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/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.ShortComplex.LeftHomology import Mathlib.CategoryTheory.Limits.Opposites /-! # Right Homology of short complexes In this file, we define the dual notions to those defined in `Algebra.Homology.ShortComplex.LeftHomology`. In particular, if `S : ShortComplex C` is a short complex consisting of two composable maps `f : X₁ ⟶ X₂` and `g : X₂ ⟶ X₃` such that `f ≫ g = 0`, we define `h : S.RightHomologyData` to be the datum of morphisms `p : X₂ ⟶ Q` and `ι : H ⟶ Q` such that `Q` identifies to the cokernel of `f` and `H` to the kernel of the induced map `g' : Q ⟶ X₃`. When such a `S.RightHomologyData` exists, we shall say that `[S.HasRightHomology]` and we define `S.rightHomology` to be the `H` field of a chosen right homology data. Similarly, we define `S.opcycles` to be the `Q` field. In `Homology.lean`, when `S` has two compatible left and right homology data (i.e. they give the same `H` up to a canonical isomorphism), we shall define `[S.HasHomology]` and `S.homology`. -/ namespace CategoryTheory open Category Limits namespace ShortComplex variable {C : Type*} [Category C] [HasZeroMorphisms C] (S : ShortComplex C) {S₁ S₂ S₃ : ShortComplex C} /-- A right homology data for a short complex `S` consists of morphisms `p : S.X₂ ⟶ Q` and `ι : H ⟶ Q` such that `p` identifies `Q` to the kernel of `f : S.X₁ ⟶ S.X₂`, and that `ι` identifies `H` to the kernel of the induced map `g' : Q ⟶ S.X₃` -/ structure RightHomologyData where /-- a choice of cokernel of `S.f : S.X₁ ⟶ S.X₂` -/ Q : C /-- a choice of kernel of the induced morphism `S.g' : S.Q ⟶ X₃` -/ H : C /-- the projection from `S.X₂` -/ p : S.X₂ ⟶ Q /-- the inclusion of the (right) homology in the chosen cokernel of `S.f` -/ ι : H ⟶ Q /-- the cokernel condition for `p` -/ wp : S.f ≫ p = 0 /-- `p : S.X₂ ⟶ Q` is a cokernel of `S.f : S.X₁ ⟶ S.X₂` -/ hp : IsColimit (CokernelCofork.ofπ p wp) /-- the kernel condition for `ι` -/ wι : ι ≫ hp.desc (CokernelCofork.ofπ _ S.zero) = 0 /-- `ι : H ⟶ Q` is a kernel of `S.g' : Q ⟶ S.X₃` -/ hι : IsLimit (KernelFork.ofι ι wι) initialize_simps_projections RightHomologyData (-hp, -hι) namespace RightHomologyData /-- The chosen cokernels and kernels of the limits API give a `RightHomologyData` -/ @[simps] noncomputable def ofHasCokernelOfHasKernel [HasCokernel S.f] [HasKernel (cokernel.desc S.f S.g S.zero)] : S.RightHomologyData := { Q := cokernel S.f, H := kernel (cokernel.desc S.f S.g S.zero), p := cokernel.π _, ι := kernel.ι _, wp := cokernel.condition _, hp := cokernelIsCokernel _, wι := kernel.condition _, hι := kernelIsKernel _, } attribute [reassoc (attr := simp)] wp wι variable {S} variable (h : S.RightHomologyData) {A : C} instance : Epi h.p := ⟨fun _ _ => Cofork.IsColimit.hom_ext h.hp⟩ instance : Mono h.ι := ⟨fun _ _ => Fork.IsLimit.hom_ext h.hι⟩ /-- Any morphism `k : S.X₂ ⟶ A` such that `S.f ≫ k = 0` descends to a morphism `Q ⟶ A` -/ def descQ (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) : h.Q ⟶ A := h.hp.desc (CokernelCofork.ofπ k hk) @[reassoc (attr := simp)] lemma p_descQ (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) : h.p ≫ h.descQ k hk = k := h.hp.fac _ WalkingParallelPair.one /-- The morphism from the (right) homology attached to a morphism `k : S.X₂ ⟶ A` such that `S.f ≫ k = 0`. -/ @[simp] def descH (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) : h.H ⟶ A := h.ι ≫ h.descQ k hk /-- The morphism `h.Q ⟶ S.X₃` induced by `S.g : S.X₂ ⟶ S.X₃` and the fact that `h.Q` is a cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ def g' : h.Q ⟶ S.X₃ := h.descQ S.g S.zero @[reassoc (attr := simp)] lemma p_g' : h.p ≫ h.g' = S.g := p_descQ _ _ _ @[reassoc (attr := simp)] lemma ι_g' : h.ι ≫ h.g' = 0 := h.wι @[reassoc] lemma ι_descQ_eq_zero_of_boundary (k : S.X₂ ⟶ A) (x : S.X₃ ⟶ A) (hx : k = S.g ≫ x) : h.ι ≫ h.descQ k (by rw [hx, S.zero_assoc, zero_comp]) = 0 := by rw [show 0 = h.ι ≫ h.g' ≫ x by simp] congr 1 simp only [← cancel_epi h.p, hx, p_descQ, p_g'_assoc] /-- For `h : S.RightHomologyData`, this is a restatement of `h.hι`, saying that `ι : h.H ⟶ h.Q` is a kernel of `h.g' : h.Q ⟶ S.X₃`. -/ def hι' : IsLimit (KernelFork.ofι h.ι h.ι_g') := h.hι /-- The morphism `A ⟶ H` induced by a morphism `k : A ⟶ Q` such that `k ≫ g' = 0` -/ def liftH (k : A ⟶ h.Q) (hk : k ≫ h.g' = 0) : A ⟶ h.H := h.hι.lift (KernelFork.ofι k hk) @[reassoc (attr := simp)] lemma liftH_ι (k : A ⟶ h.Q) (hk : k ≫ h.g' = 0) : h.liftH k hk ≫ h.ι = k := h.hι.fac (KernelFork.ofι k hk) WalkingParallelPair.zero lemma isIso_p (hf : S.f = 0) : IsIso h.p := ⟨h.descQ (𝟙 S.X₂) (by rw [hf, comp_id]), p_descQ _ _ _, by simp only [← cancel_epi h.p, p_descQ_assoc, id_comp, comp_id]⟩ lemma isIso_ι (hg : S.g = 0) : IsIso h.ι := by have ⟨φ, hφ⟩ := KernelFork.IsLimit.lift' h.hι' (𝟙 _) (by rw [← cancel_epi h.p, id_comp, p_g', comp_zero, hg]) dsimp at hφ exact ⟨φ, by rw [← cancel_mono h.ι, assoc, hφ, comp_id, id_comp], hφ⟩ variable (S) /-- When the first map `S.f` is zero, this is the right homology data on `S` given by any limit kernel fork of `S.g` -/ @[simps] def ofIsLimitKernelFork (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) : S.RightHomologyData where Q := S.X₂ H := c.pt p := 𝟙 _ ι := c.ι wp := by rw [comp_id, hf] hp := CokernelCofork.IsColimit.ofId _ hf wι := KernelFork.condition _ hι := IsLimit.ofIsoLimit hc (Fork.ext (Iso.refl _) (by simp)) @[simp] lemma ofIsLimitKernelFork_g' (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) : (ofIsLimitKernelFork S hf c hc).g' = S.g := by rw [← cancel_epi (ofIsLimitKernelFork S hf c hc).p, p_g', ofIsLimitKernelFork_p, id_comp] /-- When the first map `S.f` is zero, this is the right homology data on `S` given by the chosen `kernel S.g` -/ @[simps!] noncomputable def ofHasKernel [HasKernel S.g] (hf : S.f = 0) : S.RightHomologyData := ofIsLimitKernelFork S hf _ (kernelIsKernel _) /-- When the second map `S.g` is zero, this is the right homology data on `S` given by any colimit cokernel cofork of `S.g` -/ @[simps] def ofIsColimitCokernelCofork (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : S.RightHomologyData where Q := c.pt H := c.pt p := c.π ι := 𝟙 _ wp := CokernelCofork.condition _ hp := IsColimit.ofIsoColimit hc (Cofork.ext (Iso.refl _) (by simp)) wι := Cofork.IsColimit.hom_ext hc (by simp [hg]) hι := KernelFork.IsLimit.ofId _ (Cofork.IsColimit.hom_ext hc (by simp [hg])) @[simp] lemma ofIsColimitCokernelCofork_g' (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : (ofIsColimitCokernelCofork S hg c hc).g' = 0 := by rw [← cancel_epi (ofIsColimitCokernelCofork S hg c hc).p, p_g', hg, comp_zero] /-- When the second map `S.g` is zero, this is the right homology data on `S` given by the chosen `cokernel S.f` -/ @[simp] noncomputable def ofHasCokernel [HasCokernel S.f] (hg : S.g = 0) : S.RightHomologyData := ofIsColimitCokernelCofork S hg _ (cokernelIsCokernel _) /-- When both `S.f` and `S.g` are zero, the middle object `S.X₂` gives a right homology data on S -/ @[simps] def ofZeros (hf : S.f = 0) (hg : S.g = 0) : S.RightHomologyData where Q := S.X₂ H := S.X₂ p := 𝟙 _ ι := 𝟙 _ wp := by rw [comp_id, hf] hp := CokernelCofork.IsColimit.ofId _ hf wι := by change 𝟙 _ ≫ S.g = 0 simp only [hg, comp_zero] hι := KernelFork.IsLimit.ofId _ hg @[simp] lemma ofZeros_g' (hf : S.f = 0) (hg : S.g = 0) : (ofZeros S hf hg).g' = 0 := by rw [← cancel_epi ((ofZeros S hf hg).p), comp_zero, p_g', hg] end RightHomologyData /-- A short complex `S` has right homology when there exists a `S.RightHomologyData` -/ class HasRightHomology : Prop where condition : Nonempty S.RightHomologyData /-- A chosen `S.RightHomologyData` for a short complex `S` that has right homology -/ noncomputable def rightHomologyData [HasRightHomology S] : S.RightHomologyData := HasRightHomology.condition.some variable {S} namespace HasRightHomology lemma mk' (h : S.RightHomologyData) : HasRightHomology S := ⟨Nonempty.intro h⟩ instance of_hasCokernel_of_hasKernel [HasCokernel S.f] [HasKernel (cokernel.desc S.f S.g S.zero)] : S.HasRightHomology := HasRightHomology.mk' (RightHomologyData.ofHasCokernelOfHasKernel S) instance of_hasKernel {Y Z : C} (g : Y ⟶ Z) (X : C) [HasKernel g] : (ShortComplex.mk (0 : X ⟶ Y) g zero_comp).HasRightHomology := HasRightHomology.mk' (RightHomologyData.ofHasKernel _ rfl) instance of_hasCokernel {X Y : C} (f : X ⟶ Y) (Z : C) [HasCokernel f] : (ShortComplex.mk f (0 : Y ⟶ Z) comp_zero).HasRightHomology := HasRightHomology.mk' (RightHomologyData.ofHasCokernel _ rfl) instance of_zeros (X Y Z : C) : (ShortComplex.mk (0 : X ⟶ Y) (0 : Y ⟶ Z) zero_comp).HasRightHomology := HasRightHomology.mk' (RightHomologyData.ofZeros _ rfl rfl) end HasRightHomology namespace RightHomologyData /-- A right homology data for a short complex `S` induces a left homology data for `S.op`. -/ @[simps] def op (h : S.RightHomologyData) : S.op.LeftHomologyData where K := Opposite.op h.Q H := Opposite.op h.H i := h.p.op π := h.ι.op wi := Quiver.Hom.unop_inj h.wp hi := CokernelCofork.IsColimit.ofπOp _ _ h.hp wπ := Quiver.Hom.unop_inj h.wι hπ := KernelFork.IsLimit.ofιOp _ _ h.hι @[simp] lemma op_f' (h : S.RightHomologyData) : h.op.f' = h.g'.op := rfl /-- A right homology data for a short complex `S` in the opposite category induces a left homology data for `S.unop`. -/ @[simps] def unop {S : ShortComplex Cᵒᵖ} (h : S.RightHomologyData) : S.unop.LeftHomologyData where K := Opposite.unop h.Q H := Opposite.unop h.H i := h.p.unop π := h.ι.unop wi := Quiver.Hom.op_inj h.wp hi := CokernelCofork.IsColimit.ofπUnop _ _ h.hp wπ := Quiver.Hom.op_inj h.wι hπ := KernelFork.IsLimit.ofιUnop _ _ h.hι @[simp] lemma unop_f' {S : ShortComplex Cᵒᵖ} (h : S.RightHomologyData) : h.unop.f' = h.g'.unop := rfl end RightHomologyData namespace LeftHomologyData /-- A left homology data for a short complex `S` induces a right homology data for `S.op`. -/ @[simps] def op (h : S.LeftHomologyData) : S.op.RightHomologyData where Q := Opposite.op h.K H := Opposite.op h.H p := h.i.op ι := h.π.op wp := Quiver.Hom.unop_inj h.wi hp := KernelFork.IsLimit.ofιOp _ _ h.hi wι := Quiver.Hom.unop_inj h.wπ hι := CokernelCofork.IsColimit.ofπOp _ _ h.hπ @[simp] lemma op_g' (h : S.LeftHomologyData) : h.op.g' = h.f'.op := rfl /-- A left homology data for a short complex `S` in the opposite category induces a right homology data for `S.unop`. -/ @[simps] def unop {S : ShortComplex Cᵒᵖ} (h : S.LeftHomologyData) : S.unop.RightHomologyData where Q := Opposite.unop h.K H := Opposite.unop h.H p := h.i.unop ι := h.π.unop wp := Quiver.Hom.op_inj h.wi hp := KernelFork.IsLimit.ofιUnop _ _ h.hi wι := Quiver.Hom.op_inj h.wπ hι := CokernelCofork.IsColimit.ofπUnop _ _ h.hπ @[simp] lemma unop_g' {S : ShortComplex Cᵒᵖ} (h : S.LeftHomologyData) : h.unop.g' = h.f'.unop := rfl end LeftHomologyData instance [S.HasLeftHomology] : HasRightHomology S.op := HasRightHomology.mk' S.leftHomologyData.op instance [S.HasRightHomology] : HasLeftHomology S.op := HasLeftHomology.mk' S.rightHomologyData.op lemma hasLeftHomology_iff_op (S : ShortComplex C) : S.HasLeftHomology ↔ S.op.HasRightHomology := ⟨fun _ => inferInstance, fun _ => HasLeftHomology.mk' S.op.rightHomologyData.unop⟩ lemma hasRightHomology_iff_op (S : ShortComplex C) : S.HasRightHomology ↔ S.op.HasLeftHomology := ⟨fun _ => inferInstance, fun _ => HasRightHomology.mk' S.op.leftHomologyData.unop⟩ lemma hasLeftHomology_iff_unop (S : ShortComplex Cᵒᵖ) : S.HasLeftHomology ↔ S.unop.HasRightHomology := S.unop.hasRightHomology_iff_op.symm lemma hasRightHomology_iff_unop (S : ShortComplex Cᵒᵖ) : S.HasRightHomology ↔ S.unop.HasLeftHomology := S.unop.hasLeftHomology_iff_op.symm section variable (φ : S₁ ⟶ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) /-- Given right homology data `h₁` and `h₂` for two short complexes `S₁` and `S₂`, a `RightHomologyMapData` for a morphism `φ : S₁ ⟶ S₂` consists of a description of the induced morphisms on the `Q` (opcycles) and `H` (right homology) fields of `h₁` and `h₂`. -/ structure RightHomologyMapData where /-- the induced map on opcycles -/ φQ : h₁.Q ⟶ h₂.Q /-- the induced map on right homology -/ φH : h₁.H ⟶ h₂.H /-- commutation with `p` -/ commp : h₁.p ≫ φQ = φ.τ₂ ≫ h₂.p := by aesop_cat /-- commutation with `g'` -/ commg' : φQ ≫ h₂.g' = h₁.g' ≫ φ.τ₃ := by aesop_cat /-- commutation with `ι` -/ commι : φH ≫ h₂.ι = h₁.ι ≫ φQ := by aesop_cat namespace RightHomologyMapData attribute [reassoc (attr := simp)] commp commg' commι /-- The right homology map data associated to the zero morphism between two short complexes. -/ @[simps] def zero (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : RightHomologyMapData 0 h₁ h₂ where φQ := 0 φH := 0 /-- The right homology map data associated to the identity morphism of a short complex. -/ @[simps] def id (h : S.RightHomologyData) : RightHomologyMapData (𝟙 S) h h where φQ := 𝟙 _ φH := 𝟙 _ /-- The composition of right homology map data. -/ @[simps] def comp {φ : S₁ ⟶ S₂} {φ' : S₂ ⟶ S₃} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} {h₃ : S₃.RightHomologyData} (ψ : RightHomologyMapData φ h₁ h₂) (ψ' : RightHomologyMapData φ' h₂ h₃) : RightHomologyMapData (φ ≫ φ') h₁ h₃ where φQ := ψ.φQ ≫ ψ'.φQ φH := ψ.φH ≫ ψ'.φH instance : Subsingleton (RightHomologyMapData φ h₁ h₂) := ⟨fun ψ₁ ψ₂ => by have hQ : ψ₁.φQ = ψ₂.φQ := by rw [← cancel_epi h₁.p, commp, commp] have hH : ψ₁.φH = ψ₂.φH := by rw [← cancel_mono h₂.ι, commι, commι, hQ] cases ψ₁ cases ψ₂ congr⟩ instance : Inhabited (RightHomologyMapData φ h₁ h₂) := ⟨by let φQ : h₁.Q ⟶ h₂.Q := h₁.descQ (φ.τ₂ ≫ h₂.p) (by rw [← φ.comm₁₂_assoc, h₂.wp, comp_zero]) have commg' : φQ ≫ h₂.g' = h₁.g' ≫ φ.τ₃ := by rw [← cancel_epi h₁.p, RightHomologyData.p_descQ_assoc, assoc, RightHomologyData.p_g', φ.comm₂₃, RightHomologyData.p_g'_assoc] let φH : h₁.H ⟶ h₂.H := h₂.liftH (h₁.ι ≫ φQ) (by rw [assoc, commg', RightHomologyData.ι_g'_assoc, zero_comp]) exact ⟨φQ, φH, by simp [φQ], commg', by simp [φH]⟩⟩ instance : Unique (RightHomologyMapData φ h₁ h₂) := Unique.mk' _ variable {φ h₁ h₂} lemma congr_φH {γ₁ γ₂ : RightHomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.φH = γ₂.φH := by rw [eq] lemma congr_φQ {γ₁ γ₂ : RightHomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.φQ = γ₂.φQ := by rw [eq] /-- When `S₁.f`, `S₁.g`, `S₂.f` and `S₂.g` are all zero, the action on right homology of a morphism `φ : S₁ ⟶ S₂` is given by the action `φ.τ₂` on the middle objects. -/ @[simps] def ofZeros (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (hg₁ : S₁.g = 0) (hf₂ : S₂.f = 0) (hg₂ : S₂.g = 0) : RightHomologyMapData φ (RightHomologyData.ofZeros S₁ hf₁ hg₁) (RightHomologyData.ofZeros S₂ hf₂ hg₂) where φQ := φ.τ₂ φH := φ.τ₂ /-- When `S₁.f` and `S₂.f` are zero and we have chosen limit kernel forks `c₁` and `c₂` for `S₁.g` and `S₂.g` respectively, the action on right homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι`. -/ @[simps] def ofIsLimitKernelFork (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (c₁ : KernelFork S₁.g) (hc₁ : IsLimit c₁) (hf₂ : S₂.f = 0) (c₂ : KernelFork S₂.g) (hc₂ : IsLimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι) : RightHomologyMapData φ (RightHomologyData.ofIsLimitKernelFork S₁ hf₁ c₁ hc₁) (RightHomologyData.ofIsLimitKernelFork S₂ hf₂ c₂ hc₂) where φQ := φ.τ₂ φH := f commg' := by simp only [RightHomologyData.ofIsLimitKernelFork_g', φ.comm₂₃] commι := comm.symm /-- When `S₁.g` and `S₂.g` are zero and we have chosen colimit cokernel coforks `c₁` and `c₂` for `S₁.f` and `S₂.f` respectively, the action on right homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `φ.τ₂ ≫ c₂.π = c₁.π ≫ f`. -/ @[simps] def ofIsColimitCokernelCofork (φ : S₁ ⟶ S₂) (hg₁ : S₁.g = 0) (c₁ : CokernelCofork S₁.f) (hc₁ : IsColimit c₁) (hg₂ : S₂.g = 0) (c₂ : CokernelCofork S₂.f) (hc₂ : IsColimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : φ.τ₂ ≫ c₂.π = c₁.π ≫ f) : RightHomologyMapData φ (RightHomologyData.ofIsColimitCokernelCofork S₁ hg₁ c₁ hc₁) (RightHomologyData.ofIsColimitCokernelCofork S₂ hg₂ c₂ hc₂) where φQ := f φH := f commp := comm.symm variable (S) /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the right homology map data (for the identity of `S`) which relates the right homology data `RightHomologyData.ofIsLimitKernelFork` and `ofZeros` . -/ @[simps] def compatibilityOfZerosOfIsLimitKernelFork (hf : S.f = 0) (hg : S.g = 0) (c : KernelFork S.g) (hc : IsLimit c) : RightHomologyMapData (𝟙 S) (RightHomologyData.ofIsLimitKernelFork S hf c hc) (RightHomologyData.ofZeros S hf hg) where φQ := 𝟙 _ φH := c.ι /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the right homology map data (for the identity of `S`) which relates the right homology data `ofZeros` and `ofIsColimitCokernelCofork`. -/ @[simps] def compatibilityOfZerosOfIsColimitCokernelCofork (hf : S.f = 0) (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : RightHomologyMapData (𝟙 S) (RightHomologyData.ofZeros S hf hg) (RightHomologyData.ofIsColimitCokernelCofork S hg c hc) where φQ := c.π φH := c.π end RightHomologyMapData end section variable (S) variable [S.HasRightHomology] /-- The right homology of a short complex, given by the `H` field of a chosen right homology data. -/ noncomputable def rightHomology : C := S.rightHomologyData.H -- `S.rightHomology` is the simp normal form. @[simp] lemma rightHomologyData_H : S.rightHomologyData.H = S.rightHomology := rfl /-- The "opcycles" of a short complex, given by the `Q` field of a chosen right homology data. This is the dual notion to cycles. -/ noncomputable def opcycles : C := S.rightHomologyData.Q /-- The canonical map `S.rightHomology ⟶ S.opcycles`. -/ noncomputable def rightHomologyι : S.rightHomology ⟶ S.opcycles := S.rightHomologyData.ι /-- The projection `S.X₂ ⟶ S.opcycles`. -/ noncomputable def pOpcycles : S.X₂ ⟶ S.opcycles := S.rightHomologyData.p /-- The canonical map `S.opcycles ⟶ X₃`. -/ noncomputable def fromOpcycles : S.opcycles ⟶ S.X₃ := S.rightHomologyData.g' @[reassoc (attr := simp)] lemma f_pOpcycles : S.f ≫ S.pOpcycles = 0 := S.rightHomologyData.wp @[reassoc (attr := simp)] lemma p_fromOpcycles : S.pOpcycles ≫ S.fromOpcycles = S.g := S.rightHomologyData.p_g' instance : Epi S.pOpcycles := by dsimp only [pOpcycles] infer_instance instance : Mono S.rightHomologyι := by dsimp only [rightHomologyι] infer_instance lemma rightHomology_ext_iff {A : C} (f₁ f₂ : A ⟶ S.rightHomology) : f₁ = f₂ ↔ f₁ ≫ S.rightHomologyι = f₂ ≫ S.rightHomologyι := by rw [cancel_mono] @[ext] lemma rightHomology_ext {A : C} (f₁ f₂ : A ⟶ S.rightHomology) (h : f₁ ≫ S.rightHomologyι = f₂ ≫ S.rightHomologyι) : f₁ = f₂ := by simpa only [rightHomology_ext_iff] lemma opcycles_ext_iff {A : C} (f₁ f₂ : S.opcycles ⟶ A) : f₁ = f₂ ↔ S.pOpcycles ≫ f₁ = S.pOpcycles ≫ f₂ := by rw [cancel_epi] @[ext] lemma opcycles_ext {A : C} (f₁ f₂ : S.opcycles ⟶ A) (h : S.pOpcycles ≫ f₁ = S.pOpcycles ≫ f₂) : f₁ = f₂ := by simpa only [opcycles_ext_iff] lemma isIso_pOpcycles (hf : S.f = 0) : IsIso S.pOpcycles := RightHomologyData.isIso_p _ hf /-- When `S.f = 0`, this is the canonical isomorphism `S.opcycles ≅ S.X₂` induced by `S.pOpcycles`. -/ @[simps! inv] noncomputable def opcyclesIsoX₂ (hf : S.f = 0) : S.opcycles ≅ S.X₂ := by have := S.isIso_pOpcycles hf exact (asIso S.pOpcycles).symm @[reassoc (attr := simp)] lemma opcyclesIsoX₂_inv_hom_id (hf : S.f = 0) : S.pOpcycles ≫ (S.opcyclesIsoX₂ hf).hom = 𝟙 _ := (S.opcyclesIsoX₂ hf).inv_hom_id @[reassoc (attr := simp)] lemma opcyclesIsoX₂_hom_inv_id (hf : S.f = 0) : (S.opcyclesIsoX₂ hf).hom ≫ S.pOpcycles = 𝟙 _ := (S.opcyclesIsoX₂ hf).hom_inv_id lemma isIso_rightHomologyι (hg : S.g = 0) : IsIso S.rightHomologyι := RightHomologyData.isIso_ι _ hg /-- When `S.g = 0`, this is the canonical isomorphism `S.opcycles ≅ S.rightHomology` induced by `S.rightHomologyι`. -/ @[simps! inv] noncomputable def opcyclesIsoRightHomology (hg : S.g = 0) : S.opcycles ≅ S.rightHomology := by have := S.isIso_rightHomologyι hg exact (asIso S.rightHomologyι).symm @[reassoc (attr := simp)] lemma opcyclesIsoRightHomology_inv_hom_id (hg : S.g = 0) : S.rightHomologyι ≫ (S.opcyclesIsoRightHomology hg).hom = 𝟙 _ := (S.opcyclesIsoRightHomology hg).inv_hom_id @[reassoc (attr := simp)] lemma opcyclesIsoRightHomology_hom_inv_id (hg : S.g = 0) : (S.opcyclesIsoRightHomology hg).hom ≫ S.rightHomologyι = 𝟙 _ := (S.opcyclesIsoRightHomology hg).hom_inv_id end section variable (φ : S₁ ⟶ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) /-- The (unique) right homology map data associated to a morphism of short complexes that are both equipped with right homology data. -/ def rightHomologyMapData : RightHomologyMapData φ h₁ h₂ := default /-- Given a morphism `φ : S₁ ⟶ S₂` of short complexes and right homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced right homology map `h₁.H ⟶ h₁.H`. -/ def rightHomologyMap' : h₁.H ⟶ h₂.H := (rightHomologyMapData φ _ _).φH /-- Given a morphism `φ : S₁ ⟶ S₂` of short complexes and right homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced morphism `h₁.K ⟶ h₁.K` on opcycles. -/ def opcyclesMap' : h₁.Q ⟶ h₂.Q := (rightHomologyMapData φ _ _).φQ @[reassoc (attr := simp)] lemma p_opcyclesMap' : h₁.p ≫ opcyclesMap' φ h₁ h₂ = φ.τ₂ ≫ h₂.p := RightHomologyMapData.commp _ @[reassoc (attr := simp)] lemma opcyclesMap'_g' : opcyclesMap' φ h₁ h₂ ≫ h₂.g' = h₁.g' ≫ φ.τ₃ := by simp only [← cancel_epi h₁.p, assoc, φ.comm₂₃, p_opcyclesMap'_assoc, RightHomologyData.p_g'_assoc, RightHomologyData.p_g'] @[reassoc (attr := simp)] lemma rightHomologyι_naturality' : rightHomologyMap' φ h₁ h₂ ≫ h₂.ι = h₁.ι ≫ opcyclesMap' φ h₁ h₂ := RightHomologyMapData.commι _ end section variable [HasRightHomology S₁] [HasRightHomology S₂] (φ : S₁ ⟶ S₂) /-- The (right) homology map `S₁.rightHomology ⟶ S₂.rightHomology` induced by a morphism `S₁ ⟶ S₂` of short complexes. -/ noncomputable def rightHomologyMap : S₁.rightHomology ⟶ S₂.rightHomology := rightHomologyMap' φ _ _ /-- The morphism `S₁.opcycles ⟶ S₂.opcycles` induced by a morphism `S₁ ⟶ S₂` of short complexes. -/ noncomputable def opcyclesMap : S₁.opcycles ⟶ S₂.opcycles := opcyclesMap' φ _ _ @[reassoc (attr := simp)] lemma p_opcyclesMap : S₁.pOpcycles ≫ opcyclesMap φ = φ.τ₂ ≫ S₂.pOpcycles := p_opcyclesMap' _ _ _ @[reassoc (attr := simp)] lemma fromOpcycles_naturality : opcyclesMap φ ≫ S₂.fromOpcycles = S₁.fromOpcycles ≫ φ.τ₃ := opcyclesMap'_g' _ _ _ @[reassoc (attr := simp)] lemma rightHomologyι_naturality : rightHomologyMap φ ≫ S₂.rightHomologyι = S₁.rightHomologyι ≫ opcyclesMap φ := rightHomologyι_naturality' _ _ _ end namespace RightHomologyMapData variable {φ : S₁ ⟶ S₂} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (γ : RightHomologyMapData φ h₁ h₂) lemma rightHomologyMap'_eq : rightHomologyMap' φ h₁ h₂ = γ.φH := RightHomologyMapData.congr_φH (Subsingleton.elim _ _) lemma opcyclesMap'_eq : opcyclesMap' φ h₁ h₂ = γ.φQ := RightHomologyMapData.congr_φQ (Subsingleton.elim _ _) end RightHomologyMapData @[simp] lemma rightHomologyMap'_id (h : S.RightHomologyData) : rightHomologyMap' (𝟙 S) h h = 𝟙 _ := (RightHomologyMapData.id h).rightHomologyMap'_eq @[simp] lemma opcyclesMap'_id (h : S.RightHomologyData) : opcyclesMap' (𝟙 S) h h = 𝟙 _ := (RightHomologyMapData.id h).opcyclesMap'_eq variable (S) @[simp] lemma rightHomologyMap_id [HasRightHomology S] : rightHomologyMap (𝟙 S) = 𝟙 _ := rightHomologyMap'_id _ @[simp] lemma opcyclesMap_id [HasRightHomology S] : opcyclesMap (𝟙 S) = 𝟙 _ := opcyclesMap'_id _ @[simp] lemma rightHomologyMap'_zero (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : rightHomologyMap' 0 h₁ h₂ = 0 := (RightHomologyMapData.zero h₁ h₂).rightHomologyMap'_eq @[simp] lemma opcyclesMap'_zero (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : opcyclesMap' 0 h₁ h₂ = 0 := (RightHomologyMapData.zero h₁ h₂).opcyclesMap'_eq variable (S₁ S₂) @[simp] lemma rightHomologyMap_zero [HasRightHomology S₁] [HasRightHomology S₂] : rightHomologyMap (0 : S₁ ⟶ S₂) = 0 := rightHomologyMap'_zero _ _ @[simp] lemma opcyclesMap_zero [HasRightHomology S₁] [HasRightHomology S₂] : opcyclesMap (0 : S₁ ⟶ S₂) = 0 := opcyclesMap'_zero _ _ variable {S₁ S₂} @[reassoc] lemma rightHomologyMap'_comp (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) (h₃ : S₃.RightHomologyData) : rightHomologyMap' (φ₁ ≫ φ₂) h₁ h₃ = rightHomologyMap' φ₁ h₁ h₂ ≫ rightHomologyMap' φ₂ h₂ h₃ := by let γ₁ := rightHomologyMapData φ₁ h₁ h₂ let γ₂ := rightHomologyMapData φ₂ h₂ h₃ rw [γ₁.rightHomologyMap'_eq, γ₂.rightHomologyMap'_eq, (γ₁.comp γ₂).rightHomologyMap'_eq, RightHomologyMapData.comp_φH] @[reassoc] lemma opcyclesMap'_comp (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) (h₃ : S₃.RightHomologyData) : opcyclesMap' (φ₁ ≫ φ₂) h₁ h₃ = opcyclesMap' φ₁ h₁ h₂ ≫ opcyclesMap' φ₂ h₂ h₃ := by let γ₁ := rightHomologyMapData φ₁ h₁ h₂ let γ₂ := rightHomologyMapData φ₂ h₂ h₃ rw [γ₁.opcyclesMap'_eq, γ₂.opcyclesMap'_eq, (γ₁.comp γ₂).opcyclesMap'_eq, RightHomologyMapData.comp_φQ] @[simp] lemma rightHomologyMap_comp [HasRightHomology S₁] [HasRightHomology S₂] [HasRightHomology S₃] (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) : rightHomologyMap (φ₁ ≫ φ₂) = rightHomologyMap φ₁ ≫ rightHomologyMap φ₂ := rightHomologyMap'_comp _ _ _ _ _ @[simp] lemma opcyclesMap_comp [HasRightHomology S₁] [HasRightHomology S₂] [HasRightHomology S₃] (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) : opcyclesMap (φ₁ ≫ φ₂) = opcyclesMap φ₁ ≫ opcyclesMap φ₂ := opcyclesMap'_comp _ _ _ _ _ attribute [simp] rightHomologyMap_comp opcyclesMap_comp /-- An isomorphism of short complexes `S₁ ≅ S₂` induces an isomorphism on the `H` fields of right homology data of `S₁` and `S₂`. -/ @[simps] def rightHomologyMapIso' (e : S₁ ≅ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : h₁.H ≅ h₂.H where hom := rightHomologyMap' e.hom h₁ h₂ inv := rightHomologyMap' e.inv h₂ h₁ hom_inv_id := by rw [← rightHomologyMap'_comp, e.hom_inv_id, rightHomologyMap'_id] inv_hom_id := by rw [← rightHomologyMap'_comp, e.inv_hom_id, rightHomologyMap'_id] instance isIso_rightHomologyMap'_of_isIso (φ : S₁ ⟶ S₂) [IsIso φ] (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : IsIso (rightHomologyMap' φ h₁ h₂) := (inferInstance : IsIso (rightHomologyMapIso' (asIso φ) h₁ h₂).hom) /-- An isomorphism of short complexes `S₁ ≅ S₂` induces an isomorphism on the `Q` fields of right homology data of `S₁` and `S₂`. -/ @[simps] def opcyclesMapIso' (e : S₁ ≅ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : h₁.Q ≅ h₂.Q where hom := opcyclesMap' e.hom h₁ h₂ inv := opcyclesMap' e.inv h₂ h₁ hom_inv_id := by rw [← opcyclesMap'_comp, e.hom_inv_id, opcyclesMap'_id] inv_hom_id := by rw [← opcyclesMap'_comp, e.inv_hom_id, opcyclesMap'_id] instance isIso_opcyclesMap'_of_isIso (φ : S₁ ⟶ S₂) [IsIso φ] (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : IsIso (opcyclesMap' φ h₁ h₂) := (inferInstance : IsIso (opcyclesMapIso' (asIso φ) h₁ h₂).hom) /-- The isomorphism `S₁.rightHomology ≅ S₂.rightHomology` induced by an isomorphism of short complexes `S₁ ≅ S₂`. -/ @[simps] noncomputable def rightHomologyMapIso (e : S₁ ≅ S₂) [S₁.HasRightHomology] [S₂.HasRightHomology] : S₁.rightHomology ≅ S₂.rightHomology where hom := rightHomologyMap e.hom inv := rightHomologyMap e.inv hom_inv_id := by rw [← rightHomologyMap_comp, e.hom_inv_id, rightHomologyMap_id] inv_hom_id := by rw [← rightHomologyMap_comp, e.inv_hom_id, rightHomologyMap_id] instance isIso_rightHomologyMap_of_iso (φ : S₁ ⟶ S₂) [IsIso φ] [S₁.HasRightHomology] [S₂.HasRightHomology] : IsIso (rightHomologyMap φ) := (inferInstance : IsIso (rightHomologyMapIso (asIso φ)).hom) /-- The isomorphism `S₁.opcycles ≅ S₂.opcycles` induced by an isomorphism of short complexes `S₁ ≅ S₂`. -/ @[simps] noncomputable def opcyclesMapIso (e : S₁ ≅ S₂) [S₁.HasRightHomology] [S₂.HasRightHomology] : S₁.opcycles ≅ S₂.opcycles where hom := opcyclesMap e.hom inv := opcyclesMap e.inv hom_inv_id := by rw [← opcyclesMap_comp, e.hom_inv_id, opcyclesMap_id] inv_hom_id := by rw [← opcyclesMap_comp, e.inv_hom_id, opcyclesMap_id] instance isIso_opcyclesMap_of_iso (φ : S₁ ⟶ S₂) [IsIso φ] [S₁.HasRightHomology] [S₂.HasRightHomology] : IsIso (opcyclesMap φ) := (inferInstance : IsIso (opcyclesMapIso (asIso φ)).hom) variable {S} namespace RightHomologyData variable (h : S.RightHomologyData) [S.HasRightHomology] /-- The isomorphism `S.rightHomology ≅ h.H` induced by a right homology data `h` for a short complex `S`. -/ noncomputable def rightHomologyIso : S.rightHomology ≅ h.H := rightHomologyMapIso' (Iso.refl _) _ _ /-- The isomorphism `S.opcycles ≅ h.Q` induced by a right homology data `h` for a short complex `S`. -/ noncomputable def opcyclesIso : S.opcycles ≅ h.Q := opcyclesMapIso' (Iso.refl _) _ _ @[reassoc (attr := simp)] lemma p_comp_opcyclesIso_inv : h.p ≫ h.opcyclesIso.inv = S.pOpcycles := by dsimp [pOpcycles, RightHomologyData.opcyclesIso] simp only [p_opcyclesMap', id_τ₂, id_comp] @[reassoc (attr := simp)] lemma pOpcycles_comp_opcyclesIso_hom : S.pOpcycles ≫ h.opcyclesIso.hom = h.p := by simp only [← h.p_comp_opcyclesIso_inv, assoc, Iso.inv_hom_id, comp_id] @[reassoc (attr := simp)] lemma rightHomologyIso_inv_comp_rightHomologyι : h.rightHomologyIso.inv ≫ S.rightHomologyι = h.ι ≫ h.opcyclesIso.inv := by dsimp only [rightHomologyι, rightHomologyIso, opcyclesIso, rightHomologyMapIso', opcyclesMapIso', Iso.refl] rw [rightHomologyι_naturality'] @[reassoc (attr := simp)] lemma rightHomologyIso_hom_comp_ι : h.rightHomologyIso.hom ≫ h.ι = S.rightHomologyι ≫ h.opcyclesIso.hom := by simp only [← cancel_mono h.opcyclesIso.inv, ← cancel_epi h.rightHomologyIso.inv, assoc, Iso.inv_hom_id_assoc, Iso.hom_inv_id, comp_id, rightHomologyIso_inv_comp_rightHomologyι] end RightHomologyData namespace RightHomologyMapData variable {φ : S₁ ⟶ S₂} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (γ : RightHomologyMapData φ h₁ h₂) lemma rightHomologyMap_eq [S₁.HasRightHomology] [S₂.HasRightHomology] : rightHomologyMap φ = h₁.rightHomologyIso.hom ≫ γ.φH ≫ h₂.rightHomologyIso.inv := by dsimp [RightHomologyData.rightHomologyIso, rightHomologyMapIso'] rw [← γ.rightHomologyMap'_eq, ← rightHomologyMap'_comp, ← rightHomologyMap'_comp, id_comp, comp_id] rfl lemma opcyclesMap_eq [S₁.HasRightHomology] [S₂.HasRightHomology] : opcyclesMap φ = h₁.opcyclesIso.hom ≫ γ.φQ ≫ h₂.opcyclesIso.inv := by dsimp [RightHomologyData.opcyclesIso, cyclesMapIso'] rw [← γ.opcyclesMap'_eq, ← opcyclesMap'_comp, ← opcyclesMap'_comp, id_comp, comp_id] rfl lemma rightHomologyMap_comm [S₁.HasRightHomology] [S₂.HasRightHomology] : rightHomologyMap φ ≫ h₂.rightHomologyIso.hom = h₁.rightHomologyIso.hom ≫ γ.φH := by simp only [γ.rightHomologyMap_eq, assoc, Iso.inv_hom_id, comp_id] lemma opcyclesMap_comm [S₁.HasRightHomology] [S₂.HasRightHomology] : opcyclesMap φ ≫ h₂.opcyclesIso.hom = h₁.opcyclesIso.hom ≫ γ.φQ := by simp only [γ.opcyclesMap_eq, assoc, Iso.inv_hom_id, comp_id] end RightHomologyMapData section variable (C) variable [HasKernels C] [HasCokernels C] /-- The right homology functor `ShortComplex C ⥤ C`, where the right homology of a short complex `S` is understood as a kernel of the obvious map `S.fromOpcycles : S.opcycles ⟶ S.X₃` where `S.opcycles` is a cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ @[simps] noncomputable def rightHomologyFunctor : ShortComplex C ⥤ C where obj S := S.rightHomology map := rightHomologyMap /-- The opcycles functor `ShortComplex C ⥤ C` which sends a short complex `S` to `S.opcycles` which is a cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ @[simps] noncomputable def opcyclesFunctor : ShortComplex C ⥤ C where obj S := S.opcycles map := opcyclesMap /-- The natural transformation `S.rightHomology ⟶ S.opcycles` for all short complexes `S`. -/ @[simps] noncomputable def rightHomologyιNatTrans : rightHomologyFunctor C ⟶ opcyclesFunctor C where app S := rightHomologyι S naturality := fun _ _ φ => rightHomologyι_naturality φ /-- The natural transformation `S.X₂ ⟶ S.opcycles` for all short complexes `S`. -/ @[simps] noncomputable def pOpcyclesNatTrans : ShortComplex.π₂ ⟶ opcyclesFunctor C where app S := S.pOpcycles /-- The natural transformation `S.opcycles ⟶ S.X₃` for all short complexes `S`. -/ @[simps] noncomputable def fromOpcyclesNatTrans : opcyclesFunctor C ⟶ π₃ where app S := S.fromOpcycles naturality := fun _ _ φ => fromOpcycles_naturality φ end /-- A left homology map data for a morphism of short complexes induces a right homology map data in the opposite category. -/ @[simps] def LeftHomologyMapData.op {S₁ S₂ : ShortComplex C} {φ : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (ψ : LeftHomologyMapData φ h₁ h₂) : RightHomologyMapData (opMap φ) h₂.op h₁.op where φQ := ψ.φK.op φH := ψ.φH.op commp := Quiver.Hom.unop_inj (by simp) commg' := Quiver.Hom.unop_inj (by simp) commι := Quiver.Hom.unop_inj (by simp) /-- A left homology map data for a morphism of short complexes in the opposite category induces a right homology map data in the original category. -/ @[simps] def LeftHomologyMapData.unop {S₁ S₂ : ShortComplex Cᵒᵖ} {φ : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (ψ : LeftHomologyMapData φ h₁ h₂) : RightHomologyMapData (unopMap φ) h₂.unop h₁.unop where φQ := ψ.φK.unop φH := ψ.φH.unop commp := Quiver.Hom.op_inj (by simp) commg' := Quiver.Hom.op_inj (by simp) commι := Quiver.Hom.op_inj (by simp) /-- A right homology map data for a morphism of short complexes induces a left homology map data in the opposite category. -/ @[simps] def RightHomologyMapData.op {S₁ S₂ : ShortComplex C} {φ : S₁ ⟶ S₂} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (ψ : RightHomologyMapData φ h₁ h₂) : LeftHomologyMapData (opMap φ) h₂.op h₁.op where φK := ψ.φQ.op φH := ψ.φH.op commi := Quiver.Hom.unop_inj (by simp) commf' := Quiver.Hom.unop_inj (by simp) commπ := Quiver.Hom.unop_inj (by simp) /-- A right homology map data for a morphism of short complexes in the opposite category induces a left homology map data in the original category. -/ @[simps] def RightHomologyMapData.unop {S₁ S₂ : ShortComplex Cᵒᵖ} {φ : S₁ ⟶ S₂} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (ψ : RightHomologyMapData φ h₁ h₂) : LeftHomologyMapData (unopMap φ) h₂.unop h₁.unop where φK := ψ.φQ.unop φH := ψ.φH.unop commi := Quiver.Hom.op_inj (by simp) commf' := Quiver.Hom.op_inj (by simp) commπ := Quiver.Hom.op_inj (by simp) variable (S) /-- The right homology in the opposite category of the opposite of a short complex identifies to the left homology of this short complex. -/ noncomputable def rightHomologyOpIso [S.HasLeftHomology] : S.op.rightHomology ≅ Opposite.op S.leftHomology := S.leftHomologyData.op.rightHomologyIso /-- The left homology in the opposite category of the opposite of a short complex identifies to the right homology of this short complex. -/ noncomputable def leftHomologyOpIso [S.HasRightHomology] : S.op.leftHomology ≅ Opposite.op S.rightHomology := S.rightHomologyData.op.leftHomologyIso /-- The opcycles in the opposite category of the opposite of a short complex identifies to the cycles of this short complex. -/ noncomputable def opcyclesOpIso [S.HasLeftHomology] : S.op.opcycles ≅ Opposite.op S.cycles := S.leftHomologyData.op.opcyclesIso /-- The cycles in the opposite category of the opposite of a short complex identifies to the opcycles of this short complex. -/ noncomputable def cyclesOpIso [S.HasRightHomology] : S.op.cycles ≅ Opposite.op S.opcycles := S.rightHomologyData.op.cyclesIso @[reassoc (attr := simp)] lemma opcyclesOpIso_hom_toCycles_op [S.HasLeftHomology] : S.opcyclesOpIso.hom ≫ S.toCycles.op = S.op.fromOpcycles := by dsimp [opcyclesOpIso, toCycles] rw [← cancel_epi S.op.pOpcycles, p_fromOpcycles, RightHomologyData.pOpcycles_comp_opcyclesIso_hom_assoc, LeftHomologyData.op_p, ← op_comp, LeftHomologyData.f'_i, op_g] @[reassoc (attr := simp)] lemma fromOpcycles_op_cyclesOpIso_inv [S.HasRightHomology]: S.fromOpcycles.op ≫ S.cyclesOpIso.inv = S.op.toCycles := by dsimp [cyclesOpIso, fromOpcycles] rw [← cancel_mono S.op.iCycles, assoc, toCycles_i, LeftHomologyData.cyclesIso_inv_comp_iCycles, RightHomologyData.op_i, ← op_comp, RightHomologyData.p_g', op_f] @[reassoc (attr := simp)] lemma op_pOpcycles_opcyclesOpIso_hom [S.HasLeftHomology] : S.op.pOpcycles ≫ S.opcyclesOpIso.hom = S.iCycles.op := by dsimp [opcyclesOpIso] rw [← S.leftHomologyData.op.p_comp_opcyclesIso_inv, assoc, Iso.inv_hom_id, comp_id] rfl @[reassoc (attr := simp)] lemma cyclesOpIso_inv_op_iCycles [S.HasRightHomology] : S.cyclesOpIso.inv ≫ S.op.iCycles = S.pOpcycles.op := by dsimp [cyclesOpIso] rw [← S.rightHomologyData.op.cyclesIso_hom_comp_i, Iso.inv_hom_id_assoc] rfl @[reassoc] lemma opcyclesOpIso_hom_naturality (φ : S₁ ⟶ S₂) [S₁.HasLeftHomology] [S₂.HasLeftHomology] : opcyclesMap (opMap φ) ≫ (S₁.opcyclesOpIso).hom = S₂.opcyclesOpIso.hom ≫ (cyclesMap φ).op := by rw [← cancel_epi S₂.op.pOpcycles, p_opcyclesMap_assoc, opMap_τ₂, op_pOpcycles_opcyclesOpIso_hom, op_pOpcycles_opcyclesOpIso_hom_assoc, ← op_comp, ← op_comp, cyclesMap_i] @[reassoc] lemma opcyclesOpIso_inv_naturality (φ : S₁ ⟶ S₂) [S₁.HasLeftHomology] [S₂.HasLeftHomology] : (cyclesMap φ).op ≫ (S₁.opcyclesOpIso).inv = S₂.opcyclesOpIso.inv ≫ opcyclesMap (opMap φ) := by rw [← cancel_epi (S₂.opcyclesOpIso.hom), Iso.hom_inv_id_assoc, ← opcyclesOpIso_hom_naturality_assoc, Iso.hom_inv_id, comp_id] @[reassoc] lemma cyclesOpIso_inv_naturality (φ : S₁ ⟶ S₂) [S₁.HasRightHomology] [S₂.HasRightHomology] : (opcyclesMap φ).op ≫ (S₁.cyclesOpIso).inv = S₂.cyclesOpIso.inv ≫ cyclesMap (opMap φ) := by rw [← cancel_mono S₁.op.iCycles, assoc, assoc, cyclesOpIso_inv_op_iCycles, cyclesMap_i, cyclesOpIso_inv_op_iCycles_assoc, ← op_comp, p_opcyclesMap, op_comp, opMap_τ₂] @[reassoc] lemma cyclesOpIso_hom_naturality (φ : S₁ ⟶ S₂) [S₁.HasRightHomology] [S₂.HasRightHomology] : cyclesMap (opMap φ) ≫ (S₁.cyclesOpIso).hom = S₂.cyclesOpIso.hom ≫ (opcyclesMap φ).op := by rw [← cancel_mono (S₁.cyclesOpIso).inv, assoc, assoc, Iso.hom_inv_id, comp_id, cyclesOpIso_inv_naturality, Iso.hom_inv_id_assoc] @[simp] lemma leftHomologyMap'_op (φ : S₁ ⟶ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : (leftHomologyMap' φ h₁ h₂).op = rightHomologyMap' (opMap φ) h₂.op h₁.op := by let γ : LeftHomologyMapData φ h₁ h₂ := leftHomologyMapData φ h₁ h₂ simp only [γ.leftHomologyMap'_eq, γ.op.rightHomologyMap'_eq, LeftHomologyMapData.op_φH] lemma leftHomologyMap_op (φ : S₁ ⟶ S₂) [S₁.HasLeftHomology] [S₂.HasLeftHomology] : (leftHomologyMap φ).op = S₂.rightHomologyOpIso.inv ≫ rightHomologyMap (opMap φ) ≫ S₁.rightHomologyOpIso.hom := by dsimp [rightHomologyOpIso, RightHomologyData.rightHomologyIso, rightHomologyMap, leftHomologyMap] simp only [← rightHomologyMap'_comp, comp_id, id_comp, leftHomologyMap'_op] @[simp] lemma rightHomologyMap'_op (φ : S₁ ⟶ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : (rightHomologyMap' φ h₁ h₂).op = leftHomologyMap' (opMap φ) h₂.op h₁.op := by let γ : RightHomologyMapData φ h₁ h₂ := rightHomologyMapData φ h₁ h₂ simp only [γ.rightHomologyMap'_eq, γ.op.leftHomologyMap'_eq, RightHomologyMapData.op_φH] lemma rightHomologyMap_op (φ : S₁ ⟶ S₂) [S₁.HasRightHomology] [S₂.HasRightHomology] : (rightHomologyMap φ).op = S₂.leftHomologyOpIso.inv ≫ leftHomologyMap (opMap φ) ≫ S₁.leftHomologyOpIso.hom := by dsimp [leftHomologyOpIso, LeftHomologyData.leftHomologyIso, leftHomologyMap, rightHomologyMap] simp only [← leftHomologyMap'_comp, comp_id, id_comp, rightHomologyMap'_op] namespace RightHomologyData section variable (φ : S₁ ⟶ S₂) (h : RightHomologyData S₁) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] /-- If `φ : S₁ ⟶ S₂` is a morphism of short complexes such that `φ.τ₁` is epi, `φ.τ₂` is an iso and `φ.τ₃` is mono, then a right homology data for `S₁` induces a right homology data for `S₂` with the same `Q` and `H` fields. This is obtained by dualising `LeftHomologyData.ofEpiOfIsIsoOfMono'`. The inverse construction is `ofEpiOfIsIsoOfMono'`. -/ noncomputable def ofEpiOfIsIsoOfMono : RightHomologyData S₂ := by haveI : Epi (opMap φ).τ₁ := by dsimp; infer_instance haveI : IsIso (opMap φ).τ₂ := by dsimp; infer_instance haveI : Mono (opMap φ).τ₃ := by dsimp; infer_instance exact (LeftHomologyData.ofEpiOfIsIsoOfMono' (opMap φ) h.op).unop @[simp] lemma ofEpiOfIsIsoOfMono_Q : (ofEpiOfIsIsoOfMono φ h).Q = h.Q := rfl @[simp] lemma ofEpiOfIsIsoOfMono_H : (ofEpiOfIsIsoOfMono φ h).H = h.H := rfl @[simp] lemma ofEpiOfIsIsoOfMono_p : (ofEpiOfIsIsoOfMono φ h).p = inv φ.τ₂ ≫ h.p := by simp [ofEpiOfIsIsoOfMono, opMap] @[simp] lemma ofEpiOfIsIsoOfMono_ι : (ofEpiOfIsIsoOfMono φ h).ι = h.ι := rfl @[simp] lemma ofEpiOfIsIsoOfMono_g' : (ofEpiOfIsIsoOfMono φ h).g' = h.g' ≫ φ.τ₃ := by simp [ofEpiOfIsIsoOfMono, opMap] end section variable (φ : S₁ ⟶ S₂) (h : RightHomologyData S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] /-- If `φ : S₁ ⟶ S₂` is a morphism of short complexes such that `φ.τ₁` is epi, `φ.τ₂` is an iso and `φ.τ₃` is mono, then a right homology data for `S₂` induces a right homology data for `S₁` with the same `Q` and `H` fields. This is obtained by dualising `LeftHomologyData.ofEpiOfIsIsoOfMono`. The inverse construction is `ofEpiOfIsIsoOfMono`. -/ noncomputable def ofEpiOfIsIsoOfMono' : RightHomologyData S₁ := by haveI : Epi (opMap φ).τ₁ := by dsimp; infer_instance haveI : IsIso (opMap φ).τ₂ := by dsimp; infer_instance haveI : Mono (opMap φ).τ₃ := by dsimp; infer_instance exact (LeftHomologyData.ofEpiOfIsIsoOfMono (opMap φ) h.op).unop @[simp] lemma ofEpiOfIsIsoOfMono'_Q : (ofEpiOfIsIsoOfMono' φ h).Q = h.Q := rfl @[simp] lemma ofEpiOfIsIsoOfMono'_H : (ofEpiOfIsIsoOfMono' φ h).H = h.H := rfl @[simp] lemma ofEpiOfIsIsoOfMono'_p : (ofEpiOfIsIsoOfMono' φ h).p = φ.τ₂ ≫ h.p := by simp [ofEpiOfIsIsoOfMono', opMap] @[simp] lemma ofEpiOfIsIsoOfMono'_ι : (ofEpiOfIsIsoOfMono' φ h).ι = h.ι := rfl @[simp] lemma ofEpiOfIsIsoOfMono'_g'_τ₃ : (ofEpiOfIsIsoOfMono' φ h).g' ≫ φ.τ₃ = h.g' := by rw [← cancel_epi (ofEpiOfIsIsoOfMono' φ h).p, p_g'_assoc, ofEpiOfIsIsoOfMono'_p, assoc, p_g', φ.comm₂₃] end /-- If `e : S₁ ≅ S₂` is an isomorphism of short complexes and `h₁ : RightomologyData S₁`, this is the right homology data for `S₂` deduced from the isomorphism. -/ noncomputable def ofIso (e : S₁ ≅ S₂) (h₁ : RightHomologyData S₁) : RightHomologyData S₂ := h₁.ofEpiOfIsIsoOfMono e.hom end RightHomologyData lemma hasRightHomology_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) [HasRightHomology S₁] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HasRightHomology S₂ := HasRightHomology.mk' (RightHomologyData.ofEpiOfIsIsoOfMono φ S₁.rightHomologyData) lemma hasRightHomology_of_epi_of_isIso_of_mono' (φ : S₁ ⟶ S₂) [HasRightHomology S₂] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HasRightHomology S₁ := HasRightHomology.mk' (RightHomologyData.ofEpiOfIsIsoOfMono' φ S₂.rightHomologyData) lemma hasRightHomology_of_iso {S₁ S₂ : ShortComplex C} (e : S₁ ≅ S₂) [HasRightHomology S₁] : HasRightHomology S₂ := hasRightHomology_of_epi_of_isIso_of_mono e.hom namespace RightHomologyMapData /-- This right homology map data expresses compatibilities of the right homology data constructed by `RightHomologyData.ofEpiOfIsIsoOfMono` -/ @[simps] def ofEpiOfIsIsoOfMono (φ : S₁ ⟶ S₂) (h : RightHomologyData S₁) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : RightHomologyMapData φ h (RightHomologyData.ofEpiOfIsIsoOfMono φ h) where φQ := 𝟙 _ φH := 𝟙 _ /-- This right homology map data expresses compatibilities of the right homology data constructed by `RightHomologyData.ofEpiOfIsIsoOfMono'` -/ @[simps] noncomputable def ofEpiOfIsIsoOfMono' (φ : S₁ ⟶ S₂) (h : RightHomologyData S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : RightHomologyMapData φ (RightHomologyData.ofEpiOfIsIsoOfMono' φ h) h where φQ := 𝟙 _ φH := 𝟙 _ end RightHomologyMapData instance (φ : S₁ ⟶ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : IsIso (rightHomologyMap' φ h₁ h₂) := by let h₂' := RightHomologyData.ofEpiOfIsIsoOfMono φ h₁ haveI : IsIso (rightHomologyMap' φ h₁ h₂') := by rw [(RightHomologyMapData.ofEpiOfIsIsoOfMono φ h₁).rightHomologyMap'_eq] dsimp infer_instance have eq := rightHomologyMap'_comp φ (𝟙 S₂) h₁ h₂' h₂ rw [comp_id] at eq rw [eq] infer_instance /-- If a morphism of short complexes `φ : S₁ ⟶ S₂` is such that `φ.τ₁` is epi, `φ.τ₂` is an iso, and `φ.τ₃` is mono, then the induced morphism on right homology is an isomorphism. -/ instance (φ : S₁ ⟶ S₂) [S₁.HasRightHomology] [S₂.HasRightHomology] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : IsIso (rightHomologyMap φ) := by dsimp only [rightHomologyMap]	infer_instance variable (C)	Mathlib/Algebra/Homology/ShortComplex/RightHomology.lean	1,183	1,186
/- Copyright (c) 2020 Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Y. Lewis -/ import Mathlib.Algebra.Field.Basic import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Data.Tree.Basic import Mathlib.Logic.Basic import Mathlib.Tactic.NormNum.Core import Mathlib.Util.SynthesizeUsing import Mathlib.Util.Qq /-! # A tactic for canceling numeric denominators This file defines tactics that cancel numeric denominators from field Expressions. As an example, we want to transform a comparison `5(a/3 + b/4) < c/3` into the equivalent `5(4a + 3b) < 4c`. ## Implementation notes The tooling here was originally written for `linarith`, not intended as an interactive tactic. The interactive version has been split off because it is sometimes convenient to use on its own. There are likely some rough edges to it. Improving this tactic would be a good project for someone interested in learning tactic programming. -/ open Lean Parser Tactic Mathlib Meta NormNum Qq initialize registerTraceClass `CancelDenoms namespace CancelDenoms /-! ### Lemmas used in the procedure -/ theorem mul_subst {α} [CommRing α] {n1 n2 k e1 e2 t1 t2 : α} (h1 : n1 e1 = t1) (h2 : n2 * e2 = t2) (h3 : n1 * n2 = k) : k * (e1 * e2) = t1 * t2 := by rw [← h3, mul_comm n1, mul_assoc n2, ← mul_assoc n1, h1, ← mul_assoc n2, mul_comm n2, mul_assoc, h2] theorem div_subst {α} [Field α] {n1 n2 k e1 e2 t1 : α} (h1 : n1 * e1 = t1) (h2 : n2 / e2 = 1) (h3 : n1 * n2 = k) : k * (e1 / e2) = t1 := by rw [← h3, mul_assoc, mul_div_left_comm, h2, ← mul_assoc, h1, mul_comm, one_mul] theorem cancel_factors_eq_div {α} [Field α] {n e e' : α} (h : n * e = e') (h2 : n ≠ 0) : e = e' / n := eq_div_of_mul_eq h2 <\| by rwa [mul_comm] at h theorem add_subst {α} [Ring α] {n e1 e2 t1 t2 : α} (h1 : n * e1 = t1) (h2 : n * e2 = t2) : n * (e1 + e2) = t1 + t2 := by simp [left_distrib, ] theorem sub_subst {α} [Ring α] {n e1 e2 t1 t2 : α} (h1 : n e1 = t1) (h2 : n * e2 = t2) : n * (e1 - e2) = t1 - t2 := by simp [left_distrib, , sub_eq_add_neg] theorem neg_subst {α} [Ring α] {n e t : α} (h1 : n e = t) : n * -e = -t := by simp [] theorem pow_subst {α} [CommRing α] {n e1 t1 k l : α} {e2 : ℕ} (h1 : n e1 = t1) (h2 : l * n ^ e2 = k) : k * (e1 ^ e2) = l * t1 ^ e2 := by rw [← h2, ← h1, mul_pow, mul_assoc] theorem inv_subst {α} [Field α] {n k e : α} (h2 : e ≠ 0) (h3 : n * e = k) : k * (e ⁻¹) = n := by rw [← div_eq_mul_inv, ← h3, mul_div_cancel_right₀ _ h2] theorem cancel_factors_lt {α} [Field α] [LinearOrder α] [IsStrictOrderedRing α] {a b ad bd a' b' gcd : α} (ha : ad * a = a') (hb : bd * b = b') (had : 0 < ad) (hbd : 0 < bd) (hgcd : 0 < gcd) : (a < b) = (1 / gcd * (bd * a') < 1 / gcd * (ad * b')) := by rw [mul_lt_mul_left, ← ha, ← hb, ← mul_assoc, ← mul_assoc, mul_comm bd, mul_lt_mul_left] · exact mul_pos had hbd · exact one_div_pos.2 hgcd theorem cancel_factors_le {α} [Field α] [LinearOrder α] [IsStrictOrderedRing α] {a b ad bd a' b' gcd : α} (ha : ad * a = a') (hb : bd * b = b') (had : 0 < ad) (hbd : 0 < bd) (hgcd : 0 < gcd) : (a ≤ b) = (1 / gcd * (bd * a') ≤ 1 / gcd * (ad * b')) := by rw [mul_le_mul_left, ← ha, ← hb, ← mul_assoc, ← mul_assoc, mul_comm bd, mul_le_mul_left] · exact mul_pos had hbd · exact one_div_pos.2 hgcd theorem cancel_factors_eq {α} [Field α] {a b ad bd a' b' gcd : α} (ha : ad * a = a') (hb : bd * b = b') (had : ad ≠ 0) (hbd : bd ≠ 0) (hgcd : gcd ≠ 0) : (a = b) = (1 / gcd * (bd * a') = 1 / gcd * (ad * b')) := by rw [← ha, ← hb, ← mul_assoc bd, ← mul_assoc ad, mul_comm bd] ext; constructor · rintro rfl	rfl · intro h simp only [← mul_assoc] at h refine mul_left_cancel₀ (mul_ne_zero ?_ ?_) h on_goal 1 => apply mul_ne_zero on_goal 1 => apply div_ne_zero · exact one_ne_zero all_goals assumption theorem cancel_factors_ne {α} [Field α] {a b ad bd a' b' gcd : α} (ha : ad * a = a') (hb : bd * b = b') (had : ad ≠ 0) (hbd : bd ≠ 0) (hgcd : gcd ≠ 0) : (a ≠ b) = (1 / gcd * (bd * a') ≠ 1 / gcd * (ad * b')) := by classical rw [eq_iff_iff, not_iff_not, cancel_factors_eq ha hb had hbd hgcd]	Mathlib/Tactic/CancelDenoms/Core.lean	89	102
/- 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, Kexing Ying -/ import Mathlib.Topology.Semicontinuous import Mathlib.MeasureTheory.Function.AEMeasurableSequence import Mathlib.MeasureTheory.Order.Lattice import Mathlib.Topology.Order.Lattice import Mathlib.MeasureTheory.Constructions.BorelSpace.Basic /-! # Borel sigma algebras on spaces with orders ## Main statements * `borel_eq_generateFrom_Ixx` (where Ixx is one of {Iio, Ioi, Iic, Ici, Ico, Ioc}): The Borel sigma algebra of a linear order topology is generated by intervals of the given kind. * `Dense.borel_eq_generateFrom_Ico_mem`, `Dense.borel_eq_generateFrom_Ioc_mem`: The Borel sigma algebra of a dense linear order topology is generated by intervals of a given kind, with endpoints from dense subsets. * `ext_of_Ico`, `ext_of_Ioc`: A locally finite Borel measure on a second countable conditionally complete linear order is characterized by the measures of intervals of the given kind. * `ext_of_Iic`, `ext_of_Ici`: A finite Borel measure on a second countable linear order is characterized by the measures of intervals of the given kind. * `UpperSemicontinuous.measurable`, `LowerSemicontinuous.measurable`: Semicontinuous functions are measurable. * `Measurable.iSup`, `Measurable.iInf`, `Measurable.sSup`, `Measurable.sInf`: Countable supremums and infimums of measurable functions to conditionally complete linear orders are measurable. * `Measurable.liminf`, `Measurable.limsup`: Countable liminfs and limsups of measurable functions to conditionally complete linear orders are measurable. -/ open Set Filter MeasureTheory MeasurableSpace TopologicalSpace open scoped Topology NNReal ENNReal MeasureTheory universe u v w x y variable {α β γ δ : Type} {ι : Sort y} {s t u : Set α} section OrderTopology variable (α) variable [TopologicalSpace α] [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] theorem borel_eq_generateFrom_Iio : borel α = .generateFrom (range Iio) := by refine le_antisymm ?_ (generateFrom_le ?_) · rw [borel_eq_generateFrom_of_subbasis (@OrderTopology.topology_eq_generate_intervals α _ _ _)] letI : MeasurableSpace α := MeasurableSpace.generateFrom (range Iio) have H : ∀ a : α, MeasurableSet (Iio a) := fun a => GenerateMeasurable.basic _ ⟨_, rfl⟩ refine generateFrom_le ?_ rintro _ ⟨a, rfl \| rfl⟩ · rcases em (∃ b, a ⋖ b) with ⟨b, hb⟩ \| hcovBy · rw [hb.Ioi_eq, ← compl_Iio] exact (H _).compl · rcases isOpen_biUnion_countable (Ioi a) Ioi fun _ _ ↦ isOpen_Ioi with ⟨t, hat, htc, htU⟩ have : Ioi a = ⋃ b ∈ t, Ici b := by refine Subset.antisymm ?_ <\| iUnion₂_subset fun b hb ↦ Ici_subset_Ioi.2 (hat hb) refine Subset.trans ?_ <\| iUnion₂_mono fun _ _ ↦ Ioi_subset_Ici_self simpa [CovBy, htU, subset_def] using hcovBy simp only [this, ← compl_Iio] exact .biUnion htc <\| fun _ _ ↦ (H _).compl · apply H · rw [forall_mem_range] intro a exact GenerateMeasurable.basic _ isOpen_Iio theorem borel_eq_generateFrom_Ioi : borel α = .generateFrom (range Ioi) := @borel_eq_generateFrom_Iio αᵒᵈ _ (by infer_instance : SecondCountableTopology α) _ _ theorem borel_eq_generateFrom_Iic : borel α = MeasurableSpace.generateFrom (range Iic) := by rw [borel_eq_generateFrom_Ioi] refine le_antisymm ?_ ?_ · refine MeasurableSpace.generateFrom_le fun t ht => ?_ obtain ⟨u, rfl⟩ := ht rw [← compl_Iic] exact (MeasurableSpace.measurableSet_generateFrom (mem_range.mpr ⟨u, rfl⟩)).compl · refine MeasurableSpace.generateFrom_le fun t ht => ?_ obtain ⟨u, rfl⟩ := ht rw [← compl_Ioi] exact (MeasurableSpace.measurableSet_generateFrom (mem_range.mpr ⟨u, rfl⟩)).compl theorem borel_eq_generateFrom_Ici : borel α = MeasurableSpace.generateFrom (range Ici) := @borel_eq_generateFrom_Iic αᵒᵈ _ _ _ _ end OrderTopology section Orders variable [TopologicalSpace α] {mα : MeasurableSpace α} [OpensMeasurableSpace α] variable {mδ : MeasurableSpace δ} section Preorder variable [Preorder α] [OrderClosedTopology α] {a b x : α} {μ : Measure α} @[simp, measurability] theorem measurableSet_Ici : MeasurableSet (Ici a) := isClosed_Ici.measurableSet theorem nullMeasurableSet_Ici : NullMeasurableSet (Ici a) μ := measurableSet_Ici.nullMeasurableSet @[simp, measurability] theorem measurableSet_Iic : MeasurableSet (Iic a) := isClosed_Iic.measurableSet theorem nullMeasurableSet_Iic : NullMeasurableSet (Iic a) μ := measurableSet_Iic.nullMeasurableSet @[simp, measurability] theorem measurableSet_Icc : MeasurableSet (Icc a b) := isClosed_Icc.measurableSet theorem nullMeasurableSet_Icc : NullMeasurableSet (Icc a b) μ := measurableSet_Icc.nullMeasurableSet instance nhdsWithin_Ici_isMeasurablyGenerated : (𝓝[Ici b] a).IsMeasurablyGenerated := measurableSet_Ici.nhdsWithin_isMeasurablyGenerated _ instance nhdsWithin_Iic_isMeasurablyGenerated : (𝓝[Iic b] a).IsMeasurablyGenerated := measurableSet_Iic.nhdsWithin_isMeasurablyGenerated _ instance nhdsWithin_Icc_isMeasurablyGenerated : IsMeasurablyGenerated (𝓝[Icc a b] x) := by rw [← Ici_inter_Iic, nhdsWithin_inter] infer_instance instance atTop_isMeasurablyGenerated : (Filter.atTop : Filter α).IsMeasurablyGenerated := @Filter.iInf_isMeasurablyGenerated _ _ _ _ fun a => (measurableSet_Ici : MeasurableSet (Ici a)).principal_isMeasurablyGenerated instance atBot_isMeasurablyGenerated : (Filter.atBot : Filter α).IsMeasurablyGenerated := @Filter.iInf_isMeasurablyGenerated _ _ _ _ fun a => (measurableSet_Iic : MeasurableSet (Iic a)).principal_isMeasurablyGenerated instance [R1Space α] : IsMeasurablyGenerated (cocompact α) where exists_measurable_subset := by intro _ hs obtain ⟨t, ht, hts⟩ := mem_cocompact.mp hs exact ⟨(closure t)ᶜ, ht.closure.compl_mem_cocompact, isClosed_closure.measurableSet.compl, (compl_subset_compl.2 subset_closure).trans hts⟩ end Preorder section PartialOrder variable [PartialOrder α] [OrderClosedTopology α] [SecondCountableTopology α] {a b : α} @[measurability] theorem measurableSet_le' : MeasurableSet { p : α × α \| p.1 ≤ p.2 } := OrderClosedTopology.isClosed_le'.measurableSet @[measurability] theorem measurableSet_le {f g : δ → α} (hf : Measurable f) (hg : Measurable g) : MeasurableSet { a \| f a ≤ g a } := hf.prodMk hg measurableSet_le' end PartialOrder section LinearOrder variable [LinearOrder α] [OrderClosedTopology α] {a b x : α} {μ : Measure α} -- we open this locale only here to avoid issues with list being treated as intervals above open Interval @[simp, measurability] theorem measurableSet_Iio : MeasurableSet (Iio a) := isOpen_Iio.measurableSet theorem nullMeasurableSet_Iio : NullMeasurableSet (Iio a) μ := measurableSet_Iio.nullMeasurableSet @[simp, measurability] theorem measurableSet_Ioi : MeasurableSet (Ioi a) := isOpen_Ioi.measurableSet theorem nullMeasurableSet_Ioi : NullMeasurableSet (Ioi a) μ := measurableSet_Ioi.nullMeasurableSet @[simp, measurability] theorem measurableSet_Ioo : MeasurableSet (Ioo a b) := isOpen_Ioo.measurableSet theorem nullMeasurableSet_Ioo : NullMeasurableSet (Ioo a b) μ := measurableSet_Ioo.nullMeasurableSet @[simp, measurability] theorem measurableSet_Ioc : MeasurableSet (Ioc a b) := measurableSet_Ioi.inter measurableSet_Iic theorem nullMeasurableSet_Ioc : NullMeasurableSet (Ioc a b) μ := measurableSet_Ioc.nullMeasurableSet @[simp, measurability] theorem measurableSet_Ico : MeasurableSet (Ico a b) := measurableSet_Ici.inter measurableSet_Iio theorem nullMeasurableSet_Ico : NullMeasurableSet (Ico a b) μ := measurableSet_Ico.nullMeasurableSet instance nhdsWithin_Ioi_isMeasurablyGenerated : (𝓝[Ioi b] a).IsMeasurablyGenerated := measurableSet_Ioi.nhdsWithin_isMeasurablyGenerated _ instance nhdsWithin_Iio_isMeasurablyGenerated : (𝓝[Iio b] a).IsMeasurablyGenerated := measurableSet_Iio.nhdsWithin_isMeasurablyGenerated _ instance nhdsWithin_uIcc_isMeasurablyGenerated : IsMeasurablyGenerated (𝓝[[[a, b]]] x) := nhdsWithin_Icc_isMeasurablyGenerated @[measurability] theorem measurableSet_lt' [SecondCountableTopology α] : MeasurableSet { p : α × α \| p.1 < p.2 } := (isOpen_lt continuous_fst continuous_snd).measurableSet @[measurability] theorem measurableSet_lt [SecondCountableTopology α] {f g : δ → α} (hf : Measurable f) (hg : Measurable g) : MeasurableSet { a \| f a < g a } := hf.prodMk hg measurableSet_lt' theorem nullMeasurableSet_lt [SecondCountableTopology α] {μ : Measure δ} {f g : δ → α} (hf : AEMeasurable f μ) (hg : AEMeasurable g μ) : NullMeasurableSet { a \| f a < g a } μ := (hf.prodMk hg).nullMeasurable measurableSet_lt' theorem nullMeasurableSet_lt' [SecondCountableTopology α] {μ : Measure (α × α)} : NullMeasurableSet { p : α × α \| p.1 < p.2 } μ := measurableSet_lt'.nullMeasurableSet theorem nullMeasurableSet_le [SecondCountableTopology α] {μ : Measure δ} {f g : δ → α} (hf : AEMeasurable f μ) (hg : AEMeasurable g μ) : NullMeasurableSet { a \| f a ≤ g a } μ := (hf.prodMk hg).nullMeasurable measurableSet_le' theorem Set.OrdConnected.measurableSet (h : OrdConnected s) : MeasurableSet s := by let u := ⋃ (x ∈ s) (y ∈ s), Ioo x y have huopen : IsOpen u := isOpen_biUnion fun _ _ => isOpen_biUnion fun _ _ => isOpen_Ioo have humeas : MeasurableSet u := huopen.measurableSet have hfinite : (s \ u).Finite := s.finite_diff_iUnion_Ioo have : u ⊆ s := iUnion₂_subset fun x hx => iUnion₂_subset fun y hy => Ioo_subset_Icc_self.trans (h.out hx hy) rw [← union_diff_cancel this] exact humeas.union hfinite.measurableSet theorem IsPreconnected.measurableSet (h : IsPreconnected s) : MeasurableSet s := h.ordConnected.measurableSet theorem generateFrom_Ico_mem_le_borel {α : Type} [TopologicalSpace α] [LinearOrder α] [OrderClosedTopology α] (s t : Set α) : MeasurableSpace.generateFrom { S \| ∃ l ∈ s, ∃ u ∈ t, l < u ∧ Ico l u = S } ≤ borel α := by apply generateFrom_le borelize α rintro _ ⟨a, -, b, -, -, rfl⟩ exact measurableSet_Ico theorem Dense.borel_eq_generateFrom_Ico_mem_aux {α : Type} [TopologicalSpace α] [LinearOrder α] [OrderTopology α] [SecondCountableTopology α] {s : Set α} (hd : Dense s) (hbot : ∀ x, IsBot x → x ∈ s) (hIoo : ∀ x y : α, x < y → Ioo x y = ∅ → y ∈ s) : borel α = .generateFrom { S : Set α \| ∃ l ∈ s, ∃ u ∈ s, l < u ∧ Ico l u = S } := by set S : Set (Set α) := { S \| ∃ l ∈ s, ∃ u ∈ s, l < u ∧ Ico l u = S } refine le_antisymm ?_ (generateFrom_Ico_mem_le_borel _ _) letI : MeasurableSpace α := generateFrom S rw [borel_eq_generateFrom_Iio] refine generateFrom_le (forall_mem_range.2 fun a => ?_) rcases hd.exists_countable_dense_subset_bot_top with ⟨t, hts, hc, htd, htb, -⟩ by_cases ha : ∀ b < a, (Ioo b a).Nonempty · convert_to MeasurableSet (⋃ (l ∈ t) (u ∈ t) (_ : l < u) (_ : u ≤ a), Ico l u) · ext y simp only [mem_iUnion, mem_Iio, mem_Ico] constructor · intro hy rcases htd.exists_le' (fun b hb => htb _ hb (hbot b hb)) y with ⟨l, hlt, hly⟩ rcases htd.exists_mem_open isOpen_Ioo (ha y hy) with ⟨u, hut, hyu, hua⟩ exact ⟨l, hlt, u, hut, hly.trans_lt hyu, hua.le, hly, hyu⟩ · rintro ⟨l, -, u, -, -, hua, -, hyu⟩ exact hyu.trans_le hua · refine MeasurableSet.biUnion hc fun a ha => MeasurableSet.biUnion hc fun b hb => ?_ refine MeasurableSet.iUnion fun hab => MeasurableSet.iUnion fun _ => ?_ exact .basic _ ⟨a, hts ha, b, hts hb, hab, mem_singleton _⟩ · simp only [not_forall, not_nonempty_iff_eq_empty] at ha replace ha : a ∈ s := hIoo ha.choose a ha.choose_spec.fst ha.choose_spec.snd convert_to MeasurableSet (⋃ (l ∈ t) (_ : l < a), Ico l a) · symm simp only [← Ici_inter_Iio, ← iUnion_inter, inter_eq_right, subset_def, mem_iUnion, mem_Ici, mem_Iio] intro x hx rcases htd.exists_le' (fun b hb => htb _ hb (hbot b hb)) x with ⟨z, hzt, hzx⟩ exact ⟨z, hzt, hzx.trans_lt hx, hzx⟩ · refine .biUnion hc fun x hx => MeasurableSet.iUnion fun hlt => ?_ exact .basic _ ⟨x, hts hx, a, ha, hlt, mem_singleton _⟩ theorem Dense.borel_eq_generateFrom_Ico_mem {α : Type} [TopologicalSpace α] [LinearOrder α] [OrderTopology α] [SecondCountableTopology α] [DenselyOrdered α] [NoMinOrder α] {s : Set α} (hd : Dense s) : borel α = .generateFrom { S : Set α \| ∃ l ∈ s, ∃ u ∈ s, l < u ∧ Ico l u = S } := hd.borel_eq_generateFrom_Ico_mem_aux (by simp) fun _ _ hxy H => ((nonempty_Ioo.2 hxy).ne_empty H).elim theorem borel_eq_generateFrom_Ico (α : Type) [TopologicalSpace α] [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] : borel α = .generateFrom { S : Set α \| ∃ (l u : α), l < u ∧ Ico l u = S } := by simpa only [exists_prop, mem_univ, true_and] using (@dense_univ α _).borel_eq_generateFrom_Ico_mem_aux (fun _ _ => mem_univ _) fun _ _ _ _ => mem_univ _ theorem Dense.borel_eq_generateFrom_Ioc_mem_aux {α : Type} [TopologicalSpace α] [LinearOrder α] [OrderTopology α] [SecondCountableTopology α] {s : Set α} (hd : Dense s) (hbot : ∀ x, IsTop x → x ∈ s) (hIoo : ∀ x y : α, x < y → Ioo x y = ∅ → x ∈ s) : borel α = .generateFrom { S : Set α \| ∃ l ∈ s, ∃ u ∈ s, l < u ∧ Ioc l u = S } := by convert hd.orderDual.borel_eq_generateFrom_Ico_mem_aux hbot fun x y hlt he => hIoo y x hlt _ using 2 · ext s constructor <;> rintro ⟨l, hl, u, hu, hlt, rfl⟩ exacts [⟨u, hu, l, hl, hlt, Ico_toDual⟩, ⟨u, hu, l, hl, hlt, Ioc_toDual⟩] · erw [Ioo_toDual] exact he theorem Dense.borel_eq_generateFrom_Ioc_mem {α : Type} [TopologicalSpace α] [LinearOrder α] [OrderTopology α] [SecondCountableTopology α] [DenselyOrdered α] [NoMaxOrder α] {s : Set α} (hd : Dense s) : borel α = .generateFrom { S : Set α \| ∃ l ∈ s, ∃ u ∈ s, l < u ∧ Ioc l u = S } := hd.borel_eq_generateFrom_Ioc_mem_aux (by simp) fun _ _ hxy H => ((nonempty_Ioo.2 hxy).ne_empty H).elim theorem borel_eq_generateFrom_Ioc (α : Type) [TopologicalSpace α] [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] : borel α = .generateFrom { S : Set α \| ∃ l u, l < u ∧ Ioc l u = S } := by simpa only [exists_prop, mem_univ, true_and] using (@dense_univ α _).borel_eq_generateFrom_Ioc_mem_aux (fun _ _ => mem_univ _) fun _ _ _ _ => mem_univ _ namespace MeasureTheory.Measure /-- Two finite measures on a Borel space are equal if they agree on all closed-open intervals. If `α` is a conditionally complete linear order with no top element, `MeasureTheory.Measure.ext_of_Ico` is an extensionality lemma with weaker assumptions on `μ` and `ν`. -/ theorem ext_of_Ico_finite {α : Type} [TopologicalSpace α] {m : MeasurableSpace α} [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] [BorelSpace α] (μ ν : Measure α) [IsFiniteMeasure μ] (hμν : μ univ = ν univ) (h : ∀ ⦃a b⦄, a < b → μ (Ico a b) = ν (Ico a b)) : μ = ν := by refine ext_of_generate_finite _ (BorelSpace.measurable_eq.trans (borel_eq_generateFrom_Ico α)) (isPiSystem_Ico (id : α → α) id) ?_ hμν rintro - ⟨a, b, hlt, rfl⟩ exact h hlt /-- Two finite measures on a Borel space are equal if they agree on all open-closed intervals. If `α` is a conditionally complete linear order with no top element, `MeasureTheory.Measure.ext_of_Ioc` is an extensionality lemma with weaker assumptions on `μ` and `ν`. -/ theorem ext_of_Ioc_finite {α : Type} [TopologicalSpace α] {m : MeasurableSpace α} [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] [BorelSpace α] (μ ν : Measure α) [IsFiniteMeasure μ] (hμν : μ univ = ν univ) (h : ∀ ⦃a b⦄, a < b → μ (Ioc a b) = ν (Ioc a b)) : μ = ν := by refine @ext_of_Ico_finite αᵒᵈ _ _ _ _ _ ‹_› μ ν _ hμν fun a b hab => ?_ erw [Ico_toDual (α := α)] exact h hab /-- Two measures which are finite on closed-open intervals are equal if they agree on all closed-open intervals. -/ theorem ext_of_Ico' {α : Type} [TopologicalSpace α] {m : MeasurableSpace α} [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] [BorelSpace α] [NoMaxOrder α] (μ ν : Measure α) (hμ : ∀ ⦃a b⦄, a < b → μ (Ico a b) ≠ ∞) (h : ∀ ⦃a b⦄, a < b → μ (Ico a b) = ν (Ico a b)) : μ = ν := by rcases exists_countable_dense_bot_top α with ⟨s, hsc, hsd, hsb, _⟩ have : (⋃ (l ∈ s) (u ∈ s) (_ : l < u), {Ico l u} : Set (Set α)).Countable := hsc.biUnion fun l _ => hsc.biUnion fun u _ => countable_iUnion fun _ => countable_singleton _ simp only [← setOf_eq_eq_singleton, ← setOf_exists] at this refine Measure.ext_of_generateFrom_of_cover_subset (BorelSpace.measurable_eq.trans (borel_eq_generateFrom_Ico α)) (isPiSystem_Ico id id) ?_ this ?_ ?_ ?_ · rintro _ ⟨l, -, u, -, h, rfl⟩ exact ⟨l, u, h, rfl⟩ · refine sUnion_eq_univ_iff.2 fun x => ?_ rcases hsd.exists_le' hsb x with ⟨l, hls, hlx⟩ rcases hsd.exists_gt x with ⟨u, hus, hxu⟩ exact ⟨_, ⟨l, hls, u, hus, hlx.trans_lt hxu, rfl⟩, hlx, hxu⟩ · rintro _ ⟨l, -, u, -, hlt, rfl⟩ exact hμ hlt · rintro _ ⟨l, u, hlt, rfl⟩ exact h hlt /-- Two measures which are finite on closed-open intervals are equal if they agree on all open-closed intervals. -/ theorem ext_of_Ioc' {α : Type} [TopologicalSpace α] {m : MeasurableSpace α} [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] [BorelSpace α] [NoMinOrder α] (μ ν : Measure α) (hμ : ∀ ⦃a b⦄, a < b → μ (Ioc a b) ≠ ∞) (h : ∀ ⦃a b⦄, a < b → μ (Ioc a b) = ν (Ioc a b)) : μ = ν := by refine @ext_of_Ico' αᵒᵈ _ _ _ _ _ ‹_› _ μ ν ?_ ?_ <;> intro a b hab <;> erw [Ico_toDual (α := α)] exacts [hμ hab, h hab] /-- Two measures which are finite on closed-open intervals are equal if they agree on all closed-open intervals. -/ theorem ext_of_Ico {α : Type} [TopologicalSpace α] {_m : MeasurableSpace α} [SecondCountableTopology α] [ConditionallyCompleteLinearOrder α] [OrderTopology α] [BorelSpace α] [NoMaxOrder α] (μ ν : Measure α) [IsLocallyFiniteMeasure μ] (h : ∀ ⦃a b⦄, a < b → μ (Ico a b) = ν (Ico a b)) : μ = ν := μ.ext_of_Ico' ν (fun _ _ _ => measure_Ico_lt_top.ne) h /-- Two measures which are finite on closed-open intervals are equal if they agree on all open-closed intervals. -/ theorem ext_of_Ioc {α : Type} [TopologicalSpace α] {_m : MeasurableSpace α} [SecondCountableTopology α] [ConditionallyCompleteLinearOrder α] [OrderTopology α] [BorelSpace α] [NoMinOrder α] (μ ν : Measure α) [IsLocallyFiniteMeasure μ] (h : ∀ ⦃a b⦄, a < b → μ (Ioc a b) = ν (Ioc a b)) : μ = ν := μ.ext_of_Ioc' ν (fun _ _ _ => measure_Ioc_lt_top.ne) h /-- Two finite measures on a Borel space are equal if they agree on all left-infinite right-closed intervals. -/ theorem ext_of_Iic {α : Type} [TopologicalSpace α] {m : MeasurableSpace α} [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] [BorelSpace α] (μ ν : Measure α) [IsFiniteMeasure μ] (h : ∀ a, μ (Iic a) = ν (Iic a)) : μ = ν := by refine ext_of_Ioc_finite μ ν ?_ fun a b hlt => ?_ · rcases exists_countable_dense_bot_top α with ⟨s, hsc, hsd, -, hst⟩ have : DirectedOn (· ≤ ·) s := directedOn_iff_directed.2 (Subtype.mono_coe _).directed_le simp only [← biSup_measure_Iic hsc (hsd.exists_ge' hst) this, h] rw [← Iic_diff_Iic, measure_diff (Iic_subset_Iic.2 hlt.le) nullMeasurableSet_Iic, measure_diff (Iic_subset_Iic.2 hlt.le) nullMeasurableSet_Iic, h a, h b] · rw [← h a] exact measure_ne_top μ _ · exact measure_ne_top μ _ /-- Two finite measures on a Borel space are equal if they agree on all left-closed right-infinite intervals. -/ theorem ext_of_Ici {α : Type} [TopologicalSpace α] {_ : MeasurableSpace α} [SecondCountableTopology α] [LinearOrder α] [OrderTopology α] [BorelSpace α] (μ ν : Measure α) [IsFiniteMeasure μ] (h : ∀ a, μ (Ici a) = ν (Ici a)) : μ = ν := @ext_of_Iic αᵒᵈ _ _ _ _ _ ‹_› _ _ _ h end MeasureTheory.Measure @[measurability] theorem measurableSet_uIcc : MeasurableSet (uIcc a b) := measurableSet_Icc @[measurability] theorem measurableSet_uIoc : MeasurableSet (uIoc a b) := measurableSet_Ioc variable [SecondCountableTopology α] @[measurability, fun_prop] theorem Measurable.max {f g : δ → α} (hf : Measurable f) (hg : Measurable g) : Measurable fun a => max (f a) (g a) := by simpa only [max_def'] using hf.piecewise (measurableSet_le hg hf) hg @[measurability, fun_prop] nonrec theorem AEMeasurable.max {f g : δ → α} {μ : Measure δ} (hf : AEMeasurable f μ) (hg : AEMeasurable g μ) : AEMeasurable (fun a => max (f a) (g a)) μ := ⟨fun a => max (hf.mk f a) (hg.mk g a), hf.measurable_mk.max hg.measurable_mk, EventuallyEq.comp₂ hf.ae_eq_mk _ hg.ae_eq_mk⟩ @[measurability, fun_prop] theorem Measurable.min {f g : δ → α} (hf : Measurable f) (hg : Measurable g) : Measurable fun a => min (f a) (g a) := by simpa only [min_def] using hf.piecewise (measurableSet_le hf hg) hg @[measurability, fun_prop] nonrec theorem AEMeasurable.min {f g : δ → α} {μ : Measure δ} (hf : AEMeasurable f μ) (hg : AEMeasurable g μ) : AEMeasurable (fun a => min (f a) (g a)) μ := ⟨fun a => min (hf.mk f a) (hg.mk g a), hf.measurable_mk.min hg.measurable_mk, EventuallyEq.comp₂ hf.ae_eq_mk _ hg.ae_eq_mk⟩ end LinearOrder section Lattice variable [TopologicalSpace γ] {mγ : MeasurableSpace γ} [BorelSpace γ] instance (priority := 100) ContinuousSup.measurableSup [Max γ] [ContinuousSup γ] : MeasurableSup γ where measurable_const_sup _ := (continuous_const.sup continuous_id).measurable measurable_sup_const _ := (continuous_id.sup continuous_const).measurable instance (priority := 100) ContinuousSup.measurableSup₂ [SecondCountableTopology γ] [Max γ] [ContinuousSup γ] : MeasurableSup₂ γ := ⟨continuous_sup.measurable⟩ instance (priority := 100) ContinuousInf.measurableInf [Min γ] [ContinuousInf γ] : MeasurableInf γ where measurable_const_inf _ := (continuous_const.inf continuous_id).measurable measurable_inf_const _ := (continuous_id.inf continuous_const).measurable instance (priority := 100) ContinuousInf.measurableInf₂ [SecondCountableTopology γ] [Min γ] [ContinuousInf γ] : MeasurableInf₂ γ := ⟨continuous_inf.measurable⟩ end Lattice end Orders section BorelSpace variable [TopologicalSpace α] {mα : MeasurableSpace α} [BorelSpace α] variable [TopologicalSpace β] {mβ : MeasurableSpace β} [BorelSpace β] variable {mδ : MeasurableSpace δ} section LinearOrder variable [LinearOrder α] [OrderTopology α] [SecondCountableTopology α] theorem measurable_of_Iio {f : δ → α} (hf : ∀ x, MeasurableSet (f ⁻¹' Iio x)) : Measurable f := by convert measurable_generateFrom (α := δ) _ · exact BorelSpace.measurable_eq.trans (borel_eq_generateFrom_Iio _) · rintro _ ⟨x, rfl⟩; exact hf x theorem UpperSemicontinuous.measurable [TopologicalSpace δ] [OpensMeasurableSpace δ] {f : δ → α} (hf : UpperSemicontinuous f) : Measurable f := measurable_of_Iio fun y => (hf.isOpen_preimage y).measurableSet theorem measurable_of_Ioi {f : δ → α} (hf : ∀ x, MeasurableSet (f ⁻¹' Ioi x)) : Measurable f := by convert measurable_generateFrom (α := δ) _ · exact BorelSpace.measurable_eq.trans (borel_eq_generateFrom_Ioi _) · rintro _ ⟨x, rfl⟩; exact hf x theorem LowerSemicontinuous.measurable [TopologicalSpace δ] [OpensMeasurableSpace δ] {f : δ → α} (hf : LowerSemicontinuous f) : Measurable f := measurable_of_Ioi fun y => (hf.isOpen_preimage y).measurableSet theorem measurable_of_Iic {f : δ → α} (hf : ∀ x, MeasurableSet (f ⁻¹' Iic x)) : Measurable f := by apply measurable_of_Ioi simp_rw [← compl_Iic, preimage_compl, MeasurableSet.compl_iff] assumption theorem measurable_of_Ici {f : δ → α} (hf : ∀ x, MeasurableSet (f ⁻¹' Ici x)) : Measurable f := by apply measurable_of_Iio simp_rw [← compl_Ici, preimage_compl, MeasurableSet.compl_iff] assumption /-- If a function is the least upper bound of countably many measurable functions, then it is measurable. -/ theorem Measurable.isLUB {ι} [Countable ι] {f : ι → δ → α} {g : δ → α} (hf : ∀ i, Measurable (f i)) (hg : ∀ b, IsLUB { a \| ∃ i, f i b = a } (g b)) : Measurable g := by change ∀ b, IsLUB (range fun i => f i b) (g b) at hg rw [‹BorelSpace α›.measurable_eq, borel_eq_generateFrom_Ioi α] apply measurable_generateFrom rintro _ ⟨a, rfl⟩ simp_rw [Set.preimage, mem_Ioi, lt_isLUB_iff (hg _), exists_range_iff, setOf_exists] exact MeasurableSet.iUnion fun i => hf i (isOpen_lt' _).measurableSet /-- If a function is the least upper bound of countably many measurable functions on a measurable set `s`, and coincides with a measurable function outside of `s`, then it is measurable. -/ theorem Measurable.isLUB_of_mem {ι} [Countable ι] {f : ι → δ → α} {g g' : δ → α} (hf : ∀ i, Measurable (f i)) {s : Set δ} (hs : MeasurableSet s) (hg : ∀ b ∈ s, IsLUB { a \| ∃ i, f i b = a } (g b)) (hg' : EqOn g g' sᶜ) (g'_meas : Measurable g') : Measurable g := by classical rcases isEmpty_or_nonempty ι with hι\|⟨⟨i⟩⟩ · rcases eq_empty_or_nonempty s with rfl\|⟨x, hx⟩ · convert g'_meas rwa [compl_empty, eqOn_univ] at hg' · have A : ∀ b ∈ s, IsBot (g b) := by simpa using hg have B : ∀ b ∈ s, g b = g x := by intro b hb apply le_antisymm (A b hb (g x)) (A x hx (g b)) have : g = s.piecewise (fun _y ↦ g x) g' := by ext b by_cases hb : b ∈ s · simp [hb, B] · simp [hb, hg' hb] rw [this] exact Measurable.piecewise hs measurable_const g'_meas · have : Nonempty ι := ⟨i⟩ let f' : ι → δ → α := fun i ↦ s.piecewise (f i) g' suffices ∀ b, IsLUB { a \| ∃ i, f' i b = a } (g b) from Measurable.isLUB (fun i ↦ Measurable.piecewise hs (hf i) g'_meas) this intro b by_cases hb : b ∈ s · have A : ∀ i, f' i b = f i b := fun i ↦ by simp [f', hb] simpa [A] using hg b hb · have A : ∀ i, f' i b = g' b := fun i ↦ by simp [f', hb] simp [A, hg' hb, isLUB_singleton] theorem AEMeasurable.isLUB {ι} {μ : Measure δ} [Countable ι] {f : ι → δ → α} {g : δ → α} (hf : ∀ i, AEMeasurable (f i) μ) (hg : ∀ᵐ b ∂μ, IsLUB { a \| ∃ i, f i b = a } (g b)) : AEMeasurable g μ := by classical nontriviality α haveI hα : Nonempty α := inferInstance rcases isEmpty_or_nonempty ι with hι \| hι · simp only [IsEmpty.exists_iff, setOf_false, isLUB_empty_iff] at hg exact aemeasurable_const' (hg.mono fun a ha => hg.mono fun b hb => (ha _).antisymm (hb _)) let p : δ → (ι → α) → Prop := fun x f' => IsLUB { a \| ∃ i, f' i = a } (g x) let g_seq := (aeSeqSet hf p).piecewise g fun _ => hα.some have hg_seq : ∀ b, IsLUB { a \| ∃ i, aeSeq hf p i b = a } (g_seq b) := by intro b simp only [g_seq, aeSeq, Set.piecewise] split_ifs with h · have h_set_eq : { a : α \| ∃ i : ι, (hf i).mk (f i) b = a } = { a : α \| ∃ i : ι, f i b = a } := by ext x simp_rw [Set.mem_setOf_eq, aeSeq.mk_eq_fun_of_mem_aeSeqSet hf h] rw [h_set_eq] exact aeSeq.fun_prop_of_mem_aeSeqSet hf h · exact IsGreatest.isLUB ⟨(@exists_const (hα.some = hα.some) ι _).2 rfl, fun x ⟨i, hi⟩ => hi.ge⟩ refine ⟨g_seq, Measurable.isLUB (aeSeq.measurable hf p) hg_seq, ?_⟩ exact (ite_ae_eq_of_measure_compl_zero g (fun _ => hα.some) (aeSeqSet hf p) (aeSeq.measure_compl_aeSeqSet_eq_zero hf hg)).symm /-- If a function is the greatest lower bound of countably many measurable functions, then it is measurable. -/ theorem Measurable.isGLB {ι} [Countable ι] {f : ι → δ → α} {g : δ → α} (hf : ∀ i, Measurable (f i)) (hg : ∀ b, IsGLB { a \| ∃ i, f i b = a } (g b)) : Measurable g := Measurable.isLUB (α := αᵒᵈ) hf hg /-- If a function is the greatest lower bound of countably many measurable functions on a measurable set `s`, and coincides with a measurable function outside of `s`, then it is measurable. -/ theorem Measurable.isGLB_of_mem {ι} [Countable ι] {f : ι → δ → α} {g g' : δ → α} (hf : ∀ i, Measurable (f i)) {s : Set δ} (hs : MeasurableSet s) (hg : ∀ b ∈ s, IsGLB { a \| ∃ i, f i b = a } (g b)) (hg' : EqOn g g' sᶜ) (g'_meas : Measurable g') : Measurable g := Measurable.isLUB_of_mem (α := αᵒᵈ) hf hs hg hg' g'_meas theorem AEMeasurable.isGLB {ι} {μ : Measure δ} [Countable ι] {f : ι → δ → α} {g : δ → α} (hf : ∀ i, AEMeasurable (f i) μ) (hg : ∀ᵐ b ∂μ, IsGLB { a \| ∃ i, f i b = a } (g b)) : AEMeasurable g μ := AEMeasurable.isLUB (α := αᵒᵈ) hf hg protected theorem Monotone.measurable [LinearOrder β] [OrderClosedTopology β] {f : β → α} (hf : Monotone f) : Measurable f := suffices h : ∀ x, OrdConnected (f ⁻¹' Ioi x) from measurable_of_Ioi fun x => (h x).measurableSet fun _ => ordConnected_def.mpr fun _a ha _ _ _c hc => lt_of_lt_of_le ha (hf hc.1) theorem aemeasurable_restrict_of_monotoneOn [LinearOrder β] [OrderClosedTopology β] {μ : Measure β} {s : Set β} (hs : MeasurableSet s) {f : β → α} (hf : MonotoneOn f s) : AEMeasurable f (μ.restrict s) := have : Monotone (f ∘ (↑) : s → α) := fun ⟨x, hx⟩ ⟨y, hy⟩ => fun (hxy : x ≤ y) => hf hx hy hxy aemeasurable_restrict_of_measurable_subtype hs this.measurable protected theorem Antitone.measurable [LinearOrder β] [OrderClosedTopology β] {f : β → α} (hf : Antitone f) : Measurable f := @Monotone.measurable αᵒᵈ β _ _ ‹_› _ _ _ _ _ ‹_› _ _ _ hf theorem aemeasurable_restrict_of_antitoneOn [LinearOrder β] [OrderClosedTopology β] {μ : Measure β} {s : Set β} (hs : MeasurableSet s) {f : β → α} (hf : AntitoneOn f s) : AEMeasurable f (μ.restrict s) := @aemeasurable_restrict_of_monotoneOn αᵒᵈ β _ _ ‹_› _ _ _ _ _ ‹_› _ _ _ _ hs _ hf theorem MeasurableSet.of_mem_nhdsGT_aux {s : Set α} (h : ∀ x ∈ s, s ∈ 𝓝[>] x) (h' : ∀ x ∈ s, ∃ y, x < y) : MeasurableSet s := by choose! M hM using h' suffices H : (s \ interior s).Countable by have : s = interior s ∪ s \ interior s := by rw [union_diff_cancel interior_subset] rw [this] exact isOpen_interior.measurableSet.union H.measurableSet have A : ∀ x ∈ s, ∃ y ∈ Ioi x, Ioo x y ⊆ s := fun x hx => (mem_nhdsGT_iff_exists_Ioo_subset' (hM x hx)).1 (h x hx) choose! y hy h'y using A have B : Set.PairwiseDisjoint (s \ interior s) fun x => Ioo x (y x) := by intro x hx x' hx' hxx' rcases lt_or_gt_of_ne hxx' with (h' \| h') · refine disjoint_left.2 fun z hz h'z => ?_ have : x' ∈ interior s := mem_interior.2 ⟨Ioo x (y x), h'y _ hx.1, isOpen_Ioo, ⟨h', h'z.1.trans hz.2⟩⟩ exact False.elim (hx'.2 this) · refine disjoint_left.2 fun z hz h'z => ?_ have : x ∈ interior s := mem_interior.2 ⟨Ioo x' (y x'), h'y _ hx'.1, isOpen_Ioo, ⟨h', hz.1.trans h'z.2⟩⟩ exact False.elim (hx.2 this) exact B.countable_of_Ioo fun x hx => hy x hx.1 @[deprecated (since := "2024-12-22")] alias measurableSet_of_mem_nhdsWithin_Ioi_aux := MeasurableSet.of_mem_nhdsGT_aux /-- If a set is a right-neighborhood of all of its points, then it is measurable. -/ theorem MeasurableSet.of_mem_nhdsGT {s : Set α} (h : ∀ x ∈ s, s ∈ 𝓝[>] x) : MeasurableSet s := by by_cases H : ∃ x ∈ s, IsTop x · rcases H with ⟨x₀, x₀s, h₀⟩ have : s = { x₀ } ∪ s \ { x₀ } := by rw [union_diff_cancel (singleton_subset_iff.2 x₀s)] rw [this] refine (measurableSet_singleton _).union ?_ have A : ∀ x ∈ s \ { x₀ }, x < x₀ := fun x hx => lt_of_le_of_ne (h₀ _) (by simpa using hx.2) refine .of_mem_nhdsGT_aux (fun x hx => ?_) fun x hx => ⟨x₀, A x hx⟩ obtain ⟨u, hu, us⟩ : ∃ (u : α), u ∈ Ioi x ∧ Ioo x u ⊆ s := (mem_nhdsGT_iff_exists_Ioo_subset' (A x hx)).1 (h x hx.1) refine (mem_nhdsGT_iff_exists_Ioo_subset' (A x hx)).2 ⟨u, hu, fun y hy => ⟨us hy, ?_⟩⟩ exact ne_of_lt (hy.2.trans_le (h₀ _)) · refine .of_mem_nhdsGT_aux h ?_ simp only [IsTop] at H push_neg at H exact H @[deprecated (since := "2024-12-22")] alias measurableSet_of_mem_nhdsWithin_Ioi := MeasurableSet.of_mem_nhdsGT lemma measurableSet_bddAbove_range {ι} [Countable ι] {f : ι → δ → α} (hf : ∀ i, Measurable (f i)) : MeasurableSet {b \| BddAbove (range (fun i ↦ f i b))} := by rcases isEmpty_or_nonempty α with hα\|hα · have : ∀ b, range (fun i ↦ f i b) = ∅ := fun b ↦ eq_empty_of_isEmpty _ simp [this] have A : ∀ (i : ι) (c : α), MeasurableSet {x \| f i x ≤ c} := by intro i c exact measurableSet_le (hf i) measurable_const have B : ∀ (c : α), MeasurableSet {x \| ∀ i, f i x ≤ c} := by intro c rw [setOf_forall] exact MeasurableSet.iInter (fun i ↦ A i c) obtain ⟨u, hu⟩ : ∃ (u : ℕ → α), Tendsto u atTop atTop := exists_seq_tendsto (atTop : Filter α) have : {b \| BddAbove (range (fun i ↦ f i b))} = {x \| ∃ n, ∀ i, f i x ≤ u n} := by apply Subset.antisymm · rintro x ⟨c, hc⟩ obtain ⟨n, hn⟩ : ∃ n, c ≤ u n := (tendsto_atTop.1 hu c).exists exact ⟨n, fun i ↦ (hc ((mem_range_self i))).trans hn⟩ · rintro x ⟨n, hn⟩ refine ⟨u n, ?_⟩ rintro - ⟨i, rfl⟩ exact hn i rw [this, setOf_exists] exact MeasurableSet.iUnion (fun n ↦ B (u n)) lemma measurableSet_bddBelow_range {ι} [Countable ι] {f : ι → δ → α} (hf : ∀ i, Measurable (f i)) : MeasurableSet {b \| BddBelow (range (fun i ↦ f i b))} := measurableSet_bddAbove_range (α := αᵒᵈ) hf end LinearOrder section ConditionallyCompleteLattice @[measurability, fun_prop] theorem Measurable.iSup_Prop {α} {mα : MeasurableSpace α} [ConditionallyCompleteLattice α] (p : Prop) {f : δ → α} (hf : Measurable f) : Measurable fun b => ⨆ _ : p, f b := by classical simp_rw [ciSup_eq_ite] split_ifs with h · exact hf · exact measurable_const @[measurability, fun_prop] theorem Measurable.iInf_Prop {α} {mα : MeasurableSpace α} [ConditionallyCompleteLattice α]	(p : Prop) {f : δ → α} (hf : Measurable f) : Measurable fun b => ⨅ _ : p, f b := by classical simp_rw [ciInf_eq_ite] split_ifs with h · exact hf · exact measurable_const end ConditionallyCompleteLattice section ConditionallyCompleteLinearOrder variable [ConditionallyCompleteLinearOrder α] [OrderTopology α] [SecondCountableTopology α] @[measurability, fun_prop] protected theorem Measurable.iSup {ι} [Countable ι] {f : ι → δ → α} (hf : ∀ i, Measurable (f i)) : Measurable (fun b ↦ ⨆ i, f i b) := by rcases isEmpty_or_nonempty ι with hι\|hι · simp [iSup_of_empty'] have A : MeasurableSet {b \| BddAbove (range (fun i ↦ f i b))} := measurableSet_bddAbove_range hf have : Measurable (fun (_b : δ) ↦ sSup (∅ : Set α)) := measurable_const apply Measurable.isLUB_of_mem hf A _ _ this · rintro b ⟨c, hc⟩ apply isLUB_ciSup	Mathlib/MeasureTheory/Constructions/BorelSpace/Order.lean	739	762
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro -/ import Mathlib.Data.Set.Constructions import Mathlib.Order.Filter.AtTopBot.CountablyGenerated import Mathlib.Topology.Constructions import Mathlib.Topology.ContinuousOn /-! # Bases of topologies. Countability axioms. A topological basis on a topological space `t` is a collection of sets, such that all open sets can be generated as unions of these sets, without the need to take finite intersections of them. This file introduces a framework for dealing with these collections, and also what more we can say under certain countability conditions on bases, which are referred to as first- and second-countable. We also briefly cover the theory of separable spaces, which are those with a countable, dense subset. If a space is second-countable, and also has a countably generated uniformity filter (for example, if `t` is a metric space), it will automatically be separable (and indeed, these conditions are equivalent in this case). ## Main definitions * `TopologicalSpace.IsTopologicalBasis s`: The topological space `t` has basis `s`. * `TopologicalSpace.SeparableSpace α`: The topological space `t` has a countable, dense subset. * `TopologicalSpace.IsSeparable s`: The set `s` is contained in the closure of a countable set. * `FirstCountableTopology α`: A topology in which `𝓝 x` is countably generated for every `x`. * `SecondCountableTopology α`: A topology which has a topological basis which is countable. ## Main results * `TopologicalSpace.FirstCountableTopology.tendsto_subseq`: In a first-countable space, cluster points are limits of subsequences. * `TopologicalSpace.SecondCountableTopology.isOpen_iUnion_countable`: In a second-countable space, the union of arbitrarily-many open sets is equal to a sub-union of only countably many of these sets. * `TopologicalSpace.SecondCountableTopology.countable_cover_nhds`: Consider `f : α → Set α` with the property that `f x ∈ 𝓝 x` for all `x`. Then there is some countable set `s` whose image covers the space. ## Implementation Notes For our applications we are interested that there exists a countable basis, but we do not need the concrete basis itself. This allows us to declare these type classes as `Prop` to use them as mixins. ## TODO More fine grained instances for `FirstCountableTopology`, `TopologicalSpace.SeparableSpace`, and more. -/ open Set Filter Function Topology noncomputable section namespace TopologicalSpace universe u variable {α : Type u} {β : Type} [t : TopologicalSpace α] {B : Set (Set α)} {s : Set α} /-- A topological basis is one that satisfies the necessary conditions so that it suffices to take unions of the basis sets to get a topology (without taking finite intersections as well). -/ structure IsTopologicalBasis (s : Set (Set α)) : Prop where /-- For every point `x`, the set of `t ∈ s` such that `x ∈ t` is directed downwards. -/ exists_subset_inter : ∀ t₁ ∈ s, ∀ t₂ ∈ s, ∀ x ∈ t₁ ∩ t₂, ∃ t₃ ∈ s, x ∈ t₃ ∧ t₃ ⊆ t₁ ∩ t₂ /-- The sets from `s` cover the whole space. -/ sUnion_eq : ⋃₀ s = univ /-- The topology is generated by sets from `s`. -/ eq_generateFrom : t = generateFrom s /-- If a family of sets `s` generates the topology, then intersections of finite subcollections of `s` form a topological basis. -/ theorem isTopologicalBasis_of_subbasis {s : Set (Set α)} (hs : t = generateFrom s) : IsTopologicalBasis ((fun f => ⋂₀ f) '' { f : Set (Set α) \| f.Finite ∧ f ⊆ s }) := by subst t; letI := generateFrom s refine ⟨?_, ?_, le_antisymm (le_generateFrom ?_) <\| generateFrom_anti fun t ht => ?_⟩ · rintro _ ⟨t₁, ⟨hft₁, ht₁b⟩, rfl⟩ _ ⟨t₂, ⟨hft₂, ht₂b⟩, rfl⟩ x h exact ⟨_, ⟨_, ⟨hft₁.union hft₂, union_subset ht₁b ht₂b⟩, sInter_union t₁ t₂⟩, h, Subset.rfl⟩ · rw [sUnion_image, iUnion₂_eq_univ_iff] exact fun x => ⟨∅, ⟨finite_empty, empty_subset _⟩, sInter_empty.substr <\| mem_univ x⟩ · rintro _ ⟨t, ⟨hft, htb⟩, rfl⟩ exact hft.isOpen_sInter fun s hs ↦ GenerateOpen.basic _ <\| htb hs · rw [← sInter_singleton t] exact ⟨{t}, ⟨finite_singleton t, singleton_subset_iff.2 ht⟩, rfl⟩ theorem isTopologicalBasis_of_subbasis_of_finiteInter {s : Set (Set α)} (hsg : t = generateFrom s) (hsi : FiniteInter s) : IsTopologicalBasis s := by convert isTopologicalBasis_of_subbasis hsg refine le_antisymm (fun t ht ↦ ⟨{t}, by simpa using ht⟩) ?_ rintro _ ⟨g, ⟨hg, hgs⟩, rfl⟩ lift g to Finset (Set α) using hg exact hsi.finiteInter_mem g hgs theorem isTopologicalBasis_of_subbasis_of_inter {r : Set (Set α)} (hsg : t = generateFrom r) (hsi : ∀ ⦃s⦄, s ∈ r → ∀ ⦃t⦄, t ∈ r → s ∩ t ∈ r) : IsTopologicalBasis (insert univ r) := isTopologicalBasis_of_subbasis_of_finiteInter (by simpa using hsg) (FiniteInter.mk₂ hsi) theorem IsTopologicalBasis.of_hasBasis_nhds {s : Set (Set α)} (h_nhds : ∀ a, (𝓝 a).HasBasis (fun t ↦ t ∈ s ∧ a ∈ t) id) : IsTopologicalBasis s where exists_subset_inter t₁ ht₁ t₂ ht₂ x hx := by simpa only [and_assoc, (h_nhds x).mem_iff] using (inter_mem ((h_nhds _).mem_of_mem ⟨ht₁, hx.1⟩) ((h_nhds _).mem_of_mem ⟨ht₂, hx.2⟩)) sUnion_eq := sUnion_eq_univ_iff.2 fun x ↦ (h_nhds x).ex_mem eq_generateFrom := ext_nhds fun x ↦ by simpa only [nhds_generateFrom, and_comm] using (h_nhds x).eq_biInf /-- If a family of open sets `s` is such that every open neighbourhood contains some member of `s`, then `s` is a topological basis. -/ theorem isTopologicalBasis_of_isOpen_of_nhds {s : Set (Set α)} (h_open : ∀ u ∈ s, IsOpen u) (h_nhds : ∀ (a : α) (u : Set α), a ∈ u → IsOpen u → ∃ v ∈ s, a ∈ v ∧ v ⊆ u) : IsTopologicalBasis s := .of_hasBasis_nhds <\| fun a ↦ (nhds_basis_opens a).to_hasBasis' (by simpa [and_assoc] using h_nhds a) fun _ ⟨hts, hat⟩ ↦ (h_open _ hts).mem_nhds hat /-- A set `s` is in the neighbourhood of `a` iff there is some basis set `t`, which contains `a` and is itself contained in `s`. -/ theorem IsTopologicalBasis.mem_nhds_iff {a : α} {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) : s ∈ 𝓝 a ↔ ∃ t ∈ b, a ∈ t ∧ t ⊆ s := by change s ∈ (𝓝 a).sets ↔ ∃ t ∈ b, a ∈ t ∧ t ⊆ s rw [hb.eq_generateFrom, nhds_generateFrom, biInf_sets_eq] · simp [and_assoc, and_left_comm] · rintro s ⟨hs₁, hs₂⟩ t ⟨ht₁, ht₂⟩ let ⟨u, hu₁, hu₂, hu₃⟩ := hb.1 _ hs₂ _ ht₂ _ ⟨hs₁, ht₁⟩ exact ⟨u, ⟨hu₂, hu₁⟩, le_principal_iff.2 (hu₃.trans inter_subset_left), le_principal_iff.2 (hu₃.trans inter_subset_right)⟩ · rcases eq_univ_iff_forall.1 hb.sUnion_eq a with ⟨i, h1, h2⟩ exact ⟨i, h2, h1⟩ theorem IsTopologicalBasis.isOpen_iff {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) : IsOpen s ↔ ∀ a ∈ s, ∃ t ∈ b, a ∈ t ∧ t ⊆ s := by simp [isOpen_iff_mem_nhds, hb.mem_nhds_iff] theorem IsTopologicalBasis.of_isOpen_of_subset {s s' : Set (Set α)} (h_open : ∀ u ∈ s', IsOpen u) (hs : IsTopologicalBasis s) (hss' : s ⊆ s') : IsTopologicalBasis s' := isTopologicalBasis_of_isOpen_of_nhds h_open fun a _ ha u_open ↦ have ⟨t, hts, ht⟩ := hs.isOpen_iff.mp u_open a ha; ⟨t, hss' hts, ht⟩ theorem IsTopologicalBasis.nhds_hasBasis {b : Set (Set α)} (hb : IsTopologicalBasis b) {a : α} : (𝓝 a).HasBasis (fun t : Set α => t ∈ b ∧ a ∈ t) fun t => t := ⟨fun s => hb.mem_nhds_iff.trans <\| by simp only [and_assoc]⟩ protected theorem IsTopologicalBasis.isOpen {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) (hs : s ∈ b) : IsOpen s := by rw [hb.eq_generateFrom] exact .basic s hs theorem IsTopologicalBasis.insert_empty {s : Set (Set α)} (h : IsTopologicalBasis s) : IsTopologicalBasis (insert ∅ s) := h.of_isOpen_of_subset (by rintro _ (rfl \| hu); exacts [isOpen_empty, h.isOpen hu]) (subset_insert ..) theorem IsTopologicalBasis.diff_empty {s : Set (Set α)} (h : IsTopologicalBasis s) : IsTopologicalBasis (s \ {∅}) := isTopologicalBasis_of_isOpen_of_nhds (fun _ hu ↦ h.isOpen hu.1) fun a _ ha hu ↦ have ⟨t, hts, ht⟩ := h.isOpen_iff.mp hu a ha ⟨t, ⟨hts, ne_of_mem_of_not_mem' ht.1 <\| not_mem_empty _⟩, ht⟩ protected theorem IsTopologicalBasis.mem_nhds {a : α} {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) (hs : s ∈ b) (ha : a ∈ s) : s ∈ 𝓝 a := (hb.isOpen hs).mem_nhds ha theorem IsTopologicalBasis.exists_subset_of_mem_open {b : Set (Set α)} (hb : IsTopologicalBasis b) {a : α} {u : Set α} (au : a ∈ u) (ou : IsOpen u) : ∃ v ∈ b, a ∈ v ∧ v ⊆ u := hb.mem_nhds_iff.1 <\| IsOpen.mem_nhds ou au /-- Any open set is the union of the basis sets contained in it. -/ theorem IsTopologicalBasis.open_eq_sUnion' {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} (ou : IsOpen u) : u = ⋃₀ { s ∈ B \| s ⊆ u } := ext fun _a => ⟨fun ha => let ⟨b, hb, ab, bu⟩ := hB.exists_subset_of_mem_open ha ou ⟨b, ⟨hb, bu⟩, ab⟩, fun ⟨_b, ⟨_, bu⟩, ab⟩ => bu ab⟩ theorem IsTopologicalBasis.open_eq_sUnion {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} (ou : IsOpen u) : ∃ S ⊆ B, u = ⋃₀ S := ⟨{ s ∈ B \| s ⊆ u }, fun _ h => h.1, hB.open_eq_sUnion' ou⟩ theorem IsTopologicalBasis.open_iff_eq_sUnion {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} : IsOpen u ↔ ∃ S ⊆ B, u = ⋃₀ S := ⟨hB.open_eq_sUnion, fun ⟨_S, hSB, hu⟩ => hu.symm ▸ isOpen_sUnion fun _s hs => hB.isOpen (hSB hs)⟩ theorem IsTopologicalBasis.open_eq_iUnion {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} (ou : IsOpen u) : ∃ (β : Type u) (f : β → Set α), (u = ⋃ i, f i) ∧ ∀ i, f i ∈ B := ⟨↥({ s ∈ B \| s ⊆ u }), (↑), by rw [← sUnion_eq_iUnion] apply hB.open_eq_sUnion' ou, fun s => And.left s.2⟩ lemma IsTopologicalBasis.subset_of_forall_subset {t : Set α} (hB : IsTopologicalBasis B) (hs : IsOpen s) (h : ∀ U ∈ B, U ⊆ s → U ⊆ t) : s ⊆ t := by rw [hB.open_eq_sUnion' hs]; simpa [sUnion_subset_iff] lemma IsTopologicalBasis.eq_of_forall_subset_iff {t : Set α} (hB : IsTopologicalBasis B) (hs : IsOpen s) (ht : IsOpen t) (h : ∀ U ∈ B, U ⊆ s ↔ U ⊆ t) : s = t := by rw [hB.open_eq_sUnion' hs, hB.open_eq_sUnion' ht] exact congr_arg _ (Set.ext fun U ↦ and_congr_right <\| h _) /-- A point `a` is in the closure of `s` iff all basis sets containing `a` intersect `s`. -/ theorem IsTopologicalBasis.mem_closure_iff {b : Set (Set α)} (hb : IsTopologicalBasis b) {s : Set α} {a : α} : a ∈ closure s ↔ ∀ o ∈ b, a ∈ o → (o ∩ s).Nonempty := (mem_closure_iff_nhds_basis' hb.nhds_hasBasis).trans <\| by simp only [and_imp] /-- A set is dense iff it has non-trivial intersection with all basis sets. -/ theorem IsTopologicalBasis.dense_iff {b : Set (Set α)} (hb : IsTopologicalBasis b) {s : Set α} : Dense s ↔ ∀ o ∈ b, Set.Nonempty o → (o ∩ s).Nonempty := by simp only [Dense, hb.mem_closure_iff] exact ⟨fun h o hb ⟨a, ha⟩ => h a o hb ha, fun h a o hb ha => h o hb ⟨a, ha⟩⟩ theorem IsTopologicalBasis.isOpenMap_iff {β} [TopologicalSpace β] {B : Set (Set α)} (hB : IsTopologicalBasis B) {f : α → β} : IsOpenMap f ↔ ∀ s ∈ B, IsOpen (f '' s) := by refine ⟨fun H o ho => H _ (hB.isOpen ho), fun hf o ho => ?_⟩ rw [hB.open_eq_sUnion' ho, sUnion_eq_iUnion, image_iUnion] exact isOpen_iUnion fun s => hf s s.2.1 theorem IsTopologicalBasis.exists_nonempty_subset {B : Set (Set α)} (hb : IsTopologicalBasis B) {u : Set α} (hu : u.Nonempty) (ou : IsOpen u) : ∃ v ∈ B, Set.Nonempty v ∧ v ⊆ u := let ⟨x, hx⟩ := hu let ⟨v, vB, xv, vu⟩ := hb.exists_subset_of_mem_open hx ou ⟨v, vB, ⟨x, xv⟩, vu⟩ theorem isTopologicalBasis_opens : IsTopologicalBasis { U : Set α \| IsOpen U } := isTopologicalBasis_of_isOpen_of_nhds (by tauto) (by tauto) protected lemma IsTopologicalBasis.isInducing {β} [TopologicalSpace β] {f : α → β} {T : Set (Set β)} (hf : IsInducing f) (h : IsTopologicalBasis T) : IsTopologicalBasis ((preimage f) '' T) := .of_hasBasis_nhds fun a ↦ by convert (hf.basis_nhds (h.nhds_hasBasis (a := f a))).to_image_id with s aesop @[deprecated (since := "2024-10-28")] alias IsTopologicalBasis.inducing := IsTopologicalBasis.isInducing protected theorem IsTopologicalBasis.induced {α} [s : TopologicalSpace β] (f : α → β) {T : Set (Set β)} (h : IsTopologicalBasis T) : IsTopologicalBasis (t := induced f s) ((preimage f) '' T) := h.isInducing (t := induced f s) (.induced f) protected theorem IsTopologicalBasis.inf {t₁ t₂ : TopologicalSpace β} {B₁ B₂ : Set (Set β)} (h₁ : IsTopologicalBasis (t := t₁) B₁) (h₂ : IsTopologicalBasis (t := t₂) B₂) : IsTopologicalBasis (t := t₁ ⊓ t₂) (image2 (· ∩ ·) B₁ B₂) := by refine .of_hasBasis_nhds (t := ?_) fun a ↦ ?_ rw [nhds_inf (t₁ := t₁)] convert ((h₁.nhds_hasBasis (t := t₁)).inf (h₂.nhds_hasBasis (t := t₂))).to_image_id aesop theorem IsTopologicalBasis.inf_induced {γ} [s : TopologicalSpace β] {B₁ : Set (Set α)} {B₂ : Set (Set β)} (h₁ : IsTopologicalBasis B₁) (h₂ : IsTopologicalBasis B₂) (f₁ : γ → α) (f₂ : γ → β) : IsTopologicalBasis (t := induced f₁ t ⊓ induced f₂ s) (image2 (f₁ ⁻¹' · ∩ f₂ ⁻¹' ·) B₁ B₂) := by simpa only [image2_image_left, image2_image_right] using (h₁.induced f₁).inf (h₂.induced f₂) protected theorem IsTopologicalBasis.prod {β} [TopologicalSpace β] {B₁ : Set (Set α)} {B₂ : Set (Set β)} (h₁ : IsTopologicalBasis B₁) (h₂ : IsTopologicalBasis B₂) : IsTopologicalBasis (image2 (· ×ˢ ·) B₁ B₂) := h₁.inf_induced h₂ Prod.fst Prod.snd theorem isTopologicalBasis_of_cover {ι} {U : ι → Set α} (Uo : ∀ i, IsOpen (U i)) (Uc : ⋃ i, U i = univ) {b : ∀ i, Set (Set (U i))} (hb : ∀ i, IsTopologicalBasis (b i)) : IsTopologicalBasis (⋃ i : ι, image ((↑) : U i → α) '' b i) := by refine isTopologicalBasis_of_isOpen_of_nhds (fun u hu => ?_) ?_ · simp only [mem_iUnion, mem_image] at hu rcases hu with ⟨i, s, sb, rfl⟩ exact (Uo i).isOpenMap_subtype_val _ ((hb i).isOpen sb) · intro a u ha uo rcases iUnion_eq_univ_iff.1 Uc a with ⟨i, hi⟩ lift a to ↥(U i) using hi rcases (hb i).exists_subset_of_mem_open ha (uo.preimage continuous_subtype_val) with ⟨v, hvb, hav, hvu⟩ exact ⟨(↑) '' v, mem_iUnion.2 ⟨i, mem_image_of_mem _ hvb⟩, mem_image_of_mem _ hav, image_subset_iff.2 hvu⟩ protected theorem IsTopologicalBasis.continuous_iff {β : Type} [TopologicalSpace β] {B : Set (Set β)} (hB : IsTopologicalBasis B) {f : α → β} : Continuous f ↔ ∀ s ∈ B, IsOpen (f ⁻¹' s) := by rw [hB.eq_generateFrom, continuous_generateFrom_iff] @[simp] lemma isTopologicalBasis_empty : IsTopologicalBasis (∅ : Set (Set α)) ↔ IsEmpty α where mp h := by simpa using h.sUnion_eq.symm mpr h := ⟨by simp, by simp [Set.univ_eq_empty_iff.2], Subsingleton.elim ..⟩ variable (α) /-- A separable space is one with a countable dense subset, available through `TopologicalSpace.exists_countable_dense`. If `α` is also known to be nonempty, then `TopologicalSpace.denseSeq` provides a sequence `ℕ → α` with dense range, see `TopologicalSpace.denseRange_denseSeq`. If `α` is a uniform space with countably generated uniformity filter (e.g., an `EMetricSpace`), then this condition is equivalent to `SecondCountableTopology α`. In this case the latter should be used as a typeclass argument in theorems because Lean can automatically deduce `TopologicalSpace.SeparableSpace` from `SecondCountableTopology` but it can't deduce `SecondCountableTopology` from `TopologicalSpace.SeparableSpace`. Porting note (https://github.com/leanprover-community/mathlib4/issues/11215): TODO: the previous paragraph describes the state of the art in Lean 3. We can have instance cycles in Lean 4 but we might want to postpone adding them till after the port. -/ @[mk_iff] class SeparableSpace : Prop where /-- There exists a countable dense set. -/ exists_countable_dense : ∃ s : Set α, s.Countable ∧ Dense s theorem exists_countable_dense [SeparableSpace α] : ∃ s : Set α, s.Countable ∧ Dense s := SeparableSpace.exists_countable_dense /-- A nonempty separable space admits a sequence with dense range. Instead of running `cases` on the conclusion of this lemma, you might want to use `TopologicalSpace.denseSeq` and `TopologicalSpace.denseRange_denseSeq`. If `α` might be empty, then `TopologicalSpace.exists_countable_dense` is the main way to use separability of `α`. -/ theorem exists_dense_seq [SeparableSpace α] [Nonempty α] : ∃ u : ℕ → α, DenseRange u := by obtain ⟨s : Set α, hs, s_dense⟩ := exists_countable_dense α obtain ⟨u, hu⟩ := Set.countable_iff_exists_subset_range.mp hs exact ⟨u, s_dense.mono hu⟩ /-- A dense sequence in a non-empty separable topological space. If `α` might be empty, then `TopologicalSpace.exists_countable_dense` is the main way to use separability of `α`. -/ def denseSeq [SeparableSpace α] [Nonempty α] : ℕ → α := Classical.choose (exists_dense_seq α) /-- The sequence `TopologicalSpace.denseSeq α` has dense range. -/ @[simp] theorem denseRange_denseSeq [SeparableSpace α] [Nonempty α] : DenseRange (denseSeq α) := Classical.choose_spec (exists_dense_seq α) variable {α} instance (priority := 100) Countable.to_separableSpace [Countable α] : SeparableSpace α where exists_countable_dense := ⟨Set.univ, Set.countable_univ, dense_univ⟩ /-- If `f` has a dense range and its domain is countable, then its codomain is a separable space. See also `DenseRange.separableSpace`. -/ theorem SeparableSpace.of_denseRange {ι : Sort _} [Countable ι] (u : ι → α) (hu : DenseRange u) : SeparableSpace α := ⟨⟨range u, countable_range u, hu⟩⟩ alias _root_.DenseRange.separableSpace' := SeparableSpace.of_denseRange /-- If `α` is a separable space and `f : α → β` is a continuous map with dense range, then `β` is a separable space as well. E.g., the completion of a separable uniform space is separable. -/ protected theorem _root_.DenseRange.separableSpace [SeparableSpace α] [TopologicalSpace β] {f : α → β} (h : DenseRange f) (h' : Continuous f) : SeparableSpace β := let ⟨s, s_cnt, s_dense⟩ := exists_countable_dense α ⟨⟨f '' s, Countable.image s_cnt f, h.dense_image h' s_dense⟩⟩ theorem _root_.Topology.IsQuotientMap.separableSpace [SeparableSpace α] [TopologicalSpace β] {f : α → β} (hf : IsQuotientMap f) : SeparableSpace β := hf.surjective.denseRange.separableSpace hf.continuous @[deprecated (since := "2024-10-22")] alias _root_.QuotientMap.separableSpace := Topology.IsQuotientMap.separableSpace /-- The product of two separable spaces is a separable space. -/ instance [TopologicalSpace β] [SeparableSpace α] [SeparableSpace β] : SeparableSpace (α × β) := by rcases exists_countable_dense α with ⟨s, hsc, hsd⟩ rcases exists_countable_dense β with ⟨t, htc, htd⟩ exact ⟨⟨s ×ˢ t, hsc.prod htc, hsd.prod htd⟩⟩ /-- The product of a countable family of separable spaces is a separable space. -/ instance {ι : Type} {X : ι → Type} [∀ i, TopologicalSpace (X i)] [∀ i, SeparableSpace (X i)] [Countable ι] : SeparableSpace (∀ i, X i) := by choose t htc htd using (exists_countable_dense <\| X ·) haveI := fun i ↦ (htc i).to_subtype nontriviality ∀ i, X i; inhabit ∀ i, X i classical set f : (Σ I : Finset ι, ∀ i : I, t i) → ∀ i, X i := fun ⟨I, g⟩ i ↦ if hi : i ∈ I then g ⟨i, hi⟩ else (default : ∀ i, X i) i refine ⟨⟨range f, countable_range f, dense_iff_inter_open.2 fun U hU ⟨g, hg⟩ ↦ ?_⟩⟩ rcases isOpen_pi_iff.1 hU g hg with ⟨I, u, huo, huU⟩ have : ∀ i : I, ∃ y ∈ t i, y ∈ u i := fun i ↦ (htd i).exists_mem_open (huo i i.2).1 ⟨_, (huo i i.2).2⟩ choose y hyt hyu using this lift y to ∀ i : I, t i using hyt refine ⟨f ⟨I, y⟩, huU fun i (hi : i ∈ I) ↦ ?_, mem_range_self (f := f) ⟨I, y⟩⟩ simp only [f, dif_pos hi] exact hyu ⟨i, _⟩ instance [SeparableSpace α] {r : α → α → Prop} : SeparableSpace (Quot r) := isQuotientMap_quot_mk.separableSpace instance [SeparableSpace α] {s : Setoid α} : SeparableSpace (Quotient s) := isQuotientMap_quot_mk.separableSpace /-- A topological space with discrete topology is separable iff it is countable. -/ theorem separableSpace_iff_countable [DiscreteTopology α] : SeparableSpace α ↔ Countable α := by simp [separableSpace_iff, countable_univ_iff] /-- In a separable space, a family of nonempty disjoint open sets is countable. -/ theorem _root_.Pairwise.countable_of_isOpen_disjoint [SeparableSpace α] {ι : Type} {s : ι → Set α} (hd : Pairwise (Disjoint on s)) (ho : ∀ i, IsOpen (s i)) (hne : ∀ i, (s i).Nonempty) : Countable ι := by rcases exists_countable_dense α with ⟨u, u_countable, u_dense⟩ choose f hfu hfs using fun i ↦ u_dense.exists_mem_open (ho i) (hne i) have f_inj : Injective f := fun i j hij ↦ hd.eq <\| not_disjoint_iff.2 ⟨f i, hfs i, hij.symm ▸ hfs j⟩ have := u_countable.to_subtype exact (f_inj.codRestrict hfu).countable /-- In a separable space, a family of nonempty disjoint open sets is countable. -/ theorem _root_.Set.PairwiseDisjoint.countable_of_isOpen [SeparableSpace α] {ι : Type} {s : ι → Set α} {a : Set ι} (h : a.PairwiseDisjoint s) (ho : ∀ i ∈ a, IsOpen (s i)) (hne : ∀ i ∈ a, (s i).Nonempty) : a.Countable := (h.subtype _ _).countable_of_isOpen_disjoint (Subtype.forall.2 ho) (Subtype.forall.2 hne) /-- In a separable space, a family of disjoint sets with nonempty interiors is countable. -/ theorem _root_.Set.PairwiseDisjoint.countable_of_nonempty_interior [SeparableSpace α] {ι : Type} {s : ι → Set α} {a : Set ι} (h : a.PairwiseDisjoint s) (ha : ∀ i ∈ a, (interior (s i)).Nonempty) : a.Countable := (h.mono fun _ => interior_subset).countable_of_isOpen (fun _ _ => isOpen_interior) ha /-- A set `s` in a topological space is separable if it is contained in the closure of a countable set `c`. Beware that this definition does not require that `c` is contained in `s` (to express the latter, use `TopologicalSpace.SeparableSpace s` or `TopologicalSpace.IsSeparable (univ : Set s))`. In metric spaces, the two definitions are equivalent, see `TopologicalSpace.IsSeparable.separableSpace`. -/ def IsSeparable (s : Set α) := ∃ c : Set α, c.Countable ∧ s ⊆ closure c theorem IsSeparable.mono {s u : Set α} (hs : IsSeparable s) (hu : u ⊆ s) : IsSeparable u := by rcases hs with ⟨c, c_count, hs⟩ exact ⟨c, c_count, hu.trans hs⟩ theorem IsSeparable.iUnion {ι : Sort} [Countable ι] {s : ι → Set α} (hs : ∀ i, IsSeparable (s i)) : IsSeparable (⋃ i, s i) := by choose c hc h'c using hs refine ⟨⋃ i, c i, countable_iUnion hc, iUnion_subset_iff.2 fun i => ?_⟩ exact (h'c i).trans (closure_mono (subset_iUnion _ i)) @[simp] theorem isSeparable_iUnion {ι : Sort} [Countable ι] {s : ι → Set α} : IsSeparable (⋃ i, s i) ↔ ∀ i, IsSeparable (s i) := ⟨fun h i ↦ h.mono <\| subset_iUnion s i, .iUnion⟩ @[simp] theorem isSeparable_union {s t : Set α} : IsSeparable (s ∪ t) ↔ IsSeparable s ∧ IsSeparable t := by simp [union_eq_iUnion, and_comm] theorem IsSeparable.union {s u : Set α} (hs : IsSeparable s) (hu : IsSeparable u) : IsSeparable (s ∪ u) := isSeparable_union.2 ⟨hs, hu⟩ @[simp] theorem isSeparable_closure : IsSeparable (closure s) ↔ IsSeparable s := by simp only [IsSeparable, isClosed_closure.closure_subset_iff] protected alias ⟨_, IsSeparable.closure⟩ := isSeparable_closure theorem _root_.Set.Countable.isSeparable {s : Set α} (hs : s.Countable) : IsSeparable s := ⟨s, hs, subset_closure⟩ theorem _root_.Set.Finite.isSeparable {s : Set α} (hs : s.Finite) : IsSeparable s := hs.countable.isSeparable theorem IsSeparable.univ_pi {ι : Type} [Countable ι] {X : ι → Type} {s : ∀ i, Set (X i)} [∀ i, TopologicalSpace (X i)] (h : ∀ i, IsSeparable (s i)) : IsSeparable (univ.pi s) := by classical rcases eq_empty_or_nonempty (univ.pi s) with he \| ⟨f₀, -⟩ · rw [he] exact countable_empty.isSeparable · choose c c_count hc using h haveI := fun i ↦ (c_count i).to_subtype set g : (I : Finset ι) × ((i : I) → c i) → (i : ι) → X i := fun ⟨I, f⟩ i ↦ if hi : i ∈ I then f ⟨i, hi⟩ else f₀ i refine ⟨range g, countable_range g, fun f hf ↦ mem_closure_iff.2 fun o ho hfo ↦ ?_⟩ rcases isOpen_pi_iff.1 ho f hfo with ⟨I, u, huo, hI⟩ rsuffices ⟨f, hf⟩ : ∃ f : (i : I) → c i, g ⟨I, f⟩ ∈ Set.pi I u · exact ⟨g ⟨I, f⟩, hI hf, mem_range_self (f := g) ⟨I, f⟩⟩ suffices H : ∀ i ∈ I, (u i ∩ c i).Nonempty by choose f hfu hfc using H refine ⟨fun i ↦ ⟨f i i.2, hfc i i.2⟩, fun i (hi : i ∈ I) ↦ ?_⟩ simpa only [g, dif_pos hi] using hfu i hi intro i hi exact mem_closure_iff.1 (hc i <\| hf _ trivial) _ (huo i hi).1 (huo i hi).2 lemma isSeparable_pi {ι : Type} [Countable ι] {α : ι → Type} {s : ∀ i, Set (α i)} [∀ i, TopologicalSpace (α i)] (h : ∀ i, IsSeparable (s i)) : IsSeparable {f : ∀ i, α i \| ∀ i, f i ∈ s i} := by simpa only [← mem_univ_pi] using IsSeparable.univ_pi h lemma IsSeparable.prod {β : Type} [TopologicalSpace β] {s : Set α} {t : Set β} (hs : IsSeparable s) (ht : IsSeparable t) : IsSeparable (s ×ˢ t) := by rcases hs with ⟨cs, cs_count, hcs⟩ rcases ht with ⟨ct, ct_count, hct⟩ refine ⟨cs ×ˢ ct, cs_count.prod ct_count, ?_⟩ rw [closure_prod_eq] gcongr theorem IsSeparable.image {β : Type} [TopologicalSpace β] {s : Set α} (hs : IsSeparable s) {f : α → β} (hf : Continuous f) : IsSeparable (f '' s) := by rcases hs with ⟨c, c_count, hc⟩ refine ⟨f '' c, c_count.image _, ?_⟩ rw [image_subset_iff] exact hc.trans (closure_subset_preimage_closure_image hf) theorem _root_.Dense.isSeparable_iff (hs : Dense s) : IsSeparable s ↔ SeparableSpace α := by simp_rw [IsSeparable, separableSpace_iff, dense_iff_closure_eq, ← univ_subset_iff, ← hs.closure_eq, isClosed_closure.closure_subset_iff] theorem isSeparable_univ_iff : IsSeparable (univ : Set α) ↔ SeparableSpace α := dense_univ.isSeparable_iff theorem isSeparable_range [TopologicalSpace β] [SeparableSpace α] {f : α → β} (hf : Continuous f) : IsSeparable (range f) := image_univ (f := f) ▸ (isSeparable_univ_iff.2 ‹_›).image hf theorem IsSeparable.of_subtype (s : Set α) [SeparableSpace s] : IsSeparable s := by simpa using isSeparable_range (continuous_subtype_val (p := (· ∈ s))) theorem IsSeparable.of_separableSpace [h : SeparableSpace α] (s : Set α) : IsSeparable s := IsSeparable.mono (isSeparable_univ_iff.2 h) (subset_univ _) end TopologicalSpace open TopologicalSpace protected theorem IsTopologicalBasis.iInf {β : Type} {ι : Type} {t : ι → TopologicalSpace β} {T : ι → Set (Set β)} (h_basis : ∀ i, IsTopologicalBasis (t := t i) (T i)) : IsTopologicalBasis (t := ⨅ i, t i) { S \| ∃ (U : ι → Set β) (F : Finset ι), (∀ i, i ∈ F → U i ∈ T i) ∧ S = ⋂ i ∈ F, U i } := by let _ := ⨅ i, t i refine isTopologicalBasis_of_isOpen_of_nhds ?_ ?_ · rintro - ⟨U, F, hU, rfl⟩ refine isOpen_biInter_finset fun i hi ↦ (h_basis i).isOpen (t := t i) (hU i hi) \|>.mono (iInf_le _ _) · intro a u ha hu rcases (nhds_iInf (t := t) (a := a)).symm ▸ hasBasis_iInf' (fun i ↦ (h_basis i).nhds_hasBasis (t := t i)) \|>.mem_iff.1 (hu.mem_nhds ha) with ⟨⟨F, U⟩, ⟨hF, hU⟩, hUu⟩ refine ⟨_, ⟨U, hF.toFinset, ?_, rfl⟩, ?_, ?_⟩ <;> simp only [Finite.mem_toFinset, mem_iInter] · exact fun i hi ↦ (hU i hi).1 · exact fun i hi ↦ (hU i hi).2 · exact hUu theorem IsTopologicalBasis.iInf_induced {β : Type} {ι : Type} {X : ι → Type} [t : Π i, TopologicalSpace (X i)] {T : Π i, Set (Set (X i))} (cond : ∀ i, IsTopologicalBasis (T i)) (f : Π i, β → X i) : IsTopologicalBasis (t := ⨅ i, induced (f i) (t i)) { S \| ∃ (U : ∀ i, Set (X i)) (F : Finset ι), (∀ i, i ∈ F → U i ∈ T i) ∧ S = ⋂ (i) (_ : i ∈ F), f i ⁻¹' U i } := by convert IsTopologicalBasis.iInf (fun i ↦ (cond i).induced (f i)) with S constructor <;> rintro ⟨U, F, hUT, hSU⟩ · exact ⟨fun i ↦ (f i) ⁻¹' (U i), F, fun i hi ↦ mem_image_of_mem _ (hUT i hi), hSU⟩ · choose! U' hU' hUU' using hUT exact ⟨U', F, hU', hSU ▸ (.symm <\| iInter₂_congr hUU')⟩ theorem isTopologicalBasis_pi {ι : Type} {X : ι → Type} [∀ i, TopologicalSpace (X i)] {T : ∀ i, Set (Set (X i))} (cond : ∀ i, IsTopologicalBasis (T i)) : IsTopologicalBasis { S \| ∃ (U : ∀ i, Set (X i)) (F : Finset ι), (∀ i, i ∈ F → U i ∈ T i) ∧ S = (F : Set ι).pi U } := by simpa only [Set.pi_def] using IsTopologicalBasis.iInf_induced cond eval theorem isTopologicalBasis_singletons (α : Type) [TopologicalSpace α] [DiscreteTopology α] : IsTopologicalBasis { s \| ∃ x : α, (s : Set α) = {x} } := isTopologicalBasis_of_isOpen_of_nhds (fun _ _ => isOpen_discrete _) fun x _ hx _ => ⟨{x}, ⟨x, rfl⟩, mem_singleton x, singleton_subset_iff.2 hx⟩ theorem isTopologicalBasis_subtype {α : Type} [TopologicalSpace α] {B : Set (Set α)} (h : TopologicalSpace.IsTopologicalBasis B) (p : α → Prop) : IsTopologicalBasis (Set.preimage (Subtype.val (p := p)) '' B) := h.isInducing ⟨rfl⟩ section variable {ι : Type} {π : ι → Type} [∀ i, TopologicalSpace (π i)] lemma isOpenMap_eval (i : ι) : IsOpenMap (Function.eval i : (∀ i, π i) → π i) := by classical refine (isTopologicalBasis_pi fun _ ↦ isTopologicalBasis_opens).isOpenMap_iff.2 ?_ rintro _ ⟨U, s, hU, rfl⟩ obtain h \| h := ((s : Set ι).pi U).eq_empty_or_nonempty · simp [h] by_cases hi : i ∈ s · rw [eval_image_pi (mod_cast hi) h] exact hU _ hi · rw [eval_image_pi_of_not_mem (mod_cast hi), if_pos h] exact isOpen_univ end theorem Dense.exists_countable_dense_subset {α : Type} [TopologicalSpace α] {s : Set α} [SeparableSpace s] (hs : Dense s) : ∃ t ⊆ s, t.Countable ∧ Dense t := let ⟨t, htc, htd⟩ := exists_countable_dense s ⟨(↑) '' t, Subtype.coe_image_subset s t, htc.image Subtype.val, hs.denseRange_val.dense_image continuous_subtype_val htd⟩ /-- Let `s` be a dense set in a topological space `α` with partial order structure. If `s` is a separable space (e.g., if `α` has a second countable topology), then there exists a countable dense subset `t ⊆ s` such that `t` contains bottom/top element of `α` when they exist and belong to `s`. For a dense subset containing neither bot nor top elements, see `Dense.exists_countable_dense_subset_no_bot_top`. -/ theorem Dense.exists_countable_dense_subset_bot_top {α : Type} [TopologicalSpace α] [PartialOrder α] {s : Set α} [SeparableSpace s] (hs : Dense s) : ∃ t ⊆ s, t.Countable ∧ Dense t ∧ (∀ x, IsBot x → x ∈ s → x ∈ t) ∧ ∀ x, IsTop x → x ∈ s → x ∈ t := by rcases hs.exists_countable_dense_subset with ⟨t, hts, htc, htd⟩ refine ⟨(t ∪ ({ x \| IsBot x } ∪ { x \| IsTop x })) ∩ s, ?_, ?_, ?_, ?_, ?_⟩ exacts [inter_subset_right, (htc.union ((countable_isBot α).union (countable_isTop α))).mono inter_subset_left, htd.mono (subset_inter subset_union_left hts), fun x hx hxs => ⟨Or.inr <\| Or.inl hx, hxs⟩, fun x hx hxs => ⟨Or.inr <\| Or.inr hx, hxs⟩] instance separableSpace_univ {α : Type} [TopologicalSpace α] [SeparableSpace α] : SeparableSpace (univ : Set α) := (Equiv.Set.univ α).symm.surjective.denseRange.separableSpace (continuous_id.subtype_mk _) /-- If `α` is a separable topological space with a partial order, then there exists a countable dense set `s : Set α` that contains those of both bottom and top elements of `α` that actually exist. For a dense set containing neither bot nor top elements, see `exists_countable_dense_no_bot_top`. -/ theorem exists_countable_dense_bot_top (α : Type) [TopologicalSpace α] [SeparableSpace α] [PartialOrder α] : ∃ s : Set α, s.Countable ∧ Dense s ∧ (∀ x, IsBot x → x ∈ s) ∧ ∀ x, IsTop x → x ∈ s := by simpa using dense_univ.exists_countable_dense_subset_bot_top namespace TopologicalSpace universe u variable (α : Type u) [t : TopologicalSpace α] /-- A first-countable space is one in which every point has a countable neighborhood basis. -/ class _root_.FirstCountableTopology : Prop where /-- The filter `𝓝 a` is countably generated for all points `a`. -/ nhds_generated_countable : ∀ a : α, (𝓝 a).IsCountablyGenerated attribute [instance] FirstCountableTopology.nhds_generated_countable /-- If `β` is a first-countable space, then its induced topology via `f` on `α` is also first-countable. -/ theorem firstCountableTopology_induced (α β : Type) [t : TopologicalSpace β] [FirstCountableTopology β] (f : α → β) : @FirstCountableTopology α (t.induced f) := let _ := t.induced f ⟨fun x ↦ nhds_induced f x ▸ inferInstance⟩ variable {α} instance Subtype.firstCountableTopology (s : Set α) [FirstCountableTopology α] : FirstCountableTopology s := firstCountableTopology_induced s α (↑) protected theorem _root_.Topology.IsInducing.firstCountableTopology {β : Type} [TopologicalSpace β] [FirstCountableTopology β] {f : α → β} (hf : IsInducing f) : FirstCountableTopology α := by rw [hf.1] exact firstCountableTopology_induced α β f @[deprecated (since := "2024-10-28")] alias _root_.Inducing.firstCountableTopology := IsInducing.firstCountableTopology protected theorem _root_.Topology.IsEmbedding.firstCountableTopology {β : Type} [TopologicalSpace β] [FirstCountableTopology β] {f : α → β} (hf : IsEmbedding f) : FirstCountableTopology α := hf.1.firstCountableTopology @[deprecated (since := "2024-10-26")] alias _root_.Embedding.firstCountableTopology := IsEmbedding.firstCountableTopology namespace FirstCountableTopology /-- In a first-countable space, a cluster point `x` of a sequence is the limit of some subsequence. -/ theorem tendsto_subseq [FirstCountableTopology α] {u : ℕ → α} {x : α} (hx : MapClusterPt x atTop u) : ∃ ψ : ℕ → ℕ, StrictMono ψ ∧ Tendsto (u ∘ ψ) atTop (𝓝 x) := subseq_tendsto_of_neBot hx end FirstCountableTopology instance {β} [TopologicalSpace β] [FirstCountableTopology α] [FirstCountableTopology β] : FirstCountableTopology (α × β) := ⟨fun ⟨x, y⟩ => by rw [nhds_prod_eq]; infer_instance⟩ section Pi instance {ι : Type} {π : ι → Type} [Countable ι] [∀ i, TopologicalSpace (π i)] [∀ i, FirstCountableTopology (π i)] : FirstCountableTopology (∀ i, π i) := ⟨fun f => by rw [nhds_pi]; infer_instance⟩ end Pi instance isCountablyGenerated_nhdsWithin (x : α) [IsCountablyGenerated (𝓝 x)] (s : Set α) : IsCountablyGenerated (𝓝[s] x) := Inf.isCountablyGenerated _ _ variable (α) in /-- A second-countable space is one with a countable basis. -/ class _root_.SecondCountableTopology : Prop where /-- There exists a countable set of sets that generates the topology. -/ is_open_generated_countable : ∃ b : Set (Set α), b.Countable ∧ t = TopologicalSpace.generateFrom b protected theorem IsTopologicalBasis.secondCountableTopology {b : Set (Set α)} (hb : IsTopologicalBasis b) (hc : b.Countable) : SecondCountableTopology α := ⟨⟨b, hc, hb.eq_generateFrom⟩⟩ lemma SecondCountableTopology.mk' {α} {b : Set (Set α)} (hc : b.Countable) : @SecondCountableTopology α (generateFrom b) := @SecondCountableTopology.mk α (generateFrom b) ⟨b, hc, rfl⟩ instance _root_.Finite.toSecondCountableTopology [Finite α] : SecondCountableTopology α where is_open_generated_countable := ⟨_, {U \| IsOpen U}.to_countable, TopologicalSpace.isTopologicalBasis_opens.eq_generateFrom⟩ variable (α) theorem exists_countable_basis [SecondCountableTopology α] : ∃ b : Set (Set α), b.Countable ∧ ∅ ∉ b ∧ IsTopologicalBasis b := by obtain ⟨b, hb₁, hb₂⟩ := @SecondCountableTopology.is_open_generated_countable α _ _ refine ⟨_, ?_, not_mem_diff_of_mem ?_, (isTopologicalBasis_of_subbasis hb₂).diff_empty⟩ exacts [((countable_setOf_finite_subset hb₁).image _).mono diff_subset, rfl] /-- A countable topological basis of `α`. -/ def countableBasis [SecondCountableTopology α] : Set (Set α) := (exists_countable_basis α).choose theorem countable_countableBasis [SecondCountableTopology α] : (countableBasis α).Countable := (exists_countable_basis α).choose_spec.1 instance encodableCountableBasis [SecondCountableTopology α] : Encodable (countableBasis α) := (countable_countableBasis α).toEncodable theorem empty_nmem_countableBasis [SecondCountableTopology α] : ∅ ∉ countableBasis α := (exists_countable_basis α).choose_spec.2.1 theorem isBasis_countableBasis [SecondCountableTopology α] : IsTopologicalBasis (countableBasis α) := (exists_countable_basis α).choose_spec.2.2 theorem eq_generateFrom_countableBasis [SecondCountableTopology α] : ‹TopologicalSpace α› = generateFrom (countableBasis α) := (isBasis_countableBasis α).eq_generateFrom variable {α} theorem isOpen_of_mem_countableBasis [SecondCountableTopology α] {s : Set α} (hs : s ∈ countableBasis α) : IsOpen s := (isBasis_countableBasis α).isOpen hs theorem nonempty_of_mem_countableBasis [SecondCountableTopology α] {s : Set α} (hs : s ∈ countableBasis α) : s.Nonempty := nonempty_iff_ne_empty.2 <\| ne_of_mem_of_not_mem hs <\| empty_nmem_countableBasis α variable (α) -- see Note [lower instance priority] instance (priority := 100) SecondCountableTopology.to_firstCountableTopology [SecondCountableTopology α] : FirstCountableTopology α := ⟨fun _ => HasCountableBasis.isCountablyGenerated <\| ⟨(isBasis_countableBasis α).nhds_hasBasis, (countable_countableBasis α).mono inter_subset_left⟩⟩ /-- If `β` is a second-countable space, then its induced topology via `f` on `α` is also second-countable. -/ theorem secondCountableTopology_induced (α β) [t : TopologicalSpace β] [SecondCountableTopology β] (f : α → β) : @SecondCountableTopology α (t.induced f) := by rcases @SecondCountableTopology.is_open_generated_countable β _ _ with ⟨b, hb, eq⟩ letI := t.induced f refine { is_open_generated_countable := ⟨preimage f '' b, hb.image _, ?_⟩ } rw [eq, induced_generateFrom_eq] variable {α} instance Subtype.secondCountableTopology (s : Set α) [SecondCountableTopology α] : SecondCountableTopology s := secondCountableTopology_induced s α (↑) lemma secondCountableTopology_iInf {α ι} [Countable ι] {t : ι → TopologicalSpace α} (ht : ∀ i, @SecondCountableTopology α (t i)) : @SecondCountableTopology α (⨅ i, t i) := by rw [funext fun i => @eq_generateFrom_countableBasis α (t i) (ht i), ← generateFrom_iUnion] exact SecondCountableTopology.mk' <\| countable_iUnion fun i => @countable_countableBasis _ (t i) (ht i) -- TODO: more fine grained instances for `FirstCountableTopology`, `SeparableSpace`, `T2Space`, ... instance {β : Type} [TopologicalSpace β] [SecondCountableTopology α] [SecondCountableTopology β] : SecondCountableTopology (α × β) := ((isBasis_countableBasis α).prod (isBasis_countableBasis β)).secondCountableTopology <\| (countable_countableBasis α).image2 (countable_countableBasis β) _ instance {ι : Type} {π : ι → Type} [Countable ι] [∀ a, TopologicalSpace (π a)] [∀ a, SecondCountableTopology (π a)] : SecondCountableTopology (∀ a, π a) := secondCountableTopology_iInf fun _ => secondCountableTopology_induced _ _ _ -- see Note [lower instance priority] instance (priority := 100) SecondCountableTopology.to_separableSpace [SecondCountableTopology α] : SeparableSpace α := by choose p hp using fun s : countableBasis α => nonempty_of_mem_countableBasis s.2 exact ⟨⟨range p, countable_range _, (isBasis_countableBasis α).dense_iff.2 fun o ho _ => ⟨p ⟨o, ho⟩, hp ⟨o, _⟩, mem_range_self _⟩⟩⟩ /-- A countable open cover induces a second-countable topology if all open covers are themselves second countable. -/ theorem secondCountableTopology_of_countable_cover {ι} [Countable ι] {U : ι → Set α} [∀ i, SecondCountableTopology (U i)] (Uo : ∀ i, IsOpen (U i)) (hc : ⋃ i, U i = univ) : SecondCountableTopology α := haveI : IsTopologicalBasis (⋃ i, image ((↑) : U i → α) '' countableBasis (U i)) := isTopologicalBasis_of_cover Uo hc fun i => isBasis_countableBasis (U i) this.secondCountableTopology (countable_iUnion fun _ => (countable_countableBasis _).image _) /-- In a second-countable space, an open set, given as a union of open sets, is equal to the union of countably many of those sets. In particular, any open covering of `α` has a countable subcover: α is a Lindelöf space. -/ theorem isOpen_iUnion_countable [SecondCountableTopology α] {ι} (s : ι → Set α) (H : ∀ i, IsOpen (s i)) : ∃ T : Set ι, T.Countable ∧ ⋃ i ∈ T, s i = ⋃ i, s i := by let B := { b ∈ countableBasis α \| ∃ i, b ⊆ s i } choose f hf using fun b : B => b.2.2 haveI : Countable B := ((countable_countableBasis α).mono (sep_subset _ _)).to_subtype refine ⟨_, countable_range f, (iUnion₂_subset_iUnion _ _).antisymm (sUnion_subset ?_)⟩ rintro _ ⟨i, rfl⟩ x xs rcases (isBasis_countableBasis α).exists_subset_of_mem_open xs (H _) with ⟨b, hb, xb, bs⟩ exact ⟨_, ⟨_, rfl⟩, _, ⟨⟨⟨_, hb, _, bs⟩, rfl⟩, rfl⟩, hf _ xb⟩ theorem isOpen_biUnion_countable [SecondCountableTopology α] {ι : Type} (I : Set ι) (s : ι → Set α) (H : ∀ i ∈ I, IsOpen (s i)) : ∃ T ⊆ I, T.Countable ∧ ⋃ i ∈ T, s i = ⋃ i ∈ I, s i := by simp_rw [← Subtype.exists_set_subtype, biUnion_image] rcases isOpen_iUnion_countable (fun i : I ↦ s i) fun i ↦ H i i.2 with ⟨T, hTc, hU⟩ exact ⟨T, hTc.image _, hU.trans <\| iUnion_subtype ..⟩ theorem isOpen_sUnion_countable [SecondCountableTopology α] (S : Set (Set α)) (H : ∀ s ∈ S, IsOpen s) : ∃ T : Set (Set α), T.Countable ∧ T ⊆ S ∧ ⋃₀ T = ⋃₀ S := by simpa only [and_left_comm, sUnion_eq_biUnion] using isOpen_biUnion_countable S id H /-- In a topological space with second countable topology, if `f` is a function that sends each point `x` to a neighborhood of `x`, then for some countable set `s`, the neighborhoods `f x`, `x ∈ s`, cover the whole space. -/ theorem countable_cover_nhds [SecondCountableTopology α] {f : α → Set α} (hf : ∀ x, f x ∈ 𝓝 x) : ∃ s : Set α, s.Countable ∧ ⋃ x ∈ s, f x = univ := by rcases isOpen_iUnion_countable (fun x => interior (f x)) fun x => isOpen_interior with ⟨s, hsc, hsU⟩ suffices ⋃ x ∈ s, interior (f x) = univ from ⟨s, hsc, flip eq_univ_of_subset this <\| iUnion₂_mono fun _ _ => interior_subset⟩ simp only [hsU, eq_univ_iff_forall, mem_iUnion] exact fun x => ⟨x, mem_interior_iff_mem_nhds.2 (hf x)⟩ theorem countable_cover_nhdsWithin [SecondCountableTopology α] {f : α → Set α} {s : Set α} (hf : ∀ x ∈ s, f x ∈ 𝓝[s] x) : ∃ t ⊆ s, t.Countable ∧ s ⊆ ⋃ x ∈ t, f x := by have : ∀ x : s, (↑) ⁻¹' f x ∈ 𝓝 x := fun x => preimage_coe_mem_nhds_subtype.2 (hf x x.2) rcases countable_cover_nhds this with ⟨t, htc, htU⟩ refine ⟨(↑) '' t, Subtype.coe_image_subset _ _, htc.image _, fun x hx => ?_⟩ simp only [biUnion_image, eq_univ_iff_forall, ← preimage_iUnion, mem_preimage] at htU ⊢ exact htU ⟨x, hx⟩ section Sigma variable {ι : Type} {E : ι → Type} [∀ i, TopologicalSpace (E i)] /-- In a disjoint union space `Σ i, E i`, one can form a topological basis by taking the union of topological bases on each of the parts of the space. -/ theorem IsTopologicalBasis.sigma {s : ∀ i : ι, Set (Set (E i))} (hs : ∀ i, IsTopologicalBasis (s i)) : IsTopologicalBasis (⋃ i : ι, (fun u => (Sigma.mk i '' u : Set (Σi, E i))) '' s i) := by refine .of_hasBasis_nhds fun a ↦ ?_ rw [Sigma.nhds_eq] convert (((hs a.1).nhds_hasBasis).map _).to_image_id aesop /-- A countable disjoint union of second countable spaces is second countable. -/ instance [Countable ι] [∀ i, SecondCountableTopology (E i)] : SecondCountableTopology (Σi, E i) := by let b := ⋃ i : ι, (fun u => (Sigma.mk i '' u : Set (Σi, E i))) '' countableBasis (E i) have A : IsTopologicalBasis b := IsTopologicalBasis.sigma fun i => isBasis_countableBasis _ have B : b.Countable := countable_iUnion fun i => (countable_countableBasis _).image _ exact A.secondCountableTopology B end Sigma section Sum variable {β : Type} [TopologicalSpace β] /-- In a sum space `α ⊕ β`, one can form a topological basis by taking the union of topological bases on each of the two components. -/ theorem IsTopologicalBasis.sum {s : Set (Set α)} (hs : IsTopologicalBasis s) {t : Set (Set β)} (ht : IsTopologicalBasis t) : IsTopologicalBasis ((fun u => Sum.inl '' u) '' s ∪ (fun u => Sum.inr '' u) '' t) := by apply isTopologicalBasis_of_isOpen_of_nhds · rintro u (⟨w, hw, rfl⟩ \| ⟨w, hw, rfl⟩) · exact IsOpenEmbedding.inl.isOpenMap w (hs.isOpen hw) · exact IsOpenEmbedding.inr.isOpenMap w (ht.isOpen hw) · rintro (x \| x) u hxu u_open · obtain ⟨v, vs, xv, vu⟩ : ∃ v ∈ s, x ∈ v ∧ v ⊆ Sum.inl ⁻¹' u := hs.exists_subset_of_mem_open hxu (isOpen_sum_iff.1 u_open).1 exact ⟨Sum.inl '' v, mem_union_left _ (mem_image_of_mem _ vs), mem_image_of_mem _ xv, image_subset_iff.2 vu⟩ · obtain ⟨v, vs, xv, vu⟩ : ∃ v ∈ t, x ∈ v ∧ v ⊆ Sum.inr ⁻¹' u := ht.exists_subset_of_mem_open hxu (isOpen_sum_iff.1 u_open).2 exact ⟨Sum.inr '' v, mem_union_right _ (mem_image_of_mem _ vs), mem_image_of_mem _ xv, image_subset_iff.2 vu⟩ /-- A sum type of two second countable spaces is second countable. -/ instance [SecondCountableTopology α] [SecondCountableTopology β] : SecondCountableTopology (α ⊕ β) := by let b := (fun u => Sum.inl '' u) '' countableBasis α ∪ (fun u => Sum.inr '' u) '' countableBasis β have A : IsTopologicalBasis b := (isBasis_countableBasis α).sum (isBasis_countableBasis β) have B : b.Countable := (Countable.image (countable_countableBasis _) _).union (Countable.image (countable_countableBasis _) _) exact A.secondCountableTopology B end Sum section Quotient variable {X : Type} [TopologicalSpace X] {Y : Type} [TopologicalSpace Y] {π : X → Y} /-- The image of a topological basis under an open quotient map is a topological basis. -/ theorem IsTopologicalBasis.isQuotientMap {V : Set (Set X)} (hV : IsTopologicalBasis V)	(h' : IsQuotientMap π) (h : IsOpenMap π) : IsTopologicalBasis (Set.image π '' V) := by apply isTopologicalBasis_of_isOpen_of_nhds · rintro - ⟨U, U_in_V, rfl⟩ apply h U (hV.isOpen U_in_V) · intro y U y_in_U U_open obtain ⟨x, rfl⟩ := h'.surjective y let W := π ⁻¹' U	Mathlib/Topology/Bases.lean	916	922
