right q \| StAct.peek f => move Dir.left <\| (load fun a s ↦ f s (a.2 k)) <\| move Dir.right q \| StAct.pop f => branch (fun a _ ↦ a.1) (load (fun _ s ↦ f s none) q) (move Dir.left <\| (load fun a s ↦ f s (a.2 k)) <\| write (fun a _ ↦ (a.1, update a.2 k none)) q) /-- The initial state for the TM2 emulator, given an initial TM2 state. All stacks start out empty except for the input stack, and the stack bottom mark is set at the head. -/ def trInit (k : K) (L : List (Γ k)) : List (Γ' K Γ) := let L' : List (Γ' K Γ) := L.reverse.map fun a ↦ (false, update (fun _ ↦ none) k (some a)) (true, L'.headI.2) :: L'.tail theorem step_run {k : K} (q : TM2.Stmt Γ Λ σ) (v : σ) (S : ∀ k, List (Γ k)) : ∀ s : StAct K Γ σ k, TM2.stepAux (stRun s q) v S = TM2.stepAux q (stVar v (S k) s) (update S k (stWrite v (S k) s)) \| StAct.push _ => rfl \| StAct.peek f => by unfold stWrite; rw [Function.update_eq_self]; rfl \| StAct.pop _ => rfl end /-- The translation of TM2 statements to TM1 statements. regular actions have direct equivalents, but stack actions are deferred by going to the corresponding `go` state, so that we can find the appropriate stack top. -/ def trNormal : TM2.Stmt Γ Λ σ → TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ \| TM2.Stmt.push k f q => goto fun _ _ ↦ go k (StAct.push f) q \| TM2.Stmt.peek k f q => goto fun _ _ ↦ go k (StAct.peek f) q \| TM2.Stmt.pop k f q => goto fun _ _ ↦ go k (StAct.pop f) q \| TM2.Stmt.load a q => load (fun _ ↦ a) (trNormal q) \| TM2.Stmt.branch f q₁ q₂ => branch (fun _ ↦ f) (trNormal q₁) (trNormal q₂) \| TM2.Stmt.goto l => goto fun _ s ↦ normal (l s) \| TM2.Stmt.halt => halt theorem trNormal_run {k : K} (s : StAct K Γ σ k) (q : TM2.Stmt Γ Λ σ) : trNormal (stRun s q) = goto fun _ _ ↦ go k s q := by cases s <;> rfl section open scoped Classical in /-- The set of machine states accessible from an initial TM2 statement. -/ noncomputable def trStmts₁ : TM2.Stmt Γ Λ σ → Finset (Λ' K Γ Λ σ) \| TM2.Stmt.push k f q => {go k (StAct.push f) q, ret q} ∪ trStmts₁ q \| TM2.Stmt.peek k f q => {go k (StAct.peek f) q, ret q} ∪ trStmts₁ q \| TM2.Stmt.pop k f q => {go k (StAct.pop f) q, ret q} ∪ trStmts₁ q \| TM2.Stmt.load _ q => trStmts₁ q \| TM2.Stmt.branch _ q₁ q₂ => trStmts₁ q₁ ∪ trStmts₁ q₂ \| _ => ∅ theorem trStmts₁_run {k : K} {s : StAct K Γ σ k} {q : TM2.Stmt Γ Λ σ} : open scoped Classical in trStmts₁ (stRun s q) = {go k s q, ret q} ∪ trStmts₁ q := by cases s <;> simp only [trStmts₁, stRun] theorem tr_respects_aux₂ [DecidableEq K] {k : K} {q : TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ} {v : σ} {S : ∀ k, List (Γ k)} {L : ListBlank (∀ k, Option (Γ k))} (hL : ∀ k, L.map (proj k) = ListBlank.mk ((S k).map some).reverse) (o : StAct K Γ σ k) : let v' := stVar v (S k) o let Sk' := stWrite v (S k) o let S' := update S k Sk' ∃ L' : ListBlank (∀ k, Option (Γ k)), (∀ k, L'.map (proj k) = ListBlank.mk ((S' k).map some).reverse) ∧ TM1.stepAux (trStAct q o) v ((Tape.move Dir.right)^[(S k).length] (Tape.mk' ∅ (addBottom L))) = TM1.stepAux q v' ((Tape.move Dir.right)^[(S' k).length] (Tape.mk' ∅ (addBottom L'))) := by simp only [Function.update_self]; cases o with simp only [stWrite, stVar, trStAct, TM1.stepAux] \| push f => have := Tape.write_move_right_n fun a : Γ' K Γ ↦ (a.1, update a.2 k (some (f v))) refine ⟨_, fun k' ↦ ?_, by -- Porting note: `rw [...]` to `erw [...]; rfl`. -- https://github.com/leanprover-community/mathlib4/issues/5164 rw [Tape.move_right_n_head, List.length, Tape.mk'_nth_nat, this] erw [addBottom_modifyNth fun a ↦ update a k (some (f v))] rw [Nat.add_one, iterate_succ'] rfl⟩ refine ListBlank.ext fun i ↦ ?_ rw [ListBlank.nth_map, ListBlank.nth_modifyNth, proj, PointedMap.mk_val] by_cases h' : k' = k · subst k' split_ifs with h <;> simp only [List.reverse_cons, Function.update_self, ListBlank.nth_mk, List.map] · rw [List.getI_eq_getElem _, List.getElem_append_right] <;> simp only [List.length_append, List.length_reverse, List.length_map, ← h, Nat.sub_self, List.length_singleton, List.getElem_singleton, le_refl, Nat.lt_succ_self] rw [← proj_map_nth, hL, ListBlank.nth_mk] rcases lt_or_gt_of_ne h with h \| h · rw [List.getI_append] simpa only [List.length_map, List.length_reverse] using h · rw [gt_iff_lt] at h rw [List.getI_eq_default, List.getI_eq_default] <;> simp only [Nat.add_one_le_iff, h, List.length, le_of_lt, List.length_reverse, List.length_append, List.length_map] · split_ifs <;> rw [Function.update_of_ne h', ← proj_map_nth, hL] rw [Function.update_of_ne h'] \| peek f => rw [Function.update_eq_self] use L, hL; rw [Tape.move_left_right]; congr cases e : S k; · rfl rw [List.length_cons, iterate_succ', Function.comp, Tape.move_right_left, Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_snd, stk_nth_val _ (hL k), e, List.reverse_cons, ← List.length_reverse, List.getElem?_concat_length] rfl \| pop f => rcases e : S k with - \| ⟨hd, tl⟩ · simp only [Tape.mk'_head, ListBlank.head_cons, Tape.move_left_mk', List.length, Tape.write_mk', List.head?, iterate_zero_apply, List.tail_nil] rw [← e, Function.update_eq_self] exact ⟨L, hL, by rw [addBottom_head_fst, cond]⟩ · refine ⟨_, fun k' ↦ ?_, by erw [List.length_cons, Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_succ_fst, cond_false, iterate_succ', Function.comp, Tape.move_right_left, Tape.move_right_n_head, Tape.mk'_nth_nat, Tape.write_move_right_n fun a : Γ' K Γ ↦ (a.1, update a.2 k none), addBottom_modifyNth fun a ↦ update a k none, addBottom_nth_snd, stk_nth_val _ (hL k), e, show (List.cons hd tl).reverse[tl.length]? = some hd by rw [List.reverse_cons, ← List.length_reverse, List.getElem?_concat_length], List.head?, List.tail]⟩ refine ListBlank.ext fun i ↦ ?_ rw [ListBlank.nth_map, ListBlank.nth_modifyNth, proj, PointedMap.mk_val] by_cases h' : k' = k · subst k' split_ifs with h <;> simp only [Function.update_self, ListBlank.nth_mk, List.tail] · rw [List.getI_eq_default] · rfl rw [h, List.length_reverse, List.length_map] rw [← proj_map_nth, hL, ListBlank.nth_mk, e, List.map, List.reverse_cons] rcases lt_or_gt_of_ne h with h \| h · rw [List.getI_append] simpa only [List.length_map, List.length_reverse] using h · rw [gt_iff_lt] at h rw [List.getI_eq_default, List.getI_eq_default] <;> simp only [Nat.add_one_le_iff, h, List.length, le_of_lt, List.length_reverse, List.length_append, List.length_map] · split_ifs <;> rw [Function.update_of_ne h', ← proj_map_nth, hL] rw [Function.update_of_ne h'] end variable [DecidableEq K] variable (M : Λ → TM2.Stmt Γ Λ σ) /-- The TM2 emulator machine states written as a TM1 program. This handles the `go` and `ret` states, which shuttle to and from a stack top. -/ def tr : Λ' K Γ Λ σ → TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ \| normal q => trNormal (M q) \| go k s q => branch (fun a _ ↦ (a.2 k).isNone) (trStAct (goto fun _ _ ↦ ret q) s) (move Dir.right <\| goto fun _ _ ↦ go k s q) \| ret q => branch (fun a _ ↦ a.1) (trNormal q) (move Dir.left <\| goto fun _ _ ↦ ret q) /-- The relation between TM2 configurations and TM1 configurations of the TM2 emulator. -/ inductive TrCfg : TM2.Cfg Γ Λ σ → TM1.Cfg (Γ' K Γ) (Λ' K Γ Λ σ) σ → Prop \| mk {q : Option Λ} {v : σ} {S : ∀ k, List (Γ k)} (L : ListBlank (∀ k, Option (Γ k))) : (∀ k, L.map (proj k) = ListBlank.mk ((S k).map some).reverse) → TrCfg ⟨q, v, S⟩ ⟨q.map normal, v, Tape.mk' ∅ (addBottom L)⟩ theorem tr_respects_aux₁ {k} (o q v) {S : List (Γ k)} {L : ListBlank (∀ k, Option (Γ k))} (hL : L.map (proj k) = ListBlank.mk (S.map some).reverse) (n) (H : n ≤ S.length) : Reaches₀ (TM1.step (tr M)) ⟨some (go k o q), v, Tape.mk' ∅ (addBottom L)⟩ ⟨some (go k o q), v, (Tape.move Dir.right)^[n] (Tape.mk' ∅ (addBottom L))⟩ := by induction' n with n IH; · rfl apply (IH (le_of_lt H)).tail rw [iterate_succ_apply'] simp only [TM1.step, TM1.stepAux, tr, Tape.mk'_nth_nat, Tape.move_right_n_head, addBottom_nth_snd, Option.mem_def] rw [stk_nth_val _ hL, List.getElem?_eq_getElem] · rfl · rwa [List.length_reverse] theorem tr_respects_aux₃ {q v} {L : ListBlank (∀ k, Option (Γ k))} (n) : Reaches₀ (TM1.step (tr M)) ⟨some (ret q), v, (Tape.move Dir.right)^[n] (Tape.mk' ∅ (addBottom L))⟩ ⟨some (ret q), v, Tape.mk' ∅ (addBottom L)⟩ := by induction' n with n IH; · rfl refine Reaches₀.head ?_ IH simp only [Option.mem_def, TM1.step] rw [Option.some_inj, tr, TM1.stepAux, Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_succ_fst, TM1.stepAux, iterate_succ', Function.comp_apply, Tape.move_right_left] rfl theorem tr_respects_aux {q v T k} {S : ∀ k, List (Γ k)} (hT : ∀ k, ListBlank.map (proj k) T = ListBlank.mk ((S k).map some).reverse) (o : StAct K Γ σ k) (IH : ∀ {v : σ} {S : ∀ k : K, List (Γ k)} {T : ListBlank (∀ k, Option (Γ k))}, (∀ k, ListBlank.map (proj k) T = ListBlank.mk ((S k).map some).reverse) → ∃ b, TrCfg (TM2.stepAux q v S) b ∧ Reaches (TM1.step (tr M)) (TM1.stepAux (trNormal q) v (Tape.mk' ∅ (addBottom T))) b) : ∃ b, TrCfg (TM2.stepAux (stRun o q) v S) b ∧ Reaches (TM1.step (tr M)) (TM1.stepAux (trNormal (stRun o q)) v (Tape.mk' ∅ (addBottom T))) b := by simp only [trNormal_run, step_run] have hgo := tr_respects_aux₁ M o q v (hT k) _ le_rfl obtain ⟨T', hT', hrun⟩ := tr_respects_aux₂ (Λ := Λ) hT o have := hgo.tail' rfl rw [tr, TM1.stepAux, Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_snd, stk_nth_val _ (hT k), List.getElem?_eq_none (le_of_eq List.length_reverse), Option.isNone, cond, hrun, TM1.stepAux] at this obtain ⟨c, gc, rc⟩ := IH hT' refine ⟨c, gc, (this.to₀.trans (tr_respects_aux₃ M _) c (TransGen.head' rfl ?_)).to_reflTransGen⟩ rw [tr, TM1.stepAux, Tape.mk'_head, addBottom_head_fst] exact rc attribute [local simp] Respects TM2.step TM2.stepAux trNormal theorem tr_respects : Respects (TM2.step M) (TM1.step (tr M)) TrCfg := by -- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed intro c₁ c₂ h obtain @⟨- \| l, v, S, L, hT⟩ := h; · constructor rsuffices ⟨b, c, r⟩ : ∃ b, _ ∧ Reaches (TM1.step (tr M)) _ _ · exact ⟨b, c, TransGen.head' rfl r⟩ simp only [tr] generalize M l = N induction N using stmtStRec generalizing v S L hT with \| run k s q IH => exact tr_respects_aux M hT s @IH \| load a _ IH => exact IH _ hT \| branch p q₁ q₂ IH₁ IH₂ => unfold TM2.stepAux trNormal TM1.stepAux beta_reduce cases p v <;> [exact IH₂ _ hT; exact IH₁ _ hT] \| goto => exact ⟨_, ⟨_, hT⟩, ReflTransGen.refl⟩ \| halt => exact ⟨_, ⟨_, hT⟩, ReflTransGen.refl⟩ section variable [Inhabited Λ] [Inhabited σ] theorem trCfg_init (k) (L : List (Γ k)) : TrCfg (TM2.init k L) (TM1.init (trInit k L) : TM1.Cfg (Γ' K Γ) (Λ' K Γ Λ σ) σ) := by rw [(_ : TM1.init _ = _)] · refine ⟨ListBlank.mk (L.reverse.map fun a ↦ update default k (some a)), fun k' ↦ ?_⟩ refine ListBlank.ext fun i ↦ ?_ rw [ListBlank.map_mk, ListBlank.nth_mk, List.getI_eq_iget_getElem?, List.map_map] have : ((proj k').f ∘ fun a => update (β := fun k => Option (Γ k)) default k (some a)) = fun a => (proj k').f (update (β := fun k => Option (Γ k)) default k (some a)) := rfl rw [this, List.getElem?_map, proj, PointedMap.mk_val] simp only [] by_cases h : k' = k · subst k' simp only [Function.update_self] rw [ListBlank.nth_mk, List.getI_eq_iget_getElem?, ← List.map_reverse, List.getElem?_map] · simp only [Function.update_of_ne h] rw [ListBlank.nth_mk, List.getI_eq_iget_getElem?, List.map, List.reverse_nil] cases L.reverse[i]? <;> rfl · rw [trInit, TM1.init] congr <;> cases L.reverse <;> try rfl simp only [List.map_map, List.tail_cons, List.map] rfl theorem tr_eval_dom (k) (L : List (Γ k)) : (TM1.eval (tr M) (trInit k L)).Dom ↔ (TM2.eval M k L).Dom := Turing.tr_eval_dom (tr_respects M) (trCfg_init k L) theorem tr_eval (k) (L : List (Γ k)) {L₁ L₂} (H₁ : L₁ ∈ TM1.eval (tr M) (trInit k L)) (H₂ : L₂ ∈ TM2.eval M k L) : ∃ (S : ∀ k, List (Γ k)) (L' : ListBlank (∀ k, Option (Γ k))), addBottom L' = L₁ ∧ (∀ k, L'.map (proj k) = ListBlank.mk ((S k).map some).reverse) ∧ S k = L₂ := by obtain ⟨c₁, h₁, rfl⟩ := (Part.mem_map_iff _).1 H₁ obtain ⟨c₂, h₂, rfl⟩ := (Part.mem_map_iff _).1 H₂ obtain ⟨_, ⟨L', hT⟩, h₃⟩ := Turing.tr_eval (tr_respects M) (trCfg_init k L) h₂ cases Part.mem_unique h₁ h₃ exact ⟨_, L', by simp only [Tape.mk'_right₀], hT, rfl⟩ end section variable [Inhabited Λ] open scoped Classical in /-- The support of a set of TM2 states in the TM2 emulator. -/ noncomputable def trSupp (S : Finset Λ) : Finset (Λ' K Γ Λ σ) := S.biUnion fun l ↦ insert (normal l) (trStmts₁ (M l)) open scoped Classical in theorem tr_supports {S} (ss : TM2.Supports M S) : TM1.Supports (tr M) (trSupp M S) := ⟨Finset.mem_biUnion.2 ⟨_, ss.1, Finset.mem_insert.2 <\| Or.inl rfl⟩, fun l' h ↦ by suffices ∀ (q) (_ : TM2.SupportsStmt S q) (_ : ∀ x ∈ trStmts₁ q, x ∈ trSupp M S), TM1.SupportsStmt (trSupp M S) (trNormal q) ∧ ∀ l' ∈ trStmts₁ q, TM1.SupportsStmt (trSupp M S) (tr M l') by rcases Finset.mem_biUnion.1 h with ⟨l, lS, h⟩ have := this _ (ss.2 l lS) fun x hx ↦ Finset.mem_biUnion.2 ⟨_, lS, Finset.mem_insert_of_mem hx⟩ rcases Finset.mem_insert.1 h with (rfl \| h) <;> [exact this.1; exact this.2 _ h] clear h l' refine stmtStRec ?_ ?_ ?_ ?_ ?_ · intro _ s _ IH ss' sub -- stack op rw [TM2to1.supports_run] at ss' simp only [TM2to1.trStmts₁_run, Finset.mem_union, Finset.mem_insert, Finset.mem_singleton] at sub have hgo := sub _ (Or.inl <\| Or.inl rfl) have hret := sub _ (Or.inl <\| Or.inr rfl) obtain ⟨IH₁, IH₂⟩ := IH ss' fun x hx ↦ sub x <\| Or.inr hx refine ⟨by simp only [trNormal_run, TM1.SupportsStmt]; intros; exact hgo, fun l h ↦ ?_⟩ rw [trStmts₁_run] at h simp only [TM2to1.trStmts₁_run, Finset.mem_union, Finset.mem_insert, Finset.mem_singleton] at h rcases h with (⟨rfl \| rfl⟩ \| h) · cases s · exact ⟨fun _ _ ↦ hret, fun _ _ ↦ hgo⟩ · exact ⟨fun _ _ ↦ hret, fun _ _ ↦ hgo⟩ · exact ⟨⟨fun _ _ ↦ hret, fun _ _ ↦ hret⟩, fun _ _ ↦ hgo⟩ · unfold TM1.SupportsStmt TM2to1.tr exact ⟨IH₁, fun _ _ ↦ hret⟩ · exact IH₂ _ h · intro _ _ IH ss' sub -- load unfold TM2to1.trStmts₁ at sub ⊢ exact IH ss' sub · intro _ _ _ IH₁ IH₂ ss' sub -- branch unfold TM2to1.trStmts₁ at sub obtain ⟨IH₁₁, IH₁₂⟩ := IH₁ ss'.1 fun x hx ↦ sub x <\| Finset.mem_union_left _ hx obtain ⟨IH₂₁, IH₂₂⟩ := IH₂ ss'.2 fun x hx ↦ sub x <\| Finset.mem_union_right _ hx refine ⟨⟨IH₁₁, IH₂₁⟩, fun l h ↦ ?_⟩ rw [trStmts₁] at h rcases Finset.mem_union.1 h with (h \| h) <;> [exact IH₁₂ _ h; exact IH₂₂ _ h] · intro _ ss' _ -- goto simp only [trStmts₁, Finset.not_mem_empty]; refine ⟨?_, fun _ ↦ False.elim⟩ exact fun _ v ↦ Finset.mem_biUnion.2 ⟨_, ss' v, Finset.mem_insert_self _ _⟩ · intro _ _ -- halt simp only [trStmts₁, Finset.not_mem_empty] exact ⟨trivial, fun _ ↦ False.elim⟩⟩ end end TM2to1 end Turing		Mathlib/Computability/TuringMachine.lean	988	997
/- 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, Kim Morrison -/ import Mathlib.Algebra.Algebra.Equiv import Mathlib.Algebra.Algebra.NonUnitalHom import Mathlib.Algebra.Module.BigOperators import Mathlib.Algebra.MonoidAlgebra.MapDomain import Mathlib.Data.Finsupp.SMul import Mathlib.LinearAlgebra.Finsupp.SumProd /-! # Monoid algebras -/ noncomputable section open Finset open Finsupp hiding single mapDomain universe u₁ u₂ u₃ u₄ variable (k : Type u₁) (G : Type u₂) (H : Type) {R : Type} /-! ### Multiplicative monoids -/ namespace MonoidAlgebra variable {k G} /-! #### Non-unital, non-associative algebra structure -/ section NonUnitalNonAssocAlgebra variable (k) [Semiring k] [DistribSMul R k] [Mul G] variable {A : Type u₃} [NonUnitalNonAssocSemiring A] /-- A non_unital `k`-algebra homomorphism from `MonoidAlgebra k G` is uniquely defined by its values on the functions `single a 1`. -/ theorem nonUnitalAlgHom_ext [DistribMulAction k A] {φ₁ φ₂ : MonoidAlgebra k G →ₙₐ[k] A} (h : ∀ x, φ₁ (single x 1) = φ₂ (single x 1)) : φ₁ = φ₂ := NonUnitalAlgHom.to_distribMulActionHom_injective <\| Finsupp.distribMulActionHom_ext' fun a => DistribMulActionHom.ext_ring (h a) /-- See note [partially-applied ext lemmas]. -/ @[ext high] theorem nonUnitalAlgHom_ext' [DistribMulAction k A] {φ₁ φ₂ : MonoidAlgebra k G →ₙₐ[k] A} (h : φ₁.toMulHom.comp (ofMagma k G) = φ₂.toMulHom.comp (ofMagma k G)) : φ₁ = φ₂ := nonUnitalAlgHom_ext k <\| DFunLike.congr_fun h /-- The functor `G ↦ MonoidAlgebra k G`, from the category of magmas to the category of non-unital, non-associative algebras over `k` is adjoint to the forgetful functor in the other direction. -/ @[simps apply_apply symm_apply] def liftMagma [Module k A] [IsScalarTower k A A] [SMulCommClass k A A] : (G →ₙ* A) ≃ (MonoidAlgebra k G →ₙₐ[k] A) where toFun f := { liftAddHom fun x => (smulAddHom k A).flip (f x) with toFun := fun a => a.sum fun m t => t • f m map_smul' := fun t' a => by rw [Finsupp.smul_sum, sum_smul_index'] · simp_rw [smul_assoc, MonoidHom.id_apply] · intro m exact zero_smul k (f m) map_mul' := fun a₁ a₂ => by let g : G → k → A := fun m t => t • f m have h₁ : ∀ m, g m 0 = 0 := by intro m exact zero_smul k (f m) have h₂ : ∀ (m) (t₁ t₂ : k), g m (t₁ + t₂) = g m t₁ + g m t₂ := by intros rw [← add_smul] -- Porting note: `reducible` cannot be `local` so proof gets long. simp_rw [Finsupp.mul_sum, Finsupp.sum_mul, smul_mul_smul_comm, ← f.map_mul, mul_def, sum_comm a₂ a₁] rw [sum_sum_index h₁ h₂]; congr; ext rw [sum_sum_index h₁ h₂]; congr; ext rw [sum_single_index (h₁ _)] } invFun F := F.toMulHom.comp (ofMagma k G) left_inv f := by ext m simp only [NonUnitalAlgHom.coe_mk, ofMagma_apply, NonUnitalAlgHom.toMulHom_eq_coe, sum_single_index, Function.comp_apply, one_smul, zero_smul, MulHom.coe_comp, NonUnitalAlgHom.coe_to_mulHom] right_inv F := by ext m simp only [NonUnitalAlgHom.coe_mk, ofMagma_apply, NonUnitalAlgHom.toMulHom_eq_coe, sum_single_index, Function.comp_apply, one_smul, zero_smul, MulHom.coe_comp, NonUnitalAlgHom.coe_to_mulHom] end NonUnitalNonAssocAlgebra /-! #### Algebra structure -/ section Algebra /-- The instance `Algebra k (MonoidAlgebra A G)` whenever we have `Algebra k A`. In particular this provides the instance `Algebra k (MonoidAlgebra k G)`. -/ instance algebra {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : Algebra k (MonoidAlgebra A G) where algebraMap := singleOneRingHom.comp (algebraMap k A) smul_def' := fun r a => by ext rw [Finsupp.coe_smul] simp [single_one_mul_apply, Algebra.smul_def, Pi.smul_apply] commutes' := fun r f => by refine Finsupp.ext fun _ => ?_ simp [single_one_mul_apply, mul_single_one_apply, Algebra.commutes] /-- `Finsupp.single 1` as an `AlgHom` -/ @[simps! apply] def singleOneAlgHom {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : A →ₐ[k] MonoidAlgebra A G := { singleOneRingHom with commutes' := fun r => by ext simp rfl } @[simp] theorem coe_algebraMap {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : ⇑(algebraMap k (MonoidAlgebra A G)) = single 1 ∘ algebraMap k A := rfl theorem single_eq_algebraMap_mul_of [CommSemiring k] [Monoid G] (a : G) (b : k) : single a b = algebraMap k (MonoidAlgebra k G) b of k G a := by simp theorem single_algebraMap_eq_algebraMap_mul_of {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] (a : G) (b : k) : single a (algebraMap k A b) = algebraMap k (MonoidAlgebra A G) b of A G a := by simp instance isLocalHom_singleOneAlgHom {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : IsLocalHom (singleOneAlgHom : A →ₐ[k] MonoidAlgebra A G) where map_nonunit := isLocalHom_singleOneRingHom.map_nonunit instance isLocalHom_algebraMap {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] [IsLocalHom (algebraMap k A)] : IsLocalHom (algebraMap k (MonoidAlgebra A G)) where map_nonunit _ hx := .of_map _ _ <\| isLocalHom_singleOneAlgHom (k := k).map_nonunit _ hx end Algebra section lift variable [CommSemiring k] [Monoid G] [Monoid H] variable {A : Type u₃} [Semiring A] [Algebra k A] {B : Type} [Semiring B] [Algebra k B] /-- `liftNCRingHom` as an `AlgHom`, for when `f` is an `AlgHom` -/ def liftNCAlgHom (f : A →ₐ[k] B) (g : G → B) (h_comm : ∀ x y, Commute (f x) (g y)) : MonoidAlgebra A G →ₐ[k] B := { liftNCRingHom (f : A →+* B) g h_comm with commutes' := by simp [liftNCRingHom] } /-- A `k`-algebra homomorphism from `MonoidAlgebra k G` is uniquely defined by its values on the functions `single a 1`. -/ theorem algHom_ext ⦃φ₁ φ₂ : MonoidAlgebra k G →ₐ[k] A⦄ (h : ∀ x, φ₁ (single x 1) = φ₂ (single x 1)) : φ₁ = φ₂ := AlgHom.toLinearMap_injective <\| Finsupp.lhom_ext' fun a => LinearMap.ext_ring (h a) -- The priority must be `high`. /-- See note [partially-applied ext lemmas]. -/ @[ext high] theorem algHom_ext' ⦃φ₁ φ₂ : MonoidAlgebra k G →ₐ[k] A⦄ (h : (φ₁ : MonoidAlgebra k G →* A).comp (of k G) = (φ₂ : MonoidAlgebra k G →* A).comp (of k G)) : φ₁ = φ₂ := algHom_ext <\| DFunLike.congr_fun h variable (k G A) /-- Any monoid homomorphism `G →* A` can be lifted to an algebra homomorphism `MonoidAlgebra k G →ₐ[k] A`. -/ def lift : (G →* A) ≃ (MonoidAlgebra k G →ₐ[k] A) where invFun f := (f : MonoidAlgebra k G →* A).comp (of k G) toFun F := liftNCAlgHom (Algebra.ofId k A) F fun _ _ => Algebra.commutes _ _ left_inv f := by ext simp [liftNCAlgHom, liftNCRingHom] right_inv F := by ext simp [liftNCAlgHom, liftNCRingHom] variable {k G H A} theorem lift_apply' (F : G →* A) (f : MonoidAlgebra k G) : lift k G A F f = f.sum fun a b => algebraMap k A b * F a := rfl theorem lift_apply (F : G →* A) (f : MonoidAlgebra k G) : lift k G A F f = f.sum fun a b => b • F a := by simp only [lift_apply', Algebra.smul_def] theorem lift_def (F : G →* A) : ⇑(lift k G A F) = liftNC ((algebraMap k A : k →+* A) : k →+ A) F := rfl @[simp] theorem lift_symm_apply (F : MonoidAlgebra k G →ₐ[k] A) (x : G) : (lift k G A).symm F x = F (single x 1) := rfl @[simp] theorem lift_single (F : G →* A) (a b) : lift k G A F (single a b) = b • F a := by rw [lift_def, liftNC_single, Algebra.smul_def, AddMonoidHom.coe_coe] theorem lift_of (F : G →* A) (x) : lift k G A F (of k G x) = F x := by simp theorem lift_unique' (F : MonoidAlgebra k G →ₐ[k] A) : F = lift k G A ((F : MonoidAlgebra k G →* A).comp (of k G)) := ((lift k G A).apply_symm_apply F).symm /-- Decomposition of a `k`-algebra homomorphism from `MonoidAlgebra k G` by its values on `F (single a 1)`. -/ theorem lift_unique (F : MonoidAlgebra k G →ₐ[k] A) (f : MonoidAlgebra k G) : F f = f.sum fun a b => b • F (single a 1) := by conv_lhs => rw [lift_unique' F] simp [lift_apply] /-- If `f : G → H` is a homomorphism between two magmas, then `Finsupp.mapDomain f` is a non-unital algebra homomorphism between their magma algebras. -/ @[simps apply] def mapDomainNonUnitalAlgHom (k A : Type) [CommSemiring k] [Semiring A] [Algebra k A] {G H F : Type} [Mul G] [Mul H] [FunLike F G H] [MulHomClass F G H] (f : F) : MonoidAlgebra A G →ₙₐ[k] MonoidAlgebra A H := { (Finsupp.mapDomain.addMonoidHom f : MonoidAlgebra A G →+ MonoidAlgebra A H) with map_mul' := fun x y => mapDomain_mul f x y map_smul' := fun r x => mapDomain_smul r x } variable (A) in theorem mapDomain_algebraMap {F : Type} [FunLike F G H] [MonoidHomClass F G H] (f : F) (r : k) : mapDomain f (algebraMap k (MonoidAlgebra A G) r) = algebraMap k (MonoidAlgebra A H) r := by simp only [coe_algebraMap, mapDomain_single, map_one, (· ∘ ·)] /-- If `f : G → H` is a multiplicative homomorphism between two monoids, then `Finsupp.mapDomain f` is an algebra homomorphism between their monoid algebras. -/ @[simps!] def mapDomainAlgHom (k A : Type) [CommSemiring k] [Semiring A] [Algebra k A] {H F : Type} [Monoid H] [FunLike F G H] [MonoidHomClass F G H] (f : F) : MonoidAlgebra A G →ₐ[k] MonoidAlgebra A H := { mapDomainRingHom A f with commutes' := mapDomain_algebraMap A f } @[simp] lemma mapDomainAlgHom_id (k A) [CommSemiring k] [Semiring A] [Algebra k A] : mapDomainAlgHom k A (MonoidHom.id G) = AlgHom.id k (MonoidAlgebra A G) := by ext; simp [MonoidHom.id, ← Function.id_def] @[simp] lemma mapDomainAlgHom_comp (k A) {G₁ G₂ G₃} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G₁] [Monoid G₂] [Monoid G₃] (f : G₁ → G₂) (g : G₂ →* G₃) : mapDomainAlgHom k A (g.comp f) = (mapDomainAlgHom k A g).comp (mapDomainAlgHom k A f) := by ext; simp [mapDomain_comp] variable (k A) /-- If `e : G ≃* H` is a multiplicative equivalence between two monoids, then `MonoidAlgebra.domCongr e` is an algebra equivalence between their monoid algebras. -/ def domCongr (e : G ≃* H) : MonoidAlgebra A G ≃ₐ[k] MonoidAlgebra A H := AlgEquiv.ofLinearEquiv (Finsupp.domLCongr e : (G →₀ A) ≃ₗ[k] (H →₀ A)) ((equivMapDomain_eq_mapDomain _ _).trans <\| mapDomain_one e) (fun f g => (equivMapDomain_eq_mapDomain _ _).trans <\| (mapDomain_mul e f g).trans <\| congr_arg₂ _ (equivMapDomain_eq_mapDomain _ _).symm (equivMapDomain_eq_mapDomain _ _).symm) theorem domCongr_toAlgHom (e : G ≃* H) : (domCongr k A e).toAlgHom = mapDomainAlgHom k A e := AlgHom.ext fun _ => equivMapDomain_eq_mapDomain _ _ @[simp] theorem domCongr_apply (e : G ≃* H) (f : MonoidAlgebra A G) (h : H) : domCongr k A e f h = f (e.symm h) := rfl @[simp] theorem domCongr_support (e : G ≃* H) (f : MonoidAlgebra A G) : (domCongr k A e f).support = f.support.map e := rfl @[simp] theorem domCongr_single (e : G ≃* H) (g : G) (a : A) : domCongr k A e (single g a) = single (e g) a := Finsupp.equivMapDomain_single _ _ _ @[simp] theorem domCongr_refl : domCongr k A (MulEquiv.refl G) = AlgEquiv.refl := AlgEquiv.ext fun _ => Finsupp.ext fun _ => rfl @[simp] theorem domCongr_symm (e : G ≃* H) : (domCongr k A e).symm = domCongr k A e.symm := rfl end lift section variable (k) /-- When `V` is a `k[G]`-module, multiplication by a group element `g` is a `k`-linear map. -/ def GroupSMul.linearMap [Monoid G] [CommSemiring k] (V : Type u₃) [AddCommMonoid V] [Module k V] [Module (MonoidAlgebra k G) V] [IsScalarTower k (MonoidAlgebra k G) V] (g : G) : V →ₗ[k] V where toFun v := single g (1 : k) • v map_add' x y := smul_add (single g (1 : k)) x y map_smul' _c _x := smul_algebra_smul_comm _ _ _ @[simp] theorem GroupSMul.linearMap_apply [Monoid G] [CommSemiring k] (V : Type u₃) [AddCommMonoid V] [Module k V] [Module (MonoidAlgebra k G) V] [IsScalarTower k (MonoidAlgebra k G) V] (g : G) (v : V) : (GroupSMul.linearMap k V g) v = single g (1 : k) • v := rfl section variable {k} variable [Monoid G] [CommSemiring k] {V : Type u₃} {W : Type u₄} [AddCommMonoid V] [Module k V] [Module (MonoidAlgebra k G) V] [IsScalarTower k (MonoidAlgebra k G) V] [AddCommMonoid W] [Module k W] [Module (MonoidAlgebra k G) W] [IsScalarTower k (MonoidAlgebra k G) W] (f : V →ₗ[k] W) /-- Build a `k[G]`-linear map from a `k`-linear map and evidence that it is `G`-equivariant. -/ def equivariantOfLinearOfComm (h : ∀ (g : G) (v : V), f (single g (1 : k) • v) = single g (1 : k) • f v) : V →ₗ[MonoidAlgebra k G] W where toFun := f map_add' v v' := by simp map_smul' c v := by refine Finsupp.induction c ?_ ?_ · simp · intro g r c' _nm _nz w dsimp at * simp only [add_smul, f.map_add, w, add_left_inj, single_eq_algebraMap_mul_of, ← smul_smul] rw [algebraMap_smul (MonoidAlgebra k G) r, algebraMap_smul (MonoidAlgebra k G) r, f.map_smul, of_apply, h g v] variable (h : ∀ (g : G) (v : V), f (single g (1 : k) • v) = single g (1 : k) • f v) @[simp] theorem equivariantOfLinearOfComm_apply (v : V) : (equivariantOfLinearOfComm f h) v = f v := rfl end end end MonoidAlgebra namespace AddMonoidAlgebra variable {k G H} /-! #### Non-unital, non-associative algebra structure -/ section NonUnitalNonAssocAlgebra variable (k) [Semiring k] [DistribSMul R k] [Add G] variable {A : Type u₃} [NonUnitalNonAssocSemiring A] /-- A non_unital `k`-algebra homomorphism from `k[G]` is uniquely defined by its values on the functions `single a 1`. -/ theorem nonUnitalAlgHom_ext [DistribMulAction k A] {φ₁ φ₂ : k[G] →ₙₐ[k] A} (h : ∀ x, φ₁ (single x 1) = φ₂ (single x 1)) : φ₁ = φ₂ := @MonoidAlgebra.nonUnitalAlgHom_ext k (Multiplicative G) _ _ _ _ _ φ₁ φ₂ h /-- See note [partially-applied ext lemmas]. -/ @[ext high] theorem nonUnitalAlgHom_ext' [DistribMulAction k A] {φ₁ φ₂ : k[G] →ₙₐ[k] A} (h : φ₁.toMulHom.comp (ofMagma k G) = φ₂.toMulHom.comp (ofMagma k G)) : φ₁ = φ₂ := @MonoidAlgebra.nonUnitalAlgHom_ext' k (Multiplicative G) _ _ _ _ _ φ₁ φ₂ h /-- The functor `G ↦ k[G]`, from the category of magmas to the category of non-unital, non-associative algebras over `k` is adjoint to the forgetful functor in the other direction. -/ @[simps apply_apply symm_apply] def liftMagma [Module k A] [IsScalarTower k A A] [SMulCommClass k A A] : (Multiplicative G →ₙ* A) ≃ (k[G] →ₙₐ[k] A) := { (MonoidAlgebra.liftMagma k : (Multiplicative G →ₙ* A) ≃ (_ →ₙₐ[k] A)) with toFun := fun f => { (MonoidAlgebra.liftMagma k f :) with toFun := fun a => sum a fun m t => t • f (Multiplicative.ofAdd m) } invFun := fun F => F.toMulHom.comp (ofMagma k G) } end NonUnitalNonAssocAlgebra /-! #### Algebra structure -/ section Algebra /-- The instance `Algebra R k[G]` whenever we have `Algebra R k`. In particular this provides the instance `Algebra k k[G]`. -/ instance algebra [CommSemiring R] [Semiring k] [Algebra R k] [AddMonoid G] : Algebra R k[G] where algebraMap := singleZeroRingHom.comp (algebraMap R k) smul_def' := fun r a => by ext rw [Finsupp.coe_smul] simp [single_zero_mul_apply, Algebra.smul_def, Pi.smul_apply] commutes' := fun r f => by refine Finsupp.ext fun _ => ?_ simp [single_zero_mul_apply, mul_single_zero_apply, Algebra.commutes] /-- `Finsupp.single 0` as an `AlgHom` -/ @[simps! apply] def singleZeroAlgHom [CommSemiring R] [Semiring k] [Algebra R k] [AddMonoid G] : k →ₐ[R] k[G] := { singleZeroRingHom with commutes' := fun r => by ext simp rfl } @[simp] theorem coe_algebraMap [CommSemiring R] [Semiring k] [Algebra R k] [AddMonoid G] : (algebraMap R k[G] : R → k[G]) = single 0 ∘ algebraMap R k := rfl instance isLocalHom_singleZeroAlgHom [CommSemiring R] [Semiring k] [Algebra R k] [AddMonoid G] : IsLocalHom (singleZeroAlgHom : k →ₐ[R] k[G]) where map_nonunit := isLocalHom_singleZeroRingHom.map_nonunit instance isLocalHom_algebraMap [CommSemiring R] [Semiring k] [Algebra R k] [AddMonoid G] [IsLocalHom (algebraMap R k)] : IsLocalHom (algebraMap R k[G]) where map_nonunit _ hx := .of_map _ _ <\| isLocalHom_singleZeroAlgHom (R := R).map_nonunit _ hx end Algebra section lift variable [CommSemiring k] [AddMonoid G] variable {A : Type u₃} [Semiring A] [Algebra k A] {B : Type} [Semiring B] [Algebra k B] /-- `liftNCRingHom` as an `AlgHom`, for when `f` is an `AlgHom` -/ def liftNCAlgHom (f : A →ₐ[k] B) (g : Multiplicative G → B) (h_comm : ∀ x y, Commute (f x) (g y)) : A[G] →ₐ[k] B := { liftNCRingHom (f : A →+* B) g h_comm with commutes' := by simp [liftNCRingHom] } /-- A `k`-algebra homomorphism from `k[G]` is uniquely defined by its values on the functions `single a 1`. -/ theorem algHom_ext ⦃φ₁ φ₂ : k[G] →ₐ[k] A⦄ (h : ∀ x, φ₁ (single x 1) = φ₂ (single x 1)) : φ₁ = φ₂ := @MonoidAlgebra.algHom_ext k (Multiplicative G) _ _ _ _ _ _ _ h /-- See note [partially-applied ext lemmas]. -/ @[ext high] theorem algHom_ext' ⦃φ₁ φ₂ : k[G] →ₐ[k] A⦄ (h : (φ₁ : k[G] →* A).comp (of k G) = (φ₂ : k[G] →* A).comp (of k G)) : φ₁ = φ₂ := algHom_ext <\| DFunLike.congr_fun h variable (k G A) /-- Any monoid homomorphism `G →* A` can be lifted to an algebra homomorphism `k[G] →ₐ[k] A`. -/ def lift : (Multiplicative G →* A) ≃ (k[G] →ₐ[k] A) := { @MonoidAlgebra.lift k (Multiplicative G) _ _ A _ _ with invFun := fun f => (f : k[G] →* A).comp (of k G) toFun := fun F => { @MonoidAlgebra.lift k (Multiplicative G) _ _ A _ _ F with toFun := liftNCAlgHom (Algebra.ofId k A) F fun _ _ => Algebra.commutes _ _ } } variable {k G A} theorem lift_apply' (F : Multiplicative G →* A) (f : MonoidAlgebra k G) : lift k G A F f = f.sum fun a b => algebraMap k A b * F (Multiplicative.ofAdd a) := rfl theorem lift_apply (F : Multiplicative G →* A) (f : MonoidAlgebra k G) : lift k G A F f = f.sum fun a b => b • F (Multiplicative.ofAdd a) := by simp only [lift_apply', Algebra.smul_def] theorem lift_def (F : Multiplicative G →* A) : ⇑(lift k G A F) = liftNC ((algebraMap k A : k →+* A) : k →+ A) F := rfl @[simp] theorem lift_symm_apply (F : k[G] →ₐ[k] A) (x : Multiplicative G) : (lift k G A).symm F x = F (single x.toAdd 1) := rfl theorem lift_of (F : Multiplicative G →* A) (x : Multiplicative G) : lift k G A F (of k G x) = F x := MonoidAlgebra.lift_of F x @[simp] theorem lift_single (F : Multiplicative G →* A) (a b) : lift k G A F (single a b) = b • F (Multiplicative.ofAdd a) := MonoidAlgebra.lift_single F (.ofAdd a) b lemma lift_of' (F : Multiplicative G →* A) (x : G) : lift k G A F (of' k G x) = F (Multiplicative.ofAdd x) := lift_of F x theorem lift_unique' (F : k[G] →ₐ[k] A) : F = lift k G A ((F : k[G] →* A).comp (of k G)) := ((lift k G A).apply_symm_apply F).symm /-- Decomposition of a `k`-algebra homomorphism from `MonoidAlgebra k G` by its values on `F (single a 1)`. -/ theorem lift_unique (F : k[G] →ₐ[k] A) (f : MonoidAlgebra k G) : F f = f.sum fun a b => b • F (single a 1) := by conv_lhs => rw [lift_unique' F] simp [lift_apply] theorem algHom_ext_iff {φ₁ φ₂ : k[G] →ₐ[k] A} : (∀ x, φ₁ (Finsupp.single x 1) = φ₂ (Finsupp.single x 1)) ↔ φ₁ = φ₂ := ⟨fun h => algHom_ext h, by rintro rfl _; rfl⟩ end lift theorem mapDomain_algebraMap (A : Type) {H F : Type} [CommSemiring k] [Semiring A] [Algebra k A] [AddMonoid G] [AddMonoid H] [FunLike F G H] [AddMonoidHomClass F G H] (f : F) (r : k) : mapDomain f (algebraMap k A[G] r) = algebraMap k A[H] r := by simp only [Function.comp_apply, mapDomain_single, AddMonoidAlgebra.coe_algebraMap, map_zero] /-- If `f : G → H` is a homomorphism between two additive magmas, then `Finsupp.mapDomain f` is a non-unital algebra homomorphism between their additive magma algebras. -/ @[simps apply] def mapDomainNonUnitalAlgHom (k A : Type) [CommSemiring k] [Semiring A] [Algebra k A] {G H F : Type} [Add G] [Add H] [FunLike F G H] [AddHomClass F G H] (f : F) : A[G] →ₙₐ[k] A[H] := { (Finsupp.mapDomain.addMonoidHom f : MonoidAlgebra A G →+ MonoidAlgebra A H) with map_mul' := fun x y => mapDomain_mul f x y map_smul' := fun r x => mapDomain_smul r x } /-- If `f : G → H` is an additive homomorphism between two additive monoids, then `Finsupp.mapDomain f` is an algebra homomorphism between their add monoid algebras. -/ @[simps!] def mapDomainAlgHom (k A : Type) [CommSemiring k] [Semiring A] [Algebra k A] [AddMonoid G] {H F : Type} [AddMonoid H] [FunLike F G H] [AddMonoidHomClass F G H] (f : F) : A[G] →ₐ[k] A[H] := { mapDomainRingHom A f with commutes' := mapDomain_algebraMap A f } @[simp] lemma mapDomainAlgHom_id (k A) [CommSemiring k] [Semiring A] [Algebra k A] [AddMonoid G] : mapDomainAlgHom k A (AddMonoidHom.id G) = AlgHom.id k (AddMonoidAlgebra A G) := by ext; simp [AddMonoidHom.id, ← Function.id_def] @[simp] lemma mapDomainAlgHom_comp (k A) {G₁ G₂ G₃} [CommSemiring k] [Semiring A] [Algebra k A] [AddMonoid G₁] [AddMonoid G₂] [AddMonoid G₃] (f : G₁ →+ G₂) (g : G₂ →+ G₃) : mapDomainAlgHom k A (g.comp f) = (mapDomainAlgHom k A g).comp (mapDomainAlgHom k A f) := by ext; simp [mapDomain_comp] variable (k A) variable [CommSemiring k] [AddMonoid G] [AddMonoid H] [Semiring A] [Algebra k A] /-- If `e : G ≃* H` is a multiplicative equivalence between two monoids, then `AddMonoidAlgebra.domCongr e` is an algebra equivalence between their monoid algebras. -/ def domCongr (e : G ≃+ H) : A[G] ≃ₐ[k] A[H] := AlgEquiv.ofLinearEquiv (Finsupp.domLCongr e : (G →₀ A) ≃ₗ[k] (H →₀ A)) ((equivMapDomain_eq_mapDomain _ _).trans <\| mapDomain_one e) (fun f g => (equivMapDomain_eq_mapDomain _ _).trans <\| (mapDomain_mul e f g).trans <\| congr_arg₂ _ (equivMapDomain_eq_mapDomain _ _).symm (equivMapDomain_eq_mapDomain _ _).symm) theorem domCongr_toAlgHom (e : G ≃+ H) : (domCongr k A e).toAlgHom = mapDomainAlgHom k A e := AlgHom.ext fun _ => equivMapDomain_eq_mapDomain _ _ @[simp] theorem domCongr_apply (e : G ≃+ H) (f : MonoidAlgebra A G) (h : H) : domCongr k A e f h = f (e.symm h) := rfl @[simp] theorem domCongr_support (e : G ≃+ H) (f : MonoidAlgebra A G) : (domCongr k A e f).support = f.support.map e := rfl @[simp] theorem domCongr_single (e : G ≃+ H) (g : G) (a : A) : domCongr k A e (single g a) = single (e g) a := Finsupp.equivMapDomain_single _ _ _ @[simp] theorem domCongr_refl : domCongr k A (AddEquiv.refl G) = AlgEquiv.refl := AlgEquiv.ext fun _ => Finsupp.ext fun _ => rfl @[simp] theorem domCongr_symm (e : G ≃+ H) : (domCongr k A e).symm = domCongr k A e.symm := rfl	end AddMonoidAlgebra variable [CommSemiring R] /-- The algebra equivalence between `AddMonoidAlgebra` and `MonoidAlgebra` in terms of `Multiplicative`. -/ def AddMonoidAlgebra.toMultiplicativeAlgEquiv [Semiring k] [Algebra R k] [AddMonoid G] : AddMonoidAlgebra k G ≃ₐ[R] MonoidAlgebra k (Multiplicative G) := { AddMonoidAlgebra.toMultiplicative k G with commutes' := fun r => by simp [AddMonoidAlgebra.toMultiplicative] }	Mathlib/Algebra/MonoidAlgebra/Basic.lean	578	588