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Andrew Zipperer, Haitao Zhang, Minchao Wu, Yury Kudryashov -/ import Mathlib.Data.Set.Prod import Mathlib.Data.Set.Restrict /-! # Functions over sets This file contains basic results on the following predicates of functions and sets: * `Set.EqOn f₁ f₂ s` : functions `f₁` and `f₂` are equal at every point of `s`; * `Set.MapsTo f s t` : `f` sends every point of `s` to a point of `t`; * `Set.InjOn f s` : restriction of `f` to `s` is injective; * `Set.SurjOn f s t` : every point in `s` has a preimage in `s`; * `Set.BijOn f s t` : `f` is a bijection between `s` and `t`; * `Set.LeftInvOn f' f s` : for every `x ∈ s` we have `f' (f x) = x`; * `Set.RightInvOn f' f t` : for every `y ∈ t` we have `f (f' y) = y`; * `Set.InvOn f' f s t` : `f'` is a two-side inverse of `f` on `s` and `t`, i.e. we have `Set.LeftInvOn f' f s` and `Set.RightInvOn f' f t`. -/ variable {α β γ δ : Type} {ι : Sort} {π : α → Type} open Equiv Equiv.Perm Function namespace Set /-! ### Equality on a set -/ section equality variable {s s₁ s₂ : Set α} {f₁ f₂ f₃ : α → β} {g : β → γ} {a : α} /-- This lemma exists for use by `aesop` as a forward rule. -/ @[aesop safe forward] lemma EqOn.eq_of_mem (h : s.EqOn f₁ f₂) (ha : a ∈ s) : f₁ a = f₂ a := h ha @[simp] theorem eqOn_empty (f₁ f₂ : α → β) : EqOn f₁ f₂ ∅ := fun _ => False.elim @[simp] theorem eqOn_singleton : Set.EqOn f₁ f₂ {a} ↔ f₁ a = f₂ a := by simp [Set.EqOn] @[simp] theorem eqOn_univ (f₁ f₂ : α → β) : EqOn f₁ f₂ univ ↔ f₁ = f₂ := by simp [EqOn, funext_iff] @[symm] theorem EqOn.symm (h : EqOn f₁ f₂ s) : EqOn f₂ f₁ s := fun _ hx => (h hx).symm theorem eqOn_comm : EqOn f₁ f₂ s ↔ EqOn f₂ f₁ s := ⟨EqOn.symm, EqOn.symm⟩ -- This can not be tagged as `@[refl]` with the current argument order. -- See note below at `EqOn.trans`. theorem eqOn_refl (f : α → β) (s : Set α) : EqOn f f s := fun _ _ => rfl -- Note: this was formerly tagged with `@[trans]`, and although the `trans` attribute accepted it -- the `trans` tactic could not use it. -- An update to the trans tactic coming in https://github.com/leanprover-community/mathlib4/pull/7014 will reject this attribute. -- It can be restored by changing the argument order from `EqOn f₁ f₂ s` to `EqOn s f₁ f₂`. -- This change will be made separately: [zulip](https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/Reordering.20arguments.20of.20.60Set.2EEqOn.60/near/390467581). theorem EqOn.trans (h₁ : EqOn f₁ f₂ s) (h₂ : EqOn f₂ f₃ s) : EqOn f₁ f₃ s := fun _ hx => (h₁ hx).trans (h₂ hx) theorem EqOn.image_eq (heq : EqOn f₁ f₂ s) : f₁ '' s = f₂ '' s := image_congr heq /-- Variant of `EqOn.image_eq`, for one function being the identity. -/ theorem EqOn.image_eq_self {f : α → α} (h : Set.EqOn f id s) : f '' s = s := by rw [h.image_eq, image_id] theorem EqOn.inter_preimage_eq (heq : EqOn f₁ f₂ s) (t : Set β) : s ∩ f₁ ⁻¹' t = s ∩ f₂ ⁻¹' t := ext fun x => and_congr_right_iff.2 fun hx => by rw [mem_preimage, mem_preimage, heq hx] theorem EqOn.mono (hs : s₁ ⊆ s₂) (hf : EqOn f₁ f₂ s₂) : EqOn f₁ f₂ s₁ := fun _ hx => hf (hs hx) @[simp] theorem eqOn_union : EqOn f₁ f₂ (s₁ ∪ s₂) ↔ EqOn f₁ f₂ s₁ ∧ EqOn f₁ f₂ s₂ := forall₂_or_left theorem EqOn.union (h₁ : EqOn f₁ f₂ s₁) (h₂ : EqOn f₁ f₂ s₂) : EqOn f₁ f₂ (s₁ ∪ s₂) := eqOn_union.2 ⟨h₁, h₂⟩ theorem EqOn.comp_left (h : s.EqOn f₁ f₂) : s.EqOn (g ∘ f₁) (g ∘ f₂) := fun _ ha => congr_arg _ <\| h ha @[simp] theorem eqOn_range {ι : Sort} {f : ι → α} {g₁ g₂ : α → β} : EqOn g₁ g₂ (range f) ↔ g₁ ∘ f = g₂ ∘ f := forall_mem_range.trans <\| funext_iff.symm alias ⟨EqOn.comp_eq, _⟩ := eqOn_range end equality variable {s s₁ s₂ : Set α} {t t₁ t₂ : Set β} {p : Set γ} {f f₁ f₂ : α → β} {g g₁ g₂ : β → γ} {f' f₁' f₂' : β → α} {g' : γ → β} {a : α} {b : β} section MapsTo theorem mapsTo' : MapsTo f s t ↔ f '' s ⊆ t := image_subset_iff.symm theorem mapsTo_prodMap_diagonal : MapsTo (Prod.map f f) (diagonal α) (diagonal β) := diagonal_subset_iff.2 fun _ => rfl @[deprecated (since := "2025-04-18")] alias mapsTo_prod_map_diagonal := mapsTo_prodMap_diagonal theorem MapsTo.subset_preimage (hf : MapsTo f s t) : s ⊆ f ⁻¹' t := hf theorem mapsTo_iff_subset_preimage : MapsTo f s t ↔ s ⊆ f ⁻¹' t := Iff.rfl @[simp] theorem mapsTo_singleton {x : α} : MapsTo f {x} t ↔ f x ∈ t := singleton_subset_iff theorem mapsTo_empty (f : α → β) (t : Set β) : MapsTo f ∅ t := empty_subset _ @[simp] theorem mapsTo_empty_iff : MapsTo f s ∅ ↔ s = ∅ := by simp [mapsTo', subset_empty_iff] /-- If `f` maps `s` to `t` and `s` is non-empty, `t` is non-empty. -/ theorem MapsTo.nonempty (h : MapsTo f s t) (hs : s.Nonempty) : t.Nonempty := (hs.image f).mono (mapsTo'.mp h) theorem MapsTo.image_subset (h : MapsTo f s t) : f '' s ⊆ t := mapsTo'.1 h theorem MapsTo.congr (h₁ : MapsTo f₁ s t) (h : EqOn f₁ f₂ s) : MapsTo f₂ s t := fun _ hx => h hx ▸ h₁ hx theorem EqOn.comp_right (hg : t.EqOn g₁ g₂) (hf : s.MapsTo f t) : s.EqOn (g₁ ∘ f) (g₂ ∘ f) := fun _ ha => hg <\| hf ha theorem EqOn.mapsTo_iff (H : EqOn f₁ f₂ s) : MapsTo f₁ s t ↔ MapsTo f₂ s t := ⟨fun h => h.congr H, fun h => h.congr H.symm⟩ theorem MapsTo.comp (h₁ : MapsTo g t p) (h₂ : MapsTo f s t) : MapsTo (g ∘ f) s p := fun _ h => h₁ (h₂ h) theorem mapsTo_id (s : Set α) : MapsTo id s s := fun _ => id theorem MapsTo.iterate {f : α → α} {s : Set α} (h : MapsTo f s s) : ∀ n, MapsTo f^[n] s s \| 0 => fun _ => id \| n + 1 => (MapsTo.iterate h n).comp h theorem MapsTo.iterate_restrict {f : α → α} {s : Set α} (h : MapsTo f s s) (n : ℕ) : (h.restrict f s s)^[n] = (h.iterate n).restrict _ _ _ := by funext x rw [Subtype.ext_iff, MapsTo.val_restrict_apply] induction n generalizing x with \| zero => rfl \| succ n ihn => simp [Nat.iterate, ihn] lemma mapsTo_of_subsingleton' [Subsingleton β] (f : α → β) (h : s.Nonempty → t.Nonempty) : MapsTo f s t := fun a ha ↦ Subsingleton.mem_iff_nonempty.2 <\| h ⟨a, ha⟩ lemma mapsTo_of_subsingleton [Subsingleton α] (f : α → α) (s : Set α) : MapsTo f s s := mapsTo_of_subsingleton' _ id theorem MapsTo.mono (hf : MapsTo f s₁ t₁) (hs : s₂ ⊆ s₁) (ht : t₁ ⊆ t₂) : MapsTo f s₂ t₂ := fun _ hx => ht (hf <\| hs hx) theorem MapsTo.mono_left (hf : MapsTo f s₁ t) (hs : s₂ ⊆ s₁) : MapsTo f s₂ t := fun _ hx => hf (hs hx) theorem MapsTo.mono_right (hf : MapsTo f s t₁) (ht : t₁ ⊆ t₂) : MapsTo f s t₂ := fun _ hx => ht (hf hx) theorem MapsTo.union_union (h₁ : MapsTo f s₁ t₁) (h₂ : MapsTo f s₂ t₂) : MapsTo f (s₁ ∪ s₂) (t₁ ∪ t₂) := fun _ hx => hx.elim (fun hx => Or.inl <\| h₁ hx) fun hx => Or.inr <\| h₂ hx theorem MapsTo.union (h₁ : MapsTo f s₁ t) (h₂ : MapsTo f s₂ t) : MapsTo f (s₁ ∪ s₂) t := union_self t ▸ h₁.union_union h₂ @[simp] theorem mapsTo_union : MapsTo f (s₁ ∪ s₂) t ↔ MapsTo f s₁ t ∧ MapsTo f s₂ t := ⟨fun h => ⟨h.mono subset_union_left (Subset.refl t), h.mono subset_union_right (Subset.refl t)⟩, fun h => h.1.union h.2⟩ theorem MapsTo.inter (h₁ : MapsTo f s t₁) (h₂ : MapsTo f s t₂) : MapsTo f s (t₁ ∩ t₂) := fun _ hx => ⟨h₁ hx, h₂ hx⟩ lemma MapsTo.insert (h : MapsTo f s t) (x : α) : MapsTo f (insert x s) (insert (f x) t) := by simpa [← singleton_union] using h.mono_right subset_union_right theorem MapsTo.inter_inter (h₁ : MapsTo f s₁ t₁) (h₂ : MapsTo f s₂ t₂) : MapsTo f (s₁ ∩ s₂) (t₁ ∩ t₂) := fun _ hx => ⟨h₁ hx.1, h₂ hx.2⟩ @[simp] theorem mapsTo_inter : MapsTo f s (t₁ ∩ t₂) ↔ MapsTo f s t₁ ∧ MapsTo f s t₂ := ⟨fun h => ⟨h.mono (Subset.refl s) inter_subset_left, h.mono (Subset.refl s) inter_subset_right⟩, fun h => h.1.inter h.2⟩ theorem mapsTo_univ (f : α → β) (s : Set α) : MapsTo f s univ := fun _ _ => trivial theorem mapsTo_range (f : α → β) (s : Set α) : MapsTo f s (range f) := (mapsTo_image f s).mono (Subset.refl s) (image_subset_range _ _) @[simp] theorem mapsTo_image_iff {f : α → β} {g : γ → α} {s : Set γ} {t : Set β} : MapsTo f (g '' s) t ↔ MapsTo (f ∘ g) s t := ⟨fun h c hc => h ⟨c, hc, rfl⟩, fun h _ ⟨_, hc⟩ => hc.2 ▸ h hc.1⟩ lemma MapsTo.comp_left (g : β → γ) (hf : MapsTo f s t) : MapsTo (g ∘ f) s (g '' t) := fun x hx ↦ ⟨f x, hf hx, rfl⟩ lemma MapsTo.comp_right {s : Set β} {t : Set γ} (hg : MapsTo g s t) (f : α → β) : MapsTo (g ∘ f) (f ⁻¹' s) t := fun _ hx ↦ hg hx @[simp] lemma mapsTo_univ_iff : MapsTo f univ t ↔ ∀ x, f x ∈ t := ⟨fun h _ => h (mem_univ _), fun h x _ => h x⟩ @[simp] lemma mapsTo_range_iff {g : ι → α} : MapsTo f (range g) t ↔ ∀ i, f (g i) ∈ t := forall_mem_range theorem MapsTo.mem_iff (h : MapsTo f s t) (hc : MapsTo f sᶜ tᶜ) {x} : f x ∈ t ↔ x ∈ s := ⟨fun ht => by_contra fun hs => hc hs ht, fun hx => h hx⟩ end MapsTo /-! ### Injectivity on a set -/ section injOn theorem Subsingleton.injOn (hs : s.Subsingleton) (f : α → β) : InjOn f s := fun _ hx _ hy _ => hs hx hy @[simp] theorem injOn_empty (f : α → β) : InjOn f ∅ := subsingleton_empty.injOn f @[simp] theorem injOn_singleton (f : α → β) (a : α) : InjOn f {a} := subsingleton_singleton.injOn f @[simp] lemma injOn_pair {b : α} : InjOn f {a, b} ↔ f a = f b → a = b := by unfold InjOn; aesop theorem InjOn.eq_iff {x y} (h : InjOn f s) (hx : x ∈ s) (hy : y ∈ s) : f x = f y ↔ x = y := ⟨h hx hy, fun h => h ▸ rfl⟩ theorem InjOn.ne_iff {x y} (h : InjOn f s) (hx : x ∈ s) (hy : y ∈ s) : f x ≠ f y ↔ x ≠ y := (h.eq_iff hx hy).not alias ⟨_, InjOn.ne⟩ := InjOn.ne_iff theorem InjOn.congr (h₁ : InjOn f₁ s) (h : EqOn f₁ f₂ s) : InjOn f₂ s := fun _ hx _ hy => h hx ▸ h hy ▸ h₁ hx hy theorem EqOn.injOn_iff (H : EqOn f₁ f₂ s) : InjOn f₁ s ↔ InjOn f₂ s := ⟨fun h => h.congr H, fun h => h.congr H.symm⟩ theorem InjOn.mono (h : s₁ ⊆ s₂) (ht : InjOn f s₂) : InjOn f s₁ := fun _ hx _ hy H => ht (h hx) (h hy) H theorem injOn_union (h : Disjoint s₁ s₂) : InjOn f (s₁ ∪ s₂) ↔ InjOn f s₁ ∧ InjOn f s₂ ∧ ∀ x ∈ s₁, ∀ y ∈ s₂, f x ≠ f y := by refine ⟨fun H => ⟨H.mono subset_union_left, H.mono subset_union_right, ?_⟩, ?_⟩ · intro x hx y hy hxy obtain rfl : x = y := H (Or.inl hx) (Or.inr hy) hxy exact h.le_bot ⟨hx, hy⟩ · rintro ⟨h₁, h₂, h₁₂⟩ rintro x (hx \| hx) y (hy \| hy) hxy exacts [h₁ hx hy hxy, (h₁₂ _ hx _ hy hxy).elim, (h₁₂ _ hy _ hx hxy.symm).elim, h₂ hx hy hxy] theorem injOn_insert {f : α → β} {s : Set α} {a : α} (has : a ∉ s) : Set.InjOn f (insert a s) ↔ Set.InjOn f s ∧ f a ∉ f '' s := by rw [← union_singleton, injOn_union (disjoint_singleton_right.2 has)] simp theorem injective_iff_injOn_univ : Injective f ↔ InjOn f univ := ⟨fun h _ _ _ _ hxy => h hxy, fun h _ _ heq => h trivial trivial heq⟩ theorem injOn_of_injective (h : Injective f) {s : Set α} : InjOn f s := fun _ _ _ _ hxy => h hxy alias _root_.Function.Injective.injOn := injOn_of_injective -- A specialization of `injOn_of_injective` for `Subtype.val`. theorem injOn_subtype_val {s : Set { x // p x }} : Set.InjOn Subtype.val s := Subtype.coe_injective.injOn lemma injOn_id (s : Set α) : InjOn id s := injective_id.injOn theorem InjOn.comp (hg : InjOn g t) (hf : InjOn f s) (h : MapsTo f s t) : InjOn (g ∘ f) s := fun _ hx _ hy heq => hf hx hy <\| hg (h hx) (h hy) heq lemma InjOn.of_comp (h : InjOn (g ∘ f) s) : InjOn f s := fun _ hx _ hy heq ↦ h hx hy (by simp [heq]) lemma InjOn.image_of_comp (h : InjOn (g ∘ f) s) : InjOn g (f '' s) := forall_mem_image.2 fun _x hx ↦ forall_mem_image.2 fun _y hy heq ↦ congr_arg f <\| h hx hy heq lemma InjOn.comp_iff (hf : InjOn f s) : InjOn (g ∘ f) s ↔ InjOn g (f '' s) := ⟨image_of_comp, fun h ↦ InjOn.comp h hf <\| mapsTo_image f s⟩ lemma InjOn.iterate {f : α → α} {s : Set α} (h : InjOn f s) (hf : MapsTo f s s) : ∀ n, InjOn f^[n] s \| 0 => injOn_id _ \| (n + 1) => (h.iterate hf n).comp h hf lemma injOn_of_subsingleton [Subsingleton α] (f : α → β) (s : Set α) : InjOn f s := (injective_of_subsingleton _).injOn theorem _root_.Function.Injective.injOn_range (h : Injective (g ∘ f)) : InjOn g (range f) := by rintro _ ⟨x, rfl⟩ _ ⟨y, rfl⟩ H exact congr_arg f (h H) theorem _root_.Set.InjOn.injective_iff (s : Set β) (h : InjOn g s) (hs : range f ⊆ s) : Injective (g ∘ f) ↔ Injective f := ⟨(·.of_comp), fun h _ ↦ by aesop⟩ theorem exists_injOn_iff_injective [Nonempty β] : (∃ f : α → β, InjOn f s) ↔ ∃ f : s → β, Injective f := ⟨fun ⟨_, hf⟩ => ⟨_, hf.injective⟩, fun ⟨f, hf⟩ => by lift f to α → β using trivial exact ⟨f, injOn_iff_injective.2 hf⟩⟩ theorem injOn_preimage {B : Set (Set β)} (hB : B ⊆ 𝒫 range f) : InjOn (preimage f) B := fun _ hs _ ht hst => (preimage_eq_preimage' (hB hs) (hB ht)).1 hst theorem InjOn.mem_of_mem_image {x} (hf : InjOn f s) (hs : s₁ ⊆ s) (h : x ∈ s) (h₁ : f x ∈ f '' s₁) : x ∈ s₁ := let ⟨_, h', Eq⟩ := h₁ hf (hs h') h Eq ▸ h' theorem InjOn.mem_image_iff {x} (hf : InjOn f s) (hs : s₁ ⊆ s) (hx : x ∈ s) : f x ∈ f '' s₁ ↔ x ∈ s₁ := ⟨hf.mem_of_mem_image hs hx, mem_image_of_mem f⟩ theorem InjOn.preimage_image_inter (hf : InjOn f s) (hs : s₁ ⊆ s) : f ⁻¹' (f '' s₁) ∩ s = s₁ := ext fun _ => ⟨fun ⟨h₁, h₂⟩ => hf.mem_of_mem_image hs h₂ h₁, fun h => ⟨mem_image_of_mem _ h, hs h⟩⟩ theorem EqOn.cancel_left (h : s.EqOn (g ∘ f₁) (g ∘ f₂)) (hg : t.InjOn g) (hf₁ : s.MapsTo f₁ t) (hf₂ : s.MapsTo f₂ t) : s.EqOn f₁ f₂ := fun _ ha => hg (hf₁ ha) (hf₂ ha) (h ha) theorem InjOn.cancel_left (hg : t.InjOn g) (hf₁ : s.MapsTo f₁ t) (hf₂ : s.MapsTo f₂ t) : s.EqOn (g ∘ f₁) (g ∘ f₂) ↔ s.EqOn f₁ f₂ := ⟨fun h => h.cancel_left hg hf₁ hf₂, EqOn.comp_left⟩ lemma InjOn.image_inter {s t u : Set α} (hf : u.InjOn f) (hs : s ⊆ u) (ht : t ⊆ u) : f '' (s ∩ t) = f '' s ∩ f '' t := by apply Subset.antisymm (image_inter_subset _ _ _) intro x ⟨⟨y, ys, hy⟩, ⟨z, zt, hz⟩⟩ have : y = z := by apply hf (hs ys) (ht zt) rwa [← hz] at hy rw [← this] at zt exact ⟨y, ⟨ys, zt⟩, hy⟩ lemma InjOn.image (h : s.InjOn f) : s.powerset.InjOn (image f) := fun s₁ hs₁ s₂ hs₂ h' ↦ by rw [← h.preimage_image_inter hs₁, h', h.preimage_image_inter hs₂] theorem InjOn.image_eq_image_iff (h : s.InjOn f) (h₁ : s₁ ⊆ s) (h₂ : s₂ ⊆ s) : f '' s₁ = f '' s₂ ↔ s₁ = s₂ := h.image.eq_iff h₁ h₂ lemma InjOn.image_subset_image_iff (h : s.InjOn f) (h₁ : s₁ ⊆ s) (h₂ : s₂ ⊆ s) : f '' s₁ ⊆ f '' s₂ ↔ s₁ ⊆ s₂ := by refine ⟨fun h' ↦ ?_, image_subset _⟩ rw [← h.preimage_image_inter h₁, ← h.preimage_image_inter h₂] exact inter_subset_inter_left _ (preimage_mono h') lemma InjOn.image_ssubset_image_iff (h : s.InjOn f) (h₁ : s₁ ⊆ s) (h₂ : s₂ ⊆ s) : f '' s₁ ⊂ f '' s₂ ↔ s₁ ⊂ s₂ := by simp_rw [ssubset_def, h.image_subset_image_iff h₁ h₂, h.image_subset_image_iff h₂ h₁] -- TODO: can this move to a better place? theorem _root_.Disjoint.image {s t u : Set α} {f : α → β} (h : Disjoint s t) (hf : u.InjOn f) (hs : s ⊆ u) (ht : t ⊆ u) : Disjoint (f '' s) (f '' t) := by rw [disjoint_iff_inter_eq_empty] at h ⊢ rw [← hf.image_inter hs ht, h, image_empty] lemma InjOn.image_diff {t : Set α} (h : s.InjOn f) : f '' (s \ t) = f '' s \ f '' (s ∩ t) := by refine subset_antisymm (subset_diff.2 ⟨image_subset f diff_subset, ?_⟩) (diff_subset_iff.2 (by rw [← image_union, inter_union_diff])) exact Disjoint.image disjoint_sdiff_inter h diff_subset inter_subset_left lemma InjOn.image_diff_subset {f : α → β} {t : Set α} (h : InjOn f s) (hst : t ⊆ s) : f '' (s \ t) = f '' s \ f '' t := by rw [h.image_diff, inter_eq_self_of_subset_right hst] alias image_diff_of_injOn := InjOn.image_diff_subset theorem InjOn.imageFactorization_injective (h : InjOn f s) : Injective (s.imageFactorization f) := fun ⟨x, hx⟩ ⟨y, hy⟩ h' ↦ by simpa [imageFactorization, h.eq_iff hx hy] using h' @[simp] theorem imageFactorization_injective_iff : Injective (s.imageFactorization f) ↔ InjOn f s := ⟨fun h x hx y hy _ ↦ by simpa using @h ⟨x, hx⟩ ⟨y, hy⟩ (by simpa [imageFactorization]), InjOn.imageFactorization_injective⟩ end injOn section graphOn variable {x : α × β} lemma graphOn_univ_inj {g : α → β} : univ.graphOn f = univ.graphOn g ↔ f = g := by simp lemma graphOn_univ_injective : Injective (univ.graphOn : (α → β) → Set (α × β)) := fun _f _g ↦ graphOn_univ_inj.1 lemma exists_eq_graphOn_image_fst [Nonempty β] {s : Set (α × β)} : (∃ f : α → β, s = graphOn f (Prod.fst '' s)) ↔ InjOn Prod.fst s := by refine ⟨?_, fun h ↦ ?_⟩ · rintro ⟨f, hf⟩ rw [hf] exact InjOn.image_of_comp <\| injOn_id _ · have : ∀ x ∈ Prod.fst '' s, ∃ y, (x, y) ∈ s := forall_mem_image.2 fun (x, y) h ↦ ⟨y, h⟩ choose! f hf using this rw [forall_mem_image] at hf use f rw [graphOn, image_image, EqOn.image_eq_self] exact fun x hx ↦ h (hf hx) hx rfl lemma exists_eq_graphOn [Nonempty β] {s : Set (α × β)} : (∃ f t, s = graphOn f t) ↔ InjOn Prod.fst s := .trans ⟨fun ⟨f, t, hs⟩ ↦ ⟨f, by rw [hs, image_fst_graphOn]⟩, fun ⟨f, hf⟩ ↦ ⟨f, _, hf⟩⟩ exists_eq_graphOn_image_fst end graphOn /-! ### Surjectivity on a set -/ section surjOn theorem SurjOn.subset_range (h : SurjOn f s t) : t ⊆ range f := Subset.trans h <\| image_subset_range f s theorem surjOn_iff_exists_map_subtype : SurjOn f s t ↔ ∃ (t' : Set β) (g : s → t'), t ⊆ t' ∧ Surjective g ∧ ∀ x : s, f x = g x := ⟨fun h => ⟨_, (mapsTo_image f s).restrict f s _, h, surjective_mapsTo_image_restrict _ _, fun _ => rfl⟩, fun ⟨t', g, htt', hg, hfg⟩ y hy => let ⟨x, hx⟩ := hg ⟨y, htt' hy⟩ ⟨x, x.2, by rw [hfg, hx, Subtype.coe_mk]⟩⟩ theorem surjOn_empty (f : α → β) (s : Set α) : SurjOn f s ∅ := empty_subset _ @[simp] theorem surjOn_empty_iff : SurjOn f ∅ t ↔ t = ∅ := by simp [SurjOn, subset_empty_iff] @[simp] lemma surjOn_singleton : SurjOn f s {b} ↔ b ∈ f '' s := singleton_subset_iff theorem surjOn_image (f : α → β) (s : Set α) : SurjOn f s (f '' s) := Subset.rfl theorem SurjOn.comap_nonempty (h : SurjOn f s t) (ht : t.Nonempty) : s.Nonempty := (ht.mono h).of_image theorem SurjOn.congr (h : SurjOn f₁ s t) (H : EqOn f₁ f₂ s) : SurjOn f₂ s t := by rwa [SurjOn, ← H.image_eq] theorem EqOn.surjOn_iff (h : EqOn f₁ f₂ s) : SurjOn f₁ s t ↔ SurjOn f₂ s t := ⟨fun H => H.congr h, fun H => H.congr h.symm⟩ theorem SurjOn.mono (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) (hf : SurjOn f s₁ t₂) : SurjOn f s₂ t₁ := Subset.trans ht <\| Subset.trans hf <\| image_subset _ hs theorem SurjOn.union (h₁ : SurjOn f s t₁) (h₂ : SurjOn f s t₂) : SurjOn f s (t₁ ∪ t₂) := fun _ hx => hx.elim (fun hx => h₁ hx) fun hx => h₂ hx theorem SurjOn.union_union (h₁ : SurjOn f s₁ t₁) (h₂ : SurjOn f s₂ t₂) : SurjOn f (s₁ ∪ s₂) (t₁ ∪ t₂) := (h₁.mono subset_union_left (Subset.refl _)).union (h₂.mono subset_union_right (Subset.refl _)) theorem SurjOn.inter_inter (h₁ : SurjOn f s₁ t₁) (h₂ : SurjOn f s₂ t₂) (h : InjOn f (s₁ ∪ s₂)) : SurjOn f (s₁ ∩ s₂) (t₁ ∩ t₂) := by intro y hy rcases h₁ hy.1 with ⟨x₁, hx₁, rfl⟩ rcases h₂ hy.2 with ⟨x₂, hx₂, heq⟩ obtain rfl : x₁ = x₂ := h (Or.inl hx₁) (Or.inr hx₂) heq.symm exact mem_image_of_mem f ⟨hx₁, hx₂⟩ theorem SurjOn.inter (h₁ : SurjOn f s₁ t) (h₂ : SurjOn f s₂ t) (h : InjOn f (s₁ ∪ s₂)) : SurjOn f (s₁ ∩ s₂) t := inter_self t ▸ h₁.inter_inter h₂ h lemma surjOn_id (s : Set α) : SurjOn id s s := by simp [SurjOn] theorem SurjOn.comp (hg : SurjOn g t p) (hf : SurjOn f s t) : SurjOn (g ∘ f) s p := Subset.trans hg <\| Subset.trans (image_subset g hf) <\| image_comp g f s ▸ Subset.refl _ lemma SurjOn.of_comp (h : SurjOn (g ∘ f) s p) (hr : MapsTo f s t) : SurjOn g t p := by intro z hz obtain ⟨x, hx, rfl⟩ := h hz exact ⟨f x, hr hx, rfl⟩ lemma surjOn_comp_iff : SurjOn (g ∘ f) s p ↔ SurjOn g (f '' s) p := ⟨fun h ↦ h.of_comp <\| mapsTo_image f s, fun h ↦ h.comp <\| surjOn_image _ _⟩ lemma SurjOn.iterate {f : α → α} {s : Set α} (h : SurjOn f s s) : ∀ n, SurjOn f^[n] s s \| 0 => surjOn_id _ \| (n + 1) => (h.iterate n).comp h lemma SurjOn.comp_left (hf : SurjOn f s t) (g : β → γ) : SurjOn (g ∘ f) s (g '' t) := by rw [SurjOn, image_comp g f]; exact image_subset _ hf lemma SurjOn.comp_right {s : Set β} {t : Set γ} (hf : Surjective f) (hg : SurjOn g s t) : SurjOn (g ∘ f) (f ⁻¹' s) t := by rwa [SurjOn, image_comp g f, image_preimage_eq _ hf] lemma surjOn_of_subsingleton' [Subsingleton β] (f : α → β) (h : t.Nonempty → s.Nonempty) : SurjOn f s t := fun _ ha ↦ Subsingleton.mem_iff_nonempty.2 <\| (h ⟨_, ha⟩).image _ lemma surjOn_of_subsingleton [Subsingleton α] (f : α → α) (s : Set α) : SurjOn f s s := surjOn_of_subsingleton' _ id theorem surjective_iff_surjOn_univ : Surjective f ↔ SurjOn f univ univ := by simp [Surjective, SurjOn, subset_def] theorem SurjOn.image_eq_of_mapsTo (h₁ : SurjOn f s t) (h₂ : MapsTo f s t) : f '' s = t := eq_of_subset_of_subset h₂.image_subset h₁ theorem image_eq_iff_surjOn_mapsTo : f '' s = t ↔ s.SurjOn f t ∧ s.MapsTo f t := by refine ⟨?_, fun h => h.1.image_eq_of_mapsTo h.2⟩ rintro rfl exact ⟨s.surjOn_image f, s.mapsTo_image f⟩ lemma SurjOn.image_preimage (h : Set.SurjOn f s t) (ht : t₁ ⊆ t) : f '' (f ⁻¹' t₁) = t₁ := image_preimage_eq_iff.2 fun _ hx ↦ mem_range_of_mem_image f s <\| h <\| ht hx theorem SurjOn.mapsTo_compl (h : SurjOn f s t) (h' : Injective f) : MapsTo f sᶜ tᶜ := fun _ hs ht => let ⟨_, hx', HEq⟩ := h ht hs <\| h' HEq ▸ hx' theorem MapsTo.surjOn_compl (h : MapsTo f s t) (h' : Surjective f) : SurjOn f sᶜ tᶜ := h'.forall.2 fun _ ht => (mem_image_of_mem _) fun hs => ht (h hs) theorem EqOn.cancel_right (hf : s.EqOn (g₁ ∘ f) (g₂ ∘ f)) (hf' : s.SurjOn f t) : t.EqOn g₁ g₂ := by intro b hb obtain ⟨a, ha, rfl⟩ := hf' hb exact hf ha theorem SurjOn.cancel_right (hf : s.SurjOn f t) (hf' : s.MapsTo f t) : s.EqOn (g₁ ∘ f) (g₂ ∘ f) ↔ t.EqOn g₁ g₂ := ⟨fun h => h.cancel_right hf, fun h => h.comp_right hf'⟩ theorem eqOn_comp_right_iff : s.EqOn (g₁ ∘ f) (g₂ ∘ f) ↔ (f '' s).EqOn g₁ g₂ := (s.surjOn_image f).cancel_right <\| s.mapsTo_image f theorem SurjOn.forall {p : β → Prop} (hf : s.SurjOn f t) (hf' : s.MapsTo f t) : (∀ y ∈ t, p y) ↔ (∀ x ∈ s, p (f x)) := ⟨fun H x hx ↦ H (f x) (hf' hx), fun H _y hy ↦ let ⟨x, hx, hxy⟩ := hf hy; hxy ▸ H x hx⟩ end surjOn /-! ### Bijectivity -/ section bijOn theorem BijOn.mapsTo (h : BijOn f s t) : MapsTo f s t := h.left theorem BijOn.injOn (h : BijOn f s t) : InjOn f s := h.right.left theorem BijOn.surjOn (h : BijOn f s t) : SurjOn f s t := h.right.right theorem BijOn.mk (h₁ : MapsTo f s t) (h₂ : InjOn f s) (h₃ : SurjOn f s t) : BijOn f s t := ⟨h₁, h₂, h₃⟩ theorem bijOn_empty (f : α → β) : BijOn f ∅ ∅ := ⟨mapsTo_empty f ∅, injOn_empty f, surjOn_empty f ∅⟩ @[simp] theorem bijOn_empty_iff_left : BijOn f s ∅ ↔ s = ∅ := ⟨fun h ↦ by simpa using h.mapsTo, by rintro rfl; exact bijOn_empty f⟩ @[simp] theorem bijOn_empty_iff_right : BijOn f ∅ t ↔ t = ∅ := ⟨fun h ↦ by simpa using h.surjOn, by rintro rfl; exact bijOn_empty f⟩ @[simp] lemma bijOn_singleton : BijOn f {a} {b} ↔ f a = b := by simp [BijOn, eq_comm] theorem BijOn.inter_mapsTo (h₁ : BijOn f s₁ t₁) (h₂ : MapsTo f s₂ t₂) (h₃ : s₁ ∩ f ⁻¹' t₂ ⊆ s₂) : BijOn f (s₁ ∩ s₂) (t₁ ∩ t₂) := ⟨h₁.mapsTo.inter_inter h₂, h₁.injOn.mono inter_subset_left, fun _ hy => let ⟨x, hx, hxy⟩ := h₁.surjOn hy.1 ⟨x, ⟨hx, h₃ ⟨hx, hxy.symm.subst hy.2⟩⟩, hxy⟩⟩ theorem MapsTo.inter_bijOn (h₁ : MapsTo f s₁ t₁) (h₂ : BijOn f s₂ t₂) (h₃ : s₂ ∩ f ⁻¹' t₁ ⊆ s₁) : BijOn f (s₁ ∩ s₂) (t₁ ∩ t₂) := inter_comm s₂ s₁ ▸ inter_comm t₂ t₁ ▸ h₂.inter_mapsTo h₁ h₃ theorem BijOn.inter (h₁ : BijOn f s₁ t₁) (h₂ : BijOn f s₂ t₂) (h : InjOn f (s₁ ∪ s₂)) : BijOn f (s₁ ∩ s₂) (t₁ ∩ t₂) := ⟨h₁.mapsTo.inter_inter h₂.mapsTo, h₁.injOn.mono inter_subset_left, h₁.surjOn.inter_inter h₂.surjOn h⟩ theorem BijOn.union (h₁ : BijOn f s₁ t₁) (h₂ : BijOn f s₂ t₂) (h : InjOn f (s₁ ∪ s₂)) : BijOn f (s₁ ∪ s₂) (t₁ ∪ t₂) := ⟨h₁.mapsTo.union_union h₂.mapsTo, h, h₁.surjOn.union_union h₂.surjOn⟩ theorem BijOn.subset_range (h : BijOn f s t) : t ⊆ range f := h.surjOn.subset_range theorem InjOn.bijOn_image (h : InjOn f s) : BijOn f s (f '' s) := BijOn.mk (mapsTo_image f s) h (Subset.refl _) theorem BijOn.congr (h₁ : BijOn f₁ s t) (h : EqOn f₁ f₂ s) : BijOn f₂ s t := BijOn.mk (h₁.mapsTo.congr h) (h₁.injOn.congr h) (h₁.surjOn.congr h) theorem EqOn.bijOn_iff (H : EqOn f₁ f₂ s) : BijOn f₁ s t ↔ BijOn f₂ s t := ⟨fun h => h.congr H, fun h => h.congr H.symm⟩ theorem BijOn.image_eq (h : BijOn f s t) : f '' s = t := h.surjOn.image_eq_of_mapsTo h.mapsTo lemma BijOn.forall {p : β → Prop} (hf : BijOn f s t) : (∀ b ∈ t, p b) ↔ ∀ a ∈ s, p (f a) where mp h _ ha := h _ <\| hf.mapsTo ha mpr h b hb := by obtain ⟨a, ha, rfl⟩ := hf.surjOn hb; exact h _ ha lemma BijOn.exists {p : β → Prop} (hf : BijOn f s t) : (∃ b ∈ t, p b) ↔ ∃ a ∈ s, p (f a) where mp := by rintro ⟨b, hb, h⟩; obtain ⟨a, ha, rfl⟩ := hf.surjOn hb; exact ⟨a, ha, h⟩ mpr := by rintro ⟨a, ha, h⟩; exact ⟨f a, hf.mapsTo ha, h⟩ lemma _root_.Equiv.image_eq_iff_bijOn (e : α ≃ β) : e '' s = t ↔ BijOn e s t := ⟨fun h ↦ ⟨(mapsTo_image e s).mono_right h.subset, e.injective.injOn, h ▸ surjOn_image e s⟩, BijOn.image_eq⟩ lemma bijOn_id (s : Set α) : BijOn id s s := ⟨s.mapsTo_id, s.injOn_id, s.surjOn_id⟩ theorem BijOn.comp (hg : BijOn g t p) (hf : BijOn f s t) : BijOn (g ∘ f) s p := BijOn.mk (hg.mapsTo.comp hf.mapsTo) (hg.injOn.comp hf.injOn hf.mapsTo) (hg.surjOn.comp hf.surjOn) /-- If `f : α → β` and `g : β → γ` and if `f` is injective on `s`, then `f ∘ g` is a bijection on `s` iff `g` is a bijection on `f '' s`. -/ theorem bijOn_comp_iff (hf : InjOn f s) : BijOn (g ∘ f) s p ↔ BijOn g (f '' s) p := by simp only [BijOn, InjOn.comp_iff, surjOn_comp_iff, mapsTo_image_iff, hf] /-- If we have a commutative square ``` α --f--> β \| \| p₁ p₂ \| \| \/ \/ γ --g--> δ ``` and `f` induces a bijection from `s : Set α` to `t : Set β`, then `g` induces a bijection from the image of `s` to the image of `t`, as long as `g` is is injective on the image of `s`. -/ theorem bijOn_image_image {p₁ : α → γ} {p₂ : β → δ} {g : γ → δ} (comm : ∀ a, p₂ (f a) = g (p₁ a)) (hbij : BijOn f s t) (hinj: InjOn g (p₁ '' s)) : BijOn g (p₁ '' s) (p₂ '' t) := by obtain ⟨h1, h2, h3⟩ := hbij refine ⟨?_, hinj, ?_⟩ · rintro _ ⟨a, ha, rfl⟩ exact ⟨f a, h1 ha, by rw [comm a]⟩ · rintro _ ⟨b, hb, rfl⟩ obtain ⟨a, ha, rfl⟩ := h3 hb rw [← image_comp, comm] exact ⟨a, ha, rfl⟩ lemma BijOn.iterate {f : α → α} {s : Set α} (h : BijOn f s s) : ∀ n, BijOn f^[n] s s \| 0 => s.bijOn_id \| (n + 1) => (h.iterate n).comp h lemma bijOn_of_subsingleton' [Subsingleton α] [Subsingleton β] (f : α → β) (h : s.Nonempty ↔ t.Nonempty) : BijOn f s t := ⟨mapsTo_of_subsingleton' _ h.1, injOn_of_subsingleton _ _, surjOn_of_subsingleton' _ h.2⟩ lemma bijOn_of_subsingleton [Subsingleton α] (f : α → α) (s : Set α) : BijOn f s s := bijOn_of_subsingleton' _ Iff.rfl theorem BijOn.bijective (h : BijOn f s t) : Bijective (h.mapsTo.restrict f s t) := ⟨fun x y h' => Subtype.ext <\| h.injOn x.2 y.2 <\| Subtype.ext_iff.1 h', fun ⟨_, hy⟩ => let ⟨x, hx, hxy⟩ := h.surjOn hy ⟨⟨x, hx⟩, Subtype.eq hxy⟩⟩ theorem bijective_iff_bijOn_univ : Bijective f ↔ BijOn f univ univ := Iff.intro (fun h => let ⟨inj, surj⟩ := h ⟨mapsTo_univ f _, inj.injOn, Iff.mp surjective_iff_surjOn_univ surj⟩) fun h => let ⟨_map, inj, surj⟩ := h ⟨Iff.mpr injective_iff_injOn_univ inj, Iff.mpr surjective_iff_surjOn_univ surj⟩ alias ⟨_root_.Function.Bijective.bijOn_univ, _⟩ := bijective_iff_bijOn_univ theorem BijOn.compl (hst : BijOn f s t) (hf : Bijective f) : BijOn f sᶜ tᶜ := ⟨hst.surjOn.mapsTo_compl hf.1, hf.1.injOn, hst.mapsTo.surjOn_compl hf.2⟩ theorem BijOn.subset_right {r : Set β} (hf : BijOn f s t) (hrt : r ⊆ t) : BijOn f (s ∩ f ⁻¹' r) r := by refine ⟨inter_subset_right, hf.injOn.mono inter_subset_left, fun x hx ↦ ?_⟩ obtain ⟨y, hy, rfl⟩ := hf.surjOn (hrt hx) exact ⟨y, ⟨hy, hx⟩, rfl⟩ theorem BijOn.subset_left {r : Set α} (hf : BijOn f s t) (hrs : r ⊆ s) : BijOn f r (f '' r) := (hf.injOn.mono hrs).bijOn_image theorem BijOn.insert_iff (ha : a ∉ s) (hfa : f a ∉ t) : BijOn f (insert a s) (insert (f a) t) ↔ BijOn f s t where mp h := by have := congrArg (· \ {f a}) (image_insert_eq ▸ h.image_eq) simp only [mem_singleton_iff, insert_diff_of_mem] at this rw [diff_singleton_eq_self hfa, diff_singleton_eq_self] at this · exact ⟨by simp [← this, mapsTo'], h.injOn.mono (subset_insert ..), by simp [← this, surjOn_image]⟩ simp only [mem_image, not_exists, not_and] intro x hx rw [h.injOn.eq_iff (by simp [hx]) (by simp)] exact ha ∘ (· ▸ hx) mpr h := by repeat rw [insert_eq] refine (bijOn_singleton.mpr rfl).union h ?_ simp only [singleton_union, injOn_insert fun x ↦ (hfa (h.mapsTo x)), h.injOn, mem_image, not_exists, not_and, true_and] exact fun _ hx h₂ ↦ hfa (h₂ ▸ h.mapsTo hx) theorem BijOn.insert (h₁ : BijOn f s t) (h₂ : f a ∉ t) : BijOn f (insert a s) (insert (f a) t) := (insert_iff (h₂ <\| h₁.mapsTo ·) h₂).mpr h₁ theorem BijOn.sdiff_singleton (h₁ : BijOn f s t) (h₂ : a ∈ s) : BijOn f (s \ {a}) (t \ {f a}) := by convert h₁.subset_left diff_subset simp [h₁.injOn.image_diff, h₁.image_eq, h₂, inter_eq_self_of_subset_right] end bijOn /-! ### left inverse -/ namespace LeftInvOn theorem eqOn (h : LeftInvOn f' f s) : EqOn (f' ∘ f) id s := h theorem eq (h : LeftInvOn f' f s) {x} (hx : x ∈ s) : f' (f x) = x := h hx theorem congr_left (h₁ : LeftInvOn f₁' f s) {t : Set β} (h₁' : MapsTo f s t) (heq : EqOn f₁' f₂' t) : LeftInvOn f₂' f s := fun _ hx => heq (h₁' hx) ▸ h₁ hx theorem congr_right (h₁ : LeftInvOn f₁' f₁ s) (heq : EqOn f₁ f₂ s) : LeftInvOn f₁' f₂ s := fun _ hx => heq hx ▸ h₁ hx theorem injOn (h : LeftInvOn f₁' f s) : InjOn f s := fun x₁ h₁ x₂ h₂ heq => calc x₁ = f₁' (f x₁) := Eq.symm <\| h h₁ _ = f₁' (f x₂) := congr_arg f₁' heq _ = x₂ := h h₂ theorem surjOn (h : LeftInvOn f' f s) (hf : MapsTo f s t) : SurjOn f' t s := fun x hx => ⟨f x, hf hx, h hx⟩ theorem mapsTo (h : LeftInvOn f' f s) (hf : SurjOn f s t) : MapsTo f' t s := fun y hy => by let ⟨x, hs, hx⟩ := hf hy rwa [← hx, h hs] lemma _root_.Set.leftInvOn_id (s : Set α) : LeftInvOn id id s := fun _ _ ↦ rfl theorem comp (hf' : LeftInvOn f' f s) (hg' : LeftInvOn g' g t) (hf : MapsTo f s t) : LeftInvOn (f' ∘ g') (g ∘ f) s := fun x h => calc (f' ∘ g') ((g ∘ f) x) = f' (f x) := congr_arg f' (hg' (hf h)) _ = x := hf' h theorem mono (hf : LeftInvOn f' f s) (ht : s₁ ⊆ s) : LeftInvOn f' f s₁ := fun _ hx => hf (ht hx) theorem image_inter' (hf : LeftInvOn f' f s) : f '' (s₁ ∩ s) = f' ⁻¹' s₁ ∩ f '' s := by apply Subset.antisymm · rintro _ ⟨x, ⟨h₁, h⟩, rfl⟩ exact ⟨by rwa [mem_preimage, hf h], mem_image_of_mem _ h⟩ · rintro _ ⟨h₁, ⟨x, h, rfl⟩⟩ exact mem_image_of_mem _ ⟨by rwa [← hf h], h⟩ theorem image_inter (hf : LeftInvOn f' f s) : f '' (s₁ ∩ s) = f' ⁻¹' (s₁ ∩ s) ∩ f '' s := by rw [hf.image_inter'] refine Subset.antisymm ?_ (inter_subset_inter_left _ (preimage_mono inter_subset_left)) rintro _ ⟨h₁, x, hx, rfl⟩; exact ⟨⟨h₁, by rwa [hf hx]⟩, mem_image_of_mem _ hx⟩ theorem image_image (hf : LeftInvOn f' f s) : f' '' (f '' s) = s := by rw [Set.image_image, image_congr hf, image_id'] theorem image_image' (hf : LeftInvOn f' f s) (hs : s₁ ⊆ s) : f' '' (f '' s₁) = s₁ := (hf.mono hs).image_image end LeftInvOn	/-! ### Right inverse -/ section RightInvOn	Mathlib/Data/Set/Function.lean	803	805
/- Copyright (c) 2019 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen -/ import Mathlib.LinearAlgebra.FreeModule.StrongRankCondition import Mathlib.LinearAlgebra.GeneralLinearGroup import Mathlib.LinearAlgebra.Matrix.Reindex import Mathlib.Tactic.FieldSimp import Mathlib.LinearAlgebra.Matrix.NonsingularInverse import Mathlib.LinearAlgebra.Matrix.Basis /-! # Determinant of families of vectors This file defines the determinant of an endomorphism, and of a family of vectors with respect to some basis. For the determinant of a matrix, see the file `LinearAlgebra.Matrix.Determinant`. ## Main definitions In the list below, and in all this file, `R` is a commutative ring (semiring is sometimes enough), `M` and its variations are `R`-modules, `ι`, `κ`, `n` and `m` are finite types used for indexing. * `Basis.det`: the determinant of a family of vectors with respect to a basis, as a multilinear map * `LinearMap.det`: the determinant of an endomorphism `f : End R M` as a multiplicative homomorphism (if `M` does not have a finite `R`-basis, the result is `1` instead) * `LinearEquiv.det`: the determinant of an isomorphism `f : M ≃ₗ[R] M` as a multiplicative homomorphism (if `M` does not have a finite `R`-basis, the result is `1` instead) ## Tags basis, det, determinant -/ noncomputable section open Matrix LinearMap Submodule Set Function universe u v w variable {R : Type} [CommRing R] variable {M : Type} [AddCommGroup M] [Module R M] variable {M' : Type} [AddCommGroup M'] [Module R M'] variable {ι : Type} [DecidableEq ι] [Fintype ι] variable (e : Basis ι R M) section Conjugate variable {A : Type} [CommRing A] variable {m n : Type} /-- If `R^m` and `R^n` are linearly equivalent, then `m` and `n` are also equivalent. -/ def equivOfPiLEquivPi {R : Type} [Finite m] [Finite n] [CommRing R] [Nontrivial R] (e : (m → R) ≃ₗ[R] n → R) : m ≃ n := Basis.indexEquiv (Basis.ofEquivFun e.symm) (Pi.basisFun _ _) namespace Matrix variable [Fintype m] [Fintype n] /-- If `M` and `M'` are each other's inverse matrices, they are square matrices up to equivalence of types. -/ def indexEquivOfInv [Nontrivial A] [DecidableEq m] [DecidableEq n] {M : Matrix m n A} {M' : Matrix n m A} (hMM' : M M' = 1) (hM'M : M' * M = 1) : m ≃ n := equivOfPiLEquivPi (toLin'OfInv hMM' hM'M) theorem det_comm [DecidableEq n] (M N : Matrix n n A) : det (M * N) = det (N * M) := by rw [det_mul, det_mul, mul_comm] /-- If there exists a two-sided inverse `M'` for `M` (indexed differently), then `det (N * M) = det (M * N)`. -/ theorem det_comm' [DecidableEq m] [DecidableEq n] {M : Matrix n m A} {N : Matrix m n A} {M' : Matrix m n A} (hMM' : M * M' = 1) (hM'M : M' * M = 1) : det (M * N) = det (N * M) := by nontriviality A -- Although `m` and `n` are different a priori, we will show they have the same cardinality. -- This turns the problem into one for square matrices, which is easy. let e := indexEquivOfInv hMM' hM'M rw [← det_submatrix_equiv_self e, ← submatrix_mul_equiv _ _ _ (Equiv.refl n) _, det_comm, submatrix_mul_equiv, Equiv.coe_refl, submatrix_id_id] /-- If `M'` is a two-sided inverse for `M` (indexed differently), `det (M * N * M') = det N`. See `Matrix.det_conj` and `Matrix.det_conj'` for the case when `M' = M⁻¹` or vice versa. -/ theorem det_conj_of_mul_eq_one [DecidableEq m] [DecidableEq n] {M : Matrix m n A} {M' : Matrix n m A} {N : Matrix n n A} (hMM' : M * M' = 1) (hM'M : M' * M = 1) : det (M * N * M') = det N := by rw [← det_comm' hM'M hMM', ← Matrix.mul_assoc, hM'M, Matrix.one_mul] end Matrix end Conjugate namespace LinearMap /-! ### Determinant of a linear map -/ variable {A : Type} [CommRing A] [Module A M] variable {κ : Type} [Fintype κ] /-- The determinant of `LinearMap.toMatrix` does not depend on the choice of basis. -/ theorem det_toMatrix_eq_det_toMatrix [DecidableEq κ] (b : Basis ι A M) (c : Basis κ A M) (f : M →ₗ[A] M) : det (LinearMap.toMatrix b b f) = det (LinearMap.toMatrix c c f) := by rw [← linearMap_toMatrix_mul_basis_toMatrix c b c, ← basis_toMatrix_mul_linearMap_toMatrix b c b, Matrix.det_conj_of_mul_eq_one] <;> rw [Basis.toMatrix_mul_toMatrix, Basis.toMatrix_self] /-- The determinant of an endomorphism given a basis. See `LinearMap.det` for a version that populates the basis non-computably. Although the `Trunc (Basis ι A M)` parameter makes it slightly more convenient to switch bases, there is no good way to generalize over universe parameters, so we can't fully state in `detAux`'s type that it does not depend on the choice of basis. Instead you can use the `detAux_def''` lemma, or avoid mentioning a basis at all using `LinearMap.det`. -/ irreducible_def detAux : Trunc (Basis ι A M) → (M →ₗ[A] M) →* A := Trunc.lift (fun b : Basis ι A M => detMonoidHom.comp (toMatrixAlgEquiv b : (M →ₗ[A] M) →* Matrix ι ι A)) fun b c => MonoidHom.ext <\| det_toMatrix_eq_det_toMatrix b c /-- Unfold lemma for `detAux`. See also `detAux_def''` which allows you to vary the basis. -/ theorem detAux_def' (b : Basis ι A M) (f : M →ₗ[A] M) : LinearMap.detAux (Trunc.mk b) f = Matrix.det (LinearMap.toMatrix b b f) := by rw [detAux] rfl theorem detAux_def'' {ι' : Type} [Fintype ι'] [DecidableEq ι'] (tb : Trunc <\| Basis ι A M) (b' : Basis ι' A M) (f : M →ₗ[A] M) : LinearMap.detAux tb f = Matrix.det (LinearMap.toMatrix b' b' f) := by induction tb using Trunc.induction_on with \| h b => rw [detAux_def', det_toMatrix_eq_det_toMatrix b b'] @[simp] theorem detAux_id (b : Trunc <\| Basis ι A M) : LinearMap.detAux b LinearMap.id = 1 := (LinearMap.detAux b).map_one @[simp] theorem detAux_comp (b : Trunc <\| Basis ι A M) (f g : M →ₗ[A] M) : LinearMap.detAux b (f.comp g) = LinearMap.detAux b f LinearMap.detAux b g := (LinearMap.detAux b).map_mul f g section open scoped Classical in -- Discourage the elaborator from unfolding `det` and producing a huge term by marking it -- as irreducible. /-- The determinant of an endomorphism independent of basis. If there is no finite basis on `M`, the result is `1` instead. -/ protected irreducible_def det : (M →ₗ[A] M) →* A := if H : ∃ s : Finset M, Nonempty (Basis s A M) then LinearMap.detAux (Trunc.mk H.choose_spec.some) else 1 open scoped Classical in theorem coe_det [DecidableEq M] : ⇑(LinearMap.det : (M →ₗ[A] M) →* A) = if H : ∃ s : Finset M, Nonempty (Basis s A M) then LinearMap.detAux (Trunc.mk H.choose_spec.some) else 1 := by ext rw [LinearMap.det_def] split_ifs · congr -- use the correct `DecidableEq` instance rfl end -- Auxiliary lemma, the `simp` normal form goes in the other direction -- (using `LinearMap.det_toMatrix`) theorem det_eq_det_toMatrix_of_finset [DecidableEq M] {s : Finset M} (b : Basis s A M) (f : M →ₗ[A] M) : LinearMap.det f = Matrix.det (LinearMap.toMatrix b b f) := by have : ∃ s : Finset M, Nonempty (Basis s A M) := ⟨s, ⟨b⟩⟩ rw [LinearMap.coe_det, dif_pos, detAux_def'' _ b] <;> assumption @[simp] theorem det_toMatrix (b : Basis ι A M) (f : M →ₗ[A] M) : Matrix.det (toMatrix b b f) = LinearMap.det f := by haveI := Classical.decEq M rw [det_eq_det_toMatrix_of_finset b.reindexFinsetRange, det_toMatrix_eq_det_toMatrix b b.reindexFinsetRange] @[simp] theorem det_toMatrix' {ι : Type*} [Fintype ι] [DecidableEq ι] (f : (ι → A) →ₗ[A] ι → A) : Matrix.det (LinearMap.toMatrix' f) = LinearMap.det f := by simp [← toMatrix_eq_toMatrix']	@[simp] theorem det_toLin (b : Basis ι R M) (f : Matrix ι ι R) : LinearMap.det (Matrix.toLin b b f) = f.det := by	Mathlib/LinearAlgebra/Determinant.lean	197	200
/- Copyright (c) 2023 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Algebra.Order.Floor.Div import Mathlib.Data.Nat.Factorization.Defs /-! # Roots of natural numbers, rounded up and down This file defines the flooring and ceiling root of a natural number. `Nat.floorRoot n a`/`Nat.ceilRoot n a`, the `n`-th flooring/ceiling root of `a`, is the natural number whose `p`-adic valuation is the floor/ceil of the `p`-adic valuation of `a`. For example the `2`-nd flooring and ceiling roots of `2^3 * 3^2 * 5` are `2 * 3` and `2^2 * 3 * 5` respectively. Note this is not the `n`-th root of `a` as a real number, rounded up or down. These operations are respectively the right and left adjoints to the map `a ↦ a ^ n` where `ℕ` is ordered by divisibility. This is useful because it lets us characterise the numbers `a` whose `n`-th power divide `n` as the divisors of some fixed number (aka `floorRoot n b`). See `Nat.pow_dvd_iff_dvd_floorRoot`. Similarly, it lets us characterise the `b` whose `n`-th power is a multiple of `a` as the multiples of some fixed number (aka `ceilRoot n a`). See `Nat.dvd_pow_iff_ceilRoot_dvd`. ## TODO * `norm_num` extension -/ open Finsupp namespace Nat variable {a b n : ℕ} /-- Flooring root of a natural number. This divides the valuation of every prime number rounding down. Eg if `n = 2`, `a = 2^3 * 3^2 * 5`, then `floorRoot n a = 2 * 3`. In order theory terms, this is the upper or right adjoint of the map `a ↦ a ^ n : ℕ → ℕ` where `ℕ` is ordered by divisibility. To ensure that the adjunction (`Nat.pow_dvd_iff_dvd_floorRoot`) holds in as many cases as possible, we special-case the following values: * `floorRoot 0 a = 0` * `floorRoot n 0 = 0` -/ def floorRoot (n a : ℕ) : ℕ := if n = 0 ∨ a = 0 then 0 else a.factorization.prod fun p k ↦ p ^ (k / n) /-- The RHS is a noncomputable version of `Nat.floorRoot` with better order theoretical properties. -/ lemma floorRoot_def : floorRoot n a = if n = 0 ∨ a = 0 then 0 else (a.factorization ⌊/⌋ n).prod (· ^ ·) := by unfold floorRoot; split_ifs with h <;> simp [Finsupp.floorDiv_def, prod_mapRange_index pow_zero] @[simp] lemma floorRoot_zero_left (a : ℕ) : floorRoot 0 a = 0 := by simp [floorRoot] @[simp] lemma floorRoot_zero_right (n : ℕ) : floorRoot n 0 = 0 := by simp [floorRoot] @[simp] lemma floorRoot_one_left (a : ℕ) : floorRoot 1 a = a := by simp [floorRoot]; split_ifs <;> simp [] @[simp] lemma floorRoot_one_right (hn : n ≠ 0) : floorRoot n 1 = 1 := by simp [floorRoot, hn] @[simp] lemma floorRoot_pow_self (hn : n ≠ 0) (a : ℕ) : floorRoot n (a ^ n) = a := by simp [floorRoot_def, pos_iff_ne_zero.2, hn]; split_ifs <;> simp [] lemma floorRoot_ne_zero : floorRoot n a ≠ 0 ↔ n ≠ 0 ∧ a ≠ 0 := by simp +contextual [floorRoot, not_imp_not, not_or] @[simp] lemma floorRoot_eq_zero : floorRoot n a = 0 ↔ n = 0 ∨ a = 0 := floorRoot_ne_zero.not_right.trans <\| by simp only [not_and_or, ne_eq, not_not] @[simp] lemma factorization_floorRoot (n a : ℕ) : (floorRoot n a).factorization = a.factorization ⌊/⌋ n := by rw [floorRoot_def] split_ifs with h · obtain rfl \| rfl := h <;> simp refine prod_pow_factorization_eq_self fun p hp ↦ ?_ have : p.Prime ∧ p ∣ a ∧ ¬a = 0 := by simpa using support_floorDiv_subset hp exact this.1 /-- Galois connection between `a ↦ a ^ n : ℕ → ℕ` and `floorRoot n : ℕ → ℕ` where `ℕ` is ordered by divisibility. -/ lemma pow_dvd_iff_dvd_floorRoot : a ^ n ∣ b ↔ a ∣ floorRoot n b := by obtain rfl \| hn := eq_or_ne n 0 · simp obtain rfl \| hb := eq_or_ne b 0 · simp obtain rfl \| ha := eq_or_ne a 0 · simp [hn] rw [← factorization_le_iff_dvd (pow_ne_zero _ ha) hb, ← factorization_le_iff_dvd ha (floorRoot_ne_zero.2 ⟨hn, hb⟩), factorization_pow, factorization_floorRoot, le_floorDiv_iff_smul_le (β := ℕ →₀ ℕ) (pos_iff_ne_zero.2 hn)] lemma floorRoot_pow_dvd : floorRoot n a ^ n ∣ a := pow_dvd_iff_dvd_floorRoot.2 dvd_rfl /-- Ceiling root of a natural number. This divides the valuation of every prime number rounding up. Eg if `n = 3`, `a = 2^4 * 3^2 * 5`, then `ceilRoot n a = 2^2 * 3 * 5`. In order theory terms, this is the lower or left adjoint of the map `a ↦ a ^ n : ℕ → ℕ` where `ℕ` is ordered by divisibility. To ensure that the adjunction (`Nat.dvd_pow_iff_ceilRoot_dvd`) holds in as many cases as possible, we special-case the following values: * `ceilRoot 0 a = 0` (this one is not strictly necessary) * `ceilRoot n 0 = 0` -/ def ceilRoot (n a : ℕ) : ℕ := if n = 0 ∨ a = 0 then 0 else a.factorization.prod fun p k ↦ p ^ ((k + n - 1) / n) /-- The RHS is a noncomputable version of `Nat.ceilRoot` with better order theoretical properties. -/ lemma ceilRoot_def : ceilRoot n a = if n = 0 ∨ a = 0 then 0 else (a.factorization ⌈/⌉ n).prod (· ^ ·) := by unfold ceilRoot split_ifs with h <;> simp [Finsupp.ceilDiv_def, prod_mapRange_index pow_zero, Nat.ceilDiv_eq_add_pred_div] @[simp] lemma ceilRoot_zero_left (a : ℕ) : ceilRoot 0 a = 0 := by simp [ceilRoot] @[simp] lemma ceilRoot_zero_right (n : ℕ) : ceilRoot n 0 = 0 := by simp [ceilRoot] @[simp] lemma ceilRoot_one_left (a : ℕ) : ceilRoot 1 a = a := by simp [ceilRoot]; split_ifs <;> simp [] @[simp] lemma ceilRoot_one_right (hn : n ≠ 0) : ceilRoot n 1 = 1 := by simp [ceilRoot, hn] @[simp] lemma ceilRoot_pow_self (hn : n ≠ 0) (a : ℕ) : ceilRoot n (a ^ n) = a := by simp [ceilRoot_def, pos_iff_ne_zero.2, hn]; split_ifs <;> simp []	lemma ceilRoot_ne_zero : ceilRoot n a ≠ 0 ↔ n ≠ 0 ∧ a ≠ 0 := by simp +contextual [ceilRoot_def, not_imp_not, not_or]	Mathlib/Data/Nat/Factorization/Root.lean	129	130
/- 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, Patrick Massot -/ import Mathlib.Order.Filter.SmallSets import Mathlib.Topology.UniformSpace.Defs import Mathlib.Topology.ContinuousOn /-! # Basic results on uniform spaces Uniform spaces are a generalization of metric spaces and topological groups. ## Main definitions In this file we define a complete lattice structure on the type `UniformSpace X` of uniform structures on `X`, as well as the pullback (`UniformSpace.comap`) of uniform structures coming from the pullback of filters. Like distance functions, uniform structures cannot be pushed forward in general. ## Notations Localized in `Uniformity`, we have the notation `𝓤 X` for the uniformity on a uniform space `X`, and `○` for composition of relations, seen as terms with type `Set (X × X)`. ## References The formalization uses the books: * [N. Bourbaki, General Topology][bourbaki1966] * [I. M. James, Topologies and Uniformities][james1999] But it makes a more systematic use of the filter library. -/ open Set Filter Topology universe u v ua ub uc ud /-! ### Relations, seen as `Set (α × α)` -/ variable {α : Type ua} {β : Type ub} {γ : Type uc} {δ : Type ud} {ι : Sort} open Uniformity section UniformSpace variable [UniformSpace α] /-- If `s ∈ 𝓤 α`, then for any natural `n`, for a subset `t` of a sufficiently small set in `𝓤 α`, we have `t ○ t ○ ... ○ t ⊆ s` (`n` compositions). -/ theorem eventually_uniformity_iterate_comp_subset {s : Set (α × α)} (hs : s ∈ 𝓤 α) (n : ℕ) : ∀ᶠ t in (𝓤 α).smallSets, (t ○ ·)^[n] t ⊆ s := by suffices ∀ᶠ t in (𝓤 α).smallSets, t ⊆ s ∧ (t ○ ·)^[n] t ⊆ s from (eventually_and.1 this).2 induction n generalizing s with \| zero => simpa \| succ _ ihn => rcases comp_mem_uniformity_sets hs with ⟨t, htU, hts⟩ refine (ihn htU).mono fun U hU => ?_ rw [Function.iterate_succ_apply'] exact ⟨hU.1.trans <\| (subset_comp_self <\| refl_le_uniformity htU).trans hts, (compRel_mono hU.1 hU.2).trans hts⟩ /-- If `s ∈ 𝓤 α`, then for a subset `t` of a sufficiently small set in `𝓤 α`, we have `t ○ t ⊆ s`. -/ theorem eventually_uniformity_comp_subset {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∀ᶠ t in (𝓤 α).smallSets, t ○ t ⊆ s := eventually_uniformity_iterate_comp_subset hs 1 /-! ### Balls in uniform spaces -/ namespace UniformSpace open UniformSpace (ball) lemma isOpen_ball (x : α) {V : Set (α × α)} (hV : IsOpen V) : IsOpen (ball x V) := hV.preimage <\| .prodMk_right _ lemma isClosed_ball (x : α) {V : Set (α × α)} (hV : IsClosed V) : IsClosed (ball x V) := hV.preimage <\| .prodMk_right _ /-! ### Neighborhoods in uniform spaces -/ theorem hasBasis_nhds_prod (x y : α) : HasBasis (𝓝 (x, y)) (fun s => s ∈ 𝓤 α ∧ IsSymmetricRel s) fun s => ball x s ×ˢ ball y s := by rw [nhds_prod_eq] apply (hasBasis_nhds x).prod_same_index (hasBasis_nhds y) rintro U V ⟨U_in, U_symm⟩ ⟨V_in, V_symm⟩ exact ⟨U ∩ V, ⟨(𝓤 α).inter_sets U_in V_in, U_symm.inter V_symm⟩, ball_inter_left x U V, ball_inter_right y U V⟩ end UniformSpace open UniformSpace theorem nhds_eq_uniformity_prod {a b : α} : 𝓝 (a, b) = (𝓤 α).lift' fun s : Set (α × α) => { y : α \| (y, a) ∈ s } ×ˢ { y : α \| (b, y) ∈ s } := by rw [nhds_prod_eq, nhds_nhds_eq_uniformity_uniformity_prod, lift_lift'_same_eq_lift'] · exact fun s => monotone_const.set_prod monotone_preimage · refine fun t => Monotone.set_prod ?_ monotone_const exact monotone_preimage (f := fun y => (y, a)) theorem nhdset_of_mem_uniformity {d : Set (α × α)} (s : Set (α × α)) (hd : d ∈ 𝓤 α) : ∃ t : Set (α × α), IsOpen t ∧ s ⊆ t ∧ t ⊆ { p \| ∃ x y, (p.1, x) ∈ d ∧ (x, y) ∈ s ∧ (y, p.2) ∈ d } := by let cl_d := { p : α × α \| ∃ x y, (p.1, x) ∈ d ∧ (x, y) ∈ s ∧ (y, p.2) ∈ d } have : ∀ p ∈ s, ∃ t, t ⊆ cl_d ∧ IsOpen t ∧ p ∈ t := fun ⟨x, y⟩ hp => mem_nhds_iff.mp <\| show cl_d ∈ 𝓝 (x, y) by rw [nhds_eq_uniformity_prod, mem_lift'_sets] · exact ⟨d, hd, fun ⟨a, b⟩ ⟨ha, hb⟩ => ⟨x, y, ha, hp, hb⟩⟩ · exact fun _ _ h _ h' => ⟨h h'.1, h h'.2⟩ choose t ht using this exact ⟨(⋃ p : α × α, ⋃ h : p ∈ s, t p h : Set (α × α)), isOpen_iUnion fun p : α × α => isOpen_iUnion fun hp => (ht p hp).right.left, fun ⟨a, b⟩ hp => by simp only [mem_iUnion, Prod.exists]; exact ⟨a, b, hp, (ht (a, b) hp).right.right⟩, iUnion_subset fun p => iUnion_subset fun hp => (ht p hp).left⟩ /-- Entourages are neighborhoods of the diagonal. -/ theorem nhds_le_uniformity (x : α) : 𝓝 (x, x) ≤ 𝓤 α := by intro V V_in rcases comp_symm_mem_uniformity_sets V_in with ⟨w, w_in, w_symm, w_sub⟩ have : ball x w ×ˢ ball x w ∈ 𝓝 (x, x) := by rw [nhds_prod_eq] exact prod_mem_prod (ball_mem_nhds x w_in) (ball_mem_nhds x w_in) apply mem_of_superset this rintro ⟨u, v⟩ ⟨u_in, v_in⟩ exact w_sub (mem_comp_of_mem_ball w_symm u_in v_in) /-- Entourages are neighborhoods of the diagonal. -/ theorem iSup_nhds_le_uniformity : ⨆ x : α, 𝓝 (x, x) ≤ 𝓤 α := iSup_le nhds_le_uniformity /-- Entourages are neighborhoods of the diagonal. -/ theorem nhdsSet_diagonal_le_uniformity : 𝓝ˢ (diagonal α) ≤ 𝓤 α := (nhdsSet_diagonal α).trans_le iSup_nhds_le_uniformity section variable (α) theorem UniformSpace.has_seq_basis [IsCountablyGenerated <\| 𝓤 α] : ∃ V : ℕ → Set (α × α), HasAntitoneBasis (𝓤 α) V ∧ ∀ n, IsSymmetricRel (V n) := let ⟨U, hsym, hbasis⟩ := (@UniformSpace.hasBasis_symmetric α _).exists_antitone_subbasis ⟨U, hbasis, fun n => (hsym n).2⟩ end /-! ### Closure and interior in uniform spaces -/ theorem closure_eq_uniformity (s : Set <\| α × α) : closure s = ⋂ V ∈ { V \| V ∈ 𝓤 α ∧ IsSymmetricRel V }, V ○ s ○ V := by ext ⟨x, y⟩ simp +contextual only [mem_closure_iff_nhds_basis (UniformSpace.hasBasis_nhds_prod x y), mem_iInter, mem_setOf_eq, and_imp, mem_comp_comp, exists_prop, ← mem_inter_iff, inter_comm, Set.Nonempty] theorem uniformity_hasBasis_closed : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α ∧ IsClosed V) id := by refine Filter.hasBasis_self.2 fun t h => ?_ rcases comp_comp_symm_mem_uniformity_sets h with ⟨w, w_in, w_symm, r⟩ refine ⟨closure w, mem_of_superset w_in subset_closure, isClosed_closure, ?_⟩ refine Subset.trans ?_ r rw [closure_eq_uniformity] apply iInter_subset_of_subset apply iInter_subset exact ⟨w_in, w_symm⟩ theorem uniformity_eq_uniformity_closure : 𝓤 α = (𝓤 α).lift' closure := Eq.symm <\| uniformity_hasBasis_closed.lift'_closure_eq_self fun _ => And.right theorem Filter.HasBasis.uniformity_closure {p : ι → Prop} {U : ι → Set (α × α)} (h : (𝓤 α).HasBasis p U) : (𝓤 α).HasBasis p fun i => closure (U i) := (@uniformity_eq_uniformity_closure α _).symm ▸ h.lift'_closure /-- Closed entourages form a basis of the uniformity filter. -/ theorem uniformity_hasBasis_closure : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α) closure := (𝓤 α).basis_sets.uniformity_closure theorem closure_eq_inter_uniformity {t : Set (α × α)} : closure t = ⋂ d ∈ 𝓤 α, d ○ (t ○ d) := calc closure t = ⋂ (V) (_ : V ∈ 𝓤 α ∧ IsSymmetricRel V), V ○ t ○ V := closure_eq_uniformity t _ = ⋂ V ∈ 𝓤 α, V ○ t ○ V := Eq.symm <\| UniformSpace.hasBasis_symmetric.biInter_mem fun _ _ hV => compRel_mono (compRel_mono hV Subset.rfl) hV _ = ⋂ V ∈ 𝓤 α, V ○ (t ○ V) := by simp only [compRel_assoc] theorem uniformity_eq_uniformity_interior : 𝓤 α = (𝓤 α).lift' interior := le_antisymm (le_iInf₂ fun d hd => by let ⟨s, hs, hs_comp⟩ := comp3_mem_uniformity hd let ⟨t, ht, hst, ht_comp⟩ := nhdset_of_mem_uniformity s hs have : s ⊆ interior d := calc s ⊆ t := hst _ ⊆ interior d := ht.subset_interior_iff.mpr fun x (hx : x ∈ t) => let ⟨x, y, h₁, h₂, h₃⟩ := ht_comp hx hs_comp ⟨x, h₁, y, h₂, h₃⟩ have : interior d ∈ 𝓤 α := by filter_upwards [hs] using this simp [this]) fun _ hs => ((𝓤 α).lift' interior).sets_of_superset (mem_lift' hs) interior_subset theorem interior_mem_uniformity {s : Set (α × α)} (hs : s ∈ 𝓤 α) : interior s ∈ 𝓤 α := by rw [uniformity_eq_uniformity_interior]; exact mem_lift' hs theorem mem_uniformity_isClosed {s : Set (α × α)} (h : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, IsClosed t ∧ t ⊆ s := let ⟨t, ⟨ht_mem, htc⟩, hts⟩ := uniformity_hasBasis_closed.mem_iff.1 h ⟨t, ht_mem, htc, hts⟩ theorem isOpen_iff_isOpen_ball_subset {s : Set α} : IsOpen s ↔ ∀ x ∈ s, ∃ V ∈ 𝓤 α, IsOpen V ∧ ball x V ⊆ s := by rw [isOpen_iff_ball_subset] constructor <;> intro h x hx · obtain ⟨V, hV, hV'⟩ := h x hx exact ⟨interior V, interior_mem_uniformity hV, isOpen_interior, (ball_mono interior_subset x).trans hV'⟩ · obtain ⟨V, hV, -, hV'⟩ := h x hx exact ⟨V, hV, hV'⟩ @[deprecated (since := "2024-11-18")] alias isOpen_iff_open_ball_subset := isOpen_iff_isOpen_ball_subset /-- The uniform neighborhoods of all points of a dense set cover the whole space. -/ theorem Dense.biUnion_uniformity_ball {s : Set α} {U : Set (α × α)} (hs : Dense s) (hU : U ∈ 𝓤 α) : ⋃ x ∈ s, ball x U = univ := by refine iUnion₂_eq_univ_iff.2 fun y => ?_ rcases hs.inter_nhds_nonempty (mem_nhds_right y hU) with ⟨x, hxs, hxy : (x, y) ∈ U⟩ exact ⟨x, hxs, hxy⟩ /-- The uniform neighborhoods of all points of a dense indexed collection cover the whole space. -/ lemma DenseRange.iUnion_uniformity_ball {ι : Type} {xs : ι → α} (xs_dense : DenseRange xs) {U : Set (α × α)} (hU : U ∈ uniformity α) : ⋃ i, UniformSpace.ball (xs i) U = univ := by rw [← biUnion_range (f := xs) (g := fun x ↦ UniformSpace.ball x U)] exact Dense.biUnion_uniformity_ball xs_dense hU /-! ### Uniformity bases -/ /-- Open elements of `𝓤 α` form a basis of `𝓤 α`. -/ theorem uniformity_hasBasis_open : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α ∧ IsOpen V) id := hasBasis_self.2 fun s hs => ⟨interior s, interior_mem_uniformity hs, isOpen_interior, interior_subset⟩ theorem Filter.HasBasis.mem_uniformity_iff {p : β → Prop} {s : β → Set (α × α)} (h : (𝓤 α).HasBasis p s) {t : Set (α × α)} : t ∈ 𝓤 α ↔ ∃ i, p i ∧ ∀ a b, (a, b) ∈ s i → (a, b) ∈ t := h.mem_iff.trans <\| by simp only [Prod.forall, subset_def] /-- Open elements `s : Set (α × α)` of `𝓤 α` such that `(x, y) ∈ s ↔ (y, x) ∈ s` form a basis of `𝓤 α`. -/ theorem uniformity_hasBasis_open_symmetric : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α ∧ IsOpen V ∧ IsSymmetricRel V) id := by simp only [← and_assoc] refine uniformity_hasBasis_open.restrict fun s hs => ⟨symmetrizeRel s, ?_⟩ exact ⟨⟨symmetrize_mem_uniformity hs.1, IsOpen.inter hs.2 (hs.2.preimage continuous_swap)⟩, symmetric_symmetrizeRel s, symmetrizeRel_subset_self s⟩ theorem comp_open_symm_mem_uniformity_sets {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, IsOpen t ∧ IsSymmetricRel t ∧ t ○ t ⊆ s := by obtain ⟨t, ht₁, ht₂⟩ := comp_mem_uniformity_sets hs obtain ⟨u, ⟨hu₁, hu₂, hu₃⟩, hu₄ : u ⊆ t⟩ := uniformity_hasBasis_open_symmetric.mem_iff.mp ht₁ exact ⟨u, hu₁, hu₂, hu₃, (compRel_mono hu₄ hu₄).trans ht₂⟩ end UniformSpace open uniformity section Constructions instance : PartialOrder (UniformSpace α) := PartialOrder.lift (fun u => 𝓤[u]) fun _ _ => UniformSpace.ext	protected theorem UniformSpace.le_def {u₁ u₂ : UniformSpace α} : u₁ ≤ u₂ ↔ 𝓤[u₁] ≤ 𝓤[u₂] := Iff.rfl instance : InfSet (UniformSpace α) := ⟨fun s => UniformSpace.ofCore { uniformity := ⨅ u ∈ s, 𝓤[u] refl := le_iInf fun u => le_iInf fun _ => u.toCore.refl symm := le_iInf₂ fun u hu => le_trans (map_mono <\| iInf_le_of_le _ <\| iInf_le _ hu) u.symm	Mathlib/Topology/UniformSpace/Basic.lean	291	299
/- Copyright (c) 2018 Ellen Arlt. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Ellen Arlt, Blair Shi, Sean Leather, Mario Carneiro, Johan Commelin, Lu-Ming Zhang -/ import Mathlib.Algebra.Algebra.Opposite import Mathlib.Algebra.Algebra.Pi import Mathlib.Algebra.BigOperators.RingEquiv import Mathlib.Data.Finite.Prod import Mathlib.Data.Matrix.Mul import Mathlib.LinearAlgebra.Pi /-! # Matrices This file contains basic results on matrices including bundled versions of matrix operators. ## Implementation notes For convenience, `Matrix m n α` is defined as `m → n → α`, as this allows elements of the matrix to be accessed with `A i j`. However, it is not advisable to _construct_ matrices using terms of the form `fun i j ↦ _` or even `(fun i j ↦ _ : Matrix m n α)`, as these are not recognized by Lean as having the right type. Instead, `Matrix.of` should be used. ## TODO Under various conditions, multiplication of infinite matrices makes sense. These have not yet been implemented. -/ assert_not_exists Star universe u u' v w variable {l m n o : Type} {m' : o → Type} {n' : o → Type} variable {R : Type} {S : Type} {α : Type v} {β : Type w} {γ : Type} namespace Matrix instance decidableEq [DecidableEq α] [Fintype m] [Fintype n] : DecidableEq (Matrix m n α) := Fintype.decidablePiFintype instance {n m} [Fintype m] [DecidableEq m] [Fintype n] [DecidableEq n] (α) [Fintype α] : Fintype (Matrix m n α) := inferInstanceAs (Fintype (m → n → α)) instance {n m} [Finite m] [Finite n] (α) [Finite α] : Finite (Matrix m n α) := inferInstanceAs (Finite (m → n → α)) section variable (R) /-- This is `Matrix.of` bundled as a linear equivalence. -/ def ofLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : (m → n → α) ≃ₗ[R] Matrix m n α where __ := ofAddEquiv map_smul' _ _ := rfl @[simp] lemma coe_ofLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : ⇑(ofLinearEquiv _ : (m → n → α) ≃ₗ[R] Matrix m n α) = of := rfl @[simp] lemma coe_ofLinearEquiv_symm [Semiring R] [AddCommMonoid α] [Module R α] : ⇑((ofLinearEquiv _).symm : Matrix m n α ≃ₗ[R] (m → n → α)) = of.symm := rfl end theorem sum_apply [AddCommMonoid α] (i : m) (j : n) (s : Finset β) (g : β → Matrix m n α) : (∑ c ∈ s, g c) i j = ∑ c ∈ s, g c i j := (congr_fun (s.sum_apply i g) j).trans (s.sum_apply j _) end Matrix open Matrix namespace Matrix section Diagonal variable [DecidableEq n] variable (n α) /-- `Matrix.diagonal` as an `AddMonoidHom`. -/ @[simps] def diagonalAddMonoidHom [AddZeroClass α] : (n → α) →+ Matrix n n α where toFun := diagonal map_zero' := diagonal_zero map_add' x y := (diagonal_add x y).symm variable (R) /-- `Matrix.diagonal` as a `LinearMap`. -/ @[simps] def diagonalLinearMap [Semiring R] [AddCommMonoid α] [Module R α] : (n → α) →ₗ[R] Matrix n n α := { diagonalAddMonoidHom n α with map_smul' := diagonal_smul } variable {n α R} section One variable [Zero α] [One α] lemma zero_le_one_elem [Preorder α] [ZeroLEOneClass α] (i j : n) : 0 ≤ (1 : Matrix n n α) i j := by by_cases hi : i = j · subst hi simp · simp [hi] lemma zero_le_one_row [Preorder α] [ZeroLEOneClass α] (i : n) : 0 ≤ (1 : Matrix n n α) i := zero_le_one_elem i end One end Diagonal section Diag variable (n α) /-- `Matrix.diag` as an `AddMonoidHom`. -/ @[simps] def diagAddMonoidHom [AddZeroClass α] : Matrix n n α →+ n → α where toFun := diag map_zero' := diag_zero map_add' := diag_add variable (R) /-- `Matrix.diag` as a `LinearMap`. -/ @[simps] def diagLinearMap [Semiring R] [AddCommMonoid α] [Module R α] : Matrix n n α →ₗ[R] n → α := { diagAddMonoidHom n α with map_smul' := diag_smul } variable {n α R} @[simp] theorem diag_list_sum [AddMonoid α] (l : List (Matrix n n α)) : diag l.sum = (l.map diag).sum := map_list_sum (diagAddMonoidHom n α) l @[simp] theorem diag_multiset_sum [AddCommMonoid α] (s : Multiset (Matrix n n α)) : diag s.sum = (s.map diag).sum := map_multiset_sum (diagAddMonoidHom n α) s @[simp] theorem diag_sum {ι} [AddCommMonoid α] (s : Finset ι) (f : ι → Matrix n n α) : diag (∑ i ∈ s, f i) = ∑ i ∈ s, diag (f i) := map_sum (diagAddMonoidHom n α) f s end Diag open Matrix section AddCommMonoid variable [AddCommMonoid α] [Mul α] end AddCommMonoid section NonAssocSemiring variable [NonAssocSemiring α] variable (α n) /-- `Matrix.diagonal` as a `RingHom`. -/ @[simps] def diagonalRingHom [Fintype n] [DecidableEq n] : (n → α) →+* Matrix n n α := { diagonalAddMonoidHom n α with toFun := diagonal map_one' := diagonal_one map_mul' := fun _ _ => (diagonal_mul_diagonal' _ _).symm } end NonAssocSemiring section Semiring variable [Semiring α] theorem diagonal_pow [Fintype n] [DecidableEq n] (v : n → α) (k : ℕ) : diagonal v ^ k = diagonal (v ^ k) := (map_pow (diagonalRingHom n α) v k).symm /-- The ring homomorphism `α →+* Matrix n n α` sending `a` to the diagonal matrix with `a` on the diagonal. -/ def scalar (n : Type u) [DecidableEq n] [Fintype n] : α →+* Matrix n n α := (diagonalRingHom n α).comp <\| Pi.constRingHom n α section Scalar variable [DecidableEq n] [Fintype n] @[simp] theorem scalar_apply (a : α) : scalar n a = diagonal fun _ => a := rfl theorem scalar_inj [Nonempty n] {r s : α} : scalar n r = scalar n s ↔ r = s := (diagonal_injective.comp Function.const_injective).eq_iff theorem scalar_commute_iff {r : α} {M : Matrix n n α} : Commute (scalar n r) M ↔ r • M = MulOpposite.op r • M := by simp_rw [Commute, SemiconjBy, scalar_apply, ← smul_eq_diagonal_mul, ← op_smul_eq_mul_diagonal] theorem scalar_commute (r : α) (hr : ∀ r', Commute r r') (M : Matrix n n α) : Commute (scalar n r) M := scalar_commute_iff.2 <\| ext fun _ _ => hr _ end Scalar end Semiring section Algebra variable [Fintype n] [DecidableEq n] variable [CommSemiring R] [Semiring α] [Semiring β] [Algebra R α] [Algebra R β] instance instAlgebra : Algebra R (Matrix n n α) where algebraMap := (Matrix.scalar n).comp (algebraMap R α) commutes' _ _ := scalar_commute _ (fun _ => Algebra.commutes _ _) _ smul_def' r x := by ext; simp [Matrix.scalar, Algebra.smul_def r] theorem algebraMap_matrix_apply {r : R} {i j : n} : algebraMap R (Matrix n n α) r i j = if i = j then algebraMap R α r else 0 := by dsimp [algebraMap, Algebra.algebraMap, Matrix.scalar] split_ifs with h <;> simp [h, Matrix.one_apply_ne] theorem algebraMap_eq_diagonal (r : R) : algebraMap R (Matrix n n α) r = diagonal (algebraMap R (n → α) r) := rfl theorem algebraMap_eq_diagonalRingHom : algebraMap R (Matrix n n α) = (diagonalRingHom n α).comp (algebraMap R _) := rfl @[simp] theorem map_algebraMap (r : R) (f : α → β) (hf : f 0 = 0) (hf₂ : f (algebraMap R α r) = algebraMap R β r) : (algebraMap R (Matrix n n α) r).map f = algebraMap R (Matrix n n β) r := by rw [algebraMap_eq_diagonal, algebraMap_eq_diagonal, diagonal_map hf] simp [hf₂] variable (R) /-- `Matrix.diagonal` as an `AlgHom`. -/ @[simps] def diagonalAlgHom : (n → α) →ₐ[R] Matrix n n α := { diagonalRingHom n α with toFun := diagonal commutes' := fun r => (algebraMap_eq_diagonal r).symm } end Algebra section AddHom variable [Add α] variable (R α) in /-- Extracting entries from a matrix as an additive homomorphism. -/ @[simps] def entryAddHom (i : m) (j : n) : AddHom (Matrix m n α) α where toFun M := M i j map_add' _ _ := rfl -- It is necessary to spell out the name of the coercion explicitly on the RHS -- for unification to succeed lemma entryAddHom_eq_comp {i : m} {j : n} : entryAddHom α i j = ((Pi.evalAddHom (fun _ => α) j).comp (Pi.evalAddHom _ i)).comp (AddHomClass.toAddHom ofAddEquiv.symm) := rfl end AddHom section AddMonoidHom variable [AddZeroClass α] variable (R α) in /-- Extracting entries from a matrix as an additive monoid homomorphism. Note this cannot be upgraded to a ring homomorphism, as it does not respect multiplication. -/ @[simps] def entryAddMonoidHom (i : m) (j : n) : Matrix m n α →+ α where toFun M := M i j map_add' _ _ := rfl map_zero' := rfl -- It is necessary to spell out the name of the coercion explicitly on the RHS -- for unification to succeed lemma entryAddMonoidHom_eq_comp {i : m} {j : n} : entryAddMonoidHom α i j = ((Pi.evalAddMonoidHom (fun _ => α) j).comp (Pi.evalAddMonoidHom _ i)).comp (AddMonoidHomClass.toAddMonoidHom ofAddEquiv.symm) := by rfl @[simp] lemma evalAddMonoidHom_comp_diagAddMonoidHom (i : m) : (Pi.evalAddMonoidHom _ i).comp (diagAddMonoidHom m α) = entryAddMonoidHom α i i := by simp [AddMonoidHom.ext_iff] @[simp] lemma entryAddMonoidHom_toAddHom {i : m} {j : n} : (entryAddMonoidHom α i j : AddHom _ _) = entryAddHom α i j := rfl end AddMonoidHom section LinearMap variable [Semiring R] [AddCommMonoid α] [Module R α] variable (R α) in /-- Extracting entries from a matrix as a linear map. Note this cannot be upgraded to an algebra homomorphism, as it does not respect multiplication. -/ @[simps] def entryLinearMap (i : m) (j : n) : Matrix m n α →ₗ[R] α where toFun M := M i j map_add' _ _ := rfl map_smul' _ _ := rfl -- It is necessary to spell out the name of the coercion explicitly on the RHS -- for unification to succeed lemma entryLinearMap_eq_comp {i : m} {j : n} : entryLinearMap R α i j = LinearMap.proj j ∘ₗ LinearMap.proj i ∘ₗ (ofLinearEquiv R).symm.toLinearMap := by rfl @[simp] lemma proj_comp_diagLinearMap (i : m) : LinearMap.proj i ∘ₗ diagLinearMap m R α = entryLinearMap R α i i := by simp [LinearMap.ext_iff] @[simp] lemma entryLinearMap_toAddMonoidHom {i : m} {j : n} : (entryLinearMap R α i j : _ →+ _) = entryAddMonoidHom α i j := rfl @[simp] lemma entryLinearMap_toAddHom {i : m} {j : n} : (entryLinearMap R α i j : AddHom _ _) = entryAddHom α i j := rfl end LinearMap end Matrix /-! ### Bundled versions of `Matrix.map` -/ namespace Equiv /-- The `Equiv` between spaces of matrices induced by an `Equiv` between their coefficients. This is `Matrix.map` as an `Equiv`. -/ @[simps apply] def mapMatrix (f : α ≃ β) : Matrix m n α ≃ Matrix m n β where toFun M := M.map f invFun M := M.map f.symm left_inv _ := Matrix.ext fun _ _ => f.symm_apply_apply _ right_inv _ := Matrix.ext fun _ _ => f.apply_symm_apply _ @[simp] theorem mapMatrix_refl : (Equiv.refl α).mapMatrix = Equiv.refl (Matrix m n α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃ β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃ _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃ β) (g : β ≃ γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃ _) := rfl end Equiv namespace AddMonoidHom variable [AddZeroClass α] [AddZeroClass β] [AddZeroClass γ] /-- The `AddMonoidHom` between spaces of matrices induced by an `AddMonoidHom` between their coefficients. This is `Matrix.map` as an `AddMonoidHom`. -/ @[simps] def mapMatrix (f : α →+ β) : Matrix m n α →+ Matrix m n β where toFun M := M.map f map_zero' := Matrix.map_zero f f.map_zero map_add' := Matrix.map_add f f.map_add @[simp] theorem mapMatrix_id : (AddMonoidHom.id α).mapMatrix = AddMonoidHom.id (Matrix m n α) := rfl @[simp] theorem mapMatrix_comp (f : β →+ γ) (g : α →+ β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m n α →+ _) := rfl @[simp] lemma entryAddMonoidHom_comp_mapMatrix (f : α →+ β) (i : m) (j : n) : (entryAddMonoidHom β i j).comp f.mapMatrix = f.comp (entryAddMonoidHom α i j) := rfl end AddMonoidHom namespace AddEquiv variable [Add α] [Add β] [Add γ] /-- The `AddEquiv` between spaces of matrices induced by an `AddEquiv` between their coefficients. This is `Matrix.map` as an `AddEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃+ β) : Matrix m n α ≃+ Matrix m n β := { f.toEquiv.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm map_add' := Matrix.map_add f (map_add f) } @[simp] theorem mapMatrix_refl : (AddEquiv.refl α).mapMatrix = AddEquiv.refl (Matrix m n α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃+ β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃+ _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃+ β) (g : β ≃+ γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃+ _) := rfl @[simp] lemma entryAddHom_comp_mapMatrix (f : α ≃+ β) (i : m) (j : n) : (entryAddHom β i j).comp (AddHomClass.toAddHom f.mapMatrix) = (f : AddHom α β).comp (entryAddHom _ i j) := rfl end AddEquiv namespace LinearMap variable [Semiring R] [AddCommMonoid α] [AddCommMonoid β] [AddCommMonoid γ] variable [Module R α] [Module R β] [Module R γ] /-- The `LinearMap` between spaces of matrices induced by a `LinearMap` between their coefficients. This is `Matrix.map` as a `LinearMap`. -/ @[simps] def mapMatrix (f : α →ₗ[R] β) : Matrix m n α →ₗ[R] Matrix m n β where toFun M := M.map f map_add' := Matrix.map_add f f.map_add map_smul' r := Matrix.map_smul f r (f.map_smul r) @[simp] theorem mapMatrix_id : LinearMap.id.mapMatrix = (LinearMap.id : Matrix m n α →ₗ[R] _) := rfl @[simp] theorem mapMatrix_comp (f : β →ₗ[R] γ) (g : α →ₗ[R] β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m n α →ₗ[R] _) := rfl @[simp] lemma entryLinearMap_comp_mapMatrix (f : α →ₗ[R] β) (i : m) (j : n) : entryLinearMap R _ i j ∘ₗ f.mapMatrix = f ∘ₗ entryLinearMap R _ i j := rfl end LinearMap namespace LinearEquiv variable [Semiring R] [AddCommMonoid α] [AddCommMonoid β] [AddCommMonoid γ] variable [Module R α] [Module R β] [Module R γ] /-- The `LinearEquiv` between spaces of matrices induced by a `LinearEquiv` between their coefficients. This is `Matrix.map` as a `LinearEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃ₗ[R] β) : Matrix m n α ≃ₗ[R] Matrix m n β := { f.toEquiv.mapMatrix, f.toLinearMap.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm } @[simp] theorem mapMatrix_refl : (LinearEquiv.refl R α).mapMatrix = LinearEquiv.refl R (Matrix m n α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃ₗ[R] β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃ₗ[R] _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃ₗ[R] β) (g : β ≃ₗ[R] γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃ₗ[R] _) := rfl @[simp] lemma mapMatrix_toLinearMap (f : α ≃ₗ[R] β) : (f.mapMatrix : _ ≃ₗ[R] Matrix m n β).toLinearMap = f.toLinearMap.mapMatrix := by rfl @[simp] lemma entryLinearMap_comp_mapMatrix (f : α ≃ₗ[R] β) (i : m) (j : n) : entryLinearMap R _ i j ∘ₗ f.mapMatrix.toLinearMap = f.toLinearMap ∘ₗ entryLinearMap R _ i j := by simp only [mapMatrix_toLinearMap, LinearMap.entryLinearMap_comp_mapMatrix] end LinearEquiv namespace RingHom variable [Fintype m] [DecidableEq m] variable [NonAssocSemiring α] [NonAssocSemiring β] [NonAssocSemiring γ] /-- The `RingHom` between spaces of square matrices induced by a `RingHom` between their coefficients. This is `Matrix.map` as a `RingHom`. -/ @[simps] def mapMatrix (f : α →+* β) : Matrix m m α →+* Matrix m m β := { f.toAddMonoidHom.mapMatrix with toFun := fun M => M.map f map_one' := by simp map_mul' := fun _ _ => Matrix.map_mul } @[simp] theorem mapMatrix_id : (RingHom.id α).mapMatrix = RingHom.id (Matrix m m α) := rfl @[simp] theorem mapMatrix_comp (f : β →+* γ) (g : α →+* β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m m α →+* _) := rfl end RingHom namespace RingEquiv variable [Fintype m] [DecidableEq m] variable [NonAssocSemiring α] [NonAssocSemiring β] [NonAssocSemiring γ] /-- The `RingEquiv` between spaces of square matrices induced by a `RingEquiv` between their coefficients. This is `Matrix.map` as a `RingEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃+* β) : Matrix m m α ≃+* Matrix m m β := { f.toRingHom.mapMatrix, f.toAddEquiv.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm } @[simp] theorem mapMatrix_refl : (RingEquiv.refl α).mapMatrix = RingEquiv.refl (Matrix m m α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃+* β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m m β ≃+* _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃+* β) (g : β ≃+* γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m m α ≃+* _) := rfl open MulOpposite in /-- For any ring `R`, we have ring isomorphism `Matₙₓₙ(Rᵒᵖ) ≅ (Matₙₓₙ(R))ᵒᵖ` given by transpose. -/ @[simps apply symm_apply] def mopMatrix : Matrix m m αᵐᵒᵖ ≃+* (Matrix m m α)ᵐᵒᵖ where toFun M := op (M.transpose.map unop) invFun M := M.unop.transpose.map op left_inv _ := by aesop right_inv _ := by aesop map_mul' _ _ := unop_injective <\| by ext; simp [transpose, mul_apply] map_add' _ _ := by aesop end RingEquiv namespace AlgHom variable [Fintype m] [DecidableEq m] variable [CommSemiring R] [Semiring α] [Semiring β] [Semiring γ] variable [Algebra R α] [Algebra R β] [Algebra R γ] /-- The `AlgHom` between spaces of square matrices induced by an `AlgHom` between their coefficients. This is `Matrix.map` as an `AlgHom`. -/ @[simps] def mapMatrix (f : α →ₐ[R] β) : Matrix m m α →ₐ[R] Matrix m m β := { f.toRingHom.mapMatrix with toFun := fun M => M.map f commutes' := fun r => Matrix.map_algebraMap r f (map_zero _) (f.commutes r) } @[simp] theorem mapMatrix_id : (AlgHom.id R α).mapMatrix = AlgHom.id R (Matrix m m α) := rfl @[simp] theorem mapMatrix_comp (f : β →ₐ[R] γ) (g : α →ₐ[R] β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m m α →ₐ[R] _) := rfl end AlgHom namespace AlgEquiv variable [Fintype m] [DecidableEq m] variable [CommSemiring R] [Semiring α] [Semiring β] [Semiring γ] variable [Algebra R α] [Algebra R β] [Algebra R γ] /-- The `AlgEquiv` between spaces of square matrices induced by an `AlgEquiv` between their coefficients. This is `Matrix.map` as an `AlgEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃ₐ[R] β) : Matrix m m α ≃ₐ[R] Matrix m m β := { f.toAlgHom.mapMatrix, f.toRingEquiv.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm } @[simp] theorem mapMatrix_refl : AlgEquiv.refl.mapMatrix = (AlgEquiv.refl : Matrix m m α ≃ₐ[R] _) := rfl @[simp] theorem mapMatrix_symm (f : α ≃ₐ[R] β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m m β ≃ₐ[R] _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃ₐ[R] β) (g : β ≃ₐ[R] γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m m α ≃ₐ[R] _) := rfl /-- For any algebra `α` over a ring `R`, we have an `R`-algebra isomorphism `Matₙₓₙ(αᵒᵖ) ≅ (Matₙₓₙ(R))ᵒᵖ` given by transpose. If `α` is commutative, we can get rid of the `ᵒᵖ` in the left-hand side, see `Matrix.transposeAlgEquiv`. -/ @[simps!] def mopMatrix : Matrix m m αᵐᵒᵖ ≃ₐ[R] (Matrix m m α)ᵐᵒᵖ where __ := RingEquiv.mopMatrix commutes' _ := MulOpposite.unop_injective <\| by ext; simp [algebraMap_matrix_apply, eq_comm, apply_ite MulOpposite.unop] end AlgEquiv open Matrix namespace Matrix section Transpose open Matrix variable (m n α) /-- `Matrix.transpose` as an `AddEquiv` -/ @[simps apply] def transposeAddEquiv [Add α] : Matrix m n α ≃+ Matrix n m α where toFun := transpose invFun := transpose left_inv := transpose_transpose right_inv := transpose_transpose map_add' := transpose_add @[simp] theorem transposeAddEquiv_symm [Add α] : (transposeAddEquiv m n α).symm = transposeAddEquiv n m α := rfl variable {m n α} theorem transpose_list_sum [AddMonoid α] (l : List (Matrix m n α)) : l.sumᵀ = (l.map transpose).sum := map_list_sum (transposeAddEquiv m n α) l theorem transpose_multiset_sum [AddCommMonoid α] (s : Multiset (Matrix m n α)) : s.sumᵀ = (s.map transpose).sum := (transposeAddEquiv m n α).toAddMonoidHom.map_multiset_sum s theorem transpose_sum [AddCommMonoid α] {ι : Type} (s : Finset ι) (M : ι → Matrix m n α) : (∑ i ∈ s, M i)ᵀ = ∑ i ∈ s, (M i)ᵀ := map_sum (transposeAddEquiv m n α) _ s variable (m n R α) /-- `Matrix.transpose` as a `LinearMap` -/ @[simps apply] def transposeLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : Matrix m n α ≃ₗ[R] Matrix n m α := { transposeAddEquiv m n α with map_smul' := transpose_smul } @[simp] theorem transposeLinearEquiv_symm [Semiring R] [AddCommMonoid α] [Module R α] : (transposeLinearEquiv m n R α).symm = transposeLinearEquiv n m R α := rfl variable {m n R α} variable (m α) /-- `Matrix.transpose` as a `RingEquiv` to the opposite ring -/ @[simps] def transposeRingEquiv [AddCommMonoid α] [CommSemigroup α] [Fintype m] : Matrix m m α ≃+ (Matrix m m α)ᵐᵒᵖ := { (transposeAddEquiv m m α).trans MulOpposite.opAddEquiv with toFun := fun M => MulOpposite.op Mᵀ invFun := fun M => M.unopᵀ map_mul' := fun M N => (congr_arg MulOpposite.op (transpose_mul M N)).trans (MulOpposite.op_mul _ _) left_inv := fun M => transpose_transpose M right_inv := fun M => MulOpposite.unop_injective <\| transpose_transpose M.unop } variable {m α} @[simp] theorem transpose_pow [CommSemiring α] [Fintype m] [DecidableEq m] (M : Matrix m m α) (k : ℕ) : (M ^ k)ᵀ = Mᵀ ^ k := MulOpposite.op_injective <\| map_pow (transposeRingEquiv m α) M k theorem transpose_list_prod [CommSemiring α] [Fintype m] [DecidableEq m] (l : List (Matrix m m α)) : l.prodᵀ = (l.map transpose).reverse.prod := (transposeRingEquiv m α).unop_map_list_prod l variable (R m α) /-- `Matrix.transpose` as an `AlgEquiv` to the opposite ring -/ @[simps] def transposeAlgEquiv [CommSemiring R] [CommSemiring α] [Fintype m] [DecidableEq m] [Algebra R α] : Matrix m m α ≃ₐ[R] (Matrix m m α)ᵐᵒᵖ := { (transposeAddEquiv m m α).trans MulOpposite.opAddEquiv, transposeRingEquiv m α with toFun := fun M => MulOpposite.op Mᵀ commutes' := fun r => by simp only [algebraMap_eq_diagonal, diagonal_transpose, MulOpposite.algebraMap_apply] } variable {R m α} end Transpose end Matrix		Mathlib/Data/Matrix/Basic.lean	1,960	1,962
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Kim Morrison, Ainsley Pahljina -/ import Mathlib.RingTheory.Fintype import Mathlib.Tactic.NormNum import Mathlib.Tactic.Ring import Mathlib.Tactic.Zify /-! # The Lucas-Lehmer test for Mersenne primes. We define `lucasLehmerResidue : Π p : ℕ, ZMod (2^p - 1)`, and prove `lucasLehmerResidue p = 0 → Prime (mersenne p)`. We construct a `norm_num` extension to calculate this residue to certify primality of Mersenne primes using `lucas_lehmer_sufficiency`. ## TODO - Show reverse implication. - Speed up the calculations using `n ≡ (n % 2^p) + (n / 2^p) [MOD 2^p - 1]`. - Find some bigger primes! ## History This development began as a student project by Ainsley Pahljina, and was then cleaned up for mathlib by Kim Morrison. The tactic for certified computation of Lucas-Lehmer residues was provided by Mario Carneiro. This tactic was ported by Thomas Murrills to Lean 4, and then it was converted to a `norm_num` extension and made to use kernel reductions by Kyle Miller. -/ assert_not_exists TwoSidedIdeal /-- The Mersenne numbers, 2^p - 1. -/ def mersenne (p : ℕ) : ℕ := 2 ^ p - 1 theorem strictMono_mersenne : StrictMono mersenne := fun m n h ↦ (Nat.sub_lt_sub_iff_right <\| Nat.one_le_pow _ _ two_pos).2 <\| by gcongr; norm_num1 @[simp] theorem mersenne_lt_mersenne {p q : ℕ} : mersenne p < mersenne q ↔ p < q := strictMono_mersenne.lt_iff_lt @[gcongr] protected alias ⟨_, GCongr.mersenne_lt_mersenne⟩ := mersenne_lt_mersenne @[simp] theorem mersenne_le_mersenne {p q : ℕ} : mersenne p ≤ mersenne q ↔ p ≤ q := strictMono_mersenne.le_iff_le @[gcongr] protected alias ⟨_, GCongr.mersenne_le_mersenne⟩ := mersenne_le_mersenne @[simp] theorem mersenne_zero : mersenne 0 = 0 := rfl @[simp] lemma mersenne_odd : ∀ {p : ℕ}, Odd (mersenne p) ↔ p ≠ 0 \| 0 => by simp \| p + 1 => by simpa using Nat.Even.sub_odd (one_le_pow₀ one_le_two) (even_two.pow_of_ne_zero p.succ_ne_zero) odd_one @[simp] theorem mersenne_pos {p : ℕ} : 0 < mersenne p ↔ 0 < p := mersenne_lt_mersenne (p := 0) namespace Mathlib.Meta.Positivity open Lean Meta Qq Function alias ⟨_, mersenne_pos_of_pos⟩ := mersenne_pos /-- Extension for the `positivity` tactic: `mersenne`. -/ @[positivity mersenne _] def evalMersenne : PositivityExt where eval {u α} _zα _pα e := do match u, α, e with \| 0, ~q(ℕ), ~q(mersenne $a) => let ra ← core q(inferInstance) q(inferInstance) a assertInstancesCommute match ra with \| .positive pa => pure (.positive q(mersenne_pos_of_pos $pa)) \| _ => pure (.nonnegative q(Nat.zero_le (mersenne $a))) \| _, _, _ => throwError "not mersenne" end Mathlib.Meta.Positivity @[simp] theorem one_lt_mersenne {p : ℕ} : 1 < mersenne p ↔ 1 < p := mersenne_lt_mersenne (p := 1) @[simp] theorem succ_mersenne (k : ℕ) : mersenne k + 1 = 2 ^ k := by rw [mersenne, tsub_add_cancel_of_le] exact one_le_pow₀ (by norm_num) namespace LucasLehmer open Nat /-! We now define three(!) different versions of the recurrence `s (i+1) = (s i)^2 - 2`. These versions take values either in `ℤ`, in `ZMod (2^p - 1)`, or in `ℤ` but applying `% (2^p - 1)` at each step. They are each useful at different points in the proof, so we take a moment setting up the lemmas relating them. -/ /-- The recurrence `s (i+1) = (s i)^2 - 2` in `ℤ`. -/ def s : ℕ → ℤ \| 0 => 4 \| i + 1 => s i ^ 2 - 2 /-- The recurrence `s (i+1) = (s i)^2 - 2` in `ZMod (2^p - 1)`. -/ def sZMod (p : ℕ) : ℕ → ZMod (2 ^ p - 1) \| 0 => 4 \| i + 1 => sZMod p i ^ 2 - 2 /-- The recurrence `s (i+1) = ((s i)^2 - 2) % (2^p - 1)` in `ℤ`. -/ def sMod (p : ℕ) : ℕ → ℤ \| 0 => 4 % (2 ^ p - 1) \| i + 1 => (sMod p i ^ 2 - 2) % (2 ^ p - 1) theorem mersenne_int_pos {p : ℕ} (hp : p ≠ 0) : (0 : ℤ) < 2 ^ p - 1 := sub_pos.2 <\| mod_cast Nat.one_lt_two_pow hp theorem mersenne_int_ne_zero (p : ℕ) (hp : p ≠ 0) : (2 ^ p - 1 : ℤ) ≠ 0 := (mersenne_int_pos hp).ne' theorem sMod_nonneg (p : ℕ) (hp : p ≠ 0) (i : ℕ) : 0 ≤ sMod p i := by cases i <;> dsimp [sMod] · exact sup_eq_right.mp rfl · apply Int.emod_nonneg exact mersenne_int_ne_zero p hp theorem sMod_mod (p i : ℕ) : sMod p i % (2 ^ p - 1) = sMod p i := by cases i <;> simp [sMod] theorem sMod_lt (p : ℕ) (hp : p ≠ 0) (i : ℕ) : sMod p i < 2 ^ p - 1 := by rw [← sMod_mod] refine (Int.emod_lt_abs _ (mersenne_int_ne_zero p hp)).trans_eq ?_ exact abs_of_nonneg (mersenne_int_pos hp).le theorem sZMod_eq_s (p' : ℕ) (i : ℕ) : sZMod (p' + 2) i = (s i : ZMod (2 ^ (p' + 2) - 1)) := by induction i with \| zero => dsimp [s, sZMod]; norm_num \| succ i ih => push_cast [s, sZMod, ih]; rfl -- These next two don't make good `norm_cast` lemmas. theorem Int.natCast_pow_pred (b p : ℕ) (w : 0 < b) : ((b ^ p - 1 : ℕ) : ℤ) = (b : ℤ) ^ p - 1 := by have : 1 ≤ b ^ p := Nat.one_le_pow p b w norm_cast theorem Int.coe_nat_two_pow_pred (p : ℕ) : ((2 ^ p - 1 : ℕ) : ℤ) = (2 ^ p - 1 : ℤ) := Int.natCast_pow_pred 2 p (by decide) theorem sZMod_eq_sMod (p : ℕ) (i : ℕ) : sZMod p i = (sMod p i : ZMod (2 ^ p - 1)) := by induction i <;> push_cast [← Int.coe_nat_two_pow_pred p, sMod, sZMod, ] <;> rfl /-- The Lucas-Lehmer residue is `s p (p-2)` in `ZMod (2^p - 1)`. -/ def lucasLehmerResidue (p : ℕ) : ZMod (2 ^ p - 1) := sZMod p (p - 2) theorem residue_eq_zero_iff_sMod_eq_zero (p : ℕ) (w : 1 < p) : lucasLehmerResidue p = 0 ↔ sMod p (p - 2) = 0 := by dsimp [lucasLehmerResidue] rw [sZMod_eq_sMod p] constructor · -- We want to use that fact that `0 ≤ s_mod p (p-2) < 2^p - 1` -- and `lucas_lehmer_residue p = 0 → 2^p - 1 ∣ s_mod p (p-2)`. intro h simp? [ZMod.intCast_zmod_eq_zero_iff_dvd] at h says simp only [ZMod.intCast_zmod_eq_zero_iff_dvd, ofNat_pos, pow_pos, cast_pred, cast_pow, cast_ofNat] at h apply Int.eq_zero_of_dvd_of_nonneg_of_lt _ _ h <;> clear h · exact sMod_nonneg _ (by positivity) _ · exact sMod_lt _ (by positivity) _ · intro h rw [h] simp /-- Lucas-Lehmer Test: a Mersenne number `2^p-1` is prime if and only if the Lucas-Lehmer residue `s p (p-2) % (2^p - 1)` is zero. -/ def LucasLehmerTest (p : ℕ) : Prop := lucasLehmerResidue p = 0 /-- `q` is defined as the minimum factor of `mersenne p`, bundled as an `ℕ+`. -/ def q (p : ℕ) : ℕ+ := ⟨Nat.minFac (mersenne p), Nat.minFac_pos (mersenne p)⟩ -- It would be nice to define this as (ℤ/qℤ)[x] / (x^2 - 3), -- obtaining the ring structure for free, -- but that seems to be more trouble than it's worth; -- if it were easy to make the definition, -- cardinality calculations would be somewhat more involved, too. /-- We construct the ring `X q` as ℤ/qℤ + √3 ℤ/qℤ. -/ def X (q : ℕ+) : Type := ZMod q × ZMod q namespace X variable {q : ℕ+} instance : Inhabited (X q) := inferInstanceAs (Inhabited (ZMod q × ZMod q)) instance : Fintype (X q) := inferInstanceAs (Fintype (ZMod q × ZMod q)) instance : DecidableEq (X q) := inferInstanceAs (DecidableEq (ZMod q × ZMod q)) instance : AddCommGroup (X q) := inferInstanceAs (AddCommGroup (ZMod q × ZMod q)) @[ext] theorem ext {x y : X q} (h₁ : x.1 = y.1) (h₂ : x.2 = y.2) : x = y := by cases x; cases y; congr @[simp] theorem zero_fst : (0 : X q).1 = 0 := rfl @[simp] theorem zero_snd : (0 : X q).2 = 0 := rfl @[simp] theorem add_fst (x y : X q) : (x + y).1 = x.1 + y.1 := rfl @[simp] theorem add_snd (x y : X q) : (x + y).2 = x.2 + y.2 := rfl @[simp] theorem neg_fst (x : X q) : (-x).1 = -x.1 := rfl @[simp] theorem neg_snd (x : X q) : (-x).2 = -x.2 := rfl instance : Mul (X q) where mul x y := (x.1 y.1 + 3 * x.2 * y.2, x.1 * y.2 + x.2 * y.1) @[simp] theorem mul_fst (x y : X q) : (x * y).1 = x.1 * y.1 + 3 * x.2 * y.2 := rfl @[simp] theorem mul_snd (x y : X q) : (x * y).2 = x.1 * y.2 + x.2 * y.1 := rfl instance : One (X q) where one := ⟨1, 0⟩ @[simp] theorem one_fst : (1 : X q).1 = 1 := rfl @[simp] theorem one_snd : (1 : X q).2 = 0 := rfl instance : Monoid (X q) := { inferInstanceAs (Mul (X q)), inferInstanceAs (One (X q)) with mul_assoc := fun x y z => by ext <;> dsimp <;> ring one_mul := fun x => by ext <;> simp mul_one := fun x => by ext <;> simp } instance : NatCast (X q) where natCast := fun n => ⟨n, 0⟩ @[simp] theorem fst_natCast (n : ℕ) : (n : X q).fst = (n : ZMod q) := rfl @[simp] theorem snd_natCast (n : ℕ) : (n : X q).snd = (0 : ZMod q) := rfl @[simp] theorem ofNat_fst (n : ℕ) [n.AtLeastTwo] : (ofNat(n) : X q).fst = OfNat.ofNat n := rfl @[simp] theorem ofNat_snd (n : ℕ) [n.AtLeastTwo] : (ofNat(n) : X q).snd = 0 := rfl instance : AddGroupWithOne (X q) := { inferInstanceAs (Monoid (X q)), inferInstanceAs (AddCommGroup (X q)), inferInstanceAs (NatCast (X q)) with natCast_zero := by ext <;> simp natCast_succ := fun _ ↦ by ext <;> simp intCast := fun n => ⟨n, 0⟩ intCast_ofNat := fun n => by ext <;> simp intCast_negSucc := fun n => by ext <;> simp } theorem left_distrib (x y z : X q) : x * (y + z) = x * y + x * z := by ext <;> dsimp <;> ring theorem right_distrib (x y z : X q) : (x + y) * z = x * z + y * z := by ext <;> dsimp <;> ring instance : Ring (X q) := { inferInstanceAs (AddGroupWithOne (X q)), inferInstanceAs (AddCommGroup (X q)), inferInstanceAs (Monoid (X q)) with left_distrib := left_distrib right_distrib := right_distrib mul_zero := fun _ ↦ by ext <;> simp zero_mul := fun _ ↦ by ext <;> simp } instance : CommRing (X q) := { inferInstanceAs (Ring (X q)) with mul_comm := fun _ _ ↦ by ext <;> dsimp <;> ring } instance [Fact (1 < (q : ℕ))] : Nontrivial (X q) := ⟨⟨0, 1, ne_of_apply_ne Prod.fst zero_ne_one⟩⟩ @[simp] theorem fst_intCast (n : ℤ) : (n : X q).fst = (n : ZMod q) := rfl @[simp] theorem snd_intCast (n : ℤ) : (n : X q).snd = (0 : ZMod q) := rfl @[norm_cast] theorem coe_mul (n m : ℤ) : ((n * m : ℤ) : X q) = (n : X q) * (m : X q) := by ext <;> simp @[norm_cast] theorem coe_natCast (n : ℕ) : ((n : ℤ) : X q) = (n : X q) := by ext <;> simp /-- The cardinality of `X` is `q^2`. -/ theorem card_eq : Fintype.card (X q) = q ^ 2 := by dsimp [X] rw [Fintype.card_prod, ZMod.card q, sq] /-- There are strictly fewer than `q^2` units, since `0` is not a unit. -/ nonrec theorem card_units_lt (w : 1 < q) : Fintype.card (X q)ˣ < q ^ 2 := by have : Fact (1 < (q : ℕ)) := ⟨w⟩ convert card_units_lt (X q) rw [card_eq] /-- We define `ω = 2 + √3`. -/ def ω : X q := (2, 1) /-- We define `ωb = 2 - √3`, which is the inverse of `ω`. -/ def ωb : X q := (2, -1) theorem ω_mul_ωb (q : ℕ+) : (ω : X q) * ωb = 1 := by dsimp [ω, ωb] ext <;> simp; ring theorem ωb_mul_ω (q : ℕ+) : (ωb : X q) * ω = 1 := by rw [mul_comm, ω_mul_ωb] /-- A closed form for the recurrence relation. -/ theorem closed_form (i : ℕ) : (s i : X q) = (ω : X q) ^ 2 ^ i + (ωb : X q) ^ 2 ^ i := by induction i with \| zero => dsimp [s, ω, ωb] ext <;> norm_num \| succ i ih => calc (s (i + 1) : X q) = (s i ^ 2 - 2 : ℤ) := rfl _ = (s i : X q) ^ 2 - 2 := by push_cast; rfl _ = (ω ^ 2 ^ i + ωb ^ 2 ^ i) ^ 2 - 2 := by rw [ih] _ = (ω ^ 2 ^ i) ^ 2 + (ωb ^ 2 ^ i) ^ 2 + 2 * (ωb ^ 2 ^ i * ω ^ 2 ^ i) - 2 := by ring _ = (ω ^ 2 ^ i) ^ 2 + (ωb ^ 2 ^ i) ^ 2 := by rw [← mul_pow ωb ω, ωb_mul_ω, one_pow, mul_one, add_sub_cancel_right] _ = ω ^ 2 ^ (i + 1) + ωb ^ 2 ^ (i + 1) := by rw [← pow_mul, ← pow_mul, _root_.pow_succ] end X open X /-! Here and below, we introduce `p' = p - 2`, in order to avoid using subtraction in `ℕ`. -/ /-- If `1 < p`, then `q p`, the smallest prime factor of `mersenne p`, is more than 2. -/ theorem two_lt_q (p' : ℕ) : 2 < q (p' + 2) := by refine (minFac_prime (one_lt_mersenne.2 ?_).ne').two_le.lt_of_ne' ?_ · exact le_add_left _ _ · rw [Ne, minFac_eq_two_iff, mersenne, Nat.pow_succ'] exact Nat.two_not_dvd_two_mul_sub_one Nat.one_le_two_pow theorem ω_pow_formula (p' : ℕ) (h : lucasLehmerResidue (p' + 2) = 0) : ∃ k : ℤ, (ω : X (q (p' + 2))) ^ 2 ^ (p' + 1) = k * mersenne (p' + 2) * (ω : X (q (p' + 2))) ^ 2 ^ p' - 1 := by dsimp [lucasLehmerResidue] at h rw [sZMod_eq_s p'] at h simp? [ZMod.intCast_zmod_eq_zero_iff_dvd] at h says simp only [add_tsub_cancel_right, ZMod.intCast_zmod_eq_zero_iff_dvd, ofNat_pos, pow_pos, cast_pred, cast_pow, cast_ofNat] at h obtain ⟨k, h⟩ := h use k replace h := congr_arg (fun n : ℤ => (n : X (q (p' + 2)))) h -- coercion from ℤ to X q dsimp at h rw [closed_form] at h replace h := congr_arg (fun x => ω ^ 2 ^ p' * x) h dsimp at h have t : 2 ^ p' + 2 ^ p' = 2 ^ (p' + 1) := by ring rw [mul_add, ← pow_add ω, t, ← mul_pow ω ωb (2 ^ p'), ω_mul_ωb, one_pow] at h rw [mul_comm, coe_mul] at h rw [mul_comm _ (k : X (q (p' + 2)))] at h replace h := eq_sub_of_add_eq h have : 1 ≤ 2 ^ (p' + 2) := Nat.one_le_pow _ _ (by decide) exact mod_cast h /-- `q` is the minimum factor of `mersenne p`, so `M p = 0` in `X q`. -/ theorem mersenne_coe_X (p : ℕ) : (mersenne p : X (q p)) = 0 := by ext <;> simp [mersenne, q, ZMod.natCast_zmod_eq_zero_iff_dvd, -pow_pos] apply Nat.minFac_dvd theorem ω_pow_eq_neg_one (p' : ℕ) (h : lucasLehmerResidue (p' + 2) = 0) : (ω : X (q (p' + 2))) ^ 2 ^ (p' + 1) = -1 := by obtain ⟨k, w⟩ := ω_pow_formula p' h rw [mersenne_coe_X] at w simpa using w theorem ω_pow_eq_one (p' : ℕ) (h : lucasLehmerResidue (p' + 2) = 0) : (ω : X (q (p' + 2))) ^ 2 ^ (p' + 2) = 1 := calc (ω : X (q (p' + 2))) ^ 2 ^ (p' + 2) = (ω ^ 2 ^ (p' + 1)) ^ 2 := by rw [← pow_mul, ← Nat.pow_succ] _ = (-1) ^ 2 := by rw [ω_pow_eq_neg_one p' h] _ = 1 := by simp /-- `ω` as an element of the group of units. -/ def ωUnit (p : ℕ) : Units (X (q p)) where val := ω inv := ωb val_inv := ω_mul_ωb _ inv_val := ωb_mul_ω _ @[simp] theorem ωUnit_coe (p : ℕ) : (ωUnit p : X (q p)) = ω := rfl /-- The order of `ω` in the unit group is exactly `2^p`. -/ theorem order_ω (p' : ℕ) (h : lucasLehmerResidue (p' + 2) = 0) : orderOf (ωUnit (p' + 2)) = 2 ^ (p' + 2) := by apply Nat.eq_prime_pow_of_dvd_least_prime_pow -- the order of ω divides 2^p · exact Nat.prime_two · intro o have ω_pow := orderOf_dvd_iff_pow_eq_one.1 o replace ω_pow := congr_arg (Units.coeHom (X (q (p' + 2))) : Units (X (q (p' + 2))) → X (q (p' + 2))) ω_pow simp? at ω_pow says simp only [Units.coeHom_apply, Units.val_pow_eq_pow_val, ωUnit_coe, Units.val_one] at ω_pow have h : (1 : ZMod (q (p' + 2))) = -1 := congr_arg Prod.fst (ω_pow.symm.trans (ω_pow_eq_neg_one p' h)) haveI : Fact (2 < (q (p' + 2) : ℕ)) := ⟨two_lt_q _⟩ apply ZMod.neg_one_ne_one h.symm · apply orderOf_dvd_iff_pow_eq_one.2 apply Units.ext push_cast exact ω_pow_eq_one p' h theorem order_ineq (p' : ℕ) (h : lucasLehmerResidue (p' + 2) = 0) : 2 ^ (p' + 2) < (q (p' + 2) : ℕ) ^ 2 := calc 2 ^ (p' + 2) = orderOf (ωUnit (p' + 2)) := (order_ω p' h).symm _ ≤ Fintype.card (X (q (p' + 2)))ˣ := orderOf_le_card_univ _ < (q (p' + 2) : ℕ) ^ 2 := card_units_lt (Nat.lt_of_succ_lt (two_lt_q _)) end LucasLehmer export LucasLehmer (LucasLehmerTest lucasLehmerResidue) open LucasLehmer theorem lucas_lehmer_sufficiency (p : ℕ) (w : 1 < p) : LucasLehmerTest p → (mersenne p).Prime := by let p' := p - 2 have z : p = p' + 2 := (tsub_eq_iff_eq_add_of_le w.nat_succ_le).mp rfl have w : 1 < p' + 2 := Nat.lt_of_sub_eq_succ rfl contrapose intro a t rw [z] at a rw [z] at t have h₁ := order_ineq p' t have h₂ := Nat.minFac_sq_le_self (mersenne_pos.2 (Nat.lt_of_succ_lt w)) a have h := lt_of_lt_of_le h₁ h₂ exact not_lt_of_ge (Nat.sub_le _ _) h namespace LucasLehmer /-! ### `norm_num` extension Next we define a `norm_num` extension that calculates `LucasLehmerTest p` for `1 < p`. It makes use of a version of `sMod` that is specifically written to be reducible by the Lean 4 kernel, which has the capability of efficiently reducing natural number expressions. With this reduction in hand, it's a simple matter of applying the lemma `LucasLehmer.residue_eq_zero_iff_sMod_eq_zero`. See [Archive/Examples/MersennePrimes.lean] for certifications of all Mersenne primes up through `mersenne 4423`. -/ namespace norm_num_ext open Qq Lean Elab.Tactic Mathlib.Meta.NormNum /-- Version of `sMod` that is `ℕ`-valued. One should have `q = 2 ^ p - 1`. This can be reduced by the kernel. -/ def sModNat (q : ℕ) : ℕ → ℕ \| 0 => 4 % q \| i + 1 => (sModNat q i ^ 2 + (q - 2)) % q theorem sModNat_eq_sMod (p k : ℕ) (hp : 2 ≤ p) : (sModNat (2 ^ p - 1) k : ℤ) = sMod p k := by have h1 := calc 4 = 2 ^ 2 := by norm_num _ ≤ 2 ^ p := Nat.pow_le_pow_right (by norm_num) hp	have h2 : 1 ≤ 2 ^ p := by omega induction k with \| zero => rw [sModNat, sMod, Int.natCast_emod] simp [h2] \| succ k ih => rw [sModNat, sMod, ← ih]	Mathlib/NumberTheory/LucasLehmer.lean	504	510
/- Copyright (c) 2019 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.LinearAlgebra.AffineSpace.Slope /-! # Derivative as the limit of the slope In this file we relate the derivative of a function with its definition from a standard undergraduate course as the limit of the slope `(f y - f x) / (y - x)` as `y` tends to `𝓝[≠] x`. Since we are talking about functions taking values in a normed space instead of the base field, we use `slope f x y = (y - x)⁻¹ • (f y - f x)` instead of division. We also prove some estimates on the upper/lower limits of the slope in terms of the derivative. For a more detailed overview of one-dimensional derivatives in mathlib, see the module docstring of `analysis/calculus/deriv/basic`. ## Keywords derivative, slope -/ universe u v open scoped Topology open Filter TopologicalSpace Set section NormedField variable {𝕜 : Type u} [NontriviallyNormedField 𝕜] variable {F : Type v} [NormedAddCommGroup F] [NormedSpace 𝕜 F] variable {f : 𝕜 → F} variable {f' : F} variable {x : 𝕜} variable {s : Set 𝕜} /-- If the domain has dimension one, then Fréchet derivative is equivalent to the classical definition with a limit. In this version we have to take the limit along the subset `-{x}`, because for `y=x` the slope equals zero due to the convention `0⁻¹=0`. -/ theorem hasDerivAtFilter_iff_tendsto_slope {x : 𝕜} {L : Filter 𝕜} : HasDerivAtFilter f f' x L ↔ Tendsto (slope f x) (L ⊓ 𝓟 {x}ᶜ) (𝓝 f') := calc HasDerivAtFilter f f' x L ↔ Tendsto (fun y ↦ slope f x y - (y - x)⁻¹ • (y - x) • f') L (𝓝 0) := by simp only [hasDerivAtFilter_iff_tendsto, ← norm_inv, ← norm_smul, ← tendsto_zero_iff_norm_tendsto_zero, slope_def_module, smul_sub] _ ↔ Tendsto (fun y ↦ slope f x y - (y - x)⁻¹ • (y - x) • f') (L ⊓ 𝓟 {x}ᶜ) (𝓝 0) := .symm <\| tendsto_inf_principal_nhds_iff_of_forall_eq <\| by simp _ ↔ Tendsto (fun y ↦ slope f x y - f') (L ⊓ 𝓟 {x}ᶜ) (𝓝 0) := tendsto_congr' <\| by refine (EqOn.eventuallyEq fun y hy ↦ ?_).filter_mono inf_le_right rw [inv_smul_smul₀ (sub_ne_zero.2 hy) f'] _ ↔ Tendsto (slope f x) (L ⊓ 𝓟 {x}ᶜ) (𝓝 f') := by rw [← nhds_translation_sub f', tendsto_comap_iff]; rfl theorem hasDerivWithinAt_iff_tendsto_slope : HasDerivWithinAt f f' s x ↔ Tendsto (slope f x) (𝓝[s \ {x}] x) (𝓝 f') := by simp only [HasDerivWithinAt, nhdsWithin, diff_eq, ← inf_assoc, inf_principal.symm] exact hasDerivAtFilter_iff_tendsto_slope theorem hasDerivWithinAt_iff_tendsto_slope' (hs : x ∉ s) : HasDerivWithinAt f f' s x ↔ Tendsto (slope f x) (𝓝[s] x) (𝓝 f') := by rw [hasDerivWithinAt_iff_tendsto_slope, diff_singleton_eq_self hs] theorem hasDerivAt_iff_tendsto_slope : HasDerivAt f f' x ↔ Tendsto (slope f x) (𝓝[≠] x) (𝓝 f') := hasDerivAtFilter_iff_tendsto_slope theorem hasDerivAt_iff_tendsto_slope_zero : HasDerivAt f f' x ↔ Tendsto (fun t ↦ t⁻¹ • (f (x + t) - f x)) (𝓝[≠] 0) (𝓝 f') := by have : 𝓝[≠] x = Filter.map (fun t ↦ x + t) (𝓝[≠] 0) := by simp [nhdsWithin, map_add_left_nhds_zero x, Filter.map_inf, add_right_injective x] simp [hasDerivAt_iff_tendsto_slope, this, slope, Function.comp_def] alias ⟨HasDerivAt.tendsto_slope_zero, _⟩ := hasDerivAt_iff_tendsto_slope_zero theorem HasDerivAt.tendsto_slope_zero_right [Preorder 𝕜] (h : HasDerivAt f f' x) : Tendsto (fun t ↦ t⁻¹ • (f (x + t) - f x)) (𝓝[>] 0) (𝓝 f') := h.tendsto_slope_zero.mono_left (nhdsGT_le_nhdsNE 0) theorem HasDerivAt.tendsto_slope_zero_left [Preorder 𝕜] (h : HasDerivAt f f' x) : Tendsto (fun t ↦ t⁻¹ • (f (x + t) - f x)) (𝓝[<] 0) (𝓝 f') := h.tendsto_slope_zero.mono_left (nhdsLT_le_nhdsNE 0) /-- Given a set `t` such that `s ∩ t` is dense in `s`, then the range of `derivWithin f s` is contained in the closure of the submodule spanned by the image of `t`. -/ theorem range_derivWithin_subset_closure_span_image (f : 𝕜 → F) {s t : Set 𝕜} (h : s ⊆ closure (s ∩ t)) : range (derivWithin f s) ⊆ closure (Submodule.span 𝕜 (f '' t)) := by rintro - ⟨x, rfl⟩ by_cases H : UniqueDiffWithinAt 𝕜 s x; swap · simpa [derivWithin_zero_of_not_uniqueDiffWithinAt H] using subset_closure (zero_mem _) by_cases H' : DifferentiableWithinAt 𝕜 f s x; swap · rw [derivWithin_zero_of_not_differentiableWithinAt H'] exact subset_closure (zero_mem _) have I : (𝓝[(s ∩ t) \ {x}] x).NeBot := by rw [← accPt_principal_iff_nhdsWithin, ← uniqueDiffWithinAt_iff_accPt] exact H.mono_closure h have : Tendsto (slope f x) (𝓝[(s ∩ t) \ {x}] x) (𝓝 (derivWithin f s x)) := by apply Tendsto.mono_left (hasDerivWithinAt_iff_tendsto_slope.1 H'.hasDerivWithinAt) rw [inter_comm, inter_diff_assoc] exact nhdsWithin_mono _ inter_subset_right rw [← closure_closure, ← Submodule.topologicalClosure_coe] apply mem_closure_of_tendsto this filter_upwards [self_mem_nhdsWithin] with y hy simp only [slope, vsub_eq_sub, SetLike.mem_coe] refine Submodule.smul_mem _ _ (Submodule.sub_mem _ ?_ ?_) · apply Submodule.le_topologicalClosure apply Submodule.subset_span exact mem_image_of_mem _ hy.1.2 · apply Submodule.closure_subset_topologicalClosure_span suffices A : f x ∈ closure (f '' (s ∩ t)) from closure_mono (image_subset _ inter_subset_right) A apply ContinuousWithinAt.mem_closure_image · apply H'.continuousWithinAt.mono inter_subset_left rw [mem_closure_iff_nhdsWithin_neBot] exact I.mono (nhdsWithin_mono _ diff_subset) /-- Given a dense set `t`, then the range of `deriv f` is contained in the closure of the submodule spanned by the image of `t`. -/ theorem range_deriv_subset_closure_span_image (f : 𝕜 → F) {t : Set 𝕜} (h : Dense t) : range (deriv f) ⊆ closure (Submodule.span 𝕜 (f '' t)) := by rw [← derivWithin_univ] apply range_derivWithin_subset_closure_span_image simp [dense_iff_closure_eq.1 h] theorem isSeparable_range_derivWithin [SeparableSpace 𝕜] (f : 𝕜 → F) (s : Set 𝕜) : IsSeparable (range (derivWithin f s)) := by obtain ⟨t, ts, t_count, ht⟩ : ∃ t, t ⊆ s ∧ Set.Countable t ∧ s ⊆ closure t := (IsSeparable.of_separableSpace s).exists_countable_dense_subset have : s ⊆ closure (s ∩ t) := by rwa [inter_eq_self_of_subset_right ts] apply IsSeparable.mono _ (range_derivWithin_subset_closure_span_image f this) exact (Countable.image t_count f).isSeparable.span.closure theorem isSeparable_range_deriv [SeparableSpace 𝕜] (f : 𝕜 → F) : IsSeparable (range (deriv f)) := by rw [← derivWithin_univ] exact isSeparable_range_derivWithin _ _ lemma HasDerivAt.continuousAt_div [DecidableEq 𝕜] {f : 𝕜 → 𝕜} {c a : 𝕜} (hf : HasDerivAt f a c) : ContinuousAt (Function.update (fun x ↦ (f x - f c) / (x - c)) c a) c := by rw [← slope_fun_def_field] exact continuousAt_update_same.mpr <\| hasDerivAt_iff_tendsto_slope.mp hf end NormedField /-! ### Upper estimates on liminf and limsup -/ section Real variable {f : ℝ → ℝ} {f' : ℝ} {s : Set ℝ} {x : ℝ} {r : ℝ} theorem HasDerivWithinAt.limsup_slope_le (hf : HasDerivWithinAt f f' s x) (hr : f' < r) : ∀ᶠ z in 𝓝[s \ {x}] x, slope f x z < r := hasDerivWithinAt_iff_tendsto_slope.1 hf (IsOpen.mem_nhds isOpen_Iio hr) theorem HasDerivWithinAt.limsup_slope_le' (hf : HasDerivWithinAt f f' s x) (hs : x ∉ s) (hr : f' < r) : ∀ᶠ z in 𝓝[s] x, slope f x z < r := (hasDerivWithinAt_iff_tendsto_slope' hs).1 hf (IsOpen.mem_nhds isOpen_Iio hr) theorem HasDerivWithinAt.liminf_right_slope_le (hf : HasDerivWithinAt f f' (Ici x) x) (hr : f' < r) : ∃ᶠ z in 𝓝[>] x, slope f x z < r := (hf.Ioi_of_Ici.limsup_slope_le' (lt_irrefl x) hr).frequently end Real section RealSpace open Metric variable {E : Type u} [NormedAddCommGroup E] [NormedSpace ℝ E] {f : ℝ → E} {f' : E} {s : Set ℝ} {x r : ℝ} /-- If `f` has derivative `f'` within `s` at `x`, then for any `r > ‖f'‖` the ratio `‖f z - f x‖ / ‖z - x‖` is less than `r` in some neighborhood of `x` within `s`. In other words, the limit superior of this ratio as `z` tends to `x` along `s` is less than or equal to `‖f'‖`. -/ theorem HasDerivWithinAt.limsup_norm_slope_le (hf : HasDerivWithinAt f f' s x) (hr : ‖f'‖ < r) : ∀ᶠ z in 𝓝[s] x, ‖z - x‖⁻¹ * ‖f z - f x‖ < r := by have hr₀ : 0 < r := lt_of_le_of_lt (norm_nonneg f') hr have A : ∀ᶠ z in 𝓝[s \ {x}] x, ‖(z - x)⁻¹ • (f z - f x)‖ ∈ Iio r := (hasDerivWithinAt_iff_tendsto_slope.1 hf).norm (IsOpen.mem_nhds isOpen_Iio hr) have B : ∀ᶠ z in 𝓝[{x}] x, ‖(z - x)⁻¹ • (f z - f x)‖ ∈ Iio r := mem_of_superset self_mem_nhdsWithin (singleton_subset_iff.2 <\| by simp [hr₀]) have C := mem_sup.2 ⟨A, B⟩ rw [← nhdsWithin_union, diff_union_self, nhdsWithin_union, mem_sup] at C filter_upwards [C.1] simp only [norm_smul, mem_Iio, norm_inv] exact fun _ => id	/-- If `f` has derivative `f'` within `s` at `x`, then for any `r > ‖f'‖` the ratio `(‖f z‖ - ‖f x‖) / ‖z - x‖` is less than `r` in some neighborhood of `x` within `s`. In other words, the limit superior of this ratio as `z` tends to `x` along `s` is less than or equal to `‖f'‖`. This lemma is a weaker version of `HasDerivWithinAt.limsup_norm_slope_le` where `‖f z‖ - ‖f x‖` is replaced by `‖f z - f x‖`. -/ theorem HasDerivWithinAt.limsup_slope_norm_le (hf : HasDerivWithinAt f f' s x) (hr : ‖f'‖ < r) : ∀ᶠ z in 𝓝[s] x, ‖z - x‖⁻¹ * (‖f z‖ - ‖f x‖) < r := by apply (hf.limsup_norm_slope_le hr).mono intro z hz	Mathlib/Analysis/Calculus/Deriv/Slope.lean	194	205
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Algebra.ModEq import Mathlib.Algebra.Order.Archimedean.Basic import Mathlib.Algebra.Ring.Periodic import Mathlib.Data.Int.SuccPred import Mathlib.Order.Circular /-! # Reducing to an interval modulo its length This file defines operations that reduce a number (in an `Archimedean` `LinearOrderedAddCommGroup`) to a number in a given interval, modulo the length of that interval. ## Main definitions * `toIcoDiv hp a b` (where `hp : 0 < p`): The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ico a (a + p)`. * `toIcoMod hp a b` (where `hp : 0 < p`): Reduce `b` to the interval `Ico a (a + p)`. * `toIocDiv hp a b` (where `hp : 0 < p`): The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ioc a (a + p)`. * `toIocMod hp a b` (where `hp : 0 < p`): Reduce `b` to the interval `Ioc a (a + p)`. -/ assert_not_exists TwoSidedIdeal noncomputable section section LinearOrderedAddCommGroup variable {α : Type*} [AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α] [hα : Archimedean α] {p : α} (hp : 0 < p) {a b c : α} {n : ℤ} section include hp /-- The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ico a (a + p)`. -/ def toIcoDiv (a b : α) : ℤ := (existsUnique_sub_zsmul_mem_Ico hp b a).choose theorem sub_toIcoDiv_zsmul_mem_Ico (a b : α) : b - toIcoDiv hp a b • p ∈ Set.Ico a (a + p) := (existsUnique_sub_zsmul_mem_Ico hp b a).choose_spec.1 theorem toIcoDiv_eq_of_sub_zsmul_mem_Ico (h : b - n • p ∈ Set.Ico a (a + p)) : toIcoDiv hp a b = n := ((existsUnique_sub_zsmul_mem_Ico hp b a).choose_spec.2 _ h).symm /-- The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ioc a (a + p)`. -/ def toIocDiv (a b : α) : ℤ := (existsUnique_sub_zsmul_mem_Ioc hp b a).choose theorem sub_toIocDiv_zsmul_mem_Ioc (a b : α) : b - toIocDiv hp a b • p ∈ Set.Ioc a (a + p) := (existsUnique_sub_zsmul_mem_Ioc hp b a).choose_spec.1 theorem toIocDiv_eq_of_sub_zsmul_mem_Ioc (h : b - n • p ∈ Set.Ioc a (a + p)) : toIocDiv hp a b = n := ((existsUnique_sub_zsmul_mem_Ioc hp b a).choose_spec.2 _ h).symm /-- Reduce `b` to the interval `Ico a (a + p)`. -/ def toIcoMod (a b : α) : α := b - toIcoDiv hp a b • p /-- Reduce `b` to the interval `Ioc a (a + p)`. -/ def toIocMod (a b : α) : α := b - toIocDiv hp a b • p theorem toIcoMod_mem_Ico (a b : α) : toIcoMod hp a b ∈ Set.Ico a (a + p) := sub_toIcoDiv_zsmul_mem_Ico hp a b theorem toIcoMod_mem_Ico' (b : α) : toIcoMod hp 0 b ∈ Set.Ico 0 p := by convert toIcoMod_mem_Ico hp 0 b exact (zero_add p).symm theorem toIocMod_mem_Ioc (a b : α) : toIocMod hp a b ∈ Set.Ioc a (a + p) := sub_toIocDiv_zsmul_mem_Ioc hp a b theorem left_le_toIcoMod (a b : α) : a ≤ toIcoMod hp a b := (Set.mem_Ico.1 (toIcoMod_mem_Ico hp a b)).1 theorem left_lt_toIocMod (a b : α) : a < toIocMod hp a b := (Set.mem_Ioc.1 (toIocMod_mem_Ioc hp a b)).1 theorem toIcoMod_lt_right (a b : α) : toIcoMod hp a b < a + p := (Set.mem_Ico.1 (toIcoMod_mem_Ico hp a b)).2 theorem toIocMod_le_right (a b : α) : toIocMod hp a b ≤ a + p := (Set.mem_Ioc.1 (toIocMod_mem_Ioc hp a b)).2 @[simp] theorem self_sub_toIcoDiv_zsmul (a b : α) : b - toIcoDiv hp a b • p = toIcoMod hp a b := rfl @[simp] theorem self_sub_toIocDiv_zsmul (a b : α) : b - toIocDiv hp a b • p = toIocMod hp a b := rfl @[simp] theorem toIcoDiv_zsmul_sub_self (a b : α) : toIcoDiv hp a b • p - b = -toIcoMod hp a b := by rw [toIcoMod, neg_sub] @[simp] theorem toIocDiv_zsmul_sub_self (a b : α) : toIocDiv hp a b • p - b = -toIocMod hp a b := by rw [toIocMod, neg_sub] @[simp] theorem toIcoMod_sub_self (a b : α) : toIcoMod hp a b - b = -toIcoDiv hp a b • p := by rw [toIcoMod, sub_sub_cancel_left, neg_smul] @[simp] theorem toIocMod_sub_self (a b : α) : toIocMod hp a b - b = -toIocDiv hp a b • p := by rw [toIocMod, sub_sub_cancel_left, neg_smul] @[simp] theorem self_sub_toIcoMod (a b : α) : b - toIcoMod hp a b = toIcoDiv hp a b • p := by rw [toIcoMod, sub_sub_cancel] @[simp] theorem self_sub_toIocMod (a b : α) : b - toIocMod hp a b = toIocDiv hp a b • p := by rw [toIocMod, sub_sub_cancel] @[simp] theorem toIcoMod_add_toIcoDiv_zsmul (a b : α) : toIcoMod hp a b + toIcoDiv hp a b • p = b := by rw [toIcoMod, sub_add_cancel] @[simp] theorem toIocMod_add_toIocDiv_zsmul (a b : α) : toIocMod hp a b + toIocDiv hp a b • p = b := by rw [toIocMod, sub_add_cancel] @[simp] theorem toIcoDiv_zsmul_sub_toIcoMod (a b : α) : toIcoDiv hp a b • p + toIcoMod hp a b = b := by rw [add_comm, toIcoMod_add_toIcoDiv_zsmul] @[simp] theorem toIocDiv_zsmul_sub_toIocMod (a b : α) : toIocDiv hp a b • p + toIocMod hp a b = b := by rw [add_comm, toIocMod_add_toIocDiv_zsmul] theorem toIcoMod_eq_iff : toIcoMod hp a b = c ↔ c ∈ Set.Ico a (a + p) ∧ ∃ z : ℤ, b = c + z • p := by refine ⟨fun h => ⟨h ▸ toIcoMod_mem_Ico hp a b, toIcoDiv hp a b, h ▸ (toIcoMod_add_toIcoDiv_zsmul _ _ _).symm⟩, ?_⟩ simp_rw [← @sub_eq_iff_eq_add] rintro ⟨hc, n, rfl⟩ rw [← toIcoDiv_eq_of_sub_zsmul_mem_Ico hp hc, toIcoMod] theorem toIocMod_eq_iff : toIocMod hp a b = c ↔ c ∈ Set.Ioc a (a + p) ∧ ∃ z : ℤ, b = c + z • p := by refine ⟨fun h => ⟨h ▸ toIocMod_mem_Ioc hp a b, toIocDiv hp a b, h ▸ (toIocMod_add_toIocDiv_zsmul hp _ _).symm⟩, ?_⟩ simp_rw [← @sub_eq_iff_eq_add] rintro ⟨hc, n, rfl⟩ rw [← toIocDiv_eq_of_sub_zsmul_mem_Ioc hp hc, toIocMod] @[simp] theorem toIcoDiv_apply_left (a : α) : toIcoDiv hp a a = 0 := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simp [hp] @[simp] theorem toIocDiv_apply_left (a : α) : toIocDiv hp a a = -1 := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simp [hp] @[simp] theorem toIcoMod_apply_left (a : α) : toIcoMod hp a a = a := by rw [toIcoMod_eq_iff hp, Set.left_mem_Ico] exact ⟨lt_add_of_pos_right _ hp, 0, by simp⟩ @[simp] theorem toIocMod_apply_left (a : α) : toIocMod hp a a = a + p := by rw [toIocMod_eq_iff hp, Set.right_mem_Ioc] exact ⟨lt_add_of_pos_right _ hp, -1, by simp⟩ theorem toIcoDiv_apply_right (a : α) : toIcoDiv hp a (a + p) = 1 := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simp [hp] theorem toIocDiv_apply_right (a : α) : toIocDiv hp a (a + p) = 0 := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simp [hp] theorem toIcoMod_apply_right (a : α) : toIcoMod hp a (a + p) = a := by rw [toIcoMod_eq_iff hp, Set.left_mem_Ico] exact ⟨lt_add_of_pos_right _ hp, 1, by simp⟩ theorem toIocMod_apply_right (a : α) : toIocMod hp a (a + p) = a + p := by rw [toIocMod_eq_iff hp, Set.right_mem_Ioc] exact ⟨lt_add_of_pos_right _ hp, 0, by simp⟩ @[simp] theorem toIcoDiv_add_zsmul (a b : α) (m : ℤ) : toIcoDiv hp a (b + m • p) = toIcoDiv hp a b + m := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simpa only [add_smul, add_sub_add_right_eq_sub] using sub_toIcoDiv_zsmul_mem_Ico hp a b @[simp] theorem toIcoDiv_add_zsmul' (a b : α) (m : ℤ) : toIcoDiv hp (a + m • p) b = toIcoDiv hp a b - m := by refine toIcoDiv_eq_of_sub_zsmul_mem_Ico _ ?_ rw [sub_smul, ← sub_add, add_right_comm] simpa using sub_toIcoDiv_zsmul_mem_Ico hp a b @[simp] theorem toIocDiv_add_zsmul (a b : α) (m : ℤ) : toIocDiv hp a (b + m • p) = toIocDiv hp a b + m := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simpa only [add_smul, add_sub_add_right_eq_sub] using sub_toIocDiv_zsmul_mem_Ioc hp a b @[simp] theorem toIocDiv_add_zsmul' (a b : α) (m : ℤ) : toIocDiv hp (a + m • p) b = toIocDiv hp a b - m := by refine toIocDiv_eq_of_sub_zsmul_mem_Ioc _ ?_ rw [sub_smul, ← sub_add, add_right_comm] simpa using sub_toIocDiv_zsmul_mem_Ioc hp a b @[simp] theorem toIcoDiv_zsmul_add (a b : α) (m : ℤ) : toIcoDiv hp a (m • p + b) = m + toIcoDiv hp a b := by rw [add_comm, toIcoDiv_add_zsmul, add_comm] /-! Note we omit `toIcoDiv_zsmul_add'` as `-m + toIcoDiv hp a b` is not very convenient. -/ @[simp] theorem toIocDiv_zsmul_add (a b : α) (m : ℤ) : toIocDiv hp a (m • p + b) = m + toIocDiv hp a b := by rw [add_comm, toIocDiv_add_zsmul, add_comm] /-! Note we omit `toIocDiv_zsmul_add'` as `-m + toIocDiv hp a b` is not very convenient. -/ @[simp] theorem toIcoDiv_sub_zsmul (a b : α) (m : ℤ) : toIcoDiv hp a (b - m • p) = toIcoDiv hp a b - m := by rw [sub_eq_add_neg, ← neg_smul, toIcoDiv_add_zsmul, sub_eq_add_neg] @[simp] theorem toIcoDiv_sub_zsmul' (a b : α) (m : ℤ) : toIcoDiv hp (a - m • p) b = toIcoDiv hp a b + m := by rw [sub_eq_add_neg, ← neg_smul, toIcoDiv_add_zsmul', sub_neg_eq_add] @[simp] theorem toIocDiv_sub_zsmul (a b : α) (m : ℤ) : toIocDiv hp a (b - m • p) = toIocDiv hp a b - m := by rw [sub_eq_add_neg, ← neg_smul, toIocDiv_add_zsmul, sub_eq_add_neg] @[simp] theorem toIocDiv_sub_zsmul' (a b : α) (m : ℤ) : toIocDiv hp (a - m • p) b = toIocDiv hp a b + m := by rw [sub_eq_add_neg, ← neg_smul, toIocDiv_add_zsmul', sub_neg_eq_add] @[simp] theorem toIcoDiv_add_right (a b : α) : toIcoDiv hp a (b + p) = toIcoDiv hp a b + 1 := by simpa only [one_zsmul] using toIcoDiv_add_zsmul hp a b 1 @[simp] theorem toIcoDiv_add_right' (a b : α) : toIcoDiv hp (a + p) b = toIcoDiv hp a b - 1 := by simpa only [one_zsmul] using toIcoDiv_add_zsmul' hp a b 1 @[simp] theorem toIocDiv_add_right (a b : α) : toIocDiv hp a (b + p) = toIocDiv hp a b + 1 := by simpa only [one_zsmul] using toIocDiv_add_zsmul hp a b 1 @[simp] theorem toIocDiv_add_right' (a b : α) : toIocDiv hp (a + p) b = toIocDiv hp a b - 1 := by simpa only [one_zsmul] using toIocDiv_add_zsmul' hp a b 1 @[simp] theorem toIcoDiv_add_left (a b : α) : toIcoDiv hp a (p + b) = toIcoDiv hp a b + 1 := by rw [add_comm, toIcoDiv_add_right] @[simp] theorem toIcoDiv_add_left' (a b : α) : toIcoDiv hp (p + a) b = toIcoDiv hp a b - 1 := by rw [add_comm, toIcoDiv_add_right'] @[simp] theorem toIocDiv_add_left (a b : α) : toIocDiv hp a (p + b) = toIocDiv hp a b + 1 := by rw [add_comm, toIocDiv_add_right] @[simp] theorem toIocDiv_add_left' (a b : α) : toIocDiv hp (p + a) b = toIocDiv hp a b - 1 := by rw [add_comm, toIocDiv_add_right'] @[simp] theorem toIcoDiv_sub (a b : α) : toIcoDiv hp a (b - p) = toIcoDiv hp a b - 1 := by simpa only [one_zsmul] using toIcoDiv_sub_zsmul hp a b 1 @[simp] theorem toIcoDiv_sub' (a b : α) : toIcoDiv hp (a - p) b = toIcoDiv hp a b + 1 := by simpa only [one_zsmul] using toIcoDiv_sub_zsmul' hp a b 1 @[simp] theorem toIocDiv_sub (a b : α) : toIocDiv hp a (b - p) = toIocDiv hp a b - 1 := by simpa only [one_zsmul] using toIocDiv_sub_zsmul hp a b 1 @[simp] theorem toIocDiv_sub' (a b : α) : toIocDiv hp (a - p) b = toIocDiv hp a b + 1 := by simpa only [one_zsmul] using toIocDiv_sub_zsmul' hp a b 1 theorem toIcoDiv_sub_eq_toIcoDiv_add (a b c : α) : toIcoDiv hp a (b - c) = toIcoDiv hp (a + c) b := by apply toIcoDiv_eq_of_sub_zsmul_mem_Ico rw [← sub_right_comm, Set.sub_mem_Ico_iff_left, add_right_comm] exact sub_toIcoDiv_zsmul_mem_Ico hp (a + c) b theorem toIocDiv_sub_eq_toIocDiv_add (a b c : α) : toIocDiv hp a (b - c) = toIocDiv hp (a + c) b := by apply toIocDiv_eq_of_sub_zsmul_mem_Ioc rw [← sub_right_comm, Set.sub_mem_Ioc_iff_left, add_right_comm] exact sub_toIocDiv_zsmul_mem_Ioc hp (a + c) b theorem toIcoDiv_sub_eq_toIcoDiv_add' (a b c : α) : toIcoDiv hp (a - c) b = toIcoDiv hp a (b + c) := by rw [← sub_neg_eq_add, toIcoDiv_sub_eq_toIcoDiv_add, sub_eq_add_neg] theorem toIocDiv_sub_eq_toIocDiv_add' (a b c : α) : toIocDiv hp (a - c) b = toIocDiv hp a (b + c) := by rw [← sub_neg_eq_add, toIocDiv_sub_eq_toIocDiv_add, sub_eq_add_neg] theorem toIcoDiv_neg (a b : α) : toIcoDiv hp a (-b) = -(toIocDiv hp (-a) b + 1) := by suffices toIcoDiv hp a (-b) = -toIocDiv hp (-(a + p)) b by rwa [neg_add, ← sub_eq_add_neg, toIocDiv_sub_eq_toIocDiv_add', toIocDiv_add_right] at this rw [← neg_eq_iff_eq_neg, eq_comm] apply toIocDiv_eq_of_sub_zsmul_mem_Ioc obtain ⟨hc, ho⟩ := sub_toIcoDiv_zsmul_mem_Ico hp a (-b) rw [← neg_lt_neg_iff, neg_sub' (-b), neg_neg, ← neg_smul] at ho rw [← neg_le_neg_iff, neg_sub' (-b), neg_neg, ← neg_smul] at hc refine ⟨ho, hc.trans_eq ?_⟩ rw [neg_add, neg_add_cancel_right] theorem toIcoDiv_neg' (a b : α) : toIcoDiv hp (-a) b = -(toIocDiv hp a (-b) + 1) := by simpa only [neg_neg] using toIcoDiv_neg hp (-a) (-b) theorem toIocDiv_neg (a b : α) : toIocDiv hp a (-b) = -(toIcoDiv hp (-a) b + 1) := by rw [← neg_neg b, toIcoDiv_neg, neg_neg, neg_neg, neg_add', neg_neg, add_sub_cancel_right] theorem toIocDiv_neg' (a b : α) : toIocDiv hp (-a) b = -(toIcoDiv hp a (-b) + 1) := by simpa only [neg_neg] using toIocDiv_neg hp (-a) (-b) @[simp] theorem toIcoMod_add_zsmul (a b : α) (m : ℤ) : toIcoMod hp a (b + m • p) = toIcoMod hp a b := by rw [toIcoMod, toIcoDiv_add_zsmul, toIcoMod, add_smul] abel @[simp] theorem toIcoMod_add_zsmul' (a b : α) (m : ℤ) : toIcoMod hp (a + m • p) b = toIcoMod hp a b + m • p := by simp only [toIcoMod, toIcoDiv_add_zsmul', sub_smul, sub_add] @[simp] theorem toIocMod_add_zsmul (a b : α) (m : ℤ) : toIocMod hp a (b + m • p) = toIocMod hp a b := by rw [toIocMod, toIocDiv_add_zsmul, toIocMod, add_smul] abel @[simp] theorem toIocMod_add_zsmul' (a b : α) (m : ℤ) : toIocMod hp (a + m • p) b = toIocMod hp a b + m • p := by simp only [toIocMod, toIocDiv_add_zsmul', sub_smul, sub_add] @[simp] theorem toIcoMod_zsmul_add (a b : α) (m : ℤ) : toIcoMod hp a (m • p + b) = toIcoMod hp a b := by rw [add_comm, toIcoMod_add_zsmul] @[simp] theorem toIcoMod_zsmul_add' (a b : α) (m : ℤ) : toIcoMod hp (m • p + a) b = m • p + toIcoMod hp a b := by rw [add_comm, toIcoMod_add_zsmul', add_comm] @[simp] theorem toIocMod_zsmul_add (a b : α) (m : ℤ) : toIocMod hp a (m • p + b) = toIocMod hp a b := by rw [add_comm, toIocMod_add_zsmul] @[simp] theorem toIocMod_zsmul_add' (a b : α) (m : ℤ) : toIocMod hp (m • p + a) b = m • p + toIocMod hp a b := by rw [add_comm, toIocMod_add_zsmul', add_comm] @[simp] theorem toIcoMod_sub_zsmul (a b : α) (m : ℤ) : toIcoMod hp a (b - m • p) = toIcoMod hp a b := by rw [sub_eq_add_neg, ← neg_smul, toIcoMod_add_zsmul] @[simp] theorem toIcoMod_sub_zsmul' (a b : α) (m : ℤ) : toIcoMod hp (a - m • p) b = toIcoMod hp a b - m • p := by simp_rw [sub_eq_add_neg, ← neg_smul, toIcoMod_add_zsmul'] @[simp] theorem toIocMod_sub_zsmul (a b : α) (m : ℤ) : toIocMod hp a (b - m • p) = toIocMod hp a b := by rw [sub_eq_add_neg, ← neg_smul, toIocMod_add_zsmul] @[simp] theorem toIocMod_sub_zsmul' (a b : α) (m : ℤ) : toIocMod hp (a - m • p) b = toIocMod hp a b - m • p := by simp_rw [sub_eq_add_neg, ← neg_smul, toIocMod_add_zsmul'] @[simp] theorem toIcoMod_add_right (a b : α) : toIcoMod hp a (b + p) = toIcoMod hp a b := by simpa only [one_zsmul] using toIcoMod_add_zsmul hp a b 1 @[simp] theorem toIcoMod_add_right' (a b : α) : toIcoMod hp (a + p) b = toIcoMod hp a b + p := by simpa only [one_zsmul] using toIcoMod_add_zsmul' hp a b 1 @[simp] theorem toIocMod_add_right (a b : α) : toIocMod hp a (b + p) = toIocMod hp a b := by simpa only [one_zsmul] using toIocMod_add_zsmul hp a b 1 @[simp] theorem toIocMod_add_right' (a b : α) : toIocMod hp (a + p) b = toIocMod hp a b + p := by simpa only [one_zsmul] using toIocMod_add_zsmul' hp a b 1 @[simp] theorem toIcoMod_add_left (a b : α) : toIcoMod hp a (p + b) = toIcoMod hp a b := by rw [add_comm, toIcoMod_add_right] @[simp] theorem toIcoMod_add_left' (a b : α) : toIcoMod hp (p + a) b = p + toIcoMod hp a b := by rw [add_comm, toIcoMod_add_right', add_comm] @[simp] theorem toIocMod_add_left (a b : α) : toIocMod hp a (p + b) = toIocMod hp a b := by rw [add_comm, toIocMod_add_right] @[simp] theorem toIocMod_add_left' (a b : α) : toIocMod hp (p + a) b = p + toIocMod hp a b := by rw [add_comm, toIocMod_add_right', add_comm] @[simp] theorem toIcoMod_sub (a b : α) : toIcoMod hp a (b - p) = toIcoMod hp a b := by simpa only [one_zsmul] using toIcoMod_sub_zsmul hp a b 1 @[simp] theorem toIcoMod_sub' (a b : α) : toIcoMod hp (a - p) b = toIcoMod hp a b - p := by simpa only [one_zsmul] using toIcoMod_sub_zsmul' hp a b 1 @[simp] theorem toIocMod_sub (a b : α) : toIocMod hp a (b - p) = toIocMod hp a b := by simpa only [one_zsmul] using toIocMod_sub_zsmul hp a b 1 @[simp] theorem toIocMod_sub' (a b : α) : toIocMod hp (a - p) b = toIocMod hp a b - p := by simpa only [one_zsmul] using toIocMod_sub_zsmul' hp a b 1 theorem toIcoMod_sub_eq_sub (a b c : α) : toIcoMod hp a (b - c) = toIcoMod hp (a + c) b - c := by simp_rw [toIcoMod, toIcoDiv_sub_eq_toIcoDiv_add, sub_right_comm] theorem toIocMod_sub_eq_sub (a b c : α) : toIocMod hp a (b - c) = toIocMod hp (a + c) b - c := by simp_rw [toIocMod, toIocDiv_sub_eq_toIocDiv_add, sub_right_comm] theorem toIcoMod_add_right_eq_add (a b c : α) : toIcoMod hp a (b + c) = toIcoMod hp (a - c) b + c := by simp_rw [toIcoMod, toIcoDiv_sub_eq_toIcoDiv_add', sub_add_eq_add_sub] theorem toIocMod_add_right_eq_add (a b c : α) : toIocMod hp a (b + c) = toIocMod hp (a - c) b + c := by simp_rw [toIocMod, toIocDiv_sub_eq_toIocDiv_add', sub_add_eq_add_sub] theorem toIcoMod_neg (a b : α) : toIcoMod hp a (-b) = p - toIocMod hp (-a) b := by simp_rw [toIcoMod, toIocMod, toIcoDiv_neg, neg_smul, add_smul] abel theorem toIcoMod_neg' (a b : α) : toIcoMod hp (-a) b = p - toIocMod hp a (-b) := by simpa only [neg_neg] using toIcoMod_neg hp (-a) (-b) theorem toIocMod_neg (a b : α) : toIocMod hp a (-b) = p - toIcoMod hp (-a) b := by simp_rw [toIocMod, toIcoMod, toIocDiv_neg, neg_smul, add_smul] abel theorem toIocMod_neg' (a b : α) : toIocMod hp (-a) b = p - toIcoMod hp a (-b) := by simpa only [neg_neg] using toIocMod_neg hp (-a) (-b) theorem toIcoMod_eq_toIcoMod : toIcoMod hp a b = toIcoMod hp a c ↔ ∃ n : ℤ, c - b = n • p := by refine ⟨fun h => ⟨toIcoDiv hp a c - toIcoDiv hp a b, ?_⟩, fun h => ?_⟩ · conv_lhs => rw [← toIcoMod_add_toIcoDiv_zsmul hp a b, ← toIcoMod_add_toIcoDiv_zsmul hp a c] rw [h, sub_smul] abel · rcases h with ⟨z, hz⟩ rw [sub_eq_iff_eq_add] at hz rw [hz, toIcoMod_zsmul_add] theorem toIocMod_eq_toIocMod : toIocMod hp a b = toIocMod hp a c ↔ ∃ n : ℤ, c - b = n • p := by refine ⟨fun h => ⟨toIocDiv hp a c - toIocDiv hp a b, ?_⟩, fun h => ?_⟩ · conv_lhs => rw [← toIocMod_add_toIocDiv_zsmul hp a b, ← toIocMod_add_toIocDiv_zsmul hp a c] rw [h, sub_smul] abel · rcases h with ⟨z, hz⟩ rw [sub_eq_iff_eq_add] at hz rw [hz, toIocMod_zsmul_add] /-! ### Links between the `Ico` and `Ioc` variants applied to the same element -/ section IcoIoc namespace AddCommGroup theorem modEq_iff_toIcoMod_eq_left : a ≡ b [PMOD p] ↔ toIcoMod hp a b = a := modEq_iff_eq_add_zsmul.trans ⟨by rintro ⟨n, rfl⟩ rw [toIcoMod_add_zsmul, toIcoMod_apply_left], fun h => ⟨toIcoDiv hp a b, eq_add_of_sub_eq h⟩⟩ theorem modEq_iff_toIocMod_eq_right : a ≡ b [PMOD p] ↔ toIocMod hp a b = a + p := by refine modEq_iff_eq_add_zsmul.trans ⟨?_, fun h => ⟨toIocDiv hp a b + 1, ?_⟩⟩ · rintro ⟨z, rfl⟩ rw [toIocMod_add_zsmul, toIocMod_apply_left] · rwa [add_one_zsmul, add_left_comm, ← sub_eq_iff_eq_add'] alias ⟨ModEq.toIcoMod_eq_left, _⟩ := modEq_iff_toIcoMod_eq_left alias ⟨ModEq.toIcoMod_eq_right, _⟩ := modEq_iff_toIocMod_eq_right variable (a b) open List in theorem tfae_modEq : TFAE [a ≡ b [PMOD p], ∀ z : ℤ, b - z • p ∉ Set.Ioo a (a + p), toIcoMod hp a b ≠ toIocMod hp a b, toIcoMod hp a b + p = toIocMod hp a b] := by rw [modEq_iff_toIcoMod_eq_left hp] tfae_have 3 → 2 := by rw [← not_exists, not_imp_not] exact fun ⟨i, hi⟩ => ((toIcoMod_eq_iff hp).2 ⟨Set.Ioo_subset_Ico_self hi, i, (sub_add_cancel b _).symm⟩).trans ((toIocMod_eq_iff hp).2 ⟨Set.Ioo_subset_Ioc_self hi, i, (sub_add_cancel b _).symm⟩).symm tfae_have 4 → 3 \| h => by rw [← h, Ne, eq_comm, add_eq_left] exact hp.ne' tfae_have 1 → 4 \| h => by rw [h, eq_comm, toIocMod_eq_iff, Set.right_mem_Ioc] refine ⟨lt_add_of_pos_right a hp, toIcoDiv hp a b - 1, ?_⟩ rw [sub_one_zsmul, add_add_add_comm, add_neg_cancel, add_zero] conv_lhs => rw [← toIcoMod_add_toIcoDiv_zsmul hp a b, h] tfae_have 2 → 1 := by rw [← not_exists, not_imp_comm] have h' := toIcoMod_mem_Ico hp a b exact fun h => ⟨_, h'.1.lt_of_ne' h, h'.2⟩ tfae_finish variable {a b} theorem modEq_iff_not_forall_mem_Ioo_mod : a ≡ b [PMOD p] ↔ ∀ z : ℤ, b - z • p ∉ Set.Ioo a (a + p) := (tfae_modEq hp a b).out 0 1 theorem modEq_iff_toIcoMod_ne_toIocMod : a ≡ b [PMOD p] ↔ toIcoMod hp a b ≠ toIocMod hp a b := (tfae_modEq hp a b).out 0 2 theorem modEq_iff_toIcoMod_add_period_eq_toIocMod : a ≡ b [PMOD p] ↔ toIcoMod hp a b + p = toIocMod hp a b := (tfae_modEq hp a b).out 0 3 theorem not_modEq_iff_toIcoMod_eq_toIocMod : ¬a ≡ b [PMOD p] ↔ toIcoMod hp a b = toIocMod hp a b := (modEq_iff_toIcoMod_ne_toIocMod _).not_left theorem not_modEq_iff_toIcoDiv_eq_toIocDiv : ¬a ≡ b [PMOD p] ↔ toIcoDiv hp a b = toIocDiv hp a b := by rw [not_modEq_iff_toIcoMod_eq_toIocMod hp, toIcoMod, toIocMod, sub_right_inj, zsmul_left_inj hp] theorem modEq_iff_toIcoDiv_eq_toIocDiv_add_one : a ≡ b [PMOD p] ↔ toIcoDiv hp a b = toIocDiv hp a b + 1 := by rw [modEq_iff_toIcoMod_add_period_eq_toIocMod hp, toIcoMod, toIocMod, ← eq_sub_iff_add_eq, sub_sub, sub_right_inj, ← add_one_zsmul, zsmul_left_inj hp]	end AddCommGroup	Mathlib/Algebra/Order/ToIntervalMod.lean	566	567
/- Copyright (c) 2019 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn, Yury Kudryashov, Sébastien Gouëzel, Chris Hughes -/ import Mathlib.Data.Fin.Rev import Mathlib.Data.Nat.Find /-! # Operation on tuples We interpret maps `∀ i : Fin n, α i` as `n`-tuples of elements of possibly varying type `α i`, `(α 0, …, α (n-1))`. A particular case is `Fin n → α` of elements with all the same type. In this case when `α i` is a constant map, then tuples are isomorphic (but not definitionally equal) to `Vector`s. ## Main declarations There are three (main) ways to consider `Fin n` as a subtype of `Fin (n + 1)`, hence three (main) ways to move between tuples of length `n` and of length `n + 1` by adding/removing an entry. ### Adding at the start * `Fin.succ`: Send `i : Fin n` to `i + 1 : Fin (n + 1)`. This is defined in Core. * `Fin.cases`: Induction/recursion principle for `Fin`: To prove a property/define a function for all `Fin (n + 1)`, it is enough to prove/define it for `0` and for `i.succ` for all `i : Fin n`. This is defined in Core. * `Fin.cons`: Turn a tuple `f : Fin n → α` and an entry `a : α` into a tuple `Fin.cons a f : Fin (n + 1) → α` by adding `a` at the start. In general, tuples can be dependent functions, in which case `f : ∀ i : Fin n, α i.succ` and `a : α 0`. This is a special case of `Fin.cases`. * `Fin.tail`: Turn a tuple `f : Fin (n + 1) → α` into a tuple `Fin.tail f : Fin n → α` by forgetting the start. In general, tuples can be dependent functions, in which case `Fin.tail f : ∀ i : Fin n, α i.succ`. ### Adding at the end * `Fin.castSucc`: Send `i : Fin n` to `i : Fin (n + 1)`. This is defined in Core. * `Fin.lastCases`: Induction/recursion principle for `Fin`: To prove a property/define a function for all `Fin (n + 1)`, it is enough to prove/define it for `last n` and for `i.castSucc` for all `i : Fin n`. This is defined in Core. * `Fin.snoc`: Turn a tuple `f : Fin n → α` and an entry `a : α` into a tuple `Fin.snoc f a : Fin (n + 1) → α` by adding `a` at the end. In general, tuples can be dependent functions, in which case `f : ∀ i : Fin n, α i.castSucc` and `a : α (last n)`. This is a special case of `Fin.lastCases`. * `Fin.init`: Turn a tuple `f : Fin (n + 1) → α` into a tuple `Fin.init f : Fin n → α` by forgetting the start. In general, tuples can be dependent functions, in which case `Fin.init f : ∀ i : Fin n, α i.castSucc`. ### Adding in the middle For a pivot `p : Fin (n + 1)`, * `Fin.succAbove`: Send `i : Fin n` to * `i : Fin (n + 1)` if `i < p`, * `i + 1 : Fin (n + 1)` if `p ≤ i`. * `Fin.succAboveCases`: Induction/recursion principle for `Fin`: To prove a property/define a function for all `Fin (n + 1)`, it is enough to prove/define it for `p` and for `p.succAbove i` for all `i : Fin n`. * `Fin.insertNth`: Turn a tuple `f : Fin n → α` and an entry `a : α` into a tuple `Fin.insertNth f a : Fin (n + 1) → α` by adding `a` in position `p`. In general, tuples can be dependent functions, in which case `f : ∀ i : Fin n, α (p.succAbove i)` and `a : α p`. This is a special case of `Fin.succAboveCases`. * `Fin.removeNth`: Turn a tuple `f : Fin (n + 1) → α` into a tuple `Fin.removeNth p f : Fin n → α` by forgetting the `p`-th value. In general, tuples can be dependent functions, in which case `Fin.removeNth f : ∀ i : Fin n, α (succAbove p i)`. `p = 0` means we add at the start. `p = last n` means we add at the end. ### Miscellaneous * `Fin.find p` : returns the first index `n` where `p n` is satisfied, and `none` if it is never satisfied. * `Fin.append a b` : append two tuples. * `Fin.repeat n a` : repeat a tuple `n` times. -/ assert_not_exists Monoid universe u v namespace Fin variable {m n : ℕ} open Function section Tuple /-- There is exactly one tuple of size zero. -/ example (α : Fin 0 → Sort u) : Unique (∀ i : Fin 0, α i) := by infer_instance theorem tuple0_le {α : Fin 0 → Type} [∀ i, Preorder (α i)] (f g : ∀ i, α i) : f ≤ g := finZeroElim variable {α : Fin (n + 1) → Sort u} (x : α 0) (q : ∀ i, α i) (p : ∀ i : Fin n, α i.succ) (i : Fin n) (y : α i.succ) (z : α 0) /-- The tail of an `n+1` tuple, i.e., its last `n` entries. -/ def tail (q : ∀ i, α i) : ∀ i : Fin n, α i.succ := fun i ↦ q i.succ theorem tail_def {n : ℕ} {α : Fin (n + 1) → Sort} {q : ∀ i, α i} : (tail fun k : Fin (n + 1) ↦ q k) = fun k : Fin n ↦ q k.succ := rfl /-- Adding an element at the beginning of an `n`-tuple, to get an `n+1`-tuple. -/ def cons (x : α 0) (p : ∀ i : Fin n, α i.succ) : ∀ i, α i := fun j ↦ Fin.cases x p j @[simp] theorem tail_cons : tail (cons x p) = p := by simp +unfoldPartialApp [tail, cons] @[simp] theorem cons_succ : cons x p i.succ = p i := by simp [cons] @[simp] theorem cons_zero : cons x p 0 = x := by simp [cons] @[simp] theorem cons_one {α : Fin (n + 2) → Sort} (x : α 0) (p : ∀ i : Fin n.succ, α i.succ) : cons x p 1 = p 0 := by rw [← cons_succ x p]; rfl /-- Updating a tuple and adding an element at the beginning commute. -/ @[simp] theorem cons_update : cons x (update p i y) = update (cons x p) i.succ y := by ext j by_cases h : j = 0 · rw [h] simp [Ne.symm (succ_ne_zero i)] · let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ] by_cases h' : j' = i · rw [h'] simp · have : j'.succ ≠ i.succ := by rwa [Ne, succ_inj] rw [update_of_ne h', update_of_ne this, cons_succ] /-- As a binary function, `Fin.cons` is injective. -/ theorem cons_injective2 : Function.Injective2 (@cons n α) := fun x₀ y₀ x y h ↦ ⟨congr_fun h 0, funext fun i ↦ by simpa using congr_fun h (Fin.succ i)⟩ @[simp] theorem cons_inj {x₀ y₀ : α 0} {x y : ∀ i : Fin n, α i.succ} : cons x₀ x = cons y₀ y ↔ x₀ = y₀ ∧ x = y := cons_injective2.eq_iff theorem cons_left_injective (x : ∀ i : Fin n, α i.succ) : Function.Injective fun x₀ ↦ cons x₀ x := cons_injective2.left _ theorem cons_right_injective (x₀ : α 0) : Function.Injective (cons x₀) := cons_injective2.right _ /-- Adding an element at the beginning of a tuple and then updating it amounts to adding it directly. -/ theorem update_cons_zero : update (cons x p) 0 z = cons z p := by ext j by_cases h : j = 0 · rw [h] simp · simp only [h, update_of_ne, Ne, not_false_iff] let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ, cons_succ] /-- Concatenating the first element of a tuple with its tail gives back the original tuple -/ @[simp] theorem cons_self_tail : cons (q 0) (tail q) = q := by ext j by_cases h : j = 0 · rw [h] simp · let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this] unfold tail rw [cons_succ] /-- Equivalence between tuples of length `n + 1` and pairs of an element and a tuple of length `n` given by separating out the first element of the tuple. This is `Fin.cons` as an `Equiv`. -/ @[simps] def consEquiv (α : Fin (n + 1) → Type) : α 0 × (∀ i, α (succ i)) ≃ ∀ i, α i where toFun f := cons f.1 f.2 invFun f := (f 0, tail f) left_inv f := by simp right_inv f := by simp /-- Recurse on an `n+1`-tuple by splitting it into a single element and an `n`-tuple. -/ @[elab_as_elim] def consCases {P : (∀ i : Fin n.succ, α i) → Sort v} (h : ∀ x₀ x, P (Fin.cons x₀ x)) (x : ∀ i : Fin n.succ, α i) : P x := _root_.cast (by rw [cons_self_tail]) <\| h (x 0) (tail x) @[simp] theorem consCases_cons {P : (∀ i : Fin n.succ, α i) → Sort v} (h : ∀ x₀ x, P (Fin.cons x₀ x)) (x₀ : α 0) (x : ∀ i : Fin n, α i.succ) : @consCases _ _ _ h (cons x₀ x) = h x₀ x := by rw [consCases, cast_eq] congr /-- Recurse on a tuple by splitting into `Fin.elim0` and `Fin.cons`. -/ @[elab_as_elim]	def consInduction {α : Sort*} {P : ∀ {n : ℕ}, (Fin n → α) → Sort v} (h0 : P Fin.elim0) (h : ∀ {n} (x₀) (x : Fin n → α), P x → P (Fin.cons x₀ x)) : ∀ {n : ℕ} (x : Fin n → α), P x \| 0, x => by convert h0 \| _ + 1, x => consCases (fun _ _ ↦ h _ _ <\| consInduction h0 h _) x	Mathlib/Data/Fin/Tuple/Basic.lean	206	209
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Simon Hudon, Mario Carneiro -/ import Aesop import Mathlib.Algebra.Group.Defs import Mathlib.Data.Nat.Init import Mathlib.Data.Int.Init import Mathlib.Logic.Function.Iterate import Mathlib.Tactic.SimpRw import Mathlib.Tactic.SplitIfs /-! # Basic lemmas about semigroups, monoids, and groups This file lists various basic lemmas about semigroups, monoids, and groups. Most proofs are one-liners from the corresponding axioms. For the definitions of semigroups, monoids and groups, see `Algebra/Group/Defs.lean`. -/ assert_not_exists MonoidWithZero DenselyOrdered open Function variable {α β G M : Type} section ite variable [Pow α β] @[to_additive (attr := simp) dite_smul] lemma pow_dite (p : Prop) [Decidable p] (a : α) (b : p → β) (c : ¬ p → β) : a ^ (if h : p then b h else c h) = if h : p then a ^ b h else a ^ c h := by split_ifs <;> rfl @[to_additive (attr := simp) smul_dite] lemma dite_pow (p : Prop) [Decidable p] (a : p → α) (b : ¬ p → α) (c : β) : (if h : p then a h else b h) ^ c = if h : p then a h ^ c else b h ^ c := by split_ifs <;> rfl @[to_additive (attr := simp) ite_smul] lemma pow_ite (p : Prop) [Decidable p] (a : α) (b c : β) : a ^ (if p then b else c) = if p then a ^ b else a ^ c := pow_dite _ _ _ _ @[to_additive (attr := simp) smul_ite] lemma ite_pow (p : Prop) [Decidable p] (a b : α) (c : β) : (if p then a else b) ^ c = if p then a ^ c else b ^ c := dite_pow _ _ _ _ set_option linter.existingAttributeWarning false in attribute [to_additive (attr := simp)] dite_smul smul_dite ite_smul smul_ite end ite section Semigroup variable [Semigroup α] @[to_additive] instance Semigroup.to_isAssociative : Std.Associative (α := α) (· ·) := ⟨mul_assoc⟩ /-- Composing two multiplications on the left by `y` then `x` is equal to a multiplication on the left by `x * y`. -/ @[to_additive (attr := simp) "Composing two additions on the left by `y` then `x` is equal to an addition on the left by `x + y`."] theorem comp_mul_left (x y : α) : (x * ·) ∘ (y * ·) = (x * y * ·) := by ext z simp [mul_assoc] /-- Composing two multiplications on the right by `y` and `x` is equal to a multiplication on the right by `y * x`. -/ @[to_additive (attr := simp) "Composing two additions on the right by `y` and `x` is equal to an addition on the right by `y + x`."] theorem comp_mul_right (x y : α) : (· * x) ∘ (· * y) = (· * (y * x)) := by ext z simp [mul_assoc] end Semigroup @[to_additive] instance CommMagma.to_isCommutative [CommMagma G] : Std.Commutative (α := G) (· * ·) := ⟨mul_comm⟩ section MulOneClass variable [MulOneClass M] @[to_additive] theorem ite_mul_one {P : Prop} [Decidable P] {a b : M} : ite P (a * b) 1 = ite P a 1 * ite P b 1 := by by_cases h : P <;> simp [h] @[to_additive] theorem ite_one_mul {P : Prop} [Decidable P] {a b : M} : ite P 1 (a * b) = ite P 1 a * ite P 1 b := by by_cases h : P <;> simp [h] @[to_additive] theorem eq_one_iff_eq_one_of_mul_eq_one {a b : M} (h : a * b = 1) : a = 1 ↔ b = 1 := by constructor <;> (rintro rfl; simpa using h) @[to_additive] theorem one_mul_eq_id : ((1 : M) * ·) = id := funext one_mul @[to_additive] theorem mul_one_eq_id : (· * (1 : M)) = id := funext mul_one end MulOneClass section CommSemigroup variable [CommSemigroup G] @[to_additive] theorem mul_left_comm (a b c : G) : a * (b * c) = b * (a * c) := by rw [← mul_assoc, mul_comm a, mul_assoc] @[to_additive] theorem mul_right_comm (a b c : G) : a * b * c = a * c * b := by rw [mul_assoc, mul_comm b, mul_assoc] @[to_additive] theorem mul_mul_mul_comm (a b c d : G) : a * b * (c * d) = a * c * (b * d) := by simp only [mul_left_comm, mul_assoc] @[to_additive] theorem mul_rotate (a b c : G) : a * b * c = b * c * a := by simp only [mul_left_comm, mul_comm] @[to_additive] theorem mul_rotate' (a b c : G) : a * (b * c) = b * (c * a) := by simp only [mul_left_comm, mul_comm] end CommSemigroup attribute [local simp] mul_assoc sub_eq_add_neg section Monoid variable [Monoid M] {a b : M} {m n : ℕ} @[to_additive boole_nsmul] lemma pow_boole (P : Prop) [Decidable P] (a : M) : (a ^ if P then 1 else 0) = if P then a else 1 := by simp only [pow_ite, pow_one, pow_zero] @[to_additive nsmul_add_sub_nsmul] lemma pow_mul_pow_sub (a : M) (h : m ≤ n) : a ^ m * a ^ (n - m) = a ^ n := by rw [← pow_add, Nat.add_comm, Nat.sub_add_cancel h] @[to_additive sub_nsmul_nsmul_add] lemma pow_sub_mul_pow (a : M) (h : m ≤ n) : a ^ (n - m) * a ^ m = a ^ n := by rw [← pow_add, Nat.sub_add_cancel h] @[to_additive sub_one_nsmul_add] lemma mul_pow_sub_one (hn : n ≠ 0) (a : M) : a * a ^ (n - 1) = a ^ n := by rw [← pow_succ', Nat.sub_add_cancel <\| Nat.one_le_iff_ne_zero.2 hn] @[to_additive add_sub_one_nsmul] lemma pow_sub_one_mul (hn : n ≠ 0) (a : M) : a ^ (n - 1) * a = a ^ n := by rw [← pow_succ, Nat.sub_add_cancel <\| Nat.one_le_iff_ne_zero.2 hn] /-- If `x ^ n = 1`, then `x ^ m` is the same as `x ^ (m % n)` -/ @[to_additive nsmul_eq_mod_nsmul "If `n • x = 0`, then `m • x` is the same as `(m % n) • x`"] lemma pow_eq_pow_mod (m : ℕ) (ha : a ^ n = 1) : a ^ m = a ^ (m % n) := by calc a ^ m = a ^ (m % n + n * (m / n)) := by rw [Nat.mod_add_div] _ = a ^ (m % n) := by simp [pow_add, pow_mul, ha] @[to_additive] lemma pow_mul_pow_eq_one : ∀ n, a * b = 1 → a ^ n * b ^ n = 1 \| 0, _ => by simp \| n + 1, h => calc a ^ n.succ * b ^ n.succ = a ^ n * a * (b * b ^ n) := by rw [pow_succ, pow_succ'] _ = a ^ n * (a * b) * b ^ n := by simp only [mul_assoc] _ = 1 := by simp [h, pow_mul_pow_eq_one] @[to_additive (attr := simp)] lemma mul_left_iterate (a : M) : ∀ n : ℕ, (a * ·)^[n] = (a ^ n * ·) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_succ, mul_left_iterate] @[to_additive (attr := simp)] lemma mul_right_iterate (a : M) : ∀ n : ℕ, (· * a)^[n] = (· * a ^ n) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_succ', mul_right_iterate] @[to_additive] lemma mul_left_iterate_apply_one (a : M) : (a * ·)^[n] 1 = a ^ n := by simp [mul_right_iterate] @[to_additive] lemma mul_right_iterate_apply_one (a : M) : (· * a)^[n] 1 = a ^ n := by simp [mul_right_iterate] @[to_additive (attr := simp)] lemma pow_iterate (k : ℕ) : ∀ n : ℕ, (fun x : M ↦ x ^ k)^[n] = (· ^ k ^ n) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_iterate, Nat.pow_succ', pow_mul] end Monoid section CommMonoid variable [CommMonoid M] {x y z : M} @[to_additive] theorem inv_unique (hy : x * y = 1) (hz : x * z = 1) : y = z := left_inv_eq_right_inv (Trans.trans (mul_comm _ _) hy) hz @[to_additive nsmul_add] lemma mul_pow (a b : M) : ∀ n, (a * b) ^ n = a ^ n * b ^ n \| 0 => by rw [pow_zero, pow_zero, pow_zero, one_mul] \| n + 1 => by rw [pow_succ', pow_succ', pow_succ', mul_pow, mul_mul_mul_comm] end CommMonoid section LeftCancelMonoid variable [Monoid M] [IsLeftCancelMul M] {a b : M} @[to_additive (attr := simp)] theorem mul_eq_left : a * b = a ↔ b = 1 := calc a * b = a ↔ a * b = a * 1 := by rw [mul_one] _ ↔ b = 1 := mul_left_cancel_iff @[deprecated (since := "2025-03-05")] alias mul_right_eq_self := mul_eq_left @[deprecated (since := "2025-03-05")] alias add_right_eq_self := add_eq_left set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_right_eq_self @[to_additive (attr := simp)] theorem left_eq_mul : a = a * b ↔ b = 1 := eq_comm.trans mul_eq_left @[deprecated (since := "2025-03-05")] alias self_eq_mul_right := left_eq_mul @[deprecated (since := "2025-03-05")] alias self_eq_add_right := left_eq_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_eq_mul_right @[to_additive] theorem mul_ne_left : a * b ≠ a ↔ b ≠ 1 := mul_eq_left.not @[deprecated (since := "2025-03-05")] alias mul_right_ne_self := mul_ne_left @[deprecated (since := "2025-03-05")] alias add_right_ne_self := add_ne_left set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_right_ne_self @[to_additive] theorem left_ne_mul : a ≠ a * b ↔ b ≠ 1 := left_eq_mul.not @[deprecated (since := "2025-03-05")] alias self_ne_mul_right := left_ne_mul @[deprecated (since := "2025-03-05")] alias self_ne_add_right := left_ne_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_ne_mul_right end LeftCancelMonoid section RightCancelMonoid variable [RightCancelMonoid M] {a b : M} @[to_additive (attr := simp)] theorem mul_eq_right : a * b = b ↔ a = 1 := calc a * b = b ↔ a * b = 1 * b := by rw [one_mul] _ ↔ a = 1 := mul_right_cancel_iff @[deprecated (since := "2025-03-05")] alias mul_left_eq_self := mul_eq_right @[deprecated (since := "2025-03-05")] alias add_left_eq_self := add_eq_right set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_left_eq_self @[to_additive (attr := simp)] theorem right_eq_mul : b = a * b ↔ a = 1 := eq_comm.trans mul_eq_right @[deprecated (since := "2025-03-05")] alias self_eq_mul_left := right_eq_mul @[deprecated (since := "2025-03-05")] alias self_eq_add_left := right_eq_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_eq_mul_left @[to_additive] theorem mul_ne_right : a * b ≠ b ↔ a ≠ 1 := mul_eq_right.not @[deprecated (since := "2025-03-05")] alias mul_left_ne_self := mul_ne_right @[deprecated (since := "2025-03-05")] alias add_left_ne_self := add_ne_right set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_left_ne_self @[to_additive] theorem right_ne_mul : b ≠ a * b ↔ a ≠ 1 := right_eq_mul.not @[deprecated (since := "2025-03-05")] alias self_ne_mul_left := right_ne_mul @[deprecated (since := "2025-03-05")] alias self_ne_add_left := right_ne_add set_option linter.existingAttributeWarning false in attribute [to_additive existing] self_ne_mul_left end RightCancelMonoid section CancelCommMonoid variable [CancelCommMonoid α] {a b c d : α} @[to_additive] lemma eq_iff_eq_of_mul_eq_mul (h : a * b = c * d) : a = c ↔ b = d := by aesop @[to_additive] lemma ne_iff_ne_of_mul_eq_mul (h : a * b = c * d) : a ≠ c ↔ b ≠ d := by aesop end CancelCommMonoid section InvolutiveInv variable [InvolutiveInv G] {a b : G} @[to_additive (attr := simp)] theorem inv_involutive : Function.Involutive (Inv.inv : G → G) := inv_inv @[to_additive (attr := simp)] theorem inv_surjective : Function.Surjective (Inv.inv : G → G) := inv_involutive.surjective @[to_additive] theorem inv_injective : Function.Injective (Inv.inv : G → G) := inv_involutive.injective @[to_additive (attr := simp)] theorem inv_inj : a⁻¹ = b⁻¹ ↔ a = b := inv_injective.eq_iff @[to_additive] theorem inv_eq_iff_eq_inv : a⁻¹ = b ↔ a = b⁻¹ := ⟨fun h => h ▸ (inv_inv a).symm, fun h => h.symm ▸ inv_inv b⟩ variable (G) @[to_additive] theorem inv_comp_inv : Inv.inv ∘ Inv.inv = @id G := inv_involutive.comp_self @[to_additive] theorem leftInverse_inv : LeftInverse (fun a : G ↦ a⁻¹) fun a ↦ a⁻¹ := inv_inv @[to_additive] theorem rightInverse_inv : RightInverse (fun a : G ↦ a⁻¹) fun a ↦ a⁻¹ := inv_inv end InvolutiveInv section DivInvMonoid variable [DivInvMonoid G]	@[to_additive] theorem mul_one_div (x y : G) : x * (1 / y) = x / y := by	Mathlib/Algebra/Group/Basic.lean	352	354
/- Copyright (c) 2017 Simon Hudon. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon -/ import Mathlib.Data.PFunctor.Univariate.Basic /-! # M-types M types are potentially infinite tree-like structures. They are defined as the greatest fixpoint of a polynomial functor. -/ universe u v w open Nat Function open List variable (F : PFunctor.{u}) namespace PFunctor namespace Approx /-- `CofixA F n` is an `n` level approximation of an M-type -/ inductive CofixA : ℕ → Type u \| continue : CofixA 0 \| intro {n} : ∀ a, (F.B a → CofixA n) → CofixA (succ n) /-- default inhabitant of `CofixA` -/ protected def CofixA.default [Inhabited F.A] : ∀ n, CofixA F n \| 0 => CofixA.continue \| succ n => CofixA.intro default fun _ => CofixA.default n instance [Inhabited F.A] {n} : Inhabited (CofixA F n) := ⟨CofixA.default F n⟩ theorem cofixA_eq_zero : ∀ x y : CofixA F 0, x = y \| CofixA.continue, CofixA.continue => rfl variable {F} /-- The label of the root of the tree for a non-trivial approximation of the cofix of a pfunctor. -/ def head' : ∀ {n}, CofixA F (succ n) → F.A \| _, CofixA.intro i _ => i /-- for a non-trivial approximation, return all the subtrees of the root -/ def children' : ∀ {n} (x : CofixA F (succ n)), F.B (head' x) → CofixA F n \| _, CofixA.intro _ f => f theorem approx_eta {n : ℕ} (x : CofixA F (n + 1)) : x = CofixA.intro (head' x) (children' x) := by cases x; rfl /-- Relation between two approximations of the cofix of a pfunctor that state they both contain the same data until one of them is truncated -/ inductive Agree : ∀ {n : ℕ}, CofixA F n → CofixA F (n + 1) → Prop \| continu (x : CofixA F 0) (y : CofixA F 1) : Agree x y \| intro {n} {a} (x : F.B a → CofixA F n) (x' : F.B a → CofixA F (n + 1)) : (∀ i : F.B a, Agree (x i) (x' i)) → Agree (CofixA.intro a x) (CofixA.intro a x') /-- Given an infinite series of approximations `approx`, `AllAgree approx` states that they are all consistent with each other. -/ def AllAgree (x : ∀ n, CofixA F n) := ∀ n, Agree (x n) (x (succ n)) @[simp] theorem agree_trivial {x : CofixA F 0} {y : CofixA F 1} : Agree x y := by constructor @[deprecated (since := "2024-12-25")] alias agree_trival := agree_trivial theorem agree_children {n : ℕ} (x : CofixA F (succ n)) (y : CofixA F (succ n + 1)) {i j} (h₀ : HEq i j) (h₁ : Agree x y) : Agree (children' x i) (children' y j) := by obtain - \| ⟨_, _, hagree⟩ := h₁; cases h₀ apply hagree /-- `truncate a` turns `a` into a more limited approximation -/ def truncate : ∀ {n : ℕ}, CofixA F (n + 1) → CofixA F n \| 0, CofixA.intro _ _ => CofixA.continue \| succ _, CofixA.intro i f => CofixA.intro i <\| truncate ∘ f theorem truncate_eq_of_agree {n : ℕ} (x : CofixA F n) (y : CofixA F (succ n)) (h : Agree x y) : truncate y = x := by induction n <;> cases x <;> cases y · rfl · -- cases' h with _ _ _ _ _ h₀ h₁ cases h simp only [truncate, Function.comp_def, eq_self_iff_true, heq_iff_eq] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11041): used to be `ext y` rename_i n_ih a f y h₁ suffices (fun x => truncate (y x)) = f by simp [this] funext y apply n_ih	apply h₁ variable {X : Type w} variable (f : X → F X) /-- `sCorec f i n` creates an approximation of height `n` of the final coalgebra of `f` -/ def sCorec : X → ∀ n, CofixA F n \| _, 0 => CofixA.continue \| j, succ _ => CofixA.intro (f j).1 fun i => sCorec ((f j).2 i) _ theorem P_corec (i : X) (n : ℕ) : Agree (sCorec f i n) (sCorec f i (succ n)) := by induction' n with n n_ih generalizing i constructor obtain ⟨y, g⟩ := f i	Mathlib/Data/PFunctor/Univariate/M.lean	101	115
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Bhavik Mehta, Kim Morrison -/ import Mathlib.CategoryTheory.Subobject.Basic import Mathlib.CategoryTheory.Preadditive.Basic /-! # Factoring through subobjects The predicate `h : P.Factors f`, for `P : Subobject Y` and `f : X ⟶ Y` asserts the existence of some `P.factorThru f : X ⟶ (P : C)` making the obvious diagram commute. -/ universe v₁ v₂ u₁ u₂ noncomputable section open CategoryTheory CategoryTheory.Category CategoryTheory.Limits variable {C : Type u₁} [Category.{v₁} C] {X Y Z : C} variable {D : Type u₂} [Category.{v₂} D] namespace CategoryTheory namespace MonoOver /-- When `f : X ⟶ Y` and `P : MonoOver Y`, `P.Factors f` expresses that there exists a factorisation of `f` through `P`. Given `h : P.Factors f`, you can recover the morphism as `P.factorThru f h`. -/ def Factors {X Y : C} (P : MonoOver Y) (f : X ⟶ Y) : Prop := ∃ g : X ⟶ (P : C), g ≫ P.arrow = f theorem factors_congr {X : C} {f g : MonoOver X} {Y : C} (h : Y ⟶ X) (e : f ≅ g) : f.Factors h ↔ g.Factors h := ⟨fun ⟨u, hu⟩ => ⟨u ≫ ((MonoOver.forget _).map e.hom).left, by simp [hu]⟩, fun ⟨u, hu⟩ => ⟨u ≫ ((MonoOver.forget _).map e.inv).left, by simp [hu]⟩⟩ /-- `P.factorThru f h` provides a factorisation of `f : X ⟶ Y` through some `P : MonoOver Y`, given the evidence `h : P.Factors f` that such a factorisation exists. -/ def factorThru {X Y : C} (P : MonoOver Y) (f : X ⟶ Y) (h : Factors P f) : X ⟶ (P : C) := Classical.choose h end MonoOver namespace Subobject /-- When `f : X ⟶ Y` and `P : Subobject Y`, `P.Factors f` expresses that there exists a factorisation of `f` through `P`. Given `h : P.Factors f`, you can recover the morphism as `P.factorThru f h`. -/ def Factors {X Y : C} (P : Subobject Y) (f : X ⟶ Y) : Prop := Quotient.liftOn' P (fun P => P.Factors f) (by rintro P Q ⟨h⟩ apply propext constructor · rintro ⟨i, w⟩ exact ⟨i ≫ h.hom.left, by erw [Category.assoc, Over.w h.hom, w]⟩ · rintro ⟨i, w⟩ exact ⟨i ≫ h.inv.left, by erw [Category.assoc, Over.w h.inv, w]⟩) @[simp] theorem mk_factors_iff {X Y Z : C} (f : Y ⟶ X) [Mono f] (g : Z ⟶ X) : (Subobject.mk f).Factors g ↔ (MonoOver.mk' f).Factors g := Iff.rfl theorem mk_factors_self (f : X ⟶ Y) [Mono f] : (mk f).Factors f := ⟨𝟙 _, by simp⟩ theorem factors_iff {X Y : C} (P : Subobject Y) (f : X ⟶ Y) : P.Factors f ↔ (representative.obj P).Factors f := Quot.inductionOn P fun _ => MonoOver.factors_congr _ (representativeIso _).symm theorem factors_self {X : C} (P : Subobject X) : P.Factors P.arrow := (factors_iff _ _).mpr ⟨𝟙 (P : C), by simp⟩ theorem factors_comp_arrow {X Y : C} {P : Subobject Y} (f : X ⟶ P) : P.Factors (f ≫ P.arrow) := (factors_iff _ _).mpr ⟨f, rfl⟩ theorem factors_of_factors_right {X Y Z : C} {P : Subobject Z} (f : X ⟶ Y) {g : Y ⟶ Z} (h : P.Factors g) : P.Factors (f ≫ g) := by induction' P using Quotient.ind' with P obtain ⟨g, rfl⟩ := h exact ⟨f ≫ g, by simp⟩ theorem factors_zero [HasZeroMorphisms C] {X Y : C} {P : Subobject Y} : P.Factors (0 : X ⟶ Y) := (factors_iff _ _).mpr ⟨0, by simp⟩ theorem factors_of_le {Y Z : C} {P Q : Subobject Y} (f : Z ⟶ Y) (h : P ≤ Q) : P.Factors f → Q.Factors f := by simp only [factors_iff] exact fun ⟨u, hu⟩ => ⟨u ≫ ofLE _ _ h, by simp [← hu]⟩ /-- `P.factorThru f h` provides a factorisation of `f : X ⟶ Y` through some `P : Subobject Y`, given the evidence `h : P.Factors f` that such a factorisation exists. -/ def factorThru {X Y : C} (P : Subobject Y) (f : X ⟶ Y) (h : Factors P f) : X ⟶ P := Classical.choose ((factors_iff _ _).mp h) @[reassoc (attr := simp)] theorem factorThru_arrow {X Y : C} (P : Subobject Y) (f : X ⟶ Y) (h : Factors P f) : P.factorThru f h ≫ P.arrow = f := Classical.choose_spec ((factors_iff _ _).mp h) @[simp] theorem factorThru_self {X : C} (P : Subobject X) (h) : P.factorThru P.arrow h = 𝟙 (P : C) := by ext simp @[simp] theorem factorThru_mk_self (f : X ⟶ Y) [Mono f] : (mk f).factorThru f (mk_factors_self f) = (underlyingIso f).inv := by ext simp @[simp] theorem factorThru_comp_arrow {X Y : C} {P : Subobject Y} (f : X ⟶ P) (h) : P.factorThru (f ≫ P.arrow) h = f := by ext simp @[simp] theorem factorThru_eq_zero [HasZeroMorphisms C] {X Y : C} {P : Subobject Y} {f : X ⟶ Y} {h : Factors P f} : P.factorThru f h = 0 ↔ f = 0 := by fconstructor · intro w replace w := w =≫ P.arrow simpa using w · rintro rfl ext simp theorem factorThru_right {X Y Z : C} {P : Subobject Z} (f : X ⟶ Y) (g : Y ⟶ Z) (h : P.Factors g) : f ≫ P.factorThru g h = P.factorThru (f ≫ g) (factors_of_factors_right f h) := by apply (cancel_mono P.arrow).mp simp @[simp] theorem factorThru_zero [HasZeroMorphisms C] {X Y : C} {P : Subobject Y} (h : P.Factors (0 : X ⟶ Y)) : P.factorThru 0 h = 0 := by simp -- `h` is an explicit argument here so we can use -- `rw factorThru_ofLE h`, obtaining a subgoal `P.Factors f`. -- (While the reverse direction looks plausible as a simp lemma, it seems to be unproductive.) theorem factorThru_ofLE {Y Z : C} {P Q : Subobject Y} {f : Z ⟶ Y} (h : P ≤ Q) (w : P.Factors f) : Q.factorThru f (factors_of_le f h w) = P.factorThru f w ≫ ofLE P Q h := by ext simp section Preadditive variable [Preadditive C] theorem factors_add {X Y : C} {P : Subobject Y} (f g : X ⟶ Y) (wf : P.Factors f) (wg : P.Factors g) : P.Factors (f + g) := (factors_iff _ _).mpr ⟨P.factorThru f wf + P.factorThru g wg, by simp⟩ -- This can't be a `simp` lemma as `wf` and `wg` may not exist. -- However you can `rw` by it to assert that `f` and `g` factor through `P` separately. theorem factorThru_add {X Y : C} {P : Subobject Y} (f g : X ⟶ Y) (w : P.Factors (f + g)) (wf : P.Factors f) (wg : P.Factors g) : P.factorThru (f + g) w = P.factorThru f wf + P.factorThru g wg := by ext simp theorem factors_left_of_factors_add {X Y : C} {P : Subobject Y} (f g : X ⟶ Y) (w : P.Factors (f + g)) (wg : P.Factors g) : P.Factors f := (factors_iff _ _).mpr ⟨P.factorThru (f + g) w - P.factorThru g wg, by simp⟩ @[simp] theorem factorThru_add_sub_factorThru_right {X Y : C} {P : Subobject Y} (f g : X ⟶ Y) (w : P.Factors (f + g)) (wg : P.Factors g) : P.factorThru (f + g) w - P.factorThru g wg = P.factorThru f (factors_left_of_factors_add f g w wg) := by ext simp	theorem factors_right_of_factors_add {X Y : C} {P : Subobject Y} (f g : X ⟶ Y) (w : P.Factors (f + g)) (wf : P.Factors f) : P.Factors g :=	Mathlib/CategoryTheory/Subobject/FactorThru.lean	181	183
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.ShortComplex.PreservesHomology import Mathlib.Algebra.Homology.ShortComplex.Abelian import Mathlib.Algebra.Homology.ShortComplex.QuasiIso import Mathlib.CategoryTheory.Abelian.Opposite import Mathlib.CategoryTheory.Preadditive.AdditiveFunctor import Mathlib.CategoryTheory.Preadditive.Injective.Basic /-! # Exact short complexes When `S : ShortComplex C`, this file defines a structure `S.Exact` which expresses the exactness of `S`, i.e. there exists a homology data `h : S.HomologyData` such that `h.left.H` is zero. When `[S.HasHomology]`, it is equivalent to the assertion `IsZero S.homology`. Almost by construction, this notion of exactness is self dual, see `Exact.op` and `Exact.unop`. -/ namespace CategoryTheory open Category Limits ZeroObject Preadditive variable {C D : Type*} [Category C] [Category D] namespace ShortComplex section variable [HasZeroMorphisms C] [HasZeroMorphisms D] (S : ShortComplex C) {S₁ S₂ : ShortComplex C} /-- The assertion that the short complex `S : ShortComplex C` is exact. -/ structure Exact : Prop where /-- the condition that there exists an homology data whose `left.H` field is zero -/ condition : ∃ (h : S.HomologyData), IsZero h.left.H variable {S} lemma Exact.hasHomology (h : S.Exact) : S.HasHomology := HasHomology.mk' h.condition.choose lemma Exact.hasZeroObject (h : S.Exact) : HasZeroObject C := ⟨h.condition.choose.left.H, h.condition.choose_spec⟩ variable (S) lemma exact_iff_isZero_homology [S.HasHomology] : S.Exact ↔ IsZero S.homology := by constructor · rintro ⟨⟨h', z⟩⟩ exact IsZero.of_iso z h'.left.homologyIso · intro h exact ⟨⟨_, h⟩⟩ variable {S} lemma LeftHomologyData.exact_iff [S.HasHomology] (h : S.LeftHomologyData) : S.Exact ↔ IsZero h.H := by rw [S.exact_iff_isZero_homology] exact Iso.isZero_iff h.homologyIso lemma RightHomologyData.exact_iff [S.HasHomology] (h : S.RightHomologyData) : S.Exact ↔ IsZero h.H := by rw [S.exact_iff_isZero_homology] exact Iso.isZero_iff h.homologyIso variable (S) lemma exact_iff_isZero_leftHomology [S.HasHomology] : S.Exact ↔ IsZero S.leftHomology := LeftHomologyData.exact_iff _ lemma exact_iff_isZero_rightHomology [S.HasHomology] : S.Exact ↔ IsZero S.rightHomology := RightHomologyData.exact_iff _ variable {S} lemma HomologyData.exact_iff (h : S.HomologyData) : S.Exact ↔ IsZero h.left.H := by haveI := HasHomology.mk' h exact LeftHomologyData.exact_iff h.left lemma HomologyData.exact_iff' (h : S.HomologyData) : S.Exact ↔ IsZero h.right.H := by haveI := HasHomology.mk' h exact RightHomologyData.exact_iff h.right variable (S) lemma exact_iff_homology_iso_zero [S.HasHomology] [HasZeroObject C] : S.Exact ↔ Nonempty (S.homology ≅ 0) := by rw [exact_iff_isZero_homology] constructor · intro h exact ⟨h.isoZero⟩ · rintro ⟨e⟩ exact IsZero.of_iso (isZero_zero C) e lemma exact_of_iso (e : S₁ ≅ S₂) (h : S₁.Exact) : S₂.Exact := by obtain ⟨⟨h, z⟩⟩ := h exact ⟨⟨HomologyData.ofIso e h, z⟩⟩ lemma exact_iff_of_iso (e : S₁ ≅ S₂) : S₁.Exact ↔ S₂.Exact := ⟨exact_of_iso e, exact_of_iso e.symm⟩ lemma exact_and_mono_f_iff_of_iso (e : S₁ ≅ S₂) : S₁.Exact ∧ Mono S₁.f ↔ S₂.Exact ∧ Mono S₂.f := by have : Mono S₁.f ↔ Mono S₂.f := (MorphismProperty.monomorphisms C).arrow_mk_iso_iff (Arrow.isoMk (ShortComplex.π₁.mapIso e) (ShortComplex.π₂.mapIso e) e.hom.comm₁₂) rw [exact_iff_of_iso e, this] lemma exact_and_epi_g_iff_of_iso (e : S₁ ≅ S₂) : S₁.Exact ∧ Epi S₁.g ↔ S₂.Exact ∧ Epi S₂.g := by have : Epi S₁.g ↔ Epi S₂.g := (MorphismProperty.epimorphisms C).arrow_mk_iso_iff (Arrow.isoMk (ShortComplex.π₂.mapIso e) (ShortComplex.π₃.mapIso e) e.hom.comm₂₃) rw [exact_iff_of_iso e, this] lemma exact_of_isZero_X₂ (h : IsZero S.X₂) : S.Exact := by rw [(HomologyData.ofZeros S (IsZero.eq_of_tgt h _ _) (IsZero.eq_of_src h _ _)).exact_iff] exact h lemma exact_iff_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : S₁.Exact ↔ S₂.Exact := by constructor · rintro ⟨h₁, z₁⟩ exact ⟨HomologyData.ofEpiOfIsIsoOfMono φ h₁, z₁⟩ · rintro ⟨h₂, z₂⟩ exact ⟨HomologyData.ofEpiOfIsIsoOfMono' φ h₂, z₂⟩ variable {S} lemma HomologyData.exact_iff_i_p_zero (h : S.HomologyData) : S.Exact ↔ h.left.i ≫ h.right.p = 0 := by haveI := HasHomology.mk' h rw [h.left.exact_iff, ← h.comm] constructor · intro z rw [IsZero.eq_of_src z h.iso.hom 0, zero_comp, comp_zero] · intro eq simp only [IsZero.iff_id_eq_zero, ← cancel_mono h.iso.hom, id_comp, ← cancel_mono h.right.ι, ← cancel_epi h.left.π, eq, zero_comp, comp_zero] variable (S) lemma exact_iff_i_p_zero [S.HasHomology] (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) : S.Exact ↔ h₁.i ≫ h₂.p = 0 := (HomologyData.ofIsIsoLeftRightHomologyComparison' h₁ h₂).exact_iff_i_p_zero lemma exact_iff_iCycles_pOpcycles_zero [S.HasHomology] : S.Exact ↔ S.iCycles ≫ S.pOpcycles = 0 := S.exact_iff_i_p_zero _ _ lemma exact_iff_kernel_ι_comp_cokernel_π_zero [S.HasHomology] [HasKernel S.g] [HasCokernel S.f] : S.Exact ↔ kernel.ι S.g ≫ cokernel.π S.f = 0 := by haveI := HasLeftHomology.hasCokernel S haveI := HasRightHomology.hasKernel S exact S.exact_iff_i_p_zero (LeftHomologyData.ofHasKernelOfHasCokernel S) (RightHomologyData.ofHasCokernelOfHasKernel S) variable {S} lemma Exact.op (h : S.Exact) : S.op.Exact := by obtain ⟨h, z⟩ := h exact ⟨⟨h.op, (IsZero.of_iso z h.iso.symm).op⟩⟩ lemma Exact.unop {S : ShortComplex Cᵒᵖ} (h : S.Exact) : S.unop.Exact := by obtain ⟨h, z⟩ := h exact ⟨⟨h.unop, (IsZero.of_iso z h.iso.symm).unop⟩⟩ variable (S) @[simp] lemma exact_op_iff : S.op.Exact ↔ S.Exact := ⟨Exact.unop, Exact.op⟩ @[simp] lemma exact_unop_iff (S : ShortComplex Cᵒᵖ) : S.unop.Exact ↔ S.Exact := S.unop.exact_op_iff.symm variable {S} lemma LeftHomologyData.exact_map_iff (h : S.LeftHomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h.IsPreservedBy F] [(S.map F).HasHomology] : (S.map F).Exact ↔ IsZero (F.obj h.H) := (h.map F).exact_iff lemma RightHomologyData.exact_map_iff (h : S.RightHomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h.IsPreservedBy F] [(S.map F).HasHomology] : (S.map F).Exact ↔ IsZero (F.obj h.H) := (h.map F).exact_iff lemma Exact.map_of_preservesLeftHomologyOf (h : S.Exact) (F : C ⥤ D) [F.PreservesZeroMorphisms] [F.PreservesLeftHomologyOf S] [(S.map F).HasHomology] : (S.map F).Exact := by have := h.hasHomology rw [S.leftHomologyData.exact_iff, IsZero.iff_id_eq_zero] at h rw [S.leftHomologyData.exact_map_iff F, IsZero.iff_id_eq_zero, ← F.map_id, h, F.map_zero] lemma Exact.map_of_preservesRightHomologyOf (h : S.Exact) (F : C ⥤ D) [F.PreservesZeroMorphisms] [F.PreservesRightHomologyOf S] [(S.map F).HasHomology] : (S.map F).Exact := by have : S.HasHomology := h.hasHomology rw [S.rightHomologyData.exact_iff, IsZero.iff_id_eq_zero] at h rw [S.rightHomologyData.exact_map_iff F, IsZero.iff_id_eq_zero, ← F.map_id, h, F.map_zero] lemma Exact.map (h : S.Exact) (F : C ⥤ D) [F.PreservesZeroMorphisms] [F.PreservesLeftHomologyOf S] [F.PreservesRightHomologyOf S] : (S.map F).Exact := by have := h.hasHomology exact h.map_of_preservesLeftHomologyOf F variable (S) lemma exact_map_iff_of_faithful [S.HasHomology] (F : C ⥤ D) [F.PreservesZeroMorphisms] [F.PreservesLeftHomologyOf S] [F.PreservesRightHomologyOf S] [F.Faithful] : (S.map F).Exact ↔ S.Exact := by constructor · intro h rw [S.leftHomologyData.exact_iff, IsZero.iff_id_eq_zero] rw [(S.leftHomologyData.map F).exact_iff, IsZero.iff_id_eq_zero, LeftHomologyData.map_H] at h apply F.map_injective rw [F.map_id, F.map_zero, h] · intro h exact h.map F variable {S} @[reassoc] lemma Exact.comp_eq_zero (h : S.Exact) {X Y : C} {a : X ⟶ S.X₂} (ha : a ≫ S.g = 0) {b : S.X₂ ⟶ Y} (hb : S.f ≫ b = 0) : a ≫ b = 0 := by have := h.hasHomology have eq := h rw [exact_iff_iCycles_pOpcycles_zero] at eq rw [← S.liftCycles_i a ha, ← S.p_descOpcycles b hb, assoc, reassoc_of% eq, zero_comp, comp_zero] lemma Exact.isZero_of_both_zeros (ex : S.Exact) (hf : S.f = 0) (hg : S.g = 0) : IsZero S.X₂ := (ShortComplex.HomologyData.ofZeros S hf hg).exact_iff.1 ex end section Preadditive variable [Preadditive C] [Preadditive D] (S : ShortComplex C) lemma exact_iff_mono [HasZeroObject C] (hf : S.f = 0) : S.Exact ↔ Mono S.g := by constructor · intro h have := h.hasHomology simp only [exact_iff_isZero_homology] at h have := S.isIso_pOpcycles hf have := mono_of_isZero_kernel' _ S.homologyIsKernel h rw [← S.p_fromOpcycles] apply mono_comp · intro rw [(HomologyData.ofIsLimitKernelFork S hf _ (KernelFork.IsLimit.ofMonoOfIsZero (KernelFork.ofι (0 : 0 ⟶ S.X₂) zero_comp) inferInstance (isZero_zero C))).exact_iff] exact isZero_zero C lemma exact_iff_epi [HasZeroObject C] (hg : S.g = 0) : S.Exact ↔ Epi S.f := by constructor · intro h have := h.hasHomology simp only [exact_iff_isZero_homology] at h haveI := S.isIso_iCycles hg haveI : Epi S.toCycles := epi_of_isZero_cokernel' _ S.homologyIsCokernel h rw [← S.toCycles_i] apply epi_comp · intro rw [(HomologyData.ofIsColimitCokernelCofork S hg _ (CokernelCofork.IsColimit.ofEpiOfIsZero (CokernelCofork.ofπ (0 : S.X₂ ⟶ 0) comp_zero) inferInstance (isZero_zero C))).exact_iff] exact isZero_zero C variable {S} lemma Exact.epi_f' (hS : S.Exact) (h : LeftHomologyData S) : Epi h.f' := epi_of_isZero_cokernel' _ h.hπ (by haveI := hS.hasHomology dsimp simpa only [← h.exact_iff] using hS) lemma Exact.mono_g' (hS : S.Exact) (h : RightHomologyData S) : Mono h.g' := mono_of_isZero_kernel' _ h.hι (by haveI := hS.hasHomology dsimp simpa only [← h.exact_iff] using hS) lemma Exact.epi_toCycles (hS : S.Exact) [S.HasLeftHomology] : Epi S.toCycles := hS.epi_f' _ lemma Exact.mono_fromOpcycles (hS : S.Exact) [S.HasRightHomology] : Mono S.fromOpcycles := hS.mono_g' _ lemma LeftHomologyData.exact_iff_epi_f' [S.HasHomology] (h : LeftHomologyData S) : S.Exact ↔ Epi h.f' := by constructor · intro hS exact hS.epi_f' h · intro simp only [h.exact_iff, IsZero.iff_id_eq_zero, ← cancel_epi h.π, ← cancel_epi h.f', comp_id, h.f'_π, comp_zero] lemma RightHomologyData.exact_iff_mono_g' [S.HasHomology] (h : RightHomologyData S) : S.Exact ↔ Mono h.g' := by constructor · intro hS exact hS.mono_g' h · intro simp only [h.exact_iff, IsZero.iff_id_eq_zero, ← cancel_mono h.ι, ← cancel_mono h.g', id_comp, h.ι_g', zero_comp] /-- Given an exact short complex `S` and a limit kernel fork `kf` for `S.g`, this is the left homology data for `S` with `K := kf.pt` and `H := 0`. -/ @[simps] noncomputable def Exact.leftHomologyDataOfIsLimitKernelFork (hS : S.Exact) [HasZeroObject C] (kf : KernelFork S.g) (hkf : IsLimit kf) : S.LeftHomologyData where K := kf.pt H := 0 i := kf.ι π := 0 wi := kf.condition hi := IsLimit.ofIsoLimit hkf (Fork.ext (Iso.refl _) (by simp)) wπ := comp_zero hπ := CokernelCofork.IsColimit.ofEpiOfIsZero _ (by have := hS.hasHomology refine ((MorphismProperty.epimorphisms C).arrow_mk_iso_iff ?_).1 hS.epi_toCycles refine Arrow.isoMk (Iso.refl _) (IsLimit.conePointUniqueUpToIso S.cyclesIsKernel hkf) ?_ apply Fork.IsLimit.hom_ext hkf simp [IsLimit.conePointUniqueUpToIso]) (isZero_zero C) /-- Given an exact short complex `S` and a colimit cokernel cofork `cc` for `S.f`, this is the right homology data for `S` with `Q := cc.pt` and `H := 0`. -/ @[simps] noncomputable def Exact.rightHomologyDataOfIsColimitCokernelCofork (hS : S.Exact) [HasZeroObject C] (cc : CokernelCofork S.f) (hcc : IsColimit cc) : S.RightHomologyData where Q := cc.pt H := 0 p := cc.π ι := 0 wp := cc.condition hp := IsColimit.ofIsoColimit hcc (Cofork.ext (Iso.refl _) (by simp)) wι := zero_comp hι := KernelFork.IsLimit.ofMonoOfIsZero _ (by have := hS.hasHomology refine ((MorphismProperty.monomorphisms C).arrow_mk_iso_iff ?_).2 hS.mono_fromOpcycles refine Arrow.isoMk (IsColimit.coconePointUniqueUpToIso hcc S.opcyclesIsCokernel) (Iso.refl _) ?_ apply Cofork.IsColimit.hom_ext hcc simp [IsColimit.coconePointUniqueUpToIso]) (isZero_zero C) variable (S) lemma exact_iff_epi_toCycles [S.HasHomology] : S.Exact ↔ Epi S.toCycles := S.leftHomologyData.exact_iff_epi_f' lemma exact_iff_mono_fromOpcycles [S.HasHomology] : S.Exact ↔ Mono S.fromOpcycles := S.rightHomologyData.exact_iff_mono_g' lemma exact_iff_epi_kernel_lift [S.HasHomology] [HasKernel S.g] : S.Exact ↔ Epi (kernel.lift S.g S.f S.zero) := by rw [exact_iff_epi_toCycles] apply (MorphismProperty.epimorphisms C).arrow_mk_iso_iff exact Arrow.isoMk (Iso.refl _) S.cyclesIsoKernel (by aesop_cat) lemma exact_iff_mono_cokernel_desc [S.HasHomology] [HasCokernel S.f] : S.Exact ↔ Mono (cokernel.desc S.f S.g S.zero) := by rw [exact_iff_mono_fromOpcycles] refine (MorphismProperty.monomorphisms C).arrow_mk_iso_iff (Iso.symm ?_) exact Arrow.isoMk S.opcyclesIsoCokernel.symm (Iso.refl _) (by aesop_cat) lemma QuasiIso.exact_iff {S₁ S₂ : ShortComplex C} (φ : S₁ ⟶ S₂) [S₁.HasHomology] [S₂.HasHomology] [QuasiIso φ] : S₁.Exact ↔ S₂.Exact := by simp only [exact_iff_isZero_homology] exact Iso.isZero_iff (asIso (homologyMap φ)) lemma exact_of_f_is_kernel (hS : IsLimit (KernelFork.ofι S.f S.zero)) [S.HasHomology] : S.Exact := by rw [exact_iff_epi_toCycles] have : IsSplitEpi S.toCycles := ⟨⟨{ section_ := hS.lift (KernelFork.ofι S.iCycles S.iCycles_g) id := by rw [← cancel_mono S.iCycles, assoc, toCycles_i, id_comp] exact Fork.IsLimit.lift_ι hS }⟩⟩ infer_instance lemma exact_of_g_is_cokernel (hS : IsColimit (CokernelCofork.ofπ S.g S.zero)) [S.HasHomology] : S.Exact := by rw [exact_iff_mono_fromOpcycles] have : IsSplitMono S.fromOpcycles := ⟨⟨{ retraction := hS.desc (CokernelCofork.ofπ S.pOpcycles S.f_pOpcycles) id := by rw [← cancel_epi S.pOpcycles, p_fromOpcycles_assoc, comp_id] exact Cofork.IsColimit.π_desc hS }⟩⟩ infer_instance variable {S} lemma Exact.mono_g (hS : S.Exact) (hf : S.f = 0) : Mono S.g := by have := hS.hasHomology have := hS.epi_toCycles have : S.iCycles = 0 := by rw [← cancel_epi S.toCycles, comp_zero, toCycles_i, hf] apply Preadditive.mono_of_cancel_zero intro A x₂ hx₂ rw [← S.liftCycles_i x₂ hx₂, this, comp_zero] lemma Exact.epi_f (hS : S.Exact) (hg : S.g = 0) : Epi S.f := by have := hS.hasHomology have := hS.mono_fromOpcycles have : S.pOpcycles = 0 := by rw [← cancel_mono S.fromOpcycles, zero_comp, p_fromOpcycles, hg] apply Preadditive.epi_of_cancel_zero intro A x₂ hx₂ rw [← S.p_descOpcycles x₂ hx₂, this, zero_comp] lemma Exact.mono_g_iff (hS : S.Exact) : Mono S.g ↔ S.f = 0 := by constructor · intro rw [← cancel_mono S.g, zero, zero_comp] · exact hS.mono_g lemma Exact.epi_f_iff (hS : S.Exact) : Epi S.f ↔ S.g = 0 := by constructor · intro rw [← cancel_epi S.f, zero, comp_zero] · exact hS.epi_f lemma Exact.isZero_X₂ (hS : S.Exact) (hf : S.f = 0) (hg : S.g = 0) : IsZero S.X₂ := by have := hS.mono_g hf rw [IsZero.iff_id_eq_zero, ← cancel_mono S.g, hg, comp_zero, comp_zero] lemma Exact.isZero_X₂_iff (hS : S.Exact) : IsZero S.X₂ ↔ S.f = 0 ∧ S.g = 0 := by constructor · intro h exact ⟨h.eq_of_tgt _ _, h.eq_of_src _ _⟩ · rintro ⟨hf, hg⟩ exact hS.isZero_X₂ hf hg variable (S) /-- A splitting for a short complex `S` consists of the data of a retraction `r : X₂ ⟶ X₁` of `S.f` and section `s : X₃ ⟶ X₂` of `S.g` which satisfy `r ≫ S.f + S.g ≫ s = 𝟙 _` -/ structure Splitting (S : ShortComplex C) where /-- a retraction of `S.f` -/ r : S.X₂ ⟶ S.X₁ /-- a section of `S.g` -/ s : S.X₃ ⟶ S.X₂ /-- the condition that `r` is a retraction of `S.f` -/ f_r : S.f ≫ r = 𝟙 _ := by aesop_cat /-- the condition that `s` is a section of `S.g` -/ s_g : s ≫ S.g = 𝟙 _ := by aesop_cat /-- the compatibility between the given section and retraction -/ id : r ≫ S.f + S.g ≫ s = 𝟙 _ := by aesop_cat namespace Splitting attribute [reassoc (attr := simp)] f_r s_g variable {S} @[reassoc] lemma r_f (s : S.Splitting) : s.r ≫ S.f = 𝟙 _ - S.g ≫ s.s := by rw [← s.id, add_sub_cancel_right] @[reassoc] lemma g_s (s : S.Splitting) : S.g ≫ s.s = 𝟙 _ - s.r ≫ S.f := by rw [← s.id, add_sub_cancel_left] /-- Given a splitting of a short complex `S`, this shows that `S.f` is a split monomorphism. -/ @[simps] def splitMono_f (s : S.Splitting) : SplitMono S.f := ⟨s.r, s.f_r⟩ lemma isSplitMono_f (s : S.Splitting) : IsSplitMono S.f := ⟨⟨s.splitMono_f⟩⟩ lemma mono_f (s : S.Splitting) : Mono S.f := by have := s.isSplitMono_f infer_instance /-- Given a splitting of a short complex `S`, this shows that `S.g` is a split epimorphism. -/ @[simps] def splitEpi_g (s : S.Splitting) : SplitEpi S.g := ⟨s.s, s.s_g⟩ lemma isSplitEpi_g (s : S.Splitting) : IsSplitEpi S.g := ⟨⟨s.splitEpi_g⟩⟩ lemma epi_g (s : S.Splitting) : Epi S.g := by have := s.isSplitEpi_g infer_instance @[reassoc (attr := simp)] lemma s_r (s : S.Splitting) : s.s ≫ s.r = 0 := by have := s.epi_g simp only [← cancel_epi S.g, comp_zero, g_s_assoc, sub_comp, id_comp, assoc, f_r, comp_id, sub_self] lemma ext_r (s s' : S.Splitting) (h : s.r = s'.r) : s = s' := by have := s.epi_g have eq := s.id rw [← s'.id, h, add_right_inj, cancel_epi S.g] at eq cases s cases s' obtain rfl := eq obtain rfl := h rfl lemma ext_s (s s' : S.Splitting) (h : s.s = s'.s) : s = s' := by have := s.mono_f have eq := s.id rw [← s'.id, h, add_left_inj, cancel_mono S.f] at eq cases s cases s' obtain rfl := eq obtain rfl := h rfl /-- The left homology data on a short complex equipped with a splitting. -/ @[simps] noncomputable def leftHomologyData [HasZeroObject C] (s : S.Splitting) : LeftHomologyData S := by have hi := KernelFork.IsLimit.ofι S.f S.zero (fun x _ => x ≫ s.r) (fun x hx => by simp only [assoc, s.r_f, comp_sub, comp_id, sub_eq_self, reassoc_of% hx, zero_comp]) (fun x _ b hb => by simp only [← hb, assoc, f_r, comp_id]) let f' := hi.lift (KernelFork.ofι S.f S.zero) have hf' : f' = 𝟙 _ := by apply Fork.IsLimit.hom_ext hi dsimp erw [Fork.IsLimit.lift_ι hi] simp only [Fork.ι_ofι, id_comp] have wπ : f' ≫ (0 : S.X₁ ⟶ 0) = 0 := comp_zero have hπ : IsColimit (CokernelCofork.ofπ 0 wπ) := CokernelCofork.IsColimit.ofEpiOfIsZero _ (by rw [hf']; infer_instance) (isZero_zero _) exact { K := S.X₁ H := 0 i := S.f wi := S.zero hi := hi π := 0 wπ := wπ hπ := hπ } /-- The right homology data on a short complex equipped with a splitting. -/ @[simps] noncomputable def rightHomologyData [HasZeroObject C] (s : S.Splitting) : RightHomologyData S := by have hp := CokernelCofork.IsColimit.ofπ S.g S.zero (fun x _ => s.s ≫ x) (fun x hx => by simp only [s.g_s_assoc, sub_comp, id_comp, sub_eq_self, assoc, hx, comp_zero]) (fun x _ b hb => by simp only [← hb, s.s_g_assoc]) let g' := hp.desc (CokernelCofork.ofπ S.g S.zero) have hg' : g' = 𝟙 _ := by apply Cofork.IsColimit.hom_ext hp dsimp erw [Cofork.IsColimit.π_desc hp] simp only [Cofork.π_ofπ, comp_id] have wι : (0 : 0 ⟶ S.X₃) ≫ g' = 0 := zero_comp have hι : IsLimit (KernelFork.ofι 0 wι) := KernelFork.IsLimit.ofMonoOfIsZero _ (by rw [hg']; dsimp; infer_instance) (isZero_zero _) exact { Q := S.X₃ H := 0 p := S.g wp := S.zero hp := hp ι := 0 wι := wι hι := hι } /-- The homology data on a short complex equipped with a splitting. -/ @[simps] noncomputable def homologyData [HasZeroObject C] (s : S.Splitting) : S.HomologyData where left := s.leftHomologyData right := s.rightHomologyData iso := Iso.refl 0 /-- A short complex equipped with a splitting is exact. -/ lemma exact [HasZeroObject C] (s : S.Splitting) : S.Exact := ⟨s.homologyData, isZero_zero _⟩ /-- If a short complex `S` is equipped with a splitting, then `S.X₁` is the kernel of `S.g`. -/ noncomputable def fIsKernel [HasZeroObject C] (s : S.Splitting) : IsLimit (KernelFork.ofι S.f S.zero) := s.homologyData.left.hi /-- If a short complex `S` is equipped with a splitting, then `S.X₃` is the cokernel of `S.f`. -/ noncomputable def gIsCokernel [HasZeroObject C] (s : S.Splitting) : IsColimit (CokernelCofork.ofπ S.g S.zero) := s.homologyData.right.hp /-- If a short complex `S` has a splitting and `F` is an additive functor, then `S.map F` also has a splitting. -/ @[simps] def map (s : S.Splitting) (F : C ⥤ D) [F.Additive] : (S.map F).Splitting where r := F.map s.r s := F.map s.s f_r := by dsimp [ShortComplex.map] rw [← F.map_comp, f_r, F.map_id] s_g := by dsimp [ShortComplex.map] simp only [← F.map_comp, s_g, F.map_id] id := by dsimp [ShortComplex.map] simp only [← F.map_id, ← s.id, Functor.map_comp, Functor.map_add] /-- A splitting on a short complex induces splittings on isomorphic short complexes. -/ @[simps] def ofIso {S₁ S₂ : ShortComplex C} (s : S₁.Splitting) (e : S₁ ≅ S₂) : S₂.Splitting where r := e.inv.τ₂ ≫ s.r ≫ e.hom.τ₁ s := e.inv.τ₃ ≫ s.s ≫ e.hom.τ₂ f_r := by rw [← e.inv.comm₁₂_assoc, s.f_r_assoc, ← comp_τ₁, e.inv_hom_id, id_τ₁] s_g := by rw [assoc, assoc, e.hom.comm₂₃, s.s_g_assoc, ← comp_τ₃, e.inv_hom_id, id_τ₃] id := by have eq := e.inv.τ₂ ≫= s.id =≫ e.hom.τ₂ rw [id_comp, ← comp_τ₂, e.inv_hom_id, id_τ₂] at eq rw [← eq, assoc, assoc, add_comp, assoc, assoc, comp_add, e.hom.comm₁₂, e.inv.comm₂₃_assoc] /-- The obvious splitting of the short complex `X₁ ⟶ X₁ ⊞ X₂ ⟶ X₂`. -/ noncomputable def ofHasBinaryBiproduct (X₁ X₂ : C) [HasBinaryBiproduct X₁ X₂] : Splitting (ShortComplex.mk (biprod.inl : X₁ ⟶ _) (biprod.snd : _ ⟶ X₂) (by simp)) where r := biprod.fst s := biprod.inr variable (S) /-- The obvious splitting of a short complex when `S.X₁` is zero and `S.g` is an isomorphism. -/ noncomputable def ofIsZeroOfIsIso (hf : IsZero S.X₁) (hg : IsIso S.g) : Splitting S where r := 0 s := inv S.g f_r := hf.eq_of_src _ _ /-- The obvious splitting of a short complex when `S.f` is an isomorphism and `S.X₃` is zero. -/ noncomputable def ofIsIsoOfIsZero (hf : IsIso S.f) (hg : IsZero S.X₃) : Splitting S where r := inv S.f s := 0 s_g := hg.eq_of_src _ _ variable {S} /-- The splitting of the short complex `S.op` deduced from a splitting of `S`. -/ @[simps] def op (h : Splitting S) : Splitting S.op where r := h.s.op s := h.r.op f_r := Quiver.Hom.unop_inj (by simp) s_g := Quiver.Hom.unop_inj (by simp) id := Quiver.Hom.unop_inj (by simp only [op_X₂, Opposite.unop_op, op_X₁, op_f, op_X₃, op_g, unop_add, unop_comp, Quiver.Hom.unop_op, unop_id, ← h.id] abel) /-- The splitting of the short complex `S.unop` deduced from a splitting of `S`. -/ @[simps] def unop {S : ShortComplex Cᵒᵖ} (h : Splitting S) : Splitting S.unop where r := h.s.unop s := h.r.unop f_r := Quiver.Hom.op_inj (by simp) s_g := Quiver.Hom.op_inj (by simp) id := Quiver.Hom.op_inj (by simp only [unop_X₂, Opposite.op_unop, unop_X₁, unop_f, unop_X₃, unop_g, op_add, op_comp, Quiver.Hom.op_unop, op_id, ← h.id] abel) /-- The isomorphism `S.X₂ ≅ S.X₁ ⊞ S.X₃` induced by a splitting of the short complex `S`. -/ @[simps] noncomputable def isoBinaryBiproduct (h : Splitting S) [HasBinaryBiproduct S.X₁ S.X₃] : S.X₂ ≅ S.X₁ ⊞ S.X₃ where hom := biprod.lift h.r S.g inv := biprod.desc S.f h.s hom_inv_id := by simp [h.id] end Splitting section Balanced variable {S} variable [Balanced C] namespace Exact lemma isIso_f' (hS : S.Exact) (h : S.LeftHomologyData) [Mono S.f] : IsIso h.f' := by have := hS.epi_f' h have := mono_of_mono_fac h.f'_i exact isIso_of_mono_of_epi h.f' lemma isIso_toCycles (hS : S.Exact) [Mono S.f] [S.HasLeftHomology]: IsIso S.toCycles := hS.isIso_f' _ lemma isIso_g' (hS : S.Exact) (h : S.RightHomologyData) [Epi S.g] : IsIso h.g' := by have := hS.mono_g' h have := epi_of_epi_fac h.p_g' exact isIso_of_mono_of_epi h.g' lemma isIso_fromOpcycles (hS : S.Exact) [Epi S.g] [S.HasRightHomology] : IsIso S.fromOpcycles := hS.isIso_g' _ /-- In a balanced category, if a short complex `S` is exact and `S.f` is a mono, then `S.X₁` is the kernel of `S.g`. -/ noncomputable def fIsKernel (hS : S.Exact) [Mono S.f] : IsLimit (KernelFork.ofι S.f S.zero) := by have := hS.hasHomology have := hS.isIso_toCycles exact IsLimit.ofIsoLimit S.cyclesIsKernel (Fork.ext (asIso S.toCycles).symm (by simp)) lemma map_of_mono_of_preservesKernel (hS : S.Exact) (F : C ⥤ D) [F.PreservesZeroMorphisms] [(S.map F).HasHomology] (_ : Mono S.f) (_ : PreservesLimit (parallelPair S.g 0) F) : (S.map F).Exact := exact_of_f_is_kernel _ (KernelFork.mapIsLimit _ hS.fIsKernel F) /-- In a balanced category, if a short complex `S` is exact and `S.g` is an epi, then `S.X₃` is the cokernel of `S.g`. -/ noncomputable def gIsCokernel (hS : S.Exact) [Epi S.g] : IsColimit (CokernelCofork.ofπ S.g S.zero) := by have := hS.hasHomology have := hS.isIso_fromOpcycles exact IsColimit.ofIsoColimit S.opcyclesIsCokernel (Cofork.ext (asIso S.fromOpcycles) (by simp)) lemma map_of_epi_of_preservesCokernel (hS : S.Exact) (F : C ⥤ D) [F.PreservesZeroMorphisms] [(S.map F).HasHomology] (_ : Epi S.g) (_ : PreservesColimit (parallelPair S.f 0) F) : (S.map F).Exact := exact_of_g_is_cokernel _ (CokernelCofork.mapIsColimit _ hS.gIsCokernel F) /-- If a short complex `S` in a balanced category is exact and such that `S.f` is a mono, then a morphism `k : A ⟶ S.X₂` such that `k ≫ S.g = 0` lifts to a morphism `A ⟶ S.X₁`. -/ noncomputable def lift (hS : S.Exact) {A : C} (k : A ⟶ S.X₂) (hk : k ≫ S.g = 0) [Mono S.f] : A ⟶ S.X₁ := hS.fIsKernel.lift (KernelFork.ofι k hk) @[reassoc (attr := simp)] lemma lift_f (hS : S.Exact) {A : C} (k : A ⟶ S.X₂) (hk : k ≫ S.g = 0) [Mono S.f] : hS.lift k hk ≫ S.f = k := Fork.IsLimit.lift_ι _ lemma lift' (hS : S.Exact) {A : C} (k : A ⟶ S.X₂) (hk : k ≫ S.g = 0) [Mono S.f] : ∃ (l : A ⟶ S.X₁), l ≫ S.f = k := ⟨hS.lift k hk, by simp⟩ /-- If a short complex `S` in a balanced category is exact and such that `S.g` is an epi, then a morphism `k : S.X₂ ⟶ A` such that `S.f ≫ k = 0` descends to a morphism `S.X₃ ⟶ A`. -/ noncomputable def desc (hS : S.Exact) {A : C} (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) [Epi S.g] : S.X₃ ⟶ A := hS.gIsCokernel.desc (CokernelCofork.ofπ k hk) @[reassoc (attr := simp)] lemma g_desc (hS : S.Exact) {A : C} (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) [Epi S.g] :	S.g ≫ hS.desc k hk = k := Cofork.IsColimit.π_desc (hS.gIsCokernel)	Mathlib/Algebra/Homology/ShortComplex/Exact.lean	776	778
/- Copyright (c) 2021 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin -/ import Mathlib.Analysis.Normed.Group.Int import Mathlib.Analysis.Normed.Group.Subgroup import Mathlib.Analysis.Normed.Group.Uniform /-! # Normed groups homomorphisms This file gathers definitions and elementary constructions about bounded group homomorphisms between normed (abelian) groups (abbreviated to "normed group homs"). The main lemmas relate the boundedness condition to continuity and Lipschitzness. The main construction is to endow the type of normed group homs between two given normed groups with a group structure and a norm, giving rise to a normed group structure. We provide several simple constructions for normed group homs, like kernel, range and equalizer. Some easy other constructions are related to subgroups of normed groups. Since a lot of elementary properties don't require `‖x‖ = 0 → x = 0` we start setting up the theory of `SeminormedAddGroupHom` and we specialize to `NormedAddGroupHom` when needed. -/ noncomputable section open NNReal -- TODO: migrate to the new morphism / morphism_class style /-- A morphism of seminormed abelian groups is a bounded group homomorphism. -/ structure NormedAddGroupHom (V W : Type) [SeminormedAddCommGroup V] [SeminormedAddCommGroup W] where /-- The function underlying a `NormedAddGroupHom` -/ toFun : V → W /-- A `NormedAddGroupHom` is additive. -/ map_add' : ∀ v₁ v₂, toFun (v₁ + v₂) = toFun v₁ + toFun v₂ /-- A `NormedAddGroupHom` is bounded. -/ bound' : ∃ C, ∀ v, ‖toFun v‖ ≤ C ‖v‖ namespace AddMonoidHom variable {V W : Type} [SeminormedAddCommGroup V] [SeminormedAddCommGroup W] {f g : NormedAddGroupHom V W} /-- Associate to a group homomorphism a bounded group homomorphism under a norm control condition. See `AddMonoidHom.mkNormedAddGroupHom'` for a version that uses `ℝ≥0` for the bound. -/ def mkNormedAddGroupHom (f : V →+ W) (C : ℝ) (h : ∀ v, ‖f v‖ ≤ C ‖v‖) : NormedAddGroupHom V W := { f with bound' := ⟨C, h⟩ } /-- Associate to a group homomorphism a bounded group homomorphism under a norm control condition. See `AddMonoidHom.mkNormedAddGroupHom` for a version that uses `ℝ` for the bound. -/ def mkNormedAddGroupHom' (f : V →+ W) (C : ℝ≥0) (hC : ∀ x, ‖f x‖₊ ≤ C * ‖x‖₊) : NormedAddGroupHom V W := { f with bound' := ⟨C, hC⟩ } end AddMonoidHom theorem exists_pos_bound_of_bound {V W : Type} [SeminormedAddCommGroup V] [SeminormedAddCommGroup W] {f : V → W} (M : ℝ) (h : ∀ x, ‖f x‖ ≤ M ‖x‖) : ∃ N, 0 < N ∧ ∀ x, ‖f x‖ ≤ N * ‖x‖ := ⟨max M 1, lt_of_lt_of_le zero_lt_one (le_max_right _ _), fun x => calc ‖f x‖ ≤ M * ‖x‖ := h x _ ≤ max M 1 * ‖x‖ := by gcongr; apply le_max_left ⟩ namespace NormedAddGroupHom variable {V V₁ V₂ V₃ : Type} [SeminormedAddCommGroup V] [SeminormedAddCommGroup V₁] [SeminormedAddCommGroup V₂] [SeminormedAddCommGroup V₃] variable {f g : NormedAddGroupHom V₁ V₂} /-- A Lipschitz continuous additive homomorphism is a normed additive group homomorphism. -/ def ofLipschitz (f : V₁ →+ V₂) {K : ℝ≥0} (h : LipschitzWith K f) : NormedAddGroupHom V₁ V₂ := f.mkNormedAddGroupHom K fun x ↦ by simpa only [map_zero, dist_zero_right] using h.dist_le_mul x 0 instance funLike : FunLike (NormedAddGroupHom V₁ V₂) V₁ V₂ where coe := toFun coe_injective' f g h := by cases f; cases g; congr instance toAddMonoidHomClass : AddMonoidHomClass (NormedAddGroupHom V₁ V₂) V₁ V₂ where map_add f := f.map_add' map_zero f := (AddMonoidHom.mk' f.toFun f.map_add').map_zero initialize_simps_projections NormedAddGroupHom (toFun → apply) theorem coe_inj (H : (f : V₁ → V₂) = g) : f = g := by cases f; cases g; congr theorem coe_injective : @Function.Injective (NormedAddGroupHom V₁ V₂) (V₁ → V₂) toFun := by apply coe_inj theorem coe_inj_iff : f = g ↔ (f : V₁ → V₂) = g := ⟨congr_arg _, coe_inj⟩ @[ext] theorem ext (H : ∀ x, f x = g x) : f = g := coe_inj <\| funext H variable (f g) @[simp] theorem toFun_eq_coe : f.toFun = f := rfl theorem coe_mk (f) (h₁) (h₂) (h₃) : ⇑(⟨f, h₁, h₂, h₃⟩ : NormedAddGroupHom V₁ V₂) = f := rfl @[simp] theorem coe_mkNormedAddGroupHom (f : V₁ →+ V₂) (C) (hC) : ⇑(f.mkNormedAddGroupHom C hC) = f := rfl @[simp] theorem coe_mkNormedAddGroupHom' (f : V₁ →+ V₂) (C) (hC) : ⇑(f.mkNormedAddGroupHom' C hC) = f := rfl /-- The group homomorphism underlying a bounded group homomorphism. -/ def toAddMonoidHom (f : NormedAddGroupHom V₁ V₂) : V₁ →+ V₂ := AddMonoidHom.mk' f f.map_add' @[simp] theorem coe_toAddMonoidHom : ⇑f.toAddMonoidHom = f := rfl theorem toAddMonoidHom_injective : Function.Injective (@NormedAddGroupHom.toAddMonoidHom V₁ V₂ _ _) := fun f g h => coe_inj <\| by rw [← coe_toAddMonoidHom f, ← coe_toAddMonoidHom g, h] @[simp] theorem mk_toAddMonoidHom (f) (h₁) (h₂) : (⟨f, h₁, h₂⟩ : NormedAddGroupHom V₁ V₂).toAddMonoidHom = AddMonoidHom.mk' f h₁ := rfl theorem bound : ∃ C, 0 < C ∧ ∀ x, ‖f x‖ ≤ C ‖x‖ := let ⟨_C, hC⟩ := f.bound' exists_pos_bound_of_bound _ hC theorem antilipschitz_of_norm_ge {K : ℝ≥0} (h : ∀ x, ‖x‖ ≤ K * ‖f x‖) : AntilipschitzWith K f := AntilipschitzWith.of_le_mul_dist fun x y => by simpa only [dist_eq_norm, map_sub] using h (x - y) /-- A normed group hom is surjective on the subgroup `K` with constant `C` if every element `x` of `K` has a preimage whose norm is bounded above by `C‖x‖`. This is a more abstract version of `f` having a right inverse defined on `K` with operator norm at most `C`. -/ def SurjectiveOnWith (f : NormedAddGroupHom V₁ V₂) (K : AddSubgroup V₂) (C : ℝ) : Prop := ∀ h ∈ K, ∃ g, f g = h ∧ ‖g‖ ≤ C ‖h‖ theorem SurjectiveOnWith.mono {f : NormedAddGroupHom V₁ V₂} {K : AddSubgroup V₂} {C C' : ℝ} (h : f.SurjectiveOnWith K C) (H : C ≤ C') : f.SurjectiveOnWith K C' := by intro k k_in rcases h k k_in with ⟨g, rfl, hg⟩ use g, rfl by_cases Hg : ‖f g‖ = 0 · simpa [Hg] using hg · exact hg.trans (by gcongr) theorem SurjectiveOnWith.exists_pos {f : NormedAddGroupHom V₁ V₂} {K : AddSubgroup V₂} {C : ℝ} (h : f.SurjectiveOnWith K C) : ∃ C' > 0, f.SurjectiveOnWith K C' := by refine ⟨\|C\| + 1, ?_, ?_⟩ · linarith [abs_nonneg C] · apply h.mono linarith [le_abs_self C] theorem SurjectiveOnWith.surjOn {f : NormedAddGroupHom V₁ V₂} {K : AddSubgroup V₂} {C : ℝ} (h : f.SurjectiveOnWith K C) : Set.SurjOn f Set.univ K := fun x hx => (h x hx).imp fun _a ⟨ha, _⟩ => ⟨Set.mem_univ _, ha⟩ /-! ### The operator norm -/ /-- The operator norm of a seminormed group homomorphism is the inf of all its bounds. -/ def opNorm (f : NormedAddGroupHom V₁ V₂) := sInf { c \| 0 ≤ c ∧ ∀ x, ‖f x‖ ≤ c * ‖x‖ } instance hasOpNorm : Norm (NormedAddGroupHom V₁ V₂) := ⟨opNorm⟩ theorem norm_def : ‖f‖ = sInf { c \| 0 ≤ c ∧ ∀ x, ‖f x‖ ≤ c * ‖x‖ } := rfl -- So that invocations of `le_csInf` make sense: we show that the set of -- bounds is nonempty and bounded below. theorem bounds_nonempty {f : NormedAddGroupHom V₁ V₂} : ∃ c, c ∈ { c \| 0 ≤ c ∧ ∀ x, ‖f x‖ ≤ c * ‖x‖ } := let ⟨M, hMp, hMb⟩ := f.bound ⟨M, le_of_lt hMp, hMb⟩ theorem bounds_bddBelow {f : NormedAddGroupHom V₁ V₂} : BddBelow { c \| 0 ≤ c ∧ ∀ x, ‖f x‖ ≤ c * ‖x‖ } := ⟨0, fun _ ⟨hn, _⟩ => hn⟩ theorem opNorm_nonneg : 0 ≤ ‖f‖ := le_csInf bounds_nonempty fun _ ⟨hx, _⟩ => hx /-- The fundamental property of the operator norm: `‖f x‖ ≤ ‖f‖ * ‖x‖`. -/ theorem le_opNorm (x : V₁) : ‖f x‖ ≤ ‖f‖ * ‖x‖ := by obtain ⟨C, _Cpos, hC⟩ := f.bound replace hC := hC x by_cases h : ‖x‖ = 0 · rwa [h, mul_zero] at hC ⊢ have hlt : 0 < ‖x‖ := lt_of_le_of_ne (norm_nonneg x) (Ne.symm h) exact (div_le_iff₀ hlt).mp (le_csInf bounds_nonempty fun c ⟨_, hc⟩ => (div_le_iff₀ hlt).mpr <\| by apply hc) theorem le_opNorm_of_le {c : ℝ} {x} (h : ‖x‖ ≤ c) : ‖f x‖ ≤ ‖f‖ * c := le_trans (f.le_opNorm x) (by gcongr; exact f.opNorm_nonneg) theorem le_of_opNorm_le {c : ℝ} (h : ‖f‖ ≤ c) (x : V₁) : ‖f x‖ ≤ c * ‖x‖ := (f.le_opNorm x).trans (by gcongr) /-- continuous linear maps are Lipschitz continuous. -/ theorem lipschitz : LipschitzWith ⟨‖f‖, opNorm_nonneg f⟩ f := LipschitzWith.of_dist_le_mul fun x y => by rw [dist_eq_norm, dist_eq_norm, ← map_sub] apply le_opNorm protected theorem uniformContinuous (f : NormedAddGroupHom V₁ V₂) : UniformContinuous f := f.lipschitz.uniformContinuous @[continuity] protected theorem continuous (f : NormedAddGroupHom V₁ V₂) : Continuous f := f.uniformContinuous.continuous instance : ContinuousMapClass (NormedAddGroupHom V₁ V₂) V₁ V₂ where map_continuous := fun f => f.continuous theorem ratio_le_opNorm (x : V₁) : ‖f x‖ / ‖x‖ ≤ ‖f‖ := div_le_of_le_mul₀ (norm_nonneg _) f.opNorm_nonneg (le_opNorm _ _) /-- If one controls the norm of every `f x`, then one controls the norm of `f`. -/ theorem opNorm_le_bound {M : ℝ} (hMp : 0 ≤ M) (hM : ∀ x, ‖f x‖ ≤ M * ‖x‖) : ‖f‖ ≤ M := csInf_le bounds_bddBelow ⟨hMp, hM⟩ theorem opNorm_eq_of_bounds {M : ℝ} (M_nonneg : 0 ≤ M) (h_above : ∀ x, ‖f x‖ ≤ M * ‖x‖) (h_below : ∀ N ≥ 0, (∀ x, ‖f x‖ ≤ N * ‖x‖) → M ≤ N) : ‖f‖ = M := le_antisymm (f.opNorm_le_bound M_nonneg h_above) ((le_csInf_iff NormedAddGroupHom.bounds_bddBelow ⟨M, M_nonneg, h_above⟩).mpr fun N ⟨N_nonneg, hN⟩ => h_below N N_nonneg hN) theorem opNorm_le_of_lipschitz {f : NormedAddGroupHom V₁ V₂} {K : ℝ≥0} (hf : LipschitzWith K f) : ‖f‖ ≤ K := f.opNorm_le_bound K.2 fun x => by simpa only [dist_zero_right, map_zero] using hf.dist_le_mul x 0 /-- If a bounded group homomorphism map is constructed from a group homomorphism via the constructor `AddMonoidHom.mkNormedAddGroupHom`, then its norm is bounded by the bound given to the constructor if it is nonnegative. -/ theorem mkNormedAddGroupHom_norm_le (f : V₁ →+ V₂) {C : ℝ} (hC : 0 ≤ C) (h : ∀ x, ‖f x‖ ≤ C * ‖x‖) : ‖f.mkNormedAddGroupHom C h‖ ≤ C := opNorm_le_bound _ hC h /-- If a bounded group homomorphism map is constructed from a group homomorphism via the constructor `NormedAddGroupHom.ofLipschitz`, then its norm is bounded by the bound given to the constructor. -/ theorem ofLipschitz_norm_le (f : V₁ →+ V₂) {K : ℝ≥0} (h : LipschitzWith K f) : ‖ofLipschitz f h‖ ≤ K := mkNormedAddGroupHom_norm_le f K.coe_nonneg _ /-- If a bounded group homomorphism map is constructed from a group homomorphism via the constructor `AddMonoidHom.mkNormedAddGroupHom`, then its norm is bounded by the bound given to the constructor or zero if this bound is negative. -/ theorem mkNormedAddGroupHom_norm_le' (f : V₁ →+ V₂) {C : ℝ} (h : ∀ x, ‖f x‖ ≤ C * ‖x‖) : ‖f.mkNormedAddGroupHom C h‖ ≤ max C 0 := opNorm_le_bound _ (le_max_right _ _) fun x => (h x).trans <\| by gcongr; apply le_max_left alias _root_.AddMonoidHom.mkNormedAddGroupHom_norm_le := mkNormedAddGroupHom_norm_le alias _root_.AddMonoidHom.mkNormedAddGroupHom_norm_le' := mkNormedAddGroupHom_norm_le' /-! ### Addition of normed group homs -/ /-- Addition of normed group homs. -/ instance add : Add (NormedAddGroupHom V₁ V₂) := ⟨fun f g => (f.toAddMonoidHom + g.toAddMonoidHom).mkNormedAddGroupHom (‖f‖ + ‖g‖) fun v => calc ‖f v + g v‖ ≤ ‖f v‖ + ‖g v‖ := norm_add_le _ _ _ ≤ ‖f‖ * ‖v‖ + ‖g‖ * ‖v‖ := by gcongr <;> apply le_opNorm _ = (‖f‖ + ‖g‖) * ‖v‖ := by rw [add_mul] ⟩ /-- The operator norm satisfies the triangle inequality. -/ theorem opNorm_add_le : ‖f + g‖ ≤ ‖f‖ + ‖g‖ := mkNormedAddGroupHom_norm_le _ (add_nonneg (opNorm_nonneg _) (opNorm_nonneg _)) _ @[simp] theorem coe_add (f g : NormedAddGroupHom V₁ V₂) : ⇑(f + g) = f + g := rfl @[simp] theorem add_apply (f g : NormedAddGroupHom V₁ V₂) (v : V₁) : (f + g) v = f v + g v := rfl /-! ### The zero normed group hom -/ instance zero : Zero (NormedAddGroupHom V₁ V₂) := ⟨(0 : V₁ →+ V₂).mkNormedAddGroupHom 0 (by simp)⟩ instance inhabited : Inhabited (NormedAddGroupHom V₁ V₂) := ⟨0⟩ /-- The norm of the `0` operator is `0`. -/ theorem opNorm_zero : ‖(0 : NormedAddGroupHom V₁ V₂)‖ = 0 := le_antisymm (csInf_le bounds_bddBelow ⟨ge_of_eq rfl, fun _ => le_of_eq (by rw [zero_mul] exact norm_zero)⟩) (opNorm_nonneg _) /-- For normed groups, an operator is zero iff its norm vanishes. -/ theorem opNorm_zero_iff {V₁ V₂ : Type} [NormedAddCommGroup V₁] [NormedAddCommGroup V₂] {f : NormedAddGroupHom V₁ V₂} : ‖f‖ = 0 ↔ f = 0 := Iff.intro (fun hn => ext fun x => norm_le_zero_iff.1 (calc _ ≤ ‖f‖ ‖x‖ := le_opNorm _ _ _ = _ := by rw [hn, zero_mul] )) fun hf => by rw [hf, opNorm_zero] @[simp] theorem coe_zero : ⇑(0 : NormedAddGroupHom V₁ V₂) = 0 := rfl @[simp] theorem zero_apply (v : V₁) : (0 : NormedAddGroupHom V₁ V₂) v = 0 := rfl variable {f g} /-! ### The identity normed group hom -/ variable (V) /-- The identity as a continuous normed group hom. -/ @[simps!] def id : NormedAddGroupHom V V := (AddMonoidHom.id V).mkNormedAddGroupHom 1 (by simp [le_refl]) /-- The norm of the identity is at most `1`. It is in fact `1`, except when the norm of every element vanishes, where it is `0`. (Since we are working with seminorms this can happen even if the space is non-trivial.) It means that one can not do better than an inequality in general. -/ theorem norm_id_le : ‖(id V : NormedAddGroupHom V V)‖ ≤ 1 := opNorm_le_bound _ zero_le_one fun x => by simp /-- If there is an element with norm different from `0`, then the norm of the identity equals `1`. (Since we are working with seminorms supposing that the space is non-trivial is not enough.) -/ theorem norm_id_of_nontrivial_seminorm (h : ∃ x : V, ‖x‖ ≠ 0) : ‖id V‖ = 1 := le_antisymm (norm_id_le V) <\| by let ⟨x, hx⟩ := h have := (id V).ratio_le_opNorm x rwa [id_apply, div_self hx] at this /-- If a normed space is non-trivial, then the norm of the identity equals `1`. -/ theorem norm_id {V : Type} [NormedAddCommGroup V] [Nontrivial V] : ‖id V‖ = 1 := by refine norm_id_of_nontrivial_seminorm V ?_ obtain ⟨x, hx⟩ := exists_ne (0 : V) exact ⟨x, ne_of_gt (norm_pos_iff.2 hx)⟩ theorem coe_id : (NormedAddGroupHom.id V : V → V) = _root_.id := rfl /-! ### The negation of a normed group hom -/ /-- Opposite of a normed group hom. -/ instance neg : Neg (NormedAddGroupHom V₁ V₂) := ⟨fun f => (-f.toAddMonoidHom).mkNormedAddGroupHom ‖f‖ fun v => by simp [le_opNorm f v]⟩ @[simp] theorem coe_neg (f : NormedAddGroupHom V₁ V₂) : ⇑(-f) = -f := rfl @[simp] theorem neg_apply (f : NormedAddGroupHom V₁ V₂) (v : V₁) : (-f : NormedAddGroupHom V₁ V₂) v = -f v := rfl theorem opNorm_neg (f : NormedAddGroupHom V₁ V₂) : ‖-f‖ = ‖f‖ := by simp only [norm_def, coe_neg, norm_neg, Pi.neg_apply] /-! ### Subtraction of normed group homs -/ /-- Subtraction of normed group homs. -/ instance sub : Sub (NormedAddGroupHom V₁ V₂) := ⟨fun f g => { f.toAddMonoidHom - g.toAddMonoidHom with bound' := by simp only [AddMonoidHom.sub_apply, AddMonoidHom.toFun_eq_coe, sub_eq_add_neg] exact (f + -g).bound' }⟩ @[simp] theorem coe_sub (f g : NormedAddGroupHom V₁ V₂) : ⇑(f - g) = f - g := rfl @[simp] theorem sub_apply (f g : NormedAddGroupHom V₁ V₂) (v : V₁) : (f - g : NormedAddGroupHom V₁ V₂) v = f v - g v := rfl /-! ### Scalar actions on normed group homs -/ section SMul variable {R R' : Type} [MonoidWithZero R] [DistribMulAction R V₂] [PseudoMetricSpace R] [IsBoundedSMul R V₂] [MonoidWithZero R'] [DistribMulAction R' V₂] [PseudoMetricSpace R'] [IsBoundedSMul R' V₂] instance smul : SMul R (NormedAddGroupHom V₁ V₂) where smul r f := { toFun := r • ⇑f map_add' := (r • f.toAddMonoidHom).map_add' bound' := let ⟨b, hb⟩ := f.bound' ⟨dist r 0 * b, fun x => by have := dist_smul_pair r (f x) (f 0) rw [map_zero, smul_zero, dist_zero_right, dist_zero_right] at this rw [mul_assoc] refine this.trans ?_ gcongr exact hb x⟩ } @[simp] theorem coe_smul (r : R) (f : NormedAddGroupHom V₁ V₂) : ⇑(r • f) = r • ⇑f := rfl @[simp] theorem smul_apply (r : R) (f : NormedAddGroupHom V₁ V₂) (v : V₁) : (r • f) v = r • f v := rfl instance smulCommClass [SMulCommClass R R' V₂] : SMulCommClass R R' (NormedAddGroupHom V₁ V₂) where smul_comm _ _ _ := ext fun _ => smul_comm _ _ _ instance isScalarTower [SMul R R'] [IsScalarTower R R' V₂] : IsScalarTower R R' (NormedAddGroupHom V₁ V₂) where smul_assoc _ _ _ := ext fun _ => smul_assoc _ _ _ instance isCentralScalar [DistribMulAction Rᵐᵒᵖ V₂] [IsCentralScalar R V₂] : IsCentralScalar R (NormedAddGroupHom V₁ V₂) where op_smul_eq_smul _ _ := ext fun _ => op_smul_eq_smul _ _ end SMul instance nsmul : SMul ℕ (NormedAddGroupHom V₁ V₂) where smul n f := { toFun := n • ⇑f map_add' := (n • f.toAddMonoidHom).map_add' bound' := let ⟨b, hb⟩ := f.bound' ⟨n • b, fun v => by rw [Pi.smul_apply, nsmul_eq_mul, mul_assoc] exact norm_nsmul_le.trans (by gcongr; apply hb)⟩ } @[simp] theorem coe_nsmul (r : ℕ) (f : NormedAddGroupHom V₁ V₂) : ⇑(r • f) = r • ⇑f := rfl @[simp] theorem nsmul_apply (r : ℕ) (f : NormedAddGroupHom V₁ V₂) (v : V₁) : (r • f) v = r • f v := rfl instance zsmul : SMul ℤ (NormedAddGroupHom V₁ V₂) where smul z f := { toFun := z • ⇑f map_add' := (z • f.toAddMonoidHom).map_add' bound' := let ⟨b, hb⟩ := f.bound' ⟨‖z‖ • b, fun v => by rw [Pi.smul_apply, smul_eq_mul, mul_assoc] exact (norm_zsmul_le _ _).trans (by gcongr; apply hb)⟩ } @[simp] theorem coe_zsmul (r : ℤ) (f : NormedAddGroupHom V₁ V₂) : ⇑(r • f) = r • ⇑f := rfl @[simp] theorem zsmul_apply (r : ℤ) (f : NormedAddGroupHom V₁ V₂) (v : V₁) : (r • f) v = r • f v := rfl /-! ### Normed group structure on normed group homs -/ /-- Homs between two given normed groups form a commutative additive group. -/ instance toAddCommGroup : AddCommGroup (NormedAddGroupHom V₁ V₂) := coe_injective.addCommGroup _ rfl (fun _ _ => rfl) (fun _ => rfl) (fun _ _ => rfl) (fun _ _ => rfl) fun _ _ => rfl /-- Normed group homomorphisms themselves form a seminormed group with respect to the operator norm. -/ instance toSeminormedAddCommGroup : SeminormedAddCommGroup (NormedAddGroupHom V₁ V₂) := AddGroupSeminorm.toSeminormedAddCommGroup { toFun := opNorm map_zero' := opNorm_zero neg' := opNorm_neg add_le' := opNorm_add_le } /-- Normed group homomorphisms themselves form a normed group with respect to the operator norm. -/ instance toNormedAddCommGroup {V₁ V₂ : Type} [NormedAddCommGroup V₁] [NormedAddCommGroup V₂] : NormedAddCommGroup (NormedAddGroupHom V₁ V₂) := AddGroupNorm.toNormedAddCommGroup { toFun := opNorm map_zero' := opNorm_zero neg' := opNorm_neg add_le' := opNorm_add_le eq_zero_of_map_eq_zero' := fun _f => opNorm_zero_iff.1 } /-- Coercion of a `NormedAddGroupHom` is an `AddMonoidHom`. Similar to `AddMonoidHom.coeFn`. -/ @[simps] def coeAddHom : NormedAddGroupHom V₁ V₂ →+ V₁ → V₂ where toFun := DFunLike.coe map_zero' := coe_zero map_add' := coe_add @[simp] theorem coe_sum {ι : Type} (s : Finset ι) (f : ι → NormedAddGroupHom V₁ V₂) : ⇑(∑ i ∈ s, f i) = ∑ i ∈ s, (f i : V₁ → V₂) := map_sum coeAddHom f s theorem sum_apply {ι : Type} (s : Finset ι) (f : ι → NormedAddGroupHom V₁ V₂) (v : V₁) : (∑ i ∈ s, f i) v = ∑ i ∈ s, f i v := by simp only [coe_sum, Finset.sum_apply] /-! ### Module structure on normed group homs -/ instance distribMulAction {R : Type} [MonoidWithZero R] [DistribMulAction R V₂] [PseudoMetricSpace R] [IsBoundedSMul R V₂] : DistribMulAction R (NormedAddGroupHom V₁ V₂) := Function.Injective.distribMulAction coeAddHom coe_injective coe_smul instance module {R : Type} [Semiring R] [Module R V₂] [PseudoMetricSpace R] [IsBoundedSMul R V₂] : Module R (NormedAddGroupHom V₁ V₂) := Function.Injective.module _ coeAddHom coe_injective coe_smul /-! ### Composition of normed group homs -/ /-- The composition of continuous normed group homs. -/ @[simps!] protected def comp (g : NormedAddGroupHom V₂ V₃) (f : NormedAddGroupHom V₁ V₂) : NormedAddGroupHom V₁ V₃ := (g.toAddMonoidHom.comp f.toAddMonoidHom).mkNormedAddGroupHom (‖g‖ ‖f‖) fun v => calc ‖g (f v)‖ ≤ ‖g‖ * ‖f v‖ := le_opNorm _ _ _ ≤ ‖g‖ * (‖f‖ * ‖v‖) := by gcongr; apply le_opNorm _ = ‖g‖ * ‖f‖ * ‖v‖ := by rw [mul_assoc] theorem norm_comp_le (g : NormedAddGroupHom V₂ V₃) (f : NormedAddGroupHom V₁ V₂) : ‖g.comp f‖ ≤ ‖g‖ * ‖f‖ := mkNormedAddGroupHom_norm_le _ (mul_nonneg (opNorm_nonneg _) (opNorm_nonneg _)) _ theorem norm_comp_le_of_le {g : NormedAddGroupHom V₂ V₃} {C₁ C₂ : ℝ} (hg : ‖g‖ ≤ C₂) (hf : ‖f‖ ≤ C₁) : ‖g.comp f‖ ≤ C₂ * C₁ := le_trans (norm_comp_le g f) <\| by gcongr; exact le_trans (norm_nonneg _) hg theorem norm_comp_le_of_le' {g : NormedAddGroupHom V₂ V₃} (C₁ C₂ C₃ : ℝ) (h : C₃ = C₂ * C₁) (hg : ‖g‖ ≤ C₂) (hf : ‖f‖ ≤ C₁) : ‖g.comp f‖ ≤ C₃ := by rw [h] exact norm_comp_le_of_le hg hf /-- Composition of normed groups hom as an additive group morphism. -/ def compHom : NormedAddGroupHom V₂ V₃ →+ NormedAddGroupHom V₁ V₂ →+ NormedAddGroupHom V₁ V₃ := AddMonoidHom.mk' (fun g => AddMonoidHom.mk' (fun f => g.comp f) (by intros ext exact map_add g _ _)) (by intros ext simp only [comp_apply, Pi.add_apply, Function.comp_apply, AddMonoidHom.add_apply, AddMonoidHom.mk'_apply, coe_add]) @[simp] theorem comp_zero (f : NormedAddGroupHom V₂ V₃) : f.comp (0 : NormedAddGroupHom V₁ V₂) = 0 := by ext exact map_zero f @[simp] theorem zero_comp (f : NormedAddGroupHom V₁ V₂) : (0 : NormedAddGroupHom V₂ V₃).comp f = 0 := by ext rfl theorem comp_assoc {V₄ : Type} [SeminormedAddCommGroup V₄] (h : NormedAddGroupHom V₃ V₄) (g : NormedAddGroupHom V₂ V₃) (f : NormedAddGroupHom V₁ V₂) : (h.comp g).comp f = h.comp (g.comp f) := by ext rfl theorem coe_comp (f : NormedAddGroupHom V₁ V₂) (g : NormedAddGroupHom V₂ V₃) : (g.comp f : V₁ → V₃) = (g : V₂ → V₃) ∘ (f : V₁ → V₂) := rfl end NormedAddGroupHom namespace NormedAddGroupHom variable {V W V₁ V₂ V₃ : Type} [SeminormedAddCommGroup V] [SeminormedAddCommGroup W] [SeminormedAddCommGroup V₁] [SeminormedAddCommGroup V₂] [SeminormedAddCommGroup V₃] /-- The inclusion of an `AddSubgroup`, as bounded group homomorphism. -/ @[simps!] def incl (s : AddSubgroup V) : NormedAddGroupHom s V where toFun := (Subtype.val : s → V) map_add' _ _ := AddSubgroup.coe_add _ _ _ bound' := ⟨1, fun v => by rw [one_mul, AddSubgroup.coe_norm]⟩ theorem norm_incl {V' : AddSubgroup V} (x : V') : ‖incl _ x‖ = ‖x‖ := rfl /-!### Kernel -/ section Kernels variable (f : NormedAddGroupHom V₁ V₂) (g : NormedAddGroupHom V₂ V₃) /-- The kernel of a bounded group homomorphism. Naturally endowed with a `SeminormedAddCommGroup` instance. -/ def ker : AddSubgroup V₁ := f.toAddMonoidHom.ker theorem mem_ker (v : V₁) : v ∈ f.ker ↔ f v = 0 := by rw [ker, f.toAddMonoidHom.mem_ker, coe_toAddMonoidHom] /-- Given a normed group hom `f : V₁ → V₂` satisfying `g.comp f = 0` for some `g : V₂ → V₃`, the corestriction of `f` to the kernel of `g`. -/ @[simps] def ker.lift (h : g.comp f = 0) : NormedAddGroupHom V₁ g.ker where toFun v := ⟨f v, by rw [g.mem_ker, ← comp_apply g f, h, zero_apply]⟩ map_add' v w := by simp only [map_add, AddMemClass.mk_add_mk] bound' := f.bound' @[simp] theorem ker.incl_comp_lift (h : g.comp f = 0) : (incl g.ker).comp (ker.lift f g h) = f := by ext rfl @[simp] theorem ker_zero : (0 : NormedAddGroupHom V₁ V₂).ker = ⊤ := by ext simp [mem_ker] theorem coe_ker : (f.ker : Set V₁) = (f : V₁ → V₂) ⁻¹' {0} := rfl theorem isClosed_ker {V₂ : Type} [NormedAddCommGroup V₂] (f : NormedAddGroupHom V₁ V₂) : IsClosed (f.ker : Set V₁) := f.coe_ker ▸ IsClosed.preimage f.continuous (T1Space.t1 0) end Kernels /-! ### Range -/ section Range variable (f : NormedAddGroupHom V₁ V₂) (g : NormedAddGroupHom V₂ V₃) /-- The image of a bounded group homomorphism. Naturally endowed with a `SeminormedAddCommGroup` instance. -/ def range : AddSubgroup V₂ := f.toAddMonoidHom.range theorem mem_range (v : V₂) : v ∈ f.range ↔ ∃ w, f w = v := Iff.rfl @[simp] theorem mem_range_self (v : V₁) : f v ∈ f.range := ⟨v, rfl⟩ theorem comp_range : (g.comp f).range = AddSubgroup.map g.toAddMonoidHom f.range := by unfold range rw [AddMonoidHom.map_range] rfl theorem incl_range (s : AddSubgroup V₁) : (incl s).range = s := by ext x exact ⟨fun ⟨y, hy⟩ => by rw [← hy]; simp, fun hx => ⟨⟨x, hx⟩, by simp⟩⟩ @[simp] theorem range_comp_incl_top : (f.comp (incl (⊤ : AddSubgroup V₁))).range = f.range := by simp [comp_range, incl_range, ← AddMonoidHom.range_eq_map]; rfl end Range variable {f : NormedAddGroupHom V W} /-- A `NormedAddGroupHom` is norm-nonincreasing* if `‖f v‖ ≤ ‖v‖` for all `v`. -/ def NormNoninc (f : NormedAddGroupHom V W) : Prop := ∀ v, ‖f v‖ ≤ ‖v‖ namespace NormNoninc theorem normNoninc_iff_norm_le_one : f.NormNoninc ↔ ‖f‖ ≤ 1 := by refine ⟨fun h => ?_, fun h => fun v => ?_⟩ · refine opNorm_le_bound _ zero_le_one fun v => ?_ simpa [one_mul] using h v · simpa using le_of_opNorm_le f h v theorem zero : (0 : NormedAddGroupHom V₁ V₂).NormNoninc := fun v => by simp theorem id : (id V).NormNoninc := fun _v => le_rfl theorem comp {g : NormedAddGroupHom V₂ V₃} {f : NormedAddGroupHom V₁ V₂} (hg : g.NormNoninc) (hf : f.NormNoninc) : (g.comp f).NormNoninc := fun v => (hg (f v)).trans (hf v) @[simp] theorem neg_iff {f : NormedAddGroupHom V₁ V₂} : (-f).NormNoninc ↔ f.NormNoninc := ⟨fun h x => by simpa using h x, fun h x => (norm_neg (f x)).le.trans (h x)⟩ end NormNoninc section Isometry theorem norm_eq_of_isometry {f : NormedAddGroupHom V W} (hf : Isometry f) (v : V) : ‖f v‖ = ‖v‖ := (AddMonoidHomClass.isometry_iff_norm f).mp hf v theorem isometry_id : @Isometry V V _ _ (id V) := _root_.isometry_id theorem isometry_comp {g : NormedAddGroupHom V₂ V₃} {f : NormedAddGroupHom V₁ V₂} (hg : Isometry g) (hf : Isometry f) : Isometry (g.comp f) := hg.comp hf theorem normNoninc_of_isometry (hf : Isometry f) : f.NormNoninc := fun v => le_of_eq <\| norm_eq_of_isometry hf v end Isometry variable {W₁ W₂ W₃ : Type*} [SeminormedAddCommGroup W₁] [SeminormedAddCommGroup W₂] [SeminormedAddCommGroup W₃] variable (f) (g : NormedAddGroupHom V W) variable {f₁ g₁ : NormedAddGroupHom V₁ W₁} variable {f₂ g₂ : NormedAddGroupHom V₂ W₂} variable {f₃ g₃ : NormedAddGroupHom V₃ W₃} /-- The equalizer of two morphisms `f g : NormedAddGroupHom V W`. -/ def equalizer := (f - g).ker namespace Equalizer /-- The inclusion of `f.equalizer g` as a `NormedAddGroupHom`. -/ def ι : NormedAddGroupHom (f.equalizer g) V := incl _ theorem comp_ι_eq : f.comp (ι f g) = g.comp (ι f g) := by ext x rw [comp_apply, comp_apply, ← sub_eq_zero, ← NormedAddGroupHom.sub_apply] exact x.2 variable {f g} /-- If `φ : NormedAddGroupHom V₁ V` is such that `f.comp φ = g.comp φ`, the induced morphism `NormedAddGroupHom V₁ (f.equalizer g)`. -/ @[simps] def lift (φ : NormedAddGroupHom V₁ V) (h : f.comp φ = g.comp φ) : NormedAddGroupHom V₁ (f.equalizer g) where toFun v := ⟨φ v, show (f - g) (φ v) = 0 by rw [NormedAddGroupHom.sub_apply, sub_eq_zero, ← comp_apply, h, comp_apply]⟩ map_add' v₁ v₂ := by ext simp only [map_add, AddSubgroup.coe_add, Subtype.coe_mk] bound' := by obtain ⟨C, _C_pos, hC⟩ := φ.bound exact ⟨C, hC⟩ @[simp] theorem ι_comp_lift (φ : NormedAddGroupHom V₁ V) (h : f.comp φ = g.comp φ) : (ι _ _).comp (lift φ h) = φ := by ext rfl /-- The lifting property of the equalizer as an equivalence. -/ @[simps] def liftEquiv : { φ : NormedAddGroupHom V₁ V // f.comp φ = g.comp φ } ≃ NormedAddGroupHom V₁ (f.equalizer g) where toFun φ := lift φ φ.prop invFun ψ := ⟨(ι f g).comp ψ, by rw [← comp_assoc, ← comp_assoc, comp_ι_eq]⟩ left_inv φ := by simp right_inv ψ := by ext rfl /-- Given `φ : NormedAddGroupHom V₁ V₂` and `ψ : NormedAddGroupHom W₁ W₂` such that `ψ.comp f₁ = f₂.comp φ` and `ψ.comp g₁ = g₂.comp φ`, the induced morphism `NormedAddGroupHom (f₁.equalizer g₁) (f₂.equalizer g₂)`. -/ def map (φ : NormedAddGroupHom V₁ V₂) (ψ : NormedAddGroupHom W₁ W₂) (hf : ψ.comp f₁ = f₂.comp φ) (hg : ψ.comp g₁ = g₂.comp φ) : NormedAddGroupHom (f₁.equalizer g₁) (f₂.equalizer g₂) := lift (φ.comp <\| ι _ _) <\| by simp only [← comp_assoc, ← hf, ← hg] simp only [comp_assoc, comp_ι_eq f₁ g₁] variable {φ : NormedAddGroupHom V₁ V₂} {ψ : NormedAddGroupHom W₁ W₂} variable {φ' : NormedAddGroupHom V₂ V₃} {ψ' : NormedAddGroupHom W₂ W₃} @[simp] theorem ι_comp_map (hf : ψ.comp f₁ = f₂.comp φ) (hg : ψ.comp g₁ = g₂.comp φ) : (ι f₂ g₂).comp (map φ ψ hf hg) = φ.comp (ι f₁ g₁) := ι_comp_lift _ _ @[simp] theorem map_id : map (f₂ := f₁) (g₂ := g₁) (id V₁) (id W₁) rfl rfl = id (f₁.equalizer g₁) := by ext rfl theorem comm_sq₂ (hf : ψ.comp f₁ = f₂.comp φ) (hf' : ψ'.comp f₂ = f₃.comp φ') : (ψ'.comp ψ).comp f₁ = f₃.comp (φ'.comp φ) := by rw [comp_assoc, hf, ← comp_assoc, hf', comp_assoc] theorem map_comp_map (hf : ψ.comp f₁ = f₂.comp φ) (hg : ψ.comp g₁ = g₂.comp φ) (hf' : ψ'.comp f₂ = f₃.comp φ') (hg' : ψ'.comp g₂ = g₃.comp φ') : (map φ' ψ' hf' hg').comp (map φ ψ hf hg) = map (φ'.comp φ) (ψ'.comp ψ) (comm_sq₂ hf hf') (comm_sq₂ hg hg') := by ext rfl theorem ι_normNoninc : (ι f g).NormNoninc := fun _v => le_rfl /-- The lifting of a norm nonincreasing morphism is norm nonincreasing. -/ theorem lift_normNoninc (φ : NormedAddGroupHom V₁ V) (h : f.comp φ = g.comp φ) (hφ : φ.NormNoninc) : (lift φ h).NormNoninc := hφ /-- If `φ` satisfies `‖φ‖ ≤ C`, then the same is true for the lifted morphism. -/ theorem norm_lift_le (φ : NormedAddGroupHom V₁ V) (h : f.comp φ = g.comp φ) (C : ℝ) (hφ : ‖φ‖ ≤ C) : ‖lift φ h‖ ≤ C := hφ theorem map_normNoninc (hf : ψ.comp f₁ = f₂.comp φ) (hg : ψ.comp g₁ = g₂.comp φ) (hφ : φ.NormNoninc) : (map φ ψ hf hg).NormNoninc := lift_normNoninc _ _ <\| hφ.comp ι_normNoninc theorem norm_map_le (hf : ψ.comp f₁ = f₂.comp φ) (hg : ψ.comp g₁ = g₂.comp φ) (C : ℝ) (hφ : ‖φ.comp (ι f₁ g₁)‖ ≤ C) : ‖map φ ψ hf hg‖ ≤ C := norm_lift_le _ _ _ hφ end Equalizer end NormedAddGroupHom		Mathlib/Analysis/Normed/Group/Hom.lean	964	969
/- 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.Algebra.Polynomial.Degree.CardPowDegree import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.NumberTheory.ClassNumber.AdmissibleAbsoluteValue import Mathlib.RingTheory.LocalRing.Basic /-! # Admissible absolute values on polynomials This file defines an admissible absolute value `Polynomial.cardPowDegreeIsAdmissible` which we use to show the class number of the ring of integers of a function field is finite. ## Main results * `Polynomial.cardPowDegreeIsAdmissible` shows `cardPowDegree`, mapping `p : Polynomial 𝔽_q` to `q ^ degree p`, is admissible -/ namespace Polynomial open AbsoluteValue Real variable {Fq : Type*} [Fintype Fq] /-- If `A` is a family of enough low-degree polynomials over a finite semiring, there is a pair of equal elements in `A`. -/ theorem exists_eq_polynomial [Semiring Fq] {d : ℕ} {m : ℕ} (hm : Fintype.card Fq ^ d ≤ m) (b : Fq[X]) (hb : natDegree b ≤ d) (A : Fin m.succ → Fq[X]) (hA : ∀ i, degree (A i) < degree b) : ∃ i₀ i₁, i₀ ≠ i₁ ∧ A i₁ = A i₀ := by -- Since there are > q^d elements of A, and only q^d choices for the highest `d` coefficients, -- there must be two elements of A with the same coefficients at -- `0`, ... `degree b - 1` ≤ `d - 1`. -- In other words, the following map is not injective: set f : Fin m.succ → Fin d → Fq := fun i j => (A i).coeff j have : Fintype.card (Fin d → Fq) < Fintype.card (Fin m.succ) := by simpa using lt_of_le_of_lt hm (Nat.lt_succ_self m) -- Therefore, the differences have all coefficients higher than `deg b - d` equal. obtain ⟨i₀, i₁, i_ne, i_eq⟩ := Fintype.exists_ne_map_eq_of_card_lt f this use i₀, i₁, i_ne ext j -- The coefficients higher than `deg b` are the same because they are equal to 0. by_cases hbj : degree b ≤ j · rw [coeff_eq_zero_of_degree_lt (lt_of_lt_of_le (hA _) hbj), coeff_eq_zero_of_degree_lt (lt_of_lt_of_le (hA _) hbj)] -- So we only need to look for the coefficients between `0` and `deg b`. rw [not_le] at hbj apply congr_fun i_eq.symm ⟨j, _⟩ exact lt_of_lt_of_le (coe_lt_degree.mp hbj) hb /-- If `A` is a family of enough low-degree polynomials over a finite ring, there is a pair of elements in `A` (with different indices but not necessarily distinct), such that their difference has small degree. -/ theorem exists_approx_polynomial_aux [Ring Fq] {d : ℕ} {m : ℕ} (hm : Fintype.card Fq ^ d ≤ m) (b : Fq[X]) (A : Fin m.succ → Fq[X]) (hA : ∀ i, degree (A i) < degree b) : ∃ i₀ i₁, i₀ ≠ i₁ ∧ degree (A i₁ - A i₀) < ↑(natDegree b - d) := by have hb : b ≠ 0 := by rintro rfl specialize hA 0 rw [degree_zero] at hA exact not_lt_of_le bot_le hA -- Since there are > q^d elements of A, and only q^d choices for the highest `d` coefficients, -- there must be two elements of A with the same coefficients at -- `degree b - 1`, ... `degree b - d`. -- In other words, the following map is not injective: set f : Fin m.succ → Fin d → Fq := fun i j => (A i).coeff (natDegree b - j.succ) have : Fintype.card (Fin d → Fq) < Fintype.card (Fin m.succ) := by simpa using lt_of_le_of_lt hm (Nat.lt_succ_self m) -- Therefore, the differences have all coefficients higher than `deg b - d` equal. obtain ⟨i₀, i₁, i_ne, i_eq⟩ := Fintype.exists_ne_map_eq_of_card_lt f this use i₀, i₁, i_ne refine (degree_lt_iff_coeff_zero _ _).mpr fun j hj => ?_ -- The coefficients higher than `deg b` are the same because they are equal to 0. by_cases hbj : degree b ≤ j · refine coeff_eq_zero_of_degree_lt (lt_of_lt_of_le ?_ hbj) exact lt_of_le_of_lt (degree_sub_le _ _) (max_lt (hA _) (hA _)) -- So we only need to look for the coefficients between `deg b - d` and `deg b`. rw [coeff_sub, sub_eq_zero] rw [not_le, degree_eq_natDegree hb] at hbj have hbj : j < natDegree b := (@WithBot.coe_lt_coe _ _ _).mp hbj have hj : natDegree b - j.succ < d := by by_cases hd : natDegree b < d · exact lt_of_le_of_lt tsub_le_self hd · rw [not_lt] at hd have := lt_of_le_of_lt hj (Nat.lt_succ_self j) rwa [tsub_lt_iff_tsub_lt hd hbj] at this have : j = b.natDegree - (natDegree b - j.succ).succ := by rw [← Nat.succ_sub hbj, Nat.succ_sub_succ, tsub_tsub_cancel_of_le hbj.le] convert congr_fun i_eq.symm ⟨natDegree b - j.succ, hj⟩ variable [Field Fq] /-- If `A` is a family of enough low-degree polynomials over a finite field, there is a pair of elements in `A` (with different indices but not necessarily distinct), such that the difference of their remainders is close together. -/ theorem exists_approx_polynomial {b : Fq[X]} (hb : b ≠ 0) {ε : ℝ} (hε : 0 < ε) (A : Fin (Fintype.card Fq ^ ⌈-log ε / log (Fintype.card Fq)⌉₊).succ → Fq[X]) : ∃ i₀ i₁, i₀ ≠ i₁ ∧ (cardPowDegree (A i₁ % b - A i₀ % b) : ℝ) < cardPowDegree b • ε := by have hbε : 0 < cardPowDegree b • ε := by rw [Algebra.smul_def, eq_intCast] exact mul_pos (Int.cast_pos.mpr (AbsoluteValue.pos _ hb)) hε have one_lt_q : 1 < Fintype.card Fq := Fintype.one_lt_card have one_lt_q' : (1 : ℝ) < Fintype.card Fq := by assumption_mod_cast have q_pos : 0 < Fintype.card Fq := by omega have q_pos' : (0 : ℝ) < Fintype.card Fq := by assumption_mod_cast -- If `b` is already small enough, then the remainders are equal and we are done. by_cases le_b : b.natDegree ≤ ⌈-log ε / log (Fintype.card Fq)⌉₊ · obtain ⟨i₀, i₁, i_ne, mod_eq⟩ := exists_eq_polynomial le_rfl b le_b (fun i => A i % b) fun i => EuclideanDomain.mod_lt (A i) hb refine ⟨i₀, i₁, i_ne, ?_⟩ rwa [mod_eq, sub_self, map_zero, Int.cast_zero] -- Otherwise, it suffices to choose two elements whose difference is of small enough degree. rw [not_le] at le_b obtain ⟨i₀, i₁, i_ne, deg_lt⟩ := exists_approx_polynomial_aux le_rfl b (fun i => A i % b) fun i => EuclideanDomain.mod_lt (A i) hb use i₀, i₁, i_ne -- Again, if the remainders are equal we are done. by_cases h : A i₁ % b = A i₀ % b · rwa [h, sub_self, map_zero, Int.cast_zero] have h' : A i₁ % b - A i₀ % b ≠ 0 := mt sub_eq_zero.mp h -- If the remainders are not equal, we'll show their difference is of small degree. -- In particular, we'll show the degree is less than the following: suffices (natDegree (A i₁ % b - A i₀ % b) : ℝ) < b.natDegree + log ε / log (Fintype.card Fq) by rwa [← Real.log_lt_log_iff (Int.cast_pos.mpr (cardPowDegree.pos h')) hbε, cardPowDegree_nonzero _ h', cardPowDegree_nonzero _ hb, Algebra.smul_def, eq_intCast, Int.cast_pow, Int.cast_natCast, Int.cast_pow, Int.cast_natCast, log_mul (pow_ne_zero _ q_pos'.ne') hε.ne', ← rpow_natCast, ← rpow_natCast, log_rpow q_pos', log_rpow q_pos', ← lt_div_iff₀ (log_pos one_lt_q'), add_div, mul_div_cancel_right₀ _ (log_pos one_lt_q').ne'] -- And that result follows from manipulating the result from `exists_approx_polynomial_aux` -- to turn the `-⌈-stuff⌉₊` into `+ stuff`. apply lt_of_lt_of_le (Nat.cast_lt.mpr (WithBot.coe_lt_coe.mp _)) _ swap · convert deg_lt rw [degree_eq_natDegree h']; rfl rw [← sub_neg_eq_add, neg_div] refine le_trans ?_ (sub_le_sub_left (Nat.le_ceil _) (b.natDegree : ℝ)) rw [← neg_div] exact le_of_eq (Nat.cast_sub le_b.le) /-- If `x` is close to `y` and `y` is close to `z`, then `x` and `z` are at least as close. -/ theorem cardPowDegree_anti_archimedean {x y z : Fq[X]} {a : ℤ} (hxy : cardPowDegree (x - y) < a) (hyz : cardPowDegree (y - z) < a) : cardPowDegree (x - z) < a := by have ha : 0 < a := lt_of_le_of_lt (AbsoluteValue.nonneg _ _) hxy by_cases hxy' : x = y · rwa [hxy'] by_cases hyz' : y = z · rwa [← hyz']	by_cases hxz' : x = z · rwa [hxz', sub_self, map_zero] rw [← Ne, ← sub_ne_zero] at hxy' hyz' hxz' refine lt_of_le_of_lt ?_ (max_lt hxy hyz) rw [cardPowDegree_nonzero _ hxz', cardPowDegree_nonzero _ hxy', cardPowDegree_nonzero _ hyz'] have : (1 : ℤ) ≤ Fintype.card Fq := mod_cast (@Fintype.one_lt_card Fq _ _).le simp only [Int.cast_pow, Int.cast_natCast, le_max_iff] refine Or.imp (pow_le_pow_right₀ this) (pow_le_pow_right₀ this) ?_ rw [natDegree_le_iff_degree_le, natDegree_le_iff_degree_le, ← le_max_iff, ← degree_eq_natDegree hxy', ← degree_eq_natDegree hyz'] convert degree_add_le (x - y) (y - z) using 2 exact (sub_add_sub_cancel _ _ _).symm /-- A slightly stronger version of `exists_partition` on which we perform induction on `n`: for all `ε > 0`, we can partition the remainders of any family of polynomials `A` into equivalence classes, where the equivalence(!) relation is "closer than `ε`". -/ theorem exists_partition_polynomial_aux (n : ℕ) {ε : ℝ} (hε : 0 < ε) {b : Fq[X]} (hb : b ≠ 0) (A : Fin n → Fq[X]) : ∃ t : Fin n → Fin (Fintype.card Fq ^ ⌈-log ε / log (Fintype.card Fq)⌉₊), ∀ i₀ i₁ : Fin n, t i₀ = t i₁ ↔	Mathlib/NumberTheory/ClassNumber/AdmissibleCardPowDegree.lean	153	172
/- 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	1,903	1,905
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Algebra.ModEq import Mathlib.Algebra.Order.Archimedean.Basic import Mathlib.Algebra.Ring.Periodic import Mathlib.Data.Int.SuccPred import Mathlib.Order.Circular /-! # Reducing to an interval modulo its length This file defines operations that reduce a number (in an `Archimedean` `LinearOrderedAddCommGroup`) to a number in a given interval, modulo the length of that interval. ## Main definitions * `toIcoDiv hp a b` (where `hp : 0 < p`): The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ico a (a + p)`. * `toIcoMod hp a b` (where `hp : 0 < p`): Reduce `b` to the interval `Ico a (a + p)`. * `toIocDiv hp a b` (where `hp : 0 < p`): The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ioc a (a + p)`. * `toIocMod hp a b` (where `hp : 0 < p`): Reduce `b` to the interval `Ioc a (a + p)`. -/ assert_not_exists TwoSidedIdeal noncomputable section section LinearOrderedAddCommGroup variable {α : Type} [AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α] [hα : Archimedean α] {p : α} (hp : 0 < p) {a b c : α} {n : ℤ} section include hp /-- The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ico a (a + p)`. -/ def toIcoDiv (a b : α) : ℤ := (existsUnique_sub_zsmul_mem_Ico hp b a).choose theorem sub_toIcoDiv_zsmul_mem_Ico (a b : α) : b - toIcoDiv hp a b • p ∈ Set.Ico a (a + p) := (existsUnique_sub_zsmul_mem_Ico hp b a).choose_spec.1 theorem toIcoDiv_eq_of_sub_zsmul_mem_Ico (h : b - n • p ∈ Set.Ico a (a + p)) : toIcoDiv hp a b = n := ((existsUnique_sub_zsmul_mem_Ico hp b a).choose_spec.2 _ h).symm /-- The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ioc a (a + p)`. -/ def toIocDiv (a b : α) : ℤ := (existsUnique_sub_zsmul_mem_Ioc hp b a).choose theorem sub_toIocDiv_zsmul_mem_Ioc (a b : α) : b - toIocDiv hp a b • p ∈ Set.Ioc a (a + p) := (existsUnique_sub_zsmul_mem_Ioc hp b a).choose_spec.1 theorem toIocDiv_eq_of_sub_zsmul_mem_Ioc (h : b - n • p ∈ Set.Ioc a (a + p)) : toIocDiv hp a b = n := ((existsUnique_sub_zsmul_mem_Ioc hp b a).choose_spec.2 _ h).symm /-- Reduce `b` to the interval `Ico a (a + p)`. -/ def toIcoMod (a b : α) : α := b - toIcoDiv hp a b • p /-- Reduce `b` to the interval `Ioc a (a + p)`. -/ def toIocMod (a b : α) : α := b - toIocDiv hp a b • p theorem toIcoMod_mem_Ico (a b : α) : toIcoMod hp a b ∈ Set.Ico a (a + p) := sub_toIcoDiv_zsmul_mem_Ico hp a b theorem toIcoMod_mem_Ico' (b : α) : toIcoMod hp 0 b ∈ Set.Ico 0 p := by convert toIcoMod_mem_Ico hp 0 b exact (zero_add p).symm theorem toIocMod_mem_Ioc (a b : α) : toIocMod hp a b ∈ Set.Ioc a (a + p) := sub_toIocDiv_zsmul_mem_Ioc hp a b theorem left_le_toIcoMod (a b : α) : a ≤ toIcoMod hp a b := (Set.mem_Ico.1 (toIcoMod_mem_Ico hp a b)).1 theorem left_lt_toIocMod (a b : α) : a < toIocMod hp a b := (Set.mem_Ioc.1 (toIocMod_mem_Ioc hp a b)).1 theorem toIcoMod_lt_right (a b : α) : toIcoMod hp a b < a + p := (Set.mem_Ico.1 (toIcoMod_mem_Ico hp a b)).2 theorem toIocMod_le_right (a b : α) : toIocMod hp a b ≤ a + p := (Set.mem_Ioc.1 (toIocMod_mem_Ioc hp a b)).2 @[simp] theorem self_sub_toIcoDiv_zsmul (a b : α) : b - toIcoDiv hp a b • p = toIcoMod hp a b := rfl @[simp] theorem self_sub_toIocDiv_zsmul (a b : α) : b - toIocDiv hp a b • p = toIocMod hp a b := rfl @[simp] theorem toIcoDiv_zsmul_sub_self (a b : α) : toIcoDiv hp a b • p - b = -toIcoMod hp a b := by rw [toIcoMod, neg_sub] @[simp] theorem toIocDiv_zsmul_sub_self (a b : α) : toIocDiv hp a b • p - b = -toIocMod hp a b := by rw [toIocMod, neg_sub] @[simp] theorem toIcoMod_sub_self (a b : α) : toIcoMod hp a b - b = -toIcoDiv hp a b • p := by rw [toIcoMod, sub_sub_cancel_left, neg_smul] @[simp] theorem toIocMod_sub_self (a b : α) : toIocMod hp a b - b = -toIocDiv hp a b • p := by rw [toIocMod, sub_sub_cancel_left, neg_smul] @[simp] theorem self_sub_toIcoMod (a b : α) : b - toIcoMod hp a b = toIcoDiv hp a b • p := by rw [toIcoMod, sub_sub_cancel] @[simp] theorem self_sub_toIocMod (a b : α) : b - toIocMod hp a b = toIocDiv hp a b • p := by rw [toIocMod, sub_sub_cancel] @[simp] theorem toIcoMod_add_toIcoDiv_zsmul (a b : α) : toIcoMod hp a b + toIcoDiv hp a b • p = b := by rw [toIcoMod, sub_add_cancel] @[simp] theorem toIocMod_add_toIocDiv_zsmul (a b : α) : toIocMod hp a b + toIocDiv hp a b • p = b := by rw [toIocMod, sub_add_cancel] @[simp] theorem toIcoDiv_zsmul_sub_toIcoMod (a b : α) : toIcoDiv hp a b • p + toIcoMod hp a b = b := by rw [add_comm, toIcoMod_add_toIcoDiv_zsmul] @[simp] theorem toIocDiv_zsmul_sub_toIocMod (a b : α) : toIocDiv hp a b • p + toIocMod hp a b = b := by rw [add_comm, toIocMod_add_toIocDiv_zsmul] theorem toIcoMod_eq_iff : toIcoMod hp a b = c ↔ c ∈ Set.Ico a (a + p) ∧ ∃ z : ℤ, b = c + z • p := by refine ⟨fun h => ⟨h ▸ toIcoMod_mem_Ico hp a b, toIcoDiv hp a b, h ▸ (toIcoMod_add_toIcoDiv_zsmul _ _ _).symm⟩, ?_⟩ simp_rw [← @sub_eq_iff_eq_add] rintro ⟨hc, n, rfl⟩ rw [← toIcoDiv_eq_of_sub_zsmul_mem_Ico hp hc, toIcoMod] theorem toIocMod_eq_iff : toIocMod hp a b = c ↔ c ∈ Set.Ioc a (a + p) ∧ ∃ z : ℤ, b = c + z • p := by refine ⟨fun h => ⟨h ▸ toIocMod_mem_Ioc hp a b, toIocDiv hp a b, h ▸ (toIocMod_add_toIocDiv_zsmul hp _ _).symm⟩, ?_⟩ simp_rw [← @sub_eq_iff_eq_add] rintro ⟨hc, n, rfl⟩ rw [← toIocDiv_eq_of_sub_zsmul_mem_Ioc hp hc, toIocMod] @[simp] theorem toIcoDiv_apply_left (a : α) : toIcoDiv hp a a = 0 := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simp [hp] @[simp] theorem toIocDiv_apply_left (a : α) : toIocDiv hp a a = -1 := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simp [hp] @[simp] theorem toIcoMod_apply_left (a : α) : toIcoMod hp a a = a := by rw [toIcoMod_eq_iff hp, Set.left_mem_Ico] exact ⟨lt_add_of_pos_right _ hp, 0, by simp⟩ @[simp] theorem toIocMod_apply_left (a : α) : toIocMod hp a a = a + p := by rw [toIocMod_eq_iff hp, Set.right_mem_Ioc] exact ⟨lt_add_of_pos_right _ hp, -1, by simp⟩ theorem toIcoDiv_apply_right (a : α) : toIcoDiv hp a (a + p) = 1 := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simp [hp] theorem toIocDiv_apply_right (a : α) : toIocDiv hp a (a + p) = 0 := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simp [hp] theorem toIcoMod_apply_right (a : α) : toIcoMod hp a (a + p) = a := by rw [toIcoMod_eq_iff hp, Set.left_mem_Ico] exact ⟨lt_add_of_pos_right _ hp, 1, by simp⟩ theorem toIocMod_apply_right (a : α) : toIocMod hp a (a + p) = a + p := by rw [toIocMod_eq_iff hp, Set.right_mem_Ioc] exact ⟨lt_add_of_pos_right _ hp, 0, by simp⟩ @[simp] theorem toIcoDiv_add_zsmul (a b : α) (m : ℤ) : toIcoDiv hp a (b + m • p) = toIcoDiv hp a b + m := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simpa only [add_smul, add_sub_add_right_eq_sub] using sub_toIcoDiv_zsmul_mem_Ico hp a b @[simp] theorem toIcoDiv_add_zsmul' (a b : α) (m : ℤ) : toIcoDiv hp (a + m • p) b = toIcoDiv hp a b - m := by refine toIcoDiv_eq_of_sub_zsmul_mem_Ico _ ?_ rw [sub_smul, ← sub_add, add_right_comm] simpa using sub_toIcoDiv_zsmul_mem_Ico hp a b @[simp] theorem toIocDiv_add_zsmul (a b : α) (m : ℤ) : toIocDiv hp a (b + m • p) = toIocDiv hp a b + m := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simpa only [add_smul, add_sub_add_right_eq_sub] using sub_toIocDiv_zsmul_mem_Ioc hp a b @[simp] theorem toIocDiv_add_zsmul' (a b : α) (m : ℤ) : toIocDiv hp (a + m • p) b = toIocDiv hp a b - m := by refine toIocDiv_eq_of_sub_zsmul_mem_Ioc _ ?_ rw [sub_smul, ← sub_add, add_right_comm] simpa using sub_toIocDiv_zsmul_mem_Ioc hp a b @[simp] theorem toIcoDiv_zsmul_add (a b : α) (m : ℤ) : toIcoDiv hp a (m • p + b) = m + toIcoDiv hp a b := by rw [add_comm, toIcoDiv_add_zsmul, add_comm] /-! Note we omit `toIcoDiv_zsmul_add'` as `-m + toIcoDiv hp a b` is not very convenient. -/ @[simp] theorem toIocDiv_zsmul_add (a b : α) (m : ℤ) : toIocDiv hp a (m • p + b) = m + toIocDiv hp a b := by rw [add_comm, toIocDiv_add_zsmul, add_comm] /-! Note we omit `toIocDiv_zsmul_add'` as `-m + toIocDiv hp a b` is not very convenient. -/ @[simp] theorem toIcoDiv_sub_zsmul (a b : α) (m : ℤ) : toIcoDiv hp a (b - m • p) = toIcoDiv hp a b - m := by rw [sub_eq_add_neg, ← neg_smul, toIcoDiv_add_zsmul, sub_eq_add_neg] @[simp] theorem toIcoDiv_sub_zsmul' (a b : α) (m : ℤ) : toIcoDiv hp (a - m • p) b = toIcoDiv hp a b + m := by rw [sub_eq_add_neg, ← neg_smul, toIcoDiv_add_zsmul', sub_neg_eq_add] @[simp] theorem toIocDiv_sub_zsmul (a b : α) (m : ℤ) : toIocDiv hp a (b - m • p) = toIocDiv hp a b - m := by rw [sub_eq_add_neg, ← neg_smul, toIocDiv_add_zsmul, sub_eq_add_neg] @[simp] theorem toIocDiv_sub_zsmul' (a b : α) (m : ℤ) : toIocDiv hp (a - m • p) b = toIocDiv hp a b + m := by rw [sub_eq_add_neg, ← neg_smul, toIocDiv_add_zsmul', sub_neg_eq_add] @[simp] theorem toIcoDiv_add_right (a b : α) : toIcoDiv hp a (b + p) = toIcoDiv hp a b + 1 := by simpa only [one_zsmul] using toIcoDiv_add_zsmul hp a b 1 @[simp] theorem toIcoDiv_add_right' (a b : α) : toIcoDiv hp (a + p) b = toIcoDiv hp a b - 1 := by simpa only [one_zsmul] using toIcoDiv_add_zsmul' hp a b 1 @[simp] theorem toIocDiv_add_right (a b : α) : toIocDiv hp a (b + p) = toIocDiv hp a b + 1 := by simpa only [one_zsmul] using toIocDiv_add_zsmul hp a b 1 @[simp] theorem toIocDiv_add_right' (a b : α) : toIocDiv hp (a + p) b = toIocDiv hp a b - 1 := by simpa only [one_zsmul] using toIocDiv_add_zsmul' hp a b 1 @[simp] theorem toIcoDiv_add_left (a b : α) : toIcoDiv hp a (p + b) = toIcoDiv hp a b + 1 := by rw [add_comm, toIcoDiv_add_right] @[simp] theorem toIcoDiv_add_left' (a b : α) : toIcoDiv hp (p + a) b = toIcoDiv hp a b - 1 := by rw [add_comm, toIcoDiv_add_right'] @[simp] theorem toIocDiv_add_left (a b : α) : toIocDiv hp a (p + b) = toIocDiv hp a b + 1 := by rw [add_comm, toIocDiv_add_right] @[simp] theorem toIocDiv_add_left' (a b : α) : toIocDiv hp (p + a) b = toIocDiv hp a b - 1 := by rw [add_comm, toIocDiv_add_right'] @[simp] theorem toIcoDiv_sub (a b : α) : toIcoDiv hp a (b - p) = toIcoDiv hp a b - 1 := by simpa only [one_zsmul] using toIcoDiv_sub_zsmul hp a b 1 @[simp] theorem toIcoDiv_sub' (a b : α) : toIcoDiv hp (a - p) b = toIcoDiv hp a b + 1 := by simpa only [one_zsmul] using toIcoDiv_sub_zsmul' hp a b 1 @[simp] theorem toIocDiv_sub (a b : α) : toIocDiv hp a (b - p) = toIocDiv hp a b - 1 := by simpa only [one_zsmul] using toIocDiv_sub_zsmul hp a b 1 @[simp] theorem toIocDiv_sub' (a b : α) : toIocDiv hp (a - p) b = toIocDiv hp a b + 1 := by simpa only [one_zsmul] using toIocDiv_sub_zsmul' hp a b 1 theorem toIcoDiv_sub_eq_toIcoDiv_add (a b c : α) : toIcoDiv hp a (b - c) = toIcoDiv hp (a + c) b := by apply toIcoDiv_eq_of_sub_zsmul_mem_Ico rw [← sub_right_comm, Set.sub_mem_Ico_iff_left, add_right_comm] exact sub_toIcoDiv_zsmul_mem_Ico hp (a + c) b theorem toIocDiv_sub_eq_toIocDiv_add (a b c : α) : toIocDiv hp a (b - c) = toIocDiv hp (a + c) b := by apply toIocDiv_eq_of_sub_zsmul_mem_Ioc rw [← sub_right_comm, Set.sub_mem_Ioc_iff_left, add_right_comm] exact sub_toIocDiv_zsmul_mem_Ioc hp (a + c) b theorem toIcoDiv_sub_eq_toIcoDiv_add' (a b c : α) : toIcoDiv hp (a - c) b = toIcoDiv hp a (b + c) := by rw [← sub_neg_eq_add, toIcoDiv_sub_eq_toIcoDiv_add, sub_eq_add_neg] theorem toIocDiv_sub_eq_toIocDiv_add' (a b c : α) : toIocDiv hp (a - c) b = toIocDiv hp a (b + c) := by rw [← sub_neg_eq_add, toIocDiv_sub_eq_toIocDiv_add, sub_eq_add_neg] theorem toIcoDiv_neg (a b : α) : toIcoDiv hp a (-b) = -(toIocDiv hp (-a) b + 1) := by suffices toIcoDiv hp a (-b) = -toIocDiv hp (-(a + p)) b by rwa [neg_add, ← sub_eq_add_neg, toIocDiv_sub_eq_toIocDiv_add', toIocDiv_add_right] at this rw [← neg_eq_iff_eq_neg, eq_comm] apply toIocDiv_eq_of_sub_zsmul_mem_Ioc obtain ⟨hc, ho⟩ := sub_toIcoDiv_zsmul_mem_Ico hp a (-b) rw [← neg_lt_neg_iff, neg_sub' (-b), neg_neg, ← neg_smul] at ho rw [← neg_le_neg_iff, neg_sub' (-b), neg_neg, ← neg_smul] at hc refine ⟨ho, hc.trans_eq ?_⟩ rw [neg_add, neg_add_cancel_right] theorem toIcoDiv_neg' (a b : α) : toIcoDiv hp (-a) b = -(toIocDiv hp a (-b) + 1) := by simpa only [neg_neg] using toIcoDiv_neg hp (-a) (-b) theorem toIocDiv_neg (a b : α) : toIocDiv hp a (-b) = -(toIcoDiv hp (-a) b + 1) := by rw [← neg_neg b, toIcoDiv_neg, neg_neg, neg_neg, neg_add', neg_neg, add_sub_cancel_right] theorem toIocDiv_neg' (a b : α) : toIocDiv hp (-a) b = -(toIcoDiv hp a (-b) + 1) := by simpa only [neg_neg] using toIocDiv_neg hp (-a) (-b) @[simp] theorem toIcoMod_add_zsmul (a b : α) (m : ℤ) : toIcoMod hp a (b + m • p) = toIcoMod hp a b := by rw [toIcoMod, toIcoDiv_add_zsmul, toIcoMod, add_smul] abel @[simp] theorem toIcoMod_add_zsmul' (a b : α) (m : ℤ) : toIcoMod hp (a + m • p) b = toIcoMod hp a b + m • p := by simp only [toIcoMod, toIcoDiv_add_zsmul', sub_smul, sub_add] @[simp] theorem toIocMod_add_zsmul (a b : α) (m : ℤ) : toIocMod hp a (b + m • p) = toIocMod hp a b := by rw [toIocMod, toIocDiv_add_zsmul, toIocMod, add_smul] abel @[simp] theorem toIocMod_add_zsmul' (a b : α) (m : ℤ) : toIocMod hp (a + m • p) b = toIocMod hp a b + m • p := by simp only [toIocMod, toIocDiv_add_zsmul', sub_smul, sub_add] @[simp] theorem toIcoMod_zsmul_add (a b : α) (m : ℤ) : toIcoMod hp a (m • p + b) = toIcoMod hp a b := by rw [add_comm, toIcoMod_add_zsmul] @[simp] theorem toIcoMod_zsmul_add' (a b : α) (m : ℤ) : toIcoMod hp (m • p + a) b = m • p + toIcoMod hp a b := by rw [add_comm, toIcoMod_add_zsmul', add_comm] @[simp] theorem toIocMod_zsmul_add (a b : α) (m : ℤ) : toIocMod hp a (m • p + b) = toIocMod hp a b := by rw [add_comm, toIocMod_add_zsmul] @[simp] theorem toIocMod_zsmul_add' (a b : α) (m : ℤ) : toIocMod hp (m • p + a) b = m • p + toIocMod hp a b := by rw [add_comm, toIocMod_add_zsmul', add_comm] @[simp] theorem toIcoMod_sub_zsmul (a b : α) (m : ℤ) : toIcoMod hp a (b - m • p) = toIcoMod hp a b := by rw [sub_eq_add_neg, ← neg_smul, toIcoMod_add_zsmul] @[simp] theorem toIcoMod_sub_zsmul' (a b : α) (m : ℤ) : toIcoMod hp (a - m • p) b = toIcoMod hp a b - m • p := by simp_rw [sub_eq_add_neg, ← neg_smul, toIcoMod_add_zsmul'] @[simp] theorem toIocMod_sub_zsmul (a b : α) (m : ℤ) : toIocMod hp a (b - m • p) = toIocMod hp a b := by rw [sub_eq_add_neg, ← neg_smul, toIocMod_add_zsmul] @[simp] theorem toIocMod_sub_zsmul' (a b : α) (m : ℤ) : toIocMod hp (a - m • p) b = toIocMod hp a b - m • p := by simp_rw [sub_eq_add_neg, ← neg_smul, toIocMod_add_zsmul'] @[simp] theorem toIcoMod_add_right (a b : α) : toIcoMod hp a (b + p) = toIcoMod hp a b := by simpa only [one_zsmul] using toIcoMod_add_zsmul hp a b 1 @[simp] theorem toIcoMod_add_right' (a b : α) : toIcoMod hp (a + p) b = toIcoMod hp a b + p := by simpa only [one_zsmul] using toIcoMod_add_zsmul' hp a b 1 @[simp] theorem toIocMod_add_right (a b : α) : toIocMod hp a (b + p) = toIocMod hp a b := by simpa only [one_zsmul] using toIocMod_add_zsmul hp a b 1 @[simp] theorem toIocMod_add_right' (a b : α) : toIocMod hp (a + p) b = toIocMod hp a b + p := by simpa only [one_zsmul] using toIocMod_add_zsmul' hp a b 1 @[simp] theorem toIcoMod_add_left (a b : α) : toIcoMod hp a (p + b) = toIcoMod hp a b := by rw [add_comm, toIcoMod_add_right] @[simp] theorem toIcoMod_add_left' (a b : α) : toIcoMod hp (p + a) b = p + toIcoMod hp a b := by rw [add_comm, toIcoMod_add_right', add_comm] @[simp] theorem toIocMod_add_left (a b : α) : toIocMod hp a (p + b) = toIocMod hp a b := by rw [add_comm, toIocMod_add_right] @[simp] theorem toIocMod_add_left' (a b : α) : toIocMod hp (p + a) b = p + toIocMod hp a b := by rw [add_comm, toIocMod_add_right', add_comm] @[simp] theorem toIcoMod_sub (a b : α) : toIcoMod hp a (b - p) = toIcoMod hp a b := by simpa only [one_zsmul] using toIcoMod_sub_zsmul hp a b 1 @[simp] theorem toIcoMod_sub' (a b : α) : toIcoMod hp (a - p) b = toIcoMod hp a b - p := by simpa only [one_zsmul] using toIcoMod_sub_zsmul' hp a b 1 @[simp] theorem toIocMod_sub (a b : α) : toIocMod hp a (b - p) = toIocMod hp a b := by simpa only [one_zsmul] using toIocMod_sub_zsmul hp a b 1 @[simp] theorem toIocMod_sub' (a b : α) : toIocMod hp (a - p) b = toIocMod hp a b - p := by simpa only [one_zsmul] using toIocMod_sub_zsmul' hp a b 1 theorem toIcoMod_sub_eq_sub (a b c : α) : toIcoMod hp a (b - c) = toIcoMod hp (a + c) b - c := by simp_rw [toIcoMod, toIcoDiv_sub_eq_toIcoDiv_add, sub_right_comm] theorem toIocMod_sub_eq_sub (a b c : α) : toIocMod hp a (b - c) = toIocMod hp (a + c) b - c := by simp_rw [toIocMod, toIocDiv_sub_eq_toIocDiv_add, sub_right_comm] theorem toIcoMod_add_right_eq_add (a b c : α) : toIcoMod hp a (b + c) = toIcoMod hp (a - c) b + c := by simp_rw [toIcoMod, toIcoDiv_sub_eq_toIcoDiv_add', sub_add_eq_add_sub] theorem toIocMod_add_right_eq_add (a b c : α) : toIocMod hp a (b + c) = toIocMod hp (a - c) b + c := by simp_rw [toIocMod, toIocDiv_sub_eq_toIocDiv_add', sub_add_eq_add_sub] theorem toIcoMod_neg (a b : α) : toIcoMod hp a (-b) = p - toIocMod hp (-a) b := by simp_rw [toIcoMod, toIocMod, toIcoDiv_neg, neg_smul, add_smul] abel theorem toIcoMod_neg' (a b : α) : toIcoMod hp (-a) b = p - toIocMod hp a (-b) := by simpa only [neg_neg] using toIcoMod_neg hp (-a) (-b) theorem toIocMod_neg (a b : α) : toIocMod hp a (-b) = p - toIcoMod hp (-a) b := by simp_rw [toIocMod, toIcoMod, toIocDiv_neg, neg_smul, add_smul] abel theorem toIocMod_neg' (a b : α) : toIocMod hp (-a) b = p - toIcoMod hp a (-b) := by simpa only [neg_neg] using toIocMod_neg hp (-a) (-b) theorem toIcoMod_eq_toIcoMod : toIcoMod hp a b = toIcoMod hp a c ↔ ∃ n : ℤ, c - b = n • p := by refine ⟨fun h => ⟨toIcoDiv hp a c - toIcoDiv hp a b, ?_⟩, fun h => ?_⟩ · conv_lhs => rw [← toIcoMod_add_toIcoDiv_zsmul hp a b, ← toIcoMod_add_toIcoDiv_zsmul hp a c] rw [h, sub_smul] abel · rcases h with ⟨z, hz⟩ rw [sub_eq_iff_eq_add] at hz rw [hz, toIcoMod_zsmul_add] theorem toIocMod_eq_toIocMod : toIocMod hp a b = toIocMod hp a c ↔ ∃ n : ℤ, c - b = n • p := by refine ⟨fun h => ⟨toIocDiv hp a c - toIocDiv hp a b, ?_⟩, fun h => ?_⟩ · conv_lhs => rw [← toIocMod_add_toIocDiv_zsmul hp a b, ← toIocMod_add_toIocDiv_zsmul hp a c] rw [h, sub_smul] abel · rcases h with ⟨z, hz⟩ rw [sub_eq_iff_eq_add] at hz rw [hz, toIocMod_zsmul_add] /-! ### Links between the `Ico` and `Ioc` variants applied to the same element -/ section IcoIoc namespace AddCommGroup theorem modEq_iff_toIcoMod_eq_left : a ≡ b [PMOD p] ↔ toIcoMod hp a b = a := modEq_iff_eq_add_zsmul.trans ⟨by rintro ⟨n, rfl⟩ rw [toIcoMod_add_zsmul, toIcoMod_apply_left], fun h => ⟨toIcoDiv hp a b, eq_add_of_sub_eq h⟩⟩ theorem modEq_iff_toIocMod_eq_right : a ≡ b [PMOD p] ↔ toIocMod hp a b = a + p := by refine modEq_iff_eq_add_zsmul.trans ⟨?_, fun h => ⟨toIocDiv hp a b + 1, ?_⟩⟩ · rintro ⟨z, rfl⟩ rw [toIocMod_add_zsmul, toIocMod_apply_left] · rwa [add_one_zsmul, add_left_comm, ← sub_eq_iff_eq_add'] alias ⟨ModEq.toIcoMod_eq_left, _⟩ := modEq_iff_toIcoMod_eq_left alias ⟨ModEq.toIcoMod_eq_right, _⟩ := modEq_iff_toIocMod_eq_right variable (a b) open List in theorem tfae_modEq : TFAE [a ≡ b [PMOD p], ∀ z : ℤ, b - z • p ∉ Set.Ioo a (a + p), toIcoMod hp a b ≠ toIocMod hp a b, toIcoMod hp a b + p = toIocMod hp a b] := by rw [modEq_iff_toIcoMod_eq_left hp] tfae_have 3 → 2 := by rw [← not_exists, not_imp_not] exact fun ⟨i, hi⟩ => ((toIcoMod_eq_iff hp).2 ⟨Set.Ioo_subset_Ico_self hi, i, (sub_add_cancel b _).symm⟩).trans ((toIocMod_eq_iff hp).2 ⟨Set.Ioo_subset_Ioc_self hi, i, (sub_add_cancel b _).symm⟩).symm tfae_have 4 → 3 \| h => by rw [← h, Ne, eq_comm, add_eq_left] exact hp.ne' tfae_have 1 → 4 \| h => by rw [h, eq_comm, toIocMod_eq_iff, Set.right_mem_Ioc] refine ⟨lt_add_of_pos_right a hp, toIcoDiv hp a b - 1, ?_⟩ rw [sub_one_zsmul, add_add_add_comm, add_neg_cancel, add_zero] conv_lhs => rw [← toIcoMod_add_toIcoDiv_zsmul hp a b, h] tfae_have 2 → 1 := by rw [← not_exists, not_imp_comm] have h' := toIcoMod_mem_Ico hp a b exact fun h => ⟨_, h'.1.lt_of_ne' h, h'.2⟩ tfae_finish variable {a b} theorem modEq_iff_not_forall_mem_Ioo_mod : a ≡ b [PMOD p] ↔ ∀ z : ℤ, b - z • p ∉ Set.Ioo a (a + p) := (tfae_modEq hp a b).out 0 1 theorem modEq_iff_toIcoMod_ne_toIocMod : a ≡ b [PMOD p] ↔ toIcoMod hp a b ≠ toIocMod hp a b := (tfae_modEq hp a b).out 0 2 theorem modEq_iff_toIcoMod_add_period_eq_toIocMod : a ≡ b [PMOD p] ↔ toIcoMod hp a b + p = toIocMod hp a b := (tfae_modEq hp a b).out 0 3 theorem not_modEq_iff_toIcoMod_eq_toIocMod : ¬a ≡ b [PMOD p] ↔ toIcoMod hp a b = toIocMod hp a b := (modEq_iff_toIcoMod_ne_toIocMod _).not_left theorem not_modEq_iff_toIcoDiv_eq_toIocDiv : ¬a ≡ b [PMOD p] ↔ toIcoDiv hp a b = toIocDiv hp a b := by rw [not_modEq_iff_toIcoMod_eq_toIocMod hp, toIcoMod, toIocMod, sub_right_inj, zsmul_left_inj hp] theorem modEq_iff_toIcoDiv_eq_toIocDiv_add_one : a ≡ b [PMOD p] ↔ toIcoDiv hp a b = toIocDiv hp a b + 1 := by rw [modEq_iff_toIcoMod_add_period_eq_toIocMod hp, toIcoMod, toIocMod, ← eq_sub_iff_add_eq, sub_sub, sub_right_inj, ← add_one_zsmul, zsmul_left_inj hp] end AddCommGroup open AddCommGroup /-- If `a` and `b` fall within the same cycle WRT `c`, then they are congruent modulo `p`. -/ @[simp] theorem toIcoMod_inj {c : α} : toIcoMod hp c a = toIcoMod hp c b ↔ a ≡ b [PMOD p] := by simp_rw [toIcoMod_eq_toIcoMod, modEq_iff_eq_add_zsmul, sub_eq_iff_eq_add'] alias ⟨_, AddCommGroup.ModEq.toIcoMod_eq_toIcoMod⟩ := toIcoMod_inj theorem Ico_eq_locus_Ioc_eq_iUnion_Ioo : { b \| toIcoMod hp a b = toIocMod hp a b } = ⋃ z : ℤ, Set.Ioo (a + z • p) (a + p + z • p) := by ext1 simp_rw [Set.mem_setOf, Set.mem_iUnion, ← Set.sub_mem_Ioo_iff_left, ← not_modEq_iff_toIcoMod_eq_toIocMod, modEq_iff_not_forall_mem_Ioo_mod hp, not_forall, Classical.not_not] theorem toIocDiv_wcovBy_toIcoDiv (a b : α) : toIocDiv hp a b ⩿ toIcoDiv hp a b := by suffices toIocDiv hp a b = toIcoDiv hp a b ∨ toIocDiv hp a b + 1 = toIcoDiv hp a b by rwa [wcovBy_iff_eq_or_covBy, ← Order.succ_eq_iff_covBy] rw [eq_comm, ← not_modEq_iff_toIcoDiv_eq_toIocDiv, eq_comm, ← modEq_iff_toIcoDiv_eq_toIocDiv_add_one] exact em' _ theorem toIcoMod_le_toIocMod (a b : α) : toIcoMod hp a b ≤ toIocMod hp a b := by rw [toIcoMod, toIocMod, sub_le_sub_iff_left] exact zsmul_left_mono hp.le (toIocDiv_wcovBy_toIcoDiv _ _ _).le theorem toIocMod_le_toIcoMod_add (a b : α) : toIocMod hp a b ≤ toIcoMod hp a b + p := by rw [toIcoMod, toIocMod, sub_add, sub_le_sub_iff_left, sub_le_iff_le_add, ← add_one_zsmul, (zsmul_left_strictMono hp).le_iff_le] apply (toIocDiv_wcovBy_toIcoDiv _ _ _).le_succ end IcoIoc open AddCommGroup theorem toIcoMod_eq_self : toIcoMod hp a b = b ↔ b ∈ Set.Ico a (a + p) := by rw [toIcoMod_eq_iff, and_iff_left] exact ⟨0, by simp⟩ theorem toIocMod_eq_self : toIocMod hp a b = b ↔ b ∈ Set.Ioc a (a + p) := by rw [toIocMod_eq_iff, and_iff_left] exact ⟨0, by simp⟩ @[simp] theorem toIcoMod_toIcoMod (a₁ a₂ b : α) : toIcoMod hp a₁ (toIcoMod hp a₂ b) = toIcoMod hp a₁ b := (toIcoMod_eq_toIcoMod _).2 ⟨toIcoDiv hp a₂ b, self_sub_toIcoMod hp a₂ b⟩ @[simp] theorem toIcoMod_toIocMod (a₁ a₂ b : α) : toIcoMod hp a₁ (toIocMod hp a₂ b) = toIcoMod hp a₁ b := (toIcoMod_eq_toIcoMod _).2 ⟨toIocDiv hp a₂ b, self_sub_toIocMod hp a₂ b⟩ @[simp] theorem toIocMod_toIocMod (a₁ a₂ b : α) : toIocMod hp a₁ (toIocMod hp a₂ b) = toIocMod hp a₁ b := (toIocMod_eq_toIocMod _).2 ⟨toIocDiv hp a₂ b, self_sub_toIocMod hp a₂ b⟩ @[simp] theorem toIocMod_toIcoMod (a₁ a₂ b : α) : toIocMod hp a₁ (toIcoMod hp a₂ b) = toIocMod hp a₁ b := (toIocMod_eq_toIocMod _).2 ⟨toIcoDiv hp a₂ b, self_sub_toIcoMod hp a₂ b⟩ theorem toIcoMod_periodic (a : α) : Function.Periodic (toIcoMod hp a) p := toIcoMod_add_right hp a theorem toIocMod_periodic (a : α) : Function.Periodic (toIocMod hp a) p := toIocMod_add_right hp a -- helper lemmas for when `a = 0` section Zero theorem toIcoMod_zero_sub_comm (a b : α) : toIcoMod hp 0 (a - b) = p - toIocMod hp 0 (b - a) := by rw [← neg_sub, toIcoMod_neg, neg_zero] theorem toIocMod_zero_sub_comm (a b : α) : toIocMod hp 0 (a - b) = p - toIcoMod hp 0 (b - a) := by rw [← neg_sub, toIocMod_neg, neg_zero] theorem toIcoDiv_eq_sub (a b : α) : toIcoDiv hp a b = toIcoDiv hp 0 (b - a) := by rw [toIcoDiv_sub_eq_toIcoDiv_add, zero_add] theorem toIocDiv_eq_sub (a b : α) : toIocDiv hp a b = toIocDiv hp 0 (b - a) := by rw [toIocDiv_sub_eq_toIocDiv_add, zero_add] theorem toIcoMod_eq_sub (a b : α) : toIcoMod hp a b = toIcoMod hp 0 (b - a) + a := by rw [toIcoMod_sub_eq_sub, zero_add, sub_add_cancel] theorem toIocMod_eq_sub (a b : α) : toIocMod hp a b = toIocMod hp 0 (b - a) + a := by rw [toIocMod_sub_eq_sub, zero_add, sub_add_cancel] theorem toIcoMod_add_toIocMod_zero (a b : α) : toIcoMod hp 0 (a - b) + toIocMod hp 0 (b - a) = p := by rw [toIcoMod_zero_sub_comm, sub_add_cancel] theorem toIocMod_add_toIcoMod_zero (a b : α) : toIocMod hp 0 (a - b) + toIcoMod hp 0 (b - a) = p := by rw [_root_.add_comm, toIcoMod_add_toIocMod_zero] end Zero /-- `toIcoMod` as an equiv from the quotient. -/ @[simps symm_apply] def QuotientAddGroup.equivIcoMod (a : α) : α ⧸ AddSubgroup.zmultiples p ≃ Set.Ico a (a + p) where toFun b := ⟨(toIcoMod_periodic hp a).lift b, QuotientAddGroup.induction_on b <\| toIcoMod_mem_Ico hp a⟩ invFun := (↑) right_inv b := Subtype.ext <\| (toIcoMod_eq_self hp).mpr b.prop left_inv b := by induction b using QuotientAddGroup.induction_on dsimp rw [QuotientAddGroup.eq_iff_sub_mem, toIcoMod_sub_self] apply AddSubgroup.zsmul_mem_zmultiples @[simp] theorem QuotientAddGroup.equivIcoMod_coe (a b : α) : QuotientAddGroup.equivIcoMod hp a ↑b = ⟨toIcoMod hp a b, toIcoMod_mem_Ico hp a _⟩ := rfl @[simp] theorem QuotientAddGroup.equivIcoMod_zero (a : α) : QuotientAddGroup.equivIcoMod hp a 0 = ⟨toIcoMod hp a 0, toIcoMod_mem_Ico hp a _⟩ := rfl /-- `toIocMod` as an equiv from the quotient. -/ @[simps symm_apply] def QuotientAddGroup.equivIocMod (a : α) : α ⧸ AddSubgroup.zmultiples p ≃ Set.Ioc a (a + p) where toFun b := ⟨(toIocMod_periodic hp a).lift b, QuotientAddGroup.induction_on b <\| toIocMod_mem_Ioc hp a⟩ invFun := (↑) right_inv b := Subtype.ext <\| (toIocMod_eq_self hp).mpr b.prop left_inv b := by induction b using QuotientAddGroup.induction_on dsimp rw [QuotientAddGroup.eq_iff_sub_mem, toIocMod_sub_self] apply AddSubgroup.zsmul_mem_zmultiples @[simp] theorem QuotientAddGroup.equivIocMod_coe (a b : α) : QuotientAddGroup.equivIocMod hp a ↑b = ⟨toIocMod hp a b, toIocMod_mem_Ioc hp a _⟩ := rfl @[simp] theorem QuotientAddGroup.equivIocMod_zero (a : α) : QuotientAddGroup.equivIocMod hp a 0 = ⟨toIocMod hp a 0, toIocMod_mem_Ioc hp a _⟩ := rfl end /-! ### The circular order structure on `α ⧸ AddSubgroup.zmultiples p` -/ section Circular open AddCommGroup private theorem toIxxMod_iff (x₁ x₂ x₃ : α) : toIcoMod hp x₁ x₂ ≤ toIocMod hp x₁ x₃ ↔ toIcoMod hp 0 (x₂ - x₁) + toIcoMod hp 0 (x₁ - x₃) ≤ p := by rw [toIcoMod_eq_sub, toIocMod_eq_sub _ x₁, add_le_add_iff_right, ← neg_sub x₁ x₃, toIocMod_neg, neg_zero, le_sub_iff_add_le] private theorem toIxxMod_cyclic_left {x₁ x₂ x₃ : α} (h : toIcoMod hp x₁ x₂ ≤ toIocMod hp x₁ x₃) : toIcoMod hp x₂ x₃ ≤ toIocMod hp x₂ x₁ := by let x₂' := toIcoMod hp x₁ x₂ let x₃' := toIcoMod hp x₂' x₃ have h : x₂' ≤ toIocMod hp x₁ x₃' := by simpa [x₃'] have h₂₁ : x₂' < x₁ + p := toIcoMod_lt_right _ _ _ have h₃₂ : x₃' - p < x₂' := sub_lt_iff_lt_add.2 (toIcoMod_lt_right _ _ _) suffices hequiv : x₃' ≤ toIocMod hp x₂' x₁ by obtain ⟨z, hd⟩ : ∃ z : ℤ, x₂ = x₂' + z • p := ((toIcoMod_eq_iff hp).1 rfl).2 simpa [hd, toIocMod_add_zsmul', toIcoMod_add_zsmul', add_le_add_iff_right] rcases le_or_lt x₃' (x₁ + p) with h₃₁ \| h₁₃ · suffices hIoc₂₁ : toIocMod hp x₂' x₁ = x₁ + p from hIoc₂₁.symm.trans_ge h₃₁ apply (toIocMod_eq_iff hp).2 exact ⟨⟨h₂₁, by simp [x₂', left_le_toIcoMod]⟩, -1, by simp⟩ have hIoc₁₃ : toIocMod hp x₁ x₃' = x₃' - p := by apply (toIocMod_eq_iff hp).2 exact ⟨⟨lt_sub_iff_add_lt.2 h₁₃, le_of_lt (h₃₂.trans h₂₁)⟩, 1, by simp⟩ have not_h₃₂ := (h.trans hIoc₁₃.le).not_lt contradiction private theorem toIxxMod_antisymm (h₁₂₃ : toIcoMod hp a b ≤ toIocMod hp a c) (h₁₃₂ : toIcoMod hp a c ≤ toIocMod hp a b) : b ≡ a [PMOD p] ∨ c ≡ b [PMOD p] ∨ a ≡ c [PMOD p] := by by_contra! h rw [modEq_comm] at h rw [← (not_modEq_iff_toIcoMod_eq_toIocMod hp).mp h.2.2] at h₁₂₃ rw [← (not_modEq_iff_toIcoMod_eq_toIocMod hp).mp h.1] at h₁₃₂ exact h.2.1 ((toIcoMod_inj _).1 <\| h₁₃₂.antisymm h₁₂₃) private theorem toIxxMod_total' (a b c : α) : toIcoMod hp b a ≤ toIocMod hp b c ∨ toIcoMod hp b c ≤ toIocMod hp b a := by /- an essential ingredient is the lemma saying {a-b} + {b-a} = period if a ≠ b (and = 0 if a = b). Thus if a ≠ b and b ≠ c then ({a-b} + {b-c}) + ({c-b} + {b-a}) = 2 period, so one of `{a-b} + {b-c}` and `{c-b} + {b-a}` must be `≤ period` -/ have := congr_arg₂ (· + ·) (toIcoMod_add_toIocMod_zero hp a b) (toIcoMod_add_toIocMod_zero hp c b) simp only [add_add_add_comm] at this rw [_root_.add_comm (toIocMod _ _ _), add_add_add_comm, ← two_nsmul] at this replace := min_le_of_add_le_two_nsmul this.le rw [min_le_iff] at this rw [toIxxMod_iff, toIxxMod_iff] refine this.imp (le_trans <\| add_le_add_left ?_ _) (le_trans <\| add_le_add_left ?_ _) · apply toIcoMod_le_toIocMod · apply toIcoMod_le_toIocMod private theorem toIxxMod_total (a b c : α) : toIcoMod hp a b ≤ toIocMod hp a c ∨ toIcoMod hp c b ≤ toIocMod hp c a := (toIxxMod_total' _ _ _ _).imp_right <\| toIxxMod_cyclic_left _ private theorem toIxxMod_trans {x₁ x₂ x₃ x₄ : α} (h₁₂₃ : toIcoMod hp x₁ x₂ ≤ toIocMod hp x₁ x₃ ∧ ¬toIcoMod hp x₃ x₂ ≤ toIocMod hp x₃ x₁) (h₂₃₄ : toIcoMod hp x₂ x₄ ≤ toIocMod hp x₂ x₃ ∧ ¬toIcoMod hp x₃ x₄ ≤ toIocMod hp x₃ x₂) : toIcoMod hp x₁ x₄ ≤ toIocMod hp x₁ x₃ ∧ ¬toIcoMod hp x₃ x₄ ≤ toIocMod hp x₃ x₁ := by constructor · suffices h : ¬x₃ ≡ x₂ [PMOD p] by have h₁₂₃' := toIxxMod_cyclic_left _ (toIxxMod_cyclic_left _ h₁₂₃.1) have h₂₃₄' := toIxxMod_cyclic_left _ (toIxxMod_cyclic_left _ h₂₃₄.1) rw [(not_modEq_iff_toIcoMod_eq_toIocMod hp).1 h] at h₂₃₄' exact toIxxMod_cyclic_left _ (h₁₂₃'.trans h₂₃₄') by_contra h rw [(modEq_iff_toIcoMod_eq_left hp).1 h] at h₁₂₃ exact h₁₂₃.2 (left_lt_toIocMod _ _ _).le · rw [not_le] at h₁₂₃ h₂₃₄ ⊢ exact (h₁₂₃.2.trans_le (toIcoMod_le_toIocMod _ x₃ x₂)).trans h₂₃₄.2 namespace QuotientAddGroup variable [hp' : Fact (0 < p)] instance : Btw (α ⧸ AddSubgroup.zmultiples p) where btw x₁ x₂ x₃ := (equivIcoMod hp'.out 0 (x₂ - x₁) : α) ≤ equivIocMod hp'.out 0 (x₃ - x₁) theorem btw_coe_iff' {x₁ x₂ x₃ : α} : Btw.btw (x₁ : α ⧸ AddSubgroup.zmultiples p) x₂ x₃ ↔ toIcoMod hp'.out 0 (x₂ - x₁) ≤ toIocMod hp'.out 0 (x₃ - x₁) := Iff.rfl -- maybe harder to use than the primed one? theorem btw_coe_iff {x₁ x₂ x₃ : α} : Btw.btw (x₁ : α ⧸ AddSubgroup.zmultiples p) x₂ x₃ ↔ toIcoMod hp'.out x₁ x₂ ≤ toIocMod hp'.out x₁ x₃ := by rw [btw_coe_iff', toIocMod_sub_eq_sub, toIcoMod_sub_eq_sub, zero_add, sub_le_sub_iff_right] instance circularPreorder : CircularPreorder (α ⧸ AddSubgroup.zmultiples p) where btw_refl x := show _ ≤ _ by simp [sub_self, hp'.out.le] btw_cyclic_left {x₁ x₂ x₃} h := by induction x₁ using QuotientAddGroup.induction_on induction x₂ using QuotientAddGroup.induction_on induction x₃ using QuotientAddGroup.induction_on simp_rw [btw_coe_iff] at h ⊢ apply toIxxMod_cyclic_left _ h sbtw := _ sbtw_iff_btw_not_btw := Iff.rfl sbtw_trans_left {x₁ x₂ x₃ x₄} (h₁₂₃ : _ ∧ _) (h₂₃₄ : _ ∧ _) := show _ ∧ _ by induction x₁ using QuotientAddGroup.induction_on induction x₂ using QuotientAddGroup.induction_on induction x₃ using QuotientAddGroup.induction_on induction x₄ using QuotientAddGroup.induction_on simp_rw [btw_coe_iff] at h₁₂₃ h₂₃₄ ⊢ apply toIxxMod_trans _ h₁₂₃ h₂₃₄ instance circularOrder : CircularOrder (α ⧸ AddSubgroup.zmultiples p) := { QuotientAddGroup.circularPreorder with btw_antisymm := fun {x₁ x₂ x₃} h₁₂₃ h₃₂₁ => by induction x₁ using QuotientAddGroup.induction_on induction x₂ using QuotientAddGroup.induction_on induction x₃ using QuotientAddGroup.induction_on rw [btw_cyclic] at h₃₂₁ simp_rw [btw_coe_iff] at h₁₂₃ h₃₂₁ simp_rw [← modEq_iff_eq_mod_zmultiples] exact toIxxMod_antisymm _ h₁₂₃ h₃₂₁ btw_total := fun x₁ x₂ x₃ => by induction x₁ using QuotientAddGroup.induction_on induction x₂ using QuotientAddGroup.induction_on induction x₃ using QuotientAddGroup.induction_on simp_rw [btw_coe_iff] apply toIxxMod_total } end QuotientAddGroup end Circular end LinearOrderedAddCommGroup /-! ### Connections to `Int.floor` and `Int.fract` -/ section LinearOrderedField variable {α : Type} [Field α] [LinearOrder α] [IsStrictOrderedRing α] [FloorRing α] {p : α} (hp : 0 < p) theorem toIcoDiv_eq_floor (a b : α) : toIcoDiv hp a b = ⌊(b - a) / p⌋ := by refine toIcoDiv_eq_of_sub_zsmul_mem_Ico hp ?_ rw [Set.mem_Ico, zsmul_eq_mul, ← sub_nonneg, add_comm, sub_right_comm, ← sub_lt_iff_lt_add, sub_right_comm _ _ a] exact ⟨Int.sub_floor_div_mul_nonneg _ hp, Int.sub_floor_div_mul_lt _ hp⟩ theorem toIocDiv_eq_neg_floor (a b : α) : toIocDiv hp a b = -⌊(a + p - b) / p⌋ := by refine toIocDiv_eq_of_sub_zsmul_mem_Ioc hp ?_ rw [Set.mem_Ioc, zsmul_eq_mul, Int.cast_neg, neg_mul, sub_neg_eq_add, ← sub_nonneg, sub_add_eq_sub_sub] refine ⟨?_, Int.sub_floor_div_mul_nonneg _ hp⟩ rw [← add_lt_add_iff_right p, add_assoc, add_comm b, ← sub_lt_iff_lt_add, add_comm (_ _), ← sub_lt_iff_lt_add] exact Int.sub_floor_div_mul_lt _ hp theorem toIcoDiv_zero_one (b : α) : toIcoDiv (zero_lt_one' α) 0 b = ⌊b⌋ := by simp [toIcoDiv_eq_floor] theorem toIcoMod_eq_add_fract_mul (a b : α) : toIcoMod hp a b = a + Int.fract ((b - a) / p) * p := by rw [toIcoMod, toIcoDiv_eq_floor, Int.fract] field_simp ring theorem toIcoMod_eq_fract_mul (b : α) : toIcoMod hp 0 b = Int.fract (b / p) * p := by simp [toIcoMod_eq_add_fract_mul] theorem toIocMod_eq_sub_fract_mul (a b : α) : toIocMod hp a b = a + p - Int.fract ((a + p - b) / p) * p := by rw [toIocMod, toIocDiv_eq_neg_floor, Int.fract] field_simp ring theorem toIcoMod_zero_one (b : α) : toIcoMod (zero_lt_one' α) 0 b = Int.fract b := by simp [toIcoMod_eq_add_fract_mul] end LinearOrderedField /-! ### Lemmas about unions of translates of intervals -/ section Union open Set Int section LinearOrderedAddCommGroup variable {α : Type} [AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α] [Archimedean α] {p : α} (hp : 0 < p) (a : α) include hp theorem iUnion_Ioc_add_zsmul : ⋃ n : ℤ, Ioc (a + n • p) (a + (n + 1) • p) = univ := by refine eq_univ_iff_forall.mpr fun b => mem_iUnion.mpr ?_ rcases sub_toIocDiv_zsmul_mem_Ioc hp a b with ⟨hl, hr⟩ refine ⟨toIocDiv hp a b, ⟨lt_sub_iff_add_lt.mp hl, ?_⟩⟩ rw [add_smul, one_smul, ← add_assoc] convert sub_le_iff_le_add.mp hr using 1; abel theorem iUnion_Ico_add_zsmul : ⋃ n : ℤ, Ico (a + n • p) (a + (n + 1) • p) = univ := by refine eq_univ_iff_forall.mpr fun b => mem_iUnion.mpr ?_ rcases sub_toIcoDiv_zsmul_mem_Ico hp a b with ⟨hl, hr⟩ refine ⟨toIcoDiv hp a b, ⟨le_sub_iff_add_le.mp hl, ?_⟩⟩ rw [add_smul, one_smul, ← add_assoc] convert sub_lt_iff_lt_add.mp hr using 1; abel theorem iUnion_Icc_add_zsmul : ⋃ n : ℤ, Icc (a + n • p) (a + (n + 1) • p) = univ := by simpa only [iUnion_Ioc_add_zsmul hp a, univ_subset_iff] using iUnion_mono fun n : ℤ => (Ioc_subset_Icc_self : Ioc (a + n • p) (a + (n + 1) • p) ⊆ Icc _ _) theorem iUnion_Ioc_zsmul : ⋃ n : ℤ, Ioc (n • p) ((n + 1) • p) = univ := by simpa only [zero_add] using iUnion_Ioc_add_zsmul hp 0 theorem iUnion_Ico_zsmul : ⋃ n : ℤ, Ico (n • p) ((n + 1) • p) = univ := by simpa only [zero_add] using iUnion_Ico_add_zsmul hp 0 theorem iUnion_Icc_zsmul : ⋃ n : ℤ, Icc (n • p) ((n + 1) • p) = univ := by simpa only [zero_add] using iUnion_Icc_add_zsmul hp 0 end LinearOrderedAddCommGroup section LinearOrderedRing variable {α : Type} [Ring α] [LinearOrder α] [IsStrictOrderedRing α] [Archimedean α] (a : α) theorem iUnion_Ioc_add_intCast : ⋃ n : ℤ, Ioc (a + n) (a + n + 1) = Set.univ := by simpa only [zsmul_one, Int.cast_add, Int.cast_one, ← add_assoc] using iUnion_Ioc_add_zsmul zero_lt_one a theorem iUnion_Ico_add_intCast : ⋃ n : ℤ, Ico (a + n) (a + n + 1) = Set.univ := by simpa only [zsmul_one, Int.cast_add, Int.cast_one, ← add_assoc] using iUnion_Ico_add_zsmul zero_lt_one a theorem iUnion_Icc_add_intCast : ⋃ n : ℤ, Icc (a + n) (a + n + 1) = Set.univ := by simpa only [zsmul_one, Int.cast_add, Int.cast_one, ← add_assoc] using iUnion_Icc_add_zsmul zero_lt_one a variable (α) theorem iUnion_Ioc_intCast : ⋃ n : ℤ, Ioc (n : α) (n + 1) = Set.univ := by simpa only [zero_add] using iUnion_Ioc_add_intCast (0 : α) theorem iUnion_Ico_intCast : ⋃ n : ℤ, Ico (n : α) (n + 1) = Set.univ := by simpa only [zero_add] using iUnion_Ico_add_intCast (0 : α) theorem iUnion_Icc_intCast : ⋃ n : ℤ, Icc (n : α) (n + 1) = Set.univ := by simpa only [zero_add] using iUnion_Icc_add_intCast (0 : α) end LinearOrderedRing end Union		Mathlib/Algebra/Order/ToIntervalMod.lean	1,074	1,076