/- Copyright (c) 2014 Parikshit Khanna. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Parikshit Khanna, Jeremy Avigad, Leonardo de Moura, Floris van Doorn, Mario Carneiro -/ import Mathlib.Control.Basic import Mathlib.Data.Nat.Basic import Mathlib.Data.Option.Basic import Mathlib.Data.List.Defs import Mathlib.Data.List.Monad import Mathlib.Logic.OpClass import Mathlib.Logic.Unique import Mathlib.Order.Basic import Mathlib.Tactic.Common /-! # Basic properties of lists -/ assert_not_exists GroupWithZero assert_not_exists Lattice assert_not_exists Prod.swap_eq_iff_eq_swap assert_not_exists Ring assert_not_exists Set.range open Function open Nat hiding one_pos namespace List universe u v w variable {ι : Type} {α : Type u} {β : Type v} {γ : Type w} {l₁ l₂ : List α} /-- There is only one list of an empty type -/ instance uniqueOfIsEmpty [IsEmpty α] : Unique (List α) := { instInhabitedList with uniq := fun l => match l with \| [] => rfl \| a :: _ => isEmptyElim a } instance : Std.LawfulIdentity (α := List α) Append.append [] where left_id := nil_append right_id := append_nil instance : Std.Associative (α := List α) Append.append where assoc := append_assoc @[simp] theorem cons_injective {a : α} : Injective (cons a) := fun _ _ => tail_eq_of_cons_eq theorem singleton_injective : Injective fun a : α => [a] := fun _ _ h => (cons_eq_cons.1 h).1 theorem set_of_mem_cons (l : List α) (a : α) : { x \| x ∈ a :: l } = insert a { x \| x ∈ l } := Set.ext fun _ => mem_cons /-! ### mem -/ theorem _root_.Decidable.List.eq_or_ne_mem_of_mem [DecidableEq α] {a b : α} {l : List α} (h : a ∈ b :: l) : a = b ∨ a ≠ b ∧ a ∈ l := by by_cases hab : a = b · exact Or.inl hab · exact ((List.mem_cons.1 h).elim Or.inl (fun h => Or.inr ⟨hab, h⟩)) lemma mem_pair {a b c : α} : a ∈ [b, c] ↔ a = b ∨ a = c := by rw [mem_cons, mem_singleton] -- The simpNF linter says that the LHS can be simplified via `List.mem_map`. -- However this is a higher priority lemma. -- It seems the side condition `hf` is not applied by `simpNF`. -- https://github.com/leanprover/std4/issues/207 @[simp 1100, nolint simpNF] theorem mem_map_of_injective {f : α → β} (H : Injective f) {a : α} {l : List α} : f a ∈ map f l ↔ a ∈ l := ⟨fun m => let ⟨_, m', e⟩ := exists_of_mem_map m; H e ▸ m', mem_map_of_mem⟩ @[simp] theorem _root_.Function.Involutive.exists_mem_and_apply_eq_iff {f : α → α} (hf : Function.Involutive f) (x : α) (l : List α) : (∃ y : α, y ∈ l ∧ f y = x) ↔ f x ∈ l := ⟨by rintro ⟨y, h, rfl⟩; rwa [hf y], fun h => ⟨f x, h, hf _⟩⟩ theorem mem_map_of_involutive {f : α → α} (hf : Involutive f) {a : α} {l : List α} : a ∈ map f l ↔ f a ∈ l := by rw [mem_map, hf.exists_mem_and_apply_eq_iff] /-! ### length -/ alias ⟨_, length_pos_of_ne_nil⟩ := length_pos_iff theorem length_pos_iff_ne_nil {l : List α} : 0 < length l ↔ l ≠ [] := ⟨ne_nil_of_length_pos, length_pos_of_ne_nil⟩ theorem exists_of_length_succ {n} : ∀ l : List α, l.length = n + 1 → ∃ h t, l = h :: t \| [], H => absurd H.symm <\| succ_ne_zero n \| h :: t, _ => ⟨h, t, rfl⟩ @[simp] lemma length_injective_iff : Injective (List.length : List α → ℕ) ↔ Subsingleton α := by constructor · intro h; refine ⟨fun x y => ?_⟩; (suffices [x] = [y] by simpa using this); apply h; rfl · intros hα l1 l2 hl induction l1 generalizing l2 <;> cases l2 · rfl · cases hl · cases hl · next ih _ _ => congr · subsingleton · apply ih; simpa using hl @[simp default+1] -- Raise priority above `length_injective_iff`. lemma length_injective [Subsingleton α] : Injective (length : List α → ℕ) := length_injective_iff.mpr inferInstance theorem length_eq_two {l : List α} : l.length = 2 ↔ ∃ a b, l = [a, b] := ⟨fun _ => let [a, b] := l; ⟨a, b, rfl⟩, fun ⟨_, _, e⟩ => e ▸ rfl⟩ theorem length_eq_three {l : List α} : l.length = 3 ↔ ∃ a b c, l = [a, b, c] := ⟨fun _ => let [a, b, c] := l; ⟨a, b, c, rfl⟩, fun ⟨_, _, _, e⟩ => e ▸ rfl⟩ /-! ### set-theoretic notation of lists -/ instance instSingletonList : Singleton α (List α) := ⟨fun x => [x]⟩ instance [DecidableEq α] : Insert α (List α) := ⟨List.insert⟩ instance [DecidableEq α] : LawfulSingleton α (List α) := { insert_empty_eq := fun x => show (if x ∈ ([] : List α) then [] else [x]) = [x] from if_neg not_mem_nil } theorem singleton_eq (x : α) : ({x} : List α) = [x] := rfl theorem insert_neg [DecidableEq α] {x : α} {l : List α} (h : x ∉ l) : Insert.insert x l = x :: l := insert_of_not_mem h theorem insert_pos [DecidableEq α] {x : α} {l : List α} (h : x ∈ l) : Insert.insert x l = l := insert_of_mem h theorem doubleton_eq [DecidableEq α] {x y : α} (h : x ≠ y) : ({x, y} : List α) = [x, y] := by rw [insert_neg, singleton_eq] rwa [singleton_eq, mem_singleton] /-! ### bounded quantifiers over lists -/ theorem forall_mem_of_forall_mem_cons {p : α → Prop} {a : α} {l : List α} (h : ∀ x ∈ a :: l, p x) : ∀ x ∈ l, p x := (forall_mem_cons.1 h).2 theorem exists_mem_cons_of {p : α → Prop} {a : α} (l : List α) (h : p a) : ∃ x ∈ a :: l, p x := ⟨a, mem_cons_self, h⟩ theorem exists_mem_cons_of_exists {p : α → Prop} {a : α} {l : List α} : (∃ x ∈ l, p x) → ∃ x ∈ a :: l, p x := fun ⟨x, xl, px⟩ => ⟨x, mem_cons_of_mem _ xl, px⟩ theorem or_exists_of_exists_mem_cons {p : α → Prop} {a : α} {l : List α} : (∃ x ∈ a :: l, p x) → p a ∨ ∃ x ∈ l, p x := fun ⟨x, xal, px⟩ => Or.elim (eq_or_mem_of_mem_cons xal) (fun h : x = a => by rw [← h]; left; exact px) fun h : x ∈ l => Or.inr ⟨x, h, px⟩ theorem exists_mem_cons_iff (p : α → Prop) (a : α) (l : List α) : (∃ x ∈ a :: l, p x) ↔ p a ∨ ∃ x ∈ l, p x := Iff.intro or_exists_of_exists_mem_cons fun h => Or.elim h (exists_mem_cons_of l) exists_mem_cons_of_exists /-! ### list subset -/ theorem cons_subset_of_subset_of_mem {a : α} {l m : List α} (ainm : a ∈ m) (lsubm : l ⊆ m) : a::l ⊆ m := cons_subset.2 ⟨ainm, lsubm⟩ theorem append_subset_of_subset_of_subset {l₁ l₂ l : List α} (l₁subl : l₁ ⊆ l) (l₂subl : l₂ ⊆ l) : l₁ ++ l₂ ⊆ l := fun _ h ↦ (mem_append.1 h).elim (@l₁subl _) (@l₂subl _) theorem map_subset_iff {l₁ l₂ : List α} (f : α → β) (h : Injective f) : map f l₁ ⊆ map f l₂ ↔ l₁ ⊆ l₂ := by refine ⟨?_, map_subset f⟩; intro h2 x hx rcases mem_map.1 (h2 (mem_map_of_mem hx)) with ⟨x', hx', hxx'⟩ cases h hxx'; exact hx' /-! ### append -/ theorem append_eq_has_append {L₁ L₂ : List α} : List.append L₁ L₂ = L₁ ++ L₂ := rfl theorem append_right_injective (s : List α) : Injective fun t ↦ s ++ t := fun _ _ ↦ append_cancel_left theorem append_left_injective (t : List α) : Injective fun s ↦ s ++ t := fun _ _ ↦ append_cancel_right /-! ### replicate -/ theorem eq_replicate_length {a : α} : ∀ {l : List α}, l = replicate l.length a ↔ ∀ b ∈ l, b = a \| [] => by simp \| (b :: l) => by simp [eq_replicate_length, replicate_succ] theorem replicate_add (m n) (a : α) : replicate (m + n) a = replicate m a ++ replicate n a := by rw [replicate_append_replicate] theorem replicate_subset_singleton (n) (a : α) : replicate n a ⊆ [a] := fun _ h => mem_singleton.2 (eq_of_mem_replicate h) theorem subset_singleton_iff {a : α} {L : List α} : L ⊆ [a] ↔ ∃ n, L = replicate n a := by simp only [eq_replicate_iff, subset_def, mem_singleton, exists_eq_left'] theorem replicate_right_injective {n : ℕ} (hn : n ≠ 0) : Injective (@replicate α n) := fun _ _ h => (eq_replicate_iff.1 h).2 _ <\| mem_replicate.2 ⟨hn, rfl⟩ theorem replicate_right_inj {a b : α} {n : ℕ} (hn : n ≠ 0) : replicate n a = replicate n b ↔ a = b := (replicate_right_injective hn).eq_iff theorem replicate_right_inj' {a b : α} : ∀ {n}, replicate n a = replicate n b ↔ n = 0 ∨ a = b \| 0 => by simp \| n + 1 => (replicate_right_inj n.succ_ne_zero).trans <\| by simp only [n.succ_ne_zero, false_or] theorem replicate_left_injective (a : α) : Injective (replicate · a) := LeftInverse.injective (length_replicate (n := ·)) theorem replicate_left_inj {a : α} {n m : ℕ} : replicate n a = replicate m a ↔ n = m := (replicate_left_injective a).eq_iff @[simp] theorem head?_flatten_replicate {n : ℕ} (h : n ≠ 0) (l : List α) : (List.replicate n l).flatten.head? = l.head? := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero h induction l <;> simp [replicate] @[simp] theorem getLast?_flatten_replicate {n : ℕ} (h : n ≠ 0) (l : List α) : (List.replicate n l).flatten.getLast? = l.getLast? := by rw [← List.head?_reverse, ← List.head?_reverse, List.reverse_flatten, List.map_replicate, List.reverse_replicate, head?_flatten_replicate h] /-! ### pure -/ theorem mem_pure (x y : α) : x ∈ (pure y : List α) ↔ x = y := by simp /-! ### bind -/ @[simp] theorem bind_eq_flatMap {α β} (f : α → List β) (l : List α) : l >>= f = l.flatMap f := rfl /-! ### concat -/ /-! ### reverse -/ theorem reverse_cons' (a : α) (l : List α) : reverse (a :: l) = concat (reverse l) a := by simp only [reverse_cons, concat_eq_append] theorem reverse_concat' (l : List α) (a : α) : (l ++ [a]).reverse = a :: l.reverse := by rw [reverse_append]; rfl @[simp] theorem reverse_singleton (a : α) : reverse [a] = [a] := rfl @[simp] theorem reverse_involutive : Involutive (@reverse α) := reverse_reverse @[simp] theorem reverse_injective : Injective (@reverse α) := reverse_involutive.injective theorem reverse_surjective : Surjective (@reverse α) := reverse_involutive.surjective theorem reverse_bijective : Bijective (@reverse α) := reverse_involutive.bijective theorem concat_eq_reverse_cons (a : α) (l : List α) : concat l a = reverse (a :: reverse l) := by simp only [concat_eq_append, reverse_cons, reverse_reverse] theorem map_reverseAux (f : α → β) (l₁ l₂ : List α) : map f (reverseAux l₁ l₂) = reverseAux (map f l₁) (map f l₂) := by simp only [reverseAux_eq, map_append, map_reverse] -- TODO: Rename `List.reverse_perm` to `List.reverse_perm_self` @[simp] lemma reverse_perm' : l₁.reverse ~ l₂ ↔ l₁ ~ l₂ where mp := l₁.reverse_perm.symm.trans mpr := l₁.reverse_perm.trans @[simp] lemma perm_reverse : l₁ ~ l₂.reverse ↔ l₁ ~ l₂ where mp hl := hl.trans l₂.reverse_perm mpr hl := hl.trans l₂.reverse_perm.symm /-! ### getLast -/ attribute [simp] getLast_cons theorem getLast_append_singleton {a : α} (l : List α) : getLast (l ++ [a]) (append_ne_nil_of_right_ne_nil l (cons_ne_nil a _)) = a := by simp [getLast_append] theorem getLast_append_of_right_ne_nil (l₁ l₂ : List α) (h : l₂ ≠ []) : getLast (l₁ ++ l₂) (append_ne_nil_of_right_ne_nil l₁ h) = getLast l₂ h := by induction l₁ with \| nil => simp \| cons _ _ ih => simp only [cons_append]; rw [List.getLast_cons]; exact ih @[deprecated (since := "2025-02-06")] alias getLast_append' := getLast_append_of_right_ne_nil theorem getLast_concat' {a : α} (l : List α) : getLast (concat l a) (by simp) = a := by simp @[simp] theorem getLast_singleton' (a : α) : getLast [a] (cons_ne_nil a []) = a := rfl @[simp] theorem getLast_cons_cons (a₁ a₂ : α) (l : List α) : getLast (a₁ :: a₂ :: l) (cons_ne_nil _ _) = getLast (a₂ :: l) (cons_ne_nil a₂ l) := rfl theorem dropLast_append_getLast : ∀ {l : List α} (h : l ≠ []), dropLast l ++ [getLast l h] = l \| [], h => absurd rfl h \| [_], _ => rfl \| a :: b :: l, h => by rw [dropLast_cons₂, cons_append, getLast_cons (cons_ne_nil _ _)] congr exact dropLast_append_getLast (cons_ne_nil b l) theorem getLast_congr {l₁ l₂ : List α} (h₁ : l₁ ≠ []) (h₂ : l₂ ≠ []) (h₃ : l₁ = l₂) : getLast l₁ h₁ = getLast l₂ h₂ := by subst l₁; rfl theorem getLast_replicate_succ (m : ℕ) (a : α) : (replicate (m + 1) a).getLast (ne_nil_of_length_eq_add_one length_replicate) = a := by simp only [replicate_succ'] exact getLast_append_singleton _ @[deprecated (since := "2025-02-07")] alias getLast_filter' := getLast_filter_of_pos /-! ### getLast? -/ theorem mem_getLast?_eq_getLast : ∀ {l : List α} {x : α}, x ∈ l.getLast? → ∃ h, x = getLast l h \| [], x, hx => False.elim <\| by simp at hx \| [a], x, hx => have : a = x := by simpa using hx this ▸ ⟨cons_ne_nil a [], rfl⟩ \| a :: b :: l, x, hx => by rw [getLast?_cons_cons] at hx rcases mem_getLast?_eq_getLast hx with ⟨_, h₂⟩ use cons_ne_nil _ _ assumption theorem getLast?_eq_getLast_of_ne_nil : ∀ {l : List α} (h : l ≠ []), l.getLast? = some (l.getLast h) \| [], h => (h rfl).elim \| [_], _ => rfl \| _ :: b :: l, _ => @getLast?_eq_getLast_of_ne_nil (b :: l) (cons_ne_nil _ _) theorem mem_getLast?_cons {x y : α} : ∀ {l : List α}, x ∈ l.getLast? → x ∈ (y :: l).getLast? \| [], _ => by contradiction \| _ :: _, h => h theorem dropLast_append_getLast? : ∀ {l : List α}, ∀ a ∈ l.getLast?, dropLast l ++ [a] = l \| [], a, ha => (Option.not_mem_none a ha).elim \| [a], _, rfl => rfl \| a :: b :: l, c, hc => by rw [getLast?_cons_cons] at hc rw [dropLast_cons₂, cons_append, dropLast_append_getLast? _ hc] theorem getLastI_eq_getLast? [Inhabited α] : ∀ l : List α, l.getLastI = l.getLast?.iget \| [] => by simp [getLastI, Inhabited.default] \| [_] => rfl \| [_, _] => rfl \| [_, _, _] => rfl \| _ :: _ :: c :: l => by simp [getLastI, getLastI_eq_getLast? (c :: l)] theorem getLast?_append_cons : ∀ (l₁ : List α) (a : α) (l₂ : List α), getLast? (l₁ ++ a :: l₂) = getLast? (a :: l₂) \| [], _, _ => rfl \| [_], _, _ => rfl \| b :: c :: l₁, a, l₂ => by rw [cons_append, cons_append, getLast?_cons_cons, ← cons_append, getLast?_append_cons (c :: l₁)] theorem getLast?_append_of_ne_nil (l₁ : List α) : ∀ {l₂ : List α} (_ : l₂ ≠ []), getLast? (l₁ ++ l₂) = getLast? l₂ \| [], hl₂ => by contradiction \| b :: l₂, _ => getLast?_append_cons l₁ b l₂ theorem mem_getLast?_append_of_mem_getLast? {l₁ l₂ : List α} {x : α} (h : x ∈ l₂.getLast?) : x ∈ (l₁ ++ l₂).getLast? := by cases l₂ · contradiction · rw [List.getLast?_append_cons] exact h /-! ### head(!?) and tail -/ @[simp] theorem head!_nil [Inhabited α] : ([] : List α).head! = default := rfl @[simp] theorem head_cons_tail (x : List α) (h : x ≠ []) : x.head h :: x.tail = x := by cases x <;> simp at h ⊢ theorem head_eq_getElem_zero {l : List α} (hl : l ≠ []) : l.head hl = l[0]'(length_pos_iff.2 hl) := (getElem_zero _).symm theorem head!_eq_head? [Inhabited α] (l : List α) : head! l = (head? l).iget := by cases l <;> rfl theorem surjective_head! [Inhabited α] : Surjective (@head! α _) := fun x => ⟨[x], rfl⟩ theorem surjective_head? : Surjective (@head? α) := Option.forall.2 ⟨⟨[], rfl⟩, fun x => ⟨[x], rfl⟩⟩ theorem surjective_tail : Surjective (@tail α) \| [] => ⟨[], rfl⟩ \| a :: l => ⟨a :: a :: l, rfl⟩ theorem eq_cons_of_mem_head? {x : α} : ∀ {l : List α}, x ∈ l.head? → l = x :: tail l \| [], h => (Option.not_mem_none _ h).elim \| a :: l, h => by simp only [head?, Option.mem_def, Option.some_inj] at h exact h ▸ rfl @[simp] theorem head!_cons [Inhabited α] (a : α) (l : List α) : head! (a :: l) = a := rfl @[simp] theorem head!_append [Inhabited α] (t : List α) {s : List α} (h : s ≠ []) : head! (s ++ t) = head! s := by induction s · contradiction · rfl theorem mem_head?_append_of_mem_head? {s t : List α} {x : α} (h : x ∈ s.head?) : x ∈ (s ++ t).head? := by cases s · contradiction · exact h theorem head?_append_of_ne_nil : ∀ (l₁ : List α) {l₂ : List α} (_ : l₁ ≠ []), head? (l₁ ++ l₂) = head? l₁ \| _ :: _, _, _ => rfl theorem tail_append_singleton_of_ne_nil {a : α} {l : List α} (h : l ≠ nil) : tail (l ++ [a]) = tail l ++ [a] := by induction l · contradiction · rw [tail, cons_append, tail] theorem cons_head?_tail : ∀ {l : List α} {a : α}, a ∈ head? l → a :: tail l = l \| [], a, h => by contradiction \| b :: l, a, h => by simp? at h says simp only [head?_cons, Option.mem_def, Option.some.injEq] at h simp [h] theorem head!_mem_head? [Inhabited α] : ∀ {l : List α}, l ≠ [] → head! l ∈ head? l \| [], h => by contradiction \| _ :: _, _ => rfl theorem cons_head!_tail [Inhabited α] {l : List α} (h : l ≠ []) : head! l :: tail l = l := cons_head?_tail (head!_mem_head? h) theorem head!_mem_self [Inhabited α] {l : List α} (h : l ≠ nil) : l.head! ∈ l := by have h' : l.head! ∈ l.head! :: l.tail := mem_cons_self rwa [cons_head!_tail h] at h' theorem get_eq_getElem? (l : List α) (i : Fin l.length) : l.get i = l[i]?.get (by simp [getElem?_eq_getElem]) := by simp @[deprecated (since := "2025-02-15")] alias get_eq_get? := get_eq_getElem? theorem exists_mem_iff_getElem {l : List α} {p : α → Prop} : (∃ x ∈ l, p x) ↔ ∃ (i : ℕ) (_ : i < l.length), p l[i] := by simp only [mem_iff_getElem] exact ⟨fun ⟨_x, ⟨i, hi, hix⟩, hxp⟩ ↦ ⟨i, hi, hix ▸ hxp⟩, fun ⟨i, hi, hp⟩ ↦ ⟨_, ⟨i, hi, rfl⟩, hp⟩⟩ theorem forall_mem_iff_getElem {l : List α} {p : α → Prop} : (∀ x ∈ l, p x) ↔ ∀ (i : ℕ) (_ : i < l.length), p l[i] := by simp [mem_iff_getElem, @forall_swap α] theorem get_tail (l : List α) (i) (h : i < l.tail.length) (h' : i + 1 < l.length := (by simp only [length_tail] at h; omega)) : l.tail.get ⟨i, h⟩ = l.get ⟨i + 1, h'⟩ := by cases l <;> [cases h; rfl] /-! ### sublists -/ attribute [refl] List.Sublist.refl theorem Sublist.cons_cons {l₁ l₂ : List α} (a : α) (s : l₁ <+ l₂) : a :: l₁ <+ a :: l₂ := Sublist.cons₂ _ s lemma cons_sublist_cons' {a b : α} : a :: l₁ <+ b :: l₂ ↔ a :: l₁ <+ l₂ ∨ a = b ∧ l₁ <+ l₂ := by constructor · rintro (_ \| _) · exact Or.inl ‹_› · exact Or.inr ⟨rfl, ‹_›⟩ · rintro (h \| ⟨rfl, h⟩) · exact h.cons _ · rwa [cons_sublist_cons] theorem sublist_cons_of_sublist (a : α) (h : l₁ <+ l₂) : l₁ <+ a :: l₂ := h.cons _ @[deprecated (since := "2025-02-07")] alias sublist_nil_iff_eq_nil := sublist_nil @[simp] lemma sublist_singleton {l : List α} {a : α} : l <+ [a] ↔ l = [] ∨ l = [a] := by constructor <;> rintro (_ \| _) <;> aesop theorem Sublist.antisymm (s₁ : l₁ <+ l₂) (s₂ : l₂ <+ l₁) : l₁ = l₂ := s₁.eq_of_length_le s₂.length_le /-- If the first element of two lists are different, then a sublist relation can be reduced. -/ theorem Sublist.of_cons_of_ne {a b} (h₁ : a ≠ b) (h₂ : a :: l₁ <+ b :: l₂) : a :: l₁ <+ l₂ := match h₁, h₂ with \| _, .cons _ h => h /-! ### indexOf -/ section IndexOf variable [DecidableEq α] theorem idxOf_cons_eq {a b : α} (l : List α) : b = a → idxOf a (b :: l) = 0 \| e => by rw [← e]; exact idxOf_cons_self @[deprecated (since := "2025-01-30")] alias indexOf_cons_eq := idxOf_cons_eq @[simp] theorem idxOf_cons_ne {a b : α} (l : List α) : b ≠ a → idxOf a (b :: l) = succ (idxOf a l) \| h => by simp only [idxOf_cons, Bool.cond_eq_ite, beq_iff_eq, if_neg h] @[deprecated (since := "2025-01-30")] alias indexOf_cons_ne := idxOf_cons_ne theorem idxOf_eq_length_iff {a : α} {l : List α} : idxOf a l = length l ↔ a ∉ l := by induction l with \| nil => exact iff_of_true rfl not_mem_nil \| cons b l ih => simp only [length, mem_cons, idxOf_cons, eq_comm] rw [cond_eq_if] split_ifs with h <;> simp at h · exact iff_of_false (by rintro ⟨⟩) fun H => H <\| Or.inl h.symm · simp only [Ne.symm h, false_or] rw [← ih] exact succ_inj @[simp] theorem idxOf_of_not_mem {l : List α} {a : α} : a ∉ l → idxOf a l = length l := idxOf_eq_length_iff.2 @[deprecated (since := "2025-01-30")] alias indexOf_of_not_mem := idxOf_of_not_mem theorem idxOf_le_length {a : α} {l : List α} : idxOf a l ≤ length l := by induction l with \| nil => rfl \| cons b l ih => ?_ simp only [length, idxOf_cons, cond_eq_if, beq_iff_eq] by_cases h : b = a · rw [if_pos h]; exact Nat.zero_le _ · rw [if_neg h]; exact succ_le_succ ih @[deprecated (since := "2025-01-30")] alias indexOf_le_length := idxOf_le_length theorem idxOf_lt_length_iff {a} {l : List α} : idxOf a l < length l ↔ a ∈ l := ⟨fun h => Decidable.byContradiction fun al => Nat.ne_of_lt h <\| idxOf_eq_length_iff.2 al, fun al => (lt_of_le_of_ne idxOf_le_length) fun h => idxOf_eq_length_iff.1 h al⟩ @[deprecated (since := "2025-01-30")] alias indexOf_lt_length_iff := idxOf_lt_length_iff theorem idxOf_append_of_mem {a : α} (h : a ∈ l₁) : idxOf a (l₁ ++ l₂) = idxOf a l₁ := by induction l₁ with \| nil => exfalso exact not_mem_nil h \| cons d₁ t₁ ih => rw [List.cons_append] by_cases hh : d₁ = a · iterate 2 rw [idxOf_cons_eq _ hh] rw [idxOf_cons_ne _ hh, idxOf_cons_ne _ hh, ih (mem_of_ne_of_mem (Ne.symm hh) h)] @[deprecated (since := "2025-01-30")] alias indexOf_append_of_mem := idxOf_append_of_mem theorem idxOf_append_of_not_mem {a : α} (h : a ∉ l₁) : idxOf a (l₁ ++ l₂) = l₁.length + idxOf a l₂ := by induction l₁ with \| nil => rw [List.nil_append, List.length, Nat.zero_add] \| cons d₁ t₁ ih => rw [List.cons_append, idxOf_cons_ne _ (ne_of_not_mem_cons h).symm, List.length, ih (not_mem_of_not_mem_cons h), Nat.succ_add] @[deprecated (since := "2025-01-30")] alias indexOf_append_of_not_mem := idxOf_append_of_not_mem end IndexOf /-! ### nth element -/ section deprecated @[simp] theorem getElem?_length (l : List α) : l[l.length]? = none := getElem?_eq_none le_rfl /-- A version of `getElem_map` that can be used for rewriting. -/ theorem getElem_map_rev (f : α → β) {l} {n : Nat} {h : n < l.length} : f l[n] = (map f l)[n]'((l.length_map f).symm ▸ h) := Eq.symm (getElem_map _) theorem get_length_sub_one {l : List α} (h : l.length - 1 < l.length) : l.get ⟨l.length - 1, h⟩ = l.getLast (by rintro rfl; exact Nat.lt_irrefl 0 h) := (getLast_eq_getElem _).symm theorem take_one_drop_eq_of_lt_length {l : List α} {n : ℕ} (h : n < l.length) : (l.drop n).take 1 = [l.get ⟨n, h⟩] := by rw [drop_eq_getElem_cons h, take, take] simp theorem ext_getElem?' {l₁ l₂ : List α} (h' : ∀ n < max l₁.length l₂.length, l₁[n]? = l₂[n]?) : l₁ = l₂ := by apply ext_getElem? intro n rcases Nat.lt_or_ge n <\| max l₁.length l₂.length with hn \| hn · exact h' n hn · simp_all [Nat.max_le, getElem?_eq_none] @[deprecated (since := "2025-02-15")] alias ext_get?' := ext_getElem?' @[deprecated (since := "2025-02-15")] alias ext_get?_iff := List.ext_getElem?_iff theorem ext_get_iff {l₁ l₂ : List α} : l₁ = l₂ ↔ l₁.length = l₂.length ∧ ∀ n h₁ h₂, get l₁ ⟨n, h₁⟩ = get l₂ ⟨n, h₂⟩ := by constructor · rintro rfl exact ⟨rfl, fun _ _ _ ↦ rfl⟩ · intro ⟨h₁, h₂⟩ exact ext_get h₁ h₂ theorem ext_getElem?_iff' {l₁ l₂ : List α} : l₁ = l₂ ↔ ∀ n < max l₁.length l₂.length, l₁[n]? = l₂[n]? := ⟨by rintro rfl _ _; rfl, ext_getElem?'⟩ @[deprecated (since := "2025-02-15")] alias ext_get?_iff' := ext_getElem?_iff' /-- If two lists `l₁` and `l₂` are the same length and `l₁[n]! = l₂[n]!` for all `n`, then the lists are equal. -/ theorem ext_getElem! [Inhabited α] (hl : length l₁ = length l₂) (h : ∀ n : ℕ, l₁[n]! = l₂[n]!) : l₁ = l₂ := ext_getElem hl fun n h₁ h₂ ↦ by simpa only [← getElem!_pos] using h n @[simp] theorem getElem_idxOf [DecidableEq α] {a : α} : ∀ {l : List α} (h : idxOf a l < l.length), l[idxOf a l] = a \| b :: l, h => by by_cases h' : b = a <;> simp [h', if_pos, if_false, getElem_idxOf] @[deprecated (since := "2025-01-30")] alias getElem_indexOf := getElem_idxOf -- This is incorrectly named and should be `get_idxOf`; -- this already exists, so will require a deprecation dance. theorem idxOf_get [DecidableEq α] {a : α} {l : List α} (h) : get l ⟨idxOf a l, h⟩ = a := by simp @[deprecated (since := "2025-01-30")] alias indexOf_get := idxOf_get @[simp] theorem getElem?_idxOf [DecidableEq α] {a : α} {l : List α} (h : a ∈ l) : l[idxOf a l]? = some a := by rw [getElem?_eq_getElem, getElem_idxOf (idxOf_lt_length_iff.2 h)] @[deprecated (since := "2025-01-30")] alias getElem?_indexOf := getElem?_idxOf @[deprecated (since := "2025-02-15")] alias idxOf_get? := getElem?_idxOf @[deprecated (since := "2025-01-30")] alias indexOf_get? := getElem?_idxOf theorem idxOf_inj [DecidableEq α] {l : List α} {x y : α} (hx : x ∈ l) (hy : y ∈ l) : idxOf x l = idxOf y l ↔ x = y := ⟨fun h => by have x_eq_y : get l ⟨idxOf x l, idxOf_lt_length_iff.2 hx⟩ = get l ⟨idxOf y l, idxOf_lt_length_iff.2 hy⟩ := by simp only [h] simp only [idxOf_get] at x_eq_y; exact x_eq_y, fun h => by subst h; rfl⟩ @[deprecated (since := "2025-01-30")] alias indexOf_inj := idxOf_inj theorem get_reverse' (l : List α) (n) (hn') : l.reverse.get n = l.get ⟨l.length - 1 - n, hn'⟩ := by simp theorem eq_cons_of_length_one {l : List α} (h : l.length = 1) : l = [l.get ⟨0, by omega⟩] := by refine ext_get (by convert h) fun n h₁ h₂ => ?_ simp congr omega end deprecated @[simp] theorem getElem_set_of_ne {l : List α} {i j : ℕ} (h : i ≠ j) (a : α) (hj : j < (l.set i a).length) : (l.set i a)[j] = l[j]'(by simpa using hj) := by rw [← Option.some_inj, ← List.getElem?_eq_getElem, List.getElem?_set_ne h, List.getElem?_eq_getElem] /-! ### map -/ -- `List.map_const` (the version with `Function.const` instead of a lambda) is already tagged -- `simp` in Core -- TODO: Upstream the tagging to Core? attribute [simp] map_const' theorem flatMap_pure_eq_map (f : α → β) (l : List α) : l.flatMap (pure ∘ f) = map f l := .symm <\| map_eq_flatMap .. theorem flatMap_congr {l : List α} {f g : α → List β} (h : ∀ x ∈ l, f x = g x) : l.flatMap f = l.flatMap g := (congr_arg List.flatten <\| map_congr_left h :) theorem infix_flatMap_of_mem {a : α} {as : List α} (h : a ∈ as) (f : α → List α) : f a <:+: as.flatMap f := infix_of_mem_flatten (mem_map_of_mem h) @[simp] theorem map_eq_map {α β} (f : α → β) (l : List α) : f <$> l = map f l := rfl /-- A single `List.map` of a composition of functions is equal to composing a `List.map` with another `List.map`, fully applied. This is the reverse direction of `List.map_map`. -/ theorem comp_map (h : β → γ) (g : α → β) (l : List α) : map (h ∘ g) l = map h (map g l) := map_map.symm /-- Composing a `List.map` with another `List.map` is equal to a single `List.map` of composed functions. -/ @[simp] theorem map_comp_map (g : β → γ) (f : α → β) : map g ∘ map f = map (g ∘ f) := by ext l; rw [comp_map, Function.comp_apply] section map_bijectivity theorem _root_.Function.LeftInverse.list_map {f : α → β} {g : β → α} (h : LeftInverse f g) : LeftInverse (map f) (map g) \| [] => by simp_rw [map_nil] \| x :: xs => by simp_rw [map_cons, h x, h.list_map xs] nonrec theorem _root_.Function.RightInverse.list_map {f : α → β} {g : β → α} (h : RightInverse f g) : RightInverse (map f) (map g) := h.list_map nonrec theorem _root_.Function.Involutive.list_map {f : α → α} (h : Involutive f) : Involutive (map f) := Function.LeftInverse.list_map h @[simp] theorem map_leftInverse_iff {f : α → β} {g : β → α} : LeftInverse (map f) (map g) ↔ LeftInverse f g := ⟨fun h x => by injection h [x], (·.list_map)⟩ @[simp] theorem map_rightInverse_iff {f : α → β} {g : β → α} : RightInverse (map f) (map g) ↔ RightInverse f g := map_leftInverse_iff @[simp] theorem map_involutive_iff {f : α → α} : Involutive (map f) ↔ Involutive f := map_leftInverse_iff theorem _root_.Function.Injective.list_map {f : α → β} (h : Injective f) : Injective (map f) \| [], [], _ => rfl \| x :: xs, y :: ys, hxy => by injection hxy with hxy hxys rw [h hxy, h.list_map hxys] @[simp] theorem map_injective_iff {f : α → β} : Injective (map f) ↔ Injective f := by refine ⟨fun h x y hxy => ?_, (·.list_map)⟩ suffices [x] = [y] by simpa using this apply h simp [hxy] theorem _root_.Function.Surjective.list_map {f : α → β} (h : Surjective f) : Surjective (map f) := let ⟨_, h⟩ := h.hasRightInverse; h.list_map.surjective @[simp] theorem map_surjective_iff {f : α → β} : Surjective (map f) ↔ Surjective f := by refine ⟨fun h x => ?_, (·.list_map)⟩ let ⟨[y], hxy⟩ := h [x] exact ⟨_, List.singleton_injective hxy⟩ theorem _root_.Function.Bijective.list_map {f : α → β} (h : Bijective f) : Bijective (map f) := ⟨h.1.list_map, h.2.list_map⟩ @[simp] theorem map_bijective_iff {f : α → β} : Bijective (map f) ↔ Bijective f := by simp_rw [Function.Bijective, map_injective_iff, map_surjective_iff] end map_bijectivity theorem eq_of_mem_map_const {b₁ b₂ : β} {l : List α} (h : b₁ ∈ map (const α b₂) l) : b₁ = b₂ := by rw [map_const] at h; exact eq_of_mem_replicate h /-- `eq_nil_or_concat` in simp normal form -/ lemma eq_nil_or_concat' (l : List α) : l = [] ∨ ∃ L b, l = L ++ [b] := by simpa using l.eq_nil_or_concat /-! ### foldl, foldr -/ theorem foldl_ext (f g : α → β → α) (a : α) {l : List β} (H : ∀ a : α, ∀ b ∈ l, f a b = g a b) : foldl f a l = foldl g a l := by induction l generalizing a with \| nil => rfl \| cons hd tl ih => unfold foldl rw [ih _ fun a b bin => H a b <\| mem_cons_of_mem _ bin, H a hd mem_cons_self] theorem foldr_ext (f g : α → β → β) (b : β) {l : List α} (H : ∀ a ∈ l, ∀ b : β, f a b = g a b) : foldr f b l = foldr g b l := by induction l with \| nil => rfl \| cons hd tl ih => ?_ simp only [mem_cons, or_imp, forall_and, forall_eq] at H simp only [foldr, ih H.2, H.1] theorem foldl_concat (f : β → α → β) (b : β) (x : α) (xs : List α) : List.foldl f b (xs ++ [x]) = f (List.foldl f b xs) x := by simp only [List.foldl_append, List.foldl] theorem foldr_concat (f : α → β → β) (b : β) (x : α) (xs : List α) : List.foldr f b (xs ++ [x]) = (List.foldr f (f x b) xs) := by simp only [List.foldr_append, List.foldr] theorem foldl_fixed' {f : α → β → α} {a : α} (hf : ∀ b, f a b = a) : ∀ l : List β, foldl f a l = a \| [] => rfl \| b :: l => by rw [foldl_cons, hf b, foldl_fixed' hf l] theorem foldr_fixed' {f : α → β → β} {b : β} (hf : ∀ a, f a b = b) : ∀ l : List α, foldr f b l = b \| [] => rfl \| a :: l => by rw [foldr_cons, foldr_fixed' hf l, hf a] @[simp] theorem foldl_fixed {a : α} : ∀ l : List β, foldl (fun a _ => a) a l = a := foldl_fixed' fun _ => rfl @[simp] theorem foldr_fixed {b : β} : ∀ l : List α, foldr (fun _ b => b) b l = b := foldr_fixed' fun _ => rfl @[deprecated foldr_cons_nil (since := "2025-02-10")] theorem foldr_eta (l : List α) : foldr cons [] l = l := foldr_cons_nil theorem reverse_foldl {l : List α} : reverse (foldl (fun t h => h :: t) [] l) = l := by simp theorem foldl_hom₂ (l : List ι) (f : α → β → γ) (op₁ : α → ι → α) (op₂ : β → ι → β) (op₃ : γ → ι → γ) (a : α) (b : β) (h : ∀ a b i, f (op₁ a i) (op₂ b i) = op₃ (f a b) i) : foldl op₃ (f a b) l = f (foldl op₁ a l) (foldl op₂ b l) := Eq.symm <\| by revert a b induction l <;> intros <;> [rfl; simp only [, foldl]] theorem foldr_hom₂ (l : List ι) (f : α → β → γ) (op₁ : ι → α → α) (op₂ : ι → β → β) (op₃ : ι → γ → γ) (a : α) (b : β) (h : ∀ a b i, f (op₁ i a) (op₂ i b) = op₃ i (f a b)) : foldr op₃ (f a b) l = f (foldr op₁ a l) (foldr op₂ b l) := by revert a induction l <;> intros <;> [rfl; simp only [, foldr]] theorem injective_foldl_comp {l : List (α → α)} {f : α → α} (hl : ∀ f ∈ l, Function.Injective f) (hf : Function.Injective f) : Function.Injective (@List.foldl (α → α) (α → α) Function.comp f l) := by induction l generalizing f with \| nil => exact hf \| cons lh lt l_ih => apply l_ih fun _ h => hl _ (List.mem_cons_of_mem _ h) apply Function.Injective.comp hf apply hl _ mem_cons_self /-- Consider two lists `l₁` and `l₂` with designated elements `a₁` and `a₂` somewhere in them: `l₁ = x₁ ++ [a₁] ++ z₁` and `l₂ = x₂ ++ [a₂] ++ z₂`. Assume the designated element `a₂` is present in neither `x₁` nor `z₁`. We conclude that the lists are equal (`l₁ = l₂`) if and only if their respective parts are equal (`x₁ = x₂ ∧ a₁ = a₂ ∧ z₁ = z₂`). -/ lemma append_cons_inj_of_not_mem {x₁ x₂ z₁ z₂ : List α} {a₁ a₂ : α} (notin_x : a₂ ∉ x₁) (notin_z : a₂ ∉ z₁) : x₁ ++ a₁ :: z₁ = x₂ ++ a₂ :: z₂ ↔ x₁ = x₂ ∧ a₁ = a₂ ∧ z₁ = z₂ := by constructor · simp only [append_eq_append_iff, cons_eq_append_iff, cons_eq_cons] rintro (⟨c, rfl, ⟨rfl, rfl, rfl⟩ \| ⟨d, rfl, rfl⟩⟩ \| ⟨c, rfl, ⟨rfl, rfl, rfl⟩ \| ⟨d, rfl, rfl⟩⟩) <;> simp_all · rintro ⟨rfl, rfl, rfl⟩ rfl section FoldlEqFoldr -- foldl and foldr coincide when f is commutative and associative variable {f : α → α → α} theorem foldl1_eq_foldr1 [hassoc : Std.Associative f] : ∀ a b l, foldl f a (l ++ [b]) = foldr f b (a :: l) \| _, _, nil => rfl \| a, b, c :: l => by simp only [cons_append, foldl_cons, foldr_cons, foldl1_eq_foldr1 _ _ l] rw [hassoc.assoc] theorem foldl_eq_of_comm_of_assoc [hcomm : Std.Commutative f] [hassoc : Std.Associative f] : ∀ a b l, foldl f a (b :: l) = f b (foldl f a l) \| a, b, nil => hcomm.comm a b \| a, b, c :: l => by simp only [foldl_cons] have : RightCommutative f := inferInstance rw [← foldl_eq_of_comm_of_assoc .., this.right_comm, foldl_cons] theorem foldl_eq_foldr [Std.Commutative f] [Std.Associative f] : ∀ a l, foldl f a l = foldr f a l \| _, nil => rfl \| a, b :: l => by simp only [foldr_cons, foldl_eq_of_comm_of_assoc] rw [foldl_eq_foldr a l] end FoldlEqFoldr section FoldlEqFoldlr' variable {f : α → β → α} variable (hf : ∀ a b c, f (f a b) c = f (f a c) b) include hf theorem foldl_eq_of_comm' : ∀ a b l, foldl f a (b :: l) = f (foldl f a l) b \| _, _, [] => rfl \| a, b, c :: l => by rw [foldl, foldl, foldl, ← foldl_eq_of_comm' .., foldl, hf] theorem foldl_eq_foldr' : ∀ a l, foldl f a l = foldr (flip f) a l \| _, [] => rfl \| a, b :: l => by rw [foldl_eq_of_comm' hf, foldr, foldl_eq_foldr' ..]; rfl end FoldlEqFoldlr' section FoldlEqFoldlr' variable {f : α → β → β} theorem foldr_eq_of_comm' (hf : ∀ a b c, f a (f b c) = f b (f a c)) : ∀ a b l, foldr f a (b :: l) = foldr f (f b a) l \| _, _, [] => rfl \| a, b, c :: l => by rw [foldr, foldr, foldr, hf, ← foldr_eq_of_comm' hf ..]; rfl end FoldlEqFoldlr' section variable {op : α → α → α} [ha : Std.Associative op] /-- Notation for `op a b`. -/ local notation a " ⋆ " b => op a b /-- Notation for `foldl op a l`. -/ local notation l " <> " a => foldl op a l theorem foldl_op_eq_op_foldr_assoc : ∀ {l : List α} {a₁ a₂}, ((l <> a₁) ⋆ a₂) = a₁ ⋆ l.foldr (· ⋆ ·) a₂ \| [], _, _ => rfl \| a :: l, a₁, a₂ => by simp only [foldl_cons, foldr_cons, foldl_assoc, ha.assoc]; rw [foldl_op_eq_op_foldr_assoc] variable [hc : Std.Commutative op] theorem foldl_assoc_comm_cons {l : List α} {a₁ a₂} : ((a₁ :: l) <> a₂) = a₁ ⋆ l <> a₂ := by rw [foldl_cons, hc.comm, foldl_assoc] end /-! ### foldlM, foldrM, mapM -/ section FoldlMFoldrM variable {m : Type v → Type w} [Monad m] variable [LawfulMonad m] theorem foldrM_eq_foldr (f : α → β → m β) (b l) : foldrM f b l = foldr (fun a mb => mb >>= f a) (pure b) l := by induction l <;> simp [] theorem foldlM_eq_foldl (f : β → α → m β) (b l) : List.foldlM f b l = foldl (fun mb a => mb >>= fun b => f b a) (pure b) l := by suffices h : ∀ mb : m β, (mb >>= fun b => List.foldlM f b l) = foldl (fun mb a => mb >>= fun b => f b a) mb l by simp [← h (pure b)] induction l with \| nil => intro; simp \| cons _ _ l_ih => intro; simp only [List.foldlM, foldl, ← l_ih, functor_norm] end FoldlMFoldrM /-! ### intersperse -/ @[deprecated (since := "2025-02-07")] alias intersperse_singleton := intersperse_single @[deprecated (since := "2025-02-07")] alias intersperse_cons_cons := intersperse_cons₂ /-! ### map for partial functions -/ @[deprecated "Deprecated without replacement." (since := "2025-02-07")] theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {l : List α} (hx : x ∈ l) : SizeOf.sizeOf x < SizeOf.sizeOf l := by induction l with \| nil => ?_ \| cons h t ih => ?_ <;> cases hx <;> rw [cons.sizeOf_spec] · omega · specialize ih ‹_› omega /-! ### filter -/ theorem length_eq_length_filter_add {l : List (α)} (f : α → Bool) : l.length = (l.filter f).length + (l.filter (! f ·)).length := by simp_rw [← List.countP_eq_length_filter, l.length_eq_countP_add_countP f, Bool.not_eq_true, Bool.decide_eq_false] /-! ### filterMap -/ theorem filterMap_eq_flatMap_toList (f : α → Option β) (l : List α) : l.filterMap f = l.flatMap fun a ↦ (f a).toList := by induction l with \| nil => ?_ \| cons a l ih => ?_ <;> simp [filterMap_cons] rcases f a <;> simp [ih] theorem filterMap_congr {f g : α → Option β} {l : List α} (h : ∀ x ∈ l, f x = g x) : l.filterMap f = l.filterMap g := by induction l <;> simp_all [filterMap_cons] theorem filterMap_eq_map_iff_forall_eq_some {f : α → Option β} {g : α → β} {l : List α} : l.filterMap f = l.map g ↔ ∀ x ∈ l, f x = some (g x) where mp := by induction l with \| nil => simp \| cons a l ih => ?_ rcases ha : f a with - \| b <;> simp [ha, filterMap_cons] · intro h simpa [show (filterMap f l).length = l.length + 1 from by simp[h], Nat.add_one_le_iff] using List.length_filterMap_le f l · rintro rfl h exact ⟨rfl, ih h⟩ mpr h := Eq.trans (filterMap_congr <\| by simpa) (congr_fun filterMap_eq_map _) /-! ### filter -/ section Filter variable {p : α → Bool} theorem filter_singleton {a : α} : [a].filter p = bif p a then [a] else [] := rfl theorem filter_eq_foldr (p : α → Bool) (l : List α) : filter p l = foldr (fun a out => bif p a then a :: out else out) [] l := by induction l <;> simp [, filter]; rfl #adaptation_note /-- nightly-2024-07-27 This has to be temporarily renamed to avoid an unintentional collision. The prime should be removed at nightly-2024-07-27. -/ @[simp] theorem filter_subset' (l : List α) : filter p l ⊆ l := filter_sublist.subset theorem of_mem_filter {a : α} {l} (h : a ∈ filter p l) : p a := (mem_filter.1 h).2 theorem mem_of_mem_filter {a : α} {l} (h : a ∈ filter p l) : a ∈ l := filter_subset' l h theorem mem_filter_of_mem {a : α} {l} (h₁ : a ∈ l) (h₂ : p a) : a ∈ filter p l := mem_filter.2 ⟨h₁, h₂⟩ @[deprecated (since := "2025-02-07")] alias monotone_filter_left := filter_subset variable (p) theorem monotone_filter_right (l : List α) ⦃p q : α → Bool⦄ (h : ∀ a, p a → q a) : l.filter p <+ l.filter q := by induction l with \| nil => rfl \| cons hd tl IH => by_cases hp : p hd · rw [filter_cons_of_pos hp, filter_cons_of_pos (h _ hp)] exact IH.cons_cons hd · rw [filter_cons_of_neg hp] by_cases hq : q hd · rw [filter_cons_of_pos hq] exact sublist_cons_of_sublist hd IH · rw [filter_cons_of_neg hq] exact IH lemma map_filter {f : α → β} (hf : Injective f) (l : List α) [DecidablePred fun b => ∃ a, p a ∧ f a = b] : (l.filter p).map f = (l.map f).filter fun b => ∃ a, p a ∧ f a = b := by simp [comp_def, filter_map, hf.eq_iff] @[deprecated (since := "2025-02-07")] alias map_filter' := map_filter lemma filter_attach' (l : List α) (p : {a // a ∈ l} → Bool) [DecidableEq α] : l.attach.filter p = (l.filter fun x => ∃ h, p ⟨x, h⟩).attach.map (Subtype.map id fun _ => mem_of_mem_filter) := by classical refine map_injective_iff.2 Subtype.coe_injective ?_ simp [comp_def, map_filter _ Subtype.coe_injective] lemma filter_attach (l : List α) (p : α → Bool) : (l.attach.filter fun x => p x : List {x // x ∈ l}) = (l.filter p).attach.map (Subtype.map id fun _ => mem_of_mem_filter) := map_injective_iff.2 Subtype.coe_injective <\| by simp_rw [map_map, comp_def, Subtype.map, id, ← Function.comp_apply (g := Subtype.val), ← filter_map, attach_map_subtype_val] lemma filter_comm (q) (l : List α) : filter p (filter q l) = filter q (filter p l) := by simp [Bool.and_comm] @[simp] theorem filter_true (l : List α) : filter (fun _ => true) l = l := by induction l <;> simp [, filter] @[simp] theorem filter_false (l : List α) : filter (fun _ => false) l = [] := by induction l <;> simp [, filter] end Filter /-! ### eraseP -/ section eraseP variable {p : α → Bool} @[simp] theorem length_eraseP_add_one {l : List α} {a} (al : a ∈ l) (pa : p a) : (l.eraseP p).length + 1 = l.length := by let ⟨_, l₁, l₂, _, _, h₁, h₂⟩ := exists_of_eraseP al pa rw [h₂, h₁, length_append, length_append] rfl end eraseP /-! ### erase -/ section Erase variable [DecidableEq α] @[simp] theorem length_erase_add_one {a : α} {l : List α} (h : a ∈ l) : (l.erase a).length + 1 = l.length := by rw [erase_eq_eraseP, length_eraseP_add_one h (decide_eq_true rfl)] theorem map_erase [DecidableEq β] {f : α → β} (finj : Injective f) {a : α} (l : List α) : map f (l.erase a) = (map f l).erase (f a) := by have this : (a == ·) = (f a == f ·) := by ext b; simp [beq_eq_decide, finj.eq_iff] rw [erase_eq_eraseP, erase_eq_eraseP, eraseP_map, this]; rfl theorem map_foldl_erase [DecidableEq β] {f : α → β} (finj : Injective f) {l₁ l₂ : List α} : map f (foldl List.erase l₁ l₂) = foldl (fun l a => l.erase (f a)) (map f l₁) l₂ := by induction l₂ generalizing l₁ <;> [rfl; simp only [foldl_cons, map_erase finj, ]] theorem erase_getElem [DecidableEq ι] {l : List ι} {i : ℕ} (hi : i < l.length) : Perm (l.erase l[i]) (l.eraseIdx i) := by induction l generalizing i with \| nil => simp \| cons a l IH => cases i with \| zero => simp \| succ i => have hi' : i < l.length := by simpa using hi if ha : a = l[i] then simpa [ha] using .trans (perm_cons_erase (getElem_mem _)) (.cons _ (IH hi')) else simpa [ha] using IH hi' theorem length_eraseIdx_add_one {l : List ι} {i : ℕ} (h : i < l.length) : (l.eraseIdx i).length + 1 = l.length := by rw [length_eraseIdx] split <;> omega end Erase /-! ### diff -/ section Diff variable [DecidableEq α] @[simp] theorem map_diff [DecidableEq β] {f : α → β} (finj : Injective f) {l₁ l₂ : List α} : map f (l₁.diff l₂) = (map f l₁).diff (map f l₂) := by simp only [diff_eq_foldl, foldl_map, map_foldl_erase finj] @[deprecated (since := "2025-04-10")] alias erase_diff_erase_sublist_of_sublist := Sublist.erase_diff_erase_sublist end Diff section Choose variable (p : α → Prop) [DecidablePred p] (l : List α) theorem choose_spec (hp : ∃ a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) := (chooseX p l hp).property theorem choose_mem (hp : ∃ a, a ∈ l ∧ p a) : choose p l hp ∈ l := (choose_spec _ _ _).1 theorem choose_property (hp : ∃ a, a ∈ l ∧ p a) : p (choose p l hp) := (choose_spec _ _ _).2 end Choose /-! ### Forall -/ section Forall variable {p q : α → Prop} {l : List α} @[simp] theorem forall_cons (p : α → Prop) (x : α) : ∀ l : List α, Forall p (x :: l) ↔ p x ∧ Forall p l \| [] => (and_iff_left_of_imp fun _ ↦ trivial).symm \| _ :: _ => Iff.rfl @[simp] theorem forall_append {p : α → Prop} : ∀ {xs ys : List α}, Forall p (xs ++ ys) ↔ Forall p xs ∧ Forall p ys \| [] => by simp \| _ :: _ => by simp [forall_append, and_assoc] theorem forall_iff_forall_mem : ∀ {l : List α}, Forall p l ↔ ∀ x ∈ l, p x \| [] => (iff_true_intro <\| forall_mem_nil _).symm \| x :: l => by rw [forall_mem_cons, forall_cons, forall_iff_forall_mem] theorem Forall.imp (h : ∀ x, p x → q x) : ∀ {l : List α}, Forall p l → Forall q l \| [] => id \| x :: l => by simp only [forall_cons, and_imp] rw [← and_imp] exact And.imp (h x) (Forall.imp h) @[simp] theorem forall_map_iff {p : β → Prop} (f : α → β) : Forall p (l.map f) ↔ Forall (p ∘ f) l := by induction l <;> simp [] instance (p : α → Prop) [DecidablePred p] : DecidablePred (Forall p) := fun _ => decidable_of_iff' _ forall_iff_forall_mem end Forall /-! ### Miscellaneous lemmas -/ theorem get_attach (l : List α) (i) : (l.attach.get i).1 = l.get ⟨i, length_attach (l := l) ▸ i.2⟩ := by simp section Disjoint /-- The images of disjoint lists under a partially defined map are disjoint -/ theorem disjoint_pmap {p : α → Prop} {f : ∀ a : α, p a → β} {s t : List α} (hs : ∀ a ∈ s, p a) (ht : ∀ a ∈ t, p a) (hf : ∀ (a a' : α) (ha : p a) (ha' : p a'), f a ha = f a' ha' → a = a') (h : Disjoint s t) : Disjoint (s.pmap f hs) (t.pmap f ht) := by simp only [Disjoint, mem_pmap] rintro b ⟨a, ha, rfl⟩ ⟨a', ha', ha''⟩ apply h ha rwa [hf a a' (hs a ha) (ht a' ha') ha''.symm] /-- The images of disjoint lists under an injective map are disjoint -/ theorem disjoint_map {f : α → β} {s t : List α} (hf : Function.Injective f) (h : Disjoint s t) : Disjoint (s.map f) (t.map f) := by rw [← pmap_eq_map (fun _ _ ↦ trivial), ← pmap_eq_map (fun _ _ ↦ trivial)] exact disjoint_pmap _ _ (fun _ _ _ _ h' ↦ hf h') h alias Disjoint.map := disjoint_map theorem Disjoint.of_map {f : α → β} {s t : List α} (h : Disjoint (s.map f) (t.map f)) : Disjoint s t := fun _a has hat ↦ h (mem_map_of_mem has) (mem_map_of_mem hat) theorem Disjoint.map_iff {f : α → β} {s t : List α} (hf : Function.Injective f) : Disjoint (s.map f) (t.map f) ↔ Disjoint s t := ⟨fun h ↦ h.of_map, fun h ↦ h.map hf⟩ theorem Perm.disjoint_left {l₁ l₂ l : List α} (p : List.Perm l₁ l₂) : Disjoint l₁ l ↔ Disjoint l₂ l := by simp_rw [List.disjoint_left, p.mem_iff] theorem Perm.disjoint_right {l₁ l₂ l : List α} (p : List.Perm l₁ l₂) : Disjoint l l₁ ↔ Disjoint l l₂ := by simp_rw [List.disjoint_right, p.mem_iff] @[simp] theorem disjoint_reverse_left {l₁ l₂ : List α} : Disjoint l₁.reverse l₂ ↔ Disjoint l₁ l₂ := reverse_perm _ \|>.disjoint_left @[simp] theorem disjoint_reverse_right {l₁ l₂ : List α} : Disjoint l₁ l₂.reverse ↔ Disjoint l₁ l₂ := reverse_perm _ \|>.disjoint_right end Disjoint section lookup variable [BEq α] [LawfulBEq α] lemma lookup_graph (f : α → β) {a : α} {as : List α} (h : a ∈ as) : lookup a (as.map fun x => (x, f x)) = some (f a) := by induction as with \| nil => exact (not_mem_nil h).elim \| cons a' as ih => by_cases ha : a = a' · simp [ha, lookup_cons] · simpa [lookup_cons, beq_false_of_ne ha] using ih (List.mem_of_ne_of_mem ha h) end lookup section range' @[simp] lemma range'_0 (a b : ℕ) : range' a b 0 = replicate b a := by induction b with \| zero => simp \| succ b ih => simp [range'_succ, ih, replicate_succ] lemma left_le_of_mem_range' {a b s x : ℕ} (hx : x ∈ List.range' a b s) : a ≤ x := by obtain ⟨i, _, rfl⟩ := List.mem_range'.mp hx exact le_add_right a (s i) end range' end List		Mathlib/Data/List/Basic.lean	3,241	3,242