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Analysis.Convex.Side import Mathlib.Geometry.Euclidean.Angle.Oriented.Rotation import Mathlib.Geometry.Euclidean.Angle.Unoriented.Affine /-! # Oriented angles. This file defines oriented angles in Euclidean affine spaces. ## Main definitions * `EuclideanGeometry.oangle`, with notation `∡`, is the oriented angle determined by three points. -/ noncomputable section open Module Complex open scoped Affine EuclideanGeometry Real RealInnerProductSpace ComplexConjugate namespace EuclideanGeometry variable {V : Type} {P : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] [MetricSpace P] [NormedAddTorsor V P] [hd2 : Fact (finrank ℝ V = 2)] [Module.Oriented ℝ V (Fin 2)] /-- A fixed choice of positive orientation of Euclidean space `ℝ²` -/ abbrev o := @Module.Oriented.positiveOrientation /-- The oriented angle at `p₂` between the line segments to `p₁` and `p₃`, modulo `2 * π`. If either of those points equals `p₂`, this is 0. See `EuclideanGeometry.angle` for the corresponding unoriented angle definition. -/ def oangle (p₁ p₂ p₃ : P) : Real.Angle := o.oangle (p₁ -ᵥ p₂) (p₃ -ᵥ p₂) @[inherit_doc] scoped notation "∡" => EuclideanGeometry.oangle /-- Oriented angles are continuous when neither end point equals the middle point. -/ theorem continuousAt_oangle {x : P × P × P} (hx12 : x.1 ≠ x.2.1) (hx32 : x.2.2 ≠ x.2.1) : ContinuousAt (fun y : P × P × P => ∡ y.1 y.2.1 y.2.2) x := by unfold oangle fun_prop (disch := simp [*]) /-- The angle ∡AAB at a point. -/ @[simp] theorem oangle_self_left (p₁ p₂ : P) : ∡ p₁ p₁ p₂ = 0 := by simp [oangle] /-- The angle ∡ABB at a point. -/ @[simp] theorem oangle_self_right (p₁ p₂ : P) : ∡ p₁ p₂ p₂ = 0 := by simp [oangle] /-- The angle ∡ABA at a point. -/ @[simp] theorem oangle_self_left_right (p₁ p₂ : P) : ∡ p₁ p₂ p₁ = 0 := o.oangle_self _ /-- If the angle between three points is nonzero, the first two points are not equal. -/ theorem left_ne_of_oangle_ne_zero {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ ≠ 0) : p₁ ≠ p₂ := by rw [← @vsub_ne_zero V]; exact o.left_ne_zero_of_oangle_ne_zero h /-- If the angle between three points is nonzero, the last two points are not equal. -/ theorem right_ne_of_oangle_ne_zero {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ ≠ 0) : p₃ ≠ p₂ := by rw [← @vsub_ne_zero V]; exact o.right_ne_zero_of_oangle_ne_zero h /-- If the angle between three points is nonzero, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_ne_zero {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ ≠ 0) : p₁ ≠ p₃ := by rw [← (vsub_left_injective p₂).ne_iff]; exact o.ne_of_oangle_ne_zero h /-- If the angle between three points is `π`, the first two points are not equal. -/ theorem left_ne_of_oangle_eq_pi {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = π) : p₁ ≠ p₂ := left_ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `π`, the last two points are not equal. -/ theorem right_ne_of_oangle_eq_pi {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = π) : p₃ ≠ p₂ := right_ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `π`, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_eq_pi {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = π) : p₁ ≠ p₃ := left_ne_right_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `π / 2`, the first two points are not equal. -/ theorem left_ne_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = (π / 2 : ℝ)) : p₁ ≠ p₂ := left_ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `π / 2`, the last two points are not equal. -/ theorem right_ne_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = (π / 2 : ℝ)) : p₃ ≠ p₂ := right_ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `π / 2`, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = (π / 2 : ℝ)) : p₁ ≠ p₃ := left_ne_right_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `-π / 2`, the first two points are not equal. -/ theorem left_ne_of_oangle_eq_neg_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = (-π / 2 : ℝ)) : p₁ ≠ p₂ := left_ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `-π / 2`, the last two points are not equal. -/ theorem right_ne_of_oangle_eq_neg_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = (-π / 2 : ℝ)) : p₃ ≠ p₂ := right_ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the angle between three points is `-π / 2`, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_eq_neg_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = (-π / 2 : ℝ)) : p₁ ≠ p₃ := left_ne_right_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : ∡ p₁ p₂ p₃ ≠ 0) /-- If the sign of the angle between three points is nonzero, the first two points are not equal. -/ theorem left_ne_of_oangle_sign_ne_zero {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign ≠ 0) : p₁ ≠ p₂ := left_ne_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 /-- If the sign of the angle between three points is nonzero, the last two points are not equal. -/ theorem right_ne_of_oangle_sign_ne_zero {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign ≠ 0) : p₃ ≠ p₂ := right_ne_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 /-- If the sign of the angle between three points is nonzero, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_sign_ne_zero {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign ≠ 0) : p₁ ≠ p₃ := left_ne_right_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 /-- If the sign of the angle between three points is positive, the first two points are not equal. -/ theorem left_ne_of_oangle_sign_eq_one {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign = 1) : p₁ ≠ p₂ := left_ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (∡ p₁ p₂ p₃).sign ≠ 0) /-- If the sign of the angle between three points is positive, the last two points are not equal. -/ theorem right_ne_of_oangle_sign_eq_one {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign = 1) : p₃ ≠ p₂ := right_ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (∡ p₁ p₂ p₃).sign ≠ 0) /-- If the sign of the angle between three points is positive, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_sign_eq_one {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign = 1) : p₁ ≠ p₃ := left_ne_right_of_oangle_sign_ne_zero (h.symm ▸ by decide : (∡ p₁ p₂ p₃).sign ≠ 0) /-- If the sign of the angle between three points is negative, the first two points are not equal. -/ theorem left_ne_of_oangle_sign_eq_neg_one {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign = -1) : p₁ ≠ p₂ := left_ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (∡ p₁ p₂ p₃).sign ≠ 0) /-- If the sign of the angle between three points is negative, the last two points are not equal. -/ theorem right_ne_of_oangle_sign_eq_neg_one {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign = -1) : p₃ ≠ p₂ := right_ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (∡ p₁ p₂ p₃).sign ≠ 0) /-- If the sign of the angle between three points is negative, the first and third points are not equal. -/ theorem left_ne_right_of_oangle_sign_eq_neg_one {p₁ p₂ p₃ : P} (h : (∡ p₁ p₂ p₃).sign = -1) : p₁ ≠ p₃ := left_ne_right_of_oangle_sign_ne_zero (h.symm ▸ by decide : (∡ p₁ p₂ p₃).sign ≠ 0) /-- Reversing the order of the points passed to `oangle` negates the angle. -/ theorem oangle_rev (p₁ p₂ p₃ : P) : ∡ p₃ p₂ p₁ = -∡ p₁ p₂ p₃ := o.oangle_rev _ _ /-- Adding an angle to that with the order of the points reversed results in 0. -/ @[simp] theorem oangle_add_oangle_rev (p₁ p₂ p₃ : P) : ∡ p₁ p₂ p₃ + ∡ p₃ p₂ p₁ = 0 := o.oangle_add_oangle_rev _ _ /-- An oriented angle is zero if and only if the angle with the order of the points reversed is zero. -/ theorem oangle_eq_zero_iff_oangle_rev_eq_zero {p₁ p₂ p₃ : P} : ∡ p₁ p₂ p₃ = 0 ↔ ∡ p₃ p₂ p₁ = 0 := o.oangle_eq_zero_iff_oangle_rev_eq_zero /-- An oriented angle is `π` if and only if the angle with the order of the points reversed is `π`. -/ theorem oangle_eq_pi_iff_oangle_rev_eq_pi {p₁ p₂ p₃ : P} : ∡ p₁ p₂ p₃ = π ↔ ∡ p₃ p₂ p₁ = π := o.oangle_eq_pi_iff_oangle_rev_eq_pi /-- An oriented angle is not zero or `π` if and only if the three points are affinely independent. -/ theorem oangle_ne_zero_and_ne_pi_iff_affineIndependent {p₁ p₂ p₃ : P} : ∡ p₁ p₂ p₃ ≠ 0 ∧ ∡ p₁ p₂ p₃ ≠ π ↔ AffineIndependent ℝ ![p₁, p₂, p₃] := by rw [oangle, o.oangle_ne_zero_and_ne_pi_iff_linearIndependent, affineIndependent_iff_linearIndependent_vsub ℝ _ (1 : Fin 3), ← linearIndependent_equiv (finSuccAboveEquiv (1 : Fin 3))] convert Iff.rfl ext i fin_cases i <;> rfl /-- An oriented angle is zero or `π` if and only if the three points are collinear. -/ theorem oangle_eq_zero_or_eq_pi_iff_collinear {p₁ p₂ p₃ : P} : ∡ p₁ p₂ p₃ = 0 ∨ ∡ p₁ p₂ p₃ = π ↔ Collinear ℝ ({p₁, p₂, p₃} : Set P) := by rw [← not_iff_not, not_or, oangle_ne_zero_and_ne_pi_iff_affineIndependent, affineIndependent_iff_not_collinear_set] /-- An oriented angle has a sign zero if and only if the three points are collinear. -/ theorem oangle_sign_eq_zero_iff_collinear {p₁ p₂ p₃ : P} : (∡ p₁ p₂ p₃).sign = 0 ↔ Collinear ℝ ({p₁, p₂, p₃} : Set P) := by rw [Real.Angle.sign_eq_zero_iff, oangle_eq_zero_or_eq_pi_iff_collinear] /-- If twice the oriented angles between two triples of points are equal, one triple is affinely independent if and only if the other is. -/ theorem affineIndependent_iff_of_two_zsmul_oangle_eq {p₁ p₂ p₃ p₄ p₅ p₆ : P} (h : (2 : ℤ) • ∡ p₁ p₂ p₃ = (2 : ℤ) • ∡ p₄ p₅ p₆) : AffineIndependent ℝ ![p₁, p₂, p₃] ↔ AffineIndependent ℝ ![p₄, p₅, p₆] := by simp_rw [← oangle_ne_zero_and_ne_pi_iff_affineIndependent, ← Real.Angle.two_zsmul_ne_zero_iff, h] /-- If twice the oriented angles between two triples of points are equal, one triple is collinear if and only if the other is. -/ theorem collinear_iff_of_two_zsmul_oangle_eq {p₁ p₂ p₃ p₄ p₅ p₆ : P} (h : (2 : ℤ) • ∡ p₁ p₂ p₃ = (2 : ℤ) • ∡ p₄ p₅ p₆) : Collinear ℝ ({p₁, p₂, p₃} : Set P) ↔ Collinear ℝ ({p₄, p₅, p₆} : Set P) := by simp_rw [← oangle_eq_zero_or_eq_pi_iff_collinear, ← Real.Angle.two_zsmul_eq_zero_iff, h] /-- If corresponding pairs of points in two angles have the same vector span, twice those angles	are equal. -/ theorem two_zsmul_oangle_of_vectorSpan_eq {p₁ p₂ p₃ p₄ p₅ p₆ : P} (h₁₂₄₅ : vectorSpan ℝ ({p₁, p₂} : Set P) = vectorSpan ℝ ({p₄, p₅} : Set P)) (h₃₂₆₅ : vectorSpan ℝ ({p₃, p₂} : Set P) = vectorSpan ℝ ({p₆, p₅} : Set P)) : (2 : ℤ) • ∡ p₁ p₂ p₃ = (2 : ℤ) • ∡ p₄ p₅ p₆ := by simp_rw [vectorSpan_pair] at h₁₂₄₅ h₃₂₆₅ exact o.two_zsmul_oangle_of_span_eq_of_span_eq h₁₂₄₅ h₃₂₆₅	Mathlib/Geometry/Euclidean/Angle/Oriented/Affine.lean	218	225
/- 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, Patrick Massot -/ import Mathlib.Algebra.Group.Subgroup.Pointwise import Mathlib.Algebra.Order.Archimedean.Basic import Mathlib.Order.Filter.Bases.Finite import Mathlib.Topology.Algebra.Group.Defs import Mathlib.Topology.Algebra.Monoid import Mathlib.Topology.Homeomorph.Lemmas /-! # Topological groups This file defines the following typeclasses: * `IsTopologicalGroup`, `IsTopologicalAddGroup`: multiplicative and additive topological groups, i.e., groups with continuous `()` and `(⁻¹)` / `(+)` and `(-)`; `ContinuousSub G` means that `G` has a continuous subtraction operation. There is an instance deducing `ContinuousSub` from `IsTopologicalGroup` but we use a separate typeclass because, e.g., `ℕ` and `ℝ≥0` have continuous subtraction but are not additive groups. We also define `Homeomorph` versions of several `Equiv`s: `Homeomorph.mulLeft`, `Homeomorph.mulRight`, `Homeomorph.inv`, and prove a few facts about neighbourhood filters in groups. ## Tags topological space, group, topological group -/ open Set Filter TopologicalSpace Function Topology MulOpposite Pointwise universe u v w x variable {G : Type w} {H : Type x} {α : Type u} {β : Type v} section ContinuousMulGroup /-! ### Groups with continuous multiplication In this section we prove a few statements about groups with continuous `()`. -/ variable [TopologicalSpace G] [Group G] [ContinuousMul G] /-- Multiplication from the left in a topological group as a homeomorphism. -/ @[to_additive "Addition from the left in a topological additive group as a homeomorphism."] protected def Homeomorph.mulLeft (a : G) : G ≃ₜ G := { Equiv.mulLeft a with continuous_toFun := continuous_const.mul continuous_id continuous_invFun := continuous_const.mul continuous_id } @[to_additive (attr := simp)] theorem Homeomorph.coe_mulLeft (a : G) : ⇑(Homeomorph.mulLeft a) = (a ·) := rfl @[to_additive] theorem Homeomorph.mulLeft_symm (a : G) : (Homeomorph.mulLeft a).symm = Homeomorph.mulLeft a⁻¹ := by ext rfl @[to_additive] lemma isOpenMap_mul_left (a : G) : IsOpenMap (a * ·) := (Homeomorph.mulLeft a).isOpenMap @[to_additive IsOpen.left_addCoset] theorem IsOpen.leftCoset {U : Set G} (h : IsOpen U) (x : G) : IsOpen (x • U) := isOpenMap_mul_left x _ h @[to_additive] lemma isClosedMap_mul_left (a : G) : IsClosedMap (a * ·) := (Homeomorph.mulLeft a).isClosedMap @[to_additive IsClosed.left_addCoset] theorem IsClosed.leftCoset {U : Set G} (h : IsClosed U) (x : G) : IsClosed (x • U) := isClosedMap_mul_left x _ h /-- Multiplication from the right in a topological group as a homeomorphism. -/ @[to_additive "Addition from the right in a topological additive group as a homeomorphism."] protected def Homeomorph.mulRight (a : G) : G ≃ₜ G := { Equiv.mulRight a with continuous_toFun := continuous_id.mul continuous_const continuous_invFun := continuous_id.mul continuous_const } @[to_additive (attr := simp)] lemma Homeomorph.coe_mulRight (a : G) : ⇑(Homeomorph.mulRight a) = (· * a) := rfl @[to_additive] theorem Homeomorph.mulRight_symm (a : G) : (Homeomorph.mulRight a).symm = Homeomorph.mulRight a⁻¹ := by ext rfl @[to_additive] theorem isOpenMap_mul_right (a : G) : IsOpenMap (· * a) := (Homeomorph.mulRight a).isOpenMap @[to_additive IsOpen.right_addCoset] theorem IsOpen.rightCoset {U : Set G} (h : IsOpen U) (x : G) : IsOpen (op x • U) := isOpenMap_mul_right x _ h @[to_additive] theorem isClosedMap_mul_right (a : G) : IsClosedMap (· * a) := (Homeomorph.mulRight a).isClosedMap @[to_additive IsClosed.right_addCoset] theorem IsClosed.rightCoset {U : Set G} (h : IsClosed U) (x : G) : IsClosed (op x • U) := isClosedMap_mul_right x _ h @[to_additive] theorem discreteTopology_of_isOpen_singleton_one (h : IsOpen ({1} : Set G)) : DiscreteTopology G := by rw [← singletons_open_iff_discrete] intro g suffices {g} = (g⁻¹ * ·) ⁻¹' {1} by rw [this] exact (continuous_mul_left g⁻¹).isOpen_preimage _ h simp only [mul_one, Set.preimage_mul_left_singleton, eq_self_iff_true, inv_inv, Set.singleton_eq_singleton_iff] @[to_additive] theorem discreteTopology_iff_isOpen_singleton_one : DiscreteTopology G ↔ IsOpen ({1} : Set G) := ⟨fun h => forall_open_iff_discrete.mpr h {1}, discreteTopology_of_isOpen_singleton_one⟩ end ContinuousMulGroup /-! ### `ContinuousInv` and `ContinuousNeg` -/ section ContinuousInv variable [TopologicalSpace G] [Inv G] [ContinuousInv G] @[to_additive] theorem ContinuousInv.induced {α : Type} {β : Type} {F : Type} [FunLike F α β] [Group α] [DivisionMonoid β] [MonoidHomClass F α β] [tβ : TopologicalSpace β] [ContinuousInv β] (f : F) : @ContinuousInv α (tβ.induced f) _ := by let _tα := tβ.induced f refine ⟨continuous_induced_rng.2 ?_⟩ simp only [Function.comp_def, map_inv] fun_prop @[to_additive] protected theorem Specializes.inv {x y : G} (h : x ⤳ y) : (x⁻¹) ⤳ (y⁻¹) := h.map continuous_inv @[to_additive] protected theorem Inseparable.inv {x y : G} (h : Inseparable x y) : Inseparable (x⁻¹) (y⁻¹) := h.map continuous_inv @[to_additive] protected theorem Specializes.zpow {G : Type} [DivInvMonoid G] [TopologicalSpace G] [ContinuousMul G] [ContinuousInv G] {x y : G} (h : x ⤳ y) : ∀ m : ℤ, (x ^ m) ⤳ (y ^ m) \| .ofNat n => by simpa using h.pow n \| .negSucc n => by simpa using (h.pow (n + 1)).inv @[to_additive] protected theorem Inseparable.zpow {G : Type} [DivInvMonoid G] [TopologicalSpace G] [ContinuousMul G] [ContinuousInv G] {x y : G} (h : Inseparable x y) (m : ℤ) : Inseparable (x ^ m) (y ^ m) := (h.specializes.zpow m).antisymm (h.specializes'.zpow m) @[to_additive] instance : ContinuousInv (ULift G) := ⟨continuous_uliftUp.comp (continuous_inv.comp continuous_uliftDown)⟩ @[to_additive] theorem continuousOn_inv {s : Set G} : ContinuousOn Inv.inv s := continuous_inv.continuousOn @[to_additive] theorem continuousWithinAt_inv {s : Set G} {x : G} : ContinuousWithinAt Inv.inv s x := continuous_inv.continuousWithinAt @[to_additive] theorem continuousAt_inv {x : G} : ContinuousAt Inv.inv x := continuous_inv.continuousAt @[to_additive] theorem tendsto_inv (a : G) : Tendsto Inv.inv (𝓝 a) (𝓝 a⁻¹) := continuousAt_inv variable [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} @[to_additive] instance OrderDual.instContinuousInv : ContinuousInv Gᵒᵈ := ‹ContinuousInv G› @[to_additive] instance Prod.continuousInv [TopologicalSpace H] [Inv H] [ContinuousInv H] : ContinuousInv (G × H) := ⟨continuous_inv.fst'.prodMk continuous_inv.snd'⟩ variable {ι : Type} @[to_additive] instance Pi.continuousInv {C : ι → Type} [∀ i, TopologicalSpace (C i)] [∀ i, Inv (C i)] [∀ i, ContinuousInv (C i)] : ContinuousInv (∀ i, C i) where continuous_inv := continuous_pi fun i => (continuous_apply i).inv /-- A version of `Pi.continuousInv` for non-dependent functions. It is needed because sometimes Lean fails to use `Pi.continuousInv` for non-dependent functions. -/ @[to_additive "A version of `Pi.continuousNeg` for non-dependent functions. It is needed because sometimes Lean fails to use `Pi.continuousNeg` for non-dependent functions."] instance Pi.has_continuous_inv' : ContinuousInv (ι → G) := Pi.continuousInv @[to_additive] instance (priority := 100) continuousInv_of_discreteTopology [TopologicalSpace H] [Inv H] [DiscreteTopology H] : ContinuousInv H := ⟨continuous_of_discreteTopology⟩ section PointwiseLimits variable (G₁ G₂ : Type) [TopologicalSpace G₂] [T2Space G₂] @[to_additive] theorem isClosed_setOf_map_inv [Inv G₁] [Inv G₂] [ContinuousInv G₂] : IsClosed { f : G₁ → G₂ \| ∀ x, f x⁻¹ = (f x)⁻¹ } := by simp only [setOf_forall] exact isClosed_iInter fun i => isClosed_eq (continuous_apply _) (continuous_apply _).inv end PointwiseLimits instance [TopologicalSpace H] [Inv H] [ContinuousInv H] : ContinuousNeg (Additive H) where continuous_neg := @continuous_inv H _ _ _ instance [TopologicalSpace H] [Neg H] [ContinuousNeg H] : ContinuousInv (Multiplicative H) where continuous_inv := @continuous_neg H _ _ _ end ContinuousInv section ContinuousInvolutiveInv variable [TopologicalSpace G] [InvolutiveInv G] [ContinuousInv G] {s : Set G} @[to_additive] theorem IsCompact.inv (hs : IsCompact s) : IsCompact s⁻¹ := by rw [← image_inv_eq_inv] exact hs.image continuous_inv variable (G) /-- Inversion in a topological group as a homeomorphism. -/ @[to_additive "Negation in a topological group as a homeomorphism."] protected def Homeomorph.inv (G : Type) [TopologicalSpace G] [InvolutiveInv G] [ContinuousInv G] : G ≃ₜ G := { Equiv.inv G with continuous_toFun := continuous_inv continuous_invFun := continuous_inv } @[to_additive (attr := simp)] lemma Homeomorph.coe_inv {G : Type} [TopologicalSpace G] [InvolutiveInv G] [ContinuousInv G] : ⇑(Homeomorph.inv G) = Inv.inv := rfl @[to_additive] theorem nhds_inv (a : G) : 𝓝 a⁻¹ = (𝓝 a)⁻¹ := ((Homeomorph.inv G).map_nhds_eq a).symm @[to_additive] theorem isOpenMap_inv : IsOpenMap (Inv.inv : G → G) := (Homeomorph.inv _).isOpenMap @[to_additive] theorem isClosedMap_inv : IsClosedMap (Inv.inv : G → G) := (Homeomorph.inv _).isClosedMap variable {G} @[to_additive] theorem IsOpen.inv (hs : IsOpen s) : IsOpen s⁻¹ := hs.preimage continuous_inv @[to_additive] theorem IsClosed.inv (hs : IsClosed s) : IsClosed s⁻¹ := hs.preimage continuous_inv @[to_additive] theorem inv_closure : ∀ s : Set G, (closure s)⁻¹ = closure s⁻¹ := (Homeomorph.inv G).preimage_closure variable [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} @[to_additive (attr := simp)] lemma continuous_inv_iff : Continuous f⁻¹ ↔ Continuous f := (Homeomorph.inv G).comp_continuous_iff @[to_additive (attr := simp)] lemma continuousAt_inv_iff : ContinuousAt f⁻¹ x ↔ ContinuousAt f x := (Homeomorph.inv G).comp_continuousAt_iff _ _ @[to_additive (attr := simp)] lemma continuousOn_inv_iff : ContinuousOn f⁻¹ s ↔ ContinuousOn f s := (Homeomorph.inv G).comp_continuousOn_iff _ _ @[to_additive] alias ⟨Continuous.of_inv, _⟩ := continuous_inv_iff @[to_additive] alias ⟨ContinuousAt.of_inv, _⟩ := continuousAt_inv_iff @[to_additive] alias ⟨ContinuousOn.of_inv, _⟩ := continuousOn_inv_iff end ContinuousInvolutiveInv section LatticeOps variable {ι' : Sort} [Inv G] @[to_additive] theorem continuousInv_sInf {ts : Set (TopologicalSpace G)} (h : ∀ t ∈ ts, @ContinuousInv G t _) : @ContinuousInv G (sInf ts) _ := letI := sInf ts { continuous_inv := continuous_sInf_rng.2 fun t ht => continuous_sInf_dom ht (@ContinuousInv.continuous_inv G t _ (h t ht)) } @[to_additive] theorem continuousInv_iInf {ts' : ι' → TopologicalSpace G} (h' : ∀ i, @ContinuousInv G (ts' i) _) : @ContinuousInv G (⨅ i, ts' i) _ := by rw [← sInf_range] exact continuousInv_sInf (Set.forall_mem_range.mpr h') @[to_additive] theorem continuousInv_inf {t₁ t₂ : TopologicalSpace G} (h₁ : @ContinuousInv G t₁ _) (h₂ : @ContinuousInv G t₂ _) : @ContinuousInv G (t₁ ⊓ t₂) _ := by rw [inf_eq_iInf] refine continuousInv_iInf fun b => ?_ cases b <;> assumption end LatticeOps @[to_additive] theorem Topology.IsInducing.continuousInv {G H : Type} [Inv G] [Inv H] [TopologicalSpace G] [TopologicalSpace H] [ContinuousInv H] {f : G → H} (hf : IsInducing f) (hf_inv : ∀ x, f x⁻¹ = (f x)⁻¹) : ContinuousInv G := ⟨hf.continuous_iff.2 <\| by simpa only [Function.comp_def, hf_inv] using hf.continuous.inv⟩ @[deprecated (since := "2024-10-28")] alias Inducing.continuousInv := IsInducing.continuousInv section IsTopologicalGroup /-! ### Topological groups A topological group is a group in which the multiplication and inversion operations are continuous. Topological additive groups are defined in the same way. Equivalently, we can require that the division operation `x y ↦ x * y⁻¹` (resp., subtraction) is continuous. -/ section Conj instance ConjAct.units_continuousConstSMul {M} [Monoid M] [TopologicalSpace M] [ContinuousMul M] : ContinuousConstSMul (ConjAct Mˣ) M := ⟨fun _ => (continuous_const.mul continuous_id).mul continuous_const⟩ variable [TopologicalSpace G] [Inv G] [Mul G] [ContinuousMul G] /-- Conjugation is jointly continuous on `G × G` when both `mul` and `inv` are continuous. -/ @[to_additive continuous_addConj_prod "Conjugation is jointly continuous on `G × G` when both `add` and `neg` are continuous."] theorem IsTopologicalGroup.continuous_conj_prod [ContinuousInv G] : Continuous fun g : G × G => g.fst * g.snd * g.fst⁻¹ := continuous_mul.mul (continuous_inv.comp continuous_fst) @[deprecated (since := "2025-03-11")] alias IsTopologicalAddGroup.continuous_conj_sum := IsTopologicalAddGroup.continuous_addConj_prod /-- Conjugation by a fixed element is continuous when `mul` is continuous. -/ @[to_additive (attr := continuity) "Conjugation by a fixed element is continuous when `add` is continuous."] theorem IsTopologicalGroup.continuous_conj (g : G) : Continuous fun h : G => g * h * g⁻¹ := (continuous_mul_right g⁻¹).comp (continuous_mul_left g) /-- Conjugation acting on fixed element of the group is continuous when both `mul` and `inv` are continuous. -/ @[to_additive (attr := continuity) "Conjugation acting on fixed element of the additive group is continuous when both `add` and `neg` are continuous."] theorem IsTopologicalGroup.continuous_conj' [ContinuousInv G] (h : G) : Continuous fun g : G => g * h * g⁻¹ := (continuous_mul_right h).mul continuous_inv end Conj variable [TopologicalSpace G] [Group G] [IsTopologicalGroup G] [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} instance : IsTopologicalGroup (ULift G) where section ZPow @[to_additive (attr := continuity, fun_prop)] theorem continuous_zpow : ∀ z : ℤ, Continuous fun a : G => a ^ z \| Int.ofNat n => by simpa using continuous_pow n \| Int.negSucc n => by simpa using (continuous_pow (n + 1)).inv instance AddGroup.continuousConstSMul_int {A} [AddGroup A] [TopologicalSpace A] [IsTopologicalAddGroup A] : ContinuousConstSMul ℤ A := ⟨continuous_zsmul⟩ instance AddGroup.continuousSMul_int {A} [AddGroup A] [TopologicalSpace A] [IsTopologicalAddGroup A] : ContinuousSMul ℤ A := ⟨continuous_prod_of_discrete_left.mpr continuous_zsmul⟩ @[to_additive (attr := continuity, fun_prop)] theorem Continuous.zpow {f : α → G} (h : Continuous f) (z : ℤ) : Continuous fun b => f b ^ z := (continuous_zpow z).comp h @[to_additive] theorem continuousOn_zpow {s : Set G} (z : ℤ) : ContinuousOn (fun x => x ^ z) s := (continuous_zpow z).continuousOn @[to_additive] theorem continuousAt_zpow (x : G) (z : ℤ) : ContinuousAt (fun x => x ^ z) x := (continuous_zpow z).continuousAt @[to_additive] theorem Filter.Tendsto.zpow {α} {l : Filter α} {f : α → G} {x : G} (hf : Tendsto f l (𝓝 x)) (z : ℤ) : Tendsto (fun x => f x ^ z) l (𝓝 (x ^ z)) := (continuousAt_zpow _ _).tendsto.comp hf @[to_additive] theorem ContinuousWithinAt.zpow {f : α → G} {x : α} {s : Set α} (hf : ContinuousWithinAt f s x) (z : ℤ) : ContinuousWithinAt (fun x => f x ^ z) s x := Filter.Tendsto.zpow hf z @[to_additive (attr := fun_prop)] theorem ContinuousAt.zpow {f : α → G} {x : α} (hf : ContinuousAt f x) (z : ℤ) : ContinuousAt (fun x => f x ^ z) x := Filter.Tendsto.zpow hf z @[to_additive (attr := fun_prop)] theorem ContinuousOn.zpow {f : α → G} {s : Set α} (hf : ContinuousOn f s) (z : ℤ) : ContinuousOn (fun x => f x ^ z) s := fun x hx => (hf x hx).zpow z end ZPow section OrderedCommGroup variable [TopologicalSpace H] [CommGroup H] [PartialOrder H] [IsOrderedMonoid H] [ContinuousInv H] @[to_additive] theorem tendsto_inv_nhdsGT {a : H} : Tendsto Inv.inv (𝓝[>] a) (𝓝[<] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ioi := tendsto_neg_nhdsGT @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ioi := tendsto_inv_nhdsGT @[to_additive] theorem tendsto_inv_nhdsLT {a : H} : Tendsto Inv.inv (𝓝[<] a) (𝓝[>] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iio := tendsto_neg_nhdsLT @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iio := tendsto_inv_nhdsLT @[to_additive] theorem tendsto_inv_nhdsGT_inv {a : H} : Tendsto Inv.inv (𝓝[>] a⁻¹) (𝓝[<] a) := by simpa only [inv_inv] using tendsto_inv_nhdsGT (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ioi_neg := tendsto_neg_nhdsGT_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ioi_inv := tendsto_inv_nhdsGT_inv @[to_additive] theorem tendsto_inv_nhdsLT_inv {a : H} : Tendsto Inv.inv (𝓝[<] a⁻¹) (𝓝[>] a) := by simpa only [inv_inv] using tendsto_inv_nhdsLT (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iio_neg := tendsto_neg_nhdsLT_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iio_inv := tendsto_inv_nhdsLT_inv @[to_additive] theorem tendsto_inv_nhdsGE {a : H} : Tendsto Inv.inv (𝓝[≥] a) (𝓝[≤] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ici := tendsto_neg_nhdsGE @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ici := tendsto_inv_nhdsGE @[to_additive] theorem tendsto_inv_nhdsLE {a : H} : Tendsto Inv.inv (𝓝[≤] a) (𝓝[≥] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iic := tendsto_neg_nhdsLE @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iic := tendsto_inv_nhdsLE @[to_additive] theorem tendsto_inv_nhdsGE_inv {a : H} : Tendsto Inv.inv (𝓝[≥] a⁻¹) (𝓝[≤] a) := by simpa only [inv_inv] using tendsto_inv_nhdsGE (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ici_neg := tendsto_neg_nhdsGE_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ici_inv := tendsto_inv_nhdsGE_inv @[to_additive] theorem tendsto_inv_nhdsLE_inv {a : H} : Tendsto Inv.inv (𝓝[≤] a⁻¹) (𝓝[≥] a) := by simpa only [inv_inv] using tendsto_inv_nhdsLE (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iic_neg := tendsto_neg_nhdsLE_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iic_inv := tendsto_inv_nhdsLE_inv end OrderedCommGroup @[to_additive] instance Prod.instIsTopologicalGroup [TopologicalSpace H] [Group H] [IsTopologicalGroup H] : IsTopologicalGroup (G × H) where continuous_inv := continuous_inv.prodMap continuous_inv @[to_additive] instance OrderDual.instIsTopologicalGroup : IsTopologicalGroup Gᵒᵈ where @[to_additive] instance Pi.topologicalGroup {C : β → Type} [∀ b, TopologicalSpace (C b)] [∀ b, Group (C b)] [∀ b, IsTopologicalGroup (C b)] : IsTopologicalGroup (∀ b, C b) where continuous_inv := continuous_pi fun i => (continuous_apply i).inv open MulOpposite @[to_additive] instance [Inv α] [ContinuousInv α] : ContinuousInv αᵐᵒᵖ := opHomeomorph.symm.isInducing.continuousInv unop_inv /-- If multiplication is continuous in `α`, then it also is in `αᵐᵒᵖ`. -/ @[to_additive "If addition is continuous in `α`, then it also is in `αᵃᵒᵖ`."] instance [Group α] [IsTopologicalGroup α] : IsTopologicalGroup αᵐᵒᵖ where variable (G) @[to_additive] theorem nhds_one_symm : comap Inv.inv (𝓝 (1 : G)) = 𝓝 (1 : G) := ((Homeomorph.inv G).comap_nhds_eq _).trans (congr_arg nhds inv_one) @[to_additive] theorem nhds_one_symm' : map Inv.inv (𝓝 (1 : G)) = 𝓝 (1 : G) := ((Homeomorph.inv G).map_nhds_eq _).trans (congr_arg nhds inv_one) @[to_additive] theorem inv_mem_nhds_one {S : Set G} (hS : S ∈ (𝓝 1 : Filter G)) : S⁻¹ ∈ 𝓝 (1 : G) := by rwa [← nhds_one_symm'] at hS /-- The map `(x, y) ↦ (x, x y)` as a homeomorphism. This is a shear mapping. -/ @[to_additive "The map `(x, y) ↦ (x, x + y)` as a homeomorphism. This is a shear mapping."] protected def Homeomorph.shearMulRight : G × G ≃ₜ G × G := { Equiv.prodShear (Equiv.refl _) Equiv.mulLeft with continuous_toFun := by dsimp; fun_prop continuous_invFun := by dsimp; fun_prop } @[to_additive (attr := simp)] theorem Homeomorph.shearMulRight_coe : ⇑(Homeomorph.shearMulRight G) = fun z : G × G => (z.1, z.1 * z.2) := rfl @[to_additive (attr := simp)] theorem Homeomorph.shearMulRight_symm_coe : ⇑(Homeomorph.shearMulRight G).symm = fun z : G × G => (z.1, z.1⁻¹ * z.2) := rfl variable {G} @[to_additive] protected theorem Topology.IsInducing.topologicalGroup {F : Type} [Group H] [TopologicalSpace H] [FunLike F H G] [MonoidHomClass F H G] (f : F) (hf : IsInducing f) : IsTopologicalGroup H := { toContinuousMul := hf.continuousMul _ toContinuousInv := hf.continuousInv (map_inv f) } @[deprecated (since := "2024-10-28")] alias Inducing.topologicalGroup := IsInducing.topologicalGroup @[to_additive] theorem topologicalGroup_induced {F : Type} [Group H] [FunLike F H G] [MonoidHomClass F H G] (f : F) : @IsTopologicalGroup H (induced f ‹_›) _ := letI := induced f ‹_› IsInducing.topologicalGroup f ⟨rfl⟩ namespace Subgroup @[to_additive] instance (S : Subgroup G) : IsTopologicalGroup S := IsInducing.subtypeVal.topologicalGroup S.subtype end Subgroup /-- The (topological-space) closure of a subgroup of a topological group is itself a subgroup. -/ @[to_additive "The (topological-space) closure of an additive subgroup of an additive topological group is itself an additive subgroup."] def Subgroup.topologicalClosure (s : Subgroup G) : Subgroup G := { s.toSubmonoid.topologicalClosure with carrier := _root_.closure (s : Set G) inv_mem' := fun {g} hg => by simpa only [← Set.mem_inv, inv_closure, inv_coe_set] using hg } @[to_additive (attr := simp)] theorem Subgroup.topologicalClosure_coe {s : Subgroup G} : (s.topologicalClosure : Set G) = _root_.closure s := rfl @[to_additive] theorem Subgroup.le_topologicalClosure (s : Subgroup G) : s ≤ s.topologicalClosure := _root_.subset_closure @[to_additive] theorem Subgroup.isClosed_topologicalClosure (s : Subgroup G) : IsClosed (s.topologicalClosure : Set G) := isClosed_closure @[to_additive] theorem Subgroup.topologicalClosure_minimal (s : Subgroup G) {t : Subgroup G} (h : s ≤ t) (ht : IsClosed (t : Set G)) : s.topologicalClosure ≤ t := closure_minimal h ht @[to_additive] theorem DenseRange.topologicalClosure_map_subgroup [Group H] [TopologicalSpace H] [IsTopologicalGroup H] {f : G →* H} (hf : Continuous f) (hf' : DenseRange f) {s : Subgroup G} (hs : s.topologicalClosure = ⊤) : (s.map f).topologicalClosure = ⊤ := by rw [SetLike.ext'_iff] at hs ⊢ simp only [Subgroup.topologicalClosure_coe, Subgroup.coe_top, ← dense_iff_closure_eq] at hs ⊢ exact hf'.dense_image hf hs /-- The topological closure of a normal subgroup is normal. -/ @[to_additive "The topological closure of a normal additive subgroup is normal."] theorem Subgroup.is_normal_topologicalClosure {G : Type} [TopologicalSpace G] [Group G] [IsTopologicalGroup G] (N : Subgroup G) [N.Normal] : (Subgroup.topologicalClosure N).Normal where conj_mem n hn g := by apply map_mem_closure (IsTopologicalGroup.continuous_conj g) hn exact fun m hm => Subgroup.Normal.conj_mem inferInstance m hm g @[to_additive] theorem mul_mem_connectedComponent_one {G : Type} [TopologicalSpace G] [MulOneClass G] [ContinuousMul G] {g h : G} (hg : g ∈ connectedComponent (1 : G)) (hh : h ∈ connectedComponent (1 : G)) : g * h ∈ connectedComponent (1 : G) := by rw [connectedComponent_eq hg] have hmul : g ∈ connectedComponent (g * h) := by apply Continuous.image_connectedComponent_subset (continuous_mul_left g) rw [← connectedComponent_eq hh] exact ⟨(1 : G), mem_connectedComponent, by simp only [mul_one]⟩ simpa [← connectedComponent_eq hmul] using mem_connectedComponent @[to_additive] theorem inv_mem_connectedComponent_one {G : Type} [TopologicalSpace G] [DivisionMonoid G] [ContinuousInv G] {g : G} (hg : g ∈ connectedComponent (1 : G)) : g⁻¹ ∈ connectedComponent (1 : G) := by rw [← inv_one] exact Continuous.image_connectedComponent_subset continuous_inv _ ((Set.mem_image _ _ _).mp ⟨g, hg, rfl⟩) /-- The connected component of 1 is a subgroup of `G`. -/ @[to_additive "The connected component of 0 is a subgroup of `G`."] def Subgroup.connectedComponentOfOne (G : Type) [TopologicalSpace G] [Group G] [IsTopologicalGroup G] : Subgroup G where carrier := connectedComponent (1 : G) one_mem' := mem_connectedComponent mul_mem' hg hh := mul_mem_connectedComponent_one hg hh inv_mem' hg := inv_mem_connectedComponent_one hg /-- If a subgroup of a topological group is commutative, then so is its topological closure. See note [reducible non-instances]. -/ @[to_additive "If a subgroup of an additive topological group is commutative, then so is its topological closure. See note [reducible non-instances]."] abbrev Subgroup.commGroupTopologicalClosure [T2Space G] (s : Subgroup G) (hs : ∀ x y : s, x * y = y * x) : CommGroup s.topologicalClosure := { s.topologicalClosure.toGroup, s.toSubmonoid.commMonoidTopologicalClosure hs with } variable (G) in @[to_additive] lemma Subgroup.coe_topologicalClosure_bot : ((⊥ : Subgroup G).topologicalClosure : Set G) = _root_.closure ({1} : Set G) := by simp @[to_additive exists_nhds_half_neg] theorem exists_nhds_split_inv {s : Set G} (hs : s ∈ 𝓝 (1 : G)) : ∃ V ∈ 𝓝 (1 : G), ∀ v ∈ V, ∀ w ∈ V, v / w ∈ s := by have : (fun p : G × G => p.1 * p.2⁻¹) ⁻¹' s ∈ 𝓝 ((1, 1) : G × G) := continuousAt_fst.mul continuousAt_snd.inv (by simpa) simpa only [div_eq_mul_inv, nhds_prod_eq, mem_prod_self_iff, prod_subset_iff, mem_preimage] using this @[to_additive] theorem nhds_translation_mul_inv (x : G) : comap (· * x⁻¹) (𝓝 1) = 𝓝 x := ((Homeomorph.mulRight x⁻¹).comap_nhds_eq 1).trans <\| show 𝓝 (1 * x⁻¹⁻¹) = 𝓝 x by simp @[to_additive (attr := simp)] theorem map_mul_left_nhds (x y : G) : map (x * ·) (𝓝 y) = 𝓝 (x * y) := (Homeomorph.mulLeft x).map_nhds_eq y @[to_additive] theorem map_mul_left_nhds_one (x : G) : map (x * ·) (𝓝 1) = 𝓝 x := by simp @[to_additive (attr := simp)] theorem map_mul_right_nhds (x y : G) : map (· * x) (𝓝 y) = 𝓝 (y * x) := (Homeomorph.mulRight x).map_nhds_eq y @[to_additive] theorem map_mul_right_nhds_one (x : G) : map (· * x) (𝓝 1) = 𝓝 x := by simp @[to_additive] theorem Filter.HasBasis.nhds_of_one {ι : Sort} {p : ι → Prop} {s : ι → Set G} (hb : HasBasis (𝓝 1 : Filter G) p s) (x : G) : HasBasis (𝓝 x) p fun i => { y \| y / x ∈ s i } := by rw [← nhds_translation_mul_inv] simp_rw [div_eq_mul_inv] exact hb.comap _ @[to_additive] theorem mem_closure_iff_nhds_one {x : G} {s : Set G} : x ∈ closure s ↔ ∀ U ∈ (𝓝 1 : Filter G), ∃ y ∈ s, y / x ∈ U := by rw [mem_closure_iff_nhds_basis ((𝓝 1 : Filter G).basis_sets.nhds_of_one x)] simp_rw [Set.mem_setOf, id] /-- A monoid homomorphism (a bundled morphism of a type that implements `MonoidHomClass`) from a topological group to a topological monoid is continuous provided that it is continuous at one. See also `uniformContinuous_of_continuousAt_one`. -/ @[to_additive "An additive monoid homomorphism (a bundled morphism of a type that implements `AddMonoidHomClass`) from an additive topological group to an additive topological monoid is continuous provided that it is continuous at zero. See also `uniformContinuous_of_continuousAt_zero`."] theorem continuous_of_continuousAt_one {M hom : Type} [MulOneClass M] [TopologicalSpace M] [ContinuousMul M] [FunLike hom G M] [MonoidHomClass hom G M] (f : hom) (hf : ContinuousAt f 1) : Continuous f := continuous_iff_continuousAt.2 fun x => by simpa only [ContinuousAt, ← map_mul_left_nhds_one x, tendsto_map'_iff, Function.comp_def, map_mul, map_one, mul_one] using hf.tendsto.const_mul (f x) @[to_additive continuous_of_continuousAt_zero₂] theorem continuous_of_continuousAt_one₂ {H M : Type} [CommMonoid M] [TopologicalSpace M] [ContinuousMul M] [Group H] [TopologicalSpace H] [IsTopologicalGroup H] (f : G → H →* M) (hf : ContinuousAt (fun x : G × H ↦ f x.1 x.2) (1, 1)) (hl : ∀ x, ContinuousAt (f x) 1) (hr : ∀ y, ContinuousAt (f · y) 1) : Continuous (fun x : G × H ↦ f x.1 x.2) := continuous_iff_continuousAt.2 fun (x, y) => by simp only [ContinuousAt, nhds_prod_eq, ← map_mul_left_nhds_one x, ← map_mul_left_nhds_one y, prod_map_map_eq, tendsto_map'_iff, Function.comp_def, map_mul, MonoidHom.mul_apply] at * refine ((tendsto_const_nhds.mul ((hr y).comp tendsto_fst)).mul (((hl x).comp tendsto_snd).mul hf)).mono_right (le_of_eq ?_) simp only [map_one, mul_one, MonoidHom.one_apply] @[to_additive] lemma IsTopologicalGroup.isInducing_iff_nhds_one {H : Type} [Group H] [TopologicalSpace H] [IsTopologicalGroup H] {F : Type} [FunLike F G H] [MonoidHomClass F G H] {f : F} : Topology.IsInducing f ↔ 𝓝 (1 : G) = (𝓝 (1 : H)).comap f := by rw [Topology.isInducing_iff_nhds] refine ⟨(map_one f ▸ · 1), fun hf x ↦ ?_⟩ rw [← nhds_translation_mul_inv, ← nhds_translation_mul_inv (f x), Filter.comap_comap, hf, Filter.comap_comap] congr 1 ext; simp @[to_additive] lemma TopologicalGroup.isOpenMap_iff_nhds_one {H : Type} [Monoid H] [TopologicalSpace H] [ContinuousConstSMul H H] {F : Type} [FunLike F G H] [MonoidHomClass F G H] {f : F} : IsOpenMap f ↔ 𝓝 1 ≤ .map f (𝓝 1) := by refine ⟨fun H ↦ map_one f ▸ H.nhds_le 1, fun h ↦ IsOpenMap.of_nhds_le fun x ↦ ?_⟩ have : Filter.map (f x * ·) (𝓝 1) = 𝓝 (f x) := by simpa [-Homeomorph.map_nhds_eq, Units.smul_def] using (Homeomorph.smul ((toUnits x).map (MonoidHomClass.toMonoidHom f))).map_nhds_eq (1 : H) rw [← map_mul_left_nhds_one x, Filter.map_map, Function.comp_def, ← this] refine (Filter.map_mono h).trans ?_ simp [Function.comp_def] -- TODO: unify with `QuotientGroup.isOpenQuotientMap_mk` /-- Let `A` and `B` be topological groups, and let `φ : A → B` be a continuous surjective group homomorphism. Assume furthermore that `φ` is a quotient map (i.e., `V ⊆ B` is open iff `φ⁻¹ V` is open). Then `φ` is an open quotient map, and in particular an open map. -/ @[to_additive "Let `A` and `B` be topological additive groups, and let `φ : A → B` be a continuous surjective additive group homomorphism. Assume furthermore that `φ` is a quotient map (i.e., `V ⊆ B` is open iff `φ⁻¹ V` is open). Then `φ` is an open quotient map, and in particular an open map."] lemma MonoidHom.isOpenQuotientMap_of_isQuotientMap {A : Type} [Group A] [TopologicalSpace A] [ContinuousMul A] {B : Type} [Group B] [TopologicalSpace B] {F : Type} [FunLike F A B] [MonoidHomClass F A B] {φ : F} (hφ : IsQuotientMap φ) : IsOpenQuotientMap φ where surjective := hφ.surjective continuous := hφ.continuous isOpenMap := by -- We need to check that if `U ⊆ A` is open then `φ⁻¹ (φ U)` is open. intro U hU rw [← hφ.isOpen_preimage] -- It suffices to show that `φ⁻¹ (φ U) = ⋃ (U k⁻¹)` as `k` runs through the kernel of `φ`, -- as `U * k⁻¹` is open because `x ↦ x * k` is continuous. -- Remark: here is where we use that we have groups not monoids (you cannot avoid -- using both `k` and `k⁻¹` at this point). suffices ⇑φ ⁻¹' (⇑φ '' U) = ⋃ k ∈ ker (φ : A →* B), (fun x ↦ x * k) ⁻¹' U by exact this ▸ isOpen_biUnion (fun k _ ↦ Continuous.isOpen_preimage (by fun_prop) _ hU) ext x -- But this is an elementary calculation. constructor · rintro ⟨y, hyU, hyx⟩ apply Set.mem_iUnion_of_mem (x⁻¹ * y) simp_all · rintro ⟨_, ⟨k, rfl⟩, _, ⟨(hk : φ k = 1), rfl⟩, hx⟩ use x * k, hx rw [map_mul, hk, mul_one] @[to_additive] theorem IsTopologicalGroup.ext {G : Type} [Group G] {t t' : TopologicalSpace G} (tg : @IsTopologicalGroup G t _) (tg' : @IsTopologicalGroup G t' _) (h : @nhds G t 1 = @nhds G t' 1) : t = t' := TopologicalSpace.ext_nhds fun x ↦ by rw [← @nhds_translation_mul_inv G t _ _ x, ← @nhds_translation_mul_inv G t' _ _ x, ← h] @[to_additive] theorem IsTopologicalGroup.ext_iff {G : Type} [Group G] {t t' : TopologicalSpace G} (tg : @IsTopologicalGroup G t _) (tg' : @IsTopologicalGroup G t' _) : t = t' ↔ @nhds G t 1 = @nhds G t' 1 := ⟨fun h => h ▸ rfl, tg.ext tg'⟩ @[to_additive] theorem ContinuousInv.of_nhds_one {G : Type} [Group G] [TopologicalSpace G] (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (fun x : G => x₀ x) (𝓝 1)) (hconj : ∀ x₀ : G, Tendsto (fun x : G => x₀ * x * x₀⁻¹) (𝓝 1) (𝓝 1)) : ContinuousInv G := by refine ⟨continuous_iff_continuousAt.2 fun x₀ => ?_⟩ have : Tendsto (fun x => x₀⁻¹ * (x₀ * x⁻¹ * x₀⁻¹)) (𝓝 1) (map (x₀⁻¹ * ·) (𝓝 1)) := (tendsto_map.comp <\| hconj x₀).comp hinv simpa only [ContinuousAt, hleft x₀, hleft x₀⁻¹, tendsto_map'_iff, Function.comp_def, mul_assoc, mul_inv_rev, inv_mul_cancel_left] using this @[to_additive] theorem IsTopologicalGroup.of_nhds_one' {G : Type u} [Group G] [TopologicalSpace G] (hmul : Tendsto (uncurry ((· * ·) : G → G → G)) (𝓝 1 ×ˢ 𝓝 1) (𝓝 1)) (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (fun x => x₀ * x) (𝓝 1)) (hright : ∀ x₀ : G, 𝓝 x₀ = map (fun x => x * x₀) (𝓝 1)) : IsTopologicalGroup G := { toContinuousMul := ContinuousMul.of_nhds_one hmul hleft hright toContinuousInv := ContinuousInv.of_nhds_one hinv hleft fun x₀ => le_of_eq (by rw [show (fun x => x₀ * x * x₀⁻¹) = (fun x => x * x₀⁻¹) ∘ fun x => x₀ * x from rfl, ← map_map, ← hleft, hright, map_map] simp [(· ∘ ·)]) } @[to_additive] theorem IsTopologicalGroup.of_nhds_one {G : Type u} [Group G] [TopologicalSpace G] (hmul : Tendsto (uncurry ((· * ·) : G → G → G)) (𝓝 1 ×ˢ 𝓝 1) (𝓝 1)) (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (x₀ * ·) (𝓝 1)) (hconj : ∀ x₀ : G, Tendsto (x₀ * · * x₀⁻¹) (𝓝 1) (𝓝 1)) : IsTopologicalGroup G := by refine IsTopologicalGroup.of_nhds_one' hmul hinv hleft fun x₀ => ?_ replace hconj : ∀ x₀ : G, map (x₀ * · * x₀⁻¹) (𝓝 1) = 𝓝 1 := fun x₀ => map_eq_of_inverse (x₀⁻¹ * · * x₀⁻¹⁻¹) (by ext; simp [mul_assoc]) (hconj _) (hconj _) rw [← hconj x₀] simpa [Function.comp_def] using hleft _ @[to_additive] theorem IsTopologicalGroup.of_comm_of_nhds_one {G : Type u} [CommGroup G] [TopologicalSpace G] (hmul : Tendsto (uncurry ((· * ·) : G → G → G)) (𝓝 1 ×ˢ 𝓝 1) (𝓝 1)) (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (x₀ * ·) (𝓝 1)) : IsTopologicalGroup G := IsTopologicalGroup.of_nhds_one hmul hinv hleft (by simpa using tendsto_id) variable (G) in /-- Any first countable topological group has an antitone neighborhood basis `u : ℕ → Set G` for which `(u (n + 1)) ^ 2 ⊆ u n`. The existence of such a neighborhood basis is a key tool for `QuotientGroup.completeSpace` -/ @[to_additive "Any first countable topological additive group has an antitone neighborhood basis `u : ℕ → set G` for which `u (n + 1) + u (n + 1) ⊆ u n`. The existence of such a neighborhood basis is a key tool for `QuotientAddGroup.completeSpace`"] theorem IsTopologicalGroup.exists_antitone_basis_nhds_one [FirstCountableTopology G] : ∃ u : ℕ → Set G, (𝓝 1).HasAntitoneBasis u ∧ ∀ n, u (n + 1) * u (n + 1) ⊆ u n := by rcases (𝓝 (1 : G)).exists_antitone_basis with ⟨u, hu, u_anti⟩ have := ((hu.prod_nhds hu).tendsto_iff hu).mp (by simpa only [mul_one] using continuous_mul.tendsto ((1, 1) : G × G)) simp only [and_self_iff, mem_prod, and_imp, Prod.forall, exists_true_left, Prod.exists, forall_true_left] at this have event_mul : ∀ n : ℕ, ∀ᶠ m in atTop, u m * u m ⊆ u n := by intro n rcases this n with ⟨j, k, -, h⟩ refine atTop_basis.eventually_iff.mpr ⟨max j k, True.intro, fun m hm => ?_⟩ rintro - ⟨a, ha, b, hb, rfl⟩ exact h a b (u_anti ((le_max_left _ _).trans hm) ha) (u_anti ((le_max_right _ _).trans hm) hb) obtain ⟨φ, -, hφ, φ_anti_basis⟩ := HasAntitoneBasis.subbasis_with_rel ⟨hu, u_anti⟩ event_mul exact ⟨u ∘ φ, φ_anti_basis, fun n => hφ n.lt_succ_self⟩ end IsTopologicalGroup section ContinuousDiv variable [TopologicalSpace G] [Div G] [ContinuousDiv G] @[to_additive const_sub] theorem Filter.Tendsto.const_div' (b : G) {c : G} {f : α → G} {l : Filter α} (h : Tendsto f l (𝓝 c)) : Tendsto (fun k : α => b / f k) l (𝓝 (b / c)) := tendsto_const_nhds.div' h @[to_additive] lemma Filter.tendsto_const_div_iff {G : Type} [CommGroup G] [TopologicalSpace G] [ContinuousDiv G] (b : G) {c : G} {f : α → G} {l : Filter α} : Tendsto (fun k : α ↦ b / f k) l (𝓝 (b / c)) ↔ Tendsto f l (𝓝 c) := by refine ⟨fun h ↦ ?_, Filter.Tendsto.const_div' b⟩ convert h.const_div' b with k <;> rw [div_div_cancel] @[to_additive sub_const] theorem Filter.Tendsto.div_const' {c : G} {f : α → G} {l : Filter α} (h : Tendsto f l (𝓝 c)) (b : G) : Tendsto (f · / b) l (𝓝 (c / b)) := h.div' tendsto_const_nhds lemma Filter.tendsto_div_const_iff {G : Type} [CommGroupWithZero G] [TopologicalSpace G] [ContinuousDiv G] {b : G} (hb : b ≠ 0) {c : G} {f : α → G} {l : Filter α} : Tendsto (f · / b) l (𝓝 (c / b)) ↔ Tendsto f l (𝓝 c) := by refine ⟨fun h ↦ ?_, fun h ↦ Filter.Tendsto.div_const' h b⟩ convert h.div_const' b⁻¹ with k <;> rw [div_div, mul_inv_cancel₀ hb, div_one] lemma Filter.tendsto_sub_const_iff {G : Type} [AddCommGroup G] [TopologicalSpace G] [ContinuousSub G] (b : G) {c : G} {f : α → G} {l : Filter α} : Tendsto (f · - b) l (𝓝 (c - b)) ↔ Tendsto f l (𝓝 c) := by refine ⟨fun h ↦ ?_, fun h ↦ Filter.Tendsto.sub_const h b⟩ convert h.sub_const (-b) with k <;> rw [sub_sub, ← sub_eq_add_neg, sub_self, sub_zero] variable [TopologicalSpace α] {f g : α → G} {s : Set α} {x : α} @[to_additive (attr := continuity) continuous_sub_left] lemma continuous_div_left' (a : G) : Continuous (a / ·) := continuous_const.div' continuous_id @[to_additive (attr := continuity) continuous_sub_right] lemma continuous_div_right' (a : G) : Continuous (· / a) := continuous_id.div' continuous_const end ContinuousDiv section DivInvTopologicalGroup variable [Group G] [TopologicalSpace G] [IsTopologicalGroup G] /-- A version of `Homeomorph.mulLeft a b⁻¹` that is defeq to `a / b`. -/ @[to_additive (attr := simps! +simpRhs) "A version of `Homeomorph.addLeft a (-b)` that is defeq to `a - b`."] def Homeomorph.divLeft (x : G) : G ≃ₜ G := { Equiv.divLeft x with continuous_toFun := continuous_const.div' continuous_id continuous_invFun := continuous_inv.mul continuous_const } @[to_additive] theorem isOpenMap_div_left (a : G) : IsOpenMap (a / ·) := (Homeomorph.divLeft _).isOpenMap @[to_additive] theorem isClosedMap_div_left (a : G) : IsClosedMap (a / ·) := (Homeomorph.divLeft _).isClosedMap /-- A version of `Homeomorph.mulRight a⁻¹ b` that is defeq to `b / a`. -/ @[to_additive (attr := simps! +simpRhs) "A version of `Homeomorph.addRight (-a) b` that is defeq to `b - a`. "] def Homeomorph.divRight (x : G) : G ≃ₜ G := { Equiv.divRight x with continuous_toFun := continuous_id.div' continuous_const continuous_invFun := continuous_id.mul continuous_const } @[to_additive] lemma isOpenMap_div_right (a : G) : IsOpenMap (· / a) := (Homeomorph.divRight a).isOpenMap @[to_additive] lemma isClosedMap_div_right (a : G) : IsClosedMap (· / a) := (Homeomorph.divRight a).isClosedMap @[to_additive] theorem tendsto_div_nhds_one_iff {α : Type} {l : Filter α} {x : G} {u : α → G} : Tendsto (u · / x) l (𝓝 1) ↔ Tendsto u l (𝓝 x) := haveI A : Tendsto (fun _ : α => x) l (𝓝 x) := tendsto_const_nhds ⟨fun h => by simpa using h.mul A, fun h => by simpa using h.div' A⟩ @[to_additive] theorem nhds_translation_div (x : G) : comap (· / x) (𝓝 1) = 𝓝 x := by simpa only [div_eq_mul_inv] using nhds_translation_mul_inv x end DivInvTopologicalGroup section FilterMul section variable (G) [TopologicalSpace G] [Group G] [ContinuousMul G] @[to_additive] theorem IsTopologicalGroup.t1Space (h : @IsClosed G _ {1}) : T1Space G := ⟨fun x => by simpa using isClosedMap_mul_right x _ h⟩ end section variable [TopologicalSpace G] [Group G] [IsTopologicalGroup G] variable (S : Subgroup G) [Subgroup.Normal S] [IsClosed (S : Set G)] /-- A subgroup `S` of a topological group `G` acts on `G` properly discontinuously on the left, if it is discrete in the sense that `S ∩ K` is finite for all compact `K`. (See also `DiscreteTopology`.) -/ @[to_additive "A subgroup `S` of an additive topological group `G` acts on `G` properly discontinuously on the left, if it is discrete in the sense that `S ∩ K` is finite for all compact `K`. (See also `DiscreteTopology`."] theorem Subgroup.properlyDiscontinuousSMul_of_tendsto_cofinite (S : Subgroup G) (hS : Tendsto S.subtype cofinite (cocompact G)) : ProperlyDiscontinuousSMul S G := { finite_disjoint_inter_image := by intro K L hK hL have H : Set.Finite _ := hS ((hL.prod hK).image continuous_div').compl_mem_cocompact rw [preimage_compl, compl_compl] at H convert H ext x simp only [image_smul, mem_setOf_eq, coe_subtype, mem_preimage, mem_image, Prod.exists] exact Set.smul_inter_ne_empty_iff' } /-- A subgroup `S` of a topological group `G` acts on `G` properly discontinuously on the right, if it is discrete in the sense that `S ∩ K` is finite for all compact `K`. (See also `DiscreteTopology`.) If `G` is Hausdorff, this can be combined with `t2Space_of_properlyDiscontinuousSMul_of_t2Space` to show that the quotient group `G ⧸ S` is Hausdorff. -/ @[to_additive "A subgroup `S` of an additive topological group `G` acts on `G` properly discontinuously on the right, if it is discrete in the sense that `S ∩ K` is finite for all compact `K`. (See also `DiscreteTopology`.) If `G` is Hausdorff, this can be combined with `t2Space_of_properlyDiscontinuousVAdd_of_t2Space` to show that the quotient group `G ⧸ S` is Hausdorff."] theorem Subgroup.properlyDiscontinuousSMul_opposite_of_tendsto_cofinite (S : Subgroup G) (hS : Tendsto S.subtype cofinite (cocompact G)) : ProperlyDiscontinuousSMul S.op G := { finite_disjoint_inter_image := by intro K L hK hL have : Continuous fun p : G × G => (p.1⁻¹, p.2) := continuous_inv.prodMap continuous_id have H : Set.Finite _ := hS ((hK.prod hL).image (continuous_mul.comp this)).compl_mem_cocompact simp only [preimage_compl, compl_compl, coe_subtype, comp_apply] at H apply Finite.of_preimage _ (equivOp S).surjective convert H using 1 ext x simp only [image_smul, mem_setOf_eq, coe_subtype, mem_preimage, mem_image, Prod.exists] exact Set.op_smul_inter_ne_empty_iff } end section /-! Some results about an open set containing the product of two sets in a topological group. -/ variable [TopologicalSpace G] [MulOneClass G] [ContinuousMul G] /-- Given a compact set `K` inside an open set `U`, there is an open neighborhood `V` of `1` such that `K * V ⊆ U`. -/ @[to_additive "Given a compact set `K` inside an open set `U`, there is an open neighborhood `V` of `0` such that `K + V ⊆ U`."] theorem compact_open_separated_mul_right {K U : Set G} (hK : IsCompact K) (hU : IsOpen U) (hKU : K ⊆ U) : ∃ V ∈ 𝓝 (1 : G), K * V ⊆ U := by refine hK.induction_on ?_ ?_ ?_ ?_ · exact ⟨univ, by simp⟩ · rintro s t hst ⟨V, hV, hV'⟩ exact ⟨V, hV, (mul_subset_mul_right hst).trans hV'⟩ · rintro s t ⟨V, V_in, hV'⟩ ⟨W, W_in, hW'⟩ use V ∩ W, inter_mem V_in W_in rw [union_mul] exact union_subset ((mul_subset_mul_left V.inter_subset_left).trans hV') ((mul_subset_mul_left V.inter_subset_right).trans hW') · intro x hx have := tendsto_mul (show U ∈ 𝓝 (x * 1) by simpa using hU.mem_nhds (hKU hx)) rw [nhds_prod_eq, mem_map, mem_prod_iff] at this rcases this with ⟨t, ht, s, hs, h⟩ rw [← image_subset_iff, image_mul_prod] at h exact ⟨t, mem_nhdsWithin_of_mem_nhds ht, s, hs, h⟩ open MulOpposite /-- Given a compact set `K` inside an open set `U`, there is an open neighborhood `V` of `1` such that `V * K ⊆ U`. -/ @[to_additive "Given a compact set `K` inside an open set `U`, there is an open neighborhood `V` of `0` such that `V + K ⊆ U`."] theorem compact_open_separated_mul_left {K U : Set G} (hK : IsCompact K) (hU : IsOpen U) (hKU : K ⊆ U) : ∃ V ∈ 𝓝 (1 : G), V * K ⊆ U := by rcases compact_open_separated_mul_right (hK.image continuous_op) (opHomeomorph.isOpenMap U hU) (image_subset op hKU) with ⟨V, hV : V ∈ 𝓝 (op (1 : G)), hV' : op '' K * V ⊆ op '' U⟩ refine ⟨op ⁻¹' V, continuous_op.continuousAt hV, ?_⟩ rwa [← image_preimage_eq V op_surjective, ← image_op_mul, image_subset_iff, preimage_image_eq _ op_injective] at hV' end section variable [TopologicalSpace G] [Group G] [IsTopologicalGroup G] /-- A compact set is covered by finitely many left multiplicative translates of a set with non-empty interior. -/ @[to_additive "A compact set is covered by finitely many left additive translates of a set with non-empty interior."] theorem compact_covered_by_mul_left_translates {K V : Set G} (hK : IsCompact K) (hV : (interior V).Nonempty) : ∃ t : Finset G, K ⊆ ⋃ g ∈ t, (g * ·) ⁻¹' V := by obtain ⟨t, ht⟩ : ∃ t : Finset G, K ⊆ ⋃ x ∈ t, interior ((x * ·) ⁻¹' V) := by refine hK.elim_finite_subcover (fun x => interior <\| (x * ·) ⁻¹' V) (fun x => isOpen_interior) ?_ obtain ⟨g₀, hg₀⟩ := hV refine fun g _ => mem_iUnion.2 ⟨g₀ * g⁻¹, ?_⟩ refine preimage_interior_subset_interior_preimage (continuous_const.mul continuous_id) ?_ rwa [mem_preimage, Function.id_def, inv_mul_cancel_right] exact ⟨t, Subset.trans ht <\| iUnion₂_mono fun g _ => interior_subset⟩ /-- Every weakly locally compact separable topological group is σ-compact. Note: this is not true if we drop the topological group hypothesis. -/ @[to_additive SeparableWeaklyLocallyCompactAddGroup.sigmaCompactSpace "Every weakly locally compact separable topological additive group is σ-compact. Note: this is not true if we drop the topological group hypothesis."] instance (priority := 100) SeparableWeaklyLocallyCompactGroup.sigmaCompactSpace [SeparableSpace G] [WeaklyLocallyCompactSpace G] : SigmaCompactSpace G := by obtain ⟨L, hLc, hL1⟩ := exists_compact_mem_nhds (1 : G) refine ⟨⟨fun n => (fun x => x * denseSeq G n) ⁻¹' L, ?_, ?_⟩⟩ · intro n exact (Homeomorph.mulRight _).isCompact_preimage.mpr hLc · refine iUnion_eq_univ_iff.2 fun x => ?_ obtain ⟨_, ⟨n, rfl⟩, hn⟩ : (range (denseSeq G) ∩ (fun y => x * y) ⁻¹' L).Nonempty := by rw [← (Homeomorph.mulLeft x).apply_symm_apply 1] at hL1 exact (denseRange_denseSeq G).inter_nhds_nonempty ((Homeomorph.mulLeft x).continuous.continuousAt <\| hL1) exact ⟨n, hn⟩ /-- Given two compact sets in a noncompact topological group, there is a translate of the second one that is disjoint from the first one. -/ @[to_additive "Given two compact sets in a noncompact additive topological group, there is a translate of the second one that is disjoint from the first one."] theorem exists_disjoint_smul_of_isCompact [NoncompactSpace G] {K L : Set G} (hK : IsCompact K) (hL : IsCompact L) : ∃ g : G, Disjoint K (g • L) := by have A : ¬K * L⁻¹ = univ := (hK.mul hL.inv).ne_univ obtain ⟨g, hg⟩ : ∃ g, g ∉ K * L⁻¹ := by contrapose! A exact eq_univ_iff_forall.2 A refine ⟨g, ?_⟩ refine disjoint_left.2 fun a ha h'a => hg ?_ rcases h'a with ⟨b, bL, rfl⟩ refine ⟨g * b, ha, b⁻¹, by simpa only [Set.mem_inv, inv_inv] using bL, ?_⟩ simp only [smul_eq_mul, mul_inv_cancel_right] end section variable [TopologicalSpace G] [Group G] [IsTopologicalGroup G] @[to_additive] theorem nhds_mul (x y : G) : 𝓝 (x * y) = 𝓝 x * 𝓝 y := calc 𝓝 (x * y) = map (x * ·) (map (· * y) (𝓝 1 * 𝓝 1)) := by simp _ = map₂ (fun a b => x * (a * b * y)) (𝓝 1) (𝓝 1) := by rw [← map₂_mul, map_map₂, map_map₂] _ = map₂ (fun a b => x * a * (b * y)) (𝓝 1) (𝓝 1) := by simp only [mul_assoc] _ = 𝓝 x * 𝓝 y := by rw [← map_mul_left_nhds_one x, ← map_mul_right_nhds_one y, ← map₂_mul, map₂_map_left, map₂_map_right] /-- On a topological group, `𝓝 : G → Filter G` can be promoted to a `MulHom`. -/ @[to_additive (attr := simps) "On an additive topological group, `𝓝 : G → Filter G` can be promoted to an `AddHom`."] def nhdsMulHom : G →ₙ* Filter G where toFun := 𝓝 map_mul' _ _ := nhds_mul _ _ end end FilterMul instance {G} [TopologicalSpace G] [Group G] [IsTopologicalGroup G] : IsTopologicalAddGroup (Additive G) where continuous_neg := @continuous_inv G _ _ _ instance {G} [TopologicalSpace G] [AddGroup G] [IsTopologicalAddGroup G] : IsTopologicalGroup (Multiplicative G) where continuous_inv := @continuous_neg G _ _ _ /-- If `G` is a group with topological `⁻¹`, then it is homeomorphic to its units. -/ @[to_additive "If `G` is an additive group with topological negation, then it is homeomorphic to its additive units."] def toUnits_homeomorph [Group G] [TopologicalSpace G] [ContinuousInv G] : G ≃ₜ Gˣ where toEquiv := toUnits.toEquiv continuous_toFun := Units.continuous_iff.2 ⟨continuous_id, continuous_inv⟩ continuous_invFun := Units.continuous_val @[to_additive] theorem Units.isEmbedding_val [Group G] [TopologicalSpace G] [ContinuousInv G] : IsEmbedding (val : Gˣ → G) := toUnits_homeomorph.symm.isEmbedding @[deprecated (since := "2024-10-26")] alias Units.embedding_val := Units.isEmbedding_val lemma Continuous.of_coeHom_comp [Group G] [Monoid H] [TopologicalSpace G] [TopologicalSpace H] [ContinuousInv G] {f : G →* Hˣ} (hf : Continuous ((Units.coeHom H).comp f)) : Continuous f := by apply continuous_induced_rng.mpr ?_ refine continuous_prodMk.mpr ⟨hf, ?_⟩ simp_rw [← map_inv] exact MulOpposite.continuous_op.comp (hf.comp continuous_inv) namespace Units open MulOpposite (continuous_op continuous_unop) variable [Monoid α] [TopologicalSpace α] [Monoid β] [TopologicalSpace β] @[to_additive] instance [ContinuousMul α] : IsTopologicalGroup αˣ where continuous_inv := Units.continuous_iff.2 <\| ⟨continuous_coe_inv, continuous_val⟩ /-- The topological group isomorphism between the units of a product of two monoids, and the product of the units of each monoid. -/ @[to_additive prodAddUnits "The topological group isomorphism between the additive units of a product of two additive monoids, and the product of the additive units of each additive monoid."] def _root_.Homeomorph.prodUnits : (α × β)ˣ ≃ₜ αˣ × βˣ where continuous_toFun := (continuous_fst.units_map (MonoidHom.fst α β)).prodMk (continuous_snd.units_map (MonoidHom.snd α β)) continuous_invFun := Units.continuous_iff.2 ⟨continuous_val.fst'.prodMk continuous_val.snd', continuous_coe_inv.fst'.prodMk continuous_coe_inv.snd'⟩ toEquiv := MulEquiv.prodUnits.toEquiv @[deprecated (since := "2025-02-21")] alias Homeomorph.sumAddUnits := Homeomorph.prodAddUnits @[deprecated (since := "2025-02-21")] protected alias Homeomorph.prodUnits := Homeomorph.prodUnits end Units section LatticeOps variable {ι : Sort*} [Group G] @[to_additive] theorem topologicalGroup_sInf {ts : Set (TopologicalSpace G)} (h : ∀ t ∈ ts, @IsTopologicalGroup G t _) : @IsTopologicalGroup G (sInf ts) _ := letI := sInf ts { toContinuousInv := @continuousInv_sInf _ _ _ fun t ht => @IsTopologicalGroup.toContinuousInv G t _ <\| h t ht toContinuousMul := @continuousMul_sInf _ _ _ fun t ht => @IsTopologicalGroup.toContinuousMul G t _ <\| h t ht } @[to_additive] theorem topologicalGroup_iInf {ts' : ι → TopologicalSpace G} (h' : ∀ i, @IsTopologicalGroup G (ts' i) _) : @IsTopologicalGroup G (⨅ i, ts' i) _ := by rw [← sInf_range] exact topologicalGroup_sInf (Set.forall_mem_range.mpr h') @[to_additive] theorem topologicalGroup_inf {t₁ t₂ : TopologicalSpace G} (h₁ : @IsTopologicalGroup G t₁ _) (h₂ : @IsTopologicalGroup G t₂ _) : @IsTopologicalGroup G (t₁ ⊓ t₂) _ := by rw [inf_eq_iInf] refine topologicalGroup_iInf fun b => ?_ cases b <;> assumption end LatticeOps		Mathlib/Topology/Algebra/Group/Basic.lean	1,292	1,294
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Floris van Doorn -/ import Mathlib.Data.Countable.Small import Mathlib.Data.Fintype.BigOperators import Mathlib.Data.Fintype.Powerset import Mathlib.Data.Nat.Cast.Order.Basic import Mathlib.Data.Set.Countable import Mathlib.Logic.Equiv.Fin.Basic import Mathlib.Logic.Small.Set import Mathlib.Logic.UnivLE import Mathlib.SetTheory.Cardinal.Order /-! # Basic results on cardinal numbers We provide a collection of basic results on cardinal numbers, in particular focussing on finite/countable/small types and sets. ## Main definitions * `Cardinal.powerlt a b` or `a ^< b` is defined as the supremum of `a ^ c` for `c < b`. ## References * <https://en.wikipedia.org/wiki/Cardinal_number> ## Tags cardinal number, cardinal arithmetic, cardinal exponentiation, aleph, Cantor's theorem, König's theorem, Konig's theorem -/ assert_not_exists Field open List (Vector) open Function Order Set noncomputable section universe u v w v' w' variable {α β : Type u} namespace Cardinal /-! ### Lifting cardinals to a higher universe -/ @[simp] lemma mk_preimage_down {s : Set α} : #(ULift.down.{v} ⁻¹' s) = lift.{v} (#s) := by rw [← mk_uLift, Cardinal.eq] constructor let f : ULift.down ⁻¹' s → ULift s := fun x ↦ ULift.up (restrictPreimage s ULift.down x) have : Function.Bijective f := ULift.up_bijective.comp (restrictPreimage_bijective _ (ULift.down_bijective)) exact Equiv.ofBijective f this -- `simp` can't figure out universe levels: normal form is `lift_mk_shrink'`. theorem lift_mk_shrink (α : Type u) [Small.{v} α] : Cardinal.lift.{max u w} #(Shrink.{v} α) = Cardinal.lift.{max v w} #α := lift_mk_eq.2 ⟨(equivShrink α).symm⟩ @[simp] theorem lift_mk_shrink' (α : Type u) [Small.{v} α] : Cardinal.lift.{u} #(Shrink.{v} α) = Cardinal.lift.{v} #α := lift_mk_shrink.{u, v, 0} α @[simp] theorem lift_mk_shrink'' (α : Type max u v) [Small.{v} α] : Cardinal.lift.{u} #(Shrink.{v} α) = #α := by rw [← lift_umax, lift_mk_shrink.{max u v, v, 0} α, ← lift_umax, lift_id] theorem prod_eq_of_fintype {α : Type u} [h : Fintype α] (f : α → Cardinal.{v}) : prod f = Cardinal.lift.{u} (∏ i, f i) := by revert f refine Fintype.induction_empty_option ?_ ?_ ?_ α (h_fintype := h) · intro α β hβ e h f letI := Fintype.ofEquiv β e.symm rw [← e.prod_comp f, ← h] exact mk_congr (e.piCongrLeft _).symm · intro f rw [Fintype.univ_pempty, Finset.prod_empty, lift_one, Cardinal.prod, mk_eq_one] · intro α hα h f rw [Cardinal.prod, mk_congr Equiv.piOptionEquivProd, mk_prod, lift_umax.{v, u}, mk_out, ← Cardinal.prod, lift_prod, Fintype.prod_option, lift_mul, ← h fun a => f (some a)] simp only [lift_id] /-! ### Basic cardinals -/ theorem le_one_iff_subsingleton {α : Type u} : #α ≤ 1 ↔ Subsingleton α := ⟨fun ⟨f⟩ => ⟨fun _ _ => f.injective (Subsingleton.elim _ _)⟩, fun ⟨h⟩ => ⟨fun _ => ULift.up 0, fun _ _ _ => h _ _⟩⟩ @[simp] theorem mk_le_one_iff_set_subsingleton {s : Set α} : #s ≤ 1 ↔ s.Subsingleton := le_one_iff_subsingleton.trans s.subsingleton_coe alias ⟨_, _root_.Set.Subsingleton.cardinalMk_le_one⟩ := mk_le_one_iff_set_subsingleton @[deprecated (since := "2024-11-10")] alias _root_.Set.Subsingleton.cardinal_mk_le_one := Set.Subsingleton.cardinalMk_le_one private theorem cast_succ (n : ℕ) : ((n + 1 : ℕ) : Cardinal.{u}) = n + 1 := by change #(ULift.{u} _) = #(ULift.{u} _) + 1 rw [← mk_option] simp /-! ### Order properties -/ theorem one_lt_iff_nontrivial {α : Type u} : 1 < #α ↔ Nontrivial α := by rw [← not_le, le_one_iff_subsingleton, ← not_nontrivial_iff_subsingleton, Classical.not_not] lemma sInf_eq_zero_iff {s : Set Cardinal} : sInf s = 0 ↔ s = ∅ ∨ ∃ a ∈ s, a = 0 := by refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rcases s.eq_empty_or_nonempty with rfl \| hne · exact Or.inl rfl · exact Or.inr ⟨sInf s, csInf_mem hne, h⟩ · rcases h with rfl \| ⟨a, ha, rfl⟩ · exact Cardinal.sInf_empty · exact eq_bot_iff.2 (csInf_le' ha) lemma iInf_eq_zero_iff {ι : Sort} {f : ι → Cardinal} : (⨅ i, f i) = 0 ↔ IsEmpty ι ∨ ∃ i, f i = 0 := by simp [iInf, sInf_eq_zero_iff] /-- A variant of `ciSup_of_empty` but with `0` on the RHS for convenience -/ protected theorem iSup_of_empty {ι} (f : ι → Cardinal) [IsEmpty ι] : iSup f = 0 := ciSup_of_empty f @[simp] theorem lift_sInf (s : Set Cardinal) : lift.{u, v} (sInf s) = sInf (lift.{u, v} '' s) := by rcases eq_empty_or_nonempty s with (rfl \| hs) · simp · exact lift_monotone.map_csInf hs @[simp] theorem lift_iInf {ι} (f : ι → Cardinal) : lift.{u, v} (iInf f) = ⨅ i, lift.{u, v} (f i) := by unfold iInf convert lift_sInf (range f) simp_rw [← comp_apply (f := lift), range_comp] end Cardinal /-! ### Small sets of cardinals -/ namespace Cardinal instance small_Iic (a : Cardinal.{u}) : Small.{u} (Iic a) := by rw [← mk_out a] apply @small_of_surjective (Set a.out) (Iic #a.out) _ fun x => ⟨#x, mk_set_le x⟩ rintro ⟨x, hx⟩ simpa using le_mk_iff_exists_set.1 hx instance small_Iio (a : Cardinal.{u}) : Small.{u} (Iio a) := small_subset Iio_subset_Iic_self instance small_Icc (a b : Cardinal.{u}) : Small.{u} (Icc a b) := small_subset Icc_subset_Iic_self instance small_Ico (a b : Cardinal.{u}) : Small.{u} (Ico a b) := small_subset Ico_subset_Iio_self instance small_Ioc (a b : Cardinal.{u}) : Small.{u} (Ioc a b) := small_subset Ioc_subset_Iic_self instance small_Ioo (a b : Cardinal.{u}) : Small.{u} (Ioo a b) := small_subset Ioo_subset_Iio_self /-- A set of cardinals is bounded above iff it's small, i.e. it corresponds to a usual ZFC set. -/ theorem bddAbove_iff_small {s : Set Cardinal.{u}} : BddAbove s ↔ Small.{u} s := ⟨fun ⟨a, ha⟩ => @small_subset _ (Iic a) s (fun _ h => ha h) _, by rintro ⟨ι, ⟨e⟩⟩ use sum.{u, u} fun x ↦ e.symm x intro a ha simpa using le_sum (fun x ↦ e.symm x) (e ⟨a, ha⟩)⟩ theorem bddAbove_of_small (s : Set Cardinal.{u}) [h : Small.{u} s] : BddAbove s := bddAbove_iff_small.2 h theorem bddAbove_range {ι : Type} [Small.{u} ι] (f : ι → Cardinal.{u}) : BddAbove (Set.range f) := bddAbove_of_small _ theorem bddAbove_image (f : Cardinal.{u} → Cardinal.{max u v}) {s : Set Cardinal.{u}} (hs : BddAbove s) : BddAbove (f '' s) := by rw [bddAbove_iff_small] at hs ⊢ exact small_lift _ theorem bddAbove_range_comp {ι : Type u} {f : ι → Cardinal.{v}} (hf : BddAbove (range f)) (g : Cardinal.{v} → Cardinal.{max v w}) : BddAbove (range (g ∘ f)) := by rw [range_comp] exact bddAbove_image g hf /-- The type of cardinals in universe `u` is not `Small.{u}`. This is a version of the Burali-Forti paradox. -/ theorem _root_.not_small_cardinal : ¬ Small.{u} Cardinal.{max u v} := by intro h have := small_lift.{_, v} Cardinal.{max u v} rw [← small_univ_iff, ← bddAbove_iff_small] at this exact not_bddAbove_univ this instance uncountable : Uncountable Cardinal.{u} := Uncountable.of_not_small not_small_cardinal.{u} /-! ### Bounds on suprema -/ theorem sum_le_iSup_lift {ι : Type u} (f : ι → Cardinal.{max u v}) : sum f ≤ Cardinal.lift #ι * iSup f := by rw [← (iSup f).lift_id, ← lift_umax, lift_umax.{max u v, u}, ← sum_const] exact sum_le_sum _ _ (le_ciSup <\| bddAbove_of_small _) theorem sum_le_iSup {ι : Type u} (f : ι → Cardinal.{u}) : sum f ≤ #ι * iSup f := by rw [← lift_id #ι] exact sum_le_iSup_lift f /-- The lift of a supremum is the supremum of the lifts. -/ theorem lift_sSup {s : Set Cardinal} (hs : BddAbove s) : lift.{u} (sSup s) = sSup (lift.{u} '' s) := by apply ((le_csSup_iff' (bddAbove_image.{_,u} _ hs)).2 fun c hc => _).antisymm (csSup_le' _) · intro c hc by_contra h obtain ⟨d, rfl⟩ := Cardinal.mem_range_lift_of_le (not_le.1 h).le simp_rw [lift_le] at h hc rw [csSup_le_iff' hs] at h exact h fun a ha => lift_le.1 <\| hc (mem_image_of_mem _ ha) · rintro i ⟨j, hj, rfl⟩ exact lift_le.2 (le_csSup hs hj) /-- The lift of a supremum is the supremum of the lifts. -/ theorem lift_iSup {ι : Type v} {f : ι → Cardinal.{w}} (hf : BddAbove (range f)) : lift.{u} (iSup f) = ⨆ i, lift.{u} (f i) := by rw [iSup, iSup, lift_sSup hf, ← range_comp] simp [Function.comp_def] /-- To prove that the lift of a supremum is bounded by some cardinal `t`, it suffices to show that the lift of each cardinal is bounded by `t`. -/ theorem lift_iSup_le {ι : Type v} {f : ι → Cardinal.{w}} {t : Cardinal} (hf : BddAbove (range f)) (w : ∀ i, lift.{u} (f i) ≤ t) : lift.{u} (iSup f) ≤ t := by rw [lift_iSup hf] exact ciSup_le' w @[simp] theorem lift_iSup_le_iff {ι : Type v} {f : ι → Cardinal.{w}} (hf : BddAbove (range f)) {t : Cardinal} : lift.{u} (iSup f) ≤ t ↔ ∀ i, lift.{u} (f i) ≤ t := by rw [lift_iSup hf] exact ciSup_le_iff' (bddAbove_range_comp.{_,_,u} hf _) /-- To prove an inequality between the lifts to a common universe of two different supremums, it suffices to show that the lift of each cardinal from the smaller supremum if bounded by the lift of some cardinal from the larger supremum. -/ theorem lift_iSup_le_lift_iSup {ι : Type v} {ι' : Type v'} {f : ι → Cardinal.{w}} {f' : ι' → Cardinal.{w'}} (hf : BddAbove (range f)) (hf' : BddAbove (range f')) {g : ι → ι'} (h : ∀ i, lift.{w'} (f i) ≤ lift.{w} (f' (g i))) : lift.{w'} (iSup f) ≤ lift.{w} (iSup f') := by rw [lift_iSup hf, lift_iSup hf'] exact ciSup_mono' (bddAbove_range_comp.{_,_,w} hf' _) fun i => ⟨_, h i⟩ /-- A variant of `lift_iSup_le_lift_iSup` with universes specialized via `w = v` and `w' = v'`. This is sometimes necessary to avoid universe unification issues. -/ theorem lift_iSup_le_lift_iSup' {ι : Type v} {ι' : Type v'} {f : ι → Cardinal.{v}} {f' : ι' → Cardinal.{v'}} (hf : BddAbove (range f)) (hf' : BddAbove (range f')) (g : ι → ι') (h : ∀ i, lift.{v'} (f i) ≤ lift.{v} (f' (g i))) : lift.{v'} (iSup f) ≤ lift.{v} (iSup f') := lift_iSup_le_lift_iSup hf hf' h /-! ### Properties about the cast from `ℕ` -/ theorem mk_finset_of_fintype [Fintype α] : #(Finset α) = 2 ^ Fintype.card α := by simp [Pow.pow] @[norm_cast] theorem nat_succ (n : ℕ) : (n.succ : Cardinal) = succ ↑n := by rw [Nat.cast_succ] refine (add_one_le_succ _).antisymm (succ_le_of_lt ?_) rw [← Nat.cast_succ] exact Nat.cast_lt.2 (Nat.lt_succ_self _) lemma succ_natCast (n : ℕ) : Order.succ (n : Cardinal) = n + 1 := by rw [← Cardinal.nat_succ] norm_cast lemma natCast_add_one_le_iff {n : ℕ} {c : Cardinal} : n + 1 ≤ c ↔ n < c := by rw [← Order.succ_le_iff, Cardinal.succ_natCast] lemma two_le_iff_one_lt {c : Cardinal} : 2 ≤ c ↔ 1 < c := by convert natCast_add_one_le_iff norm_cast @[simp] theorem succ_zero : succ (0 : Cardinal) = 1 := by norm_cast -- This works generally to prove inequalities between numeric cardinals. theorem one_lt_two : (1 : Cardinal) < 2 := by norm_cast theorem exists_finset_le_card (α : Type) (n : ℕ) (h : n ≤ #α) : ∃ s : Finset α, n ≤ s.card := by obtain hα\|hα := finite_or_infinite α · let hα := Fintype.ofFinite α use Finset.univ simpa only [mk_fintype, Nat.cast_le] using h · obtain ⟨s, hs⟩ := Infinite.exists_subset_card_eq α n exact ⟨s, hs.ge⟩ theorem card_le_of {α : Type u} {n : ℕ} (H : ∀ s : Finset α, s.card ≤ n) : #α ≤ n := by contrapose! H apply exists_finset_le_card α (n+1) simpa only [nat_succ, succ_le_iff] using H theorem cantor' (a) {b : Cardinal} (hb : 1 < b) : a < b ^ a := by rw [← succ_le_iff, (by norm_cast : succ (1 : Cardinal) = 2)] at hb exact (cantor a).trans_le (power_le_power_right hb) theorem one_le_iff_pos {c : Cardinal} : 1 ≤ c ↔ 0 < c := by rw [← succ_zero, succ_le_iff] theorem one_le_iff_ne_zero {c : Cardinal} : 1 ≤ c ↔ c ≠ 0 := by rw [one_le_iff_pos, pos_iff_ne_zero] @[simp] theorem lt_one_iff_zero {c : Cardinal} : c < 1 ↔ c = 0 := by simpa using lt_succ_bot_iff (a := c) /-! ### Properties about `aleph0` -/ theorem nat_lt_aleph0 (n : ℕ) : (n : Cardinal.{u}) < ℵ₀ := succ_le_iff.1 (by rw [← nat_succ, ← lift_mk_fin, aleph0, lift_mk_le.{u}] exact ⟨⟨(↑), fun a b => Fin.ext⟩⟩) @[simp] theorem one_lt_aleph0 : 1 < ℵ₀ := by simpa using nat_lt_aleph0 1 @[simp] theorem one_le_aleph0 : 1 ≤ ℵ₀ := one_lt_aleph0.le theorem lt_aleph0 {c : Cardinal} : c < ℵ₀ ↔ ∃ n : ℕ, c = n := ⟨fun h => by rcases lt_lift_iff.1 h with ⟨c, h', rfl⟩ rcases le_mk_iff_exists_set.1 h'.1 with ⟨S, rfl⟩ suffices S.Finite by lift S to Finset ℕ using this simp contrapose! h' haveI := Infinite.to_subtype h' exact ⟨Infinite.natEmbedding S⟩, fun ⟨_, e⟩ => e.symm ▸ nat_lt_aleph0 _⟩ lemma succ_eq_of_lt_aleph0 {c : Cardinal} (h : c < ℵ₀) : Order.succ c = c + 1 := by obtain ⟨n, hn⟩ := Cardinal.lt_aleph0.mp h rw [hn, succ_natCast] theorem aleph0_le {c : Cardinal} : ℵ₀ ≤ c ↔ ∀ n : ℕ, ↑n ≤ c := ⟨fun h _ => (nat_lt_aleph0 _).le.trans h, fun h => le_of_not_lt fun hn => by rcases lt_aleph0.1 hn with ⟨n, rfl⟩ exact (Nat.lt_succ_self _).not_le (Nat.cast_le.1 (h (n + 1)))⟩ theorem isSuccPrelimit_aleph0 : IsSuccPrelimit ℵ₀ := isSuccPrelimit_of_succ_lt fun a ha => by rcases lt_aleph0.1 ha with ⟨n, rfl⟩ rw [← nat_succ] apply nat_lt_aleph0 theorem isSuccLimit_aleph0 : IsSuccLimit ℵ₀ := by rw [Cardinal.isSuccLimit_iff] exact ⟨aleph0_ne_zero, isSuccPrelimit_aleph0⟩ lemma not_isSuccLimit_natCast : (n : ℕ) → ¬ IsSuccLimit (n : Cardinal.{u}) \| 0, e => e.1 isMin_bot \| Nat.succ n, e => Order.not_isSuccPrelimit_succ _ (nat_succ n ▸ e.2) theorem not_isSuccLimit_of_lt_aleph0 {c : Cardinal} (h : c < ℵ₀) : ¬ IsSuccLimit c := by obtain ⟨n, rfl⟩ := lt_aleph0.1 h exact not_isSuccLimit_natCast n theorem aleph0_le_of_isSuccLimit {c : Cardinal} (h : IsSuccLimit c) : ℵ₀ ≤ c := by contrapose! h exact not_isSuccLimit_of_lt_aleph0 h theorem isStrongLimit_aleph0 : IsStrongLimit ℵ₀ := by refine ⟨aleph0_ne_zero, fun x hx ↦ ?_⟩ obtain ⟨n, rfl⟩ := lt_aleph0.1 hx exact_mod_cast nat_lt_aleph0 _ theorem IsStrongLimit.aleph0_le {c} (H : IsStrongLimit c) : ℵ₀ ≤ c := aleph0_le_of_isSuccLimit H.isSuccLimit lemma exists_eq_natCast_of_iSup_eq {ι : Type u} [Nonempty ι] (f : ι → Cardinal.{v}) (hf : BddAbove (range f)) (n : ℕ) (h : ⨆ i, f i = n) : ∃ i, f i = n := exists_eq_of_iSup_eq_of_not_isSuccLimit.{u, v} f hf (not_isSuccLimit_natCast n) h @[simp] theorem range_natCast : range ((↑) : ℕ → Cardinal) = Iio ℵ₀ := ext fun x => by simp only [mem_Iio, mem_range, eq_comm, lt_aleph0] theorem mk_eq_nat_iff {α : Type u} {n : ℕ} : #α = n ↔ Nonempty (α ≃ Fin n) := by rw [← lift_mk_fin, ← lift_uzero #α, lift_mk_eq'] theorem lt_aleph0_iff_finite {α : Type u} : #α < ℵ₀ ↔ Finite α := by simp only [lt_aleph0, mk_eq_nat_iff, finite_iff_exists_equiv_fin] theorem lt_aleph0_iff_fintype {α : Type u} : #α < ℵ₀ ↔ Nonempty (Fintype α) := lt_aleph0_iff_finite.trans (finite_iff_nonempty_fintype _) theorem lt_aleph0_of_finite (α : Type u) [Finite α] : #α < ℵ₀ := lt_aleph0_iff_finite.2 ‹_› theorem lt_aleph0_iff_set_finite {S : Set α} : #S < ℵ₀ ↔ S.Finite := lt_aleph0_iff_finite.trans finite_coe_iff alias ⟨_, _root_.Set.Finite.lt_aleph0⟩ := lt_aleph0_iff_set_finite @[simp] theorem lt_aleph0_iff_subtype_finite {p : α → Prop} : #{ x // p x } < ℵ₀ ↔ { x \| p x }.Finite := lt_aleph0_iff_set_finite theorem mk_le_aleph0_iff : #α ≤ ℵ₀ ↔ Countable α := by rw [countable_iff_nonempty_embedding, aleph0, ← lift_uzero #α, lift_mk_le'] @[simp] theorem mk_le_aleph0 [Countable α] : #α ≤ ℵ₀ := mk_le_aleph0_iff.mpr ‹_› theorem le_aleph0_iff_set_countable {s : Set α} : #s ≤ ℵ₀ ↔ s.Countable := mk_le_aleph0_iff alias ⟨_, _root_.Set.Countable.le_aleph0⟩ := le_aleph0_iff_set_countable @[simp] theorem le_aleph0_iff_subtype_countable {p : α → Prop} : #{ x // p x } ≤ ℵ₀ ↔ { x \| p x }.Countable := le_aleph0_iff_set_countable theorem aleph0_lt_mk_iff : ℵ₀ < #α ↔ Uncountable α := by rw [← not_le, ← not_countable_iff, not_iff_not, mk_le_aleph0_iff] @[simp] theorem aleph0_lt_mk [Uncountable α] : ℵ₀ < #α := aleph0_lt_mk_iff.mpr ‹_› instance canLiftCardinalNat : CanLift Cardinal ℕ (↑) fun x => x < ℵ₀ := ⟨fun _ hx => let ⟨n, hn⟩ := lt_aleph0.mp hx ⟨n, hn.symm⟩⟩ theorem add_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a + b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← Nat.cast_add]; apply nat_lt_aleph0 theorem add_lt_aleph0_iff {a b : Cardinal} : a + b < ℵ₀ ↔ a < ℵ₀ ∧ b < ℵ₀ := ⟨fun h => ⟨(self_le_add_right _ _).trans_lt h, (self_le_add_left _ _).trans_lt h⟩, fun ⟨h1, h2⟩ => add_lt_aleph0 h1 h2⟩ theorem aleph0_le_add_iff {a b : Cardinal} : ℵ₀ ≤ a + b ↔ ℵ₀ ≤ a ∨ ℵ₀ ≤ b := by simp only [← not_lt, add_lt_aleph0_iff, not_and_or] /-- See also `Cardinal.nsmul_lt_aleph0_iff_of_ne_zero` if you already have `n ≠ 0`. -/ theorem nsmul_lt_aleph0_iff {n : ℕ} {a : Cardinal} : n • a < ℵ₀ ↔ n = 0 ∨ a < ℵ₀ := by cases n with \| zero => simpa using nat_lt_aleph0 0 \| succ n => simp only [Nat.succ_ne_zero, false_or] induction' n with n ih · simp rw [succ_nsmul, add_lt_aleph0_iff, ih, and_self_iff] /-- See also `Cardinal.nsmul_lt_aleph0_iff` for a hypothesis-free version. -/ theorem nsmul_lt_aleph0_iff_of_ne_zero {n : ℕ} {a : Cardinal} (h : n ≠ 0) : n • a < ℵ₀ ↔ a < ℵ₀ := nsmul_lt_aleph0_iff.trans <\| or_iff_right h theorem mul_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← Nat.cast_mul]; apply nat_lt_aleph0 theorem mul_lt_aleph0_iff {a b : Cardinal} : a * b < ℵ₀ ↔ a = 0 ∨ b = 0 ∨ a < ℵ₀ ∧ b < ℵ₀ := by refine ⟨fun h => ?_, ?_⟩ · by_cases ha : a = 0 · exact Or.inl ha right by_cases hb : b = 0 · exact Or.inl hb right rw [← Ne, ← one_le_iff_ne_zero] at ha hb constructor · rw [← mul_one a] exact (mul_le_mul' le_rfl hb).trans_lt h · rw [← one_mul b] exact (mul_le_mul' ha le_rfl).trans_lt h rintro (rfl \| rfl \| ⟨ha, hb⟩) <;> simp only [, mul_lt_aleph0, aleph0_pos, zero_mul, mul_zero] /-- See also `Cardinal.aleph0_le_mul_iff`. -/ theorem aleph0_le_mul_iff {a b : Cardinal} : ℵ₀ ≤ a b ↔ a ≠ 0 ∧ b ≠ 0 ∧ (ℵ₀ ≤ a ∨ ℵ₀ ≤ b) := by let h := (@mul_lt_aleph0_iff a b).not rwa [not_lt, not_or, not_or, not_and_or, not_lt, not_lt] at h /-- See also `Cardinal.aleph0_le_mul_iff'`. -/ theorem aleph0_le_mul_iff' {a b : Cardinal.{u}} : ℵ₀ ≤ a * b ↔ a ≠ 0 ∧ ℵ₀ ≤ b ∨ ℵ₀ ≤ a ∧ b ≠ 0 := by have : ∀ {a : Cardinal.{u}}, ℵ₀ ≤ a → a ≠ 0 := fun a => ne_bot_of_le_ne_bot aleph0_ne_zero a simp only [aleph0_le_mul_iff, and_or_left, and_iff_right_of_imp this, @and_left_comm (a ≠ 0)] simp only [and_comm, or_comm] theorem mul_lt_aleph0_iff_of_ne_zero {a b : Cardinal} (ha : a ≠ 0) (hb : b ≠ 0) : a * b < ℵ₀ ↔ a < ℵ₀ ∧ b < ℵ₀ := by simp [mul_lt_aleph0_iff, ha, hb] theorem power_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a ^ b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [power_natCast, ← Nat.cast_pow]; apply nat_lt_aleph0 theorem eq_one_iff_unique {α : Type} : #α = 1 ↔ Subsingleton α ∧ Nonempty α := calc #α = 1 ↔ #α ≤ 1 ∧ 1 ≤ #α := le_antisymm_iff _ ↔ Subsingleton α ∧ Nonempty α := le_one_iff_subsingleton.and (one_le_iff_ne_zero.trans mk_ne_zero_iff) theorem infinite_iff {α : Type u} : Infinite α ↔ ℵ₀ ≤ #α := by rw [← not_lt, lt_aleph0_iff_finite, not_finite_iff_infinite] lemma aleph0_le_mk_iff : ℵ₀ ≤ #α ↔ Infinite α := infinite_iff.symm lemma mk_lt_aleph0_iff : #α < ℵ₀ ↔ Finite α := by simp [← not_le, aleph0_le_mk_iff] @[simp] lemma mk_lt_aleph0 [Finite α] : #α < ℵ₀ := mk_lt_aleph0_iff.2 ‹_› @[simp] theorem aleph0_le_mk (α : Type u) [Infinite α] : ℵ₀ ≤ #α := infinite_iff.1 ‹_› @[simp] theorem mk_eq_aleph0 (α : Type) [Countable α] [Infinite α] : #α = ℵ₀ := mk_le_aleph0.antisymm <\| aleph0_le_mk _ theorem denumerable_iff {α : Type u} : Nonempty (Denumerable α) ↔ #α = ℵ₀ := ⟨fun ⟨h⟩ => mk_congr ((@Denumerable.eqv α h).trans Equiv.ulift.symm), fun h => by obtain ⟨f⟩ := Quotient.exact h exact ⟨Denumerable.mk' <\| f.trans Equiv.ulift⟩⟩ theorem mk_denumerable (α : Type u) [Denumerable α] : #α = ℵ₀ := denumerable_iff.1 ⟨‹_›⟩ theorem _root_.Set.countable_infinite_iff_nonempty_denumerable {α : Type} {s : Set α} : s.Countable ∧ s.Infinite ↔ Nonempty (Denumerable s) := by rw [nonempty_denumerable_iff, ← Set.infinite_coe_iff, countable_coe_iff] @[simp] theorem aleph0_add_aleph0 : ℵ₀ + ℵ₀ = ℵ₀ := mk_denumerable _ theorem aleph0_mul_aleph0 : ℵ₀ ℵ₀ = ℵ₀ := mk_denumerable _ @[simp] theorem nat_mul_aleph0 {n : ℕ} (hn : n ≠ 0) : ↑n * ℵ₀ = ℵ₀ := le_antisymm (lift_mk_fin n ▸ mk_le_aleph0) <\| le_mul_of_one_le_left (zero_le _) <\| by rwa [← Nat.cast_one, Nat.cast_le, Nat.one_le_iff_ne_zero] @[simp] theorem aleph0_mul_nat {n : ℕ} (hn : n ≠ 0) : ℵ₀ * n = ℵ₀ := by rw [mul_comm, nat_mul_aleph0 hn] @[simp] theorem ofNat_mul_aleph0 {n : ℕ} [Nat.AtLeastTwo n] : ofNat(n) * ℵ₀ = ℵ₀ := nat_mul_aleph0 (NeZero.ne n) @[simp] theorem aleph0_mul_ofNat {n : ℕ} [Nat.AtLeastTwo n] : ℵ₀ * ofNat(n) = ℵ₀ := aleph0_mul_nat (NeZero.ne n) @[simp] theorem add_le_aleph0 {c₁ c₂ : Cardinal} : c₁ + c₂ ≤ ℵ₀ ↔ c₁ ≤ ℵ₀ ∧ c₂ ≤ ℵ₀ := ⟨fun h => ⟨le_self_add.trans h, le_add_self.trans h⟩, fun h => aleph0_add_aleph0 ▸ add_le_add h.1 h.2⟩ @[simp] theorem aleph0_add_nat (n : ℕ) : ℵ₀ + n = ℵ₀ := (add_le_aleph0.2 ⟨le_rfl, (nat_lt_aleph0 n).le⟩).antisymm le_self_add @[simp] theorem nat_add_aleph0 (n : ℕ) : ↑n + ℵ₀ = ℵ₀ := by rw [add_comm, aleph0_add_nat] @[simp] theorem ofNat_add_aleph0 {n : ℕ} [Nat.AtLeastTwo n] : ofNat(n) + ℵ₀ = ℵ₀ := nat_add_aleph0 n @[simp] theorem aleph0_add_ofNat {n : ℕ} [Nat.AtLeastTwo n] : ℵ₀ + ofNat(n) = ℵ₀ := aleph0_add_nat n theorem exists_nat_eq_of_le_nat {c : Cardinal} {n : ℕ} (h : c ≤ n) : ∃ m, m ≤ n ∧ c = m := by lift c to ℕ using h.trans_lt (nat_lt_aleph0 _) exact ⟨c, mod_cast h, rfl⟩ theorem mk_int : #ℤ = ℵ₀ := mk_denumerable ℤ theorem mk_pnat : #ℕ+ = ℵ₀ := mk_denumerable ℕ+ @[deprecated (since := "2025-04-27")] alias mk_pNat := mk_pnat /-! ### Cardinalities of basic sets and types -/ @[simp] theorem mk_additive : #(Additive α) = #α := rfl @[simp] theorem mk_multiplicative : #(Multiplicative α) = #α := rfl @[to_additive (attr := simp)] theorem mk_mulOpposite : #(MulOpposite α) = #α := mk_congr MulOpposite.opEquiv.symm theorem mk_singleton {α : Type u} (x : α) : #({x} : Set α) = 1 := mk_eq_one _ @[simp] theorem mk_vector (α : Type u) (n : ℕ) : #(List.Vector α n) = #α ^ n := (mk_congr (Equiv.vectorEquivFin α n)).trans <\| by simp theorem mk_list_eq_sum_pow (α : Type u) : #(List α) = sum fun n : ℕ => #α ^ n := calc #(List α) = #(Σn, List.Vector α n) := mk_congr (Equiv.sigmaFiberEquiv List.length).symm _ = sum fun n : ℕ => #α ^ n := by simp theorem mk_quot_le {α : Type u} {r : α → α → Prop} : #(Quot r) ≤ #α := mk_le_of_surjective Quot.exists_rep theorem mk_quotient_le {α : Type u} {s : Setoid α} : #(Quotient s) ≤ #α := mk_quot_le theorem mk_subtype_le_of_subset {α : Type u} {p q : α → Prop} (h : ∀ ⦃x⦄, p x → q x) : #(Subtype p) ≤ #(Subtype q) := ⟨Embedding.subtypeMap (Embedding.refl α) h⟩ theorem mk_emptyCollection (α : Type u) : #(∅ : Set α) = 0 := mk_eq_zero _ theorem mk_emptyCollection_iff {α : Type u} {s : Set α} : #s = 0 ↔ s = ∅ := by constructor · intro h rw [mk_eq_zero_iff] at h exact eq_empty_iff_forall_not_mem.2 fun x hx => h.elim' ⟨x, hx⟩ · rintro rfl exact mk_emptyCollection _ @[simp] theorem mk_univ {α : Type u} : #(@univ α) = #α := mk_congr (Equiv.Set.univ α) @[simp] lemma mk_setProd {α β : Type u} (s : Set α) (t : Set β) : #(s ×ˢ t) = #s * #t := by rw [mul_def, mk_congr (Equiv.Set.prod ..)] theorem mk_image_le {α β : Type u} {f : α → β} {s : Set α} : #(f '' s) ≤ #s := mk_le_of_surjective surjective_onto_image lemma mk_image2_le {α β γ : Type u} {f : α → β → γ} {s : Set α} {t : Set β} : #(image2 f s t) ≤ #s * #t := by rw [← image_uncurry_prod, ← mk_setProd] exact mk_image_le theorem mk_image_le_lift {α : Type u} {β : Type v} {f : α → β} {s : Set α} : lift.{u} #(f '' s) ≤ lift.{v} #s := lift_mk_le.{0}.mpr ⟨Embedding.ofSurjective _ surjective_onto_image⟩	theorem mk_range_le {α β : Type u} {f : α → β} : #(range f) ≤ #α :=	Mathlib/SetTheory/Cardinal/Basic.lean	651	652
/- Copyright (c) 2019 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn, Yury Kudryashov, Sébastien Gouëzel, Chris Hughes -/ import Mathlib.Data.Fin.Rev import Mathlib.Data.Nat.Find /-! # Operation on tuples We interpret maps `∀ i : Fin n, α i` as `n`-tuples of elements of possibly varying type `α i`, `(α 0, …, α (n-1))`. A particular case is `Fin n → α` of elements with all the same type. In this case when `α i` is a constant map, then tuples are isomorphic (but not definitionally equal) to `Vector`s. ## Main declarations There are three (main) ways to consider `Fin n` as a subtype of `Fin (n + 1)`, hence three (main) ways to move between tuples of length `n` and of length `n + 1` by adding/removing an entry. ### Adding at the start * `Fin.succ`: Send `i : Fin n` to `i + 1 : Fin (n + 1)`. This is defined in Core. * `Fin.cases`: Induction/recursion principle for `Fin`: To prove a property/define a function for all `Fin (n + 1)`, it is enough to prove/define it for `0` and for `i.succ` for all `i : Fin n`. This is defined in Core. * `Fin.cons`: Turn a tuple `f : Fin n → α` and an entry `a : α` into a tuple `Fin.cons a f : Fin (n + 1) → α` by adding `a` at the start. In general, tuples can be dependent functions, in which case `f : ∀ i : Fin n, α i.succ` and `a : α 0`. This is a special case of `Fin.cases`. * `Fin.tail`: Turn a tuple `f : Fin (n + 1) → α` into a tuple `Fin.tail f : Fin n → α` by forgetting the start. In general, tuples can be dependent functions, in which case `Fin.tail f : ∀ i : Fin n, α i.succ`. ### Adding at the end * `Fin.castSucc`: Send `i : Fin n` to `i : Fin (n + 1)`. This is defined in Core. * `Fin.lastCases`: Induction/recursion principle for `Fin`: To prove a property/define a function for all `Fin (n + 1)`, it is enough to prove/define it for `last n` and for `i.castSucc` for all `i : Fin n`. This is defined in Core. * `Fin.snoc`: Turn a tuple `f : Fin n → α` and an entry `a : α` into a tuple `Fin.snoc f a : Fin (n + 1) → α` by adding `a` at the end. In general, tuples can be dependent functions, in which case `f : ∀ i : Fin n, α i.castSucc` and `a : α (last n)`. This is a special case of `Fin.lastCases`. * `Fin.init`: Turn a tuple `f : Fin (n + 1) → α` into a tuple `Fin.init f : Fin n → α` by forgetting the start. In general, tuples can be dependent functions, in which case `Fin.init f : ∀ i : Fin n, α i.castSucc`. ### Adding in the middle For a pivot `p : Fin (n + 1)`, * `Fin.succAbove`: Send `i : Fin n` to * `i : Fin (n + 1)` if `i < p`, * `i + 1 : Fin (n + 1)` if `p ≤ i`. * `Fin.succAboveCases`: Induction/recursion principle for `Fin`: To prove a property/define a function for all `Fin (n + 1)`, it is enough to prove/define it for `p` and for `p.succAbove i` for all `i : Fin n`. * `Fin.insertNth`: Turn a tuple `f : Fin n → α` and an entry `a : α` into a tuple `Fin.insertNth f a : Fin (n + 1) → α` by adding `a` in position `p`. In general, tuples can be dependent functions, in which case `f : ∀ i : Fin n, α (p.succAbove i)` and `a : α p`. This is a special case of `Fin.succAboveCases`. * `Fin.removeNth`: Turn a tuple `f : Fin (n + 1) → α` into a tuple `Fin.removeNth p f : Fin n → α` by forgetting the `p`-th value. In general, tuples can be dependent functions, in which case `Fin.removeNth f : ∀ i : Fin n, α (succAbove p i)`. `p = 0` means we add at the start. `p = last n` means we add at the end. ### Miscellaneous * `Fin.find p` : returns the first index `n` where `p n` is satisfied, and `none` if it is never satisfied. * `Fin.append a b` : append two tuples. * `Fin.repeat n a` : repeat a tuple `n` times. -/ assert_not_exists Monoid universe u v namespace Fin variable {m n : ℕ} open Function section Tuple /-- There is exactly one tuple of size zero. -/ example (α : Fin 0 → Sort u) : Unique (∀ i : Fin 0, α i) := by infer_instance theorem tuple0_le {α : Fin 0 → Type} [∀ i, Preorder (α i)] (f g : ∀ i, α i) : f ≤ g := finZeroElim variable {α : Fin (n + 1) → Sort u} (x : α 0) (q : ∀ i, α i) (p : ∀ i : Fin n, α i.succ) (i : Fin n) (y : α i.succ) (z : α 0) /-- The tail of an `n+1` tuple, i.e., its last `n` entries. -/ def tail (q : ∀ i, α i) : ∀ i : Fin n, α i.succ := fun i ↦ q i.succ theorem tail_def {n : ℕ} {α : Fin (n + 1) → Sort} {q : ∀ i, α i} : (tail fun k : Fin (n + 1) ↦ q k) = fun k : Fin n ↦ q k.succ := rfl /-- Adding an element at the beginning of an `n`-tuple, to get an `n+1`-tuple. -/ def cons (x : α 0) (p : ∀ i : Fin n, α i.succ) : ∀ i, α i := fun j ↦ Fin.cases x p j @[simp] theorem tail_cons : tail (cons x p) = p := by simp +unfoldPartialApp [tail, cons] @[simp] theorem cons_succ : cons x p i.succ = p i := by simp [cons] @[simp] theorem cons_zero : cons x p 0 = x := by simp [cons] @[simp] theorem cons_one {α : Fin (n + 2) → Sort} (x : α 0) (p : ∀ i : Fin n.succ, α i.succ) : cons x p 1 = p 0 := by rw [← cons_succ x p]; rfl /-- Updating a tuple and adding an element at the beginning commute. -/ @[simp] theorem cons_update : cons x (update p i y) = update (cons x p) i.succ y := by ext j by_cases h : j = 0 · rw [h] simp [Ne.symm (succ_ne_zero i)] · let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ] by_cases h' : j' = i · rw [h'] simp · have : j'.succ ≠ i.succ := by rwa [Ne, succ_inj] rw [update_of_ne h', update_of_ne this, cons_succ] /-- As a binary function, `Fin.cons` is injective. -/ theorem cons_injective2 : Function.Injective2 (@cons n α) := fun x₀ y₀ x y h ↦ ⟨congr_fun h 0, funext fun i ↦ by simpa using congr_fun h (Fin.succ i)⟩ @[simp] theorem cons_inj {x₀ y₀ : α 0} {x y : ∀ i : Fin n, α i.succ} : cons x₀ x = cons y₀ y ↔ x₀ = y₀ ∧ x = y := cons_injective2.eq_iff theorem cons_left_injective (x : ∀ i : Fin n, α i.succ) : Function.Injective fun x₀ ↦ cons x₀ x := cons_injective2.left _ theorem cons_right_injective (x₀ : α 0) : Function.Injective (cons x₀) := cons_injective2.right _ /-- Adding an element at the beginning of a tuple and then updating it amounts to adding it directly. -/ theorem update_cons_zero : update (cons x p) 0 z = cons z p := by ext j by_cases h : j = 0 · rw [h] simp · simp only [h, update_of_ne, Ne, not_false_iff] let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ, cons_succ] /-- Concatenating the first element of a tuple with its tail gives back the original tuple -/ @[simp] theorem cons_self_tail : cons (q 0) (tail q) = q := by ext j by_cases h : j = 0 · rw [h] simp · let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this] unfold tail rw [cons_succ] /-- Equivalence between tuples of length `n + 1` and pairs of an element and a tuple of length `n` given by separating out the first element of the tuple. This is `Fin.cons` as an `Equiv`. -/ @[simps] def consEquiv (α : Fin (n + 1) → Type) : α 0 × (∀ i, α (succ i)) ≃ ∀ i, α i where toFun f := cons f.1 f.2 invFun f := (f 0, tail f) left_inv f := by simp right_inv f := by simp /-- Recurse on an `n+1`-tuple by splitting it into a single element and an `n`-tuple. -/ @[elab_as_elim] def consCases {P : (∀ i : Fin n.succ, α i) → Sort v} (h : ∀ x₀ x, P (Fin.cons x₀ x)) (x : ∀ i : Fin n.succ, α i) : P x := _root_.cast (by rw [cons_self_tail]) <\| h (x 0) (tail x) @[simp] theorem consCases_cons {P : (∀ i : Fin n.succ, α i) → Sort v} (h : ∀ x₀ x, P (Fin.cons x₀ x)) (x₀ : α 0) (x : ∀ i : Fin n, α i.succ) : @consCases _ _ _ h (cons x₀ x) = h x₀ x := by rw [consCases, cast_eq] congr /-- Recurse on a tuple by splitting into `Fin.elim0` and `Fin.cons`. -/ @[elab_as_elim] def consInduction {α : Sort} {P : ∀ {n : ℕ}, (Fin n → α) → Sort v} (h0 : P Fin.elim0) (h : ∀ {n} (x₀) (x : Fin n → α), P x → P (Fin.cons x₀ x)) : ∀ {n : ℕ} (x : Fin n → α), P x \| 0, x => by convert h0 \| _ + 1, x => consCases (fun _ _ ↦ h _ _ <\| consInduction h0 h _) x theorem cons_injective_of_injective {α} {x₀ : α} {x : Fin n → α} (hx₀ : x₀ ∉ Set.range x) (hx : Function.Injective x) : Function.Injective (cons x₀ x : Fin n.succ → α) := by refine Fin.cases ?_ ?_ · refine Fin.cases ?_ ?_ · intro rfl · intro j h rw [cons_zero, cons_succ] at h exact hx₀.elim ⟨_, h.symm⟩ · intro i refine Fin.cases ?_ ?_ · intro h rw [cons_zero, cons_succ] at h exact hx₀.elim ⟨_, h⟩ · intro j h rw [cons_succ, cons_succ] at h exact congr_arg _ (hx h) theorem cons_injective_iff {α} {x₀ : α} {x : Fin n → α} : Function.Injective (cons x₀ x : Fin n.succ → α) ↔ x₀ ∉ Set.range x ∧ Function.Injective x := by refine ⟨fun h ↦ ⟨?_, ?_⟩, fun h ↦ cons_injective_of_injective h.1 h.2⟩ · rintro ⟨i, hi⟩ replace h := @h i.succ 0 simp [hi] at h · simpa [Function.comp] using h.comp (Fin.succ_injective _) @[simp] theorem forall_fin_zero_pi {α : Fin 0 → Sort} {P : (∀ i, α i) → Prop} : (∀ x, P x) ↔ P finZeroElim := ⟨fun h ↦ h _, fun h x ↦ Subsingleton.elim finZeroElim x ▸ h⟩ @[simp] theorem exists_fin_zero_pi {α : Fin 0 → Sort} {P : (∀ i, α i) → Prop} : (∃ x, P x) ↔ P finZeroElim := ⟨fun ⟨x, h⟩ ↦ Subsingleton.elim x finZeroElim ▸ h, fun h ↦ ⟨_, h⟩⟩ theorem forall_fin_succ_pi {P : (∀ i, α i) → Prop} : (∀ x, P x) ↔ ∀ a v, P (Fin.cons a v) := ⟨fun h a v ↦ h (Fin.cons a v), consCases⟩ theorem exists_fin_succ_pi {P : (∀ i, α i) → Prop} : (∃ x, P x) ↔ ∃ a v, P (Fin.cons a v) := ⟨fun ⟨x, h⟩ ↦ ⟨x 0, tail x, (cons_self_tail x).symm ▸ h⟩, fun ⟨_, _, h⟩ ↦ ⟨_, h⟩⟩ /-- Updating the first element of a tuple does not change the tail. -/ @[simp] theorem tail_update_zero : tail (update q 0 z) = tail q := by ext j simp [tail] /-- Updating a nonzero element and taking the tail commute. -/ @[simp] theorem tail_update_succ : tail (update q i.succ y) = update (tail q) i y := by ext j by_cases h : j = i · rw [h] simp [tail] · simp [tail, (Fin.succ_injective n).ne h, h] theorem comp_cons {α : Sort} {β : Sort} (g : α → β) (y : α) (q : Fin n → α) : g ∘ cons y q = cons (g y) (g ∘ q) := by ext j by_cases h : j = 0 · rw [h] rfl · let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ, comp_apply, comp_apply, cons_succ] theorem comp_tail {α : Sort} {β : Sort} (g : α → β) (q : Fin n.succ → α) : g ∘ tail q = tail (g ∘ q) := by ext j simp [tail] section Preorder variable {α : Fin (n + 1) → Type} theorem le_cons [∀ i, Preorder (α i)] {x : α 0} {q : ∀ i, α i} {p : ∀ i : Fin n, α i.succ} : q ≤ cons x p ↔ q 0 ≤ x ∧ tail q ≤ p := forall_fin_succ.trans <\| and_congr Iff.rfl <\| forall_congr' fun j ↦ by simp [tail] theorem cons_le [∀ i, Preorder (α i)] {x : α 0} {q : ∀ i, α i} {p : ∀ i : Fin n, α i.succ} : cons x p ≤ q ↔ x ≤ q 0 ∧ p ≤ tail q := @le_cons _ (fun i ↦ (α i)ᵒᵈ) _ x q p theorem cons_le_cons [∀ i, Preorder (α i)] {x₀ y₀ : α 0} {x y : ∀ i : Fin n, α i.succ} : cons x₀ x ≤ cons y₀ y ↔ x₀ ≤ y₀ ∧ x ≤ y := forall_fin_succ.trans <\| and_congr_right' <\| by simp only [cons_succ, Pi.le_def] end Preorder theorem range_fin_succ {α} (f : Fin (n + 1) → α) : Set.range f = insert (f 0) (Set.range (Fin.tail f)) := Set.ext fun _ ↦ exists_fin_succ.trans <\| eq_comm.or Iff.rfl @[simp] theorem range_cons {α} {n : ℕ} (x : α) (b : Fin n → α) : Set.range (Fin.cons x b : Fin n.succ → α) = insert x (Set.range b) := by rw [range_fin_succ, cons_zero, tail_cons] section Append variable {α : Sort} /-- Append a tuple of length `m` to a tuple of length `n` to get a tuple of length `m + n`. This is a non-dependent version of `Fin.add_cases`. -/ def append (a : Fin m → α) (b : Fin n → α) : Fin (m + n) → α := @Fin.addCases _ _ (fun _ => α) a b @[simp] theorem append_left (u : Fin m → α) (v : Fin n → α) (i : Fin m) : append u v (Fin.castAdd n i) = u i := addCases_left _ @[simp] theorem append_right (u : Fin m → α) (v : Fin n → α) (i : Fin n) : append u v (natAdd m i) = v i := addCases_right _ theorem append_right_nil (u : Fin m → α) (v : Fin n → α) (hv : n = 0) : append u v = u ∘ Fin.cast (by rw [hv, Nat.add_zero]) := by refine funext (Fin.addCases (fun l => ?_) fun r => ?_) · rw [append_left, Function.comp_apply] refine congr_arg u (Fin.ext ?_) simp · exact (Fin.cast hv r).elim0 @[simp] theorem append_elim0 (u : Fin m → α) : append u Fin.elim0 = u ∘ Fin.cast (Nat.add_zero _) := append_right_nil _ _ rfl theorem append_left_nil (u : Fin m → α) (v : Fin n → α) (hu : m = 0) : append u v = v ∘ Fin.cast (by rw [hu, Nat.zero_add]) := by refine funext (Fin.addCases (fun l => ?_) fun r => ?_) · exact (Fin.cast hu l).elim0 · rw [append_right, Function.comp_apply] refine congr_arg v (Fin.ext ?_) simp [hu] @[simp] theorem elim0_append (v : Fin n → α) : append Fin.elim0 v = v ∘ Fin.cast (Nat.zero_add _) := append_left_nil _ _ rfl theorem append_assoc {p : ℕ} (a : Fin m → α) (b : Fin n → α) (c : Fin p → α) : append (append a b) c = append a (append b c) ∘ Fin.cast (Nat.add_assoc ..) := by ext i rw [Function.comp_apply] refine Fin.addCases (fun l => ?_) (fun r => ?_) i · rw [append_left] refine Fin.addCases (fun ll => ?_) (fun lr => ?_) l · rw [append_left] simp [castAdd_castAdd] · rw [append_right] simp [castAdd_natAdd] · rw [append_right] simp [← natAdd_natAdd] /-- Appending a one-tuple to the left is the same as `Fin.cons`. -/ theorem append_left_eq_cons {n : ℕ} (x₀ : Fin 1 → α) (x : Fin n → α) : Fin.append x₀ x = Fin.cons (x₀ 0) x ∘ Fin.cast (Nat.add_comm ..) := by ext i refine Fin.addCases ?_ ?_ i <;> clear i · intro i rw [Subsingleton.elim i 0, Fin.append_left, Function.comp_apply, eq_comm] exact Fin.cons_zero _ _ · intro i rw [Fin.append_right, Function.comp_apply, Fin.cast_natAdd, eq_comm, Fin.addNat_one] exact Fin.cons_succ _ _ _ /-- `Fin.cons` is the same as appending a one-tuple to the left. -/ theorem cons_eq_append (x : α) (xs : Fin n → α) : cons x xs = append (cons x Fin.elim0) xs ∘ Fin.cast (Nat.add_comm ..) := by funext i; simp [append_left_eq_cons] @[simp] lemma append_cast_left {n m} (xs : Fin n → α) (ys : Fin m → α) (n' : ℕ) (h : n' = n) : Fin.append (xs ∘ Fin.cast h) ys = Fin.append xs ys ∘ (Fin.cast <\| by rw [h]) := by subst h; simp @[simp] lemma append_cast_right {n m} (xs : Fin n → α) (ys : Fin m → α) (m' : ℕ) (h : m' = m) : Fin.append xs (ys ∘ Fin.cast h) = Fin.append xs ys ∘ (Fin.cast <\| by rw [h]) := by subst h; simp lemma append_rev {m n} (xs : Fin m → α) (ys : Fin n → α) (i : Fin (m + n)) : append xs ys (rev i) = append (ys ∘ rev) (xs ∘ rev) (i.cast (Nat.add_comm ..)) := by rcases rev_surjective i with ⟨i, rfl⟩ rw [rev_rev] induction i using Fin.addCases · simp [rev_castAdd] · simp [cast_rev, rev_addNat] lemma append_comp_rev {m n} (xs : Fin m → α) (ys : Fin n → α) : append xs ys ∘ rev = append (ys ∘ rev) (xs ∘ rev) ∘ Fin.cast (Nat.add_comm ..) := funext <\| append_rev xs ys theorem append_castAdd_natAdd {f : Fin (m + n) → α} : append (fun i ↦ f (castAdd n i)) (fun i ↦ f (natAdd m i)) = f := by unfold append addCases simp end Append section Repeat variable {α : Sort} /-- Repeat `a` `m` times. For example `Fin.repeat 2 ![0, 3, 7] = ![0, 3, 7, 0, 3, 7]`. -/ def «repeat» (m : ℕ) (a : Fin n → α) : Fin (m * n) → α \| i => a i.modNat @[simp] theorem repeat_apply (a : Fin n → α) (i : Fin (m * n)) : Fin.repeat m a i = a i.modNat := rfl @[simp] theorem repeat_zero (a : Fin n → α) : Fin.repeat 0 a = Fin.elim0 ∘ Fin.cast (Nat.zero_mul _) := funext fun x => (x.cast (Nat.zero_mul _)).elim0 @[simp] theorem repeat_one (a : Fin n → α) : Fin.repeat 1 a = a ∘ Fin.cast (Nat.one_mul _) := by generalize_proofs h apply funext rw [(Fin.rightInverse_cast h.symm).surjective.forall] intro i simp [modNat, Nat.mod_eq_of_lt i.is_lt] theorem repeat_succ (a : Fin n → α) (m : ℕ) : Fin.repeat m.succ a = append a (Fin.repeat m a) ∘ Fin.cast ((Nat.succ_mul _ _).trans (Nat.add_comm ..)) := by generalize_proofs h apply funext rw [(Fin.rightInverse_cast h.symm).surjective.forall] refine Fin.addCases (fun l => ?_) fun r => ?_ · simp [modNat, Nat.mod_eq_of_lt l.is_lt] · simp [modNat] @[simp] theorem repeat_add (a : Fin n → α) (m₁ m₂ : ℕ) : Fin.repeat (m₁ + m₂) a = append (Fin.repeat m₁ a) (Fin.repeat m₂ a) ∘ Fin.cast (Nat.add_mul ..) := by generalize_proofs h apply funext rw [(Fin.rightInverse_cast h.symm).surjective.forall] refine Fin.addCases (fun l => ?_) fun r => ?_ · simp [modNat, Nat.mod_eq_of_lt l.is_lt] · simp [modNat, Nat.add_mod] theorem repeat_rev (a : Fin n → α) (k : Fin (m * n)) : Fin.repeat m a k.rev = Fin.repeat m (a ∘ Fin.rev) k := congr_arg a k.modNat_rev theorem repeat_comp_rev (a : Fin n → α) : Fin.repeat m a ∘ Fin.rev = Fin.repeat m (a ∘ Fin.rev) := funext <\| repeat_rev a end Repeat end Tuple section TupleRight /-! In the previous section, we have discussed inserting or removing elements on the left of a tuple. In this section, we do the same on the right. A difference is that `Fin (n+1)` is constructed inductively from `Fin n` starting from the left, not from the right. This implies that Lean needs more help to realize that elements belong to the right types, i.e., we need to insert casts at several places. -/ variable {α : Fin (n + 1) → Sort} (x : α (last n)) (q : ∀ i, α i) (p : ∀ i : Fin n, α i.castSucc) (i : Fin n) (y : α i.castSucc) (z : α (last n)) /-- The beginning of an `n+1` tuple, i.e., its first `n` entries -/ def init (q : ∀ i, α i) (i : Fin n) : α i.castSucc := q i.castSucc theorem init_def {q : ∀ i, α i} : (init fun k : Fin (n + 1) ↦ q k) = fun k : Fin n ↦ q k.castSucc := rfl /-- Adding an element at the end of an `n`-tuple, to get an `n+1`-tuple. The name `snoc` comes from `cons` (i.e., adding an element to the left of a tuple) read in reverse order. -/ def snoc (p : ∀ i : Fin n, α i.castSucc) (x : α (last n)) (i : Fin (n + 1)) : α i := if h : i.val < n then _root_.cast (by rw [Fin.castSucc_castLT i h]) (p (castLT i h)) else _root_.cast (by rw [eq_last_of_not_lt h]) x @[simp] theorem init_snoc : init (snoc p x) = p := by ext i simp only [init, snoc, coe_castSucc, is_lt, cast_eq, dite_true] convert cast_eq rfl (p i) @[simp] theorem snoc_castSucc : snoc p x i.castSucc = p i := by simp only [snoc, coe_castSucc, is_lt, cast_eq, dite_true] convert cast_eq rfl (p i) @[simp] theorem snoc_comp_castSucc {α : Sort} {a : α} {f : Fin n → α} : (snoc f a : Fin (n + 1) → α) ∘ castSucc = f := funext fun i ↦ by rw [Function.comp_apply, snoc_castSucc] @[simp] theorem snoc_last : snoc p x (last n) = x := by simp [snoc] lemma snoc_zero {α : Sort} (p : Fin 0 → α) (x : α) : Fin.snoc p x = fun _ ↦ x := by ext y have : Subsingleton (Fin (0 + 1)) := Fin.subsingleton_one simp only [Subsingleton.elim y (Fin.last 0), snoc_last] @[simp] theorem snoc_comp_nat_add {n m : ℕ} {α : Sort} (f : Fin (m + n) → α) (a : α) : (snoc f a : Fin _ → α) ∘ (natAdd m : Fin (n + 1) → Fin (m + n + 1)) = snoc (f ∘ natAdd m) a := by ext i refine Fin.lastCases ?_ (fun i ↦ ?_) i · simp only [Function.comp_apply] rw [snoc_last, natAdd_last, snoc_last] · simp only [comp_apply, snoc_castSucc] rw [natAdd_castSucc, snoc_castSucc] @[simp] theorem snoc_cast_add {α : Fin (n + m + 1) → Sort} (f : ∀ i : Fin (n + m), α i.castSucc) (a : α (last (n + m))) (i : Fin n) : (snoc f a) (castAdd (m + 1) i) = f (castAdd m i) := dif_pos _ @[simp] theorem snoc_comp_cast_add {n m : ℕ} {α : Sort} (f : Fin (n + m) → α) (a : α) : (snoc f a : Fin _ → α) ∘ castAdd (m + 1) = f ∘ castAdd m := funext (snoc_cast_add _ _) /-- Updating a tuple and adding an element at the end commute. -/ @[simp] theorem snoc_update : snoc (update p i y) x = update (snoc p x) i.castSucc y := by ext j cases j using lastCases with \| cast j => rcases eq_or_ne j i with rfl \| hne <;> simp [] \| last => simp [Ne.symm] /-- Adding an element at the beginning of a tuple and then updating it amounts to adding it directly. -/ theorem update_snoc_last : update (snoc p x) (last n) z = snoc p z := by ext j cases j using lastCases <;> simp /-- As a binary function, `Fin.snoc` is injective. -/ theorem snoc_injective2 : Function.Injective2 (@snoc n α) := fun x y xₙ yₙ h ↦ ⟨funext fun i ↦ by simpa using congr_fun h (castSucc i), by simpa using congr_fun h (last n)⟩ @[simp] theorem snoc_inj {x y : ∀ i : Fin n, α i.castSucc} {xₙ yₙ : α (last n)} : snoc x xₙ = snoc y yₙ ↔ x = y ∧ xₙ = yₙ := snoc_injective2.eq_iff theorem snoc_right_injective (x : ∀ i : Fin n, α i.castSucc) : Function.Injective (snoc x) := snoc_injective2.right _ theorem snoc_left_injective (xₙ : α (last n)) : Function.Injective (snoc · xₙ) := snoc_injective2.left _ /-- Concatenating the first element of a tuple with its tail gives back the original tuple -/ @[simp] theorem snoc_init_self : snoc (init q) (q (last n)) = q := by ext j by_cases h : j.val < n · simp only [init, snoc, h, cast_eq, dite_true, castSucc_castLT] · rw [eq_last_of_not_lt h] simp /-- Updating the last element of a tuple does not change the beginning. -/ @[simp] theorem init_update_last : init (update q (last n) z) = init q := by ext j simp [init, Fin.ne_of_lt] /-- Updating an element and taking the beginning commute. -/ @[simp] theorem init_update_castSucc : init (update q i.castSucc y) = update (init q) i y := by ext j by_cases h : j = i · rw [h] simp [init] · simp [init, h, castSucc_inj] /-- `tail` and `init` commute. We state this lemma in a non-dependent setting, as otherwise it would involve a cast to convince Lean that the two types are equal, making it harder to use. -/ theorem tail_init_eq_init_tail {β : Sort} (q : Fin (n + 2) → β) : tail (init q) = init (tail q) := by ext i simp [tail, init, castSucc_fin_succ] /-- `cons` and `snoc` commute. We state this lemma in a non-dependent setting, as otherwise it would involve a cast to convince Lean that the two types are equal, making it harder to use. -/ theorem cons_snoc_eq_snoc_cons {β : Sort} (a : β) (q : Fin n → β) (b : β) : @cons n.succ (fun _ ↦ β) a (snoc q b) = snoc (cons a q) b := by ext i by_cases h : i = 0 · simp [h, snoc, castLT] set j := pred i h with ji have : i = j.succ := by rw [ji, succ_pred] rw [this, cons_succ] by_cases h' : j.val < n · set k := castLT j h' with jk have : j = castSucc k := by rw [jk, castSucc_castLT] rw [this, ← castSucc_fin_succ, snoc] simp [pred, snoc, cons] rw [eq_last_of_not_lt h', succ_last] simp theorem comp_snoc {α : Sort} {β : Sort} (g : α → β) (q : Fin n → α) (y : α) : g ∘ snoc q y = snoc (g ∘ q) (g y) := by ext j by_cases h : j.val < n · simp [h, snoc, castSucc_castLT] · rw [eq_last_of_not_lt h] simp /-- Appending a one-tuple to the right is the same as `Fin.snoc`. -/ theorem append_right_eq_snoc {α : Sort} {n : ℕ} (x : Fin n → α) (x₀ : Fin 1 → α) : Fin.append x x₀ = Fin.snoc x (x₀ 0) := by ext i refine Fin.addCases ?_ ?_ i <;> clear i · intro i rw [Fin.append_left] exact (@snoc_castSucc _ (fun _ => α) _ _ i).symm · intro i rw [Subsingleton.elim i 0, Fin.append_right] exact (@snoc_last _ (fun _ => α) _ _).symm /-- `Fin.snoc` is the same as appending a one-tuple -/ theorem snoc_eq_append {α : Sort} (xs : Fin n → α) (x : α) : snoc xs x = append xs (cons x Fin.elim0) := (append_right_eq_snoc xs (cons x Fin.elim0)).symm theorem append_left_snoc {n m} {α : Sort} (xs : Fin n → α) (x : α) (ys : Fin m → α) : Fin.append (Fin.snoc xs x) ys = Fin.append xs (Fin.cons x ys) ∘ Fin.cast (Nat.succ_add_eq_add_succ ..) := by rw [snoc_eq_append, append_assoc, append_left_eq_cons, append_cast_right]; rfl theorem append_right_cons {n m} {α : Sort} (xs : Fin n → α) (y : α) (ys : Fin m → α) : Fin.append xs (Fin.cons y ys) = Fin.append (Fin.snoc xs y) ys ∘ Fin.cast (Nat.succ_add_eq_add_succ ..).symm := by rw [append_left_snoc]; rfl theorem append_cons {α : Sort} (a : α) (as : Fin n → α) (bs : Fin m → α) : Fin.append (cons a as) bs = cons a (Fin.append as bs) ∘ (Fin.cast <\| Nat.add_right_comm n 1 m) := by funext i rcases i with ⟨i, -⟩ simp only [append, addCases, cons, castLT, cast, comp_apply] rcases i with - \| i · simp · split_ifs with h · have : i < n := Nat.lt_of_succ_lt_succ h simp [addCases, this] · have : ¬i < n := Nat.not_le.mpr <\| Nat.lt_succ.mp <\| Nat.not_le.mp h simp [addCases, this] theorem append_snoc {α : Sort} (as : Fin n → α) (bs : Fin m → α) (b : α) : Fin.append as (snoc bs b) = snoc (Fin.append as bs) b := by funext i rcases i with ⟨i, isLt⟩ simp only [append, addCases, castLT, cast_mk, subNat_mk, natAdd_mk, cast, snoc.eq_1, cast_eq, eq_rec_constant, Nat.add_eq, Nat.add_zero, castLT_mk] split_ifs with lt_n lt_add sub_lt nlt_add lt_add <;> (try rfl) · have := Nat.lt_add_right m lt_n contradiction · obtain rfl := Nat.eq_of_le_of_lt_succ (Nat.not_lt.mp nlt_add) isLt simp [Nat.add_comm n m] at sub_lt · have := Nat.sub_lt_left_of_lt_add (Nat.not_lt.mp lt_n) lt_add contradiction theorem comp_init {α : Sort} {β : Sort} (g : α → β) (q : Fin n.succ → α) : g ∘ init q = init (g ∘ q) := by ext j simp [init] /-- Equivalence between tuples of length `n + 1` and pairs of an element and a tuple of length `n` given by separating out the last element of the tuple. This is `Fin.snoc` as an `Equiv`. -/ @[simps] def snocEquiv (α : Fin (n + 1) → Type) : α (last n) × (∀ i, α (castSucc i)) ≃ ∀ i, α i where toFun f _ := Fin.snoc f.2 f.1 _ invFun f := ⟨f _, Fin.init f⟩ left_inv f := by simp right_inv f := by simp /-- Recurse on an `n+1`-tuple by splitting it its initial `n`-tuple and its last element. -/ @[elab_as_elim, inline] def snocCases {P : (∀ i : Fin n.succ, α i) → Sort} (h : ∀ xs x, P (Fin.snoc xs x)) (x : ∀ i : Fin n.succ, α i) : P x := _root_.cast (by rw [Fin.snoc_init_self]) <\| h (Fin.init x) (x <\| Fin.last _) @[simp] lemma snocCases_snoc {P : (∀ i : Fin (n+1), α i) → Sort} (h : ∀ x x₀, P (Fin.snoc x x₀)) (x : ∀ i : Fin n, (Fin.init α) i) (x₀ : α (Fin.last _)) : snocCases h (Fin.snoc x x₀) = h x x₀ := by rw [snocCases, cast_eq_iff_heq, Fin.init_snoc, Fin.snoc_last] /-- Recurse on a tuple by splitting into `Fin.elim0` and `Fin.snoc`. -/ @[elab_as_elim] def snocInduction {α : Sort} {P : ∀ {n : ℕ}, (Fin n → α) → Sort} (h0 : P Fin.elim0) (h : ∀ {n} (x : Fin n → α) (x₀), P x → P (Fin.snoc x x₀)) : ∀ {n : ℕ} (x : Fin n → α), P x \| 0, x => by convert h0 \| _ + 1, x => snocCases (fun _ _ ↦ h _ _ <\| snocInduction h0 h _) x end TupleRight section InsertNth variable {α : Fin (n + 1) → Sort} {β : Sort} /- Porting note: Lean told me `(fun x x_1 ↦ α x)` was an invalid motive, but disabling automatic insertion and specifying that motive seems to work. -/ /-- Define a function on `Fin (n + 1)` from a value on `i : Fin (n + 1)` and values on each `Fin.succAbove i j`, `j : Fin n`. This version is elaborated as eliminator and works for propositions, see also `Fin.insertNth` for a version without an `@[elab_as_elim]` attribute. -/ @[elab_as_elim] def succAboveCases {α : Fin (n + 1) → Sort u} (i : Fin (n + 1)) (x : α i) (p : ∀ j : Fin n, α (i.succAbove j)) (j : Fin (n + 1)) : α j := if hj : j = i then Eq.rec x hj.symm else if hlt : j < i then @Eq.recOn _ _ (fun x _ ↦ α x) _ (succAbove_castPred_of_lt _ _ hlt) (p _) else @Eq.recOn _ _ (fun x _ ↦ α x) _ (succAbove_pred_of_lt _ _ <\| (Fin.lt_or_lt_of_ne hj).resolve_left hlt) (p _) -- This is a duplicate of `Fin.exists_fin_succ` in Core. We should upstream the name change. alias forall_iff_succ := forall_fin_succ -- This is a duplicate of `Fin.exists_fin_succ` in Core. We should upstream the name change. alias exists_iff_succ := exists_fin_succ lemma forall_iff_castSucc {P : Fin (n + 1) → Prop} : (∀ i, P i) ↔ P (last n) ∧ ∀ i : Fin n, P i.castSucc := ⟨fun h ↦ ⟨h _, fun _ ↦ h _⟩, fun h ↦ lastCases h.1 h.2⟩ lemma exists_iff_castSucc {P : Fin (n + 1) → Prop} : (∃ i, P i) ↔ P (last n) ∨ ∃ i : Fin n, P i.castSucc where mp := by rintro ⟨i, hi⟩ induction' i using lastCases · exact .inl hi · exact .inr ⟨_, hi⟩ mpr := by rintro (h \| ⟨i, hi⟩) <;> exact ⟨_, ‹_›⟩ theorem forall_iff_succAbove {P : Fin (n + 1) → Prop} (p : Fin (n + 1)) : (∀ i, P i) ↔ P p ∧ ∀ i, P (p.succAbove i) := ⟨fun h ↦ ⟨h _, fun _ ↦ h _⟩, fun h ↦ succAboveCases p h.1 h.2⟩ lemma exists_iff_succAbove {P : Fin (n + 1) → Prop} (p : Fin (n + 1)) : (∃ i, P i) ↔ P p ∨ ∃ i, P (p.succAbove i) where mp := by rintro ⟨i, hi⟩ induction' i using p.succAboveCases · exact .inl hi · exact .inr ⟨_, hi⟩ mpr := by rintro (h \| ⟨i, hi⟩) <;> exact ⟨_, ‹_›⟩ /-- Analogue of `Fin.eq_zero_or_eq_succ` for `succAbove`. -/ theorem eq_self_or_eq_succAbove (p i : Fin (n + 1)) : i = p ∨ ∃ j, i = p.succAbove j := succAboveCases p (.inl rfl) (fun j => .inr ⟨j, rfl⟩) i /-- Remove the `p`-th entry of a tuple. -/ def removeNth (p : Fin (n + 1)) (f : ∀ i, α i) : ∀ i, α (p.succAbove i) := fun i ↦ f (p.succAbove i) /-- Insert an element into a tuple at a given position. For `i = 0` see `Fin.cons`, for `i = Fin.last n` see `Fin.snoc`. See also `Fin.succAboveCases` for a version elaborated as an eliminator. -/ def insertNth (i : Fin (n + 1)) (x : α i) (p : ∀ j : Fin n, α (i.succAbove j)) (j : Fin (n + 1)) : α j := succAboveCases i x p j @[simp] theorem insertNth_apply_same (i : Fin (n + 1)) (x : α i) (p : ∀ j, α (i.succAbove j)) : insertNth i x p i = x := by simp [insertNth, succAboveCases] @[simp] theorem insertNth_apply_succAbove (i : Fin (n + 1)) (x : α i) (p : ∀ j, α (i.succAbove j)) (j : Fin n) : insertNth i x p (i.succAbove j) = p j := by simp only [insertNth, succAboveCases, dif_neg (succAbove_ne _ _), succAbove_lt_iff_castSucc_lt] split_ifs with hlt · generalize_proofs H₁ H₂; revert H₂ generalize hk : castPred ((succAbove i) j) H₁ = k rw [castPred_succAbove _ _ hlt] at hk; cases hk intro; rfl · generalize_proofs H₀ H₁ H₂; revert H₂ generalize hk : pred (succAbove i j) H₁ = k rw [pred_succAbove _ _ (Fin.not_lt.1 hlt)] at hk; cases hk intro; rfl @[simp] theorem succAbove_cases_eq_insertNth : @succAboveCases = @insertNth := rfl @[simp] lemma removeNth_insertNth (p : Fin (n + 1)) (a : α p) (f : ∀ i, α (succAbove p i)) : removeNth p (insertNth p a f) = f := by ext; unfold removeNth; simp @[simp] lemma removeNth_zero (f : ∀ i, α i) : removeNth 0 f = tail f := by ext; simp [tail, removeNth] @[simp] lemma removeNth_last {α : Type} (f : Fin (n + 1) → α) : removeNth (last n) f = init f := by ext; simp [init, removeNth] @[simp] theorem insertNth_comp_succAbove (i : Fin (n + 1)) (x : β) (p : Fin n → β) : insertNth i x p ∘ i.succAbove = p := funext (insertNth_apply_succAbove i _ _) theorem insertNth_eq_iff {p : Fin (n + 1)} {a : α p} {f : ∀ i, α (p.succAbove i)} {g : ∀ j, α j} : insertNth p a f = g ↔ a = g p ∧ f = removeNth p g := by simp [funext_iff, forall_iff_succAbove p, removeNth] theorem eq_insertNth_iff {p : Fin (n + 1)} {a : α p} {f : ∀ i, α (p.succAbove i)} {g : ∀ j, α j} : g = insertNth p a f ↔ g p = a ∧ removeNth p g = f := by simpa [eq_comm] using insertNth_eq_iff /-- As a binary function, `Fin.insertNth` is injective. -/ theorem insertNth_injective2 {p : Fin (n + 1)} : Function.Injective2 (@insertNth n α p) := fun xₚ yₚ x y h ↦ ⟨by simpa using congr_fun h p, funext fun i ↦ by simpa using congr_fun h (succAbove p i)⟩ @[simp] theorem insertNth_inj {p : Fin (n + 1)} {x y : ∀ i, α (succAbove p i)} {xₚ yₚ : α p} : insertNth p xₚ x = insertNth p yₚ y ↔ xₚ = yₚ ∧ x = y := insertNth_injective2.eq_iff theorem insertNth_left_injective {p : Fin (n + 1)} (x : ∀ i, α (succAbove p i)) : Function.Injective (insertNth p · x) := insertNth_injective2.left _ theorem insertNth_right_injective {p : Fin (n + 1)} (x : α p) : Function.Injective (insertNth p x) := insertNth_injective2.right _ /- Porting note: Once again, Lean told me `(fun x x_1 ↦ α x)` was an invalid motive, but disabling automatic insertion and specifying that motive seems to work. -/ theorem insertNth_apply_below {i j : Fin (n + 1)} (h : j < i) (x : α i) (p : ∀ k, α (i.succAbove k)) : i.insertNth x p j = @Eq.recOn _ _ (fun x _ ↦ α x) _ (succAbove_castPred_of_lt _ _ h) (p <\| j.castPred _) := by rw [insertNth, succAboveCases, dif_neg (Fin.ne_of_lt h), dif_pos h] /- Porting note: Once again, Lean told me `(fun x x_1 ↦ α x)` was an invalid motive, but disabling automatic insertion and specifying that motive seems to work. -/ theorem insertNth_apply_above {i j : Fin (n + 1)} (h : i < j) (x : α i) (p : ∀ k, α (i.succAbove k)) : i.insertNth x p j = @Eq.recOn _ _ (fun x _ ↦ α x) _ (succAbove_pred_of_lt _ _ h) (p <\| j.pred _) := by rw [insertNth, succAboveCases, dif_neg (Fin.ne_of_gt h), dif_neg (Fin.lt_asymm h)] theorem insertNth_zero (x : α 0) (p : ∀ j : Fin n, α (succAbove 0 j)) : insertNth 0 x p = cons x fun j ↦ _root_.cast (congr_arg α (congr_fun succAbove_zero j)) (p j) := by refine insertNth_eq_iff.2 ⟨by simp, ?_⟩ ext j convert (cons_succ x p j).symm @[simp] theorem insertNth_zero' (x : β) (p : Fin n → β) : @insertNth _ (fun _ ↦ β) 0 x p = cons x p := by simp [insertNth_zero] theorem insertNth_last (x : α (last n)) (p : ∀ j : Fin n, α ((last n).succAbove j)) : insertNth (last n) x p = snoc (fun j ↦ _root_.cast (congr_arg α (succAbove_last_apply j)) (p j)) x := by refine insertNth_eq_iff.2 ⟨by simp, ?_⟩ ext j apply eq_of_heq trans snoc (fun j ↦ _root_.cast (congr_arg α (succAbove_last_apply j)) (p j)) x j.castSucc · rw [snoc_castSucc] exact (cast_heq _ _).symm · apply congr_arg_heq rw [succAbove_last] @[simp] theorem insertNth_last' (x : β) (p : Fin n → β) : @insertNth _ (fun _ ↦ β) (last n) x p = snoc p x := by simp [insertNth_last] lemma insertNth_rev {α : Sort} (i : Fin (n + 1)) (a : α) (f : Fin n → α) (j : Fin (n + 1)) : insertNth (α := fun _ ↦ α) i a f (rev j) = insertNth (α := fun _ ↦ α) i.rev a (f ∘ rev) j := by induction j using Fin.succAboveCases · exact rev i · simp · simp [rev_succAbove] theorem insertNth_comp_rev {α} (i : Fin (n + 1)) (x : α) (p : Fin n → α) : (Fin.insertNth i x p) ∘ Fin.rev = Fin.insertNth (Fin.rev i) x (p ∘ Fin.rev) := by funext x apply insertNth_rev theorem cons_rev {α n} (a : α) (f : Fin n → α) (i : Fin <\| n + 1) : cons (α := fun _ => α) a f i.rev = snoc (α := fun _ => α) (f ∘ Fin.rev : Fin _ → α) a i := by simpa using insertNth_rev 0 a f i theorem cons_comp_rev {α n} (a : α) (f : Fin n → α) : Fin.cons a f ∘ Fin.rev = Fin.snoc (f ∘ Fin.rev) a := by funext i; exact cons_rev .. theorem snoc_rev {α n} (a : α) (f : Fin n → α) (i : Fin <\| n + 1) : snoc (α := fun _ => α) f a i.rev = cons (α := fun _ => α) a (f ∘ Fin.rev : Fin _ → α) i := by simpa using insertNth_rev (last n) a f i theorem snoc_comp_rev {α n} (a : α) (f : Fin n → α) : Fin.snoc f a ∘ Fin.rev = Fin.cons a (f ∘ Fin.rev) := funext <\| snoc_rev a f theorem insertNth_binop (op : ∀ j, α j → α j → α j) (i : Fin (n + 1)) (x y : α i) (p q : ∀ j, α (i.succAbove j)) : (i.insertNth (op i x y) fun j ↦ op _ (p j) (q j)) = fun j ↦ op j (i.insertNth x p j) (i.insertNth y q j) := insertNth_eq_iff.2 <\| by unfold removeNth; simp section Preorder	variable {α : Fin (n + 1) → Type*} [∀ i, Preorder (α i)]	Mathlib/Data/Fin/Tuple/Basic.lean	931	933
/- 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] have h1 : I * ↑(1 / x) = -1 / (I * x) := by push_cast rw [← div_div, mul_one_div, div_I, neg_one_mul, neg_neg] have hx' : I * x ≠ 0 := mul_ne_zero I_ne_zero (ofReal_ne_zero.mpr hx.ne') have h2 : a * I * x / (I * x) = a := by rw [div_eq_iff hx'] ring have h3 : 1 / (-I * (I * x)) ^ (1 / 2 : ℂ) = 1 / ↑(x ^ (1 / 2 : ℝ)) := by rw [neg_mul, ← mul_assoc, I_mul_I, neg_one_mul, neg_neg,ofReal_cpow hx.le, ofReal_div, ofReal_one, ofReal_ofNat] have h4 : -π * I * (a * I * x) ^ 2 / (I * x) = - (-π * a ^ 2 * x) := by rw [mul_pow, mul_pow, I_sq, div_eq_iff hx'] ring rw [h1, h2, h3, h4, ← mul_assoc, mul_comm (cexp _), mul_assoc _ (cexp _) (cexp _), ← Complex.exp_add, neg_add_cancel, Complex.exp_zero, mul_one, ofReal_div, ofReal_one] end kernel_defs section asymp /-! ## Formulae for the kernels as sums -/ lemma hasSum_int_evenKernel (a : ℝ) {t : ℝ} (ht : 0 < t) : HasSum (fun n : ℤ ↦ rexp (-π * (n + a) ^ 2 * t)) (evenKernel a t) := by rw [← hasSum_ofReal, evenKernel_def] have (n : ℤ) : cexp (-(π * (n + a) ^ 2 * t)) = cexp (-(π * a ^ 2 * t)) * jacobiTheta₂_term n (a * I * t) (I * t) := by rw [jacobiTheta₂_term, ← Complex.exp_add] ring_nf simp simpa [this] using (hasSum_jacobiTheta₂_term _ (by simpa)).mul_left _ lemma hasSum_int_cosKernel (a : ℝ) {t : ℝ} (ht : 0 < t) : HasSum (fun n : ℤ ↦ cexp (2 * π * I * a * n) * rexp (-π * n ^ 2 * t)) ↑(cosKernel a t) := by rw [cosKernel_def a t] have (n : ℤ) : cexp (2 * π * I * a * n) * cexp (-(π * n ^ 2 * t)) = jacobiTheta₂_term n a (I * ↑t) := by rw [jacobiTheta₂_term, ← Complex.exp_add] ring_nf simp [sub_eq_add_neg] simpa [this] using hasSum_jacobiTheta₂_term _ (by simpa) /-- Modified version of `hasSum_int_evenKernel` omitting the constant term at `∞`. -/ lemma hasSum_int_evenKernel₀ (a : ℝ) {t : ℝ} (ht : 0 < t) : HasSum (fun n : ℤ ↦ if n + a = 0 then 0 else rexp (-π * (n + a) ^ 2 * t)) (evenKernel a t - if (a : UnitAddCircle) = 0 then 1 else 0) := by haveI := Classical.propDecidable -- speed up instance search for `if / then / else` simp_rw [AddCircle.coe_eq_zero_iff, zsmul_one] split_ifs with h · obtain ⟨k, rfl⟩ := h simpa [← Int.cast_add, add_eq_zero_iff_eq_neg] using hasSum_ite_sub_hasSum (hasSum_int_evenKernel (k : ℝ) ht) (-k) · suffices ∀ (n : ℤ), n + a ≠ 0 by simpa [this] using hasSum_int_evenKernel a ht contrapose! h let ⟨n, hn⟩ := h exact ⟨-n, by simpa [neg_eq_iff_add_eq_zero]⟩ lemma hasSum_int_cosKernel₀ (a : ℝ) {t : ℝ} (ht : 0 < t) : HasSum (fun n : ℤ ↦ if n = 0 then 0 else cexp (2 * π * I * a * n) * rexp (-π * n ^ 2 * t)) (↑(cosKernel a t) - 1) := by simpa using hasSum_ite_sub_hasSum (hasSum_int_cosKernel a ht) 0 lemma hasSum_nat_cosKernel₀ (a : ℝ) {t : ℝ} (ht : 0 < t) : HasSum (fun n : ℕ ↦ 2 * Real.cos (2 * π * a * (n + 1)) * rexp (-π * (n + 1) ^ 2 * t)) (cosKernel a t - 1) := by rw [← hasSum_ofReal, ofReal_sub, ofReal_one] have := (hasSum_int_cosKernel a ht).nat_add_neg rw [← hasSum_nat_add_iff' 1] at this simp_rw [Finset.sum_range_one, Nat.cast_zero, neg_zero, Int.cast_zero, zero_pow two_ne_zero, mul_zero, zero_mul, Complex.exp_zero, Real.exp_zero, ofReal_one, mul_one, Int.cast_neg, Int.cast_natCast, neg_sq, ← add_mul, add_sub_assoc, ← sub_sub, sub_self, zero_sub, ← sub_eq_add_neg, mul_neg] at this refine this.congr_fun fun n ↦ ?_ push_cast rw [Complex.cos, mul_div_cancel₀ _ two_ne_zero] congr 3 <;> ring /-! ## Asymptotics of the kernels as `t → ∞` -/ /-- The function `evenKernel a - L` has exponential decay at `+∞`, where `L = 1` if `a = 0` and `L = 0` otherwise. -/ lemma isBigO_atTop_evenKernel_sub (a : UnitAddCircle) : ∃ p : ℝ, 0 < p ∧ (evenKernel a · - (if a = 0 then 1 else 0)) =O[atTop] (rexp <\| -p * ·) := by induction a using QuotientAddGroup.induction_on with \| H b => obtain ⟨p, hp, hp'⟩ := HurwitzKernelBounds.isBigO_atTop_F_int_zero_sub b refine ⟨p, hp, (EventuallyEq.isBigO ?_).trans hp'⟩ filter_upwards [eventually_gt_atTop 0] with t h simp [← (hasSum_int_evenKernel b h).tsum_eq, HurwitzKernelBounds.F_int, HurwitzKernelBounds.f_int] /-- The function `cosKernel a - 1` has exponential decay at `+∞`, for any `a`. -/ lemma isBigO_atTop_cosKernel_sub (a : UnitAddCircle) : ∃ p, 0 < p ∧ IsBigO atTop (cosKernel a · - 1) (fun x ↦ Real.exp (-p * x)) := by induction a using QuotientAddGroup.induction_on with \| H a => obtain ⟨p, hp, hp'⟩ := HurwitzKernelBounds.isBigO_atTop_F_nat_zero_sub zero_le_one refine ⟨p, hp, (Eventually.isBigO ?_).trans (hp'.const_mul_left 2)⟩ filter_upwards [eventually_gt_atTop 0] with t ht simp only [eq_false_intro one_ne_zero, if_false, sub_zero, ← (hasSum_nat_cosKernel₀ a ht).tsum_eq, HurwitzKernelBounds.F_nat] apply tsum_of_norm_bounded ((HurwitzKernelBounds.summable_f_nat 0 1 ht).hasSum.mul_left 2) intro n rw [norm_mul, norm_mul, norm_two, mul_assoc, mul_le_mul_iff_of_pos_left two_pos, norm_of_nonneg (exp_pos _).le, HurwitzKernelBounds.f_nat, pow_zero, one_mul, Real.norm_eq_abs] exact mul_le_of_le_one_left (exp_pos _).le (abs_cos_le_one _) end asymp section FEPair /-! ## Construction of a FE-pair -/ /-- A `WeakFEPair` structure with `f = evenKernel a` and `g = cosKernel a`. -/ def hurwitzEvenFEPair (a : UnitAddCircle) : WeakFEPair ℂ where f := ofReal ∘ evenKernel a g := ofReal ∘ cosKernel a hf_int := (continuous_ofReal.comp_continuousOn (continuousOn_evenKernel a)).locallyIntegrableOn measurableSet_Ioi hg_int := (continuous_ofReal.comp_continuousOn (continuousOn_cosKernel a)).locallyIntegrableOn measurableSet_Ioi k := 1 / 2 hk := one_half_pos ε := 1 hε := one_ne_zero f₀ := if a = 0 then 1 else 0 hf_top r := by let ⟨v, hv, hv'⟩ := isBigO_atTop_evenKernel_sub a rw [← isBigO_norm_left] at hv' ⊢ conv at hv' => enter [2, x]; rw [← norm_real, ofReal_sub, apply_ite ((↑) : ℝ → ℂ), ofReal_one, ofReal_zero] exact hv'.trans (isLittleO_exp_neg_mul_rpow_atTop hv _).isBigO g₀ := 1 hg_top r := by obtain ⟨p, hp, hp'⟩ := isBigO_atTop_cosKernel_sub a simpa using isBigO_ofReal_left.mpr <\| hp'.trans (isLittleO_exp_neg_mul_rpow_atTop hp r).isBigO h_feq x hx := by simp [← ofReal_mul, evenKernel_functional_equation, inv_rpow (le_of_lt hx)] @[simp] lemma hurwitzEvenFEPair_zero_symm : (hurwitzEvenFEPair 0).symm = hurwitzEvenFEPair 0 := by unfold hurwitzEvenFEPair WeakFEPair.symm congr 1 <;> simp [evenKernel_eq_cosKernel_of_zero] @[simp] lemma hurwitzEvenFEPair_neg (a : UnitAddCircle) : hurwitzEvenFEPair (-a) = hurwitzEvenFEPair a := by unfold hurwitzEvenFEPair congr 1 <;> simp [Function.comp_def] /-! ## Definition of the completed even Hurwitz zeta function -/ /-- The meromorphic function of `s` which agrees with `1 / 2 * Gamma (s / 2) * π ^ (-s / 2) * ∑' (n : ℤ), 1 / \|n + a\| ^ s` for `1 < re s`. -/ def completedHurwitzZetaEven (a : UnitAddCircle) (s : ℂ) : ℂ := ((hurwitzEvenFEPair a).Λ (s / 2)) / 2 /-- The entire function differing from `completedHurwitzZetaEven a s` by a linear combination of `1 / s` and `1 / (1 - s)`. -/ def completedHurwitzZetaEven₀ (a : UnitAddCircle) (s : ℂ) : ℂ := ((hurwitzEvenFEPair a).Λ₀ (s / 2)) / 2 lemma completedHurwitzZetaEven_eq (a : UnitAddCircle) (s : ℂ) : completedHurwitzZetaEven a s = completedHurwitzZetaEven₀ a s - (if a = 0 then 1 else 0) / s - 1 / (1 - s) := by rw [completedHurwitzZetaEven, WeakFEPair.Λ, sub_div, sub_div] congr 1 · change completedHurwitzZetaEven₀ a s - (1 / (s / 2)) • (if a = 0 then 1 else 0) / 2 = completedHurwitzZetaEven₀ a s - (if a = 0 then 1 else 0) / s rw [smul_eq_mul, mul_comm, mul_div_assoc, div_div, div_mul_cancel₀ _ two_ne_zero, mul_one_div] · change (1 / (↑(1 / 2 : ℝ) - s / 2)) • 1 / 2 = 1 / (1 - s) push_cast rw [smul_eq_mul, mul_one, ← sub_div, div_div, div_mul_cancel₀ _ two_ne_zero] /-- The meromorphic function of `s` which agrees with `Gamma (s / 2) * π ^ (-s / 2) * ∑' n : ℕ, cos (2 * π * a * n) / n ^ s` for `1 < re s`. -/ def completedCosZeta (a : UnitAddCircle) (s : ℂ) : ℂ := ((hurwitzEvenFEPair a).symm.Λ (s / 2)) / 2 /-- The entire function differing from `completedCosZeta a s` by a linear combination of `1 / s` and `1 / (1 - s)`. -/ def completedCosZeta₀ (a : UnitAddCircle) (s : ℂ) : ℂ := ((hurwitzEvenFEPair a).symm.Λ₀ (s / 2)) / 2 lemma completedCosZeta_eq (a : UnitAddCircle) (s : ℂ) : completedCosZeta a s = completedCosZeta₀ a s - 1 / s - (if a = 0 then 1 else 0) / (1 - s) := by rw [completedCosZeta, WeakFEPair.Λ, sub_div, sub_div] congr 1 · rw [completedCosZeta₀, WeakFEPair.symm, hurwitzEvenFEPair, smul_eq_mul, mul_one, div_div, div_mul_cancel₀ _ (two_ne_zero' ℂ)] · simp_rw [WeakFEPair.symm, hurwitzEvenFEPair, push_cast, inv_one, smul_eq_mul, mul_comm _ (if _ then _ else _), mul_div_assoc, div_div, ← sub_div, div_mul_cancel₀ _ (two_ne_zero' ℂ), mul_one_div] /-! ## Parity and functional equations -/ @[simp] lemma completedHurwitzZetaEven_neg (a : UnitAddCircle) (s : ℂ) : completedHurwitzZetaEven (-a) s = completedHurwitzZetaEven a s := by simp [completedHurwitzZetaEven] @[simp] lemma completedHurwitzZetaEven₀_neg (a : UnitAddCircle) (s : ℂ) : completedHurwitzZetaEven₀ (-a) s = completedHurwitzZetaEven₀ a s := by simp [completedHurwitzZetaEven₀] @[simp] lemma completedCosZeta_neg (a : UnitAddCircle) (s : ℂ) : completedCosZeta (-a) s = completedCosZeta a s := by simp [completedCosZeta] @[simp] lemma completedCosZeta₀_neg (a : UnitAddCircle) (s : ℂ) : completedCosZeta₀ (-a) s = completedCosZeta₀ a s := by simp [completedCosZeta₀] /-- Functional equation for the even Hurwitz zeta function. -/ lemma completedHurwitzZetaEven_one_sub (a : UnitAddCircle) (s : ℂ) : completedHurwitzZetaEven a (1 - s) = completedCosZeta a s := by rw [completedHurwitzZetaEven, completedCosZeta, sub_div, (by norm_num : (1 / 2 : ℂ) = ↑(1 / 2 : ℝ)), (by rfl : (1 / 2 : ℝ) = (hurwitzEvenFEPair a).k), (hurwitzEvenFEPair a).functional_equation (s / 2), (by rfl : (hurwitzEvenFEPair a).ε = 1), one_smul] /-- Functional equation for the even Hurwitz zeta function with poles removed. -/ lemma completedHurwitzZetaEven₀_one_sub (a : UnitAddCircle) (s : ℂ) : completedHurwitzZetaEven₀ a (1 - s) = completedCosZeta₀ a s := by rw [completedHurwitzZetaEven₀, completedCosZeta₀, sub_div, (by norm_num : (1 / 2 : ℂ) = ↑(1 / 2 : ℝ)),	(by rfl : (1 / 2 : ℝ) = (hurwitzEvenFEPair a).k), (hurwitzEvenFEPair a).functional_equation₀ (s / 2), (by rfl : (hurwitzEvenFEPair a).ε = 1),	Mathlib/NumberTheory/LSeries/HurwitzZetaEven.lean	376	378
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Yury Kudryashov -/ import Mathlib.Order.Filter.Tendsto import Mathlib.Data.Set.Accumulate import Mathlib.Topology.Bornology.Basic import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Ultrafilter import Mathlib.Topology.Defs.Ultrafilter /-! # Compact sets and compact spaces ## Main results * `isCompact_univ_pi`: Tychonov's theorem - an arbitrary product of compact sets is compact. -/ open Set Filter Topology TopologicalSpace Function universe u v variable {X : Type u} {Y : Type v} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} {f : X → Y} -- compact sets section Compact lemma IsCompact.exists_clusterPt (hs : IsCompact s) {f : Filter X} [NeBot f] (hf : f ≤ 𝓟 s) : ∃ x ∈ s, ClusterPt x f := hs hf lemma IsCompact.exists_mapClusterPt {ι : Type} (hs : IsCompact s) {f : Filter ι} [NeBot f] {u : ι → X} (hf : Filter.map u f ≤ 𝓟 s) : ∃ x ∈ s, MapClusterPt x f u := hs hf lemma IsCompact.exists_clusterPt_of_frequently {l : Filter X} (hs : IsCompact s) (hl : ∃ᶠ x in l, x ∈ s) : ∃ a ∈ s, ClusterPt a l := let ⟨a, has, ha⟩ := @hs _ (frequently_mem_iff_neBot.mp hl) inf_le_right ⟨a, has, ha.mono inf_le_left⟩ lemma IsCompact.exists_mapClusterPt_of_frequently {l : Filter ι} {f : ι → X} (hs : IsCompact s) (hf : ∃ᶠ x in l, f x ∈ s) : ∃ a ∈ s, MapClusterPt a l f := hs.exists_clusterPt_of_frequently hf /-- The complement to a compact set belongs to a filter `f` if it belongs to each filter `𝓝 x ⊓ f`, `x ∈ s`. -/ theorem IsCompact.compl_mem_sets (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, sᶜ ∈ 𝓝 x ⊓ f) : sᶜ ∈ f := by contrapose! hf simp only [not_mem_iff_inf_principal_compl, compl_compl, inf_assoc] at hf ⊢ exact @hs _ hf inf_le_right /-- The complement to a compact set belongs to a filter `f` if each `x ∈ s` has a neighborhood `t` within `s` such that `tᶜ` belongs to `f`. -/ theorem IsCompact.compl_mem_sets_of_nhdsWithin (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx => ?_ rcases hf x hx with ⟨t, ht, hst⟩ replace ht := mem_inf_principal.1 ht apply mem_inf_of_inter ht hst rintro x ⟨h₁, h₂⟩ hs exact h₂ (h₁ hs) /-- If `p : Set X → Prop` is stable under restriction and union, and each point `x` of a compact set `s` has a neighborhood `t` within `s` such that `p t`, then `p s` holds. -/ @[elab_as_elim] theorem IsCompact.induction_on (hs : IsCompact s) {p : Set X → Prop} (he : p ∅) (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hunion : ∀ ⦃s t⦄, p s → p t → p (s ∪ t)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := comk p he (fun _t ht _s hsub ↦ hmono hsub ht) (fun _s hs _t ht ↦ hunion hs ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] /-- The intersection of a compact set and a closed set is a compact set. -/ theorem IsCompact.inter_right (hs : IsCompact s) (ht : IsClosed t) : IsCompact (s ∩ t) := by	intro f hnf hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs (le_trans hstf (le_principal_iff.2 inter_subset_left)) have : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono <\| le_trans hstf (le_principal_iff.2 inter_subset_right) exact ⟨x, ⟨hsx, this⟩, hx⟩	Mathlib/Topology/Compactness/Compact.lean	79	85
/- 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.Logic.Equiv.Defs /-! # A type for VM-erased data This file defines a type `Erased α` which is classically isomorphic to `α`, but erased in the VM. That is, at runtime every value of `Erased α` is represented as `0`, just like types and proofs. -/ universe u /-- `Erased α` is the same as `α`, except that the elements of `Erased α` are erased in the VM in the same way as types and proofs. This can be used to track data without storing it literally. -/ def Erased (α : Sort u) : Sort max 1 u := { s : α → Prop // ∃ a, (a = ·) = s } namespace Erased /-- Erase a value. -/ @[inline] def mk {α} (a : α) : Erased α := ⟨fun b => a = b, a, rfl⟩ /-- Extracts the erased value, noncomputably. -/ noncomputable def out {α} : Erased α → α \| ⟨_, h⟩ => Classical.choose h /-- Extracts the erased value, if it is a type. Note: `(mk a).OutType` is not definitionally equal to `a`. -/ abbrev OutType (a : Erased (Sort u)) : Sort u := out a /-- Extracts the erased value, if it is a proof. -/ theorem out_proof {p : Prop} (a : Erased p) : p := out a @[simp] theorem out_mk {α} (a : α) : (mk a).out = a := by let h := (mk a).2; show Classical.choose h = a have := Classical.choose_spec h exact cast (congr_fun this a).symm rfl @[simp] theorem mk_out {α} : ∀ a : Erased α, mk (out a) = a \| ⟨s, h⟩ => by simp only [mk]; congr; exact Classical.choose_spec h @[ext] theorem out_inj {α} (a b : Erased α) (h : a.out = b.out) : a = b := by simpa using congr_arg mk h /-- Equivalence between `Erased α` and `α`. -/ noncomputable def equiv (α) : Erased α ≃ α := ⟨out, mk, mk_out, out_mk⟩ instance (α : Type u) : Repr (Erased α) := ⟨fun _ _ => "Erased"⟩ instance (α : Type u) : ToString (Erased α) := ⟨fun _ => "Erased"⟩ /-- Computably produce an erased value from a proof of nonemptiness. -/ def choice {α} (h : Nonempty α) : Erased α := mk (Classical.choice h) @[simp] theorem nonempty_iff {α} : Nonempty (Erased α) ↔ Nonempty α := ⟨fun ⟨a⟩ => ⟨a.out⟩, fun ⟨a⟩ => ⟨mk a⟩⟩ instance {α} [h : Nonempty α] : Inhabited (Erased α) := ⟨choice h⟩ /-- `(>>=)` operation on `Erased`. This is a separate definition because `α` and `β` can live in different universes (the universe is fixed in `Monad`). -/ def bind {α β} (a : Erased α) (f : α → Erased β) : Erased β := ⟨fun b => (f a.out).1 b, (f a.out).2⟩ @[simp] theorem bind_eq_out {α β} (a f) : @bind α β a f = f a.out := rfl /-- Collapses two levels of erasure. -/ def join {α} (a : Erased (Erased α)) : Erased α := bind a id @[simp] theorem join_eq_out {α} (a) : @join α a = a.out := bind_eq_out _ _ /-- `(<$>)` operation on `Erased`. This is a separate definition because `α` and `β` can live in different universes (the universe is fixed in `Functor`). -/ def map {α β} (f : α → β) (a : Erased α) : Erased β := bind a (mk ∘ f) @[simp] theorem map_out {α β} {f : α → β} (a : Erased α) : (a.map f).out = f a.out := by simp [map] protected instance Monad : Monad Erased where pure := @mk bind := @bind map := @map @[simp] theorem pure_def {α} : (pure : α → Erased α) = @mk _ := rfl @[simp] theorem bind_def {α β} : ((· >>= ·) : Erased α → (α → Erased β) → Erased β) = @bind _ _ := rfl @[simp] theorem map_def {α β} : ((· <$> ·) : (α → β) → Erased α → Erased β) = @map _ _ := rfl protected instance instLawfulMonad : LawfulMonad Erased :=	{ id_map := by intros; ext; simp	Mathlib/Data/Erased.lean	131	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, Patrick Massot -/ import Mathlib.Order.Filter.SmallSets import Mathlib.Topology.UniformSpace.Defs import Mathlib.Topology.ContinuousOn /-! # Basic results on uniform spaces Uniform spaces are a generalization of metric spaces and topological groups. ## Main definitions In this file we define a complete lattice structure on the type `UniformSpace X` of uniform structures on `X`, as well as the pullback (`UniformSpace.comap`) of uniform structures coming from the pullback of filters. Like distance functions, uniform structures cannot be pushed forward in general. ## Notations Localized in `Uniformity`, we have the notation `𝓤 X` for the uniformity on a uniform space `X`, and `○` for composition of relations, seen as terms with type `Set (X × X)`. ## References The formalization uses the books: * [N. Bourbaki, General Topology][bourbaki1966] * [I. M. James, Topologies and Uniformities][james1999] But it makes a more systematic use of the filter library. -/ open Set Filter Topology universe u v ua ub uc ud /-! ### Relations, seen as `Set (α × α)` -/ variable {α : Type ua} {β : Type ub} {γ : Type uc} {δ : Type ud} {ι : Sort} open Uniformity section UniformSpace variable [UniformSpace α] /-- If `s ∈ 𝓤 α`, then for any natural `n`, for a subset `t` of a sufficiently small set in `𝓤 α`, we have `t ○ t ○ ... ○ t ⊆ s` (`n` compositions). -/ theorem eventually_uniformity_iterate_comp_subset {s : Set (α × α)} (hs : s ∈ 𝓤 α) (n : ℕ) : ∀ᶠ t in (𝓤 α).smallSets, (t ○ ·)^[n] t ⊆ s := by suffices ∀ᶠ t in (𝓤 α).smallSets, t ⊆ s ∧ (t ○ ·)^[n] t ⊆ s from (eventually_and.1 this).2 induction n generalizing s with \| zero => simpa \| succ _ ihn => rcases comp_mem_uniformity_sets hs with ⟨t, htU, hts⟩ refine (ihn htU).mono fun U hU => ?_ rw [Function.iterate_succ_apply'] exact ⟨hU.1.trans <\| (subset_comp_self <\| refl_le_uniformity htU).trans hts, (compRel_mono hU.1 hU.2).trans hts⟩ /-- If `s ∈ 𝓤 α`, then for a subset `t` of a sufficiently small set in `𝓤 α`, we have `t ○ t ⊆ s`. -/ theorem eventually_uniformity_comp_subset {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∀ᶠ t in (𝓤 α).smallSets, t ○ t ⊆ s := eventually_uniformity_iterate_comp_subset hs 1 /-! ### Balls in uniform spaces -/ namespace UniformSpace open UniformSpace (ball) lemma isOpen_ball (x : α) {V : Set (α × α)} (hV : IsOpen V) : IsOpen (ball x V) := hV.preimage <\| .prodMk_right _ lemma isClosed_ball (x : α) {V : Set (α × α)} (hV : IsClosed V) : IsClosed (ball x V) := hV.preimage <\| .prodMk_right _ /-! ### Neighborhoods in uniform spaces -/ theorem hasBasis_nhds_prod (x y : α) : HasBasis (𝓝 (x, y)) (fun s => s ∈ 𝓤 α ∧ IsSymmetricRel s) fun s => ball x s ×ˢ ball y s := by rw [nhds_prod_eq] apply (hasBasis_nhds x).prod_same_index (hasBasis_nhds y) rintro U V ⟨U_in, U_symm⟩ ⟨V_in, V_symm⟩ exact ⟨U ∩ V, ⟨(𝓤 α).inter_sets U_in V_in, U_symm.inter V_symm⟩, ball_inter_left x U V, ball_inter_right y U V⟩ end UniformSpace open UniformSpace theorem nhds_eq_uniformity_prod {a b : α} : 𝓝 (a, b) = (𝓤 α).lift' fun s : Set (α × α) => { y : α \| (y, a) ∈ s } ×ˢ { y : α \| (b, y) ∈ s } := by rw [nhds_prod_eq, nhds_nhds_eq_uniformity_uniformity_prod, lift_lift'_same_eq_lift'] · exact fun s => monotone_const.set_prod monotone_preimage · refine fun t => Monotone.set_prod ?_ monotone_const exact monotone_preimage (f := fun y => (y, a)) theorem nhdset_of_mem_uniformity {d : Set (α × α)} (s : Set (α × α)) (hd : d ∈ 𝓤 α) : ∃ t : Set (α × α), IsOpen t ∧ s ⊆ t ∧ t ⊆ { p \| ∃ x y, (p.1, x) ∈ d ∧ (x, y) ∈ s ∧ (y, p.2) ∈ d } := by let cl_d := { p : α × α \| ∃ x y, (p.1, x) ∈ d ∧ (x, y) ∈ s ∧ (y, p.2) ∈ d } have : ∀ p ∈ s, ∃ t, t ⊆ cl_d ∧ IsOpen t ∧ p ∈ t := fun ⟨x, y⟩ hp => mem_nhds_iff.mp <\| show cl_d ∈ 𝓝 (x, y) by rw [nhds_eq_uniformity_prod, mem_lift'_sets] · exact ⟨d, hd, fun ⟨a, b⟩ ⟨ha, hb⟩ => ⟨x, y, ha, hp, hb⟩⟩ · exact fun _ _ h _ h' => ⟨h h'.1, h h'.2⟩ choose t ht using this exact ⟨(⋃ p : α × α, ⋃ h : p ∈ s, t p h : Set (α × α)), isOpen_iUnion fun p : α × α => isOpen_iUnion fun hp => (ht p hp).right.left, fun ⟨a, b⟩ hp => by simp only [mem_iUnion, Prod.exists]; exact ⟨a, b, hp, (ht (a, b) hp).right.right⟩, iUnion_subset fun p => iUnion_subset fun hp => (ht p hp).left⟩ /-- Entourages are neighborhoods of the diagonal. -/ theorem nhds_le_uniformity (x : α) : 𝓝 (x, x) ≤ 𝓤 α := by intro V V_in rcases comp_symm_mem_uniformity_sets V_in with ⟨w, w_in, w_symm, w_sub⟩ have : ball x w ×ˢ ball x w ∈ 𝓝 (x, x) := by rw [nhds_prod_eq] exact prod_mem_prod (ball_mem_nhds x w_in) (ball_mem_nhds x w_in) apply mem_of_superset this rintro ⟨u, v⟩ ⟨u_in, v_in⟩ exact w_sub (mem_comp_of_mem_ball w_symm u_in v_in) /-- Entourages are neighborhoods of the diagonal. -/ theorem iSup_nhds_le_uniformity : ⨆ x : α, 𝓝 (x, x) ≤ 𝓤 α := iSup_le nhds_le_uniformity /-- Entourages are neighborhoods of the diagonal. -/ theorem nhdsSet_diagonal_le_uniformity : 𝓝ˢ (diagonal α) ≤ 𝓤 α := (nhdsSet_diagonal α).trans_le iSup_nhds_le_uniformity section variable (α) theorem UniformSpace.has_seq_basis [IsCountablyGenerated <\| 𝓤 α] : ∃ V : ℕ → Set (α × α), HasAntitoneBasis (𝓤 α) V ∧ ∀ n, IsSymmetricRel (V n) := let ⟨U, hsym, hbasis⟩ := (@UniformSpace.hasBasis_symmetric α _).exists_antitone_subbasis ⟨U, hbasis, fun n => (hsym n).2⟩ end /-! ### Closure and interior in uniform spaces -/ theorem closure_eq_uniformity (s : Set <\| α × α) : closure s = ⋂ V ∈ { V \| V ∈ 𝓤 α ∧ IsSymmetricRel V }, V ○ s ○ V := by ext ⟨x, y⟩ simp +contextual only [mem_closure_iff_nhds_basis (UniformSpace.hasBasis_nhds_prod x y), mem_iInter, mem_setOf_eq, and_imp, mem_comp_comp, exists_prop, ← mem_inter_iff, inter_comm, Set.Nonempty] theorem uniformity_hasBasis_closed : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α ∧ IsClosed V) id := by refine Filter.hasBasis_self.2 fun t h => ?_ rcases comp_comp_symm_mem_uniformity_sets h with ⟨w, w_in, w_symm, r⟩ refine ⟨closure w, mem_of_superset w_in subset_closure, isClosed_closure, ?_⟩ refine Subset.trans ?_ r rw [closure_eq_uniformity] apply iInter_subset_of_subset apply iInter_subset exact ⟨w_in, w_symm⟩ theorem uniformity_eq_uniformity_closure : 𝓤 α = (𝓤 α).lift' closure := Eq.symm <\| uniformity_hasBasis_closed.lift'_closure_eq_self fun _ => And.right theorem Filter.HasBasis.uniformity_closure {p : ι → Prop} {U : ι → Set (α × α)} (h : (𝓤 α).HasBasis p U) : (𝓤 α).HasBasis p fun i => closure (U i) := (@uniformity_eq_uniformity_closure α _).symm ▸ h.lift'_closure /-- Closed entourages form a basis of the uniformity filter. -/ theorem uniformity_hasBasis_closure : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α) closure := (𝓤 α).basis_sets.uniformity_closure theorem closure_eq_inter_uniformity {t : Set (α × α)} : closure t = ⋂ d ∈ 𝓤 α, d ○ (t ○ d) := calc closure t = ⋂ (V) (_ : V ∈ 𝓤 α ∧ IsSymmetricRel V), V ○ t ○ V := closure_eq_uniformity t _ = ⋂ V ∈ 𝓤 α, V ○ t ○ V := Eq.symm <\| UniformSpace.hasBasis_symmetric.biInter_mem fun _ _ hV => compRel_mono (compRel_mono hV Subset.rfl) hV _ = ⋂ V ∈ 𝓤 α, V ○ (t ○ V) := by simp only [compRel_assoc] theorem uniformity_eq_uniformity_interior : 𝓤 α = (𝓤 α).lift' interior := le_antisymm (le_iInf₂ fun d hd => by let ⟨s, hs, hs_comp⟩ := comp3_mem_uniformity hd let ⟨t, ht, hst, ht_comp⟩ := nhdset_of_mem_uniformity s hs have : s ⊆ interior d := calc s ⊆ t := hst _ ⊆ interior d := ht.subset_interior_iff.mpr fun x (hx : x ∈ t) => let ⟨x, y, h₁, h₂, h₃⟩ := ht_comp hx hs_comp ⟨x, h₁, y, h₂, h₃⟩ have : interior d ∈ 𝓤 α := by filter_upwards [hs] using this simp [this]) fun _ hs => ((𝓤 α).lift' interior).sets_of_superset (mem_lift' hs) interior_subset theorem interior_mem_uniformity {s : Set (α × α)} (hs : s ∈ 𝓤 α) : interior s ∈ 𝓤 α := by rw [uniformity_eq_uniformity_interior]; exact mem_lift' hs theorem mem_uniformity_isClosed {s : Set (α × α)} (h : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, IsClosed t ∧ t ⊆ s := let ⟨t, ⟨ht_mem, htc⟩, hts⟩ := uniformity_hasBasis_closed.mem_iff.1 h ⟨t, ht_mem, htc, hts⟩ theorem isOpen_iff_isOpen_ball_subset {s : Set α} : IsOpen s ↔ ∀ x ∈ s, ∃ V ∈ 𝓤 α, IsOpen V ∧ ball x V ⊆ s := by rw [isOpen_iff_ball_subset] constructor <;> intro h x hx · obtain ⟨V, hV, hV'⟩ := h x hx exact ⟨interior V, interior_mem_uniformity hV, isOpen_interior, (ball_mono interior_subset x).trans hV'⟩ · obtain ⟨V, hV, -, hV'⟩ := h x hx exact ⟨V, hV, hV'⟩ @[deprecated (since := "2024-11-18")] alias isOpen_iff_open_ball_subset := isOpen_iff_isOpen_ball_subset /-- The uniform neighborhoods of all points of a dense set cover the whole space. -/ theorem Dense.biUnion_uniformity_ball {s : Set α} {U : Set (α × α)} (hs : Dense s) (hU : U ∈ 𝓤 α) : ⋃ x ∈ s, ball x U = univ := by refine iUnion₂_eq_univ_iff.2 fun y => ?_ rcases hs.inter_nhds_nonempty (mem_nhds_right y hU) with ⟨x, hxs, hxy : (x, y) ∈ U⟩ exact ⟨x, hxs, hxy⟩ /-- The uniform neighborhoods of all points of a dense indexed collection cover the whole space. -/ lemma DenseRange.iUnion_uniformity_ball {ι : Type} {xs : ι → α} (xs_dense : DenseRange xs) {U : Set (α × α)} (hU : U ∈ uniformity α) : ⋃ i, UniformSpace.ball (xs i) U = univ := by rw [← biUnion_range (f := xs) (g := fun x ↦ UniformSpace.ball x U)] exact Dense.biUnion_uniformity_ball xs_dense hU /-! ### Uniformity bases -/ /-- Open elements of `𝓤 α` form a basis of `𝓤 α`. -/ theorem uniformity_hasBasis_open : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α ∧ IsOpen V) id := hasBasis_self.2 fun s hs => ⟨interior s, interior_mem_uniformity hs, isOpen_interior, interior_subset⟩ theorem Filter.HasBasis.mem_uniformity_iff {p : β → Prop} {s : β → Set (α × α)} (h : (𝓤 α).HasBasis p s) {t : Set (α × α)} : t ∈ 𝓤 α ↔ ∃ i, p i ∧ ∀ a b, (a, b) ∈ s i → (a, b) ∈ t := h.mem_iff.trans <\| by simp only [Prod.forall, subset_def] /-- Open elements `s : Set (α × α)` of `𝓤 α` such that `(x, y) ∈ s ↔ (y, x) ∈ s` form a basis of `𝓤 α`. -/ theorem uniformity_hasBasis_open_symmetric : HasBasis (𝓤 α) (fun V : Set (α × α) => V ∈ 𝓤 α ∧ IsOpen V ∧ IsSymmetricRel V) id := by simp only [← and_assoc] refine uniformity_hasBasis_open.restrict fun s hs => ⟨symmetrizeRel s, ?_⟩ exact ⟨⟨symmetrize_mem_uniformity hs.1, IsOpen.inter hs.2 (hs.2.preimage continuous_swap)⟩, symmetric_symmetrizeRel s, symmetrizeRel_subset_self s⟩ theorem comp_open_symm_mem_uniformity_sets {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, IsOpen t ∧ IsSymmetricRel t ∧ t ○ t ⊆ s := by obtain ⟨t, ht₁, ht₂⟩ := comp_mem_uniformity_sets hs obtain ⟨u, ⟨hu₁, hu₂, hu₃⟩, hu₄ : u ⊆ t⟩ := uniformity_hasBasis_open_symmetric.mem_iff.mp ht₁ exact ⟨u, hu₁, hu₂, hu₃, (compRel_mono hu₄ hu₄).trans ht₂⟩ end UniformSpace open uniformity section Constructions instance : PartialOrder (UniformSpace α) := PartialOrder.lift (fun u => 𝓤[u]) fun _ _ => UniformSpace.ext protected theorem UniformSpace.le_def {u₁ u₂ : UniformSpace α} : u₁ ≤ u₂ ↔ 𝓤[u₁] ≤ 𝓤[u₂] := Iff.rfl instance : InfSet (UniformSpace α) := ⟨fun s => UniformSpace.ofCore { uniformity := ⨅ u ∈ s, 𝓤[u] refl := le_iInf fun u => le_iInf fun _ => u.toCore.refl symm := le_iInf₂ fun u hu => le_trans (map_mono <\| iInf_le_of_le _ <\| iInf_le _ hu) u.symm comp := le_iInf₂ fun u hu => le_trans (lift'_mono (iInf_le_of_le _ <\| iInf_le _ hu) <\| le_rfl) u.comp }⟩ protected theorem UniformSpace.sInf_le {tt : Set (UniformSpace α)} {t : UniformSpace α} (h : t ∈ tt) : sInf tt ≤ t := show ⨅ u ∈ tt, 𝓤[u] ≤ 𝓤[t] from iInf₂_le t h protected theorem UniformSpace.le_sInf {tt : Set (UniformSpace α)} {t : UniformSpace α} (h : ∀ t' ∈ tt, t ≤ t') : t ≤ sInf tt := show 𝓤[t] ≤ ⨅ u ∈ tt, 𝓤[u] from le_iInf₂ h instance : Top (UniformSpace α) := ⟨@UniformSpace.mk α ⊤ ⊤ le_top le_top fun x ↦ by simp only [nhds_top, comap_top]⟩ instance : Bot (UniformSpace α) := ⟨{ toTopologicalSpace := ⊥ uniformity := 𝓟 idRel symm := by simp [Tendsto] comp := lift'_le (mem_principal_self _) <\| principal_mono.2 id_compRel.subset nhds_eq_comap_uniformity := fun s => by let _ : TopologicalSpace α := ⊥; have := discreteTopology_bot α simp [idRel] }⟩ instance : Min (UniformSpace α) := ⟨fun u₁ u₂ => { uniformity := 𝓤[u₁] ⊓ 𝓤[u₂] symm := u₁.symm.inf u₂.symm comp := (lift'_inf_le _ _ _).trans <\| inf_le_inf u₁.comp u₂.comp toTopologicalSpace := u₁.toTopologicalSpace ⊓ u₂.toTopologicalSpace nhds_eq_comap_uniformity := fun _ ↦ by rw [@nhds_inf _ u₁.toTopologicalSpace _, @nhds_eq_comap_uniformity _ u₁, @nhds_eq_comap_uniformity _ u₂, comap_inf] }⟩ instance : CompleteLattice (UniformSpace α) := { inferInstanceAs (PartialOrder (UniformSpace α)) with sup := fun a b => sInf { x \| a ≤ x ∧ b ≤ x } le_sup_left := fun _ _ => UniformSpace.le_sInf fun _ ⟨h, _⟩ => h le_sup_right := fun _ _ => UniformSpace.le_sInf fun _ ⟨_, h⟩ => h sup_le := fun _ _ _ h₁ h₂ => UniformSpace.sInf_le ⟨h₁, h₂⟩ inf := (· ⊓ ·) le_inf := fun a _ _ h₁ h₂ => show a.uniformity ≤ _ from le_inf h₁ h₂ inf_le_left := fun a _ => show _ ≤ a.uniformity from inf_le_left inf_le_right := fun _ b => show _ ≤ b.uniformity from inf_le_right top := ⊤ le_top := fun a => show a.uniformity ≤ ⊤ from le_top bot := ⊥ bot_le := fun u => u.toCore.refl sSup := fun tt => sInf { t \| ∀ t' ∈ tt, t' ≤ t } le_sSup := fun _ _ h => UniformSpace.le_sInf fun _ h' => h' _ h sSup_le := fun _ _ h => UniformSpace.sInf_le h sInf := sInf le_sInf := fun _ _ hs => UniformSpace.le_sInf hs sInf_le := fun _ _ ha => UniformSpace.sInf_le ha } theorem iInf_uniformity {ι : Sort} {u : ι → UniformSpace α} : 𝓤[iInf u] = ⨅ i, 𝓤[u i] := iInf_range theorem inf_uniformity {u v : UniformSpace α} : 𝓤[u ⊓ v] = 𝓤[u] ⊓ 𝓤[v] := rfl lemma bot_uniformity : 𝓤[(⊥ : UniformSpace α)] = 𝓟 idRel := rfl lemma top_uniformity : 𝓤[(⊤ : UniformSpace α)] = ⊤ := rfl instance inhabitedUniformSpace : Inhabited (UniformSpace α) := ⟨⊥⟩ instance inhabitedUniformSpaceCore : Inhabited (UniformSpace.Core α) := ⟨@UniformSpace.toCore _ default⟩ instance [Subsingleton α] : Unique (UniformSpace α) where uniq u := bot_unique <\| le_principal_iff.2 <\| by rw [idRel, ← diagonal, diagonal_eq_univ]; exact univ_mem /-- Given `f : α → β` and a uniformity `u` on `β`, the inverse image of `u` under `f` is the inverse image in the filter sense of the induced function `α × α → β × β`. See note [reducible non-instances]. -/ abbrev UniformSpace.comap (f : α → β) (u : UniformSpace β) : UniformSpace α where uniformity := 𝓤[u].comap fun p : α × α => (f p.1, f p.2) symm := by simp only [tendsto_comap_iff, Prod.swap, (· ∘ ·)] exact tendsto_swap_uniformity.comp tendsto_comap comp := le_trans (by rw [comap_lift'_eq, comap_lift'_eq2] · exact lift'_mono' fun s _ ⟨a₁, a₂⟩ ⟨x, h₁, h₂⟩ => ⟨f x, h₁, h₂⟩ · exact monotone_id.compRel monotone_id) (comap_mono u.comp) toTopologicalSpace := u.toTopologicalSpace.induced f nhds_eq_comap_uniformity x := by simp only [nhds_induced, nhds_eq_comap_uniformity, comap_comap, Function.comp_def] theorem uniformity_comap {_ : UniformSpace β} (f : α → β) : 𝓤[UniformSpace.comap f ‹_›] = comap (Prod.map f f) (𝓤 β) := rfl lemma ball_preimage {f : α → β} {U : Set (β × β)} {x : α} : UniformSpace.ball x (Prod.map f f ⁻¹' U) = f ⁻¹' UniformSpace.ball (f x) U := by ext : 1 simp only [UniformSpace.ball, mem_preimage, Prod.map_apply] @[simp] theorem uniformSpace_comap_id {α : Type} : UniformSpace.comap (id : α → α) = id := by ext : 2 rw [uniformity_comap, Prod.map_id, comap_id] theorem UniformSpace.comap_comap {α β γ} {uγ : UniformSpace γ} {f : α → β} {g : β → γ} : UniformSpace.comap (g ∘ f) uγ = UniformSpace.comap f (UniformSpace.comap g uγ) := by ext1 simp only [uniformity_comap, Filter.comap_comap, Prod.map_comp_map] theorem UniformSpace.comap_inf {α γ} {u₁ u₂ : UniformSpace γ} {f : α → γ} : (u₁ ⊓ u₂).comap f = u₁.comap f ⊓ u₂.comap f := UniformSpace.ext Filter.comap_inf theorem UniformSpace.comap_iInf {ι α γ} {u : ι → UniformSpace γ} {f : α → γ} : (⨅ i, u i).comap f = ⨅ i, (u i).comap f := by ext : 1 simp [uniformity_comap, iInf_uniformity] theorem UniformSpace.comap_mono {α γ} {f : α → γ} : Monotone fun u : UniformSpace γ => u.comap f := fun _ _ hu => Filter.comap_mono hu theorem uniformContinuous_iff {α β} {uα : UniformSpace α} {uβ : UniformSpace β} {f : α → β} : UniformContinuous f ↔ uα ≤ uβ.comap f := Filter.map_le_iff_le_comap theorem le_iff_uniformContinuous_id {u v : UniformSpace α} : u ≤ v ↔ @UniformContinuous _ _ u v id := by rw [uniformContinuous_iff, uniformSpace_comap_id, id] theorem uniformContinuous_comap {f : α → β} [u : UniformSpace β] : @UniformContinuous α β (UniformSpace.comap f u) u f := tendsto_comap theorem uniformContinuous_comap' {f : γ → β} {g : α → γ} [v : UniformSpace β] [u : UniformSpace α] (h : UniformContinuous (f ∘ g)) : @UniformContinuous α γ u (UniformSpace.comap f v) g := tendsto_comap_iff.2 h namespace UniformSpace theorem to_nhds_mono {u₁ u₂ : UniformSpace α} (h : u₁ ≤ u₂) (a : α) : @nhds _ (@UniformSpace.toTopologicalSpace _ u₁) a ≤ @nhds _ (@UniformSpace.toTopologicalSpace _ u₂) a := by rw [@nhds_eq_uniformity α u₁ a, @nhds_eq_uniformity α u₂ a]; exact lift'_mono h le_rfl theorem toTopologicalSpace_mono {u₁ u₂ : UniformSpace α} (h : u₁ ≤ u₂) : @UniformSpace.toTopologicalSpace _ u₁ ≤ @UniformSpace.toTopologicalSpace _ u₂ := le_of_nhds_le_nhds <\| to_nhds_mono h theorem toTopologicalSpace_comap {f : α → β} {u : UniformSpace β} : @UniformSpace.toTopologicalSpace _ (UniformSpace.comap f u) = TopologicalSpace.induced f (@UniformSpace.toTopologicalSpace β u) := rfl lemma uniformSpace_eq_bot {u : UniformSpace α} : u = ⊥ ↔ idRel ∈ 𝓤[u] := le_bot_iff.symm.trans le_principal_iff protected lemma _root_.Filter.HasBasis.uniformSpace_eq_bot {ι p} {s : ι → Set (α × α)} {u : UniformSpace α} (h : 𝓤[u].HasBasis p s) : u = ⊥ ↔ ∃ i, p i ∧ Pairwise fun x y : α ↦ (x, y) ∉ s i := by simp [uniformSpace_eq_bot, h.mem_iff, subset_def, Pairwise, not_imp_not] theorem toTopologicalSpace_bot : @UniformSpace.toTopologicalSpace α ⊥ = ⊥ := rfl theorem toTopologicalSpace_top : @UniformSpace.toTopologicalSpace α ⊤ = ⊤ := rfl theorem toTopologicalSpace_iInf {ι : Sort} {u : ι → UniformSpace α} : (iInf u).toTopologicalSpace = ⨅ i, (u i).toTopologicalSpace := TopologicalSpace.ext_nhds fun a ↦ by simp only [@nhds_eq_comap_uniformity _ (iInf u), nhds_iInf, iInf_uniformity, @nhds_eq_comap_uniformity _ (u _), Filter.comap_iInf] theorem toTopologicalSpace_sInf {s : Set (UniformSpace α)} : (sInf s).toTopologicalSpace = ⨅ i ∈ s, @UniformSpace.toTopologicalSpace α i := by rw [sInf_eq_iInf] simp only [← toTopologicalSpace_iInf] theorem toTopologicalSpace_inf {u v : UniformSpace α} : (u ⊓ v).toTopologicalSpace = u.toTopologicalSpace ⊓ v.toTopologicalSpace := rfl end UniformSpace theorem UniformContinuous.continuous [UniformSpace α] [UniformSpace β] {f : α → β} (hf : UniformContinuous f) : Continuous f := continuous_iff_le_induced.mpr <\| UniformSpace.toTopologicalSpace_mono <\| uniformContinuous_iff.1 hf /-- Uniform space structure on `ULift α`. -/ instance ULift.uniformSpace [UniformSpace α] : UniformSpace (ULift α) := UniformSpace.comap ULift.down ‹_› /-- Uniform space structure on `αᵒᵈ`. -/ instance OrderDual.instUniformSpace [UniformSpace α] : UniformSpace (αᵒᵈ) := ‹UniformSpace α› section UniformContinuousInfi -- TODO: add an `iff` lemma? theorem UniformContinuous.inf_rng {f : α → β} {u₁ : UniformSpace α} {u₂ u₃ : UniformSpace β} (h₁ : UniformContinuous[u₁, u₂] f) (h₂ : UniformContinuous[u₁, u₃] f) : UniformContinuous[u₁, u₂ ⊓ u₃] f := tendsto_inf.mpr ⟨h₁, h₂⟩ theorem UniformContinuous.inf_dom_left {f : α → β} {u₁ u₂ : UniformSpace α} {u₃ : UniformSpace β} (hf : UniformContinuous[u₁, u₃] f) : UniformContinuous[u₁ ⊓ u₂, u₃] f := tendsto_inf_left hf theorem UniformContinuous.inf_dom_right {f : α → β} {u₁ u₂ : UniformSpace α} {u₃ : UniformSpace β} (hf : UniformContinuous[u₂, u₃] f) : UniformContinuous[u₁ ⊓ u₂, u₃] f := tendsto_inf_right hf theorem uniformContinuous_sInf_dom {f : α → β} {u₁ : Set (UniformSpace α)} {u₂ : UniformSpace β} {u : UniformSpace α} (h₁ : u ∈ u₁) (hf : UniformContinuous[u, u₂] f) : UniformContinuous[sInf u₁, u₂] f := by delta UniformContinuous rw [sInf_eq_iInf', iInf_uniformity] exact tendsto_iInf' ⟨u, h₁⟩ hf theorem uniformContinuous_sInf_rng {f : α → β} {u₁ : UniformSpace α} {u₂ : Set (UniformSpace β)} : UniformContinuous[u₁, sInf u₂] f ↔ ∀ u ∈ u₂, UniformContinuous[u₁, u] f := by delta UniformContinuous rw [sInf_eq_iInf', iInf_uniformity, tendsto_iInf, SetCoe.forall] theorem uniformContinuous_iInf_dom {f : α → β} {u₁ : ι → UniformSpace α} {u₂ : UniformSpace β} {i : ι} (hf : UniformContinuous[u₁ i, u₂] f) : UniformContinuous[iInf u₁, u₂] f := by delta UniformContinuous rw [iInf_uniformity] exact tendsto_iInf' i hf theorem uniformContinuous_iInf_rng {f : α → β} {u₁ : UniformSpace α} {u₂ : ι → UniformSpace β} : UniformContinuous[u₁, iInf u₂] f ↔ ∀ i, UniformContinuous[u₁, u₂ i] f := by delta UniformContinuous rw [iInf_uniformity, tendsto_iInf] end UniformContinuousInfi /-- A uniform space with the discrete uniformity has the discrete topology. -/ theorem discreteTopology_of_discrete_uniformity [hα : UniformSpace α] (h : uniformity α = 𝓟 idRel) : DiscreteTopology α := ⟨(UniformSpace.ext h.symm : ⊥ = hα) ▸ rfl⟩ instance : UniformSpace Empty := ⊥ instance : UniformSpace PUnit := ⊥ instance : UniformSpace Bool := ⊥ instance : UniformSpace ℕ := ⊥ instance : UniformSpace ℤ := ⊥ section variable [UniformSpace α] open Additive Multiplicative instance : UniformSpace (Additive α) := ‹UniformSpace α› instance : UniformSpace (Multiplicative α) := ‹UniformSpace α› theorem uniformContinuous_ofMul : UniformContinuous (ofMul : α → Additive α) := uniformContinuous_id theorem uniformContinuous_toMul : UniformContinuous (toMul : Additive α → α) := uniformContinuous_id theorem uniformContinuous_ofAdd : UniformContinuous (ofAdd : α → Multiplicative α) := uniformContinuous_id theorem uniformContinuous_toAdd : UniformContinuous (toAdd : Multiplicative α → α) := uniformContinuous_id theorem uniformity_additive : 𝓤 (Additive α) = (𝓤 α).map (Prod.map ofMul ofMul) := rfl theorem uniformity_multiplicative : 𝓤 (Multiplicative α) = (𝓤 α).map (Prod.map ofAdd ofAdd) := rfl end instance instUniformSpaceSubtype {p : α → Prop} [t : UniformSpace α] : UniformSpace (Subtype p) := UniformSpace.comap Subtype.val t theorem uniformity_subtype {p : α → Prop} [UniformSpace α] : 𝓤 (Subtype p) = comap (fun q : Subtype p × Subtype p => (q.1.1, q.2.1)) (𝓤 α) := rfl theorem uniformity_setCoe {s : Set α} [UniformSpace α] : 𝓤 s = comap (Prod.map ((↑) : s → α) ((↑) : s → α)) (𝓤 α) := rfl theorem map_uniformity_set_coe {s : Set α} [UniformSpace α] : map (Prod.map (↑) (↑)) (𝓤 s) = 𝓤 α ⊓ 𝓟 (s ×ˢ s) := by rw [uniformity_setCoe, map_comap, range_prodMap, Subtype.range_val] theorem uniformContinuous_subtype_val {p : α → Prop} [UniformSpace α] : UniformContinuous (Subtype.val : { a : α // p a } → α) := uniformContinuous_comap theorem UniformContinuous.subtype_mk {p : α → Prop} [UniformSpace α] [UniformSpace β] {f : β → α} (hf : UniformContinuous f) (h : ∀ x, p (f x)) : UniformContinuous (fun x => ⟨f x, h x⟩ : β → Subtype p) := uniformContinuous_comap' hf theorem uniformContinuousOn_iff_restrict [UniformSpace α] [UniformSpace β] {f : α → β} {s : Set α} : UniformContinuousOn f s ↔ UniformContinuous (s.restrict f) := by delta UniformContinuousOn UniformContinuous rw [← map_uniformity_set_coe, tendsto_map'_iff]; rfl theorem tendsto_of_uniformContinuous_subtype [UniformSpace α] [UniformSpace β] {f : α → β} {s : Set α} {a : α} (hf : UniformContinuous fun x : s => f x.val) (ha : s ∈ 𝓝 a) : Tendsto f (𝓝 a) (𝓝 (f a)) := by rw [(@map_nhds_subtype_coe_eq_nhds α _ s a (mem_of_mem_nhds ha) ha).symm] exact tendsto_map' hf.continuous.continuousAt theorem UniformContinuousOn.continuousOn [UniformSpace α] [UniformSpace β] {f : α → β} {s : Set α} (h : UniformContinuousOn f s) : ContinuousOn f s := by rw [uniformContinuousOn_iff_restrict] at h rw [continuousOn_iff_continuous_restrict] exact h.continuous @[to_additive] instance [UniformSpace α] : UniformSpace αᵐᵒᵖ := UniformSpace.comap MulOpposite.unop ‹_› @[to_additive] theorem uniformity_mulOpposite [UniformSpace α] : 𝓤 αᵐᵒᵖ = comap (fun q : αᵐᵒᵖ × αᵐᵒᵖ => (q.1.unop, q.2.unop)) (𝓤 α) := rfl @[to_additive (attr := simp)] theorem comap_uniformity_mulOpposite [UniformSpace α] : comap (fun p : α × α => (MulOpposite.op p.1, MulOpposite.op p.2)) (𝓤 αᵐᵒᵖ) = 𝓤 α := by simpa [uniformity_mulOpposite, comap_comap, (· ∘ ·)] using comap_id namespace MulOpposite @[to_additive] theorem uniformContinuous_unop [UniformSpace α] : UniformContinuous (unop : αᵐᵒᵖ → α) := uniformContinuous_comap @[to_additive] theorem uniformContinuous_op [UniformSpace α] : UniformContinuous (op : α → αᵐᵒᵖ) := uniformContinuous_comap' uniformContinuous_id end MulOpposite section Prod open UniformSpace /- a similar product space is possible on the function space (uniformity of pointwise convergence), but we want to have the uniformity of uniform convergence on function spaces -/ instance instUniformSpaceProd [u₁ : UniformSpace α] [u₂ : UniformSpace β] : UniformSpace (α × β) := u₁.comap Prod.fst ⊓ u₂.comap Prod.snd -- check the above produces no diamond for `simp` and typeclass search example [UniformSpace α] [UniformSpace β] : (instTopologicalSpaceProd : TopologicalSpace (α × β)) = UniformSpace.toTopologicalSpace := by with_reducible_and_instances rfl theorem uniformity_prod [UniformSpace α] [UniformSpace β] : 𝓤 (α × β) = ((𝓤 α).comap fun p : (α × β) × α × β => (p.1.1, p.2.1)) ⊓ (𝓤 β).comap fun p : (α × β) × α × β => (p.1.2, p.2.2) := rfl instance [UniformSpace α] [IsCountablyGenerated (𝓤 α)] [UniformSpace β] [IsCountablyGenerated (𝓤 β)] : IsCountablyGenerated (𝓤 (α × β)) := by rw [uniformity_prod] infer_instance theorem uniformity_prod_eq_comap_prod [UniformSpace α] [UniformSpace β] : 𝓤 (α × β) = comap (fun p : (α × β) × α × β => ((p.1.1, p.2.1), (p.1.2, p.2.2))) (𝓤 α ×ˢ 𝓤 β) := by simp_rw [uniformity_prod, prod_eq_inf, Filter.comap_inf, Filter.comap_comap, Function.comp_def] theorem uniformity_prod_eq_prod [UniformSpace α] [UniformSpace β] : 𝓤 (α × β) = map (fun p : (α × α) × β × β => ((p.1.1, p.2.1), (p.1.2, p.2.2))) (𝓤 α ×ˢ 𝓤 β) := by rw [map_swap4_eq_comap, uniformity_prod_eq_comap_prod] theorem mem_uniformity_of_uniformContinuous_invariant [UniformSpace α] [UniformSpace β] {s : Set (β × β)} {f : α → α → β} (hf : UniformContinuous fun p : α × α => f p.1 p.2) (hs : s ∈ 𝓤 β) : ∃ u ∈ 𝓤 α, ∀ a b c, (a, b) ∈ u → (f a c, f b c) ∈ s := by rw [UniformContinuous, uniformity_prod_eq_prod, tendsto_map'_iff] at hf rcases mem_prod_iff.1 (mem_map.1 <\| hf hs) with ⟨u, hu, v, hv, huvt⟩ exact ⟨u, hu, fun a b c hab => @huvt ((_, _), (_, _)) ⟨hab, refl_mem_uniformity hv⟩⟩ /-- An entourage of the diagonal in `α` and an entourage in `β` yield an entourage in `α × β` once we permute coordinates. -/ def entourageProd (u : Set (α × α)) (v : Set (β × β)) : Set ((α × β) × α × β) := {((a₁, b₁),(a₂, b₂)) \| (a₁, a₂) ∈ u ∧ (b₁, b₂) ∈ v} theorem mem_entourageProd {u : Set (α × α)} {v : Set (β × β)} {p : (α × β) × α × β} : p ∈ entourageProd u v ↔ (p.1.1, p.2.1) ∈ u ∧ (p.1.2, p.2.2) ∈ v := Iff.rfl theorem entourageProd_mem_uniformity [t₁ : UniformSpace α] [t₂ : UniformSpace β] {u : Set (α × α)} {v : Set (β × β)} (hu : u ∈ 𝓤 α) (hv : v ∈ 𝓤 β) : entourageProd u v ∈ 𝓤 (α × β) := by rw [uniformity_prod]; exact inter_mem_inf (preimage_mem_comap hu) (preimage_mem_comap hv) theorem ball_entourageProd (u : Set (α × α)) (v : Set (β × β)) (x : α × β) : ball x (entourageProd u v) = ball x.1 u ×ˢ ball x.2 v := by ext p; simp only [ball, entourageProd, Set.mem_setOf_eq, Set.mem_prod, Set.mem_preimage] lemma IsSymmetricRel.entourageProd {u : Set (α × α)} {v : Set (β × β)} (hu : IsSymmetricRel u) (hv : IsSymmetricRel v) : IsSymmetricRel (entourageProd u v) := Set.ext fun _ ↦ and_congr hu.mk_mem_comm hv.mk_mem_comm theorem Filter.HasBasis.uniformity_prod {ιa ιb : Type} [UniformSpace α] [UniformSpace β] {pa : ιa → Prop} {pb : ιb → Prop} {sa : ιa → Set (α × α)} {sb : ιb → Set (β × β)} (ha : (𝓤 α).HasBasis pa sa) (hb : (𝓤 β).HasBasis pb sb) : (𝓤 (α × β)).HasBasis (fun i : ιa × ιb ↦ pa i.1 ∧ pb i.2) (fun i ↦ entourageProd (sa i.1) (sb i.2)) := (ha.comap _).inf (hb.comap _) theorem entourageProd_subset [UniformSpace α] [UniformSpace β] {s : Set ((α × β) × α × β)} (h : s ∈ 𝓤 (α × β)) : ∃ u ∈ 𝓤 α, ∃ v ∈ 𝓤 β, entourageProd u v ⊆ s := by rcases (((𝓤 α).basis_sets.uniformity_prod (𝓤 β).basis_sets).mem_iff' s).1 h with ⟨w, hw⟩ use w.1, hw.1.1, w.2, hw.1.2, hw.2 theorem tendsto_prod_uniformity_fst [UniformSpace α] [UniformSpace β] : Tendsto (fun p : (α × β) × α × β => (p.1.1, p.2.1)) (𝓤 (α × β)) (𝓤 α) := le_trans (map_mono inf_le_left) map_comap_le theorem tendsto_prod_uniformity_snd [UniformSpace α] [UniformSpace β] : Tendsto (fun p : (α × β) × α × β => (p.1.2, p.2.2)) (𝓤 (α × β)) (𝓤 β) := le_trans (map_mono inf_le_right) map_comap_le theorem uniformContinuous_fst [UniformSpace α] [UniformSpace β] : UniformContinuous fun p : α × β => p.1 := tendsto_prod_uniformity_fst theorem uniformContinuous_snd [UniformSpace α] [UniformSpace β] : UniformContinuous fun p : α × β => p.2 := tendsto_prod_uniformity_snd variable [UniformSpace α] [UniformSpace β] [UniformSpace γ] theorem UniformContinuous.prodMk {f₁ : α → β} {f₂ : α → γ} (h₁ : UniformContinuous f₁) (h₂ : UniformContinuous f₂) : UniformContinuous fun a => (f₁ a, f₂ a) := by rw [UniformContinuous, uniformity_prod] exact tendsto_inf.2 ⟨tendsto_comap_iff.2 h₁, tendsto_comap_iff.2 h₂⟩ @[deprecated (since := "2025-03-10")] alias UniformContinuous.prod_mk := UniformContinuous.prodMk theorem UniformContinuous.prodMk_left {f : α × β → γ} (h : UniformContinuous f) (b) : UniformContinuous fun a => f (a, b) := h.comp (uniformContinuous_id.prodMk uniformContinuous_const) @[deprecated (since := "2025-03-10")] alias UniformContinuous.prod_mk_left := UniformContinuous.prodMk_left theorem UniformContinuous.prodMk_right {f : α × β → γ} (h : UniformContinuous f) (a) : UniformContinuous fun b => f (a, b) := h.comp (uniformContinuous_const.prodMk uniformContinuous_id) @[deprecated (since := "2025-03-10")] alias UniformContinuous.prod_mk_right := UniformContinuous.prodMk_right theorem UniformContinuous.prodMap [UniformSpace δ] {f : α → γ} {g : β → δ} (hf : UniformContinuous f) (hg : UniformContinuous g) : UniformContinuous (Prod.map f g) := (hf.comp uniformContinuous_fst).prodMk (hg.comp uniformContinuous_snd) theorem toTopologicalSpace_prod {α} {β} [u : UniformSpace α] [v : UniformSpace β] : @UniformSpace.toTopologicalSpace (α × β) instUniformSpaceProd = @instTopologicalSpaceProd α β u.toTopologicalSpace v.toTopologicalSpace := rfl /-- A version of `UniformContinuous.inf_dom_left` for binary functions -/ theorem uniformContinuous_inf_dom_left₂ {α β γ} {f : α → β → γ} {ua1 ua2 : UniformSpace α} {ub1 ub2 : UniformSpace β} {uc1 : UniformSpace γ} (h : by haveI := ua1; haveI := ub1; exact UniformContinuous fun p : α × β => f p.1 p.2) : by haveI := ua1 ⊓ ua2; haveI := ub1 ⊓ ub2 exact UniformContinuous fun p : α × β => f p.1 p.2 := by -- proof essentially copied from `continuous_inf_dom_left₂` have ha := @UniformContinuous.inf_dom_left _ _ id ua1 ua2 ua1 (@uniformContinuous_id _ (id _)) have hb := @UniformContinuous.inf_dom_left _ _ id ub1 ub2 ub1 (@uniformContinuous_id _ (id _)) have h_unif_cont_id := @UniformContinuous.prodMap _ _ _ _ (ua1 ⊓ ua2) (ub1 ⊓ ub2) ua1 ub1 _ _ ha hb exact @UniformContinuous.comp _ _ _ (id _) (id _) _ _ _ h h_unif_cont_id /-- A version of `UniformContinuous.inf_dom_right` for binary functions -/ theorem uniformContinuous_inf_dom_right₂ {α β γ} {f : α → β → γ} {ua1 ua2 : UniformSpace α} {ub1 ub2 : UniformSpace β} {uc1 : UniformSpace γ} (h : by haveI := ua2; haveI := ub2; exact UniformContinuous fun p : α × β => f p.1 p.2) : by haveI := ua1 ⊓ ua2; haveI := ub1 ⊓ ub2 exact UniformContinuous fun p : α × β => f p.1 p.2 := by -- proof essentially copied from `continuous_inf_dom_right₂` have ha := @UniformContinuous.inf_dom_right _ _ id ua1 ua2 ua2 (@uniformContinuous_id _ (id _)) have hb := @UniformContinuous.inf_dom_right _ _ id ub1 ub2 ub2 (@uniformContinuous_id _ (id _)) have h_unif_cont_id := @UniformContinuous.prodMap _ _ _ _ (ua1 ⊓ ua2) (ub1 ⊓ ub2) ua2 ub2 _ _ ha hb exact @UniformContinuous.comp _ _ _ (id _) (id _) _ _ _ h h_unif_cont_id /-- A version of `uniformContinuous_sInf_dom` for binary functions -/ theorem uniformContinuous_sInf_dom₂ {α β γ} {f : α → β → γ} {uas : Set (UniformSpace α)} {ubs : Set (UniformSpace β)} {ua : UniformSpace α} {ub : UniformSpace β} {uc : UniformSpace γ} (ha : ua ∈ uas) (hb : ub ∈ ubs) (hf : UniformContinuous fun p : α × β => f p.1 p.2) : by haveI := sInf uas; haveI := sInf ubs exact @UniformContinuous _ _ _ uc fun p : α × β => f p.1 p.2 := by -- proof essentially copied from `continuous_sInf_dom` let _ : UniformSpace (α × β) := instUniformSpaceProd have ha := uniformContinuous_sInf_dom ha uniformContinuous_id have hb := uniformContinuous_sInf_dom hb uniformContinuous_id have h_unif_cont_id := @UniformContinuous.prodMap _ _ _ _ (sInf uas) (sInf ubs) ua ub _ _ ha hb exact @UniformContinuous.comp _ _ _ (id _) (id _) _ _ _ hf h_unif_cont_id end Prod section open UniformSpace Function variable {δ' : Type*} [UniformSpace α] [UniformSpace β] [UniformSpace γ] [UniformSpace δ] [UniformSpace δ'] local notation f " ∘₂ " g => Function.bicompr f g /-- Uniform continuity for functions of two variables. -/ def UniformContinuous₂ (f : α → β → γ) := UniformContinuous (uncurry f) theorem uniformContinuous₂_def (f : α → β → γ) : UniformContinuous₂ f ↔ UniformContinuous (uncurry f) := Iff.rfl theorem UniformContinuous₂.uniformContinuous {f : α → β → γ} (h : UniformContinuous₂ f) : UniformContinuous (uncurry f) := h theorem uniformContinuous₂_curry (f : α × β → γ) : UniformContinuous₂ (Function.curry f) ↔ UniformContinuous f := by rw [UniformContinuous₂, uncurry_curry] theorem UniformContinuous₂.comp {f : α → β → γ} {g : γ → δ} (hg : UniformContinuous g) (hf : UniformContinuous₂ f) : UniformContinuous₂ (g ∘₂ f) := hg.comp hf theorem UniformContinuous₂.bicompl {f : α → β → γ} {ga : δ → α} {gb : δ' → β} (hf : UniformContinuous₂ f) (hga : UniformContinuous ga) (hgb : UniformContinuous gb) : UniformContinuous₂ (bicompl f ga gb) := hf.uniformContinuous.comp (hga.prodMap hgb) end theorem toTopologicalSpace_subtype [u : UniformSpace α] {p : α → Prop} : @UniformSpace.toTopologicalSpace (Subtype p) instUniformSpaceSubtype = @instTopologicalSpaceSubtype α p u.toTopologicalSpace := rfl section Sum variable [UniformSpace α] [UniformSpace β] open Sum -- Obsolete auxiliary definitions and lemmas /-- Uniformity on a disjoint union. Entourages of the diagonal in the union are obtained by taking independently an entourage of the diagonal in the first part, and an entourage of the diagonal in the second part. -/ instance Sum.instUniformSpace : UniformSpace (α ⊕ β) where uniformity := map (fun p : α × α => (inl p.1, inl p.2)) (𝓤 α) ⊔ map (fun p : β × β => (inr p.1, inr p.2)) (𝓤 β) symm := fun _ hs ↦ ⟨symm_le_uniformity hs.1, symm_le_uniformity hs.2⟩ comp := fun s hs ↦ by rcases comp_mem_uniformity_sets hs.1 with ⟨tα, htα, Htα⟩ rcases comp_mem_uniformity_sets hs.2 with ⟨tβ, htβ, Htβ⟩ filter_upwards [mem_lift' (union_mem_sup (image_mem_map htα) (image_mem_map htβ))] rintro ⟨_, _⟩ ⟨z, ⟨⟨a, b⟩, hab, ⟨⟩⟩ \| ⟨⟨a, b⟩, hab, ⟨⟩⟩, ⟨⟨_, c⟩, hbc, ⟨⟩⟩ \| ⟨⟨_, c⟩, hbc, ⟨⟩⟩⟩ exacts [@Htα (_, _) ⟨b, hab, hbc⟩, @Htβ (_, _) ⟨b, hab, hbc⟩] nhds_eq_comap_uniformity x := by ext cases x <;> simp [mem_comap', -mem_comap, nhds_inl, nhds_inr, nhds_eq_comap_uniformity, Prod.ext_iff] /-- The union of an entourage of the diagonal in each set of a disjoint union is again an entourage of the diagonal. -/ theorem union_mem_uniformity_sum {a : Set (α × α)} (ha : a ∈ 𝓤 α) {b : Set (β × β)} (hb : b ∈ 𝓤 β) : Prod.map inl inl '' a ∪ Prod.map inr inr '' b ∈ 𝓤 (α ⊕ β) := union_mem_sup (image_mem_map ha) (image_mem_map hb) theorem Sum.uniformity : 𝓤 (α ⊕ β) = map (Prod.map inl inl) (𝓤 α) ⊔ map (Prod.map inr inr) (𝓤 β) := rfl lemma uniformContinuous_inl : UniformContinuous (Sum.inl : α → α ⊕ β) := le_sup_left lemma uniformContinuous_inr : UniformContinuous (Sum.inr : β → α ⊕ β) := le_sup_right instance [IsCountablyGenerated (𝓤 α)] [IsCountablyGenerated (𝓤 β)] : IsCountablyGenerated (𝓤 (α ⊕ β)) := by rw [Sum.uniformity] infer_instance end Sum end Constructions /-! ### Expressing continuity properties in uniform spaces We reformulate the various continuity properties of functions taking values in a uniform space in terms of the uniformity in the target. Since the same lemmas (essentially with the same names) also exist for metric spaces and emetric spaces (reformulating things in terms of the distance or the edistance in the target), we put them in a namespace `Uniform` here. In the metric and emetric space setting, there are also similar lemmas where one assumes that both the source and the target are metric spaces, reformulating things in terms of the distance on both sides. These lemmas are generally written without primes, and the versions where only the target is a metric space is primed. We follow the same convention here, thus giving lemmas with primes. -/ namespace Uniform variable [UniformSpace α] theorem tendsto_nhds_right {f : Filter β} {u : β → α} {a : α} : Tendsto u f (𝓝 a) ↔ Tendsto (fun x => (a, u x)) f (𝓤 α) := by rw [nhds_eq_comap_uniformity, tendsto_comap_iff]; rfl theorem tendsto_nhds_left {f : Filter β} {u : β → α} {a : α} : Tendsto u f (𝓝 a) ↔ Tendsto (fun x => (u x, a)) f (𝓤 α) := by rw [nhds_eq_comap_uniformity', tendsto_comap_iff]; rfl theorem continuousAt_iff'_right [TopologicalSpace β] {f : β → α} {b : β} : ContinuousAt f b ↔ Tendsto (fun x => (f b, f x)) (𝓝 b) (𝓤 α) := by rw [ContinuousAt, tendsto_nhds_right] theorem continuousAt_iff'_left [TopologicalSpace β] {f : β → α} {b : β} : ContinuousAt f b ↔ Tendsto (fun x => (f x, f b)) (𝓝 b) (𝓤 α) := by rw [ContinuousAt, tendsto_nhds_left] theorem continuousAt_iff_prod [TopologicalSpace β] {f : β → α} {b : β} : ContinuousAt f b ↔ Tendsto (fun x : β × β => (f x.1, f x.2)) (𝓝 (b, b)) (𝓤 α) := ⟨fun H => le_trans (H.prodMap' H) (nhds_le_uniformity _), fun H => continuousAt_iff'_left.2 <\| H.comp <\| tendsto_id.prodMk_nhds tendsto_const_nhds⟩ theorem continuousWithinAt_iff'_right [TopologicalSpace β] {f : β → α} {b : β} {s : Set β} : ContinuousWithinAt f s b ↔ Tendsto (fun x => (f b, f x)) (𝓝[s] b) (𝓤 α) := by rw [ContinuousWithinAt, tendsto_nhds_right] theorem continuousWithinAt_iff'_left [TopologicalSpace β] {f : β → α} {b : β} {s : Set β} : ContinuousWithinAt f s b ↔ Tendsto (fun x => (f x, f b)) (𝓝[s] b) (𝓤 α) := by rw [ContinuousWithinAt, tendsto_nhds_left] theorem continuousOn_iff'_right [TopologicalSpace β] {f : β → α} {s : Set β} : ContinuousOn f s ↔ ∀ b ∈ s, Tendsto (fun x => (f b, f x)) (𝓝[s] b) (𝓤 α) := by simp [ContinuousOn, continuousWithinAt_iff'_right] theorem continuousOn_iff'_left [TopologicalSpace β] {f : β → α} {s : Set β} : ContinuousOn f s ↔ ∀ b ∈ s, Tendsto (fun x => (f x, f b)) (𝓝[s] b) (𝓤 α) := by simp [ContinuousOn, continuousWithinAt_iff'_left] theorem continuous_iff'_right [TopologicalSpace β] {f : β → α} : Continuous f ↔ ∀ b, Tendsto (fun x => (f b, f x)) (𝓝 b) (𝓤 α) := continuous_iff_continuousAt.trans <\| forall_congr' fun _ => tendsto_nhds_right theorem continuous_iff'_left [TopologicalSpace β] {f : β → α} : Continuous f ↔ ∀ b, Tendsto (fun x => (f x, f b)) (𝓝 b) (𝓤 α) := continuous_iff_continuousAt.trans <\| forall_congr' fun _ => tendsto_nhds_left /-- Consider two functions `f` and `g` which coincide on a set `s` and are continuous there. Then there is an open neighborhood of `s` on which `f` and `g` are uniformly close. -/ lemma exists_is_open_mem_uniformity_of_forall_mem_eq [TopologicalSpace β] {r : Set (α × α)} {s : Set β} {f g : β → α} (hf : ∀ x ∈ s, ContinuousAt f x) (hg : ∀ x ∈ s, ContinuousAt g x) (hfg : s.EqOn f g) (hr : r ∈ 𝓤 α) : ∃ t, IsOpen t ∧ s ⊆ t ∧ ∀ x ∈ t, (f x, g x) ∈ r := by have A : ∀ x ∈ s, ∃ t, IsOpen t ∧ x ∈ t ∧ ∀ z ∈ t, (f z, g z) ∈ r := by intro x hx obtain ⟨t, ht, htsymm, htr⟩ := comp_symm_mem_uniformity_sets hr have A : {z \| (f x, f z) ∈ t} ∈ 𝓝 x := (hf x hx).preimage_mem_nhds (mem_nhds_left (f x) ht) have B : {z \| (g x, g z) ∈ t} ∈ 𝓝 x := (hg x hx).preimage_mem_nhds (mem_nhds_left (g x) ht) rcases _root_.mem_nhds_iff.1 (inter_mem A B) with ⟨u, hu, u_open, xu⟩ refine ⟨u, u_open, xu, fun y hy ↦ ?_⟩ have I1 : (f y, f x) ∈ t := (htsymm.mk_mem_comm).2 (hu hy).1 have I2 : (g x, g y) ∈ t := (hu hy).2 rw [hfg hx] at I1 exact htr (prodMk_mem_compRel I1 I2) choose! t t_open xt ht using A refine ⟨⋃ x ∈ s, t x, isOpen_biUnion t_open, fun x hx ↦ mem_biUnion hx (xt x hx), ?_⟩ rintro x hx simp only [mem_iUnion, exists_prop] at hx rcases hx with ⟨y, ys, hy⟩ exact ht y ys x hy end Uniform theorem Filter.Tendsto.congr_uniformity {α β} [UniformSpace β] {f g : α → β} {l : Filter α} {b : β} (hf : Tendsto f l (𝓝 b)) (hg : Tendsto (fun x => (f x, g x)) l (𝓤 β)) : Tendsto g l (𝓝 b) := Uniform.tendsto_nhds_right.2 <\| (Uniform.tendsto_nhds_right.1 hf).uniformity_trans hg theorem Uniform.tendsto_congr {α β} [UniformSpace β] {f g : α → β} {l : Filter α} {b : β} (hfg : Tendsto (fun x => (f x, g x)) l (𝓤 β)) : Tendsto f l (𝓝 b) ↔ Tendsto g l (𝓝 b) := ⟨fun h => h.congr_uniformity hfg, fun h => h.congr_uniformity hfg.uniformity_symm⟩		Mathlib/Topology/UniformSpace/Basic.lean	1,000	1,004
/- Copyright (c) 2018 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Data.Fintype.Lattice import Mathlib.Data.Fintype.Sum import Mathlib.Topology.Homeomorph.Lemmas import Mathlib.Topology.MetricSpace.Antilipschitz /-! # Isometries We define isometries, i.e., maps between emetric spaces that preserve the edistance (on metric spaces, these are exactly the maps that preserve distances), and prove their basic properties. We also introduce isometric bijections. Since a lot of elementary properties don't require `eq_of_dist_eq_zero` we start setting up the theory for `PseudoMetricSpace` and we specialize to `MetricSpace` when needed. -/ open Topology noncomputable section universe u v w variable {ι : Type} {α : Type u} {β : Type v} {γ : Type w} open Function Set open scoped Topology ENNReal /-- An isometry (also known as isometric embedding) is a map preserving the edistance between pseudoemetric spaces, or equivalently the distance between pseudometric space. -/ def Isometry [PseudoEMetricSpace α] [PseudoEMetricSpace β] (f : α → β) : Prop := ∀ x1 x2 : α, edist (f x1) (f x2) = edist x1 x2 /-- On pseudometric spaces, a map is an isometry if and only if it preserves nonnegative distances. -/ theorem isometry_iff_nndist_eq [PseudoMetricSpace α] [PseudoMetricSpace β] {f : α → β} : Isometry f ↔ ∀ x y, nndist (f x) (f y) = nndist x y := by simp only [Isometry, edist_nndist, ENNReal.coe_inj] /-- On pseudometric spaces, a map is an isometry if and only if it preserves distances. -/ theorem isometry_iff_dist_eq [PseudoMetricSpace α] [PseudoMetricSpace β] {f : α → β} : Isometry f ↔ ∀ x y, dist (f x) (f y) = dist x y := by simp only [isometry_iff_nndist_eq, ← coe_nndist, NNReal.coe_inj] /-- An isometry preserves distances. -/ alias ⟨Isometry.dist_eq, _⟩ := isometry_iff_dist_eq /-- A map that preserves distances is an isometry -/ alias ⟨_, Isometry.of_dist_eq⟩ := isometry_iff_dist_eq /-- An isometry preserves non-negative distances. -/ alias ⟨Isometry.nndist_eq, _⟩ := isometry_iff_nndist_eq /-- A map that preserves non-negative distances is an isometry. -/ alias ⟨_, Isometry.of_nndist_eq⟩ := isometry_iff_nndist_eq namespace Isometry section PseudoEmetricIsometry variable [PseudoEMetricSpace α] [PseudoEMetricSpace β] [PseudoEMetricSpace γ] variable {f : α → β} {x : α} /-- An isometry preserves edistances. -/ theorem edist_eq (hf : Isometry f) (x y : α) : edist (f x) (f y) = edist x y := hf x y theorem lipschitz (h : Isometry f) : LipschitzWith 1 f := LipschitzWith.of_edist_le fun x y => (h x y).le theorem antilipschitz (h : Isometry f) : AntilipschitzWith 1 f := fun x y => by simp only [h x y, ENNReal.coe_one, one_mul, le_refl] /-- Any map on a subsingleton is an isometry -/ @[nontriviality] theorem _root_.isometry_subsingleton [Subsingleton α] : Isometry f := fun x y => by rw [Subsingleton.elim x y]; simp /-- The identity is an isometry -/ theorem _root_.isometry_id : Isometry (id : α → α) := fun _ _ => rfl theorem prodMap {δ} [PseudoEMetricSpace δ] {f : α → β} {g : γ → δ} (hf : Isometry f) (hg : Isometry g) : Isometry (Prod.map f g) := fun x y => by simp only [Prod.edist_eq, Prod.map_fst, hf.edist_eq, Prod.map_snd, hg.edist_eq] @[deprecated (since := "2025-04-18")] alias prod_map := prodMap protected theorem piMap {ι} [Fintype ι] {α β : ι → Type} [∀ i, PseudoEMetricSpace (α i)] [∀ i, PseudoEMetricSpace (β i)] (f : ∀ i, α i → β i) (hf : ∀ i, Isometry (f i)) : Isometry (Pi.map f) := fun x y => by simp only [edist_pi_def, (hf _).edist_eq, Pi.map_apply] /-- The composition of isometries is an isometry. -/ theorem comp {g : β → γ} {f : α → β} (hg : Isometry g) (hf : Isometry f) : Isometry (g ∘ f) := fun _ _ => (hg _ _).trans (hf _ _) /-- An isometry from a metric space is a uniform continuous map -/ protected theorem uniformContinuous (hf : Isometry f) : UniformContinuous f := hf.lipschitz.uniformContinuous /-- An isometry from a metric space is a uniform inducing map -/ theorem isUniformInducing (hf : Isometry f) : IsUniformInducing f := hf.antilipschitz.isUniformInducing hf.uniformContinuous theorem tendsto_nhds_iff {ι : Type*} {f : α → β} {g : ι → α} {a : Filter ι} {b : α} (hf : Isometry f) : Filter.Tendsto g a (𝓝 b) ↔ Filter.Tendsto (f ∘ g) a (𝓝 (f b)) := hf.isUniformInducing.isInducing.tendsto_nhds_iff /-- An isometry is continuous. -/ protected theorem continuous (hf : Isometry f) : Continuous f := hf.lipschitz.continuous /-- The right inverse of an isometry is an isometry. -/ theorem right_inv {f : α → β} {g : β → α} (h : Isometry f) (hg : RightInverse g f) : Isometry g := fun x y => by rw [← h, hg _, hg _] theorem preimage_emetric_closedBall (h : Isometry f) (x : α) (r : ℝ≥0∞) : f ⁻¹' EMetric.closedBall (f x) r = EMetric.closedBall x r := by ext y simp [h.edist_eq] theorem preimage_emetric_ball (h : Isometry f) (x : α) (r : ℝ≥0∞) : f ⁻¹' EMetric.ball (f x) r = EMetric.ball x r := by ext y simp [h.edist_eq] /-- Isometries preserve the diameter in pseudoemetric spaces. -/ theorem ediam_image (hf : Isometry f) (s : Set α) : EMetric.diam (f '' s) = EMetric.diam s := eq_of_forall_ge_iff fun d => by simp only [EMetric.diam_le_iff, forall_mem_image, hf.edist_eq] theorem ediam_range (hf : Isometry f) : EMetric.diam (range f) = EMetric.diam (univ : Set α) := by	rw [← image_univ] exact hf.ediam_image univ theorem mapsTo_emetric_ball (hf : Isometry f) (x : α) (r : ℝ≥0∞) :	Mathlib/Topology/MetricSpace/Isometry.lean	138	141
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Benjamin Davidson -/ import Mathlib.Analysis.SpecialFunctions.Trigonometric.Complex /-! # The `arctan` function. Inequalities, identities and `Real.tan` as a `PartialHomeomorph` between `(-(π / 2), π / 2)` and the whole line. The result of `arctan x + arctan y` is given by `arctan_add`, `arctan_add_eq_add_pi` or `arctan_add_eq_sub_pi` depending on whether `x * y < 1` and `0 < x`. As an application of `arctan_add` we give four Machin-like formulas (linear combinations of arctangents equal to `π / 4 = arctan 1`), including John Machin's original one at `four_mul_arctan_inv_5_sub_arctan_inv_239`. -/ noncomputable section namespace Real open Set Filter open scoped Topology Real theorem tan_add {x y : ℝ} (h : ((∀ k : ℤ, x ≠ (2 * k + 1) * π / 2) ∧ ∀ l : ℤ, y ≠ (2 * l + 1) * π / 2) ∨ (∃ k : ℤ, x = (2 * k + 1) * π / 2) ∧ ∃ l : ℤ, y = (2 * l + 1) * π / 2) : tan (x + y) = (tan x + tan y) / (1 - tan x * tan y) := by simpa only [← Complex.ofReal_inj, Complex.ofReal_sub, Complex.ofReal_add, Complex.ofReal_div, Complex.ofReal_mul, Complex.ofReal_tan] using @Complex.tan_add (x : ℂ) (y : ℂ) (by convert h <;> norm_cast) theorem tan_add' {x y : ℝ} (h : (∀ k : ℤ, x ≠ (2 * k + 1) * π / 2) ∧ ∀ l : ℤ, y ≠ (2 * l + 1) * π / 2) : tan (x + y) = (tan x + tan y) / (1 - tan x * tan y) := tan_add (Or.inl h) theorem tan_two_mul {x : ℝ} : tan (2 * x) = 2 * tan x / (1 - tan x ^ 2) := by have := @Complex.tan_two_mul x norm_cast at * theorem tan_int_mul_pi_div_two (n : ℤ) : tan (n * π / 2) = 0 := tan_eq_zero_iff.mpr (by use n) theorem continuousOn_tan : ContinuousOn tan {x \| cos x ≠ 0} := by suffices ContinuousOn (fun x => sin x / cos x) {x \| cos x ≠ 0} by have h_eq : (fun x => sin x / cos x) = tan := by ext1 x; rw [tan_eq_sin_div_cos] rwa [h_eq] at this exact continuousOn_sin.div continuousOn_cos fun x => id @[continuity] theorem continuous_tan : Continuous fun x : {x \| cos x ≠ 0} => tan x := continuousOn_iff_continuous_restrict.1 continuousOn_tan theorem continuousOn_tan_Ioo : ContinuousOn tan (Ioo (-(π / 2)) (π / 2)) := by refine ContinuousOn.mono continuousOn_tan fun x => ?_ simp only [and_imp, mem_Ioo, mem_setOf_eq, Ne] rw [cos_eq_zero_iff] rintro hx_gt hx_lt ⟨r, hxr_eq⟩ rcases le_or_lt 0 r with h \| h · rw [lt_iff_not_ge] at hx_lt refine hx_lt ?_ rw [hxr_eq, ← one_mul (π / 2), mul_div_assoc, ge_iff_le, mul_le_mul_right (half_pos pi_pos)] simp [h] · rw [lt_iff_not_ge] at hx_gt refine hx_gt ?_ rw [hxr_eq, ← one_mul (π / 2), mul_div_assoc, ge_iff_le, neg_mul_eq_neg_mul, mul_le_mul_right (half_pos pi_pos)] have hr_le : r ≤ -1 := by rwa [Int.lt_iff_add_one_le, ← le_neg_iff_add_nonpos_right] at h rw [← le_sub_iff_add_le, mul_comm, ← le_div_iff₀] · norm_num rw [← Int.cast_one, ← Int.cast_neg]; norm_cast · exact zero_lt_two theorem surjOn_tan : SurjOn tan (Ioo (-(π / 2)) (π / 2)) univ := have := neg_lt_self pi_div_two_pos continuousOn_tan_Ioo.surjOn_of_tendsto (nonempty_Ioo.2 this) (by rw [tendsto_comp_coe_Ioo_atBot this]; exact tendsto_tan_neg_pi_div_two) (by rw [tendsto_comp_coe_Ioo_atTop this]; exact tendsto_tan_pi_div_two) theorem tan_surjective : Function.Surjective tan := fun _ => surjOn_tan.subset_range trivial theorem image_tan_Ioo : tan '' Ioo (-(π / 2)) (π / 2) = univ := univ_subset_iff.1 surjOn_tan /-- `Real.tan` as an `OrderIso` between `(-(π / 2), π / 2)` and `ℝ`. -/ def tanOrderIso : Ioo (-(π / 2)) (π / 2) ≃o ℝ := (strictMonoOn_tan.orderIso _ _).trans <\| (OrderIso.setCongr _ _ image_tan_Ioo).trans OrderIso.Set.univ /-- Inverse of the `tan` function, returns values in the range `-π / 2 < arctan x` and `arctan x < π / 2` -/ @[pp_nodot] noncomputable def arctan (x : ℝ) : ℝ := tanOrderIso.symm x @[simp] theorem tan_arctan (x : ℝ) : tan (arctan x) = x := tanOrderIso.apply_symm_apply x theorem arctan_mem_Ioo (x : ℝ) : arctan x ∈ Ioo (-(π / 2)) (π / 2) := Subtype.coe_prop _ @[simp] theorem range_arctan : range arctan = Ioo (-(π / 2)) (π / 2) := ((EquivLike.surjective _).range_comp _).trans Subtype.range_coe theorem arctan_tan {x : ℝ} (hx₁ : -(π / 2) < x) (hx₂ : x < π / 2) : arctan (tan x) = x := Subtype.ext_iff.1 <\| tanOrderIso.symm_apply_apply ⟨x, hx₁, hx₂⟩ theorem cos_arctan_pos (x : ℝ) : 0 < cos (arctan x) := cos_pos_of_mem_Ioo <\| arctan_mem_Ioo x theorem cos_sq_arctan (x : ℝ) : cos (arctan x) ^ 2 = 1 / (1 + x ^ 2) := by rw_mod_cast [one_div, ← inv_one_add_tan_sq (cos_arctan_pos x).ne', tan_arctan] theorem sin_arctan (x : ℝ) : sin (arctan x) = x / √(1 + x ^ 2) := by rw_mod_cast [← tan_div_sqrt_one_add_tan_sq (cos_arctan_pos x), tan_arctan] theorem cos_arctan (x : ℝ) : cos (arctan x) = 1 / √(1 + x ^ 2) := by rw_mod_cast [one_div, ← inv_sqrt_one_add_tan_sq (cos_arctan_pos x), tan_arctan] theorem arctan_lt_pi_div_two (x : ℝ) : arctan x < π / 2 := (arctan_mem_Ioo x).2 theorem neg_pi_div_two_lt_arctan (x : ℝ) : -(π / 2) < arctan x := (arctan_mem_Ioo x).1 theorem arctan_eq_arcsin (x : ℝ) : arctan x = arcsin (x / √(1 + x ^ 2)) := Eq.symm <\| arcsin_eq_of_sin_eq (sin_arctan x) (mem_Icc_of_Ioo <\| arctan_mem_Ioo x) theorem arcsin_eq_arctan {x : ℝ} (h : x ∈ Ioo (-(1 : ℝ)) 1) : arcsin x = arctan (x / √(1 - x ^ 2)) := by rw_mod_cast [arctan_eq_arcsin, div_pow, sq_sqrt, one_add_div, div_div, ← sqrt_mul, mul_div_cancel₀, sub_add_cancel, sqrt_one, div_one] <;> simp at h <;> nlinarith [h.1, h.2] @[simp] theorem arctan_zero : arctan 0 = 0 := by simp [arctan_eq_arcsin] @[mono] theorem arctan_strictMono : StrictMono arctan := tanOrderIso.symm.strictMono @[gcongr] lemma arctan_lt_arctan {x y : ℝ} (hxy : x < y) : arctan x < arctan y := arctan_strictMono hxy @[gcongr] lemma arctan_le_arctan {x y : ℝ} (hxy : x ≤ y) : arctan x ≤ arctan y := arctan_strictMono.monotone hxy theorem arctan_injective : arctan.Injective := arctan_strictMono.injective @[simp] theorem arctan_eq_zero_iff {x : ℝ} : arctan x = 0 ↔ x = 0 := .trans (by rw [arctan_zero]) arctan_injective.eq_iff theorem tendsto_arctan_atTop : Tendsto arctan atTop (𝓝[<] (π / 2)) := tendsto_Ioo_atTop.mp tanOrderIso.symm.tendsto_atTop theorem tendsto_arctan_atBot : Tendsto arctan atBot (𝓝[>] (-(π / 2))) := tendsto_Ioo_atBot.mp tanOrderIso.symm.tendsto_atBot theorem arctan_eq_of_tan_eq {x y : ℝ} (h : tan x = y) (hx : x ∈ Ioo (-(π / 2)) (π / 2)) : arctan y = x := injOn_tan (arctan_mem_Ioo _) hx (by rw [tan_arctan, h]) @[simp] theorem arctan_one : arctan 1 = π / 4 := arctan_eq_of_tan_eq tan_pi_div_four <\| by constructor <;> linarith [pi_pos] @[simp] theorem arctan_neg (x : ℝ) : arctan (-x) = -arctan x := by simp [arctan_eq_arcsin, neg_div] theorem arctan_eq_arccos {x : ℝ} (h : 0 ≤ x) : arctan x = arccos (√(1 + x ^ 2))⁻¹ := by rw [arctan_eq_arcsin, arccos_eq_arcsin]; swap; · exact inv_nonneg.2 (sqrt_nonneg _) congr 1 rw_mod_cast [← sqrt_inv, sq_sqrt, ← one_div, one_sub_div, add_sub_cancel_left, sqrt_div, sqrt_sq h] all_goals positivity -- The junk values for `arccos` and `sqrt` make this true even for `1 < x`. theorem arccos_eq_arctan {x : ℝ} (h : 0 < x) : arccos x = arctan (√(1 - x ^ 2) / x) := by rw [arccos, eq_comm] refine arctan_eq_of_tan_eq ?_ ⟨?_, ?_⟩ · rw_mod_cast [tan_pi_div_two_sub, tan_arcsin, inv_div] · linarith only [arcsin_le_pi_div_two x, pi_pos] · linarith only [arcsin_pos.2 h] theorem arctan_inv_of_pos {x : ℝ} (h : 0 < x) : arctan x⁻¹ = π / 2 - arctan x := by rw [← arctan_tan (x := _ - _), tan_pi_div_two_sub, tan_arctan] · norm_num exact (arctan_lt_pi_div_two x).trans (half_lt_self_iff.mpr pi_pos) · rw [sub_lt_self_iff, ← arctan_zero] exact tanOrderIso.symm.strictMono h theorem arctan_inv_of_neg {x : ℝ} (h : x < 0) : arctan x⁻¹ = -(π / 2) - arctan x := by have := arctan_inv_of_pos (neg_pos.mpr h) rwa [inv_neg, arctan_neg, neg_eq_iff_eq_neg, neg_sub', arctan_neg, neg_neg] at this section ArctanAdd lemma arctan_ne_mul_pi_div_two {x : ℝ} : ∀ (k : ℤ), arctan x ≠ (2 * k + 1) * π / 2 := by by_contra! obtain ⟨k, h⟩ := this obtain ⟨lb, ub⟩ := arctan_mem_Ioo x rw [h, neg_eq_neg_one_mul, mul_div_assoc, mul_lt_mul_right (by positivity)] at lb rw [h, ← one_mul (π / 2), mul_div_assoc, mul_lt_mul_right (by positivity)] at ub norm_cast at lb ub; change -1 < _ at lb; omega lemma arctan_add_arctan_lt_pi_div_two {x y : ℝ} (h : x * y < 1) : arctan x + arctan y < π / 2 := by rcases le_or_lt y 0 with hy \| hy · rw [← add_zero (π / 2), ← arctan_zero] exact add_lt_add_of_lt_of_le (arctan_lt_pi_div_two _) (tanOrderIso.symm.monotone hy) · rw [← lt_div_iff₀ hy, ← inv_eq_one_div] at h replace h : arctan x < arctan y⁻¹ := tanOrderIso.symm.strictMono h rwa [arctan_inv_of_pos hy, lt_tsub_iff_right] at h theorem arctan_add {x y : ℝ} (h : x * y < 1) : arctan x + arctan y = arctan ((x + y) / (1 - x * y)) := by rw [← arctan_tan (x := _ + _)]	· congr conv_rhs => rw [← tan_arctan x, ← tan_arctan y] exact tan_add' ⟨arctan_ne_mul_pi_div_two, arctan_ne_mul_pi_div_two⟩	Mathlib/Analysis/SpecialFunctions/Trigonometric/Arctan.lean	225	227
/- Copyright (c) 2021 Martin Zinkevich. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Martin Zinkevich, Rémy Degenne -/ import Mathlib.Logic.Encodable.Lattice import Mathlib.MeasureTheory.MeasurableSpace.Defs import Mathlib.Order.Disjointed /-! # Induction principles for measurable sets, related to π-systems and λ-systems. ## Main statements * The main theorem of this file is Dynkin's π-λ theorem, which appears here as an induction principle `induction_on_inter`. Suppose `s` is a collection of subsets of `α` such that the intersection of two members of `s` belongs to `s` whenever it is nonempty. Let `m` be the σ-algebra generated by `s`. In order to check that a predicate `C` holds on every member of `m`, it suffices to check that `C` holds on the members of `s` and that `C` is preserved by complementation and disjoint countable unions. * The proof of this theorem relies on the notion of `IsPiSystem`, i.e., a collection of sets which is closed under binary non-empty intersections. Note that this is a small variation around the usual notion in the literature, which often requires that a π-system is non-empty, and closed also under disjoint intersections. This variation turns out to be convenient for the formalization. * The proof of Dynkin's π-λ theorem also requires the notion of `DynkinSystem`, i.e., a collection of sets which contains the empty set, is closed under complementation and under countable union of pairwise disjoint sets. The disjointness condition is the only difference with `σ`-algebras. * `generatePiSystem g` gives the minimal π-system containing `g`. This can be considered a Galois insertion into both measurable spaces and sets. * `generateFrom_generatePiSystem_eq` proves that if you start from a collection of sets `g`, take the generated π-system, and then the generated σ-algebra, you get the same result as the σ-algebra generated from `g`. This is useful because there are connections between independent sets that are π-systems and the generated independent spaces. * `mem_generatePiSystem_iUnion_elim` and `mem_generatePiSystem_iUnion_elim'` show that any element of the π-system generated from the union of a set of π-systems can be represented as the intersection of a finite number of elements from these sets. * `piiUnionInter` defines a new π-system from a family of π-systems `π : ι → Set (Set α)` and a set of indices `S : Set ι`. `piiUnionInter π S` is the set of sets that can be written as `⋂ x ∈ t, f x` for some finset `t ∈ S` and sets `f x ∈ π x`. ## Implementation details * `IsPiSystem` is a predicate, not a type. Thus, we don't explicitly define the galois insertion, nor do we define a complete lattice. In theory, we could define a complete lattice and galois insertion on the subtype corresponding to `IsPiSystem`. -/ open MeasurableSpace Set open MeasureTheory variable {α β : Type} /-- A π-system is a collection of subsets of `α` that is closed under binary intersection of non-disjoint sets. Usually it is also required that the collection is nonempty, but we don't do that here. -/ def IsPiSystem (C : Set (Set α)) : Prop := ∀ᵉ (s ∈ C) (t ∈ C), (s ∩ t : Set α).Nonempty → s ∩ t ∈ C namespace MeasurableSpace theorem isPiSystem_measurableSet {α : Type} [MeasurableSpace α] : IsPiSystem { s : Set α \| MeasurableSet s } := fun _ hs _ ht _ => hs.inter ht end MeasurableSpace theorem IsPiSystem.singleton (S : Set α) : IsPiSystem ({S} : Set (Set α)) := by intro s h_s t h_t _ rw [Set.mem_singleton_iff.1 h_s, Set.mem_singleton_iff.1 h_t, Set.inter_self, Set.mem_singleton_iff] theorem IsPiSystem.insert_empty {S : Set (Set α)} (h_pi : IsPiSystem S) : IsPiSystem (insert ∅ S) := by intro s hs t ht hst rcases hs with hs \| hs · simp [hs] · rcases ht with ht \| ht · simp [ht] · exact Set.mem_insert_of_mem _ (h_pi s hs t ht hst) theorem IsPiSystem.insert_univ {S : Set (Set α)} (h_pi : IsPiSystem S) : IsPiSystem (insert Set.univ S) := by intro s hs t ht hst rcases hs with hs \| hs · rcases ht with ht \| ht <;> simp [hs, ht] · rcases ht with ht \| ht · simp [hs, ht] · exact Set.mem_insert_of_mem _ (h_pi s hs t ht hst) theorem IsPiSystem.comap {α β} {S : Set (Set β)} (h_pi : IsPiSystem S) (f : α → β) : IsPiSystem { s : Set α \| ∃ t ∈ S, f ⁻¹' t = s } := by rintro _ ⟨s, hs_mem, rfl⟩ _ ⟨t, ht_mem, rfl⟩ hst rw [← Set.preimage_inter] at hst ⊢ exact ⟨s ∩ t, h_pi s hs_mem t ht_mem (nonempty_of_nonempty_preimage hst), rfl⟩ theorem isPiSystem_iUnion_of_directed_le {α ι} (p : ι → Set (Set α)) (hp_pi : ∀ n, IsPiSystem (p n)) (hp_directed : Directed (· ≤ ·) p) : IsPiSystem (⋃ n, p n) := by intro t1 ht1 t2 ht2 h rw [Set.mem_iUnion] at ht1 ht2 ⊢ obtain ⟨n, ht1⟩ := ht1 obtain ⟨m, ht2⟩ := ht2 obtain ⟨k, hpnk, hpmk⟩ : ∃ k, p n ≤ p k ∧ p m ≤ p k := hp_directed n m exact ⟨k, hp_pi k t1 (hpnk ht1) t2 (hpmk ht2) h⟩ theorem isPiSystem_iUnion_of_monotone {α ι} [SemilatticeSup ι] (p : ι → Set (Set α)) (hp_pi : ∀ n, IsPiSystem (p n)) (hp_mono : Monotone p) : IsPiSystem (⋃ n, p n) := isPiSystem_iUnion_of_directed_le p hp_pi (Monotone.directed_le hp_mono) /-- Rectangles formed by π-systems form a π-system. -/ lemma IsPiSystem.prod {C : Set (Set α)} {D : Set (Set β)} (hC : IsPiSystem C) (hD : IsPiSystem D) : IsPiSystem (image2 (· ×ˢ ·) C D) := by rintro _ ⟨s₁, hs₁, t₁, ht₁, rfl⟩ _ ⟨s₂, hs₂, t₂, ht₂, rfl⟩ hst rw [prod_inter_prod] at hst ⊢; rw [prod_nonempty_iff] at hst exact mem_image2_of_mem (hC _ hs₁ _ hs₂ hst.1) (hD _ ht₁ _ ht₂ hst.2) section Order variable {ι ι' : Sort*} [LinearOrder α] theorem isPiSystem_image_Iio (s : Set α) : IsPiSystem (Iio '' s) := by rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩ - exact ⟨a ⊓ b, inf_ind a b ha hb, Iio_inter_Iio.symm⟩ theorem isPiSystem_Iio : IsPiSystem (range Iio : Set (Set α)) := @image_univ α _ Iio ▸ isPiSystem_image_Iio univ theorem isPiSystem_image_Ioi (s : Set α) : IsPiSystem (Ioi '' s) := @isPiSystem_image_Iio αᵒᵈ _ s theorem isPiSystem_Ioi : IsPiSystem (range Ioi : Set (Set α)) := @image_univ α _ Ioi ▸ isPiSystem_image_Ioi univ theorem isPiSystem_image_Iic (s : Set α) : IsPiSystem (Iic '' s) := by rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩ - exact ⟨a ⊓ b, inf_ind a b ha hb, Iic_inter_Iic.symm⟩ theorem isPiSystem_Iic : IsPiSystem (range Iic : Set (Set α)) := @image_univ α _ Iic ▸ isPiSystem_image_Iic univ theorem isPiSystem_image_Ici (s : Set α) : IsPiSystem (Ici '' s) := @isPiSystem_image_Iic αᵒᵈ _ s theorem isPiSystem_Ici : IsPiSystem (range Ici : Set (Set α)) := @image_univ α _ Ici ▸ isPiSystem_image_Ici univ theorem isPiSystem_Ixx_mem {Ixx : α → α → Set α} {p : α → α → Prop} (Hne : ∀ {a b}, (Ixx a b).Nonempty → p a b) (Hi : ∀ {a₁ b₁ a₂ b₂}, Ixx a₁ b₁ ∩ Ixx a₂ b₂ = Ixx (max a₁ a₂) (min b₁ b₂)) (s t : Set α) : IsPiSystem { S \| ∃ᵉ (l ∈ s) (u ∈ t), p l u ∧ Ixx l u = S } := by rintro _ ⟨l₁, hls₁, u₁, hut₁, _, rfl⟩ _ ⟨l₂, hls₂, u₂, hut₂, _, rfl⟩ simp only [Hi] exact fun H => ⟨l₁ ⊔ l₂, sup_ind l₁ l₂ hls₁ hls₂, u₁ ⊓ u₂, inf_ind u₁ u₂ hut₁ hut₂, Hne H, rfl⟩ theorem isPiSystem_Ixx {Ixx : α → α → Set α} {p : α → α → Prop} (Hne : ∀ {a b}, (Ixx a b).Nonempty → p a b) (Hi : ∀ {a₁ b₁ a₂ b₂}, Ixx a₁ b₁ ∩ Ixx a₂ b₂ = Ixx (max a₁ a₂) (min b₁ b₂)) (f : ι → α) (g : ι' → α) : @IsPiSystem α { S \| ∃ i j, p (f i) (g j) ∧ Ixx (f i) (g j) = S } := by simpa only [exists_range_iff] using isPiSystem_Ixx_mem (@Hne) (@Hi) (range f) (range g) theorem isPiSystem_Ioo_mem (s t : Set α) : IsPiSystem { S \| ∃ᵉ (l ∈ s) (u ∈ t), l < u ∧ Ioo l u = S } := isPiSystem_Ixx_mem (Ixx := Ioo) (fun ⟨_, hax, hxb⟩ => hax.trans hxb) Ioo_inter_Ioo s t theorem isPiSystem_Ioo (f : ι → α) (g : ι' → α) : @IsPiSystem α { S \| ∃ l u, f l < g u ∧ Ioo (f l) (g u) = S } := isPiSystem_Ixx (Ixx := Ioo) (fun ⟨_, hax, hxb⟩ => hax.trans hxb) Ioo_inter_Ioo f g theorem isPiSystem_Ioc_mem (s t : Set α) : IsPiSystem { S \| ∃ᵉ (l ∈ s) (u ∈ t), l < u ∧ Ioc l u = S } := isPiSystem_Ixx_mem (Ixx := Ioc) (fun ⟨_, hax, hxb⟩ => hax.trans_le hxb) Ioc_inter_Ioc s t theorem isPiSystem_Ioc (f : ι → α) (g : ι' → α) : @IsPiSystem α { S \| ∃ i j, f i < g j ∧ Ioc (f i) (g j) = S } := isPiSystem_Ixx (Ixx := Ioc) (fun ⟨_, hax, hxb⟩ => hax.trans_le hxb) Ioc_inter_Ioc f g theorem isPiSystem_Ico_mem (s t : Set α) : IsPiSystem { S \| ∃ᵉ (l ∈ s) (u ∈ t), l < u ∧ Ico l u = S } := isPiSystem_Ixx_mem (Ixx := Ico) (fun ⟨_, hax, hxb⟩ => hax.trans_lt hxb) Ico_inter_Ico s t theorem isPiSystem_Ico (f : ι → α) (g : ι' → α) : @IsPiSystem α { S \| ∃ i j, f i < g j ∧ Ico (f i) (g j) = S } := isPiSystem_Ixx (Ixx := Ico) (fun ⟨_, hax, hxb⟩ => hax.trans_lt hxb) Ico_inter_Ico f g theorem isPiSystem_Icc_mem (s t : Set α) : IsPiSystem { S \| ∃ᵉ (l ∈ s) (u ∈ t), l ≤ u ∧ Icc l u = S } := isPiSystem_Ixx_mem (Ixx := Icc) nonempty_Icc.1 (by exact Icc_inter_Icc) s t theorem isPiSystem_Icc (f : ι → α) (g : ι' → α) : @IsPiSystem α { S \| ∃ i j, f i ≤ g j ∧ Icc (f i) (g j) = S } := isPiSystem_Ixx (Ixx := Icc) nonempty_Icc.1 (by exact Icc_inter_Icc) f g end Order /-- Given a collection `S` of subsets of `α`, then `generatePiSystem S` is the smallest π-system containing `S`. -/ inductive generatePiSystem (S : Set (Set α)) : Set (Set α) \| base {s : Set α} (h_s : s ∈ S) : generatePiSystem S s \| inter {s t : Set α} (h_s : generatePiSystem S s) (h_t : generatePiSystem S t) (h_nonempty : (s ∩ t).Nonempty) : generatePiSystem S (s ∩ t) theorem isPiSystem_generatePiSystem (S : Set (Set α)) : IsPiSystem (generatePiSystem S) := fun _ h_s _ h_t h_nonempty => generatePiSystem.inter h_s h_t h_nonempty theorem subset_generatePiSystem_self (S : Set (Set α)) : S ⊆ generatePiSystem S := fun _ => generatePiSystem.base theorem generatePiSystem_subset_self {S : Set (Set α)} (h_S : IsPiSystem S) : generatePiSystem S ⊆ S := fun x h => by induction h with \| base h_s => exact h_s \| inter _ _ h_nonempty h_s h_u => exact h_S _ h_s _ h_u h_nonempty theorem generatePiSystem_eq {S : Set (Set α)} (h_pi : IsPiSystem S) : generatePiSystem S = S := Set.Subset.antisymm (generatePiSystem_subset_self h_pi) (subset_generatePiSystem_self S) theorem generatePiSystem_mono {S T : Set (Set α)} (hST : S ⊆ T) : generatePiSystem S ⊆ generatePiSystem T := fun t ht => by induction ht with \| base h_s => exact generatePiSystem.base (Set.mem_of_subset_of_mem hST h_s) \| inter _ _ h_nonempty h_s h_u => exact isPiSystem_generatePiSystem T _ h_s _ h_u h_nonempty theorem generatePiSystem_measurableSet [M : MeasurableSpace α] {S : Set (Set α)} (h_meas_S : ∀ s ∈ S, MeasurableSet s) (t : Set α) (h_in_pi : t ∈ generatePiSystem S) : MeasurableSet t := by induction h_in_pi with \| base h_s => apply h_meas_S _ h_s \| inter _ _ _ h_s h_u => apply MeasurableSet.inter h_s h_u theorem generateFrom_measurableSet_of_generatePiSystem {g : Set (Set α)} (t : Set α) (ht : t ∈ generatePiSystem g) : MeasurableSet[generateFrom g] t := @generatePiSystem_measurableSet α (generateFrom g) g (fun _ h_s_in_g => measurableSet_generateFrom h_s_in_g) t ht theorem generateFrom_generatePiSystem_eq {g : Set (Set α)} : generateFrom (generatePiSystem g) = generateFrom g := by apply le_antisymm <;> apply generateFrom_le · exact fun t h_t => generateFrom_measurableSet_of_generatePiSystem t h_t · exact fun t h_t => measurableSet_generateFrom (generatePiSystem.base h_t) /-- Every element of the π-system generated by the union of a family of π-systems is a finite intersection of elements from the π-systems. For an indexed union version, see `mem_generatePiSystem_iUnion_elim'`. -/ theorem mem_generatePiSystem_iUnion_elim {α β} {g : β → Set (Set α)} (h_pi : ∀ b, IsPiSystem (g b)) (t : Set α) (h_t : t ∈ generatePiSystem (⋃ b, g b)) : ∃ (T : Finset β) (f : β → Set α), (t = ⋂ b ∈ T, f b) ∧ ∀ b ∈ T, f b ∈ g b := by classical induction h_t with \| @base s h_s => rcases h_s with ⟨t', ⟨⟨b, rfl⟩, h_s_in_t'⟩⟩ refine ⟨{b}, fun _ => s, ?_⟩ simpa using h_s_in_t' \| inter h_gen_s h_gen_t' h_nonempty h_s h_t' => rcases h_t' with ⟨T_t', ⟨f_t', ⟨rfl, h_t'⟩⟩⟩ rcases h_s with ⟨T_s, ⟨f_s, ⟨rfl, h_s⟩⟩⟩ use T_s ∪ T_t', fun b : β => if b ∈ T_s then if b ∈ T_t' then f_s b ∩ f_t' b else f_s b else if b ∈ T_t' then f_t' b else (∅ : Set α) constructor · ext a simp_rw [Set.mem_inter_iff, Set.mem_iInter, Finset.mem_union, or_imp] rw [← forall_and] constructor <;> intro h1 b <;> by_cases hbs : b ∈ T_s <;> by_cases hbt : b ∈ T_t' <;> specialize h1 b <;> simp only [hbs, hbt, if_true, if_false, true_imp_iff, and_self_iff, false_imp_iff] at h1 ⊢ all_goals exact h1 intro b h_b split_ifs with hbs hbt hbt · refine h_pi b (f_s b) (h_s b hbs) (f_t' b) (h_t' b hbt) (Set.Nonempty.mono ?_ h_nonempty) exact Set.inter_subset_inter (Set.biInter_subset_of_mem hbs) (Set.biInter_subset_of_mem hbt) · exact h_s b hbs · exact h_t' b hbt · rw [Finset.mem_union] at h_b apply False.elim (h_b.elim hbs hbt) /-- Every element of the π-system generated by an indexed union of a family of π-systems is a finite intersection of elements from the π-systems. For a total union version, see `mem_generatePiSystem_iUnion_elim`. -/ theorem mem_generatePiSystem_iUnion_elim' {α β} {g : β → Set (Set α)} {s : Set β} (h_pi : ∀ b ∈ s, IsPiSystem (g b)) (t : Set α) (h_t : t ∈ generatePiSystem (⋃ b ∈ s, g b)) : ∃ (T : Finset β) (f : β → Set α), ↑T ⊆ s ∧ (t = ⋂ b ∈ T, f b) ∧ ∀ b ∈ T, f b ∈ g b := by classical have : t ∈ generatePiSystem (⋃ b : Subtype s, (g ∘ Subtype.val) b) := by suffices h1 : ⋃ b : Subtype s, (g ∘ Subtype.val) b = ⋃ b ∈ s, g b by rwa [h1] ext x simp only [exists_prop, Set.mem_iUnion, Function.comp_apply, Subtype.exists, Subtype.coe_mk] rfl rcases @mem_generatePiSystem_iUnion_elim α (Subtype s) (g ∘ Subtype.val) (fun b => h_pi b.val b.property) t this with ⟨T, ⟨f, ⟨rfl, h_t'⟩⟩⟩ refine ⟨T.image (fun x : s => (x : β)), Function.extend (fun x : s => (x : β)) f fun _ : β => (∅ : Set α), by simp, ?_, ?_⟩ · ext a constructor <;> · simp -proj only [Set.mem_iInter, Subtype.forall, Finset.set_biInter_finset_image] intro h1 b h_b h_b_in_T have h2 := h1 b h_b h_b_in_T revert h2 rw [Subtype.val_injective.extend_apply] apply id · intros b h_b	simp_rw [Finset.mem_image, Subtype.exists, exists_and_right, exists_eq_right] at h_b obtain ⟨h_b_w, h_b_h⟩ := h_b have h_b_alt : b = (Subtype.mk b h_b_w).val := rfl rw [h_b_alt, Subtype.val_injective.extend_apply] apply h_t' apply h_b_h section UnionInter variable {α ι : Type*} /-! ### π-system generated by finite intersections of sets of a π-system family -/ /-- From a set of indices `S : Set ι` and a family of sets of sets `π : ι → Set (Set α)`, define the set of sets that can be written as `⋂ x ∈ t, f x` for some finset `t ⊆ S` and sets `f x ∈ π x`. If `π` is a family of π-systems, then it is a π-system. -/ def piiUnionInter (π : ι → Set (Set α)) (S : Set ι) : Set (Set α) := { s : Set α \| ∃ (t : Finset ι) (_ : ↑t ⊆ S) (f : ι → Set α) (_ : ∀ x, x ∈ t → f x ∈ π x), s = ⋂ x ∈ t, f x } theorem piiUnionInter_singleton (π : ι → Set (Set α)) (i : ι) : piiUnionInter π {i} = π i ∪ {univ} := by ext1 s simp only [piiUnionInter, exists_prop, mem_union] refine ⟨?_, fun h => ?_⟩ · rintro ⟨t, hti, f, hfπ, rfl⟩ simp only [subset_singleton_iff, Finset.mem_coe] at hti by_cases hi : i ∈ t · have ht_eq_i : t = {i} := by	Mathlib/MeasureTheory/PiSystem.lean	314	344
/- Copyright (c) 2018 Simon Hudon. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon, Sean Leather -/ import Mathlib.Algebra.Group.Opposite import Mathlib.Algebra.FreeMonoid.Basic import Mathlib.Control.Traversable.Instances import Mathlib.Control.Traversable.Lemmas import Mathlib.CategoryTheory.Endomorphism import Mathlib.CategoryTheory.Types import Mathlib.CategoryTheory.Category.KleisliCat import Mathlib.Tactic.AdaptationNote /-! # List folds generalized to `Traversable` Informally, we can think of `foldl` as a special case of `traverse` where we do not care about the reconstructed data structure and, in a state monad, we care about the final state. The obvious way to define `foldl` would be to use the state monad but it is nicer to reason about a more abstract interface with `foldMap` as a primitive and `foldMap_hom` as a defining property. ``` def foldMap {α ω} [One ω] [Mul ω] (f : α → ω) : t α → ω := ... lemma foldMap_hom (α β) [Monoid α] [Monoid β] (f : α →* β) (g : γ → α) (x : t γ) : f (foldMap g x) = foldMap (f ∘ g) x := ... ``` `foldMap` uses a monoid ω to accumulate a value for every element of a data structure and `foldMap_hom` uses a monoid homomorphism to substitute the monoid used by `foldMap`. The two are sufficient to define `foldl`, `foldr` and `toList`. `toList` permits the formulation of specifications in terms of operations on lists. Each fold function can be defined using a specialized monoid. `toList` uses a free monoid represented as a list with concatenation while `foldl` uses endofunctions together with function composition. The definition through monoids uses `traverse` together with the applicative functor `const m` (where `m` is the monoid). As an implementation, `const` guarantees that no resource is spent on reconstructing the structure during traversal. A special class could be defined for `foldable`, similarly to Haskell, but the author cannot think of instances of `foldable` that are not also `Traversable`. -/ universe u v open ULift CategoryTheory MulOpposite namespace Monoid variable {m : Type u → Type u} [Monad m] variable {α β : Type u} /-- For a list, foldl f x [y₀,y₁] reduces as follows: ``` calc foldl f x [y₀,y₁] = foldl f (f x y₀) [y₁] : rfl ... = foldl f (f (f x y₀) y₁) [] : rfl ... = f (f x y₀) y₁ : rfl ``` with ``` f : α → β → α x : α [y₀,y₁] : List β ``` We can view the above as a composition of functions: ``` ... = f (f x y₀) y₁ : rfl ... = flip f y₁ (flip f y₀ x) : rfl ... = (flip f y₁ ∘ flip f y₀) x : rfl ``` We can use traverse and const to construct this composition: ``` calc const.run (traverse (fun y ↦ const.mk' (flip f y)) [y₀,y₁]) x = const.run ((::) <$> const.mk' (flip f y₀) <> traverse (fun y ↦ const.mk' (flip f y)) [y₁]) x ... = const.run ((::) <$> const.mk' (flip f y₀) <> ( (::) <$> const.mk' (flip f y₁) <> traverse (fun y ↦ const.mk' (flip f y)) [] )) x ... = const.run ((::) <$> const.mk' (flip f y₀) <> ( (::) <$> const.mk' (flip f y₁) <> pure [] )) x ... = const.run ( ((::) <$> const.mk' (flip f y₁) <> pure []) ∘ ((::) <$> const.mk' (flip f y₀)) ) x ... = const.run ( const.mk' (flip f y₁) ∘ const.mk' (flip f y₀) ) x ... = const.run ( flip f y₁ ∘ flip f y₀ ) x ... = f (f x y₀) y₁ ``` And this is how `const` turns a monoid into an applicative functor and how the monoid of endofunctions define `Foldl`. -/ abbrev Foldl (α : Type u) : Type u := (End α)ᵐᵒᵖ def Foldl.mk (f : α → α) : Foldl α := op f def Foldl.get (x : Foldl α) : α → α := unop x @[simps] def Foldl.ofFreeMonoid (f : β → α → β) : FreeMonoid α →* Monoid.Foldl β where toFun xs := op <\| flip (List.foldl f) (FreeMonoid.toList xs) map_one' := rfl map_mul' := by intros simp only [FreeMonoid.toList_mul, unop_op, List.foldl_append, op_inj, Function.flip_def] rfl abbrev Foldr (α : Type u) : Type u := End α def Foldr.mk (f : α → α) : Foldr α := f def Foldr.get (x : Foldr α) : α → α := x @[simps] def Foldr.ofFreeMonoid (f : α → β → β) : FreeMonoid α →* Monoid.Foldr β where toFun xs := flip (List.foldr f) (FreeMonoid.toList xs) map_one' := rfl map_mul' _ _ := funext fun _ => List.foldr_append abbrev foldlM (m : Type u → Type u) [Monad m] (α : Type u) : Type u := MulOpposite <\| End <\| KleisliCat.mk m α def foldlM.mk (f : α → m α) : foldlM m α := op f def foldlM.get (x : foldlM m α) : α → m α := unop x @[simps] def foldlM.ofFreeMonoid [LawfulMonad m] (f : β → α → m β) : FreeMonoid α →* Monoid.foldlM m β where toFun xs := op <\| flip (List.foldlM f) (FreeMonoid.toList xs) map_one' := rfl map_mul' := by intros; apply unop_injective; funext; apply List.foldlM_append abbrev foldrM (m : Type u → Type u) [Monad m] (α : Type u) : Type u := End <\| KleisliCat.mk m α def foldrM.mk (f : α → m α) : foldrM m α := f def foldrM.get (x : foldrM m α) : α → m α := x @[simps] def foldrM.ofFreeMonoid [LawfulMonad m] (f : α → β → m β) : FreeMonoid α →* Monoid.foldrM m β where toFun xs := flip (List.foldrM f) (FreeMonoid.toList xs) map_one' := rfl map_mul' := by intros; funext; apply List.foldrM_append end Monoid namespace Traversable open Monoid Functor section Defs variable {α β : Type u} {t : Type u → Type u} [Traversable t] def foldMap {α ω} [One ω] [Mul ω] (f : α → ω) : t α → ω := traverse (Const.mk' ∘ f) def foldl (f : α → β → α) (x : α) (xs : t β) : α := (foldMap (Foldl.mk ∘ flip f) xs).get x def foldr (f : α → β → β) (x : β) (xs : t α) : β := (foldMap (Foldr.mk ∘ f) xs).get x /-- Conceptually, `toList` collects all the elements of a collection in a list. This idea is formalized by `lemma toList_spec (x : t α) : toList x = foldMap FreeMonoid.mk x`. The definition of `toList` is based on `foldl` and `List.cons` for speed. It is faster than using `foldMap FreeMonoid.mk` because, by using `foldl` and `List.cons`, each insertion is done in constant time. As a consequence, `toList` performs in linear. On the other hand, `foldMap FreeMonoid.mk` creates a singleton list around each element and concatenates all the resulting lists. In `xs ++ ys`, concatenation takes a time proportional to `length xs`. Since the order in which concatenation is evaluated is unspecified, nothing prevents each element of the traversable to be appended at the end `xs ++ [x]` which would yield a `O(n²)` run time. -/ def toList : t α → List α := List.reverse ∘ foldl (flip List.cons) [] def length (xs : t α) : ℕ := down <\| foldl (fun l _ => up <\| l.down + 1) (up 0) xs variable {m : Type u → Type u} [Monad m] def foldlm (f : α → β → m α) (x : α) (xs : t β) : m α := (foldMap (foldlM.mk ∘ flip f) xs).get x def foldrm (f : α → β → m β) (x : β) (xs : t α) : m β := (foldMap (foldrM.mk ∘ f) xs).get x end Defs section ApplicativeTransformation variable {α β γ : Type u} open Function hiding const def mapFold [Monoid α] [Monoid β] (f : α →* β) : ApplicativeTransformation (Const α) (Const β) where app _ := f preserves_seq' := by intros; simp only [Seq.seq, map_mul] preserves_pure' := by intros; simp only [map_one, pure] theorem Free.map_eq_map (f : α → β) (xs : List α) : f <$> xs = (FreeMonoid.toList (FreeMonoid.map f (FreeMonoid.ofList xs))) := rfl theorem foldl.unop_ofFreeMonoid (f : β → α → β) (xs : FreeMonoid α) (a : β) : unop (Foldl.ofFreeMonoid f xs) a = List.foldl f a (FreeMonoid.toList xs) := rfl variable {t : Type u → Type u} [Traversable t] [LawfulTraversable t] open LawfulTraversable theorem foldMap_hom [Monoid α] [Monoid β] (f : α →* β) (g : γ → α) (x : t γ) : f (foldMap g x) = foldMap (f ∘ g) x := calc f (foldMap g x) = f (traverse (Const.mk' ∘ g) x) := rfl _ = (mapFold f).app _ (traverse (Const.mk' ∘ g) x) := rfl _ = traverse ((mapFold f).app _ ∘ Const.mk' ∘ g) x := naturality (mapFold f) _ _ _ = foldMap (f ∘ g) x := rfl theorem foldMap_hom_free [Monoid β] (f : FreeMonoid α →* β) (x : t α) : f (foldMap FreeMonoid.of x) = foldMap (f ∘ FreeMonoid.of) x := foldMap_hom f _ x end ApplicativeTransformation section Equalities open LawfulTraversable open List (cons) variable {α β γ : Type u} variable {t : Type u → Type u} [Traversable t] [LawfulTraversable t] @[simp] theorem foldl.ofFreeMonoid_comp_of (f : α → β → α) : Foldl.ofFreeMonoid f ∘ FreeMonoid.of = Foldl.mk ∘ flip f := rfl @[simp] theorem foldr.ofFreeMonoid_comp_of (f : β → α → α) : Foldr.ofFreeMonoid f ∘ FreeMonoid.of = Foldr.mk ∘ f := rfl @[simp] theorem foldlm.ofFreeMonoid_comp_of {m} [Monad m] [LawfulMonad m] (f : α → β → m α) : foldlM.ofFreeMonoid f ∘ FreeMonoid.of = foldlM.mk ∘ flip f := by ext1 x simp only [foldlM.ofFreeMonoid, Function.flip_def, MonoidHom.coe_mk, OneHom.coe_mk, Function.comp_apply, FreeMonoid.toList_of, List.foldlM_cons, List.foldlM_nil, bind_pure, foldlM.mk, op_inj] rfl @[simp] theorem foldrm.ofFreeMonoid_comp_of {m} [Monad m] [LawfulMonad m] (f : β → α → m α) : foldrM.ofFreeMonoid f ∘ FreeMonoid.of = foldrM.mk ∘ f := by ext simp [(· ∘ ·), foldrM.ofFreeMonoid, foldrM.mk, Function.flip_def] theorem toList_spec (xs : t α) : toList xs = FreeMonoid.toList (foldMap FreeMonoid.of xs) := Eq.symm <\| calc FreeMonoid.toList (foldMap FreeMonoid.of xs) = FreeMonoid.toList (foldMap FreeMonoid.of xs).reverse.reverse := by simp only [FreeMonoid.reverse_reverse] _ = (List.foldr cons [] (foldMap FreeMonoid.of xs).toList.reverse).reverse := by simp _ = (unop (Foldl.ofFreeMonoid (flip cons) (foldMap FreeMonoid.of xs)) []).reverse := by simp [Function.flip_def, List.foldr_reverse, Foldl.ofFreeMonoid, unop_op] _ = toList xs := by rw [foldMap_hom_free (Foldl.ofFreeMonoid (flip <\| @cons α))] simp only [toList, foldl, List.reverse_inj, Foldl.get, foldl.ofFreeMonoid_comp_of, Function.comp_apply] theorem foldMap_map [Monoid γ] (f : α → β) (g : β → γ) (xs : t α) : foldMap g (f <$> xs) = foldMap (g ∘ f) xs := by simp only [foldMap, traverse_map, Function.comp_def] theorem foldl_toList (f : α → β → α) (xs : t β) (x : α) : foldl f x xs = List.foldl f x (toList xs) := by rw [← FreeMonoid.toList_ofList (toList xs), ← foldl.unop_ofFreeMonoid] simp only [foldl, toList_spec, foldMap_hom_free, foldl.ofFreeMonoid_comp_of, Foldl.get, FreeMonoid.ofList_toList] theorem foldr_toList (f : α → β → β) (xs : t α) (x : β) : foldr f x xs = List.foldr f x (toList xs) := by change _ = Foldr.ofFreeMonoid _ (FreeMonoid.ofList <\| toList xs) _ rw [toList_spec, foldr, Foldr.get, FreeMonoid.ofList_toList, foldMap_hom_free, foldr.ofFreeMonoid_comp_of] theorem toList_map (f : α → β) (xs : t α) : toList (f <$> xs) = f <$> toList xs := by simp only [toList_spec, Free.map_eq_map, foldMap_hom, foldMap_map, FreeMonoid.ofList_toList, FreeMonoid.map_of, Function.comp_def] @[simp]	theorem foldl_map (g : β → γ) (f : α → γ → α) (a : α) (l : t β) : foldl f a (g <$> l) = foldl (fun x y => f x (g y)) a l := by simp only [foldl, foldMap_map, Function.comp_def, Function.flip_def] @[simp] theorem foldr_map (g : β → γ) (f : γ → α → α) (a : α) (l : t β) :	Mathlib/Control/Fold.lean	326	331
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Kenny Lau -/ import Mathlib.Data.List.Forall2 /-! # Lists with no duplicates `List.Nodup` is defined in `Data/List/Basic`. In this file we prove various properties of this predicate. -/ universe u v open Function variable {α : Type u} {β : Type v} {l l₁ l₂ : List α} {r : α → α → Prop} {a : α} namespace List protected theorem Pairwise.nodup {l : List α} {r : α → α → Prop} [IsIrrefl α r] (h : Pairwise r l) : Nodup l := h.imp ne_of_irrefl open scoped Relator in theorem rel_nodup {r : α → β → Prop} (hr : Relator.BiUnique r) : (Forall₂ r ⇒ (· ↔ ·)) Nodup Nodup \| _, _, Forall₂.nil => by simp only [nodup_nil] \| _, _, Forall₂.cons hab h => by simpa only [nodup_cons] using Relator.rel_and (Relator.rel_not (rel_mem hr hab h)) (rel_nodup hr h) protected theorem Nodup.cons (ha : a ∉ l) (hl : Nodup l) : Nodup (a :: l) := nodup_cons.2 ⟨ha, hl⟩ theorem nodup_singleton (a : α) : Nodup [a] := pairwise_singleton _ _ theorem Nodup.of_cons (h : Nodup (a :: l)) : Nodup l := (nodup_cons.1 h).2 theorem Nodup.not_mem (h : (a :: l).Nodup) : a ∉ l := (nodup_cons.1 h).1 theorem not_nodup_cons_of_mem : a ∈ l → ¬Nodup (a :: l) := imp_not_comm.1 Nodup.not_mem theorem not_nodup_pair (a : α) : ¬Nodup [a, a] := not_nodup_cons_of_mem <\| mem_singleton_self _ theorem nodup_iff_sublist {l : List α} : Nodup l ↔ ∀ a, ¬[a, a] <+ l := ⟨fun d a h => not_nodup_pair a (d.sublist h), by induction l <;> intro h; · exact nodup_nil case cons a l IH => exact (IH fun a s => h a <\| sublist_cons_of_sublist _ s).cons fun al => h a <\| (singleton_sublist.2 al).cons_cons _⟩ @[simp] theorem nodup_mergeSort {l : List α} {le : α → α → Bool} : (l.mergeSort le).Nodup ↔ l.Nodup := (mergeSort_perm l le).nodup_iff protected alias ⟨_, Nodup.mergeSort⟩ := nodup_mergeSort theorem nodup_iff_injective_getElem {l : List α} : Nodup l ↔ Function.Injective (fun i : Fin l.length => l[i.1]) := pairwise_iff_getElem.trans ⟨fun h i j hg => by obtain ⟨i, hi⟩ := i; obtain ⟨j, hj⟩ := j rcases lt_trichotomy i j with (hij \| rfl \| hji) · exact (h i j hi hj hij hg).elim · rfl · exact (h j i hj hi hji hg.symm).elim, fun hinj i j hi hj hij h => Nat.ne_of_lt hij (Fin.val_eq_of_eq (@hinj ⟨i, hi⟩ ⟨j, hj⟩ h))⟩ theorem nodup_iff_injective_get {l : List α} : Nodup l ↔ Function.Injective l.get := by rw [nodup_iff_injective_getElem] change _ ↔ Injective (fun i => l.get i) simp theorem Nodup.get_inj_iff {l : List α} (h : Nodup l) {i j : Fin l.length} : l.get i = l.get j ↔ i = j := (nodup_iff_injective_get.1 h).eq_iff theorem Nodup.getElem_inj_iff {l : List α} (h : Nodup l) {i : Nat} {hi : i < l.length} {j : Nat} {hj : j < l.length} : l[i] = l[j] ↔ i = j := by have := @Nodup.get_inj_iff _ _ h ⟨i, hi⟩ ⟨j, hj⟩ simpa theorem nodup_iff_getElem?_ne_getElem? {l : List α} : l.Nodup ↔ ∀ i j : ℕ, i < j → j < l.length → l[i]? ≠ l[j]? := by rw [Nodup, pairwise_iff_getElem] constructor · intro h i j hij hj rw [getElem?_eq_getElem (lt_trans hij hj), getElem?_eq_getElem hj, Ne, Option.some_inj] exact h _ _ (by omega) hj hij · intro h i j hi hj hij rw [Ne, ← Option.some_inj, ← getElem?_eq_getElem, ← getElem?_eq_getElem] exact h i j hij hj set_option linter.deprecated false in @[deprecated nodup_iff_getElem?_ne_getElem? (since := "2025-02-17")] theorem nodup_iff_get?_ne_get? {l : List α} : l.Nodup ↔ ∀ i j : ℕ, i < j → j < l.length → l.get? i ≠ l.get? j := by simp [nodup_iff_getElem?_ne_getElem?] theorem Nodup.ne_singleton_iff {l : List α} (h : Nodup l) (x : α) : l ≠ [x] ↔ l = [] ∨ ∃ y ∈ l, y ≠ x := by induction l with \| nil => simp \| cons hd tl hl => specialize hl h.of_cons by_cases hx : tl = [x] · simpa [hx, and_comm, and_or_left] using h · rw [← Ne, hl] at hx rcases hx with (rfl \| ⟨y, hy, hx⟩) · simp · suffices ∃ y ∈ hd :: tl, y ≠ x by simpa [ne_nil_of_mem hy] exact ⟨y, mem_cons_of_mem _ hy, hx⟩ theorem not_nodup_of_get_eq_of_ne (xs : List α) (n m : Fin xs.length) (h : xs.get n = xs.get m) (hne : n ≠ m) : ¬Nodup xs := by rw [nodup_iff_injective_get] exact fun hinj => hne (hinj h) theorem idxOf_getElem [DecidableEq α] {l : List α} (H : Nodup l) (i : Nat) (h : i < l.length) : idxOf l[i] l = i := suffices (⟨idxOf l[i] l, idxOf_lt_length_iff.2 (getElem_mem _)⟩ : Fin l.length) = ⟨i, h⟩ from Fin.val_eq_of_eq this nodup_iff_injective_get.1 H (by simp) @[deprecated (since := "2025-01-30")] alias indexOf_getElem := idxOf_getElem -- This is incorrectly named and should be `idxOf_get`; -- this already exists, so will require a deprecation dance. theorem get_idxOf [DecidableEq α] {l : List α} (H : Nodup l) (i : Fin l.length) : idxOf (get l i) l = i := by simp [idxOf_getElem, H] @[deprecated (since := "2025-01-30")] alias get_indexOf := get_idxOf theorem nodup_iff_count_le_one [DecidableEq α] {l : List α} : Nodup l ↔ ∀ a, count a l ≤ 1 := nodup_iff_sublist.trans <\| forall_congr' fun a => have : replicate 2 a <+ l ↔ 1 < count a l := (le_count_iff_replicate_sublist ..).symm (not_congr this).trans not_lt theorem nodup_iff_count_eq_one [DecidableEq α] : Nodup l ↔ ∀ a ∈ l, count a l = 1 := nodup_iff_count_le_one.trans <\| forall_congr' fun _ => ⟨fun H h => H.antisymm (count_pos_iff.mpr h), fun H => if h : _ then (H h).le else (count_eq_zero.mpr h).trans_le (Nat.zero_le 1)⟩ @[simp] theorem count_eq_one_of_mem [DecidableEq α] {a : α} {l : List α} (d : Nodup l) (h : a ∈ l) : count a l = 1 := _root_.le_antisymm (nodup_iff_count_le_one.1 d a) (Nat.succ_le_of_lt (count_pos_iff.2 h)) theorem count_eq_of_nodup [DecidableEq α] {a : α} {l : List α} (d : Nodup l) : count a l = if a ∈ l then 1 else 0 := by split_ifs with h · exact count_eq_one_of_mem d h · exact count_eq_zero_of_not_mem h theorem Nodup.of_append_left : Nodup (l₁ ++ l₂) → Nodup l₁ := Nodup.sublist (sublist_append_left l₁ l₂) theorem Nodup.of_append_right : Nodup (l₁ ++ l₂) → Nodup l₂ := Nodup.sublist (sublist_append_right l₁ l₂) theorem nodup_append {l₁ l₂ : List α} : Nodup (l₁ ++ l₂) ↔ Nodup l₁ ∧ Nodup l₂ ∧ Disjoint l₁ l₂ := by simp only [Nodup, pairwise_append, disjoint_iff_ne] theorem disjoint_of_nodup_append {l₁ l₂ : List α} (d : Nodup (l₁ ++ l₂)) : Disjoint l₁ l₂ := (nodup_append.1 d).2.2 theorem Nodup.append (d₁ : Nodup l₁) (d₂ : Nodup l₂) (dj : Disjoint l₁ l₂) : Nodup (l₁ ++ l₂) := nodup_append.2 ⟨d₁, d₂, dj⟩ theorem nodup_append_comm {l₁ l₂ : List α} : Nodup (l₁ ++ l₂) ↔ Nodup (l₂ ++ l₁) := by simp only [nodup_append, and_left_comm, disjoint_comm] theorem nodup_middle {a : α} {l₁ l₂ : List α} : Nodup (l₁ ++ a :: l₂) ↔ Nodup (a :: (l₁ ++ l₂)) := by simp only [nodup_append, not_or, and_left_comm, and_assoc, nodup_cons, mem_append, disjoint_cons_right] theorem Nodup.of_map (f : α → β) {l : List α} : Nodup (map f l) → Nodup l := (Pairwise.of_map f) fun _ _ => mt <\| congr_arg f theorem Nodup.map_on {f : α → β} (H : ∀ x ∈ l, ∀ y ∈ l, f x = f y → x = y) (d : Nodup l) : (map f l).Nodup := Pairwise.map _ (fun a b ⟨ma, mb, n⟩ e => n (H a ma b mb e)) (Pairwise.and_mem.1 d) theorem inj_on_of_nodup_map {f : α → β} {l : List α} (d : Nodup (map f l)) : ∀ ⦃x⦄, x ∈ l → ∀ ⦃y⦄, y ∈ l → f x = f y → x = y := by induction l with \| nil => simp \| cons hd tl ih => simp only [map, nodup_cons, mem_map, not_exists, not_and, ← Ne.eq_def] at d simp only [mem_cons] rintro _ (rfl \| h₁) _ (rfl \| h₂) h₃ · rfl · apply (d.1 _ h₂ h₃.symm).elim · apply (d.1 _ h₁ h₃).elim · apply ih d.2 h₁ h₂ h₃ theorem nodup_map_iff_inj_on {f : α → β} {l : List α} (d : Nodup l) : Nodup (map f l) ↔ ∀ x ∈ l, ∀ y ∈ l, f x = f y → x = y := ⟨inj_on_of_nodup_map, fun h => d.map_on h⟩ protected theorem Nodup.map {f : α → β} (hf : Injective f) : Nodup l → Nodup (map f l) := Nodup.map_on fun _ _ _ _ h => hf h theorem nodup_map_iff {f : α → β} {l : List α} (hf : Injective f) : Nodup (map f l) ↔ Nodup l := ⟨Nodup.of_map _, Nodup.map hf⟩ @[simp] theorem nodup_attach {l : List α} : Nodup (attach l) ↔ Nodup l := ⟨fun h => attach_map_subtype_val l ▸ h.map fun _ _ => Subtype.eq, fun h => Nodup.of_map Subtype.val ((attach_map_subtype_val l).symm ▸ h)⟩ protected alias ⟨Nodup.of_attach, Nodup.attach⟩ := nodup_attach theorem Nodup.pmap {p : α → Prop} {f : ∀ a, p a → β} {l : List α} {H} (hf : ∀ a ha b hb, f a ha = f b hb → a = b) (h : Nodup l) : Nodup (pmap f l H) := by rw [pmap_eq_map_attach] exact h.attach.map fun ⟨a, ha⟩ ⟨b, hb⟩ h => by congr; exact hf a (H _ ha) b (H _ hb) h theorem Nodup.filter (p : α → Bool) {l} : Nodup l → Nodup (filter p l) := by simpa using Pairwise.filter p @[simp] theorem nodup_reverse {l : List α} : Nodup (reverse l) ↔ Nodup l := pairwise_reverse.trans <\| by simp only [Nodup, Ne, eq_comm] lemma nodup_tail_reverse (l : List α) (h : l[0]? = l.getLast?) : Nodup l.reverse.tail ↔ Nodup l.tail := by induction l with \| nil => simp \| cons a l ih => by_cases hl : l = [] · aesop · simp_all only [List.tail_reverse, List.nodup_reverse, List.dropLast_cons_of_ne_nil hl, List.tail_cons] simp only [length_cons, Nat.zero_lt_succ, getElem?_eq_getElem, getElem_cons_zero, Nat.add_one_sub_one, Nat.lt_add_one, Option.some.injEq, List.getElem_cons, show l.length ≠ 0 by aesop, ↓reduceDIte, getLast?_eq_getElem?] at h rw [h, show l.Nodup = (l.dropLast ++ [l.getLast hl]).Nodup by simp [List.dropLast_eq_take], List.nodup_append_comm] simp [List.getLast_eq_getElem] theorem Nodup.erase_getElem [DecidableEq α] {l : List α} (hl : l.Nodup) (i : Nat) (h : i < l.length) : 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 => rw [nodup_cons] at hl rw [erase_cons_tail] · simp [IH hl.2] · rw [beq_iff_eq] simp only [getElem_cons_succ] simp only [length_cons, Nat.succ_eq_add_one, Nat.add_lt_add_iff_right] at h exact mt (· ▸ getElem_mem h) hl.1 theorem Nodup.erase_get [DecidableEq α] {l : List α} (hl : l.Nodup) (i : Fin l.length) : l.erase (l.get i) = l.eraseIdx ↑i := by simp [erase_getElem, hl] theorem Nodup.diff [DecidableEq α] : l₁.Nodup → (l₁.diff l₂).Nodup := Nodup.sublist <\| diff_sublist _ _ theorem nodup_flatten {L : List (List α)} : Nodup (flatten L) ↔ (∀ l ∈ L, Nodup l) ∧ Pairwise Disjoint L := by simp only [Nodup, pairwise_flatten, disjoint_left.symm, forall_mem_ne] @[deprecated (since := "2025-10-15")] alias nodup_join := nodup_flatten theorem nodup_flatMap {l₁ : List α} {f : α → List β} : Nodup (l₁.flatMap f) ↔ (∀ x ∈ l₁, Nodup (f x)) ∧ Pairwise (Disjoint on f) l₁ := by simp only [List.flatMap, nodup_flatten, pairwise_map, and_comm, and_left_comm, mem_map, exists_imp, and_imp] rw [show (∀ (l : List β) (x : α), f x = l → x ∈ l₁ → Nodup l) ↔ ∀ x : α, x ∈ l₁ → Nodup (f x) from forall_swap.trans <\| forall_congr' fun _ => forall_eq'] @[deprecated (since := "2025-10-16")] alias nodup_bind := nodup_flatMap protected theorem Nodup.product {l₂ : List β} (d₁ : l₁.Nodup) (d₂ : l₂.Nodup) : (l₁ ×ˢ l₂).Nodup := nodup_flatMap.2 ⟨fun a _ => d₂.map <\| LeftInverse.injective fun b => (rfl : (a, b).2 = b), d₁.imp fun {a₁ a₂} n x h₁ h₂ => by rcases mem_map.1 h₁ with ⟨b₁, _, rfl⟩ rcases mem_map.1 h₂ with ⟨b₂, mb₂, ⟨⟩⟩ exact n rfl⟩ theorem Nodup.sigma {σ : α → Type*} {l₂ : ∀ a, List (σ a)} (d₁ : Nodup l₁) (d₂ : ∀ a, Nodup (l₂ a)) : (l₁.sigma l₂).Nodup := nodup_flatMap.2 ⟨fun a _ => (d₂ a).map fun b b' h => by injection h with _ h, d₁.imp fun {a₁ a₂} n x h₁ h₂ => by rcases mem_map.1 h₁ with ⟨b₁, _, rfl⟩ rcases mem_map.1 h₂ with ⟨b₂, mb₂, ⟨⟩⟩ exact n rfl⟩ protected theorem Nodup.filterMap {f : α → Option β} (h : ∀ a a' b, b ∈ f a → b ∈ f a' → a = a') : Nodup l → Nodup (filterMap f l) := (Pairwise.filterMap f) @fun a a' n b bm b' bm' e => n <\| h a a' b' (by rw [← e]; exact bm) bm' protected theorem Nodup.concat (h : a ∉ l) (h' : l.Nodup) : (l.concat a).Nodup := by rw [concat_eq_append]; exact h'.append (nodup_singleton _) (disjoint_singleton.2 h) protected theorem Nodup.insert [DecidableEq α] (h : l.Nodup) : (l.insert a).Nodup := if h' : a ∈ l then by rw [insert_of_mem h']; exact h else by rw [insert_of_not_mem h', nodup_cons]; constructor <;> assumption theorem Nodup.union [DecidableEq α] (l₁ : List α) (h : Nodup l₂) : (l₁ ∪ l₂).Nodup := by induction l₁ generalizing l₂ with \| nil => exact h \| cons a l₁ ih => exact (ih h).insert theorem Nodup.inter [DecidableEq α] (l₂ : List α) : Nodup l₁ → Nodup (l₁ ∩ l₂) := Nodup.filter _ theorem Nodup.diff_eq_filter [BEq α] [LawfulBEq α] : ∀ {l₁ l₂ : List α} (_ : l₁.Nodup), l₁.diff l₂ = l₁.filter (· ∉ l₂) \| l₁, [], _ => by simp \| l₁, a :: l₂, hl₁ => by rw [diff_cons, (hl₁.erase _).diff_eq_filter, hl₁.erase_eq_filter, filter_filter] simp only [decide_not, bne, Bool.and_comm, mem_cons, not_or, decide_mem_cons, Bool.not_or] theorem Nodup.mem_diff_iff [DecidableEq α] (hl₁ : l₁.Nodup) : a ∈ l₁.diff l₂ ↔ a ∈ l₁ ∧ a ∉ l₂ := by rw [hl₁.diff_eq_filter, mem_filter, decide_eq_true_iff] protected theorem Nodup.set : ∀ {l : List α} {n : ℕ} {a : α} (_ : l.Nodup) (_ : a ∉ l), (l.set n a).Nodup \| [], _, _, _, _ => nodup_nil \| _ :: _, 0, _, hl, ha => nodup_cons.2 ⟨mt (mem_cons_of_mem _) ha, (nodup_cons.1 hl).2⟩ \| _ :: _, _ + 1, _, hl, ha => nodup_cons.2 ⟨fun h => (mem_or_eq_of_mem_set h).elim (nodup_cons.1 hl).1 fun hba => ha (hba ▸ mem_cons_self), hl.of_cons.set (mt (mem_cons_of_mem _) ha)⟩ theorem Nodup.map_update [DecidableEq α] {l : List α} (hl : l.Nodup) (f : α → β) (x : α) (y : β) : l.map (Function.update f x y) = if x ∈ l then (l.map f).set (l.idxOf x) y else l.map f := by induction l with \| nil => simp \| cons hd tl ihl => ?_ rw [nodup_cons] at hl simp only [mem_cons, map, ihl hl.2] by_cases H : hd = x · subst hd simp [set, hl.1] · simp [Ne.symm H, H, set, ← apply_ite (cons (f hd))] theorem Nodup.pairwise_of_forall_ne {l : List α} {r : α → α → Prop} (hl : l.Nodup) (h : ∀ a ∈ l, ∀ b ∈ l, a ≠ b → r a b) : l.Pairwise r := by rw [pairwise_iff_forall_sublist] intro a b hab if heq : a = b then cases heq; have := nodup_iff_sublist.mp hl _ hab; contradiction else apply h <;> try (apply hab.subset; simp) exact heq theorem Nodup.take_eq_filter_mem [DecidableEq α] : ∀ {l : List α} {n : ℕ} (_ : l.Nodup), l.take n = l.filter (l.take n).elem \| [], n, _ => by simp \| b::l, 0, _ => by simp \| b::l, n+1, hl => by rw [take_succ_cons, Nodup.take_eq_filter_mem (Nodup.of_cons hl), filter_cons_of_pos (by simp)] congr 1 refine List.filter_congr ?_ intro x hx have : x ≠ b := fun h => (nodup_cons.1 hl).1 (h ▸ hx) simp +contextual [List.mem_filter, this, hx] end List theorem Option.toList_nodup : ∀ o : Option α, o.toList.Nodup \| none => List.nodup_nil \| some x => List.nodup_singleton x		Mathlib/Data/List/Nodup.lean	473	481
/- Copyright (c) 2018 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Markus Himmel -/ import Mathlib.CategoryTheory.EpiMono import Mathlib.CategoryTheory.Limits.HasLimits /-! # Equalizers and coequalizers This file defines (co)equalizers as special cases of (co)limits. An equalizer is the categorical generalization of the subobject {a ∈ A \| f(a) = g(a)} known from abelian groups or modules. It is a limit cone over the diagram formed by `f` and `g`. A coequalizer is the dual concept. ## Main definitions * `WalkingParallelPair` is the indexing category used for (co)equalizer_diagrams * `parallelPair` is a functor from `WalkingParallelPair` to our category `C`. * a `fork` is a cone over a parallel pair. * there is really only one interesting morphism in a fork: the arrow from the vertex of the fork to the domain of f and g. It is called `fork.ι`. * an `equalizer` is now just a `limit (parallelPair f g)` Each of these has a dual. ## Main statements * `equalizer.ι_mono` states that every equalizer map is a monomorphism * `isIso_limit_cone_parallelPair_of_self` states that the identity on the domain of `f` is an equalizer of `f` and `f`. ## Implementation notes As with the other special shapes in the limits library, all the definitions here are given as `abbreviation`s of the general statements for limits, so all the `simp` lemmas and theorems about general limits can be used. ## References * [F. Borceux, Handbook of Categorical Algebra 1][borceux-vol1] -/ section open CategoryTheory Opposite namespace CategoryTheory.Limits universe v v₂ u u₂ /-- The type of objects for the diagram indexing a (co)equalizer. -/ inductive WalkingParallelPair : Type \| zero \| one deriving DecidableEq, Inhabited open WalkingParallelPair -- Don't generate unnecessary `sizeOf_spec` lemma which the `simpNF` linter will complain about. set_option genSizeOfSpec false in /-- The type family of morphisms for the diagram indexing a (co)equalizer. -/ inductive WalkingParallelPairHom : WalkingParallelPair → WalkingParallelPair → Type \| left : WalkingParallelPairHom zero one \| right : WalkingParallelPairHom zero one \| id (X : WalkingParallelPair) : WalkingParallelPairHom X X deriving DecidableEq /-- Satisfying the inhabited linter -/ instance : Inhabited (WalkingParallelPairHom zero one) where default := WalkingParallelPairHom.left open WalkingParallelPairHom /-- Composition of morphisms in the indexing diagram for (co)equalizers. -/ def WalkingParallelPairHom.comp : -- Porting note: changed X Y Z to implicit to match comp fields in precategory ∀ {X Y Z : WalkingParallelPair} (_ : WalkingParallelPairHom X Y) (_ : WalkingParallelPairHom Y Z), WalkingParallelPairHom X Z \| _, _, _, id _, h => h \| _, _, _, left, id one => left \| _, _, _, right, id one => right -- Porting note: adding these since they are simple and aesop couldn't directly prove them theorem WalkingParallelPairHom.id_comp {X Y : WalkingParallelPair} (g : WalkingParallelPairHom X Y) : comp (id X) g = g := rfl theorem WalkingParallelPairHom.comp_id {X Y : WalkingParallelPair} (f : WalkingParallelPairHom X Y) : comp f (id Y) = f := by cases f <;> rfl theorem WalkingParallelPairHom.assoc {X Y Z W : WalkingParallelPair} (f : WalkingParallelPairHom X Y) (g : WalkingParallelPairHom Y Z) (h : WalkingParallelPairHom Z W) : comp (comp f g) h = comp f (comp g h) := by cases f <;> cases g <;> cases h <;> rfl instance walkingParallelPairHomCategory : SmallCategory WalkingParallelPair where Hom := WalkingParallelPairHom id := id comp := comp comp_id := comp_id id_comp := id_comp assoc := assoc @[simp] theorem walkingParallelPairHom_id (X : WalkingParallelPair) : WalkingParallelPairHom.id X = 𝟙 X := rfl /-- The functor `WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ` sending left to left and right to right. -/ def walkingParallelPairOp : WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ where obj x := op <\| by cases x; exacts [one, zero] map f := by cases f <;> apply Quiver.Hom.op exacts [left, right, WalkingParallelPairHom.id _] map_comp := by rintro _ _ _ (_\|_\|_) g <;> cases g <;> rfl @[simp] theorem walkingParallelPairOp_zero : walkingParallelPairOp.obj zero = op one := rfl @[simp] theorem walkingParallelPairOp_one : walkingParallelPairOp.obj one = op zero := rfl @[simp] theorem walkingParallelPairOp_left : walkingParallelPairOp.map left = @Quiver.Hom.op _ _ zero one left := rfl @[simp] theorem walkingParallelPairOp_right : walkingParallelPairOp.map right = @Quiver.Hom.op _ _ zero one right := rfl /-- The equivalence `WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ` sending left to left and right to right. -/ @[simps functor inverse] def walkingParallelPairOpEquiv : WalkingParallelPair ≌ WalkingParallelPairᵒᵖ where functor := walkingParallelPairOp inverse := walkingParallelPairOp.leftOp unitIso := NatIso.ofComponents (fun j => eqToIso (by cases j <;> rfl)) (by rintro _ _ (_ \| _ \| _) <;> simp) counitIso := NatIso.ofComponents (fun j => eqToIso (by induction' j with X cases X <;> rfl)) (fun {i} {j} f => by induction' i with i induction' j with j let g := f.unop have : f = g.op := rfl rw [this] cases i <;> cases j <;> cases g <;> rfl) functor_unitIso_comp := fun j => by cases j <;> rfl @[simp] theorem walkingParallelPairOpEquiv_unitIso_zero : walkingParallelPairOpEquiv.unitIso.app zero = Iso.refl zero := rfl @[simp] theorem walkingParallelPairOpEquiv_unitIso_one : walkingParallelPairOpEquiv.unitIso.app one = Iso.refl one := rfl @[simp] theorem walkingParallelPairOpEquiv_counitIso_zero : walkingParallelPairOpEquiv.counitIso.app (op zero) = Iso.refl (op zero) := rfl @[simp] theorem walkingParallelPairOpEquiv_counitIso_one : walkingParallelPairOpEquiv.counitIso.app (op one) = Iso.refl (op one) := rfl variable {C : Type u} [Category.{v} C] variable {X Y : C} /-- `parallelPair f g` is the diagram in `C` consisting of the two morphisms `f` and `g` with common domain and codomain. -/ def parallelPair (f g : X ⟶ Y) : WalkingParallelPair ⥤ C where obj x := match x with \| zero => X \| one => Y map h := match h with \| WalkingParallelPairHom.id _ => 𝟙 _ \| left => f \| right => g -- `sorry` can cope with this, but it's too slow: map_comp := by rintro _ _ _ ⟨⟩ g <;> cases g <;> {dsimp; simp} @[simp] theorem parallelPair_obj_zero (f g : X ⟶ Y) : (parallelPair f g).obj zero = X := rfl @[simp] theorem parallelPair_obj_one (f g : X ⟶ Y) : (parallelPair f g).obj one = Y := rfl @[simp] theorem parallelPair_map_left (f g : X ⟶ Y) : (parallelPair f g).map left = f := rfl @[simp] theorem parallelPair_map_right (f g : X ⟶ Y) : (parallelPair f g).map right = g := rfl @[simp] theorem parallelPair_functor_obj {F : WalkingParallelPair ⥤ C} (j : WalkingParallelPair) : (parallelPair (F.map left) (F.map right)).obj j = F.obj j := by cases j <;> rfl /-- Every functor indexing a (co)equalizer is naturally isomorphic (actually, equal) to a `parallelPair` -/ @[simps!] def diagramIsoParallelPair (F : WalkingParallelPair ⥤ C) : F ≅ parallelPair (F.map left) (F.map right) := NatIso.ofComponents (fun j => eqToIso <\| by cases j <;> rfl) (by rintro _ _ (_\|_\|_) <;> simp) /-- Construct a morphism between parallel pairs. -/ def parallelPairHom {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : parallelPair f g ⟶ parallelPair f' g' where app j := match j with \| zero => p \| one => q naturality := by rintro _ _ ⟨⟩ <;> {dsimp; simp [wf,wg]} @[simp] theorem parallelPairHom_app_zero {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : (parallelPairHom f g f' g' p q wf wg).app zero = p := rfl @[simp] theorem parallelPairHom_app_one {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : (parallelPairHom f g f' g' p q wf wg).app one = q := rfl /-- Construct a natural isomorphism between functors out of the walking parallel pair from its components. -/ @[simps!] def parallelPair.ext {F G : WalkingParallelPair ⥤ C} (zero : F.obj zero ≅ G.obj zero) (one : F.obj one ≅ G.obj one) (left : F.map left ≫ one.hom = zero.hom ≫ G.map left) (right : F.map right ≫ one.hom = zero.hom ≫ G.map right) : F ≅ G := NatIso.ofComponents (by rintro ⟨j⟩ exacts [zero, one]) (by rintro _ _ ⟨_⟩ <;> simp [left, right]) /-- Construct a natural isomorphism between `parallelPair f g` and `parallelPair f' g'` given equalities `f = f'` and `g = g'`. -/ @[simps!] def parallelPair.eqOfHomEq {f g f' g' : X ⟶ Y} (hf : f = f') (hg : g = g') : parallelPair f g ≅ parallelPair f' g' := parallelPair.ext (Iso.refl _) (Iso.refl _) (by simp [hf]) (by simp [hg]) /-- A fork on `f` and `g` is just a `Cone (parallelPair f g)`. -/ abbrev Fork (f g : X ⟶ Y) := Cone (parallelPair f g) /-- A cofork on `f` and `g` is just a `Cocone (parallelPair f g)`. -/ abbrev Cofork (f g : X ⟶ Y) := Cocone (parallelPair f g) variable {f g : X ⟶ Y} /-- A fork `t` on the parallel pair `f g : X ⟶ Y` consists of two morphisms `t.π.app zero : t.pt ⟶ X` and `t.π.app one : t.pt ⟶ Y`. Of these, only the first one is interesting, and we give it the shorter name `Fork.ι t`. -/ def Fork.ι (t : Fork f g) := t.π.app zero @[simp] theorem Fork.app_zero_eq_ι (t : Fork f g) : t.π.app zero = t.ι := rfl /-- A cofork `t` on the parallelPair `f g : X ⟶ Y` consists of two morphisms `t.ι.app zero : X ⟶ t.pt` and `t.ι.app one : Y ⟶ t.pt`. Of these, only the second one is interesting, and we give it the shorter name `Cofork.π t`. -/ def Cofork.π (t : Cofork f g) := t.ι.app one @[simp] theorem Cofork.app_one_eq_π (t : Cofork f g) : t.ι.app one = t.π := rfl @[simp] theorem Fork.app_one_eq_ι_comp_left (s : Fork f g) : s.π.app one = s.ι ≫ f := by rw [← s.app_zero_eq_ι, ← s.w left, parallelPair_map_left] @[reassoc] theorem Fork.app_one_eq_ι_comp_right (s : Fork f g) : s.π.app one = s.ι ≫ g := by rw [← s.app_zero_eq_ι, ← s.w right, parallelPair_map_right] @[simp] theorem Cofork.app_zero_eq_comp_π_left (s : Cofork f g) : s.ι.app zero = f ≫ s.π := by rw [← s.app_one_eq_π, ← s.w left, parallelPair_map_left] @[reassoc] theorem Cofork.app_zero_eq_comp_π_right (s : Cofork f g) : s.ι.app zero = g ≫ s.π := by rw [← s.app_one_eq_π, ← s.w right, parallelPair_map_right] /-- A fork on `f g : X ⟶ Y` is determined by the morphism `ι : P ⟶ X` satisfying `ι ≫ f = ι ≫ g`. -/ @[simps] def Fork.ofι {P : C} (ι : P ⟶ X) (w : ι ≫ f = ι ≫ g) : Fork f g where pt := P π := { app := fun X => by cases X · exact ι · exact ι ≫ f naturality := fun {X} {Y} f => by cases X <;> cases Y <;> cases f <;> dsimp <;> simp; assumption } /-- A cofork on `f g : X ⟶ Y` is determined by the morphism `π : Y ⟶ P` satisfying `f ≫ π = g ≫ π`. -/ @[simps] def Cofork.ofπ {P : C} (π : Y ⟶ P) (w : f ≫ π = g ≫ π) : Cofork f g where pt := P ι := { app := fun X => WalkingParallelPair.casesOn X (f ≫ π) π naturality := fun i j f => by cases f <;> dsimp <;> simp [w] } -- See note [dsimp, simp] @[simp] theorem Fork.ι_ofι {P : C} (ι : P ⟶ X) (w : ι ≫ f = ι ≫ g) : (Fork.ofι ι w).ι = ι := rfl @[simp] theorem Cofork.π_ofπ {P : C} (π : Y ⟶ P) (w : f ≫ π = g ≫ π) : (Cofork.ofπ π w).π = π := rfl @[reassoc (attr := simp)] theorem Fork.condition (t : Fork f g) : t.ι ≫ f = t.ι ≫ g := by rw [← t.app_one_eq_ι_comp_left, ← t.app_one_eq_ι_comp_right] @[reassoc (attr := simp)] theorem Cofork.condition (t : Cofork f g) : f ≫ t.π = g ≫ t.π := by rw [← t.app_zero_eq_comp_π_left, ← t.app_zero_eq_comp_π_right] /-- To check whether two maps are equalized by both maps of a fork, it suffices to check it for the first map -/ theorem Fork.equalizer_ext (s : Fork f g) {W : C} {k l : W ⟶ s.pt} (h : k ≫ s.ι = l ≫ s.ι) : ∀ j : WalkingParallelPair, k ≫ s.π.app j = l ≫ s.π.app j \| zero => h \| one => by have : k ≫ ι s ≫ f = l ≫ ι s ≫ f := by simp only [← Category.assoc]; exact congrArg (· ≫ f) h rw [s.app_one_eq_ι_comp_left, this] /-- To check whether two maps are coequalized by both maps of a cofork, it suffices to check it for the second map -/ theorem Cofork.coequalizer_ext (s : Cofork f g) {W : C} {k l : s.pt ⟶ W} (h : Cofork.π s ≫ k = Cofork.π s ≫ l) : ∀ j : WalkingParallelPair, s.ι.app j ≫ k = s.ι.app j ≫ l \| zero => by simp only [s.app_zero_eq_comp_π_left, Category.assoc, h] \| one => h theorem Fork.IsLimit.hom_ext {s : Fork f g} (hs : IsLimit s) {W : C} {k l : W ⟶ s.pt} (h : k ≫ Fork.ι s = l ≫ Fork.ι s) : k = l := hs.hom_ext <\| Fork.equalizer_ext _ h theorem Cofork.IsColimit.hom_ext {s : Cofork f g} (hs : IsColimit s) {W : C} {k l : s.pt ⟶ W} (h : Cofork.π s ≫ k = Cofork.π s ≫ l) : k = l := hs.hom_ext <\| Cofork.coequalizer_ext _ h @[reassoc (attr := simp)] theorem Fork.IsLimit.lift_ι {s t : Fork f g} (hs : IsLimit s) : hs.lift t ≫ s.ι = t.ι := hs.fac _ _ @[reassoc (attr := simp)] theorem Cofork.IsColimit.π_desc {s t : Cofork f g} (hs : IsColimit s) : s.π ≫ hs.desc t = t.π := hs.fac _ _ -- Porting note: `Fork.IsLimit.lift` was added in order to ease the port /-- If `s` is a limit fork over `f` and `g`, then a morphism `k : W ⟶ X` satisfying `k ≫ f = k ≫ g` induces a morphism `l : W ⟶ s.pt` such that `l ≫ fork.ι s = k`. -/ def Fork.IsLimit.lift {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : W ⟶ s.pt := hs.lift (Fork.ofι _ h) @[reassoc (attr := simp)] lemma Fork.IsLimit.lift_ι' {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : Fork.IsLimit.lift hs k h ≫ Fork.ι s = k := hs.fac _ _ /-- If `s` is a limit fork over `f` and `g`, then a morphism `k : W ⟶ X` satisfying `k ≫ f = k ≫ g` induces a morphism `l : W ⟶ s.pt` such that `l ≫ fork.ι s = k`. -/ def Fork.IsLimit.lift' {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : { l : W ⟶ s.pt // l ≫ Fork.ι s = k } := ⟨Fork.IsLimit.lift hs k h, by simp⟩ -- Porting note: `Cofork.IsColimit.desc` was added in order to ease the port /-- If `s` is a colimit cofork over `f` and `g`, then a morphism `k : Y ⟶ W` satisfying `f ≫ k = g ≫ k` induces a morphism `l : s.pt ⟶ W` such that `cofork.π s ≫ l = k`. -/ def Cofork.IsColimit.desc {s : Cofork f g} (hs : IsColimit s) {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : s.pt ⟶ W := hs.desc (Cofork.ofπ _ h) @[reassoc (attr := simp)] lemma Cofork.IsColimit.π_desc' {s : Cofork f g} (hs : IsColimit s) {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : Cofork.π s ≫ Cofork.IsColimit.desc hs k h = k := hs.fac _ _ /-- If `s` is a colimit cofork over `f` and `g`, then a morphism `k : Y ⟶ W` satisfying `f ≫ k = g ≫ k` induces a morphism `l : s.pt ⟶ W` such that `cofork.π s ≫ l = k`. -/ def Cofork.IsColimit.desc' {s : Cofork f g} (hs : IsColimit s) {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : { l : s.pt ⟶ W // Cofork.π s ≫ l = k } := ⟨Cofork.IsColimit.desc hs k h, by simp⟩ theorem Fork.IsLimit.existsUnique {s : Fork f g} (hs : IsLimit s) {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : ∃! l : W ⟶ s.pt, l ≫ Fork.ι s = k := ⟨hs.lift <\| Fork.ofι _ h, hs.fac _ _, fun _ hm => Fork.IsLimit.hom_ext hs <\| hm.symm ▸ (hs.fac (Fork.ofι _ h) WalkingParallelPair.zero).symm⟩ theorem Cofork.IsColimit.existsUnique {s : Cofork f g} (hs : IsColimit s) {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : ∃! d : s.pt ⟶ W, Cofork.π s ≫ d = k := ⟨hs.desc <\| Cofork.ofπ _ h, hs.fac _ _, fun _ hm => Cofork.IsColimit.hom_ext hs <\| hm.symm ▸ (hs.fac (Cofork.ofπ _ h) WalkingParallelPair.one).symm⟩ /-- This is a slightly more convenient method to verify that a fork is a limit cone. It only asks for a proof of facts that carry any mathematical content -/ @[simps] def Fork.IsLimit.mk (t : Fork f g) (lift : ∀ s : Fork f g, s.pt ⟶ t.pt) (fac : ∀ s : Fork f g, lift s ≫ Fork.ι t = Fork.ι s) (uniq : ∀ (s : Fork f g) (m : s.pt ⟶ t.pt) (_ : m ≫ t.ι = s.ι), m = lift s) : IsLimit t := { lift fac := fun s j => WalkingParallelPair.casesOn j (fac s) <\| by erw [← s.w left, ← t.w left, ← Category.assoc, fac]; rfl uniq := fun s m j => by aesop} /-- This is another convenient method to verify that a fork is a limit cone. It only asks for a proof of facts that carry any mathematical content, and allows access to the same `s` for all parts. -/ def Fork.IsLimit.mk' {X Y : C} {f g : X ⟶ Y} (t : Fork f g) (create : ∀ s : Fork f g, { l // l ≫ t.ι = s.ι ∧ ∀ {m}, m ≫ t.ι = s.ι → m = l }) : IsLimit t := Fork.IsLimit.mk t (fun s => (create s).1) (fun s => (create s).2.1) fun s _ w => (create s).2.2 w /-- This is a slightly more convenient method to verify that a cofork is a colimit cocone. It only asks for a proof of facts that carry any mathematical content -/ def Cofork.IsColimit.mk (t : Cofork f g) (desc : ∀ s : Cofork f g, t.pt ⟶ s.pt) (fac : ∀ s : Cofork f g, Cofork.π t ≫ desc s = Cofork.π s) (uniq : ∀ (s : Cofork f g) (m : t.pt ⟶ s.pt) (_ : t.π ≫ m = s.π), m = desc s) : IsColimit t := { desc fac := fun s j => WalkingParallelPair.casesOn j (by erw [← s.w left, ← t.w left, Category.assoc, fac]; rfl) (fac s) uniq := by aesop } /-- This is another convenient method to verify that a fork is a limit cone. It only asks for a proof of facts that carry any mathematical content, and allows access to the same `s` for all parts. -/ def Cofork.IsColimit.mk' {X Y : C} {f g : X ⟶ Y} (t : Cofork f g) (create : ∀ s : Cofork f g, { l : t.pt ⟶ s.pt // t.π ≫ l = s.π ∧ ∀ {m}, t.π ≫ m = s.π → m = l }) : IsColimit t := Cofork.IsColimit.mk t (fun s => (create s).1) (fun s => (create s).2.1) fun s _ w => (create s).2.2 w /-- Noncomputably make a limit cone from the existence of unique factorizations. -/ noncomputable def Fork.IsLimit.ofExistsUnique {t : Fork f g} (hs : ∀ s : Fork f g, ∃! l : s.pt ⟶ t.pt, l ≫ Fork.ι t = Fork.ι s) : IsLimit t := by choose d hd hd' using hs exact Fork.IsLimit.mk _ d hd fun s m hm => hd' _ _ hm /-- Noncomputably make a colimit cocone from the existence of unique factorizations. -/ noncomputable def Cofork.IsColimit.ofExistsUnique {t : Cofork f g} (hs : ∀ s : Cofork f g, ∃! d : t.pt ⟶ s.pt, Cofork.π t ≫ d = Cofork.π s) : IsColimit t := by choose d hd hd' using hs exact Cofork.IsColimit.mk _ d hd fun s m hm => hd' _ _ hm /-- Given a limit cone for the pair `f g : X ⟶ Y`, for any `Z`, morphisms from `Z` to its point are in bijection with morphisms `h : Z ⟶ X` such that `h ≫ f = h ≫ g`. Further, this bijection is natural in `Z`: see `Fork.IsLimit.homIso_natural`. This is a special case of `IsLimit.homIso'`, often useful to construct adjunctions. -/ @[simps] def Fork.IsLimit.homIso {X Y : C} {f g : X ⟶ Y} {t : Fork f g} (ht : IsLimit t) (Z : C) : (Z ⟶ t.pt) ≃ { h : Z ⟶ X // h ≫ f = h ≫ g } where toFun k := ⟨k ≫ t.ι, by simp only [Category.assoc, t.condition]⟩ invFun h := (Fork.IsLimit.lift' ht _ h.prop).1 left_inv _ := Fork.IsLimit.hom_ext ht (Fork.IsLimit.lift' _ _ _).prop right_inv _ := Subtype.ext (Fork.IsLimit.lift' ht _ _).prop /-- The bijection of `Fork.IsLimit.homIso` is natural in `Z`. -/ theorem Fork.IsLimit.homIso_natural {X Y : C} {f g : X ⟶ Y} {t : Fork f g} (ht : IsLimit t) {Z Z' : C} (q : Z' ⟶ Z) (k : Z ⟶ t.pt) : (Fork.IsLimit.homIso ht _ (q ≫ k) : Z' ⟶ X) = q ≫ (Fork.IsLimit.homIso ht _ k : Z ⟶ X) := Category.assoc _ _ _ /-- Given a colimit cocone for the pair `f g : X ⟶ Y`, for any `Z`, morphisms from the cocone point to `Z` are in bijection with morphisms `h : Y ⟶ Z` such that `f ≫ h = g ≫ h`. Further, this bijection is natural in `Z`: see `Cofork.IsColimit.homIso_natural`. This is a special case of `IsColimit.homIso'`, often useful to construct adjunctions. -/ @[simps] def Cofork.IsColimit.homIso {X Y : C} {f g : X ⟶ Y} {t : Cofork f g} (ht : IsColimit t) (Z : C) : (t.pt ⟶ Z) ≃ { h : Y ⟶ Z // f ≫ h = g ≫ h } where toFun k := ⟨t.π ≫ k, by simp only [← Category.assoc, t.condition]⟩ invFun h := (Cofork.IsColimit.desc' ht _ h.prop).1 left_inv _ := Cofork.IsColimit.hom_ext ht (Cofork.IsColimit.desc' _ _ _).prop right_inv _ := Subtype.ext (Cofork.IsColimit.desc' ht _ _).prop /-- The bijection of `Cofork.IsColimit.homIso` is natural in `Z`. -/ theorem Cofork.IsColimit.homIso_natural {X Y : C} {f g : X ⟶ Y} {t : Cofork f g} {Z Z' : C} (q : Z ⟶ Z') (ht : IsColimit t) (k : t.pt ⟶ Z) : (Cofork.IsColimit.homIso ht _ (k ≫ q) : Y ⟶ Z') = (Cofork.IsColimit.homIso ht _ k : Y ⟶ Z) ≫ q := (Category.assoc _ _ _).symm /-- This is a helper construction that can be useful when verifying that a category has all equalizers. Given `F : WalkingParallelPair ⥤ C`, which is really the same as `parallelPair (F.map left) (F.map right)`, and a fork on `F.map left` and `F.map right`, we get a cone on `F`. If you're thinking about using this, have a look at `hasEqualizers_of_hasLimit_parallelPair`, which you may find to be an easier way of achieving your goal. -/ def Cone.ofFork {F : WalkingParallelPair ⥤ C} (t : Fork (F.map left) (F.map right)) : Cone F where pt := t.pt π := { app := fun X => t.π.app X ≫ eqToHom (by simp) naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp [t.condition]}} /-- This is a helper construction that can be useful when verifying that a category has all coequalizers. Given `F : WalkingParallelPair ⥤ C`, which is really the same as `parallelPair (F.map left) (F.map right)`, and a cofork on `F.map left` and `F.map right`, we get a cocone on `F`. If you're thinking about using this, have a look at `hasCoequalizers_of_hasColimit_parallelPair`, which you may find to be an easier way of achieving your goal. -/ def Cocone.ofCofork {F : WalkingParallelPair ⥤ C} (t : Cofork (F.map left) (F.map right)) : Cocone F where pt := t.pt ι := { app := fun X => eqToHom (by simp) ≫ t.ι.app X naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp [t.condition]}} @[simp] theorem Cone.ofFork_π {F : WalkingParallelPair ⥤ C} (t : Fork (F.map left) (F.map right)) (j) : (Cone.ofFork t).π.app j = t.π.app j ≫ eqToHom (by simp) := rfl @[simp] theorem Cocone.ofCofork_ι {F : WalkingParallelPair ⥤ C} (t : Cofork (F.map left) (F.map right)) (j) : (Cocone.ofCofork t).ι.app j = eqToHom (by simp) ≫ t.ι.app j := rfl /-- Given `F : WalkingParallelPair ⥤ C`, which is really the same as `parallelPair (F.map left) (F.map right)` and a cone on `F`, we get a fork on `F.map left` and `F.map right`. -/ def Fork.ofCone {F : WalkingParallelPair ⥤ C} (t : Cone F) : Fork (F.map left) (F.map right) where pt := t.pt π := { app := fun X => t.π.app X ≫ eqToHom (by simp) naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp}} /-- Given `F : WalkingParallelPair ⥤ C`, which is really the same as `parallelPair (F.map left) (F.map right)` and a cocone on `F`, we get a cofork on `F.map left` and `F.map right`. -/ def Cofork.ofCocone {F : WalkingParallelPair ⥤ C} (t : Cocone F) : Cofork (F.map left) (F.map right) where pt := t.pt ι := { app := fun X => eqToHom (by simp) ≫ t.ι.app X naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp}} @[simp] theorem Fork.ofCone_π {F : WalkingParallelPair ⥤ C} (t : Cone F) (j) : (Fork.ofCone t).π.app j = t.π.app j ≫ eqToHom (by simp) := rfl @[simp] theorem Cofork.ofCocone_ι {F : WalkingParallelPair ⥤ C} (t : Cocone F) (j) : (Cofork.ofCocone t).ι.app j = eqToHom (by simp) ≫ t.ι.app j := rfl @[simp] theorem Fork.ι_postcompose {f' g' : X ⟶ Y} {α : parallelPair f g ⟶ parallelPair f' g'} {c : Fork f g} : Fork.ι ((Cones.postcompose α).obj c) = c.ι ≫ α.app _ := rfl @[simp] theorem Cofork.π_precompose {f' g' : X ⟶ Y} {α : parallelPair f g ⟶ parallelPair f' g'} {c : Cofork f' g'} : Cofork.π ((Cocones.precompose α).obj c) = α.app _ ≫ c.π := rfl /-- Helper function for constructing morphisms between equalizer forks. -/ @[simps] def Fork.mkHom {s t : Fork f g} (k : s.pt ⟶ t.pt) (w : k ≫ t.ι = s.ι) : s ⟶ t where hom := k w := by rintro ⟨_ \| _⟩ · exact w · simp only [Fork.app_one_eq_ι_comp_left,← Category.assoc] congr /-- To construct an isomorphism between forks, it suffices to give an isomorphism between the cone points and check that it commutes with the `ι` morphisms. -/ @[simps] def Fork.ext {s t : Fork f g} (i : s.pt ≅ t.pt) (w : i.hom ≫ t.ι = s.ι := by aesop_cat) : s ≅ t where hom := Fork.mkHom i.hom w inv := Fork.mkHom i.inv (by rw [← w, Iso.inv_hom_id_assoc]) /-- Two forks of the form `ofι` are isomorphic whenever their `ι`'s are equal. -/ def ForkOfι.ext {P : C} {ι ι' : P ⟶ X} (w : ι ≫ f = ι ≫ g) (w' : ι' ≫ f = ι' ≫ g) (h : ι = ι') : Fork.ofι ι w ≅ Fork.ofι ι' w' := Fork.ext (Iso.refl _) (by simp [h]) /-- Every fork is isomorphic to one of the form `Fork.of_ι _ _`. -/ def Fork.isoForkOfι (c : Fork f g) : c ≅ Fork.ofι c.