/- 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.Seminorm import Mathlib.Data.NNReal.Basic import Mathlib.Topology.Algebra.Support import Mathlib.Topology.MetricSpace.Basic import Mathlib.Topology.Order.Real /-! # Normed (semi)groups In this file we define 10 classes: * `Norm`, `NNNorm`: auxiliary classes endowing a type `α` with a function `norm : α → ℝ` (notation: `‖x‖`) and `nnnorm : α → ℝ≥0` (notation: `‖x‖₊`), respectively; * `Seminormed...Group`: A seminormed (additive) (commutative) group is an (additive) (commutative) group with a norm and a compatible pseudometric space structure: `∀ x y, dist x y = ‖x / y‖` or `∀ x y, dist x y = ‖x - y‖`, depending on the group operation. * `Normed...Group`: A normed (additive) (commutative) group is an (additive) (commutative) group with a norm and a compatible metric space structure. We also prove basic properties of (semi)normed groups and provide some instances. ## Notes The current convention `dist x y = ‖x - y‖` means that the distance is invariant under right addition, but actions in mathlib are usually from the left. This means we might want to change it to `dist x y = ‖-x + y‖`. The normed group hierarchy would lend itself well to a mixin design (that is, having `SeminormedGroup` and `SeminormedAddGroup` not extend `Group` and `AddGroup`), but we choose not to for performance concerns. ## Tags normed group -/ variable {𝓕 α ι κ E F G : Type} open Filter Function Metric Bornology open ENNReal Filter NNReal Uniformity Pointwise Topology /-- Auxiliary class, endowing a type `E` with a function `norm : E → ℝ` with notation `‖x‖`. This class is designed to be extended in more interesting classes specifying the properties of the norm. -/ @[notation_class] class Norm (E : Type) where /-- the `ℝ`-valued norm function. -/ norm : E → ℝ /-- Auxiliary class, endowing a type `α` with a function `nnnorm : α → ℝ≥0` with notation `‖x‖₊`. -/ @[notation_class] class NNNorm (E : Type) where /-- the `ℝ≥0`-valued norm function. -/ nnnorm : E → ℝ≥0 /-- Auxiliary class, endowing a type `α` with a function `enorm : α → ℝ≥0∞` with notation `‖x‖ₑ`. -/ @[notation_class] class ENorm (E : Type) where /-- the `ℝ≥0∞`-valued norm function. -/ enorm : E → ℝ≥0∞ export Norm (norm) export NNNorm (nnnorm) export ENorm (enorm) @[inherit_doc] notation "‖" e "‖" => norm e @[inherit_doc] notation "‖" e "‖₊" => nnnorm e @[inherit_doc] notation "‖" e "‖ₑ" => enorm e section ENorm variable {E : Type} [NNNorm E] {x : E} {r : ℝ≥0} instance NNNorm.toENorm : ENorm E where enorm := (‖·‖₊ : E → ℝ≥0∞) lemma enorm_eq_nnnorm (x : E) : ‖x‖ₑ = ‖x‖₊ := rfl @[simp] lemma toNNReal_enorm (x : E) : ‖x‖ₑ.toNNReal = ‖x‖₊ := rfl @[simp, norm_cast] lemma coe_le_enorm : r ≤ ‖x‖ₑ ↔ r ≤ ‖x‖₊ := by simp [enorm] @[simp, norm_cast] lemma enorm_le_coe : ‖x‖ₑ ≤ r ↔ ‖x‖₊ ≤ r := by simp [enorm] @[simp, norm_cast] lemma coe_lt_enorm : r < ‖x‖ₑ ↔ r < ‖x‖₊ := by simp [enorm] @[simp, norm_cast] lemma enorm_lt_coe : ‖x‖ₑ < r ↔ ‖x‖₊ < r := by simp [enorm] @[simp] lemma enorm_ne_top : ‖x‖ₑ ≠ ∞ := by simp [enorm] @[simp] lemma enorm_lt_top : ‖x‖ₑ < ∞ := by simp [enorm] end ENorm /-- A type `E` equipped with a continuous map `‖·‖ₑ : E → ℝ≥0∞` NB. We do not demand that the topology is somehow defined by the enorm: for ℝ≥0∞ (the motivating example behind this definition), this is not true. -/ class ContinuousENorm (E : Type) [TopologicalSpace E] extends ENorm E where continuous_enorm : Continuous enorm /-- An enormed monoid is an additive monoid endowed with a continuous enorm. -/ class ENormedAddMonoid (E : Type) [TopologicalSpace E] extends ContinuousENorm E, AddMonoid E where enorm_eq_zero : ∀ x : E, ‖x‖ₑ = 0 ↔ x = 0 protected enorm_add_le : ∀ x y : E, ‖x + y‖ₑ ≤ ‖x‖ₑ + ‖y‖ₑ /-- An enormed monoid is a monoid endowed with a continuous enorm. -/ @[to_additive] class ENormedMonoid (E : Type) [TopologicalSpace E] extends ContinuousENorm E, Monoid E where enorm_eq_zero : ∀ x : E, ‖x‖ₑ = 0 ↔ x = 1 enorm_mul_le : ∀ x y : E, ‖x * y‖ₑ ≤ ‖x‖ₑ + ‖y‖ₑ /-- An enormed commutative monoid is an additive commutative monoid endowed with a continuous enorm. We don't have `ENormedAddCommMonoid` extend `EMetricSpace`, since the canonical instance `ℝ≥0∞` is not an `EMetricSpace`. This is because `ℝ≥0∞` carries the order topology, which is distinct from the topology coming from `edist`. -/ class ENormedAddCommMonoid (E : Type) [TopologicalSpace E] extends ENormedAddMonoid E, AddCommMonoid E where /-- An enormed commutative monoid is a commutative monoid endowed with a continuous enorm. -/ @[to_additive] class ENormedCommMonoid (E : Type) [TopologicalSpace E] extends ENormedMonoid E, CommMonoid E where /-- A seminormed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖` defines a pseudometric space structure. -/ class SeminormedAddGroup (E : Type) extends Norm E, AddGroup E, PseudoMetricSpace E where dist := fun x y => ‖x - y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop /-- A seminormed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a pseudometric space structure. -/ @[to_additive] class SeminormedGroup (E : Type) extends Norm E, Group E, PseudoMetricSpace E where dist := fun x y => ‖x / y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop /-- A normed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖` defines a metric space structure. -/ class NormedAddGroup (E : Type) extends Norm E, AddGroup E, MetricSpace E where dist := fun x y => ‖x - y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop /-- A normed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a metric space structure. -/ @[to_additive] class NormedGroup (E : Type) extends Norm E, Group E, MetricSpace E where dist := fun x y => ‖x / y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop /-- A seminormed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖` defines a pseudometric space structure. -/ class SeminormedAddCommGroup (E : Type) extends Norm E, AddCommGroup E, PseudoMetricSpace E where dist := fun x y => ‖x - y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop /-- A seminormed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a pseudometric space structure. -/ @[to_additive] class SeminormedCommGroup (E : Type) extends Norm E, CommGroup E, PseudoMetricSpace E where dist := fun x y => ‖x / y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop /-- A normed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖` defines a metric space structure. -/ class NormedAddCommGroup (E : Type) extends Norm E, AddCommGroup E, MetricSpace E where dist := fun x y => ‖x - y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop /-- A normed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a metric space structure. -/ @[to_additive] class NormedCommGroup (E : Type) extends Norm E, CommGroup E, MetricSpace E where dist := fun x y => ‖x / y‖ /-- The distance function is induced by the norm. -/ dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop -- See note [lower instance priority] @[to_additive] instance (priority := 100) NormedGroup.toSeminormedGroup [NormedGroup E] : SeminormedGroup E := { ‹NormedGroup E› with } -- See note [lower instance priority] @[to_additive] instance (priority := 100) NormedCommGroup.toSeminormedCommGroup [NormedCommGroup E] : SeminormedCommGroup E := { ‹NormedCommGroup E› with } -- See note [lower instance priority] @[to_additive] instance (priority := 100) SeminormedCommGroup.toSeminormedGroup [SeminormedCommGroup E] : SeminormedGroup E := { ‹SeminormedCommGroup E› with } -- See note [lower instance priority] @[to_additive] instance (priority := 100) NormedCommGroup.toNormedGroup [NormedCommGroup E] : NormedGroup E := { ‹NormedCommGroup E› with } -- See note [reducible non-instances] /-- Construct a `NormedGroup` from a `SeminormedGroup` satisfying `∀ x, ‖x‖ = 0 → x = 1`. This avoids having to go back to the `(Pseudo)MetricSpace` level when declaring a `NormedGroup` instance as a special case of a more general `SeminormedGroup` instance. -/ @[to_additive "Construct a `NormedAddGroup` from a `SeminormedAddGroup` satisfying `∀ x, ‖x‖ = 0 → x = 0`. This avoids having to go back to the `(Pseudo)MetricSpace` level when declaring a `NormedAddGroup` instance as a special case of a more general `SeminormedAddGroup` instance."] abbrev NormedGroup.ofSeparation [SeminormedGroup E] (h : ∀ x : E, ‖x‖ = 0 → x = 1) : NormedGroup E where dist_eq := ‹SeminormedGroup E›.dist_eq toMetricSpace := { eq_of_dist_eq_zero := fun hxy => div_eq_one.1 <\| h _ <\| (‹SeminormedGroup E›.dist_eq _ _).symm.trans hxy } -- See note [reducible non-instances] /-- Construct a `NormedCommGroup` from a `SeminormedCommGroup` satisfying `∀ x, ‖x‖ = 0 → x = 1`. This avoids having to go back to the `(Pseudo)MetricSpace` level when declaring a `NormedCommGroup` instance as a special case of a more general `SeminormedCommGroup` instance. -/ @[to_additive "Construct a `NormedAddCommGroup` from a `SeminormedAddCommGroup` satisfying `∀ x, ‖x‖ = 0 → x = 0`. This avoids having to go back to the `(Pseudo)MetricSpace` level when declaring a `NormedAddCommGroup` instance as a special case of a more general `SeminormedAddCommGroup` instance."] abbrev NormedCommGroup.ofSeparation [SeminormedCommGroup E] (h : ∀ x : E, ‖x‖ = 0 → x = 1) : NormedCommGroup E := { ‹SeminormedCommGroup E›, NormedGroup.ofSeparation h with } -- See note [reducible non-instances] /-- Construct a seminormed group from a multiplication-invariant distance. -/ @[to_additive "Construct a seminormed group from a translation-invariant distance."] abbrev SeminormedGroup.ofMulDist [Norm E] [Group E] [PseudoMetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) : SeminormedGroup E where dist_eq x y := by rw [h₁]; apply le_antisymm · simpa only [div_eq_mul_inv, ← mul_inv_cancel y] using h₂ _ _ _ · simpa only [div_mul_cancel, one_mul] using h₂ (x / y) 1 y -- See note [reducible non-instances] /-- Construct a seminormed group from a multiplication-invariant pseudodistance. -/ @[to_additive "Construct a seminormed group from a translation-invariant pseudodistance."] abbrev SeminormedGroup.ofMulDist' [Norm E] [Group E] [PseudoMetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) : SeminormedGroup E where dist_eq x y := by rw [h₁]; apply le_antisymm · simpa only [div_mul_cancel, one_mul] using h₂ (x / y) 1 y · simpa only [div_eq_mul_inv, ← mul_inv_cancel y] using h₂ _ _ _ -- See note [reducible non-instances] /-- Construct a seminormed group from a multiplication-invariant pseudodistance. -/ @[to_additive "Construct a seminormed group from a translation-invariant pseudodistance."] abbrev SeminormedCommGroup.ofMulDist [Norm E] [CommGroup E] [PseudoMetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) : SeminormedCommGroup E := { SeminormedGroup.ofMulDist h₁ h₂ with mul_comm := mul_comm } -- See note [reducible non-instances] /-- Construct a seminormed group from a multiplication-invariant pseudodistance. -/ @[to_additive "Construct a seminormed group from a translation-invariant pseudodistance."] abbrev SeminormedCommGroup.ofMulDist' [Norm E] [CommGroup E] [PseudoMetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) : SeminormedCommGroup E := { SeminormedGroup.ofMulDist' h₁ h₂ with mul_comm := mul_comm } -- See note [reducible non-instances] /-- Construct a normed group from a multiplication-invariant distance. -/ @[to_additive "Construct a normed group from a translation-invariant distance."] abbrev NormedGroup.ofMulDist [Norm E] [Group E] [MetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) : NormedGroup E := { SeminormedGroup.ofMulDist h₁ h₂ with eq_of_dist_eq_zero := eq_of_dist_eq_zero } -- See note [reducible non-instances] /-- Construct a normed group from a multiplication-invariant pseudodistance. -/ @[to_additive "Construct a normed group from a translation-invariant pseudodistance."] abbrev NormedGroup.ofMulDist' [Norm E] [Group E] [MetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) : NormedGroup E := { SeminormedGroup.ofMulDist' h₁ h₂ with eq_of_dist_eq_zero := eq_of_dist_eq_zero } -- See note [reducible non-instances] /-- Construct a normed group from a multiplication-invariant pseudodistance. -/ @[to_additive "Construct a normed group from a translation-invariant pseudodistance."] abbrev NormedCommGroup.ofMulDist [Norm E] [CommGroup E] [MetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) : NormedCommGroup E := { NormedGroup.ofMulDist h₁ h₂ with mul_comm := mul_comm } -- See note [reducible non-instances] /-- Construct a normed group from a multiplication-invariant pseudodistance. -/ @[to_additive "Construct a normed group from a translation-invariant pseudodistance."] abbrev NormedCommGroup.ofMulDist' [Norm E] [CommGroup E] [MetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) : NormedCommGroup E := { NormedGroup.ofMulDist' h₁ h₂ with mul_comm := mul_comm } -- See note [reducible non-instances] /-- Construct a seminormed group from a seminorm, i.e., registering the pseudodistance and the pseudometric space structure from the seminorm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`). -/ @[to_additive "Construct a seminormed group from a seminorm, i.e., registering the pseudodistance and the pseudometric space structure from the seminorm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`)."] abbrev GroupSeminorm.toSeminormedGroup [Group E] (f : GroupSeminorm E) : SeminormedGroup E where dist x y := f (x / y) norm := f dist_eq _ _ := rfl dist_self x := by simp only [div_self', map_one_eq_zero] dist_triangle := le_map_div_add_map_div f dist_comm := map_div_rev f -- See note [reducible non-instances] /-- Construct a seminormed group from a seminorm, i.e., registering the pseudodistance and the pseudometric space structure from the seminorm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`). -/ @[to_additive "Construct a seminormed group from a seminorm, i.e., registering the pseudodistance and the pseudometric space structure from the seminorm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`)."] abbrev GroupSeminorm.toSeminormedCommGroup [CommGroup E] (f : GroupSeminorm E) : SeminormedCommGroup E := { f.toSeminormedGroup with mul_comm := mul_comm } -- See note [reducible non-instances] /-- Construct a normed group from a norm, i.e., registering the distance and the metric space structure from the norm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`). -/ @[to_additive "Construct a normed group from a norm, i.e., registering the distance and the metric space structure from the norm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`)."] abbrev GroupNorm.toNormedGroup [Group E] (f : GroupNorm E) : NormedGroup E := { f.toGroupSeminorm.toSeminormedGroup with eq_of_dist_eq_zero := fun h => div_eq_one.1 <\| eq_one_of_map_eq_zero f h } -- See note [reducible non-instances] /-- Construct a normed group from a norm, i.e., registering the distance and the metric space structure from the norm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`). -/ @[to_additive "Construct a normed group from a norm, i.e., registering the distance and the metric space structure from the norm properties. Note that in most cases this instance creates bad definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on `E`)."] abbrev GroupNorm.toNormedCommGroup [CommGroup E] (f : GroupNorm E) : NormedCommGroup E := { f.toNormedGroup with mul_comm := mul_comm } section SeminormedGroup variable [SeminormedGroup E] [SeminormedGroup F] [SeminormedGroup G] {s : Set E} {a a₁ a₂ b c : E} {r r₁ r₂ : ℝ} @[to_additive] theorem dist_eq_norm_div (a b : E) : dist a b = ‖a / b‖ := SeminormedGroup.dist_eq _ _ @[to_additive] theorem dist_eq_norm_div' (a b : E) : dist a b = ‖b / a‖ := by rw [dist_comm, dist_eq_norm_div] alias dist_eq_norm := dist_eq_norm_sub alias dist_eq_norm' := dist_eq_norm_sub' @[to_additive of_forall_le_norm] lemma DiscreteTopology.of_forall_le_norm' (hpos : 0 < r) (hr : ∀ x : E, x ≠ 1 → r ≤ ‖x‖) : DiscreteTopology E := .of_forall_le_dist hpos fun x y hne ↦ by simp only [dist_eq_norm_div] exact hr _ (div_ne_one.2 hne) @[to_additive (attr := simp)] theorem dist_one_right (a : E) : dist a 1 = ‖a‖ := by rw [dist_eq_norm_div, div_one] @[to_additive] theorem inseparable_one_iff_norm {a : E} : Inseparable a 1 ↔ ‖a‖ = 0 := by rw [Metric.inseparable_iff, dist_one_right] @[to_additive] lemma dist_one_left (a : E) : dist 1 a = ‖a‖ := by rw [dist_comm, dist_one_right] @[to_additive (attr := simp)] lemma dist_one : dist (1 : E) = norm := funext dist_one_left @[to_additive] theorem norm_div_rev (a b : E) : ‖a / b‖ = ‖b / a‖ := by simpa only [dist_eq_norm_div] using dist_comm a b @[to_additive (attr := simp) norm_neg] theorem norm_inv' (a : E) : ‖a⁻¹‖ = ‖a‖ := by simpa using norm_div_rev 1 a @[to_additive (attr := simp) norm_abs_zsmul] theorem norm_zpow_abs (a : E) (n : ℤ) : ‖a ^ \|n\|‖ = ‖a ^ n‖ := by rcases le_total 0 n with hn \| hn <;> simp [hn, abs_of_nonneg, abs_of_nonpos] @[to_additive (attr := simp) norm_natAbs_smul] theorem norm_pow_natAbs (a : E) (n : ℤ) : ‖a ^ n.natAbs‖ = ‖a ^ n‖ := by rw [← zpow_natCast, ← Int.abs_eq_natAbs, norm_zpow_abs] @[to_additive norm_isUnit_zsmul] theorem norm_zpow_isUnit (a : E) {n : ℤ} (hn : IsUnit n) : ‖a ^ n‖ = ‖a‖ := by rw [← norm_pow_natAbs, Int.isUnit_iff_natAbs_eq.mp hn, pow_one] @[simp] theorem norm_units_zsmul {E : Type} [SeminormedAddGroup E] (n : ℤˣ) (a : E) : ‖n • a‖ = ‖a‖ := norm_isUnit_zsmul a n.isUnit open scoped symmDiff in @[to_additive] theorem dist_mulIndicator (s t : Set α) (f : α → E) (x : α) : dist (s.mulIndicator f x) (t.mulIndicator f x) = ‖(s ∆ t).mulIndicator f x‖ := by rw [dist_eq_norm_div, Set.apply_mulIndicator_symmDiff norm_inv'] /-- Triangle inequality* for the norm. -/ @[to_additive norm_add_le "Triangle inequality for the norm."] theorem norm_mul_le' (a b : E) : ‖a * b‖ ≤ ‖a‖ + ‖b‖ := by simpa [dist_eq_norm_div] using dist_triangle a 1 b⁻¹ /-- Triangle inequality for the norm. -/ @[to_additive norm_add_le_of_le "Triangle inequality for the norm."] theorem norm_mul_le_of_le' (h₁ : ‖a₁‖ ≤ r₁) (h₂ : ‖a₂‖ ≤ r₂) : ‖a₁ * a₂‖ ≤ r₁ + r₂ := (norm_mul_le' a₁ a₂).trans <\| add_le_add h₁ h₂ /-- Triangle inequality for the norm. -/ @[to_additive norm_add₃_le "Triangle inequality for the norm."] lemma norm_mul₃_le' : ‖a * b * c‖ ≤ ‖a‖ + ‖b‖ + ‖c‖ := norm_mul_le_of_le' (norm_mul_le' _ _) le_rfl @[to_additive] lemma norm_div_le_norm_div_add_norm_div (a b c : E) : ‖a / c‖ ≤ ‖a / b‖ + ‖b / c‖ := by simpa only [dist_eq_norm_div] using dist_triangle a b c @[to_additive (attr := simp) norm_nonneg] theorem norm_nonneg' (a : E) : 0 ≤ ‖a‖ := by rw [← dist_one_right] exact dist_nonneg attribute [bound] norm_nonneg @[to_additive (attr := simp) abs_norm] theorem abs_norm' (z : E) : \|‖z‖\| = ‖z‖ := abs_of_nonneg <\| norm_nonneg' _ @[to_additive (attr := simp) norm_zero] theorem norm_one' : ‖(1 : E)‖ = 0 := by rw [← dist_one_right, dist_self] @[to_additive] theorem ne_one_of_norm_ne_zero : ‖a‖ ≠ 0 → a ≠ 1 := mt <\| by rintro rfl exact norm_one' @[to_additive (attr := nontriviality) norm_of_subsingleton] theorem norm_of_subsingleton' [Subsingleton E] (a : E) : ‖a‖ = 0 := by rw [Subsingleton.elim a 1, norm_one'] @[to_additive zero_lt_one_add_norm_sq] theorem zero_lt_one_add_norm_sq' (x : E) : 0 < 1 + ‖x‖ ^ 2 := by positivity @[to_additive] theorem norm_div_le (a b : E) : ‖a / b‖ ≤ ‖a‖ + ‖b‖ := by simpa [dist_eq_norm_div] using dist_triangle a 1 b attribute [bound] norm_sub_le @[to_additive] theorem norm_div_le_of_le {r₁ r₂ : ℝ} (H₁ : ‖a₁‖ ≤ r₁) (H₂ : ‖a₂‖ ≤ r₂) : ‖a₁ / a₂‖ ≤ r₁ + r₂ := (norm_div_le a₁ a₂).trans <\| add_le_add H₁ H₂ @[to_additive dist_le_norm_add_norm] theorem dist_le_norm_add_norm' (a b : E) : dist a b ≤ ‖a‖ + ‖b‖ := by rw [dist_eq_norm_div] apply norm_div_le @[to_additive abs_norm_sub_norm_le] theorem abs_norm_sub_norm_le' (a b : E) : \|‖a‖ - ‖b‖\| ≤ ‖a / b‖ := by simpa [dist_eq_norm_div] using abs_dist_sub_le a b 1 @[to_additive norm_sub_norm_le] theorem norm_sub_norm_le' (a b : E) : ‖a‖ - ‖b‖ ≤ ‖a / b‖ := (le_abs_self _).trans (abs_norm_sub_norm_le' a b) @[to_additive (attr := bound)] theorem norm_sub_le_norm_mul (a b : E) : ‖a‖ - ‖b‖ ≤ ‖a * b‖ := by simpa using norm_mul_le' (a * b) (b⁻¹) @[to_additive dist_norm_norm_le] theorem dist_norm_norm_le' (a b : E) : dist ‖a‖ ‖b‖ ≤ ‖a / b‖ := abs_norm_sub_norm_le' a b @[to_additive] theorem norm_le_norm_add_norm_div' (u v : E) : ‖u‖ ≤ ‖v‖ + ‖u / v‖ := by rw [add_comm] refine (norm_mul_le' _ _).trans_eq' ?_ rw [div_mul_cancel] @[to_additive] theorem norm_le_norm_add_norm_div (u v : E) : ‖v‖ ≤ ‖u‖ + ‖u / v‖ := by rw [norm_div_rev] exact norm_le_norm_add_norm_div' v u alias norm_le_insert' := norm_le_norm_add_norm_sub' alias norm_le_insert := norm_le_norm_add_norm_sub @[to_additive] theorem norm_le_mul_norm_add (u v : E) : ‖u‖ ≤ ‖u * v‖ + ‖v‖ := calc ‖u‖ = ‖u * v / v‖ := by rw [mul_div_cancel_right] _ ≤ ‖u * v‖ + ‖v‖ := norm_div_le _ _ /-- An analogue of `norm_le_mul_norm_add` for the multiplication from the left. -/ @[to_additive "An analogue of `norm_le_add_norm_add` for the addition from the left."] theorem norm_le_mul_norm_add' (u v : E) : ‖v‖ ≤ ‖u * v‖ + ‖u‖ := calc ‖v‖ = ‖u⁻¹ * (u * v)‖ := by rw [← mul_assoc, inv_mul_cancel, one_mul] _ ≤ ‖u⁻¹‖ + ‖u * v‖ := norm_mul_le' u⁻¹ (u * v) _ = ‖u * v‖ + ‖u‖ := by rw [norm_inv', add_comm] @[to_additive] lemma norm_mul_eq_norm_right {x : E} (y : E) (h : ‖x‖ = 0) : ‖x * y‖ = ‖y‖ := by apply le_antisymm ?_ ?_ · simpa [h] using norm_mul_le' x y · simpa [h] using norm_le_mul_norm_add' x y @[to_additive] lemma norm_mul_eq_norm_left (x : E) {y : E} (h : ‖y‖ = 0) : ‖x * y‖ = ‖x‖ := by apply le_antisymm ?_ ?_ · simpa [h] using norm_mul_le' x y · simpa [h] using norm_le_mul_norm_add x y @[to_additive] lemma norm_div_eq_norm_right {x : E} (y : E) (h : ‖x‖ = 0) : ‖x / y‖ = ‖y‖ := by apply le_antisymm ?_ ?_ · simpa [h] using norm_div_le x y · simpa [h, norm_div_rev x y] using norm_sub_norm_le' y x @[to_additive] lemma norm_div_eq_norm_left (x : E) {y : E} (h : ‖y‖ = 0) : ‖x / y‖ = ‖x‖ := by apply le_antisymm ?_ ?_ · simpa [h] using norm_div_le x y · simpa [h] using norm_sub_norm_le' x y @[to_additive ball_eq] theorem ball_eq' (y : E) (ε : ℝ) : ball y ε = { x \| ‖x / y‖ < ε } := Set.ext fun a => by simp [dist_eq_norm_div] @[to_additive] theorem ball_one_eq (r : ℝ) : ball (1 : E) r = { x \| ‖x‖ < r } := Set.ext fun a => by simp @[to_additive mem_ball_iff_norm] theorem mem_ball_iff_norm'' : b ∈ ball a r ↔ ‖b / a‖ < r := by rw [mem_ball, dist_eq_norm_div] @[to_additive mem_ball_iff_norm'] theorem mem_ball_iff_norm''' : b ∈ ball a r ↔ ‖a / b‖ < r := by rw [mem_ball', dist_eq_norm_div] @[to_additive] theorem mem_ball_one_iff : a ∈ ball (1 : E) r ↔ ‖a‖ < r := by rw [mem_ball, dist_one_right] @[to_additive mem_closedBall_iff_norm] theorem mem_closedBall_iff_norm'' : b ∈ closedBall a r ↔ ‖b / a‖ ≤ r := by rw [mem_closedBall, dist_eq_norm_div] @[to_additive] theorem mem_closedBall_one_iff : a ∈ closedBall (1 : E) r ↔ ‖a‖ ≤ r := by rw [mem_closedBall, dist_one_right] @[to_additive mem_closedBall_iff_norm'] theorem mem_closedBall_iff_norm''' : b ∈ closedBall a r ↔ ‖a / b‖ ≤ r := by rw [mem_closedBall', dist_eq_norm_div] @[to_additive norm_le_of_mem_closedBall] theorem norm_le_of_mem_closedBall' (h : b ∈ closedBall a r) : ‖b‖ ≤ ‖a‖ + r := (norm_le_norm_add_norm_div' _ _).trans <\| add_le_add_left (by rwa [← dist_eq_norm_div]) _ @[to_additive norm_le_norm_add_const_of_dist_le] theorem norm_le_norm_add_const_of_dist_le' : dist a b ≤ r → ‖a‖ ≤ ‖b‖ + r := norm_le_of_mem_closedBall' @[to_additive norm_lt_of_mem_ball] theorem norm_lt_of_mem_ball' (h : b ∈ ball a r) : ‖b‖ < ‖a‖ + r := (norm_le_norm_add_norm_div' _ _).trans_lt <\| add_lt_add_left (by rwa [← dist_eq_norm_div]) _ @[to_additive] theorem norm_div_sub_norm_div_le_norm_div (u v w : E) : ‖u / w‖ - ‖v / w‖ ≤ ‖u / v‖ := by simpa only [div_div_div_cancel_right] using norm_sub_norm_le' (u / w) (v / w) @[to_additive (attr := simp 1001) mem_sphere_iff_norm] -- Porting note: increase priority so the left-hand side doesn't reduce theorem mem_sphere_iff_norm' : b ∈ sphere a r ↔ ‖b / a‖ = r := by simp [dist_eq_norm_div] @[to_additive] -- `simp` can prove this theorem mem_sphere_one_iff_norm : a ∈ sphere (1 : E) r ↔ ‖a‖ = r := by simp [dist_eq_norm_div] @[to_additive (attr := simp) norm_eq_of_mem_sphere] theorem norm_eq_of_mem_sphere' (x : sphere (1 : E) r) : ‖(x : E)‖ = r := mem_sphere_one_iff_norm.mp x.2 @[to_additive] theorem ne_one_of_mem_sphere (hr : r ≠ 0) (x : sphere (1 : E) r) : (x : E) ≠ 1 := ne_one_of_norm_ne_zero <\| by rwa [norm_eq_of_mem_sphere' x] @[to_additive ne_zero_of_mem_unit_sphere] theorem ne_one_of_mem_unit_sphere (x : sphere (1 : E) 1) : (x : E) ≠ 1 := ne_one_of_mem_sphere one_ne_zero _ variable (E) /-- The norm of a seminormed group as a group seminorm. -/ @[to_additive "The norm of a seminormed group as an additive group seminorm."] def normGroupSeminorm : GroupSeminorm E := ⟨norm, norm_one', norm_mul_le', norm_inv'⟩ @[to_additive (attr := simp)] theorem coe_normGroupSeminorm : ⇑(normGroupSeminorm E) = norm := rfl variable {E} @[to_additive] theorem NormedCommGroup.tendsto_nhds_one {f : α → E} {l : Filter α} : Tendsto f l (𝓝 1) ↔ ∀ ε > 0, ∀ᶠ x in l, ‖f x‖ < ε := Metric.tendsto_nhds.trans <\| by simp only [dist_one_right] @[to_additive] theorem NormedCommGroup.tendsto_nhds_nhds {f : E → F} {x : E} {y : F} : Tendsto f (𝓝 x) (𝓝 y) ↔ ∀ ε > 0, ∃ δ > 0, ∀ x', ‖x' / x‖ < δ → ‖f x' / y‖ < ε := by simp_rw [Metric.tendsto_nhds_nhds, dist_eq_norm_div] @[to_additive] theorem NormedCommGroup.nhds_basis_norm_lt (x : E) : (𝓝 x).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { y \| ‖y / x‖ < ε } := by simp_rw [← ball_eq'] exact Metric.nhds_basis_ball @[to_additive] theorem NormedCommGroup.nhds_one_basis_norm_lt : (𝓝 (1 : E)).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { y \| ‖y‖ < ε } := by convert NormedCommGroup.nhds_basis_norm_lt (1 : E) simp @[to_additive] theorem NormedCommGroup.uniformity_basis_dist : (𝓤 E).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { p : E × E \| ‖p.fst / p.snd‖ < ε } := by convert Metric.uniformity_basis_dist (α := E) using 1 simp [dist_eq_norm_div] open Finset variable [FunLike 𝓕 E F] section NNNorm -- See note [lower instance priority] @[to_additive] instance (priority := 100) SeminormedGroup.toNNNorm : NNNorm E := ⟨fun a => ⟨‖a‖, norm_nonneg' a⟩⟩ @[to_additive (attr := simp, norm_cast) coe_nnnorm] theorem coe_nnnorm' (a : E) : (‖a‖₊ : ℝ) = ‖a‖ := rfl @[to_additive (attr := simp) coe_comp_nnnorm] theorem coe_comp_nnnorm' : (toReal : ℝ≥0 → ℝ) ∘ (nnnorm : E → ℝ≥0) = norm := rfl @[to_additive (attr := simp) norm_toNNReal] theorem norm_toNNReal' : ‖a‖.toNNReal = ‖a‖₊ := @Real.toNNReal_coe ‖a‖₊ @[to_additive (attr := simp) toReal_enorm] lemma toReal_enorm' (x : E) : ‖x‖ₑ.toReal = ‖x‖ := by simp [enorm] @[to_additive (attr := simp) ofReal_norm] lemma ofReal_norm' (x : E) : .ofReal ‖x‖ = ‖x‖ₑ := by simp [enorm, ENNReal.ofReal, Real.toNNReal, nnnorm] @[to_additive enorm_eq_iff_norm_eq] theorem enorm'_eq_iff_norm_eq {x : E} {y : F} : ‖x‖ₑ = ‖y‖ₑ ↔ ‖x‖ = ‖y‖ := by simp only [← ofReal_norm'] refine ⟨fun h ↦ ?_, fun h ↦ by congr⟩ exact (Real.toNNReal_eq_toNNReal_iff (norm_nonneg' _) (norm_nonneg' _)).mp (ENNReal.coe_inj.mp h) @[to_additive enorm_le_iff_norm_le] theorem enorm'_le_iff_norm_le {x : E} {y : F} : ‖x‖ₑ ≤ ‖y‖ₑ ↔ ‖x‖ ≤ ‖y‖ := by simp only [← ofReal_norm'] refine ⟨fun h ↦ ?_, fun h ↦ by gcongr⟩ rw [ENNReal.ofReal_le_ofReal_iff (norm_nonneg' _)] at h exact h @[to_additive] theorem nndist_eq_nnnorm_div (a b : E) : nndist a b = ‖a / b‖₊ := NNReal.eq <\| dist_eq_norm_div _ _ alias nndist_eq_nnnorm := nndist_eq_nnnorm_sub @[to_additive (attr := simp)] theorem nndist_one_right (a : E) : nndist a 1 = ‖a‖₊ := by simp [nndist_eq_nnnorm_div] @[to_additive (attr := simp)] lemma edist_one_right (a : E) : edist a 1 = ‖a‖ₑ := by simp [edist_nndist, nndist_one_right, enorm] @[to_additive (attr := simp) nnnorm_zero] theorem nnnorm_one' : ‖(1 : E)‖₊ = 0 := NNReal.eq norm_one' @[to_additive] theorem ne_one_of_nnnorm_ne_zero {a : E} : ‖a‖₊ ≠ 0 → a ≠ 1 := mt <\| by rintro rfl exact nnnorm_one' @[to_additive nnnorm_add_le] theorem nnnorm_mul_le' (a b : E) : ‖a * b‖₊ ≤ ‖a‖₊ + ‖b‖₊ := NNReal.coe_le_coe.1 <\| norm_mul_le' a b @[to_additive norm_nsmul_le] lemma norm_pow_le_mul_norm : ∀ {n : ℕ}, ‖a ^ n‖ ≤ n * ‖a‖ \| 0 => by simp \| n + 1 => by simpa [pow_succ, add_mul] using norm_mul_le_of_le' norm_pow_le_mul_norm le_rfl @[to_additive nnnorm_nsmul_le] lemma nnnorm_pow_le_mul_norm {n : ℕ} : ‖a ^ n‖₊ ≤ n * ‖a‖₊ := by simpa only [← NNReal.coe_le_coe, NNReal.coe_mul, NNReal.coe_natCast] using norm_pow_le_mul_norm @[to_additive (attr := simp) nnnorm_neg] theorem nnnorm_inv' (a : E) : ‖a⁻¹‖₊ = ‖a‖₊ := NNReal.eq <\| norm_inv' a @[to_additive (attr := simp) nnnorm_abs_zsmul] theorem nnnorm_zpow_abs (a : E) (n : ℤ) : ‖a ^ \|n\|‖₊ = ‖a ^ n‖₊ := NNReal.eq <\| norm_zpow_abs a n @[to_additive (attr := simp) nnnorm_natAbs_smul] theorem nnnorm_pow_natAbs (a : E) (n : ℤ) : ‖a ^ n.natAbs‖₊ = ‖a ^ n‖₊ := NNReal.eq <\| norm_pow_natAbs a n @[to_additive nnnorm_isUnit_zsmul] theorem nnnorm_zpow_isUnit (a : E) {n : ℤ} (hn : IsUnit n) : ‖a ^ n‖₊ = ‖a‖₊ := NNReal.eq <\| norm_zpow_isUnit a hn @[simp] theorem nnnorm_units_zsmul {E : Type} [SeminormedAddGroup E] (n : ℤˣ) (a : E) : ‖n • a‖₊ = ‖a‖₊ := NNReal.eq <\| norm_isUnit_zsmul a n.isUnit @[to_additive (attr := simp)] theorem nndist_one_left (a : E) : nndist 1 a = ‖a‖₊ := by simp [nndist_eq_nnnorm_div] @[to_additive (attr := simp)] theorem edist_one_left (a : E) : edist 1 a = ‖a‖₊ := by rw [edist_nndist, nndist_one_left] open scoped symmDiff in @[to_additive] theorem nndist_mulIndicator (s t : Set α) (f : α → E) (x : α) : nndist (s.mulIndicator f x) (t.mulIndicator f x) = ‖(s ∆ t).mulIndicator f x‖₊ := NNReal.eq <\| dist_mulIndicator s t f x @[to_additive] theorem nnnorm_div_le (a b : E) : ‖a / b‖₊ ≤ ‖a‖₊ + ‖b‖₊ := NNReal.coe_le_coe.1 <\| norm_div_le _ _ @[to_additive] lemma enorm_div_le : ‖a / b‖ₑ ≤ ‖a‖ₑ + ‖b‖ₑ := by simpa [enorm, ← ENNReal.coe_add] using nnnorm_div_le a b @[to_additive nndist_nnnorm_nnnorm_le] theorem nndist_nnnorm_nnnorm_le' (a b : E) : nndist ‖a‖₊ ‖b‖₊ ≤ ‖a / b‖₊ := NNReal.coe_le_coe.1 <\| dist_norm_norm_le' a b @[to_additive] theorem nnnorm_le_nnnorm_add_nnnorm_div (a b : E) : ‖b‖₊ ≤ ‖a‖₊ + ‖a / b‖₊ := norm_le_norm_add_norm_div _ _ @[to_additive] theorem nnnorm_le_nnnorm_add_nnnorm_div' (a b : E) : ‖a‖₊ ≤ ‖b‖₊ + ‖a / b‖₊ := norm_le_norm_add_norm_div' _ _ alias nnnorm_le_insert' := nnnorm_le_nnnorm_add_nnnorm_sub' alias nnnorm_le_insert := nnnorm_le_nnnorm_add_nnnorm_sub @[to_additive] theorem nnnorm_le_mul_nnnorm_add (a b : E) : ‖a‖₊ ≤ ‖a b‖₊ + ‖b‖₊ := norm_le_mul_norm_add _ _ /-- An analogue of `nnnorm_le_mul_nnnorm_add` for the multiplication from the left. -/ @[to_additive "An analogue of `nnnorm_le_add_nnnorm_add` for the addition from the left."] theorem nnnorm_le_mul_nnnorm_add' (a b : E) : ‖b‖₊ ≤ ‖a * b‖₊ + ‖a‖₊ := norm_le_mul_norm_add' _ _ @[to_additive] lemma nnnorm_mul_eq_nnnorm_right {x : E} (y : E) (h : ‖x‖₊ = 0) : ‖x * y‖₊ = ‖y‖₊ := NNReal.eq <\| norm_mul_eq_norm_right _ <\| congr_arg NNReal.toReal h @[to_additive] lemma nnnorm_mul_eq_nnnorm_left (x : E) {y : E} (h : ‖y‖₊ = 0) : ‖x * y‖₊ = ‖x‖₊ := NNReal.eq <\| norm_mul_eq_norm_left _ <\| congr_arg NNReal.toReal h @[to_additive] lemma nnnorm_div_eq_nnnorm_right {x : E} (y : E) (h : ‖x‖₊ = 0) : ‖x / y‖₊ = ‖y‖₊ := NNReal.eq <\| norm_div_eq_norm_right _ <\| congr_arg NNReal.toReal h @[to_additive] lemma nnnorm_div_eq_nnnorm_left (x : E) {y : E} (h : ‖y‖₊ = 0) : ‖x / y‖₊ = ‖x‖₊ := NNReal.eq <\| norm_div_eq_norm_left _ <\| congr_arg NNReal.toReal h /-- The non negative norm seen as an `ENNReal` and then as a `Real` is equal to the norm. -/ @[to_additive toReal_coe_nnnorm "The non negative norm seen as an `ENNReal` and then as a `Real` is equal to the norm."] theorem toReal_coe_nnnorm' (a : E) : (‖a‖₊ : ℝ≥0∞).toReal = ‖a‖ := rfl open scoped symmDiff in @[to_additive] theorem edist_mulIndicator (s t : Set α) (f : α → E) (x : α) : edist (s.mulIndicator f x) (t.mulIndicator f x) = ‖(s ∆ t).mulIndicator f x‖₊ := by rw [edist_nndist, nndist_mulIndicator] end NNNorm section ENorm @[to_additive (attr := simp) enorm_zero] lemma enorm_one' {E : Type} [TopologicalSpace E] [ENormedMonoid E] : ‖(1 : E)‖ₑ = 0 := by rw [ENormedMonoid.enorm_eq_zero] @[to_additive exists_enorm_lt] lemma exists_enorm_lt' (E : Type) [TopologicalSpace E] [ENormedMonoid E] [hbot : NeBot (𝓝[≠] (1 : E))] {c : ℝ≥0∞} (hc : c ≠ 0) : ∃ x ≠ (1 : E), ‖x‖ₑ < c := frequently_iff_neBot.mpr hbot \|>.and_eventually (ContinuousENorm.continuous_enorm.tendsto' 1 0 (by simp) \|>.eventually_lt_const hc.bot_lt) \|>.exists @[to_additive (attr := simp) enorm_neg] lemma enorm_inv' (a : E) : ‖a⁻¹‖ₑ = ‖a‖ₑ := by simp [enorm] @[to_additive ofReal_norm_eq_enorm] lemma ofReal_norm_eq_enorm' (a : E) : .ofReal ‖a‖ = ‖a‖ₑ := ENNReal.ofReal_eq_coe_nnreal _ @[deprecated (since := "2025-01-17")] alias ofReal_norm_eq_coe_nnnorm := ofReal_norm_eq_enorm @[deprecated (since := "2025-01-17")] alias ofReal_norm_eq_coe_nnnorm' := ofReal_norm_eq_enorm' instance : ENorm ℝ≥0∞ where enorm x := x @[simp] lemma enorm_eq_self (x : ℝ≥0∞) : ‖x‖ₑ = x := rfl @[to_additive] theorem edist_eq_enorm_div (a b : E) : edist a b = ‖a / b‖ₑ := by rw [edist_dist, dist_eq_norm_div, ofReal_norm_eq_enorm'] @[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm_sub := edist_eq_enorm_sub @[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm_div := edist_eq_enorm_div @[to_additive] theorem edist_one_eq_enorm (x : E) : edist x 1 = ‖x‖ₑ := by rw [edist_eq_enorm_div, div_one] @[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm := edist_zero_eq_enorm @[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm' := edist_one_eq_enorm @[to_additive] theorem mem_emetric_ball_one_iff {r : ℝ≥0∞} : a ∈ EMetric.ball 1 r ↔ ‖a‖ₑ < r := by rw [EMetric.mem_ball, edist_one_eq_enorm] end ENorm section ContinuousENorm variable {E : Type} [TopologicalSpace E] [ContinuousENorm E] @[continuity, fun_prop] lemma continuous_enorm : Continuous fun a : E ↦ ‖a‖ₑ := ContinuousENorm.continuous_enorm variable {X : Type} [TopologicalSpace X] {f : X → E} {s : Set X} {a : X} @[fun_prop] lemma Continuous.enorm : Continuous f → Continuous (‖f ·‖ₑ) := continuous_enorm.comp lemma ContinuousAt.enorm {a : X} (h : ContinuousAt f a) : ContinuousAt (‖f ·‖ₑ) a := by fun_prop @[fun_prop] lemma ContinuousWithinAt.enorm {s : Set X} {a : X} (h : ContinuousWithinAt f s a) : ContinuousWithinAt (‖f ·‖ₑ) s a := (ContinuousENorm.continuous_enorm.continuousWithinAt).comp (t := Set.univ) h (fun _ _ ↦ by trivial) @[fun_prop] lemma ContinuousOn.enorm (h : ContinuousOn f s) : ContinuousOn (‖f ·‖ₑ) s := (ContinuousENorm.continuous_enorm.continuousOn).comp (t := Set.univ) h <\| Set.mapsTo_univ _ _ end ContinuousENorm section ENormedMonoid variable {E : Type} [TopologicalSpace E] [ENormedMonoid E] @[to_additive enorm_add_le] lemma enorm_mul_le' (a b : E) : ‖a b‖ₑ ≤ ‖a‖ₑ + ‖b‖ₑ := ENormedMonoid.enorm_mul_le a b @[to_additive (attr := simp) enorm_eq_zero] lemma enorm_eq_zero' {a : E} : ‖a‖ₑ = 0 ↔ a = 1 := by simp [enorm, ENormedMonoid.enorm_eq_zero] @[to_additive enorm_ne_zero] lemma enorm_ne_zero' {a : E} : ‖a‖ₑ ≠ 0 ↔ a ≠ 1 := enorm_eq_zero'.ne @[to_additive (attr := simp) enorm_pos] lemma enorm_pos' {a : E} : 0 < ‖a‖ₑ ↔ a ≠ 1 := pos_iff_ne_zero.trans enorm_ne_zero' end ENormedMonoid instance : ENormedAddCommMonoid ℝ≥0∞ where continuous_enorm := continuous_id enorm_eq_zero := by simp enorm_add_le := by simp open Set in @[to_additive] lemma SeminormedGroup.disjoint_nhds (x : E) (f : Filter E) : Disjoint (𝓝 x) f ↔ ∃ δ > 0, ∀ᶠ y in f, δ ≤ ‖y / x‖ := by simp [NormedCommGroup.nhds_basis_norm_lt x \|>.disjoint_iff_left, compl_setOf, eventually_iff] @[to_additive] lemma SeminormedGroup.disjoint_nhds_one (f : Filter E) : Disjoint (𝓝 1) f ↔ ∃ δ > 0, ∀ᶠ y in f, δ ≤ ‖y‖ := by simpa using disjoint_nhds 1 f end SeminormedGroup section Induced variable (E F) variable [FunLike 𝓕 E F] -- See note [reducible non-instances] /-- A group homomorphism from a `Group` to a `SeminormedGroup` induces a `SeminormedGroup` structure on the domain. -/ @[to_additive "A group homomorphism from an `AddGroup` to a `SeminormedAddGroup` induces a `SeminormedAddGroup` structure on the domain."] abbrev SeminormedGroup.induced [Group E] [SeminormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) : SeminormedGroup E := { PseudoMetricSpace.induced f toPseudoMetricSpace with norm := fun x => ‖f x‖ dist_eq := fun x y => by simp only [map_div, ← dist_eq_norm_div]; rfl } -- See note [reducible non-instances] /-- A group homomorphism from a `CommGroup` to a `SeminormedGroup` induces a `SeminormedCommGroup` structure on the domain. -/ @[to_additive "A group homomorphism from an `AddCommGroup` to a `SeminormedAddGroup` induces a `SeminormedAddCommGroup` structure on the domain."] abbrev SeminormedCommGroup.induced [CommGroup E] [SeminormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) : SeminormedCommGroup E := { SeminormedGroup.induced E F f with mul_comm := mul_comm } -- See note [reducible non-instances]. /-- An injective group homomorphism from a `Group` to a `NormedGroup` induces a `NormedGroup` structure on the domain. -/ @[to_additive "An injective group homomorphism from an `AddGroup` to a `NormedAddGroup` induces a `NormedAddGroup` structure on the domain."] abbrev NormedGroup.induced [Group E] [NormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) (h : Injective f) : NormedGroup E := { SeminormedGroup.induced E F f, MetricSpace.induced f h _ with } -- See note [reducible non-instances]. /-- An injective group homomorphism from a `CommGroup` to a `NormedGroup` induces a `NormedCommGroup` structure on the domain. -/ @[to_additive "An injective group homomorphism from a `CommGroup` to a `NormedCommGroup` induces a `NormedCommGroup` structure on the domain."] abbrev NormedCommGroup.induced [CommGroup E] [NormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) (h : Injective f) : NormedCommGroup E := { SeminormedGroup.induced E F f, MetricSpace.induced f h _ with mul_comm := mul_comm } end Induced namespace Real variable {r : ℝ} instance norm : Norm ℝ where norm r := \|r\| @[simp] theorem norm_eq_abs (r : ℝ) : ‖r‖ = \|r\| := rfl instance normedAddCommGroup : NormedAddCommGroup ℝ := ⟨fun _r _y => rfl⟩ theorem norm_of_nonneg (hr : 0 ≤ r) : ‖r‖ = r := abs_of_nonneg hr theorem norm_of_nonpos (hr : r ≤ 0) : ‖r‖ = -r := abs_of_nonpos hr theorem le_norm_self (r : ℝ) : r ≤ ‖r‖ := le_abs_self r @[simp 1100] lemma norm_natCast (n : ℕ) : ‖(n : ℝ)‖ = n := abs_of_nonneg n.cast_nonneg @[simp 1100] lemma nnnorm_natCast (n : ℕ) : ‖(n : ℝ)‖₊ = n := NNReal.eq <\| norm_natCast _ @[simp 1100] lemma enorm_natCast (n : ℕ) : ‖(n : ℝ)‖ₑ = n := by simp [enorm] @[simp 1100] lemma norm_ofNat (n : ℕ) [n.AtLeastTwo] : ‖(ofNat(n) : ℝ)‖ = ofNat(n) := norm_natCast n @[simp 1100] lemma nnnorm_ofNat (n : ℕ) [n.AtLeastTwo] : ‖(ofNat(n) : ℝ)‖₊ = ofNat(n) := nnnorm_natCast n lemma norm_two : ‖(2 : ℝ)‖ = 2 := abs_of_pos zero_lt_two lemma nnnorm_two : ‖(2 : ℝ)‖₊ = 2 := NNReal.eq <\| by simp @[simp 1100, norm_cast] lemma norm_nnratCast (q : ℚ≥0) : ‖(q : ℝ)‖ = q := norm_of_nonneg q.cast_nonneg @[simp 1100, norm_cast] lemma nnnorm_nnratCast (q : ℚ≥0) : ‖(q : ℝ)‖₊ = q := by simp [nnnorm, -norm_eq_abs] theorem nnnorm_of_nonneg (hr : 0 ≤ r) : ‖r‖₊ = ⟨r, hr⟩ := NNReal.eq <\| norm_of_nonneg hr lemma enorm_of_nonneg (hr : 0 ≤ r) : ‖r‖ₑ = .ofReal r := by simp [enorm, nnnorm_of_nonneg hr, ENNReal.ofReal, toNNReal, hr] @[simp] lemma nnnorm_abs (r : ℝ) : ‖\|r\|‖₊ = ‖r‖₊ := by simp [nnnorm] @[simp] lemma enorm_abs (r : ℝ) : ‖\|r\|‖ₑ = ‖r‖ₑ := by simp [enorm] theorem enorm_eq_ofReal (hr : 0 ≤ r) : ‖r‖ₑ = .ofReal r := by rw [← ofReal_norm_eq_enorm, norm_of_nonneg hr] @[deprecated (since := "2025-01-17")] alias ennnorm_eq_ofReal := enorm_eq_ofReal theorem enorm_eq_ofReal_abs (r : ℝ) : ‖r‖ₑ = ENNReal.ofReal \|r\| := by rw [← enorm_eq_ofReal (abs_nonneg _), enorm_abs] @[deprecated (since := "2025-01-17")] alias ennnorm_eq_ofReal_abs := enorm_eq_ofReal_abs theorem toNNReal_eq_nnnorm_of_nonneg (hr : 0 ≤ r) : r.toNNReal = ‖r‖₊ := by rw [Real.toNNReal_of_nonneg hr] ext rw [coe_mk, coe_nnnorm r, Real.norm_eq_abs r, abs_of_nonneg hr] -- Porting note: this is due to the change from `Subtype.val` to `NNReal.toReal` for the coercion theorem ofReal_le_enorm (r : ℝ) : ENNReal.ofReal r ≤ ‖r‖ₑ := by rw [enorm_eq_ofReal_abs]; gcongr; exact le_abs_self _ @[deprecated (since := "2025-01-17")] alias ofReal_le_ennnorm := ofReal_le_enorm end Real namespace NNReal instance : NNNorm ℝ≥0 where nnnorm x := x @[simp] lemma nnnorm_eq_self (x : ℝ≥0) : ‖x‖₊ = x := rfl end NNReal section SeminormedCommGroup variable [SeminormedCommGroup E] [SeminormedCommGroup F] {a b : E} {r : ℝ} @[to_additive] theorem dist_inv (x y : E) : dist x⁻¹ y = dist x y⁻¹ := by simp_rw [dist_eq_norm_div, ← norm_inv' (x⁻¹ / y), inv_div, div_inv_eq_mul, mul_comm] theorem norm_multiset_sum_le {E} [SeminormedAddCommGroup E] (m : Multiset E) : ‖m.sum‖ ≤ (m.map fun x => ‖x‖).sum := m.le_sum_of_subadditive norm norm_zero norm_add_le @[to_additive existing] theorem norm_multiset_prod_le (m : Multiset E) : ‖m.prod‖ ≤ (m.map fun x => ‖x‖).sum := by rw [← Multiplicative.ofAdd_le, ofAdd_multiset_prod, Multiset.map_map] refine Multiset.le_prod_of_submultiplicative (Multiplicative.ofAdd ∘ norm) ?_ (fun x y => ?_) _ · simp only [comp_apply, norm_one', ofAdd_zero] · exact norm_mul_le' x y @[bound] theorem norm_sum_le {ι E} [SeminormedAddCommGroup E] (s : Finset ι) (f : ι → E) : ‖∑ i ∈ s, f i‖ ≤ ∑ i ∈ s, ‖f i‖ := s.le_sum_of_subadditive norm norm_zero norm_add_le f @[to_additive existing] theorem norm_prod_le (s : Finset ι) (f : ι → E) : ‖∏ i ∈ s, f i‖ ≤ ∑ i ∈ s, ‖f i‖ := by rw [← Multiplicative.ofAdd_le, ofAdd_sum] refine Finset.le_prod_of_submultiplicative (Multiplicative.ofAdd ∘ norm) ?_ (fun x y => ?_) _ _ · simp only [comp_apply, norm_one', ofAdd_zero] · exact norm_mul_le' x y @[to_additive] theorem norm_prod_le_of_le (s : Finset ι) {f : ι → E} {n : ι → ℝ} (h : ∀ b ∈ s, ‖f b‖ ≤ n b) : ‖∏ b ∈ s, f b‖ ≤ ∑ b ∈ s, n b := (norm_prod_le s f).trans <\| Finset.sum_le_sum h @[to_additive] theorem dist_prod_prod_le_of_le (s : Finset ι) {f a : ι → E} {d : ι → ℝ} (h : ∀ b ∈ s, dist (f b) (a b) ≤ d b) : dist (∏ b ∈ s, f b) (∏ b ∈ s, a b) ≤ ∑ b ∈ s, d b := by simp only [dist_eq_norm_div, ← Finset.prod_div_distrib] at * exact norm_prod_le_of_le s h @[to_additive] theorem dist_prod_prod_le (s : Finset ι) (f a : ι → E) : dist (∏ b ∈ s, f b) (∏ b ∈ s, a b) ≤ ∑ b ∈ s, dist (f b) (a b) := dist_prod_prod_le_of_le s fun _ _ => le_rfl @[to_additive] theorem mul_mem_ball_iff_norm : a * b ∈ ball a r ↔ ‖b‖ < r := by rw [mem_ball_iff_norm'', mul_div_cancel_left] @[to_additive] theorem mul_mem_closedBall_iff_norm : a * b ∈ closedBall a r ↔ ‖b‖ ≤ r := by rw [mem_closedBall_iff_norm'', mul_div_cancel_left] @[to_additive (attr := simp 1001)] -- Porting note: increase priority so that the left-hand side doesn't simplify theorem preimage_mul_ball (a b : E) (r : ℝ) : (b * ·) ⁻¹' ball a r = ball (a / b) r := by ext c simp only [dist_eq_norm_div, Set.mem_preimage, mem_ball, div_div_eq_mul_div, mul_comm] @[to_additive (attr := simp 1001)] -- Porting note: increase priority so that the left-hand side doesn't simplify theorem preimage_mul_closedBall (a b : E) (r : ℝ) : (b * ·) ⁻¹' closedBall a r = closedBall (a / b) r := by ext c simp only [dist_eq_norm_div, Set.mem_preimage, mem_closedBall, div_div_eq_mul_div, mul_comm] @[to_additive (attr := simp)] theorem preimage_mul_sphere (a b : E) (r : ℝ) : (b * ·) ⁻¹' sphere a r = sphere (a / b) r := by ext c simp only [Set.mem_preimage, mem_sphere_iff_norm', div_div_eq_mul_div, mul_comm] @[to_additive] theorem pow_mem_closedBall {n : ℕ} (h : a ∈ closedBall b r) : a ^ n ∈ closedBall (b ^ n) (n • r) := by simp only [mem_closedBall, dist_eq_norm_div, ← div_pow] at h ⊢ refine norm_pow_le_mul_norm.trans ?_ simpa only [nsmul_eq_mul] using mul_le_mul_of_nonneg_left h n.cast_nonneg @[to_additive] theorem pow_mem_ball {n : ℕ} (hn : 0 < n) (h : a ∈ ball b r) : a ^ n ∈ ball (b ^ n) (n • r) := by simp only [mem_ball, dist_eq_norm_div, ← div_pow] at h ⊢ refine lt_of_le_of_lt norm_pow_le_mul_norm ?_ replace hn : 0 < (n : ℝ) := by norm_cast rw [nsmul_eq_mul] nlinarith @[to_additive] theorem mul_mem_closedBall_mul_iff {c : E} : a * c ∈ closedBall (b * c) r ↔ a ∈ closedBall b r := by simp only [mem_closedBall, dist_eq_norm_div, mul_div_mul_right_eq_div] @[to_additive] theorem mul_mem_ball_mul_iff {c : E} : a * c ∈ ball (b * c) r ↔ a ∈ ball b r := by simp only [mem_ball, dist_eq_norm_div, mul_div_mul_right_eq_div] @[to_additive] theorem smul_closedBall'' : a • closedBall b r = closedBall (a • b) r := by ext simp [mem_closedBall, Set.mem_smul_set, dist_eq_norm_div, div_eq_inv_mul, ← eq_inv_mul_iff_mul_eq, mul_assoc] @[to_additive] theorem smul_ball'' : a • ball b r = ball (a • b) r := by ext simp [mem_ball, Set.mem_smul_set, dist_eq_norm_div, _root_.div_eq_inv_mul, ← eq_inv_mul_iff_mul_eq, mul_assoc] @[to_additive] theorem nnnorm_multiset_prod_le (m : Multiset E) : ‖m.prod‖₊ ≤ (m.map fun x => ‖x‖₊).sum := NNReal.coe_le_coe.1 <\| by push_cast rw [Multiset.map_map] exact norm_multiset_prod_le _ @[to_additive] theorem nnnorm_prod_le (s : Finset ι) (f : ι → E) : ‖∏ a ∈ s, f a‖₊ ≤ ∑ a ∈ s, ‖f a‖₊ :=	NNReal.coe_le_coe.1 <\| by push_cast exact norm_prod_le _ _ @[to_additive]	Mathlib/Analysis/Normed/Group/Basic.lean	1,212	1,216