ι c.condition := Fork.ext (by simp only [Fork.ofι_pt, Functor.const_obj_obj]; rfl) (by simp) /-- Given two forks with isomorphic components in such a way that the natural diagrams commute, then if one is a limit, then the other one is as well. -/ def Fork.isLimitOfIsos {X' Y' : C} (c : Fork f g) (hc : IsLimit c) {f' g' : X' ⟶ Y'} (c' : Fork f' g') (e₀ : X ≅ X') (e₁ : Y ≅ Y') (e : c.pt ≅ c'.pt) (comm₁ : e₀.hom ≫ f' = f ≫ e₁.hom := by aesop_cat) (comm₂ : e₀.hom ≫ g' = g ≫ e₁.hom := by aesop_cat) (comm₃ : e.hom ≫ c'.ι = c.ι ≫ e₀.hom := by aesop_cat) : IsLimit c' := let i : parallelPair f g ≅ parallelPair f' g' := parallelPair.ext e₀ e₁ comm₁.symm comm₂.symm (IsLimit.equivOfNatIsoOfIso i c c' (Fork.ext e comm₃)) hc /-- Helper function for constructing morphisms between coequalizer coforks. -/ @[simps] def Cofork.mkHom {s t : Cofork f g} (k : s.pt ⟶ t.pt) (w : s.π ≫ k = t.π) : s ⟶ t where hom := k w := by rintro ⟨_ \| _⟩ · simp [Cofork.app_zero_eq_comp_π_left, w] · exact w @[reassoc (attr := simp)] theorem Fork.hom_comp_ι {s t : Fork f g} (f : s ⟶ t) : f.hom ≫ t.ι = s.ι := by cases s; cases t; cases f; aesop @[reassoc (attr := simp)] theorem Fork.π_comp_hom {s t : Cofork f g} (f : s ⟶ t) : s.π ≫ f.hom = t.π := by cases s; cases t; cases f; aesop /-- To construct an isomorphism between coforks, it suffices to give an isomorphism between the cocone points and check that it commutes with the `π` morphisms. -/ @[simps] def Cofork.ext {s t : Cofork f g} (i : s.pt ≅ t.pt) (w : s.π ≫ i.hom = t.π := by aesop_cat) : s ≅ t where hom := Cofork.mkHom i.hom w inv := Cofork.mkHom i.inv (by rw [Iso.comp_inv_eq, w]) /-- Every cofork is isomorphic to one of the form `Cofork.ofπ _ _`. -/ def Cofork.isoCoforkOfπ (c : Cofork f g) : c ≅ Cofork.ofπ c.π c.condition := Cofork.ext (by simp only [Cofork.ofπ_pt, Functor.const_obj_obj]; rfl) (by dsimp; simp) variable (f g) section /-- `HasEqualizer f g` represents a particular choice of limiting cone for the parallel pair of morphisms `f` and `g`. -/ abbrev HasEqualizer := HasLimit (parallelPair f g) variable [HasEqualizer f g] /-- If an equalizer of `f` and `g` exists, we can access an arbitrary choice of such by saying `equalizer f g`. -/ noncomputable abbrev equalizer : C := limit (parallelPair f g) /-- If an equalizer of `f` and `g` exists, we can access the inclusion `equalizer f g ⟶ X` by saying `equalizer.ι f g`. -/ noncomputable abbrev equalizer.ι : equalizer f g ⟶ X := limit.π (parallelPair f g) zero /-- An equalizer cone for a parallel pair `f` and `g` -/ noncomputable abbrev equalizer.fork : Fork f g := limit.cone (parallelPair f g) @[simp] theorem equalizer.fork_ι : (equalizer.fork f g).ι = equalizer.ι f g := rfl @[simp] theorem equalizer.fork_π_app_zero : (equalizer.fork f g).π.app zero = equalizer.ι f g := rfl @[reassoc] theorem equalizer.condition : equalizer.ι f g ≫ f = equalizer.ι f g ≫ g := Fork.condition <\| limit.cone <\| parallelPair f g /-- The equalizer built from `equalizer.ι f g` is limiting. -/ noncomputable def equalizerIsEqualizer : IsLimit (Fork.ofι (equalizer.ι f g) (equalizer.condition f g)) := IsLimit.ofIsoLimit (limit.isLimit _) (Fork.ext (Iso.refl _) (by simp)) variable {f g} /-- A morphism `k : W ⟶ X` satisfying `k ≫ f = k ≫ g` factors through the equalizer of `f` and `g` via `equalizer.lift : W ⟶ equalizer f g`. -/ noncomputable abbrev equalizer.lift {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : W ⟶ equalizer f g := limit.lift (parallelPair f g) (Fork.ofι k h) @[reassoc] theorem equalizer.lift_ι {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : equalizer.lift k h ≫ equalizer.ι f g = k := limit.lift_π _ _ /-- A morphism `k : W ⟶ X` satisfying `k ≫ f = k ≫ g` induces a morphism `l : W ⟶ equalizer f g` satisfying `l ≫ equalizer.ι f g = k`. -/ noncomputable def equalizer.lift' {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : { l : W ⟶ equalizer f g // l ≫ equalizer.ι f g = k } := ⟨equalizer.lift k h, equalizer.lift_ι _ _⟩ /-- Two maps into an equalizer are equal if they are equal when composed with the equalizer map. -/ @[ext] theorem equalizer.hom_ext {W : C} {k l : W ⟶ equalizer f g} (h : k ≫ equalizer.ι f g = l ≫ equalizer.ι f g) : k = l := Fork.IsLimit.hom_ext (limit.isLimit _) h theorem equalizer.existsUnique {W : C} (k : W ⟶ X) (h : k ≫ f = k ≫ g) : ∃! l : W ⟶ equalizer f g, l ≫ equalizer.ι f g = k := Fork.IsLimit.existsUnique (limit.isLimit _) _ h /-- An equalizer morphism is a monomorphism -/ instance equalizer.ι_mono : Mono (equalizer.ι f g) where right_cancellation _ _ w := equalizer.hom_ext w end section variable {f g} /-- The equalizer morphism in any limit cone is a monomorphism. -/ theorem mono_of_isLimit_fork {c : Fork f g} (i : IsLimit c) : Mono (Fork.ι c) := { right_cancellation := fun _ _ w => Fork.IsLimit.hom_ext i w } end section variable {f g} /-- The identity determines a cone on the equalizer diagram of `f` and `g` if `f = g`. -/ def idFork (h : f = g) : Fork f g := Fork.ofι (𝟙 X) <\| h ▸ rfl /-- The identity on `X` is an equalizer of `(f, g)`, if `f = g`. -/ def isLimitIdFork (h : f = g) : IsLimit (idFork h) := Fork.IsLimit.mk _ (fun s => Fork.ι s) (fun _ => Category.comp_id _) fun s m h => by convert h exact (Category.comp_id _).symm /-- Every equalizer of `(f, g)`, where `f = g`, is an isomorphism. -/ theorem isIso_limit_cone_parallelPair_of_eq (h₀ : f = g) {c : Fork f g} (h : IsLimit c) : IsIso c.ι := Iso.isIso_hom <\| IsLimit.conePointUniqueUpToIso h <\| isLimitIdFork h₀ /-- The equalizer of `(f, g)`, where `f = g`, is an isomorphism. -/ theorem equalizer.ι_of_eq [HasEqualizer f g] (h : f = g) : IsIso (equalizer.ι f g) := isIso_limit_cone_parallelPair_of_eq h <\| limit.isLimit _ /-- Every equalizer of `(f, f)` is an isomorphism. -/ theorem isIso_limit_cone_parallelPair_of_self {c : Fork f f} (h : IsLimit c) : IsIso c.ι := isIso_limit_cone_parallelPair_of_eq rfl h /-- An equalizer that is an epimorphism is an isomorphism. -/ theorem isIso_limit_cone_parallelPair_of_epi {c : Fork f g} (h : IsLimit c) [Epi c.ι] : IsIso c.ι := isIso_limit_cone_parallelPair_of_eq ((cancel_epi _).1 (Fork.condition c)) h /-- Two morphisms are equal if there is a fork whose inclusion is epi. -/ theorem eq_of_epi_fork_ι (t : Fork f g) [Epi (Fork.ι t)] : f = g := (cancel_epi (Fork.ι t)).1 <\| Fork.condition t /-- If the equalizer of two morphisms is an epimorphism, then the two morphisms are equal. -/ theorem eq_of_epi_equalizer [HasEqualizer f g] [Epi (equalizer.ι f g)] : f = g := (cancel_epi (equalizer.ι f g)).1 <\| equalizer.condition _ _ end instance hasEqualizer_of_self : HasEqualizer f f := HasLimit.mk { cone := idFork rfl isLimit := isLimitIdFork rfl } /-- The equalizer inclusion for `(f, f)` is an isomorphism. -/ instance equalizer.ι_of_self : IsIso (equalizer.ι f f) := equalizer.ι_of_eq rfl /-- The equalizer of a morphism with itself is isomorphic to the source. -/ noncomputable def equalizer.isoSourceOfSelf : equalizer f f ≅ X := asIso (equalizer.ι f f) @[simp] theorem equalizer.isoSourceOfSelf_hom : (equalizer.isoSourceOfSelf f).hom = equalizer.ι f f := rfl @[simp] theorem equalizer.isoSourceOfSelf_inv : (equalizer.isoSourceOfSelf f).inv = equalizer.lift (𝟙 X) (by simp) := by ext simp [equalizer.isoSourceOfSelf] section /-- `HasCoequalizer f g` represents a particular choice of colimiting cocone for the parallel pair of morphisms `f` and `g`. -/ abbrev HasCoequalizer := HasColimit (parallelPair f g) variable [HasCoequalizer f g] /-- If a coequalizer of `f` and `g` exists, we can access an arbitrary choice of such by saying `coequalizer f g`. -/ noncomputable abbrev coequalizer : C := colimit (parallelPair f g) /-- If a coequalizer of `f` and `g` exists, we can access the corresponding projection by saying `coequalizer.π f g`. -/ noncomputable abbrev coequalizer.π : Y ⟶ coequalizer f g := colimit.ι (parallelPair f g) one /-- An arbitrary choice of coequalizer cocone for a parallel pair `f` and `g`. -/ noncomputable abbrev coequalizer.cofork : Cofork f g := colimit.cocone (parallelPair f g) @[simp] theorem coequalizer.cofork_π : (coequalizer.cofork f g).π = coequalizer.π f g := rfl theorem coequalizer.cofork_ι_app_one : (coequalizer.cofork f g).ι.app one = coequalizer.π f g := rfl @[reassoc] theorem coequalizer.condition : f ≫ coequalizer.π f g = g ≫ coequalizer.π f g := Cofork.condition <\| colimit.cocone <\| parallelPair f g /-- The cofork built from `coequalizer.π f g` is colimiting. -/ noncomputable def coequalizerIsCoequalizer : IsColimit (Cofork.ofπ (coequalizer.π f g) (coequalizer.condition f g)) := IsColimit.ofIsoColimit (colimit.isColimit _) (Cofork.ext (Iso.refl _) (by simp)) variable {f g} /-- Any morphism `k : Y ⟶ W` satisfying `f ≫ k = g ≫ k` factors through the coequalizer of `f` and `g` via `coequalizer.desc : coequalizer f g ⟶ W`. -/ noncomputable abbrev coequalizer.desc {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : coequalizer f g ⟶ W := colimit.desc (parallelPair f g) (Cofork.ofπ k h) @[reassoc] theorem coequalizer.π_desc {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : coequalizer.π f g ≫ coequalizer.desc k h = k := colimit.ι_desc _ _ theorem coequalizer.π_colimMap_desc {X' Y' Z : C} (f' g' : X' ⟶ Y') [HasCoequalizer f' g'] (p : X ⟶ X') (q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') (h : Y' ⟶ Z) (wh : f' ≫ h = g' ≫ h) : coequalizer.π f g ≫ colimMap (parallelPairHom f g f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := by rw [ι_colimMap_assoc, parallelPairHom_app_one, coequalizer.π_desc] /-- Any morphism `k : Y ⟶ W` satisfying `f ≫ k = g ≫ k` induces a morphism `l : coequalizer f g ⟶ W` satisfying `coequalizer.π ≫ g = l`. -/ noncomputable def coequalizer.desc' {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : { l : coequalizer f g ⟶ W // coequalizer.π f g ≫ l = k } := ⟨coequalizer.desc k h, coequalizer.π_desc _ _⟩ /-- Two maps from a coequalizer are equal if they are equal when composed with the coequalizer map -/ @[ext] theorem coequalizer.hom_ext {W : C} {k l : coequalizer f g ⟶ W} (h : coequalizer.π f g ≫ k = coequalizer.π f g ≫ l) : k = l := Cofork.IsColimit.hom_ext (colimit.isColimit _) h theorem coequalizer.existsUnique {W : C} (k : Y ⟶ W) (h : f ≫ k = g ≫ k) : ∃! d : coequalizer f g ⟶ W, coequalizer.π f g ≫ d = k := Cofork.IsColimit.existsUnique (colimit.isColimit _) _ h /-- A coequalizer morphism is an epimorphism -/ instance coequalizer.π_epi : Epi (coequalizer.π f g) where left_cancellation _ _ w := coequalizer.hom_ext w end section variable {f g} /-- The coequalizer morphism in any colimit cocone is an epimorphism. -/ theorem epi_of_isColimit_cofork {c : Cofork f g} (i : IsColimit c) : Epi c.π := { left_cancellation := fun _ _ w => Cofork.IsColimit.hom_ext i w } end section variable {f g} /-- The identity determines a cocone on the coequalizer diagram of `f` and `g`, if `f = g`. -/ def idCofork (h : f = g) : Cofork f g := Cofork.ofπ (𝟙 Y) <\| h ▸ rfl /-- The identity on `Y` is a coequalizer of `(f, g)`, where `f = g`. -/ def isColimitIdCofork (h : f = g) : IsColimit (idCofork h) := Cofork.IsColimit.mk _ (fun s => Cofork.π s) (fun _ => Category.id_comp _) fun s m h => by convert h exact (Category.id_comp _).symm /-- Every coequalizer of `(f, g)`, where `f = g`, is an isomorphism. -/ theorem isIso_colimit_cocone_parallelPair_of_eq (h₀ : f = g) {c : Cofork f g} (h : IsColimit c) : IsIso c.π := Iso.isIso_hom <\| IsColimit.coconePointUniqueUpToIso (isColimitIdCofork h₀) h /-- The coequalizer of `(f, g)`, where `f = g`, is an isomorphism. -/ theorem coequalizer.π_of_eq [HasCoequalizer f g] (h : f = g) : IsIso (coequalizer.π f g) := isIso_colimit_cocone_parallelPair_of_eq h <\| colimit.isColimit _ /-- Every coequalizer of `(f, f)` is an isomorphism. -/ theorem isIso_colimit_cocone_parallelPair_of_self {c : Cofork f f} (h : IsColimit c) : IsIso c.π := isIso_colimit_cocone_parallelPair_of_eq rfl h /-- A coequalizer that is a monomorphism is an isomorphism. -/ theorem isIso_limit_cocone_parallelPair_of_epi {c : Cofork f g} (h : IsColimit c) [Mono c.π] : IsIso c.π := isIso_colimit_cocone_parallelPair_of_eq ((cancel_mono _).1 (Cofork.condition c)) h /-- Two morphisms are equal if there is a cofork whose projection is mono. -/ theorem eq_of_mono_cofork_π (t : Cofork f g) [Mono (Cofork.π t)] : f = g := (cancel_mono (Cofork.π t)).1 <\| Cofork.condition t /-- If the coequalizer of two morphisms is a monomorphism, then the two morphisms are equal. -/ theorem eq_of_mono_coequalizer [HasCoequalizer f g] [Mono (coequalizer.π f g)] : f = g := (cancel_mono (coequalizer.π f g)).1 <\| coequalizer.condition _ _ end instance hasCoequalizer_of_self : HasCoequalizer f f := HasColimit.mk { cocone := idCofork rfl isColimit := isColimitIdCofork rfl } /-- The coequalizer projection for `(f, f)` is an isomorphism. -/ instance coequalizer.π_of_self : IsIso (coequalizer.π f f) := coequalizer.π_of_eq rfl /-- The coequalizer of a morphism with itself is isomorphic to the target. -/ noncomputable def coequalizer.isoTargetOfSelf : coequalizer f f ≅ Y := (asIso (coequalizer.π f f)).symm @[simp] theorem coequalizer.isoTargetOfSelf_hom : (coequalizer.isoTargetOfSelf f).hom = coequalizer.desc (𝟙 Y) (by simp) := by ext simp [coequalizer.isoTargetOfSelf] @[simp] theorem coequalizer.isoTargetOfSelf_inv : (coequalizer.isoTargetOfSelf f).inv = coequalizer.π f f := rfl section Comparison variable {D : Type u₂} [Category.{v₂} D] (G : C ⥤ D) /-- The comparison morphism for the equalizer of `f,g`. This is an isomorphism iff `G` preserves the equalizer of `f,g`; see `CategoryTheory/Limits/Preserves/Shapes/Equalizers.lean` -/ noncomputable def equalizerComparison [HasEqualizer f g] [HasEqualizer (G.map f) (G.map g)] : G.obj (equalizer f g) ⟶ equalizer (G.map f) (G.map g) := equalizer.lift (G.map (equalizer.ι _ _)) (by simp only [← G.map_comp]; rw [equalizer.condition]) @[reassoc (attr := simp)] theorem equalizerComparison_comp_π [HasEqualizer f g] [HasEqualizer (G.map f) (G.map g)] : equalizerComparison f g G ≫ equalizer.ι (G.map f) (G.map g) = G.map (equalizer.ι f g) := equalizer.lift_ι _ _ @[reassoc (attr := simp)] theorem map_lift_equalizerComparison [HasEqualizer f g] [HasEqualizer (G.map f) (G.map g)] {Z : C} {h : Z ⟶ X} (w : h ≫ f = h ≫ g) : G.map (equalizer.lift h w) ≫ equalizerComparison f g G = equalizer.lift (G.map h) (by simp only [← G.map_comp, w]) := by apply equalizer.hom_ext simp [← G.map_comp] /-- The comparison morphism for the coequalizer of `f,g`. -/ noncomputable def coequalizerComparison [HasCoequalizer f g] [HasCoequalizer (G.map f) (G.map g)] : coequalizer (G.map f) (G.map g) ⟶ G.obj (coequalizer f g) := coequalizer.desc (G.map (coequalizer.π _ _)) (by simp only [← G.map_comp]; rw [coequalizer.condition]) @[reassoc (attr := simp)] theorem ι_comp_coequalizerComparison [HasCoequalizer f g] [HasCoequalizer (G.map f) (G.map g)] : coequalizer.π _ _ ≫ coequalizerComparison f g G = G.map (coequalizer.π _ _) := coequalizer.π_desc _ _ @[reassoc (attr := simp)] theorem coequalizerComparison_map_desc [HasCoequalizer f g] [HasCoequalizer (G.map f) (G.map g)] {Z : C} {h : Y ⟶ Z} (w : f ≫ h = g ≫ h) : coequalizerComparison f g G ≫ G.map (coequalizer.desc h w) = coequalizer.desc (G.map h) (by simp only [← G.map_comp, w]) := by apply coequalizer.hom_ext simp [← G.map_comp] end Comparison variable (C) /-- `HasEqualizers` represents a choice of equalizer for every pair of morphisms -/ abbrev HasEqualizers := HasLimitsOfShape WalkingParallelPair C /-- `HasCoequalizers` represents a choice of coequalizer for every pair of morphisms -/ abbrev HasCoequalizers := HasColimitsOfShape WalkingParallelPair C /-- If `C` has all limits of diagrams `parallelPair f g`, then it has all equalizers -/ theorem hasEqualizers_of_hasLimit_parallelPair [∀ {X Y : C} {f g : X ⟶ Y}, HasLimit (parallelPair f g)] : HasEqualizers C := { has_limit := fun F => hasLimit_of_iso (diagramIsoParallelPair F).symm } /-- If `C` has all colimits of diagrams `parallelPair f g`, then it has all coequalizers -/ theorem hasCoequalizers_of_hasColimit_parallelPair [∀ {X Y : C} {f g : X ⟶ Y}, HasColimit (parallelPair f g)] : HasCoequalizers C := { has_colimit := fun F => hasColimit_of_iso (diagramIsoParallelPair F) } section -- In this section we show that a split mono `f` equalizes `(retraction f ≫ f)` and `(𝟙 Y)`. variable {C} [IsSplitMono f] /-- A split mono `f` equalizes `(retraction f ≫ f)` and `(𝟙 Y)`. Here we build the cone, and show in `isSplitMonoEqualizes` that it is a limit cone. -/ -- @[simps (config := { rhsMd := semireducible })] Porting note: no semireducible @[simps!] noncomputable def coneOfIsSplitMono : Fork (𝟙 Y) (retraction f ≫ f) := Fork.ofι f (by simp) @[simp] theorem coneOfIsSplitMono_ι : (coneOfIsSplitMono f).ι = f := rfl /-- A split mono `f` equalizes `(retraction f ≫ f)` and `(𝟙 Y)`. -/ noncomputable def isSplitMonoEqualizes {X Y : C} (f : X ⟶ Y) [IsSplitMono f] : IsLimit (coneOfIsSplitMono f) := Fork.IsLimit.mk' _ fun s => ⟨s.ι ≫ retraction f, by dsimp rw [Category.assoc, ← s.condition] apply Category.comp_id, fun hm => by simp [← hm]⟩ end /-- We show that the converse to `isSplitMonoEqualizes` is true: Whenever `f` equalizes `(r ≫ f)` and `(𝟙 Y)`, then `r` is a retraction of `f`. -/ def splitMonoOfEqualizer {X Y : C} {f : X ⟶ Y} {r : Y ⟶ X} (hr : f ≫ r ≫ f = f) (h : IsLimit (Fork.ofι f (hr.trans (Category.comp_id _).symm : f ≫ r ≫ f = f ≫ 𝟙 Y))) : SplitMono f where retraction := r id := Fork.IsLimit.hom_ext h ((Category.assoc _ _ _).trans <\| hr.trans (Category.id_comp _).symm) variable {C f g} /-- The fork obtained by postcomposing an equalizer fork with a monomorphism is an equalizer. -/ def isEqualizerCompMono {c : Fork f g} (i : IsLimit c) {Z : C} (h : Y ⟶ Z) [hm : Mono h] : have : Fork.ι c ≫ f ≫ h = Fork.ι c ≫ g ≫ h := by simp only [← Category.assoc] exact congrArg (· ≫ h) c.condition IsLimit (Fork.ofι c.ι (by simp [this]) : Fork (f ≫ h) (g ≫ h)) := Fork.IsLimit.mk' _ fun s => let s' : Fork f g := Fork.ofι s.ι (by apply hm.right_cancellation; simp [s.condition]) let l := Fork.IsLimit.lift' i s'.ι s'.condition ⟨l.1, l.2, fun hm => by apply Fork.IsLimit.hom_ext i; rw [Fork.ι_ofι] at hm; rw [hm]; exact l.2.symm⟩ variable (C f g) @[instance] theorem hasEqualizer_comp_mono [HasEqualizer f g] {Z : C} (h : Y ⟶ Z) [Mono h] : HasEqualizer (f ≫ h) (g ≫ h) := ⟨⟨{ cone := _ isLimit := isEqualizerCompMono (limit.isLimit _) h }⟩⟩ /-- An equalizer of an idempotent morphism and the identity is split mono. -/ @[simps] def splitMonoOfIdempotentOfIsLimitFork {X : C} {f : X ⟶ X} (hf : f ≫ f = f) {c : Fork (𝟙 X) f} (i : IsLimit c) : SplitMono c.ι where retraction := i.lift (Fork.ofι f (by simp [hf])) id := by letI := mono_of_isLimit_fork i rw [← cancel_mono_id c.ι, Category.assoc, Fork.IsLimit.lift_ι, Fork.ι_ofι, ← c.condition] exact Category.comp_id c.ι /-- The equalizer of an idempotent morphism and the identity is split mono. -/ noncomputable def splitMonoOfIdempotentEqualizer {X : C} {f : X ⟶ X} (hf : f ≫ f = f) [HasEqualizer (𝟙 X) f] : SplitMono (equalizer.ι (𝟙 X) f) := splitMonoOfIdempotentOfIsLimitFork _ hf (limit.isLimit _) section -- In this section we show that a split epi `f` coequalizes `(f ≫ section_ f)` and `(𝟙 X)`. variable {C} [IsSplitEpi f] /-- A split epi `f` coequalizes `(f ≫ section_ f)` and `(𝟙 X)`. Here we build the cocone, and show in `isSplitEpiCoequalizes` that it is a colimit cocone. -/ -- @[simps (config := { rhsMd := semireducible })] Porting note: no semireducible @[simps!] noncomputable def coconeOfIsSplitEpi : Cofork (𝟙 X) (f ≫ section_ f) := Cofork.ofπ f (by simp) @[simp] theorem coconeOfIsSplitEpi_π : (coconeOfIsSplitEpi f).π = f := rfl /-- A split epi `f` coequalizes `(f ≫ section_ f)` and `(𝟙 X)`. -/ noncomputable def isSplitEpiCoequalizes {X Y : C} (f : X ⟶ Y) [IsSplitEpi f] : IsColimit (coconeOfIsSplitEpi f) := Cofork.IsColimit.mk' _ fun s => ⟨section_ f ≫ s.π, by dsimp rw [← Category.assoc, ← s.condition, Category.id_comp], fun hm => by simp [← hm]⟩ end /-- We show that the converse to `isSplitEpiEqualizes` is true: Whenever `f` coequalizes `(f ≫ s)` and `(𝟙 X)`, then `s` is a section of `f`. -/ def splitEpiOfCoequalizer {X Y : C} {f : X ⟶ Y} {s : Y ⟶ X} (hs : f ≫ s ≫ f = f) (h : IsColimit (Cofork.ofπ f	((Category.assoc _ _ _).trans <\| hs.trans (Category.id_comp f).symm : (f ≫ s) ≫ f = 𝟙 X ≫ f))) : SplitEpi f where section_ := s id := Cofork.IsColimit.hom_ext h (hs.trans (Category.comp_id _).symm)	Mathlib/CategoryTheory/Limits/Shapes/Equalizers.lean	1,146	1,151
/- Copyright (c) 2020 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Wrenna Robson -/ import Mathlib.Algebra.BigOperators.Group.Finset.Pi import Mathlib.Algebra.Polynomial.FieldDivision import Mathlib.LinearAlgebra.Vandermonde import Mathlib.RingTheory.Polynomial.Basic /-! # Lagrange interpolation ## Main definitions * In everything that follows, `s : Finset ι` is a finite set of indexes, with `v : ι → F` an indexing of the field over some type. We call the image of v on s the interpolation nodes, though strictly unique nodes are only defined when v is injective on s. * `Lagrange.basisDivisor x y`, with `x y : F`. These are the normalised irreducible factors of the Lagrange basis polynomials. They evaluate to `1` at `x` and `0` at `y` when `x` and `y` are distinct. * `Lagrange.basis v i` with `i : ι`: the Lagrange basis polynomial that evaluates to `1` at `v i` and `0` at `v j` for `i ≠ j`. * `Lagrange.interpolate v r` where `r : ι → F` is a function from the fintype to the field: the Lagrange interpolant that evaluates to `r i` at `x i` for all `i : ι`. The `r i` are the _values_ associated with the _nodes_`x i`. -/ open Polynomial section PolynomialDetermination namespace Polynomial variable {R : Type} [CommRing R] [IsDomain R] {f g : R[X]} section Finset open Function Fintype open scoped Finset variable (s : Finset R) theorem eq_zero_of_degree_lt_of_eval_finset_eq_zero (degree_f_lt : f.degree < #s) (eval_f : ∀ x ∈ s, f.eval x = 0) : f = 0 := by rw [← mem_degreeLT] at degree_f_lt simp_rw [eval_eq_sum_degreeLTEquiv degree_f_lt] at eval_f rw [← degreeLTEquiv_eq_zero_iff_eq_zero degree_f_lt] exact Matrix.eq_zero_of_forall_index_sum_mul_pow_eq_zero (Injective.comp (Embedding.subtype _).inj' (equivFinOfCardEq (card_coe _)).symm.injective) fun _ => eval_f _ (Finset.coe_mem _) theorem eq_of_degree_sub_lt_of_eval_finset_eq (degree_fg_lt : (f - g).degree < #s) (eval_fg : ∀ x ∈ s, f.eval x = g.eval x) : f = g := by rw [← sub_eq_zero] refine eq_zero_of_degree_lt_of_eval_finset_eq_zero _ degree_fg_lt ?_ simp_rw [eval_sub, sub_eq_zero] exact eval_fg theorem eq_of_degrees_lt_of_eval_finset_eq (degree_f_lt : f.degree < #s) (degree_g_lt : g.degree < #s) (eval_fg : ∀ x ∈ s, f.eval x = g.eval x) : f = g := by rw [← mem_degreeLT] at degree_f_lt degree_g_lt refine eq_of_degree_sub_lt_of_eval_finset_eq _ ?_ eval_fg rw [← mem_degreeLT]; exact Submodule.sub_mem _ degree_f_lt degree_g_lt /-- Two polynomials, with the same degree and leading coefficient, which have the same evaluation on a set of distinct values with cardinality equal to the degree, are equal. -/ theorem eq_of_degree_le_of_eval_finset_eq (h_deg_le : f.degree ≤ #s) (h_deg_eq : f.degree = g.degree) (hlc : f.leadingCoeff = g.leadingCoeff) (h_eval : ∀ x ∈ s, f.eval x = g.eval x) : f = g := by rcases eq_or_ne f 0 with rfl \| hf · rwa [degree_zero, eq_comm, degree_eq_bot, eq_comm] at h_deg_eq · exact eq_of_degree_sub_lt_of_eval_finset_eq s (lt_of_lt_of_le (degree_sub_lt h_deg_eq hf hlc) h_deg_le) h_eval end Finset section Indexed open Finset variable {ι : Type} {v : ι → R} (s : Finset ι) theorem eq_zero_of_degree_lt_of_eval_index_eq_zero (hvs : Set.InjOn v s) (degree_f_lt : f.degree < #s) (eval_f : ∀ i ∈ s, f.eval (v i) = 0) : f = 0 := by classical rw [← card_image_of_injOn hvs] at degree_f_lt refine eq_zero_of_degree_lt_of_eval_finset_eq_zero _ degree_f_lt ?_ intro x hx rcases mem_image.mp hx with ⟨_, hj, rfl⟩ exact eval_f _ hj theorem eq_of_degree_sub_lt_of_eval_index_eq (hvs : Set.InjOn v s) (degree_fg_lt : (f - g).degree < #s) (eval_fg : ∀ i ∈ s, f.eval (v i) = g.eval (v i)) : f = g := by rw [← sub_eq_zero] refine eq_zero_of_degree_lt_of_eval_index_eq_zero _ hvs degree_fg_lt ?_ simp_rw [eval_sub, sub_eq_zero] exact eval_fg theorem eq_of_degrees_lt_of_eval_index_eq (hvs : Set.InjOn v s) (degree_f_lt : f.degree < #s) (degree_g_lt : g.degree < #s) (eval_fg : ∀ i ∈ s, f.eval (v i) = g.eval (v i)) : f = g := by refine eq_of_degree_sub_lt_of_eval_index_eq _ hvs ?_ eval_fg rw [← mem_degreeLT] at degree_f_lt degree_g_lt ⊢ exact Submodule.sub_mem _ degree_f_lt degree_g_lt theorem eq_of_degree_le_of_eval_index_eq (hvs : Set.InjOn v s) (h_deg_le : f.degree ≤ #s) (h_deg_eq : f.degree = g.degree) (hlc : f.leadingCoeff = g.leadingCoeff) (h_eval : ∀ i ∈ s, f.eval (v i) = g.eval (v i)) : f = g := by rcases eq_or_ne f 0 with rfl \| hf · rwa [degree_zero, eq_comm, degree_eq_bot, eq_comm] at h_deg_eq · exact eq_of_degree_sub_lt_of_eval_index_eq s hvs (lt_of_lt_of_le (degree_sub_lt h_deg_eq hf hlc) h_deg_le) h_eval end Indexed end Polynomial end PolynomialDetermination noncomputable section namespace Lagrange open Polynomial section BasisDivisor variable {F : Type} [Field F] variable {x y : F} /-- `basisDivisor x y` is the unique linear or constant polynomial such that when evaluated at `x` it gives `1` and `y` it gives `0` (where when `x = y` it is identically `0`). Such polynomials are the building blocks for the Lagrange interpolants. -/ def basisDivisor (x y : F) : F[X] := C (x - y)⁻¹ (X - C y) theorem basisDivisor_self : basisDivisor x x = 0 := by simp only [basisDivisor, sub_self, inv_zero, map_zero, zero_mul] theorem basisDivisor_inj (hxy : basisDivisor x y = 0) : x = y := by simp_rw [basisDivisor, mul_eq_zero, X_sub_C_ne_zero, or_false, C_eq_zero, inv_eq_zero, sub_eq_zero] at hxy exact hxy @[simp] theorem basisDivisor_eq_zero_iff : basisDivisor x y = 0 ↔ x = y := ⟨basisDivisor_inj, fun H => H ▸ basisDivisor_self⟩ theorem basisDivisor_ne_zero_iff : basisDivisor x y ≠ 0 ↔ x ≠ y := by rw [Ne, basisDivisor_eq_zero_iff] theorem degree_basisDivisor_of_ne (hxy : x ≠ y) : (basisDivisor x y).degree = 1 := by rw [basisDivisor, degree_mul, degree_X_sub_C, degree_C, zero_add] exact inv_ne_zero (sub_ne_zero_of_ne hxy) @[simp] theorem degree_basisDivisor_self : (basisDivisor x x).degree = ⊥ := by rw [basisDivisor_self, degree_zero] theorem natDegree_basisDivisor_self : (basisDivisor x x).natDegree = 0 := by rw [basisDivisor_self, natDegree_zero] theorem natDegree_basisDivisor_of_ne (hxy : x ≠ y) : (basisDivisor x y).natDegree = 1 := natDegree_eq_of_degree_eq_some (degree_basisDivisor_of_ne hxy) @[simp] theorem eval_basisDivisor_right : eval y (basisDivisor x y) = 0 := by simp only [basisDivisor, eval_mul, eval_C, eval_sub, eval_X, sub_self, mul_zero] theorem eval_basisDivisor_left_of_ne (hxy : x ≠ y) : eval x (basisDivisor x y) = 1 := by simp only [basisDivisor, eval_mul, eval_C, eval_sub, eval_X] exact inv_mul_cancel₀ (sub_ne_zero_of_ne hxy) end BasisDivisor section Basis variable {F : Type} [Field F] {ι : Type} [DecidableEq ι] variable {s : Finset ι} {v : ι → F} {i j : ι} open Finset /-- Lagrange basis polynomials indexed by `s : Finset ι`, defined at nodes `v i` for a map `v : ι → F`. For `i, j ∈ s`, `basis s v i` evaluates to 0 at `v j` for `i ≠ j`. When `v` is injective on `s`, `basis s v i` evaluates to 1 at `v i`. -/ protected def basis (s : Finset ι) (v : ι → F) (i : ι) : F[X] := ∏ j ∈ s.erase i, basisDivisor (v i) (v j) @[simp] theorem basis_empty : Lagrange.basis ∅ v i = 1 := rfl @[simp] theorem basis_singleton (i : ι) : Lagrange.basis {i} v i = 1 := by rw [Lagrange.basis, erase_singleton, prod_empty] @[simp] theorem basis_pair_left (hij : i ≠ j) : Lagrange.basis {i, j} v i = basisDivisor (v i) (v j) := by simp only [Lagrange.basis, hij, erase_insert_eq_erase, erase_eq_of_not_mem, mem_singleton, not_false_iff, prod_singleton] @[simp] theorem basis_pair_right (hij : i ≠ j) : Lagrange.basis {i, j} v j = basisDivisor (v j) (v i) := by rw [pair_comm] exact basis_pair_left hij.symm theorem basis_ne_zero (hvs : Set.InjOn v s) (hi : i ∈ s) : Lagrange.basis s v i ≠ 0 := by simp_rw [Lagrange.basis, prod_ne_zero_iff, Ne, mem_erase] rintro j ⟨hij, hj⟩ rw [basisDivisor_eq_zero_iff, hvs.eq_iff hi hj] exact hij.symm @[simp] theorem eval_basis_self (hvs : Set.InjOn v s) (hi : i ∈ s) : (Lagrange.basis s v i).eval (v i) = 1 := by rw [Lagrange.basis, eval_prod] refine prod_eq_one fun j H => ?_ rw [eval_basisDivisor_left_of_ne] rcases mem_erase.mp H with ⟨hij, hj⟩ exact mt (hvs hi hj) hij.symm @[simp] theorem eval_basis_of_ne (hij : i ≠ j) (hj : j ∈ s) : (Lagrange.basis s v i).eval (v j) = 0 := by simp_rw [Lagrange.basis, eval_prod, prod_eq_zero_iff] exact ⟨j, ⟨mem_erase.mpr ⟨hij.symm, hj⟩, eval_basisDivisor_right⟩⟩ @[simp] theorem natDegree_basis (hvs : Set.InjOn v s) (hi : i ∈ s) : (Lagrange.basis s v i).natDegree = #s - 1 := by have H : ∀ j, j ∈ s.erase i → basisDivisor (v i) (v j) ≠ 0 := by simp_rw [Ne, mem_erase, basisDivisor_eq_zero_iff] exact fun j ⟨hij₁, hj⟩ hij₂ => hij₁ (hvs hj hi hij₂.symm) rw [← card_erase_of_mem hi, card_eq_sum_ones] convert natDegree_prod _ _ H using 1 refine sum_congr rfl fun j hj => (natDegree_basisDivisor_of_ne ?_).symm rw [Ne, ← basisDivisor_eq_zero_iff] exact H _ hj theorem degree_basis (hvs : Set.InjOn v s) (hi : i ∈ s) : (Lagrange.basis s v i).degree = ↑(#s - 1) := by rw [degree_eq_natDegree (basis_ne_zero hvs hi), natDegree_basis hvs hi] theorem sum_basis (hvs : Set.InjOn v s) (hs : s.Nonempty) : ∑ j ∈ s, Lagrange.basis s v j = 1 := by refine eq_of_degrees_lt_of_eval_index_eq s hvs (lt_of_le_of_lt (degree_sum_le _ _) ?_) ?_ ?_ · rw [Nat.cast_withBot, Finset.sup_lt_iff (WithBot.bot_lt_coe #s)] intro i hi rw [degree_basis hvs hi, Nat.cast_withBot, WithBot.coe_lt_coe] exact Nat.pred_lt (card_ne_zero_of_mem hi) · rw [degree_one, ← WithBot.coe_zero, Nat.cast_withBot, WithBot.coe_lt_coe] exact Nonempty.card_pos hs · intro i hi rw [eval_finset_sum, eval_one, ← add_sum_erase _ _ hi, eval_basis_self hvs hi, add_eq_left] refine sum_eq_zero fun j hj => ?_ rcases mem_erase.mp hj with ⟨hij, _⟩ rw [eval_basis_of_ne hij hi] theorem basisDivisor_add_symm {x y : F} (hxy : x ≠ y) : basisDivisor x y + basisDivisor y x = 1 := by classical rw [← sum_basis Function.injective_id.injOn ⟨x, mem_insert_self _ {y}⟩, sum_insert (not_mem_singleton.mpr hxy), sum_singleton, basis_pair_left hxy, basis_pair_right hxy, id, id] end Basis section Interpolate variable {F : Type} [Field F] {ι : Type} [DecidableEq ι]	variable {s t : Finset ι} {i j : ι} {v : ι → F} (r r' : ι → F) open Finset /-- Lagrange interpolation: given a finset `s : Finset ι`, a nodal map `v : ι → F` injective on `s` and a value function `r : ι → F`, `interpolate s v r` is the unique polynomial of degree `< #s` that takes value `r i` on `v i` for all `i` in `s`. -/ @[simps] def interpolate (s : Finset ι) (v : ι → F) : (ι → F) →ₗ[F] F[X] where toFun r := ∑ i ∈ s, C (r i) * Lagrange.basis s v i map_add' f g := by simp_rw [← Finset.sum_add_distrib] have h : (fun x => C (f x) * Lagrange.basis s v x + C (g x) * Lagrange.basis s v x) = (fun x => C ((f + g) x) * Lagrange.basis s v x) := by simp_rw [← add_mul, ← C_add, Pi.add_apply]	Mathlib/LinearAlgebra/Lagrange.lean	280	294
/- Copyright (c) 2023 Frédéric Dupuis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Frédéric Dupuis -/ import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.Algebra.Order.ToIntervalMod import Mathlib.Analysis.SpecialFunctions.Log.Base /-! # Akra-Bazzi theorem: The polynomial growth condition This file defines and develops an API for the polynomial growth condition that appears in the statement of the Akra-Bazzi theorem: for the Akra-Bazzi theorem to hold, the function `g` must satisfy the condition that `c₁ g(n) ≤ g(u) ≤ c₂ g(n)`, for u between bn and n for any constant `b ∈ (0,1)`. ## Implementation notes Our definition states that the condition must hold for any `b ∈ (0,1)`. This is equivalent to only requiring it for `b = 1/2` or any other particular value between 0 and 1. While this could in principle make it harder to prove that a particular function grows polynomially, this issue doesn't seem to arise in practice. -/ open Finset Real Filter Asymptotics open scoped Topology namespace AkraBazziRecurrence /-- The growth condition that the function `g` must satisfy for the Akra-Bazzi theorem to apply. It roughly states that `c₁ g(n) ≤ g(u) ≤ c₂ g(n)`, for `u` between `bn` and `n` for any constant `b ∈ (0,1)`. -/ def GrowsPolynomially (f : ℝ → ℝ) : Prop := ∀ b ∈ Set.Ioo 0 1, ∃ c₁ > 0, ∃ c₂ > 0, ∀ᶠ x in atTop, ∀ u ∈ Set.Icc (b * x) x, f u ∈ Set.Icc (c₁ * (f x)) (c₂ * f x) namespace GrowsPolynomially lemma congr_of_eventuallyEq {f g : ℝ → ℝ} (hfg : f =ᶠ[atTop] g) (hg : GrowsPolynomially g) : GrowsPolynomially f := by intro b hb have hg' := hg b hb obtain ⟨c₁, hc₁_mem, c₂, hc₂_mem, hg'⟩ := hg' refine ⟨c₁, hc₁_mem, c₂, hc₂_mem, ?_⟩ filter_upwards [hg', (tendsto_id.const_mul_atTop hb.1).eventually_forall_ge_atTop hfg, hfg] with x hx₁ hx₂ hx₃ intro u hu rw [hx₂ u hu.1, hx₃] exact hx₁ u hu lemma iff_eventuallyEq {f g : ℝ → ℝ} (h : f =ᶠ[atTop] g) : GrowsPolynomially f ↔ GrowsPolynomially g := ⟨fun hf => congr_of_eventuallyEq h.symm hf, fun hg => congr_of_eventuallyEq h hg⟩ variable {f : ℝ → ℝ} lemma eventually_atTop_le {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ x in atTop, ∀ u ∈ Set.Icc (b * x) x, f u ≤ c * f x := by obtain ⟨c₁, _, c₂, hc₂, h⟩ := hf b hb refine ⟨c₂, hc₂, ?_⟩ filter_upwards [h] exact fun _ H u hu => (H u hu).2 lemma eventually_atTop_le_nat {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ (n : ℕ) in atTop, ∀ u ∈ Set.Icc (b * n) n, f u ≤ c * f n := by obtain ⟨c, hc_mem, hc⟩ := hf.eventually_atTop_le hb exact ⟨c, hc_mem, hc.natCast_atTop⟩ lemma eventually_atTop_ge {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ x in atTop, ∀ u ∈ Set.Icc (b * x) x, c * f x ≤ f u := by obtain ⟨c₁, hc₁, c₂, _, h⟩ := hf b hb refine ⟨c₁, hc₁, ?_⟩ filter_upwards [h] exact fun _ H u hu => (H u hu).1 lemma eventually_atTop_ge_nat {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ (n : ℕ) in atTop, ∀ u ∈ Set.Icc (b * n) n, c * f n ≤ f u := by obtain ⟨c, hc_mem, hc⟩ := hf.eventually_atTop_ge hb exact ⟨c, hc_mem, hc.natCast_atTop⟩ lemma eventually_zero_of_frequently_zero (hf : GrowsPolynomially f) (hf' : ∃ᶠ x in atTop, f x = 0) : ∀ᶠ x in atTop, f x = 0 := by obtain ⟨c₁, hc₁_mem, c₂, hc₂_mem, hf⟩ := hf (1/2) (by norm_num) rw [frequently_atTop] at hf' filter_upwards [eventually_forall_ge_atTop.mpr hf, eventually_gt_atTop 0] with x hx hx_pos obtain ⟨x₀, hx₀_ge, hx₀⟩ := hf' (max x 1) have x₀_pos := calc 0 < 1 := by norm_num _ ≤ x₀ := le_of_max_le_right hx₀_ge have hmain : ∀ (m : ℕ) (z : ℝ), x ≤ z → z ∈ Set.Icc ((2 : ℝ)^(-(m : ℤ) -1) * x₀) ((2 : ℝ)^(-(m : ℤ)) * x₀) → f z = 0 := by intro m induction m with \| zero => simp only [CharP.cast_eq_zero, neg_zero, zero_sub, zpow_zero, one_mul] at * specialize hx x₀ (le_of_max_le_left hx₀_ge) simp only [hx₀, mul_zero, Set.Icc_self, Set.mem_singleton_iff] at hx refine fun z _ hz => hx _ ?_ simp only [zpow_neg, zpow_one] at hz simp only [one_div, hz] \| succ k ih => intro z hxz hz simp only [Nat.succ_eq_add_one, Nat.cast_add, Nat.cast_one] at * have hx' : x ≤ (2 : ℝ)^(-(k : ℤ) - 1) * x₀ := by calc x ≤ z := hxz _ ≤ _ := by simp only [neg_add, ← sub_eq_add_neg] at hz; exact hz.2 specialize hx ((2 : ℝ)^(-(k : ℤ) - 1) * x₀) hx' z specialize ih ((2 : ℝ)^(-(k : ℤ) - 1) * x₀) hx' ?ineq case ineq => rw [Set.left_mem_Icc] gcongr · norm_num · omega simp only [ih, mul_zero, Set.Icc_self, Set.mem_singleton_iff] at hx refine hx ⟨?lb₁, ?ub₁⟩ case lb₁ => rw [one_div, ← zpow_neg_one, ← mul_assoc, ← zpow_add₀ (by norm_num)] have h₁ : (-1 : ℤ) + (-k - 1) = -k - 2 := by ring have h₂ : -(k + (1 : ℤ)) - 1 = -k - 2 := by ring rw [h₁] rw [h₂] at hz exact hz.1 case ub₁ => have := hz.2 simp only [neg_add, ← sub_eq_add_neg] at this exact this refine hmain ⌊-logb 2 (x / x₀)⌋₊ x le_rfl ⟨?lb, ?ub⟩ case lb => rw [← le_div_iff₀ x₀_pos] refine (logb_le_logb (b := 2) (by norm_num) (zpow_pos (by norm_num) _) (by positivity)).mp ?_ rw [← rpow_intCast, logb_rpow (by norm_num) (by norm_num), ← neg_le_neg_iff] simp only [Int.cast_sub, Int.cast_neg, Int.cast_natCast, Int.cast_one, neg_sub, sub_neg_eq_add] calc -logb 2 (x/x₀) ≤ ⌈-logb 2 (x/x₀)⌉₊ := Nat.le_ceil (-logb 2 (x / x₀)) _ ≤ _ := by rw [add_comm]; exact_mod_cast Nat.ceil_le_floor_add_one _ case ub => rw [← div_le_iff₀ x₀_pos] refine (logb_le_logb (b := 2) (by norm_num) (by positivity) (zpow_pos (by norm_num) _)).mp ?_ rw [← rpow_intCast, logb_rpow (by norm_num) (by norm_num), ← neg_le_neg_iff] simp only [Int.cast_neg, Int.cast_natCast, neg_neg] have : 0 ≤ -logb 2 (x / x₀) := by rw [neg_nonneg] refine logb_nonpos (by norm_num) (by positivity) ?_ rw [div_le_one x₀_pos] exact le_of_max_le_left hx₀_ge exact_mod_cast Nat.floor_le this lemma eventually_atTop_nonneg_or_nonpos (hf : GrowsPolynomially f) : (∀ᶠ x in atTop, 0 ≤ f x) ∨ (∀ᶠ x in atTop, f x ≤ 0) := by obtain ⟨c₁, _, c₂, _, h⟩ := hf (1/2) (by norm_num) match lt_trichotomy c₁ c₂ with \| .inl hlt => -- c₁ < c₂ left filter_upwards [h, eventually_ge_atTop 0] with x hx hx_nonneg have h' : 3 / 4 * x ∈ Set.Icc (1 / 2 * x) x := by rw [Set.mem_Icc] exact ⟨by gcongr ?_ * x; norm_num, by linarith⟩ have hu := hx (3/4 * x) h' have hu := Set.nonempty_of_mem hu rw [Set.nonempty_Icc] at hu have hu' : 0 ≤ (c₂ - c₁) * f x := by linarith exact nonneg_of_mul_nonneg_right hu' (by linarith) \| .inr (.inr hgt) => -- c₂ < c₁ right filter_upwards [h, eventually_ge_atTop 0] with x hx hx_nonneg have h' : 3 / 4 * x ∈ Set.Icc (1 / 2 * x) x := by rw [Set.mem_Icc] exact ⟨by gcongr ?_ * x; norm_num, by linarith⟩ have hu := hx (3/4 * x) h' have hu := Set.nonempty_of_mem hu rw [Set.nonempty_Icc] at hu have hu' : (c₁ - c₂) * f x ≤ 0 := by linarith exact nonpos_of_mul_nonpos_right hu' (by linarith) \| .inr (.inl heq) => -- c₁ = c₂ have hmain : ∃ c, ∀ᶠ x in atTop, f x = c := by simp only [heq, Set.Icc_self, Set.mem_singleton_iff, one_mul] at h rw [eventually_atTop] at h obtain ⟨n₀, hn₀⟩ := h refine ⟨f (max n₀ 2), ?_⟩ rw [eventually_atTop] refine ⟨max n₀ 2, ?_⟩ refine Real.induction_Ico_mul _ 2 (by norm_num) (by positivity) ?base ?step case base => intro x ⟨hxlb, hxub⟩ have h₁ := calc n₀ ≤ 1 * max n₀ 2 := by simp _ ≤ 2 * max n₀ 2 := by gcongr; norm_num have h₂ := hn₀ (2 * max n₀ 2) h₁ (max n₀ 2) ⟨by simp [hxlb], by linarith⟩ rw [h₂] exact hn₀ (2 * max n₀ 2) h₁ x ⟨by simp [hxlb], le_of_lt hxub⟩ case step => intro n hn hyp_ind z hz have z_nonneg : 0 ≤ z := by calc (0 : ℝ) ≤ (2 : ℝ)^n * max n₀ 2 := by exact mul_nonneg (pow_nonneg (by norm_num) _) (by norm_num) _ ≤ z := by exact_mod_cast hz.1 have le_2n : max n₀ 2 ≤ (2 : ℝ)^n * max n₀ 2 := by nth_rewrite 1 [← one_mul (max n₀ 2)] gcongr exact one_le_pow₀ (by norm_num : (1 : ℝ) ≤ 2) have n₀_le_z : n₀ ≤ z := by calc n₀ ≤ max n₀ 2 := by simp _ ≤ (2 : ℝ)^n * max n₀ 2 := le_2n _ ≤ _ := by exact_mod_cast hz.1 have fz_eq_c₂fz : f z = c₂ * f z := hn₀ z n₀_le_z z ⟨by linarith, le_rfl⟩ have z_to_half_z' : f (1/2 * z) = c₂ * f z := hn₀ z n₀_le_z (1/2 * z) ⟨le_rfl, by linarith⟩ have z_to_half_z : f (1/2 * z) = f z := by rwa [← fz_eq_c₂fz] at z_to_half_z' have half_z_to_base : f (1/2 * z) = f (max n₀ 2) := by refine hyp_ind (1/2 * z) ⟨?lb, ?ub⟩ case lb => calc max n₀ 2 ≤ ((1 : ℝ)/(2 : ℝ)) * (2 : ℝ) ^ 1 * max n₀ 2 := by simp _ ≤ ((1 : ℝ)/(2 : ℝ)) * (2 : ℝ) ^ n * max n₀ 2 := by gcongr; norm_num _ ≤ _ := by rw [mul_assoc]; gcongr; exact_mod_cast hz.1 case ub => have h₁ : (2 : ℝ)^n = ((1 : ℝ)/(2 : ℝ)) * (2 : ℝ)^(n+1) := by rw [one_div, pow_add, pow_one] ring rw [h₁, mul_assoc] gcongr exact_mod_cast hz.2 rw [← z_to_half_z, half_z_to_base] obtain ⟨c, hc⟩ := hmain cases le_or_lt 0 c with \| inl hpos => exact Or.inl <\| by filter_upwards [hc] with _ hc; simpa only [hc] \| inr hneg => right filter_upwards [hc] with x hc exact le_of_lt <\| by simpa only [hc] lemma eventually_atTop_zero_or_pos_or_neg (hf : GrowsPolynomially f) : (∀ᶠ x in atTop, f x = 0) ∨ (∀ᶠ x in atTop, 0 < f x) ∨ (∀ᶠ x in atTop, f x < 0) := by if h : ∃ᶠ x in atTop, f x = 0 then exact Or.inl <\| eventually_zero_of_frequently_zero hf h else rw [not_frequently] at h push_neg at h cases eventually_atTop_nonneg_or_nonpos hf with \| inl h' => refine Or.inr (Or.inl ?_) simp only [lt_iff_le_and_ne] rw [eventually_and] exact ⟨h', by filter_upwards [h] with x hx; exact hx.symm⟩ \| inr h' => refine Or.inr (Or.inr ?_) simp only [lt_iff_le_and_ne] rw [eventually_and] exact ⟨h', h⟩ protected lemma neg {f : ℝ → ℝ} (hf : GrowsPolynomially f) : GrowsPolynomially (-f) := by intro b hb obtain ⟨c₁, hc₁_mem, c₂, hc₂_mem, hf⟩ := hf b hb refine ⟨c₂, hc₂_mem, c₁, hc₁_mem, ?_⟩ filter_upwards [hf] with x hx intro u hu simp only [Pi.neg_apply, Set.neg_mem_Icc_iff, neg_mul_eq_mul_neg, neg_neg] exact hx u hu protected lemma neg_iff {f : ℝ → ℝ} : GrowsPolynomially f ↔ GrowsPolynomially (-f) := ⟨fun hf => hf.neg, fun hf => by rw [← neg_neg f]; exact hf.neg⟩	protected lemma abs (hf : GrowsPolynomially f) : GrowsPolynomially (fun x => \|f x\|) := by cases eventually_atTop_nonneg_or_nonpos hf with \| inl hf' => have hmain : f =ᶠ[atTop] fun x => \|f x\| := by filter_upwards [hf'] with x hx rw [abs_of_nonneg hx] rw [← iff_eventuallyEq hmain] exact hf \| inr hf' => have hmain : -f =ᶠ[atTop] fun x => \|f x\| := by filter_upwards [hf'] with x hx simp only [Pi.neg_apply, abs_of_nonpos hx] rw [← iff_eventuallyEq hmain] exact hf.neg	Mathlib/Computability/AkraBazzi/GrowsPolynomially.lean	266	280
/- Copyright (c) 2020 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.GroupTheory.Complement /-! # Semidirect product This file defines semidirect products of groups, and the canonical maps in and out of the semidirect product. The semidirect product of `N` and `G` given a hom `φ` from `G` to the automorphism group of `N` is the product of sets with the group `⟨n₁, g₁⟩ * ⟨n₂, g₂⟩ = ⟨n₁ * φ g₁ n₂, g₁ * g₂⟩` ## Key definitions There are two homs into the semidirect product `inl : N →* N ⋊[φ] G` and `inr : G →* N ⋊[φ] G`, and `lift` can be used to define maps `N ⋊[φ] G →* H` out of the semidirect product given maps `fn : N →* H` and `fg : G →* H` that satisfy the condition `∀ n g, fn (φ g n) = fg g * fn n * fg g⁻¹` ## Notation This file introduces the global notation `N ⋊[φ] G` for `SemidirectProduct N G φ` ## Tags group, semidirect product -/ open Subgroup variable (N : Type) (G : Type) {H : Type} [Group N] [Group G] [Group H] -- Don't generate sizeOf and injectivity lemmas, which the `simpNF` linter will complain about. set_option genSizeOfSpec false in set_option genInjectivity false in /-- The semidirect product of groups `N` and `G`, given a map `φ` from `G` to the automorphism group of `N`. It the product of sets with the group operation `⟨n₁, g₁⟩ ⟨n₂, g₂⟩ = ⟨n₁ * φ g₁ n₂, g₁ * g₂⟩` -/ @[ext] structure SemidirectProduct (φ : G →* MulAut N) where /-- The element of N -/ left : N /-- The element of G -/ right : G deriving DecidableEq -- Porting note: unknown attribute -- attribute [pp_using_anonymous_constructor] SemidirectProduct @[inherit_doc] notation:35 N " ⋊[" φ:35 "] " G:35 => SemidirectProduct N G φ namespace SemidirectProduct variable {N G} variable {φ : G →* MulAut N} instance : Mul (SemidirectProduct N G φ) where mul a b := ⟨a.1 * φ a.2 b.1, a.2 * b.2⟩ lemma mul_def (a b : SemidirectProduct N G φ) : a * b = ⟨a.1 * φ a.2 b.1, a.2 * b.2⟩ := rfl @[simp] theorem mul_left (a b : N ⋊[φ] G) : (a * b).left = a.left * φ a.right b.left := rfl @[simp] theorem mul_right (a b : N ⋊[φ] G) : (a * b).right = a.right * b.right := rfl instance : One (SemidirectProduct N G φ) where one := ⟨1, 1⟩ @[simp] theorem one_left : (1 : N ⋊[φ] G).left = 1 := rfl @[simp] theorem one_right : (1 : N ⋊[φ] G).right = 1 := rfl instance : Inv (SemidirectProduct N G φ) where inv x := ⟨φ x.2⁻¹ x.1⁻¹, x.2⁻¹⟩ @[simp] theorem inv_left (a : N ⋊[φ] G) : a⁻¹.left = φ a.right⁻¹ a.left⁻¹ := rfl @[simp] theorem inv_right (a : N ⋊[φ] G) : a⁻¹.right = a.right⁻¹ := rfl instance : Group (N ⋊[φ] G) where mul_assoc a b c := SemidirectProduct.ext (by simp [mul_assoc]) (by simp [mul_assoc]) one_mul a := SemidirectProduct.ext (by simp) (one_mul a.2) mul_one a := SemidirectProduct.ext (by simp) (mul_one _) inv_mul_cancel a := SemidirectProduct.ext (by simp) (by simp) instance : Inhabited (N ⋊[φ] G) := ⟨1⟩ /-- The canonical map `N →* N ⋊[φ] G` sending `n` to `⟨n, 1⟩` -/ def inl : N →* N ⋊[φ] G where toFun n := ⟨n, 1⟩ map_one' := rfl map_mul' := by intros; ext <;> simp only [mul_left, map_one, MulAut.one_apply, mul_right, mul_one] @[simp] theorem left_inl (n : N) : (inl n : N ⋊[φ] G).left = n := rfl @[simp] theorem right_inl (n : N) : (inl n : N ⋊[φ] G).right = 1 := rfl theorem inl_injective : Function.Injective (inl : N → N ⋊[φ] G) := Function.injective_iff_hasLeftInverse.2 ⟨left, left_inl⟩ @[simp] theorem inl_inj {n₁ n₂ : N} : (inl n₁ : N ⋊[φ] G) = inl n₂ ↔ n₁ = n₂ := inl_injective.eq_iff /-- The canonical map `G →* N ⋊[φ] G` sending `g` to `⟨1, g⟩` -/ def inr : G →* N ⋊[φ] G where toFun g := ⟨1, g⟩ map_one' := rfl map_mul' := by intros; ext <;> simp @[simp] theorem left_inr (g : G) : (inr g : N ⋊[φ] G).left = 1 := rfl @[simp] theorem right_inr (g : G) : (inr g : N ⋊[φ] G).right = g := rfl theorem inr_injective : Function.Injective (inr : G → N ⋊[φ] G) := Function.injective_iff_hasLeftInverse.2 ⟨right, right_inr⟩ @[simp] theorem inr_inj {g₁ g₂ : G} : (inr g₁ : N ⋊[φ] G) = inr g₂ ↔ g₁ = g₂ := inr_injective.eq_iff theorem inl_aut (g : G) (n : N) : (inl (φ g n) : N ⋊[φ] G) = inr g * inl n * inr g⁻¹ := by ext <;> simp theorem inl_aut_inv (g : G) (n : N) : (inl ((φ g)⁻¹ n) : N ⋊[φ] G) = inr g⁻¹ * inl n * inr g := by rw [← MonoidHom.map_inv, inl_aut, inv_inv] @[simp] theorem mk_eq_inl_mul_inr (g : G) (n : N) : (⟨n, g⟩ : N ⋊[φ] G) = inl n * inr g := by ext <;> simp @[simp] theorem inl_left_mul_inr_right (x : N ⋊[φ] G) : inl x.left * inr x.right = x := by ext <;> simp /-- The canonical projection map `N ⋊[φ] G →* G`, as a group hom. -/ def rightHom : N ⋊[φ] G →* G where toFun := SemidirectProduct.right map_one' := rfl map_mul' _ _ := rfl @[simp] theorem rightHom_eq_right : (rightHom : N ⋊[φ] G → G) = right := rfl @[simp] theorem rightHom_comp_inl : (rightHom : N ⋊[φ] G →* G).comp inl = 1 := by ext; simp [rightHom] @[simp] theorem rightHom_comp_inr : (rightHom : N ⋊[φ] G →* G).comp inr = MonoidHom.id _ := by ext; simp [rightHom] @[simp] theorem rightHom_inl (n : N) : rightHom (inl n : N ⋊[φ] G) = 1 := by simp [rightHom] @[simp] theorem rightHom_inr (g : G) : rightHom (inr g : N ⋊[φ] G) = g := by simp [rightHom] theorem rightHom_surjective : Function.Surjective (rightHom : N ⋊[φ] G → G) := Function.surjective_iff_hasRightInverse.2 ⟨inr, rightHom_inr⟩ theorem range_inl_eq_ker_rightHom : (inl : N →* N ⋊[φ] G).range = rightHom.ker := le_antisymm (fun _ ↦ by simp +contextual [MonoidHom.mem_ker, eq_comm]) fun x hx ↦ ⟨x.left, by ext <;> simp_all [MonoidHom.mem_ker]⟩ /-- The bijection between the semidirect product and the product. -/ @[simps] def equivProd : N ⋊[φ] G ≃ N × G where toFun x := ⟨x.1, x.2⟩ invFun x := ⟨x.1, x.2⟩ left_inv _ := rfl right_inv _ := rfl /-- The group isomorphism between a semidirect product with respect to the trivial map and the product. -/ @[simps (config := { rhsMd := .default })] def mulEquivProd : N ⋊[1] G ≃* N × G := { equivProd with map_mul' _ _ := rfl } section lift variable (fn : N →* H) (fg : G →* H) (h : ∀ g, fn.comp (φ g).toMonoidHom = (MulAut.conj (fg g)).toMonoidHom.comp fn) /-- Define a group hom `N ⋊[φ] G →* H`, by defining maps `N →* H` and `G →* H` -/ def lift : N ⋊[φ] G →* H where toFun a := fn a.1 * fg a.2 map_one' := by simp map_mul' a b := by have := fun n g ↦ DFunLike.ext_iff.1 (h n) g simp only [MulAut.conj_apply, MonoidHom.comp_apply, MulEquiv.coe_toMonoidHom] at this simp only [mul_left, mul_right, map_mul, this, mul_assoc, inv_mul_cancel_left] @[simp] theorem lift_inl (n : N) : lift fn fg h (inl n) = fn n := by simp [lift] @[simp] theorem lift_comp_inl : (lift fn fg h).comp inl = fn := by ext; simp @[simp] theorem lift_inr (g : G) : lift fn fg h (inr g) = fg g := by simp [lift] @[simp] theorem lift_comp_inr : (lift fn fg h).comp inr = fg := by ext; simp theorem lift_unique (F : N ⋊[φ] G →* H) : F = lift (F.comp inl) (F.comp inr) fun _ ↦ by ext; simp [inl_aut] := by rw [DFunLike.ext_iff] simp only [lift, MonoidHom.comp_apply, MonoidHom.coe_mk, OneHom.coe_mk, ← map_mul, inl_left_mul_inr_right, forall_const] /-- Two maps out of the semidirect product are equal if they're equal after composition with both `inl` and `inr` -/ theorem hom_ext {f g : N ⋊[φ] G →* H} (hl : f.comp inl = g.comp inl) (hr : f.comp inr = g.comp inr) : f = g := by rw [lift_unique f, lift_unique g] simp only [] /-- The homomorphism from a semidirect product of subgroups to the ambient group. -/ @[simps!] def monoidHomSubgroup {H K : Subgroup G} (h : K ≤ H.normalizer) : H ⋊[(H.normalizerMonoidHom).comp (inclusion h)] K → G := lift H.subtype K.subtype (by simp [DFunLike.ext_iff]) /-- The isomorphism from a semidirect product of complementary subgroups to the ambient group. -/ @[simps!] noncomputable def mulEquivSubgroup {H K : Subgroup G} [H.Normal] (h : H.IsComplement' K) : H ⋊[(H.normalizerMonoidHom).comp (inclusion (H.normalizer_eq_top ▸ le_top))] K ≃* G := MulEquiv.ofBijective (monoidHomSubgroup _) ((equivProd.bijective_comp _).mpr h) end lift section Map variable {N₁ G₁ N₂ G₂ : Type} [Group N₁] [Group G₁] [Group N₂] [Group G₂] {φ₁ : G₁ → MulAut N₁} {φ₂ : G₂ →* MulAut N₂} (fn : N₁ →* N₂) (fg : G₁ →* G₂) (h : ∀ g : G₁, fn.comp (φ₁ g).toMonoidHom = (φ₂ (fg g)).toMonoidHom.comp fn) /-- Define a map from `N₁ ⋊[φ₁] G₁` to `N₂ ⋊[φ₂] G₂` given maps `N₁ →* N₂` and `G₁ →* G₂` that satisfy a commutativity condition `∀ n g, fn (φ₁ g n) = φ₂ (fg g) (fn n)`. -/ def map : N₁ ⋊[φ₁] G₁ →* N₂ ⋊[φ₂] G₂ where toFun x := ⟨fn x.1, fg x.2⟩ map_one' := by simp map_mul' x y := by replace h := DFunLike.ext_iff.1 (h x.right) y.left ext <;> simp_all @[simp] theorem map_left (g : N₁ ⋊[φ₁] G₁) : (map fn fg h g).left = fn g.left := rfl @[simp] theorem map_right (g : N₁ ⋊[φ₁] G₁) : (map fn fg h g).right = fg g.right := rfl @[simp] theorem rightHom_comp_map : rightHom.comp (map fn fg h) = fg.comp rightHom := rfl @[simp] theorem map_inl (n : N₁) : map fn fg h (inl n) = inl (fn n) := by simp [map] @[simp] theorem map_comp_inl : (map fn fg h).comp inl = inl.comp fn := by ext <;> simp @[simp] theorem map_inr (g : G₁) : map fn fg h (inr g) = inr (fg g) := by simp [map] @[simp] theorem map_comp_inr : (map fn fg h).comp inr = inr.comp fg := by ext <;> simp [map] end Map section Congr variable {N₁ G₁ N₂ G₂ : Type} [Group N₁] [Group G₁] [Group N₂] [Group G₂] {φ₁ : G₁ → MulAut N₁} {φ₂ : G₂ →* MulAut N₂} (fn : N₁ ≃* N₂) (fg : G₁ ≃* G₂) (h : ∀ g : G₁, (φ₁ g).trans fn = fn.trans (φ₂ (fg g))) /-- Define an isomorphism from `N₁ ⋊[φ₁] G₁` to `N₂ ⋊[φ₂] G₂` given isomorphisms `N₁ ≃* N₂` and `G₁ ≃* G₂` that satisfy a commutativity condition `∀ n g, fn (φ₁ g n) = φ₂ (fg g) (fn n)`. -/ @[simps]	def congr : N₁ ⋊[φ₁] G₁ ≃* N₂ ⋊[φ₂] G₂ where	Mathlib/GroupTheory/SemidirectProduct.lean	292	292
/- Copyright (c) 2020 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin, Robert Y. Lewis -/ import Mathlib.RingTheory.WittVector.InitTail /-! # Truncated Witt vectors The ring of truncated Witt vectors (of length `n`) is a quotient of the ring of Witt vectors. It retains the first `n` coefficients of each Witt vector. In this file, we set up the basic quotient API for this ring. The ring of Witt vectors is the projective limit of all the rings of truncated Witt vectors. ## Main declarations - `TruncatedWittVector`: the underlying type of the ring of truncated Witt vectors - `TruncatedWittVector.instCommRing`: the ring structure on truncated Witt vectors - `WittVector.truncate`: the quotient homomorphism that truncates a Witt vector, to obtain a truncated Witt vector - `TruncatedWittVector.truncate`: the homomorphism that truncates a truncated Witt vector of length `n` to one of length `m` (for some `m ≤ n`) - `WittVector.lift`: the unique ring homomorphism into the ring of Witt vectors that is compatible with a family of ring homomorphisms to the truncated Witt vectors: this realizes the ring of Witt vectors as projective limit of the rings of truncated Witt vectors ## References * [Hazewinkel, Witt Vectors][Haze09] * [Commelin and Lewis, Formalizing the Ring of Witt Vectors][CL21] -/ open Function (Injective Surjective) noncomputable section variable {p : ℕ} (n : ℕ) (R : Type) local notation "𝕎" => WittVector p -- type as `\bbW` /-- A truncated Witt vector over `R` is a vector of elements of `R`, i.e., the first `n` coefficients of a Witt vector. We will define operations on this type that are compatible with the (untruncated) Witt vector operations. `TruncatedWittVector p n R` takes a parameter `p : ℕ` that is not used in the definition. In practice, this number `p` is assumed to be a prime number, and under this assumption we construct a ring structure on `TruncatedWittVector p n R`. (`TruncatedWittVector p₁ n R` and `TruncatedWittVector p₂ n R` are definitionally equal as types but will have different ring operations.) -/ @[nolint unusedArguments] def TruncatedWittVector (_ : ℕ) (n : ℕ) (R : Type) := Fin n → R instance (p n : ℕ) (R : Type) [Inhabited R] : Inhabited (TruncatedWittVector p n R) := ⟨fun _ => default⟩ variable {n R} namespace TruncatedWittVector variable (p) in /-- Create a `TruncatedWittVector` from a vector `x`. -/ def mk (x : Fin n → R) : TruncatedWittVector p n R := x /-- `x.coeff i` is the `i`th entry of `x`. -/ def coeff (i : Fin n) (x : TruncatedWittVector p n R) : R := x i @[ext] theorem ext {x y : TruncatedWittVector p n R} (h : ∀ i, x.coeff i = y.coeff i) : x = y := funext h @[simp] theorem coeff_mk (x : Fin n → R) (i : Fin n) : (mk p x).coeff i = x i := rfl @[simp] theorem mk_coeff (x : TruncatedWittVector p n R) : (mk p fun i => x.coeff i) = x := by ext i; rw [coeff_mk] variable [CommRing R] /-- We can turn a truncated Witt vector `x` into a Witt vector by setting all coefficients after `x` to be 0. -/ def out (x : TruncatedWittVector p n R) : 𝕎 R := @WittVector.mk' p _ fun i => if h : i < n then x.coeff ⟨i, h⟩ else 0 @[simp] theorem coeff_out (x : TruncatedWittVector p n R) (i : Fin n) : x.out.coeff i = x.coeff i := by rw [out]; dsimp only; rw [dif_pos i.is_lt, Fin.eta] theorem out_injective : Injective (@out p n R _) := by intro x y h ext i rw [WittVector.ext_iff] at h simpa only [coeff_out] using h ↑i end TruncatedWittVector namespace WittVector variable (n) section /-- `truncateFun n x` uses the first `n` entries of `x` to construct a `TruncatedWittVector`, which has the same base `p` as `x`. This function is bundled into a ring homomorphism in `WittVector.truncate` -/ def truncateFun (x : 𝕎 R) : TruncatedWittVector p n R := TruncatedWittVector.mk p fun i => x.coeff i end variable {n} @[simp] theorem coeff_truncateFun (x : 𝕎 R) (i : Fin n) : (truncateFun n x).coeff i = x.coeff i := by rw [truncateFun, TruncatedWittVector.coeff_mk] variable [CommRing R] @[simp] theorem out_truncateFun (x : 𝕎 R) : (truncateFun n x).out = init n x := by ext i dsimp [TruncatedWittVector.out, init, select, coeff_mk] split_ifs with hi; swap; · rfl rw [coeff_truncateFun, Fin.val_mk] end WittVector namespace TruncatedWittVector variable [CommRing R] @[simp] theorem truncateFun_out (x : TruncatedWittVector p n R) : x.out.truncateFun n = x := by simp only [WittVector.truncateFun, coeff_out, mk_coeff] open WittVector variable (p n R) variable [Fact p.Prime] instance : Zero (TruncatedWittVector p n R) := ⟨truncateFun n 0⟩ instance : One (TruncatedWittVector p n R) := ⟨truncateFun n 1⟩ instance : NatCast (TruncatedWittVector p n R) := ⟨fun i => truncateFun n i⟩ instance : IntCast (TruncatedWittVector p n R) := ⟨fun i => truncateFun n i⟩ instance : Add (TruncatedWittVector p n R) := ⟨fun x y => truncateFun n (x.out + y.out)⟩ instance : Mul (TruncatedWittVector p n R) := ⟨fun x y => truncateFun n (x.out y.out)⟩ instance : Neg (TruncatedWittVector p n R) := ⟨fun x => truncateFun n (-x.out)⟩ instance : Sub (TruncatedWittVector p n R) := ⟨fun x y => truncateFun n (x.out - y.out)⟩ instance hasNatScalar : SMul ℕ (TruncatedWittVector p n R) := ⟨fun m x => truncateFun n (m • x.out)⟩ instance hasIntScalar : SMul ℤ (TruncatedWittVector p n R) := ⟨fun m x => truncateFun n (m • x.out)⟩ instance hasNatPow : Pow (TruncatedWittVector p n R) ℕ := ⟨fun x m => truncateFun n (x.out ^ m)⟩ @[simp] theorem coeff_zero (i : Fin n) : (0 : TruncatedWittVector p n R).coeff i = 0 := by show coeff i (truncateFun _ 0 : TruncatedWittVector p n R) = 0 rw [coeff_truncateFun, WittVector.zero_coeff] end TruncatedWittVector /-- A macro tactic used to prove that `truncateFun` respects ring operations. -/ macro (name := witt_truncateFun_tac) "witt_truncateFun_tac" : tactic => `(tactic\| { show _ = WittVector.truncateFun n _ apply TruncatedWittVector.out_injective iterate rw [WittVector.out_truncateFun] first \| rw [WittVector.init_add] \| rw [WittVector.init_mul] \| rw [WittVector.init_neg] \| rw [WittVector.init_sub] \| rw [WittVector.init_nsmul] \| rw [WittVector.init_zsmul] \| rw [WittVector.init_pow]}) namespace WittVector variable (p n R) variable [CommRing R] theorem truncateFun_surjective : Surjective (@truncateFun p n R) := Function.RightInverse.surjective TruncatedWittVector.truncateFun_out variable [Fact p.Prime] @[simp] theorem truncateFun_zero : truncateFun n (0 : 𝕎 R) = 0 := rfl @[simp] theorem truncateFun_one : truncateFun n (1 : 𝕎 R) = 1 := rfl variable {p R} @[simp] theorem truncateFun_add (x y : 𝕎 R) : truncateFun n (x + y) = truncateFun n x + truncateFun n y := by witt_truncateFun_tac @[simp] theorem truncateFun_mul (x y : 𝕎 R) : truncateFun n (x * y) = truncateFun n x * truncateFun n y := by witt_truncateFun_tac theorem truncateFun_neg (x : 𝕎 R) : truncateFun n (-x) = -truncateFun n x := by witt_truncateFun_tac theorem truncateFun_sub (x y : 𝕎 R) : truncateFun n (x - y) = truncateFun n x - truncateFun n y := by witt_truncateFun_tac theorem truncateFun_nsmul (m : ℕ) (x : 𝕎 R) : truncateFun n (m • x) = m • truncateFun n x := by witt_truncateFun_tac theorem truncateFun_zsmul (m : ℤ) (x : 𝕎 R) : truncateFun n (m • x) = m • truncateFun n x := by witt_truncateFun_tac theorem truncateFun_pow (x : 𝕎 R) (m : ℕ) : truncateFun n (x ^ m) = truncateFun n x ^ m := by witt_truncateFun_tac theorem truncateFun_natCast (m : ℕ) : truncateFun n (m : 𝕎 R) = m := rfl theorem truncateFun_intCast (m : ℤ) : truncateFun n (m : 𝕎 R) = m := rfl end WittVector namespace TruncatedWittVector open WittVector variable (p n R) variable [CommRing R] variable [Fact p.Prime] instance instCommRing : CommRing (TruncatedWittVector p n R) := (truncateFun_surjective p n R).commRing _ (truncateFun_zero p n R) (truncateFun_one p n R) (truncateFun_add n) (truncateFun_mul n) (truncateFun_neg n) (truncateFun_sub n) (truncateFun_nsmul n) (truncateFun_zsmul n) (truncateFun_pow n) (truncateFun_natCast n) (truncateFun_intCast n) end TruncatedWittVector namespace WittVector open TruncatedWittVector variable (n) variable [CommRing R] variable [Fact p.Prime] /-- `truncate n` is a ring homomorphism that truncates `x` to its first `n` entries to obtain a `TruncatedWittVector`, which has the same base `p` as `x`. -/ noncomputable def truncate : 𝕎 R →+* TruncatedWittVector p n R where toFun := truncateFun n map_zero' := truncateFun_zero p n R map_add' := truncateFun_add n map_one' := truncateFun_one p n R map_mul' := truncateFun_mul n variable (p R) theorem truncate_surjective : Surjective (truncate n : 𝕎 R → TruncatedWittVector p n R) := truncateFun_surjective p n R variable {p n R} @[simp] theorem coeff_truncate (x : 𝕎 R) (i : Fin n) : (truncate n x).coeff i = x.coeff i := coeff_truncateFun _ _ variable (n) theorem mem_ker_truncate (x : 𝕎 R) : x ∈ RingHom.ker (truncate (p := p) n) ↔ ∀ i < n, x.coeff i = 0 := by simp only [RingHom.mem_ker, truncate, truncateFun, RingHom.coe_mk, TruncatedWittVector.ext_iff, TruncatedWittVector.coeff_mk, coeff_zero] exact Fin.forall_iff variable (p) @[simp] theorem truncate_mk' (f : ℕ → R) : truncate n (@mk' p _ f) = TruncatedWittVector.mk _ fun k => f k := by ext i simp only [coeff_truncate, TruncatedWittVector.coeff_mk] end WittVector namespace TruncatedWittVector variable [CommRing R] section variable [Fact p.Prime] /-- A ring homomorphism that truncates a truncated Witt vector of length `m` to a truncated Witt vector of length `n`, for `n ≤ m`. -/ def truncate {m : ℕ} (hm : n ≤ m) : TruncatedWittVector p m R →+* TruncatedWittVector p n R := RingHom.liftOfRightInverse (WittVector.truncate m) out truncateFun_out ⟨WittVector.truncate n, by intro x simp only [WittVector.mem_ker_truncate] intro h i hi exact h i (lt_of_lt_of_le hi hm)⟩ @[simp] theorem truncate_comp_wittVector_truncate {m : ℕ} (hm : n ≤ m) : (truncate (p := p) (R := R) hm).comp (WittVector.truncate m) = WittVector.truncate n := RingHom.liftOfRightInverse_comp _ _ _ _ @[simp] theorem truncate_wittVector_truncate {m : ℕ} (hm : n ≤ m) (x : 𝕎 R) : truncate hm (WittVector.truncate m x) = WittVector.truncate n x := RingHom.liftOfRightInverse_comp_apply _ _ _ _ _ @[simp] theorem truncate_truncate {n₁ n₂ n₃ : ℕ} (h1 : n₁ ≤ n₂) (h2 : n₂ ≤ n₃) (x : TruncatedWittVector p n₃ R) : (truncate h1) (truncate h2 x) = truncate (h1.trans h2) x := by obtain ⟨x, rfl⟩ := WittVector.truncate_surjective (p := p) n₃ R x simp only [truncate_wittVector_truncate] @[simp] theorem truncate_comp {n₁ n₂ n₃ : ℕ} (h1 : n₁ ≤ n₂) (h2 : n₂ ≤ n₃) : (truncate (p := p) (R := R) h1).comp (truncate h2) = truncate (h1.trans h2) := by ext1 x; simp only [truncate_truncate, Function.comp_apply, RingHom.coe_comp] theorem truncate_surjective {m : ℕ} (hm : n ≤ m) : Surjective (truncate (p := p) (R := R) hm) := by intro x obtain ⟨x, rfl⟩ := WittVector.truncate_surjective (p := p) _ R x exact ⟨WittVector.truncate _ x, truncate_wittVector_truncate _ _⟩ @[simp] theorem coeff_truncate {m : ℕ} (hm : n ≤ m) (i : Fin n) (x : TruncatedWittVector p m R) : (truncate hm x).coeff i = x.coeff (Fin.castLE hm i) := by obtain ⟨y, rfl⟩ := @WittVector.truncate_surjective p _ _ _ _ x simp only [truncate_wittVector_truncate, WittVector.coeff_truncate, Fin.coe_castLE] end section Fintype instance {R : Type} [Fintype R] : Fintype (TruncatedWittVector p n R) := Pi.instFintype variable (p n R) theorem card {R : Type} [Fintype R] : Fintype.card (TruncatedWittVector p n R) = Fintype.card R ^ n := by simp only [TruncatedWittVector, Fintype.card_fin, Fintype.card_fun] end Fintype variable [Fact p.Prime] theorem iInf_ker_truncate : ⨅ i : ℕ, RingHom.ker (WittVector.truncate (p := p) (R := R) i) = ⊥ := by rw [Submodule.eq_bot_iff] intro x hx ext simp only [WittVector.mem_ker_truncate, Ideal.mem_iInf, WittVector.zero_coeff] at hx ⊢ exact hx _ _ (Nat.lt_succ_self _) end TruncatedWittVector namespace WittVector open TruncatedWittVector hiding truncate coeff section lift variable [CommRing R] variable [Fact p.Prime] variable {S : Type} [Semiring S] variable (f : ∀ k : ℕ, S →+ TruncatedWittVector p k R) variable (f_compat : ∀ (k₁ k₂ : ℕ) (hk : k₁ ≤ k₂), (TruncatedWittVector.truncate hk).comp (f k₂) = f k₁) variable (n) /-- Given a family `fₖ : S → TruncatedWittVector p k R` and `s : S`, we produce a Witt vector by	defining the `k`th entry to be the final entry of `fₖ s`. -/ def liftFun (s : S) : 𝕎 R := @WittVector.mk' p _ fun k => TruncatedWittVector.coeff (Fin.last k) (f (k + 1) s)	Mathlib/RingTheory/WittVector/Truncated.lean	413	416
/- Copyright (c) 2019 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Yaël Dillies -/ import Mathlib.Algebra.Module.BigOperators import Mathlib.GroupTheory.Perm.Basic import Mathlib.GroupTheory.Perm.Finite import Mathlib.GroupTheory.Perm.List import Mathlib.GroupTheory.Perm.Sign /-! # Cycles of a permutation This file starts the theory of cycles in permutations. ## Main definitions In the following, `f : Equiv.Perm β`. * `Equiv.Perm.SameCycle`: `f.SameCycle x y` when `x` and `y` are in the same cycle of `f`. * `Equiv.Perm.IsCycle`: `f` is a cycle if any two nonfixed points of `f` are related by repeated applications of `f`, and `f` is not the identity. * `Equiv.Perm.IsCycleOn`: `f` is a cycle on a set `s` when any two points of `s` are related by repeated applications of `f`. ## Notes `Equiv.Perm.IsCycle` and `Equiv.Perm.IsCycleOn` are different in three ways: * `IsCycle` is about the entire type while `IsCycleOn` is restricted to a set. * `IsCycle` forbids the identity while `IsCycleOn` allows it (if `s` is a subsingleton). * `IsCycleOn` forbids fixed points on `s` (if `s` is nontrivial), while `IsCycle` allows them. -/ open Equiv Function Finset variable {ι α β : Type} namespace Equiv.Perm /-! ### `SameCycle` -/ section SameCycle variable {f g : Perm α} {p : α → Prop} {x y z : α} /-- The equivalence relation indicating that two points are in the same cycle of a permutation. -/ def SameCycle (f : Perm α) (x y : α) : Prop := ∃ i : ℤ, (f ^ i) x = y @[refl] theorem SameCycle.refl (f : Perm α) (x : α) : SameCycle f x x := ⟨0, rfl⟩ theorem SameCycle.rfl : SameCycle f x x := SameCycle.refl _ _ protected theorem _root_.Eq.sameCycle (h : x = y) (f : Perm α) : f.SameCycle x y := by rw [h] @[symm] theorem SameCycle.symm : SameCycle f x y → SameCycle f y x := fun ⟨i, hi⟩ => ⟨-i, by rw [zpow_neg, ← hi, inv_apply_self]⟩ theorem sameCycle_comm : SameCycle f x y ↔ SameCycle f y x := ⟨SameCycle.symm, SameCycle.symm⟩ @[trans] theorem SameCycle.trans : SameCycle f x y → SameCycle f y z → SameCycle f x z := fun ⟨i, hi⟩ ⟨j, hj⟩ => ⟨j + i, by rw [zpow_add, mul_apply, hi, hj]⟩ variable (f) in theorem SameCycle.equivalence : Equivalence (SameCycle f) := ⟨SameCycle.refl f, SameCycle.symm, SameCycle.trans⟩ /-- The setoid defined by the `SameCycle` relation. -/ def SameCycle.setoid (f : Perm α) : Setoid α where r := f.SameCycle iseqv := SameCycle.equivalence f @[simp] theorem sameCycle_one : SameCycle 1 x y ↔ x = y := by simp [SameCycle] @[simp] theorem sameCycle_inv : SameCycle f⁻¹ x y ↔ SameCycle f x y := (Equiv.neg _).exists_congr_left.trans <\| by simp [SameCycle] alias ⟨SameCycle.of_inv, SameCycle.inv⟩ := sameCycle_inv @[simp] theorem sameCycle_conj : SameCycle (g f * g⁻¹) x y ↔ SameCycle f (g⁻¹ x) (g⁻¹ y) := exists_congr fun i => by simp [conj_zpow, eq_inv_iff_eq] theorem SameCycle.conj : SameCycle f x y → SameCycle (g * f * g⁻¹) (g x) (g y) := by simp [sameCycle_conj] theorem SameCycle.apply_eq_self_iff : SameCycle f x y → (f x = x ↔ f y = y) := fun ⟨i, hi⟩ => by rw [← hi, ← mul_apply, ← zpow_one_add, add_comm, zpow_add_one, mul_apply, (f ^ i).injective.eq_iff] theorem SameCycle.eq_of_left (h : SameCycle f x y) (hx : IsFixedPt f x) : x = y := let ⟨_, hn⟩ := h (hx.perm_zpow _).eq.symm.trans hn theorem SameCycle.eq_of_right (h : SameCycle f x y) (hy : IsFixedPt f y) : x = y := h.eq_of_left <\| h.apply_eq_self_iff.2 hy @[simp] theorem sameCycle_apply_left : SameCycle f (f x) y ↔ SameCycle f x y := (Equiv.addRight 1).exists_congr_left.trans <\| by simp [zpow_sub, SameCycle, Int.add_neg_one, Function.comp] @[simp] theorem sameCycle_apply_right : SameCycle f x (f y) ↔ SameCycle f x y := by rw [sameCycle_comm, sameCycle_apply_left, sameCycle_comm] @[simp] theorem sameCycle_inv_apply_left : SameCycle f (f⁻¹ x) y ↔ SameCycle f x y := by rw [← sameCycle_apply_left, apply_inv_self] @[simp] theorem sameCycle_inv_apply_right : SameCycle f x (f⁻¹ y) ↔ SameCycle f x y := by rw [← sameCycle_apply_right, apply_inv_self] @[simp] theorem sameCycle_zpow_left {n : ℤ} : SameCycle f ((f ^ n) x) y ↔ SameCycle f x y := (Equiv.addRight (n : ℤ)).exists_congr_left.trans <\| by simp [SameCycle, zpow_add] @[simp] theorem sameCycle_zpow_right {n : ℤ} : SameCycle f x ((f ^ n) y) ↔ SameCycle f x y := by rw [sameCycle_comm, sameCycle_zpow_left, sameCycle_comm] @[simp] theorem sameCycle_pow_left {n : ℕ} : SameCycle f ((f ^ n) x) y ↔ SameCycle f x y := by rw [← zpow_natCast, sameCycle_zpow_left] @[simp] theorem sameCycle_pow_right {n : ℕ} : SameCycle f x ((f ^ n) y) ↔ SameCycle f x y := by rw [← zpow_natCast, sameCycle_zpow_right] alias ⟨SameCycle.of_apply_left, SameCycle.apply_left⟩ := sameCycle_apply_left alias ⟨SameCycle.of_apply_right, SameCycle.apply_right⟩ := sameCycle_apply_right alias ⟨SameCycle.of_inv_apply_left, SameCycle.inv_apply_left⟩ := sameCycle_inv_apply_left alias ⟨SameCycle.of_inv_apply_right, SameCycle.inv_apply_right⟩ := sameCycle_inv_apply_right alias ⟨SameCycle.of_pow_left, SameCycle.pow_left⟩ := sameCycle_pow_left alias ⟨SameCycle.of_pow_right, SameCycle.pow_right⟩ := sameCycle_pow_right alias ⟨SameCycle.of_zpow_left, SameCycle.zpow_left⟩ := sameCycle_zpow_left alias ⟨SameCycle.of_zpow_right, SameCycle.zpow_right⟩ := sameCycle_zpow_right theorem SameCycle.of_pow {n : ℕ} : SameCycle (f ^ n) x y → SameCycle f x y := fun ⟨m, h⟩ => ⟨n * m, by simp [zpow_mul, h]⟩ theorem SameCycle.of_zpow {n : ℤ} : SameCycle (f ^ n) x y → SameCycle f x y := fun ⟨m, h⟩ => ⟨n * m, by simp [zpow_mul, h]⟩ @[simp] theorem sameCycle_subtypePerm {h} {x y : { x // p x }} : (f.subtypePerm h).SameCycle x y ↔ f.SameCycle x y := exists_congr fun n => by simp [Subtype.ext_iff] alias ⟨_, SameCycle.subtypePerm⟩ := sameCycle_subtypePerm @[simp] theorem sameCycle_extendDomain {p : β → Prop} [DecidablePred p] {f : α ≃ Subtype p} : SameCycle (g.extendDomain f) (f x) (f y) ↔ g.SameCycle x y := exists_congr fun n => by rw [← extendDomain_zpow, extendDomain_apply_image, Subtype.coe_inj, f.injective.eq_iff] alias ⟨_, SameCycle.extendDomain⟩ := sameCycle_extendDomain theorem SameCycle.exists_pow_eq' [Finite α] : SameCycle f x y → ∃ i < orderOf f, (f ^ i) x = y := by rintro ⟨k, rfl⟩ use (k % orderOf f).natAbs have h₀ := Int.natCast_pos.mpr (orderOf_pos f) have h₁ := Int.emod_nonneg k h₀.ne' rw [← zpow_natCast, Int.natAbs_of_nonneg h₁, zpow_mod_orderOf] refine ⟨?_, by rfl⟩ rw [← Int.ofNat_lt, Int.natAbs_of_nonneg h₁] exact Int.emod_lt_of_pos _ h₀ theorem SameCycle.exists_pow_eq'' [Finite α] (h : SameCycle f x y) : ∃ i : ℕ, 0 < i ∧ i ≤ orderOf f ∧ (f ^ i) x = y := by obtain ⟨_ \| i, hi, rfl⟩ := h.exists_pow_eq' · refine ⟨orderOf f, orderOf_pos f, le_rfl, ?_⟩ rw [pow_orderOf_eq_one, pow_zero] · exact ⟨i.succ, i.zero_lt_succ, hi.le, by rfl⟩ theorem SameCycle.exists_fin_pow_eq [Finite α] (h : SameCycle f x y) : ∃ i : Fin (orderOf f), (f ^ (i : ℕ)) x = y := by obtain ⟨i, hi, hx⟩ := SameCycle.exists_pow_eq' h exact ⟨⟨i, hi⟩, hx⟩ theorem SameCycle.exists_nat_pow_eq [Finite α] (h : SameCycle f x y) : ∃ i : ℕ, (f ^ i) x = y := by obtain ⟨i, _, hi⟩ := h.exists_pow_eq' exact ⟨i, hi⟩ instance (f : Perm α) [DecidableRel (SameCycle f)] : DecidableRel (SameCycle f⁻¹) := fun x y => decidable_of_iff (f.SameCycle x y) (sameCycle_inv).symm instance (priority := 100) [DecidableEq α] : DecidableRel (SameCycle (1 : Perm α)) := fun x y => decidable_of_iff (x = y) sameCycle_one.symm end SameCycle /-! ### `IsCycle` -/ section IsCycle variable {f g : Perm α} {x y : α} /-- A cycle is a non identity permutation where any two nonfixed points of the permutation are related by repeated application of the permutation. -/ def IsCycle (f : Perm α) : Prop := ∃ x, f x ≠ x ∧ ∀ ⦃y⦄, f y ≠ y → SameCycle f x y theorem IsCycle.ne_one (h : IsCycle f) : f ≠ 1 := fun hf => by simp [hf, IsCycle] at h @[simp] theorem not_isCycle_one : ¬(1 : Perm α).IsCycle := fun H => H.ne_one rfl protected theorem IsCycle.sameCycle (hf : IsCycle f) (hx : f x ≠ x) (hy : f y ≠ y) : SameCycle f x y := let ⟨g, hg⟩ := hf let ⟨a, ha⟩ := hg.2 hx let ⟨b, hb⟩ := hg.2 hy ⟨b - a, by rw [← ha, ← mul_apply, ← zpow_add, sub_add_cancel, hb]⟩ theorem IsCycle.exists_zpow_eq : IsCycle f → f x ≠ x → f y ≠ y → ∃ i : ℤ, (f ^ i) x = y := IsCycle.sameCycle theorem IsCycle.inv (hf : IsCycle f) : IsCycle f⁻¹ := hf.imp fun _ ⟨hx, h⟩ => ⟨inv_eq_iff_eq.not.2 hx.symm, fun _ hy => (h <\| inv_eq_iff_eq.not.2 hy.symm).inv⟩ @[simp] theorem isCycle_inv : IsCycle f⁻¹ ↔ IsCycle f := ⟨fun h => h.inv, IsCycle.inv⟩ theorem IsCycle.conj : IsCycle f → IsCycle (g * f * g⁻¹) := by rintro ⟨x, hx, h⟩ refine ⟨g x, by simp [coe_mul, inv_apply_self, hx], fun y hy => ?_⟩ rw [← apply_inv_self g y] exact (h <\| eq_inv_iff_eq.not.2 hy).conj protected theorem IsCycle.extendDomain {p : β → Prop} [DecidablePred p] (f : α ≃ Subtype p) : IsCycle g → IsCycle (g.extendDomain f) := by rintro ⟨a, ha, ha'⟩ refine ⟨f a, ?_, fun b hb => ?_⟩ · rw [extendDomain_apply_image] exact Subtype.coe_injective.ne (f.injective.ne ha) have h : b = f (f.symm ⟨b, of_not_not <\| hb ∘ extendDomain_apply_not_subtype _ _⟩) := by rw [apply_symm_apply, Subtype.coe_mk] rw [h] at hb ⊢ simp only [extendDomain_apply_image, Subtype.coe_injective.ne_iff, f.injective.ne_iff] at hb exact (ha' hb).extendDomain theorem isCycle_iff_sameCycle (hx : f x ≠ x) : IsCycle f ↔ ∀ {y}, SameCycle f x y ↔ f y ≠ y := ⟨fun hf y => ⟨fun ⟨i, hi⟩ hy => hx <\| by rw [← zpow_apply_eq_self_of_apply_eq_self hy i, (f ^ i).injective.eq_iff] at hi rw [hi, hy], hf.exists_zpow_eq hx⟩, fun h => ⟨x, hx, fun _ hy => h.2 hy⟩⟩ section Finite variable [Finite α] theorem IsCycle.exists_pow_eq (hf : IsCycle f) (hx : f x ≠ x) (hy : f y ≠ y) : ∃ i : ℕ, (f ^ i) x = y := by let ⟨n, hn⟩ := hf.exists_zpow_eq hx hy classical exact ⟨(n % orderOf f).toNat, by {have := n.emod_nonneg (Int.natCast_ne_zero.mpr (ne_of_gt (orderOf_pos f))) rwa [← zpow_natCast, Int.toNat_of_nonneg this, zpow_mod_orderOf]}⟩ end Finite variable [DecidableEq α] theorem isCycle_swap (hxy : x ≠ y) : IsCycle (swap x y) := ⟨y, by rwa [swap_apply_right], fun a (ha : ite (a = x) y (ite (a = y) x a) ≠ a) => if hya : y = a then ⟨0, hya⟩ else ⟨1, by rw [zpow_one, swap_apply_def] split_ifs at * <;> tauto⟩⟩ protected theorem IsSwap.isCycle : IsSwap f → IsCycle f := by rintro ⟨x, y, hxy, rfl⟩ exact isCycle_swap hxy variable [Fintype α] theorem IsCycle.two_le_card_support (h : IsCycle f) : 2 ≤ #f.support := two_le_card_support_of_ne_one h.ne_one /-- The subgroup generated by a cycle is in bijection with its support -/ noncomputable def IsCycle.zpowersEquivSupport {σ : Perm α} (hσ : IsCycle σ) : (Subgroup.zpowers σ) ≃ σ.support := Equiv.ofBijective (fun (τ : ↥ ((Subgroup.zpowers σ) : Set (Perm α))) => ⟨(τ : Perm α) (Classical.choose hσ), by obtain ⟨τ, n, rfl⟩ := τ rw [Subtype.coe_mk, zpow_apply_mem_support, mem_support] exact (Classical.choose_spec hσ).1⟩) (by constructor · rintro ⟨a, m, rfl⟩ ⟨b, n, rfl⟩ h ext y by_cases hy : σ y = y · simp_rw [zpow_apply_eq_self_of_apply_eq_self hy] · obtain ⟨i, rfl⟩ := (Classical.choose_spec hσ).2 hy rw [Subtype.coe_mk, Subtype.coe_mk, zpow_apply_comm σ m i, zpow_apply_comm σ n i] exact congr_arg _ (Subtype.ext_iff.mp h) · rintro ⟨y, hy⟩ rw [mem_support] at hy obtain ⟨n, rfl⟩ := (Classical.choose_spec hσ).2 hy exact ⟨⟨σ ^ n, n, rfl⟩, rfl⟩) @[simp] theorem IsCycle.zpowersEquivSupport_apply {σ : Perm α} (hσ : IsCycle σ) {n : ℕ} : hσ.zpowersEquivSupport ⟨σ ^ n, n, rfl⟩ = ⟨(σ ^ n) (Classical.choose hσ), pow_apply_mem_support.2 (mem_support.2 (Classical.choose_spec hσ).1)⟩ := rfl @[simp] theorem IsCycle.zpowersEquivSupport_symm_apply {σ : Perm α} (hσ : IsCycle σ) (n : ℕ) : hσ.zpowersEquivSupport.symm ⟨(σ ^ n) (Classical.choose hσ), pow_apply_mem_support.2 (mem_support.2 (Classical.choose_spec hσ).1)⟩ = ⟨σ ^ n, n, rfl⟩ := (Equiv.symm_apply_eq _).2 hσ.zpowersEquivSupport_apply protected theorem IsCycle.orderOf (hf : IsCycle f) : orderOf f = #f.support := by rw [← Fintype.card_zpowers, ← Fintype.card_coe] convert Fintype.card_congr (IsCycle.zpowersEquivSupport hf) theorem isCycle_swap_mul_aux₁ {α : Type} [DecidableEq α] : ∀ (n : ℕ) {b x : α} {f : Perm α} (_ : (swap x (f x) f) b ≠ b) (_ : (f ^ n) (f x) = b), ∃ i : ℤ, ((swap x (f x) * f) ^ i) (f x) = b := by intro n induction n with \| zero => exact fun _ h => ⟨0, h⟩ \| succ n hn => intro b x f hb h exact if hfbx : f x = b then ⟨0, hfbx⟩ else have : f b ≠ b ∧ b ≠ x := ne_and_ne_of_swap_mul_apply_ne_self hb have hb' : (swap x (f x) * f) (f⁻¹ b) ≠ f⁻¹ b := by rw [mul_apply, apply_inv_self, swap_apply_of_ne_of_ne this.2 (Ne.symm hfbx), Ne, ← f.injective.eq_iff, apply_inv_self] exact this.1 let ⟨i, hi⟩ := hn hb' (f.injective <\| by rw [apply_inv_self]; rwa [pow_succ', mul_apply] at h) ⟨i + 1, by rw [add_comm, zpow_add, mul_apply, hi, zpow_one, mul_apply, apply_inv_self, swap_apply_of_ne_of_ne (ne_and_ne_of_swap_mul_apply_ne_self hb).2 (Ne.symm hfbx)]⟩ theorem isCycle_swap_mul_aux₂ {α : Type} [DecidableEq α] : ∀ (n : ℤ) {b x : α} {f : Perm α} (_ : (swap x (f x) f) b ≠ b) (_ : (f ^ n) (f x) = b), ∃ i : ℤ, ((swap x (f x) * f) ^ i) (f x) = b := by intro n cases n with \| ofNat n => exact isCycle_swap_mul_aux₁ n \| negSucc n => intro b x f hb h exact if hfbx' : f x = b then ⟨0, hfbx'⟩ else have : f b ≠ b ∧ b ≠ x := ne_and_ne_of_swap_mul_apply_ne_self hb have hb : (swap x (f⁻¹ x) * f⁻¹) (f⁻¹ b) ≠ f⁻¹ b := by rw [mul_apply, swap_apply_def] split_ifs <;> simp only [inv_eq_iff_eq, Perm.mul_apply, zpow_negSucc, Ne, Perm.apply_inv_self] at * <;> tauto let ⟨i, hi⟩ := isCycle_swap_mul_aux₁ n hb (show (f⁻¹ ^ n) (f⁻¹ x) = f⁻¹ b by rw [← zpow_natCast, ← h, ← mul_apply, ← mul_apply, ← mul_apply, zpow_negSucc, ← inv_pow, pow_succ, mul_assoc, mul_assoc, inv_mul_cancel, mul_one, zpow_natCast, ← pow_succ', ← pow_succ]) have h : (swap x (f⁻¹ x) * f⁻¹) (f x) = f⁻¹ x := by rw [mul_apply, inv_apply_self, swap_apply_left] ⟨-i, by rw [← add_sub_cancel_right i 1, neg_sub, sub_eq_add_neg, zpow_add, zpow_one, zpow_neg, ← inv_zpow, mul_inv_rev, swap_inv, mul_swap_eq_swap_mul, inv_apply_self, swap_comm _ x, zpow_add, zpow_one, mul_apply, mul_apply (_ ^ i), h, hi, mul_apply, apply_inv_self, swap_apply_of_ne_of_ne this.2 (Ne.symm hfbx')]⟩ theorem IsCycle.eq_swap_of_apply_apply_eq_self {α : Type} [DecidableEq α] {f : Perm α} (hf : IsCycle f) {x : α} (hfx : f x ≠ x) (hffx : f (f x) = x) : f = swap x (f x) := Equiv.ext fun y => let ⟨z, hz⟩ := hf let ⟨i, hi⟩ := hz.2 hfx if hyx : y = x then by simp [hyx] else if hfyx : y = f x then by simp [hfyx, hffx] else by rw [swap_apply_of_ne_of_ne hyx hfyx] refine by_contradiction fun hy => ?_ obtain ⟨j, hj⟩ := hz.2 hy rw [← sub_add_cancel j i, zpow_add, mul_apply, hi] at hj rcases zpow_apply_eq_of_apply_apply_eq_self hffx (j - i) with hji \| hji · rw [← hj, hji] at hyx tauto · rw [← hj, hji] at hfyx tauto theorem IsCycle.swap_mul {α : Type} [DecidableEq α] {f : Perm α} (hf : IsCycle f) {x : α} (hx : f x ≠ x) (hffx : f (f x) ≠ x) : IsCycle (swap x (f x) * f) := ⟨f x, by simp [swap_apply_def, mul_apply, if_neg hffx, f.injective.eq_iff, if_neg hx, hx], fun y hy => let ⟨i, hi⟩ := hf.exists_zpow_eq hx (ne_and_ne_of_swap_mul_apply_ne_self hy).1 have hi : (f ^ (i - 1)) (f x) = y := calc (f ^ (i - 1) : Perm α) (f x) = (f ^ (i - 1) * f ^ (1 : ℤ) : Perm α) x := by simp _ = y := by rwa [← zpow_add, sub_add_cancel] isCycle_swap_mul_aux₂ (i - 1) hy hi⟩ theorem IsCycle.sign {f : Perm α} (hf : IsCycle f) : sign f = -(-1) ^ #f.support := let ⟨x, hx⟩ := hf calc Perm.sign f = Perm.sign (swap x (f x) * (swap x (f x) * f)) := by {rw [← mul_assoc, mul_def, mul_def, swap_swap, trans_refl]} _ = -(-1) ^ #f.support := if h1 : f (f x) = x then by have h : swap x (f x) * f = 1 := by simp only [mul_def, one_def] rw [hf.eq_swap_of_apply_apply_eq_self hx.1 h1, swap_apply_left, swap_swap] rw [sign_mul, sign_swap hx.1.symm, h, sign_one, hf.eq_swap_of_apply_apply_eq_self hx.1 h1, card_support_swap hx.1.symm] rfl else by have h : #(swap x (f x) * f).support + 1 = #f.support := by rw [← insert_erase (mem_support.2 hx.1), support_swap_mul_eq _ _ h1, card_insert_of_not_mem (not_mem_erase _ _), sdiff_singleton_eq_erase] have : #(swap x (f x) * f).support < #f.support := card_support_swap_mul hx.1 rw [sign_mul, sign_swap hx.1.symm, (hf.swap_mul hx.1 h1).sign, ← h] simp only [mul_neg, neg_mul, one_mul, neg_neg, pow_add, pow_one, mul_one] termination_by #f.support theorem IsCycle.of_pow {n : ℕ} (h1 : IsCycle (f ^ n)) (h2 : f.support ⊆ (f ^ n).support) : IsCycle f := by have key : ∀ x : α, (f ^ n) x ≠ x ↔ f x ≠ x := by simp_rw [← mem_support, ← Finset.ext_iff] exact (support_pow_le _ n).antisymm h2 obtain ⟨x, hx1, hx2⟩ := h1 refine ⟨x, (key x).mp hx1, fun y hy => ?_⟩ obtain ⟨i, _⟩ := hx2 ((key y).mpr hy) exact ⟨n * i, by rwa [zpow_mul]⟩ -- The lemma `support_zpow_le` is relevant. It means that `h2` is equivalent to -- `σ.support = (σ ^ n).support`, as well as to `#σ.support ≤ #(σ ^ n).support`. theorem IsCycle.of_zpow {n : ℤ} (h1 : IsCycle (f ^ n)) (h2 : f.support ⊆ (f ^ n).support) : IsCycle f := by cases n · exact h1.of_pow h2 · simp only [le_eq_subset, zpow_negSucc, Perm.support_inv] at h1 h2 exact (inv_inv (f ^ _) ▸ h1.inv).of_pow h2 theorem nodup_of_pairwise_disjoint_cycles {l : List (Perm β)} (h1 : ∀ f ∈ l, IsCycle f) (h2 : l.Pairwise Disjoint) : l.Nodup := nodup_of_pairwise_disjoint (fun h => (h1 1 h).ne_one rfl) h2 /-- Unlike `support_congr`, which assumes that `∀ (x ∈ g.support), f x = g x)`, here we have the weaker assumption that `∀ (x ∈ f.support), f x = g x`. -/ theorem IsCycle.support_congr (hf : IsCycle f) (hg : IsCycle g) (h : f.support ⊆ g.support) (h' : ∀ x ∈ f.support, f x = g x) : f = g := by have : f.support = g.support := by refine le_antisymm h ?_ intro z hz obtain ⟨x, hx, _⟩ := id hf have hx' : g x ≠ x := by rwa [← h' x (mem_support.mpr hx)] obtain ⟨m, hm⟩ := hg.exists_pow_eq hx' (mem_support.mp hz) have h'' : ∀ x ∈ f.support ∩ g.support, f x = g x := by intro x hx exact h' x (mem_of_mem_inter_left hx) rwa [← hm, ← pow_eq_on_of_mem_support h'' _ x (mem_inter_of_mem (mem_support.mpr hx) (mem_support.mpr hx')), pow_apply_mem_support, mem_support] refine Equiv.Perm.support_congr h ?_ simpa [← this] using h' /-- If two cyclic permutations agree on all terms in their intersection, and that intersection is not empty, then the two cyclic permutations must be equal. -/ theorem IsCycle.eq_on_support_inter_nonempty_congr (hf : IsCycle f) (hg : IsCycle g) (h : ∀ x ∈ f.support ∩ g.support, f x = g x) (hx : f x = g x) (hx' : x ∈ f.support) : f = g := by have hx'' : x ∈ g.support := by rwa [mem_support, ← hx, ← mem_support] have : f.support ⊆ g.support := by intro y hy obtain ⟨k, rfl⟩ := hf.exists_pow_eq (mem_support.mp hx') (mem_support.mp hy) rwa [pow_eq_on_of_mem_support h _ _ (mem_inter_of_mem hx' hx''), pow_apply_mem_support] rw [inter_eq_left.mpr this] at h exact hf.support_congr hg this h theorem IsCycle.support_pow_eq_iff (hf : IsCycle f) {n : ℕ} : support (f ^ n) = support f ↔ ¬orderOf f ∣ n := by rw [orderOf_dvd_iff_pow_eq_one] constructor · intro h H refine hf.ne_one ?_ rw [← support_eq_empty_iff, ← h, H, support_one] · intro H apply le_antisymm (support_pow_le _ n) _ intro x hx contrapose! H ext z by_cases hz : f z = z · rw [pow_apply_eq_self_of_apply_eq_self hz, one_apply] · obtain ⟨k, rfl⟩ := hf.exists_pow_eq hz (mem_support.mp hx) apply (f ^ k).injective rw [← mul_apply, (Commute.pow_pow_self _ _ _).eq, mul_apply] simpa using H theorem IsCycle.support_pow_of_pos_of_lt_orderOf (hf : IsCycle f) {n : ℕ} (npos : 0 < n) (hn : n < orderOf f) : (f ^ n).support = f.support := hf.support_pow_eq_iff.2 <\| Nat.not_dvd_of_pos_of_lt npos hn theorem IsCycle.pow_iff [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} : IsCycle (f ^ n) ↔ n.Coprime (orderOf f) := by classical cases nonempty_fintype β constructor · intro h have hr : support (f ^ n) = support f := by rw [hf.support_pow_eq_iff] rintro ⟨k, rfl⟩ refine h.ne_one ?_ simp [pow_mul, pow_orderOf_eq_one] have : orderOf (f ^ n) = orderOf f := by rw [h.orderOf, hr, hf.orderOf] rw [orderOf_pow, Nat.div_eq_self] at this rcases this with h \| _ · exact absurd h (orderOf_pos _).ne' · rwa [Nat.coprime_iff_gcd_eq_one, Nat.gcd_comm] · intro h obtain ⟨m, hm⟩ := exists_pow_eq_self_of_coprime h have hf' : IsCycle ((f ^ n) ^ m) := by rwa [hm] refine hf'.of_pow fun x hx => ?_ rw [hm] exact support_pow_le _ n hx -- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption theorem IsCycle.pow_eq_one_iff [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} : f ^ n = 1 ↔ ∃ x, f x ≠ x ∧ (f ^ n) x = x := by classical cases nonempty_fintype β constructor · intro h obtain ⟨x, hx, -⟩ := id hf exact ⟨x, hx, by simp [h]⟩ · rintro ⟨x, hx, hx'⟩ by_cases h : support (f ^ n) = support f · rw [← mem_support, ← h, mem_support] at hx contradiction · rw [hf.support_pow_eq_iff, Classical.not_not] at h obtain ⟨k, rfl⟩ := h rw [pow_mul, pow_orderOf_eq_one, one_pow] -- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption theorem IsCycle.pow_eq_one_iff' [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} {x : β} (hx : f x ≠ x) : f ^ n = 1 ↔ (f ^ n) x = x := ⟨fun h => DFunLike.congr_fun h x, fun h => hf.pow_eq_one_iff.2 ⟨x, hx, h⟩⟩ -- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption theorem IsCycle.pow_eq_one_iff'' [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} : f ^ n = 1 ↔ ∀ x, f x ≠ x → (f ^ n) x = x := ⟨fun h _ hx => (hf.pow_eq_one_iff' hx).1 h, fun h => let ⟨_, hx, _⟩ := id hf (hf.pow_eq_one_iff' hx).2 (h _ hx)⟩ -- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption theorem IsCycle.pow_eq_pow_iff [Finite β] {f : Perm β} (hf : IsCycle f) {a b : ℕ} : f ^ a = f ^ b ↔ ∃ x, f x ≠ x ∧ (f ^ a) x = (f ^ b) x := by classical cases nonempty_fintype β constructor · intro h obtain ⟨x, hx, -⟩ := id hf exact ⟨x, hx, by simp [h]⟩ · rintro ⟨x, hx, hx'⟩ wlog hab : a ≤ b generalizing a b · exact (this hx'.symm (le_of_not_le hab)).symm suffices f ^ (b - a) = 1 by rw [pow_sub _ hab, mul_inv_eq_one] at this rw [this] rw [hf.pow_eq_one_iff] by_cases hfa : (f ^ a) x ∈ f.support · refine ⟨(f ^ a) x, mem_support.mp hfa, ?_⟩ simp only [pow_sub _ hab, Equiv.Perm.coe_mul, Function.comp_apply, inv_apply_self, ← hx'] · have h := @Equiv.Perm.zpow_apply_comm _ f 1 a x simp only [zpow_one, zpow_natCast] at h rw [not_mem_support, h, Function.Injective.eq_iff (f ^ a).injective] at hfa contradiction theorem IsCycle.isCycle_pow_pos_of_lt_prime_order [Finite β] {f : Perm β} (hf : IsCycle f) (hf' : (orderOf f).Prime) (n : ℕ) (hn : 0 < n) (hn' : n < orderOf f) : IsCycle (f ^ n) := by classical cases nonempty_fintype β have : n.Coprime (orderOf f) := by refine Nat.Coprime.symm ?_ rw [Nat.Prime.coprime_iff_not_dvd hf'] exact Nat.not_dvd_of_pos_of_lt hn hn' obtain ⟨m, hm⟩ := exists_pow_eq_self_of_coprime this have hf'' := hf rw [← hm] at hf'' refine hf''.of_pow ?_ rw [hm] exact support_pow_le f n end IsCycle open Equiv theorem _root_.Int.addLeft_one_isCycle : (Equiv.addLeft 1 : Perm ℤ).IsCycle := ⟨0, one_ne_zero, fun n _ => ⟨n, by simp⟩⟩ theorem _root_.Int.addRight_one_isCycle : (Equiv.addRight 1 : Perm ℤ).IsCycle := ⟨0, one_ne_zero, fun n _ => ⟨n, by simp⟩⟩ section Conjugation variable [Fintype α] [DecidableEq α] {σ τ : Perm α} theorem IsCycle.isConj (hσ : IsCycle σ) (hτ : IsCycle τ) (h : #σ.support = #τ.support) : IsConj σ τ := by refine isConj_of_support_equiv (hσ.zpowersEquivSupport.symm.trans <\| (zpowersEquivZPowers <\| by rw [hσ.orderOf, h, hτ.orderOf]).trans hτ.zpowersEquivSupport) ?_ intro x hx simp only [Perm.mul_apply, Equiv.trans_apply, Equiv.sumCongr_apply] obtain ⟨n, rfl⟩ := hσ.exists_pow_eq (Classical.choose_spec hσ).1 (mem_support.1 hx) simp [← Perm.mul_apply, ← pow_succ'] theorem IsCycle.isConj_iff (hσ : IsCycle σ) (hτ : IsCycle τ) : IsConj σ τ ↔ #σ.support = #τ.support where mp h := by obtain ⟨π, rfl⟩ := (_root_.isConj_iff).1 h refine Finset.card_bij (fun a _ => π a) (fun _ ha => ?_) (fun _ _ _ _ ab => π.injective ab) fun b hb ↦ ⟨π⁻¹ b, ?_, π.apply_inv_self b⟩ · simp [mem_support.1 ha] contrapose! hb rw [mem_support, Classical.not_not] at hb rw [mem_support, Classical.not_not, Perm.mul_apply, Perm.mul_apply, hb, Perm.apply_inv_self] mpr := hσ.isConj hτ end Conjugation /-! ### `IsCycleOn` -/ section IsCycleOn variable {f g : Perm α} {s t : Set α} {a b x y : α} /-- A permutation is a cycle on `s` when any two points of `s` are related by repeated application of the permutation. Note that this means the identity is a cycle of subsingleton sets. -/ def IsCycleOn (f : Perm α) (s : Set α) : Prop := Set.BijOn f s s ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → f.SameCycle x y @[simp] theorem isCycleOn_empty : f.IsCycleOn ∅ := by simp [IsCycleOn, Set.bijOn_empty] @[simp] theorem isCycleOn_one : (1 : Perm α).IsCycleOn s ↔ s.Subsingleton := by simp [IsCycleOn, Set.bijOn_id, Set.Subsingleton] alias ⟨IsCycleOn.subsingleton, _root_.Set.Subsingleton.isCycleOn_one⟩ := isCycleOn_one @[simp] theorem isCycleOn_singleton : f.IsCycleOn {a} ↔ f a = a := by simp [IsCycleOn, SameCycle.rfl] theorem isCycleOn_of_subsingleton [Subsingleton α] (f : Perm α) (s : Set α) : f.IsCycleOn s := ⟨s.bijOn_of_subsingleton _, fun x _ y _ => (Subsingleton.elim x y).sameCycle _⟩ @[simp] theorem isCycleOn_inv : f⁻¹.IsCycleOn s ↔ f.IsCycleOn s := by simp only [IsCycleOn, sameCycle_inv, and_congr_left_iff] exact fun _ ↦ ⟨fun h ↦ Set.BijOn.perm_inv h, fun h ↦ Set.BijOn.perm_inv h⟩ alias ⟨IsCycleOn.of_inv, IsCycleOn.inv⟩ := isCycleOn_inv theorem IsCycleOn.conj (h : f.IsCycleOn s) : (g * f * g⁻¹).IsCycleOn ((g : Perm α) '' s) := ⟨(g.bijOn_image.comp h.1).comp g.bijOn_symm_image, fun x hx y hy => by rw [← preimage_inv] at hx hy convert Equiv.Perm.SameCycle.conj (h.2 hx hy) (g := g) <;> rw [apply_inv_self]⟩ theorem isCycleOn_swap [DecidableEq α] (hab : a ≠ b) : (swap a b).IsCycleOn {a, b} := ⟨bijOn_swap (by simp) (by simp), fun x hx y hy => by rw [Set.mem_insert_iff, Set.mem_singleton_iff] at hx hy obtain rfl \| rfl := hx <;> obtain rfl \| rfl := hy · exact ⟨0, by rw [zpow_zero, coe_one, id]⟩ · exact ⟨1, by rw [zpow_one, swap_apply_left]⟩ · exact ⟨1, by rw [zpow_one, swap_apply_right]⟩ · exact ⟨0, by rw [zpow_zero, coe_one, id]⟩⟩ protected theorem IsCycleOn.apply_ne (hf : f.IsCycleOn s) (hs : s.Nontrivial) (ha : a ∈ s) : f a ≠ a := by obtain ⟨b, hb, hba⟩ := hs.exists_ne a obtain ⟨n, rfl⟩ := hf.2 ha hb exact fun h => hba (IsFixedPt.perm_zpow h n) protected theorem IsCycle.isCycleOn (hf : f.IsCycle) : f.IsCycleOn { x \| f x ≠ x } := ⟨f.bijOn fun _ => f.apply_eq_iff_eq.not, fun _ ha _ => hf.sameCycle ha⟩ /-- This lemma demonstrates the relation between `Equiv.Perm.IsCycle` and `Equiv.Perm.IsCycleOn` in non-degenerate cases. -/ theorem isCycle_iff_exists_isCycleOn : f.IsCycle ↔ ∃ s : Set α, s.Nontrivial ∧ f.IsCycleOn s ∧ ∀ ⦃x⦄, ¬IsFixedPt f x → x ∈ s := by refine ⟨fun hf => ⟨{ x \| f x ≠ x }, ?_, hf.isCycleOn, fun _ => id⟩, ?_⟩ · obtain ⟨a, ha⟩ := hf exact ⟨f a, f.injective.ne ha.1, a, ha.1, ha.1⟩ · rintro ⟨s, hs, hf, hsf⟩ obtain ⟨a, ha⟩ := hs.nonempty exact ⟨a, hf.apply_ne hs ha, fun b hb => hf.2 ha <\| hsf hb⟩ theorem IsCycleOn.apply_mem_iff (hf : f.IsCycleOn s) : f x ∈ s ↔ x ∈ s := ⟨fun hx => by convert hf.1.perm_inv.1 hx rw [inv_apply_self], fun hx => hf.1.mapsTo hx⟩ /-- Note that the identity satisfies `IsCycleOn` for any subsingleton set, but not `IsCycle`. -/ theorem IsCycleOn.isCycle_subtypePerm (hf : f.IsCycleOn s) (hs : s.Nontrivial) : (f.subtypePerm fun _ => hf.apply_mem_iff.symm : Perm s).IsCycle := by obtain ⟨a, ha⟩ := hs.nonempty exact ⟨⟨a, ha⟩, ne_of_apply_ne ((↑) : s → α) (hf.apply_ne hs ha), fun b _ => (hf.2 (⟨a, ha⟩ : s).2 b.2).subtypePerm⟩ /-- Note that the identity is a cycle on any subsingleton set, but not a cycle. -/ protected theorem IsCycleOn.subtypePerm (hf : f.IsCycleOn s) : (f.subtypePerm fun _ => hf.apply_mem_iff.symm : Perm s).IsCycleOn _root_.Set.univ := by obtain hs \| hs := s.subsingleton_or_nontrivial · haveI := hs.coe_sort exact isCycleOn_of_subsingleton _ _ convert (hf.isCycle_subtypePerm hs).isCycleOn rw [eq_comm, Set.eq_univ_iff_forall] exact fun x => ne_of_apply_ne ((↑) : s → α) (hf.apply_ne hs x.2) -- TODO: Theory of order of an element under an action theorem IsCycleOn.pow_apply_eq {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) {n : ℕ} : (f ^ n) a = a ↔ #s ∣ n := by obtain rfl \| hs := Finset.eq_singleton_or_nontrivial ha · rw [coe_singleton, isCycleOn_singleton] at hf simpa using IsFixedPt.iterate hf n classical have h (x : s) : ¬f x = x := hf.apply_ne hs x.2 have := (hf.isCycle_subtypePerm hs).orderOf simp only [coe_sort_coe, support_subtype_perm, ne_eq, h, not_false_eq_true, univ_eq_attach, mem_attach, imp_self, implies_true, filter_true_of_mem, card_attach] at this rw [← this, orderOf_dvd_iff_pow_eq_one, (hf.isCycle_subtypePerm hs).pow_eq_one_iff' (ne_of_apply_ne ((↑) : s → α) <\| hf.apply_ne hs (⟨a, ha⟩ : s).2)] simp [-coe_sort_coe] theorem IsCycleOn.zpow_apply_eq {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) : ∀ {n : ℤ}, (f ^ n) a = a ↔ (#s : ℤ) ∣ n \| Int.ofNat _ => (hf.pow_apply_eq ha).trans Int.natCast_dvd_natCast.symm \| Int.negSucc n => by rw [zpow_negSucc, ← inv_pow] exact (hf.inv.pow_apply_eq ha).trans (dvd_neg.trans Int.natCast_dvd_natCast).symm theorem IsCycleOn.pow_apply_eq_pow_apply {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) {m n : ℕ} : (f ^ m) a = (f ^ n) a ↔ m ≡ n [MOD #s] := by rw [Nat.modEq_iff_dvd, ← hf.zpow_apply_eq ha] simp [sub_eq_neg_add, zpow_add, eq_inv_iff_eq, eq_comm] theorem IsCycleOn.zpow_apply_eq_zpow_apply {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) {m n : ℤ} : (f ^ m) a = (f ^ n) a ↔ m ≡ n [ZMOD #s] := by rw [Int.modEq_iff_dvd, ← hf.zpow_apply_eq ha] simp [sub_eq_neg_add, zpow_add, eq_inv_iff_eq, eq_comm] theorem IsCycleOn.pow_card_apply {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) : (f ^ #s) a = a := (hf.pow_apply_eq ha).2 dvd_rfl theorem IsCycleOn.exists_pow_eq {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) (hb : b ∈ s) : ∃ n < #s, (f ^ n) a = b := by classical obtain ⟨n, rfl⟩ := hf.2 ha hb obtain ⟨k, hk⟩ := (Int.mod_modEq n #s).symm.dvd refine ⟨n.natMod #s, Int.natMod_lt (Nonempty.card_pos ⟨a, ha⟩).ne', ?_⟩ rw [← zpow_natCast, Int.natMod, Int.toNat_of_nonneg (Int.emod_nonneg _ <\| Nat.cast_ne_zero.2 (Nonempty.card_pos ⟨a, ha⟩).ne'), sub_eq_iff_eq_add'.1 hk, zpow_add, zpow_mul] simp only [zpow_natCast, coe_mul, comp_apply, EmbeddingLike.apply_eq_iff_eq] exact IsFixedPt.perm_zpow (hf.pow_card_apply ha) _ theorem IsCycleOn.exists_pow_eq' (hs : s.Finite) (hf : f.IsCycleOn s) (ha : a ∈ s) (hb : b ∈ s) : ∃ n : ℕ, (f ^ n) a = b := by lift s to Finset α using id hs obtain ⟨n, -, hn⟩ := hf.exists_pow_eq ha hb exact ⟨n, hn⟩ theorem IsCycleOn.range_pow (hs : s.Finite) (h : f.IsCycleOn s) (ha : a ∈ s) : Set.range (fun n => (f ^ n) a : ℕ → α) = s := Set.Subset.antisymm (Set.range_subset_iff.2 fun _ => h.1.mapsTo.perm_pow _ ha) fun _ => h.exists_pow_eq' hs ha theorem IsCycleOn.range_zpow (h : f.IsCycleOn s) (ha : a ∈ s) : Set.range (fun n => (f ^ n) a : ℤ → α) = s := Set.Subset.antisymm (Set.range_subset_iff.2 fun _ => (h.1.perm_zpow _).mapsTo ha) <\| h.2 ha theorem IsCycleOn.of_pow {n : ℕ} (hf : (f ^ n).IsCycleOn s) (h : Set.BijOn f s s) : f.IsCycleOn s := ⟨h, fun _ hx _ hy => (hf.2 hx hy).of_pow⟩ theorem IsCycleOn.of_zpow {n : ℤ} (hf : (f ^ n).IsCycleOn s) (h : Set.BijOn f s s) : f.IsCycleOn s := ⟨h, fun _ hx _ hy => (hf.2 hx hy).of_zpow⟩ theorem IsCycleOn.extendDomain {p : β → Prop} [DecidablePred p] (f : α ≃ Subtype p) (h : g.IsCycleOn s) : (g.extendDomain f).IsCycleOn ((↑) ∘ f '' s) := ⟨h.1.extendDomain, by rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩ exact (h.2 ha hb).extendDomain⟩ protected theorem IsCycleOn.countable (hs : f.IsCycleOn s) : s.Countable := by obtain rfl \| ⟨a, ha⟩ := s.eq_empty_or_nonempty · exact Set.countable_empty · exact (Set.countable_range fun n : ℤ => (⇑(f ^ n) : α → α) a).mono (hs.2 ha) end IsCycleOn end Equiv.Perm namespace List section variable [DecidableEq α] {l : List α} theorem Nodup.isCycleOn_formPerm (h : l.Nodup) : l.formPerm.IsCycleOn { a \| a ∈ l } := by refine ⟨l.formPerm.bijOn fun _ => List.formPerm_mem_iff_mem, fun a ha b hb => ?_⟩ rw [Set.mem_setOf, ← List.idxOf_lt_length_iff] at ha hb rw [← List.getElem_idxOf ha, ← List.getElem_idxOf hb] refine ⟨l.idxOf b - l.idxOf a, ?_⟩ simp only [sub_eq_neg_add, zpow_add, zpow_neg, Equiv.Perm.inv_eq_iff_eq, zpow_natCast, Equiv.Perm.coe_mul, List.formPerm_pow_apply_getElem _ h, Function.comp] rw [add_comm] end end List namespace Finset variable [DecidableEq α] [Fintype α] theorem exists_cycleOn (s : Finset α) : ∃ f : Perm α, f.IsCycleOn s ∧ f.support ⊆ s := by refine ⟨s.toList.formPerm, ?_, fun x hx => by simpa using List.mem_of_formPerm_apply_ne (Perm.mem_support.1 hx)⟩ convert s.nodup_toList.isCycleOn_formPerm simp end Finset namespace Set variable {f : Perm α} {s : Set α} theorem Countable.exists_cycleOn (hs : s.Countable) : ∃ f : Perm α, f.IsCycleOn s ∧ { x \| f x ≠ x } ⊆ s := by classical obtain hs' \| hs' := s.finite_or_infinite · refine ⟨hs'.toFinset.toList.formPerm, ?_, fun x hx => by simpa using List.mem_of_formPerm_apply_ne hx⟩ convert hs'.toFinset.nodup_toList.isCycleOn_formPerm simp · haveI := hs.to_subtype haveI := hs'.to_subtype obtain ⟨f⟩ : Nonempty (ℤ ≃ s) := inferInstance refine ⟨(Equiv.addRight 1).extendDomain f, ?_, fun x hx => of_not_not fun h => hx <\| Perm.extendDomain_apply_not_subtype _ _ h⟩ convert Int.addRight_one_isCycle.isCycleOn.extendDomain f rw [Set.image_comp, Equiv.image_eq_preimage] ext simp theorem prod_self_eq_iUnion_perm (hf : f.IsCycleOn s) : s ×ˢ s = ⋃ n : ℤ, (fun a => (a, (f ^ n) a)) '' s := by ext ⟨a, b⟩ simp only [Set.mem_prod, Set.mem_iUnion, Set.mem_image] refine ⟨fun hx => ?_, ?_⟩ · obtain ⟨n, rfl⟩ := hf.2 hx.1 hx.2 exact ⟨_, _, hx.1, rfl⟩ · rintro ⟨n, a, ha, ⟨⟩⟩ exact ⟨ha, (hf.1.perm_zpow _).mapsTo ha⟩ end Set namespace Finset variable {f : Perm α} {s : Finset α} theorem product_self_eq_disjiUnion_perm_aux (hf : f.IsCycleOn s) : (range #s : Set ℕ).PairwiseDisjoint fun k => s.map ⟨fun i => (i, (f ^ k) i), fun _ _ => congr_arg Prod.fst⟩ := by obtain hs \| _ := (s : Set α).subsingleton_or_nontrivial · refine Set.Subsingleton.pairwise ?_ _ simp_rw [Set.Subsingleton, mem_coe, ← card_le_one] at hs ⊢ rwa [card_range] classical rintro m hm n hn hmn simp only [disjoint_left, Function.onFun, mem_map, Function.Embedding.coeFn_mk, exists_prop, not_exists, not_and, forall_exists_index, and_imp, Prod.forall, Prod.mk_inj] rintro _ _ _ - rfl rfl a ha rfl h rw [hf.pow_apply_eq_pow_apply ha] at h rw [mem_coe, mem_range] at hm hn exact hmn.symm (h.eq_of_lt_of_lt hn hm) /-- We can partition the square `s ×ˢ s` into shifted diagonals as such: ``` 01234 40123 34012 23401 12340 ``` The diagonals are given by the cycle `f`. -/ theorem product_self_eq_disjiUnion_perm (hf : f.IsCycleOn s) : s ×ˢ s = (range #s).disjiUnion (fun k => s.map ⟨fun i => (i, (f ^ k) i), fun _ _ => congr_arg Prod.fst⟩) (product_self_eq_disjiUnion_perm_aux hf) := by ext ⟨a, b⟩ simp only [mem_product, Equiv.Perm.coe_pow, mem_disjiUnion, mem_range, mem_map, Function.Embedding.coeFn_mk, Prod.mk_inj, exists_prop] refine ⟨fun hx => ?_, ?_⟩ · obtain ⟨n, hn, rfl⟩ := hf.exists_pow_eq hx.1 hx.2 exact ⟨n, hn, a, hx.1, rfl, by rw [f.iterate_eq_pow]⟩ · rintro ⟨n, -, a, ha, rfl, rfl⟩ exact ⟨ha, (hf.1.iterate _).mapsTo ha⟩ end Finset namespace Finset variable [Semiring α] [AddCommMonoid β] [Module α β] {s : Finset ι} {σ : Perm ι} theorem sum_smul_sum_eq_sum_perm (hσ : σ.IsCycleOn s) (f : ι → α) (g : ι → β) : (∑ i ∈ s, f i) • ∑ i ∈ s, g i = ∑ k ∈ range #s, ∑ i ∈ s, f i • g ((σ ^ k) i) := by rw [sum_smul_sum, ← sum_product'] simp_rw [product_self_eq_disjiUnion_perm hσ, sum_disjiUnion, sum_map, Embedding.coeFn_mk] theorem sum_mul_sum_eq_sum_perm (hσ : σ.IsCycleOn s) (f g : ι → α) : ((∑ i ∈ s, f i) * ∑ i ∈ s, g i) = ∑ k ∈ range #s, ∑ i ∈ s, f i * g ((σ ^ k) i) := sum_smul_sum_eq_sum_perm hσ f g end Finset namespace Equiv.Perm theorem subtypePerm_apply_pow_of_mem {g : Perm α} {s : Finset α} (hs : ∀ x : α, x ∈ s ↔ g x ∈ s) {n : ℕ} {x : α} (hx : x ∈ s) : ((g.subtypePerm hs ^ n) (⟨x, hx⟩ : s) : α) = (g ^ n) x := by simp only [subtypePerm_pow, subtypePerm_apply] theorem subtypePerm_apply_zpow_of_mem {g : Perm α} {s : Finset α} (hs : ∀ x : α, x ∈ s ↔ g x ∈ s) {i : ℤ} {x : α} (hx : x ∈ s) : ((g.subtypePerm hs ^ i) (⟨x, hx⟩ : s) : α) = (g ^ i) x := by simp only [subtypePerm_zpow, subtypePerm_apply] variable [Fintype α] [DecidableEq α] /-- Restrict a permutation to its support -/ def subtypePermOfSupport (c : Perm α) : Perm c.support := subtypePerm c fun _ : α => apply_mem_support.symm /-- Restrict a permutation to a Finset containing its support -/ def subtypePerm_of_support_le (c : Perm α) {s : Finset α} (hcs : c.support ⊆ s) : Equiv.Perm s := subtypePerm c (isInvariant_of_support_le hcs) /-- Support of a cycle is nonempty -/ theorem IsCycle.nonempty_support {g : Perm α} (hg : g.IsCycle) : g.support.Nonempty := by rw [Finset.nonempty_iff_ne_empty, ne_eq, support_eq_empty_iff] exact IsCycle.ne_one hg /-- Centralizer of a cycle is a power of that cycle on the cycle -/ theorem IsCycle.commute_iff' {g c : Perm α} (hc : c.IsCycle) : Commute g c ↔ ∃ hc' : ∀ x : α, x ∈ c.support ↔ g x ∈ c.support, subtypePerm g hc' ∈ Subgroup.zpowers c.subtypePermOfSupport := by constructor · intro hgc have hgc' := mem_support_iff_of_commute hgc use hgc' obtain ⟨a, ha⟩ := IsCycle.nonempty_support hc obtain ⟨i, hi⟩ := hc.sameCycle (mem_support.mp ha) (mem_support.mp ((hgc' a).mp ha)) use i ext ⟨x, hx⟩ simp only [subtypePermOfSupport, Subtype.coe_mk, subtypePerm_apply] rw [subtypePerm_apply_zpow_of_mem] obtain ⟨j, rfl⟩ := hc.sameCycle (mem_support.mp ha) (mem_support.mp hx) simp only [← mul_apply, Commute.eq (Commute.zpow_right hgc j)] rw [← zpow_add, add_comm i j, zpow_add] simp only [mul_apply, EmbeddingLike.apply_eq_iff_eq] exact hi · rintro ⟨hc', ⟨i, hi⟩⟩ ext x simp only [coe_mul, Function.comp_apply] by_cases hx : x ∈ c.support · suffices hi' : ∀ x ∈ c.support, g x = (c ^ i) x by rw [hi' x hx, hi' (c x) (apply_mem_support.mpr hx)] simp only [← mul_apply, ← zpow_add_one, ← zpow_one_add, add_comm] intro x hx have hix := Perm.congr_fun hi ⟨x, hx⟩ simp only [← Subtype.coe_inj, subtypePermOfSupport, Subtype.coe_mk, subtypePerm_apply, subtypePerm_apply_zpow_of_mem] at hix exact hix.symm · rw [not_mem_support.mp hx, eq_comm, ← not_mem_support] contrapose! hx exact (hc' x).mpr hx /-- A permutation `g` commutes with a cycle `c` if and only if `c.support` is invariant under `g`, and `g` acts on it as a power of `c`. -/ theorem IsCycle.commute_iff {g c : Perm α} (hc : c.IsCycle) : Commute g c ↔ ∃ hc' : ∀ x : α, x ∈ c.support ↔ g x ∈ c.support, ofSubtype (subtypePerm g hc') ∈ Subgroup.zpowers c := by simp_rw [hc.commute_iff', Subgroup.mem_zpowers_iff] refine exists_congr fun hc' => exists_congr fun k => ?_ rw [subtypePermOfSupport, subtypePerm_zpow c k] simp only [Perm.ext_iff, subtypePerm_apply, Subtype.mk.injEq, Subtype.forall] apply forall_congr' intro a by_cases ha : a ∈ c.support · rw [imp_iff_right ha, ofSubtype_subtypePerm_of_mem hc' ha] · rw [iff_true_left (fun b ↦ (ha b).elim), ofSubtype_apply_of_not_mem, ← not_mem_support] · exact Finset.not_mem_mono (support_zpow_le c k) ha · exact ha theorem zpow_eq_ofSubtype_subtypePerm_iff {g c : Equiv.Perm α} {s : Finset α} (hg : ∀ x, x ∈ s ↔ g x ∈ s) (hc : c.support ⊆ s) (n : ℤ) : c ^ n = ofSubtype (g.subtypePerm hg) ↔ c.subtypePerm (isInvariant_of_support_le hc) ^ n = g.subtypePerm hg := by constructor · intro h ext ⟨x, hx⟩ simp only [Perm.congr_fun h x, subtypePerm_apply_zpow_of_mem, Subtype.coe_mk, subtypePerm_apply] rw [ofSubtype_apply_of_mem] · simp only [Subtype.coe_mk, subtypePerm_apply] · exact hx · intro h; ext x rw [← h] by_cases hx : x ∈ s · rw [ofSubtype_apply_of_mem (subtypePerm c _ ^ n) hx, subtypePerm_zpow, subtypePerm_apply] · rw [ofSubtype_apply_of_not_mem (subtypePerm c _ ^ n) hx, ← not_mem_support] exact fun hx' ↦ hx (hc (support_zpow_le _ _ hx')) theorem cycle_zpow_mem_support_iff {g : Perm α} (hg : g.IsCycle) {n : ℤ} {x : α} (hx : g x ≠ x) : (g ^ n) x = x ↔ n % #g.support = 0 := by set q := n / #g.support set r := n % #g.support have div_euc : r + #g.support * q = n ∧ 0 ≤ r ∧ r < #g.support := by rw [← Int.ediv_emod_unique _] · exact ⟨rfl, rfl⟩ simp only [Int.natCast_pos]	apply lt_of_lt_of_le _ (IsCycle.two_le_card_support hg); norm_num simp only [← hg.orderOf] at div_euc obtain ⟨m, hm⟩ := Int.eq_ofNat_of_zero_le div_euc.2.1 simp only [hm, Nat.cast_nonneg, Nat.cast_lt, true_and] at div_euc rw [← div_euc.1, zpow_add g] simp only [hm, Nat.cast_eq_zero, zpow_natCast, coe_mul, comp_apply,zpow_mul, pow_orderOf_eq_one, one_zpow, coe_one, id_eq] have : (g ^ m) x = x ↔ g ^ m = 1 := by constructor · intro hgm simp only [IsCycle.pow_eq_one_iff hg] use x · intro hgm	Mathlib/GroupTheory/Perm/Cycle/Basic.lean	1,086	1,098
/- Copyright (c) 2021 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn -/ import Mathlib.MeasureTheory.Group.Measure import Mathlib.MeasureTheory.Measure.Prod /-! # Measure theory in the product of groups In this file we show properties about measure theory in products of measurable groups and properties of iterated integrals in measurable groups. These lemmas show the uniqueness of left invariant measures on measurable groups, up to scaling. In this file we follow the proof and refer to the book Measure Theory by Paul Halmos. The idea of the proof is to use the translation invariance of measures to prove `μ(t) = c * μ(s)` for two sets `s` and `t`, where `c` is a constant that does not depend on `μ`. Let `e` and `f` be the characteristic functions of `s` and `t`. Assume that `μ` and `ν` are left-invariant measures. Then the map `(x, y) ↦ (y * x, x⁻¹)` preserves the measure `μ × ν`, which means that ``` ∫ x, ∫ y, h x y ∂ν ∂μ = ∫ x, ∫ y, h (y * x) x⁻¹ ∂ν ∂μ ``` If we apply this to `h x y := e x * f y⁻¹ / ν ((fun h ↦ h * y⁻¹) ⁻¹' s)`, we can rewrite the RHS to `μ(t)`, and the LHS to `c * μ(s)`, where `c = c(ν)` does not depend on `μ`. Applying this to `μ` and to `ν` gives `μ (t) / μ (s) = ν (t) / ν (s)`, which is the uniqueness up to scalar multiplication. The proof in [Halmos] seems to contain an omission in §60 Th. A, see `MeasureTheory.measure_lintegral_div_measure`. Note that this theory only applies in measurable groups, i.e., when multiplication and inversion are measurable. This is not the case in general in locally compact groups, or even in compact groups, when the topology is not second-countable. For arguments along the same line, but using continuous functions instead of measurable sets and working in the general locally compact setting, see the file `Mathlib/MeasureTheory/Measure/Haar/Unique.lean`. -/ noncomputable section open Set hiding prod_eq open Function MeasureTheory open Filter hiding map open scoped ENNReal Pointwise MeasureTheory variable (G : Type) [MeasurableSpace G] variable [Group G] [MeasurableMul₂ G] variable (μ ν : Measure G) [SFinite ν] [SFinite μ] {s : Set G} /-- The map `(x, y) ↦ (x, xy)` as a `MeasurableEquiv`. -/ @[to_additive "The map `(x, y) ↦ (x, x + y)` as a `MeasurableEquiv`."] protected def MeasurableEquiv.shearMulRight [MeasurableInv G] : G × G ≃ᵐ G × G := { Equiv.prodShear (Equiv.refl _) Equiv.mulLeft with measurable_toFun := measurable_fst.prodMk measurable_mul measurable_invFun := measurable_fst.prodMk <\| measurable_fst.inv.mul measurable_snd } /-- The map `(x, y) ↦ (x, y / x)` as a `MeasurableEquiv` with as inverse `(x, y) ↦ (x, yx)` -/ @[to_additive "The map `(x, y) ↦ (x, y - x)` as a `MeasurableEquiv` with as inverse `(x, y) ↦ (x, y + x)`."] protected def MeasurableEquiv.shearDivRight [MeasurableInv G] : G × G ≃ᵐ G × G := { Equiv.prodShear (Equiv.refl _) Equiv.divRight with measurable_toFun := measurable_fst.prodMk <\| measurable_snd.div measurable_fst measurable_invFun := measurable_fst.prodMk <\| measurable_snd.mul measurable_fst } variable {G} namespace MeasureTheory open Measure section LeftInvariant /-- The multiplicative shear mapping `(x, y) ↦ (x, xy)` preserves the measure `μ × ν`. This condition is part of the definition of a measurable group in [Halmos, §59]. There, the map in this lemma is called `S`. -/ @[to_additive measurePreserving_prod_add " The shear mapping `(x, y) ↦ (x, x + y)` preserves the measure `μ × ν`. "] theorem measurePreserving_prod_mul [IsMulLeftInvariant ν] : MeasurePreserving (fun z : G × G => (z.1, z.1 z.2)) (μ.prod ν) (μ.prod ν) := (MeasurePreserving.id μ).skew_product measurable_mul <\| Filter.Eventually.of_forall <\| map_mul_left_eq_self ν /-- The map `(x, y) ↦ (y, yx)` sends the measure `μ × ν` to `ν × μ`. This is the map `SR` in [Halmos, §59]. `S` is the map `(x, y) ↦ (x, xy)` and `R` is `Prod.swap`. -/ @[to_additive measurePreserving_prod_add_swap " The map `(x, y) ↦ (y, y + x)` sends the measure `μ × ν` to `ν × μ`. "] theorem measurePreserving_prod_mul_swap [IsMulLeftInvariant μ] : MeasurePreserving (fun z : G × G => (z.2, z.2 * z.1)) (μ.prod ν) (ν.prod μ) := (measurePreserving_prod_mul ν μ).comp measurePreserving_swap @[to_additive] theorem measurable_measure_mul_right (hs : MeasurableSet s) : Measurable fun x => μ ((fun y => y * x) ⁻¹' s) := by suffices Measurable fun y => μ ((fun x => (x, y)) ⁻¹' ((fun z : G × G => ((1 : G), z.1 * z.2)) ⁻¹' univ ×ˢ s)) by convert this using 1; ext1 x; congr 1 with y : 1; simp apply measurable_measure_prodMk_right apply measurable_const.prodMk measurable_mul (MeasurableSet.univ.prod hs) infer_instance variable [MeasurableInv G] /-- The map `(x, y) ↦ (x, x⁻¹y)` is measure-preserving. This is the function `S⁻¹` in [Halmos, §59], where `S` is the map `(x, y) ↦ (x, xy)`. -/ @[to_additive measurePreserving_prod_neg_add "The map `(x, y) ↦ (x, - x + y)` is measure-preserving."] theorem measurePreserving_prod_inv_mul [IsMulLeftInvariant ν] : MeasurePreserving (fun z : G × G => (z.1, z.1⁻¹ * z.2)) (μ.prod ν) (μ.prod ν) := (measurePreserving_prod_mul μ ν).symm <\| MeasurableEquiv.shearMulRight G variable [IsMulLeftInvariant μ] /-- The map `(x, y) ↦ (y, y⁻¹x)` sends `μ × ν` to `ν × μ`. This is the function `S⁻¹R` in [Halmos, §59], where `S` is the map `(x, y) ↦ (x, xy)` and `R` is `Prod.swap`. -/ @[to_additive measurePreserving_prod_neg_add_swap "The map `(x, y) ↦ (y, - y + x)` sends `μ × ν` to `ν × μ`."] theorem measurePreserving_prod_inv_mul_swap : MeasurePreserving (fun z : G × G => (z.2, z.2⁻¹ * z.1)) (μ.prod ν) (ν.prod μ) := (measurePreserving_prod_inv_mul ν μ).comp measurePreserving_swap /-- The map `(x, y) ↦ (yx, x⁻¹)` is measure-preserving. This is the function `S⁻¹RSR` in [Halmos, §59], where `S` is the map `(x, y) ↦ (x, xy)` and `R` is `Prod.swap`. -/ @[to_additive measurePreserving_add_prod_neg "The map `(x, y) ↦ (y + x, - x)` is measure-preserving."] theorem measurePreserving_mul_prod_inv [IsMulLeftInvariant ν] : MeasurePreserving (fun z : G × G => (z.2 * z.1, z.1⁻¹)) (μ.prod ν) (μ.prod ν) := by convert (measurePreserving_prod_inv_mul_swap ν μ).comp (measurePreserving_prod_mul_swap μ ν) using 1 ext1 ⟨x, y⟩ simp_rw [Function.comp_apply, mul_inv_rev, inv_mul_cancel_right] @[to_additive] theorem quasiMeasurePreserving_inv : QuasiMeasurePreserving (Inv.inv : G → G) μ μ := by refine ⟨measurable_inv, AbsolutelyContinuous.mk fun s hsm hμs => ?_⟩ rw [map_apply measurable_inv hsm, inv_preimage] have hf : Measurable fun z : G × G => (z.2 * z.1, z.1⁻¹) := (measurable_snd.mul measurable_fst).prodMk measurable_fst.inv suffices map (fun z : G × G => (z.2 * z.1, z.1⁻¹)) (μ.prod μ) (s⁻¹ ×ˢ s⁻¹) = 0 by simpa only [(measurePreserving_mul_prod_inv μ μ).map_eq, prod_prod, mul_eq_zero (M₀ := ℝ≥0∞), or_self_iff] using this have hsm' : MeasurableSet (s⁻¹ ×ˢ s⁻¹) := hsm.inv.prod hsm.inv simp_rw [map_apply hf hsm', prod_apply_symm (μ := μ) (ν := μ) (hf hsm'), preimage_preimage, mk_preimage_prod, inv_preimage, inv_inv, measure_mono_null inter_subset_right hμs, lintegral_zero] @[to_additive (attr := simp)] theorem measure_inv_null : μ s⁻¹ = 0 ↔ μ s = 0 := by refine ⟨fun hs => ?_, (quasiMeasurePreserving_inv μ).preimage_null⟩ rw [← inv_inv s] exact (quasiMeasurePreserving_inv μ).preimage_null hs @[to_additive (attr := simp)] theorem inv_ae : (ae μ)⁻¹ = ae μ := by refine le_antisymm (quasiMeasurePreserving_inv μ).tendsto_ae ?_ nth_rewrite 1 [← inv_inv (ae μ)] exact Filter.map_mono (quasiMeasurePreserving_inv μ).tendsto_ae @[to_additive (attr := simp)] theorem eventuallyConst_inv_set_ae : EventuallyConst (s⁻¹ : Set G) (ae μ) ↔ EventuallyConst s (ae μ) := by rw [← inv_preimage, eventuallyConst_preimage, Filter.map_inv, inv_ae] @[to_additive] theorem inv_absolutelyContinuous : μ.inv ≪ μ := (quasiMeasurePreserving_inv μ).absolutelyContinuous @[to_additive] theorem absolutelyContinuous_inv : μ ≪ μ.inv := by refine AbsolutelyContinuous.mk fun s _ => ?_ simp_rw [inv_apply μ s, measure_inv_null, imp_self] @[to_additive] theorem lintegral_lintegral_mul_inv [IsMulLeftInvariant ν] (f : G → G → ℝ≥0∞) (hf : AEMeasurable (uncurry f) (μ.prod ν)) : (∫⁻ x, ∫⁻ y, f (y * x) x⁻¹ ∂ν ∂μ) = ∫⁻ x, ∫⁻ y, f x y ∂ν ∂μ := by have h : Measurable fun z : G × G => (z.2 * z.1, z.1⁻¹) := (measurable_snd.mul measurable_fst).prodMk measurable_fst.inv have h2f : AEMeasurable (uncurry fun x y => f (y * x) x⁻¹) (μ.prod ν) := hf.comp_quasiMeasurePreserving (measurePreserving_mul_prod_inv μ ν).quasiMeasurePreserving simp_rw [lintegral_lintegral h2f, lintegral_lintegral hf]	conv_rhs => rw [← (measurePreserving_mul_prod_inv μ ν).map_eq] symm exact	Mathlib/MeasureTheory/Group/Prod.lean	191	193
/- Copyright (c) 2023 Jujian Zhang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jujian Zhang, Fangming Li, Joachim Breitner -/ import Mathlib.Algebra.Order.Group.Int import Mathlib.Algebra.Order.SuccPred.WithBot import Mathlib.Data.ENat.Lattice import Mathlib.Data.Int.Basic import Mathlib.Order.Atoms import Mathlib.Order.Minimal import Mathlib.Order.RelSeries import Mathlib.Order.LatticeIntervals import Mathlib.Tactic.FinCases /-! # Krull dimension of a preordered set and height of an element If `α` is a preordered set, then `krullDim α : WithBot ℕ∞` is defined to be `sup {n \| a₀ < a₁ < ... < aₙ}`. In case that `α` is empty, then its Krull dimension is defined to be negative infinity; if the length of all series `a₀ < a₁ < ... < aₙ` is unbounded, then its Krull dimension is defined to be positive infinity. For `a : α`, its height (in `ℕ∞`) is defined to be `sup {n \| a₀ < a₁ < ... < aₙ ≤ a}`, while its coheight is defined to be `sup {n \| a ≤ a₀ < a₁ < ... < aₙ}` . ## Main results * The Krull dimension is the same as that of the dual order (`krullDim_orderDual`). * The Krull dimension is the supremum of the heights of the elements (`krullDim_eq_iSup_height`), or their coheights (`krullDim_eq_iSup_coheight`), or their sums of height and coheight (`krullDim_eq_iSup_height_add_coheight_of_nonempty`) * The height in the dual order equals the coheight, and vice versa. * The height is monotone (`height_mono`), and strictly monotone if finite (`height_strictMono`). * The coheight is antitone (`coheight_anti`), and strictly antitone if finite (`coheight_strictAnti`). * The height is the supremum of the successor of the height of all smaller elements (`height_eq_iSup_lt_height`). * The elements of height zero are the minimal elements (`height_eq_zero`), and the elements of height `n` are minimal among those of height `≥ n` (`height_eq_coe_iff_minimal_le_height`). * Concrete calculations for the height, coheight and Krull dimension in `ℕ`, `ℤ`, `WithTop`, `WithBot` and `ℕ∞`. ## Design notes Krull dimensions are defined to take value in `WithBot ℕ∞` so that `(-∞) + (+∞)` is also negative infinity. This is because we want Krull dimensions to be additive with respect to product of varieties so that `-∞` being the Krull dimension of empty variety is equal to sum of `-∞` and the Krull dimension of any other varieties. We could generalize the notion of Krull dimension to an arbitrary binary relation; many results in this file would generalize as well. But we don't think it would be useful, so we only define Krull dimension of a preorder. -/ assert_not_exists Field namespace Order	section definitions /-- The Krull dimension of a preorder `α` is the supremum of the rightmost index of all relation series of `α` ordered by `<`. If there is no series `a₀ < a₁ < ... < aₙ` in `α`, then its Krull dimension is defined to be negative infinity; if the length of all series `a₀ < a₁ < ... < aₙ` is unbounded, its Krull dimension is defined to be positive infinity. -/ noncomputable def krullDim (α : Type*) [Preorder α] : WithBot ℕ∞ := ⨆ (p : LTSeries α), p.length	Mathlib/Order/KrullDimension.lean	69	79
/- Copyright (c) 2015, 2017 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Robert Y. Lewis, Johannes Hölzl, Mario Carneiro, Sébastien Gouëzel -/ import Mathlib.Algebra.Order.BigOperators.Group.Finset import Mathlib.Order.Interval.Finset.Nat import Mathlib.Topology.EMetricSpace.Defs import Mathlib.Topology.UniformSpace.Compact import Mathlib.Topology.UniformSpace.LocallyUniformConvergence import Mathlib.Topology.UniformSpace.UniformEmbedding /-! # Extended metric spaces Further results about extended metric spaces. -/ open Set Filter universe u v w variable {α : Type u} {β : Type v} {X : Type} open scoped Uniformity Topology NNReal ENNReal Pointwise variable [PseudoEMetricSpace α] /-- The triangle (polygon) inequality for sequences of points; `Finset.Ico` version. -/ theorem edist_le_Ico_sum_edist (f : ℕ → α) {m n} (h : m ≤ n) : edist (f m) (f n) ≤ ∑ i ∈ Finset.Ico m n, edist (f i) (f (i + 1)) := by induction n, h using Nat.le_induction with \| base => rw [Finset.Ico_self, Finset.sum_empty, edist_self] \| succ n hle ihn => calc edist (f m) (f (n + 1)) ≤ edist (f m) (f n) + edist (f n) (f (n + 1)) := edist_triangle _ _ _ _ ≤ (∑ i ∈ Finset.Ico m n, _) + _ := add_le_add ihn le_rfl _ = ∑ i ∈ Finset.Ico m (n + 1), _ := by { rw [Nat.Ico_succ_right_eq_insert_Ico hle, Finset.sum_insert, add_comm]; simp } /-- The triangle (polygon) inequality for sequences of points; `Finset.range` version. -/ theorem edist_le_range_sum_edist (f : ℕ → α) (n : ℕ) : edist (f 0) (f n) ≤ ∑ i ∈ Finset.range n, edist (f i) (f (i + 1)) := Nat.Ico_zero_eq_range ▸ edist_le_Ico_sum_edist f (Nat.zero_le n) /-- A version of `edist_le_Ico_sum_edist` with each intermediate distance replaced with an upper estimate. -/ theorem edist_le_Ico_sum_of_edist_le {f : ℕ → α} {m n} (hmn : m ≤ n) {d : ℕ → ℝ≥0∞} (hd : ∀ {k}, m ≤ k → k < n → edist (f k) (f (k + 1)) ≤ d k) : edist (f m) (f n) ≤ ∑ i ∈ Finset.Ico m n, d i := le_trans (edist_le_Ico_sum_edist f hmn) <\| Finset.sum_le_sum fun _k hk => hd (Finset.mem_Ico.1 hk).1 (Finset.mem_Ico.1 hk).2 /-- A version of `edist_le_range_sum_edist` with each intermediate distance replaced with an upper estimate. -/ theorem edist_le_range_sum_of_edist_le {f : ℕ → α} (n : ℕ) {d : ℕ → ℝ≥0∞} (hd : ∀ {k}, k < n → edist (f k) (f (k + 1)) ≤ d k) : edist (f 0) (f n) ≤ ∑ i ∈ Finset.range n, d i := Nat.Ico_zero_eq_range ▸ edist_le_Ico_sum_of_edist_le (zero_le n) fun _ => hd namespace EMetric theorem isUniformInducing_iff [PseudoEMetricSpace β] {f : α → β} : IsUniformInducing f ↔ UniformContinuous f ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, edist (f a) (f b) < ε → edist a b < δ := isUniformInducing_iff'.trans <\| Iff.rfl.and <\| ((uniformity_basis_edist.comap _).le_basis_iff uniformity_basis_edist).trans <\| by simp only [subset_def, Prod.forall]; rfl /-- ε-δ characterization of uniform embeddings on pseudoemetric spaces -/ nonrec theorem isUniformEmbedding_iff [PseudoEMetricSpace β] {f : α → β} : IsUniformEmbedding f ↔ Function.Injective f ∧ UniformContinuous f ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, edist (f a) (f b) < ε → edist a b < δ := (isUniformEmbedding_iff _).trans <\| and_comm.trans <\| Iff.rfl.and isUniformInducing_iff /-- If a map between pseudoemetric spaces is a uniform embedding then the edistance between `f x` and `f y` is controlled in terms of the distance between `x` and `y`. In fact, this lemma holds for a `IsUniformInducing` map. TODO: generalize? -/ theorem controlled_of_isUniformEmbedding [PseudoEMetricSpace β] {f : α → β} (h : IsUniformEmbedding f) : (∀ ε > 0, ∃ δ > 0, ∀ {a b : α}, edist a b < δ → edist (f a) (f b) < ε) ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, edist (f a) (f b) < ε → edist a b < δ := ⟨uniformContinuous_iff.1 h.uniformContinuous, (isUniformEmbedding_iff.1 h).2.2⟩ /-- ε-δ characterization of Cauchy sequences on pseudoemetric spaces -/ protected theorem cauchy_iff {f : Filter α} : Cauchy f ↔ f ≠ ⊥ ∧ ∀ ε > 0, ∃ t ∈ f, ∀ x, x ∈ t → ∀ y, y ∈ t → edist x y < ε := by rw [← neBot_iff]; exact uniformity_basis_edist.cauchy_iff /-- A very useful criterion to show that a space is complete is to show that all sequences which satisfy a bound of the form `edist (u n) (u m) < B N` for all `n m ≥ N` are converging. This is often applied for `B N = 2^{-N}`, i.e., with a very fast convergence to `0`, which makes it possible to use arguments of converging series, while this is impossible to do in general for arbitrary Cauchy sequences. -/ theorem complete_of_convergent_controlled_sequences (B : ℕ → ℝ≥0∞) (hB : ∀ n, 0 < B n) (H : ∀ u : ℕ → α, (∀ N n m : ℕ, N ≤ n → N ≤ m → edist (u n) (u m) < B N) → ∃ x, Tendsto u atTop (𝓝 x)) : CompleteSpace α := UniformSpace.complete_of_convergent_controlled_sequences (fun n => { p : α × α \| edist p.1 p.2 < B n }) (fun n => edist_mem_uniformity <\| hB n) H /-- A sequentially complete pseudoemetric space is complete. -/ theorem complete_of_cauchySeq_tendsto : (∀ u : ℕ → α, CauchySeq u → ∃ a, Tendsto u atTop (𝓝 a)) → CompleteSpace α := UniformSpace.complete_of_cauchySeq_tendsto /-- Expressing locally uniform convergence on a set using `edist`. -/ theorem tendstoLocallyUniformlyOn_iff {ι : Type} [TopologicalSpace β] {F : ι → β → α} {f : β → α} {p : Filter ι} {s : Set β} : TendstoLocallyUniformlyOn F f p s ↔ ∀ ε > 0, ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, ∀ᶠ n in p, ∀ y ∈ t, edist (f y) (F n y) < ε := by refine ⟨fun H ε hε => H _ (edist_mem_uniformity hε), fun H u hu x hx => ?_⟩ rcases mem_uniformity_edist.1 hu with ⟨ε, εpos, hε⟩ rcases H ε εpos x hx with ⟨t, ht, Ht⟩ exact ⟨t, ht, Ht.mono fun n hs x hx => hε (hs x hx)⟩ /-- Expressing uniform convergence on a set using `edist`. -/ theorem tendstoUniformlyOn_iff {ι : Type} {F : ι → β → α} {f : β → α} {p : Filter ι} {s : Set β} : TendstoUniformlyOn F f p s ↔ ∀ ε > 0, ∀ᶠ n in p, ∀ x ∈ s, edist (f x) (F n x) < ε := by refine ⟨fun H ε hε => H _ (edist_mem_uniformity hε), fun H u hu => ?_⟩ rcases mem_uniformity_edist.1 hu with ⟨ε, εpos, hε⟩ exact (H ε εpos).mono fun n hs x hx => hε (hs x hx) /-- Expressing locally uniform convergence using `edist`. -/ theorem tendstoLocallyUniformly_iff {ι : Type} [TopologicalSpace β] {F : ι → β → α} {f : β → α} {p : Filter ι} : TendstoLocallyUniformly F f p ↔ ∀ ε > 0, ∀ x : β, ∃ t ∈ 𝓝 x, ∀ᶠ n in p, ∀ y ∈ t, edist (f y) (F n y) < ε := by simp only [← tendstoLocallyUniformlyOn_univ, tendstoLocallyUniformlyOn_iff, mem_univ, forall_const, exists_prop, nhdsWithin_univ] /-- Expressing uniform convergence using `edist`. -/ theorem tendstoUniformly_iff {ι : Type} {F : ι → β → α} {f : β → α} {p : Filter ι} : TendstoUniformly F f p ↔ ∀ ε > 0, ∀ᶠ n in p, ∀ x, edist (f x) (F n x) < ε := by simp only [← tendstoUniformlyOn_univ, tendstoUniformlyOn_iff, mem_univ, forall_const] end EMetric open EMetric namespace EMetric variable {x y z : α} {ε ε₁ ε₂ : ℝ≥0∞} {s t : Set α} theorem inseparable_iff : Inseparable x y ↔ edist x y = 0 := by simp [inseparable_iff_mem_closure, mem_closure_iff, edist_comm, forall_lt_iff_le'] alias ⟨_root_.Inseparable.edist_eq_zero, _⟩ := EMetric.inseparable_iff -- see Note [nolint_ge] /-- In a pseudoemetric space, Cauchy sequences are characterized by the fact that, eventually, the pseudoedistance between its elements is arbitrarily small -/ theorem cauchySeq_iff [Nonempty β] [SemilatticeSup β] {u : β → α} : CauchySeq u ↔ ∀ ε > 0, ∃ N, ∀ m, N ≤ m → ∀ n, N ≤ n → edist (u m) (u n) < ε := uniformity_basis_edist.cauchySeq_iff /-- A variation around the emetric characterization of Cauchy sequences -/ theorem cauchySeq_iff' [Nonempty β] [SemilatticeSup β] {u : β → α} : CauchySeq u ↔ ∀ ε > (0 : ℝ≥0∞), ∃ N, ∀ n ≥ N, edist (u n) (u N) < ε := uniformity_basis_edist.cauchySeq_iff' /-- A variation of the emetric characterization of Cauchy sequences that deals with `ℝ≥0` upper bounds. -/ theorem cauchySeq_iff_NNReal [Nonempty β] [SemilatticeSup β] {u : β → α} : CauchySeq u ↔ ∀ ε : ℝ≥0, 0 < ε → ∃ N, ∀ n, N ≤ n → edist (u n) (u N) < ε := uniformity_basis_edist_nnreal.cauchySeq_iff' theorem totallyBounded_iff {s : Set α} : TotallyBounded s ↔ ∀ ε > 0, ∃ t : Set α, t.Finite ∧ s ⊆ ⋃ y ∈ t, ball y ε := ⟨fun H _ε ε0 => H _ (edist_mem_uniformity ε0), fun H _r ru => let ⟨ε, ε0, hε⟩ := mem_uniformity_edist.1 ru let ⟨t, ft, h⟩ := H ε ε0 ⟨t, ft, h.trans <\| iUnion₂_mono fun _ _ _ => hε⟩⟩ theorem totallyBounded_iff' {s : Set α} : TotallyBounded s ↔ ∀ ε > 0, ∃ t, t ⊆ s ∧ Set.Finite t ∧ s ⊆ ⋃ y ∈ t, ball y ε := ⟨fun H _ε ε0 => (totallyBounded_iff_subset.1 H) _ (edist_mem_uniformity ε0), fun H _r ru => let ⟨ε, ε0, hε⟩ := mem_uniformity_edist.1 ru let ⟨t, _, ft, h⟩ := H ε ε0 ⟨t, ft, h.trans <\| iUnion₂_mono fun _ _ _ => hε⟩⟩ section Compact -- TODO: generalize to metrizable spaces /-- A compact set in a pseudo emetric space is separable, i.e., it is a subset of the closure of a countable set. -/ theorem subset_countable_closure_of_compact {s : Set α} (hs : IsCompact s) : ∃ t, t ⊆ s ∧ t.Countable ∧ s ⊆ closure t := by refine subset_countable_closure_of_almost_dense_set s fun ε hε => ?_ rcases totallyBounded_iff'.1 hs.totallyBounded ε hε with ⟨t, -, htf, hst⟩ exact ⟨t, htf.countable, hst.trans <\| iUnion₂_mono fun _ _ => ball_subset_closedBall⟩ end Compact section SecondCountable open TopologicalSpace variable (α) in /-- A sigma compact pseudo emetric space has second countable topology. -/ instance (priority := 90) secondCountable_of_sigmaCompact [SigmaCompactSpace α] : SecondCountableTopology α := by suffices SeparableSpace α by exact UniformSpace.secondCountable_of_separable α choose T _ hTc hsubT using fun n => subset_countable_closure_of_compact (isCompact_compactCovering α n) refine ⟨⟨⋃ n, T n, countable_iUnion hTc, fun x => ?_⟩⟩ rcases iUnion_eq_univ_iff.1 (iUnion_compactCovering α) x with ⟨n, hn⟩ exact closure_mono (subset_iUnion _ n) (hsubT _ hn) theorem secondCountable_of_almost_dense_set (hs : ∀ ε > 0, ∃ t : Set α, t.Countable ∧ ⋃ x ∈ t, closedBall x ε = univ) : SecondCountableTopology α := by suffices SeparableSpace α from UniformSpace.secondCountable_of_separable α have : ∀ ε > 0, ∃ t : Set α, Set.Countable t ∧ univ ⊆ ⋃ x ∈ t, closedBall x ε := by simpa only [univ_subset_iff] using hs rcases subset_countable_closure_of_almost_dense_set (univ : Set α) this with ⟨t, -, htc, ht⟩ exact ⟨⟨t, htc, fun x => ht (mem_univ x)⟩⟩ end SecondCountable end EMetric variable {γ : Type w} [EMetricSpace γ] -- see Note [lower instance priority] /-- An emetric space is separated -/ instance (priority := 100) EMetricSpace.instT0Space : T0Space γ where t0 _ _ h := eq_of_edist_eq_zero <\| inseparable_iff.1 h /-- A map between emetric spaces is a uniform embedding if and only if the edistance between `f x` and `f y` is controlled in terms of the distance between `x` and `y` and conversely. -/ theorem EMetric.isUniformEmbedding_iff' [PseudoEMetricSpace β] {f : γ → β} : IsUniformEmbedding f ↔ (∀ ε > 0, ∃ δ > 0, ∀ {a b : γ}, edist a b < δ → edist (f a) (f b) < ε) ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : γ}, edist (f a) (f b) < ε → edist a b < δ := by rw [isUniformEmbedding_iff_isUniformInducing, isUniformInducing_iff, uniformContinuous_iff] /-- If a `PseudoEMetricSpace` is a T₀ space, then it is an `EMetricSpace`. -/ -- TODO: make it an instance? abbrev EMetricSpace.ofT0PseudoEMetricSpace (α : Type) [PseudoEMetricSpace α] [T0Space α] : EMetricSpace α := { ‹PseudoEMetricSpace α› with eq_of_edist_eq_zero := fun h => (EMetric.inseparable_iff.2 h).eq } /-- The product of two emetric spaces, with the max distance, is an extended metric spaces. We make sure that the uniform structure thus constructed is the one corresponding to the product of uniform spaces, to avoid diamond problems. -/ instance Prod.emetricSpaceMax [EMetricSpace β] : EMetricSpace (γ × β) := .ofT0PseudoEMetricSpace _ namespace EMetric /-- A compact set in an emetric space is separable, i.e., it is the closure of a countable set. -/ theorem countable_closure_of_compact {s : Set γ} (hs : IsCompact s) : ∃ t, t ⊆ s ∧ t.Countable ∧ s = closure t := by rcases subset_countable_closure_of_compact hs with ⟨t, hts, htc, hsub⟩ exact ⟨t, hts, htc, hsub.antisymm (closure_minimal hts hs.isClosed)⟩ end EMetric /-! ### Separation quotient -/ instance [PseudoEMetricSpace X] : EDist (SeparationQuotient X) where edist := SeparationQuotient.lift₂ edist fun _ _ _ _ hx hy => edist_congr (EMetric.inseparable_iff.1 hx) (EMetric.inseparable_iff.1 hy) @[simp] theorem SeparationQuotient.edist_mk [PseudoEMetricSpace X] (x y : X) : edist (mk x) (mk y) = edist x y := rfl open SeparationQuotient in instance [PseudoEMetricSpace X] : EMetricSpace (SeparationQuotient X) := @EMetricSpace.ofT0PseudoEMetricSpace (SeparationQuotient X) { edist_self := surjective_mk.forall.2 edist_self, edist_comm := surjective_mk.forall₂.2 edist_comm, edist_triangle := surjective_mk.forall₃.2 edist_triangle, toUniformSpace := inferInstance, uniformity_edist := comap_injective (surjective_mk.prodMap surjective_mk) <\| by simp [comap_mk_uniformity, PseudoEMetricSpace.uniformity_edist] } _ namespace TopologicalSpace section Compact open Topology /-- If a set `s` is separable in a (pseudo extended) metric space, then it admits a countable dense subset. This is not obvious, as the countable set whose closure covers `s` given by the definition of separability does not need in general to be contained in `s`. -/ theorem IsSeparable.exists_countable_dense_subset {s : Set α} (hs : IsSeparable s) : ∃ t, t ⊆ s ∧ t.Countable ∧ s ⊆ closure t := by have : ∀ ε > 0, ∃ t : Set α, t.Countable ∧ s ⊆ ⋃ x ∈ t, closedBall x ε := fun ε ε0 => by rcases hs with ⟨t, htc, hst⟩ refine ⟨t, htc, hst.trans fun x hx => ?_⟩ rcases mem_closure_iff.1 hx ε ε0 with ⟨y, hyt, hxy⟩ exact mem_iUnion₂.2 ⟨y, hyt, mem_closedBall.2 hxy.le⟩ exact subset_countable_closure_of_almost_dense_set _ this /-- If a set `s` is separable, then the corresponding subtype is separable in a (pseudo extended) metric space. This is not obvious, as the countable set whose closure covers `s` does not need in general to be contained in `s`. -/ theorem IsSeparable.separableSpace {s : Set α} (hs : IsSeparable s) : SeparableSpace s := by rcases hs.exists_countable_dense_subset with ⟨t, hts, htc, hst⟩ lift t to Set s using hts refine ⟨⟨t, countable_of_injective_of_countable_image Subtype.coe_injective.injOn htc, ?_⟩⟩ rwa [IsInducing.subtypeVal.dense_iff, Subtype.forall] end Compact end TopologicalSpace section LebesgueNumberLemma variable {s : Set α} theorem lebesgue_number_lemma_of_emetric {ι : Sort*} {c : ι → Set α} (hs : IsCompact s) (hc₁ : ∀ i, IsOpen (c i)) (hc₂ : s ⊆ ⋃ i, c i) : ∃ δ > 0, ∀ x ∈ s, ∃ i, ball x δ ⊆ c i := by simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm] using uniformity_basis_edist.lebesgue_number_lemma hs hc₁ hc₂ theorem lebesgue_number_lemma_of_emetric_nhds' {c : (x : α) → x ∈ s → Set α} (hs : IsCompact s) (hc : ∀ x hx, c x hx ∈ 𝓝 x) : ∃ δ > 0, ∀ x ∈ s, ∃ y : s, ball x δ ⊆ c y y.2 := by simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm] using uniformity_basis_edist.lebesgue_number_lemma_nhds' hs hc theorem lebesgue_number_lemma_of_emetric_nhds {c : α → Set α} (hs : IsCompact s) (hc : ∀ x ∈ s, c x ∈ 𝓝 x) : ∃ δ > 0, ∀ x ∈ s, ∃ y, ball x δ ⊆ c y := by simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm] using uniformity_basis_edist.lebesgue_number_lemma_nhds hs hc theorem lebesgue_number_lemma_of_emetric_nhdsWithin' {c : (x : α) → x ∈ s → Set α} (hs : IsCompact s) (hc : ∀ x hx, c x hx ∈ 𝓝[s] x) : ∃ δ > 0, ∀ x ∈ s, ∃ y : s, ball x δ ∩ s ⊆ c y y.2 := by simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm] using uniformity_basis_edist.lebesgue_number_lemma_nhdsWithin' hs hc theorem lebesgue_number_lemma_of_emetric_nhdsWithin {c : α → Set α} (hs : IsCompact s) (hc : ∀ x ∈ s, c x ∈ 𝓝[s] x) : ∃ δ > 0, ∀ x ∈ s, ∃ y, ball x δ ∩ s ⊆ c y := by simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm] using uniformity_basis_edist.lebesgue_number_lemma_nhdsWithin hs hc theorem lebesgue_number_lemma_of_emetric_sUnion {c : Set (Set α)} (hs : IsCompact s) (hc₁ : ∀ t ∈ c, IsOpen t) (hc₂ : s ⊆ ⋃₀ c) : ∃ δ > 0, ∀ x ∈ s, ∃ t ∈ c, ball x δ ⊆ t := by rw [sUnion_eq_iUnion] at hc₂; simpa using lebesgue_number_lemma_of_emetric hs (by simpa) hc₂ end LebesgueNumberLemma		Mathlib/Topology/EMetricSpace/Basic.lean	829	836
/- 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⟩	Mathlib/Topology/Compactness/Lindelof.lean	78	83
/- Copyright (c) 2019 Neil Strickland. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Neil Strickland, Yury Kudryashov -/ import Mathlib.Algebra.Group.Semiconj.Defs /-! # Commuting pairs of elements in monoids We define the predicate `Commute a b := a * b = b * a` and provide some operations on terms `(h : Commute a b)`. E.g., if `a`, `b`, and c are elements of a semiring, and that `hb : Commute a b` and `hc : Commute a c`. Then `hb.pow_left 5` proves `Commute (a ^ 5) b` and `(hb.pow_right 2).add_right (hb.mul_right hc)` proves `Commute a (b ^ 2 + b * c)`. Lean does not immediately recognise these terms as equations, so for rewriting we need syntax like `rw [(hb.pow_left 5).eq]` rather than just `rw [hb.pow_left 5]`. This file defines only a few operations (`mul_left`, `inv_right`, etc). Other operations (`pow_right`, field inverse etc) are in the files that define corresponding notions. ## Implementation details Most of the proofs come from the properties of `SemiconjBy`. -/ assert_not_exists MonoidWithZero DenselyOrdered variable {G M S : Type} /-- Two elements commute if `a b = b * a`. -/ @[to_additive "Two elements additively commute if `a + b = b + a`"] def Commute [Mul S] (a b : S) : Prop := SemiconjBy a b b /-- Two elements `a` and `b` commute if `a * b = b * a`. -/ @[to_additive] theorem commute_iff_eq [Mul S] (a b : S) : Commute a b ↔ a * b = b * a := Iff.rfl namespace Commute section Mul variable [Mul S] /-- Equality behind `Commute a b`; useful for rewriting. -/ @[to_additive "Equality behind `AddCommute a b`; useful for rewriting."] protected theorem eq {a b : S} (h : Commute a b) : a * b = b * a := h /-- Any element commutes with itself. -/ @[to_additive (attr := refl, simp) "Any element commutes with itself."] protected theorem refl (a : S) : Commute a a := Eq.refl (a * a) /-- If `a` commutes with `b`, then `b` commutes with `a`. -/ @[to_additive (attr := symm) "If `a` commutes with `b`, then `b` commutes with `a`."] protected theorem symm {a b : S} (h : Commute a b) : Commute b a := Eq.symm h @[to_additive] protected theorem semiconjBy {a b : S} (h : Commute a b) : SemiconjBy a b b := h @[to_additive] protected theorem symm_iff {a b : S} : Commute a b ↔ Commute b a := ⟨Commute.symm, Commute.symm⟩ @[to_additive] instance : IsRefl S Commute := ⟨Commute.refl⟩ -- This instance is useful for `Finset.noncommProd` @[to_additive] instance on_isRefl {f : G → S} : IsRefl G fun a b => Commute (f a) (f b) := ⟨fun _ => Commute.refl _⟩ end Mul section Semigroup variable [Semigroup S] {a b c : S} /-- If `a` commutes with both `b` and `c`, then it commutes with their product. -/ @[to_additive (attr := simp) "If `a` commutes with both `b` and `c`, then it commutes with their sum."] theorem mul_right (hab : Commute a b) (hac : Commute a c) : Commute a (b * c) := SemiconjBy.mul_right hab hac -- I think `ₓ` is necessary because of the `mul` vs `HMul` distinction /-- If both `a` and `b` commute with `c`, then their product commutes with `c`. -/ @[to_additive (attr := simp) "If both `a` and `b` commute with `c`, then their product commutes with `c`."] theorem mul_left (hac : Commute a c) (hbc : Commute b c) : Commute (a * b) c := SemiconjBy.mul_left hac hbc -- I think `ₓ` is necessary because of the `mul` vs `HMul` distinction @[to_additive] protected theorem right_comm (h : Commute b c) (a : S) : a * b * c = a * c * b := by simp only [mul_assoc, h.eq] -- I think `ₓ` is necessary because of the `mul` vs `HMul` distinction @[to_additive] protected theorem left_comm (h : Commute a b) (c) : a * (b * c) = b * (a * c) := by simp only [← mul_assoc, h.eq] -- I think `ₓ` is necessary because of the `mul` vs `HMul` distinction @[to_additive] protected theorem mul_mul_mul_comm (hbc : Commute b c) (a d : S) : a * b * (c * d) = a * c * (b * d) := by simp only [hbc.left_comm, mul_assoc] end Semigroup @[to_additive] protected theorem all [CommMagma S] (a b : S) : Commute a b := mul_comm a b section MulOneClass variable [MulOneClass M] @[to_additive (attr := simp)] theorem one_right (a : M) : Commute a 1 := SemiconjBy.one_right a -- I think `ₓ` is necessary because `One.toOfNat1` appears in the Lean 4 version @[to_additive (attr := simp)] theorem one_left (a : M) : Commute 1 a := SemiconjBy.one_left a -- I think `ₓ` is necessary because `One.toOfNat1` appears in the Lean 4 version end MulOneClass section Monoid variable [Monoid M] {a b : M} @[to_additive (attr := simp)] theorem pow_right (h : Commute a b) (n : ℕ) : Commute a (b ^ n) := SemiconjBy.pow_right h n -- `MulOneClass.toHasMul` vs. `MulOneClass.toMul` @[to_additive (attr := simp)] theorem pow_left (h : Commute a b) (n : ℕ) : Commute (a ^ n) b := (h.symm.pow_right n).symm -- `MulOneClass.toHasMul` vs. `MulOneClass.toMul` -- todo: should nat power be called `nsmul` here? @[to_additive (attr := simp)] theorem pow_pow (h : Commute a b) (m n : ℕ) : Commute (a ^ m) (b ^ n) := (h.pow_left m).pow_right n -- `MulOneClass.toHasMul` vs. `MulOneClass.toMul` @[to_additive] theorem self_pow (a : M) (n : ℕ) : Commute a (a ^ n) := (Commute.refl a).pow_right n -- `MulOneClass.toHasMul` vs. `MulOneClass.toMul` @[to_additive] theorem pow_self (a : M) (n : ℕ) : Commute (a ^ n) a := (Commute.refl a).pow_left n -- `MulOneClass.toHasMul` vs. `MulOneClass.toMul` @[to_additive] theorem pow_pow_self (a : M) (m n : ℕ) : Commute (a ^ m) (a ^ n) := (Commute.refl a).pow_pow m n -- `MulOneClass.toHasMul` vs. `MulOneClass.toMul` @[to_additive] lemma mul_pow (h : Commute a b) : ∀ n, (a * b) ^ n = a ^ n * b ^ n \| 0 => by rw [pow_zero, pow_zero, pow_zero, one_mul] \| n + 1 => by simp only [pow_succ', h.mul_pow n, ← mul_assoc, (h.pow_left n).right_comm] end Monoid section DivisionMonoid variable [DivisionMonoid G] {a b : G} @[to_additive] protected theorem mul_inv (hab : Commute a b) : (a * b)⁻¹ = a⁻¹ * b⁻¹ := by rw [hab.eq, mul_inv_rev] @[to_additive] protected theorem inv (hab : Commute a b) : (a * b)⁻¹ = a⁻¹ * b⁻¹ := by rw [hab.eq, mul_inv_rev] @[to_additive AddCommute.zsmul_add] protected lemma mul_zpow (h : Commute a b) : ∀ n : ℤ, (a * b) ^ n = a ^ n * b ^ n \| (n : ℕ) => by simp [zpow_natCast, h.mul_pow n] \| .negSucc n => by simp [h.mul_pow, (h.pow_pow _ _).eq, mul_inv_rev] end DivisionMonoid section Group variable [Group G] {a b : G} @[to_additive] protected theorem mul_inv_cancel (h : Commute a b) : a * b * a⁻¹ = b := by rw [h.eq, mul_inv_cancel_right] @[to_additive] theorem mul_inv_cancel_assoc (h : Commute a b) : a * (b * a⁻¹) = b := by rw [← mul_assoc, h.mul_inv_cancel] end Group end Commute		Mathlib/Algebra/Group/Commute/Defs.lean	238	238
/- 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	1,901	1,902
/- 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, ← QuotientGroup.eq] exact ⟨fun h q => Quotient.inductionOn' q h, fun h g => h (Quotient.mk'' g)⟩ set_option linter.docPrime false in @[to_additive] lemma isComplement_subgroup_left_iff_existsUnique_quotientMk'' : IsComplement H T ↔ ∀ q : Quotient (QuotientGroup.rightRel H), ∃! t : T, Quotient.mk'' t.1 = q := by simp_rw [isComplement_iff_existsUnique_mul_inv_mem, SetLike.mem_coe, ← QuotientGroup.rightRel_apply, ← Quotient.eq'', Quotient.forall] set_option linter.deprecated false in @[to_additive (attr := deprecated isComplement_subgroup_left_iff_existsUnique_quotientMk'' (since := "2024-12-18"))] theorem mem_rightTransversals_iff_existsUnique_quotient_mk''_eq : S ∈ rightTransversals (H : Set G) ↔ ∀ q : Quotient (QuotientGroup.rightRel H), ∃! s : S, Quotient.mk'' s.1 = q := by simp_rw [mem_rightTransversals_iff_existsUnique_mul_inv_mem, SetLike.mem_coe, ← QuotientGroup.rightRel_apply, ← Quotient.eq''] exact ⟨fun h q => Quotient.inductionOn' q h, fun h g => h (Quotient.mk'' g)⟩ @[to_additive] lemma isComplement_subgroup_right_iff_bijective : IsComplement S H ↔ Bijective (S.restrict (QuotientGroup.mk : G → G ⧸ H)) := isComplement_subgroup_right_iff_existsUnique_quotientGroupMk.trans (bijective_iff_existsUnique (S.restrict QuotientGroup.mk)).symm set_option linter.deprecated false in @[to_additive (attr := deprecated isComplement_subgroup_right_iff_bijective (since := "2024-12-18"))] theorem mem_leftTransversals_iff_bijective : S ∈ leftTransversals (H : Set G) ↔ Function.Bijective (S.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.leftRel H))) := mem_leftTransversals_iff_existsUnique_quotient_mk''_eq.trans (Function.bijective_iff_existsUnique (S.restrict Quotient.mk'')).symm @[to_additive] lemma isComplement_subgroup_left_iff_bijective : IsComplement H T ↔ Bijective (T.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.rightRel H))) := isComplement_subgroup_left_iff_existsUnique_quotientMk''.trans (bijective_iff_existsUnique (T.restrict Quotient.mk'')).symm set_option linter.deprecated false in @[to_additive	(attr := deprecated isComplement_subgroup_left_iff_bijective (since := "2024-12-18"))] theorem mem_rightTransversals_iff_bijective : S ∈ rightTransversals (H : Set G) ↔ Function.Bijective (S.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.rightRel H))) := mem_rightTransversals_iff_existsUnique_quotient_mk''_eq.trans (Function.bijective_iff_existsUnique (S.restrict Quotient.mk'')).symm	Mathlib/GroupTheory/Complement.lean	300	305
/- Copyright (c) 2020 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Devon Tuma, Oliver Nash -/ import Mathlib.Algebra.Group.Action.Opposite import Mathlib.Algebra.Group.Submonoid.Membership import Mathlib.Algebra.GroupWithZero.Associated import Mathlib.Algebra.GroupWithZero.Opposite /-! # Non-zero divisors and smul-divisors In this file we define the submonoid `nonZeroDivisors` and `nonZeroSMulDivisors` of a `MonoidWithZero`. We also define `nonZeroDivisorsLeft` and `nonZeroDivisorsRight` for non-commutative monoids. ## Notations This file declares the notations: - `M₀⁰` for the submonoid of non-zero-divisors of `M₀`, in the locale `nonZeroDivisors`. - `M₀⁰[M]` for the submonoid of non-zero smul-divisors of `M₀` with respect to `M`, in the locale `nonZeroSMulDivisors` Use the statement `open scoped nonZeroDivisors nonZeroSMulDivisors` to access this notation in your own code. -/ assert_not_exists Ring open Function section variable (M₀ : Type) [MonoidWithZero M₀] {x : M₀} /-- The collection of elements of a `MonoidWithZero` that are not left zero divisors form a `Submonoid`. -/ def nonZeroDivisorsLeft : Submonoid M₀ where carrier := {x \| ∀ y, y x = 0 → y = 0} one_mem' := by simp mul_mem' {x} {y} hx hy := fun z hz ↦ hx _ <\| hy _ (mul_assoc z x y ▸ hz) @[simp] lemma mem_nonZeroDivisorsLeft_iff : x ∈ nonZeroDivisorsLeft M₀ ↔ ∀ y, y * x = 0 → y = 0 := .rfl lemma nmem_nonZeroDivisorsLeft_iff : x ∉ nonZeroDivisorsLeft M₀ ↔ {y \| y * x = 0 ∧ y ≠ 0}.Nonempty := by simpa [mem_nonZeroDivisorsLeft_iff] using Set.nonempty_def.symm /-- The collection of elements of a `MonoidWithZero` that are not right zero divisors form a `Submonoid`. -/ def nonZeroDivisorsRight : Submonoid M₀ where carrier := {x \| ∀ y, x * y = 0 → y = 0} one_mem' := by simp mul_mem' := fun {x} {y} hx hy z hz ↦ hy _ (hx _ ((mul_assoc x y z).symm ▸ hz)) @[simp] lemma mem_nonZeroDivisorsRight_iff : x ∈ nonZeroDivisorsRight M₀ ↔ ∀ y, x * y = 0 → y = 0 := .rfl lemma nmem_nonZeroDivisorsRight_iff : x ∉ nonZeroDivisorsRight M₀ ↔ {y \| x * y = 0 ∧ y ≠ 0}.Nonempty := by simpa [mem_nonZeroDivisorsRight_iff] using Set.nonempty_def.symm lemma nonZeroDivisorsLeft_eq_right (M₀ : Type*) [CommMonoidWithZero M₀] : nonZeroDivisorsLeft M₀ = nonZeroDivisorsRight M₀ := by ext x; simp [mul_comm x]	@[simp] lemma coe_nonZeroDivisorsLeft_eq [NoZeroDivisors M₀] [Nontrivial M₀] : nonZeroDivisorsLeft M₀ = {x : M₀ \| x ≠ 0} := by ext x simp only [SetLike.mem_coe, mem_nonZeroDivisorsLeft_iff, mul_eq_zero, forall_eq_or_imp, true_and, Set.mem_setOf_eq] refine ⟨fun h ↦ ?_, fun hx y hx' ↦ by contradiction⟩ contrapose! h	Mathlib/Algebra/GroupWithZero/NonZeroDivisors.lean	68	75
/- 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 -/ import Mathlib.Analysis.SpecialFunctions.Pow.Continuity import Mathlib.Analysis.SpecialFunctions.Complex.LogDeriv import Mathlib.Analysis.Calculus.FDeriv.Extend import Mathlib.Analysis.Calculus.Deriv.Prod import Mathlib.Analysis.SpecialFunctions.Log.Deriv import Mathlib.Analysis.SpecialFunctions.Trigonometric.Deriv /-! # Derivatives of power function on `ℂ`, `ℝ`, `ℝ≥0`, and `ℝ≥0∞` We also prove differentiability and provide derivatives for the power functions `x ^ y`. -/ noncomputable section open scoped Real Topology NNReal ENNReal open Filter namespace Complex theorem hasStrictFDerivAt_cpow {p : ℂ × ℂ} (hp : p.1 ∈ slitPlane) : HasStrictFDerivAt (fun x : ℂ × ℂ => x.1 ^ x.2) ((p.2 * p.1 ^ (p.2 - 1)) • ContinuousLinearMap.fst ℂ ℂ ℂ + (p.1 ^ p.2 * log p.1) • ContinuousLinearMap.snd ℂ ℂ ℂ) p := by have A : p.1 ≠ 0 := slitPlane_ne_zero hp have : (fun x : ℂ × ℂ => x.1 ^ x.2) =ᶠ[𝓝 p] fun x => exp (log x.1 * x.2) := ((isOpen_ne.preimage continuous_fst).eventually_mem A).mono fun p hp => cpow_def_of_ne_zero hp _ rw [cpow_sub _ _ A, cpow_one, mul_div_left_comm, mul_smul, mul_smul] refine HasStrictFDerivAt.congr_of_eventuallyEq ?_ this.symm simpa only [cpow_def_of_ne_zero A, div_eq_mul_inv, mul_smul, add_comm, smul_add] using ((hasStrictFDerivAt_fst.clog hp).mul hasStrictFDerivAt_snd).cexp theorem hasStrictFDerivAt_cpow' {x y : ℂ} (hp : x ∈ slitPlane) : HasStrictFDerivAt (fun x : ℂ × ℂ => x.1 ^ x.2) ((y * x ^ (y - 1)) • ContinuousLinearMap.fst ℂ ℂ ℂ + (x ^ y * log x) • ContinuousLinearMap.snd ℂ ℂ ℂ) (x, y) := @hasStrictFDerivAt_cpow (x, y) hp theorem hasStrictDerivAt_const_cpow {x y : ℂ} (h : x ≠ 0 ∨ y ≠ 0) : HasStrictDerivAt (fun y => x ^ y) (x ^ y * log x) y := by rcases em (x = 0) with (rfl \| hx) · replace h := h.neg_resolve_left rfl rw [log_zero, mul_zero] refine (hasStrictDerivAt_const y 0).congr_of_eventuallyEq ?_ exact (isOpen_ne.eventually_mem h).mono fun y hy => (zero_cpow hy).symm · simpa only [cpow_def_of_ne_zero hx, mul_one] using ((hasStrictDerivAt_id y).const_mul (log x)).cexp theorem hasFDerivAt_cpow {p : ℂ × ℂ} (hp : p.1 ∈ slitPlane) : HasFDerivAt (fun x : ℂ × ℂ => x.1 ^ x.2) ((p.2 * p.1 ^ (p.2 - 1)) • ContinuousLinearMap.fst ℂ ℂ ℂ + (p.1 ^ p.2 * log p.1) • ContinuousLinearMap.snd ℂ ℂ ℂ) p := (hasStrictFDerivAt_cpow hp).hasFDerivAt end Complex section fderiv open Complex variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℂ E] {f g : E → ℂ} {f' g' : E →L[ℂ] ℂ} {x : E} {s : Set E} {c : ℂ} theorem HasStrictFDerivAt.cpow (hf : HasStrictFDerivAt f f' x) (hg : HasStrictFDerivAt g g' x) (h0 : f x ∈ slitPlane) : HasStrictFDerivAt (fun x => f x ^ g x) ((g x f x ^ (g x - 1)) • f' + (f x ^ g x * Complex.log (f x)) • g') x := (hasStrictFDerivAt_cpow (p := (f x, g x)) h0).comp x (hf.prodMk hg) theorem HasStrictFDerivAt.const_cpow (hf : HasStrictFDerivAt f f' x) (h0 : c ≠ 0 ∨ f x ≠ 0) : HasStrictFDerivAt (fun x => c ^ f x) ((c ^ f x * Complex.log c) • f') x := (hasStrictDerivAt_const_cpow h0).comp_hasStrictFDerivAt x hf theorem HasFDerivAt.cpow (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) (h0 : f x ∈ slitPlane) : HasFDerivAt (fun x => f x ^ g x) ((g x * f x ^ (g x - 1)) • f' + (f x ^ g x * Complex.log (f x)) • g') x := by convert (@Complex.hasFDerivAt_cpow ((fun x => (f x, g x)) x) h0).comp x (hf.prodMk hg) theorem HasFDerivAt.const_cpow (hf : HasFDerivAt f f' x) (h0 : c ≠ 0 ∨ f x ≠ 0) : HasFDerivAt (fun x => c ^ f x) ((c ^ f x * Complex.log c) • f') x := (hasStrictDerivAt_const_cpow h0).hasDerivAt.comp_hasFDerivAt x hf theorem HasFDerivWithinAt.cpow (hf : HasFDerivWithinAt f f' s x) (hg : HasFDerivWithinAt g g' s x) (h0 : f x ∈ slitPlane) : HasFDerivWithinAt (fun x => f x ^ g x) ((g x * f x ^ (g x - 1)) • f' + (f x ^ g x * Complex.log (f x)) • g') s x := by convert (@Complex.hasFDerivAt_cpow ((fun x => (f x, g x)) x) h0).comp_hasFDerivWithinAt x (hf.prodMk hg) theorem HasFDerivWithinAt.const_cpow (hf : HasFDerivWithinAt f f' s x) (h0 : c ≠ 0 ∨ f x ≠ 0) : HasFDerivWithinAt (fun x => c ^ f x) ((c ^ f x * Complex.log c) • f') s x := (hasStrictDerivAt_const_cpow h0).hasDerivAt.comp_hasFDerivWithinAt x hf theorem DifferentiableAt.cpow (hf : DifferentiableAt ℂ f x) (hg : DifferentiableAt ℂ g x) (h0 : f x ∈ slitPlane) : DifferentiableAt ℂ (fun x => f x ^ g x) x := (hf.hasFDerivAt.cpow hg.hasFDerivAt h0).differentiableAt theorem DifferentiableAt.const_cpow (hf : DifferentiableAt ℂ f x) (h0 : c ≠ 0 ∨ f x ≠ 0) : DifferentiableAt ℂ (fun x => c ^ f x) x := (hf.hasFDerivAt.const_cpow h0).differentiableAt theorem DifferentiableAt.cpow_const (hf : DifferentiableAt ℂ f x) (h0 : f x ∈ slitPlane) : DifferentiableAt ℂ (fun x => f x ^ c) x := hf.cpow (differentiableAt_const c) h0 theorem DifferentiableWithinAt.cpow (hf : DifferentiableWithinAt ℂ f s x) (hg : DifferentiableWithinAt ℂ g s x) (h0 : f x ∈ slitPlane) : DifferentiableWithinAt ℂ (fun x => f x ^ g x) s x := (hf.hasFDerivWithinAt.cpow hg.hasFDerivWithinAt h0).differentiableWithinAt theorem DifferentiableWithinAt.const_cpow (hf : DifferentiableWithinAt ℂ f s x) (h0 : c ≠ 0 ∨ f x ≠ 0) : DifferentiableWithinAt ℂ (fun x => c ^ f x) s x := (hf.hasFDerivWithinAt.const_cpow h0).differentiableWithinAt theorem DifferentiableWithinAt.cpow_const (hf : DifferentiableWithinAt ℂ f s x) (h0 : f x ∈ slitPlane) : DifferentiableWithinAt ℂ (fun x => f x ^ c) s x := hf.cpow (differentiableWithinAt_const c) h0 theorem DifferentiableOn.cpow (hf : DifferentiableOn ℂ f s) (hg : DifferentiableOn ℂ g s) (h0 : Set.MapsTo f s slitPlane) : DifferentiableOn ℂ (fun x ↦ f x ^ g x) s := fun x hx ↦ (hf x hx).cpow (hg x hx) (h0 hx) theorem DifferentiableOn.const_cpow (hf : DifferentiableOn ℂ f s) (h0 : c ≠ 0 ∨ ∀ x ∈ s, f x ≠ 0) : DifferentiableOn ℂ (fun x ↦ c ^ f x) s := fun x hx ↦ (hf x hx).const_cpow (h0.imp_right fun h ↦ h x hx) theorem DifferentiableOn.cpow_const (hf : DifferentiableOn ℂ f s) (h0 : ∀ x ∈ s, f x ∈ slitPlane) : DifferentiableOn ℂ (fun x => f x ^ c) s := hf.cpow (differentiableOn_const c) h0 theorem Differentiable.cpow (hf : Differentiable ℂ f) (hg : Differentiable ℂ g) (h0 : ∀ x, f x ∈ slitPlane) : Differentiable ℂ (fun x ↦ f x ^ g x) := fun x ↦ (hf x).cpow (hg x) (h0 x) theorem Differentiable.const_cpow (hf : Differentiable ℂ f) (h0 : c ≠ 0 ∨ ∀ x, f x ≠ 0) : Differentiable ℂ (fun x ↦ c ^ f x) := fun x ↦ (hf x).const_cpow (h0.imp_right fun h ↦ h x) @[fun_prop] lemma differentiable_const_cpow_of_neZero (z : ℂ) [NeZero z] : Differentiable ℂ fun s : ℂ ↦ z ^ s := differentiable_id.const_cpow (.inl <\| NeZero.ne z) @[fun_prop] lemma differentiableAt_const_cpow_of_neZero (z : ℂ) [NeZero z] (t : ℂ) : DifferentiableAt ℂ (fun s : ℂ ↦ z ^ s) t := differentiableAt_id.const_cpow (.inl <\| NeZero.ne z) end fderiv section deriv open Complex variable {f g : ℂ → ℂ} {s : Set ℂ} {f' g' x c : ℂ} /-- A private lemma that rewrites the output of lemmas like `HasFDerivAt.cpow` to the form expected by lemmas like `HasDerivAt.cpow`. -/ private theorem aux : ((g x * f x ^ (g x - 1)) • (1 : ℂ →L[ℂ] ℂ).smulRight f' + (f x ^ g x * log (f x)) • (1 : ℂ →L[ℂ] ℂ).smulRight g') 1 = g x * f x ^ (g x - 1) * f' + f x ^ g x * log (f x) * g' := by simp only [Algebra.id.smul_eq_mul, one_mul, ContinuousLinearMap.one_apply, ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.add_apply, Pi.smul_apply, ContinuousLinearMap.coe_smul'] nonrec theorem HasStrictDerivAt.cpow (hf : HasStrictDerivAt f f' x) (hg : HasStrictDerivAt g g' x) (h0 : f x ∈ slitPlane) : HasStrictDerivAt (fun x => f x ^ g x) (g x * f x ^ (g x - 1) * f' + f x ^ g x * Complex.log (f x) * g') x := by simpa using (hf.cpow hg h0).hasStrictDerivAt theorem HasStrictDerivAt.const_cpow (hf : HasStrictDerivAt f f' x) (h : c ≠ 0 ∨ f x ≠ 0) : HasStrictDerivAt (fun x => c ^ f x) (c ^ f x * Complex.log c * f') x := (hasStrictDerivAt_const_cpow h).comp x hf theorem Complex.hasStrictDerivAt_cpow_const (h : x ∈ slitPlane) : HasStrictDerivAt (fun z : ℂ => z ^ c) (c * x ^ (c - 1)) x := by simpa only [mul_zero, add_zero, mul_one] using (hasStrictDerivAt_id x).cpow (hasStrictDerivAt_const x c) h theorem HasStrictDerivAt.cpow_const (hf : HasStrictDerivAt f f' x) (h0 : f x ∈ slitPlane) : HasStrictDerivAt (fun x => f x ^ c) (c * f x ^ (c - 1) * f') x := (Complex.hasStrictDerivAt_cpow_const h0).comp x hf theorem HasDerivAt.cpow (hf : HasDerivAt f f' x) (hg : HasDerivAt g g' x) (h0 : f x ∈ slitPlane) : HasDerivAt (fun x => f x ^ g x) (g x * f x ^ (g x - 1) * f' + f x ^ g x * Complex.log (f x) * g') x := by simpa only [aux] using (hf.hasFDerivAt.cpow hg h0).hasDerivAt theorem HasDerivAt.const_cpow (hf : HasDerivAt f f' x) (h0 : c ≠ 0 ∨ f x ≠ 0) : HasDerivAt (fun x => c ^ f x) (c ^ f x * Complex.log c * f') x := (hasStrictDerivAt_const_cpow h0).hasDerivAt.comp x hf theorem HasDerivAt.cpow_const (hf : HasDerivAt f f' x) (h0 : f x ∈ slitPlane) : HasDerivAt (fun x => f x ^ c) (c * f x ^ (c - 1) * f') x := (Complex.hasStrictDerivAt_cpow_const h0).hasDerivAt.comp x hf theorem HasDerivWithinAt.cpow (hf : HasDerivWithinAt f f' s x) (hg : HasDerivWithinAt g g' s x) (h0 : f x ∈ slitPlane) : HasDerivWithinAt (fun x => f x ^ g x) (g x * f x ^ (g x - 1) * f' + f x ^ g x * Complex.log (f x) * g') s x := by simpa only [aux] using (hf.hasFDerivWithinAt.cpow hg h0).hasDerivWithinAt theorem HasDerivWithinAt.const_cpow (hf : HasDerivWithinAt f f' s x) (h0 : c ≠ 0 ∨ f x ≠ 0) : HasDerivWithinAt (fun x => c ^ f x) (c ^ f x * Complex.log c * f') s x := (hasStrictDerivAt_const_cpow h0).hasDerivAt.comp_hasDerivWithinAt x hf theorem HasDerivWithinAt.cpow_const (hf : HasDerivWithinAt f f' s x) (h0 : f x ∈ slitPlane) : HasDerivWithinAt (fun x => f x ^ c) (c * f x ^ (c - 1) * f') s x := (Complex.hasStrictDerivAt_cpow_const h0).hasDerivAt.comp_hasDerivWithinAt x hf /-- Although `fun x => x ^ r` for fixed `r` is not complex-differentiable along the negative real line, it is still real-differentiable, and the derivative is what one would formally expect. See `hasDerivAt_ofReal_cpow_const` for an alternate formulation. -/ theorem hasDerivAt_ofReal_cpow_const' {x : ℝ} (hx : x ≠ 0) {r : ℂ} (hr : r ≠ -1) : HasDerivAt (fun y : ℝ => (y : ℂ) ^ (r + 1) / (r + 1)) (x ^ r) x := by rw [Ne, ← add_eq_zero_iff_eq_neg, ← Ne] at hr rcases lt_or_gt_of_ne hx.symm with (hx \| hx) · -- easy case : `0 < x` apply HasDerivAt.comp_ofReal (e := fun y => (y : ℂ) ^ (r + 1) / (r + 1)) convert HasDerivAt.div_const (𝕜 := ℂ) ?_ (r + 1) using 1 · exact (mul_div_cancel_right₀ _ hr).symm · convert HasDerivAt.cpow_const ?_ ?_ using 1 · rw [add_sub_cancel_right, mul_comm]; exact (mul_one _).symm · exact hasDerivAt_id (x : ℂ) · simp [hx] · -- harder case : `x < 0` have : ∀ᶠ y : ℝ in 𝓝 x, (y : ℂ) ^ (r + 1) / (r + 1) = (-y : ℂ) ^ (r + 1) * exp (π * I * (r + 1)) / (r + 1) := by refine Filter.eventually_of_mem (Iio_mem_nhds hx) fun y hy => ?_ rw [ofReal_cpow_of_nonpos (le_of_lt hy)] refine HasDerivAt.congr_of_eventuallyEq ?_ this rw [ofReal_cpow_of_nonpos (le_of_lt hx)] suffices HasDerivAt (fun y : ℝ => (-↑y) ^ (r + 1) * exp (↑π * I * (r + 1))) ((r + 1) * (-↑x) ^ r * exp (↑π * I * r)) x by convert this.div_const (r + 1) using 1 conv_rhs => rw [mul_assoc, mul_comm, mul_div_cancel_right₀ _ hr] rw [mul_add ((π : ℂ) * _), mul_one, exp_add, exp_pi_mul_I, mul_comm (_ : ℂ) (-1 : ℂ), neg_one_mul] simp_rw [mul_neg, ← neg_mul, ← ofReal_neg] suffices HasDerivAt (fun y : ℝ => (↑(-y) : ℂ) ^ (r + 1)) (-(r + 1) * ↑(-x) ^ r) x by convert this.neg.mul_const _ using 1; ring suffices HasDerivAt (fun y : ℝ => (y : ℂ) ^ (r + 1)) ((r + 1) * ↑(-x) ^ r) (-x) by convert @HasDerivAt.scomp ℝ _ ℂ _ _ x ℝ _ _ _ _ _ _ _ _ this (hasDerivAt_neg x) using 1 rw [real_smul, ofReal_neg 1, ofReal_one]; ring suffices HasDerivAt (fun y : ℂ => y ^ (r + 1)) ((r + 1) * ↑(-x) ^ r) ↑(-x) by exact this.comp_ofReal conv in ↑_ ^ _ => rw [(by ring : r = r + 1 - 1)] convert HasDerivAt.cpow_const ?_ ?_ using 1 · rw [add_sub_cancel_right, add_sub_cancel_right]; exact (mul_one _).symm · exact hasDerivAt_id ((-x : ℝ) : ℂ) · simp [hx] @[deprecated (since := "2024-12-15")] alias hasDerivAt_ofReal_cpow := hasDerivAt_ofReal_cpow_const' /-- An alternate formulation of `hasDerivAt_ofReal_cpow_const'`. -/ theorem hasDerivAt_ofReal_cpow_const {x : ℝ} (hx : x ≠ 0) {r : ℂ} (hr : r ≠ 0) : HasDerivAt (fun y : ℝ => (y : ℂ) ^ r) (r * x ^ (r - 1)) x := by have := HasDerivAt.const_mul r <\| hasDerivAt_ofReal_cpow_const' hx (by rwa [ne_eq, sub_eq_neg_self]) simpa [sub_add_cancel, mul_div_cancel₀ _ hr] using this /-- A version of `DifferentiableAt.cpow_const` for a real function. -/ theorem DifferentiableAt.ofReal_cpow_const {f : ℝ → ℝ} {x : ℝ} (hf : DifferentiableAt ℝ f x) (h0 : f x ≠ 0) (h1 : c ≠ 0) : DifferentiableAt ℝ (fun (y : ℝ) => (f y : ℂ) ^ c) x := (hasDerivAt_ofReal_cpow_const h0 h1).differentiableAt.comp x hf theorem Complex.deriv_cpow_const (hx : x ∈ Complex.slitPlane) : deriv (fun (x : ℂ) ↦ x ^ c) x = c * x ^ (c - 1) := (hasStrictDerivAt_cpow_const hx).hasDerivAt.deriv /-- A version of `Complex.deriv_cpow_const` for a real variable. -/ theorem Complex.deriv_ofReal_cpow_const {x : ℝ} (hx : x ≠ 0) (hc : c ≠ 0) : deriv (fun x : ℝ ↦ (x : ℂ) ^ c) x = c * x ^ (c - 1) := (hasDerivAt_ofReal_cpow_const hx hc).deriv theorem deriv_cpow_const (hf : DifferentiableAt ℂ f x) (hx : f x ∈ Complex.slitPlane) : deriv (fun (x : ℂ) ↦ f x ^ c) x = c * f x ^ (c - 1) * deriv f x := (hf.hasDerivAt.cpow_const hx).deriv theorem isTheta_deriv_ofReal_cpow_const_atTop {c : ℂ} (hc : c ≠ 0) : deriv (fun (x : ℝ) => (x : ℂ) ^ c) =Θ[atTop] fun x => x ^ (c.re - 1) := by calc _ =ᶠ[atTop] fun x : ℝ ↦ c * x ^ (c - 1) := by filter_upwards [eventually_ne_atTop 0] with x hx using by rw [deriv_ofReal_cpow_const hx hc] _ =Θ[atTop] fun x : ℝ ↦ ‖(x : ℂ) ^ (c - 1)‖ := (Asymptotics.IsTheta.of_norm_eventuallyEq EventuallyEq.rfl).const_mul_left hc _ =ᶠ[atTop] fun x ↦ x ^ (c.re - 1) := by filter_upwards [eventually_gt_atTop 0] with x hx rw [norm_cpow_eq_rpow_re_of_pos hx, sub_re, one_re] theorem isBigO_deriv_ofReal_cpow_const_atTop (c : ℂ) : deriv (fun (x : ℝ) => (x : ℂ) ^ c) =O[atTop] fun x => x ^ (c.re - 1) := by obtain rfl \| hc := eq_or_ne c 0 · simp_rw [cpow_zero, deriv_const', Asymptotics.isBigO_zero] · exact (isTheta_deriv_ofReal_cpow_const_atTop hc).1 end deriv namespace Real variable {x y z : ℝ} /-- `(x, y) ↦ x ^ y` is strictly differentiable at `p : ℝ × ℝ` such that `0 < p.fst`. -/ theorem hasStrictFDerivAt_rpow_of_pos (p : ℝ × ℝ) (hp : 0 < p.1) : HasStrictFDerivAt (fun x : ℝ × ℝ => x.1 ^ x.2) ((p.2 * p.1 ^ (p.2 - 1)) • ContinuousLinearMap.fst ℝ ℝ ℝ + (p.1 ^ p.2 * log p.1) • ContinuousLinearMap.snd ℝ ℝ ℝ) p := by have : (fun x : ℝ × ℝ => x.1 ^ x.2) =ᶠ[𝓝 p] fun x => exp (log x.1 * x.2) := (continuousAt_fst.eventually (lt_mem_nhds hp)).mono fun p hp => rpow_def_of_pos hp _ refine HasStrictFDerivAt.congr_of_eventuallyEq ?_ this.symm convert ((hasStrictFDerivAt_fst.log hp.ne').mul hasStrictFDerivAt_snd).exp using 1 rw [rpow_sub_one hp.ne', ← rpow_def_of_pos hp, smul_add, smul_smul, mul_div_left_comm, div_eq_mul_inv, smul_smul, smul_smul, mul_assoc, add_comm] /-- `(x, y) ↦ x ^ y` is strictly differentiable at `p : ℝ × ℝ` such that `p.fst < 0`. -/ theorem hasStrictFDerivAt_rpow_of_neg (p : ℝ × ℝ) (hp : p.1 < 0) : HasStrictFDerivAt (fun x : ℝ × ℝ => x.1 ^ x.2) ((p.2 * p.1 ^ (p.2 - 1)) • ContinuousLinearMap.fst ℝ ℝ ℝ + (p.1 ^ p.2 * log p.1 - exp (log p.1 * p.2) * sin (p.2 * π) * π) • ContinuousLinearMap.snd ℝ ℝ ℝ) p := by have : (fun x : ℝ × ℝ => x.1 ^ x.2) =ᶠ[𝓝 p] fun x => exp (log x.1 * x.2) * cos (x.2 * π) := (continuousAt_fst.eventually (gt_mem_nhds hp)).mono fun p hp => rpow_def_of_neg hp _ refine HasStrictFDerivAt.congr_of_eventuallyEq ?_ this.symm convert ((hasStrictFDerivAt_fst.log hp.ne).mul hasStrictFDerivAt_snd).exp.mul (hasStrictFDerivAt_snd.mul_const π).cos using 1 simp_rw [rpow_sub_one hp.ne, smul_add, ← add_assoc, smul_smul, ← add_smul, ← mul_assoc, mul_comm (cos _), ← rpow_def_of_neg hp] rw [div_eq_mul_inv, add_comm]; congr 2 <;> ring /-- The function `fun (x, y) => x ^ y` is infinitely smooth at `(x, y)` unless `x = 0`. -/ theorem contDiffAt_rpow_of_ne (p : ℝ × ℝ) (hp : p.1 ≠ 0) {n : WithTop ℕ∞} : ContDiffAt ℝ n (fun p : ℝ × ℝ => p.1 ^ p.2) p := by rcases hp.lt_or_lt with hneg \| hpos exacts [(((contDiffAt_fst.log hneg.ne).mul contDiffAt_snd).exp.mul (contDiffAt_snd.mul contDiffAt_const).cos).congr_of_eventuallyEq ((continuousAt_fst.eventually (gt_mem_nhds hneg)).mono fun p hp => rpow_def_of_neg hp _), ((contDiffAt_fst.log hpos.ne').mul contDiffAt_snd).exp.congr_of_eventuallyEq ((continuousAt_fst.eventually (lt_mem_nhds hpos)).mono fun p hp => rpow_def_of_pos hp _)] theorem differentiableAt_rpow_of_ne (p : ℝ × ℝ) (hp : p.1 ≠ 0) : DifferentiableAt ℝ (fun p : ℝ × ℝ => p.1 ^ p.2) p := (contDiffAt_rpow_of_ne p hp).differentiableAt le_rfl theorem _root_.HasStrictDerivAt.rpow {f g : ℝ → ℝ} {f' g' : ℝ} (hf : HasStrictDerivAt f f' x) (hg : HasStrictDerivAt g g' x) (h : 0 < f x) : HasStrictDerivAt (fun x => f x ^ g x) (f' * g x * f x ^ (g x - 1) + g' * f x ^ g x * Real.log (f x)) x := by convert (hasStrictFDerivAt_rpow_of_pos ((fun x => (f x, g x)) x) h).comp_hasStrictDerivAt x (hf.prodMk hg) using 1 simp [mul_assoc, mul_comm, mul_left_comm] theorem hasStrictDerivAt_rpow_const_of_ne {x : ℝ} (hx : x ≠ 0) (p : ℝ) : HasStrictDerivAt (fun x => x ^ p) (p * x ^ (p - 1)) x := by rcases hx.lt_or_lt with hx \| hx · have := (hasStrictFDerivAt_rpow_of_neg (x, p) hx).comp_hasStrictDerivAt x ((hasStrictDerivAt_id x).prodMk (hasStrictDerivAt_const x p)) convert this using 1; simp · simpa using (hasStrictDerivAt_id x).rpow (hasStrictDerivAt_const x p) hx theorem hasStrictDerivAt_const_rpow {a : ℝ} (ha : 0 < a) (x : ℝ) : HasStrictDerivAt (fun x => a ^ x) (a ^ x * log a) x := by simpa using (hasStrictDerivAt_const _ _).rpow (hasStrictDerivAt_id x) ha lemma differentiableAt_rpow_const_of_ne (p : ℝ) {x : ℝ} (hx : x ≠ 0) : DifferentiableAt ℝ (fun x => x ^ p) x := (hasStrictDerivAt_rpow_const_of_ne hx p).differentiableAt lemma differentiableOn_rpow_const (p : ℝ) : DifferentiableOn ℝ (fun x => (x : ℝ) ^ p) {0}ᶜ := fun _ hx => (Real.differentiableAt_rpow_const_of_ne p hx).differentiableWithinAt /-- This lemma says that `fun x => a ^ x` is strictly differentiable for `a < 0`. Note that these values of `a` are outside of the "official" domain of `a ^ x`, and we may redefine `a ^ x` for negative `a` if some other definition will be more convenient. -/ theorem hasStrictDerivAt_const_rpow_of_neg {a x : ℝ} (ha : a < 0) : HasStrictDerivAt (fun x => a ^ x) (a ^ x * log a - exp (log a * x) * sin (x * π) * π) x := by simpa using (hasStrictFDerivAt_rpow_of_neg (a, x) ha).comp_hasStrictDerivAt x ((hasStrictDerivAt_const _ _).prodMk (hasStrictDerivAt_id _)) end Real namespace Real variable {z x y : ℝ} theorem hasDerivAt_rpow_const {x p : ℝ} (h : x ≠ 0 ∨ 1 ≤ p) : HasDerivAt (fun x => x ^ p) (p * x ^ (p - 1)) x := by rcases ne_or_eq x 0 with (hx \| rfl) · exact (hasStrictDerivAt_rpow_const_of_ne hx _).hasDerivAt replace h : 1 ≤ p := h.neg_resolve_left rfl apply hasDerivAt_of_hasDerivAt_of_ne fun x hx => (hasStrictDerivAt_rpow_const_of_ne hx p).hasDerivAt exacts [continuousAt_id.rpow_const (Or.inr (zero_le_one.trans h)), continuousAt_const.mul (continuousAt_id.rpow_const (Or.inr (sub_nonneg.2 h)))] theorem differentiable_rpow_const {p : ℝ} (hp : 1 ≤ p) : Differentiable ℝ fun x : ℝ => x ^ p := fun _ => (hasDerivAt_rpow_const (Or.inr hp)).differentiableAt theorem deriv_rpow_const {x p : ℝ} (h : x ≠ 0 ∨ 1 ≤ p) : deriv (fun x : ℝ => x ^ p) x = p * x ^ (p - 1) := (hasDerivAt_rpow_const h).deriv theorem deriv_rpow_const' {p : ℝ} (h : 1 ≤ p) : (deriv fun x : ℝ => x ^ p) = fun x => p * x ^ (p - 1) := funext fun _ => deriv_rpow_const (Or.inr h)	theorem contDiffAt_rpow_const_of_ne {x p : ℝ} {n : WithTop ℕ∞} (h : x ≠ 0) : ContDiffAt ℝ n (fun x => x ^ p) x := (contDiffAt_rpow_of_ne (x, p) h).comp x (contDiffAt_id.prodMk contDiffAt_const)	Mathlib/Analysis/SpecialFunctions/Pow/Deriv.lean	416	419
/- 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.Group.PUnit import Mathlib.CategoryTheory.Monoidal.Braided.Basic import Mathlib.CategoryTheory.Monoidal.CoherenceLemmas import Mathlib.CategoryTheory.Monoidal.Discrete import Mathlib.CategoryTheory.Limits.Shapes.Terminal /-! # The category of monoids in a monoidal category. We define monoids in a monoidal category `C` and show that the category of monoids is equivalent to the category of lax monoidal functors from the unit monoidal category to `C`. We also show that if `C` is braided, then the category of monoids is naturally monoidal. -/ universe v₁ v₂ u₁ u₂ u open CategoryTheory MonoidalCategory Functor.LaxMonoidal Functor.OplaxMonoidal variable {C : Type u₁} [Category.{v₁} C] [MonoidalCategory.{v₁} C] /-- A monoid object internal to a monoidal category. When the monoidal category is preadditive, this is also sometimes called an "algebra object". -/ class Mon_Class (X : C) where /-- The unit morphism of a monoid object. -/ one : 𝟙_ C ⟶ X /-- The multiplication morphism of a monoid object. -/ mul : X ⊗ X ⟶ X /- For the names of the conditions below, the unprimed names are reserved for the version where the argument `X` is explicit. -/ one_mul' : one ▷ X ≫ mul = (λ_ X).hom := by aesop_cat mul_one' : X ◁ one ≫ mul = (ρ_ X).hom := by aesop_cat -- Obviously there is some flexibility stating this axiom. -- This one has left- and right-hand sides matching the statement of `Monoid.mul_assoc`, -- and chooses to place the associator on the right-hand side. -- The heuristic is that unitors and associators "don't have much weight". mul_assoc' : (mul ▷ X) ≫ mul = (α_ X X X).hom ≫ (X ◁ mul) ≫ mul := by aesop_cat namespace Mon_Class @[inherit_doc] scoped notation "μ" => Mon_Class.mul @[inherit_doc] scoped notation "μ["M"]" => Mon_Class.mul (X := M) @[inherit_doc] scoped notation "η" => Mon_Class.one @[inherit_doc] scoped notation "η["M"]" => Mon_Class.one (X := M) /- The simp attribute is reserved for the unprimed versions. -/ attribute [reassoc] one_mul' mul_one' mul_assoc' @[reassoc (attr := simp)] theorem one_mul (X : C) [Mon_Class X] : η ▷ X ≫ μ = (λ_ X).hom := one_mul' @[reassoc (attr := simp)] theorem mul_one (X : C) [Mon_Class X] : X ◁ η ≫ μ = (ρ_ X).hom := mul_one' @[reassoc (attr := simp)] theorem mul_assoc (X : C) [Mon_Class X] : μ ▷ X ≫ μ = (α_ X X X).hom ≫ X ◁ μ ≫ μ := mul_assoc' @[ext] theorem ext {X : C} (h₁ h₂ : Mon_Class X) (H : h₁.mul = h₂.mul) : h₁ = h₂ := by suffices h₁.one = h₂.one by cases h₁; cases h₂; subst H this; rfl trans (λ_ _).inv ≫ (h₁.one ⊗ h₂.one) ≫ h₁.mul · simp [tensorHom_def, H, ← unitors_equal] · simp [tensorHom_def'] end Mon_Class open scoped Mon_Class variable {M N : C} [Mon_Class M] [Mon_Class N] /-- The property that a morphism between monoid objects is a monoid morphism. -/ class IsMon_Hom (f : M ⟶ N) : Prop where one_hom (f) : η ≫ f = η := by aesop_cat mul_hom (f) : μ ≫ f = (f ⊗ f) ≫ μ := by aesop_cat attribute [reassoc (attr := simp)] IsMon_Hom.one_hom IsMon_Hom.mul_hom variable (C) /-- A monoid object internal to a monoidal category. When the monoidal category is preadditive, this is also sometimes called an "algebra object". -/ structure Mon_ where /-- The underlying object in the ambient monoidal category -/ X : C /-- The unit morphism of the monoid object -/ one : 𝟙_ C ⟶ X /-- The multiplication morphism of a monoid object -/ mul : X ⊗ X ⟶ X one_mul : (one ▷ X) ≫ mul = (λ_ X).hom := by aesop_cat mul_one : (X ◁ one) ≫ mul = (ρ_ X).hom := by aesop_cat -- Obviously there is some flexibility stating this axiom. -- This one has left- and right-hand sides matching the statement of `Monoid.mul_assoc`, -- and chooses to place the associator on the right-hand side. -- The heuristic is that unitors and associators "don't have much weight". mul_assoc : (mul ▷ X) ≫ mul = (α_ X X X).hom ≫ (X ◁ mul) ≫ mul := by aesop_cat attribute [reassoc] Mon_.one_mul Mon_.mul_one attribute [simp] Mon_.one_mul Mon_.mul_one -- We prove a more general `@[simp]` lemma below. attribute [reassoc (attr := simp)] Mon_.mul_assoc namespace Mon_ variable {C} /-- Construct an object of `Mon_ C` from an object `X : C` and `Mon_Class X` instance. -/ @[simps] def mk' (X : C) [Mon_Class X] : Mon_ C where X := X one := η mul := μ instance {M : Mon_ C} : Mon_Class M.X where one := M.one mul := M.mul one_mul' := M.one_mul mul_one' := M.mul_one mul_assoc' := M.mul_assoc variable (C) /-- The trivial monoid object. We later show this is initial in `Mon_ C`. -/ @[simps] def trivial : Mon_ C where X := 𝟙_ C one := 𝟙 _ mul := (λ_ _).hom mul_assoc := by monoidal_coherence mul_one := by monoidal_coherence instance : Inhabited (Mon_ C) := ⟨trivial C⟩ variable {C} variable {M : Mon_ C} @[simp] theorem one_mul_hom {Z : C} (f : Z ⟶ M.X) : (M.one ⊗ f) ≫ M.mul = (λ_ Z).hom ≫ f := by rw [tensorHom_def'_assoc, M.one_mul, leftUnitor_naturality] @[simp] theorem mul_one_hom {Z : C} (f : Z ⟶ M.X) : (f ⊗ M.one) ≫ M.mul = (ρ_ Z).hom ≫ f := by rw [tensorHom_def_assoc, M.mul_one, rightUnitor_naturality] theorem mul_assoc_flip : (M.X ◁ M.mul) ≫ M.mul = (α_ M.X M.X M.X).inv ≫ (M.mul ▷ M.X) ≫ M.mul := by simp /-- A morphism of monoid objects. -/ @[ext] structure Hom (M N : Mon_ C) where /-- The underlying morphism -/ hom : M.X ⟶ N.X one_hom : M.one ≫ hom = N.one := by aesop_cat mul_hom : M.mul ≫ hom = (hom ⊗ hom) ≫ N.mul := by aesop_cat /-- Construct a morphism `M ⟶ N` of `Mon_ C` from a map `f : M ⟶ N` and a `IsMon_Hom f` instance. -/ abbrev Hom.mk' {M N : C} [Mon_Class M] [Mon_Class N] (f : M ⟶ N) [IsMon_Hom f] : Hom (.mk' M) (.mk' N) := .mk f attribute [reassoc (attr := simp)] Hom.one_hom Hom.mul_hom /-- The identity morphism on a monoid object. -/ @[simps] def id (M : Mon_ C) : Hom M M where hom := 𝟙 M.X instance homInhabited (M : Mon_ C) : Inhabited (Hom M M) := ⟨id M⟩ /-- Composition of morphisms of monoid objects. -/ @[simps] def comp {M N O : Mon_ C} (f : Hom M N) (g : Hom N O) : Hom M O where hom := f.hom ≫ g.hom instance : Category (Mon_ C) where Hom M N := Hom M N id := id comp f g := comp f g instance {M N : Mon_ C} (f : M ⟶ N) : IsMon_Hom f.hom := ⟨f.2, f.3⟩ @[ext] lemma ext {X Y : Mon_ C} {f g : X ⟶ Y} (w : f.hom = g.hom) : f = g := Hom.ext w @[simp] theorem id_hom' (M : Mon_ C) : (𝟙 M : Hom M M).hom = 𝟙 M.X := rfl @[simp] theorem comp_hom' {M N K : Mon_ C} (f : M ⟶ N) (g : N ⟶ K) : (f ≫ g : Hom M K).hom = f.hom ≫ g.hom := rfl section variable (C) /-- The forgetful functor from monoid objects to the ambient category. -/ @[simps] def forget : Mon_ C ⥤ C where obj A := A.X map f := f.hom end instance forget_faithful : (forget C).Faithful where instance {A B : Mon_ C} (f : A ⟶ B) [e : IsIso ((forget C).map f)] : IsIso f.hom := e /-- The forgetful functor from monoid objects to the ambient category reflects isomorphisms. -/ instance : (forget C).ReflectsIsomorphisms where reflects f e := ⟨⟨{ hom := inv f.hom }, by aesop_cat⟩⟩ /-- Construct an isomorphism of monoids by giving an isomorphism between the underlying objects and checking compatibility with unit and multiplication only in the forward direction. -/ @[simps] def mkIso {M N : Mon_ C} (f : M.X ≅ N.X) (one_f : M.one ≫ f.hom = N.one := by aesop_cat) (mul_f : M.mul ≫ f.hom = (f.hom ⊗ f.hom) ≫ N.mul := by aesop_cat) : M ≅ N where hom := { hom := f.hom } inv := { hom := f.inv one_hom := by rw [← one_f]; simp mul_hom := by rw [← cancel_mono f.hom] slice_rhs 2 3 => rw [mul_f] simp } @[simps] instance uniqueHomFromTrivial (A : Mon_ C) : Unique (trivial C ⟶ A) where default := { hom := A.one mul_hom := by simp [A.one_mul, unitors_equal] } uniq f := by ext simp only [trivial_X] rw [← Category.id_comp f.hom] erw [f.one_hom] open CategoryTheory.Limits instance : HasInitial (Mon_ C) := hasInitial_of_unique (trivial C) end Mon_ namespace CategoryTheory.Functor variable {C} {D : Type u₂} [Category.{v₂} D] [MonoidalCategory.{v₂} D] (F : C ⥤ D) section LaxMonoidal variable [F.LaxMonoidal] (X Y : C) [Mon_Class X] [Mon_Class Y] (f : X ⟶ Y) [IsMon_Hom f] /-- The image of a monoid object under a lax monoidal functor is a monoid object. -/ abbrev obj.instMon_Class : Mon_Class (F.obj X) where one := ε F ≫ F.map η mul := LaxMonoidal.μ F X X ≫ F.map μ one_mul' := by simp [← F.map_comp] mul_one' := by simp [← F.map_comp] mul_assoc' := by simp_rw [comp_whiskerRight, Category.assoc, μ_natural_left_assoc, MonoidalCategory.whiskerLeft_comp, Category.assoc, μ_natural_right_assoc] slice_lhs 3 4 => rw [← F.map_comp, Mon_Class.mul_assoc] simp attribute [local instance] obj.instMon_Class @[reassoc, simp] lemma obj.η_def : (η : 𝟙_ D ⟶ F.obj X) = ε F ≫ F.map η := rfl @[reassoc, simp] lemma obj.μ_def : μ = LaxMonoidal.μ F X X ≫ F.map μ := rfl instance map.instIsMon_Hom : IsMon_Hom (F.map f) where one_hom := by simp [← map_comp] mul_hom := by simp [← map_comp] -- TODO: mapMod F A : Mod A ⥤ Mod (F.mapMon A) /-- A lax monoidal functor takes monoid objects to monoid objects. That is, a lax monoidal functor `F : C ⥤ D` induces a functor `Mon_ C ⥤ Mon_ D`. -/ @[simps] def mapMon (F : C ⥤ D) [F.LaxMonoidal] : Mon_ C ⥤ Mon_ D where -- TODO: The following could be, but it leads to weird `erw`s later down the file -- obj A := .mk' (F.obj A.X) obj A := { X := F.obj A.X one := ε F ≫ F.map A.one mul := «μ» F _ _ ≫ F.map A.mul one_mul := by simp_rw [comp_whiskerRight, Category.assoc, μ_natural_left_assoc, LaxMonoidal.left_unitality] slice_lhs 3 4 => rw [← F.map_comp, A.one_mul] mul_one := by simp_rw [MonoidalCategory.whiskerLeft_comp, Category.assoc, μ_natural_right_assoc, LaxMonoidal.right_unitality] slice_lhs 3 4 => rw [← F.map_comp, A.mul_one] mul_assoc := by simp_rw [comp_whiskerRight, Category.assoc, μ_natural_left_assoc, MonoidalCategory.whiskerLeft_comp, Category.assoc, μ_natural_right_assoc] slice_lhs 3 4 => rw [← F.map_comp, A.mul_assoc] simp } map f := .mk' (F.map f.hom) protected instance Faithful.mapMon [F.Faithful] : F.mapMon.Faithful where map_injective {_X _Y} _f _g hfg := Mon_.Hom.ext <\| map_injective congr(($hfg).hom) end LaxMonoidal section Monoidal variable [F.Monoidal] attribute [local instance] obj.instMon_Class protected instance Full.mapMon [F.Full] [F.Faithful] : F.mapMon.Full where map_surjective {X Y} f := let ⟨g, hg⟩ := F.map_surjective f.hom ⟨{ hom := g one_hom := F.map_injective <\| by simpa [← hg, cancel_epi] using f.one_hom mul_hom := F.map_injective <\| by simpa [← hg, cancel_epi] using f.mul_hom }, Mon_.Hom.ext hg⟩ instance FullyFaithful.isMon_Hom_preimage (hF : F.FullyFaithful) {X Y : C} [Mon_Class X] [Mon_Class Y] (f : F.obj X ⟶ F.obj Y) [IsMon_Hom f] : IsMon_Hom (hF.preimage f) where one_hom := hF.map_injective <\| by simp [← obj.η_def_assoc, ← obj.η_def, ← cancel_epi (ε F)] mul_hom := hF.map_injective <\| by simp [← obj.μ_def_assoc, ← obj.μ_def, ← μ_natural_assoc, ← cancel_epi (LaxMonoidal.μ F ..)] /-- If `F : C ⥤ D` is a fully faithful monoidal functor, then `Mon(F) : Mon C ⥤ Mon D` is fully faithful too. -/ protected def FullyFaithful.mapMon (hF : F.FullyFaithful) : F.mapMon.FullyFaithful where preimage {X Y} f := .mk' <\| hF.preimage f.hom end Monoidal variable (C D) /-- `mapMon` is functorial in the lax monoidal functor. -/ @[simps] -- Porting note: added this, not sure how it worked previously without. def mapMonFunctor : LaxMonoidalFunctor C D ⥤ Mon_ C ⥤ Mon_ D where obj F := F.mapMon map α := { app := fun A => { hom := α.hom.app A.X } } map_comp _ _ := rfl end CategoryTheory.Functor namespace Mon_ namespace EquivLaxMonoidalFunctorPUnit /-- Implementation of `Mon_.equivLaxMonoidalFunctorPUnit`. -/ @[simps] def laxMonoidalToMon : LaxMonoidalFunctor (Discrete PUnit.{u + 1}) C ⥤ Mon_ C where obj F := (F.mapMon : Mon_ _ ⥤ Mon_ C).obj (trivial (Discrete PUnit)) map α := ((Functor.mapMonFunctor (Discrete PUnit) C).map α).app _ variable {C} /-- Implementation of `Mon_.equivLaxMonoidalFunctorPUnit`. -/ @[simps!] def monToLaxMonoidalObj (A : Mon_ C) : Discrete PUnit.{u + 1} ⥤ C := (Functor.const _).obj A.X instance (A : Mon_ C) : (monToLaxMonoidalObj A).LaxMonoidal where ε' := A.one μ' := fun _ _ => A.mul @[simp] lemma monToLaxMonoidalObj_ε (A : Mon_ C) : ε (monToLaxMonoidalObj A) = A.one := rfl @[simp] lemma monToLaxMonoidalObj_μ (A : Mon_ C) (X Y) : «μ» (monToLaxMonoidalObj A) X Y = A.mul := rfl variable (C) /-- Implementation of `Mon_.equivLaxMonoidalFunctorPUnit`. -/ @[simps] def monToLaxMonoidal : Mon_ C ⥤ LaxMonoidalFunctor (Discrete PUnit.{u + 1}) C where obj A := LaxMonoidalFunctor.of (monToLaxMonoidalObj A) map f := { hom := { app := fun _ => f.hom } isMonoidal := { } } attribute [local aesop safe tactic (rule_sets := [CategoryTheory])] CategoryTheory.Discrete.discreteCases /-- Implementation of `Mon_.equivLaxMonoidalFunctorPUnit`. -/ @[simps!] def unitIso : 𝟭 (LaxMonoidalFunctor (Discrete PUnit.{u + 1}) C) ≅ laxMonoidalToMon C ⋙ monToLaxMonoidal C := NatIso.ofComponents (fun F ↦ LaxMonoidalFunctor.isoOfComponents (fun _ ↦ F.mapIso (eqToIso (by ext)))) /-- Implementation of `Mon_.equivLaxMonoidalFunctorPUnit`. -/ @[simps!] def counitIso : monToLaxMonoidal C ⋙ laxMonoidalToMon C ≅ 𝟭 (Mon_ C) := NatIso.ofComponents fun F ↦ mkIso (Iso.refl _) end EquivLaxMonoidalFunctorPUnit open EquivLaxMonoidalFunctorPUnit attribute [local simp] eqToIso_map /-- Monoid objects in `C` are "just" lax monoidal functors from the trivial monoidal category to `C`. -/ @[simps] def equivLaxMonoidalFunctorPUnit : LaxMonoidalFunctor (Discrete PUnit.{u + 1}) C ≌ Mon_ C where functor := laxMonoidalToMon C inverse := monToLaxMonoidal C unitIso := unitIso C counitIso := counitIso C end Mon_ namespace Mon_ /-! In this section, we prove that the category of monoids in a braided monoidal category is monoidal. Given two monoids `M` and `N` in a braided monoidal category `C`, the multiplication on the tensor product `M.X ⊗ N.X` is defined in the obvious way: it is the tensor product of the multiplications on `M` and `N`, except that the tensor factors in the source come in the wrong order, which we fix by pre-composing with a permutation isomorphism constructed from the braiding. (There is a subtlety here: in fact there are two ways to do these, using either the positive or negative crossing.) A more conceptual way of understanding this definition is the following: The braiding on `C` gives rise to a monoidal structure on the tensor product functor from `C × C` to `C`. A pair of monoids in `C` gives rise to a monoid in `C × C`, which the tensor product functor by being monoidal takes to a monoid in `C`. The permutation isomorphism appearing in the definition of the multiplication on the tensor product of two monoids is an instance of a more general family of isomorphisms which together form a strength that equips the tensor product functor with a monoidal structure, and the monoid axioms for the tensor product follow from the monoid axioms for the tensor factors plus the properties of the strength (i.e., monoidal functor axioms). The strength `tensorμ` of the tensor product functor has been defined in `Mathlib.CategoryTheory.Monoidal.Braided`. Its properties, stated as independent lemmas in that module, are used extensively in the proofs below. Notice that we could have followed the above plan not only conceptually but also as a possible implementation and could have constructed the tensor product of monoids via `mapMon`, but we chose to give a more explicit definition directly in terms of `tensorμ`. To complete the definition of the monoidal category structure on the category of monoids, we need to provide definitions of associator and unitors. The obvious candidates are the associator and unitors from `C`, but we need to prove that they are monoid morphisms, i.e., compatible with unit and multiplication. These properties translate to the monoidality of the associator and unitors (with respect to the monoidal structures on the functors they relate), which have also been proved in `Mathlib.CategoryTheory.Monoidal.Braided`. -/ variable {C} -- The proofs that associators and unitors preserve monoid units don't require braiding. theorem one_associator {M N P : Mon_ C} : ((λ_ (𝟙_ C)).inv ≫ ((λ_ (𝟙_ C)).inv ≫ (M.one ⊗ N.one) ⊗ P.one)) ≫ (α_ M.X N.X P.X).hom = (λ_ (𝟙_ C)).inv ≫ (M.one ⊗ (λ_ (𝟙_ C)).inv ≫ (N.one ⊗ P.one)) := by simp only [Category.assoc, Iso.cancel_iso_inv_left] slice_lhs 1 3 => rw [← Category.id_comp P.one, tensor_comp] slice_lhs 2 3 => rw [associator_naturality] slice_rhs 1 2 => rw [← Category.id_comp M.one, tensor_comp] slice_lhs 1 2 => rw [tensorHom_id, ← leftUnitor_tensor_inv] rw [← cancel_epi (λ_ (𝟙_ C)).inv] slice_lhs 1 2 => rw [leftUnitor_inv_naturality] simp theorem one_leftUnitor {M : Mon_ C} : ((λ_ (𝟙_ C)).inv ≫ (𝟙 (𝟙_ C) ⊗ M.one)) ≫ (λ_ M.X).hom = M.one := by simp theorem one_rightUnitor {M : Mon_ C} : ((λ_ (𝟙_ C)).inv ≫ (M.one ⊗ 𝟙 (𝟙_ C))) ≫ (ρ_ M.X).hom = M.one := by simp [← unitors_equal] section BraidedCategory variable [BraidedCategory C] theorem Mon_tensor_one_mul (M N : Mon_ C) : (((λ_ (𝟙_ C)).inv ≫ (M.one ⊗ N.one)) ▷ (M.X ⊗ N.X)) ≫ tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul) = (λ_ (M.X ⊗ N.X)).hom := by simp only [comp_whiskerRight_assoc] slice_lhs 2 3 => rw [tensorμ_natural_left] slice_lhs 3 4 => rw [← tensor_comp, one_mul M, one_mul N] symm exact tensor_left_unitality M.X N.X theorem Mon_tensor_mul_one (M N : Mon_ C) : (M.X ⊗ N.X) ◁ ((λ_ (𝟙_ C)).inv ≫ (M.one ⊗ N.one)) ≫ tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul) = (ρ_ (M.X ⊗ N.X)).hom := by simp only [MonoidalCategory.whiskerLeft_comp_assoc] slice_lhs 2 3 => rw [tensorμ_natural_right] slice_lhs 3 4 => rw [← tensor_comp, mul_one M, mul_one N] symm exact tensor_right_unitality M.X N.X theorem Mon_tensor_mul_assoc (M N : Mon_ C) : ((tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul)) ▷ (M.X ⊗ N.X)) ≫ tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul) = (α_ (M.X ⊗ N.X) (M.X ⊗ N.X) (M.X ⊗ N.X)).hom ≫ ((M.X ⊗ N.X) ◁ (tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul))) ≫ tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul) := by simp only [comp_whiskerRight_assoc, MonoidalCategory.whiskerLeft_comp_assoc] slice_lhs 2 3 => rw [tensorμ_natural_left] slice_lhs 3 4 => rw [← tensor_comp, mul_assoc M, mul_assoc N, tensor_comp, tensor_comp] slice_lhs 1 3 => rw [tensor_associativity] slice_lhs 3 4 => rw [← tensorμ_natural_right] simp theorem mul_associator {M N P : Mon_ C} : (tensorμ (M.X ⊗ N.X) P.X (M.X ⊗ N.X) P.X ≫ (tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul) ⊗ P.mul)) ≫ (α_ M.X N.X P.X).hom = ((α_ M.X N.X P.X).hom ⊗ (α_ M.X N.X P.X).hom) ≫ tensorμ M.X (N.X ⊗ P.X) M.X (N.X ⊗ P.X) ≫ (M.mul ⊗ tensorμ N.X P.X N.X P.X ≫ (N.mul ⊗ P.mul)) := by simp only [tensor_obj, prodMonoidal_tensorObj, Category.assoc] slice_lhs 2 3 => rw [← Category.id_comp P.mul, tensor_comp] slice_lhs 3 4 => rw [associator_naturality] slice_rhs 3 4 => rw [← Category.id_comp M.mul, tensor_comp] simp only [tensorHom_id, id_tensorHom] slice_lhs 1 3 => rw [associator_monoidal] simp only [Category.assoc] theorem mul_leftUnitor {M : Mon_ C} : (tensorμ (𝟙_ C) M.X (𝟙_ C) M.X ≫ ((λ_ (𝟙_ C)).hom ⊗ M.mul)) ≫ (λ_ M.X).hom = ((λ_ M.X).hom ⊗ (λ_ M.X).hom) ≫ M.mul := by rw [← Category.comp_id (λ_ (𝟙_ C)).hom, ← Category.id_comp M.mul, tensor_comp] simp only [tensorHom_id, id_tensorHom] slice_lhs 3 4 => rw [leftUnitor_naturality] slice_lhs 1 3 => rw [← leftUnitor_monoidal] simp only [Category.assoc, Category.id_comp] theorem mul_rightUnitor {M : Mon_ C} : (tensorμ M.X (𝟙_ C) M.X (𝟙_ C) ≫ (M.mul ⊗ (λ_ (𝟙_ C)).hom)) ≫ (ρ_ M.X).hom = ((ρ_ M.X).hom ⊗ (ρ_ M.X).hom) ≫ M.mul := by rw [← Category.id_comp M.mul, ← Category.comp_id (λ_ (𝟙_ C)).hom, tensor_comp] simp only [tensorHom_id, id_tensorHom] slice_lhs 3 4 => rw [rightUnitor_naturality]	slice_lhs 1 3 => rw [← rightUnitor_monoidal] simp only [Category.assoc, Category.id_comp] @[simps tensorObj_X tensorHom_hom] instance monMonoidalStruct : MonoidalCategoryStruct (Mon_ C) := let tensorObj (M N : Mon_ C) : Mon_ C := { X := M.X ⊗ N.X one := (λ_ (𝟙_ C)).inv ≫ (M.one ⊗ N.one) mul := tensorμ M.X N.X M.X N.X ≫ (M.mul ⊗ N.mul) one_mul := Mon_tensor_one_mul M N mul_one := Mon_tensor_mul_one M N mul_assoc := Mon_tensor_mul_assoc M N } let tensorHom {X₁ Y₁ X₂ Y₂ : Mon_ C} (f : X₁ ⟶ Y₁) (g : X₂ ⟶ Y₂) : tensorObj _ _ ⟶ tensorObj _ _ := { hom := f.hom ⊗ g.hom one_hom := by dsimp [tensorObj] slice_lhs 2 3 => rw [← tensor_comp, Hom.one_hom f, Hom.one_hom g] mul_hom := by dsimp [tensorObj] slice_rhs 1 2 => rw [tensorμ_natural] slice_lhs 2 3 => rw [← tensor_comp, Hom.mul_hom f, Hom.mul_hom g, tensor_comp]	Mathlib/CategoryTheory/Monoidal/Mon_.lean	569	590
/- 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]	Mathlib/Topology/Compactness/Lindelof.lean	167	177
/- Copyright (c) 2020 Aaron Anderson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Aaron Anderson -/ import Mathlib.Algebra.Squarefree.Basic import Mathlib.Data.Nat.Factorization.PrimePow import Mathlib.RingTheory.UniqueFactorizationDomain.Nat /-! # Lemmas about squarefreeness of natural numbers A number is squarefree when it is not divisible by any squares except the squares of units. ## Main Results - `Nat.squarefree_iff_nodup_primeFactorsList`: A positive natural number `x` is squarefree iff the list `factors x` has no duplicate factors. ## Tags squarefree, multiplicity -/ open Finset namespace Nat theorem squarefree_iff_nodup_primeFactorsList {n : ℕ} (h0 : n ≠ 0) :	Squarefree n ↔ n.primeFactorsList.Nodup := by rw [UniqueFactorizationMonoid.squarefree_iff_nodup_normalizedFactors h0, Nat.factors_eq] simp	Mathlib/Data/Nat/Squarefree.lean	28	30
/- Copyright (c) 2019 Kevin Buzzard. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kevin Buzzard -/ import Mathlib.Data.EReal.Basic deprecated_module (since := "2025-04-13")		Mathlib/Data/Real/EReal.lean	455	459
/- Copyright (c) 2023 Joachim Breitner. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joachim Breitner -/ import Mathlib.Data.Nat.Choose.Sum import Mathlib.Probability.ProbabilityMassFunction.Constructions import Mathlib.Tactic.FinCases /-! # The binomial distribution This file defines the probability mass function of the binomial distribution. ## Main results * `binomial_one_eq_bernoulli`: For `n = 1`, it is equal to `PMF.bernoulli`. -/ namespace PMF open ENNReal NNReal /-- The binomial `PMF`: the probability of observing exactly `i` “heads” in a sequence of `n` independent coin tosses, each having probability `p` of coming up “heads”. -/ def binomial (p : ℝ≥0∞) (h : p ≤ 1) (n : ℕ) : PMF (Fin (n + 1)) := .ofFintype (fun i => -- Using `toNNReal` here makes this computable ↑(p.toNNReal^(i : ℕ) * (1-p.toNNReal)^((Fin.last n - i) : ℕ) * (n.choose i : ℕ))) (by lift p to ℝ≥0 using ne_top_of_lt <\| h.trans_lt one_lt_top dsimp only norm_cast convert (add_pow p (1-p) n).symm · rw [Finset.sum_fin_eq_sum_range] apply Finset.sum_congr rfl intro i hi rw [Finset.mem_range] at hi rw [dif_pos hi, Fin.last] · rw [add_tsub_cancel_of_le (mod_cast h), one_pow]) theorem binomial_apply (p : ℝ≥0∞) (h : p ≤ 1) (n : ℕ) (i : Fin (n + 1)) : binomial p h n i = p^(i : ℕ) * (1-p)^((Fin.last n - i) : ℕ) * (n.choose i : ℕ) := by lift p to ℝ≥0 using ne_top_of_lt <\| h.trans_lt one_lt_top simp [binomial] @[simp] theorem binomial_apply_zero (p : ℝ≥0∞) (h : p ≤ 1) (n : ℕ) : binomial p h n 0 = (1-p)^n := by simp [binomial_apply] @[simp] theorem binomial_apply_last (p : ℝ≥0∞) (h : p ≤ 1) (n : ℕ) : binomial p h n (.last n) = p^n := by	simp [binomial_apply] theorem binomial_apply_self (p : ℝ≥0∞) (h : p ≤ 1) (n : ℕ) :	Mathlib/Probability/ProbabilityMassFunction/Binomial.lean	53	55
/- 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]	Mathlib/Computability/Primrec.lean	101	102
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Finite.Defs import Mathlib.Data.Finset.BooleanAlgebra import Mathlib.Data.Finset.Image import Mathlib.Data.Fintype.Defs import Mathlib.Data.Fintype.OfMap import Mathlib.Data.Fintype.Sets import Mathlib.Data.List.FinRange /-! # Instances for finite types This file is a collection of basic `Fintype` instances for types such as `Fin`, `Prod` and pi types. -/ assert_not_exists Monoid open Function open Nat universe u v variable {α β γ : Type} open Finset instance Fin.fintype (n : ℕ) : Fintype (Fin n) := ⟨⟨List.finRange n, List.nodup_finRange n⟩, List.mem_finRange⟩ theorem Fin.univ_def (n : ℕ) : (univ : Finset (Fin n)) = ⟨List.finRange n, List.nodup_finRange n⟩ := rfl theorem Finset.val_univ_fin (n : ℕ) : (Finset.univ : Finset (Fin n)).val = List.finRange n := rfl /-- See also `nonempty_encodable`, `nonempty_denumerable`. -/ theorem nonempty_fintype (α : Type) [Finite α] : Nonempty (Fintype α) := by rcases Finite.exists_equiv_fin α with ⟨n, ⟨e⟩⟩ exact ⟨.ofEquiv _ e.symm⟩ @[simp] theorem List.toFinset_finRange (n : ℕ) : (List.finRange n).toFinset = Finset.univ := by ext; simp @[simp] theorem Fin.univ_val_map {n : ℕ} (f : Fin n → α) : Finset.univ.val.map f = List.ofFn f := by simp [List.ofFn_eq_map, univ_def] theorem Fin.univ_image_def {n : ℕ} [DecidableEq α] (f : Fin n → α) : Finset.univ.image f = (List.ofFn f).toFinset := by simp [Finset.image] theorem Fin.univ_map_def {n : ℕ} (f : Fin n ↪ α) : Finset.univ.map f = ⟨List.ofFn f, List.nodup_ofFn.mpr f.injective⟩ := by simp [Finset.map] @[simp] theorem Fin.image_succAbove_univ {n : ℕ} (i : Fin (n + 1)) : univ.image i.succAbove = {i}ᶜ := by ext m simp @[simp] theorem Fin.image_succ_univ (n : ℕ) : (univ : Finset (Fin n)).image Fin.succ = {0}ᶜ := by rw [← Fin.succAbove_zero, Fin.image_succAbove_univ] @[simp] theorem Fin.image_castSucc (n : ℕ) : (univ : Finset (Fin n)).image Fin.castSucc = {Fin.last n}ᶜ := by rw [← Fin.succAbove_last, Fin.image_succAbove_univ] /- The following three lemmas use `Finset.cons` instead of `insert` and `Finset.map` instead of `Finset.image` to reduce proof obligations downstream. -/ /-- Embed `Fin n` into `Fin (n + 1)` by prepending zero to the `univ` -/ theorem Fin.univ_succ (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons 0 (univ.map ⟨Fin.succ, Fin.succ_injective _⟩) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by appending a new `Fin.last n` to the `univ` -/ theorem Fin.univ_castSuccEmb (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons (Fin.last n) (univ.map Fin.castSuccEmb) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by inserting around a specified pivot `p : Fin (n + 1)` into the `univ` -/ theorem Fin.univ_succAbove (n : ℕ) (p : Fin (n + 1)) : (univ : Finset (Fin (n + 1))) = Finset.cons p (univ.map <\| Fin.succAboveEmb p) (by simp) := by simp [map_eq_image] @[simp] theorem Fin.univ_image_get [DecidableEq α] (l : List α) : Finset.univ.image l.get = l.toFinset := by simp [univ_image_def] @[simp] theorem Fin.univ_image_getElem' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (fun i : Fin l.length => f <\| l[(i : Nat)]) = (l.map f).toFinset := by simp only [univ_image_def, List.ofFn_getElem_eq_map] theorem Fin.univ_image_get' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (f <\| l.get ·) = (l.map f).toFinset := by simp @[instance] def Unique.fintype {α : Type} [Unique α] : Fintype α := Fintype.ofSubsingleton default /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq (y : α) : Fintype { x // x = y } := Fintype.subtype {y} (by simp) /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq' (y : α) : Fintype { x // y = x } := Fintype.subtype {y} (by simp [eq_comm]) theorem Fintype.univ_empty : @univ Empty _ = ∅ := rfl theorem Fintype.univ_pempty : @univ PEmpty _ = ∅ := rfl instance Unit.fintype : Fintype Unit := Fintype.ofSubsingleton () theorem Fintype.univ_unit : @univ Unit _ = {()} := rfl instance PUnit.fintype : Fintype PUnit := Fintype.ofSubsingleton PUnit.unit theorem Fintype.univ_punit : @univ PUnit _ = {PUnit.unit} := rfl @[simp] theorem Fintype.univ_bool : @univ Bool _ = {true, false} := rfl /-- Given that `α × β` is a fintype, `α` is also a fintype. -/ def Fintype.prodLeft {α β} [DecidableEq α] [Fintype (α × β)] [Nonempty β] : Fintype α := ⟨(@univ (α × β) _).image Prod.fst, fun a => by simp⟩ /-- Given that `α × β` is a fintype, `β` is also a fintype. -/ def Fintype.prodRight {α β} [DecidableEq β] [Fintype (α × β)] [Nonempty α] : Fintype β := ⟨(@univ (α × β) _).image Prod.snd, fun b => by simp⟩ instance ULift.fintype (α : Type) [Fintype α] : Fintype (ULift α) := Fintype.ofEquiv _ Equiv.ulift.symm instance PLift.fintype (α : Type) [Fintype α] : Fintype (PLift α) := Fintype.ofEquiv _ Equiv.plift.symm instance PLift.fintypeProp (p : Prop) [Decidable p] : Fintype (PLift p) := ⟨if h : p then {⟨h⟩} else ∅, fun ⟨h⟩ => by simp [h]⟩ instance Quotient.fintype [Fintype α] (s : Setoid α) [DecidableRel ((· ≈ ·) : α → α → Prop)] : Fintype (Quotient s) := Fintype.ofSurjective Quotient.mk'' Quotient.mk''_surjective instance PSigma.fintypePropLeft {α : Prop} {β : α → Type} [Decidable α] [∀ a, Fintype (β a)] : Fintype (Σ'a, β a) := if h : α then Fintype.ofEquiv (β h) ⟨fun x => ⟨h, x⟩, PSigma.snd, fun _ => rfl, fun ⟨_, _⟩ => rfl⟩ else ⟨∅, fun x => (h x.1).elim⟩ instance PSigma.fintypePropRight {α : Type*} {β : α → Prop} [∀ a, Decidable (β a)] [Fintype α] : Fintype (Σ'a, β a) := Fintype.ofEquiv { a // β a } ⟨fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨_, _⟩ => rfl, fun ⟨_, _⟩ => rfl⟩ instance PSigma.fintypePropProp {α : Prop} {β : α → Prop} [Decidable α] [∀ a, Decidable (β a)] : Fintype (Σ'a, β a) :=	if h : ∃ a, β a then ⟨{⟨h.fst, h.snd⟩}, fun ⟨_, _⟩ => by simp⟩ else ⟨∅, fun ⟨x, y⟩ =>	Mathlib/Data/Fintype/Basic.lean	175	175
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.Algebra.Group.Action.End import Mathlib.Algebra.Group.Action.Pointwise.Set.Basic import Mathlib.Algebra.Group.Action.Prod import Mathlib.Algebra.Group.Subgroup.Map import Mathlib.Algebra.Module.Defs import Mathlib.Algebra.NoZeroSMulDivisors.Defs import Mathlib.Data.Finite.Sigma import Mathlib.Data.Set.Finite.Range import Mathlib.Data.Setoid.Basic import Mathlib.GroupTheory.GroupAction.Defs /-! # Basic properties of group actions This file primarily concerns itself with orbits, stabilizers, and other objects defined in terms of actions. Despite this file being called `basic`, low-level helper lemmas for algebraic manipulation of `•` belong elsewhere. ## Main definitions * `MulAction.orbit` * `MulAction.fixedPoints` * `MulAction.fixedBy` * `MulAction.stabilizer` -/ universe u v open Pointwise open Function namespace MulAction variable (M : Type u) [Monoid M] (α : Type v) [MulAction M α] {β : Type} [MulAction M β] section Orbit variable {α M} @[to_additive] lemma fst_mem_orbit_of_mem_orbit {x y : α × β} (h : x ∈ MulAction.orbit M y) : x.1 ∈ MulAction.orbit M y.1 := by rcases h with ⟨g, rfl⟩ exact mem_orbit _ _ @[to_additive] lemma snd_mem_orbit_of_mem_orbit {x y : α × β} (h : x ∈ MulAction.orbit M y) : x.2 ∈ MulAction.orbit M y.2 := by rcases h with ⟨g, rfl⟩ exact mem_orbit _ _ @[to_additive] lemma _root_.Finite.finite_mulAction_orbit [Finite M] (a : α) : Set.Finite (orbit M a) := Set.finite_range _ variable (M) @[to_additive] theorem orbit_eq_univ [IsPretransitive M α] (a : α) : orbit M a = Set.univ := (surjective_smul M a).range_eq end Orbit section FixedPoints variable {M α} @[to_additive (attr := simp)] theorem subsingleton_orbit_iff_mem_fixedPoints {a : α} : (orbit M a).Subsingleton ↔ a ∈ fixedPoints M α := by rw [mem_fixedPoints] constructor · exact fun h m ↦ h (mem_orbit a m) (mem_orbit_self a) · rintro h _ ⟨m, rfl⟩ y ⟨p, rfl⟩ simp only [h] @[to_additive mem_fixedPoints_iff_card_orbit_eq_one] theorem mem_fixedPoints_iff_card_orbit_eq_one {a : α} [Fintype (orbit M a)] : a ∈ fixedPoints M α ↔ Fintype.card (orbit M a) = 1 := by simp only [← subsingleton_orbit_iff_mem_fixedPoints, le_antisymm_iff, Fintype.card_le_one_iff_subsingleton, Nat.add_one_le_iff, Fintype.card_pos_iff, Set.subsingleton_coe, iff_self_and, Set.nonempty_coe_sort, orbit_nonempty, implies_true] @[to_additive instDecidablePredMemSetFixedByAddOfDecidableEq] instance (m : M) [DecidableEq β] : DecidablePred fun b : β => b ∈ MulAction.fixedBy β m := fun b ↦ by simp only [MulAction.mem_fixedBy, Equiv.Perm.smul_def] infer_instance end FixedPoints end MulAction /-- `smul` by a `k : M` over a group is injective, if `k` is not a zero divisor. The general theory of such `k` is elaborated by `IsSMulRegular`. The typeclass that restricts all terms of `M` to have this property is `NoZeroSMulDivisors`. -/ theorem smul_cancel_of_non_zero_divisor {M G : Type} [Monoid M] [AddGroup G] [DistribMulAction M G] (k : M) (h : ∀ x : G, k • x = 0 → x = 0) {a b : G} (h' : k • a = k • b) : a = b := by rw [← sub_eq_zero] refine h _ ?_ rw [smul_sub, h', sub_self] namespace MulAction variable {G α β : Type} [Group G] [MulAction G α] [MulAction G β] @[to_additive] theorem fixedPoints_of_subsingleton [Subsingleton α] : fixedPoints G α = .univ := by apply Set.eq_univ_of_forall simp only [mem_fixedPoints] intro x hx apply Subsingleton.elim .. /-- If a group acts nontrivially, then the type is nontrivial -/ @[to_additive "If a subgroup acts nontrivially, then the type is nontrivial."] theorem nontrivial_of_fixedPoints_ne_univ (h : fixedPoints G α ≠ .univ) : Nontrivial α := (subsingleton_or_nontrivial α).resolve_left fun _ ↦ h fixedPoints_of_subsingleton section Orbit -- TODO: This proof is redoing a special case of `MulAction.IsInvariantBlock.isBlock`. Can we move -- this lemma earlier to golf? @[to_additive (attr := simp)] theorem smul_orbit (g : G) (a : α) : g • orbit G a = orbit G a := (smul_orbit_subset g a).antisymm <\| calc orbit G a = g • g⁻¹ • orbit G a := (smul_inv_smul _ _).symm _ ⊆ g • orbit G a := Set.image_subset _ (smul_orbit_subset _ _) /-- The action of a group on an orbit is transitive. -/ @[to_additive "The action of an additive group on an orbit is transitive."] instance (a : α) : IsPretransitive G (orbit G a) := ⟨by rintro ⟨_, g, rfl⟩ ⟨_, h, rfl⟩ use h g⁻¹ ext1 simp [mul_smul]⟩ @[to_additive] lemma orbitRel_subgroup_le (H : Subgroup G) : orbitRel H α ≤ orbitRel G α := Setoid.le_def.2 mem_orbit_of_mem_orbit_subgroup @[to_additive] lemma orbitRel_subgroupOf (H K : Subgroup G) : orbitRel (H.subgroupOf K) α = orbitRel (H ⊓ K : Subgroup G) α := by rw [← Subgroup.subgroupOf_map_subtype] ext x simp_rw [orbitRel_apply] refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rcases h with ⟨⟨gv, gp⟩, rfl⟩ simp only [Submonoid.mk_smul] refine mem_orbit _ (⟨gv, ?_⟩ : Subgroup.map K.subtype (H.subgroupOf K)) simpa using gp · rcases h with ⟨⟨gv, gp⟩, rfl⟩ simp only [Submonoid.mk_smul] simp only [Subgroup.subgroupOf_map_subtype, Subgroup.mem_inf] at gp refine mem_orbit _ (⟨⟨gv, ?_⟩, ?_⟩ : H.subgroupOf K) · exact gp.2 · simp only [Subgroup.mem_subgroupOf] exact gp.1 variable (G α) /-- An action is pretransitive if and only if the quotient by `MulAction.orbitRel` is a subsingleton. -/ @[to_additive "An additive action is pretransitive if and only if the quotient by `AddAction.orbitRel` is a subsingleton."] theorem pretransitive_iff_subsingleton_quotient : IsPretransitive G α ↔ Subsingleton (orbitRel.Quotient G α) := by refine ⟨fun _ ↦ ⟨fun a b ↦ ?_⟩, fun _ ↦ ⟨fun a b ↦ ?_⟩⟩ · refine Quot.inductionOn a (fun x ↦ ?_) exact Quot.inductionOn b (fun y ↦ Quot.sound <\| exists_smul_eq G y x) · have h : Quotient.mk (orbitRel G α) b = ⟦a⟧ := Subsingleton.elim _ _ exact Quotient.eq''.mp h /-- If `α` is non-empty, an action is pretransitive if and only if the quotient has exactly one element. -/ @[to_additive "If `α` is non-empty, an additive action is pretransitive if and only if the quotient has exactly one element."] theorem pretransitive_iff_unique_quotient_of_nonempty [Nonempty α] : IsPretransitive G α ↔ Nonempty (Unique <\| orbitRel.Quotient G α) := by rw [unique_iff_subsingleton_and_nonempty, pretransitive_iff_subsingleton_quotient, iff_self_and] exact fun _ ↦ (nonempty_quotient_iff _).mpr inferInstance variable {G α} @[to_additive] instance (x : orbitRel.Quotient G α) : IsPretransitive G x.orbit where exists_smul_eq := by induction x using Quotient.inductionOn' rintro ⟨y, yh⟩ ⟨z, zh⟩ rw [orbitRel.Quotient.mem_orbit, Quotient.eq''] at yh zh rcases yh with ⟨g, rfl⟩ rcases zh with ⟨h, rfl⟩ refine ⟨h * g⁻¹, ?_⟩ ext simp [mul_smul] variable (G) (α) local notation "Ω" => orbitRel.Quotient G α @[to_additive] lemma _root_.Finite.of_finite_mulAction_orbitRel_quotient [Finite G] [Finite Ω] : Finite α := by rw [(selfEquivSigmaOrbits' G _).finite_iff] have : ∀ g : Ω, Finite g.orbit := by intro g induction g using Quotient.inductionOn' simpa [Set.finite_coe_iff] using Finite.finite_mulAction_orbit _ exact Finite.instSigma variable (β) @[to_additive] lemma orbitRel_le_fst : orbitRel G (α × β) ≤ (orbitRel G α).comap Prod.fst := Setoid.le_def.2 fst_mem_orbit_of_mem_orbit @[to_additive] lemma orbitRel_le_snd : orbitRel G (α × β) ≤ (orbitRel G β).comap Prod.snd := Setoid.le_def.2 snd_mem_orbit_of_mem_orbit end Orbit section Stabilizer variable (G) variable {G} /-- If the stabilizer of `a` is `S`, then the stabilizer of `g • a` is `gSg⁻¹`. -/ theorem stabilizer_smul_eq_stabilizer_map_conj (g : G) (a : α) : stabilizer G (g • a) = (stabilizer G a).map (MulAut.conj g).toMonoidHom := by ext h rw [mem_stabilizer_iff, ← smul_left_cancel_iff g⁻¹, smul_smul, smul_smul, smul_smul, inv_mul_cancel, one_smul, ← mem_stabilizer_iff, Subgroup.mem_map_equiv, MulAut.conj_symm_apply] /-- A bijection between the stabilizers of two elements in the same orbit. -/ noncomputable def stabilizerEquivStabilizerOfOrbitRel {a b : α} (h : orbitRel G α a b) : stabilizer G a ≃* stabilizer G b := let g : G := Classical.choose h have hg : g • b = a := Classical.choose_spec h have this : stabilizer G a = (stabilizer G b).map (MulAut.conj g).toMonoidHom := by rw [← hg, stabilizer_smul_eq_stabilizer_map_conj] (MulEquiv.subgroupCongr this).trans ((MulAut.conj g).subgroupMap <\| stabilizer G b).symm end Stabilizer end MulAction namespace AddAction variable {G α : Type} [AddGroup G] [AddAction G α] /-- If the stabilizer of `x` is `S`, then the stabilizer of `g +ᵥ x` is `g + S + (-g)`. -/ theorem stabilizer_vadd_eq_stabilizer_map_conj (g : G) (a : α) : stabilizer G (g +ᵥ a) = (stabilizer G a).map (AddAut.conj g).toMul.toAddMonoidHom := by ext h rw [mem_stabilizer_iff, ← vadd_left_cancel_iff (-g), vadd_vadd, vadd_vadd, vadd_vadd, neg_add_cancel, zero_vadd, ← mem_stabilizer_iff, AddSubgroup.mem_map_equiv, AddAut.conj_symm_apply] /-- A bijection between the stabilizers of two elements in the same orbit. -/ noncomputable def stabilizerEquivStabilizerOfOrbitRel {a b : α} (h : orbitRel G α a b) : stabilizer G a ≃+ stabilizer G b := let g : G := Classical.choose h have hg : g +ᵥ b = a := Classical.choose_spec h have this : stabilizer G a = (stabilizer G b).map (AddAut.conj g).toMul.toAddMonoidHom := by rw [← hg, stabilizer_vadd_eq_stabilizer_map_conj] (AddEquiv.addSubgroupCongr this).trans ((AddAut.conj g).addSubgroupMap <\| stabilizer G b).symm end AddAction attribute [to_additive existing] MulAction.stabilizer_smul_eq_stabilizer_map_conj attribute [to_additive existing] MulAction.stabilizerEquivStabilizerOfOrbitRel theorem Equiv.swap_mem_stabilizer {α : Type} [DecidableEq α] {S : Set α} {a b : α} : Equiv.swap a b ∈ MulAction.stabilizer (Equiv.Perm α) S ↔ (a ∈ S ↔ b ∈ S) := by rw [MulAction.mem_stabilizer_iff, Set.ext_iff, ← swap_inv] simp_rw [Set.mem_inv_smul_set_iff, Perm.smul_def, swap_apply_def] exact ⟨fun h ↦ by simpa [Iff.comm] using h a, by intros; split_ifs <;> simp []⟩ namespace MulAction variable {G : Type} [Group G] {α : Type} [MulAction G α] /-- To prove inclusion of a subgroup* in a stabilizer, it is enough to prove inclusions. -/ @[to_additive "To prove inclusion of a subgroup in a stabilizer, it is enough to prove inclusions."] theorem le_stabilizer_iff_smul_le (s : Set α) (H : Subgroup G) : H ≤ stabilizer G s ↔ ∀ g ∈ H, g • s ⊆ s := by constructor · intro hyp g hg apply Eq.subset rw [← mem_stabilizer_iff] exact hyp hg · intro hyp g hg rw [mem_stabilizer_iff] apply subset_antisymm (hyp g hg) intro x hx use g⁻¹ • x constructor · apply hyp g⁻¹ (inv_mem hg) simp only [Set.smul_mem_smul_set_iff, hx] · simp only [smul_inv_smul] end MulAction section variable (R M : Type*) [Ring R] [AddCommGroup M] [Module R M] [NoZeroSMulDivisors R M] variable {M} in lemma Module.stabilizer_units_eq_bot_of_ne_zero {x : M} (hx : x ≠ 0) : MulAction.stabilizer Rˣ x = ⊥ := by rw [eq_bot_iff] intro g (hg : g.val • x = x) ext rw [← sub_eq_zero, ← smul_eq_zero_iff_left hx, Units.val_one, sub_smul, hg, one_smul, sub_self] end		Mathlib/GroupTheory/GroupAction/Basic.lean	754	758
/- Copyright (c) 2022 Jon Eugster. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jon Eugster -/ import Mathlib.Algebra.CharP.Defs import Mathlib.Algebra.IsPrimePow import Mathlib.Data.Nat.Factorization.Basic import Mathlib.RingTheory.LocalRing.ResidueField.Defs /-! # Characteristics of local rings ## Main result - `charP_zero_or_prime_power`: In a commutative local ring the characteristics is either zero or a prime power. -/ /-- In a local ring the characteristics is either zero or a prime power. -/ theorem charP_zero_or_prime_power (R : Type*) [CommRing R] [IsLocalRing R] (q : ℕ) [char_R_q : CharP R q] : q = 0 ∨ IsPrimePow q := by	-- Assume `q := char(R)` is not zero. apply or_iff_not_imp_left.2 intro q_pos let K := IsLocalRing.ResidueField R haveI RM_char := ringChar.charP K let r := ringChar K let n := q.factorization r -- `r := char(R/m)` is either prime or zero: rcases CharP.char_is_prime_or_zero K r with r_prime \| r_zero · let a := q / r ^ n -- If `r` is prime, we can write it as `r = a * q^n` ... have q_eq_a_mul_rn : q = r ^ n * a := by rw [Nat.mul_div_cancel' (Nat.ordProj_dvd q r)] have r_ne_dvd_a := Nat.not_dvd_ordCompl r_prime q_pos have rn_dvd_q : r ^ n ∣ q := ⟨a, q_eq_a_mul_rn⟩ rw [mul_comm] at q_eq_a_mul_rn -- ... where `a` is a unit. have a_unit : IsUnit (a : R) := by by_contra g rw [← mem_nonunits_iff] at g rw [← IsLocalRing.mem_maximalIdeal] at g have a_cast_zero := Ideal.Quotient.eq_zero_iff_mem.2 g rw [map_natCast] at a_cast_zero have r_dvd_a := (ringChar.spec K a).1 a_cast_zero exact absurd r_dvd_a r_ne_dvd_a -- Let `b` be the inverse of `a`. have rn_cast_zero : ↑(r ^ n) = (0 : R) := by rw [← @mul_one R _ ↑(r ^ n), mul_comm, ← Classical.choose_spec a_unit.exists_left_inv, mul_assoc, ← Nat.cast_mul, ← q_eq_a_mul_rn, CharP.cast_eq_zero R q] simp have q_eq_rn := Nat.dvd_antisymm ((CharP.cast_eq_zero_iff R q (r ^ n)).mp rn_cast_zero) rn_dvd_q have n_pos : n ≠ 0 := fun n_zero => absurd (by simpa [n_zero] using q_eq_rn) (CharP.char_ne_one R q) -- Definition of prime power: `∃ r n, Prime r ∧ 0 < n ∧ r ^ n = q`. exact ⟨r, ⟨n, ⟨r_prime.prime, ⟨pos_iff_ne_zero.mpr n_pos, q_eq_rn.symm⟩⟩⟩⟩ · haveI K_char_p_0 := ringChar.of_eq r_zero haveI K_char_zero : CharZero K := CharP.charP_to_charZero K haveI R_char_zero := RingHom.charZero (IsLocalRing.residue R) -- Finally, `r = 0` would lead to a contradiction: have q_zero := CharP.eq R char_R_q (CharP.ofCharZero R) exact absurd q_zero q_pos	Mathlib/Algebra/CharP/LocalRing.lean	25	67
/- Copyright (c) 2014 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura, Jeremy Avigad -/ import Mathlib.Logic.Basic import Mathlib.Logic.Function.Defs import Mathlib.Order.Defs.LinearOrder /-! # Booleans This file proves various trivial lemmas about booleans and their relation to decidable propositions. ## Tags bool, boolean, Bool, De Morgan -/ namespace Bool section /-! This section contains lemmas about booleans which were present in core Lean 3. The remainder of this file contains lemmas about booleans from mathlib 3. -/ theorem true_eq_false_eq_False : ¬true = false := by decide theorem false_eq_true_eq_False : ¬false = true := by decide theorem eq_false_eq_not_eq_true (b : Bool) : (¬b = true) = (b = false) := by simp theorem eq_true_eq_not_eq_false (b : Bool) : (¬b = false) = (b = true) := by simp theorem eq_false_of_not_eq_true {b : Bool} : ¬b = true → b = false := Eq.mp (eq_false_eq_not_eq_true b) theorem eq_true_of_not_eq_false {b : Bool} : ¬b = false → b = true := Eq.mp (eq_true_eq_not_eq_false b) theorem and_eq_true_eq_eq_true_and_eq_true (a b : Bool) : ((a && b) = true) = (a = true ∧ b = true) := by simp theorem or_eq_true_eq_eq_true_or_eq_true (a b : Bool) : ((a \|\| b) = true) = (a = true ∨ b = true) := by simp theorem not_eq_true_eq_eq_false (a : Bool) : (not a = true) = (a = false) := by cases a <;> simp #adaptation_note /-- nightly-2024-03-05 this is no longer a simp lemma, as the LHS simplifies. -/ theorem and_eq_false_eq_eq_false_or_eq_false (a b : Bool) : ((a && b) = false) = (a = false ∨ b = false) := by cases a <;> cases b <;> simp theorem or_eq_false_eq_eq_false_and_eq_false (a b : Bool) : ((a \|\| b) = false) = (a = false ∧ b = false) := by cases a <;> cases b <;> simp theorem not_eq_false_eq_eq_true (a : Bool) : (not a = false) = (a = true) := by cases a <;> simp theorem coe_false : ↑false = False := by simp theorem coe_true : ↑true = True := by simp theorem coe_sort_false : (false : Prop) = False := by simp theorem coe_sort_true : (true : Prop) = True := by simp theorem decide_iff (p : Prop) [d : Decidable p] : decide p = true ↔ p := by simp theorem decide_true {p : Prop} [Decidable p] : p → decide p := (decide_iff p).2 theorem of_decide_true {p : Prop} [Decidable p] : decide p → p := (decide_iff p).1 theorem bool_iff_false {b : Bool} : ¬b ↔ b = false := by cases b <;> decide theorem bool_eq_false {b : Bool} : ¬b → b = false := bool_iff_false.1 theorem decide_false_iff (p : Prop) {_ : Decidable p} : decide p = false ↔ ¬p := bool_iff_false.symm.trans (not_congr (decide_iff _)) theorem decide_false {p : Prop} [Decidable p] : ¬p → decide p = false := (decide_false_iff p).2 theorem of_decide_false {p : Prop} [Decidable p] : decide p = false → ¬p := (decide_false_iff p).1 theorem decide_congr {p q : Prop} [Decidable p] [Decidable q] (h : p ↔ q) : decide p = decide q := decide_eq_decide.mpr h theorem coe_xor_iff (a b : Bool) : xor a b ↔ Xor' (a = true) (b = true) := by cases a <;> cases b <;> decide end theorem dichotomy (b : Bool) : b = false ∨ b = true := by cases b <;> simp theorem not_ne_id : not ≠ id := fun h ↦ false_ne_true <\| congrFun h true theorem or_inl {a b : Bool} (H : a) : a \|\| b := by simp [H] theorem or_inr {a b : Bool} (H : b) : a \|\| b := by cases a <;> simp [H] theorem and_elim_left : ∀ {a b : Bool}, a && b → a := by decide theorem and_intro : ∀ {a b : Bool}, a → b → a && b := by decide theorem and_elim_right : ∀ {a b : Bool}, a && b → b := by decide lemma eq_not_iff : ∀ {a b : Bool}, a = !b ↔ a ≠ b := by decide lemma not_eq_iff : ∀ {a b : Bool}, !a = b ↔ a ≠ b := by decide theorem ne_not {a b : Bool} : a ≠ !b ↔ a = b := not_eq_not lemma not_ne_self : ∀ b : Bool, (!b) ≠ b := by decide lemma self_ne_not : ∀ b : Bool, b ≠ !b := by decide lemma eq_or_eq_not : ∀ a b, a = b ∨ a = !b := by decide		Mathlib/Data/Bool/Basic.lean	128	128
/- Copyright (c) 2022 Devon Tuma. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Devon Tuma -/ import Mathlib.Data.Vector.Basic /-! # Theorems about membership of elements in vectors This file contains theorems for membership in a `v.toList` for a vector `v`. Having the length available in the type allows some of the lemmas to be simpler and more general than the original version for lists. In particular we can avoid some assumptions about types being `Inhabited`, and make more general statements about `head` and `tail`. -/ namespace List namespace Vector variable {α β : Type*} {n : ℕ} (a a' : α) @[simp] theorem get_mem (i : Fin n) (v : Vector α n) : v.get i ∈ v.toList := List.get_mem _ _	theorem mem_iff_get (v : Vector α n) : a ∈ v.toList ↔ ∃ i, v.get i = a := by simp only [List.mem_iff_get, Fin.exists_iff, Vector.get_eq_get_toList]	Mathlib/Data/Vector/Mem.lean	26	28
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.Algebra.Homology.ShortComplex.Preadditive import Mathlib.CategoryTheory.Linear.LinearFunctor /-! # Homology of linear categories In this file, it is shown that if `C` is a `R`-linear category, then `ShortComplex C` is a `R`-linear category. Various homological notions are also shown to be linear. -/ namespace CategoryTheory open Category Limits variable {R C : Type*} [Semiring R] [Category C] [Preadditive C] [Linear R C] namespace ShortComplex variable {S₁ S₂ : ShortComplex C} attribute [local simp] Hom.comm₁₂ Hom.comm₂₃ mul_smul add_smul instance : SMul R (S₁ ⟶ S₂) where smul a φ := { τ₁ := a • φ.τ₁ τ₂ := a • φ.τ₂ τ₃ := a • φ.τ₃ } @[simp] lemma smul_τ₁ (a : R) (φ : S₁ ⟶ S₂) : (a • φ).τ₁ = a • φ.τ₁ := rfl @[simp] lemma smul_τ₂ (a : R) (φ : S₁ ⟶ S₂) : (a • φ).τ₂ = a • φ.τ₂ := rfl @[simp] lemma smul_τ₃ (a : R) (φ : S₁ ⟶ S₂) : (a • φ).τ₃ = a • φ.τ₃ := rfl instance : Module R (S₁ ⟶ S₂) where zero_smul := by aesop_cat one_smul := by aesop_cat smul_zero := by aesop_cat smul_add := by aesop_cat add_smul := by aesop_cat mul_smul := by aesop_cat instance : Linear R (ShortComplex C) where section LeftHomology variable {φ φ' : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} namespace LeftHomologyMapData variable (γ : LeftHomologyMapData φ h₁ h₂) /-- Given a left homology map data for morphism `φ`, this is the induced left homology map data for `a • φ`. -/ @[simps] def smul (a : R) : LeftHomologyMapData (a • φ) h₁ h₂ where φK := a • γ.φK φH := a • γ.φH end LeftHomologyMapData variable (h₁ h₂ φ) variable (a : R)	@[simp] lemma leftHomologyMap'_smul : leftHomologyMap' (a • φ) h₁ h₂ = a • leftHomologyMap' φ h₁ h₂ := by have γ : LeftHomologyMapData φ h₁ h₂ := default simp only [(γ.smul a).leftHomologyMap'_eq, LeftHomologyMapData.smul_φH, γ.leftHomologyMap'_eq]	Mathlib/Algebra/Homology/ShortComplex/Linear.lean	70	74
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Yury Kudryashov -/ import Mathlib.Order.Filter.Tendsto import Mathlib.Data.Set.Accumulate import Mathlib.Topology.Bornology.Basic import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Ultrafilter import Mathlib.Topology.Defs.Ultrafilter /-! # Compact sets and compact spaces ## Main results * `isCompact_univ_pi`: Tychonov's theorem - an arbitrary product of compact sets is compact. -/ open Set Filter Topology TopologicalSpace Function universe u v variable {X : Type u} {Y : Type v} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} {f : X → Y} -- compact sets section Compact lemma IsCompact.exists_clusterPt (hs : IsCompact s) {f : Filter X} [NeBot f] (hf : f ≤ 𝓟 s) : ∃ x ∈ s, ClusterPt x f := hs hf lemma IsCompact.exists_mapClusterPt {ι : Type} (hs : IsCompact s) {f : Filter ι} [NeBot f] {u : ι → X} (hf : Filter.map u f ≤ 𝓟 s) : ∃ x ∈ s, MapClusterPt x f u := hs hf lemma IsCompact.exists_clusterPt_of_frequently {l : Filter X} (hs : IsCompact s) (hl : ∃ᶠ x in l, x ∈ s) : ∃ a ∈ s, ClusterPt a l := let ⟨a, has, ha⟩ := @hs _ (frequently_mem_iff_neBot.mp hl) inf_le_right ⟨a, has, ha.mono inf_le_left⟩ lemma IsCompact.exists_mapClusterPt_of_frequently {l : Filter ι} {f : ι → X} (hs : IsCompact s) (hf : ∃ᶠ x in l, f x ∈ s) : ∃ a ∈ s, MapClusterPt a l f := hs.exists_clusterPt_of_frequently hf /-- The complement to a compact set belongs to a filter `f` if it belongs to each filter `𝓝 x ⊓ f`, `x ∈ s`. -/ theorem IsCompact.compl_mem_sets (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, sᶜ ∈ 𝓝 x ⊓ f) : sᶜ ∈ f := by contrapose! hf simp only [not_mem_iff_inf_principal_compl, compl_compl, inf_assoc] at hf ⊢ exact @hs _ hf inf_le_right /-- The complement to a compact set belongs to a filter `f` if each `x ∈ s` has a neighborhood `t` within `s` such that `tᶜ` belongs to `f`. -/ theorem IsCompact.compl_mem_sets_of_nhdsWithin (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx => ?_ rcases hf x hx with ⟨t, ht, hst⟩ replace ht := mem_inf_principal.1 ht apply mem_inf_of_inter ht hst rintro x ⟨h₁, h₂⟩ hs exact h₂ (h₁ hs) /-- If `p : Set X → Prop` is stable under restriction and union, and each point `x` of a compact set `s` has a neighborhood `t` within `s` such that `p t`, then `p s` holds. -/ @[elab_as_elim] theorem IsCompact.induction_on (hs : IsCompact s) {p : Set X → Prop} (he : p ∅) (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hunion : ∀ ⦃s t⦄, p s → p t → p (s ∪ t)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := comk p he (fun _t ht _s hsub ↦ hmono hsub ht) (fun _s hs _t ht ↦ hunion hs ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] /-- The intersection of a compact set and a closed set is a compact set. -/ theorem IsCompact.inter_right (hs : IsCompact s) (ht : IsClosed t) : IsCompact (s ∩ t) := by intro f hnf hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs (le_trans hstf (le_principal_iff.2 inter_subset_left)) have : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono <\| le_trans hstf (le_principal_iff.2 inter_subset_right) exact ⟨x, ⟨hsx, this⟩, hx⟩ /-- The intersection of a closed set and a compact set is a compact set. -/ theorem IsCompact.inter_left (ht : IsCompact t) (hs : IsClosed s) : IsCompact (s ∩ t) := inter_comm t s ▸ ht.inter_right hs /-- The set difference of a compact set and an open set is a compact set. -/ theorem IsCompact.diff (hs : IsCompact s) (ht : IsOpen t) : IsCompact (s \ t) := hs.inter_right (isClosed_compl_iff.mpr ht) /-- A closed subset of a compact set is a compact set. -/ theorem IsCompact.of_isClosed_subset (hs : IsCompact s) (ht : IsClosed t) (h : t ⊆ s) : IsCompact t := inter_eq_self_of_subset_right h ▸ hs.inter_right ht theorem IsCompact.image_of_continuousOn {f : X → Y} (hs : IsCompact s) (hf : ContinuousOn f s) : IsCompact (f '' s) := by intro l lne ls have : NeBot (l.comap f ⊓ 𝓟 s) := comap_inf_principal_neBot_of_image_mem lne (le_principal_iff.1 ls) obtain ⟨x, hxs, hx⟩ : ∃ x ∈ s, ClusterPt x (l.comap f ⊓ 𝓟 s) := @hs _ this inf_le_right haveI := hx.neBot use f x, mem_image_of_mem f hxs have : Tendsto f (𝓝 x ⊓ (comap f l ⊓ 𝓟 s)) (𝓝 (f x) ⊓ l) := by convert (hf x hxs).inf (@tendsto_comap _ _ f l) using 1 rw [nhdsWithin] ac_rfl exact this.neBot theorem IsCompact.image {f : X → Y} (hs : IsCompact s) (hf : Continuous f) : IsCompact (f '' s) := hs.image_of_continuousOn hf.continuousOn theorem IsCompact.adherence_nhdset {f : Filter X} (hs : IsCompact s) (hf₂ : f ≤ 𝓟 s) (ht₁ : IsOpen t) (ht₂ : ∀ x ∈ s, ClusterPt x f → x ∈ t) : t ∈ f := Classical.by_cases mem_of_eq_bot fun (this : f ⊓ 𝓟 tᶜ ≠ ⊥) => let ⟨x, hx, (hfx : ClusterPt x <\| f ⊓ 𝓟 tᶜ)⟩ := @hs _ ⟨this⟩ <\| inf_le_of_left_le hf₂ have : x ∈ t := ht₂ x hx hfx.of_inf_left have : tᶜ ∩ t ∈ 𝓝[tᶜ] x := inter_mem_nhdsWithin _ (IsOpen.mem_nhds ht₁ this) have A : 𝓝[tᶜ] x = ⊥ := empty_mem_iff_bot.1 <\| compl_inter_self t ▸ this have : 𝓝[tᶜ] x ≠ ⊥ := hfx.of_inf_right.ne absurd A this theorem isCompact_iff_ultrafilter_le_nhds : IsCompact s ↔ ∀ f : Ultrafilter X, ↑f ≤ 𝓟 s → ∃ x ∈ s, ↑f ≤ 𝓝 x := by refine (forall_neBot_le_iff ?_).trans ?_ · rintro f g hle ⟨x, hxs, hxf⟩ exact ⟨x, hxs, hxf.mono hle⟩ · simp only [Ultrafilter.clusterPt_iff] alias ⟨IsCompact.ultrafilter_le_nhds, _⟩ := isCompact_iff_ultrafilter_le_nhds theorem isCompact_iff_ultrafilter_le_nhds' : IsCompact s ↔ ∀ f : Ultrafilter X, s ∈ f → ∃ x ∈ s, ↑f ≤ 𝓝 x := by simp only [isCompact_iff_ultrafilter_le_nhds, le_principal_iff, Ultrafilter.mem_coe] alias ⟨IsCompact.ultrafilter_le_nhds', _⟩ := isCompact_iff_ultrafilter_le_nhds' /-- If a compact set belongs to a filter and this filter has a unique cluster point `y` in this set, then the filter is less than or equal to `𝓝 y`. -/ lemma IsCompact.le_nhds_of_unique_clusterPt (hs : IsCompact s) {l : Filter X} {y : X} (hmem : s ∈ l) (h : ∀ x ∈ s, ClusterPt x l → x = y) : l ≤ 𝓝 y := by refine le_iff_ultrafilter.2 fun f hf ↦ ?_ rcases hs.ultrafilter_le_nhds' f (hf hmem) with ⟨x, hxs, hx⟩ convert ← hx exact h x hxs (.mono (.of_le_nhds hx) hf) /-- If values of `f : Y → X` belong to a compact set `s` eventually along a filter `l` and `y` is a unique `MapClusterPt` for `f` along `l` in `s`, then `f` tends to `𝓝 y` along `l`. -/ lemma IsCompact.tendsto_nhds_of_unique_mapClusterPt {Y} {l : Filter Y} {y : X} {f : Y → X} (hs : IsCompact s) (hmem : ∀ᶠ x in l, f x ∈ s) (h : ∀ x ∈ s, MapClusterPt x l f → x = y) : Tendsto f l (𝓝 y) := hs.le_nhds_of_unique_clusterPt (mem_map.2 hmem) h /-- For every open directed cover of a compact set, there exists a single element of the cover which itself includes the set. -/ theorem IsCompact.elim_directed_cover {ι : Type v} [hι : Nonempty ι] (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) (hdU : Directed (· ⊆ ·) U) : ∃ i, s ⊆ U i := hι.elim fun i₀ => IsCompact.induction_on hs ⟨i₀, empty_subset _⟩ (fun _ _ hs ⟨i, hi⟩ => ⟨i, hs.trans hi⟩) (fun _ _ ⟨i, hi⟩ ⟨j, hj⟩ => let ⟨k, hki, hkj⟩ := hdU i j ⟨k, union_subset (Subset.trans hi hki) (Subset.trans hj hkj)⟩) fun _x hx => let ⟨i, hi⟩ := mem_iUnion.1 (hsU hx) ⟨U i, mem_nhdsWithin_of_mem_nhds (IsOpen.mem_nhds (hUo i) hi), i, Subset.refl _⟩ /-- For every open cover of a compact set, there exists a finite subcover. -/ theorem IsCompact.elim_finite_subcover {ι : Type v} (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := hs.elim_directed_cover _ (fun _ => isOpen_biUnion fun i _ => hUo i) (iUnion_eq_iUnion_finset U ▸ hsU) (directed_of_isDirected_le fun _ _ h => biUnion_subset_biUnion_left h) lemma IsCompact.elim_nhds_subcover_nhdsSet' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x hx, U x hx ∈ 𝓝 x) : ∃ t : Finset s, (⋃ x ∈ t, U x.1 x.2) ∈ 𝓝ˢ s := by rcases hs.elim_finite_subcover (fun x : s ↦ interior (U x x.2)) (fun _ ↦ isOpen_interior) fun x hx ↦ mem_iUnion.2 ⟨⟨x, hx⟩, mem_interior_iff_mem_nhds.2 <\| hU _ _⟩ with ⟨t, hst⟩ refine ⟨t, mem_nhdsSet_iff_forall.2 fun x hx ↦ ?_⟩ rcases mem_iUnion₂.1 (hst hx) with ⟨y, hyt, hy⟩ refine mem_of_superset ?_ (subset_biUnion_of_mem hyt) exact mem_interior_iff_mem_nhds.1 hy lemma IsCompact.elim_nhds_subcover_nhdsSet (hs : IsCompact s) {U : X → Set X} (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ (⋃ x ∈ t, U x) ∈ 𝓝ˢ s := by let ⟨t, ht⟩ := hs.elim_nhds_subcover_nhdsSet' (fun x _ => U x) hU classical exact ⟨t.image (↑), fun x hx => let ⟨y, _, hyx⟩ := Finset.mem_image.1 hx hyx ▸ y.2, by rwa [Finset.set_biUnion_finset_image]⟩ theorem IsCompact.elim_nhds_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x ‹x ∈ s› ∈ 𝓝 x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U (x : s) x.2 := (hs.elim_nhds_subcover_nhdsSet' U hU).imp fun _ ↦ subset_of_mem_nhdsSet	theorem IsCompact.elim_nhds_subcover (hs : IsCompact s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := (hs.elim_nhds_subcover_nhdsSet hU).imp fun _ h ↦ h.imp_right subset_of_mem_nhdsSet theorem IsCompact.elim_nhdsWithin_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x hx ∈ 𝓝[s] x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U x x.2 := by	Mathlib/Topology/Compactness/Compact.lean	200	206
/- Copyright (c) 2019 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Nat.Choose.Basic import Mathlib.Data.List.FinRange import Mathlib.Data.List.Perm.Basic import Mathlib.Data.List.Lex import Mathlib.Data.List.Induction /-! # sublists `List.Sublists` gives a list of all (not necessarily contiguous) sublists of a list. This file contains basic results on this function. -/ universe u v w variable {α : Type u} {β : Type v} {γ : Type w} open Nat namespace List /-! ### sublists -/ @[simp] theorem sublists'_nil : sublists' (@nil α) = [[]] := rfl @[simp] theorem sublists'_singleton (a : α) : sublists' [a] = [[], [a]] := rfl /-- Auxiliary helper definition for `sublists'` -/ def sublists'Aux (a : α) (r₁ r₂ : List (List α)) : List (List α) := r₁.foldl (init := r₂) fun r l => r ++ [a :: l] theorem sublists'Aux_eq_array_foldl (a : α) : ∀ (r₁ r₂ : List (List α)), sublists'Aux a r₁ r₂ = ((r₁.toArray).foldl (init := r₂.toArray) (fun r l => r.push (a :: l))).toList := by intro r₁ r₂ rw [sublists'Aux, Array.foldl_toList] have := List.foldl_hom Array.toList (g₁ := fun r l => r.push (a :: l)) (g₂ := fun r l => r ++ [a :: l]) (l := r₁) (init := r₂.toArray) (by simp) simpa using this theorem sublists'_eq_sublists'Aux (l : List α) : sublists' l = l.foldr (fun a r => sublists'Aux a r r) [[]] := by simp only [sublists', sublists'Aux_eq_array_foldl] rw [← List.foldr_hom Array.toList] · intros _ _; congr theorem sublists'Aux_eq_map (a : α) (r₁ : List (List α)) : ∀ (r₂ : List (List α)), sublists'Aux a r₁ r₂ = r₂ ++ map (cons a) r₁ := List.reverseRecOn r₁ (fun _ => by simp [sublists'Aux]) fun r₁ l ih r₂ => by rw [map_append, map_singleton, ← append_assoc, ← ih, sublists'Aux, foldl_append, foldl] simp [sublists'Aux] @[simp 900] theorem sublists'_cons (a : α) (l : List α) : sublists' (a :: l) = sublists' l ++ map (cons a) (sublists' l) := by simp [sublists'_eq_sublists'Aux, foldr_cons, sublists'Aux_eq_map] @[simp] theorem mem_sublists' {s t : List α} : s ∈ sublists' t ↔ s <+ t := by induction' t with a t IH generalizing s · simp only [sublists'_nil, mem_singleton] exact ⟨fun h => by rw [h], eq_nil_of_sublist_nil⟩ simp only [sublists'_cons, mem_append, IH, mem_map] constructor <;> intro h · rcases h with (h \| ⟨s, h, rfl⟩) · exact sublist_cons_of_sublist _ h · exact h.cons_cons _ · obtain - \| ⟨-, h⟩ \| ⟨-, h⟩ := h · exact Or.inl h · exact Or.inr ⟨_, h, rfl⟩ @[simp] theorem length_sublists' : ∀ l : List α, length (sublists' l) = 2 ^ length l \| [] => rfl \| a :: l => by simp +arith only [sublists'_cons, length_append, length_sublists' l, length_map, length, Nat.pow_succ'] @[simp] theorem sublists_nil : sublists (@nil α) = [[]] := rfl @[simp] theorem sublists_singleton (a : α) : sublists [a] = [[], [a]] := rfl /-- Auxiliary helper function for `sublists` -/ def sublistsAux (a : α) (r : List (List α)) : List (List α) := r.foldl (init := []) fun r l => r ++ [l, a :: l] theorem sublistsAux_eq_array_foldl : sublistsAux = fun (a : α) (r : List (List α)) => (r.toArray.foldl (init := #[]) fun r l => (r.push l).push (a :: l)).toList := by funext a r simp only [sublistsAux, Array.foldl_toList, Array.mkEmpty] have := foldl_hom Array.toList (g₁ := fun r l => (r.push l).push (a :: l)) (g₂ := fun r l => r ++ [l, a :: l]) (l := r) (init := #[]) (by simp) simpa using this theorem sublistsAux_eq_flatMap : sublistsAux = fun (a : α) (r : List (List α)) => r.flatMap fun l => [l, a :: l] := funext fun a => funext fun r => List.reverseRecOn r (by simp [sublistsAux]) (fun r l ih => by rw [flatMap_append, ← ih, flatMap_singleton, sublistsAux, foldl_append] simp [sublistsAux]) @[csimp] theorem sublists_eq_sublistsFast : @sublists = @sublistsFast := by ext α l : 2 trans l.foldr sublistsAux [[]] · rw [sublistsAux_eq_flatMap, sublists] · simp only [sublistsFast, sublistsAux_eq_array_foldl, Array.foldr_toList] rw [← foldr_hom Array.toList] · intros _ _; congr theorem sublists_append (l₁ l₂ : List α) : sublists (l₁ ++ l₂) = (sublists l₂) >>= (fun x => (sublists l₁).map (· ++ x)) := by simp only [sublists, foldr_append] induction l₁ with \| nil => simp \| cons a l₁ ih => rw [foldr_cons, ih] simp [List.flatMap, flatten_flatten, Function.comp_def] theorem sublists_cons (a : α) (l : List α) : sublists (a :: l) = sublists l >>= (fun x => [x, a :: x]) := show sublists ([a] ++ l) = _ by rw [sublists_append] simp only [sublists_singleton, map_cons, bind_eq_flatMap, nil_append, cons_append, map_nil] @[simp] theorem sublists_concat (l : List α) (a : α) : sublists (l ++ [a]) = sublists l ++ map (fun x => x ++ [a]) (sublists l) := by rw [sublists_append, sublists_singleton, bind_eq_flatMap, flatMap_cons, flatMap_cons, flatMap_nil, map_id'' append_nil, append_nil] theorem sublists_reverse (l : List α) : sublists (reverse l) = map reverse (sublists' l) := by induction' l with hd tl ih <;> [rfl; simp only [reverse_cons, sublists_append, sublists'_cons, map_append, ih, sublists_singleton, map_eq_map, bind_eq_flatMap, map_map, flatMap_cons, append_nil, flatMap_nil, Function.comp_def]] theorem sublists_eq_sublists' (l : List α) : sublists l = map reverse (sublists' (reverse l)) := by rw [← sublists_reverse, reverse_reverse] theorem sublists'_reverse (l : List α) : sublists' (reverse l) = map reverse (sublists l) := by simp only [sublists_eq_sublists', map_map, map_id'' reverse_reverse, Function.comp_def]	theorem sublists'_eq_sublists (l : List α) : sublists' l = map reverse (sublists (reverse l)) := by rw [← sublists'_reverse, reverse_reverse] @[simp] theorem mem_sublists {s t : List α} : s ∈ sublists t ↔ s <+ t := by rw [← reverse_sublist, ← mem_sublists', sublists'_reverse, mem_map_of_injective reverse_injective]	Mathlib/Data/List/Sublists.lean	159	166
/- 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.Lie.OfAssociative import Mathlib.LinearAlgebra.Eigenspace.Basic import Mathlib.LinearAlgebra.FreeModule.StrongRankCondition /-! # The Lie algebra `sl₂` and its representations The Lie algebra `sl₂` is the unique simple Lie algebra of minimal rank, 1, and as such occupies a distinguished position in the general theory. This file provides some basic definitions and results about `sl₂`. ## Main definitions: * `IsSl2Triple`: a structure representing a triple of elements in a Lie algebra which satisfy the standard relations for `sl₂`. * `IsSl2Triple.HasPrimitiveVectorWith`: a structure representing a primitive vector in a representation of a Lie algebra relative to a distinguished `sl₂` triple. * `IsSl2Triple.HasPrimitiveVectorWith.exists_nat`: the eigenvalue of a primitive vector must be a natural number if the representation is finite-dimensional. -/ variable (R L M : Type) [CommRing R] [LieRing L] [LieAlgebra R L] [AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M] open LieModule Set variable {L} in /-- An `sl₂` triple within a Lie ring `L` is a triple of elements `h`, `e`, `f` obeying relations which ensure that the Lie subalgebra they generate is equivalent to `sl₂`. -/ structure IsSl2Triple (h e f : L) : Prop where h_ne_zero : h ≠ 0 lie_e_f : ⁅e, f⁆ = h lie_h_e_nsmul : ⁅h, e⁆ = 2 • e lie_h_f_nsmul : ⁅h, f⁆ = - (2 • f) namespace IsSl2Triple variable {L M} variable {h e f : L} lemma symm (ht : IsSl2Triple h e f) : IsSl2Triple (-h) f e where h_ne_zero := by simpa using ht.h_ne_zero lie_e_f := by rw [← neg_eq_iff_eq_neg, lie_skew, ht.lie_e_f] lie_h_e_nsmul := by rw [neg_lie, neg_eq_iff_eq_neg, ht.lie_h_f_nsmul] lie_h_f_nsmul := by rw [neg_lie, neg_inj, ht.lie_h_e_nsmul] @[simp] lemma symm_iff : IsSl2Triple (-h) f e ↔ IsSl2Triple h e f := ⟨fun t ↦ neg_neg h ▸ t.symm, symm⟩ lemma lie_h_e_smul (t : IsSl2Triple h e f) : ⁅h, e⁆ = (2 : R) • e := by simp [t.lie_h_e_nsmul, two_smul] lemma lie_lie_smul_f (t : IsSl2Triple h e f) : ⁅h, f⁆ = -((2 : R) • f) := by simp [t.lie_h_f_nsmul, two_smul] lemma e_ne_zero (t : IsSl2Triple h e f) : e ≠ 0 := by have := t.h_ne_zero contrapose! this simpa [this] using t.lie_e_f.symm lemma f_ne_zero (t : IsSl2Triple h e f) : f ≠ 0 := by have := t.h_ne_zero contrapose! this simpa [this] using t.lie_e_f.symm variable {R} /-- Given a representation of a Lie algebra with distinguished `sl₂` triple, a vector is said to be primitive if it is a simultaneous eigenvector for the action of both `h`, `e`, and the eigenvalue for `e` is zero. -/ structure HasPrimitiveVectorWith (t : IsSl2Triple h e f) (m : M) (μ : R) : Prop where ne_zero : m ≠ 0 lie_h : ⁅h, m⁆ = μ • m lie_e : ⁅e, m⁆ = 0 /-- Given a representation of a Lie algebra with distinguished `sl₂` triple, a simultaneous eigenvector for the action of both `h` and `e` necessarily has eigenvalue zero for `e`. -/ lemma HasPrimitiveVectorWith.mk' [NoZeroSMulDivisors ℤ M] (t : IsSl2Triple h e f) (m : M) (μ ρ : R) (hm : m ≠ 0) (hm' : ⁅h, m⁆ = μ • m) (he : ⁅e, m⁆ = ρ • m) : HasPrimitiveVectorWith t m μ where ne_zero := hm lie_h := hm' lie_e := by suffices 2 • ⁅e, m⁆ = 0 by simpa using this rw [← nsmul_lie, ← t.lie_h_e_nsmul, lie_lie, hm', lie_smul, he, lie_smul, hm', smul_smul, smul_smul, mul_comm ρ μ, sub_self] namespace HasPrimitiveVectorWith variable {m : M} {μ : R} {t : IsSl2Triple h e f} local notation "ψ" n => ((toEnd R L M f) ^ n) m -- Although this is true by definition, we include this lemma (and the assumption) to mirror the API -- for `lie_h_pow_toEnd_f` and `lie_e_pow_succ_toEnd_f`. set_option linter.unusedVariables false in @[nolint unusedArguments] lemma lie_f_pow_toEnd_f (P : HasPrimitiveVectorWith t m μ) (n : ℕ) : ⁅f, ψ n⁆ = ψ (n + 1) := by simp [pow_succ'] variable (P : HasPrimitiveVectorWith t m μ) include P lemma lie_h_pow_toEnd_f (n : ℕ) : ⁅h, ψ n⁆ = (μ - 2 n) • ψ n := by induction n with \| zero => simpa using P.lie_h \| succ n ih => rw [pow_succ', Module.End.mul_apply, toEnd_apply_apply, Nat.cast_add, Nat.cast_one, leibniz_lie h, t.lie_lie_smul_f R, ← neg_smul, ih, lie_smul, smul_lie, ← add_smul] congr ring lemma lie_e_pow_succ_toEnd_f (n : ℕ) : ⁅e, ψ (n + 1)⁆ = ((n + 1) * (μ - n)) • ψ n := by induction n with \| zero => simp only [zero_add, pow_one, toEnd_apply_apply, Nat.cast_zero, sub_zero, one_mul, pow_zero, Module.End.one_apply, leibniz_lie e, t.lie_e_f, P.lie_e, P.lie_h, lie_zero, add_zero] \| succ n ih => rw [pow_succ', Module.End.mul_apply, toEnd_apply_apply, leibniz_lie e, t.lie_e_f, lie_h_pow_toEnd_f P, ih, lie_smul, lie_f_pow_toEnd_f P, ← add_smul, Nat.cast_add, Nat.cast_one] congr ring /-- The eigenvalue of a primitive vector must be a natural number if the representation is finite-dimensional. -/ lemma exists_nat [IsNoetherian R M] [NoZeroSMulDivisors R M] [IsDomain R] [CharZero R] : ∃ n : ℕ, μ = n := by suffices ∃ n : ℕ, (ψ n) = 0 by obtain ⟨n, hn₁, hn₂⟩ := Nat.exists_not_and_succ_of_not_zero_of_exists P.ne_zero this refine ⟨n, ?_⟩ have := lie_e_pow_succ_toEnd_f P n rw [hn₂, lie_zero, eq_comm, smul_eq_zero_iff_left hn₁, mul_eq_zero, sub_eq_zero] at this exact this.resolve_left <\| Nat.cast_add_one_ne_zero n have hs : (range <\| fun (n : ℕ) ↦ μ - 2 * n).Infinite := by rw [infinite_range_iff (fun n m ↦ by simp)]; infer_instance by_contra! contra exact hs ((toEnd R L M h).eigenvectors_linearIndependent {μ - 2 * n \| n : ℕ} (fun ⟨s, hs⟩ ↦ ψ Classical.choose hs) (fun ⟨r, hr⟩ ↦ by simp [lie_h_pow_toEnd_f P, Classical.choose_spec hr, contra, Module.End.hasEigenvector_iff, Module.End.mem_eigenspace_iff])).finite lemma pow_toEnd_f_ne_zero_of_eq_nat [CharZero R] [NoZeroSMulDivisors R M] {n : ℕ} (hn : μ = n) {i} (hi : i ≤ n) : (ψ i) ≠ 0 := by intro H induction i · exact P.ne_zero (by simpa using H) · next i IH => have : ((i + 1) * (n - i) : ℤ) • (toEnd R L M f ^ i) m = 0 := by have := congr_arg (⁅e, ·⁆) H simpa [← Int.cast_smul_eq_zsmul R, P.lie_e_pow_succ_toEnd_f, hn] using this	rw [← Int.cast_smul_eq_zsmul R, smul_eq_zero, Int.cast_eq_zero, mul_eq_zero, sub_eq_zero, Nat.cast_inj, ← @Nat.cast_one ℤ, ← Nat.cast_add, Nat.cast_eq_zero] at this simp only [add_eq_zero, one_ne_zero, and_false, false_or] at this exact (hi.trans_eq (this.resolve_right (IH (i.le_succ.trans hi)))).not_lt i.lt_succ_self lemma pow_toEnd_f_eq_zero_of_eq_nat [IsNoetherian R M] [NoZeroSMulDivisors R M] [IsDomain R] [CharZero R] {n : ℕ} (hn : μ = n) : (ψ (n + 1)) = 0 := by by_contra h have : t.HasPrimitiveVectorWith (ψ (n + 1)) (n - 2 * (n + 1) : R) := { ne_zero := h	Mathlib/Algebra/Lie/Sl2.lean	163	173
/- Copyright (c) 2019 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jan-David Salchow, Sébastien Gouëzel, Jean Lo, Yury Kudryashov, Frédéric Dupuis, Heather Macbeth -/ import Mathlib.Algebra.Module.Opposite import Mathlib.Topology.Algebra.Group.Quotient import Mathlib.Topology.Algebra.Ring.Basic import Mathlib.Topology.UniformSpace.UniformEmbedding import Mathlib.LinearAlgebra.Finsupp.LinearCombination import Mathlib.LinearAlgebra.Pi import Mathlib.LinearAlgebra.Quotient.Defs /-! # Theory of topological modules We use the class `ContinuousSMul` for topological (semi) modules and topological vector spaces. -/ assert_not_exists Star.star open LinearMap (ker range) open Topology Filter Pointwise universe u v w u' section variable {R : Type} {M : Type} [Ring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommGroup M] [Module R M] theorem ContinuousSMul.of_nhds_zero [IsTopologicalRing R] [IsTopologicalAddGroup M] (hmul : Tendsto (fun p : R × M => p.1 • p.2) (𝓝 0 ×ˢ 𝓝 0) (𝓝 0)) (hmulleft : ∀ m : M, Tendsto (fun a : R => a • m) (𝓝 0) (𝓝 0)) (hmulright : ∀ a : R, Tendsto (fun m : M => a • m) (𝓝 0) (𝓝 0)) : ContinuousSMul R M where continuous_smul := by rw [← nhds_prod_eq] at hmul refine continuous_of_continuousAt_zero₂ (AddMonoidHom.smul : R →+ M →+ M) ?_ ?_ ?_ <;> simpa [ContinuousAt] variable (R M) in omit [TopologicalSpace R] in /-- A topological module over a ring has continuous negation. This cannot be an instance, because it would cause search for `[Module ?R M]` with unknown `R`. -/ theorem ContinuousNeg.of_continuousConstSMul [ContinuousConstSMul R M] : ContinuousNeg M where continuous_neg := by simpa using continuous_const_smul (T := M) (-1 : R) end section variable {R : Type} {M : Type} [Ring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommGroup M] [ContinuousAdd M] [Module R M] [ContinuousSMul R M] /-- If `M` is a topological module over `R` and `0` is a limit of invertible elements of `R`, then `⊤` is the only submodule of `M` with a nonempty interior. This is the case, e.g., if `R` is a nontrivially normed field. -/ theorem Submodule.eq_top_of_nonempty_interior' [NeBot (𝓝[{ x : R \| IsUnit x }] 0)] (s : Submodule R M) (hs : (interior (s : Set M)).Nonempty) : s = ⊤ := by rcases hs with ⟨y, hy⟩ refine Submodule.eq_top_iff'.2 fun x => ?_ rw [mem_interior_iff_mem_nhds] at hy have : Tendsto (fun c : R => y + c • x) (𝓝[{ x : R \| IsUnit x }] 0) (𝓝 (y + (0 : R) • x)) := tendsto_const_nhds.add ((tendsto_nhdsWithin_of_tendsto_nhds tendsto_id).smul tendsto_const_nhds) rw [zero_smul, add_zero] at this obtain ⟨_, hu : y + _ • _ ∈ s, u, rfl⟩ := nonempty_of_mem (inter_mem (Filter.mem_map.1 (this hy)) self_mem_nhdsWithin) have hy' : y ∈ ↑s := mem_of_mem_nhds hy rwa [s.add_mem_iff_right hy', ← Units.smul_def, s.smul_mem_iff' u] at hu variable (R M) /-- Let `R` be a topological ring such that zero is not an isolated point (e.g., a nontrivially normed field, see `NormedField.punctured_nhds_neBot`). Let `M` be a nontrivial module over `R` such that `c • x = 0` implies `c = 0 ∨ x = 0`. Then `M` has no isolated points. We formulate this using `NeBot (𝓝[≠] x)`. This lemma is not an instance because Lean would need to find `[ContinuousSMul ?m_1 M]` with unknown `?m_1`. We register this as an instance for `R = ℝ` in `Real.punctured_nhds_module_neBot`. One can also use `haveI := Module.punctured_nhds_neBot R M` in a proof. -/ theorem Module.punctured_nhds_neBot [Nontrivial M] [NeBot (𝓝[≠] (0 : R))] [NoZeroSMulDivisors R M] (x : M) : NeBot (𝓝[≠] x) := by rcases exists_ne (0 : M) with ⟨y, hy⟩ suffices Tendsto (fun c : R => x + c • y) (𝓝[≠] 0) (𝓝[≠] x) from this.neBot refine Tendsto.inf ?_ (tendsto_principal_principal.2 <\| ?_) · convert tendsto_const_nhds.add ((@tendsto_id R _).smul_const y) rw [zero_smul, add_zero] · intro c hc simpa [hy] using hc end section LatticeOps variable {R M₁ M₂ : Type} [SMul R M₁] [SMul R M₂] [u : TopologicalSpace R] {t : TopologicalSpace M₂} [ContinuousSMul R M₂] {F : Type} [FunLike F M₁ M₂] [MulActionHomClass F R M₁ M₂] (f : F) theorem continuousSMul_induced : @ContinuousSMul R M₁ _ u (t.induced f) := let _ : TopologicalSpace M₁ := t.induced f IsInducing.continuousSMul ⟨rfl⟩ continuous_id (map_smul f _ _) end LatticeOps /-- The span of a separable subset with respect to a separable scalar ring is again separable. -/ lemma TopologicalSpace.IsSeparable.span {R M : Type} [AddCommMonoid M] [Semiring R] [Module R M] [TopologicalSpace M] [TopologicalSpace R] [SeparableSpace R] [ContinuousAdd M] [ContinuousSMul R M] {s : Set M} (hs : IsSeparable s) : IsSeparable (Submodule.span R s : Set M) := by rw [Submodule.span_eq_iUnion_nat] refine .iUnion fun n ↦ .image ?_ ?_ · have : IsSeparable {f : Fin n → R × M \| ∀ (i : Fin n), f i ∈ Set.univ ×ˢ s} := by apply isSeparable_pi (fun i ↦ .prod (.of_separableSpace Set.univ) hs) rwa [Set.univ_prod] at this · apply continuous_finset_sum _ (fun i _ ↦ ?_) exact (continuous_fst.comp (continuous_apply i)).smul (continuous_snd.comp (continuous_apply i)) namespace Submodule instance topologicalAddGroup {R M : Type} [Ring R] [AddCommGroup M] [Module R M] [TopologicalSpace M] [IsTopologicalAddGroup M] (S : Submodule R M) : IsTopologicalAddGroup S := inferInstanceAs (IsTopologicalAddGroup S.toAddSubgroup) end Submodule section closure variable {R : Type u} {M : Type v} [Semiring R] [TopologicalSpace M] [AddCommMonoid M] [Module R M] [ContinuousConstSMul R M] theorem Submodule.mapsTo_smul_closure (s : Submodule R M) (c : R) : Set.MapsTo (c • ·) (closure s : Set M) (closure s) := have : Set.MapsTo (c • ·) (s : Set M) s := fun _ h ↦ s.smul_mem c h this.closure (continuous_const_smul c) theorem Submodule.smul_closure_subset (s : Submodule R M) (c : R) : c • closure (s : Set M) ⊆ closure (s : Set M) := (s.mapsTo_smul_closure c).image_subset variable [ContinuousAdd M] /-- The (topological-space) closure of a submodule of a topological `R`-module `M` is itself a submodule. -/ def Submodule.topologicalClosure (s : Submodule R M) : Submodule R M := { s.toAddSubmonoid.topologicalClosure with smul_mem' := s.mapsTo_smul_closure } @[simp, norm_cast] theorem Submodule.topologicalClosure_coe (s : Submodule R M) : (s.topologicalClosure : Set M) = closure (s : Set M) := rfl theorem Submodule.le_topologicalClosure (s : Submodule R M) : s ≤ s.topologicalClosure := subset_closure theorem Submodule.closure_subset_topologicalClosure_span (s : Set M) : closure s ⊆ (span R s).topologicalClosure := by rw [Submodule.topologicalClosure_coe] exact closure_mono subset_span theorem Submodule.isClosed_topologicalClosure (s : Submodule R M) : IsClosed (s.topologicalClosure : Set M) := isClosed_closure theorem Submodule.topologicalClosure_minimal (s : Submodule R M) {t : Submodule R M} (h : s ≤ t) (ht : IsClosed (t : Set M)) : s.topologicalClosure ≤ t := closure_minimal h ht theorem Submodule.topologicalClosure_mono {s : Submodule R M} {t : Submodule R M} (h : s ≤ t) : s.topologicalClosure ≤ t.topologicalClosure := closure_mono h /-- The topological closure of a closed submodule `s` is equal to `s`. -/ theorem IsClosed.submodule_topologicalClosure_eq {s : Submodule R M} (hs : IsClosed (s : Set M)) : s.topologicalClosure = s := SetLike.ext' hs.closure_eq /-- A subspace is dense iff its topological closure is the entire space. -/ theorem Submodule.dense_iff_topologicalClosure_eq_top {s : Submodule R M} : Dense (s : Set M) ↔ s.topologicalClosure = ⊤ := by rw [← SetLike.coe_set_eq, dense_iff_closure_eq] simp instance Submodule.topologicalClosure.completeSpace {M' : Type} [AddCommMonoid M'] [Module R M'] [UniformSpace M'] [ContinuousAdd M'] [ContinuousConstSMul R M'] [CompleteSpace M'] (U : Submodule R M') : CompleteSpace U.topologicalClosure := isClosed_closure.completeSpace_coe /-- A maximal proper subspace of a topological module (i.e a `Submodule` satisfying `IsCoatom`) is either closed or dense. -/ theorem Submodule.isClosed_or_dense_of_isCoatom (s : Submodule R M) (hs : IsCoatom s) : IsClosed (s : Set M) ∨ Dense (s : Set M) := by refine (hs.le_iff.mp s.le_topologicalClosure).symm.imp ?_ dense_iff_topologicalClosure_eq_top.mpr exact fun h ↦ h ▸ isClosed_closure end closure namespace Submodule variable {ι R : Type} {M : ι → Type} [Semiring R] [∀ i, AddCommMonoid (M i)] [∀ i, Module R (M i)] [∀ i, TopologicalSpace (M i)] [DecidableEq ι] /-- If `s i` is a family of submodules, each is in its module, then the closure of their span in the indexed product of the modules is the product of their closures. In case of a finite index type, this statement immediately follows from `Submodule.iSup_map_single`. However, the statement is true for an infinite index type as well. -/ theorem closure_coe_iSup_map_single (s : ∀ i, Submodule R (M i)) : closure (↑(⨆ i, (s i).map (LinearMap.single R M i)) : Set (∀ i, M i)) = Set.univ.pi fun i ↦ closure (s i) := by rw [← closure_pi_set] refine (closure_mono ?_).antisymm <\| closure_minimal ?_ isClosed_closure · exact SetLike.coe_mono <\| iSup_map_single_le · simp only [Set.subset_def, mem_closure_iff] intro x hx U hU hxU rcases isOpen_pi_iff.mp hU x hxU with ⟨t, V, hV, hVU⟩ refine ⟨∑ i ∈ t, Pi.single i (x i), hVU ?_, ?_⟩ · simp_all [Finset.sum_pi_single] · exact sum_mem fun i hi ↦ mem_iSup_of_mem i <\| mem_map_of_mem <\| hx _ <\| Set.mem_univ _ /-- If `s i` is a family of submodules, each is in its module, then the closure of their span in the indexed product of the modules is the product of their closures. In case of a finite index type, this statement immediately follows from `Submodule.iSup_map_single`. However, the statement is true for an infinite index type as well. This version is stated in terms of `Submodule.topologicalClosure`, thus assumes that `M i`s are topological modules over `R`. However, the statement is true without assuming continuity of the operations, see `Submodule.closure_coe_iSup_map_single` above. -/ theorem topologicalClosure_iSup_map_single [∀ i, ContinuousAdd (M i)] [∀ i, ContinuousConstSMul R (M i)] (s : ∀ i, Submodule R (M i)) : topologicalClosure (⨆ i, (s i).map (LinearMap.single R M i)) = pi Set.univ fun i ↦ (s i).topologicalClosure := SetLike.coe_injective <\| closure_coe_iSup_map_single _ end Submodule section Pi theorem LinearMap.continuous_on_pi {ι : Type} {R : Type} {M : Type} [Finite ι] [Semiring R] [TopologicalSpace R] [AddCommMonoid M] [Module R M] [TopologicalSpace M] [ContinuousAdd M] [ContinuousSMul R M] (f : (ι → R) →ₗ[R] M) : Continuous f := by cases nonempty_fintype ι classical -- for the proof, write `f` in the standard basis, and use that each coordinate is a continuous -- function. have : (f : (ι → R) → M) = fun x => ∑ i : ι, x i • f fun j => if i = j then 1 else 0 := by ext x exact f.pi_apply_eq_sum_univ x rw [this] refine continuous_finset_sum _ fun i _ => ?_ exact (continuous_apply i).smul continuous_const end Pi section PointwiseLimits variable {M₁ M₂ α R S : Type} [TopologicalSpace M₂] [T2Space M₂] [Semiring R] [Semiring S] [AddCommMonoid M₁] [AddCommMonoid M₂] [Module R M₁] [Module S M₂] [ContinuousConstSMul S M₂] variable [ContinuousAdd M₂] {σ : R →+ S} {l : Filter α} /-- Constructs a bundled linear map from a function and a proof that this function belongs to the closure of the set of linear maps. -/ @[simps -fullyApplied] def linearMapOfMemClosureRangeCoe (f : M₁ → M₂) (hf : f ∈ closure (Set.range ((↑) : (M₁ →ₛₗ[σ] M₂) → M₁ → M₂))) : M₁ →ₛₗ[σ] M₂ := { addMonoidHomOfMemClosureRangeCoe f hf with map_smul' := (isClosed_setOf_map_smul M₁ M₂ σ).closure_subset_iff.2 (Set.range_subset_iff.2 LinearMap.map_smulₛₗ) hf } /-- Construct a bundled linear map from a pointwise limit of linear maps -/ @[simps! -fullyApplied] def linearMapOfTendsto (f : M₁ → M₂) (g : α → M₁ →ₛₗ[σ] M₂) [l.NeBot] (h : Tendsto (fun a x => g a x) l (𝓝 f)) : M₁ →ₛₗ[σ] M₂ := linearMapOfMemClosureRangeCoe f <\| mem_closure_of_tendsto h <\| Eventually.of_forall fun _ => Set.mem_range_self _ variable (M₁ M₂ σ) theorem LinearMap.isClosed_range_coe : IsClosed (Set.range ((↑) : (M₁ →ₛₗ[σ] M₂) → M₁ → M₂)) := isClosed_of_closure_subset fun f hf => ⟨linearMapOfMemClosureRangeCoe f hf, rfl⟩ end PointwiseLimits section Quotient namespace Submodule variable {R M : Type*} [Ring R] [AddCommGroup M] [Module R M] [TopologicalSpace M] (S : Submodule R M) instance _root_.QuotientModule.Quotient.topologicalSpace : TopologicalSpace (M ⧸ S) := inferInstanceAs (TopologicalSpace (Quotient S.quotientRel)) theorem isOpenMap_mkQ [ContinuousAdd M] : IsOpenMap S.mkQ := QuotientAddGroup.isOpenMap_coe theorem isOpenQuotientMap_mkQ [ContinuousAdd M] : IsOpenQuotientMap S.mkQ := QuotientAddGroup.isOpenQuotientMap_mk instance topologicalAddGroup_quotient [IsTopologicalAddGroup M] : IsTopologicalAddGroup (M ⧸ S) := inferInstanceAs <\| IsTopologicalAddGroup (M ⧸ S.toAddSubgroup) instance continuousSMul_quotient [TopologicalSpace R] [IsTopologicalAddGroup M] [ContinuousSMul R M] : ContinuousSMul R (M ⧸ S) where continuous_smul := by rw [← (IsOpenQuotientMap.id.prodMap S.isOpenQuotientMap_mkQ).continuous_comp_iff] exact continuous_quot_mk.comp continuous_smul instance t3_quotient_of_isClosed [IsTopologicalAddGroup M] [IsClosed (S : Set M)] : T3Space (M ⧸ S) := letI : IsClosed (S.toAddSubgroup : Set M) := ‹_› QuotientAddGroup.instT3Space S.toAddSubgroup end Submodule end Quotient		Mathlib/Topology/Algebra/Module/Basic.lean	1,491	1,494
/- Copyright (c) 2023 Jason Yuen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jason Yuen -/ import Mathlib.Data.Real.ConjExponents import Mathlib.Data.Real.Irrational /-! # Rayleigh's theorem on Beatty sequences This file proves Rayleigh's theorem on Beatty sequences. We start by proving `compl_beattySeq`, which is a generalization of Rayleigh's theorem, and eventually prove `Irrational.beattySeq_symmDiff_beattySeq_pos`, which is Rayleigh's theorem. ## Main definitions * `beattySeq`: In the Beatty sequence for real number `r`, the `k`th term is `⌊k * r⌋`. * `beattySeq'`: In this variant of the Beatty sequence for `r`, the `k`th term is `⌈k * r⌉ - 1`. ## Main statements Define the following Beatty sets, where `r` denotes a real number: * `B_r := {⌊k * r⌋ \| k ∈ ℤ}` * `B'_r := {⌈k * r⌉ - 1 \| k ∈ ℤ}` * `B⁺_r := {⌊r⌋, ⌊2r⌋, ⌊3r⌋, ...}` * `B⁺'_r := {⌈r⌉-1, ⌈2r⌉-1, ⌈3r⌉-1, ...}` The main statements are: * `compl_beattySeq`: Let `r` be a real number greater than 1, and `1/r + 1/s = 1`. Then the complement of `B_r` is `B'_s`. * `beattySeq_symmDiff_beattySeq'_pos`: Let `r` be a real number greater than 1, and `1/r + 1/s = 1`. Then `B⁺_r` and `B⁺'_s` partition the positive integers. * `Irrational.beattySeq_symmDiff_beattySeq_pos`: Let `r` be an irrational number greater than 1, and `1/r + 1/s = 1`. Then `B⁺_r` and `B⁺_s` partition the positive integers. ## References * [Wikipedia, Beatty sequence](https://en.wikipedia.org/wiki/Beatty_sequence) ## Tags beatty, sequence, rayleigh, irrational, floor, positive -/ /-- In the Beatty sequence for real number `r`, the `k`th term is `⌊k * r⌋`. -/ noncomputable def beattySeq (r : ℝ) : ℤ → ℤ := fun k ↦ ⌊k * r⌋ /-- In this variant of the Beatty sequence for `r`, the `k`th term is `⌈k * r⌉ - 1`. -/ noncomputable def beattySeq' (r : ℝ) : ℤ → ℤ := fun k ↦ ⌈k * r⌉ - 1 namespace Beatty variable {r s : ℝ} {j : ℤ} /-- Let `r > 1` and `1/r + 1/s = 1`. Then `B_r` and `B'_s` are disjoint (i.e. no collision exists). -/ private theorem no_collision (hrs : r.HolderConjugate s) : Disjoint {beattySeq r k \| k} {beattySeq' s k \| k} := by rw [Set.disjoint_left] intro j ⟨k, h₁⟩ ⟨m, h₂⟩ rw [beattySeq, Int.floor_eq_iff, ← div_le_iff₀ hrs.pos, ← lt_div_iff₀ hrs.pos] at h₁ rw [beattySeq', sub_eq_iff_eq_add, Int.ceil_eq_iff, Int.cast_add, Int.cast_one, add_sub_cancel_right, ← div_lt_iff₀ hrs.symm.pos, ← le_div_iff₀ hrs.symm.pos] at h₂ have h₃ := add_lt_add_of_le_of_lt h₁.1 h₂.1 have h₄ := add_lt_add_of_lt_of_le h₁.2 h₂.2 simp_rw [div_eq_inv_mul, ← right_distrib, hrs.inv_add_inv_eq_one, one_mul] at h₃ h₄ rw [← Int.cast_one] at h₄ simp_rw [← Int.cast_add, Int.cast_lt, Int.lt_add_one_iff] at h₃ h₄ exact h₄.not_lt h₃ /-- Let `r > 1` and `1/r + 1/s = 1`. Suppose there is an integer `j` where `B_r` and `B'_s` both	jump over `j` (i.e. an anti-collision). Then this leads to a contradiction. -/ private theorem no_anticollision (hrs : r.HolderConjugate s) : ¬∃ j k m : ℤ, k < j / r ∧ (j + 1) / r ≤ k + 1 ∧ m ≤ j / s ∧ (j + 1) / s < m + 1 := by intro ⟨j, k, m, h₁₁, h₁₂, h₂₁, h₂₂⟩ have h₃ := add_lt_add_of_lt_of_le h₁₁ h₂₁ have h₄ := add_lt_add_of_le_of_lt h₁₂ h₂₂ simp_rw [div_eq_inv_mul, ← right_distrib, hrs.inv_add_inv_eq_one, one_mul] at h₃ h₄ rw [← Int.cast_one, ← add_assoc, add_lt_add_iff_right, add_right_comm] at h₄ simp_rw [← Int.cast_add, Int.cast_lt, Int.lt_add_one_iff] at h₃ h₄	Mathlib/NumberTheory/Rayleigh.lean	77	85