/- Copyright (c) 2019 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Order.ConditionallyCompleteLattice.Group import Mathlib.Topology.MetricSpace.Isometry /-! # Metric space gluing Gluing two metric spaces along a common subset. Formally, we are given ``` Φ Z ---> X \| \|Ψ v Y ``` where `hΦ : Isometry Φ` and `hΨ : Isometry Ψ`. We want to complete the square by a space `GlueSpacescan hΦ hΨ` and two isometries `toGlueL hΦ hΨ` and `toGlueR hΦ hΨ` that make the square commute. We start by defining a predistance on the disjoint union `X ⊕ Y`, for which points `Φ p` and `Ψ p` are at distance 0. The (quotient) metric space associated to this predistance is the desired space. This is an instance of a more general construction, where `Φ` and `Ψ` do not have to be isometries, but the distances in the image almost coincide, up to `2ε` say. Then one can almost glue the two spaces so that the images of a point under `Φ` and `Ψ` are `ε`-close. If `ε > 0`, this yields a metric space structure on `X ⊕ Y`, without the need to take a quotient. In particular, this gives a natural metric space structure on `X ⊕ Y`, where the basepoints are at distance 1, say, and the distances between other points are obtained by going through the two basepoints. (We also register the same metric space structure on a general disjoint union `Σ i, E i`). We also define the inductive limit of metric spaces. Given ``` f 0 f 1 f 2 f 3 X 0 -----> X 1 -----> X 2 -----> X 3 -----> ... ``` where the `X n` are metric spaces and `f n` isometric embeddings, we define the inductive limit of the `X n`, also known as the increasing union of the `X n` in this context, if we identify `X n` and `X (n+1)` through `f n`. This is a metric space in which all `X n` embed isometrically and in a way compatible with `f n`. -/ noncomputable section universe u v w open Function Set Uniformity Topology namespace Metric section ApproxGluing variable {X : Type u} {Y : Type v} {Z : Type w} variable [MetricSpace X] [MetricSpace Y] {Φ : Z → X} {Ψ : Z → Y} {ε : ℝ} /-- Define a predistance on `X ⊕ Y`, for which `Φ p` and `Ψ p` are at distance `ε` -/ def glueDist (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) : X ⊕ Y → X ⊕ Y → ℝ \| .inl x, .inl y => dist x y \| .inr x, .inr y => dist x y \| .inl x, .inr y => (⨅ p, dist x (Φ p) + dist y (Ψ p)) + ε \| .inr x, .inl y => (⨅ p, dist y (Φ p) + dist x (Ψ p)) + ε private theorem glueDist_self (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) : ∀ x, glueDist Φ Ψ ε x x = 0 \| .inl _ => dist_self _ \| .inr _ => dist_self _ theorem glueDist_glued_points [Nonempty Z] (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (p : Z) : glueDist Φ Ψ ε (.inl (Φ p)) (.inr (Ψ p)) = ε := by have : ⨅ q, dist (Φ p) (Φ q) + dist (Ψ p) (Ψ q) = 0 := by have A : ∀ q, 0 ≤ dist (Φ p) (Φ q) + dist (Ψ p) (Ψ q) := fun _ => add_nonneg dist_nonneg dist_nonneg refine le_antisymm ?_ (le_ciInf A) have : 0 = dist (Φ p) (Φ p) + dist (Ψ p) (Ψ p) := by simp rw [this] exact ciInf_le ⟨0, forall_mem_range.2 A⟩ p simp only [glueDist, this, zero_add] private theorem glueDist_comm (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) : ∀ x y, glueDist Φ Ψ ε x y = glueDist Φ Ψ ε y x \| .inl _, .inl _ => dist_comm _ _ \| .inr _, .inr _ => dist_comm _ _ \| .inl _, .inr _ => rfl \| .inr _, .inl _ => rfl theorem glueDist_swap (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) : ∀ x y, glueDist Ψ Φ ε x.swap y.swap = glueDist Φ Ψ ε x y \| .inl _, .inl _ => rfl \| .inr _, .inr _ => rfl \| .inl _, .inr _ => by simp only [glueDist, Sum.swap_inl, Sum.swap_inr, dist_comm, add_comm] \| .inr _, .inl _ => by simp only [glueDist, Sum.swap_inl, Sum.swap_inr, dist_comm, add_comm] theorem le_glueDist_inl_inr (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (x y) : ε ≤ glueDist Φ Ψ ε (.inl x) (.inr y) := le_add_of_nonneg_left <\| Real.iInf_nonneg fun _ => add_nonneg dist_nonneg dist_nonneg theorem le_glueDist_inr_inl (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (x y) : ε ≤ glueDist Φ Ψ ε (.inr x) (.inl y) := by rw [glueDist_comm]; apply le_glueDist_inl_inr section variable [Nonempty Z] private theorem glueDist_triangle_inl_inr_inr (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (x : X) (y z : Y) : glueDist Φ Ψ ε (.inl x) (.inr z) ≤ glueDist Φ Ψ ε (.inl x) (.inr y) + glueDist Φ Ψ ε (.inr y) (.inr z) := by simp only [glueDist] rw [add_right_comm, add_le_add_iff_right] refine le_ciInf_add fun p => ciInf_le_of_le ⟨0, ?_⟩ p ?_ · exact forall_mem_range.2 fun _ => add_nonneg dist_nonneg dist_nonneg · linarith [dist_triangle_left z (Ψ p) y] private theorem glueDist_triangle_inl_inr_inl (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (H : ∀ p q, \|dist (Φ p) (Φ q) - dist (Ψ p) (Ψ q)\| ≤ 2 * ε) (x : X) (y : Y) (z : X) : glueDist Φ Ψ ε (.inl x) (.inl z) ≤ glueDist Φ Ψ ε (.inl x) (.inr y) + glueDist Φ Ψ ε (.inr y) (.inl z) := by simp_rw [glueDist, add_add_add_comm _ ε, add_assoc] refine le_ciInf_add fun p => ?_ rw [add_left_comm, add_assoc, ← two_mul] refine le_ciInf_add fun q => ?_ rw [dist_comm z] linarith [dist_triangle4 x (Φ p) (Φ q) z, dist_triangle_left (Ψ p) (Ψ q) y, (abs_le.1 (H p q)).2] private theorem glueDist_triangle (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (H : ∀ p q, \|dist (Φ p) (Φ q) - dist (Ψ p) (Ψ q)\| ≤ 2 * ε) : ∀ x y z, glueDist Φ Ψ ε x z ≤ glueDist Φ Ψ ε x y + glueDist Φ Ψ ε y z \| .inl _, .inl _, .inl _ => dist_triangle _ _ _ \| .inr _, .inr _, .inr _ => dist_triangle _ _ _ \| .inr x, .inl y, .inl z => by simp only [← glueDist_swap Φ] apply glueDist_triangle_inl_inr_inr \| .inr x, .inr y, .inl z => by simpa only [glueDist_comm, add_comm] using glueDist_triangle_inl_inr_inr _ _ _ z y x \| .inl x, .inl y, .inr z => by simpa only [← glueDist_swap Φ, glueDist_comm, add_comm, Sum.swap_inl, Sum.swap_inr] using glueDist_triangle_inl_inr_inr Ψ Φ ε z y x \| .inl _, .inr _, .inr _ => glueDist_triangle_inl_inr_inr .. \| .inl x, .inr y, .inl z => glueDist_triangle_inl_inr_inl Φ Ψ ε H x y z \| .inr x, .inl y, .inr z => by simp only [← glueDist_swap Φ] apply glueDist_triangle_inl_inr_inl simpa only [abs_sub_comm] end private theorem eq_of_glueDist_eq_zero (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (ε0 : 0 < ε) : ∀ p q : X ⊕ Y, glueDist Φ Ψ ε p q = 0 → p = q \| .inl x, .inl y, h => by rw [eq_of_dist_eq_zero h] \| .inl x, .inr y, h => by exfalso; linarith [le_glueDist_inl_inr Φ Ψ ε x y] \| .inr x, .inl y, h => by exfalso; linarith [le_glueDist_inr_inl Φ Ψ ε x y] \| .inr x, .inr y, h => by rw [eq_of_dist_eq_zero h] theorem Sum.mem_uniformity_iff_glueDist (hε : 0 < ε) (s : Set ((X ⊕ Y) × (X ⊕ Y))) : s ∈ 𝓤 (X ⊕ Y) ↔ ∃ δ > 0, ∀ a b, glueDist Φ Ψ ε a b < δ → (a, b) ∈ s := by simp only [Sum.uniformity, Filter.mem_sup, Filter.mem_map, mem_uniformity_dist, mem_preimage] constructor · rintro ⟨⟨δX, δX0, hX⟩, δY, δY0, hY⟩ refine ⟨min (min δX δY) ε, lt_min (lt_min δX0 δY0) hε, ?_⟩ rintro (a \| a) (b \| b) h <;> simp only [lt_min_iff] at h · exact hX h.1.1 · exact absurd h.2 (le_glueDist_inl_inr _ _ _ _ _).not_lt · exact absurd h.2 (le_glueDist_inr_inl _ _ _ _ _).not_lt · exact hY h.1.2 · rintro ⟨ε, ε0, H⟩ constructor <;> exact ⟨ε, ε0, fun _ _ h => H _ _ h⟩ /-- Given two maps `Φ` and `Ψ` intro metric spaces `X` and `Y` such that the distances between `Φ p` and `Φ q`, and between `Ψ p` and `Ψ q`, coincide up to `2 ε` where `ε > 0`, one can almost glue the two spaces `X` and `Y` along the images of `Φ` and `Ψ`, so that `Φ p` and `Ψ p` are at distance `ε`. -/ def glueMetricApprox [Nonempty Z] (Φ : Z → X) (Ψ : Z → Y) (ε : ℝ) (ε0 : 0 < ε) (H : ∀ p q, \|dist (Φ p) (Φ q) - dist (Ψ p) (Ψ q)\| ≤ 2 * ε) : MetricSpace (X ⊕ Y) where dist := glueDist Φ Ψ ε dist_self := glueDist_self Φ Ψ ε dist_comm := glueDist_comm Φ Ψ ε dist_triangle := glueDist_triangle Φ Ψ ε H eq_of_dist_eq_zero := eq_of_glueDist_eq_zero Φ Ψ ε ε0 _ _ toUniformSpace := Sum.instUniformSpace uniformity_dist := uniformity_dist_of_mem_uniformity _ _ <\| Sum.mem_uniformity_iff_glueDist ε0 end ApproxGluing section Sum /-! ### Metric on `X ⊕ Y` A particular case of the previous construction is when one uses basepoints in `X` and `Y` and one glues only along the basepoints, putting them at distance 1. We give a direct definition of the distance, without `iInf`, as it is easier to use in applications, and show that it is equal to the gluing distance defined above to take advantage of the lemmas we have already proved. -/ variable {X : Type u} {Y : Type v} {Z : Type w} variable [MetricSpace X] [MetricSpace Y] /-- Distance on a disjoint union. There are many (noncanonical) ways to put a distance compatible with each factor. If the two spaces are bounded, one can say for instance that each point in the first is at distance `diam X + diam Y + 1` of each point in the second. Instead, we choose a construction that works for unbounded spaces, but requires basepoints, chosen arbitrarily. We embed isometrically each factor, set the basepoints at distance 1, arbitrarily, and say that the distance from `a` to `b` is the sum of the distances of `a` and `b` to their respective basepoints, plus the distance 1 between the basepoints. Since there is an arbitrary choice in this construction, it is not an instance by default. -/ protected def Sum.dist : X ⊕ Y → X ⊕ Y → ℝ \| .inl a, .inl a' => dist a a' \| .inr b, .inr b' => dist b b' \| .inl a, .inr b => dist a (Nonempty.some ⟨a⟩) + 1 + dist (Nonempty.some ⟨b⟩) b \| .inr b, .inl a => dist b (Nonempty.some ⟨b⟩) + 1 + dist (Nonempty.some ⟨a⟩) a theorem Sum.dist_eq_glueDist {p q : X ⊕ Y} (x : X) (y : Y) : Sum.dist p q = glueDist (fun _ : Unit => Nonempty.some ⟨x⟩) (fun _ : Unit => Nonempty.some ⟨y⟩) 1 p q := by cases p <;> cases q <;> first \|rfl\|simp [Sum.dist, glueDist, dist_comm, add_comm, add_left_comm, add_assoc] private theorem Sum.dist_comm (x y : X ⊕ Y) : Sum.dist x y = Sum.dist y x := by cases x <;> cases y <;> simp [Sum.dist, _root_.dist_comm, add_comm, add_left_comm, add_assoc] theorem Sum.one_le_dist_inl_inr {x : X} {y : Y} : 1 ≤ Sum.dist (.inl x) (.inr y) := le_trans (le_add_of_nonneg_right dist_nonneg) <\| add_le_add_right (le_add_of_nonneg_left dist_nonneg) _ theorem Sum.one_le_dist_inr_inl {x : X} {y : Y} : 1 ≤ Sum.dist (.inr y) (.inl x) := by rw [Sum.dist_comm]; exact Sum.one_le_dist_inl_inr private theorem Sum.mem_uniformity (s : Set ((X ⊕ Y) × (X ⊕ Y))) : s ∈ 𝓤 (X ⊕ Y) ↔ ∃ ε > 0, ∀ a b, Sum.dist a b < ε → (a, b) ∈ s := by constructor · rintro ⟨hsX, hsY⟩ rcases mem_uniformity_dist.1 hsX with ⟨εX, εX0, hX⟩ rcases mem_uniformity_dist.1 hsY with ⟨εY, εY0, hY⟩ refine ⟨min (min εX εY) 1, lt_min (lt_min εX0 εY0) zero_lt_one, ?_⟩ rintro (a \| a) (b \| b) h · exact hX (lt_of_lt_of_le h (le_trans (min_le_left _ _) (min_le_left _ _))) · cases not_le_of_lt (lt_of_lt_of_le h (min_le_right _ _)) Sum.one_le_dist_inl_inr · cases not_le_of_lt (lt_of_lt_of_le h (min_le_right _ _)) Sum.one_le_dist_inr_inl · exact hY (lt_of_lt_of_le h (le_trans (min_le_left _ _) (min_le_right _ _))) · rintro ⟨ε, ε0, H⟩ constructor <;> rw [Filter.mem_map, mem_uniformity_dist] <;> exact ⟨ε, ε0, fun _ _ h => H _ _ h⟩ /-- The distance on the disjoint union indeed defines a metric space. All the distance properties follow from our choice of the distance. The harder work is to show that the uniform structure defined by the distance coincides with the disjoint union uniform structure. -/ def metricSpaceSum : MetricSpace (X ⊕ Y) where dist := Sum.dist dist_self x := by cases x <;> simp only [Sum.dist, dist_self] dist_comm := Sum.dist_comm dist_triangle \| .inl p, .inl q, .inl r => dist_triangle p q r \| .inl p, .inr q, _ => by simp only [Sum.dist_eq_glueDist p q] exact glueDist_triangle _ _ _ (by norm_num) _ _ _ \| _, .inl q, .inr r => by simp only [Sum.dist_eq_glueDist q r] exact glueDist_triangle _ _ _ (by norm_num) _ _ _ \| .inr p, _, .inl r => by simp only [Sum.dist_eq_glueDist r p] exact glueDist_triangle _ _ _ (by norm_num) _ _ _ \| .inr p, .inr q, .inr r => dist_triangle p q r eq_of_dist_eq_zero {p q} h := by rcases p with p \| p <;> rcases q with q \| q · rw [eq_of_dist_eq_zero h] · exact eq_of_glueDist_eq_zero _ _ _ one_pos _ _ ((Sum.dist_eq_glueDist p q).symm.trans h) · exact eq_of_glueDist_eq_zero _ _ _ one_pos _ _ ((Sum.dist_eq_glueDist q p).symm.trans h) · rw [eq_of_dist_eq_zero h] toUniformSpace := Sum.instUniformSpace uniformity_dist := uniformity_dist_of_mem_uniformity _ _ Sum.mem_uniformity attribute [local instance] metricSpaceSum theorem Sum.dist_eq {x y : X ⊕ Y} : dist x y = Sum.dist x y := rfl /-- The left injection of a space in a disjoint union is an isometry -/ theorem isometry_inl : Isometry (Sum.inl : X → X ⊕ Y) := Isometry.of_dist_eq fun _ _ => rfl /-- The right injection of a space in a disjoint union is an isometry -/ theorem isometry_inr : Isometry (Sum.inr : Y → X ⊕ Y) := Isometry.of_dist_eq fun _ _ => rfl end Sum namespace Sigma /- Copy of the previous paragraph, but for arbitrary disjoint unions instead of the disjoint union of two spaces. I.e., work with sigma types instead of sum types. -/ variable {ι : Type} {E : ι → Type} [∀ i, MetricSpace (E i)] open Classical in /-- Distance on a disjoint union. There are many (noncanonical) ways to put a distance compatible with each factor. We choose a construction that works for unbounded spaces, but requires basepoints, chosen arbitrarily. We embed isometrically each factor, set the basepoints at distance 1, arbitrarily, and say that the distance from `a` to `b` is the sum of the distances of `a` and `b` to their respective basepoints, plus the distance 1 between the basepoints. Since there is an arbitrary choice in this construction, it is not an instance by default. -/ protected def dist : (Σ i, E i) → (Σ i, E i) → ℝ \| ⟨i, x⟩, ⟨j, y⟩ => if h : i = j then haveI : E j = E i := by rw [h] Dist.dist x (cast this y) else Dist.dist x (Nonempty.some ⟨x⟩) + 1 + Dist.dist (Nonempty.some ⟨y⟩) y /-- A `Dist` instance on the disjoint union `Σ i, E i`. We embed isometrically each factor, set the basepoints at distance 1, arbitrarily, and say that the distance from `a` to `b` is the sum of the distances of `a` and `b` to their respective basepoints, plus the distance 1 between the basepoints. Since there is an arbitrary choice in this construction, it is not an instance by default. -/ def instDist : Dist (Σ i, E i) := ⟨Sigma.dist⟩ attribute [local instance] Sigma.instDist @[simp] theorem dist_same (i : ι) (x y : E i) : dist (Sigma.mk i x) ⟨i, y⟩ = dist x y := by simp [Dist.dist, Sigma.dist] @[simp] theorem dist_ne {i j : ι} (h : i ≠ j) (x : E i) (y : E j) : dist (⟨i, x⟩ : Σk, E k) ⟨j, y⟩ = dist x (Nonempty.some ⟨x⟩) + 1 + dist (Nonempty.some ⟨y⟩) y := dif_neg h theorem one_le_dist_of_ne {i j : ι} (h : i ≠ j) (x : E i) (y : E j) : 1 ≤ dist (⟨i, x⟩ : Σk, E k) ⟨j, y⟩ := by rw [Sigma.dist_ne h x y] linarith [@dist_nonneg _ _ x (Nonempty.some ⟨x⟩), @dist_nonneg _ _ (Nonempty.some ⟨y⟩) y] theorem fst_eq_of_dist_lt_one (x y : Σ i, E i) (h : dist x y < 1) : x.1 = y.1 := by cases x; cases y contrapose! h apply one_le_dist_of_ne h protected theorem dist_triangle (x y z : Σ i, E i) : dist x z ≤ dist x y + dist y z := by rcases x with ⟨i, x⟩; rcases y with ⟨j, y⟩; rcases z with ⟨k, z⟩ rcases eq_or_ne i k with (rfl \| hik) · rcases eq_or_ne i j with (rfl \| hij) · simpa using dist_triangle x y z · simp only [Sigma.dist_same, Sigma.dist_ne hij, Sigma.dist_ne hij.symm] calc dist x z ≤ dist x (Nonempty.some ⟨x⟩) + 0 + 0 + (0 + 0 + dist (Nonempty.some ⟨z⟩) z) := by simpa only [zero_add, add_zero] using dist_triangle _ _ _ _ ≤ _ := by apply_rules [add_le_add, le_rfl, dist_nonneg, zero_le_one] · rcases eq_or_ne i j with (rfl \| hij) · simp only [Sigma.dist_ne hik, Sigma.dist_same] calc dist x (Nonempty.some ⟨x⟩) + 1 + dist (Nonempty.some ⟨z⟩) z ≤ dist x y + dist y (Nonempty.some ⟨y⟩) + 1 + dist (Nonempty.some ⟨z⟩) z := by apply_rules [add_le_add, le_rfl, dist_triangle] _ = _ := by abel · rcases eq_or_ne j k with (rfl \| hjk) · simp only [Sigma.dist_ne hij, Sigma.dist_same] calc dist x (Nonempty.some ⟨x⟩) + 1 + dist (Nonempty.some ⟨z⟩) z ≤ dist x (Nonempty.some ⟨x⟩) + 1 + (dist (Nonempty.some ⟨z⟩) y + dist y z) := by apply_rules [add_le_add, le_rfl, dist_triangle] _ = _ := by abel · simp only [hik, hij, hjk, Sigma.dist_ne, Ne, not_false_iff] calc dist x (Nonempty.some ⟨x⟩) + 1 + dist (Nonempty.some ⟨z⟩) z = dist x (Nonempty.some ⟨x⟩) + 1 + 0 + (0 + 0 + dist (Nonempty.some ⟨z⟩) z) := by simp only [add_zero, zero_add] _ ≤ _ := by apply_rules [add_le_add, zero_le_one, dist_nonneg, le_rfl] protected theorem isOpen_iff (s : Set (Σ i, E i)) : IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ∀ y, dist x y < ε → y ∈ s := by constructor · rintro hs ⟨i, x⟩ hx obtain ⟨ε, εpos, hε⟩ : ∃ ε > 0, ball x ε ⊆ Sigma.mk i ⁻¹' s := Metric.isOpen_iff.1 (isOpen_sigma_iff.1 hs i) x hx refine ⟨min ε 1, lt_min εpos zero_lt_one, ?_⟩ rintro ⟨j, y⟩ hy rcases eq_or_ne i j with (rfl \| hij) · simp only [Sigma.dist_same, lt_min_iff] at hy exact hε (mem_ball'.2 hy.1) · apply (lt_irrefl (1 : ℝ) _).elim calc 1 ≤ Sigma.dist ⟨i, x⟩ ⟨j, y⟩ := Sigma.one_le_dist_of_ne hij _ _ _ < 1 := hy.trans_le (min_le_right _ _) · refine fun H => isOpen_sigma_iff.2 fun i => Metric.isOpen_iff.2 fun x hx => ?_ obtain ⟨ε, εpos, hε⟩ : ∃ ε > 0, ∀ y, dist (⟨i, x⟩ : Σj, E j) y < ε → y ∈ s := H ⟨i, x⟩ hx refine ⟨ε, εpos, fun y hy => ?_⟩ apply hε ⟨i, y⟩ rw [Sigma.dist_same] exact mem_ball'.1 hy /-- A metric space structure on the disjoint union `Σ i, E i`. We embed isometrically each factor, set the basepoints at distance 1, arbitrarily, and say that the distance from `a` to `b` is the sum of the distances of `a` and `b` to their respective basepoints, plus the distance 1 between the basepoints. Since there is an arbitrary choice in this construction, it is not an instance by default. -/ protected def metricSpace : MetricSpace (Σ i, E i) := by refine MetricSpace.ofDistTopology Sigma.dist ?_ ?_ Sigma.dist_triangle Sigma.isOpen_iff ?_ · rintro ⟨i, x⟩ simp [Sigma.dist] · rintro ⟨i, x⟩ ⟨j, y⟩ rcases eq_or_ne i j with (rfl \| h) · simp [Sigma.dist, dist_comm] · simp only [Sigma.dist, dist_comm, h, h.symm, not_false_iff, dif_neg] abel · rintro ⟨i, x⟩ ⟨j, y⟩ rcases eq_or_ne i j with (rfl \| hij) · simp [Sigma.dist] · intro h apply (lt_irrefl (1 : ℝ) _).elim calc 1 ≤ Sigma.dist (⟨i, x⟩ : Σk, E k) ⟨j, y⟩ := Sigma.one_le_dist_of_ne hij _ _ _ < 1 := by rw [h]; exact zero_lt_one attribute [local instance] Sigma.metricSpace open Topology open Filter /-- The injection of a space in a disjoint union is an isometry -/ theorem isometry_mk (i : ι) : Isometry (Sigma.mk i : E i → Σk, E k) := Isometry.of_dist_eq fun x y => by simp /-- A disjoint union of complete metric spaces is complete. -/ protected theorem completeSpace [∀ i, CompleteSpace (E i)] : CompleteSpace (Σ i, E i) := by set s : ι → Set (Σ i, E i) := fun i => Sigma.fst ⁻¹' {i} set U := { p : (Σk, E k) × Σk, E k \| dist p.1 p.2 < 1 } have hc : ∀ i, IsComplete (s i) := fun i => by simp only [s, ← range_sigmaMk] exact (isometry_mk i).isUniformInducing.isComplete_range have hd : ∀ (i j), ∀ x ∈ s i, ∀ y ∈ s j, (x, y) ∈ U → i = j := fun i j x hx y hy hxy => (Eq.symm hx).trans ((fst_eq_of_dist_lt_one _ _ hxy).trans hy) refine completeSpace_of_isComplete_univ ?_ convert isComplete_iUnion_separated hc (dist_mem_uniformity zero_lt_one) hd simp only [s, ← preimage_iUnion, iUnion_of_singleton, preimage_univ] end Sigma section Gluing -- Exact gluing of two metric spaces along isometric subsets. variable {X : Type u} {Y : Type v} {Z : Type w} variable [Nonempty Z] [MetricSpace Z] [MetricSpace X] [MetricSpace Y] {Φ : Z → X} {Ψ : Z → Y} {ε : ℝ} /-- Given two isometric embeddings `Φ : Z → X` and `Ψ : Z → Y`, we define a pseudo metric space structure on `X ⊕ Y` by declaring that `Φ x` and `Ψ x` are at distance `0`. -/ def gluePremetric (hΦ : Isometry Φ) (hΨ : Isometry Ψ) : PseudoMetricSpace (X ⊕ Y) where dist := glueDist Φ Ψ 0 dist_self := glueDist_self Φ Ψ 0 dist_comm := glueDist_comm Φ Ψ 0 dist_triangle := glueDist_triangle Φ Ψ 0 fun p q => by rw [hΦ.dist_eq, hΨ.dist_eq]; simp /-- Given two isometric embeddings `Φ : Z → X` and `Ψ : Z → Y`, we define a space `GlueSpace hΦ hΨ` by identifying in `X ⊕ Y` the points `Φ x` and `Ψ x`. -/ def GlueSpace (hΦ : Isometry Φ) (hΨ : Isometry Ψ) : Type _ := @SeparationQuotient _ (gluePremetric hΦ hΨ).toUniformSpace.toTopologicalSpace instance (hΦ : Isometry Φ) (hΨ : Isometry Ψ) : MetricSpace (GlueSpace hΦ hΨ) := inferInstanceAs <\| MetricSpace <\| @SeparationQuotient _ (gluePremetric hΦ hΨ).toUniformSpace.toTopologicalSpace /-- The canonical map from `X` to the space obtained by gluing isometric subsets in `X` and `Y`. -/ def toGlueL (hΦ : Isometry Φ) (hΨ : Isometry Ψ) (x : X) : GlueSpace hΦ hΨ := Quotient.mk'' (.inl x) /-- The canonical map from `Y` to the space obtained by gluing isometric subsets in `X` and `Y`. -/ def toGlueR (hΦ : Isometry Φ) (hΨ : Isometry Ψ) (y : Y) : GlueSpace hΦ hΨ := Quotient.mk'' (.inr y) instance inhabitedLeft (hΦ : Isometry Φ) (hΨ : Isometry Ψ) [Inhabited X] : Inhabited (GlueSpace hΦ hΨ) := ⟨toGlueL _ _ default⟩ instance inhabitedRight (hΦ : Isometry Φ) (hΨ : Isometry Ψ) [Inhabited Y] : Inhabited (GlueSpace hΦ hΨ) := ⟨toGlueR _ _ default⟩ theorem toGlue_commute (hΦ : Isometry Φ) (hΨ : Isometry Ψ) : toGlueL hΦ hΨ ∘ Φ = toGlueR hΦ hΨ ∘ Ψ := by let i : PseudoMetricSpace (X ⊕ Y) := gluePremetric hΦ hΨ let _ := i.toUniformSpace.toTopologicalSpace funext simp only [comp, toGlueL, toGlueR] refine SeparationQuotient.mk_eq_mk.2 (Metric.inseparable_iff.2 ?_) exact glueDist_glued_points Φ Ψ 0 _ theorem toGlueL_isometry (hΦ : Isometry Φ) (hΨ : Isometry Ψ) : Isometry (toGlueL hΦ hΨ) := Isometry.of_dist_eq fun _ _ => rfl theorem toGlueR_isometry (hΦ : Isometry Φ) (hΨ : Isometry Ψ) : Isometry (toGlueR hΦ hΨ) := Isometry.of_dist_eq fun _ _ => rfl end Gluing --section section InductiveLimit /-! ### Inductive limit of metric spaces In this section, we define the inductive limit of ``` f 0 f 1 f 2 f 3 X 0 -----> X 1 -----> X 2 -----> X 3 -----> ... ``` where the `X n` are metric spaces and f n isometric embeddings. We do it by defining a premetric space structure on `Σ n, X n`, where the predistance `dist x y` is obtained by pushing `x` and `y` in a common `X k` using composition by the `f n`, and taking the distance there. This does not depend on the choice of `k` as the `f n` are isometries. The metric space associated to this premetric space is the desired inductive limit. -/ open Nat variable {X : ℕ → Type u} [∀ n, MetricSpace (X n)] {f : ∀ n, X n → X (n + 1)} /-- Predistance on the disjoint union `Σ n, X n`. -/ def inductiveLimitDist (f : ∀ n, X n → X (n + 1)) (x y : Σ n, X n) : ℝ := dist (leRecOn (le_max_left x.1 y.1) (f _) x.2 : X (max x.1 y.1)) (leRecOn (le_max_right x.1 y.1) (f _) y.2 : X (max x.1 y.1)) /-- The predistance on the disjoint union `Σ n, X n` can be computed in any `X k` for large enough `k`. -/ theorem inductiveLimitDist_eq_dist (I : ∀ n, Isometry (f n)) (x y : Σ n, X n) : ∀ m (hx : x.1 ≤ m) (hy : y.1 ≤ m), inductiveLimitDist f x y = dist (leRecOn hx (f _) x.2 : X m) (leRecOn hy (f _) y.2 : X m) \| 0, hx, hy => by obtain ⟨i, x⟩ := x; obtain ⟨j, y⟩ := y obtain rfl : i = 0 := nonpos_iff_eq_zero.1 hx obtain rfl : j = 0 := nonpos_iff_eq_zero.1 hy rfl \| (m + 1), hx, hy => by by_cases h : max x.1 y.1 = (m + 1) · generalize m + 1 = m' at * subst m' rfl · have : max x.1 y.1 ≤ succ m := by simp [hx, hy] have : max x.1 y.1 ≤ m := by simpa [h] using of_le_succ this have xm : x.1 ≤ m := le_trans (le_max_left _ _) this have ym : y.1 ≤ m := le_trans (le_max_right _ _) this rw [leRecOn_succ xm, leRecOn_succ ym, (I m).dist_eq] exact inductiveLimitDist_eq_dist I x y m xm ym /-- Premetric space structure on `Σ n, X n`. -/ def inductivePremetric (I : ∀ n, Isometry (f n)) : PseudoMetricSpace (Σn, X n) where dist := inductiveLimitDist f dist_self x := by simp [dist, inductiveLimitDist] dist_comm x y := by let m := max x.1 y.1 have hx : x.1 ≤ m := le_max_left _ _ have hy : y.1 ≤ m := le_max_right _ _ rw [inductiveLimitDist_eq_dist I x y m hx hy, inductiveLimitDist_eq_dist I y x m hy hx, dist_comm] dist_triangle x y z := by let m := max (max x.1 y.1) z.1 have hx : x.1 ≤ m := le_trans (le_max_left _ _) (le_max_left _ _) have hy : y.1 ≤ m := le_trans (le_max_right _ _) (le_max_left _ _) have hz : z.1 ≤ m := le_max_right _ _ calc inductiveLimitDist f x z = dist (leRecOn hx (f _) x.2 : X m) (leRecOn hz (f _) z.2 : X m) := inductiveLimitDist_eq_dist I x z m hx hz _ ≤ dist (leRecOn hx (f _) x.2 : X m) (leRecOn hy (f _) y.2 : X m) + dist (leRecOn hy (f _) y.2 : X m) (leRecOn hz (f _) z.2 : X m) := (dist_triangle _ _ _) _ = inductiveLimitDist f x y + inductiveLimitDist f y z := by rw [inductiveLimitDist_eq_dist I x y m hx hy, inductiveLimitDist_eq_dist I y z m hy hz] attribute [local instance] inductivePremetric /-- The type giving the inductive limit in a metric space context. -/ def InductiveLimit (I : ∀ n, Isometry (f n)) : Type _ := @SeparationQuotient _ (inductivePremetric I).toUniformSpace.toTopologicalSpace instance {I : ∀ (n : ℕ), Isometry (f n)} : MetricSpace (InductiveLimit (f := f) I) := inferInstanceAs <\| MetricSpace <\| @SeparationQuotient _ (inductivePremetric I).toUniformSpace.toTopologicalSpace /-- Mapping each `X n` to the inductive limit. -/ def toInductiveLimit (I : ∀ n, Isometry (f n)) (n : ℕ) (x : X n) : Metric.InductiveLimit I := Quotient.mk'' (Sigma.mk n x) instance (I : ∀ n, Isometry (f n)) [Inhabited (X 0)] : Inhabited (InductiveLimit I) := ⟨toInductiveLimit _ 0 default⟩ /-- The map `toInductiveLimit n` mapping `X n` to the inductive limit is an isometry. -/ theorem toInductiveLimit_isometry (I : ∀ n, Isometry (f n)) (n : ℕ) : Isometry (toInductiveLimit I n) := Isometry.of_dist_eq fun x y => by change inductiveLimitDist f ⟨n, x⟩ ⟨n, y⟩ = dist x y rw [inductiveLimitDist_eq_dist I ⟨n, x⟩ ⟨n, y⟩ n (le_refl n) (le_refl n), leRecOn_self, leRecOn_self] /-- The maps `toInductiveLimit n` are compatible with the maps `f n`. -/ theorem toInductiveLimit_commute (I : ∀ n, Isometry (f n)) (n : ℕ) : toInductiveLimit I n.succ ∘ f n = toInductiveLimit I n := by let h := inductivePremetric I let _ := h.toUniformSpace.toTopologicalSpace funext x simp only [comp, toInductiveLimit] refine SeparationQuotient.mk_eq_mk.2 (Metric.inseparable_iff.2 ?_) show inductiveLimitDist f ⟨n.succ, f n x⟩ ⟨n, x⟩ = 0 rw [inductiveLimitDist_eq_dist I ⟨n.succ, f n x⟩ ⟨n, x⟩ n.succ, leRecOn_self, leRecOn_succ, leRecOn_self, dist_self] exact le_succ _ end InductiveLimit --section end Metric --namespace		Mathlib/Topology/MetricSpace/Gluing.lean	645	655
/- 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.VecNotation import Mathlib.Logic.Small.Basic import Mathlib.SetTheory.ZFC.PSet /-! # A model of ZFC In this file, we model Zermelo-Fraenkel set theory (+ choice) using Lean's underlying type theory, building on the pre-sets defined in `Mathlib.SetTheory.ZFC.PSet`. The theory of classes is developed in `Mathlib.SetTheory.ZFC.Class`. ## Main definitions * `ZFSet`: ZFC set. Defined as `PSet` quotiented by `PSet.Equiv`, the extensional equivalence. * `ZFSet.choice`: Axiom of choice. Proved from Lean's axiom of choice. * `ZFSet.omega`: The von Neumann ordinal `ω` as a `Set`. * `Classical.allZFSetDefinable`: All functions are classically definable. * `ZFSet.IsFunc` : Predicate that a ZFC set is a subset of `x × y` that can be considered as a ZFC function `x → y`. That is, each member of `x` is related by the ZFC set to exactly one member of `y`. * `ZFSet.funs`: ZFC set of ZFC functions `x → y`. * `ZFSet.Hereditarily p x`: Predicate that every set in the transitive closure of `x` has property `p`. ## Notes To avoid confusion between the Lean `Set` and the ZFC `Set`, docstrings in this file refer to them respectively as "`Set`" and "ZFC set". -/ universe u /-- The ZFC universe of sets consists of the type of pre-sets, quotiented by extensional equivalence. -/ @[pp_with_univ] def ZFSet : Type (u + 1) := Quotient PSet.setoid.{u} namespace ZFSet /-- Turns a pre-set into a ZFC set. -/ def mk : PSet → ZFSet := Quotient.mk'' @[simp] theorem mk_eq (x : PSet) : @Eq ZFSet ⟦x⟧ (mk x) := rfl @[simp] theorem mk_out : ∀ x : ZFSet, mk x.out = x := Quotient.out_eq /-- A set function is "definable" if it is the image of some n-ary `PSet` function. This isn't exactly definability, but is useful as a sufficient condition for functions that have a computable image. -/ class Definable (n) (f : (Fin n → ZFSet.{u}) → ZFSet.{u}) where /-- Turns a definable function into an n-ary `PSet` function. -/ out : (Fin n → PSet.{u}) → PSet.{u} /-- A set function `f` is the image of `Definable.out f`. -/ mk_out xs : mk (out xs) = f (mk <\| xs ·) := by simp attribute [simp] Definable.mk_out /-- An abbrev of `ZFSet.Definable` for unary functions. -/ abbrev Definable₁ (f : ZFSet.{u} → ZFSet.{u}) := Definable 1 (fun s ↦ f (s 0)) /-- A simpler constructor for `ZFSet.Definable₁`. -/ abbrev Definable₁.mk {f : ZFSet.{u} → ZFSet.{u}} (out : PSet.{u} → PSet.{u}) (mk_out : ∀ x, ⟦out x⟧ = f ⟦x⟧) : Definable₁ f where out xs := out (xs 0) mk_out xs := mk_out (xs 0) /-- Turns a unary definable function into a unary `PSet` function. -/ abbrev Definable₁.out (f : ZFSet.{u} → ZFSet.{u}) [Definable₁ f] : PSet.{u} → PSet.{u} := fun x ↦ Definable.out (fun s ↦ f (s 0)) ![x] lemma Definable₁.mk_out {f : ZFSet.{u} → ZFSet.{u}} [Definable₁ f] {x : PSet} : .mk (out f x) = f (.mk x) := Definable.mk_out ![x] /-- An abbrev of `ZFSet.Definable` for binary functions. -/ abbrev Definable₂ (f : ZFSet.{u} → ZFSet.{u} → ZFSet.{u}) := Definable 2 (fun s ↦ f (s 0) (s 1)) /-- A simpler constructor for `ZFSet.Definable₂`. -/ abbrev Definable₂.mk {f : ZFSet.{u} → ZFSet.{u} → ZFSet.{u}} (out : PSet.{u} → PSet.{u} → PSet.{u}) (mk_out : ∀ x y, ⟦out x y⟧ = f ⟦x⟧ ⟦y⟧) : Definable₂ f where out xs := out (xs 0) (xs 1) mk_out xs := mk_out (xs 0) (xs 1) /-- Turns a binary definable function into a binary `PSet` function. -/ abbrev Definable₂.out (f : ZFSet.{u} → ZFSet.{u} → ZFSet.{u}) [Definable₂ f] : PSet.{u} → PSet.{u} → PSet.{u} := fun x y ↦ Definable.out (fun s ↦ f (s 0) (s 1)) ![x, y] lemma Definable₂.mk_out {f : ZFSet.{u} → ZFSet.{u} → ZFSet.{u}} [Definable₂ f] {x y : PSet} : .mk (out f x y) = f (.mk x) (.mk y) := Definable.mk_out ![x, y] instance (f) [Definable₁ f] (n g) [Definable n g] : Definable n (fun s ↦ f (g s)) where out xs := Definable₁.out f (Definable.out g xs) instance (f) [Definable₂ f] (n g₁ g₂) [Definable n g₁] [Definable n g₂] : Definable n (fun s ↦ f (g₁ s) (g₂ s)) where out xs := Definable₂.out f (Definable.out g₁ xs) (Definable.out g₂ xs) instance (n) (i) : Definable n (fun s ↦ s i) where out s := s i lemma Definable.out_equiv {n} (f : (Fin n → ZFSet.{u}) → ZFSet.{u}) [Definable n f] {xs ys : Fin n → PSet} (h : ∀ i, xs i ≈ ys i) : out f xs ≈ out f ys := by rw [← Quotient.eq_iff_equiv, mk_eq, mk_eq, mk_out, mk_out] exact congrArg _ (funext fun i ↦ Quotient.sound (h i)) lemma Definable₁.out_equiv (f : ZFSet.{u} → ZFSet.{u}) [Definable₁ f] {x y : PSet} (h : x ≈ y) : out f x ≈ out f y := Definable.out_equiv _ (by simp [h]) lemma Definable₂.out_equiv (f : ZFSet.{u} → ZFSet.{u} → ZFSet.{u}) [Definable₂ f] {x₁ y₁ x₂ y₂ : PSet} (h₁ : x₁ ≈ y₁) (h₂ : x₂ ≈ y₂) : out f x₁ x₂ ≈ out f y₁ y₂ := Definable.out_equiv _ (by simp [Fin.forall_fin_succ, h₁, h₂]) end ZFSet namespace Classical open PSet ZFSet /-- All functions are classically definable. -/ noncomputable def allZFSetDefinable {n} (F : (Fin n → ZFSet.{u}) → ZFSet.{u}) : Definable n F where out xs := (F (mk <\| xs ·)).out end Classical namespace ZFSet open PSet theorem eq {x y : PSet} : mk x = mk y ↔ Equiv x y := Quotient.eq theorem sound {x y : PSet} (h : PSet.Equiv x y) : mk x = mk y := Quotient.sound h theorem exact {x y : PSet} : mk x = mk y → PSet.Equiv x y := Quotient.exact /-- The membership relation for ZFC sets is inherited from the membership relation for pre-sets. -/ protected def Mem : ZFSet → ZFSet → Prop := Quotient.lift₂ (· ∈ ·) fun _ _ _ _ hx hy => propext ((Mem.congr_left hx).trans (Mem.congr_right hy)) instance : Membership ZFSet ZFSet where mem t s := ZFSet.Mem s t @[simp] theorem mk_mem_iff {x y : PSet} : mk x ∈ mk y ↔ x ∈ y := Iff.rfl /-- Convert a ZFC set into a `Set` of ZFC sets -/ def toSet (u : ZFSet.{u}) : Set ZFSet.{u} := { x \| x ∈ u } @[simp] theorem mem_toSet (a u : ZFSet.{u}) : a ∈ u.toSet ↔ a ∈ u := Iff.rfl instance small_toSet (x : ZFSet.{u}) : Small.{u} x.toSet := Quotient.inductionOn x fun a => by let f : a.Type → (mk a).toSet := fun i => ⟨mk <\| a.Func i, func_mem a i⟩ suffices Function.Surjective f by exact small_of_surjective this rintro ⟨y, hb⟩ induction y using Quotient.inductionOn obtain ⟨i, h⟩ := hb exact ⟨i, Subtype.coe_injective (Quotient.sound h.symm)⟩ /-- A nonempty set is one that contains some element. -/ protected def Nonempty (u : ZFSet) : Prop := u.toSet.Nonempty theorem nonempty_def (u : ZFSet) : u.Nonempty ↔ ∃ x, x ∈ u := Iff.rfl theorem nonempty_of_mem {x u : ZFSet} (h : x ∈ u) : u.Nonempty := ⟨x, h⟩ @[simp] theorem nonempty_toSet_iff {u : ZFSet} : u.toSet.Nonempty ↔ u.Nonempty := Iff.rfl /-- `x ⊆ y` as ZFC sets means that all members of `x` are members of `y`. -/ protected def Subset (x y : ZFSet.{u}) := ∀ ⦃z⦄, z ∈ x → z ∈ y instance hasSubset : HasSubset ZFSet := ⟨ZFSet.Subset⟩ theorem subset_def {x y : ZFSet.{u}} : x ⊆ y ↔ ∀ ⦃z⦄, z ∈ x → z ∈ y := Iff.rfl instance : IsRefl ZFSet (· ⊆ ·) := ⟨fun _ _ => id⟩ instance : IsTrans ZFSet (· ⊆ ·) := ⟨fun _ _ _ hxy hyz _ ha => hyz (hxy ha)⟩ @[simp] theorem subset_iff : ∀ {x y : PSet}, mk x ⊆ mk y ↔ x ⊆ y \| ⟨_, A⟩, ⟨_, _⟩ => ⟨fun h a => @h ⟦A a⟧ (Mem.mk A a), fun h z => Quotient.inductionOn z fun _ ⟨a, za⟩ => let ⟨b, ab⟩ := h a ⟨b, za.trans ab⟩⟩ @[simp] theorem toSet_subset_iff {x y : ZFSet} : x.toSet ⊆ y.toSet ↔ x ⊆ y := by simp [subset_def, Set.subset_def] @[ext] theorem ext {x y : ZFSet.{u}} : (∀ z : ZFSet.{u}, z ∈ x ↔ z ∈ y) → x = y := Quotient.inductionOn₂ x y fun _ _ h => Quotient.sound (Mem.ext fun w => h ⟦w⟧) theorem toSet_injective : Function.Injective toSet := fun _ _ h => ext <\| Set.ext_iff.1 h @[simp] theorem toSet_inj {x y : ZFSet} : x.toSet = y.toSet ↔ x = y := toSet_injective.eq_iff instance : IsAntisymm ZFSet (· ⊆ ·) := ⟨fun _ _ hab hba => ext fun c => ⟨@hab c, @hba c⟩⟩ /-- The empty ZFC set -/ protected def empty : ZFSet := mk ∅ instance : EmptyCollection ZFSet := ⟨ZFSet.empty⟩ instance : Inhabited ZFSet := ⟨∅⟩ @[simp] theorem not_mem_empty (x) : x ∉ (∅ : ZFSet.{u}) := Quotient.inductionOn x PSet.not_mem_empty @[simp] theorem toSet_empty : toSet ∅ = ∅ := by simp [toSet] @[simp] theorem empty_subset (x : ZFSet.{u}) : (∅ : ZFSet) ⊆ x := Quotient.inductionOn x fun y => subset_iff.2 <\| PSet.empty_subset y @[simp] theorem not_nonempty_empty : ¬ZFSet.Nonempty ∅ := by simp [ZFSet.Nonempty] @[simp] theorem nonempty_mk_iff {x : PSet} : (mk x).Nonempty ↔ x.Nonempty := by refine ⟨?_, fun ⟨a, h⟩ => ⟨mk a, h⟩⟩ rintro ⟨a, h⟩ induction a using Quotient.inductionOn exact ⟨_, h⟩ theorem eq_empty (x : ZFSet.{u}) : x = ∅ ↔ ∀ y : ZFSet.{u}, y ∉ x := by simp [ZFSet.ext_iff] theorem eq_empty_or_nonempty (u : ZFSet) : u = ∅ ∨ u.Nonempty := by rw [eq_empty, ← not_exists] apply em' /-- `Insert x y` is the set `{x} ∪ y` -/ protected def Insert : ZFSet → ZFSet → ZFSet := Quotient.map₂ PSet.insert fun _ _ uv ⟨_, _⟩ ⟨_, _⟩ ⟨αβ, βα⟩ => ⟨fun o => match o with \| some a => let ⟨b, hb⟩ := αβ a ⟨some b, hb⟩ \| none => ⟨none, uv⟩, fun o => match o with \| some b => let ⟨a, ha⟩ := βα b ⟨some a, ha⟩ \| none => ⟨none, uv⟩⟩ instance : Insert ZFSet ZFSet := ⟨ZFSet.Insert⟩ instance : Singleton ZFSet ZFSet := ⟨fun x => insert x ∅⟩ instance : LawfulSingleton ZFSet ZFSet := ⟨fun _ => rfl⟩ @[simp] theorem mem_insert_iff {x y z : ZFSet.{u}} : x ∈ insert y z ↔ x = y ∨ x ∈ z := Quotient.inductionOn₃ x y z fun _ _ _ => PSet.mem_insert_iff.trans (or_congr_left eq.symm) theorem mem_insert (x y : ZFSet) : x ∈ insert x y := mem_insert_iff.2 <\| Or.inl rfl theorem mem_insert_of_mem {y z : ZFSet} (x) (h : z ∈ y) : z ∈ insert x y := mem_insert_iff.2 <\| Or.inr h @[simp] theorem toSet_insert (x y : ZFSet) : (insert x y).toSet = insert x y.toSet := by ext simp @[simp] theorem mem_singleton {x y : ZFSet.{u}} : x ∈ @singleton ZFSet.{u} ZFSet.{u} _ y ↔ x = y := Quotient.inductionOn₂ x y fun _ _ => PSet.mem_singleton.trans eq.symm @[simp] theorem toSet_singleton (x : ZFSet) : ({x} : ZFSet).toSet = {x} := by ext simp theorem insert_nonempty (u v : ZFSet) : (insert u v).Nonempty := ⟨u, mem_insert u v⟩ theorem singleton_nonempty (u : ZFSet) : ZFSet.Nonempty {u} := insert_nonempty u ∅ theorem mem_pair {x y z : ZFSet.{u}} : x ∈ ({y, z} : ZFSet) ↔ x = y ∨ x = z := by simp @[simp] theorem pair_eq_singleton (x : ZFSet) : {x, x} = ({x} : ZFSet) := by ext simp @[simp] theorem pair_eq_singleton_iff {x y z : ZFSet} : ({x, y} : ZFSet) = {z} ↔ x = z ∧ y = z := by refine ⟨fun h ↦ ?_, ?_⟩ · rw [← mem_singleton, ← mem_singleton] simp [← h] · rintro ⟨rfl, rfl⟩ exact pair_eq_singleton y @[simp] theorem singleton_eq_pair_iff {x y z : ZFSet} : ({x} : ZFSet) = {y, z} ↔ x = y ∧ x = z := by rw [eq_comm, pair_eq_singleton_iff] simp_rw [eq_comm] /-- `omega` is the first infinite von Neumann ordinal -/ def omega : ZFSet := mk PSet.omega @[simp] theorem omega_zero : ∅ ∈ omega := ⟨⟨0⟩, Equiv.rfl⟩ @[simp] theorem omega_succ {n} : n ∈ omega.{u} → insert n n ∈ omega.{u} := Quotient.inductionOn n fun x ⟨⟨n⟩, h⟩ => ⟨⟨n + 1⟩, ZFSet.exact <\| show insert (mk x) (mk x) = insert (mk <\| ofNat n) (mk <\| ofNat n) by rw [ZFSet.sound h] rfl⟩ /-- `{x ∈ a \| p x}` is the set of elements in `a` satisfying `p` -/ protected def sep (p : ZFSet → Prop) : ZFSet → ZFSet := Quotient.map (PSet.sep fun y => p (mk y)) fun ⟨α, A⟩ ⟨β, B⟩ ⟨αβ, βα⟩ => ⟨fun ⟨a, pa⟩ => let ⟨b, hb⟩ := αβ a ⟨⟨b, by simpa only [mk_func, ← ZFSet.sound hb]⟩, hb⟩, fun ⟨b, pb⟩ => let ⟨a, ha⟩ := βα b ⟨⟨a, by simpa only [mk_func, ZFSet.sound ha]⟩, ha⟩⟩ -- Porting note: the { x \| p x } notation appears to be disabled in Lean 4. instance : Sep ZFSet ZFSet := ⟨ZFSet.sep⟩ @[simp] theorem mem_sep {p : ZFSet.{u} → Prop} {x y : ZFSet.{u}} : y ∈ ZFSet.sep p x ↔ y ∈ x ∧ p y := Quotient.inductionOn₂ x y fun _ _ => PSet.mem_sep (p := p ∘ mk) fun _ _ h => (Quotient.sound h).subst @[simp] theorem sep_empty (p : ZFSet → Prop) : (∅ : ZFSet).sep p = ∅ := (eq_empty _).mpr fun _ h ↦ not_mem_empty _ (mem_sep.mp h).1 @[simp] theorem toSet_sep (a : ZFSet) (p : ZFSet → Prop) : (ZFSet.sep p a).toSet = { x ∈ a.toSet \| p x } := by ext simp /-- The powerset operation, the collection of subsets of a ZFC set -/ def powerset : ZFSet → ZFSet := Quotient.map PSet.powerset fun ⟨_, A⟩ ⟨_, B⟩ ⟨αβ, βα⟩ => ⟨fun p => ⟨{ b \| ∃ a, p a ∧ Equiv (A a) (B b) }, fun ⟨a, pa⟩ => let ⟨b, ab⟩ := αβ a ⟨⟨b, a, pa, ab⟩, ab⟩, fun ⟨_, a, pa, ab⟩ => ⟨⟨a, pa⟩, ab⟩⟩, fun q => ⟨{ a \| ∃ b, q b ∧ Equiv (A a) (B b) }, fun ⟨_, b, qb, ab⟩ => ⟨⟨b, qb⟩, ab⟩, fun ⟨b, qb⟩ => let ⟨a, ab⟩ := βα b ⟨⟨a, b, qb, ab⟩, ab⟩⟩⟩ @[simp] theorem mem_powerset {x y : ZFSet.{u}} : y ∈ powerset x ↔ y ⊆ x := Quotient.inductionOn₂ x y fun _ _ => PSet.mem_powerset.trans subset_iff.symm theorem sUnion_lem {α β : Type u} (A : α → PSet) (B : β → PSet) (αβ : ∀ a, ∃ b, Equiv (A a) (B b)) : ∀ a, ∃ b, Equiv ((sUnion ⟨α, A⟩).Func a) ((sUnion ⟨β, B⟩).Func b) \| ⟨a, c⟩ => by let ⟨b, hb⟩ := αβ a induction' ea : A a with γ Γ induction' eb : B b with δ Δ rw [ea, eb] at hb obtain ⟨γδ, δγ⟩ := hb let c : (A a).Type := c let ⟨d, hd⟩ := γδ (by rwa [ea] at c) use ⟨b, Eq.ndrec d (Eq.symm eb)⟩ change PSet.Equiv ((A a).Func c) ((B b).Func (Eq.ndrec d eb.symm)) match A a, B b, ea, eb, c, d, hd with \| _, _, rfl, rfl, _, _, hd => exact hd /-- The union operator, the collection of elements of elements of a ZFC set -/ def sUnion : ZFSet → ZFSet := Quotient.map PSet.sUnion fun ⟨_, A⟩ ⟨_, B⟩ ⟨αβ, βα⟩ => ⟨sUnion_lem A B αβ, fun a => Exists.elim (sUnion_lem B A (fun b => Exists.elim (βα b) fun c hc => ⟨c, PSet.Equiv.symm hc⟩) a) fun b hb => ⟨b, PSet.Equiv.symm hb⟩⟩ @[inherit_doc] prefix:110 "⋃₀ " => ZFSet.sUnion /-- The intersection operator, the collection of elements in all of the elements of a ZFC set. We define `⋂₀ ∅ = ∅`. -/ def sInter (x : ZFSet) : ZFSet := (⋃₀ x).sep (fun y => ∀ z ∈ x, y ∈ z) @[inherit_doc] prefix:110 "⋂₀ " => ZFSet.sInter @[simp] theorem mem_sUnion {x y : ZFSet.{u}} : y ∈ ⋃₀ x ↔ ∃ z ∈ x, y ∈ z := Quotient.inductionOn₂ x y fun _ _ => PSet.mem_sUnion.trans ⟨fun ⟨z, h⟩ => ⟨⟦z⟧, h⟩, fun ⟨z, h⟩ => Quotient.inductionOn z (fun z h => ⟨z, h⟩) h⟩ theorem mem_sInter {x y : ZFSet} (h : x.Nonempty) : y ∈ ⋂₀ x ↔ ∀ z ∈ x, y ∈ z := by unfold sInter simp only [and_iff_right_iff_imp, mem_sep] intro mem apply mem_sUnion.mpr replace ⟨s, h⟩ := h exact ⟨_, h, mem _ h⟩ @[simp] theorem sUnion_empty : ⋃₀ (∅ : ZFSet.{u}) = ∅ := by ext simp @[simp] theorem sInter_empty : ⋂₀ (∅ : ZFSet) = ∅ := by simp [sInter] theorem mem_of_mem_sInter {x y z : ZFSet} (hy : y ∈ ⋂₀ x) (hz : z ∈ x) : y ∈ z := by rcases eq_empty_or_nonempty x with (rfl \| hx) · exact (not_mem_empty z hz).elim · exact (mem_sInter hx).1 hy z hz theorem mem_sUnion_of_mem {x y z : ZFSet} (hy : y ∈ z) (hz : z ∈ x) : y ∈ ⋃₀ x := mem_sUnion.2 ⟨z, hz, hy⟩ theorem not_mem_sInter_of_not_mem {x y z : ZFSet} (hy : ¬y ∈ z) (hz : z ∈ x) : ¬y ∈ ⋂₀ x := fun hx => hy <\| mem_of_mem_sInter hx hz @[simp] theorem sUnion_singleton {x : ZFSet.{u}} : ⋃₀ ({x} : ZFSet) = x := ext fun y => by simp_rw [mem_sUnion, mem_singleton, exists_eq_left] @[simp] theorem sInter_singleton {x : ZFSet.{u}} : ⋂₀ ({x} : ZFSet) = x := ext fun y => by simp_rw [mem_sInter (singleton_nonempty x), mem_singleton, forall_eq] @[simp] theorem toSet_sUnion (x : ZFSet.{u}) : (⋃₀ x).toSet = ⋃₀ (toSet '' x.toSet) := by ext simp theorem toSet_sInter {x : ZFSet.{u}} (h : x.Nonempty) : (⋂₀ x).toSet = ⋂₀ (toSet '' x.toSet) := by ext simp [mem_sInter h] theorem singleton_injective : Function.Injective (@singleton ZFSet ZFSet _) := fun x y H => by let this := congr_arg sUnion H rwa [sUnion_singleton, sUnion_singleton] at this @[simp] theorem singleton_inj {x y : ZFSet} : ({x} : ZFSet) = {y} ↔ x = y := singleton_injective.eq_iff /-- The binary union operation -/ protected def union (x y : ZFSet.{u}) : ZFSet.{u} := ⋃₀ {x, y} /-- The binary intersection operation -/ protected def inter (x y : ZFSet.{u}) : ZFSet.{u} := ZFSet.sep (fun z => z ∈ y) x -- { z ∈ x \| z ∈ y } /-- The set difference operation -/ protected def diff (x y : ZFSet.{u}) : ZFSet.{u} := ZFSet.sep (fun z => z ∉ y) x -- { z ∈ x \| z ∉ y } instance : Union ZFSet := ⟨ZFSet.union⟩ instance : Inter ZFSet := ⟨ZFSet.inter⟩ instance : SDiff ZFSet := ⟨ZFSet.diff⟩ @[simp] theorem toSet_union (x y : ZFSet.{u}) : (x ∪ y).toSet = x.toSet ∪ y.toSet := by change (⋃₀ {x, y}).toSet = _ simp @[simp] theorem toSet_inter (x y : ZFSet.{u}) : (x ∩ y).toSet = x.toSet ∩ y.toSet := by change (ZFSet.sep (fun z => z ∈ y) x).toSet = _ ext simp @[simp] theorem toSet_sdiff (x y : ZFSet.{u}) : (x \ y).toSet = x.toSet \ y.toSet := by change (ZFSet.sep (fun z => z ∉ y) x).toSet = _ ext simp @[simp] theorem mem_union {x y z : ZFSet.{u}} : z ∈ x ∪ y ↔ z ∈ x ∨ z ∈ y := by rw [← mem_toSet] simp @[simp] theorem mem_inter {x y z : ZFSet.{u}} : z ∈ x ∩ y ↔ z ∈ x ∧ z ∈ y := @mem_sep (fun z : ZFSet.{u} => z ∈ y) x z @[simp] theorem mem_diff {x y z : ZFSet.{u}} : z ∈ x \ y ↔ z ∈ x ∧ z ∉ y := @mem_sep (fun z : ZFSet.{u} => z ∉ y) x z @[simp] theorem sUnion_pair {x y : ZFSet.{u}} : ⋃₀ ({x, y} : ZFSet.{u}) = x ∪ y := rfl theorem mem_wf : @WellFounded ZFSet (· ∈ ·) := (wellFounded_lift₂_iff (H := fun a b c d hx hy => propext ((@Mem.congr_left a c hx).trans (@Mem.congr_right b d hy _)))).mpr PSet.mem_wf /-- Induction on the `∈` relation. -/ @[elab_as_elim] theorem inductionOn {p : ZFSet → Prop} (x) (h : ∀ x, (∀ y ∈ x, p y) → p x) : p x := mem_wf.induction x h instance : IsWellFounded ZFSet (· ∈ ·) := ⟨mem_wf⟩ instance : WellFoundedRelation ZFSet := ⟨_, mem_wf⟩ theorem mem_asymm {x y : ZFSet} : x ∈ y → y ∉ x := asymm_of (· ∈ ·) theorem mem_irrefl (x : ZFSet) : x ∉ x := irrefl_of (· ∈ ·) x theorem not_subset_of_mem {x y : ZFSet} (h : x ∈ y) : ¬ y ⊆ x := fun h' ↦ mem_irrefl _ (h' h) theorem not_mem_of_subset {x y : ZFSet} (h : x ⊆ y) : y ∉ x := imp_not_comm.2 not_subset_of_mem h theorem regularity (x : ZFSet.{u}) (h : x ≠ ∅) : ∃ y ∈ x, x ∩ y = ∅ := by_contradiction fun ne => h <\| (eq_empty x).2 fun y => @inductionOn (fun z => z ∉ x) y fun z IH zx => ne ⟨z, zx, (eq_empty _).2 fun w wxz => let ⟨wx, wz⟩ := mem_inter.1 wxz IH w wz wx⟩ /-- The image of a (definable) ZFC set function -/ def image (f : ZFSet → ZFSet) [Definable₁ f] : ZFSet → ZFSet := let r := Definable₁.out f Quotient.map (PSet.image r) fun _ _ e => Mem.ext fun _ => (mem_image (fun _ _ ↦ Definable₁.out_equiv _)).trans <\| Iff.trans ⟨fun ⟨w, h1, h2⟩ => ⟨w, (Mem.congr_right e).1 h1, h2⟩, fun ⟨w, h1, h2⟩ => ⟨w, (Mem.congr_right e).2 h1, h2⟩⟩ <\| (mem_image (fun _ _ ↦ Definable₁.out_equiv _)).symm theorem image.mk (f : ZFSet.{u} → ZFSet.{u}) [Definable₁ f] (x) {y} : y ∈ x → f y ∈ image f x := Quotient.inductionOn₂ x y fun ⟨_, _⟩ _ ⟨a, ya⟩ => by simp only [mk_eq, ← Definable₁.mk_out (f := f)] exact ⟨a, Definable₁.out_equiv f ya⟩ @[simp] theorem mem_image {f : ZFSet.{u} → ZFSet.{u}} [Definable₁ f] {x y : ZFSet.{u}} : y ∈ image f x ↔ ∃ z ∈ x, f z = y := Quotient.inductionOn₂ x y fun ⟨_, A⟩ _ => ⟨fun ⟨a, ya⟩ => ⟨⟦A a⟧, Mem.mk A a, ((Quotient.sound ya).trans Definable₁.mk_out).symm⟩, fun ⟨_, hz, e⟩ => e ▸ image.mk _ _ hz⟩ @[simp] theorem toSet_image (f : ZFSet → ZFSet) [Definable₁ f] (x : ZFSet) : (image f x).toSet = f '' x.toSet := by ext simp /-- The range of a type-indexed family of sets. -/ noncomputable def range {α} [Small.{u} α] (f : α → ZFSet.{u}) : ZFSet.{u} := ⟦⟨_, Quotient.out ∘ f ∘ (equivShrink α).symm⟩⟧ @[simp] theorem mem_range {α} [Small.{u} α] {f : α → ZFSet.{u}} {x : ZFSet.{u}} : x ∈ range f ↔ x ∈ Set.range f := Quotient.inductionOn x fun y => by constructor · rintro ⟨z, hz⟩ exact ⟨(equivShrink α).symm z, Quotient.eq_mk_iff_out.2 hz.symm⟩ · rintro ⟨z, hz⟩ use equivShrink α z simpa [hz] using PSet.Equiv.symm (Quotient.mk_out y) @[simp] theorem toSet_range {α} [Small.{u} α] (f : α → ZFSet.{u}) : (range f).toSet = Set.range f := by ext simp /-- Kuratowski ordered pair -/ def pair (x y : ZFSet.{u}) : ZFSet.{u} := {{x}, {x, y}} @[simp] theorem toSet_pair (x y : ZFSet.{u}) : (pair x y).toSet = {{x}, {x, y}} := by simp [pair] /-- A subset of pairs `{(a, b) ∈ x × y \| p a b}` -/ def pairSep (p : ZFSet.{u} → ZFSet.{u} → Prop) (x y : ZFSet.{u}) : ZFSet.{u} := (powerset (powerset (x ∪ y))).sep fun z => ∃ a ∈ x, ∃ b ∈ y, z = pair a b ∧ p a b @[simp] theorem mem_pairSep {p} {x y z : ZFSet.{u}} : z ∈ pairSep p x y ↔ ∃ a ∈ x, ∃ b ∈ y, z = pair a b ∧ p a b := by refine mem_sep.trans ⟨And.right, fun e => ⟨?_, e⟩⟩ rcases e with ⟨a, ax, b, bY, rfl, pab⟩ simp only [mem_powerset, subset_def, mem_union, pair, mem_pair] rintro u (rfl \| rfl) v <;> simp only [mem_singleton, mem_pair] · rintro rfl exact Or.inl ax · rintro (rfl \| rfl) <;> [left; right] <;> assumption theorem pair_injective : Function.Injective2 pair := by intro x x' y y' H simp_rw [ZFSet.ext_iff, pair, mem_pair] at H obtain rfl : x = x' := And.left <\| by simpa [or_and_left] using (H {x}).1 (Or.inl rfl) have he : y = x → y = y' := by rintro rfl simpa [eq_comm] using H {y, y'} have hx := H {x, y} simp_rw [pair_eq_singleton_iff, true_and, or_true, true_iff] at hx refine ⟨rfl, hx.elim he fun hy ↦ Or.elim ?_ he id⟩ simpa using ZFSet.ext_iff.1 hy y @[simp] theorem pair_inj {x y x' y' : ZFSet} : pair x y = pair x' y' ↔ x = x' ∧ y = y' := pair_injective.eq_iff /-- The cartesian product, `{(a, b) \| a ∈ x, b ∈ y}` -/ def prod : ZFSet.{u} → ZFSet.{u} → ZFSet.{u} := pairSep fun _ _ => True @[simp] theorem mem_prod {x y z : ZFSet.{u}} : z ∈ prod x y ↔ ∃ a ∈ x, ∃ b ∈ y, z = pair a b := by simp [prod] theorem pair_mem_prod {x y a b : ZFSet.{u}} : pair a b ∈ prod x y ↔ a ∈ x ∧ b ∈ y := by simp /-- `isFunc x y f` is the assertion that `f` is a subset of `x × y` which relates to each element of `x` a unique element of `y`, so that we can consider `f` as a ZFC function `x → y`. -/ def IsFunc (x y f : ZFSet.{u}) : Prop := f ⊆ prod x y ∧ ∀ z : ZFSet.{u}, z ∈ x → ∃! w, pair z w ∈ f /-- `funs x y` is `y ^ x`, the set of all set functions `x → y` -/ def funs (x y : ZFSet.{u}) : ZFSet.{u} := ZFSet.sep (IsFunc x y) (powerset (prod x y)) @[simp] theorem mem_funs {x y f : ZFSet.{u}} : f ∈ funs x y ↔ IsFunc x y f := by simp [funs, IsFunc] instance : Definable₁ ({·}) := .mk ({·}) (fun _ ↦ rfl) instance : Definable₂ insert := .mk insert (fun _ _ ↦ rfl) instance : Definable₂ pair := by unfold pair; infer_instance /-- Graph of a function: `map f x` is the ZFC function which maps `a ∈ x` to `f a` -/ def map (f : ZFSet → ZFSet) [Definable₁ f] : ZFSet → ZFSet := image fun y => pair y (f y) @[simp] theorem mem_map {f : ZFSet → ZFSet} [Definable₁ f] {x y : ZFSet} : y ∈ map f x ↔ ∃ z ∈ x, pair z (f z) = y := mem_image theorem map_unique {f : ZFSet.{u} → ZFSet.{u}} [Definable₁ f] {x z : ZFSet.{u}} (zx : z ∈ x) : ∃! w, pair z w ∈ map f x := ⟨f z, image.mk _ _ zx, fun y yx => by let ⟨w, _, we⟩ := mem_image.1 yx let ⟨wz, fy⟩ := pair_injective we rw [← fy, wz]⟩ @[simp] theorem map_isFunc {f : ZFSet → ZFSet} [Definable₁ f] {x y : ZFSet} : IsFunc x y (map f x) ↔ ∀ z ∈ x, f z ∈ y := ⟨fun ⟨ss, h⟩ z zx => let ⟨_, t1, t2⟩ := h z zx (t2 (f z) (image.mk _ _ zx)).symm ▸ (pair_mem_prod.1 (ss t1)).right, fun h => ⟨fun _ yx => let ⟨z, zx, ze⟩ := mem_image.1 yx ze ▸ pair_mem_prod.2 ⟨zx, h z zx⟩, fun _ => map_unique⟩⟩ /-- Given a predicate `p` on ZFC sets. `Hereditarily p x` means that `x` has property `p` and the members of `x` are all `Hereditarily p`. -/ def Hereditarily (p : ZFSet → Prop) (x : ZFSet) : Prop := p x ∧ ∀ y ∈ x, Hereditarily p y termination_by x section Hereditarily variable {p : ZFSet.{u} → Prop} {x y : ZFSet.{u}} theorem hereditarily_iff : Hereditarily p x ↔ p x ∧ ∀ y ∈ x, Hereditarily p y := by rw [← Hereditarily] alias ⟨Hereditarily.def, _⟩ := hereditarily_iff theorem Hereditarily.self (h : x.Hereditarily p) : p x := h.def.1 theorem Hereditarily.mem (h : x.Hereditarily p) (hy : y ∈ x) : y.Hereditarily p := h.def.2 _ hy theorem Hereditarily.empty : Hereditarily p x → p ∅ := by apply @ZFSet.inductionOn _ x intro y IH h rcases ZFSet.eq_empty_or_nonempty y with (rfl \| ⟨a, ha⟩) · exact h.self · exact IH a ha (h.mem ha) end Hereditarily end ZFSet		Mathlib/SetTheory/ZFC/Basic.lean	1,714	1,717
/- Copyright (c) 2022 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Algebra.Group.Support import Mathlib.Algebra.GroupWithZero.Action.Pointwise.Set /-! # Support of a function composed with a scalar action We show that the support of `x ↦ f (c⁻¹ • x)` is equal to `c • support f`. -/ open Pointwise open Function Set section Group variable {α β γ : Type*} [Group α] [MulAction α β] theorem mulSupport_comp_inv_smul [One γ] (c : α) (f : β → γ) : (mulSupport fun x ↦ f (c⁻¹ • x)) = c • mulSupport f := by	ext x simp only [mem_smul_set_iff_inv_smul_mem, mem_mulSupport] /- Note: to_additive also automatically translates `SMul` to `VAdd`, so we give the additive version	Mathlib/Data/Set/Pointwise/Support.lean	26	29
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Multiset.ZeroCons /-! # Basic results on multisets -/ -- No algebra should be required assert_not_exists Monoid universe v open List Subtype Nat Function variable {α : Type} {β : Type v} {γ : Type} namespace Multiset /-! ### `Multiset.toList` -/ section ToList /-- Produces a list of the elements in the multiset using choice. -/ noncomputable def toList (s : Multiset α) := s.out @[simp, norm_cast] theorem coe_toList (s : Multiset α) : (s.toList : Multiset α) = s := s.out_eq' @[simp] theorem toList_eq_nil {s : Multiset α} : s.toList = [] ↔ s = 0 := by rw [← coe_eq_zero, coe_toList] theorem empty_toList {s : Multiset α} : s.toList.isEmpty ↔ s = 0 := by simp @[simp] theorem toList_zero : (Multiset.toList 0 : List α) = [] := toList_eq_nil.mpr rfl @[simp] theorem mem_toList {a : α} {s : Multiset α} : a ∈ s.toList ↔ a ∈ s := by rw [← mem_coe, coe_toList] @[simp] theorem toList_eq_singleton_iff {a : α} {m : Multiset α} : m.toList = [a] ↔ m = {a} := by rw [← perm_singleton, ← coe_eq_coe, coe_toList, coe_singleton] @[simp] theorem toList_singleton (a : α) : ({a} : Multiset α).toList = [a] := Multiset.toList_eq_singleton_iff.2 rfl @[simp] theorem length_toList (s : Multiset α) : s.toList.length = card s := by rw [← coe_card, coe_toList] end ToList /-! ### Induction principles -/ /-- The strong induction principle for multisets. -/ @[elab_as_elim] def strongInductionOn {p : Multiset α → Sort} (s : Multiset α) (ih : ∀ s, (∀ t < s, p t) → p s) : p s := (ih s) fun t _h => strongInductionOn t ih termination_by card s decreasing_by exact card_lt_card _h theorem strongInductionOn_eq {p : Multiset α → Sort} (s : Multiset α) (H) : @strongInductionOn _ p s H = H s fun t _h => @strongInductionOn _ p t H := by rw [strongInductionOn] @[elab_as_elim] theorem case_strongInductionOn {p : Multiset α → Prop} (s : Multiset α) (h₀ : p 0) (h₁ : ∀ a s, (∀ t ≤ s, p t) → p (a ::ₘ s)) : p s := Multiset.strongInductionOn s fun s => Multiset.induction_on s (fun _ => h₀) fun _a _s _ ih => (h₁ _ _) fun _t h => ih _ <\| lt_of_le_of_lt h <\| lt_cons_self _ _ /-- Suppose that, given that `p t` can be defined on all supersets of `s` of cardinality less than `n`, one knows how to define `p s`. Then one can inductively define `p s` for all multisets `s` of cardinality less than `n`, starting from multisets of card `n` and iterating. This can be used either to define data, or to prove properties. -/ def strongDownwardInduction {p : Multiset α → Sort} {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) (s : Multiset α) : card s ≤ n → p s := H s fun {t} ht _h => strongDownwardInduction H t ht termination_by n - card s decreasing_by simp_wf; have := (card_lt_card _h); omega theorem strongDownwardInduction_eq {p : Multiset α → Sort} {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) (s : Multiset α) : strongDownwardInduction H s = H s fun ht _hst => strongDownwardInduction H _ ht := by rw [strongDownwardInduction] /-- Analogue of `strongDownwardInduction` with order of arguments swapped. -/ @[elab_as_elim] def strongDownwardInductionOn {p : Multiset α → Sort} {n : ℕ} : ∀ s : Multiset α, (∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) → card s ≤ n → p s := fun s H => strongDownwardInduction H s theorem strongDownwardInductionOn_eq {p : Multiset α → Sort} (s : Multiset α) {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) : s.strongDownwardInductionOn H = H s fun {t} ht _h => t.strongDownwardInductionOn H ht := by dsimp only [strongDownwardInductionOn] rw [strongDownwardInduction] section Choose variable (p : α → Prop) [DecidablePred p] (l : Multiset α) /-- Given a proof `hp` that there exists a unique `a ∈ l` such that `p a`, `chooseX p l hp` returns that `a` together with proofs of `a ∈ l` and `p a`. -/ def chooseX : ∀ _hp : ∃! a, a ∈ l ∧ p a, { a // a ∈ l ∧ p a } := Quotient.recOn l (fun l' ex_unique => List.chooseX p l' (ExistsUnique.exists ex_unique)) (by intros a b _ funext hp suffices all_equal : ∀ x y : { t // t ∈ b ∧ p t }, x = y by apply all_equal rintro ⟨x, px⟩ ⟨y, py⟩ rcases hp with ⟨z, ⟨_z_mem_l, _pz⟩, z_unique⟩ congr calc x = z := z_unique x px _ = y := (z_unique y py).symm ) /-- Given a proof `hp` that there exists a unique `a ∈ l` such that `p a`, `choose p l hp` returns that `a`. -/ def choose (hp : ∃! a, a ∈ l ∧ p a) : α := chooseX p l hp theorem choose_spec (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) := (chooseX p l hp).property theorem choose_mem (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l := (choose_spec _ _ _).1 theorem choose_property (hp : ∃! a, a ∈ l ∧ p a) : p (choose p l hp) := (choose_spec _ _ _).2 end Choose variable (α) in /-- The equivalence between lists and multisets of a subsingleton type. -/ def subsingletonEquiv [Subsingleton α] : List α ≃ Multiset α where toFun := ofList invFun := (Quot.lift id) fun (a b : List α) (h : a ~ b) => (List.ext_get h.length_eq) fun _ _ _ => Subsingleton.elim _ _ left_inv _ := rfl right_inv m := Quot.inductionOn m fun _ => rfl @[simp] theorem coe_subsingletonEquiv [Subsingleton α] : (subsingletonEquiv α : List α → Multiset α) = ofList := rfl section SizeOf set_option linter.deprecated false in @[deprecated "Deprecated without replacement." (since := "2025-02-07")] theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Multiset α} (hx : x ∈ s) : SizeOf.sizeOf x < SizeOf.sizeOf s := by induction s using Quot.inductionOn exact List.sizeOf_lt_sizeOf_of_mem hx end SizeOf end Multiset		Mathlib/Data/Multiset/Basic.lean	2,777	2,782
/- Copyright (c) 2020 Rémy Degenne. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémy Degenne, Sébastien Gouëzel -/ import Mathlib.Analysis.NormedSpace.IndicatorFunction import Mathlib.Data.Fintype.Order import Mathlib.MeasureTheory.Function.AEEqFun import Mathlib.MeasureTheory.Function.LpSeminorm.Defs import Mathlib.MeasureTheory.Function.SpecialFunctions.Basic import Mathlib.MeasureTheory.Integral.Lebesgue.Countable import Mathlib.MeasureTheory.Integral.Lebesgue.Sub /-! # Basic theorems about ℒp space -/ noncomputable section open TopologicalSpace MeasureTheory Filter open scoped NNReal ENNReal Topology ComplexConjugate variable {α ε ε' E F G : Type} {m m0 : MeasurableSpace α} {p : ℝ≥0∞} {q : ℝ} {μ ν : Measure α} [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedAddCommGroup G] [ENorm ε] [ENorm ε'] namespace MeasureTheory section Lp section Top theorem MemLp.eLpNorm_lt_top [TopologicalSpace ε] {f : α → ε} (hfp : MemLp f p μ) : eLpNorm f p μ < ∞ := hfp.2 @[deprecated (since := "2025-02-21")] alias Memℒp.eLpNorm_lt_top := MemLp.eLpNorm_lt_top theorem MemLp.eLpNorm_ne_top [TopologicalSpace ε] {f : α → ε} (hfp : MemLp f p μ) : eLpNorm f p μ ≠ ∞ := ne_of_lt hfp.2 @[deprecated (since := "2025-02-21")] alias Memℒp.eLpNorm_ne_top := MemLp.eLpNorm_ne_top theorem lintegral_rpow_enorm_lt_top_of_eLpNorm'_lt_top {f : α → ε} (hq0_lt : 0 < q) (hfq : eLpNorm' f q μ < ∞) : ∫⁻ a, ‖f a‖ₑ ^ q ∂μ < ∞ := by rw [lintegral_rpow_enorm_eq_rpow_eLpNorm' hq0_lt] exact ENNReal.rpow_lt_top_of_nonneg (le_of_lt hq0_lt) (ne_of_lt hfq) @[deprecated (since := "2025-01-17")] alias lintegral_rpow_nnnorm_lt_top_of_eLpNorm'_lt_top' := lintegral_rpow_enorm_lt_top_of_eLpNorm'_lt_top theorem lintegral_rpow_enorm_lt_top_of_eLpNorm_lt_top {f : α → ε} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) (hfp : eLpNorm f p μ < ∞) : ∫⁻ a, ‖f a‖ₑ ^ p.toReal ∂μ < ∞ := by apply lintegral_rpow_enorm_lt_top_of_eLpNorm'_lt_top · exact ENNReal.toReal_pos hp_ne_zero hp_ne_top · simpa [eLpNorm_eq_eLpNorm' hp_ne_zero hp_ne_top] using hfp @[deprecated (since := "2025-01-17")] alias lintegral_rpow_nnnorm_lt_top_of_eLpNorm_lt_top := lintegral_rpow_enorm_lt_top_of_eLpNorm_lt_top theorem eLpNorm_lt_top_iff_lintegral_rpow_enorm_lt_top {f : α → ε} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : eLpNorm f p μ < ∞ ↔ ∫⁻ a, (‖f a‖ₑ) ^ p.toReal ∂μ < ∞ := ⟨lintegral_rpow_enorm_lt_top_of_eLpNorm_lt_top hp_ne_zero hp_ne_top, by intro h have hp' := ENNReal.toReal_pos hp_ne_zero hp_ne_top have : 0 < 1 / p.toReal := div_pos zero_lt_one hp' simpa [eLpNorm_eq_lintegral_rpow_enorm hp_ne_zero hp_ne_top] using ENNReal.rpow_lt_top_of_nonneg (le_of_lt this) (ne_of_lt h)⟩ @[deprecated (since := "2025-02-04")] alias eLpNorm_lt_top_iff_lintegral_rpow_nnnorm_lt_top := eLpNorm_lt_top_iff_lintegral_rpow_enorm_lt_top end Top section Zero @[simp] theorem eLpNorm'_exponent_zero {f : α → ε} : eLpNorm' f 0 μ = 1 := by rw [eLpNorm', div_zero, ENNReal.rpow_zero] @[simp] theorem eLpNorm_exponent_zero {f : α → ε} : eLpNorm f 0 μ = 0 := by simp [eLpNorm] @[simp] theorem memLp_zero_iff_aestronglyMeasurable [TopologicalSpace ε] {f : α → ε} : MemLp f 0 μ ↔ AEStronglyMeasurable f μ := by simp [MemLp, eLpNorm_exponent_zero] @[deprecated (since := "2025-02-21")] alias memℒp_zero_iff_aestronglyMeasurable := memLp_zero_iff_aestronglyMeasurable section ENormedAddMonoid variable {ε : Type} [TopologicalSpace ε] [ENormedAddMonoid ε] @[simp] theorem eLpNorm'_zero (hp0_lt : 0 < q) : eLpNorm' (0 : α → ε) q μ = 0 := by simp [eLpNorm'_eq_lintegral_enorm, hp0_lt] @[simp] theorem eLpNorm'_zero' (hq0_ne : q ≠ 0) (hμ : μ ≠ 0) : eLpNorm' (0 : α → ε) q μ = 0 := by rcases le_or_lt 0 q with hq0 \| hq_neg · exact eLpNorm'_zero (lt_of_le_of_ne hq0 hq0_ne.symm) · simp [eLpNorm'_eq_lintegral_enorm, ENNReal.rpow_eq_zero_iff, hμ, hq_neg] @[simp] theorem eLpNormEssSup_zero : eLpNormEssSup (0 : α → ε) μ = 0 := by simp [eLpNormEssSup, ← bot_eq_zero', essSup_const_bot] @[simp] theorem eLpNorm_zero : eLpNorm (0 : α → ε) p μ = 0 := by by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp only [h_top, eLpNorm_exponent_top, eLpNormEssSup_zero] rw [← Ne] at h0 simp [eLpNorm_eq_eLpNorm' h0 h_top, ENNReal.toReal_pos h0 h_top] @[simp] theorem eLpNorm_zero' : eLpNorm (fun _ : α => (0 : ε)) p μ = 0 := eLpNorm_zero @[simp] lemma MemLp.zero : MemLp (0 : α → ε) p μ := ⟨aestronglyMeasurable_zero, by rw [eLpNorm_zero]; exact ENNReal.coe_lt_top⟩ @[simp] lemma MemLp.zero' : MemLp (fun _ : α => (0 : ε)) p μ := MemLp.zero @[deprecated (since := "2025-02-21")] alias Memℒp.zero' := MemLp.zero' @[deprecated (since := "2025-01-21")] alias zero_memℒp := MemLp.zero @[deprecated (since := "2025-01-21")] alias zero_mem_ℒp := MemLp.zero' variable [MeasurableSpace α] theorem eLpNorm'_measure_zero_of_pos {f : α → ε} (hq_pos : 0 < q) : eLpNorm' f q (0 : Measure α) = 0 := by simp [eLpNorm', hq_pos] theorem eLpNorm'_measure_zero_of_exponent_zero {f : α → ε} : eLpNorm' f 0 (0 : Measure α) = 1 := by simp [eLpNorm'] theorem eLpNorm'_measure_zero_of_neg {f : α → ε} (hq_neg : q < 0) : eLpNorm' f q (0 : Measure α) = ∞ := by simp [eLpNorm', hq_neg] end ENormedAddMonoid @[simp] theorem eLpNormEssSup_measure_zero {f : α → ε} : eLpNormEssSup f (0 : Measure α) = 0 := by simp [eLpNormEssSup] @[simp] theorem eLpNorm_measure_zero {f : α → ε} : eLpNorm f p (0 : Measure α) = 0 := by by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp [h_top] rw [← Ne] at h0 simp [eLpNorm_eq_eLpNorm' h0 h_top, eLpNorm', ENNReal.toReal_pos h0 h_top] section ContinuousENorm variable {ε : Type} [TopologicalSpace ε] [ContinuousENorm ε] @[simp] lemma memLp_measure_zero {f : α → ε} : MemLp f p (0 : Measure α) := by simp [MemLp] @[deprecated (since := "2025-02-21")] alias memℒp_measure_zero := memLp_measure_zero end ContinuousENorm end Zero section Neg @[simp] theorem eLpNorm'_neg (f : α → F) (q : ℝ) (μ : Measure α) : eLpNorm' (-f) q μ = eLpNorm' f q μ := by simp [eLpNorm'_eq_lintegral_enorm] @[simp] theorem eLpNorm_neg (f : α → F) (p : ℝ≥0∞) (μ : Measure α) : eLpNorm (-f) p μ = eLpNorm f p μ := by by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp [h_top, eLpNormEssSup_eq_essSup_enorm] simp [eLpNorm_eq_eLpNorm' h0 h_top] lemma eLpNorm_sub_comm (f g : α → E) (p : ℝ≥0∞) (μ : Measure α) : eLpNorm (f - g) p μ = eLpNorm (g - f) p μ := by simp [← eLpNorm_neg (f := f - g)] theorem MemLp.neg {f : α → E} (hf : MemLp f p μ) : MemLp (-f) p μ := ⟨AEStronglyMeasurable.neg hf.1, by simp [hf.right]⟩ @[deprecated (since := "2025-02-21")] alias Memℒp.neg := MemLp.neg theorem memLp_neg_iff {f : α → E} : MemLp (-f) p μ ↔ MemLp f p μ := ⟨fun h => neg_neg f ▸ h.neg, MemLp.neg⟩ @[deprecated (since := "2025-02-21")] alias memℒp_neg_iff := memLp_neg_iff end Neg section Const variable {ε' ε'' : Type} [TopologicalSpace ε'] [ContinuousENorm ε'] [TopologicalSpace ε''] [ENormedAddMonoid ε''] theorem eLpNorm'_const (c : ε) (hq_pos : 0 < q) : eLpNorm' (fun _ : α => c) q μ = ‖c‖ₑ * μ Set.univ ^ (1 / q) := by rw [eLpNorm'_eq_lintegral_enorm, lintegral_const, ENNReal.mul_rpow_of_nonneg _ _ (by simp [hq_pos.le] : 0 ≤ 1 / q)] congr rw [← ENNReal.rpow_mul] suffices hq_cancel : q * (1 / q) = 1 by rw [hq_cancel, ENNReal.rpow_one] rw [one_div, mul_inv_cancel₀ (ne_of_lt hq_pos).symm] -- Generalising this to ENormedAddMonoid requires a case analysis whether ‖c‖ₑ = ⊤, -- and will happen in a future PR. theorem eLpNorm'_const' [IsFiniteMeasure μ] (c : F) (hc_ne_zero : c ≠ 0) (hq_ne_zero : q ≠ 0) : eLpNorm' (fun _ : α => c) q μ = ‖c‖ₑ * μ Set.univ ^ (1 / q) := by rw [eLpNorm'_eq_lintegral_enorm, lintegral_const, ENNReal.mul_rpow_of_ne_top _ (measure_ne_top μ Set.univ)] · congr rw [← ENNReal.rpow_mul] suffices hp_cancel : q * (1 / q) = 1 by rw [hp_cancel, ENNReal.rpow_one] rw [one_div, mul_inv_cancel₀ hq_ne_zero] · rw [Ne, ENNReal.rpow_eq_top_iff, not_or, not_and_or, not_and_or] simp [hc_ne_zero] theorem eLpNormEssSup_const (c : ε) (hμ : μ ≠ 0) : eLpNormEssSup (fun _ : α => c) μ = ‖c‖ₑ := by rw [eLpNormEssSup_eq_essSup_enorm, essSup_const _ hμ] theorem eLpNorm'_const_of_isProbabilityMeasure (c : ε) (hq_pos : 0 < q) [IsProbabilityMeasure μ] : eLpNorm' (fun _ : α => c) q μ = ‖c‖ₑ := by simp [eLpNorm'_const c hq_pos, measure_univ] theorem eLpNorm_const (c : ε) (h0 : p ≠ 0) (hμ : μ ≠ 0) : eLpNorm (fun _ : α => c) p μ = ‖c‖ₑ * μ Set.univ ^ (1 / ENNReal.toReal p) := by by_cases h_top : p = ∞ · simp [h_top, eLpNormEssSup_const c hμ] simp [eLpNorm_eq_eLpNorm' h0 h_top, eLpNorm'_const, ENNReal.toReal_pos h0 h_top] theorem eLpNorm_const' (c : ε) (h0 : p ≠ 0) (h_top : p ≠ ∞) : eLpNorm (fun _ : α => c) p μ = ‖c‖ₑ * μ Set.univ ^ (1 / ENNReal.toReal p) := by simp [eLpNorm_eq_eLpNorm' h0 h_top, eLpNorm'_const, ENNReal.toReal_pos h0 h_top] -- NB. If ‖c‖ₑ = ∞ and μ is finite, this claim is false: the right has side is true, -- but the left hand side is false (as the norm is infinite). theorem eLpNorm_const_lt_top_iff_enorm {c : ε''} (hc' : ‖c‖ₑ ≠ ∞) {p : ℝ≥0∞} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : eLpNorm (fun _ : α ↦ c) p μ < ∞ ↔ c = 0 ∨ μ Set.univ < ∞ := by have hp : 0 < p.toReal := ENNReal.toReal_pos hp_ne_zero hp_ne_top by_cases hμ : μ = 0 · simp only [hμ, Measure.coe_zero, Pi.zero_apply, or_true, ENNReal.zero_lt_top, eLpNorm_measure_zero] by_cases hc : c = 0 · simp only [hc, true_or, eq_self_iff_true, ENNReal.zero_lt_top, eLpNorm_zero'] rw [eLpNorm_const' c hp_ne_zero hp_ne_top] obtain hμ_top \| hμ_ne_top := eq_or_ne (μ .univ) ∞ · simp [hc, hμ_top, hp] rw [ENNReal.mul_lt_top_iff] simpa [hμ, hc, hμ_ne_top, hμ_ne_top.lt_top, hc, hc'.lt_top] using ENNReal.rpow_lt_top_of_nonneg (inv_nonneg.mpr hp.le) hμ_ne_top theorem eLpNorm_const_lt_top_iff {p : ℝ≥0∞} {c : F} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : eLpNorm (fun _ : α => c) p μ < ∞ ↔ c = 0 ∨ μ Set.univ < ∞ := eLpNorm_const_lt_top_iff_enorm enorm_ne_top hp_ne_zero hp_ne_top theorem memLp_const_enorm {c : ε'} (hc : ‖c‖ₑ ≠ ⊤) [IsFiniteMeasure μ] : MemLp (fun _ : α ↦ c) p μ := by refine ⟨aestronglyMeasurable_const, ?_⟩ by_cases h0 : p = 0 · simp [h0] by_cases hμ : μ = 0 · simp [hμ] rw [eLpNorm_const c h0 hμ] exact ENNReal.mul_lt_top hc.lt_top (ENNReal.rpow_lt_top_of_nonneg (by simp) (measure_ne_top μ Set.univ)) theorem memLp_const (c : E) [IsFiniteMeasure μ] : MemLp (fun _ : α => c) p μ := memLp_const_enorm enorm_ne_top @[deprecated (since := "2025-02-21")] alias memℒp_const := memLp_const theorem memLp_top_const_enorm {c : ε'} (hc : ‖c‖ₑ ≠ ⊤) : MemLp (fun _ : α ↦ c) ∞ μ := ⟨aestronglyMeasurable_const, by by_cases h : μ = 0 <;> simp [eLpNorm_const _, h, hc.lt_top]⟩ theorem memLp_top_const (c : E) : MemLp (fun _ : α => c) ∞ μ := memLp_top_const_enorm enorm_ne_top @[deprecated (since := "2025-02-21")] alias memℒp_top_const := memLp_top_const theorem memLp_const_iff_enorm {p : ℝ≥0∞} {c : ε''} (hc : ‖c‖ₑ ≠ ⊤) (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : MemLp (fun _ : α ↦ c) p μ ↔ c = 0 ∨ μ Set.univ < ∞ := by simp_all [MemLp, aestronglyMeasurable_const, eLpNorm_const_lt_top_iff_enorm hc hp_ne_zero hp_ne_top] theorem memLp_const_iff {p : ℝ≥0∞} {c : E} (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : MemLp (fun _ : α => c) p μ ↔ c = 0 ∨ μ Set.univ < ∞ := memLp_const_iff_enorm enorm_ne_top hp_ne_zero hp_ne_top @[deprecated (since := "2025-02-21")] alias memℒp_const_iff := memLp_const_iff end Const variable {f : α → F} lemma eLpNorm'_mono_enorm_ae {f : α → ε} {g : α → ε'} (hq : 0 ≤ q) (h : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ ‖g x‖ₑ) : eLpNorm' f q μ ≤ eLpNorm' g q μ := by simp only [eLpNorm'_eq_lintegral_enorm] gcongr ?_ ^ (1/q) refine lintegral_mono_ae (h.mono fun x hx => ?_) gcongr lemma eLpNorm'_mono_nnnorm_ae {f : α → F} {g : α → G} (hq : 0 ≤ q) (h : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ ‖g x‖₊) : eLpNorm' f q μ ≤ eLpNorm' g q μ := by simp only [eLpNorm'_eq_lintegral_enorm] gcongr ?_ ^ (1/q) refine lintegral_mono_ae (h.mono fun x hx => ?_) dsimp [enorm] gcongr theorem eLpNorm'_mono_ae {f : α → F} {g : α → G} (hq : 0 ≤ q) (h : ∀ᵐ x ∂μ, ‖f x‖ ≤ ‖g x‖) : eLpNorm' f q μ ≤ eLpNorm' g q μ := eLpNorm'_mono_enorm_ae hq (by simpa only [enorm_le_iff_norm_le] using h) theorem eLpNorm'_congr_enorm_ae {f g : α → ε} (hfg : ∀ᵐ x ∂μ, ‖f x‖ₑ = ‖g x‖ₑ) : eLpNorm' f q μ = eLpNorm' g q μ := by have : (‖f ·‖ₑ ^ q) =ᵐ[μ] (‖g ·‖ₑ ^ q) := hfg.mono fun x hx ↦ by simp [hx] simp only [eLpNorm'_eq_lintegral_enorm, lintegral_congr_ae this] theorem eLpNorm'_congr_nnnorm_ae {f g : α → F} (hfg : ∀ᵐ x ∂μ, ‖f x‖₊ = ‖g x‖₊) : eLpNorm' f q μ = eLpNorm' g q μ := by have : (‖f ·‖ₑ ^ q) =ᵐ[μ] (‖g ·‖ₑ ^ q) := hfg.mono fun x hx ↦ by simp [enorm, hx] simp only [eLpNorm'_eq_lintegral_enorm, lintegral_congr_ae this] theorem eLpNorm'_congr_norm_ae {f g : α → F} (hfg : ∀ᵐ x ∂μ, ‖f x‖ = ‖g x‖) : eLpNorm' f q μ = eLpNorm' g q μ := eLpNorm'_congr_nnnorm_ae <\| hfg.mono fun _x hx => NNReal.eq hx theorem eLpNorm'_congr_ae {f g : α → ε} (hfg : f =ᵐ[μ] g) : eLpNorm' f q μ = eLpNorm' g q μ := eLpNorm'_congr_enorm_ae (hfg.fun_comp _) theorem eLpNormEssSup_congr_ae {f g : α → ε} (hfg : f =ᵐ[μ] g) : eLpNormEssSup f μ = eLpNormEssSup g μ := essSup_congr_ae (hfg.fun_comp enorm) theorem eLpNormEssSup_mono_enorm_ae {f g : α → ε} (hfg : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ ‖g x‖ₑ) : eLpNormEssSup f μ ≤ eLpNormEssSup g μ := essSup_mono_ae <\| hfg theorem eLpNormEssSup_mono_nnnorm_ae {f g : α → F} (hfg : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ ‖g x‖₊) : eLpNormEssSup f μ ≤ eLpNormEssSup g μ := essSup_mono_ae <\| hfg.mono fun _x hx => ENNReal.coe_le_coe.mpr hx theorem eLpNorm_mono_enorm_ae {f : α → ε} {g : α → ε'} (h : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ ‖g x‖ₑ) : eLpNorm f p μ ≤ eLpNorm g p μ := by simp only [eLpNorm] split_ifs · exact le_rfl · exact essSup_mono_ae h · exact eLpNorm'_mono_enorm_ae ENNReal.toReal_nonneg h theorem eLpNorm_mono_nnnorm_ae {f : α → F} {g : α → G} (h : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ ‖g x‖₊) : eLpNorm f p μ ≤ eLpNorm g p μ := by simp only [eLpNorm] split_ifs · exact le_rfl · exact essSup_mono_ae (h.mono fun x hx => ENNReal.coe_le_coe.mpr hx) · exact eLpNorm'_mono_nnnorm_ae ENNReal.toReal_nonneg h theorem eLpNorm_mono_ae {f : α → F} {g : α → G} (h : ∀ᵐ x ∂μ, ‖f x‖ ≤ ‖g x‖) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_enorm_ae (by simpa only [enorm_le_iff_norm_le] using h) theorem eLpNorm_mono_ae' {ε' : Type} [ENorm ε'] {f : α → ε} {g : α → ε'} (h : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ ‖g x‖ₑ) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_enorm_ae (by simpa only [enorm_le_iff_norm_le] using h) theorem eLpNorm_mono_ae_real {f : α → F} {g : α → ℝ} (h : ∀ᵐ x ∂μ, ‖f x‖ ≤ g x) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_ae <\| h.mono fun _x hx => hx.trans ((le_abs_self _).trans (Real.norm_eq_abs _).symm.le) theorem eLpNorm_mono_enorm {f : α → ε} {g : α → ε'} (h : ∀ x, ‖f x‖ₑ ≤ ‖g x‖ₑ) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_enorm_ae (Eventually.of_forall h) theorem eLpNorm_mono_nnnorm {f : α → F} {g : α → G} (h : ∀ x, ‖f x‖₊ ≤ ‖g x‖₊) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_nnnorm_ae (Eventually.of_forall h) theorem eLpNorm_mono {f : α → F} {g : α → G} (h : ∀ x, ‖f x‖ ≤ ‖g x‖) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_ae (Eventually.of_forall h) theorem eLpNorm_mono_real {f : α → F} {g : α → ℝ} (h : ∀ x, ‖f x‖ ≤ g x) : eLpNorm f p μ ≤ eLpNorm g p μ := eLpNorm_mono_ae_real (Eventually.of_forall h) theorem eLpNormEssSup_le_of_ae_enorm_bound {f : α → ε} {C : ℝ≥0∞} (hfC : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ C) : eLpNormEssSup f μ ≤ C := essSup_le_of_ae_le C hfC theorem eLpNormEssSup_le_of_ae_nnnorm_bound {f : α → F} {C : ℝ≥0} (hfC : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ C) : eLpNormEssSup f μ ≤ C := essSup_le_of_ae_le (C : ℝ≥0∞) <\| hfC.mono fun _x hx => ENNReal.coe_le_coe.mpr hx theorem eLpNormEssSup_le_of_ae_bound {f : α → F} {C : ℝ} (hfC : ∀ᵐ x ∂μ, ‖f x‖ ≤ C) : eLpNormEssSup f μ ≤ ENNReal.ofReal C := eLpNormEssSup_le_of_ae_nnnorm_bound <\| hfC.mono fun _x hx => hx.trans C.le_coe_toNNReal theorem eLpNormEssSup_lt_top_of_ae_enorm_bound {f : α → ε} {C : ℝ≥0} (hfC : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ C) : eLpNormEssSup f μ < ∞ := (eLpNormEssSup_le_of_ae_enorm_bound hfC).trans_lt ENNReal.coe_lt_top theorem eLpNormEssSup_lt_top_of_ae_nnnorm_bound {f : α → F} {C : ℝ≥0} (hfC : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ C) : eLpNormEssSup f μ < ∞ := (eLpNormEssSup_le_of_ae_nnnorm_bound hfC).trans_lt ENNReal.coe_lt_top theorem eLpNormEssSup_lt_top_of_ae_bound {f : α → F} {C : ℝ} (hfC : ∀ᵐ x ∂μ, ‖f x‖ ≤ C) : eLpNormEssSup f μ < ∞ := (eLpNormEssSup_le_of_ae_bound hfC).trans_lt ENNReal.ofReal_lt_top theorem eLpNorm_le_of_ae_enorm_bound {ε} [TopologicalSpace ε] [ENormedAddMonoid ε] {f : α → ε} {C : ℝ≥0∞} (hfC : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ C) : eLpNorm f p μ ≤ C • μ Set.univ ^ p.toReal⁻¹ := by rcases eq_zero_or_neZero μ with rfl \| hμ · simp by_cases hp : p = 0 · simp [hp] have : ∀ᵐ x ∂μ, ‖f x‖ₑ ≤ ‖C‖ₑ := hfC.mono fun x hx ↦ hx.trans (Preorder.le_refl C) refine (eLpNorm_mono_enorm_ae this).trans_eq ?_ rw [eLpNorm_const _ hp (NeZero.ne μ), one_div, enorm_eq_self, smul_eq_mul] theorem eLpNorm_le_of_ae_nnnorm_bound {f : α → F} {C : ℝ≥0} (hfC : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ C) : eLpNorm f p μ ≤ C • μ Set.univ ^ p.toReal⁻¹ := by rcases eq_zero_or_neZero μ with rfl \| hμ · simp by_cases hp : p = 0 · simp [hp] have : ∀ᵐ x ∂μ, ‖f x‖₊ ≤ ‖(C : ℝ)‖₊ := hfC.mono fun x hx => hx.trans_eq C.nnnorm_eq.symm refine (eLpNorm_mono_ae this).trans_eq ?_ rw [eLpNorm_const _ hp (NeZero.ne μ), C.enorm_eq, one_div, ENNReal.smul_def, smul_eq_mul] theorem eLpNorm_le_of_ae_bound {f : α → F} {C : ℝ} (hfC : ∀ᵐ x ∂μ, ‖f x‖ ≤ C) : eLpNorm f p μ ≤ μ Set.univ ^ p.toReal⁻¹ ENNReal.ofReal C := by rw [← mul_comm] exact eLpNorm_le_of_ae_nnnorm_bound (hfC.mono fun x hx => hx.trans C.le_coe_toNNReal) theorem eLpNorm_congr_enorm_ae {f : α → ε} {g : α → ε'} (hfg : ∀ᵐ x ∂μ, ‖f x‖ₑ = ‖g x‖ₑ) : eLpNorm f p μ = eLpNorm g p μ := le_antisymm (eLpNorm_mono_enorm_ae <\| EventuallyEq.le hfg) (eLpNorm_mono_enorm_ae <\| (EventuallyEq.symm hfg).le) theorem eLpNorm_congr_nnnorm_ae {f : α → F} {g : α → G} (hfg : ∀ᵐ x ∂μ, ‖f x‖₊ = ‖g x‖₊) : eLpNorm f p μ = eLpNorm g p μ := le_antisymm (eLpNorm_mono_nnnorm_ae <\| EventuallyEq.le hfg) (eLpNorm_mono_nnnorm_ae <\| (EventuallyEq.symm hfg).le) theorem eLpNorm_congr_norm_ae {f : α → F} {g : α → G} (hfg : ∀ᵐ x ∂μ, ‖f x‖ = ‖g x‖) : eLpNorm f p μ = eLpNorm g p μ := eLpNorm_congr_nnnorm_ae <\| hfg.mono fun _x hx => NNReal.eq hx open scoped symmDiff in theorem eLpNorm_indicator_sub_indicator (s t : Set α) (f : α → E) : eLpNorm (s.indicator f - t.indicator f) p μ = eLpNorm ((s ∆ t).indicator f) p μ := eLpNorm_congr_norm_ae <\| ae_of_all _ fun x ↦ by simp [Set.apply_indicator_symmDiff norm_neg] @[simp] theorem eLpNorm'_norm {f : α → F} : eLpNorm' (fun a => ‖f a‖) q μ = eLpNorm' f q μ := by simp [eLpNorm'_eq_lintegral_enorm] @[simp] theorem eLpNorm'_enorm {f : α → ε} : eLpNorm' (fun a => ‖f a‖ₑ) q μ = eLpNorm' f q μ := by simp [eLpNorm'_eq_lintegral_enorm] @[simp] theorem eLpNorm_norm (f : α → F) : eLpNorm (fun x => ‖f x‖) p μ = eLpNorm f p μ := eLpNorm_congr_norm_ae <\| Eventually.of_forall fun _ => norm_norm _ @[simp] theorem eLpNorm_enorm (f : α → ε) : eLpNorm (fun x ↦ ‖f x‖ₑ) p μ = eLpNorm f p μ := eLpNorm_congr_enorm_ae <\| Eventually.of_forall fun _ => enorm_enorm _	theorem eLpNorm'_norm_rpow (f : α → F) (p q : ℝ) (hq_pos : 0 < q) : eLpNorm' (fun x => ‖f x‖ ^ q) p μ = eLpNorm' f (p * q) μ ^ q := by simp_rw [eLpNorm', ← ENNReal.rpow_mul, ← one_div_mul_one_div, one_div,	Mathlib/MeasureTheory/Function/LpSeminorm/Basic.lean	495	498
/- Copyright (c) 2022 Rémi Bottinelli. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Rémi Bottinelli, Junyan Xu -/ import Mathlib.Algebra.Group.Subgroup.Defs import Mathlib.CategoryTheory.Groupoid.VertexGroup import Mathlib.CategoryTheory.Groupoid.Basic import Mathlib.CategoryTheory.Groupoid import Mathlib.Data.Set.Lattice /-! # Subgroupoid This file defines subgroupoids as `structure`s containing the subsets of arrows and their stability under composition and inversion. Also defined are: * containment of subgroupoids is a complete lattice; * images and preimages of subgroupoids under a functor; * the notion of normality of subgroupoids and its stability under intersection and preimage; * compatibility of the above with `CategoryTheory.Groupoid.vertexGroup`. ## Main definitions Given a type `C` with associated `groupoid C` instance. * `CategoryTheory.Subgroupoid C` is the type of subgroupoids of `C` * `CategoryTheory.Subgroupoid.IsNormal` is the property that the subgroupoid is stable under conjugation by arbitrary arrows, _and_ that all identity arrows are contained in the subgroupoid. * `CategoryTheory.Subgroupoid.comap` is the "preimage" map of subgroupoids along a functor. * `CategoryTheory.Subgroupoid.map` is the "image" map of subgroupoids along a functor _injective on objects_. * `CategoryTheory.Subgroupoid.vertexSubgroup` is the subgroup of the vertex group at a given vertex `v`, assuming `v` is contained in the `CategoryTheory.Subgroupoid` (meaning, by definition, that the arrow `𝟙 v` is contained in the subgroupoid). ## Implementation details The structure of this file is copied from/inspired by `Mathlib/GroupTheory/Subgroup/Basic.lean` and `Mathlib/Combinatorics/SimpleGraph/Subgraph.lean`. ## TODO * Equivalent inductive characterization of generated (normal) subgroupoids. * Characterization of normal subgroupoids as kernels. * Prove that `CategoryTheory.Subgroupoid.full` and `CategoryTheory.Subgroupoid.disconnect` preserve intersections (and `CategoryTheory.Subgroupoid.disconnect` also unions) ## Tags category theory, groupoid, subgroupoid -/ namespace CategoryTheory open Set Groupoid universe u v variable {C : Type u} [Groupoid C] /-- A sugroupoid of `C` consists of a choice of arrows for each pair of vertices, closed under composition and inverses. -/ @[ext] structure Subgroupoid (C : Type u) [Groupoid C] where /-- The arrow choice for each pair of vertices -/ arrows : ∀ c d : C, Set (c ⟶ d) protected inv : ∀ {c d} {p : c ⟶ d}, p ∈ arrows c d → Groupoid.inv p ∈ arrows d c protected mul : ∀ {c d e} {p}, p ∈ arrows c d → ∀ {q}, q ∈ arrows d e → p ≫ q ∈ arrows c e namespace Subgroupoid variable (S : Subgroupoid C) theorem inv_mem_iff {c d : C} (f : c ⟶ d) : Groupoid.inv f ∈ S.arrows d c ↔ f ∈ S.arrows c d := by constructor · intro h simpa only [inv_eq_inv, IsIso.inv_inv] using S.inv h · apply S.inv theorem mul_mem_cancel_left {c d e : C} {f : c ⟶ d} {g : d ⟶ e} (hf : f ∈ S.arrows c d) : f ≫ g ∈ S.arrows c e ↔ g ∈ S.arrows d e := by constructor · rintro h suffices Groupoid.inv f ≫ f ≫ g ∈ S.arrows d e by simpa only [inv_eq_inv, IsIso.inv_hom_id_assoc] using this apply S.mul (S.inv hf) h · apply S.mul hf theorem mul_mem_cancel_right {c d e : C} {f : c ⟶ d} {g : d ⟶ e} (hg : g ∈ S.arrows d e) : f ≫ g ∈ S.arrows c e ↔ f ∈ S.arrows c d := by constructor · rintro h suffices (f ≫ g) ≫ Groupoid.inv g ∈ S.arrows c d by simpa only [inv_eq_inv, IsIso.hom_inv_id, Category.comp_id, Category.assoc] using this apply S.mul h (S.inv hg) · exact fun hf => S.mul hf hg /-- The vertices of `C` on which `S` has non-trivial isotropy -/ def objs : Set C := {c : C \| (S.arrows c c).Nonempty} theorem mem_objs_of_src {c d : C} {f : c ⟶ d} (h : f ∈ S.arrows c d) : c ∈ S.objs := ⟨f ≫ Groupoid.inv f, S.mul h (S.inv h)⟩ theorem mem_objs_of_tgt {c d : C} {f : c ⟶ d} (h : f ∈ S.arrows c d) : d ∈ S.objs := ⟨Groupoid.inv f ≫ f, S.mul (S.inv h) h⟩ theorem id_mem_of_nonempty_isotropy (c : C) : c ∈ objs S → 𝟙 c ∈ S.arrows c c := by rintro ⟨γ, hγ⟩ convert S.mul hγ (S.inv hγ) simp only [inv_eq_inv, IsIso.hom_inv_id] theorem id_mem_of_src {c d : C} {f : c ⟶ d} (h : f ∈ S.arrows c d) : 𝟙 c ∈ S.arrows c c := id_mem_of_nonempty_isotropy S c (mem_objs_of_src S h) theorem id_mem_of_tgt {c d : C} {f : c ⟶ d} (h : f ∈ S.arrows c d) : 𝟙 d ∈ S.arrows d d := id_mem_of_nonempty_isotropy S d (mem_objs_of_tgt S h) /-- A subgroupoid seen as a quiver on vertex set `C` -/ def asWideQuiver : Quiver C := ⟨fun c d => Subtype <\| S.arrows c d⟩ /-- The coercion of a subgroupoid as a groupoid -/ @[simps comp_coe, simps -isSimp inv_coe] instance coe : Groupoid S.objs where Hom a b := S.arrows a.val b.val id a := ⟨𝟙 a.val, id_mem_of_nonempty_isotropy S a.val a.prop⟩ comp p q := ⟨p.val ≫ q.val, S.mul p.prop q.prop⟩ inv p := ⟨Groupoid.inv p.val, S.inv p.prop⟩ @[simp] theorem coe_inv_coe' {c d : S.objs} (p : c ⟶ d) : (CategoryTheory.inv p).val = CategoryTheory.inv p.val := by simp only [← inv_eq_inv, coe_inv_coe] /-- The embedding of the coerced subgroupoid to its parent -/ def hom : S.objs ⥤ C where obj c := c.val map f := f.val map_id _ := rfl map_comp _ _ := rfl theorem hom.inj_on_objects : Function.Injective (hom S).obj := by rintro ⟨c, hc⟩ ⟨d, hd⟩ hcd simp only [Subtype.mk_eq_mk]; exact hcd theorem hom.faithful : ∀ c d, Function.Injective fun f : c ⟶ d => (hom S).map f := by rintro ⟨c, hc⟩ ⟨d, hd⟩ ⟨f, hf⟩ ⟨g, hg⟩ hfg; exact Subtype.eq hfg /-- The subgroup of the vertex group at `c` given by the subgroupoid -/ def vertexSubgroup {c : C} (hc : c ∈ S.objs) : Subgroup (c ⟶ c) where carrier := S.arrows c c mul_mem' hf hg := S.mul hf hg one_mem' := id_mem_of_nonempty_isotropy _ _ hc inv_mem' hf := S.inv hf /-- The set of all arrows of a subgroupoid, as a set in `Σ c d : C, c ⟶ d`. -/ @[coe] def toSet (S : Subgroupoid C) : Set (Σ c d : C, c ⟶ d) := {F \| F.2.2 ∈ S.arrows F.1 F.2.1} instance : SetLike (Subgroupoid C) (Σ c d : C, c ⟶ d) where coe := toSet coe_injective' := fun ⟨S, _, _⟩ ⟨T, _, _⟩ h => by ext c d f; apply Set.ext_iff.1 h ⟨c, d, f⟩ theorem mem_iff (S : Subgroupoid C) (F : Σ c d, c ⟶ d) : F ∈ S ↔ F.2.2 ∈ S.arrows F.1 F.2.1 := Iff.rfl theorem le_iff (S T : Subgroupoid C) : S ≤ T ↔ ∀ {c d}, S.arrows c d ⊆ T.arrows c d := by rw [SetLike.le_def, Sigma.forall]; exact forall_congr' fun c => Sigma.forall instance : Top (Subgroupoid C) := ⟨{ arrows := fun _ _ => Set.univ mul := by intros; trivial inv := by intros; trivial }⟩ theorem mem_top {c d : C} (f : c ⟶ d) : f ∈ (⊤ : Subgroupoid C).arrows c d := trivial theorem mem_top_objs (c : C) : c ∈ (⊤ : Subgroupoid C).objs := by dsimp [Top.top, objs] simp only [univ_nonempty] instance : Bot (Subgroupoid C) := ⟨{ arrows := fun _ _ => ∅ mul := False.elim inv := False.elim }⟩	instance : Inhabited (Subgroupoid C) := ⟨⊤⟩	Mathlib/CategoryTheory/Groupoid/Subgroupoid.lean	194	195
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Algebra.BigOperators.Group.Multiset.Basic /-! # Bind operation for multisets This file defines a few basic operations on `Multiset`, notably the monadic bind. ## Main declarations * `Multiset.join`: The join, aka union or sum, of multisets. * `Multiset.bind`: The bind of a multiset-indexed family of multisets. * `Multiset.product`: Cartesian product of two multisets. * `Multiset.sigma`: Disjoint sum of multisets in a sigma type. -/ assert_not_exists MonoidWithZero MulAction universe v variable {α : Type} {β : Type v} {γ δ : Type} namespace Multiset /-! ### Join -/ /-- `join S`, where `S` is a multiset of multisets, is the lift of the list join operation, that is, the union of all the sets. join {{1, 2}, {1, 2}, {0, 1}} = {0, 1, 1, 1, 2, 2} -/ def join : Multiset (Multiset α) → Multiset α := sum theorem coe_join : ∀ L : List (List α), join (L.map ((↑) : List α → Multiset α) : Multiset (Multiset α)) = L.flatten \| [] => rfl \| l :: L => by exact congr_arg (fun s : Multiset α => ↑l + s) (coe_join L) @[simp] theorem join_zero : @join α 0 = 0 := rfl @[simp] theorem join_cons (s S) : @join α (s ::ₘ S) = s + join S := sum_cons _ _ @[simp] theorem join_add (S T) : @join α (S + T) = join S + join T := sum_add _ _ @[simp] theorem singleton_join (a) : join ({a} : Multiset (Multiset α)) = a := sum_singleton _ @[simp] theorem mem_join {a S} : a ∈ @join α S ↔ ∃ s ∈ S, a ∈ s := Multiset.induction_on S (by simp) <\| by simp +contextual [or_and_right, exists_or] @[simp] theorem card_join (S) : card (@join α S) = sum (map card S) := Multiset.induction_on S (by simp) (by simp) @[simp] theorem map_join (f : α → β) (S : Multiset (Multiset α)) : map f (join S) = join (map (map f) S) := by induction S using Multiset.induction with \| empty => simp \| cons _ _ ih => simp [ih] @[to_additive (attr := simp)] theorem prod_join [CommMonoid α] {S : Multiset (Multiset α)} : prod (join S) = prod (map prod S) := by induction S using Multiset.induction with \| empty => simp \| cons _ _ ih => simp [ih]	theorem rel_join {r : α → β → Prop} {s t} (h : Rel (Rel r) s t) : Rel r s.join t.join := by induction h with \| zero => simp \| cons hab hst ih => simpa using hab.add ih	Mathlib/Data/Multiset/Bind.lean	82	86
/- Copyright (c) 2020 Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Zhouhang Zhou -/ import Mathlib.Algebra.Group.Pi.Lemmas import Mathlib.Algebra.Group.Support import Mathlib.Data.Set.SymmDiff /-! # Indicator function - `Set.indicator (s : Set α) (f : α → β) (a : α)` is `f a` if `a ∈ s` and is `0` otherwise. - `Set.mulIndicator (s : Set α) (f : α → β) (a : α)` is `f a` if `a ∈ s` and is `1` otherwise. ## Implementation note In mathematics, an indicator function or a characteristic function is a function used to indicate membership of an element in a set `s`, having the value `1` for all elements of `s` and the value `0` otherwise. But since it is usually used to restrict a function to a certain set `s`, we let the indicator function take the value `f x` for some function `f`, instead of `1`. If the usual indicator function is needed, just set `f` to be the constant function `fun _ ↦ 1`. The indicator function is implemented non-computably, to avoid having to pass around `Decidable` arguments. This is in contrast with the design of `Pi.single` or `Set.piecewise`. ## Tags indicator, characteristic -/ assert_not_exists MonoidWithZero open Function variable {α β M N : Type} namespace Set section One variable [One M] [One N] {s t : Set α} {f g : α → M} {a : α} /-- `Set.mulIndicator s f a` is `f a` if `a ∈ s`, `1` otherwise. -/ @[to_additive "`Set.indicator s f a` is `f a` if `a ∈ s`, `0` otherwise."] noncomputable def mulIndicator (s : Set α) (f : α → M) (x : α) : M := haveI := Classical.decPred (· ∈ s) if x ∈ s then f x else 1 @[to_additive (attr := simp)] theorem piecewise_eq_mulIndicator [DecidablePred (· ∈ s)] : s.piecewise f 1 = s.mulIndicator f := funext fun _ => @if_congr _ _ _ _ (id _) _ _ _ _ Iff.rfl rfl rfl @[to_additive] theorem mulIndicator_apply (s : Set α) (f : α → M) (a : α) [Decidable (a ∈ s)] : mulIndicator s f a = if a ∈ s then f a else 1 := by unfold mulIndicator congr @[to_additive (attr := simp)] theorem mulIndicator_of_mem (h : a ∈ s) (f : α → M) : mulIndicator s f a = f a := if_pos h @[to_additive (attr := simp)] theorem mulIndicator_of_not_mem (h : a ∉ s) (f : α → M) : mulIndicator s f a = 1 := if_neg h @[to_additive] theorem mulIndicator_eq_one_or_self (s : Set α) (f : α → M) (a : α) : mulIndicator s f a = 1 ∨ mulIndicator s f a = f a := by by_cases h : a ∈ s · exact Or.inr (mulIndicator_of_mem h f) · exact Or.inl (mulIndicator_of_not_mem h f) @[to_additive (attr := simp)] theorem mulIndicator_apply_eq_self : s.mulIndicator f a = f a ↔ a ∉ s → f a = 1 := letI := Classical.dec (a ∈ s) ite_eq_left_iff.trans (by rw [@eq_comm _ (f a)]) @[to_additive (attr := simp)] theorem mulIndicator_eq_self : s.mulIndicator f = f ↔ mulSupport f ⊆ s := by simp only [funext_iff, subset_def, mem_mulSupport, mulIndicator_apply_eq_self, not_imp_comm] @[to_additive] theorem mulIndicator_eq_self_of_superset (h1 : s.mulIndicator f = f) (h2 : s ⊆ t) : t.mulIndicator f = f := by rw [mulIndicator_eq_self] at h1 ⊢ exact Subset.trans h1 h2 @[to_additive (attr := simp)] theorem mulIndicator_apply_eq_one : mulIndicator s f a = 1 ↔ a ∈ s → f a = 1 := letI := Classical.dec (a ∈ s) ite_eq_right_iff @[to_additive (attr := simp)] theorem mulIndicator_eq_one : (mulIndicator s f = fun _ => 1) ↔ Disjoint (mulSupport f) s := by simp only [funext_iff, mulIndicator_apply_eq_one, Set.disjoint_left, mem_mulSupport, not_imp_not] @[to_additive (attr := simp)] theorem mulIndicator_eq_one' : mulIndicator s f = 1 ↔ Disjoint (mulSupport f) s := mulIndicator_eq_one @[to_additive] theorem mulIndicator_apply_ne_one {a : α} : s.mulIndicator f a ≠ 1 ↔ a ∈ s ∩ mulSupport f := by simp only [Ne, mulIndicator_apply_eq_one, Classical.not_imp, mem_inter_iff, mem_mulSupport] @[to_additive (attr := simp)] theorem mulSupport_mulIndicator : Function.mulSupport (s.mulIndicator f) = s ∩ Function.mulSupport f := ext fun x => by simp [Function.mem_mulSupport, mulIndicator_apply_eq_one] /-- If a multiplicative indicator function is not equal to `1` at a point, then that point is in the set. -/ @[to_additive "If an additive indicator function is not equal to `0` at a point, then that point is in the set."] theorem mem_of_mulIndicator_ne_one (h : mulIndicator s f a ≠ 1) : a ∈ s := not_imp_comm.1 (fun hn => mulIndicator_of_not_mem hn f) h /-- See `Set.eqOn_mulIndicator'` for the version with `sᶜ`. -/ @[to_additive "See `Set.eqOn_indicator'` for the version with `sᶜ`"] theorem eqOn_mulIndicator : EqOn (mulIndicator s f) f s := fun _ hx => mulIndicator_of_mem hx f /-- See `Set.eqOn_mulIndicator` for the version with `s`. -/ @[to_additive "See `Set.eqOn_indicator` for the version with `s`."] theorem eqOn_mulIndicator' : EqOn (mulIndicator s f) 1 sᶜ := fun _ hx => mulIndicator_of_not_mem hx f @[to_additive] theorem mulSupport_mulIndicator_subset : mulSupport (s.mulIndicator f) ⊆ s := fun _ hx => hx.imp_symm fun h => mulIndicator_of_not_mem h f @[to_additive (attr := simp)] theorem mulIndicator_mulSupport : mulIndicator (mulSupport f) f = f := mulIndicator_eq_self.2 Subset.rfl @[to_additive (attr := simp)] theorem mulIndicator_range_comp {ι : Sort} (f : ι → α) (g : α → M) : mulIndicator (range f) g ∘ f = g ∘ f := letI := Classical.decPred (· ∈ range f) piecewise_range_comp _ _ _ @[to_additive] theorem mulIndicator_congr (h : EqOn f g s) : mulIndicator s f = mulIndicator s g := funext fun x => by simp only [mulIndicator] split_ifs with h_1 · exact h h_1 rfl @[to_additive] theorem mulIndicator_eq_mulIndicator {t : Set β} {g : β → M} {b : β} (h1 : a ∈ s ↔ b ∈ t) (h2 : f a = g b) : s.mulIndicator f a = t.mulIndicator g b := by by_cases a ∈ s <;> simp_all @[to_additive] theorem mulIndicator_const_eq_mulIndicator_const {t : Set β} {b : β} {c : M} (h : a ∈ s ↔ b ∈ t) : s.mulIndicator (fun _ ↦ c) a = t.mulIndicator (fun _ ↦ c) b := mulIndicator_eq_mulIndicator h rfl @[to_additive (attr := simp)] theorem mulIndicator_univ (f : α → M) : mulIndicator (univ : Set α) f = f := mulIndicator_eq_self.2 <\| subset_univ _ @[to_additive (attr := simp)] theorem mulIndicator_empty (f : α → M) : mulIndicator (∅ : Set α) f = fun _ => 1 := mulIndicator_eq_one.2 <\| disjoint_empty _ @[to_additive] theorem mulIndicator_empty' (f : α → M) : mulIndicator (∅ : Set α) f = 1 := mulIndicator_empty f variable (M) @[to_additive (attr := simp)] theorem mulIndicator_one (s : Set α) : (mulIndicator s fun _ => (1 : M)) = fun _ => (1 : M) := mulIndicator_eq_one.2 <\| by simp only [mulSupport_one, empty_disjoint] @[to_additive (attr := simp)] theorem mulIndicator_one' {s : Set α} : s.mulIndicator (1 : α → M) = 1 := mulIndicator_one M s variable {M} @[to_additive] theorem mulIndicator_mulIndicator (s t : Set α) (f : α → M) : mulIndicator s (mulIndicator t f) = mulIndicator (s ∩ t) f := funext fun x => by simp only [mulIndicator] split_ifs <;> simp_all +contextual @[to_additive (attr := simp)] theorem mulIndicator_inter_mulSupport (s : Set α) (f : α → M) : mulIndicator (s ∩ mulSupport f) f = mulIndicator s f := by rw [← mulIndicator_mulIndicator, mulIndicator_mulSupport] @[to_additive] theorem comp_mulIndicator (h : M → β) (f : α → M) {s : Set α} {x : α} [DecidablePred (· ∈ s)] : h (s.mulIndicator f x) = s.piecewise (h ∘ f) (const α (h 1)) x := by letI := Classical.decPred (· ∈ s) convert s.apply_piecewise f (const α 1) (fun _ => h) (x := x) using 2 @[to_additive] theorem mulIndicator_comp_right {s : Set α} (f : β → α) {g : α → M} {x : β} : mulIndicator (f ⁻¹' s) (g ∘ f) x = mulIndicator s g (f x) := by simp only [mulIndicator, Function.comp] split_ifs with h h' h'' <;> first \| rfl \| contradiction @[to_additive] theorem mulIndicator_image {s : Set α} {f : β → M} {g : α → β} (hg : Injective g) {x : α} : mulIndicator (g '' s) f (g x) = mulIndicator s (f ∘ g) x := by rw [← mulIndicator_comp_right, preimage_image_eq _ hg] @[to_additive] theorem mulIndicator_comp_of_one {g : M → N} (hg : g 1 = 1) : mulIndicator s (g ∘ f) = g ∘ mulIndicator s f := by funext simp only [mulIndicator] split_ifs <;> simp [] @[to_additive] theorem comp_mulIndicator_const (c : M) (f : M → N) (hf : f 1 = 1) : (fun x => f (s.mulIndicator (fun _ => c) x)) = s.mulIndicator fun _ => f c := (mulIndicator_comp_of_one hf).symm @[to_additive] theorem mulIndicator_preimage (s : Set α) (f : α → M) (B : Set M) : mulIndicator s f ⁻¹' B = s.ite (f ⁻¹' B) (1 ⁻¹' B) := letI := Classical.decPred (· ∈ s) piecewise_preimage s f 1 B @[to_additive] theorem mulIndicator_one_preimage (s : Set M) : t.mulIndicator 1 ⁻¹' s ∈ ({Set.univ, ∅} : Set (Set α)) := by classical rw [mulIndicator_one', preimage_one] split_ifs <;> simp @[to_additive] theorem mulIndicator_const_preimage_eq_union (U : Set α) (s : Set M) (a : M) [Decidable (a ∈ s)] [Decidable ((1 : M) ∈ s)] : (U.mulIndicator fun _ => a) ⁻¹' s = (if a ∈ s then U else ∅) ∪ if (1 : M) ∈ s then Uᶜ else ∅ := by rw [mulIndicator_preimage, preimage_one, preimage_const] split_ifs <;> simp [← compl_eq_univ_diff] @[to_additive] theorem mulIndicator_const_preimage (U : Set α) (s : Set M) (a : M) : (U.mulIndicator fun _ => a) ⁻¹' s ∈ ({Set.univ, U, Uᶜ, ∅} : Set (Set α)) := by classical rw [mulIndicator_const_preimage_eq_union] split_ifs <;> simp theorem indicator_one_preimage [Zero M] (U : Set α) (s : Set M) : U.indicator 1 ⁻¹' s ∈ ({Set.univ, U, Uᶜ, ∅} : Set (Set α)) := indicator_const_preimage _ _ 1 @[to_additive] theorem mulIndicator_preimage_of_not_mem (s : Set α) (f : α → M) {t : Set M} (ht : (1 : M) ∉ t) : mulIndicator s f ⁻¹' t = f ⁻¹' t ∩ s := by simp [mulIndicator_preimage, Pi.one_def, Set.preimage_const_of_not_mem ht] @[to_additive] theorem mem_range_mulIndicator {r : M} {s : Set α} {f : α → M} : r ∈ range (mulIndicator s f) ↔ r = 1 ∧ s ≠ univ ∨ r ∈ f '' s := by simp [mulIndicator, ite_eq_iff, exists_or, eq_univ_iff_forall, and_comm, or_comm, @eq_comm _ r 1] @[to_additive] theorem mulIndicator_rel_mulIndicator {r : M → M → Prop} (h1 : r 1 1) (ha : a ∈ s → r (f a) (g a)) : r (mulIndicator s f a) (mulIndicator s g a) := by simp only [mulIndicator] split_ifs with has exacts [ha has, h1] end One section Monoid variable [MulOneClass M] {s t : Set α} {a : α} @[to_additive] theorem mulIndicator_union_mul_inter_apply (f : α → M) (s t : Set α) (a : α) : mulIndicator (s ∪ t) f a mulIndicator (s ∩ t) f a = mulIndicator s f a * mulIndicator t f a := by by_cases hs : a ∈ s <;> by_cases ht : a ∈ t <;> simp [] @[to_additive] theorem mulIndicator_union_mul_inter (f : α → M) (s t : Set α) : mulIndicator (s ∪ t) f mulIndicator (s ∩ t) f = mulIndicator s f * mulIndicator t f := funext <\| mulIndicator_union_mul_inter_apply f s t @[to_additive] theorem mulIndicator_union_of_not_mem_inter (h : a ∉ s ∩ t) (f : α → M) : mulIndicator (s ∪ t) f a = mulIndicator s f a * mulIndicator t f a := by rw [← mulIndicator_union_mul_inter_apply f s t, mulIndicator_of_not_mem h, mul_one] @[to_additive] theorem mulIndicator_union_of_disjoint (h : Disjoint s t) (f : α → M) : mulIndicator (s ∪ t) f = fun a => mulIndicator s f a * mulIndicator t f a := funext fun _ => mulIndicator_union_of_not_mem_inter (fun ha => h.le_bot ha) _ open scoped symmDiff in @[to_additive] theorem mulIndicator_symmDiff (s t : Set α) (f : α → M) : mulIndicator (s ∆ t) f = mulIndicator (s \ t) f * mulIndicator (t \ s) f := mulIndicator_union_of_disjoint (disjoint_sdiff_self_right.mono_left sdiff_le) _ @[to_additive] theorem mulIndicator_mul (s : Set α) (f g : α → M) : (mulIndicator s fun a => f a * g a) = fun a => mulIndicator s f a * mulIndicator s g a := by funext simp only [mulIndicator] split_ifs · rfl rw [mul_one] @[to_additive] theorem mulIndicator_mul' (s : Set α) (f g : α → M) : mulIndicator s (f * g) = mulIndicator s f * mulIndicator s g := mulIndicator_mul s f g @[to_additive (attr := simp)] theorem mulIndicator_compl_mul_self_apply (s : Set α) (f : α → M) (a : α) : mulIndicator sᶜ f a * mulIndicator s f a = f a := by_cases (fun ha : a ∈ s => by simp [ha]) fun ha => by simp [ha] @[to_additive (attr := simp)]	theorem mulIndicator_compl_mul_self (s : Set α) (f : α → M) : mulIndicator sᶜ f * mulIndicator s f = f := funext <\| mulIndicator_compl_mul_self_apply s f @[to_additive (attr := simp)]	Mathlib/Algebra/Group/Indicator.lean	333	337
/- 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 section DivisionMonoid variable [DivisionMonoid α] [HasDistribNeg α] {a : α} {n : ℤ} lemma Even.neg_zpow : Even n → ∀ a : α, (-a) ^ n = a ^ n := by rintro ⟨c, rfl⟩ a; simp_rw [← Int.two_mul, zpow_mul, zpow_two, neg_mul_neg] lemma Even.neg_one_zpow (h : Even n) : (-1 : α) ^ n = 1 := by rw [h.neg_zpow, one_zpow] end DivisionMonoid @[simp] lemma IsSquare.zero [MulZeroClass α] : IsSquare (0 : α) := ⟨0, (mul_zero _).symm⟩ section Semiring variable [Semiring α] [Semiring β] {a b : α} {m n : ℕ} lemma even_iff_exists_two_mul : Even a ↔ ∃ b, a = 2 b := by simp [even_iff_exists_two_nsmul] lemma even_iff_two_dvd : Even a ↔ 2 ∣ a := by simp [Even, Dvd.dvd, two_mul] alias ⟨Even.two_dvd, _⟩ := even_iff_two_dvd lemma Even.trans_dvd (ha : Even a) (hab : a ∣ b) : Even b := even_iff_two_dvd.2 <\| ha.two_dvd.trans hab lemma Dvd.dvd.even (hab : a ∣ b) (ha : Even a) : Even b := ha.trans_dvd hab @[simp] lemma range_two_mul (α) [NonAssocSemiring α] : Set.range (fun x : α ↦ 2 * x) = {a \| Even a} := by ext x simp [eq_comm, two_mul, Even] @[simp] lemma even_two : Even (2 : α) := ⟨1, by rw [one_add_one_eq_two]⟩ @[simp] lemma Even.mul_left (ha : Even a) (b) : Even (b * a) := ha.map (AddMonoidHom.mulLeft _) @[simp] lemma Even.mul_right (ha : Even a) (b) : Even (a * b) := ha.map (AddMonoidHom.mulRight _) lemma even_two_mul (a : α) : Even (2 * a) := ⟨a, two_mul _⟩ lemma Even.pow_of_ne_zero (ha : Even a) : ∀ {n : ℕ}, n ≠ 0 → Even (a ^ n) \| n + 1, _ => by rw [pow_succ]; exact ha.mul_left _ /-- An element `a` of a semiring is odd if there exists `k` such `a = 2k + 1`. -/ def Odd (a : α) : Prop := ∃ k, a = 2 k + 1 lemma odd_iff_exists_bit1 : Odd a ↔ ∃ b, a = 2 * b + 1 := exists_congr fun b ↦ by rw [two_mul] alias ⟨Odd.exists_bit1, _⟩ := odd_iff_exists_bit1 @[simp] lemma range_two_mul_add_one (α : Type) [Semiring α] : Set.range (fun x : α ↦ 2 x + 1) = {a \| Odd a} := by ext x; simp [Odd, eq_comm] lemma Even.add_odd : Even a → Odd b → Odd (a + b) := by rintro ⟨a, rfl⟩ ⟨b, rfl⟩; exact ⟨a + b, by rw [mul_add, ← two_mul, add_assoc]⟩ lemma Even.odd_add (ha : Even a) (hb : Odd b) : Odd (b + a) := add_comm a b ▸ ha.add_odd hb lemma Odd.add_even (ha : Odd a) (hb : Even b) : Odd (a + b) := add_comm a b ▸ hb.add_odd ha lemma Odd.add_odd : Odd a → Odd b → Even (a + b) := by rintro ⟨a, rfl⟩ ⟨b, rfl⟩ refine ⟨a + b + 1, ?_⟩ rw [two_mul, two_mul] ac_rfl @[simp] lemma odd_one : Odd (1 : α) := ⟨0, (zero_add _).symm.trans (congr_arg (· + (1 : α)) (mul_zero _).symm)⟩ @[simp] lemma Even.add_one (h : Even a) : Odd (a + 1) := h.add_odd odd_one @[simp] lemma Even.one_add (h : Even a) : Odd (1 + a) := h.odd_add odd_one @[simp] lemma Odd.add_one (h : Odd a) : Even (a + 1) := h.add_odd odd_one @[simp] lemma Odd.one_add (h : Odd a) : Even (1 + a) := odd_one.add_odd h lemma odd_two_mul_add_one (a : α) : Odd (2 * a + 1) := ⟨_, rfl⟩ @[simp] lemma odd_add_self_one' : Odd (a + (a + 1)) := by simp [← add_assoc] @[simp] lemma odd_add_one_self : Odd (a + 1 + a) := by simp [add_comm _ a] @[simp] lemma odd_add_one_self' : Odd (a + (1 + a)) := by simp [add_comm 1 a] lemma Odd.map [FunLike F α β] [RingHomClass F α β] (f : F) : Odd a → Odd (f a) := by rintro ⟨a, rfl⟩; exact ⟨f a, by simp [two_mul]⟩ lemma Odd.natCast {R : Type} [Semiring R] {n : ℕ} (hn : Odd n) : Odd (n : R) := hn.map <\| Nat.castRingHom R @[simp] lemma Odd.mul : Odd a → Odd b → Odd (a b) := by rintro ⟨a, rfl⟩ ⟨b, rfl⟩ refine ⟨2 * a * b + b + a, ?_⟩ rw [mul_add, add_mul, mul_one, ← add_assoc, one_mul, mul_assoc, ← mul_add, ← mul_add, ← mul_assoc, ← Nat.cast_two, ← Nat.cast_comm] lemma Odd.pow (ha : Odd a) : ∀ {n : ℕ}, Odd (a ^ n) \| 0 => by rw [pow_zero] exact odd_one \| n + 1 => by rw [pow_succ]; exact ha.pow.mul ha lemma Odd.pow_add_pow_eq_zero [IsCancelAdd α] (hn : Odd n) (hab : a + b = 0) : a ^ n + b ^ n = 0 := by obtain ⟨k, rfl⟩ := hn induction k with \| zero => simpa \| succ k ih => ?_ have : a ^ 2 = b ^ 2 := add_right_cancel <\| calc a ^ 2 + a * b = 0 := by rw [sq, ← mul_add, hab, mul_zero] _ = b ^ 2 + a * b := by rw [sq, ← add_mul, add_comm, hab, zero_mul] refine add_right_cancel (b := b ^ (2 * k + 1) * a ^ 2) ?_ calc _ = (a ^ (2 * k + 1) + b ^ (2 * k + 1)) * a ^ 2 + b ^ (2 * k + 3) := by rw [add_mul, ← pow_add, add_right_comm]; rfl _ = _ := by rw [ih, zero_mul, zero_add, zero_add, this, ← pow_add] end Semiring section Monoid variable [Monoid α] [HasDistribNeg α] {n : ℕ} lemma Odd.neg_pow : Odd n → ∀ a : α, (-a) ^ n = -a ^ n := by rintro ⟨c, rfl⟩ a; simp_rw [pow_add, pow_mul, neg_sq, pow_one, mul_neg] @[simp] lemma Odd.neg_one_pow (h : Odd n) : (-1 : α) ^ n = -1 := by rw [h.neg_pow, one_pow] end Monoid section Ring variable [Ring α] {a b : α} {n : ℕ} lemma even_neg_two : Even (-2 : α) := by simp only [even_neg, even_two] lemma Odd.neg (hp : Odd a) : Odd (-a) := by obtain ⟨k, hk⟩ := hp use -(k + 1) rw [mul_neg, mul_add, neg_add, add_assoc, two_mul (1 : α), neg_add, neg_add_cancel_right, ← neg_add, hk] @[simp] lemma odd_neg : Odd (-a) ↔ Odd a := ⟨fun h ↦ neg_neg a ▸ h.neg, Odd.neg⟩ lemma odd_neg_one : Odd (-1 : α) := by simp lemma Odd.sub_even (ha : Odd a) (hb : Even b) : Odd (a - b) := by rw [sub_eq_add_neg]; exact ha.add_even hb.neg lemma Even.sub_odd (ha : Even a) (hb : Odd b) : Odd (a - b) := by rw [sub_eq_add_neg]; exact ha.add_odd hb.neg lemma Odd.sub_odd (ha : Odd a) (hb : Odd b) : Even (a - b) := by rw [sub_eq_add_neg]; exact ha.add_odd hb.neg end Ring namespace Nat variable {m n : ℕ} lemma odd_iff : Odd n ↔ n % 2 = 1 := ⟨fun ⟨m, hm⟩ ↦ by omega, fun h ↦ ⟨n / 2, (mod_add_div n 2).symm.trans (by rw [h, add_comm])⟩⟩ instance : DecidablePred (Odd : ℕ → Prop) := fun _ ↦ decidable_of_iff _ odd_iff.symm lemma not_odd_iff : ¬Odd n ↔ n % 2 = 0 := by rw [odd_iff, mod_two_not_eq_one] @[simp] lemma not_odd_iff_even : ¬Odd n ↔ Even n := by rw [not_odd_iff, even_iff] @[simp] lemma not_even_iff_odd : ¬Even n ↔ Odd n := by rw [not_even_iff, odd_iff] @[simp] lemma not_odd_zero : ¬Odd 0 := not_odd_iff.mpr rfl lemma _root_.Odd.not_two_dvd_nat (h : Odd n) : ¬(2 ∣ n) := by rwa [← even_iff_two_dvd, not_even_iff_odd] lemma even_xor_odd (n : ℕ) : Xor' (Even n) (Odd n) := by simp [Xor', ← not_even_iff_odd, Decidable.em (Even n)] lemma even_or_odd (n : ℕ) : Even n ∨ Odd n := (even_xor_odd n).or lemma even_or_odd' (n : ℕ) : ∃ k, n = 2 * k ∨ n = 2 * k + 1 := by simpa only [← two_mul, exists_or, Odd, Even] using even_or_odd n lemma even_xor_odd' (n : ℕ) : ∃ k, Xor' (n = 2 * k) (n = 2 * k + 1) := by obtain ⟨k, rfl⟩ \| ⟨k, rfl⟩ := even_or_odd n <;> use k · simpa only [← two_mul, eq_self_iff_true, xor_true] using (succ_ne_self (2 * k)).symm · simpa only [xor_true, xor_comm] using (succ_ne_self _) lemma odd_add_one {n : ℕ} : Odd (n + 1) ↔ ¬ Odd n := by rw [← not_even_iff_odd, Nat.even_add_one, not_even_iff_odd] lemma mod_two_add_add_odd_mod_two (m : ℕ) {n : ℕ} (hn : Odd n) : m % 2 + (m + n) % 2 = 1 := ((even_or_odd m).elim fun hm ↦ by rw [even_iff.1 hm, odd_iff.1 (hm.add_odd hn)]) fun hm ↦ by rw [odd_iff.1 hm, even_iff.1 (hm.add_odd hn)] @[simp] lemma mod_two_add_succ_mod_two (m : ℕ) : m % 2 + (m + 1) % 2 = 1 := mod_two_add_add_odd_mod_two m odd_one @[simp] lemma succ_mod_two_add_mod_two (m : ℕ) : (m + 1) % 2 + m % 2 = 1 := by rw [add_comm, mod_two_add_succ_mod_two] lemma even_add' : Even (m + n) ↔ (Odd m ↔ Odd n) := by rw [even_add, ← not_odd_iff_even, ← not_odd_iff_even, not_iff_not] @[simp] lemma not_even_bit1 (n : ℕ) : ¬Even (2 * n + 1) := by simp [parity_simps] lemma not_even_two_mul_add_one (n : ℕ) : ¬ Even (2 * n + 1) := not_even_iff_odd.2 <\| odd_two_mul_add_one n lemma even_sub' (h : n ≤ m) : Even (m - n) ↔ (Odd m ↔ Odd n) := by rw [even_sub h, ← not_odd_iff_even, ← not_odd_iff_even, not_iff_not] lemma Odd.sub_odd (hm : Odd m) (hn : Odd n) : Even (m - n) := (le_total n m).elim (fun h ↦ by simp only [even_sub' h, ]) fun h ↦ by simp only [Nat.sub_eq_zero_iff_le.2 h, Even.zero] alias _root_.Odd.tsub_odd := Nat.Odd.sub_odd lemma odd_mul : Odd (m n) ↔ Odd m ∧ Odd n := by simp [not_or, even_mul, ← not_even_iff_odd] lemma Odd.of_mul_left (h : Odd (m * n)) : Odd m := (odd_mul.mp h).1 lemma Odd.of_mul_right (h : Odd (m * n)) : Odd n := (odd_mul.mp h).2 lemma even_div : Even (m / n) ↔ m % (2 * n) / n = 0 := by rw [even_iff_two_dvd, dvd_iff_mod_eq_zero, ← Nat.mod_mul_right_div_self, mul_comm] @[parity_simps] lemma odd_add : Odd (m + n) ↔ (Odd m ↔ Even n) := by rw [← not_even_iff_odd, even_add, not_iff, ← not_even_iff_odd] lemma odd_add' : Odd (m + n) ↔ (Odd n ↔ Even m) := by rw [add_comm, odd_add] lemma ne_of_odd_add (h : Odd (m + n)) : m ≠ n := by rintro rfl; simp [← not_even_iff_odd] at h	@[parity_simps] lemma odd_sub (h : n ≤ m) : Odd (m - n) ↔ (Odd m ↔ Even n) := by rw [← not_even_iff_odd, even_sub h, not_iff, ← not_even_iff_odd]	Mathlib/Algebra/Ring/Parity.lean	274	275
/- Copyright (c) 2020 Johan Commelin, Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin, Robert Y. Lewis -/ import Mathlib.Algebra.Field.ZMod import Mathlib.NumberTheory.Padics.PadicIntegers import Mathlib.RingTheory.LocalRing.ResidueField.Defs import Mathlib.RingTheory.ZMod /-! # Relating `ℤ_[p]` to `ZMod (p ^ n)`, aka `ℤ/p^nℤ`. In this file we establish connections between the `p`-adic integers `ℤ_[p]` and the integers modulo powers of `p`, `ℤ/p^nℤ`, implemented as `ZMod (p^n)`. ## Main declarations We show that `ℤ_[p]` has a ring homomorphism to `ℤ/p^nℤ` for each `n`. The case for `n = 1` is handled separately, since it is used in the general construction and we may want to use it without the `^1` getting in the way. * `PadicInt.toZMod`: ring homomorphism to `ℤ/pℤ`, implemented as `ZMod p`. * `PadicInt.toZModPow`: ring homomorphism to `ℤ/p^nℤ`, implemented as `ZMod (p^n)`. * `PadicInt.ker_toZMod` / `PadicInt.ker_toZModPow`: the kernels of these maps are the ideals generated by `p^n` * `PadicInt.residueField` shows that the residue field of `ℤ_[p]` is isomorhic to ``ℤ/pℤ`. We also establish the universal property of `ℤ_[p]` as a projective limit. Given a family of compatible ring homomorphisms `f_k : R → ℤ/p^nℤ`, there is a unique limit `R → ℤ_[p]` * `PadicInt.lift`: the limit function * `PadicInt.lift_spec` / `PadicInt.lift_unique`: the universal property ## Implementation notes The constructions of the ring homomorphisms go through an auxiliary constructor `PadicInt.toZModHom`, which removes some boilerplate code. -/ noncomputable section open Nat IsLocalRing Padic namespace PadicInt variable {p : ℕ} [hp_prime : Fact p.Prime] section RingHoms /-! ### Ring homomorphisms to `ZMod p` and `ZMod (p ^ n)` -/ variable (p) (r : ℚ) /-- `modPart p r` is an integer that satisfies `‖(r - modPart p r : ℚ_[p])‖ < 1` when `‖(r : ℚ_[p])‖ ≤ 1`, see `PadicInt.norm_sub_modPart`. It is the unique non-negative integer that is `< p` with this property. (Note that this definition assumes `r : ℚ`. See `PadicInt.zmodRepr` for a version that takes values in `ℕ` and works for arbitrary `x : ℤ_[p]`.) -/ def modPart : ℤ := r.num * gcdA r.den p % p variable {p} theorem modPart_lt_p : modPart p r < p := by convert Int.emod_lt_abs _ _ · simp · exact mod_cast hp_prime.1.ne_zero theorem modPart_nonneg : 0 ≤ modPart p r := Int.emod_nonneg _ <\| mod_cast hp_prime.1.ne_zero theorem isUnit_den (r : ℚ) (h : ‖(r : ℚ_[p])‖ ≤ 1) : IsUnit (r.den : ℤ_[p]) := by rw [isUnit_iff] apply le_antisymm (r.den : ℤ_[p]).2 rw [← not_lt, coe_natCast] intro norm_denom_lt have hr : ‖(r * r.den : ℚ_[p])‖ = ‖(r.num : ℚ_[p])‖ := by congr rw_mod_cast [@Rat.mul_den_eq_num r] rw [padicNormE.mul] at hr have key : ‖(r.num : ℚ_[p])‖ < 1 := by calc _ = _ := hr.symm _ < 1 * 1 := mul_lt_mul' h norm_denom_lt (norm_nonneg _) zero_lt_one _ = 1 := mul_one 1 have : ↑p ∣ r.num ∧ (p : ℤ) ∣ r.den := by simp only [← norm_int_lt_one_iff_dvd, ← padic_norm_e_of_padicInt] exact ⟨key, norm_denom_lt⟩ apply hp_prime.1.not_dvd_one rwa [← r.reduced.gcd_eq_one, Nat.dvd_gcd_iff, ← Int.natCast_dvd, ← Int.natCast_dvd_natCast] theorem norm_sub_modPart_aux (r : ℚ) (h : ‖(r : ℚ_[p])‖ ≤ 1) : ↑p ∣ r.num - r.num * r.den.gcdA p % p * ↑r.den := by rw [← ZMod.intCast_zmod_eq_zero_iff_dvd] simp only [Int.cast_natCast, ZMod.natCast_mod, Int.cast_mul, Int.cast_sub] have := congr_arg (fun x => x % p : ℤ → ZMod p) (gcd_eq_gcd_ab r.den p) simp only [Int.cast_natCast, CharP.cast_eq_zero, EuclideanDomain.mod_zero, Int.cast_add, Int.cast_mul, zero_mul, add_zero] at this push_cast rw [mul_right_comm, mul_assoc, ← this] suffices rdcp : r.den.Coprime p by rw [rdcp.gcd_eq_one] simp only [mul_one, cast_one, sub_self] apply Coprime.symm apply (coprime_or_dvd_of_prime hp_prime.1 _).resolve_right rw [← Int.natCast_dvd_natCast, ← norm_int_lt_one_iff_dvd, not_lt] apply ge_of_eq rw [← isUnit_iff] exact isUnit_den r h theorem norm_sub_modPart (h : ‖(r : ℚ_[p])‖ ≤ 1) : ‖(⟨r, h⟩ - modPart p r : ℤ_[p])‖ < 1 := by let n := modPart p r rw [norm_lt_one_iff_dvd, ← (isUnit_den r h).dvd_mul_right] suffices ↑p ∣ r.num - n * r.den by convert (Int.castRingHom ℤ_[p]).map_dvd this simp only [n, sub_mul, Int.cast_natCast, eq_intCast, Int.cast_mul, sub_left_inj, Int.cast_sub] apply Subtype.coe_injective simp only [coe_mul, Subtype.coe_mk, coe_natCast] rw_mod_cast [@Rat.mul_den_eq_num r] rfl exact norm_sub_modPart_aux r h theorem exists_mem_range_of_norm_rat_le_one (h : ‖(r : ℚ_[p])‖ ≤ 1) : ∃ n : ℤ, 0 ≤ n ∧ n < p ∧ ‖(⟨r, h⟩ - n : ℤ_[p])‖ < 1 := ⟨modPart p r, modPart_nonneg _, modPart_lt_p _, norm_sub_modPart _ h⟩ theorem zmod_congr_of_sub_mem_span_aux (n : ℕ) (x : ℤ_[p]) (a b : ℤ) (ha : x - a ∈ (Ideal.span {(p : ℤ_[p]) ^ n})) (hb : x - b ∈ (Ideal.span {(p : ℤ_[p]) ^ n})) : (a : ZMod (p ^ n)) = b := by rw [Ideal.mem_span_singleton] at ha hb rw [← sub_eq_zero, ← Int.cast_sub, ZMod.intCast_zmod_eq_zero_iff_dvd, Int.natCast_pow] rw [← dvd_neg, neg_sub] at ha have := dvd_add ha hb rwa [sub_eq_add_neg, sub_eq_add_neg, add_assoc, neg_add_cancel_left, ← sub_eq_add_neg, ← Int.cast_sub, pow_p_dvd_int_iff] at this theorem zmod_congr_of_sub_mem_span (n : ℕ) (x : ℤ_[p]) (a b : ℕ) (ha : x - a ∈ (Ideal.span {(p : ℤ_[p]) ^ n})) (hb : x - b ∈ (Ideal.span {(p : ℤ_[p]) ^ n})) : (a : ZMod (p ^ n)) = b := by simpa using zmod_congr_of_sub_mem_span_aux n x a b ha hb theorem zmod_congr_of_sub_mem_max_ideal (x : ℤ_[p]) (m n : ℕ) (hm : x - m ∈ maximalIdeal ℤ_[p]) (hn : x - n ∈ maximalIdeal ℤ_[p]) : (m : ZMod p) = n := by rw [maximalIdeal_eq_span_p] at hm hn have := zmod_congr_of_sub_mem_span_aux 1 x m n simp only [pow_one] at this specialize this hm hn apply_fun ZMod.castHom (show p ∣ p ^ 1 by rw [pow_one]) (ZMod p) at this simp only [map_intCast] at this simpa only [Int.cast_natCast] using this variable (x : ℤ_[p]) theorem exists_mem_range : ∃ n : ℕ, n < p ∧ x - n ∈ maximalIdeal ℤ_[p] := by simp only [maximalIdeal_eq_span_p, Ideal.mem_span_singleton, ← norm_lt_one_iff_dvd] obtain ⟨r, hr⟩ := rat_dense p (x : ℚ_[p]) zero_lt_one have H : ‖(r : ℚ_[p])‖ ≤ 1 := by rw [norm_sub_rev] at hr calc _ = ‖(r : ℚ_[p]) - x + x‖ := by ring_nf _ ≤ _ := padicNormE.nonarchimedean _ _ _ ≤ _ := max_le (le_of_lt hr) x.2 obtain ⟨n, hzn, hnp, hn⟩ := exists_mem_range_of_norm_rat_le_one r H lift n to ℕ using hzn use n constructor · exact mod_cast hnp simp only [norm_def, coe_sub, Subtype.coe_mk, coe_natCast] at hn ⊢ rw [show (x - n : ℚ_[p]) = x - r + (r - n) by ring] apply lt_of_le_of_lt (padicNormE.nonarchimedean _ _) apply max_lt hr simpa using hn theorem existsUnique_mem_range : ∃! n : ℕ, n < p ∧ x - n ∈ maximalIdeal ℤ_[p] := by obtain ⟨n, hn₁, hn₂⟩ := exists_mem_range x use n, ⟨hn₁, hn₂⟩, fun m ⟨hm₁, hm₂⟩ ↦ ?_ have := (zmod_congr_of_sub_mem_max_ideal x n m hn₂ hm₂).symm rwa [ZMod.natCast_eq_natCast_iff, ModEq, mod_eq_of_lt hn₁, mod_eq_of_lt hm₁] at this @[deprecated (since := "2024-12-17")] alias exists_unique_mem_range := existsUnique_mem_range /-- `zmodRepr x` is the unique natural number smaller than `p` satisfying `‖(x - zmodRepr x : ℤ_[p])‖ < 1`. -/ def zmodRepr : ℕ := Classical.choose (existsUnique_mem_range x).exists theorem zmodRepr_spec : zmodRepr x < p ∧ x - zmodRepr x ∈ maximalIdeal ℤ_[p] := Classical.choose_spec (existsUnique_mem_range x).exists theorem zmodRepr_unique (y : ℕ) (hy₁ : y < p) (hy₂ : x - y ∈ maximalIdeal ℤ_[p]) : y = zmodRepr x := have h := (Classical.choose_spec (existsUnique_mem_range x)).right (h y ⟨hy₁, hy₂⟩).trans (h (zmodRepr x) (zmodRepr_spec x)).symm theorem zmodRepr_lt_p : zmodRepr x < p := (zmodRepr_spec _).1 theorem sub_zmodRepr_mem : x - zmodRepr x ∈ maximalIdeal ℤ_[p] := (zmodRepr_spec _).2 /-- `toZModHom` is an auxiliary constructor for creating ring homs from `ℤ_[p]` to `ZMod v`. -/ def toZModHom (v : ℕ) (f : ℤ_[p] → ℕ) (f_spec : ∀ x, x - f x ∈ (Ideal.span {↑v} : Ideal ℤ_[p])) (f_congr : ∀ (x : ℤ_[p]) (a b : ℕ), x - a ∈ (Ideal.span {↑v} : Ideal ℤ_[p]) → x - b ∈ (Ideal.span {↑v} : Ideal ℤ_[p]) → (a : ZMod v) = b) : ℤ_[p] →+* ZMod v where toFun x := f x map_zero' := by rw [f_congr (0 : ℤ_[p]) _ 0, cast_zero] · exact f_spec _ · simp only [sub_zero, cast_zero, Submodule.zero_mem] map_one' := by rw [f_congr (1 : ℤ_[p]) _ 1, cast_one] · exact f_spec _ · simp only [sub_self, cast_one, Submodule.zero_mem] map_add' := by intro x y rw [f_congr (x + y) _ (f x + f y), cast_add] · exact f_spec _ · convert Ideal.add_mem _ (f_spec x) (f_spec y) using 1 rw [cast_add] ring map_mul' := by intro x y rw [f_congr (x * y) _ (f x * f y), cast_mul] · exact f_spec _ · let I : Ideal ℤ_[p] := Ideal.span {↑v} convert I.add_mem (I.mul_mem_left x (f_spec y)) (I.mul_mem_right ↑(f y) (f_spec x)) using 1 rw [cast_mul] ring /-- `toZMod` is a ring hom from `ℤ_[p]` to `ZMod p`, with the equality `toZMod x = (zmodRepr x : ZMod p)`. -/ def toZMod : ℤ_[p] →+* ZMod p := toZModHom p zmodRepr (by rw [← maximalIdeal_eq_span_p] exact sub_zmodRepr_mem) (by rw [← maximalIdeal_eq_span_p] exact zmod_congr_of_sub_mem_max_ideal) /-- `z - (toZMod z : ℤ_[p])` is contained in the maximal ideal of `ℤ_[p]`, for every `z : ℤ_[p]`. The coercion from `ZMod p` to `ℤ_[p]` is `ZMod.cast`, which coerces `ZMod p` into arbitrary rings. This is unfortunate, but a consequence of the fact that we allow `ZMod p` to coerce to rings of arbitrary characteristic, instead of only rings of characteristic `p`. This coercion is only a ring homomorphism if it coerces into a ring whose characteristic divides `p`. While this is not the case here we can still make use of the coercion. -/ theorem toZMod_spec : x - (ZMod.cast (toZMod x) : ℤ_[p]) ∈ maximalIdeal ℤ_[p] := by convert sub_zmodRepr_mem x using 2 dsimp [toZMod, toZModHom] rcases Nat.exists_eq_add_of_lt hp_prime.1.pos with ⟨p', rfl⟩ change ↑((_ : ZMod (0 + p' + 1)).val) = (_ : ℤ_[0 + p' + 1]) rw [Nat.cast_inj] apply mod_eq_of_lt simpa only [zero_add] using zmodRepr_lt_p x theorem ker_toZMod : RingHom.ker (toZMod : ℤ_[p] →+* ZMod p) = maximalIdeal ℤ_[p] := by ext x rw [RingHom.mem_ker] constructor · intro h simpa only [h, ZMod.cast_zero, sub_zero] using toZMod_spec x · intro h rw [← sub_zero x] at h dsimp [toZMod, toZModHom] convert zmod_congr_of_sub_mem_max_ideal x _ 0 _ h · norm_cast · apply sub_zmodRepr_mem /-- The equivalence between the residue field of the `p`-adic integers and `ℤ/pℤ` -/ def residueField : IsLocalRing.ResidueField ℤ_[p] ≃+* ZMod p := (Ideal.quotEquivOfEq PadicInt.ker_toZMod.symm).trans <\| RingHom.quotientKerEquivOfSurjective (ZMod.ringHom_surjective PadicInt.toZMod) open scoped Classical in /-- `appr n x` gives a value `v : ℕ` such that `x` and `↑v : ℤ_p` are congruent mod `p^n`. See `appr_spec`. -/ noncomputable def appr : ℤ_[p] → ℕ → ℕ \| _x, 0 => 0 \| x, n + 1 => let y := x - appr x n if hy : y = 0 then appr x n else let u := (unitCoeff hy : ℤ_[p]) appr x n + p ^ n * (toZMod ((u * (p : ℤ_[p]) ^ (y.valuation - n : ℤ).natAbs) : ℤ_[p])).val theorem appr_lt (x : ℤ_[p]) (n : ℕ) : x.appr n < p ^ n := by induction n generalizing x with \| zero => simp only [appr, zero_eq, _root_.pow_zero, zero_lt_one] \| succ n ih => simp only [appr, map_natCast, ZMod.natCast_self, RingHom.map_pow, Int.natAbs, RingHom.map_mul] have hp : p ^ n < p ^ (n + 1) := by apply Nat.pow_lt_pow_right hp_prime.1.one_lt n.lt_add_one split_ifs with h · apply lt_trans (ih _) hp · calc _ < p ^ n + p ^ n * (p - 1) := ?_ _ = p ^ (n + 1) := ?_ · apply add_lt_add_of_lt_of_le (ih _) apply Nat.mul_le_mul_left apply le_pred_of_lt apply ZMod.val_lt · rw [mul_tsub, mul_one, ← _root_.pow_succ] apply add_tsub_cancel_of_le (le_of_lt hp) theorem appr_mono (x : ℤ_[p]) : Monotone x.appr := by apply monotone_nat_of_le_succ intro n dsimp [appr] split_ifs; · rfl apply Nat.le_add_right theorem dvd_appr_sub_appr (x : ℤ_[p]) (m n : ℕ) (h : m ≤ n) : p ^ m ∣ x.appr n - x.appr m := by obtain ⟨k, rfl⟩ := Nat.exists_eq_add_of_le h; clear h induction k with \| zero => simp only [zero_eq, add_zero, le_refl, tsub_eq_zero_of_le, ne_eq, Nat.isUnit_iff, dvd_zero] \| succ k ih => rw [← add_assoc] dsimp [appr] split_ifs with h · exact ih rw [add_comm, add_tsub_assoc_of_le (appr_mono _ (Nat.le_add_right m k))] apply dvd_add _ ih apply dvd_mul_of_dvd_left apply pow_dvd_pow _ (Nat.le_add_right m k) theorem appr_spec (n : ℕ) : ∀ x : ℤ_[p], x - appr x n ∈ Ideal.span {(p : ℤ_[p]) ^ n} := by simp only [Ideal.mem_span_singleton] induction n with \| zero => simp only [zero_eq, _root_.pow_zero, isUnit_one, IsUnit.dvd, forall_const] \| succ n ih => intro x dsimp only [appr] split_ifs with h · rw [h] apply dvd_zero push_cast rw [sub_add_eq_sub_sub] obtain ⟨c, hc⟩ := ih x simp only [map_natCast, ZMod.natCast_self, RingHom.map_pow, RingHom.map_mul, ZMod.natCast_val] have hc' : c ≠ 0 := by rintro rfl simp only [mul_zero] at hc contradiction conv_rhs => congr simp only [hc] rw [show (x - (appr x n : ℤ_[p])).valuation = ((p : ℤ_[p]) ^ n * c).valuation by rw [hc]] rw [valuation_p_pow_mul _ _ hc', Nat.cast_add, add_sub_cancel_left, _root_.pow_succ, ← mul_sub] apply mul_dvd_mul_left obtain hc0 \| hc0 := eq_or_ne c.valuation 0 · simp only [hc0, mul_one, _root_.pow_zero, Nat.cast_zero, Int.natAbs_zero] rw [mul_comm, unitCoeff_spec h] at hc suffices c = unitCoeff h by rw [← this, ← Ideal.mem_span_singleton, ← maximalIdeal_eq_span_p] apply toZMod_spec lift c to ℤ_[p]ˣ using by simp [isUnit_iff, norm_eq_zpow_neg_valuation hc', hc0] rw [IsDiscreteValuationRing.unit_mul_pow_congr_unit _ _ _ _ _ hc] exact irreducible_p · simp only [Int.natAbs_natCast, zero_pow hc0, sub_zero, ZMod.cast_zero, mul_zero] rw [unitCoeff_spec hc'] exact (dvd_pow_self (p : ℤ_[p]) hc0).mul_left _ /-- A ring hom from `ℤ_[p]` to `ZMod (p^n)`, with underlying function `PadicInt.appr n`. -/ def toZModPow (n : ℕ) : ℤ_[p] →+* ZMod (p ^ n) := toZModHom (p ^ n) (fun x => appr x n) (by intros rw [Nat.cast_pow] exact appr_spec n _) (by intro x a b ha hb apply zmod_congr_of_sub_mem_span n x a b · simpa using ha · simpa using hb) theorem ker_toZModPow (n : ℕ) : RingHom.ker (toZModPow n : ℤ_[p] →+* ZMod (p ^ n)) = Ideal.span {(p : ℤ_[p]) ^ n} := by ext x rw [RingHom.mem_ker] constructor · intro h suffices x.appr n = 0 by convert appr_spec n x simp only [this, sub_zero, cast_zero] dsimp [toZModPow, toZModHom] at h rw [ZMod.natCast_zmod_eq_zero_iff_dvd] at h apply eq_zero_of_dvd_of_lt h (appr_lt _ _) · intro h rw [← sub_zero x] at h dsimp [toZModPow, toZModHom] rw [zmod_congr_of_sub_mem_span n x _ 0 _ h, cast_zero] apply appr_spec -- This is not a simp lemma; simp can't match the LHS. theorem zmod_cast_comp_toZModPow (m n : ℕ) (h : m ≤ n) : (ZMod.castHom (pow_dvd_pow p h) (ZMod (p ^ m))).comp (@toZModPow p _ n) = @toZModPow p _ m := by apply ZMod.ringHom_eq_of_ker_eq ext x rw [RingHom.mem_ker, RingHom.mem_ker] simp only [Function.comp_apply, ZMod.castHom_apply, RingHom.coe_comp] simp only [toZModPow, toZModHom, RingHom.coe_mk] dsimp rw [ZMod.cast_natCast (pow_dvd_pow p h), zmod_congr_of_sub_mem_span m (x.appr n) (x.appr n) (x.appr m)] · rw [sub_self] apply Ideal.zero_mem _ · rw [Ideal.mem_span_singleton] rcases dvd_appr_sub_appr x m n h with ⟨c, hc⟩ use c rw [← Nat.cast_sub (appr_mono _ h), hc, Nat.cast_mul, Nat.cast_pow] @[simp] theorem cast_toZModPow (m n : ℕ) (h : m ≤ n) (x : ℤ_[p]) : ZMod.cast (toZModPow n x) = toZModPow m x := by rw [← zmod_cast_comp_toZModPow _ _ h] rfl theorem denseRange_natCast : DenseRange (Nat.cast : ℕ → ℤ_[p]) := by intro x rw [Metric.mem_closure_range_iff] intro ε hε obtain ⟨n, hn⟩ := exists_pow_neg_lt p hε use x.appr n rw [dist_eq_norm] apply lt_of_le_of_lt _ hn rw [norm_le_pow_iff_mem_span_pow] apply appr_spec theorem denseRange_intCast : DenseRange (Int.cast : ℤ → ℤ_[p]) := by intro x refine DenseRange.induction_on denseRange_natCast x ?_ ?_ · exact isClosed_closure · intro a apply subset_closure exact Set.mem_range_self _ end RingHoms section lift /-! ### Universal property as projective limit -/ open CauSeq PadicSeq variable {R : Type} [NonAssocSemiring R] {p : Nat} (f : ∀ k : ℕ, R →+ ZMod (p ^ k)) /-- Given a family of ring homs `f : Π n : ℕ, R →+* ZMod (p ^ n)`, `nthHom f r` is an integer-valued sequence whose `n`th value is the unique integer `k` such that `0 ≤ k < p ^ n` and `f n r = (k : ZMod (p ^ n))`. -/ def nthHom (r : R) : ℕ → ℤ := fun n => (f n r : ZMod (p ^ n)).val @[simp] theorem nthHom_zero : nthHom f 0 = 0 := by simp +unfoldPartialApp [nthHom] rfl variable {f} variable [hp_prime : Fact p.Prime] section variable (f_compat : ∀ (k1 k2) (hk : k1 ≤ k2), (ZMod.castHom (pow_dvd_pow p hk) _).comp (f k2) = f k1) include f_compat theorem pow_dvd_nthHom_sub (r : R) (i j : ℕ) (h : i ≤ j) : (p : ℤ) ^ i ∣ nthHom f r j - nthHom f r i := by specialize f_compat i j h rw [← Int.natCast_pow, ← ZMod.intCast_zmod_eq_zero_iff_dvd, Int.cast_sub] dsimp [nthHom] rw [← f_compat, RingHom.comp_apply] simp only [ZMod.cast_id, ZMod.castHom_apply, sub_self, ZMod.natCast_val, ZMod.intCast_cast] theorem isCauSeq_nthHom (r : R) : IsCauSeq (padicNorm p) fun n => nthHom f r n := by intro ε hε obtain ⟨k, hk⟩ : ∃ k : ℕ, (p : ℚ) ^ (-((k : ℕ) : ℤ)) < ε := exists_pow_neg_lt_rat p hε use k intro j hj refine lt_of_le_of_lt ?_ hk -- Need to do beta reduction first, as `norm_cast` doesn't. -- Added to adapt to https://github.com/leanprover/lean4/pull/2734. beta_reduce norm_cast rw [← padicNorm.dvd_iff_norm_le] exact mod_cast pow_dvd_nthHom_sub f_compat r k j hj /-- `nthHomSeq f_compat r` bundles `PadicInt.nthHom f r` as a Cauchy sequence of rationals with respect to the `p`-adic norm. The `n`th value of the sequence is `((f n r).val : ℚ)`. -/ def nthHomSeq (r : R) : PadicSeq p := ⟨fun n => nthHom f r n, isCauSeq_nthHom f_compat r⟩ -- this lemma ran into issues after changing to `NeZero` and I'm not sure why. theorem nthHomSeq_one : nthHomSeq f_compat 1 ≈ 1 := by intro ε hε change _ < _ at hε use 1 intro j hj haveI : Fact (1 < p ^ j) := ⟨Nat.one_lt_pow (by omega) hp_prime.1.one_lt⟩ suffices (ZMod.cast (1 : ZMod (p ^ j)) : ℚ) = 1 by simp [nthHomSeq, nthHom, this, hε] rw [ZMod.cast_eq_val, ZMod.val_one, Nat.cast_one] theorem nthHomSeq_add (r s : R) : nthHomSeq f_compat (r + s) ≈ nthHomSeq f_compat r + nthHomSeq f_compat s := by intro ε hε obtain ⟨n, hn⟩ := exists_pow_neg_lt_rat p hε use n intro j hj dsimp [nthHomSeq] apply lt_of_le_of_lt _ hn rw [← Int.cast_add, ← Int.cast_sub, ← padicNorm.dvd_iff_norm_le, ← ZMod.intCast_zmod_eq_zero_iff_dvd] dsimp [nthHom]	simp only [ZMod.natCast_val, RingHom.map_add, Int.cast_sub, ZMod.intCast_cast, Int.cast_add] rw [ZMod.cast_add (show p ^ n ∣ p ^ j from pow_dvd_pow _ hj)] simp only [cast_add, ZMod.natCast_val, Int.cast_add, ZMod.intCast_cast, sub_self] theorem nthHomSeq_mul (r s : R) : nthHomSeq f_compat (r * s) ≈ nthHomSeq f_compat r * nthHomSeq f_compat s := by intro ε hε obtain ⟨n, hn⟩ := exists_pow_neg_lt_rat p hε	Mathlib/NumberTheory/Padics/RingHoms.lean	537	544
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Bryan Gin-ge Chen -/ import Mathlib.Order.Heyting.Basic /-! # (Generalized) Boolean algebras A Boolean algebra is a bounded distributive lattice with a complement operator. Boolean algebras generalize the (classical) logic of propositions and the lattice of subsets of a set. Generalized Boolean algebras may be less familiar, but they are essentially Boolean algebras which do not necessarily have a top element (`⊤`) (and hence not all elements may have complements). One example in mathlib is `Finset α`, the type of all finite subsets of an arbitrary (not-necessarily-finite) type `α`. `GeneralizedBooleanAlgebra α` is defined to be a distributive lattice with bottom (`⊥`) admitting a relative complement operator, written using "set difference" notation as `x \ y` (`sdiff x y`). For convenience, the `BooleanAlgebra` type class is defined to extend `GeneralizedBooleanAlgebra` so that it is also bundled with a `\` operator. (A terminological point: `x \ y` is the complement of `y` relative to the interval `[⊥, x]`. We do not yet have relative complements for arbitrary intervals, as we do not even have lattice intervals.) ## Main declarations * `GeneralizedBooleanAlgebra`: a type class for generalized Boolean algebras * `BooleanAlgebra`: a type class for Boolean algebras. * `Prop.booleanAlgebra`: the Boolean algebra instance on `Prop` ## Implementation notes The `sup_inf_sdiff` and `inf_inf_sdiff` axioms for the relative complement operator in `GeneralizedBooleanAlgebra` are taken from [Wikipedia](https://en.wikipedia.org/wiki/Boolean_algebra_(structure)#Generalizations). [Stone's paper introducing generalized Boolean algebras][Stone1935] does not define a relative complement operator `a \ b` for all `a`, `b`. Instead, the postulates there amount to an assumption that for all `a, b : α` where `a ≤ b`, the equations `x ⊔ a = b` and `x ⊓ a = ⊥` have a solution `x`. `Disjoint.sdiff_unique` proves that this `x` is in fact `b \ a`. ## References * <https://en.wikipedia.org/wiki/Boolean_algebra_(structure)#Generalizations> * [Postulates for Boolean Algebras and Generalized Boolean Algebras, M.H. Stone][Stone1935] * [Lattice Theory: Foundation, George Grätzer][Gratzer2011] ## Tags generalized Boolean algebras, Boolean algebras, lattices, sdiff, compl -/ assert_not_exists RelIso open Function OrderDual universe u v variable {α : Type u} {β : Type} {x y z : α} /-! ### Generalized Boolean algebras Some of the lemmas in this section are from: [Lattice Theory: Foundation, George Grätzer][Gratzer2011] * <https://ncatlab.org/nlab/show/relative+complement> * <https://people.math.gatech.edu/~mccuan/courses/4317/symmetricdifference.pdf> -/ /-- A generalized Boolean algebra is a distributive lattice with `⊥` and a relative complement operation `\` (called `sdiff`, after "set difference") satisfying `(a ⊓ b) ⊔ (a \ b) = a` and `(a ⊓ b) ⊓ (a \ b) = ⊥`, i.e. `a \ b` is the complement of `b` in `a`. This is a generalization of Boolean algebras which applies to `Finset α` for arbitrary (not-necessarily-`Fintype`) `α`. -/ class GeneralizedBooleanAlgebra (α : Type u) extends DistribLattice α, SDiff α, Bot α where /-- For any `a`, `b`, `(a ⊓ b) ⊔ (a / b) = a` -/ sup_inf_sdiff : ∀ a b : α, a ⊓ b ⊔ a \ b = a /-- For any `a`, `b`, `(a ⊓ b) ⊓ (a / b) = ⊥` -/ inf_inf_sdiff : ∀ a b : α, a ⊓ b ⊓ a \ b = ⊥ -- We might want an `IsCompl_of` predicate (for relative complements) generalizing `IsCompl`, -- however we'd need another type class for lattices with bot, and all the API for that. section GeneralizedBooleanAlgebra variable [GeneralizedBooleanAlgebra α] @[simp] theorem sup_inf_sdiff (x y : α) : x ⊓ y ⊔ x \ y = x := GeneralizedBooleanAlgebra.sup_inf_sdiff _ _ @[simp] theorem inf_inf_sdiff (x y : α) : x ⊓ y ⊓ x \ y = ⊥ := GeneralizedBooleanAlgebra.inf_inf_sdiff _ _ @[simp] theorem sup_sdiff_inf (x y : α) : x \ y ⊔ x ⊓ y = x := by rw [sup_comm, sup_inf_sdiff] @[simp] theorem inf_sdiff_inf (x y : α) : x \ y ⊓ (x ⊓ y) = ⊥ := by rw [inf_comm, inf_inf_sdiff] -- see Note [lower instance priority] instance (priority := 100) GeneralizedBooleanAlgebra.toOrderBot : OrderBot α where __ := GeneralizedBooleanAlgebra.toBot bot_le a := by rw [← inf_inf_sdiff a a, inf_assoc] exact inf_le_left theorem disjoint_inf_sdiff : Disjoint (x ⊓ y) (x \ y) := disjoint_iff_inf_le.mpr (inf_inf_sdiff x y).le -- TODO: in distributive lattices, relative complements are unique when they exist theorem sdiff_unique (s : x ⊓ y ⊔ z = x) (i : x ⊓ y ⊓ z = ⊥) : x \ y = z := by conv_rhs at s => rw [← sup_inf_sdiff x y, sup_comm] rw [sup_comm] at s conv_rhs at i => rw [← inf_inf_sdiff x y, inf_comm] rw [inf_comm] at i exact (eq_of_inf_eq_sup_eq i s).symm -- Use `sdiff_le` private theorem sdiff_le' : x \ y ≤ x := calc x \ y ≤ x ⊓ y ⊔ x \ y := le_sup_right _ = x := sup_inf_sdiff x y -- Use `sdiff_sup_self` private theorem sdiff_sup_self' : y \ x ⊔ x = y ⊔ x := calc y \ x ⊔ x = y \ x ⊔ (x ⊔ x ⊓ y) := by rw [sup_inf_self] _ = y ⊓ x ⊔ y \ x ⊔ x := by ac_rfl _ = y ⊔ x := by rw [sup_inf_sdiff] @[simp] theorem sdiff_inf_sdiff : x \ y ⊓ y \ x = ⊥ := Eq.symm <\| calc ⊥ = x ⊓ y ⊓ x \ y := by rw [inf_inf_sdiff] _ = x ⊓ (y ⊓ x ⊔ y \ x) ⊓ x \ y := by rw [sup_inf_sdiff] _ = (x ⊓ (y ⊓ x) ⊔ x ⊓ y \ x) ⊓ x \ y := by rw [inf_sup_left] _ = (y ⊓ (x ⊓ x) ⊔ x ⊓ y \ x) ⊓ x \ y := by ac_rfl _ = (y ⊓ x ⊔ x ⊓ y \ x) ⊓ x \ y := by rw [inf_idem] _ = x ⊓ y ⊓ x \ y ⊔ x ⊓ y \ x ⊓ x \ y := by rw [inf_sup_right, inf_comm x y] _ = x ⊓ y \ x ⊓ x \ y := by rw [inf_inf_sdiff, bot_sup_eq] _ = x ⊓ x \ y ⊓ y \ x := by ac_rfl _ = x \ y ⊓ y \ x := by rw [inf_of_le_right sdiff_le'] theorem disjoint_sdiff_sdiff : Disjoint (x \ y) (y \ x) := disjoint_iff_inf_le.mpr sdiff_inf_sdiff.le @[simp] theorem inf_sdiff_self_right : x ⊓ y \ x = ⊥ := calc x ⊓ y \ x = (x ⊓ y ⊔ x \ y) ⊓ y \ x := by rw [sup_inf_sdiff] _ = x ⊓ y ⊓ y \ x ⊔ x \ y ⊓ y \ x := by rw [inf_sup_right] _ = ⊥ := by rw [inf_comm x y, inf_inf_sdiff, sdiff_inf_sdiff, bot_sup_eq] @[simp] theorem inf_sdiff_self_left : y \ x ⊓ x = ⊥ := by rw [inf_comm, inf_sdiff_self_right] -- see Note [lower instance priority] instance (priority := 100) GeneralizedBooleanAlgebra.toGeneralizedCoheytingAlgebra : GeneralizedCoheytingAlgebra α where __ := ‹GeneralizedBooleanAlgebra α› __ := GeneralizedBooleanAlgebra.toOrderBot sdiff := (· \ ·) sdiff_le_iff y x z := ⟨fun h => le_of_inf_le_sup_le (le_of_eq (calc y ⊓ y \ x = y \ x := inf_of_le_right sdiff_le' _ = x ⊓ y \ x ⊔ z ⊓ y \ x := by rw [inf_eq_right.2 h, inf_sdiff_self_right, bot_sup_eq] _ = (x ⊔ z) ⊓ y \ x := by rw [← inf_sup_right])) (calc y ⊔ y \ x = y := sup_of_le_left sdiff_le' _ ≤ y ⊔ (x ⊔ z) := le_sup_left _ = y \ x ⊔ x ⊔ z := by rw [← sup_assoc, ← @sdiff_sup_self' _ x y] _ = x ⊔ z ⊔ y \ x := by ac_rfl), fun h => le_of_inf_le_sup_le (calc y \ x ⊓ x = ⊥ := inf_sdiff_self_left _ ≤ z ⊓ x := bot_le) (calc y \ x ⊔ x = y ⊔ x := sdiff_sup_self' _ ≤ x ⊔ z ⊔ x := sup_le_sup_right h x _ ≤ z ⊔ x := by rw [sup_assoc, sup_comm, sup_assoc, sup_idem])⟩ theorem disjoint_sdiff_self_left : Disjoint (y \ x) x := disjoint_iff_inf_le.mpr inf_sdiff_self_left.le theorem disjoint_sdiff_self_right : Disjoint x (y \ x) := disjoint_iff_inf_le.mpr inf_sdiff_self_right.le lemma le_sdiff : x ≤ y \ z ↔ x ≤ y ∧ Disjoint x z := ⟨fun h ↦ ⟨h.trans sdiff_le, disjoint_sdiff_self_left.mono_left h⟩, fun h ↦ by rw [← h.2.sdiff_eq_left]; exact sdiff_le_sdiff_right h.1⟩ @[simp] lemma sdiff_eq_left : x \ y = x ↔ Disjoint x y := ⟨fun h ↦ disjoint_sdiff_self_left.mono_left h.ge, Disjoint.sdiff_eq_left⟩ /- TODO: we could make an alternative constructor for `GeneralizedBooleanAlgebra` using `Disjoint x (y \ x)` and `x ⊔ (y \ x) = y` as axioms. -/ theorem Disjoint.sdiff_eq_of_sup_eq (hi : Disjoint x z) (hs : x ⊔ z = y) : y \ x = z := have h : y ⊓ x = x := inf_eq_right.2 <\| le_sup_left.trans hs.le sdiff_unique (by rw [h, hs]) (by rw [h, hi.eq_bot]) protected theorem Disjoint.sdiff_unique (hd : Disjoint x z) (hz : z ≤ y) (hs : y ≤ x ⊔ z) : y \ x = z := sdiff_unique (by rw [← inf_eq_right] at hs rwa [sup_inf_right, inf_sup_right, sup_comm x, inf_sup_self, inf_comm, sup_comm z, hs, sup_eq_left]) (by rw [inf_assoc, hd.eq_bot, inf_bot_eq]) -- cf. `IsCompl.disjoint_left_iff` and `IsCompl.disjoint_right_iff` theorem disjoint_sdiff_iff_le (hz : z ≤ y) (hx : x ≤ y) : Disjoint z (y \ x) ↔ z ≤ x := ⟨fun H => le_of_inf_le_sup_le (le_trans H.le_bot bot_le) (by rw [sup_sdiff_cancel_right hx] refine le_trans (sup_le_sup_left sdiff_le z) ?_ rw [sup_eq_right.2 hz]), fun H => disjoint_sdiff_self_right.mono_left H⟩ -- cf. `IsCompl.le_left_iff` and `IsCompl.le_right_iff` theorem le_iff_disjoint_sdiff (hz : z ≤ y) (hx : x ≤ y) : z ≤ x ↔ Disjoint z (y \ x) := (disjoint_sdiff_iff_le hz hx).symm -- cf. `IsCompl.inf_left_eq_bot_iff` and `IsCompl.inf_right_eq_bot_iff` theorem inf_sdiff_eq_bot_iff (hz : z ≤ y) (hx : x ≤ y) : z ⊓ y \ x = ⊥ ↔ z ≤ x := by rw [← disjoint_iff] exact disjoint_sdiff_iff_le hz hx -- cf. `IsCompl.left_le_iff` and `IsCompl.right_le_iff` theorem le_iff_eq_sup_sdiff (hz : z ≤ y) (hx : x ≤ y) : x ≤ z ↔ y = z ⊔ y \ x := ⟨fun H => by apply le_antisymm · conv_lhs => rw [← sup_inf_sdiff y x] apply sup_le_sup_right rwa [inf_eq_right.2 hx] · apply le_trans · apply sup_le_sup_right hz · rw [sup_sdiff_left], fun H => by conv_lhs at H => rw [← sup_sdiff_cancel_right hx] refine le_of_inf_le_sup_le ?_ H.le rw [inf_sdiff_self_right] exact bot_le⟩ -- cf. `IsCompl.sup_inf` theorem sdiff_sup : y \ (x ⊔ z) = y \ x ⊓ y \ z := sdiff_unique (calc y ⊓ (x ⊔ z) ⊔ y \ x ⊓ y \ z = (y ⊓ (x ⊔ z) ⊔ y \ x) ⊓ (y ⊓ (x ⊔ z) ⊔ y \ z) := by rw [sup_inf_left] _ = (y ⊓ x ⊔ y ⊓ z ⊔ y \ x) ⊓ (y ⊓ x ⊔ y ⊓ z ⊔ y \ z) := by rw [@inf_sup_left _ _ y] _ = (y ⊓ z ⊔ (y ⊓ x ⊔ y \ x)) ⊓ (y ⊓ x ⊔ (y ⊓ z ⊔ y \ z)) := by ac_rfl _ = (y ⊓ z ⊔ y) ⊓ (y ⊓ x ⊔ y) := by rw [sup_inf_sdiff, sup_inf_sdiff] _ = (y ⊔ y ⊓ z) ⊓ (y ⊔ y ⊓ x) := by ac_rfl _ = y := by rw [sup_inf_self, sup_inf_self, inf_idem]) (calc y ⊓ (x ⊔ z) ⊓ (y \ x ⊓ y \ z) = (y ⊓ x ⊔ y ⊓ z) ⊓ (y \ x ⊓ y \ z) := by rw [inf_sup_left] _ = y ⊓ x ⊓ (y \ x ⊓ y \ z) ⊔ y ⊓ z ⊓ (y \ x ⊓ y \ z) := by rw [inf_sup_right] _ = y ⊓ x ⊓ y \ x ⊓ y \ z ⊔ y \ x ⊓ (y \ z ⊓ (y ⊓ z)) := by ac_rfl _ = ⊥ := by rw [inf_inf_sdiff, bot_inf_eq, bot_sup_eq, inf_comm (y \ z), inf_inf_sdiff, inf_bot_eq]) theorem sdiff_eq_sdiff_iff_inf_eq_inf : y \ x = y \ z ↔ y ⊓ x = y ⊓ z := ⟨fun h => eq_of_inf_eq_sup_eq (a := y \ x) (by rw [inf_inf_sdiff, h, inf_inf_sdiff]) (by rw [sup_inf_sdiff, h, sup_inf_sdiff]), fun h => by rw [← sdiff_inf_self_right, ← sdiff_inf_self_right z y, inf_comm, h, inf_comm]⟩ theorem sdiff_eq_self_iff_disjoint : x \ y = x ↔ Disjoint y x := calc x \ y = x ↔ x \ y = x \ ⊥ := by rw [sdiff_bot] _ ↔ x ⊓ y = x ⊓ ⊥ := sdiff_eq_sdiff_iff_inf_eq_inf _ ↔ Disjoint y x := by rw [inf_bot_eq, inf_comm, disjoint_iff] theorem sdiff_eq_self_iff_disjoint' : x \ y = x ↔ Disjoint x y := by rw [sdiff_eq_self_iff_disjoint, disjoint_comm] theorem sdiff_lt (hx : y ≤ x) (hy : y ≠ ⊥) : x \ y < x := by refine sdiff_le.lt_of_ne fun h => hy ?_ rw [sdiff_eq_self_iff_disjoint', disjoint_iff] at h rw [← h, inf_eq_right.mpr hx] theorem sdiff_lt_left : x \ y < x ↔ ¬ Disjoint y x := by rw [lt_iff_le_and_ne, Ne, sdiff_eq_self_iff_disjoint, and_iff_right sdiff_le] @[simp] theorem le_sdiff_right : x ≤ y \ x ↔ x = ⊥ := ⟨fun h => disjoint_self.1 (disjoint_sdiff_self_right.mono_right h), fun h => h.le.trans bot_le⟩ @[simp] lemma sdiff_eq_right : x \ y = y ↔ x = ⊥ ∧ y = ⊥ := by rw [disjoint_sdiff_self_left.eq_iff]; aesop lemma sdiff_ne_right : x \ y ≠ y ↔ x ≠ ⊥ ∨ y ≠ ⊥ := sdiff_eq_right.not.trans not_and_or theorem sdiff_lt_sdiff_right (h : x < y) (hz : z ≤ x) : x \ z < y \ z := (sdiff_le_sdiff_right h.le).lt_of_not_le fun h' => h.not_le <\| le_sdiff_sup.trans <\| sup_le_of_le_sdiff_right h' hz theorem sup_inf_inf_sdiff : x ⊓ y ⊓ z ⊔ y \ z = x ⊓ y ⊔ y \ z := calc x ⊓ y ⊓ z ⊔ y \ z = x ⊓ (y ⊓ z) ⊔ y \ z := by rw [inf_assoc] _ = (x ⊔ y \ z) ⊓ y := by rw [sup_inf_right, sup_inf_sdiff] _ = x ⊓ y ⊔ y \ z := by rw [inf_sup_right, inf_sdiff_left] theorem sdiff_sdiff_right : x \ (y \ z) = x \ y ⊔ x ⊓ y ⊓ z := by rw [sup_comm, inf_comm, ← inf_assoc, sup_inf_inf_sdiff] apply sdiff_unique · calc x ⊓ y \ z ⊔ (z ⊓ x ⊔ x \ y) = (x ⊔ (z ⊓ x ⊔ x \ y)) ⊓ (y \ z ⊔ (z ⊓ x ⊔ x \ y)) := by rw [sup_inf_right] _ = (x ⊔ x ⊓ z ⊔ x \ y) ⊓ (y \ z ⊔ (x ⊓ z ⊔ x \ y)) := by ac_rfl _ = x ⊓ (y \ z ⊔ x ⊓ z ⊔ x \ y) := by rw [sup_inf_self, sup_sdiff_left, ← sup_assoc] _ = x ⊓ (y \ z ⊓ (z ⊔ y) ⊔ x ⊓ (z ⊔ y) ⊔ x \ y) := by rw [sup_inf_left, sdiff_sup_self', inf_sup_right, sup_comm y] _ = x ⊓ (y \ z ⊔ (x ⊓ z ⊔ x ⊓ y) ⊔ x \ y) := by rw [inf_sdiff_sup_right, @inf_sup_left _ _ x z y] _ = x ⊓ (y \ z ⊔ (x ⊓ z ⊔ (x ⊓ y ⊔ x \ y))) := by ac_rfl _ = x ⊓ (y \ z ⊔ (x ⊔ x ⊓ z)) := by rw [sup_inf_sdiff, sup_comm (x ⊓ z)] _ = x := by rw [sup_inf_self, sup_comm, inf_sup_self] · calc x ⊓ y \ z ⊓ (z ⊓ x ⊔ x \ y) = x ⊓ y \ z ⊓ (z ⊓ x) ⊔ x ⊓ y \ z ⊓ x \ y := by rw [inf_sup_left] _ = x ⊓ (y \ z ⊓ z ⊓ x) ⊔ x ⊓ y \ z ⊓ x \ y := by ac_rfl _ = x ⊓ y \ z ⊓ x \ y := by rw [inf_sdiff_self_left, bot_inf_eq, inf_bot_eq, bot_sup_eq] _ = x ⊓ (y \ z ⊓ y) ⊓ x \ y := by conv_lhs => rw [← inf_sdiff_left] _ = x ⊓ (y \ z ⊓ (y ⊓ x \ y)) := by ac_rfl _ = ⊥ := by rw [inf_sdiff_self_right, inf_bot_eq, inf_bot_eq] theorem sdiff_sdiff_right' : x \ (y \ z) = x \ y ⊔ x ⊓ z := calc x \ (y \ z) = x \ y ⊔ x ⊓ y ⊓ z := sdiff_sdiff_right _ = z ⊓ x ⊓ y ⊔ x \ y := by ac_rfl _ = x \ y ⊔ x ⊓ z := by rw [sup_inf_inf_sdiff, sup_comm, inf_comm] theorem sdiff_sdiff_eq_sdiff_sup (h : z ≤ x) : x \ (y \ z) = x \ y ⊔ z := by rw [sdiff_sdiff_right', inf_eq_right.2 h] @[simp] theorem sdiff_sdiff_right_self : x \ (x \ y) = x ⊓ y := by rw [sdiff_sdiff_right, inf_idem, sdiff_self, bot_sup_eq] theorem sdiff_sdiff_eq_self (h : y ≤ x) : x \ (x \ y) = y := by rw [sdiff_sdiff_right_self, inf_of_le_right h] theorem sdiff_eq_symm (hy : y ≤ x) (h : x \ y = z) : x \ z = y := by rw [← h, sdiff_sdiff_eq_self hy] theorem sdiff_eq_comm (hy : y ≤ x) (hz : z ≤ x) : x \ y = z ↔ x \ z = y := ⟨sdiff_eq_symm hy, sdiff_eq_symm hz⟩ theorem eq_of_sdiff_eq_sdiff (hxz : x ≤ z) (hyz : y ≤ z) (h : z \ x = z \ y) : x = y := by rw [← sdiff_sdiff_eq_self hxz, h, sdiff_sdiff_eq_self hyz] theorem sdiff_le_sdiff_iff_le (hx : x ≤ z) (hy : y ≤ z) : z \ x ≤ z \ y ↔ y ≤ x := by refine ⟨fun h ↦ ?_, sdiff_le_sdiff_left⟩ rw [← sdiff_sdiff_eq_self hx, ← sdiff_sdiff_eq_self hy] exact sdiff_le_sdiff_left h theorem sdiff_sdiff_left' : (x \ y) \ z = x \ y ⊓ x \ z := by rw [sdiff_sdiff_left, sdiff_sup] theorem sdiff_sdiff_sup_sdiff : z \ (x \ y ⊔ y \ x) = z ⊓ (z \ x ⊔ y) ⊓ (z \ y ⊔ x) := calc z \ (x \ y ⊔ y \ x) = (z \ x ⊔ z ⊓ x ⊓ y) ⊓ (z \ y ⊔ z ⊓ y ⊓ x) := by rw [sdiff_sup, sdiff_sdiff_right, sdiff_sdiff_right] _ = z ⊓ (z \ x ⊔ y) ⊓ (z \ y ⊔ z ⊓ y ⊓ x) := by rw [sup_inf_left, sup_comm, sup_inf_sdiff] _ = z ⊓ (z \ x ⊔ y) ⊓ (z ⊓ (z \ y ⊔ x)) := by rw [sup_inf_left, sup_comm (z \ y), sup_inf_sdiff] _ = z ⊓ z ⊓ (z \ x ⊔ y) ⊓ (z \ y ⊔ x) := by ac_rfl _ = z ⊓ (z \ x ⊔ y) ⊓ (z \ y ⊔ x) := by rw [inf_idem] theorem sdiff_sdiff_sup_sdiff' : z \ (x \ y ⊔ y \ x) = z ⊓ x ⊓ y ⊔ z \ x ⊓ z \ y := calc z \ (x \ y ⊔ y \ x) = z \ (x \ y) ⊓ z \ (y \ x) := sdiff_sup _ = (z \ x ⊔ z ⊓ x ⊓ y) ⊓ (z \ y ⊔ z ⊓ y ⊓ x) := by rw [sdiff_sdiff_right, sdiff_sdiff_right] _ = (z \ x ⊔ z ⊓ y ⊓ x) ⊓ (z \ y ⊔ z ⊓ y ⊓ x) := by ac_rfl _ = z \ x ⊓ z \ y ⊔ z ⊓ y ⊓ x := by rw [← sup_inf_right] _ = z ⊓ x ⊓ y ⊔ z \ x ⊓ z \ y := by ac_rfl lemma sdiff_sdiff_sdiff_cancel_left (hca : z ≤ x) : (x \ y) \ (x \ z) = z \ y := sdiff_sdiff_sdiff_le_sdiff.antisymm <\| (disjoint_sdiff_self_right.mono_left sdiff_le).le_sdiff_of_le_left <\| sdiff_le_sdiff_right hca lemma sdiff_sdiff_sdiff_cancel_right (hcb : z ≤ y) : (x \ z) \ (y \ z) = x \ y := by rw [le_antisymm_iff, sdiff_le_comm] exact ⟨sdiff_sdiff_sdiff_le_sdiff, (disjoint_sdiff_self_left.mono_right sdiff_le).le_sdiff_of_le_left <\| sdiff_le_sdiff_left hcb⟩ theorem inf_sdiff : (x ⊓ y) \ z = x \ z ⊓ y \ z := sdiff_unique (calc x ⊓ y ⊓ z ⊔ x \ z ⊓ y \ z = (x ⊓ y ⊓ z ⊔ x \ z) ⊓ (x ⊓ y ⊓ z ⊔ y \ z) := by rw [sup_inf_left] _ = (x ⊓ y ⊓ (z ⊔ x) ⊔ x \ z) ⊓ (x ⊓ y ⊓ z ⊔ y \ z) := by rw [sup_inf_right, sup_sdiff_self_right, inf_sup_right, inf_sdiff_sup_right] _ = (y ⊓ (x ⊓ (x ⊔ z)) ⊔ x \ z) ⊓ (x ⊓ y ⊓ z ⊔ y \ z) := by ac_rfl _ = (y ⊓ x ⊔ x \ z) ⊓ (x ⊓ y ⊔ y \ z) := by rw [inf_sup_self, sup_inf_inf_sdiff] _ = x ⊓ y ⊔ x \ z ⊓ y \ z := by rw [inf_comm y, sup_inf_left] _ = x ⊓ y := sup_eq_left.2 (inf_le_inf sdiff_le sdiff_le)) (calc x ⊓ y ⊓ z ⊓ (x \ z ⊓ y \ z) = x ⊓ y ⊓ (z ⊓ x \ z) ⊓ y \ z := by ac_rfl _ = ⊥ := by rw [inf_sdiff_self_right, inf_bot_eq, bot_inf_eq]) /-- See also `sdiff_inf_right_comm`. -/ theorem inf_sdiff_assoc (x y z : α) : (x ⊓ y) \ z = x ⊓ y \ z := sdiff_unique (calc x ⊓ y ⊓ z ⊔ x ⊓ y \ z = x ⊓ (y ⊓ z) ⊔ x ⊓ y \ z := by rw [inf_assoc] _ = x ⊓ (y ⊓ z ⊔ y \ z) := by rw [← inf_sup_left] _ = x ⊓ y := by rw [sup_inf_sdiff]) (calc x ⊓ y ⊓ z ⊓ (x ⊓ y \ z) = x ⊓ x ⊓ (y ⊓ z ⊓ y \ z) := by ac_rfl _ = ⊥ := by rw [inf_inf_sdiff, inf_bot_eq]) /-- See also `inf_sdiff_assoc`. -/ theorem sdiff_inf_right_comm (x y z : α) : x \ z ⊓ y = (x ⊓ y) \ z := by rw [inf_comm x, inf_comm, inf_sdiff_assoc] lemma inf_sdiff_left_comm (a b c : α) : a ⊓ (b \ c) = b ⊓ (a \ c) := by simp_rw [← inf_sdiff_assoc, inf_comm] @[deprecated (since := "2025-01-08")] alias inf_sdiff_right_comm := sdiff_inf_right_comm theorem inf_sdiff_distrib_left (a b c : α) : a ⊓ b \ c = (a ⊓ b) \ (a ⊓ c) := by rw [sdiff_inf, sdiff_eq_bot_iff.2 inf_le_left, bot_sup_eq, inf_sdiff_assoc] theorem inf_sdiff_distrib_right (a b c : α) : a \ b ⊓ c = (a ⊓ c) \ (b ⊓ c) := by simp_rw [inf_comm _ c, inf_sdiff_distrib_left] theorem disjoint_sdiff_comm : Disjoint (x \ z) y ↔ Disjoint x (y \ z) := by simp_rw [disjoint_iff, sdiff_inf_right_comm, inf_sdiff_assoc] theorem sup_eq_sdiff_sup_sdiff_sup_inf : x ⊔ y = x \ y ⊔ y \ x ⊔ x ⊓ y := Eq.symm <\| calc x \ y ⊔ y \ x ⊔ x ⊓ y = (x \ y ⊔ y \ x ⊔ x) ⊓ (x \ y ⊔ y \ x ⊔ y) := by rw [sup_inf_left] _ = (x \ y ⊔ x ⊔ y \ x) ⊓ (x \ y ⊔ (y \ x ⊔ y)) := by ac_rfl _ = (x ⊔ y \ x) ⊓ (x \ y ⊔ y) := by rw [sup_sdiff_right, sup_sdiff_right] _ = x ⊔ y := by rw [sup_sdiff_self_right, sup_sdiff_self_left, inf_idem] theorem sup_lt_of_lt_sdiff_left (h : y < z \ x) (hxz : x ≤ z) : x ⊔ y < z := by rw [← sup_sdiff_cancel_right hxz] refine (sup_le_sup_left h.le _).lt_of_not_le fun h' => h.not_le ?_ rw [← sdiff_idem] exact (sdiff_le_sdiff_of_sup_le_sup_left h').trans sdiff_le theorem sup_lt_of_lt_sdiff_right (h : x < z \ y) (hyz : y ≤ z) : x ⊔ y < z := by rw [← sdiff_sup_cancel hyz] refine (sup_le_sup_right h.le _).lt_of_not_le fun h' => h.not_le ?_ rw [← sdiff_idem] exact (sdiff_le_sdiff_of_sup_le_sup_right h').trans sdiff_le instance Prod.instGeneralizedBooleanAlgebra [GeneralizedBooleanAlgebra β] : GeneralizedBooleanAlgebra (α × β) where sup_inf_sdiff _ _ := Prod.ext (sup_inf_sdiff _ _) (sup_inf_sdiff _ _) inf_inf_sdiff _ _ := Prod.ext (inf_inf_sdiff _ _) (inf_inf_sdiff _ _) -- Porting note: Once `pi_instance` has been ported, this is just `by pi_instance`. instance Pi.instGeneralizedBooleanAlgebra {ι : Type} {α : ι → Type} [∀ i, GeneralizedBooleanAlgebra (α i)] : GeneralizedBooleanAlgebra (∀ i, α i) where sup_inf_sdiff := fun f g => funext fun a => sup_inf_sdiff (f a) (g a) inf_inf_sdiff := fun f g => funext fun a => inf_inf_sdiff (f a) (g a) end GeneralizedBooleanAlgebra /-! ### Boolean algebras -/ /-- A Boolean algebra is a bounded distributive lattice with a complement operator `ᶜ` such that `x ⊓ xᶜ = ⊥` and `x ⊔ xᶜ = ⊤`. For convenience, it must also provide a set difference operation `\` and a Heyting implication `⇨` satisfying `x \ y = x ⊓ yᶜ` and `x ⇨ y = y ⊔ xᶜ`. This is a generalization of (classical) logic of propositions, or the powerset lattice. Since `BoundedOrder`, `OrderBot`, and `OrderTop` are mixins that require `LE` to be present at define-time, the `extends` mechanism does not work with them. Instead, we extend using the underlying `Bot` and `Top` data typeclasses, and replicate the order axioms of those classes here. A "forgetful" instance back to `BoundedOrder` is provided. -/ class BooleanAlgebra (α : Type u) extends DistribLattice α, HasCompl α, SDiff α, HImp α, Top α, Bot α where /-- The infimum of `x` and `xᶜ` is at most `⊥` -/ inf_compl_le_bot : ∀ x : α, x ⊓ xᶜ ≤ ⊥ /-- The supremum of `x` and `xᶜ` is at least `⊤` -/ top_le_sup_compl : ∀ x : α, ⊤ ≤ x ⊔ xᶜ /-- `⊤` is the greatest element -/ le_top : ∀ a : α, a ≤ ⊤ /-- `⊥` is the least element -/ bot_le : ∀ a : α, ⊥ ≤ a /-- `x \ y` is equal to `x ⊓ yᶜ` -/ sdiff := fun x y => x ⊓ yᶜ /-- `x ⇨ y` is equal to `y ⊔ xᶜ` -/ himp := fun x y => y ⊔ xᶜ /-- `x \ y` is equal to `x ⊓ yᶜ` -/ sdiff_eq : ∀ x y : α, x \ y = x ⊓ yᶜ := by aesop /-- `x ⇨ y` is equal to `y ⊔ xᶜ` -/ himp_eq : ∀ x y : α, x ⇨ y = y ⊔ xᶜ := by aesop -- see Note [lower instance priority] instance (priority := 100) BooleanAlgebra.toBoundedOrder [h : BooleanAlgebra α] : BoundedOrder α := { h with } -- See note [reducible non instances] /-- A bounded generalized boolean algebra is a boolean algebra. -/ abbrev GeneralizedBooleanAlgebra.toBooleanAlgebra [GeneralizedBooleanAlgebra α] [OrderTop α] : BooleanAlgebra α where __ := ‹GeneralizedBooleanAlgebra α› __ := GeneralizedBooleanAlgebra.toOrderBot __ := ‹OrderTop α› compl a := ⊤ \ a inf_compl_le_bot _ := disjoint_sdiff_self_right.le_bot top_le_sup_compl _ := le_sup_sdiff sdiff_eq a b := by change _ = a ⊓ (⊤ \ b) rw [← inf_sdiff_assoc, inf_top_eq] section BooleanAlgebra variable [BooleanAlgebra α] theorem inf_compl_eq_bot' : x ⊓ xᶜ = ⊥ := bot_unique <\| BooleanAlgebra.inf_compl_le_bot x @[simp] theorem sup_compl_eq_top : x ⊔ xᶜ = ⊤ := top_unique <\| BooleanAlgebra.top_le_sup_compl x @[simp] theorem compl_sup_eq_top : xᶜ ⊔ x = ⊤ := by rw [sup_comm, sup_compl_eq_top] theorem isCompl_compl : IsCompl x xᶜ := IsCompl.of_eq inf_compl_eq_bot' sup_compl_eq_top theorem sdiff_eq : x \ y = x ⊓ yᶜ := BooleanAlgebra.sdiff_eq x y theorem himp_eq : x ⇨ y = y ⊔ xᶜ := BooleanAlgebra.himp_eq x y instance (priority := 100) BooleanAlgebra.toComplementedLattice : ComplementedLattice α := ⟨fun x => ⟨xᶜ, isCompl_compl⟩⟩ -- see Note [lower instance priority] instance (priority := 100) BooleanAlgebra.toGeneralizedBooleanAlgebra : GeneralizedBooleanAlgebra α where __ := ‹BooleanAlgebra α› sup_inf_sdiff a b := by rw [sdiff_eq, ← inf_sup_left, sup_compl_eq_top, inf_top_eq] inf_inf_sdiff a b := by rw [sdiff_eq, ← inf_inf_distrib_left, inf_compl_eq_bot', inf_bot_eq] -- See note [lower instance priority] instance (priority := 100) BooleanAlgebra.toBiheytingAlgebra : BiheytingAlgebra α where __ := ‹BooleanAlgebra α› __ := GeneralizedBooleanAlgebra.toGeneralizedCoheytingAlgebra hnot := compl le_himp_iff a b c := by rw [himp_eq, isCompl_compl.le_sup_right_iff_inf_left_le] himp_bot _ := _root_.himp_eq.trans (bot_sup_eq _) top_sdiff a := by rw [sdiff_eq, top_inf_eq] @[simp] theorem hnot_eq_compl : ￢x = xᶜ := rfl /- NOTE: Is this theorem needed at all or can we use `top_sdiff'`. -/ theorem top_sdiff : ⊤ \ x = xᶜ := top_sdiff' x theorem eq_compl_iff_isCompl : x = yᶜ ↔ IsCompl x y := ⟨fun h => by rw [h] exact isCompl_compl.symm, IsCompl.eq_compl⟩ theorem compl_eq_iff_isCompl : xᶜ = y ↔ IsCompl x y := ⟨fun h => by rw [← h] exact isCompl_compl, IsCompl.compl_eq⟩ theorem compl_eq_comm : xᶜ = y ↔ yᶜ = x := by rw [eq_comm, compl_eq_iff_isCompl, eq_compl_iff_isCompl] theorem eq_compl_comm : x = yᶜ ↔ y = xᶜ := by rw [eq_comm, compl_eq_iff_isCompl, eq_compl_iff_isCompl] @[simp] theorem compl_compl (x : α) : xᶜᶜ = x := (@isCompl_compl _ x _).symm.compl_eq theorem compl_comp_compl : compl ∘ compl = @id α := funext compl_compl @[simp] theorem compl_involutive : Function.Involutive (compl : α → α) := compl_compl theorem compl_bijective : Function.Bijective (compl : α → α) := compl_involutive.bijective theorem compl_surjective : Function.Surjective (compl : α → α) := compl_involutive.surjective theorem compl_injective : Function.Injective (compl : α → α) := compl_involutive.injective @[simp] theorem compl_inj_iff : xᶜ = yᶜ ↔ x = y := compl_injective.eq_iff theorem IsCompl.compl_eq_iff (h : IsCompl x y) : zᶜ = y ↔ z = x := h.compl_eq ▸ compl_inj_iff @[simp] theorem compl_eq_top : xᶜ = ⊤ ↔ x = ⊥ := isCompl_bot_top.compl_eq_iff @[simp] theorem compl_eq_bot : xᶜ = ⊥ ↔ x = ⊤ := isCompl_top_bot.compl_eq_iff @[simp] theorem compl_inf : (x ⊓ y)ᶜ = xᶜ ⊔ yᶜ := hnot_inf_distrib _ _ @[simp] theorem compl_le_compl_iff_le : yᶜ ≤ xᶜ ↔ x ≤ y := ⟨fun h => by have h := compl_le_compl h; simpa using h, compl_le_compl⟩ @[simp] lemma compl_lt_compl_iff_lt : yᶜ < xᶜ ↔ x < y := lt_iff_lt_of_le_iff_le' compl_le_compl_iff_le compl_le_compl_iff_le theorem compl_le_of_compl_le (h : yᶜ ≤ x) : xᶜ ≤ y := by simpa only [compl_compl] using compl_le_compl h theorem compl_le_iff_compl_le : xᶜ ≤ y ↔ yᶜ ≤ x := ⟨compl_le_of_compl_le, compl_le_of_compl_le⟩ @[simp] theorem compl_le_self : xᶜ ≤ x ↔ x = ⊤ := by simpa using le_compl_self (a := xᶜ) @[simp] theorem compl_lt_self [Nontrivial α] : xᶜ < x ↔ x = ⊤ := by simpa using lt_compl_self (a := xᶜ) @[simp] theorem sdiff_compl : x \ yᶜ = x ⊓ y := by rw [sdiff_eq, compl_compl] instance OrderDual.instBooleanAlgebra : BooleanAlgebra αᵒᵈ where __ := instDistribLattice α __ := instHeytingAlgebra sdiff_eq _ _ := @himp_eq α _ _ _ himp_eq _ _ := @sdiff_eq α _ _ _ inf_compl_le_bot a := (@codisjoint_hnot_right _ _ (ofDual a)).top_le top_le_sup_compl a := (@disjoint_compl_right _ _ (ofDual a)).le_bot @[simp] theorem sup_inf_inf_compl : x ⊓ y ⊔ x ⊓ yᶜ = x := by rw [← sdiff_eq, sup_inf_sdiff _ _] theorem compl_sdiff : (x \ y)ᶜ = x ⇨ y := by rw [sdiff_eq, himp_eq, compl_inf, compl_compl, sup_comm] @[simp] theorem compl_himp : (x ⇨ y)ᶜ = x \ y := @compl_sdiff αᵒᵈ _ _ _ theorem compl_sdiff_compl : xᶜ \ yᶜ = y \ x := by rw [sdiff_compl, sdiff_eq, inf_comm] @[simp] theorem compl_himp_compl : xᶜ ⇨ yᶜ = y ⇨ x := @compl_sdiff_compl αᵒᵈ _ _ _ theorem disjoint_compl_left_iff : Disjoint xᶜ y ↔ y ≤ x := by rw [← le_compl_iff_disjoint_left, compl_compl] theorem disjoint_compl_right_iff : Disjoint x yᶜ ↔ x ≤ y := by rw [← le_compl_iff_disjoint_right, compl_compl] theorem codisjoint_himp_self_left : Codisjoint (x ⇨ y) x := @disjoint_sdiff_self_left αᵒᵈ _ _ _ theorem codisjoint_himp_self_right : Codisjoint x (x ⇨ y) := @disjoint_sdiff_self_right αᵒᵈ _ _ _ theorem himp_le : x ⇨ y ≤ z ↔ y ≤ z ∧ Codisjoint x z := (@le_sdiff αᵒᵈ _ _ _ _).trans <\| and_congr_right' <\| @codisjoint_comm _ (_) _ _ _ @[simp] lemma himp_le_left : x ⇨ y ≤ x ↔ x = ⊤ := ⟨fun h ↦ codisjoint_self.1 <\| codisjoint_himp_self_right.mono_right h, fun h ↦ le_top.trans h.ge⟩ @[simp] lemma himp_eq_left : x ⇨ y = x ↔ x = ⊤ ∧ y = ⊤ := by rw [codisjoint_himp_self_left.eq_iff]; aesop lemma himp_ne_right : x ⇨ y ≠ x ↔ x ≠ ⊤ ∨ y ≠ ⊤ := himp_eq_left.not.trans not_and_or lemma codisjoint_iff_compl_le_left : Codisjoint x y ↔ yᶜ ≤ x := hnot_le_iff_codisjoint_left.symm lemma codisjoint_iff_compl_le_right : Codisjoint x y ↔ xᶜ ≤ y := hnot_le_iff_codisjoint_right.symm end BooleanAlgebra instance Prop.instBooleanAlgebra : BooleanAlgebra Prop where __ := Prop.instHeytingAlgebra __ := GeneralizedHeytingAlgebra.toDistribLattice compl := Not himp_eq _ _ := propext imp_iff_or_not inf_compl_le_bot _ H := H.2 H.1 top_le_sup_compl p _ := Classical.em p instance Prod.instBooleanAlgebra [BooleanAlgebra α] [BooleanAlgebra β] : BooleanAlgebra (α × β) where __ := instDistribLattice α β __ := instHeytingAlgebra himp_eq x y := by ext <;> simp [himp_eq] sdiff_eq x y := by ext <;> simp [sdiff_eq] inf_compl_le_bot x := by constructor <;> simp top_le_sup_compl x := by constructor <;> simp instance Pi.instBooleanAlgebra {ι : Type u} {α : ι → Type v} [∀ i, BooleanAlgebra (α i)] : BooleanAlgebra (∀ i, α i) where __ := instDistribLattice __ := instHeytingAlgebra sdiff_eq _ _ := funext fun _ => sdiff_eq himp_eq _ _ := funext fun _ => himp_eq inf_compl_le_bot _ _ := BooleanAlgebra.inf_compl_le_bot _ top_le_sup_compl _ _ := BooleanAlgebra.top_le_sup_compl _ instance Bool.instBooleanAlgebra : BooleanAlgebra Bool where __ := instBoundedOrder compl := not inf_compl_le_bot a := a.and_not_self.le top_le_sup_compl a := a.or_not_self.ge theorem Bool.sup_eq_bor : (· ⊔ ·) = or := by dsimp theorem Bool.inf_eq_band : (· ⊓ ·) = and := by dsimp @[simp] theorem Bool.compl_eq_bnot : HasCompl.compl = not := rfl section lift -- See note [reducible non-instances] /-- Pullback a `GeneralizedBooleanAlgebra` along an injection. -/ protected abbrev Function.Injective.generalizedBooleanAlgebra [Max α] [Min α] [Bot α] [SDiff α] [GeneralizedBooleanAlgebra β] (f : α → β) (hf : Injective f) (map_sup : ∀ a b, f (a ⊔ b) = f a ⊔ f b) (map_inf : ∀ a b, f (a ⊓ b) = f a ⊓ f b) (map_bot : f ⊥ = ⊥) (map_sdiff : ∀ a b, f (a \ b) = f a \ f b) : GeneralizedBooleanAlgebra α where __ := hf.generalizedCoheytingAlgebra f map_sup map_inf map_bot map_sdiff __ := hf.distribLattice f map_sup map_inf	sup_inf_sdiff a b := hf <\| by rw [map_sup, map_sdiff, map_inf, sup_inf_sdiff] inf_inf_sdiff a b := hf <\| by rw [map_inf, map_sdiff, map_inf, inf_inf_sdiff, map_bot]	Mathlib/Order/BooleanAlgebra.lean	762	763
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Yury Kudryashov -/ import Mathlib.Algebra.Algebra.Rat import Mathlib.Data.Nat.Prime.Int import Mathlib.Data.Rat.Sqrt import Mathlib.Data.Real.Sqrt import Mathlib.RingTheory.Algebraic.Basic import Mathlib.Tactic.IntervalCases /-! # Irrational real numbers In this file we define a predicate `Irrational` on `ℝ`, prove that the `n`-th root of an integer number is irrational if it is not integer, and that `√(q : ℚ)` is irrational if and only if `¬IsSquare q ∧ 0 ≤ q`. We also provide dot-style constructors like `Irrational.add_rat`, `Irrational.rat_sub` etc. With the `Decidable` instances in this file, is possible to prove `Irrational √n` using `decide`, when `n` is a numeric literal or cast; but this only works if you `unseal Nat.sqrt.iter in` before the theorem where you use this proof. -/ open Rat Real /-- A real number is irrational if it is not equal to any rational number. -/ def Irrational (x : ℝ) := x ∉ Set.range ((↑) : ℚ → ℝ) theorem irrational_iff_ne_rational (x : ℝ) : Irrational x ↔ ∀ a b : ℤ, x ≠ a / b := by simp only [Irrational, Rat.forall, cast_mk, not_exists, Set.mem_range, cast_intCast, cast_div, eq_comm] /-- A transcendental real number is irrational. -/ theorem Transcendental.irrational {r : ℝ} (tr : Transcendental ℚ r) : Irrational r := by rintro ⟨a, rfl⟩ exact tr (isAlgebraic_algebraMap a) /-! ### Irrationality of roots of integer and rational numbers -/ /-- If `x^n`, `n > 0`, is integer and is not the `n`-th power of an integer, then `x` is irrational. -/ theorem irrational_nrt_of_notint_nrt {x : ℝ} (n : ℕ) (m : ℤ) (hxr : x ^ n = m) (hv : ¬∃ y : ℤ, x = y) (hnpos : 0 < n) : Irrational x := by rintro ⟨⟨N, D, P, C⟩, rfl⟩ rw [← cast_pow] at hxr have c1 : ((D : ℤ) : ℝ) ≠ 0 := by rw [Int.cast_ne_zero, Int.natCast_ne_zero] exact P have c2 : ((D : ℤ) : ℝ) ^ n ≠ 0 := pow_ne_zero _ c1 rw [mk'_eq_divInt, cast_pow, cast_mk, div_pow, div_eq_iff_mul_eq c2, ← Int.cast_pow, ← Int.cast_pow, ← Int.cast_mul, Int.cast_inj] at hxr have hdivn : (D : ℤ) ^ n ∣ N ^ n := Dvd.intro_left m hxr rw [← Int.dvd_natAbs, ← Int.natCast_pow, Int.natCast_dvd_natCast, Int.natAbs_pow, Nat.pow_dvd_pow_iff hnpos.ne'] at hdivn obtain rfl : D = 1 := by rw [← Nat.gcd_eq_right hdivn, C.gcd_eq_one] refine hv ⟨N, ?_⟩ rw [mk'_eq_divInt, Int.ofNat_one, divInt_one, cast_intCast] /-- If `x^n = m` is an integer and `n` does not divide the `multiplicity p m`, then `x` is irrational. -/ theorem irrational_nrt_of_n_not_dvd_multiplicity {x : ℝ} (n : ℕ) {m : ℤ} (hm : m ≠ 0) (p : ℕ) [hp : Fact p.Prime] (hxr : x ^ n = m) (hv : multiplicity (p : ℤ) m % n ≠ 0) : Irrational x := by rcases Nat.eq_zero_or_pos n with (rfl \| hnpos) · rw [eq_comm, pow_zero, ← Int.cast_one, Int.cast_inj] at hxr simp [hxr, multiplicity_of_one_right (mt isUnit_iff_dvd_one.1 (mt Int.natCast_dvd_natCast.1 hp.1.not_dvd_one)), Nat.zero_mod] at hv refine irrational_nrt_of_notint_nrt _ _ hxr ?_ hnpos rintro ⟨y, rfl⟩ rw [← Int.cast_pow, Int.cast_inj] at hxr subst m have : y ≠ 0 := by rintro rfl; rw [zero_pow hnpos.ne'] at hm; exact hm rfl rw [(Int.finiteMultiplicity_iff.2 ⟨by simp [hp.1.ne_one], this⟩).multiplicity_pow (Nat.prime_iff_prime_int.1 hp.1), Nat.mul_mod_right] at hv exact hv rfl theorem irrational_sqrt_of_multiplicity_odd (m : ℤ) (hm : 0 < m) (p : ℕ) [hp : Fact p.Prime] (Hpv : multiplicity (p : ℤ) m % 2 = 1) : Irrational (√m) := @irrational_nrt_of_n_not_dvd_multiplicity _ 2 _ (Ne.symm (ne_of_lt hm)) p hp (sq_sqrt (Int.cast_nonneg.2 <\| le_of_lt hm)) (by rw [Hpv]; exact one_ne_zero) @[simp] theorem not_irrational_zero : ¬Irrational 0 := not_not_intro ⟨0, Rat.cast_zero⟩ @[simp] theorem not_irrational_one : ¬Irrational 1 := not_not_intro ⟨1, Rat.cast_one⟩ theorem irrational_sqrt_ratCast_iff_of_nonneg {q : ℚ} (hq : 0 ≤ q) : Irrational (√q) ↔ ¬IsSquare q := by refine Iff.not (?_ : Exists _ ↔ Exists _) constructor · rintro ⟨y, hy⟩ refine ⟨y, Rat.cast_injective (α := ℝ) ?_⟩ rw [Rat.cast_mul, hy, mul_self_sqrt (Rat.cast_nonneg.2 hq)] · rintro ⟨q', rfl⟩ exact ⟨\|q'\|, mod_cast (sqrt_mul_self_eq_abs q').symm⟩ theorem irrational_sqrt_ratCast_iff {q : ℚ} : Irrational (√q) ↔ ¬IsSquare q ∧ 0 ≤ q := by obtain hq \| hq := le_or_lt 0 q · simp_rw [irrational_sqrt_ratCast_iff_of_nonneg hq, and_iff_left hq] · rw [sqrt_eq_zero_of_nonpos (Rat.cast_nonpos.2 hq.le)] simp_rw [not_irrational_zero, false_iff, not_and, not_le, hq, implies_true] theorem irrational_sqrt_intCast_iff_of_nonneg {z : ℤ} (hz : 0 ≤ z) : Irrational (√z) ↔ ¬IsSquare z := by rw [← Rat.isSquare_intCast_iff, ← irrational_sqrt_ratCast_iff_of_nonneg (mod_cast hz), Rat.cast_intCast] theorem irrational_sqrt_intCast_iff {z : ℤ} : Irrational (√z) ↔ ¬IsSquare z ∧ 0 ≤ z := by rw [← Rat.cast_intCast, irrational_sqrt_ratCast_iff, Rat.isSquare_intCast_iff, Int.cast_nonneg] theorem irrational_sqrt_natCast_iff {n : ℕ} : Irrational (√n) ↔ ¬IsSquare n := by rw [← Rat.isSquare_natCast_iff, ← irrational_sqrt_ratCast_iff_of_nonneg n.cast_nonneg, Rat.cast_natCast] theorem irrational_sqrt_ofNat_iff {n : ℕ} [n.AtLeastTwo] : Irrational √(ofNat(n)) ↔ ¬IsSquare ofNat(n) := irrational_sqrt_natCast_iff theorem Nat.Prime.irrational_sqrt {p : ℕ} (hp : Nat.Prime p) : Irrational (√p) := irrational_sqrt_natCast_iff.mpr hp.not_isSquare /-- Irrationality of the Square Root of 2 -/ theorem irrational_sqrt_two : Irrational (√2) := by simpa using Nat.prime_two.irrational_sqrt /-- This can be used as ```lean unseal Nat.sqrt.iter in example : Irrational √24 := by decide ``` -/ instance {n : ℕ} [n.AtLeastTwo] : Decidable (Irrational √(ofNat(n))) := decidable_of_iff' _ irrational_sqrt_ofNat_iff instance (n : ℕ) : Decidable (Irrational (√n)) := decidable_of_iff' _ irrational_sqrt_natCast_iff instance (z : ℤ) : Decidable (Irrational (√z)) := decidable_of_iff' _ irrational_sqrt_intCast_iff instance (q : ℚ) : Decidable (Irrational (√q)) := decidable_of_iff' _ irrational_sqrt_ratCast_iff /-! ### Dot-style operations on `Irrational` #### Coercion of a rational/integer/natural number is not irrational -/ namespace Irrational variable {x : ℝ} /-! #### Irrational number is not equal to a rational/integer/natural number -/ theorem ne_rat (h : Irrational x) (q : ℚ) : x ≠ q := fun hq => h ⟨q, hq.symm⟩ theorem ne_int (h : Irrational x) (m : ℤ) : x ≠ m := by rw [← Rat.cast_intCast] exact h.ne_rat _ theorem ne_nat (h : Irrational x) (m : ℕ) : x ≠ m := h.ne_int m theorem ne_zero (h : Irrational x) : x ≠ 0 := mod_cast h.ne_nat 0 theorem ne_one (h : Irrational x) : x ≠ 1 := by simpa only [Nat.cast_one] using h.ne_nat 1 @[simp] theorem ne_ofNat (h : Irrational x) (n : ℕ) [n.AtLeastTwo] : x ≠ ofNat(n) := h.ne_nat n end Irrational @[simp] theorem Rat.not_irrational (q : ℚ) : ¬Irrational q := fun h => h ⟨q, rfl⟩ @[simp] theorem Int.not_irrational (m : ℤ) : ¬Irrational m := fun h => h.ne_int m rfl @[simp] theorem Nat.not_irrational (m : ℕ) : ¬Irrational m := fun h => h.ne_nat m rfl @[simp] theorem not_irrational_ofNat (n : ℕ) [n.AtLeastTwo] : ¬Irrational ofNat(n) := n.not_irrational namespace Irrational variable (q : ℚ) {x y : ℝ} /-! #### Addition of rational/integer/natural numbers -/ /-- If `x + y` is irrational, then at least one of `x` and `y` is irrational. -/ theorem add_cases : Irrational (x + y) → Irrational x ∨ Irrational y := by delta Irrational contrapose! rintro ⟨⟨rx, rfl⟩, ⟨ry, rfl⟩⟩ exact ⟨rx + ry, cast_add rx ry⟩ theorem of_ratCast_add (h : Irrational (q + x)) : Irrational x := h.add_cases.resolve_left q.not_irrational @[deprecated (since := "2025-04-01")] alias of_rat_add := of_ratCast_add theorem ratCast_add (h : Irrational x) : Irrational (q + x) := of_ratCast_add (-q) <\| by rwa [cast_neg, neg_add_cancel_left] @[deprecated (since := "2025-04-01")] alias rat_add := ratCast_add theorem of_add_ratCast : Irrational (x + q) → Irrational x := add_comm (↑q) x ▸ of_ratCast_add q @[deprecated (since := "2025-04-01")] alias of_add_rat := of_add_ratCast theorem add_ratCast (h : Irrational x) : Irrational (x + q) := add_comm (↑q) x ▸ h.ratCast_add q @[deprecated (since := "2025-04-01")] alias add_rat := add_ratCast theorem of_intCast_add (m : ℤ) (h : Irrational (m + x)) : Irrational x := by rw [← cast_intCast] at h exact h.of_ratCast_add m @[deprecated (since := "2025-04-01")] alias of_int_add := of_intCast_add theorem of_add_intCast (m : ℤ) (h : Irrational (x + m)) : Irrational x := of_intCast_add m <\| add_comm x m ▸ h @[deprecated (since := "2025-04-01")] alias of_add_int := of_add_intCast theorem intCast_add (h : Irrational x) (m : ℤ) : Irrational (m + x) := by rw [← cast_intCast] exact h.ratCast_add m @[deprecated (since := "2025-04-01")] alias int_add := intCast_add theorem add_intCast (h : Irrational x) (m : ℤ) : Irrational (x + m) := add_comm (↑m) x ▸ h.intCast_add m @[deprecated (since := "2025-04-01")] alias add_int := add_intCast theorem of_natCast_add (m : ℕ) (h : Irrational (m + x)) : Irrational x := h.of_intCast_add m @[deprecated (since := "2025-04-01")] alias of_nat_add := of_natCast_add theorem of_add_natCast (m : ℕ) (h : Irrational (x + m)) : Irrational x := h.of_add_intCast m @[deprecated (since := "2025-04-01")] alias of_add_nat := of_add_natCast theorem natCast_add (h : Irrational x) (m : ℕ) : Irrational (m + x) := h.intCast_add m @[deprecated (since := "2025-04-01")] alias nat_add := natCast_add theorem add_natCast (h : Irrational x) (m : ℕ) : Irrational (x + m) := h.add_intCast m @[deprecated (since := "2025-04-01")] alias add_nat := add_natCast /-! #### Negation -/ theorem of_neg (h : Irrational (-x)) : Irrational x := fun ⟨q, hx⟩ => h ⟨-q, by rw [cast_neg, hx]⟩ protected theorem neg (h : Irrational x) : Irrational (-x) := of_neg <\| by rwa [neg_neg] /-! #### Subtraction of rational/integer/natural numbers -/ theorem sub_ratCast (h : Irrational x) : Irrational (x - q) := by simpa only [sub_eq_add_neg, cast_neg] using h.add_ratCast (-q) @[deprecated (since := "2025-04-01")] alias sub_rat := sub_ratCast theorem ratCast_sub (h : Irrational x) : Irrational (q - x) := by simpa only [sub_eq_add_neg] using h.neg.ratCast_add q @[deprecated (since := "2025-04-01")] alias rat_sub := ratCast_sub theorem of_sub_ratCast (h : Irrational (x - q)) : Irrational x := of_add_ratCast (-q) <\| by simpa only [cast_neg, sub_eq_add_neg] using h @[deprecated (since := "2025-04-01")] alias of_sub_rat := of_sub_ratCast theorem of_ratCast_sub (h : Irrational (q - x)) : Irrational x := of_neg (of_ratCast_add q (by simpa only [sub_eq_add_neg] using h)) @[deprecated (since := "2025-04-01")] alias of_rat_sub := of_ratCast_sub theorem sub_intCast (h : Irrational x) (m : ℤ) : Irrational (x - m) := by simpa only [Rat.cast_intCast] using h.sub_ratCast m @[deprecated (since := "2025-04-01")] alias sub_int := sub_intCast theorem intCast_sub (h : Irrational x) (m : ℤ) : Irrational (m - x) := by simpa only [Rat.cast_intCast] using h.ratCast_sub m @[deprecated (since := "2025-04-01")] alias int_sub := intCast_sub theorem of_sub_intCast (m : ℤ) (h : Irrational (x - m)) : Irrational x := of_sub_ratCast m <\| by rwa [Rat.cast_intCast] @[deprecated (since := "2025-04-01")] alias of_sub_int := of_sub_intCast theorem of_intCast_sub (m : ℤ) (h : Irrational (m - x)) : Irrational x := of_ratCast_sub m <\| by rwa [Rat.cast_intCast] @[deprecated (since := "2025-04-01")] alias of_int_sub := of_intCast_sub theorem sub_natCast (h : Irrational x) (m : ℕ) : Irrational (x - m) := h.sub_intCast m @[deprecated (since := "2025-04-01")] alias sub_nat := sub_natCast theorem natCast_sub (h : Irrational x) (m : ℕ) : Irrational (m - x) := h.intCast_sub m @[deprecated (since := "2025-04-01")] alias nat_sub := natCast_sub theorem of_sub_natCast (m : ℕ) (h : Irrational (x - m)) : Irrational x := h.of_sub_intCast m @[deprecated (since := "2025-04-01")] alias of_sub_nat := of_sub_natCast theorem of_natCast_sub (m : ℕ) (h : Irrational (m - x)) : Irrational x := h.of_intCast_sub m @[deprecated (since := "2025-04-01")] alias of_nat_sub := of_natCast_sub /-! #### Multiplication by rational numbers -/ theorem mul_cases : Irrational (x * y) → Irrational x ∨ Irrational y := by delta Irrational contrapose! rintro ⟨⟨rx, rfl⟩, ⟨ry, rfl⟩⟩ exact ⟨rx * ry, cast_mul rx ry⟩ theorem of_mul_ratCast (h : Irrational (x * q)) : Irrational x := h.mul_cases.resolve_right q.not_irrational @[deprecated (since := "2025-04-01")] alias of_mul_rat := of_mul_ratCast theorem mul_ratCast (h : Irrational x) {q : ℚ} (hq : q ≠ 0) : Irrational (x * q) := of_mul_ratCast q⁻¹ <\| by rwa [mul_assoc, ← cast_mul, mul_inv_cancel₀ hq, cast_one, mul_one] @[deprecated (since := "2025-04-01")] alias mul_rat := mul_ratCast theorem of_ratCast_mul : Irrational (q * x) → Irrational x := mul_comm x q ▸ of_mul_ratCast q @[deprecated (since := "2025-04-01")] alias of_rat_mul := of_ratCast_mul theorem ratCast_mul (h : Irrational x) {q : ℚ} (hq : q ≠ 0) : Irrational (q * x) := mul_comm x q ▸ h.mul_ratCast hq @[deprecated (since := "2025-04-01")] alias rat_mul := ratCast_mul theorem of_mul_intCast (m : ℤ) (h : Irrational (x * m)) : Irrational x := of_mul_ratCast m <\| by rwa [cast_intCast] @[deprecated (since := "2025-04-01")] alias of_mul_int := of_mul_intCast theorem of_intCast_mul (m : ℤ) (h : Irrational (m * x)) : Irrational x := of_ratCast_mul m <\| by rwa [cast_intCast] @[deprecated (since := "2025-04-01")] alias of_int_mul := of_intCast_mul theorem mul_intCast (h : Irrational x) {m : ℤ} (hm : m ≠ 0) : Irrational (x * m) := by rw [← cast_intCast] refine h.mul_ratCast ?_ rwa [Int.cast_ne_zero] @[deprecated (since := "2025-04-01")] alias mul_int := mul_intCast theorem intCast_mul (h : Irrational x) {m : ℤ} (hm : m ≠ 0) : Irrational (m * x) := mul_comm x m ▸ h.mul_intCast hm @[deprecated (since := "2025-04-01")] alias int_mul := intCast_mul theorem of_mul_natCast (m : ℕ) (h : Irrational (x * m)) : Irrational x := h.of_mul_intCast m @[deprecated (since := "2025-04-01")] alias of_mul_nat := of_mul_natCast theorem of_natCast_mul (m : ℕ) (h : Irrational (m * x)) : Irrational x := h.of_intCast_mul m @[deprecated (since := "2025-04-01")] alias of_nat_mul := of_natCast_mul theorem mul_natCast (h : Irrational x) {m : ℕ} (hm : m ≠ 0) : Irrational (x * m) := h.mul_intCast <\| Int.natCast_ne_zero.2 hm @[deprecated (since := "2025-04-01")] alias mul_nat := mul_natCast theorem natCast_mul (h : Irrational x) {m : ℕ} (hm : m ≠ 0) : Irrational (m * x) := h.intCast_mul <\| Int.natCast_ne_zero.2 hm @[deprecated (since := "2025-04-01")] alias nat_mul := natCast_mul /-! #### Inverse -/ theorem of_inv (h : Irrational x⁻¹) : Irrational x := fun ⟨q, hq⟩ => h <\| hq ▸ ⟨q⁻¹, q.cast_inv⟩ protected theorem inv (h : Irrational x) : Irrational x⁻¹ := of_inv <\| by rwa [inv_inv] /-! #### Division -/ theorem div_cases (h : Irrational (x / y)) : Irrational x ∨ Irrational y := h.mul_cases.imp id of_inv theorem of_ratCast_div (h : Irrational (q / x)) : Irrational x := (h.of_ratCast_mul q).of_inv @[deprecated (since := "2025-04-01")] alias of_rat_div := of_ratCast_div theorem of_div_ratCast (h : Irrational (x / q)) : Irrational x := h.div_cases.resolve_right q.not_irrational @[deprecated (since := "2025-04-01")] alias of_div_rat := of_div_ratCast theorem ratCast_div (h : Irrational x) {q : ℚ} (hq : q ≠ 0) : Irrational (q / x) := h.inv.ratCast_mul hq @[deprecated (since := "2025-04-01")] alias rat_div := ratCast_div theorem div_ratCast (h : Irrational x) {q : ℚ} (hq : q ≠ 0) : Irrational (x / q) := by rw [div_eq_mul_inv, ← cast_inv] exact h.mul_ratCast (inv_ne_zero hq) @[deprecated (since := "2025-04-01")] alias div_rat := div_ratCast theorem of_intCast_div (m : ℤ) (h : Irrational (m / x)) : Irrational x := h.div_cases.resolve_left m.not_irrational @[deprecated (since := "2025-04-01")] alias of_int_div := of_intCast_div theorem of_div_intCast (m : ℤ) (h : Irrational (x / m)) : Irrational x := h.div_cases.resolve_right m.not_irrational @[deprecated (since := "2025-04-01")] alias of_div_int := of_div_intCast theorem intCast_div (h : Irrational x) {m : ℤ} (hm : m ≠ 0) : Irrational (m / x) := h.inv.intCast_mul hm @[deprecated (since := "2025-04-01")] alias int_div := intCast_div theorem div_intCast (h : Irrational x) {m : ℤ} (hm : m ≠ 0) : Irrational (x / m) := by rw [← cast_intCast] refine h.div_ratCast ?_ rwa [Int.cast_ne_zero] @[deprecated (since := "2025-04-01")] alias div_int := div_intCast theorem of_natCast_div (m : ℕ) (h : Irrational (m / x)) : Irrational x := h.of_intCast_div m @[deprecated (since := "2025-04-01")] alias of_nat_div := of_natCast_div theorem of_div_natCast (m : ℕ) (h : Irrational (x / m)) : Irrational x := h.of_div_intCast m @[deprecated (since := "2025-04-01")] alias of_div_nat := of_div_natCast theorem natCast_div (h : Irrational x) {m : ℕ} (hm : m ≠ 0) : Irrational (m / x) := h.inv.natCast_mul hm @[deprecated (since := "2025-04-01")] alias nat_div := natCast_div theorem div_natCast (h : Irrational x) {m : ℕ} (hm : m ≠ 0) : Irrational (x / m) := h.div_intCast <\| by rwa [Int.natCast_ne_zero] @[deprecated (since := "2025-04-01")] alias div_nat := div_natCast theorem of_one_div (h : Irrational (1 / x)) : Irrational x := of_ratCast_div 1 <\| by rwa [cast_one] /-! #### Natural and integer power -/ theorem of_mul_self (h : Irrational (x * x)) : Irrational x := h.mul_cases.elim id id theorem of_pow : ∀ n : ℕ, Irrational (x ^ n) → Irrational x \| 0 => fun h => by	rw [pow_zero] at h exact (h ⟨1, cast_one⟩).elim \| n + 1 => fun h => by rw [pow_succ] at h	Mathlib/Data/Real/Irrational.lean	473	476
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison -/ import Mathlib.AlgebraicGeometry.Spec import Mathlib.Algebra.Category.Ring.Constructions import Mathlib.CategoryTheory.Elementwise /-! # The category of schemes A scheme is a locally ringed space such that every point is contained in some open set where there is an isomorphism of presheaves between the restriction to that open set, and the structure sheaf of `Spec R`, for some commutative ring `R`. A morphism of schemes is just a morphism of the underlying locally ringed spaces. -/ -- Explicit universe annotations were used in this file to improve performance https://github.com/leanprover-community/mathlib4/issues/12737 universe u noncomputable section open TopologicalSpace open CategoryTheory open TopCat open Opposite namespace AlgebraicGeometry /-- We define `Scheme` as an `X : LocallyRingedSpace`, along with a proof that every point has an open neighbourhood `U` so that the restriction of `X` to `U` is isomorphic, as a locally ringed space, to `Spec.toLocallyRingedSpace.obj (op R)` for some `R : CommRingCat`. -/ structure Scheme extends LocallyRingedSpace where local_affine : ∀ x : toLocallyRingedSpace, ∃ (U : OpenNhds x) (R : CommRingCat), Nonempty (toLocallyRingedSpace.restrict U.isOpenEmbedding ≅ Spec.toLocallyRingedSpace.obj (op R)) namespace Scheme instance : CoeSort Scheme Type* where coe X := X.carrier /-- The type of open sets of a scheme. -/ abbrev Opens (X : Scheme) : Type* := TopologicalSpace.Opens X /-- A morphism between schemes is a morphism between the underlying locally ringed spaces. -/ structure Hom (X Y : Scheme) extends toLRSHom' : X.toLocallyRingedSpace.Hom Y.toLocallyRingedSpace where /-- Cast a morphism of schemes into morphisms of local ringed spaces. -/ abbrev Hom.toLRSHom {X Y : Scheme.{u}} (f : X.Hom Y) : X.toLocallyRingedSpace ⟶ Y.toLocallyRingedSpace := f.toLRSHom' /-- See Note [custom simps projection] -/ def Hom.Simps.toLRSHom {X Y : Scheme.{u}} (f : X.Hom Y) : X.toLocallyRingedSpace ⟶ Y.toLocallyRingedSpace := f.toLRSHom initialize_simps_projections Hom (toLRSHom' → toLRSHom) /-- Schemes are a full subcategory of locally ringed spaces. -/ instance : Category Scheme where Hom := Hom id X := Hom.mk (𝟙 X.toLocallyRingedSpace) comp f g := Hom.mk (f.toLRSHom ≫ g.toLRSHom) /-- `f ⁻¹ᵁ U` is notation for `(Opens.map f.base).obj U`, the preimage of an open set `U` under `f`. -/ scoped[AlgebraicGeometry] notation3:90 f:91 " ⁻¹ᵁ " U:90 => @Prefunctor.obj (Scheme.Opens _) _ (Scheme.Opens _) _ (Opens.map (f : Scheme.Hom _ _).base).toPrefunctor U /-- `Γ(X, U)` is notation for `X.presheaf.obj (op U)`. -/ scoped[AlgebraicGeometry] notation3 "Γ(" X ", " U ")" => (PresheafedSpace.presheaf (SheafedSpace.toPresheafedSpace (LocallyRingedSpace.toSheafedSpace (Scheme.toLocallyRingedSpace X)))).obj (op (α := Scheme.Opens _) U) instance {X : Scheme.{u}} : Subsingleton Γ(X, ⊥) := CommRingCat.subsingleton_of_isTerminal X.sheaf.isTerminalOfEmpty @[continuity, fun_prop] lemma Hom.continuous {X Y : Scheme} (f : X.Hom Y) : Continuous f.base := f.base.hom.2 /-- The structure sheaf of a scheme. -/ protected abbrev sheaf (X : Scheme) := X.toSheafedSpace.sheaf namespace Hom variable {X Y : Scheme.{u}} (f : Hom X Y) {U U' : Y.Opens} {V V' : X.Opens} /-- Given a morphism of schemes `f : X ⟶ Y`, and open `U ⊆ Y`, this is the induced map `Γ(Y, U) ⟶ Γ(X, f ⁻¹ᵁ U)`. -/ abbrev app (U : Y.Opens) : Γ(Y, U) ⟶ Γ(X, f ⁻¹ᵁ U) := f.c.app (op U) /-- Given a morphism of schemes `f : X ⟶ Y`, this is the induced map `Γ(Y, ⊤) ⟶ Γ(X, ⊤)`. -/ abbrev appTop : Γ(Y, ⊤) ⟶ Γ(X, ⊤) := f.app ⊤ @[reassoc] lemma naturality (i : op U' ⟶ op U) : Y.presheaf.map i ≫ f.app U = f.app U' ≫ X.presheaf.map ((Opens.map f.base).map i.unop).op := f.c.naturality i /-- Given a morphism of schemes `f : X ⟶ Y`, and open sets `U ⊆ Y`, `V ⊆ f ⁻¹' U`, this is the induced map `Γ(Y, U) ⟶ Γ(X, V)`. -/ def appLE (U : Y.Opens) (V : X.Opens) (e : V ≤ f ⁻¹ᵁ U) : Γ(Y, U) ⟶ Γ(X, V) := f.app U ≫ X.presheaf.map (homOfLE e).op @[reassoc (attr := simp)] lemma appLE_map (e : V ≤ f ⁻¹ᵁ U) (i : op V ⟶ op V') : f.appLE U V e ≫ X.presheaf.map i = f.appLE U V' (i.unop.le.trans e) := by rw [Hom.appLE, Category.assoc, ← Functor.map_comp] rfl @[reassoc] lemma appLE_map' (e : V ≤ f ⁻¹ᵁ U) (i : V = V') : f.appLE U V' (i ▸ e) ≫ X.presheaf.map (eqToHom i).op = f.appLE U V e := appLE_map _ _ _ @[reassoc (attr := simp)] lemma map_appLE (e : V ≤ f ⁻¹ᵁ U) (i : op U' ⟶ op U) : Y.presheaf.map i ≫ f.appLE U V e = f.appLE U' V (e.trans ((Opens.map f.base).map i.unop).le) := by rw [Hom.appLE, f.naturality_assoc, ← Functor.map_comp] rfl @[reassoc] lemma map_appLE' (e : V ≤ f ⁻¹ᵁ U) (i : U' = U) : Y.presheaf.map (eqToHom i).op ≫ f.appLE U' V (i ▸ e) = f.appLE U V e := map_appLE _ _ _ lemma app_eq_appLE {U : Y.Opens} : f.app U = f.appLE U _ le_rfl := by simp [Hom.appLE] lemma appLE_eq_app {U : Y.Opens} : f.appLE U (f ⁻¹ᵁ U) le_rfl = f.app U := (app_eq_appLE f).symm lemma appLE_congr (e : V ≤ f ⁻¹ᵁ U) (e₁ : U = U') (e₂ : V = V') (P : ∀ {R S : CommRingCat.{u}} (_ : R ⟶ S), Prop) : P (f.appLE U V e) ↔ P (f.appLE U' V' (e₁ ▸ e₂ ▸ e)) := by subst e₁; subst e₂; rfl /-- A morphism of schemes `f : X ⟶ Y` induces a local ring homomorphism from `Y.presheaf.stalk (f x)` to `X.presheaf.stalk x` for any `x : X`. -/ def stalkMap (x : X) : Y.presheaf.stalk (f.base x) ⟶ X.presheaf.stalk x := f.toLRSHom.stalkMap x @[ext (iff := false)] protected lemma ext {f g : X ⟶ Y} (h_base : f.base = g.base) (h_app : ∀ U, f.app U ≫ X.presheaf.map (eqToHom congr((Opens.map $h_base.symm).obj U)).op = g.app U) : f = g := by cases f; cases g; congr 1 exact LocallyRingedSpace.Hom.ext' <\| SheafedSpace.ext _ _ h_base (TopCat.Presheaf.ext fun U ↦ by simpa using h_app U) /-- An alternative ext lemma for scheme morphisms. -/ protected lemma ext' {f g : X ⟶ Y} (h : f.toLRSHom = g.toLRSHom) : f = g := by cases f; cases g; congr 1 lemma preimage_iSup {ι} (U : ι → Opens Y) : f ⁻¹ᵁ iSup U = ⨆ i, f ⁻¹ᵁ U i := Opens.ext (by simp) lemma preimage_iSup_eq_top {ι} {U : ι → Opens Y} (hU : iSup U = ⊤) : ⨆ i, f ⁻¹ᵁ U i = ⊤ := f.preimage_iSup U ▸ hU ▸ rfl lemma preimage_le_preimage_of_le {U U' : Y.Opens} (hUU' : U ≤ U') : f ⁻¹ᵁ U ≤ f ⁻¹ᵁ U' := fun _ ha ↦ hUU' ha end Hom @[simp] lemma preimage_comp {X Y Z : Scheme.{u}} (f : X ⟶ Y) (g : Y ⟶ Z) (U) : (f ≫ g) ⁻¹ᵁ U = f ⁻¹ᵁ g ⁻¹ᵁ U := rfl /-- The forgetful functor from `Scheme` to `LocallyRingedSpace`. -/ @[simps!] def forgetToLocallyRingedSpace : Scheme ⥤ LocallyRingedSpace where obj := toLocallyRingedSpace map := Hom.toLRSHom /-- The forget functor `Scheme ⥤ LocallyRingedSpace` is fully faithful. -/ @[simps preimage_toLRSHom] def fullyFaithfulForgetToLocallyRingedSpace : forgetToLocallyRingedSpace.FullyFaithful where preimage := Hom.mk instance : forgetToLocallyRingedSpace.Full := fullyFaithfulForgetToLocallyRingedSpace.full instance : forgetToLocallyRingedSpace.Faithful := fullyFaithfulForgetToLocallyRingedSpace.faithful /-- The forgetful functor from `Scheme` to `TopCat`. -/ @[simps!] def forgetToTop : Scheme ⥤ TopCat := Scheme.forgetToLocallyRingedSpace ⋙ LocallyRingedSpace.forgetToTop /-- An isomorphism of schemes induces a homeomorphism of the underlying topological spaces. -/ noncomputable def homeoOfIso {X Y : Scheme.{u}} (e : X ≅ Y) : X ≃ₜ Y := TopCat.homeoOfIso (forgetToTop.mapIso e) @[simp] lemma homeoOfIso_symm {X Y : Scheme} (e : X ≅ Y) : (homeoOfIso e).symm = homeoOfIso e.symm := rfl @[simp] lemma homeoOfIso_apply {X Y : Scheme} (e : X ≅ Y) (x : X) : homeoOfIso e x = e.hom.base x := rfl alias _root_.CategoryTheory.Iso.schemeIsoToHomeo := homeoOfIso /-- An isomorphism of schemes induces a homeomorphism of the underlying topological spaces. -/ noncomputable def Hom.homeomorph {X Y : Scheme.{u}} (f : X.Hom Y) [IsIso (C := Scheme) f] : X ≃ₜ Y := (asIso f).schemeIsoToHomeo @[simp] lemma Hom.homeomorph_apply {X Y : Scheme.{u}} (f : X.Hom Y) [IsIso (C := Scheme) f] (x) : f.homeomorph x = f.base x := rfl -- Porting note: Lean seems not able to find this coercion any more instance hasCoeToTopCat : CoeOut Scheme TopCat where coe X := X.carrier	-- Porting note: added this unification hint just in case	Mathlib/AlgebraicGeometry/Scheme.lean	246	247
/- Copyright (c) 2018 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Mario Carneiro, Johan Commelin, Amelia Livingston, Anne Baanen -/ import Mathlib.GroupTheory.Submonoid.Inverses import Mathlib.RingTheory.FiniteType import Mathlib.RingTheory.Localization.Defs /-! # Submonoid of inverses ## Main definitions * `IsLocalization.invSubmonoid M S` is the submonoid of `S = M⁻¹R` consisting of inverses of each element `x ∈ M` ## Implementation notes See `Mathlib/RingTheory/Localization/Basic.lean` for a design overview. ## Tags localization, ring localization, commutative ring localization, characteristic predicate, commutative ring, field of fractions -/ variable {R : Type} [CommRing R] (M : Submonoid R) (S : Type) [CommRing S] variable [Algebra R S] open Function namespace IsLocalization section InvSubmonoid /-- The submonoid of `S = M⁻¹R` consisting of `{ 1 / x \| x ∈ M }`. -/ def invSubmonoid : Submonoid S := (M.map (algebraMap R S)).leftInv variable [IsLocalization M S] theorem submonoid_map_le_is_unit : M.map (algebraMap R S) ≤ IsUnit.submonoid S := by rintro _ ⟨a, ha, rfl⟩ exact IsLocalization.map_units S ⟨_, ha⟩ /-- There is an equivalence of monoids between the image of `M` and `invSubmonoid`. -/ noncomputable abbrev equivInvSubmonoid : M.map (algebraMap R S) ≃* invSubmonoid M S := ((M.map (algebraMap R S)).leftInvEquiv (submonoid_map_le_is_unit M S)).symm /-- There is a canonical map from `M` to `invSubmonoid` sending `x` to `1 / x`. -/ noncomputable def toInvSubmonoid : M →* invSubmonoid M S := (equivInvSubmonoid M S).toMonoidHom.comp ((algebraMap R S : R →* S).submonoidMap M) theorem toInvSubmonoid_surjective : Function.Surjective (toInvSubmonoid M S) := Function.Surjective.comp (β := M.map (algebraMap R S)) (Equiv.surjective (equivInvSubmonoid _ _).toEquiv) (MonoidHom.submonoidMap_surjective _ _) @[simp] theorem toInvSubmonoid_mul (m : M) : (toInvSubmonoid M S m : S) * algebraMap R S m = 1 := Submonoid.leftInvEquiv_symm_mul _ (submonoid_map_le_is_unit _ _) _ @[simp] theorem mul_toInvSubmonoid (m : M) : algebraMap R S m * (toInvSubmonoid M S m : S) = 1 := Submonoid.mul_leftInvEquiv_symm _ (submonoid_map_le_is_unit _ _) ⟨_, _⟩ @[simp] theorem smul_toInvSubmonoid (m : M) : m • (toInvSubmonoid M S m : S) = 1 := by convert mul_toInvSubmonoid M S m ext rw [← Algebra.smul_def] rfl variable {S} -- Porting note: `surj'` was taken, so use `surj''` instead theorem surj'' (z : S) : ∃ (r : R) (m : M), z = r • (toInvSubmonoid M S m : S) := by rcases IsLocalization.surj M z with ⟨⟨r, m⟩, e : z * _ = algebraMap R S r⟩ refine ⟨r, m, ?_⟩ rw [Algebra.smul_def, ← e, mul_assoc] simp theorem toInvSubmonoid_eq_mk' (x : M) : (toInvSubmonoid M S x : S) = mk' S 1 x := by rw [← (IsLocalization.map_units S x).mul_left_inj] simp theorem mem_invSubmonoid_iff_exists_mk' (x : S) : x ∈ invSubmonoid M S ↔ ∃ m : M, mk' S 1 m = x := by simp_rw [← toInvSubmonoid_eq_mk'] exact ⟨fun h => ⟨_, congr_arg Subtype.val (toInvSubmonoid_surjective M S ⟨x, h⟩).choose_spec⟩, fun h => h.choose_spec ▸ (toInvSubmonoid M S h.choose).prop⟩ variable (S)	theorem span_invSubmonoid : Submodule.span R (invSubmonoid M S : Set S) = ⊤ := by rw [eq_top_iff]	Mathlib/RingTheory/Localization/InvSubmonoid.lean	94	96
/- Copyright (c) 2022 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.CategoryTheory.Adjunction.FullyFaithful import Mathlib.CategoryTheory.Adjunction.Limits import Mathlib.CategoryTheory.Limits.Shapes.Pullback.CommSq import Mathlib.CategoryTheory.Limits.Shapes.StrictInitial import Mathlib.CategoryTheory.Limits.FunctorCategory.Basic import Mathlib.CategoryTheory.Limits.Constructions.FiniteProductsOfBinaryProducts /-! # Universal colimits and van Kampen colimits ## Main definitions - `CategoryTheory.IsUniversalColimit`: A (colimit) cocone over a diagram `F : J ⥤ C` is universal if it is stable under pullbacks. - `CategoryTheory.IsVanKampenColimit`: A (colimit) cocone over a diagram `F : J ⥤ C` is van Kampen if for every cocone `c'` over the pullback of the diagram `F' : J ⥤ C'`, `c'` is colimiting iff `c'` is the pullback of `c`. ## References - https://ncatlab.org/nlab/show/van+Kampen+colimit - [Stephen Lack and Paweł Sobociński, Adhesive Categories][adhesive2004] -/ open CategoryTheory.Limits namespace CategoryTheory universe v' u' v u variable {J : Type v'} [Category.{u'} J] {C : Type u} [Category.{v} C] variable {K : Type} [Category K] {D : Type} [Category D] section NatTrans /-- A natural transformation is equifibered if every commutative square of the following form is a pullback. ``` F(X) → F(Y) ↓ ↓ G(X) → G(Y) ``` -/ def NatTrans.Equifibered {F G : J ⥤ C} (α : F ⟶ G) : Prop := ∀ ⦃i j : J⦄ (f : i ⟶ j), IsPullback (F.map f) (α.app i) (α.app j) (G.map f) theorem NatTrans.equifibered_of_isIso {F G : J ⥤ C} (α : F ⟶ G) [IsIso α] : Equifibered α := fun _ _ f => IsPullback.of_vert_isIso ⟨NatTrans.naturality _ f⟩ theorem NatTrans.Equifibered.comp {F G H : J ⥤ C} {α : F ⟶ G} {β : G ⟶ H} (hα : Equifibered α) (hβ : Equifibered β) : Equifibered (α ≫ β) := fun _ _ f => (hα f).paste_vert (hβ f) theorem NatTrans.Equifibered.whiskerRight {F G : J ⥤ C} {α : F ⟶ G} (hα : Equifibered α) (H : C ⥤ D) [∀ (i j : J) (f : j ⟶ i), PreservesLimit (cospan (α.app i) (G.map f)) H] : Equifibered (whiskerRight α H) := fun _ _ f => (hα f).map H theorem NatTrans.Equifibered.whiskerLeft {K : Type} [Category K] {F G : J ⥤ C} {α : F ⟶ G} (hα : Equifibered α) (H : K ⥤ J) : Equifibered (whiskerLeft H α) := fun _ _ f => hα (H.map f) theorem mapPair_equifibered {F F' : Discrete WalkingPair ⥤ C} (α : F ⟶ F') : NatTrans.Equifibered α := by rintro ⟨⟨⟩⟩ ⟨j⟩ ⟨⟨rfl : _ = j⟩⟩ all_goals dsimp; simp only [Discrete.functor_map_id] exact IsPullback.of_horiz_isIso ⟨by simp only [Category.comp_id, Category.id_comp]⟩ theorem NatTrans.equifibered_of_discrete {ι : Type} {F G : Discrete ι ⥤ C} (α : F ⟶ G) : NatTrans.Equifibered α := by rintro ⟨i⟩ ⟨j⟩ ⟨⟨rfl : i = j⟩⟩ simp only [Discrete.functor_map_id] exact IsPullback.of_horiz_isIso ⟨by rw [Category.id_comp, Category.comp_id]⟩ end NatTrans /-- A (colimit) cocone over a diagram `F : J ⥤ C` is universal if it is stable under pullbacks. -/ def IsUniversalColimit {F : J ⥤ C} (c : Cocone F) : Prop := ∀ ⦃F' : J ⥤ C⦄ (c' : Cocone F') (α : F' ⟶ F) (f : c'.pt ⟶ c.pt) (_ : α ≫ c.ι = c'.ι ≫ (Functor.const J).map f) (_ : NatTrans.Equifibered α), (∀ j : J, IsPullback (c'.ι.app j) (α.app j) f (c.ι.app j)) → Nonempty (IsColimit c') /-- A (colimit) cocone over a diagram `F : J ⥤ C` is van Kampen if for every cocone `c'` over the pullback of the diagram `F' : J ⥤ C'`, `c'` is colimiting iff `c'` is the pullback of `c`. TODO: Show that this is iff the functor `C ⥤ Catᵒᵖ` sending `x` to `C/x` preserves it. TODO: Show that this is iff the inclusion functor `C ⥤ Span(C)` preserves it. -/ def IsVanKampenColimit {F : J ⥤ C} (c : Cocone F) : Prop := ∀ ⦃F' : J ⥤ C⦄ (c' : Cocone F') (α : F' ⟶ F) (f : c'.pt ⟶ c.pt) (_ : α ≫ c.ι = c'.ι ≫ (Functor.const J).map f) (_ : NatTrans.Equifibered α), Nonempty (IsColimit c') ↔ ∀ j : J, IsPullback (c'.ι.app j) (α.app j) f (c.ι.app j) theorem IsVanKampenColimit.isUniversal {F : J ⥤ C} {c : Cocone F} (H : IsVanKampenColimit c) : IsUniversalColimit c := fun _ c' α f h hα => (H c' α f h hα).mpr /-- A universal colimit is a colimit. -/ noncomputable def IsUniversalColimit.isColimit {F : J ⥤ C} {c : Cocone F} (h : IsUniversalColimit c) : IsColimit c := by refine ((h c (𝟙 F) (𝟙 c.pt :) (by rw [Functor.map_id, Category.comp_id, Category.id_comp]) (NatTrans.equifibered_of_isIso _)) fun j => ?_).some haveI : IsIso (𝟙 c.pt) := inferInstance exact IsPullback.of_vert_isIso ⟨by simp⟩ /-- A van Kampen colimit is a colimit. -/ noncomputable def IsVanKampenColimit.isColimit {F : J ⥤ C} {c : Cocone F} (h : IsVanKampenColimit c) : IsColimit c := h.isUniversal.isColimit theorem IsInitial.isVanKampenColimit [HasStrictInitialObjects C] {X : C} (h : IsInitial X) : IsVanKampenColimit (asEmptyCocone X) := by intro F' c' α f hf hα have : F' = Functor.empty C := by apply Functor.hext <;> rintro ⟨⟨⟩⟩ subst this haveI := h.isIso_to f refine ⟨by rintro _ ⟨⟨⟩⟩, fun _ => ⟨IsColimit.ofIsoColimit h (Cocones.ext (asIso f).symm <\| by rintro ⟨⟨⟩⟩)⟩⟩ section Functor theorem IsUniversalColimit.of_iso {F : J ⥤ C} {c c' : Cocone F} (hc : IsUniversalColimit c) (e : c ≅ c') : IsUniversalColimit c' := by intro F' c'' α f h hα H have : c'.ι ≫ (Functor.const J).map e.inv.hom = c.ι := by ext j exact e.inv.2 j apply hc c'' α (f ≫ e.inv.1) (by rw [Functor.map_comp, ← reassoc_of% h, this]) hα intro j rw [← Category.comp_id (α.app j)] have : IsIso e.inv.hom := Functor.map_isIso (Cocones.forget _) e.inv exact (H j).paste_vert (IsPullback.of_vert_isIso ⟨by simp⟩) theorem IsVanKampenColimit.of_iso {F : J ⥤ C} {c c' : Cocone F} (H : IsVanKampenColimit c) (e : c ≅ c') : IsVanKampenColimit c' := by intro F' c'' α f h hα have : c'.ι ≫ (Functor.const J).map e.inv.hom = c.ι := by ext j exact e.inv.2 j rw [H c'' α (f ≫ e.inv.1) (by rw [Functor.map_comp, ← reassoc_of% h, this]) hα] apply forall_congr' intro j conv_lhs => rw [← Category.comp_id (α.app j)] haveI : IsIso e.inv.hom := Functor.map_isIso (Cocones.forget _) e.inv exact (IsPullback.of_vert_isIso ⟨by simp⟩).paste_vert_iff (NatTrans.congr_app h j).symm	theorem IsVanKampenColimit.precompose_isIso {F G : J ⥤ C} (α : F ⟶ G) [IsIso α] {c : Cocone G} (hc : IsVanKampenColimit c) : IsVanKampenColimit ((Cocones.precompose α).obj c) := by intros F' c' α' f e hα refine (hc c' (α' ≫ α) f ((Category.assoc _ _ _).trans e) (hα.comp (NatTrans.equifibered_of_isIso _))).trans ?_ apply forall_congr' intro j simp only [Functor.const_obj_obj, NatTrans.comp_app, Cocones.precompose_obj_pt, Cocones.precompose_obj_ι] have : IsPullback (α.app j ≫ c.ι.app j) (α.app j) (𝟙 _) (c.ι.app j) :=	Mathlib/CategoryTheory/Limits/VanKampen.lean	153	164
/- Copyright (c) 2022 Eric Rodriguez. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Eric Rodriguez -/ import Mathlib.Algebra.GroupWithZero.Units.Lemmas import Mathlib.Algebra.Order.BigOperators.Group.Finset import Mathlib.Algebra.Order.Ring.Cast import Mathlib.Data.Fintype.BigOperators import Mathlib.Tactic.DeriveFintype /-! # Sign function This file defines the sign function for types with zero and a decidable less-than relation, and proves some basic theorems about it. -/ -- Don't generate unnecessary `sizeOf_spec` lemmas which the `simpNF` linter will complain about. set_option genSizeOfSpec false in /-- The type of signs. -/ inductive SignType \| zero \| neg \| pos deriving DecidableEq, Inhabited, Fintype namespace SignType instance : Zero SignType := ⟨zero⟩ instance : One SignType := ⟨pos⟩ instance : Neg SignType := ⟨fun s => match s with \| neg => pos \| zero => zero \| pos => neg⟩ @[simp] theorem zero_eq_zero : zero = 0 := rfl @[simp] theorem neg_eq_neg_one : neg = -1 := rfl @[simp] theorem pos_eq_one : pos = 1 := rfl instance : Mul SignType := ⟨fun x y => match x with \| neg => -y \| zero => zero \| pos => y⟩ /-- The less-than-or-equal relation on signs. -/ protected inductive LE : SignType → SignType → Prop \| of_neg (a) : SignType.LE neg a \| zero : SignType.LE zero zero \| of_pos (a) : SignType.LE a pos instance : LE SignType := ⟨SignType.LE⟩ instance LE.decidableRel : DecidableRel SignType.LE := fun a b => by cases a <;> cases b <;> first \| exact isTrue (by constructor)\| exact isFalse (by rintro ⟨_⟩) instance decidableEq : DecidableEq SignType := fun a b => by cases a <;> cases b <;> first \| exact isTrue (by constructor)\| exact isFalse (by rintro ⟨_⟩) private lemma mul_comm : ∀ (a b : SignType), a * b = b * a := by rintro ⟨⟩ ⟨⟩ <;> rfl private lemma mul_assoc : ∀ (a b c : SignType), (a * b) * c = a * (b * c) := by rintro ⟨⟩ ⟨⟩ ⟨⟩ <;> rfl /- We can define a `Field` instance on `SignType`, but it's not mathematically sensible, so we only define the `CommGroupWithZero`. -/ instance : CommGroupWithZero SignType where zero := 0 one := 1 mul := (· * ·) inv := id mul_zero a := by cases a <;> rfl zero_mul a := by cases a <;> rfl mul_one a := by cases a <;> rfl one_mul a := by cases a <;> rfl mul_inv_cancel a ha := by cases a <;> trivial mul_comm := mul_comm mul_assoc := mul_assoc exists_pair_ne := ⟨0, 1, by rintro ⟨_⟩⟩ inv_zero := rfl private lemma le_antisymm (a b : SignType) (_ : a ≤ b) (_ : b ≤ a) : a = b := by cases a <;> cases b <;> trivial private lemma le_trans (a b c : SignType) (_ : a ≤ b) (_ : b ≤ c) : a ≤ c := by cases a <;> cases b <;> cases c <;> tauto instance : LinearOrder SignType where le := (· ≤ ·) le_refl a := by cases a <;> constructor le_total a b := by cases a <;> cases b <;> first \| left; constructor \| right; constructor le_antisymm := le_antisymm le_trans := le_trans toDecidableLE := LE.decidableRel toDecidableEq := SignType.decidableEq instance : BoundedOrder SignType where	top := 1 le_top := LE.of_pos	Mathlib/Data/Sign.lean	114	115
/- Copyright (c) 2021 Thomas Browning. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Thomas Browning -/ import Mathlib.GroupTheory.Index /-! # Complements In this file we define the complement of a subgroup. ## Main definitions - `Subgroup.IsComplement S T` where `S` and `T` are subsets of `G` states that every `g : G` can be written uniquely as a product `s * t` for `s ∈ S`, `t ∈ T`. - `H.LeftTransversal` where `H` is a subgroup of `G` is the type of all left-complements of `H`, i.e. the set of all `S : Set G` that contain exactly one element of each left coset of `H`. - `H.RightTransversal` where `H` is a subgroup of `G` is the set of all right-complements of `H`, i.e. the set of all `T : Set G` that contain exactly one element of each right coset of `H`. ## Main results - `isComplement'_of_coprime` : Subgroups of coprime order are complements. -/ open Function Set open scoped Pointwise namespace Subgroup variable {G : Type} [Group G] (H K : Subgroup G) (S T : Set G) /-- `S` and `T` are complements if `() : S × T → G` is a bijection. This notion generalizes left transversals, right transversals, and complementary subgroups. -/ @[to_additive "`S` and `T` are complements if `(+) : S × T → G` is a bijection"] def IsComplement : Prop := Function.Bijective fun x : S × T => x.1.1 * x.2.1 /-- `H` and `K` are complements if `() : H × K → G` is a bijection -/ @[to_additive "`H` and `K` are complements if `(+) : H × K → G` is a bijection"] abbrev IsComplement' := IsComplement (H : Set G) (K : Set G) /-- The set of left-complements of `T : Set G` -/ @[to_additive (attr := deprecated IsComplement (since := "2024-12-18")) "The set of left-complements of `T : Set G`"] def leftTransversals : Set (Set G) := { S : Set G \| IsComplement S T } /-- The set of right-complements of `S : Set G` -/ @[to_additive (attr := deprecated IsComplement (since := "2024-12-18")) "The set of right-complements of `S : Set G`"] def rightTransversals : Set (Set G) := { T : Set G \| IsComplement S T } variable {H K S T} @[to_additive] theorem isComplement'_def : IsComplement' H K ↔ IsComplement (H : Set G) (K : Set G) := Iff.rfl @[to_additive] theorem isComplement_iff_existsUnique : IsComplement S T ↔ ∀ g : G, ∃! x : S × T, x.1.1 x.2.1 = g := Function.bijective_iff_existsUnique _ @[to_additive] theorem IsComplement.existsUnique (h : IsComplement S T) (g : G) : ∃! x : S × T, x.1.1 * x.2.1 = g := isComplement_iff_existsUnique.mp h g @[to_additive] theorem IsComplement'.symm (h : IsComplement' H K) : IsComplement' K H := by let ϕ : H × K ≃ K × H := Equiv.mk (fun x => ⟨x.2⁻¹, x.1⁻¹⟩) (fun x => ⟨x.2⁻¹, x.1⁻¹⟩) (fun x => Prod.ext (inv_inv _) (inv_inv _)) fun x => Prod.ext (inv_inv _) (inv_inv _) let ψ : G ≃ G := Equiv.mk (fun g : G => g⁻¹) (fun g : G => g⁻¹) inv_inv inv_inv suffices hf : (ψ ∘ fun x : H × K => x.1.1 * x.2.1) = (fun x : K × H => x.1.1 * x.2.1) ∘ ϕ by rw [isComplement'_def, IsComplement, ← Equiv.bijective_comp ϕ] apply (congr_arg Function.Bijective hf).mp -- Porting note: This was a `rw` in mathlib3 rwa [ψ.comp_bijective] exact funext fun x => mul_inv_rev _ _ @[to_additive] theorem isComplement'_comm : IsComplement' H K ↔ IsComplement' K H := ⟨IsComplement'.symm, IsComplement'.symm⟩ @[to_additive] theorem isComplement_univ_singleton {g : G} : IsComplement (univ : Set G) {g} := ⟨fun ⟨_, _, rfl⟩ ⟨_, _, rfl⟩ h => Prod.ext (Subtype.ext (mul_right_cancel h)) rfl, fun x => ⟨⟨⟨x * g⁻¹, ⟨⟩⟩, g, rfl⟩, inv_mul_cancel_right x g⟩⟩ @[to_additive] theorem isComplement_singleton_univ {g : G} : IsComplement ({g} : Set G) univ := ⟨fun ⟨⟨_, rfl⟩, _⟩ ⟨⟨_, rfl⟩, _⟩ h => Prod.ext rfl (Subtype.ext (mul_left_cancel h)), fun x => ⟨⟨⟨g, rfl⟩, g⁻¹ * x, ⟨⟩⟩, mul_inv_cancel_left g x⟩⟩ @[to_additive] theorem isComplement_singleton_left {g : G} : IsComplement {g} S ↔ S = univ := by refine ⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => (congr_arg _ h).mpr isComplement_singleton_univ⟩ obtain ⟨⟨⟨z, rfl : z = g⟩, y, _⟩, hy⟩ := h.2 (g * x) rwa [← mul_left_cancel hy] @[to_additive] theorem isComplement_singleton_right {g : G} : IsComplement S {g} ↔ S = univ := by refine ⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => h ▸ isComplement_univ_singleton⟩ obtain ⟨y, hy⟩ := h.2 (x * g) conv_rhs at hy => rw [← show y.2.1 = g from y.2.2] rw [← mul_right_cancel hy] exact y.1.2 @[to_additive] theorem isComplement_univ_left : IsComplement univ S ↔ ∃ g : G, S = {g} := by refine ⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩ · obtain ⟨a, _⟩ := h.2 1 exact ⟨a.2.1, a.2.2⟩ · have : (⟨⟨_, mem_top a⁻¹⟩, ⟨a, ha⟩⟩ : (⊤ : Set G) × S) = ⟨⟨_, mem_top b⁻¹⟩, ⟨b, hb⟩⟩ := h.1 ((inv_mul_cancel a).trans (inv_mul_cancel b).symm) exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).2 · rintro ⟨g, rfl⟩ exact isComplement_univ_singleton @[to_additive] theorem isComplement_univ_right : IsComplement S univ ↔ ∃ g : G, S = {g} := by refine ⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩ · obtain ⟨a, _⟩ := h.2 1 exact ⟨a.1.1, a.1.2⟩ · have : (⟨⟨a, ha⟩, ⟨_, mem_top a⁻¹⟩⟩ : S × (⊤ : Set G)) = ⟨⟨b, hb⟩, ⟨_, mem_top b⁻¹⟩⟩ := h.1 ((mul_inv_cancel a).trans (mul_inv_cancel b).symm) exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).1 · rintro ⟨g, rfl⟩ exact isComplement_singleton_univ @[to_additive] lemma IsComplement.mul_eq (h : IsComplement S T) : S * T = univ := eq_univ_of_forall fun x ↦ by simpa [mem_mul] using (h.existsUnique x).exists @[to_additive (attr := simp)] lemma not_isComplement_empty_left : ¬ IsComplement ∅ T := fun h ↦ by simpa [eq_comm (a := ∅)] using h.mul_eq @[to_additive (attr := simp)] lemma not_isComplement_empty_right : ¬ IsComplement S ∅ := fun h ↦ by simpa [eq_comm (a := ∅)] using h.mul_eq @[to_additive] lemma IsComplement.nonempty_left (hst : IsComplement S T) : S.Nonempty := by contrapose! hst; simp [hst] @[to_additive] lemma IsComplement.nonempty_right (hst : IsComplement S T) : T.Nonempty := by contrapose! hst; simp [hst] @[to_additive] lemma IsComplement.pairwiseDisjoint_smul (hst : IsComplement S T) : S.PairwiseDisjoint (· • T) := fun a ha b hb hab ↦ disjoint_iff_forall_ne.2 <\| by rintro _ ⟨c, hc, rfl⟩ _ ⟨d, hd, rfl⟩ exact hst.1.ne (a₁ := (⟨a, ha⟩, ⟨c, hc⟩)) (a₂:= (⟨b, hb⟩, ⟨d, hd⟩)) (by simp [hab]) @[to_additive AddSubgroup.IsComplement.card_mul_card] lemma IsComplement.card_mul_card (h : IsComplement S T) : Nat.card S * Nat.card T = Nat.card G := (Nat.card_prod _ _).symm.trans <\| Nat.card_congr <\| Equiv.ofBijective _ h @[to_additive] theorem isComplement'_top_bot : IsComplement' (⊤ : Subgroup G) ⊥ := isComplement_univ_singleton @[to_additive] theorem isComplement'_bot_top : IsComplement' (⊥ : Subgroup G) ⊤ := isComplement_singleton_univ @[to_additive (attr := simp)] theorem isComplement'_bot_left : IsComplement' ⊥ H ↔ H = ⊤ := isComplement_singleton_left.trans coe_eq_univ @[to_additive (attr := simp)] theorem isComplement'_bot_right : IsComplement' H ⊥ ↔ H = ⊤ := isComplement_singleton_right.trans coe_eq_univ @[to_additive (attr := simp)] theorem isComplement'_top_left : IsComplement' ⊤ H ↔ H = ⊥ := isComplement_univ_left.trans coe_eq_singleton @[to_additive (attr := simp)] theorem isComplement'_top_right : IsComplement' H ⊤ ↔ H = ⊥ := isComplement_univ_right.trans coe_eq_singleton @[to_additive] lemma isComplement_iff_existsUnique_inv_mul_mem : IsComplement S T ↔ ∀ g, ∃! s : S, (s : G)⁻¹ * g ∈ T := by convert isComplement_iff_existsUnique with g constructor <;> rintro ⟨x, hx, hx'⟩ · exact ⟨(x, ⟨_, hx⟩), by simp, by aesop⟩ · exact ⟨x.1, by simp [← hx], fun y hy ↦ (Prod.ext_iff.1 <\| by simpa using hx' (y, ⟨_, hy⟩)).1⟩ set_option linter.deprecated false in @[to_additive (attr := deprecated isComplement_iff_existsUnique_inv_mul_mem (since := "2024-12-18"))] theorem mem_leftTransversals_iff_existsUnique_inv_mul_mem : S ∈ leftTransversals T ↔ ∀ g : G, ∃! s : S, (s : G)⁻¹ * g ∈ T := by rw [leftTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique] refine ⟨fun h g => ?_, fun h g => ?_⟩ · obtain ⟨x, h1, h2⟩ := h g exact ⟨x.1, (congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq h1)).mp x.2.2, fun y hy => (Prod.ext_iff.mp (h2 ⟨y, (↑y)⁻¹ * g, hy⟩ (mul_inv_cancel_left ↑y g))).1⟩ · obtain ⟨x, h1, h2⟩ := h g refine ⟨⟨x, (↑x)⁻¹ * g, h1⟩, mul_inv_cancel_left (↑x) g, fun y hy => ?_⟩ have hf := h2 y.1 ((congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq hy)).mp y.2.2) exact Prod.ext hf (Subtype.ext (eq_inv_mul_of_mul_eq (hf ▸ hy))) @[to_additive] lemma isComplement_iff_existsUnique_mul_inv_mem : IsComplement S T ↔ ∀ g, ∃! t : T, g * (t : G)⁻¹ ∈ S := by convert isComplement_iff_existsUnique with g constructor <;> rintro ⟨x, hx, hx'⟩ · exact ⟨(⟨_, hx⟩, x), by simp, by aesop⟩ · exact ⟨x.2, by simp [← hx], fun y hy ↦ (Prod.ext_iff.1 <\| by simpa using hx' (⟨_, hy⟩, y)).2⟩ set_option linter.deprecated false in @[to_additive (attr := deprecated isComplement_iff_existsUnique_mul_inv_mem (since := "2024-12-18"))] theorem mem_rightTransversals_iff_existsUnique_mul_inv_mem : S ∈ rightTransversals T ↔ ∀ g : G, ∃! s : S, g * (s : G)⁻¹ ∈ T := by rw [rightTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique] refine ⟨fun h g => ?_, fun h g => ?_⟩ · obtain ⟨x, h1, h2⟩ := h g exact ⟨x.2, (congr_arg (· ∈ T) (eq_mul_inv_of_mul_eq h1)).mp x.1.2, fun y hy => (Prod.ext_iff.mp (h2 ⟨⟨g * (↑y)⁻¹, hy⟩, y⟩ (inv_mul_cancel_right g y))).2⟩ · obtain ⟨x, h1, h2⟩ := h g refine ⟨⟨⟨g * (↑x)⁻¹, h1⟩, x⟩, inv_mul_cancel_right g x, fun y hy => ?_⟩ have hf := h2 y.2 ((congr_arg (· ∈ T) (eq_mul_inv_of_mul_eq hy)).mp y.1.2) exact Prod.ext (Subtype.ext (eq_mul_inv_of_mul_eq (hf ▸ hy))) hf @[to_additive] lemma isComplement_subgroup_right_iff_existsUnique_quotientGroupMk : IsComplement S H ↔ ∀ q : G ⧸ H, ∃! s : S, QuotientGroup.mk s.1 = q := by simp_rw [isComplement_iff_existsUnique_inv_mul_mem, SetLike.mem_coe, ← QuotientGroup.eq, QuotientGroup.forall_mk] set_option linter.deprecated false in @[to_additive	(attr := deprecated isComplement_subgroup_right_iff_existsUnique_quotientGroupMk (since := "2024-12-18"))] theorem mem_leftTransversals_iff_existsUnique_quotient_mk''_eq : S ∈ leftTransversals (H : Set G) ↔ ∀ q : Quotient (QuotientGroup.leftRel H), ∃! s : S, Quotient.mk'' s.1 = q := by simp_rw [mem_leftTransversals_iff_existsUnique_inv_mul_mem, SetLike.mem_coe, ←	Mathlib/GroupTheory/Complement.lean	248	253

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