/- Copyright (c) 2022 David Loeffler. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Loeffler, Yaël Dillies, Bhavik Mehta -/ import Mathlib.Analysis.Convex.SpecificFunctions.Deriv import Mathlib.Analysis.SpecialFunctions.Trigonometric.ArctanDeriv /-! # Polynomial bounds for trigonometric functions ## Main statements This file contains upper and lower bounds for real trigonometric functions in terms of polynomials. See `Trigonometric.Basic` for more elementary inequalities, establishing the ranges of these functions, and their monotonicity in suitable intervals. Here we prove the following: * `sin_lt`: for `x > 0` we have `sin x < x`. * `sin_gt_sub_cube`: For `0 < x ≤ 1` we have `x - x ^ 3 / 4 < sin x`. * `lt_tan`: for `0 < x < π/2` we have `x < tan x`. * `cos_le_one_div_sqrt_sq_add_one` and `cos_lt_one_div_sqrt_sq_add_one`: for `-3 * π / 2 ≤ x ≤ 3 * π / 2`, we have `cos x ≤ 1 / sqrt (x ^ 2 + 1)`, with strict inequality if `x ≠ 0`. (This bound is not quite optimal, but not far off) ## Tags sin, cos, tan, angle -/ open Set namespace Real variable {x : ℝ} /-- For 0 < x, we have sin x < x. -/ theorem sin_lt (h : 0 < x) : sin x < x := by rcases lt_or_le 1 x with h' \| h' · exact (sin_le_one x).trans_lt h' have hx : \|x\| = x := abs_of_nonneg h.le have := le_of_abs_le (sin_bound <\| show \|x\| ≤ 1 by rwa [hx]) rw [sub_le_iff_le_add', hx] at this apply this.trans_lt rw [sub_add, sub_lt_self_iff, sub_pos, div_eq_mul_inv (x ^ 3)] refine mul_lt_mul' ?_ (by norm_num) (by norm_num) (pow_pos h 3) apply pow_le_pow_of_le_one h.le h' norm_num lemma sin_le (hx : 0 ≤ x) : sin x ≤ x := by obtain rfl \| hx := hx.eq_or_lt · simp · exact (sin_lt hx).le lemma lt_sin (hx : x < 0) : x < sin x := by simpa using sin_lt <\| neg_pos.2 hx lemma le_sin (hx : x ≤ 0) : x ≤ sin x := by simpa using sin_le <\| neg_nonneg.2 hx theorem lt_sin_mul {x : ℝ} (hx : 0 < x) (hx' : x < 1) : x < sin (π / 2 * x) := by simpa [mul_comm x] using	strictConcaveOn_sin_Icc.2 ⟨le_rfl, pi_pos.le⟩ ⟨pi_div_two_pos.le, half_le_self pi_pos.le⟩ pi_div_two_pos.ne (sub_pos.2 hx') hx theorem le_sin_mul {x : ℝ} (hx : 0 ≤ x) (hx' : x ≤ 1) : x ≤ sin (π / 2 * x) := by simpa [mul_comm x] using strictConcaveOn_sin_Icc.concaveOn.2 ⟨le_rfl, pi_pos.le⟩ ⟨pi_div_two_pos.le, half_le_self pi_pos.le⟩ (sub_nonneg.2 hx') hx theorem mul_lt_sin {x : ℝ} (hx : 0 < x) (hx' : x < π / 2) : 2 / π * x < sin x := by rw [← inv_div]	Mathlib/Analysis/SpecialFunctions/Trigonometric/Bounds.lean	60	69
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Jeremy Avigad, Simon Hudon -/ import Mathlib.Algebra.Notation.Defs import Mathlib.Data.Set.Subsingleton import Mathlib.Logic.Equiv.Defs /-! # Partial values of a type This file defines `Part α`, the partial values of a type. `o : Part α` carries a proposition `o.Dom`, its domain, along with a function `get : o.Dom → α`, its value. The rule is then that every partial value has a value but, to access it, you need to provide a proof of the domain. `Part α` behaves the same as `Option α` except that `o : Option α` is decidably `none` or `some a` for some `a : α`, while the domain of `o : Part α` doesn't have to be decidable. That means you can translate back and forth between a partial value with a decidable domain and an option, and `Option α` and `Part α` are classically equivalent. In general, `Part α` is bigger than `Option α`. In current mathlib, `Part ℕ`, aka `PartENat`, is used to move decidability of the order to decidability of `PartENat.find` (which is the smallest natural satisfying a predicate, or `∞` if there's none). ## Main declarations `Option`-like declarations: * `Part.none`: The partial value whose domain is `False`. * `Part.some a`: The partial value whose domain is `True` and whose value is `a`. * `Part.ofOption`: Converts an `Option α` to a `Part α` by sending `none` to `none` and `some a` to `some a`. * `Part.toOption`: Converts a `Part α` with a decidable domain to an `Option α`. * `Part.equivOption`: Classical equivalence between `Part α` and `Option α`. Monadic structure: * `Part.bind`: `o.bind f` has value `(f (o.get _)).get _` (`f o` morally) and is defined when `o` and `f (o.get _)` are defined. * `Part.map`: Maps the value and keeps the same domain. Other: * `Part.restrict`: `Part.restrict p o` replaces the domain of `o : Part α` by `p : Prop` so long as `p → o.Dom`. * `Part.assert`: `assert p f` appends `p` to the domains of the values of a partial function. * `Part.unwrap`: Gets the value of a partial value regardless of its domain. Unsound. ## Notation For `a : α`, `o : Part α`, `a ∈ o` means that `o` is defined and equal to `a`. Formally, it means `o.Dom` and `o.get _ = a`. -/ assert_not_exists RelIso open Function /-- `Part α` is the type of "partial values" of type `α`. It is similar to `Option α` except the domain condition can be an arbitrary proposition, not necessarily decidable. -/ structure Part.{u} (α : Type u) : Type u where /-- The domain of a partial value -/ Dom : Prop /-- Extract a value from a partial value given a proof of `Dom` -/ get : Dom → α namespace Part variable {α : Type} {β : Type} {γ : Type} /-- Convert a `Part α` with a decidable domain to an option -/ def toOption (o : Part α) [Decidable o.Dom] : Option α := if h : Dom o then some (o.get h) else none @[simp] lemma toOption_isSome (o : Part α) [Decidable o.Dom] : o.toOption.isSome ↔ o.Dom := by by_cases h : o.Dom <;> simp [h, toOption] @[simp] lemma toOption_eq_none (o : Part α) [Decidable o.Dom] : o.toOption = none ↔ ¬o.Dom := by by_cases h : o.Dom <;> simp [h, toOption] /-- `Part` extensionality -/ theorem ext' : ∀ {o p : Part α}, (o.Dom ↔ p.Dom) → (∀ h₁ h₂, o.get h₁ = p.get h₂) → o = p \| ⟨od, o⟩, ⟨pd, p⟩, H1, H2 => by have t : od = pd := propext H1 cases t; rw [show o = p from funext fun p => H2 p p] /-- `Part` eta expansion -/ @[simp] theorem eta : ∀ o : Part α, (⟨o.Dom, fun h => o.get h⟩ : Part α) = o \| ⟨_, _⟩ => rfl /-- `a ∈ o` means that `o` is defined and equal to `a` -/ protected def Mem (o : Part α) (a : α) : Prop := ∃ h, o.get h = a instance : Membership α (Part α) := ⟨Part.Mem⟩ theorem mem_eq (a : α) (o : Part α) : (a ∈ o) = ∃ h, o.get h = a := rfl theorem dom_iff_mem : ∀ {o : Part α}, o.Dom ↔ ∃ y, y ∈ o \| ⟨_, f⟩ => ⟨fun h => ⟨f h, h, rfl⟩, fun ⟨_, h, rfl⟩ => h⟩ theorem get_mem {o : Part α} (h) : get o h ∈ o := ⟨_, rfl⟩ @[simp] theorem mem_mk_iff {p : Prop} {o : p → α} {a : α} : a ∈ Part.mk p o ↔ ∃ h, o h = a := Iff.rfl /-- `Part` extensionality -/ @[ext] theorem ext {o p : Part α} (H : ∀ a, a ∈ o ↔ a ∈ p) : o = p := (ext' ⟨fun h => ((H _).1 ⟨h, rfl⟩).fst, fun h => ((H _).2 ⟨h, rfl⟩).fst⟩) fun _ _ => ((H _).2 ⟨_, rfl⟩).snd /-- The `none` value in `Part` has a `False` domain and an empty function. -/ def none : Part α := ⟨False, False.rec⟩ instance : Inhabited (Part α) := ⟨none⟩ @[simp] theorem not_mem_none (a : α) : a ∉ @none α := fun h => h.fst /-- The `some a` value in `Part` has a `True` domain and the function returns `a`. -/ def some (a : α) : Part α := ⟨True, fun _ => a⟩ @[simp] theorem some_dom (a : α) : (some a).Dom := trivial theorem mem_unique : ∀ {a b : α} {o : Part α}, a ∈ o → b ∈ o → a = b \| _, _, ⟨_, _⟩, ⟨_, rfl⟩, ⟨_, rfl⟩ => rfl theorem mem_right_unique : ∀ {a : α} {o p : Part α}, a ∈ o → a ∈ p → o = p \| _, _, _, ⟨ho, _⟩, ⟨hp, _⟩ => ext' (iff_of_true ho hp) (by simp []) theorem Mem.left_unique : Relator.LeftUnique ((· ∈ ·) : α → Part α → Prop) := fun _ _ _ => mem_unique theorem Mem.right_unique : Relator.RightUnique ((· ∈ ·) : α → Part α → Prop) := fun _ _ _ => mem_right_unique theorem get_eq_of_mem {o : Part α} {a} (h : a ∈ o) (h') : get o h' = a := mem_unique ⟨_, rfl⟩ h protected theorem subsingleton (o : Part α) : Set.Subsingleton { a \| a ∈ o } := fun _ ha _ hb => mem_unique ha hb @[simp] theorem get_some {a : α} (ha : (some a).Dom) : get (some a) ha = a := rfl theorem mem_some (a : α) : a ∈ some a := ⟨trivial, rfl⟩ @[simp] theorem mem_some_iff {a b} : b ∈ (some a : Part α) ↔ b = a := ⟨fun ⟨_, e⟩ => e.symm, fun e => ⟨trivial, e.symm⟩⟩ theorem eq_some_iff {a : α} {o : Part α} : o = some a ↔ a ∈ o := ⟨fun e => e.symm ▸ mem_some _, fun ⟨h, e⟩ => e ▸ ext' (iff_true_intro h) fun _ _ => rfl⟩ theorem eq_none_iff {o : Part α} : o = none ↔ ∀ a, a ∉ o := ⟨fun e => e.symm ▸ not_mem_none, fun h => ext (by simpa)⟩ theorem eq_none_iff' {o : Part α} : o = none ↔ ¬o.Dom := ⟨fun e => e.symm ▸ id, fun h => eq_none_iff.2 fun _ h' => h h'.fst⟩ @[simp] theorem not_none_dom : ¬(none : Part α).Dom := id @[simp] theorem some_ne_none (x : α) : some x ≠ none := by intro h exact true_ne_false (congr_arg Dom h) @[simp] theorem none_ne_some (x : α) : none ≠ some x := (some_ne_none x).symm theorem ne_none_iff {o : Part α} : o ≠ none ↔ ∃ x, o = some x := by constructor · rw [Ne, eq_none_iff', not_not] exact fun h => ⟨o.get h, eq_some_iff.2 (get_mem h)⟩ · rintro ⟨x, rfl⟩ apply some_ne_none theorem eq_none_or_eq_some (o : Part α) : o = none ∨ ∃ x, o = some x := or_iff_not_imp_left.2 ne_none_iff.1 theorem some_injective : Injective (@Part.some α) := fun _ _ h => congr_fun (eq_of_heq (Part.mk.inj h).2) trivial @[simp] theorem some_inj {a b : α} : Part.some a = some b ↔ a = b := some_injective.eq_iff @[simp] theorem some_get {a : Part α} (ha : a.Dom) : Part.some (Part.get a ha) = a := Eq.symm (eq_some_iff.2 ⟨ha, rfl⟩) theorem get_eq_iff_eq_some {a : Part α} {ha : a.Dom} {b : α} : a.get ha = b ↔ a = some b := ⟨fun h => by simp [h.symm], fun h => by simp [h]⟩ theorem get_eq_get_of_eq (a : Part α) (ha : a.Dom) {b : Part α} (h : a = b) : a.get ha = b.get (h ▸ ha) := by congr theorem get_eq_iff_mem {o : Part α} {a : α} (h : o.Dom) : o.get h = a ↔ a ∈ o := ⟨fun H => ⟨h, H⟩, fun ⟨_, H⟩ => H⟩ theorem eq_get_iff_mem {o : Part α} {a : α} (h : o.Dom) : a = o.get h ↔ a ∈ o := eq_comm.trans (get_eq_iff_mem h) @[simp] theorem none_toOption [Decidable (@none α).Dom] : (none : Part α).toOption = Option.none := dif_neg id @[simp] theorem some_toOption (a : α) [Decidable (some a).Dom] : (some a).toOption = Option.some a := dif_pos trivial instance noneDecidable : Decidable (@none α).Dom := instDecidableFalse instance someDecidable (a : α) : Decidable (some a).Dom := instDecidableTrue /-- Retrieves the value of `a : Part α` if it exists, and return the provided default value otherwise. -/ def getOrElse (a : Part α) [Decidable a.Dom] (d : α) := if ha : a.Dom then a.get ha else d theorem getOrElse_of_dom (a : Part α) (h : a.Dom) [Decidable a.Dom] (d : α) : getOrElse a d = a.get h := dif_pos h theorem getOrElse_of_not_dom (a : Part α) (h : ¬a.Dom) [Decidable a.Dom] (d : α) : getOrElse a d = d := dif_neg h @[simp] theorem getOrElse_none (d : α) [Decidable (none : Part α).Dom] : getOrElse none d = d := none.getOrElse_of_not_dom not_none_dom d @[simp] theorem getOrElse_some (a : α) (d : α) [Decidable (some a).Dom] : getOrElse (some a) d = a := (some a).getOrElse_of_dom (some_dom a) d -- `simp`-normal form is `toOption_eq_some_iff`. theorem mem_toOption {o : Part α} [Decidable o.Dom] {a : α} : a ∈ toOption o ↔ a ∈ o := by unfold toOption by_cases h : o.Dom <;> simp [h] · exact ⟨fun h => ⟨_, h⟩, fun ⟨_, h⟩ => h⟩ · exact mt Exists.fst h @[simp] theorem toOption_eq_some_iff {o : Part α} [Decidable o.Dom] {a : α} : toOption o = Option.some a ↔ a ∈ o := by rw [← Option.mem_def, mem_toOption] protected theorem Dom.toOption {o : Part α} [Decidable o.Dom] (h : o.Dom) : o.toOption = o.get h := dif_pos h theorem toOption_eq_none_iff {a : Part α} [Decidable a.Dom] : a.toOption = Option.none ↔ ¬a.Dom := Ne.dite_eq_right_iff fun _ => Option.some_ne_none _ @[simp] theorem elim_toOption {α β : Type*} (a : Part α) [Decidable a.Dom] (b : β) (f : α → β) : a.toOption.elim b f = if h : a.Dom then f (a.get h) else b := by split_ifs with h · rw [h.toOption] rfl · rw [Part.toOption_eq_none_iff.2 h] rfl /-- Converts an `Option α` into a `Part α`. -/ @[coe] def ofOption : Option α → Part α \| Option.none => none \| Option.some a => some a @[simp] theorem mem_ofOption {a : α} : ∀ {o : Option α}, a ∈ ofOption o ↔ a ∈ o \| Option.none => ⟨fun h => h.fst.elim, fun h => Option.noConfusion h⟩ \| Option.some _ => ⟨fun h => congr_arg Option.some h.snd, fun h => ⟨trivial, Option.some.inj h⟩⟩ @[simp] theorem ofOption_dom {α} : ∀ o : Option α, (ofOption o).Dom ↔ o.isSome \| Option.none => by simp [ofOption, none] \| Option.some a => by simp [ofOption] theorem ofOption_eq_get {α} (o : Option α) : ofOption o = ⟨_, @Option.get _ o⟩ := Part.ext' (ofOption_dom o) fun h₁ h₂ => by cases o · simp at h₂ · rfl instance : Coe (Option α) (Part α) := ⟨ofOption⟩ theorem mem_coe {a : α} {o : Option α} : a ∈ (o : Part α) ↔ a ∈ o := mem_ofOption @[simp] theorem coe_none : (@Option.none α : Part α) = none := rfl @[simp] theorem coe_some (a : α) : (Option.some a : Part α) = some a := rfl @[elab_as_elim] protected theorem induction_on {P : Part α → Prop} (a : Part α) (hnone : P none) (hsome : ∀ a : α, P (some a)) : P a := (Classical.em a.Dom).elim (fun h => Part.some_get h ▸ hsome _) fun h => (eq_none_iff'.2 h).symm ▸ hnone instance ofOptionDecidable : ∀ o : Option α, Decidable (ofOption o).Dom \| Option.none => Part.noneDecidable \| Option.some a => Part.someDecidable a @[simp] theorem to_ofOption (o : Option α) : toOption (ofOption o) = o := by cases o <;> rfl @[simp] theorem of_toOption (o : Part α) [Decidable o.Dom] : ofOption (toOption o) = o := ext fun _ => mem_ofOption.trans mem_toOption /-- `Part α` is (classically) equivalent to `Option α`. -/ noncomputable def equivOption : Part α ≃ Option α := haveI := Classical.dec ⟨fun o => toOption o, ofOption, fun o => of_toOption o, fun o => Eq.trans (by dsimp; congr) (to_ofOption o)⟩ /-- We give `Part α` the order where everything is greater than `none`. -/ instance : PartialOrder (Part α) where le x y := ∀ i, i ∈ x → i ∈ y le_refl _ _ := id le_trans _ _ _ f g _ := g _ ∘ f _ le_antisymm _ _ f g := Part.ext fun _ => ⟨f _, g _⟩ instance : OrderBot (Part α) where bot := none bot_le := by rintro x _ ⟨⟨_⟩, _⟩ theorem le_total_of_le_of_le {x y : Part α} (z : Part α) (hx : x ≤ z) (hy : y ≤ z) : x ≤ y ∨ y ≤ x := by rcases Part.eq_none_or_eq_some x with (h \| ⟨b, h₀⟩) · rw [h] left apply OrderBot.bot_le _ right; intro b' h₁ rw [Part.eq_some_iff] at h₀ have hx := hx _ h₀; have hy := hy _ h₁ have hx := Part.mem_unique hx hy; subst hx exact h₀ /-- `assert p f` is a bind-like operation which appends an additional condition `p` to the domain and uses `f` to produce the value. -/ def assert (p : Prop) (f : p → Part α) : Part α := ⟨∃ h : p, (f h).Dom, fun ha => (f ha.fst).get ha.snd⟩ /-- The bind operation has value `g (f.get)`, and is defined when all the parts are defined. -/ protected def bind (f : Part α) (g : α → Part β) : Part β := assert (Dom f) fun b => g (f.get b) /-- The map operation for `Part` just maps the value and maintains the same domain. -/ @[simps] def map (f : α → β) (o : Part α) : Part β := ⟨o.Dom, f ∘ o.get⟩ theorem mem_map (f : α → β) {o : Part α} : ∀ {a}, a ∈ o → f a ∈ map f o \| _, ⟨_, rfl⟩ => ⟨_, rfl⟩ @[simp] theorem mem_map_iff (f : α → β) {o : Part α} {b} : b ∈ map f o ↔ ∃ a ∈ o, f a = b := ⟨fun hb => match b, hb with \| _, ⟨_, rfl⟩ => ⟨_, ⟨_, rfl⟩, rfl⟩, fun ⟨_, h₁, h₂⟩ => h₂ ▸ mem_map f h₁⟩ @[simp] theorem map_none (f : α → β) : map f none = none := eq_none_iff.2 fun a => by simp @[simp] theorem map_some (f : α → β) (a : α) : map f (some a) = some (f a) := eq_some_iff.2 <\| mem_map f <\| mem_some _ theorem mem_assert {p : Prop} {f : p → Part α} : ∀ {a} (h : p), a ∈ f h → a ∈ assert p f \| _, x, ⟨h, rfl⟩ => ⟨⟨x, h⟩, rfl⟩ @[simp] theorem mem_assert_iff {p : Prop} {f : p → Part α} {a} : a ∈ assert p f ↔ ∃ h : p, a ∈ f h := ⟨fun ha => match a, ha with \| _, ⟨_, rfl⟩ => ⟨_, ⟨_, rfl⟩⟩, fun ⟨_, h⟩ => mem_assert _ h⟩ theorem assert_pos {p : Prop} {f : p → Part α} (h : p) : assert p f = f h := by dsimp [assert] cases h' : f h simp only [h', mk.injEq, h, exists_prop_of_true, true_and] apply Function.hfunext · simp only [h, h', exists_prop_of_true] · simp	theorem assert_neg {p : Prop} {f : p → Part α} (h : ¬p) : assert p f = none := by dsimp [assert, none]; congr · simp only [h, not_false_iff, exists_prop_of_false] · apply Function.hfunext · simp only [h, not_false_iff, exists_prop_of_false] simp at * theorem mem_bind {f : Part α} {g : α → Part β} : ∀ {a b}, a ∈ f → b ∈ g a → b ∈ f.bind g \| _, _, ⟨h, rfl⟩, ⟨h₂, rfl⟩ => ⟨⟨h, h₂⟩, rfl⟩	Mathlib/Data/Part.lean	406	416
/- Copyright (c) 2020 Markus Himmel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Markus Himmel, Kim Morrison -/ import Mathlib.RingTheory.Ideal.Quotient.Basic import Mathlib.RingTheory.Noetherian.Orzech import Mathlib.RingTheory.OrzechProperty import Mathlib.RingTheory.PrincipalIdealDomain import Mathlib.LinearAlgebra.Finsupp.Pi /-! # Invariant basis number property ## Main definitions Let `R` be a (not necessary commutative) ring. - `InvariantBasisNumber R` is a type class stating that `(Fin n → R) ≃ₗ[R] (Fin m → R)` implies `n = m`, a property known as the invariant basis number property. This assumption implies that there is a well-defined notion of the rank of a finitely generated free (left) `R`-module. It is also useful to consider the following stronger conditions: - The rank condition, witnessed by the type class `RankCondition R`, states that the existence of a surjective linear map `(Fin n → R) →ₗ[R] (Fin m → R)` implies `m ≤ n`. - The strong rank condition, witnessed by the type class `StrongRankCondition R`, states that the existence of an injective linear map `(Fin n → R) →ₗ[R] (Fin m → R)` implies `n ≤ m`. - `OrzechProperty R`, defined in `Mathlib/RingTheory/OrzechProperty.lean`, states that for any finitely generated `R`-module `M`, any surjective homomorphism `f : N → M` from a submodule `N` of `M` to `M` is injective. ## Instances - `IsNoetherianRing.orzechProperty` (defined in `Mathlib/RingTheory/Noetherian.lean`) : any left-noetherian ring satisfies the Orzech property. This applies in particular to division rings. - `strongRankCondition_of_orzechProperty` : the Orzech property implies the strong rank condition (for non trivial rings). - `IsNoetherianRing.strongRankCondition` : every nontrivial left-noetherian ring satisfies the strong rank condition (and so in particular every division ring or field). - `rankCondition_of_strongRankCondition` : the strong rank condition implies the rank condition. - `invariantBasisNumber_of_rankCondition` : the rank condition implies the invariant basis number property. - `invariantBasisNumber_of_nontrivial_of_commRing`: a nontrivial commutative ring satisfies the invariant basis number property. More generally, every commutative ring satisfies the Orzech property, hence the strong rank condition, which is proved in `Mathlib/RingTheory/FiniteType.lean`. We keep `invariantBasisNumber_of_nontrivial_of_commRing` here since it imports fewer files. ## Counterexamples to converse results The following examples can be found in the book of Lam [lam_1999] (see also <https://math.stackexchange.com/questions/4711904>): - Let `k` be a field, then the free (non-commutative) algebra `k⟨x, y⟩` satisfies the rank condition but not the strong rank condition. - The free (non-commutative) algebra `ℚ⟨a, b, c, d⟩` quotient by the two-sided ideal `(ac − 1, bd − 1, ab, cd)` satisfies the invariant basis number property but not the rank condition. ## Future work So far, there is no API at all for the `InvariantBasisNumber` class. There are several natural ways to formulate that a module `M` is finitely generated and free, for example `M ≃ₗ[R] (Fin n → R)`, `M ≃ₗ[R] (ι → R)`, where `ι` is a fintype, or providing a basis indexed by a finite type. There should be lemmas applying the invariant basis number property to each situation. The finite version of the invariant basis number property implies the infinite analogue, i.e., that `(ι →₀ R) ≃ₗ[R] (ι' →₀ R)` implies that `Cardinal.mk ι = Cardinal.mk ι'`. This fact (and its variants) should be formalized. ## References * https://en.wikipedia.org/wiki/Invariant_basis_number * https://mathoverflow.net/a/2574/ * [Lam, T. Y. Lectures on Modules and Rings][lam_1999] * [Orzech, Morris. Onto endomorphisms are isomorphisms][orzech1971] * [Djoković, D. Ž. Epimorphisms of modules which must be isomorphisms][djokovic1973] * [Ribenboim, Paulo. Épimorphismes de modules qui sont nécessairement des isomorphismes][ribenboim1971] ## Tags free module, rank, Orzech property, (strong) rank condition, invariant basis number, IBN -/ noncomputable section open Function universe u v w section variable (R : Type u) [Semiring R] /-- We say that `R` satisfies the strong rank condition if `(Fin n → R) →ₗ[R] (Fin m → R)` injective implies `n ≤ m`. -/ @[mk_iff] class StrongRankCondition : Prop where /-- Any injective linear map from `Rⁿ` to `Rᵐ` guarantees `n ≤ m`. -/ le_of_fin_injective : ∀ {n m : ℕ} (f : (Fin n → R) →ₗ[R] Fin m → R), Injective f → n ≤ m theorem le_of_fin_injective [StrongRankCondition R] {n m : ℕ} (f : (Fin n → R) →ₗ[R] Fin m → R) : Injective f → n ≤ m := StrongRankCondition.le_of_fin_injective f /-- A ring satisfies the strong rank condition if and only if, for all `n : ℕ`, any linear map `(Fin (n + 1) → R) →ₗ[R] (Fin n → R)` is not injective. -/ theorem strongRankCondition_iff_succ : StrongRankCondition R ↔ ∀ (n : ℕ) (f : (Fin (n + 1) → R) →ₗ[R] Fin n → R), ¬Function.Injective f := by refine ⟨fun h n => fun f hf => ?_, fun h => ⟨@fun n m f hf => ?_⟩⟩ · letI : StrongRankCondition R := h exact Nat.not_succ_le_self n (le_of_fin_injective R f hf) · by_contra H exact h m (f.comp (Function.ExtendByZero.linearMap R (Fin.castLE (not_le.1 H)))) (hf.comp (Function.extend_injective (Fin.strictMono_castLE _).injective _)) /-- Any nontrivial ring satisfying Orzech property also satisfies strong rank condition. -/ instance (priority := 100) strongRankCondition_of_orzechProperty [Nontrivial R] [OrzechProperty R] : StrongRankCondition R := by refine (strongRankCondition_iff_succ R).2 fun n i hi ↦ ?_ let f : (Fin (n + 1) → R) →ₗ[R] Fin n → R := { toFun := fun x ↦ x ∘ Fin.castSucc map_add' := fun _ _ ↦ rfl map_smul' := fun _ _ ↦ rfl } have h : (0 : Fin (n + 1) → R) = update (0 : Fin (n + 1) → R) (Fin.last n) 1 := by apply OrzechProperty.injective_of_surjective_of_injective i f hi (Fin.castSucc_injective _).surjective_comp_right ext m simp [f, update_apply] simpa using congr_fun h (Fin.last n) theorem card_le_of_injective [StrongRankCondition R] {α β : Type} [Fintype α] [Fintype β] (f : (α → R) →ₗ[R] β → R) (i : Injective f) : Fintype.card α ≤ Fintype.card β := by let P := LinearEquiv.funCongrLeft R R (Fintype.equivFin α) let Q := LinearEquiv.funCongrLeft R R (Fintype.equivFin β) exact le_of_fin_injective R ((Q.symm.toLinearMap.comp f).comp P.toLinearMap) (((LinearEquiv.symm Q).injective.comp i).comp (LinearEquiv.injective P)) theorem card_le_of_injective' [StrongRankCondition R] {α β : Type} [Fintype α] [Fintype β] (f : (α →₀ R) →ₗ[R] β →₀ R) (i : Injective f) : Fintype.card α ≤ Fintype.card β := by let P := Finsupp.linearEquivFunOnFinite R R β let Q := (Finsupp.linearEquivFunOnFinite R R α).symm exact card_le_of_injective R ((P.toLinearMap.comp f).comp Q.toLinearMap) ((P.injective.comp i).comp Q.injective) /-- We say that `R` satisfies the rank condition if `(Fin n → R) →ₗ[R] (Fin m → R)` surjective implies `m ≤ n`. -/ class RankCondition : Prop where /-- Any surjective linear map from `Rⁿ` to `Rᵐ` guarantees `m ≤ n`. -/ le_of_fin_surjective : ∀ {n m : ℕ} (f : (Fin n → R) →ₗ[R] Fin m → R), Surjective f → m ≤ n theorem le_of_fin_surjective [RankCondition R] {n m : ℕ} (f : (Fin n → R) →ₗ[R] Fin m → R) : Surjective f → m ≤ n := RankCondition.le_of_fin_surjective f theorem card_le_of_surjective [RankCondition R] {α β : Type} [Fintype α] [Fintype β] (f : (α → R) →ₗ[R] β → R) (i : Surjective f) : Fintype.card β ≤ Fintype.card α := by let P := LinearEquiv.funCongrLeft R R (Fintype.equivFin α) let Q := LinearEquiv.funCongrLeft R R (Fintype.equivFin β) exact le_of_fin_surjective R ((Q.symm.toLinearMap.comp f).comp P.toLinearMap) (((LinearEquiv.symm Q).surjective.comp i).comp (LinearEquiv.surjective P)) theorem card_le_of_surjective' [RankCondition R] {α β : Type} [Fintype α] [Fintype β] (f : (α →₀ R) →ₗ[R] β →₀ R) (i : Surjective f) : Fintype.card β ≤ Fintype.card α := by let P := Finsupp.linearEquivFunOnFinite R R β let Q := (Finsupp.linearEquivFunOnFinite R R α).symm exact card_le_of_surjective R ((P.toLinearMap.comp f).comp Q.toLinearMap) ((P.surjective.comp i).comp Q.surjective) /-- By the universal property for free modules, any surjective map `(Fin n → R) →ₗ[R] (Fin m → R)` has an injective splitting `(Fin m → R) →ₗ[R] (Fin n → R)` from which the strong rank condition gives the necessary inequality for the rank condition. -/ instance (priority := 100) rankCondition_of_strongRankCondition [StrongRankCondition R] : RankCondition R where le_of_fin_surjective f s := le_of_fin_injective R _ (f.splittingOfFunOnFintypeSurjective_injective s) /-- We say that `R` has the invariant basis number property if `(Fin n → R) ≃ₗ[R] (Fin m → R)` implies `n = m`. This gives rise to a well-defined notion of rank of a finitely generated free module. -/ class InvariantBasisNumber : Prop where /-- Any linear equiv between `Rⁿ` and `Rᵐ` guarantees `m = n`. -/ eq_of_fin_equiv : ∀ {n m : ℕ}, ((Fin n → R) ≃ₗ[R] Fin m → R) → n = m instance (priority := 100) invariantBasisNumber_of_rankCondition [RankCondition R] : InvariantBasisNumber R where eq_of_fin_equiv e := le_antisymm (le_of_fin_surjective R e.symm.toLinearMap e.symm.surjective) (le_of_fin_surjective R e.toLinearMap e.surjective) end section variable (R : Type u) [Semiring R] [InvariantBasisNumber R] theorem eq_of_fin_equiv {n m : ℕ} : ((Fin n → R) ≃ₗ[R] Fin m → R) → n = m := InvariantBasisNumber.eq_of_fin_equiv theorem card_eq_of_linearEquiv {α β : Type*} [Fintype α] [Fintype β] (f : (α → R) ≃ₗ[R] β → R) : Fintype.card α = Fintype.card β := eq_of_fin_equiv R ((LinearEquiv.funCongrLeft R R (Fintype.equivFin α)).trans f ≪≫ₗ (LinearEquiv.funCongrLeft R R (Fintype.equivFin β)).symm) theorem nontrivial_of_invariantBasisNumber : Nontrivial R := by by_contra h refine zero_ne_one (eq_of_fin_equiv R ?_) haveI := not_nontrivial_iff_subsingleton.1 h haveI : Subsingleton (Fin 1 → R) := Subsingleton.intro fun a b => funext fun x => Subsingleton.elim _ _ exact { toFun := 0 invFun := 0 map_add' := by simp map_smul' := by simp left_inv := fun _ => by simp [eq_iff_true_of_subsingleton] right_inv := fun _ => by simp [eq_iff_true_of_subsingleton] } end section	variable (R : Type u) [Ring R] [Nontrivial R] [IsNoetherianRing R] /-- Any nontrivial noetherian ring satisfies the strong rank condition, since it satisfies Orzech property. -/ instance (priority := 100) IsNoetherianRing.strongRankCondition : StrongRankCondition R := inferInstance end /-! We want to show that nontrivial commutative rings have invariant basis number. The idea is to take a maximal ideal `I` of `R` and use an isomorphism `R^n ≃ R^m` of `R` modules to produce an	Mathlib/LinearAlgebra/InvariantBasisNumber.lean	249	261
/- Copyright (c) 2024 Jz Pan. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jz Pan -/ import Mathlib.LinearAlgebra.DFinsupp import Mathlib.RingTheory.Finiteness.Basic import Mathlib.LinearAlgebra.TensorProduct.Basic /-! # Some finiteness results of tensor product This file contains some finiteness results of tensor product. - `TensorProduct.exists_multiset`, `TensorProduct.exists_finsupp_left`, `TensorProduct.exists_finsupp_right`, `TensorProduct.exists_finset`: any element of `M ⊗[R] N` can be written as a finite sum of pure tensors. See also `TensorProduct.span_tmul_eq_top`. - `TensorProduct.exists_finite_submodule_left_of_finite`, `TensorProduct.exists_finite_submodule_right_of_finite`, `TensorProduct.exists_finite_submodule_of_finite`: any finite subset of `M ⊗[R] N` is contained in `M' ⊗[R] N`, resp. `M ⊗[R] N'`, resp. `M' ⊗[R] N'`, for some finitely generated submodules `M'` and `N'` of `M` and `N`, respectively. - `TensorProduct.exists_finite_submodule_left_of_finite'`, `TensorProduct.exists_finite_submodule_right_of_finite'`, `TensorProduct.exists_finite_submodule_of_finite'`: variation of the above results where `M` and `N` are already submodules. ## Tags tensor product, finitely generated -/ open scoped TensorProduct open Submodule variable {R M N : Type*} variable [CommSemiring R] [AddCommMonoid M] [AddCommMonoid N] [Module R M] [Module R N] variable {M₁ M₂ : Submodule R M} {N₁ N₂ : Submodule R N} namespace TensorProduct /-- For any element `x` of `M ⊗[R] N`, there exists a (finite) multiset `{ (m_i, n_i) }` of `M × N`, such that `x` is equal to the sum of `m_i ⊗ₜ[R] n_i`. -/ theorem exists_multiset (x : M ⊗[R] N) : ∃ S : Multiset (M × N), x = (S.map fun i ↦ i.1 ⊗ₜ[R] i.2).sum := by induction x with \| zero => exact ⟨0, by simp⟩ \| tmul x y => exact ⟨{(x, y)}, by simp⟩ \| add x y hx hy => obtain ⟨Sx, hx⟩ := hx obtain ⟨Sy, hy⟩ := hy exact ⟨Sx + Sy, by rw [Multiset.map_add, Multiset.sum_add, hx, hy]⟩ /-- For any element `x` of `M ⊗[R] N`, there exists a finite subset `{ (m_i, n_i) }` of `M × N` such that each `m_i` is distinct (we represent it as an element of `M →₀ N`), such that `x` is equal to the sum of `m_i ⊗ₜ[R] n_i`. -/ theorem exists_finsupp_left (x : M ⊗[R] N) : ∃ S : M →₀ N, x = S.sum fun m n ↦ m ⊗ₜ[R] n := by induction x with \| zero => exact ⟨0, by simp⟩ \| tmul x y => exact ⟨Finsupp.single x y, by simp⟩ \| add x y hx hy => obtain ⟨Sx, hx⟩ := hx obtain ⟨Sy, hy⟩ := hy use Sx + Sy rw [hx, hy] exact (Finsupp.sum_add_index' (by simp) TensorProduct.tmul_add).symm /-- For any element `x` of `M ⊗[R] N`, there exists a finite subset `{ (m_i, n_i) }` of `M × N` such that each `n_i` is distinct (we represent it as an element of `N →₀ M`), such that `x` is equal to the sum of `m_i ⊗ₜ[R] n_i`. -/ theorem exists_finsupp_right (x : M ⊗[R] N) : ∃ S : N →₀ M, x = S.sum fun n m ↦ m ⊗ₜ[R] n := by obtain ⟨S, h⟩ := exists_finsupp_left (TensorProduct.comm R M N x) refine ⟨S, (TensorProduct.comm R M N).injective ?_⟩ simp_rw [h, Finsupp.sum, map_sum, comm_tmul] /-- For any element `x` of `M ⊗[R] N`, there exists a finite subset `{ (m_i, n_i) }` of `M × N`, such that `x` is equal to the sum of `m_i ⊗ₜ[R] n_i`. -/ theorem exists_finset (x : M ⊗[R] N) : ∃ S : Finset (M × N), x = S.sum fun i ↦ i.1 ⊗ₜ[R] i.2 := by obtain ⟨S, h⟩ := exists_finsupp_left x use S.graph rw [h, Finsupp.sum] apply Finset.sum_nbij' (fun m ↦ ⟨m, S m⟩) Prod.fst <;> simp /-- For a finite subset `s` of `M ⊗[R] N`, there are finitely generated submodules `M'` and `N'` of `M` and `N`, respectively, such that `s` is contained in the image	of `M' ⊗[R] N'` in `M ⊗[R] N`. -/ theorem exists_finite_submodule_of_finite (s : Set (M ⊗[R] N)) (hs : s.Finite) : ∃ (M' : Submodule R M) (N' : Submodule R N), Module.Finite R M' ∧ Module.Finite R N' ∧ s ⊆ LinearMap.range (mapIncl M' N') := by simp_rw [Module.Finite.iff_fg] induction s, hs using Set.Finite.induction_on with \| empty => exact ⟨_, _, fg_bot, fg_bot, Set.empty_subset _⟩ \| @insert a s _ _ ih => obtain ⟨M', N', hM', hN', h⟩ := ih refine TensorProduct.induction_on a ?_ (fun x y ↦ ?_) fun x y hx hy ↦ ?_ · exact ⟨M', N', hM', hN', Set.insert_subset (zero_mem _) h⟩ · refine ⟨_, _, hM'.sup (fg_span_singleton x), hN'.sup (fg_span_singleton y), Set.insert_subset ?_ fun z hz ↦ ?_⟩ · exact ⟨⟨x, mem_sup_right (mem_span_singleton_self x)⟩ ⊗ₜ ⟨y, mem_sup_right (mem_span_singleton_self y)⟩, rfl⟩ · exact range_mapIncl_mono le_sup_left le_sup_left (h hz) · obtain ⟨M₁', N₁', hM₁', hN₁', h₁⟩ := hx obtain ⟨M₂', N₂', hM₂', hN₂', h₂⟩ := hy refine ⟨_, _, hM₁'.sup hM₂', hN₁'.sup hN₂', Set.insert_subset (add_mem ?_ ?_) fun z hz ↦ ?_⟩	Mathlib/LinearAlgebra/TensorProduct/Finiteness.lean	98	116
/- 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.Control.Combinators import Mathlib.Data.Option.Defs import Mathlib.Logic.IsEmpty import Mathlib.Logic.Relator import Mathlib.Util.CompileInductive import Aesop /-! # Option of a type This file develops the basic theory of option types. If `α` is a type, then `Option α` can be understood as the type with one more element than `α`. `Option α` has terms `some a`, where `a : α`, and `none`, which is the added element. This is useful in multiple ways: * It is the prototype of addition of terms to a type. See for example `WithBot α` which uses `none` as an element smaller than all others. * It can be used to define failsafe partial functions, which return `some the_result_we_expect` if we can find `the_result_we_expect`, and `none` if there is no meaningful result. This forces any subsequent use of the partial function to explicitly deal with the exceptions that make it return `none`. * `Option` is a monad. We love monads. `Part` is an alternative to `Option` that can be seen as the type of `True`/`False` values along with a term `a : α` if the value is `True`. -/ universe u namespace Option variable {α β γ δ : Type} theorem coe_def : (fun a ↦ ↑a : α → Option α) = some := rfl theorem mem_map {f : α → β} {y : β} {o : Option α} : y ∈ o.map f ↔ ∃ x ∈ o, f x = y := by simp -- The simpNF linter says that the LHS can be simplified via `Option.mem_def`. -- However this is a higher priority lemma. -- It seems the side condition `H` 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 : Function.Injective f) {a : α} {o : Option α} : f a ∈ o.map f ↔ a ∈ o := by aesop theorem forall_mem_map {f : α → β} {o : Option α} {p : β → Prop} : (∀ y ∈ o.map f, p y) ↔ ∀ x ∈ o, p (f x) := by simp theorem exists_mem_map {f : α → β} {o : Option α} {p : β → Prop} : (∃ y ∈ o.map f, p y) ↔ ∃ x ∈ o, p (f x) := by simp theorem coe_get {o : Option α} (h : o.isSome) : ((Option.get _ h : α) : Option α) = o := Option.some_get h theorem eq_of_mem_of_mem {a : α} {o1 o2 : Option α} (h1 : a ∈ o1) (h2 : a ∈ o2) : o1 = o2 := h1.trans h2.symm theorem Mem.leftUnique : Relator.LeftUnique ((· ∈ ·) : α → Option α → Prop) := fun _ _ _=> mem_unique theorem some_injective (α : Type) : Function.Injective (@some α) := fun _ _ ↦ some_inj.mp /-- `Option.map f` is injective if `f` is injective. -/ theorem map_injective {f : α → β} (Hf : Function.Injective f) : Function.Injective (Option.map f) \| none, none, _ => rfl \| some a₁, some a₂, H => by rw [Hf (Option.some.inj H)] @[simp] theorem map_comp_some (f : α → β) : Option.map f ∘ some = some ∘ f := rfl @[simp] theorem none_bind' (f : α → Option β) : none.bind f = none := rfl @[simp] theorem some_bind' (a : α) (f : α → Option β) : (some a).bind f = f a := rfl theorem bind_eq_some' {x : Option α} {f : α → Option β} {b : β} : x.bind f = some b ↔ ∃ a, x = some a ∧ f a = some b := by cases x <;> simp @[congr] theorem bind_congr' {f g : α → Option β} {x y : Option α} (hx : x = y) (hf : ∀ a ∈ y, f a = g a) : x.bind f = y.bind g := hx.symm ▸ bind_congr hf @[deprecated bind_congr (since := "2025-03-20")] -- This was renamed from `bind_congr` after https://github.com/leanprover/lean4/pull/7529 -- upstreamed it with a slightly different statement. theorem bind_congr'' {f g : α → Option β} {x : Option α} (h : ∀ a ∈ x, f a = g a) : x.bind f = x.bind g := by cases x <;> simp only [some_bind, none_bind, mem_def, h] theorem joinM_eq_join : joinM = @join α := funext fun _ ↦ rfl theorem bind_eq_bind' {α β : Type u} {f : α → Option β} {x : Option α} : x >>= f = x.bind f := rfl theorem map_coe {α β} {a : α} {f : α → β} : f <$> (a : Option α) = ↑(f a) := rfl @[simp] theorem map_coe' {a : α} {f : α → β} : Option.map f (a : Option α) = ↑(f a) := rfl /-- `Option.map` as a function between functions is injective. -/ theorem map_injective' : Function.Injective (@Option.map α β) := fun f g h ↦ funext fun x ↦ some_injective _ <\| by simp only [← map_some', h] @[simp] theorem map_inj {f g : α → β} : Option.map f = Option.map g ↔ f = g := map_injective'.eq_iff attribute [simp] map_id @[simp] theorem map_eq_id {f : α → α} : Option.map f = id ↔ f = id := map_injective'.eq_iff' map_id theorem map_comm {f₁ : α → β} {f₂ : α → γ} {g₁ : β → δ} {g₂ : γ → δ} (h : g₁ ∘ f₁ = g₂ ∘ f₂) (a : α) : (Option.map f₁ a).map g₁ = (Option.map f₂ a).map g₂ := by rw [map_map, h, ← map_map] section pmap variable {p : α → Prop} (f : ∀ a : α, p a → β) (x : Option α) @[simp] theorem pbind_eq_bind (f : α → Option β) (x : Option α) : (x.pbind fun a _ ↦ f a) = x.bind f := by cases x <;> simp only [pbind, none_bind', some_bind'] theorem map_bind' (f : β → γ) (x : Option α) (g : α → Option β) : Option.map f (x.bind g) = x.bind fun a ↦ Option.map f (g a) := by cases x <;> simp theorem pbind_map (f : α → β) (x : Option α) (g : ∀ b : β, b ∈ x.map f → Option γ) : pbind (Option.map f x) g = x.pbind fun a h ↦ g (f a) (mem_map_of_mem _ h) := by cases x <;> rfl theorem mem_pmem {a : α} (h : ∀ a ∈ x, p a) (ha : a ∈ x) : f a (h a ha) ∈ pmap f x h := by rw [mem_def] at ha ⊢ subst ha rfl theorem pmap_bind {α β γ} {x : Option α} {g : α → Option β} {p : β → Prop} {f : ∀ b, p b → γ} (H) (H' : ∀ (a : α), ∀ b ∈ g a, b ∈ x >>= g) : pmap f (x >>= g) H = x >>= fun a ↦ pmap f (g a) fun _ h ↦ H _ (H' a _ h) := by cases x <;> simp only [pmap, bind_eq_bind, none_bind, some_bind] theorem bind_pmap {α β γ} {p : α → Prop} (f : ∀ a, p a → β) (x : Option α) (g : β → Option γ) (H) : pmap f x H >>= g = x.pbind fun a h ↦ g (f a (H _ h)) := by cases x <;> simp only [pmap, bind_eq_bind, none_bind, some_bind, pbind] variable {f x} theorem pbind_eq_none {f : ∀ a : α, a ∈ x → Option β} (h' : ∀ a (H : a ∈ x), f a H = none → x = none) : x.pbind f = none ↔ x = none := by cases x · simp · simp only [pbind, iff_false, reduceCtorEq] intro h cases h' _ rfl h theorem pbind_eq_some {f : ∀ a : α, a ∈ x → Option β} {y : β} : x.pbind f = some y ↔ ∃ (z : α) (H : z ∈ x), f z H = some y := by rcases x with (_\|x) · simp · simp only [pbind] refine ⟨fun h ↦ ⟨x, rfl, h⟩, ?_⟩ rintro ⟨z, H, hz⟩ simp only [mem_def, Option.some_inj] at H simpa [H] using hz theorem join_pmap_eq_pmap_join {f : ∀ a, p a → β} {x : Option (Option α)} (H) : (pmap (pmap f) x H).join = pmap f x.join fun a h ↦ H (some a) (mem_of_mem_join h) _ rfl := by rcases x with (_ \| _ \| x) <;> simp /-- `simp`-normal form of `join_pmap_eq_pmap_join` -/ @[simp] theorem pmap_bind_id_eq_pmap_join {f : ∀ a, p a → β} {x : Option (Option α)} (H) : ((pmap (pmap f) x H).bind fun a ↦ a) = pmap f x.join fun a h ↦ H (some a) (mem_of_mem_join h) _ rfl := by rcases x with (_ \| _ \| x) <;> simp end pmap @[simp] theorem seq_some {α β} {a : α} {f : α → β} : some f <*> some a = some (f a) := rfl @[simp] theorem some_orElse' (a : α) (x : Option α) : (some a).orElse (fun _ ↦ x) = some a := rfl @[simp] theorem none_orElse' (x : Option α) : none.orElse (fun _ ↦ x) = x := by cases x <;> rfl @[simp] theorem orElse_none' (x : Option α) : x.orElse (fun _ ↦ none) = x := by cases x <;> rfl theorem exists_ne_none {p : Option α → Prop} : (∃ x ≠ none, p x) ↔ (∃ x : α, p x) := by simp only [← exists_prop, bex_ne_none] theorem iget_mem [Inhabited α] : ∀ {o : Option α}, isSome o → o.iget ∈ o \| some _, _ => rfl theorem iget_of_mem [Inhabited α] {a : α} : ∀ {o : Option α}, a ∈ o → o.iget = a \| _, rfl => rfl theorem getD_default_eq_iget [Inhabited α] (o : Option α) : o.getD default = o.iget := by cases o <;> rfl @[simp] theorem guard_eq_some' {p : Prop} [Decidable p] (u) : _root_.guard p = some u ↔ p := by cases u by_cases h : p <;> simp [_root_.guard, h] theorem liftOrGet_choice {f : α → α → α} (h : ∀ a b, f a b = a ∨ f a b = b) : ∀ o₁ o₂, liftOrGet f o₁ o₂ = o₁ ∨ liftOrGet f o₁ o₂ = o₂ \| none, none => Or.inl rfl \| some _, none => Or.inl rfl \| none, some _ => Or.inr rfl \| some a, some b => by simpa [liftOrGet] using h a b /-- Given an element of `a : Option α`, a default element `b : β` and a function `α → β`, apply this function to `a` if it comes from `α`, and return `b` otherwise. -/ def casesOn' : Option α → β → (α → β) → β \| none, n, _ => n \| some a, _, s => s a	@[simp] theorem casesOn'_none (x : β) (f : α → β) : casesOn' none x f = x := rfl @[simp] theorem casesOn'_some (x : β) (f : α → β) (a : α) : casesOn' (some a) x f = f a := rfl @[simp] theorem casesOn'_coe (x : β) (f : α → β) (a : α) : casesOn' (a : Option α) x f = f a := rfl	Mathlib/Data/Option/Basic.lean	240	250
/- 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, Kevin Buzzard, Yury Kudryashov -/ import Mathlib.LinearAlgebra.Quotient.Basic /-! # Isomorphism theorems for modules. * The Noether's first, second, and third isomorphism theorems for modules are proved as `LinearMap.quotKerEquivRange`, `LinearMap.quotientInfEquivSupQuotient` and `Submodule.quotientQuotientEquivQuotient`. -/ universe u v variable {R M M₂ M₃ : Type} variable [Ring R] [AddCommGroup M] [AddCommGroup M₂] [AddCommGroup M₃] variable [Module R M] [Module R M₂] [Module R M₃] variable (f : M →ₗ[R] M₂) /-! The first and second isomorphism theorems for modules. -/ namespace LinearMap open Submodule section IsomorphismLaws /-- The first isomorphism law for modules. The quotient of `M` by the kernel of `f` is linearly equivalent to the range of `f`. -/ noncomputable def quotKerEquivRange : (M ⧸ LinearMap.ker f) ≃ₗ[R] LinearMap.range f := (LinearEquiv.ofInjective ((LinearMap.ker f).liftQ f <\| le_rfl) <\| ker_eq_bot.mp <\| Submodule.ker_liftQ_eq_bot _ _ _ (le_refl (LinearMap.ker f))).trans (LinearEquiv.ofEq _ _ <\| Submodule.range_liftQ _ _ _) /-- The first isomorphism theorem for surjective linear maps*. -/ noncomputable def quotKerEquivOfSurjective (f : M →ₗ[R] M₂) (hf : Function.Surjective f) : (M ⧸ LinearMap.ker f) ≃ₗ[R] M₂ := f.quotKerEquivRange.trans <\| .ofTop (LinearMap.range f) <\| range_eq_top.2 hf @[simp] theorem quotKerEquivRange_apply_mk (x : M) : (f.quotKerEquivRange (Submodule.Quotient.mk x) : M₂) = f x := rfl @[simp] theorem quotKerEquivRange_symm_apply_image (x : M) (h : f x ∈ LinearMap.range f) : f.quotKerEquivRange.symm ⟨f x, h⟩ = (LinearMap.ker f).mkQ x := f.quotKerEquivRange.symm_apply_apply ((LinearMap.ker f).mkQ x) /-- Linear map from `p` to `p+p'/p'` where `p p'` are submodules of `R` -/ abbrev subToSupQuotient (p p' : Submodule R M) : { x // x ∈ p } →ₗ[R] { x // x ∈ p ⊔ p' } ⧸ comap (Submodule.subtype (p ⊔ p')) p' := (comap (p ⊔ p').subtype p').mkQ.comp (Submodule.inclusion le_sup_left) theorem comap_leq_ker_subToSupQuotient (p p' : Submodule R M) : comap (Submodule.subtype p) (p ⊓ p') ≤ ker (subToSupQuotient p p') := by rw [LinearMap.ker_comp, Submodule.inclusion, comap_codRestrict, ker_mkQ, map_comap_subtype] exact comap_mono (inf_le_inf_right _ le_sup_left) /-- Canonical linear map from the quotient `p/(p ∩ p')` to `(p+p')/p'`, mapping `x + (p ∩ p')` to `x + p'`, where `p` and `p'` are submodules of an ambient module. Note that in the following declaration the type of the domain is expressed using ``comap p.subtype p ⊓ comap p.subtype p'` instead of `comap p.subtype (p ⊓ p')` because the former is the simp normal form (see also `Submodule.comap_inf`). -/ def quotientInfToSupQuotient (p p' : Submodule R M) : (↥p) ⧸ (comap p.subtype p ⊓ comap p.subtype p') →ₗ[R] (↥(p ⊔ p')) ⧸ (comap (p ⊔ p').subtype p') := (comap p.subtype (p ⊓ p')).liftQ (subToSupQuotient p p') (comap_leq_ker_subToSupQuotient p p') theorem quotientInfEquivSupQuotient_injective (p p' : Submodule R M) : Function.Injective (quotientInfToSupQuotient p p') := by rw [← ker_eq_bot, quotientInfToSupQuotient, ker_liftQ_eq_bot] rw [ker_comp, ker_mkQ]	exact fun ⟨x, hx1⟩ hx2 => ⟨hx1, hx2⟩ theorem quotientInfEquivSupQuotient_surjective (p p' : Submodule R M) : Function.Surjective (quotientInfToSupQuotient p p') := by rw [← range_eq_top, quotientInfToSupQuotient, range_liftQ, eq_top_iff']	Mathlib/LinearAlgebra/Isomorphisms.lean	81	85
/- 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 namespace Finset /-- Given a finset on `α`, lift it to being a finset on `Option α` using `Option.some` and then insert `Option.none`. -/ def insertNone : Finset α ↪o Finset (Option α) := (OrderEmbedding.ofMapLEIff fun s => cons none (s.map Embedding.some) <\| by simp) fun s t => by rw [le_iff_subset, cons_subset_cons, map_subset_map, le_iff_subset] @[simp] theorem mem_insertNone {s : Finset α} : ∀ {o : Option α}, o ∈ insertNone s ↔ ∀ a ∈ o, a ∈ s \| none => iff_of_true (Multiset.mem_cons_self _ _) fun a h => by cases h \| some a => Multiset.mem_cons.trans <\| by simp lemma forall_mem_insertNone {s : Finset α} {p : Option α → Prop} : (∀ a ∈ insertNone s, p a) ↔ p none ∧ ∀ a ∈ s, p a := by simp [Option.forall] theorem some_mem_insertNone {s : Finset α} {a : α} : some a ∈ insertNone s ↔ a ∈ s := by simp lemma none_mem_insertNone {s : Finset α} : none ∈ insertNone s := by simp @[aesop safe apply (rule_sets := [finsetNonempty])] lemma insertNone_nonempty {s : Finset α} : insertNone s \|>.Nonempty := ⟨none, none_mem_insertNone⟩ @[simp] theorem card_insertNone (s : Finset α) : s.insertNone.card = s.card + 1 := by simp [insertNone] /-- Given `s : Finset (Option α)`, `eraseNone s : Finset α` is the set of `x : α` such that `some x ∈ s`. -/ def eraseNone : Finset (Option α) →o Finset α := (Finset.mapEmbedding (Equiv.optionIsSomeEquiv α).toEmbedding).toOrderHom.comp ⟨Finset.subtype _, subtype_mono⟩ @[simp] theorem mem_eraseNone {s : Finset (Option α)} {x : α} : x ∈ eraseNone s ↔ some x ∈ s := by simp [eraseNone] lemma forall_mem_eraseNone {s : Finset (Option α)} {p : Option α → Prop} : (∀ a ∈ eraseNone s, p a) ↔ ∀ a : α, (a : Option α) ∈ s → p a := by simp [Option.forall] theorem eraseNone_eq_biUnion [DecidableEq α] (s : Finset (Option α)) : eraseNone s = s.biUnion Option.toFinset := by ext simp	@[simp] theorem eraseNone_map_some (s : Finset α) : eraseNone (s.map Embedding.some) = s := by	Mathlib/Data/Finset/Option.lean	98	99
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Yury Kudryashov, Yaël Dillies -/ import Mathlib.Algebra.BigOperators.GroupWithZero.Action import Mathlib.Algebra.Module.Defs import Mathlib.Data.Fintype.BigOperators /-! # Finite sums over modules over a ring -/ variable {ι κ α β R M : Type*} section AddCommMonoid variable [Semiring R] [AddCommMonoid M] [Module R M] theorem List.sum_smul {l : List R} {x : M} : l.sum • x = (l.map fun r ↦ r • x).sum := map_list_sum ((smulAddHom R M).flip x) l theorem Multiset.sum_smul {l : Multiset R} {x : M} : l.sum • x = (l.map fun r ↦ r • x).sum := ((smulAddHom R M).flip x).map_multiset_sum l theorem Multiset.sum_smul_sum {s : Multiset R} {t : Multiset M} : s.sum • t.sum = ((s ×ˢ t).map fun p : R × M ↦ p.fst • p.snd).sum := by induction' s using Multiset.induction with a s ih · simp · simp [add_smul, ih, ← Multiset.smul_sum] theorem Finset.sum_smul {f : ι → R} {s : Finset ι} {x : M} : (∑ i ∈ s, f i) • x = ∑ i ∈ s, f i • x := map_sum ((smulAddHom R M).flip x) f s lemma Finset.sum_smul_sum (s : Finset α) (t : Finset β) {f : α → R} {g : β → M} : (∑ i ∈ s, f i) • ∑ j ∈ t, g j = ∑ i ∈ s, ∑ j ∈ t, f i • g j := by simp_rw [sum_smul, ← smul_sum] lemma Fintype.sum_smul_sum [Fintype α] [Fintype β] (f : α → R) (g : β → M) : (∑ i, f i) • ∑ j, g j = ∑ i, ∑ j, f i • g j := Finset.sum_smul_sum _ _ end AddCommMonoid open Finset theorem Finset.cast_card [NonAssocSemiring R] (s : Finset α) : (#s : R) = ∑ _ ∈ s, 1 := by rw [Finset.sum_const, Nat.smul_one_eq_cast] namespace Fintype variable [DecidableEq ι] [Fintype ι] [AddCommMonoid α] lemma sum_piFinset_apply (f : κ → α) (s : Finset κ) (i : ι) : ∑ g ∈ piFinset fun _ : ι ↦ s, f (g i) = #s ^ (card ι - 1) • ∑ b ∈ s, f b := by classical rw [Finset.sum_comp] simp only [eval_image_piFinset_const, card_filter_piFinset_const s, ite_smul, zero_smul, smul_sum, Finset.sum_ite_mem, inter_self]	end Fintype	Mathlib/Algebra/Module/BigOperators.lean	59	64
/- 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, Patrick Massot -/ import Mathlib.Algebra.Group.TypeTags.Basic import Mathlib.Data.Fin.VecNotation import Mathlib.Data.Finset.Piecewise import Mathlib.Order.Filter.Cofinite import Mathlib.Order.Filter.Curry import Mathlib.Topology.Constructions.SumProd import Mathlib.Topology.NhdsSet /-! # Constructions of new topological spaces from old ones This file constructs pi types, subtypes and quotients of topological spaces and sets up their basic theory, such as criteria for maps into or out of these constructions to be continuous; descriptions of the open sets, neighborhood filters, and generators of these constructions; and their behavior with respect to embeddings and other specific classes of maps. ## Implementation note The constructed topologies are defined using induced and coinduced topologies along with the complete lattice structure on topologies. Their universal properties (for example, a map `X → Y × Z` is continuous if and only if both projections `X → Y`, `X → Z` are) follow easily using order-theoretic descriptions of continuity. With more work we can also extract descriptions of the open sets, neighborhood filters and so on. ## Tags product, subspace, quotient space -/ noncomputable section open Topology TopologicalSpace Set Filter Function open scoped Set.Notation universe u v u' v' variable {X : Type u} {Y : Type v} {Z W ε ζ : Type} section Constructions instance {r : X → X → Prop} [t : TopologicalSpace X] : TopologicalSpace (Quot r) := coinduced (Quot.mk r) t instance instTopologicalSpaceQuotient {s : Setoid X} [t : TopologicalSpace X] : TopologicalSpace (Quotient s) := coinduced Quotient.mk' t instance instTopologicalSpaceSigma {ι : Type} {X : ι → Type v} [t₂ : ∀ i, TopologicalSpace (X i)] : TopologicalSpace (Sigma X) := ⨆ i, coinduced (Sigma.mk i) (t₂ i) instance Pi.topologicalSpace {ι : Type} {Y : ι → Type v} [t₂ : (i : ι) → TopologicalSpace (Y i)] : TopologicalSpace ((i : ι) → Y i) := ⨅ i, induced (fun f => f i) (t₂ i) instance ULift.topologicalSpace [t : TopologicalSpace X] : TopologicalSpace (ULift.{v, u} X) := t.induced ULift.down /-! ### `Additive`, `Multiplicative` The topology on those type synonyms is inherited without change. -/ section variable [TopologicalSpace X] open Additive Multiplicative instance : TopologicalSpace (Additive X) := ‹TopologicalSpace X› instance : TopologicalSpace (Multiplicative X) := ‹TopologicalSpace X› instance [DiscreteTopology X] : DiscreteTopology (Additive X) := ‹DiscreteTopology X› instance [DiscreteTopology X] : DiscreteTopology (Multiplicative X) := ‹DiscreteTopology X› theorem continuous_ofMul : Continuous (ofMul : X → Additive X) := continuous_id theorem continuous_toMul : Continuous (toMul : Additive X → X) := continuous_id theorem continuous_ofAdd : Continuous (ofAdd : X → Multiplicative X) := continuous_id theorem continuous_toAdd : Continuous (toAdd : Multiplicative X → X) := continuous_id theorem isOpenMap_ofMul : IsOpenMap (ofMul : X → Additive X) := IsOpenMap.id theorem isOpenMap_toMul : IsOpenMap (toMul : Additive X → X) := IsOpenMap.id theorem isOpenMap_ofAdd : IsOpenMap (ofAdd : X → Multiplicative X) := IsOpenMap.id theorem isOpenMap_toAdd : IsOpenMap (toAdd : Multiplicative X → X) := IsOpenMap.id theorem isClosedMap_ofMul : IsClosedMap (ofMul : X → Additive X) := IsClosedMap.id theorem isClosedMap_toMul : IsClosedMap (toMul : Additive X → X) := IsClosedMap.id theorem isClosedMap_ofAdd : IsClosedMap (ofAdd : X → Multiplicative X) := IsClosedMap.id theorem isClosedMap_toAdd : IsClosedMap (toAdd : Multiplicative X → X) := IsClosedMap.id theorem nhds_ofMul (x : X) : 𝓝 (ofMul x) = map ofMul (𝓝 x) := rfl theorem nhds_ofAdd (x : X) : 𝓝 (ofAdd x) = map ofAdd (𝓝 x) := rfl theorem nhds_toMul (x : Additive X) : 𝓝 x.toMul = map toMul (𝓝 x) := rfl theorem nhds_toAdd (x : Multiplicative X) : 𝓝 x.toAdd = map toAdd (𝓝 x) := rfl end /-! ### Order dual The topology on this type synonym is inherited without change. -/ section variable [TopologicalSpace X] open OrderDual instance OrderDual.instTopologicalSpace : TopologicalSpace Xᵒᵈ := ‹_› instance OrderDual.instDiscreteTopology [DiscreteTopology X] : DiscreteTopology Xᵒᵈ := ‹_› theorem continuous_toDual : Continuous (toDual : X → Xᵒᵈ) := continuous_id theorem continuous_ofDual : Continuous (ofDual : Xᵒᵈ → X) := continuous_id theorem isOpenMap_toDual : IsOpenMap (toDual : X → Xᵒᵈ) := IsOpenMap.id theorem isOpenMap_ofDual : IsOpenMap (ofDual : Xᵒᵈ → X) := IsOpenMap.id theorem isClosedMap_toDual : IsClosedMap (toDual : X → Xᵒᵈ) := IsClosedMap.id theorem isClosedMap_ofDual : IsClosedMap (ofDual : Xᵒᵈ → X) := IsClosedMap.id theorem nhds_toDual (x : X) : 𝓝 (toDual x) = map toDual (𝓝 x) := rfl theorem nhds_ofDual (x : X) : 𝓝 (ofDual x) = map ofDual (𝓝 x) := rfl variable [Preorder X] {x : X} instance OrderDual.instNeBotNhdsWithinIoi [(𝓝[<] x).NeBot] : (𝓝[>] toDual x).NeBot := ‹_› instance OrderDual.instNeBotNhdsWithinIio [(𝓝[>] x).NeBot] : (𝓝[<] toDual x).NeBot := ‹_› end theorem Quotient.preimage_mem_nhds [TopologicalSpace X] [s : Setoid X] {V : Set <\| Quotient s} {x : X} (hs : V ∈ 𝓝 (Quotient.mk' x)) : Quotient.mk' ⁻¹' V ∈ 𝓝 x := preimage_nhds_coinduced hs /-- The image of a dense set under `Quotient.mk'` is a dense set. -/ theorem Dense.quotient [Setoid X] [TopologicalSpace X] {s : Set X} (H : Dense s) : Dense (Quotient.mk' '' s) := Quotient.mk''_surjective.denseRange.dense_image continuous_coinduced_rng H /-- The composition of `Quotient.mk'` and a function with dense range has dense range. -/ theorem DenseRange.quotient [Setoid X] [TopologicalSpace X] {f : Y → X} (hf : DenseRange f) : DenseRange (Quotient.mk' ∘ f) := Quotient.mk''_surjective.denseRange.comp hf continuous_coinduced_rng theorem continuous_map_of_le {α : Type} [TopologicalSpace α] {s t : Setoid α} (h : s ≤ t) : Continuous (Setoid.map_of_le h) := continuous_coinduced_rng theorem continuous_map_sInf {α : Type} [TopologicalSpace α] {S : Set (Setoid α)} {s : Setoid α} (h : s ∈ S) : Continuous (Setoid.map_sInf h) := continuous_coinduced_rng instance {p : X → Prop} [TopologicalSpace X] [DiscreteTopology X] : DiscreteTopology (Subtype p) := ⟨bot_unique fun s _ => ⟨(↑) '' s, isOpen_discrete _, preimage_image_eq _ Subtype.val_injective⟩⟩ instance Sum.discreteTopology [TopologicalSpace X] [TopologicalSpace Y] [h : DiscreteTopology X] [hY : DiscreteTopology Y] : DiscreteTopology (X ⊕ Y) := ⟨sup_eq_bot_iff.2 <\| by simp [h.eq_bot, hY.eq_bot]⟩ instance Sigma.discreteTopology {ι : Type} {Y : ι → Type v} [∀ i, TopologicalSpace (Y i)] [h : ∀ i, DiscreteTopology (Y i)] : DiscreteTopology (Sigma Y) := ⟨iSup_eq_bot.2 fun _ => by simp only [(h _).eq_bot, coinduced_bot]⟩ @[simp] lemma comap_nhdsWithin_range {α β} [TopologicalSpace β] (f : α → β) (y : β) : comap f (𝓝[range f] y) = comap f (𝓝 y) := comap_inf_principal_range section Top variable [TopologicalSpace X] /- The 𝓝 filter and the subspace topology. -/ theorem mem_nhds_subtype (s : Set X) (x : { x // x ∈ s }) (t : Set { x // x ∈ s }) : t ∈ 𝓝 x ↔ ∃ u ∈ 𝓝 (x : X), Subtype.val ⁻¹' u ⊆ t := mem_nhds_induced _ x t theorem nhds_subtype (s : Set X) (x : { x // x ∈ s }) : 𝓝 x = comap (↑) (𝓝 (x : X)) := nhds_induced _ x lemma nhds_subtype_eq_comap_nhdsWithin (s : Set X) (x : { x // x ∈ s }) : 𝓝 x = comap (↑) (𝓝[s] (x : X)) := by rw [nhds_subtype, ← comap_nhdsWithin_range, Subtype.range_val] theorem nhdsWithin_subtype_eq_bot_iff {s t : Set X} {x : s} : 𝓝[((↑) : s → X) ⁻¹' t] x = ⊥ ↔ 𝓝[t] (x : X) ⊓ 𝓟 s = ⊥ := by rw [inf_principal_eq_bot_iff_comap, nhdsWithin, nhdsWithin, comap_inf, comap_principal, nhds_induced] theorem nhds_ne_subtype_eq_bot_iff {S : Set X} {x : S} : 𝓝[≠] x = ⊥ ↔ 𝓝[≠] (x : X) ⊓ 𝓟 S = ⊥ := by rw [← nhdsWithin_subtype_eq_bot_iff, preimage_compl, ← image_singleton, Subtype.coe_injective.preimage_image] theorem nhds_ne_subtype_neBot_iff {S : Set X} {x : S} : (𝓝[≠] x).NeBot ↔ (𝓝[≠] (x : X) ⊓ 𝓟 S).NeBot := by rw [neBot_iff, neBot_iff, not_iff_not, nhds_ne_subtype_eq_bot_iff] theorem discreteTopology_subtype_iff {S : Set X} : DiscreteTopology S ↔ ∀ x ∈ S, 𝓝[≠] x ⊓ 𝓟 S = ⊥ := by simp_rw [discreteTopology_iff_nhds_ne, SetCoe.forall', nhds_ne_subtype_eq_bot_iff] end Top /-- A type synonym equipped with the topology whose open sets are the empty set and the sets with finite complements. -/ def CofiniteTopology (X : Type) := X namespace CofiniteTopology /-- The identity equivalence between `` and `CofiniteTopology `. -/ def of : X ≃ CofiniteTopology X := Equiv.refl X instance [Inhabited X] : Inhabited (CofiniteTopology X) where default := of default instance : TopologicalSpace (CofiniteTopology X) where IsOpen s := s.Nonempty → Set.Finite sᶜ isOpen_univ := by simp isOpen_inter s t := by rintro hs ht ⟨x, hxs, hxt⟩ rw [compl_inter] exact (hs ⟨x, hxs⟩).union (ht ⟨x, hxt⟩) isOpen_sUnion := by rintro s h ⟨x, t, hts, hzt⟩ rw [compl_sUnion] exact Finite.sInter (mem_image_of_mem _ hts) (h t hts ⟨x, hzt⟩) theorem isOpen_iff {s : Set (CofiniteTopology X)} : IsOpen s ↔ s.Nonempty → sᶜ.Finite := Iff.rfl theorem isOpen_iff' {s : Set (CofiniteTopology X)} : IsOpen s ↔ s = ∅ ∨ sᶜ.Finite := by simp only [isOpen_iff, nonempty_iff_ne_empty, or_iff_not_imp_left] theorem isClosed_iff {s : Set (CofiniteTopology X)} : IsClosed s ↔ s = univ ∨ s.Finite := by simp only [← isOpen_compl_iff, isOpen_iff', compl_compl, compl_empty_iff] theorem nhds_eq (x : CofiniteTopology X) : 𝓝 x = pure x ⊔ cofinite := by ext U rw [mem_nhds_iff] constructor · rintro ⟨V, hVU, V_op, haV⟩ exact mem_sup.mpr ⟨hVU haV, mem_of_superset (V_op ⟨_, haV⟩) hVU⟩ · rintro ⟨hU : x ∈ U, hU' : Uᶜ.Finite⟩ exact ⟨U, Subset.rfl, fun _ => hU', hU⟩ theorem mem_nhds_iff {x : CofiniteTopology X} {s : Set (CofiniteTopology X)} : s ∈ 𝓝 x ↔ x ∈ s ∧ sᶜ.Finite := by simp [nhds_eq] end CofiniteTopology end Constructions section Prod variable [TopologicalSpace X] [TopologicalSpace Y] theorem MapClusterPt.curry_prodMap {α β : Type} {f : α → X} {g : β → Y} {la : Filter α} {lb : Filter β} {x : X} {y : Y} (hf : MapClusterPt x la f) (hg : MapClusterPt y lb g) : MapClusterPt (x, y) (la.curry lb) (.map f g) := by rw [mapClusterPt_iff_frequently] at hf hg rw [((𝓝 x).basis_sets.prod_nhds (𝓝 y).basis_sets).mapClusterPt_iff_frequently] rintro ⟨s, t⟩ ⟨hs, ht⟩ rw [frequently_curry_iff] exact (hf s hs).mono fun x hx ↦ (hg t ht).mono fun y hy ↦ ⟨hx, hy⟩ theorem MapClusterPt.prodMap {α β : Type} {f : α → X} {g : β → Y} {la : Filter α} {lb : Filter β} {x : X} {y : Y} (hf : MapClusterPt x la f) (hg : MapClusterPt y lb g) : MapClusterPt (x, y) (la ×ˢ lb) (.map f g) := (hf.curry_prodMap hg).mono <\| map_mono curry_le_prod end Prod section Bool lemma continuous_bool_rng [TopologicalSpace X] {f : X → Bool} (b : Bool) : Continuous f ↔ IsClopen (f ⁻¹' {b}) := by rw [continuous_discrete_rng, Bool.forall_bool' b, IsClopen, ← isOpen_compl_iff, ← preimage_compl, Bool.compl_singleton, and_comm] end Bool section Subtype variable [TopologicalSpace X] [TopologicalSpace Y] {p : X → Prop} lemma Topology.IsInducing.subtypeVal {t : Set Y} : IsInducing ((↑) : t → Y) := ⟨rfl⟩ @[deprecated (since := "2024-10-28")] alias inducing_subtype_val := IsInducing.subtypeVal lemma Topology.IsInducing.of_codRestrict {f : X → Y} {t : Set Y} (ht : ∀ x, f x ∈ t) (h : IsInducing (t.codRestrict f ht)) : IsInducing f := subtypeVal.comp h @[deprecated (since := "2024-10-28")] alias Inducing.of_codRestrict := IsInducing.of_codRestrict lemma Topology.IsEmbedding.subtypeVal : IsEmbedding ((↑) : Subtype p → X) := ⟨.subtypeVal, Subtype.coe_injective⟩ @[deprecated (since := "2024-10-26")] alias embedding_subtype_val := IsEmbedding.subtypeVal theorem Topology.IsClosedEmbedding.subtypeVal (h : IsClosed {a \| p a}) : IsClosedEmbedding ((↑) : Subtype p → X) := ⟨.subtypeVal, by rwa [Subtype.range_coe_subtype]⟩ @[continuity, fun_prop] theorem continuous_subtype_val : Continuous (@Subtype.val X p) := continuous_induced_dom theorem Continuous.subtype_val {f : Y → Subtype p} (hf : Continuous f) : Continuous fun x => (f x : X) := continuous_subtype_val.comp hf theorem IsOpen.isOpenEmbedding_subtypeVal {s : Set X} (hs : IsOpen s) : IsOpenEmbedding ((↑) : s → X) := ⟨.subtypeVal, (@Subtype.range_coe _ s).symm ▸ hs⟩ theorem IsOpen.isOpenMap_subtype_val {s : Set X} (hs : IsOpen s) : IsOpenMap ((↑) : s → X) := hs.isOpenEmbedding_subtypeVal.isOpenMap theorem IsOpenMap.restrict {f : X → Y} (hf : IsOpenMap f) {s : Set X} (hs : IsOpen s) : IsOpenMap (s.restrict f) := hf.comp hs.isOpenMap_subtype_val lemma IsClosed.isClosedEmbedding_subtypeVal {s : Set X} (hs : IsClosed s) : IsClosedEmbedding ((↑) : s → X) := .subtypeVal hs theorem IsClosed.isClosedMap_subtype_val {s : Set X} (hs : IsClosed s) : IsClosedMap ((↑) : s → X) := hs.isClosedEmbedding_subtypeVal.isClosedMap @[continuity, fun_prop] theorem Continuous.subtype_mk {f : Y → X} (h : Continuous f) (hp : ∀ x, p (f x)) : Continuous fun x => (⟨f x, hp x⟩ : Subtype p) := continuous_induced_rng.2 h theorem Continuous.subtype_map {f : X → Y} (h : Continuous f) {q : Y → Prop} (hpq : ∀ x, p x → q (f x)) : Continuous (Subtype.map f hpq) := (h.comp continuous_subtype_val).subtype_mk _ theorem continuous_inclusion {s t : Set X} (h : s ⊆ t) : Continuous (inclusion h) := continuous_id.subtype_map h theorem continuousAt_subtype_val {p : X → Prop} {x : Subtype p} : ContinuousAt ((↑) : Subtype p → X) x := continuous_subtype_val.continuousAt theorem Subtype.dense_iff {s : Set X} {t : Set s} : Dense t ↔ s ⊆ closure ((↑) '' t) := by rw [IsInducing.subtypeVal.dense_iff, SetCoe.forall] rfl theorem map_nhds_subtype_val {s : Set X} (x : s) : map ((↑) : s → X) (𝓝 x) = 𝓝[s] ↑x := by rw [IsInducing.subtypeVal.map_nhds_eq, Subtype.range_val] theorem map_nhds_subtype_coe_eq_nhds {x : X} (hx : p x) (h : ∀ᶠ x in 𝓝 x, p x) : map ((↑) : Subtype p → X) (𝓝 ⟨x, hx⟩) = 𝓝 x := map_nhds_induced_of_mem <\| by rw [Subtype.range_val]; exact h theorem nhds_subtype_eq_comap {x : X} {h : p x} : 𝓝 (⟨x, h⟩ : Subtype p) = comap (↑) (𝓝 x) := nhds_induced _ _ theorem tendsto_subtype_rng {Y : Type} {p : X → Prop} {l : Filter Y} {f : Y → Subtype p} : ∀ {x : Subtype p}, Tendsto f l (𝓝 x) ↔ Tendsto (fun x => (f x : X)) l (𝓝 (x : X)) \| ⟨a, ha⟩ => by rw [nhds_subtype_eq_comap, tendsto_comap_iff]; rfl theorem closure_subtype {x : { a // p a }} {s : Set { a // p a }} : x ∈ closure s ↔ (x : X) ∈ closure (((↑) : _ → X) '' s) := closure_induced @[simp] theorem continuousAt_codRestrict_iff {f : X → Y} {t : Set Y} (h1 : ∀ x, f x ∈ t) {x : X} : ContinuousAt (codRestrict f t h1) x ↔ ContinuousAt f x := IsInducing.subtypeVal.continuousAt_iff alias ⟨_, ContinuousAt.codRestrict⟩ := continuousAt_codRestrict_iff theorem ContinuousAt.restrict {f : X → Y} {s : Set X} {t : Set Y} (h1 : MapsTo f s t) {x : s} (h2 : ContinuousAt f x) : ContinuousAt (h1.restrict f s t) x := (h2.comp continuousAt_subtype_val).codRestrict _ theorem ContinuousAt.restrictPreimage {f : X → Y} {s : Set Y} {x : f ⁻¹' s} (h : ContinuousAt f x) : ContinuousAt (s.restrictPreimage f) x := h.restrict _ @[continuity, fun_prop] theorem Continuous.codRestrict {f : X → Y} {s : Set Y} (hf : Continuous f) (hs : ∀ a, f a ∈ s) : Continuous (s.codRestrict f hs) := hf.subtype_mk hs @[continuity, fun_prop] theorem Continuous.restrict {f : X → Y} {s : Set X} {t : Set Y} (h1 : MapsTo f s t) (h2 : Continuous f) : Continuous (h1.restrict f s t) := (h2.comp continuous_subtype_val).codRestrict _ @[continuity, fun_prop] theorem Continuous.restrictPreimage {f : X → Y} {s : Set Y} (h : Continuous f) : Continuous (s.restrictPreimage f) := h.restrict _ lemma Topology.IsEmbedding.restrict {f : X → Y} (hf : IsEmbedding f) {s : Set X} {t : Set Y} (H : s.MapsTo f t) : IsEmbedding H.restrict := .of_comp (hf.continuous.restrict H) continuous_subtype_val (hf.comp .subtypeVal) lemma Topology.IsOpenEmbedding.restrict {f : X → Y} (hf : IsOpenEmbedding f) {s : Set X} {t : Set Y} (H : s.MapsTo f t) (hs : IsOpen s) : IsOpenEmbedding H.restrict := ⟨hf.isEmbedding.restrict H, (by rw [MapsTo.range_restrict] exact continuous_subtype_val.1 _ (hf.isOpenMap _ hs))⟩ theorem Topology.IsInducing.codRestrict {e : X → Y} (he : IsInducing e) {s : Set Y} (hs : ∀ x, e x ∈ s) : IsInducing (codRestrict e s hs) := he.of_comp (he.continuous.codRestrict hs) continuous_subtype_val @[deprecated (since := "2024-10-28")] alias Inducing.codRestrict := IsInducing.codRestrict protected lemma Topology.IsEmbedding.codRestrict {e : X → Y} (he : IsEmbedding e) (s : Set Y) (hs : ∀ x, e x ∈ s) : IsEmbedding (codRestrict e s hs) := he.of_comp (he.continuous.codRestrict hs) continuous_subtype_val @[deprecated (since := "2024-10-26")] alias Embedding.codRestrict := IsEmbedding.codRestrict variable {s t : Set X} protected lemma Topology.IsEmbedding.inclusion (h : s ⊆ t) : IsEmbedding (inclusion h) := IsEmbedding.subtypeVal.codRestrict _ _ protected lemma Topology.IsOpenEmbedding.inclusion (hst : s ⊆ t) (hs : IsOpen (t ↓∩ s)) : IsOpenEmbedding (inclusion hst) where toIsEmbedding := .inclusion _ isOpen_range := by rwa [range_inclusion] protected lemma Topology.IsClosedEmbedding.inclusion (hst : s ⊆ t) (hs : IsClosed (t ↓∩ s)) : IsClosedEmbedding (inclusion hst) where toIsEmbedding := .inclusion _ isClosed_range := by rwa [range_inclusion] @[deprecated (since := "2024-10-26")] alias embedding_inclusion := IsEmbedding.inclusion /-- Let `s, t ⊆ X` be two subsets of a topological space `X`. If `t ⊆ s` and the topology induced by `X`on `s` is discrete, then also the topology induces on `t` is discrete. -/ theorem DiscreteTopology.of_subset {X : Type} [TopologicalSpace X] {s t : Set X} (_ : DiscreteTopology s) (ts : t ⊆ s) : DiscreteTopology t := (IsEmbedding.inclusion ts).discreteTopology /-- Let `s` be a discrete subset of a topological space. Then the preimage of `s` by a continuous injective map is also discrete. -/ theorem DiscreteTopology.preimage_of_continuous_injective {X Y : Type} [TopologicalSpace X] [TopologicalSpace Y] (s : Set Y) [DiscreteTopology s] {f : X → Y} (hc : Continuous f) (hinj : Function.Injective f) : DiscreteTopology (f ⁻¹' s) := DiscreteTopology.of_continuous_injective (β := s) (Continuous.restrict (by exact fun _ x ↦ x) hc) ((MapsTo.restrict_inj _).mpr hinj.injOn) /-- If `f : X → Y` is a quotient map, then its restriction to the preimage of an open set is a quotient map too. -/ theorem Topology.IsQuotientMap.restrictPreimage_isOpen {f : X → Y} (hf : IsQuotientMap f) {s : Set Y} (hs : IsOpen s) : IsQuotientMap (s.restrictPreimage f) := by refine isQuotientMap_iff.2 ⟨hf.surjective.restrictPreimage _, fun U ↦ ?_⟩ rw [hs.isOpenEmbedding_subtypeVal.isOpen_iff_image_isOpen, ← hf.isOpen_preimage, (hs.preimage hf.continuous).isOpenEmbedding_subtypeVal.isOpen_iff_image_isOpen, image_val_preimage_restrictPreimage] @[deprecated (since := "2024-10-22")] alias QuotientMap.restrictPreimage_isOpen := IsQuotientMap.restrictPreimage_isOpen open scoped Set.Notation in lemma isClosed_preimage_val {s t : Set X} : IsClosed (s ↓∩ t) ↔ s ∩ closure (s ∩ t) ⊆ t := by rw [← closure_eq_iff_isClosed, IsEmbedding.subtypeVal.closure_eq_preimage_closure_image, ← Subtype.val_injective.image_injective.eq_iff, Subtype.image_preimage_coe, Subtype.image_preimage_coe, subset_antisymm_iff, and_iff_left, Set.subset_inter_iff, and_iff_right] exacts [Set.inter_subset_left, Set.subset_inter Set.inter_subset_left subset_closure] theorem frontier_inter_open_inter {s t : Set X} (ht : IsOpen t) : frontier (s ∩ t) ∩ t = frontier s ∩ t := by simp only [Set.inter_comm _ t, ← Subtype.preimage_coe_eq_preimage_coe_iff, ht.isOpenMap_subtype_val.preimage_frontier_eq_frontier_preimage continuous_subtype_val, Subtype.preimage_coe_self_inter] section SetNotation open scoped Set.Notation lemma IsOpen.preimage_val {s t : Set X} (ht : IsOpen t) : IsOpen (s ↓∩ t) := ht.preimage continuous_subtype_val lemma IsClosed.preimage_val {s t : Set X} (ht : IsClosed t) : IsClosed (s ↓∩ t) := ht.preimage continuous_subtype_val @[simp] lemma IsOpen.inter_preimage_val_iff {s t : Set X} (hs : IsOpen s) : IsOpen (s ↓∩ t) ↔ IsOpen (s ∩ t) := ⟨fun h ↦ by simpa using hs.isOpenMap_subtype_val _ h, fun h ↦ (Subtype.preimage_coe_self_inter _ _).symm ▸ h.preimage_val⟩ @[simp] lemma IsClosed.inter_preimage_val_iff {s t : Set X} (hs : IsClosed s) : IsClosed (s ↓∩ t) ↔ IsClosed (s ∩ t) := ⟨fun h ↦ by simpa using hs.isClosedMap_subtype_val _ h, fun h ↦ (Subtype.preimage_coe_self_inter _ _).symm ▸ h.preimage_val⟩ end SetNotation end Subtype section Quotient variable [TopologicalSpace X] [TopologicalSpace Y] variable {r : X → X → Prop} {s : Setoid X} theorem isQuotientMap_quot_mk : IsQuotientMap (@Quot.mk X r) := ⟨Quot.exists_rep, rfl⟩ @[deprecated (since := "2024-10-22")] alias quotientMap_quot_mk := isQuotientMap_quot_mk @[continuity, fun_prop] theorem continuous_quot_mk : Continuous (@Quot.mk X r) := continuous_coinduced_rng @[continuity, fun_prop] theorem continuous_quot_lift {f : X → Y} (hr : ∀ a b, r a b → f a = f b) (h : Continuous f) : Continuous (Quot.lift f hr : Quot r → Y) := continuous_coinduced_dom.2 h theorem isQuotientMap_quotient_mk' : IsQuotientMap (@Quotient.mk' X s) := isQuotientMap_quot_mk @[deprecated (since := "2024-10-22")] alias quotientMap_quotient_mk' := isQuotientMap_quotient_mk' theorem continuous_quotient_mk' : Continuous (@Quotient.mk' X s) := continuous_coinduced_rng theorem Continuous.quotient_lift {f : X → Y} (h : Continuous f) (hs : ∀ a b, a ≈ b → f a = f b) : Continuous (Quotient.lift f hs : Quotient s → Y) := continuous_coinduced_dom.2 h theorem Continuous.quotient_liftOn' {f : X → Y} (h : Continuous f) (hs : ∀ a b, s a b → f a = f b) : Continuous (fun x => Quotient.liftOn' x f hs : Quotient s → Y) := h.quotient_lift hs open scoped Relator in @[continuity, fun_prop] theorem Continuous.quotient_map' {t : Setoid Y} {f : X → Y} (hf : Continuous f) (H : (s.r ⇒ t.r) f f) : Continuous (Quotient.map' f H) := (continuous_quotient_mk'.comp hf).quotient_lift _ end Quotient section Pi variable {ι : Type} {π : ι → Type} {κ : Type} [TopologicalSpace X] [T : ∀ i, TopologicalSpace (π i)] {f : X → ∀ i : ι, π i} theorem continuous_pi_iff : Continuous f ↔ ∀ i, Continuous fun a => f a i := by simp only [continuous_iInf_rng, continuous_induced_rng, comp_def] @[continuity, fun_prop] theorem continuous_pi (h : ∀ i, Continuous fun a => f a i) : Continuous f := continuous_pi_iff.2 h @[continuity, fun_prop] theorem continuous_apply (i : ι) : Continuous fun p : ∀ i, π i => p i := continuous_iInf_dom continuous_induced_dom @[continuity] theorem continuous_apply_apply {ρ : κ → ι → Type} [∀ j i, TopologicalSpace (ρ j i)] (j : κ) (i : ι) : Continuous fun p : ∀ j, ∀ i, ρ j i => p j i := (continuous_apply i).comp (continuous_apply j) theorem continuousAt_apply (i : ι) (x : ∀ i, π i) : ContinuousAt (fun p : ∀ i, π i => p i) x := (continuous_apply i).continuousAt theorem Filter.Tendsto.apply_nhds {l : Filter Y} {f : Y → ∀ i, π i} {x : ∀ i, π i} (h : Tendsto f l (𝓝 x)) (i : ι) : Tendsto (fun a => f a i) l (𝓝 <\| x i) := (continuousAt_apply i _).tendsto.comp h @[fun_prop] protected theorem Continuous.piMap {Y : ι → Type} [∀ i, TopologicalSpace (Y i)] {f : ∀ i, π i → Y i} (hf : ∀ i, Continuous (f i)) : Continuous (Pi.map f) := continuous_pi fun i ↦ (hf i).comp (continuous_apply i) theorem nhds_pi {a : ∀ i, π i} : 𝓝 a = pi fun i => 𝓝 (a i) := by simp only [nhds_iInf, nhds_induced, Filter.pi] protected theorem IsOpenMap.piMap {Y : ι → Type} [∀ i, TopologicalSpace (Y i)] {f : ∀ i, π i → Y i} (hfo : ∀ i, IsOpenMap (f i)) (hsurj : ∀ᶠ i in cofinite, Surjective (f i)) : IsOpenMap (Pi.map f) := by refine IsOpenMap.of_nhds_le fun x ↦ ?_ rw [nhds_pi, nhds_pi, map_piMap_pi hsurj] exact Filter.pi_mono fun i ↦ (hfo i).nhds_le _ protected theorem IsOpenQuotientMap.piMap {Y : ι → Type} [∀ i, TopologicalSpace (Y i)] {f : ∀ i, π i → Y i} (hf : ∀ i, IsOpenQuotientMap (f i)) : IsOpenQuotientMap (Pi.map f) := ⟨.piMap fun i ↦ (hf i).1, .piMap fun i ↦ (hf i).2, .piMap (fun i ↦ (hf i).3) <\| .of_forall fun i ↦ (hf i).1⟩ theorem tendsto_pi_nhds {f : Y → ∀ i, π i} {g : ∀ i, π i} {u : Filter Y} : Tendsto f u (𝓝 g) ↔ ∀ x, Tendsto (fun i => f i x) u (𝓝 (g x)) := by rw [nhds_pi, Filter.tendsto_pi] theorem continuousAt_pi {f : X → ∀ i, π i} {x : X} : ContinuousAt f x ↔ ∀ i, ContinuousAt (fun y => f y i) x := tendsto_pi_nhds @[fun_prop] theorem continuousAt_pi' {f : X → ∀ i, π i} {x : X} (hf : ∀ i, ContinuousAt (fun y => f y i) x) : ContinuousAt f x := continuousAt_pi.2 hf @[fun_prop] protected theorem ContinuousAt.piMap {Y : ι → Type} [∀ i, TopologicalSpace (Y i)] {f : ∀ i, π i → Y i} {x : ∀ i, π i} (hf : ∀ i, ContinuousAt (f i) (x i)) : ContinuousAt (Pi.map f) x := continuousAt_pi.2 fun i ↦ (hf i).comp (continuousAt_apply i x) theorem Pi.continuous_precomp' {ι' : Type} (φ : ι' → ι) : Continuous (fun (f : (∀ i, π i)) (j : ι') ↦ f (φ j)) := continuous_pi fun j ↦ continuous_apply (φ j) theorem Pi.continuous_precomp {ι' : Type} (φ : ι' → ι) : Continuous (· ∘ φ : (ι → X) → (ι' → X)) := Pi.continuous_precomp' φ theorem Pi.continuous_postcomp' {X : ι → Type} [∀ i, TopologicalSpace (X i)] {g : ∀ i, π i → X i} (hg : ∀ i, Continuous (g i)) : Continuous (fun (f : (∀ i, π i)) (i : ι) ↦ g i (f i)) := continuous_pi fun i ↦ (hg i).comp <\| continuous_apply i theorem Pi.continuous_postcomp [TopologicalSpace Y] {g : X → Y} (hg : Continuous g) : Continuous (g ∘ · : (ι → X) → (ι → Y)) := Pi.continuous_postcomp' fun _ ↦ hg lemma Pi.induced_precomp' {ι' : Type} (φ : ι' → ι) : induced (fun (f : (∀ i, π i)) (j : ι') ↦ f (φ j)) Pi.topologicalSpace = ⨅ i', induced (eval (φ i')) (T (φ i')) := by simp [Pi.topologicalSpace, induced_iInf, induced_compose, comp_def] lemma Pi.induced_precomp [TopologicalSpace Y] {ι' : Type} (φ : ι' → ι) : induced (· ∘ φ) Pi.topologicalSpace = ⨅ i', induced (eval (φ i')) ‹TopologicalSpace Y› := induced_precomp' φ @[continuity, fun_prop] lemma Pi.continuous_restrict (S : Set ι) : Continuous (S.restrict : (∀ i : ι, π i) → (∀ i : S, π i)) := Pi.continuous_precomp' ((↑) : S → ι) @[continuity, fun_prop] lemma Pi.continuous_restrict₂ {s t : Set ι} (hst : s ⊆ t) : Continuous (restrict₂ (π := π) hst) := continuous_pi fun _ ↦ continuous_apply _ @[continuity, fun_prop] theorem Finset.continuous_restrict (s : Finset ι) : Continuous (s.restrict (π := π)) := continuous_pi fun _ ↦ continuous_apply _ @[continuity, fun_prop] theorem Finset.continuous_restrict₂ {s t : Finset ι} (hst : s ⊆ t) : Continuous (Finset.restrict₂ (π := π) hst) := continuous_pi fun _ ↦ continuous_apply _ variable [TopologicalSpace Z] @[continuity, fun_prop] theorem Pi.continuous_restrict_apply (s : Set X) {f : X → Z} (hf : Continuous f) : Continuous (s.restrict f) := hf.comp continuous_subtype_val @[continuity, fun_prop] theorem Pi.continuous_restrict₂_apply {s t : Set X} (hst : s ⊆ t) {f : t → Z} (hf : Continuous f) : Continuous (restrict₂ (π := fun _ ↦ Z) hst f) := hf.comp (continuous_inclusion hst) @[continuity, fun_prop] theorem Finset.continuous_restrict_apply (s : Finset X) {f : X → Z} (hf : Continuous f) : Continuous (s.restrict f) := hf.comp continuous_subtype_val @[continuity, fun_prop] theorem Finset.continuous_restrict₂_apply {s t : Finset X} (hst : s ⊆ t) {f : t → Z} (hf : Continuous f) : Continuous (restrict₂ (π := fun _ ↦ Z) hst f) := hf.comp (continuous_inclusion hst) lemma Pi.induced_restrict (S : Set ι) : induced (S.restrict) Pi.topologicalSpace = ⨅ i ∈ S, induced (eval i) (T i) := by simp +unfoldPartialApp [← iInf_subtype'', ← induced_precomp' ((↑) : S → ι), restrict] lemma Pi.induced_restrict_sUnion (𝔖 : Set (Set ι)) : induced (⋃₀ 𝔖).restrict (Pi.topologicalSpace (Y := fun i : (⋃₀ 𝔖) ↦ π i)) = ⨅ S ∈ 𝔖, induced S.restrict Pi.topologicalSpace := by simp_rw [Pi.induced_restrict, iInf_sUnion] theorem Filter.Tendsto.update [DecidableEq ι] {l : Filter Y} {f : Y → ∀ i, π i} {x : ∀ i, π i} (hf : Tendsto f l (𝓝 x)) (i : ι) {g : Y → π i} {xi : π i} (hg : Tendsto g l (𝓝 xi)) : Tendsto (fun a => update (f a) i (g a)) l (𝓝 <\| update x i xi) := tendsto_pi_nhds.2 fun j => by rcases eq_or_ne j i with (rfl \| hj) <;> simp [, hf.apply_nhds] theorem ContinuousAt.update [DecidableEq ι] {x : X} (hf : ContinuousAt f x) (i : ι) {g : X → π i} (hg : ContinuousAt g x) : ContinuousAt (fun a => update (f a) i (g a)) x := hf.tendsto.update i hg theorem Continuous.update [DecidableEq ι] (hf : Continuous f) (i : ι) {g : X → π i} (hg : Continuous g) : Continuous fun a => update (f a) i (g a) := continuous_iff_continuousAt.2 fun _ => hf.continuousAt.update i hg.continuousAt /-- `Function.update f i x` is continuous in `(f, x)`. -/ @[continuity, fun_prop] theorem continuous_update [DecidableEq ι] (i : ι) : Continuous fun f : (∀ j, π j) × π i => update f.1 i f.2 := continuous_fst.update i continuous_snd /-- `Pi.mulSingle i x` is continuous in `x`. -/ @[to_additive (attr := continuity) "`Pi.single i x` is continuous in `x`."] theorem continuous_mulSingle [∀ i, One (π i)] [DecidableEq ι] (i : ι) : Continuous fun x => (Pi.mulSingle i x : ∀ i, π i) := continuous_const.update _ continuous_id section Fin variable {n : ℕ} {π : Fin (n + 1) → Type*} [∀ i, TopologicalSpace (π i)] theorem Filter.Tendsto.finCons {f : Y → π 0} {g : Y → ∀ j : Fin n, π j.succ} {l : Filter Y} {x : π 0} {y : ∀ j, π (Fin.succ j)} (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (fun a => Fin.cons (f a) (g a)) l (𝓝 <\| Fin.cons x y) := tendsto_pi_nhds.2 fun j => Fin.cases (by simpa) (by simpa using tendsto_pi_nhds.1 hg) j theorem ContinuousAt.finCons {f : X → π 0} {g : X → ∀ j : Fin n, π (Fin.succ j)} {x : X} (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun a => Fin.cons (f a) (g a)) x := hf.tendsto.finCons hg theorem Continuous.finCons {f : X → π 0} {g : X → ∀ j : Fin n, π (Fin.succ j)} (hf : Continuous f) (hg : Continuous g) : Continuous fun a => Fin.cons (f a) (g a) := continuous_iff_continuousAt.2 fun _ => hf.continuousAt.finCons hg.continuousAt theorem Filter.Tendsto.matrixVecCons {f : Y → Z} {g : Y → Fin n → Z} {l : Filter Y} {x : Z} {y : Fin n → Z} (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (fun a => Matrix.vecCons (f a) (g a)) l (𝓝 <\| Matrix.vecCons x y) := hf.finCons hg theorem ContinuousAt.matrixVecCons {f : X → Z} {g : X → Fin n → Z} {x : X} (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun a => Matrix.vecCons (f a) (g a)) x := hf.finCons hg theorem Continuous.matrixVecCons {f : X → Z} {g : X → Fin n → Z} (hf : Continuous f) (hg : Continuous g) : Continuous fun a => Matrix.vecCons (f a) (g a) := hf.finCons hg theorem Filter.Tendsto.finSnoc {f : Y → ∀ j : Fin n, π j.castSucc} {g : Y → π (Fin.last _)} {l : Filter Y} {x : ∀ j, π (Fin.castSucc j)} {y : π (Fin.last _)} (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (fun a => Fin.snoc (f a) (g a)) l (𝓝 <\| Fin.snoc x y) := tendsto_pi_nhds.2 fun j => Fin.lastCases (by simpa) (by simpa using tendsto_pi_nhds.1 hf) j theorem ContinuousAt.finSnoc {f : X → ∀ j : Fin n, π j.castSucc} {g : X → π (Fin.last _)} {x : X} (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun a => Fin.snoc (f a) (g a)) x := hf.tendsto.finSnoc hg theorem Continuous.finSnoc {f : X → ∀ j : Fin n, π j.castSucc} {g : X → π (Fin.last _)} (hf : Continuous f) (hg : Continuous g) : Continuous fun a => Fin.snoc (f a) (g a) := continuous_iff_continuousAt.2 fun _ => hf.continuousAt.finSnoc hg.continuousAt theorem Filter.Tendsto.finInsertNth (i : Fin (n + 1)) {f : Y → π i} {g : Y → ∀ j : Fin n, π (i.succAbove j)} {l : Filter Y} {x : π i} {y : ∀ j, π (i.succAbove j)} (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) : Tendsto (fun a => i.insertNth (f a) (g a)) l (𝓝 <\| i.insertNth x y) := tendsto_pi_nhds.2 fun j => Fin.succAboveCases i (by simpa) (by simpa using tendsto_pi_nhds.1 hg) j @[deprecated (since := "2025-01-02")] alias Filter.Tendsto.fin_insertNth := Filter.Tendsto.finInsertNth theorem ContinuousAt.finInsertNth (i : Fin (n + 1)) {f : X → π i} {g : X → ∀ j : Fin n, π (i.succAbove j)} {x : X} (hf : ContinuousAt f x) (hg : ContinuousAt g x) : ContinuousAt (fun a => i.insertNth (f a) (g a)) x := hf.tendsto.finInsertNth i hg @[deprecated (since := "2025-01-02")] alias ContinuousAt.fin_insertNth := ContinuousAt.finInsertNth theorem Continuous.finInsertNth (i : Fin (n + 1)) {f : X → π i} {g : X → ∀ j : Fin n, π (i.succAbove j)} (hf : Continuous f) (hg : Continuous g) : Continuous fun a => i.insertNth (f a) (g a) := continuous_iff_continuousAt.2 fun _ => hf.continuousAt.finInsertNth i hg.continuousAt @[deprecated (since := "2025-01-02")] alias Continuous.fin_insertNth := Continuous.finInsertNth theorem Filter.Tendsto.finInit {f : Y → ∀ j : Fin (n + 1), π j} {l : Filter Y} {x : ∀ j, π j} (hg : Tendsto f l (𝓝 x)) : Tendsto (fun a ↦ Fin.init (f a)) l (𝓝 <\| Fin.init x) := tendsto_pi_nhds.2 fun j ↦ apply_nhds hg j.castSucc @[fun_prop] theorem ContinuousAt.finInit {f : X → ∀ j : Fin (n + 1), π j} {x : X} (hf : ContinuousAt f x) : ContinuousAt (fun a ↦ Fin.init (f a)) x := hf.tendsto.finInit @[fun_prop] theorem Continuous.finInit {f : X → ∀ j : Fin (n + 1), π j} (hf : Continuous f) : Continuous fun a ↦ Fin.init (f a) := continuous_iff_continuousAt.2 fun _ ↦ hf.continuousAt.finInit theorem Filter.Tendsto.finTail {f : Y → ∀ j : Fin (n + 1), π j} {l : Filter Y} {x : ∀ j, π j} (hg : Tendsto f l (𝓝 x)) : Tendsto (fun a ↦ Fin.tail (f a)) l (𝓝 <\| Fin.tail x) := tendsto_pi_nhds.2 fun j ↦ apply_nhds hg j.succ @[fun_prop] theorem ContinuousAt.finTail {f : X → ∀ j : Fin (n + 1), π j} {x : X} (hf : ContinuousAt f x) : ContinuousAt (fun a ↦ Fin.tail (f a)) x := hf.tendsto.finTail @[fun_prop] theorem Continuous.finTail {f : X → ∀ j : Fin (n + 1), π j} (hf : Continuous f) : Continuous fun a ↦ Fin.tail (f a) := continuous_iff_continuousAt.2 fun _ ↦ hf.continuousAt.finTail end Fin theorem isOpen_set_pi {i : Set ι} {s : ∀ a, Set (π a)} (hi : i.Finite) (hs : ∀ a ∈ i, IsOpen (s a)) : IsOpen (pi i s) := by rw [pi_def]; exact hi.isOpen_biInter fun a ha => (hs _ ha).preimage (continuous_apply _) theorem isOpen_pi_iff {s : Set (∀ a, π a)} : IsOpen s ↔ ∀ f, f ∈ s → ∃ (I : Finset ι) (u : ∀ a, Set (π a)), (∀ a, a ∈ I → IsOpen (u a) ∧ f a ∈ u a) ∧ (I : Set ι).pi u ⊆ s := by rw [isOpen_iff_nhds]	simp_rw [le_principal_iff, nhds_pi, Filter.mem_pi', mem_nhds_iff] refine forall₂_congr fun a _ => ⟨?_, ?_⟩ · rintro ⟨I, t, ⟨h1, h2⟩⟩ refine ⟨I, fun a => eval a '' (I : Set ι).pi fun a => (h1 a).choose, fun i hi => ?_, ?_⟩	Mathlib/Topology/Constructions.lean	864	867
/- Copyright (c) 2020 Kyle Miller. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kyle Miller, Yury Kudryashov -/ import Mathlib.Algebra.Module.BigOperators import Mathlib.Algebra.Order.Ring.Nat import Mathlib.Data.Nat.ModEq /-! # Pigeonhole principles Given pigeons (possibly infinitely many) in pigeonholes, the pigeonhole principle states that, if there are more pigeons than pigeonholes, then there is a pigeonhole with two or more pigeons. There are a few variations on this statement, and the conclusion can be made stronger depending on how many pigeons you know you might have. The basic statements of the pigeonhole principle appear in the following locations: * `Data.Finset.Basic` has `Finset.exists_ne_map_eq_of_card_lt_of_maps_to` * `Data.Fintype.Basic` has `Fintype.exists_ne_map_eq_of_card_lt` * `Data.Fintype.Basic` has `Finite.exists_ne_map_eq_of_infinite` * `Data.Fintype.Basic` has `Finite.exists_infinite_fiber` * `Data.Set.Finite` has `Set.infinite.exists_ne_map_eq_of_mapsTo` This module gives access to these pigeonhole principles along with 20 more. The versions vary by: * using a function between `Fintype`s or a function between possibly infinite types restricted to `Finset`s; * counting pigeons by a general weight function (`∑ x ∈ s, w x`) or by heads (`#s`); * using strict or non-strict inequalities; * establishing upper or lower estimate on the number (or the total weight) of the pigeons in one pigeonhole; * in case when we count pigeons by some weight function `w` and consider a function `f` between `Finset`s `s` and `t`, we can either assume that each pigeon is in one of the pigeonholes (`∀ x ∈ s, f x ∈ t`), or assume that for `y ∉ t`, the total weight of the pigeons in this pigeonhole `∑ x ∈ s with f x = y, w x` is nonpositive or nonnegative depending on the inequality we are proving. Lemma names follow `mathlib` convention (e.g., `Finset.exists_lt_sum_fiber_of_maps_to_of_nsmul_lt_sum`); "pigeonhole principle" is mentioned in the docstrings instead of the names. ## See also * `Ordinal.infinite_pigeonhole`: pigeonhole principle for cardinals, formulated using cofinality; * `MeasureTheory.exists_nonempty_inter_of_measure_univ_lt_tsum_measure`, `MeasureTheory.exists_nonempty_inter_of_measure_univ_lt_sum_measure`: pigeonhole principle in a measure space. ## Tags pigeonhole principle -/ universe u v w variable {α : Type u} {β : Type v} {M : Type w} [DecidableEq β] open Nat namespace Finset variable {s : Finset α} {t : Finset β} {f : α → β} {w : α → M} {b : M} {n : ℕ} /-! ### The pigeonhole principles on `Finset`s, pigeons counted by weight In this section we prove the following version of the pigeonhole principle: if the total weight of a finite set of pigeons is greater than `n • b`, and they are sorted into `n` pigeonholes, then for some pigeonhole, the total weight of the pigeons in this pigeonhole is greater than `b`, and a few variations of this theorem. The principle is formalized in the following way, see `Finset.exists_lt_sum_fiber_of_maps_to_of_nsmul_lt_sum`: if `f : α → β` is a function which maps all elements of `s : Finset α` to `t : Finset β` and `#t • b < ∑ x ∈ s, w x`, where `w : α → M` is a weight function taking values in a `LinearOrderedCancelAddCommMonoid`, then for some `y ∈ t`, the sum of the weights of all `x ∈ s` such that `f x = y` is greater than `b`. There are a few bits we can change in this theorem: * reverse all inequalities, with obvious adjustments to the name; * replace the assumption `∀ a ∈ s, f a ∈ t` with `∀ y ∉ t, ∑ x ∈ s with f x = y, w x ≤ 0`, and replace `of_maps_to` with `of_sum_fiber_nonpos` in the name; * use non-strict inequalities assuming `t` is nonempty. We can do all these variations independently, so we have eight versions of the theorem. -/ section variable [AddCommMonoid M] [LinearOrder M] [IsOrderedCancelAddMonoid M] /-! #### Strict inequality versions -/ /-- The pigeonhole principle for finitely many pigeons counted by weight, strict inequality version: if the total weight of a finite set of pigeons is greater than `n • b`, and they are sorted into `n` pigeonholes, then for some pigeonhole, the total weight of the pigeons in this pigeonhole is greater than `b`. -/ theorem exists_lt_sum_fiber_of_maps_to_of_nsmul_lt_sum (hf : ∀ a ∈ s, f a ∈ t) (hb : #t • b < ∑ x ∈ s, w x) : ∃ y ∈ t, b < ∑ x ∈ s with f x = y, w x := exists_lt_of_sum_lt <\| by simpa only [sum_fiberwise_of_maps_to hf, sum_const] /-- The pigeonhole principle for finitely many pigeons counted by weight, strict inequality version: if the total weight of a finite set of pigeons is less than `n • b`, and they are sorted into `n` pigeonholes, then for some pigeonhole, the total weight of the pigeons in this pigeonhole is less than `b`. -/ theorem exists_sum_fiber_lt_of_maps_to_of_sum_lt_nsmul (hf : ∀ a ∈ s, f a ∈ t) (hb : ∑ x ∈ s, w x < #t • b) : ∃ y ∈ t, ∑ x ∈ s with f x = y, w x < b := exists_lt_sum_fiber_of_maps_to_of_nsmul_lt_sum (M := Mᵒᵈ) hf hb /-- The pigeonhole principle for finitely many pigeons counted by weight, strict inequality version: if the total weight of a finite set of pigeons is greater than `n • b`, they are sorted into some pigeonholes, and for all but `n` pigeonholes the total weight of the pigeons there is nonpositive, then for at least one of these `n` pigeonholes, the total weight of the pigeons in this pigeonhole is greater than `b`. -/ theorem exists_lt_sum_fiber_of_sum_fiber_nonpos_of_nsmul_lt_sum (ht : ∀ y ∉ t, ∑ x ∈ s with f x = y, w x ≤ 0) (hb : #t • b < ∑ x ∈ s, w x) : ∃ y ∈ t, b < ∑ x ∈ s with f x = y, w x := exists_lt_of_sum_lt <\| calc ∑ _y ∈ t, b < ∑ x ∈ s, w x := by simpa _ ≤ ∑ y ∈ t, ∑ x ∈ s with f x = y, w x := sum_le_sum_fiberwise_of_sum_fiber_nonpos ht /-- The pigeonhole principle for finitely many pigeons counted by weight, strict inequality version: if the total weight of a finite set of pigeons is less than `n • b`, they are sorted into some pigeonholes, and for all but `n` pigeonholes the total weight of the pigeons there is nonnegative, then for at least one of these `n` pigeonholes, the total weight of the pigeons in this pigeonhole is less than `b`. -/ theorem exists_sum_fiber_lt_of_sum_fiber_nonneg_of_sum_lt_nsmul (ht : ∀ y ∉ t, (0 : M) ≤ ∑ x ∈ s with f x = y, w x) (hb : ∑ x ∈ s, w x < #t • b) : ∃ y ∈ t, ∑ x ∈ s with f x = y, w x < b := exists_lt_sum_fiber_of_sum_fiber_nonpos_of_nsmul_lt_sum (M := Mᵒᵈ) ht hb /-! #### Non-strict inequality versions -/ /-- The pigeonhole principle for finitely many pigeons counted by weight, non-strict inequality version: if the total weight of a finite set of pigeons is greater than or equal to `n • b`, and they are sorted into `n > 0` pigeonholes, then for some pigeonhole, the total weight of the pigeons in this pigeonhole is greater than or equal to `b`. -/ theorem exists_le_sum_fiber_of_maps_to_of_nsmul_le_sum (hf : ∀ a ∈ s, f a ∈ t) (ht : t.Nonempty) (hb : #t • b ≤ ∑ x ∈ s, w x) : ∃ y ∈ t, b ≤ ∑ x ∈ s with f x = y, w x := exists_le_of_sum_le ht <\| by simpa only [sum_fiberwise_of_maps_to hf, sum_const] /-- The pigeonhole principle for finitely many pigeons counted by weight, non-strict inequality version: if the total weight of a finite set of pigeons is less than or equal to `n • b`, and they are sorted into `n > 0` pigeonholes, then for some pigeonhole, the total weight of the pigeons in this pigeonhole is less than or equal to `b`. -/ theorem exists_sum_fiber_le_of_maps_to_of_sum_le_nsmul (hf : ∀ a ∈ s, f a ∈ t) (ht : t.Nonempty) (hb : ∑ x ∈ s, w x ≤ #t • b) : ∃ y ∈ t, ∑ x ∈ s with f x = y, w x ≤ b := exists_le_sum_fiber_of_maps_to_of_nsmul_le_sum (M := Mᵒᵈ) hf ht hb /-- The pigeonhole principle for finitely many pigeons counted by weight, non-strict inequality version: if the total weight of a finite set of pigeons is greater than or equal to `n • b`, they are sorted into some pigeonholes, and for all but `n > 0` pigeonholes the total weight of the pigeons there is nonpositive, then for at least one of these `n` pigeonholes, the total weight of the pigeons in this pigeonhole is greater than or equal to `b`. -/ theorem exists_le_sum_fiber_of_sum_fiber_nonpos_of_nsmul_le_sum (hf : ∀ y ∉ t, ∑ x ∈ s with f x = y, w x ≤ 0) (ht : t.Nonempty) (hb : #t • b ≤ ∑ x ∈ s, w x) : ∃ y ∈ t, b ≤ ∑ x ∈ s with f x = y, w x := exists_le_of_sum_le ht <\| calc ∑ _y ∈ t, b ≤ ∑ x ∈ s, w x := by simpa _ ≤ ∑ y ∈ t, ∑ x ∈ s with f x = y, w x := sum_le_sum_fiberwise_of_sum_fiber_nonpos hf /-- The pigeonhole principle for finitely many pigeons counted by weight, non-strict inequality version: if the total weight of a finite set of pigeons is less than or equal to `n • b`, they are sorted into some pigeonholes, and for all but `n > 0` pigeonholes the total weight of the pigeons there is nonnegative, then for at least one of these `n` pigeonholes, the total weight of the pigeons in this pigeonhole is less than or equal to `b`. -/ theorem exists_sum_fiber_le_of_sum_fiber_nonneg_of_sum_le_nsmul (hf : ∀ y ∉ t, (0 : M) ≤ ∑ x ∈ s with f x = y, w x) (ht : t.Nonempty) (hb : ∑ x ∈ s, w x ≤ #t • b) : ∃ y ∈ t, ∑ x ∈ s with f x = y, w x ≤ b := exists_le_sum_fiber_of_sum_fiber_nonpos_of_nsmul_le_sum (M := Mᵒᵈ) hf ht hb end variable [CommSemiring M] [LinearOrder M] [IsStrictOrderedRing M] /-! ### The pigeonhole principles on `Finset`s, pigeons counted by heads In this section we formalize a few versions of the following pigeonhole principle: there is a pigeonhole with at least as many pigeons as the ceiling of the average number of pigeons across all pigeonholes. First, we can use strict or non-strict inequalities. While the versions with non-strict inequalities are weaker than those with strict inequalities, sometimes it might be more convenient to apply the weaker version. Second, we can either state that there exists a pigeonhole with at least `n` pigeons, or state that there exists a pigeonhole with at most `n` pigeons. In the latter case we do not need the assumption `∀ a ∈ s, f a ∈ t`. So, we prove four theorems: `Finset.exists_lt_card_fiber_of_maps_to_of_mul_lt_card`, `Finset.exists_le_card_fiber_of_maps_to_of_mul_le_card`, `Finset.exists_card_fiber_lt_of_card_lt_mul`, and `Finset.exists_card_fiber_le_of_card_le_mul`. -/ /-- The pigeonhole principle for finitely many pigeons counted by heads: there is a pigeonhole with at least as many pigeons as the ceiling of the average number of pigeons across all pigeonholes. -/ theorem exists_lt_card_fiber_of_nsmul_lt_card_of_maps_to (hf : ∀ a ∈ s, f a ∈ t) (ht : #t • b < #s) : ∃ y ∈ t, b < #{x ∈ s \| f x = y} := by simp_rw [cast_card] at ht ⊢ exact exists_lt_sum_fiber_of_maps_to_of_nsmul_lt_sum hf ht /-- The pigeonhole principle for finitely many pigeons counted by heads: there is a pigeonhole with at least as many pigeons as the ceiling of the average number of pigeons across all pigeonholes. ("The maximum is at least the mean" specialized to integers.) More formally, given a function between finite sets `s` and `t` and a natural number `n` such that `#t * n < #s`, there exists `y ∈ t` such that its preimage in `s` has more than `n` elements. -/ theorem exists_lt_card_fiber_of_mul_lt_card_of_maps_to (hf : ∀ a ∈ s, f a ∈ t) (hn : #t * n < #s) : ∃ y ∈ t, n < #{x ∈ s \| f x = y} := exists_lt_card_fiber_of_nsmul_lt_card_of_maps_to hf hn /-- The pigeonhole principle for finitely many pigeons counted by heads: there is a pigeonhole with at most as many pigeons as the floor of the average number of pigeons across all pigeonholes. -/ theorem exists_card_fiber_lt_of_card_lt_nsmul (ht : #s < #t • b) : ∃ y ∈ t, #{x ∈ s \| f x = y} < b := by simp_rw [cast_card] at ht ⊢ exact exists_sum_fiber_lt_of_sum_fiber_nonneg_of_sum_lt_nsmul (fun _ _ => sum_nonneg fun _ _ => zero_le_one) ht /-- The pigeonhole principle for finitely many pigeons counted by heads: there is a pigeonhole with at most as many pigeons as the floor of the average number of pigeons across all pigeonholes. ("The minimum is at most the mean" specialized to integers.) More formally, given a function `f`, a finite sets `s` in its domain, a finite set `t` in its codomain, and a natural number `n` such that `#s < #t * n`, there exists `y ∈ t` such that its preimage in `s` has less than `n` elements. -/ theorem exists_card_fiber_lt_of_card_lt_mul (hn : #s < #t * n) : ∃ y ∈ t, #{x ∈ s \| f x = y} < n := exists_card_fiber_lt_of_card_lt_nsmul hn	/-- The pigeonhole principle for finitely many pigeons counted by heads: given a function between finite sets `s` and `t` and a number `b` such that `#t • b ≤ #s`, there exists `y ∈ t` such that its preimage in `s` has at least `b` elements. See also `Finset.exists_lt_card_fiber_of_nsmul_lt_card_of_maps_to` for a stronger statement. -/ theorem exists_le_card_fiber_of_nsmul_le_card_of_maps_to (hf : ∀ a ∈ s, f a ∈ t) (ht : t.Nonempty)	Mathlib/Combinatorics/Pigeonhole.lean	248	253
/- Copyright (c) 2023 Frédéric Dupuis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Frédéric Dupuis -/ import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.Algebra.Order.ToIntervalMod import Mathlib.Analysis.SpecialFunctions.Log.Base /-! # Akra-Bazzi theorem: The polynomial growth condition This file defines and develops an API for the polynomial growth condition that appears in the statement of the Akra-Bazzi theorem: for the Akra-Bazzi theorem to hold, the function `g` must satisfy the condition that `c₁ g(n) ≤ g(u) ≤ c₂ g(n)`, for u between bn and n for any constant `b ∈ (0,1)`. ## Implementation notes Our definition states that the condition must hold for any `b ∈ (0,1)`. This is equivalent to only requiring it for `b = 1/2` or any other particular value between 0 and 1. While this could in principle make it harder to prove that a particular function grows polynomially, this issue doesn't seem to arise in practice. -/ open Finset Real Filter Asymptotics open scoped Topology namespace AkraBazziRecurrence /-- The growth condition that the function `g` must satisfy for the Akra-Bazzi theorem to apply. It roughly states that `c₁ g(n) ≤ g(u) ≤ c₂ g(n)`, for `u` between `bn` and `n` for any constant `b ∈ (0,1)`. -/ def GrowsPolynomially (f : ℝ → ℝ) : Prop := ∀ b ∈ Set.Ioo 0 1, ∃ c₁ > 0, ∃ c₂ > 0, ∀ᶠ x in atTop, ∀ u ∈ Set.Icc (b * x) x, f u ∈ Set.Icc (c₁ * (f x)) (c₂ * f x) namespace GrowsPolynomially lemma congr_of_eventuallyEq {f g : ℝ → ℝ} (hfg : f =ᶠ[atTop] g) (hg : GrowsPolynomially g) : GrowsPolynomially f := by intro b hb have hg' := hg b hb obtain ⟨c₁, hc₁_mem, c₂, hc₂_mem, hg'⟩ := hg' refine ⟨c₁, hc₁_mem, c₂, hc₂_mem, ?_⟩ filter_upwards [hg', (tendsto_id.const_mul_atTop hb.1).eventually_forall_ge_atTop hfg, hfg] with x hx₁ hx₂ hx₃ intro u hu rw [hx₂ u hu.1, hx₃] exact hx₁ u hu lemma iff_eventuallyEq {f g : ℝ → ℝ} (h : f =ᶠ[atTop] g) : GrowsPolynomially f ↔ GrowsPolynomially g := ⟨fun hf => congr_of_eventuallyEq h.symm hf, fun hg => congr_of_eventuallyEq h hg⟩ variable {f : ℝ → ℝ} lemma eventually_atTop_le {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ x in atTop, ∀ u ∈ Set.Icc (b * x) x, f u ≤ c * f x := by obtain ⟨c₁, _, c₂, hc₂, h⟩ := hf b hb refine ⟨c₂, hc₂, ?_⟩ filter_upwards [h] exact fun _ H u hu => (H u hu).2 lemma eventually_atTop_le_nat {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ (n : ℕ) in atTop, ∀ u ∈ Set.Icc (b * n) n, f u ≤ c * f n := by obtain ⟨c, hc_mem, hc⟩ := hf.eventually_atTop_le hb exact ⟨c, hc_mem, hc.natCast_atTop⟩ lemma eventually_atTop_ge {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ x in atTop, ∀ u ∈ Set.Icc (b * x) x, c * f x ≤ f u := by obtain ⟨c₁, hc₁, c₂, _, h⟩ := hf b hb refine ⟨c₁, hc₁, ?_⟩ filter_upwards [h] exact fun _ H u hu => (H u hu).1 lemma eventually_atTop_ge_nat {b : ℝ} (hb : b ∈ Set.Ioo 0 1) (hf : GrowsPolynomially f) : ∃ c > 0, ∀ᶠ (n : ℕ) in atTop, ∀ u ∈ Set.Icc (b * n) n, c * f n ≤ f u := by obtain ⟨c, hc_mem, hc⟩ := hf.eventually_atTop_ge hb exact ⟨c, hc_mem, hc.natCast_atTop⟩ lemma eventually_zero_of_frequently_zero (hf : GrowsPolynomially f) (hf' : ∃ᶠ x in atTop, f x = 0) : ∀ᶠ x in atTop, f x = 0 := by obtain ⟨c₁, hc₁_mem, c₂, hc₂_mem, hf⟩ := hf (1/2) (by norm_num) rw [frequently_atTop] at hf' filter_upwards [eventually_forall_ge_atTop.mpr hf, eventually_gt_atTop 0] with x hx hx_pos obtain ⟨x₀, hx₀_ge, hx₀⟩ := hf' (max x 1) have x₀_pos := calc 0 < 1 := by norm_num _ ≤ x₀ := le_of_max_le_right hx₀_ge have hmain : ∀ (m : ℕ) (z : ℝ), x ≤ z → z ∈ Set.Icc ((2 : ℝ)^(-(m : ℤ) -1) * x₀) ((2 : ℝ)^(-(m : ℤ)) * x₀) → f z = 0 := by intro m induction m with \| zero => simp only [CharP.cast_eq_zero, neg_zero, zero_sub, zpow_zero, one_mul] at * specialize hx x₀ (le_of_max_le_left hx₀_ge) simp only [hx₀, mul_zero, Set.Icc_self, Set.mem_singleton_iff] at hx refine fun z _ hz => hx _ ?_ simp only [zpow_neg, zpow_one] at hz simp only [one_div, hz] \| succ k ih => intro z hxz hz simp only [Nat.succ_eq_add_one, Nat.cast_add, Nat.cast_one] at * have hx' : x ≤ (2 : ℝ)^(-(k : ℤ) - 1) * x₀ := by calc x ≤ z := hxz _ ≤ _ := by simp only [neg_add, ← sub_eq_add_neg] at hz; exact hz.2 specialize hx ((2 : ℝ)^(-(k : ℤ) - 1) * x₀) hx' z specialize ih ((2 : ℝ)^(-(k : ℤ) - 1) * x₀) hx' ?ineq case ineq => rw [Set.left_mem_Icc] gcongr · norm_num · omega simp only [ih, mul_zero, Set.Icc_self, Set.mem_singleton_iff] at hx refine hx ⟨?lb₁, ?ub₁⟩ case lb₁ => rw [one_div, ← zpow_neg_one, ← mul_assoc, ← zpow_add₀ (by norm_num)] have h₁ : (-1 : ℤ) + (-k - 1) = -k - 2 := by ring have h₂ : -(k + (1 : ℤ)) - 1 = -k - 2 := by ring rw [h₁] rw [h₂] at hz exact hz.1 case ub₁ => have := hz.2 simp only [neg_add, ← sub_eq_add_neg] at this exact this refine hmain ⌊-logb 2 (x / x₀)⌋₊ x le_rfl ⟨?lb, ?ub⟩ case lb => rw [← le_div_iff₀ x₀_pos] refine (logb_le_logb (b := 2) (by norm_num) (zpow_pos (by norm_num) _) (by positivity)).mp ?_ rw [← rpow_intCast, logb_rpow (by norm_num) (by norm_num), ← neg_le_neg_iff] simp only [Int.cast_sub, Int.cast_neg, Int.cast_natCast, Int.cast_one, neg_sub, sub_neg_eq_add] calc -logb 2 (x/x₀) ≤ ⌈-logb 2 (x/x₀)⌉₊ := Nat.le_ceil (-logb 2 (x / x₀)) _ ≤ _ := by rw [add_comm]; exact_mod_cast Nat.ceil_le_floor_add_one _ case ub => rw [← div_le_iff₀ x₀_pos] refine (logb_le_logb (b := 2) (by norm_num) (by positivity) (zpow_pos (by norm_num) _)).mp ?_ rw [← rpow_intCast, logb_rpow (by norm_num) (by norm_num), ← neg_le_neg_iff] simp only [Int.cast_neg, Int.cast_natCast, neg_neg] have : 0 ≤ -logb 2 (x / x₀) := by rw [neg_nonneg] refine logb_nonpos (by norm_num) (by positivity) ?_ rw [div_le_one x₀_pos] exact le_of_max_le_left hx₀_ge exact_mod_cast Nat.floor_le this	lemma eventually_atTop_nonneg_or_nonpos (hf : GrowsPolynomially f) : (∀ᶠ x in atTop, 0 ≤ f x) ∨ (∀ᶠ x in atTop, f x ≤ 0) := by obtain ⟨c₁, _, c₂, _, h⟩ := hf (1/2) (by norm_num) match lt_trichotomy c₁ c₂ with \| .inl hlt => -- c₁ < c₂ left filter_upwards [h, eventually_ge_atTop 0] with x hx hx_nonneg have h' : 3 / 4 * x ∈ Set.Icc (1 / 2 * x) x := by rw [Set.mem_Icc] exact ⟨by gcongr ?_ * x; norm_num, by linarith⟩ have hu := hx (3/4 * x) h' have hu := Set.nonempty_of_mem hu rw [Set.nonempty_Icc] at hu have hu' : 0 ≤ (c₂ - c₁) * f x := by linarith exact nonneg_of_mul_nonneg_right hu' (by linarith) \| .inr (.inr hgt) => -- c₂ < c₁ right filter_upwards [h, eventually_ge_atTop 0] with x hx hx_nonneg have h' : 3 / 4 * x ∈ Set.Icc (1 / 2 * x) x := by rw [Set.mem_Icc] exact ⟨by gcongr ?_ * x; norm_num, by linarith⟩ have hu := hx (3/4 * x) h' have hu := Set.nonempty_of_mem hu rw [Set.nonempty_Icc] at hu have hu' : (c₁ - c₂) * f x ≤ 0 := by linarith exact nonpos_of_mul_nonpos_right hu' (by linarith) \| .inr (.inl heq) => -- c₁ = c₂ have hmain : ∃ c, ∀ᶠ x in atTop, f x = c := by simp only [heq, Set.Icc_self, Set.mem_singleton_iff, one_mul] at h rw [eventually_atTop] at h obtain ⟨n₀, hn₀⟩ := h refine ⟨f (max n₀ 2), ?_⟩ rw [eventually_atTop] refine ⟨max n₀ 2, ?_⟩ refine Real.induction_Ico_mul _ 2 (by norm_num) (by positivity) ?base ?step case base => intro x ⟨hxlb, hxub⟩ have h₁ := calc n₀ ≤ 1 * max n₀ 2 := by simp _ ≤ 2 * max n₀ 2 := by gcongr; norm_num have h₂ := hn₀ (2 * max n₀ 2) h₁ (max n₀ 2) ⟨by simp [hxlb], by linarith⟩ rw [h₂] exact hn₀ (2 * max n₀ 2) h₁ x ⟨by simp [hxlb], le_of_lt hxub⟩ case step => intro n hn hyp_ind z hz have z_nonneg : 0 ≤ z := by calc (0 : ℝ) ≤ (2 : ℝ)^n * max n₀ 2 := by exact mul_nonneg (pow_nonneg (by norm_num) _) (by norm_num) _ ≤ z := by exact_mod_cast hz.1 have le_2n : max n₀ 2 ≤ (2 : ℝ)^n * max n₀ 2 := by nth_rewrite 1 [← one_mul (max n₀ 2)] gcongr exact one_le_pow₀ (by norm_num : (1 : ℝ) ≤ 2) have n₀_le_z : n₀ ≤ z := by calc n₀ ≤ max n₀ 2 := by simp _ ≤ (2 : ℝ)^n * max n₀ 2 := le_2n _ ≤ _ := by exact_mod_cast hz.1 have fz_eq_c₂fz : f z = c₂ * f z := hn₀ z n₀_le_z z ⟨by linarith, le_rfl⟩ have z_to_half_z' : f (1/2 * z) = c₂ * f z := hn₀ z n₀_le_z (1/2 * z) ⟨le_rfl, by linarith⟩ have z_to_half_z : f (1/2 * z) = f z := by rwa [← fz_eq_c₂fz] at z_to_half_z' have half_z_to_base : f (1/2 * z) = f (max n₀ 2) := by refine hyp_ind (1/2 * z) ⟨?lb, ?ub⟩ case lb => calc max n₀ 2 ≤ ((1 : ℝ)/(2 : ℝ)) * (2 : ℝ) ^ 1 * max n₀ 2 := by simp _ ≤ ((1 : ℝ)/(2 : ℝ)) * (2 : ℝ) ^ n * max n₀ 2 := by gcongr; norm_num _ ≤ _ := by rw [mul_assoc]; gcongr; exact_mod_cast hz.1 case ub => have h₁ : (2 : ℝ)^n = ((1 : ℝ)/(2 : ℝ)) * (2 : ℝ)^(n+1) := by rw [one_div, pow_add, pow_one] ring rw [h₁, mul_assoc] gcongr exact_mod_cast hz.2 rw [← z_to_half_z, half_z_to_base] obtain ⟨c, hc⟩ := hmain cases le_or_lt 0 c with \| inl hpos => exact Or.inl <\| by filter_upwards [hc] with _ hc; simpa only [hc] \| inr hneg => right filter_upwards [hc] with x hc exact le_of_lt <\| by simpa only [hc]	Mathlib/Computability/AkraBazzi/GrowsPolynomially.lean	153	233
/- Copyright (c) 2024 Josha Dekker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Josha Dekker, Devon Tuma, Kexing Ying -/ import Mathlib.Probability.Notation import Mathlib.Probability.Density import Mathlib.Probability.ConditionalProbability import Mathlib.Probability.ProbabilityMassFunction.Constructions /-! # Uniform distributions and probability mass functions This file defines two related notions of uniform distributions, which will be unified in the future. # Uniform distributions Defines the uniform distribution for any set with finite measure. ## Main definitions * `IsUniform X s ℙ μ` : A random variable `X` has uniform distribution on `s` under `ℙ` if the push-forward measure agrees with the rescaled restricted measure `μ`. # Uniform probability mass functions This file defines a number of uniform `PMF` distributions from various inputs, uniformly drawing from the corresponding object. ## Main definitions `PMF.uniformOfFinset` gives each element in the set equal probability, with `0` probability for elements not in the set. `PMF.uniformOfFintype` gives all elements equal probability, equal to the inverse of the size of the `Fintype`. `PMF.ofMultiset` draws randomly from the given `Multiset`, treating duplicate values as distinct. Each probability is given by the count of the element divided by the size of the `Multiset` ## TODO * Refactor the `PMF` definitions to come from a `uniformMeasure` on a `Finset`/`Fintype`/`Multiset`. -/ open scoped Finset MeasureTheory NNReal ENNReal -- TODO: We can't `open ProbabilityTheory` without opening the `ProbabilityTheory` locale :( open TopologicalSpace MeasureTheory.Measure PMF noncomputable section namespace MeasureTheory variable {E : Type} [MeasurableSpace E] {μ : Measure E} namespace pdf variable {Ω : Type} variable {_ : MeasurableSpace Ω} {ℙ : Measure Ω} /-- A random variable `X` has uniform distribution on `s` if its push-forward measure is `(μ s)⁻¹ • μ.restrict s`. -/ def IsUniform (X : Ω → E) (s : Set E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) := map X ℙ = ProbabilityTheory.cond μ s namespace IsUniform theorem aemeasurable {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : AEMeasurable X ℙ := by dsimp [IsUniform, ProbabilityTheory.cond] at hu by_contra h rw [map_of_not_aemeasurable h] at hu apply zero_ne_one' ℝ≥0∞ calc 0 = (0 : Measure E) Set.univ := rfl _ = _ := by rw [hu, smul_apply, restrict_apply MeasurableSet.univ, Set.univ_inter, smul_eq_mul, ENNReal.inv_mul_cancel hns hnt] theorem absolutelyContinuous {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) : map X ℙ ≪ μ := by rw [hu]; exact ProbabilityTheory.cond_absolutelyContinuous theorem measure_preimage {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) {A : Set E} (hA : MeasurableSet A) : ℙ (X ⁻¹' A) = μ (s ∩ A) / μ s := by rwa [← map_apply_of_aemeasurable (hu.aemeasurable hns hnt) hA, hu, ProbabilityTheory.cond_apply', ENNReal.div_eq_inv_mul] theorem isProbabilityMeasure {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : IsProbabilityMeasure ℙ := ⟨by have : X ⁻¹' Set.univ = Set.univ := Set.preimage_univ rw [← this, hu.measure_preimage hns hnt MeasurableSet.univ, Set.inter_univ, ENNReal.div_self hns hnt]⟩ theorem toMeasurable_iff {X : Ω → E} {s : Set E} : IsUniform X (toMeasurable μ s) ℙ μ ↔ IsUniform X s ℙ μ := by unfold IsUniform rw [ProbabilityTheory.cond_toMeasurable_eq] protected theorem toMeasurable {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) : IsUniform X (toMeasurable μ s) ℙ μ := by unfold IsUniform at * rwa [ProbabilityTheory.cond_toMeasurable_eq] theorem hasPDF {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : HasPDF X ℙ μ := by let t := toMeasurable μ s apply hasPDF_of_map_eq_withDensity (hu.aemeasurable hns hnt) (t.indicator ((μ t)⁻¹ • 1)) <\| (measurable_one.aemeasurable.const_smul (μ t)⁻¹).indicator (measurableSet_toMeasurable μ s) rw [hu, withDensity_indicator (measurableSet_toMeasurable μ s), withDensity_smul _ measurable_one, withDensity_one, restrict_toMeasurable hnt, measure_toMeasurable, ProbabilityTheory.cond] theorem pdf_eq_zero_of_measure_eq_zero_or_top {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) (hμs : μ s = 0 ∨ μ s = ∞) : pdf X ℙ μ =ᵐ[μ] 0 := by rcases hμs with H\|H · simp only [IsUniform, ProbabilityTheory.cond, H, ENNReal.inv_zero, restrict_eq_zero.mpr H, smul_zero] at hu simp [pdf, hu] · simp only [IsUniform, ProbabilityTheory.cond, H, ENNReal.inv_top, zero_smul] at hu simp [pdf, hu] theorem pdf_eq {X : Ω → E} {s : Set E} (hms : MeasurableSet s) (hu : IsUniform X s ℙ μ) : pdf X ℙ μ =ᵐ[μ] s.indicator ((μ s)⁻¹ • (1 : E → ℝ≥0∞)) := by by_cases hnt : μ s = ∞ · simp [pdf_eq_zero_of_measure_eq_zero_or_top hu (Or.inr hnt), hnt] by_cases hns : μ s = 0 · filter_upwards [measure_zero_iff_ae_nmem.mp hns, pdf_eq_zero_of_measure_eq_zero_or_top hu (Or.inl hns)] with x hx h'x simp [hx, h'x, hns] have : HasPDF X ℙ μ := hasPDF hns hnt hu have : IsProbabilityMeasure ℙ := isProbabilityMeasure hns hnt hu apply (eq_of_map_eq_withDensity _ _).mp · rw [hu, withDensity_indicator hms, withDensity_smul _ measurable_one, withDensity_one, ProbabilityTheory.cond] · exact (measurable_one.aemeasurable.const_smul (μ s)⁻¹).indicator hms theorem pdf_toReal_ae_eq {X : Ω → E} {s : Set E} (hms : MeasurableSet s) (hX : IsUniform X s ℙ μ) : (fun x => (pdf X ℙ μ x).toReal) =ᵐ[μ] fun x => (s.indicator ((μ s)⁻¹ • (1 : E → ℝ≥0∞)) x).toReal := Filter.EventuallyEq.fun_comp (pdf_eq hms hX) ENNReal.toReal variable {X : Ω → ℝ} {s : Set ℝ} theorem mul_pdf_integrable (hcs : IsCompact s) (huX : IsUniform X s ℙ) : Integrable fun x : ℝ => x * (pdf X ℙ volume x).toReal := by by_cases hnt : volume s = 0 ∨ volume s = ∞ · have I : Integrable (fun x ↦ x * ENNReal.toReal (0)) := by simp apply I.congr filter_upwards [pdf_eq_zero_of_measure_eq_zero_or_top huX hnt] with x hx simp [hx] simp only [not_or] at hnt have : IsProbabilityMeasure ℙ := isProbabilityMeasure hnt.1 hnt.2 huX constructor · exact aestronglyMeasurable_id.mul (measurable_pdf X ℙ).aemeasurable.ennreal_toReal.aestronglyMeasurable refine hasFiniteIntegral_mul (pdf_eq hcs.measurableSet huX) ?_ set ind := (volume s)⁻¹ • (1 : ℝ → ℝ≥0∞) have : ∀ x, ‖x‖ₑ * s.indicator ind x = s.indicator (fun x => ‖x‖ₑ * ind x) x := fun x => (s.indicator_mul_right (fun x => ↑‖x‖₊) ind).symm simp only [ind, this, lintegral_indicator hcs.measurableSet, mul_one, Algebra.id.smul_eq_mul, Pi.one_apply, Pi.smul_apply] rw [lintegral_mul_const _ measurable_enorm] exact ENNReal.mul_ne_top (setLIntegral_lt_top_of_isCompact hnt.2 hcs continuous_nnnorm).ne (ENNReal.inv_lt_top.2 (pos_iff_ne_zero.mpr hnt.1)).ne /-- A real uniform random variable `X` with support `s` has expectation `(λ s)⁻¹ * ∫ x in s, x ∂λ` where `λ` is the Lebesgue measure. -/ theorem integral_eq (huX : IsUniform X s ℙ) : ∫ x, X x ∂ℙ = (volume s)⁻¹.toReal * ∫ x in s, x := by rw [← smul_eq_mul, ← integral_smul_measure] dsimp only [IsUniform, ProbabilityTheory.cond] at huX rw [← huX] by_cases hX : AEMeasurable X ℙ · exact (integral_map hX aestronglyMeasurable_id).symm · rw [map_of_not_aemeasurable hX, integral_zero_measure, integral_non_aestronglyMeasurable] rwa [aestronglyMeasurable_iff_aemeasurable] end IsUniform variable {X : Ω → E} lemma IsUniform.cond {s : Set E} : IsUniform (id : E → E) s (ProbabilityTheory.cond μ s) μ := by unfold IsUniform rw [Measure.map_id] /-- The density of the uniform measure on a set with respect to itself. This allows us to abstract away the choice of random variable and probability space. -/ def uniformPDF (s : Set E) (x : E) (μ : Measure E := by volume_tac) : ℝ≥0∞ := s.indicator ((μ s)⁻¹ • (1 : E → ℝ≥0∞)) x /-- Check that indeed any uniform random variable has the uniformPDF. -/ lemma uniformPDF_eq_pdf {s : Set E} (hs : MeasurableSet s) (hu : pdf.IsUniform X s ℙ μ) : (fun x ↦ uniformPDF s x μ) =ᵐ[μ] pdf X ℙ μ := by unfold uniformPDF exact Filter.EventuallyEq.trans (pdf.IsUniform.pdf_eq hs hu).symm (ae_eq_refl _) open scoped Classical in /-- Alternative way of writing the uniformPDF. -/ lemma uniformPDF_ite {s : Set E} {x : E} : uniformPDF s x μ = if x ∈ s then (μ s)⁻¹ else 0 := by unfold uniformPDF unfold Set.indicator simp only [Pi.smul_apply, Pi.one_apply, smul_eq_mul, mul_one] end pdf end MeasureTheory namespace PMF variable {α : Type} open scoped NNReal ENNReal section UniformOfFinset /-- Uniform distribution taking the same non-zero probability on the nonempty finset `s` -/ def uniformOfFinset (s : Finset α) (hs : s.Nonempty) : PMF α := by classical refine ofFinset (fun a => if a ∈ s then s.card⁻¹ else 0) s ?_ ?_ · simp only [Finset.sum_ite_mem, Finset.inter_self, Finset.sum_const, nsmul_eq_mul] have : (s.card : ℝ≥0∞) ≠ 0 := by simpa only [Ne, Nat.cast_eq_zero, Finset.card_eq_zero] using Finset.nonempty_iff_ne_empty.1 hs exact ENNReal.mul_inv_cancel this <\| ENNReal.natCast_ne_top s.card · exact fun x hx => by simp only [hx, if_false] variable {s : Finset α} (hs : s.Nonempty) {a : α} open scoped Classical in @[simp] theorem uniformOfFinset_apply (a : α) : uniformOfFinset s hs a = if a ∈ s then (s.card : ℝ≥0∞)⁻¹ else 0 := rfl theorem uniformOfFinset_apply_of_mem (ha : a ∈ s) : uniformOfFinset s hs a = (s.card : ℝ≥0∞)⁻¹ := by simp [ha] theorem uniformOfFinset_apply_of_not_mem (ha : a ∉ s) : uniformOfFinset s hs a = 0 := by simp [ha] @[simp] theorem support_uniformOfFinset : (uniformOfFinset s hs).support = s := Set.ext (by let ⟨a, ha⟩ := hs simp [mem_support_iff, Finset.ne_empty_of_mem ha]) theorem mem_support_uniformOfFinset_iff (a : α) : a ∈ (uniformOfFinset s hs).support ↔ a ∈ s := by simp section Measure variable (t : Set α) open scoped Classical in @[simp] theorem toOuterMeasure_uniformOfFinset_apply : (uniformOfFinset s hs).toOuterMeasure t = #{x ∈ s \| x ∈ t} / #s := calc (uniformOfFinset s hs).toOuterMeasure t = ∑' x, if x ∈ t then uniformOfFinset s hs x else 0 := toOuterMeasure_apply (uniformOfFinset s hs) t _ = ∑' x, if x ∈ s ∧ x ∈ t then (#s : ℝ≥0∞)⁻¹ else 0 := tsum_congr fun x => by simp_rw [uniformOfFinset_apply, ← ite_and, and_comm] _ = ∑ x ∈ s with x ∈ t, if x ∈ s ∧ x ∈ t then (#s : ℝ≥0∞)⁻¹ else 0 := tsum_eq_sum fun _ hx => if_neg fun h => hx (Finset.mem_filter.2 h) _ = ∑ x ∈ s with x ∈ t, (#s : ℝ≥0∞)⁻¹ := Finset.sum_congr rfl fun x hx => by have this : x ∈ s ∧ x ∈ t := by simpa using hx simp only [this, and_self_iff, if_true] _ = #{x ∈ s \| x ∈ t} / #s := by simp only [div_eq_mul_inv, Finset.sum_const, nsmul_eq_mul] open scoped Classical in @[simp] theorem toMeasure_uniformOfFinset_apply [MeasurableSpace α] (ht : MeasurableSet t) : (uniformOfFinset s hs).toMeasure t = #{x ∈ s \| x ∈ t} / #s := (toMeasure_apply_eq_toOuterMeasure_apply _ t ht).trans (toOuterMeasure_uniformOfFinset_apply hs t) end Measure end UniformOfFinset section UniformOfFintype /-- The uniform pmf taking the same uniform value on all of the fintype `α` -/ def uniformOfFintype (α : Type) [Fintype α] [Nonempty α] : PMF α := uniformOfFinset Finset.univ Finset.univ_nonempty variable [Fintype α] [Nonempty α] @[simp] theorem uniformOfFintype_apply (a : α) : uniformOfFintype α a = (Fintype.card α : ℝ≥0∞)⁻¹ := by simp [uniformOfFintype, Finset.mem_univ, if_true, uniformOfFinset_apply] @[simp] theorem support_uniformOfFintype (α : Type) [Fintype α] [Nonempty α] : (uniformOfFintype α).support = ⊤ := Set.ext fun x => by simp [mem_support_iff] theorem mem_support_uniformOfFintype (a : α) : a ∈ (uniformOfFintype α).support := by simp section Measure variable (s : Set α) theorem toOuterMeasure_uniformOfFintype_apply [Fintype s] : (uniformOfFintype α).toOuterMeasure s = Fintype.card s / Fintype.card α := by classical rw [uniformOfFintype, toOuterMeasure_uniformOfFinset_apply, Fintype.card_subtype, Finset.card_univ] theorem toMeasure_uniformOfFintype_apply [MeasurableSpace α] (hs : MeasurableSet s) [Fintype s] : (uniformOfFintype α).toMeasure s = Fintype.card s / Fintype.card α := by classical simp [uniformOfFintype, Fintype.card_subtype, hs] end Measure end UniformOfFintype section OfMultiset open scoped Classical in /-- Given a non-empty multiset `s` we construct the `PMF` which sends `a` to the fraction of elements in `s` that are `a`. -/ def ofMultiset (s : Multiset α) (hs : s ≠ 0) : PMF α := ⟨fun a => s.count a / (Multiset.card s), ENNReal.summable.hasSum_iff.2 (calc (∑' b : α, (s.count b : ℝ≥0∞) / (Multiset.card s)) = (Multiset.card s : ℝ≥0∞)⁻¹ ∑' b, (s.count b : ℝ≥0∞) := by simp_rw [ENNReal.div_eq_inv_mul, ENNReal.tsum_mul_left] _ = (Multiset.card s : ℝ≥0∞)⁻¹ * ∑ b ∈ s.toFinset, (s.count b : ℝ≥0∞) := (congr_arg (fun x => (Multiset.card s : ℝ≥0∞)⁻¹ * x) (tsum_eq_sum fun a ha => Nat.cast_eq_zero.2 <\| by rwa [Multiset.count_eq_zero, ← Multiset.mem_toFinset])) _ = 1 := by rw [← Nat.cast_sum, Multiset.toFinset_sum_count_eq s, ENNReal.inv_mul_cancel (Nat.cast_ne_zero.2 (hs ∘ Multiset.card_eq_zero.1)) (ENNReal.natCast_ne_top _)] )⟩ variable {s : Multiset α} (hs : s ≠ 0) open scoped Classical in @[simp] theorem ofMultiset_apply (a : α) : ofMultiset s hs a = s.count a / (Multiset.card s) := rfl open scoped Classical in @[simp] theorem support_ofMultiset : (ofMultiset s hs).support = s.toFinset := Set.ext (by simp [mem_support_iff, hs]) open scoped Classical in theorem mem_support_ofMultiset_iff (a : α) : a ∈ (ofMultiset s hs).support ↔ a ∈ s.toFinset := by simp theorem ofMultiset_apply_of_not_mem {a : α} (ha : a ∉ s) : ofMultiset s hs a = 0 := by simpa only [ofMultiset_apply, ENNReal.div_eq_zero_iff, Nat.cast_eq_zero, Multiset.count_eq_zero, ENNReal.natCast_ne_top, or_false] using ha section Measure variable (t : Set α) open scoped Classical in @[simp] theorem toOuterMeasure_ofMultiset_apply : (ofMultiset s hs).toOuterMeasure t = (∑' x, (s.filter (· ∈ t)).count x : ℝ≥0∞) / (Multiset.card s) := by simp_rw [div_eq_mul_inv, ← ENNReal.tsum_mul_right, toOuterMeasure_apply] refine tsum_congr fun x => ?_ by_cases hx : x ∈ t <;> simp [Set.indicator, hx, div_eq_mul_inv] open scoped Classical in @[simp] theorem toMeasure_ofMultiset_apply [MeasurableSpace α] (ht : MeasurableSet t) : (ofMultiset s hs).toMeasure t = (∑' x, (s.filter (· ∈ t)).count x : ℝ≥0∞) / (Multiset.card s) := (toMeasure_apply_eq_toOuterMeasure_apply _ t ht).trans (toOuterMeasure_ofMultiset_apply hs t) end Measure end OfMultiset	end PMF	Mathlib/Probability/Distributions/Uniform.lean	385	390
/- Copyright (c) 2023 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.CategoryTheory.Shift.Adjunction import Mathlib.CategoryTheory.Preadditive.Opposite /-! # The (naive) shift on the opposite category If `C` is a category equipped with a shift by a monoid `A`, the opposite category can be equipped with a shift such that the shift functor by `n` is `(shiftFunctor C n).op`. This is the "naive" opposite shift, which we shall set on a category `OppositeShift C A`, which is a type synonym for `Cᵒᵖ`. However, for the application to (pre)triangulated categories, we would like to define the shift on `Cᵒᵖ` so that `shiftFunctor Cᵒᵖ n` for `n : ℤ` identifies to `(shiftFunctor C (-n)).op` rather than `(shiftFunctor C n).op`. Then, the construction of the shift on `Cᵒᵖ` shall combine the shift on `OppositeShift C A` and another construction of the "pullback" of a shift by a monoid morphism like `n ↦ -n`. If `F : C ⥤ D` is a functor between categories equipped with shifts by `A`, we define a type synonym `OppositeShift.functor A F` for `F.op`. When `F` has a `CommShift` structure by `A`, we define a `CommShift` structure by `A` on `OppositeShift.functor A F`. In this way, we can make this an instance and reserve `F.op` for the `CommShift` instance by the modified shift in the case of (pre)triangulated categories. Similarly, if `τ` is a natural transformation between functors `F,G : C ⥤ D`, we define a type synonym for `τ.op` called `OppositeShift.natTrans A τ : OppositeShift.functor A F ⟶ OppositeShift.functor A G`. When `τ` has a `CommShift` structure by `A` (i.e. is compatible with `CommShift` structures on `F` and `G`), we define a `CommShift` structure by `A` on `OppositeShift.natTrans A τ`. Finally, if we have an adjunction `F ⊣ G` (with `G : D ⥤ C`), we define a type synonym `OppositeShift.adjunction A adj : OppositeShift.functor A G ⊣ OppositeShift.functor A F` for `adj.op`, and we show that, if `adj` compatible with `CommShift` structures on `F` and `G`, then `OppositeShift.adjunction A adj` is also compatible with the pulled back `CommShift` structures. Given a `CommShift` structure on a functor `F`, we define a `CommShift` structure on `F.op` (and vice versa). We also prove that, if an adjunction `F ⊣ G` is compatible with `CommShift` structures on `F` and `G`, then the opposite adjunction `G.op ⊣ F.op` is compatible with the opposite `CommShift` structures. -/ namespace CategoryTheory open Limits Category section variable (C : Type) [Category C] (A : Type) [AddMonoid A] [HasShift C A] namespace HasShift /-- Construction of the naive shift on the opposite category of a category `C`: the shiftfunctor by `n` is `(shiftFunctor C n).op`. -/ noncomputable def mkShiftCoreOp : ShiftMkCore Cᵒᵖ A where F n := (shiftFunctor C n).op zero := (NatIso.op (shiftFunctorZero C A)).symm add a b := (NatIso.op (shiftFunctorAdd C a b)).symm assoc_hom_app m₁ m₂ m₃ X := Quiver.Hom.unop_inj ((shiftFunctorAdd_assoc_inv_app m₁ m₂ m₃ X.unop).trans (by simp [shiftFunctorAdd'])) zero_add_hom_app n X := Quiver.Hom.unop_inj ((shiftFunctorAdd_zero_add_inv_app n X.unop).trans (by simp)) add_zero_hom_app n X := Quiver.Hom.unop_inj ((shiftFunctorAdd_add_zero_inv_app n X.unop).trans (by simp)) end HasShift /-- The category `OppositeShift C A` is the opposite category `Cᵒᵖ` equipped with the naive shift: `shiftFunctor (OppositeShift C A) n` is `(shiftFunctor C n).op`. -/ @[nolint unusedArguments] def OppositeShift (A : Type*) [AddMonoid A] [HasShift C A] := Cᵒᵖ instance : Category (OppositeShift C A) := by dsimp only [OppositeShift] infer_instance noncomputable instance : HasShift (OppositeShift C A) A := hasShiftMk Cᵒᵖ A (HasShift.mkShiftCoreOp C A) instance [HasZeroObject C] : HasZeroObject (OppositeShift C A) := by dsimp only [OppositeShift] infer_instance instance [Preadditive C] : Preadditive (OppositeShift C A) := by dsimp only [OppositeShift] infer_instance instance [Preadditive C] (n : A) [(shiftFunctor C n).Additive] : (shiftFunctor (OppositeShift C A) n).Additive := by change (shiftFunctor C n).op.Additive infer_instance lemma oppositeShiftFunctorZero_inv_app (X : OppositeShift C A) :	(shiftFunctorZero (OppositeShift C A) A).inv.app X = ((shiftFunctorZero C A).hom.app X.unop).op := rfl lemma oppositeShiftFunctorZero_hom_app (X : OppositeShift C A) : (shiftFunctorZero (OppositeShift C A) A).hom.app X =	Mathlib/CategoryTheory/Shift/Opposite.lean	101	105
/- Copyright (c) 2019 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen -/ import Mathlib.Data.Matrix.Basis import Mathlib.Data.Matrix.Block import Mathlib.Data.Matrix.RowCol import Mathlib.Data.Matrix.Notation /-! # Trace of a matrix This file defines the trace of a matrix, the map sending a matrix to the sum of its diagonal entries. See also `LinearAlgebra.Trace` for the trace of an endomorphism. ## Tags matrix, trace, diagonal -/ open Matrix namespace Matrix variable {ι m n p : Type} {α R S : Type} variable [Fintype m] [Fintype n] [Fintype p] section AddCommMonoid variable [AddCommMonoid R] /-- The trace of a square matrix. For more bundled versions, see: * `Matrix.traceAddMonoidHom` * `Matrix.traceLinearMap` -/ def trace (A : Matrix n n R) : R := ∑ i, diag A i lemma trace_diagonal {o} [Fintype o] [DecidableEq o] (d : o → R) : trace (diagonal d) = ∑ i, d i := by simp only [trace, diag_apply, diagonal_apply_eq] variable (n R) @[simp] theorem trace_zero : trace (0 : Matrix n n R) = 0 := (Finset.sum_const (0 : R)).trans <\| smul_zero _ variable {n R} @[simp] lemma trace_eq_zero_of_isEmpty [IsEmpty n] (A : Matrix n n R) : trace A = 0 := by simp [trace] @[simp] theorem trace_add (A B : Matrix n n R) : trace (A + B) = trace A + trace B := Finset.sum_add_distrib @[simp] theorem trace_smul [DistribSMul α R] (r : α) (A : Matrix n n R) : trace (r • A) = r • trace A := Finset.smul_sum.symm @[simp] theorem trace_transpose (A : Matrix n n R) : trace Aᵀ = trace A := rfl @[simp] theorem trace_conjTranspose [StarAddMonoid R] (A : Matrix n n R) : trace Aᴴ = star (trace A) := (star_sum _ _).symm variable (n α R) /-- `Matrix.trace` as an `AddMonoidHom` -/ @[simps] def traceAddMonoidHom : Matrix n n R →+ R where toFun := trace map_zero' := trace_zero n R map_add' := trace_add /-- `Matrix.trace` as a `LinearMap` -/ @[simps] def traceLinearMap [Semiring α] [Module α R] : Matrix n n R →ₗ[α] R where toFun := trace map_add' := trace_add map_smul' := trace_smul variable {n α R} @[simp] theorem trace_list_sum (l : List (Matrix n n R)) : trace l.sum = (l.map trace).sum := map_list_sum (traceAddMonoidHom n R) l @[simp] theorem trace_multiset_sum (s : Multiset (Matrix n n R)) : trace s.sum = (s.map trace).sum := map_multiset_sum (traceAddMonoidHom n R) s @[simp] theorem trace_sum (s : Finset ι) (f : ι → Matrix n n R) : trace (∑ i ∈ s, f i) = ∑ i ∈ s, trace (f i) := map_sum (traceAddMonoidHom n R) f s theorem _root_.AddMonoidHom.map_trace [AddCommMonoid S] {F : Type} [FunLike F R S] [AddMonoidHomClass F R S] (f : F) (A : Matrix n n R) : f (trace A) = trace ((f : R →+ S).mapMatrix A) := map_sum f (fun i => diag A i) Finset.univ lemma trace_blockDiagonal [DecidableEq p] (M : p → Matrix n n R) : trace (blockDiagonal M) = ∑ i, trace (M i) := by simp [blockDiagonal, trace, Finset.sum_comm (γ := n), Fintype.sum_prod_type] lemma trace_blockDiagonal' [DecidableEq p] {m : p → Type} [∀ i, Fintype (m i)] (M : ∀ i, Matrix (m i) (m i) R) : trace (blockDiagonal' M) = ∑ i, trace (M i) := by simp [blockDiagonal', trace, Finset.sum_sigma'] end AddCommMonoid section AddCommGroup variable [AddCommGroup R] @[simp] theorem trace_sub (A B : Matrix n n R) : trace (A - B) = trace A - trace B := Finset.sum_sub_distrib @[simp] theorem trace_neg (A : Matrix n n R) : trace (-A) = -trace A := Finset.sum_neg_distrib end AddCommGroup section One variable [DecidableEq n] [AddCommMonoidWithOne R] @[simp] theorem trace_one : trace (1 : Matrix n n R) = Fintype.card n := by simp_rw [trace, diag_one, Pi.one_def, Finset.sum_const, nsmul_one, Finset.card_univ] end One section Mul @[simp] theorem trace_transpose_mul [AddCommMonoid R] [Mul R] (A : Matrix m n R) (B : Matrix n m R) : trace (Aᵀ * Bᵀ) = trace (A * B) := Finset.sum_comm theorem trace_mul_comm [AddCommMonoid R] [CommMagma R] (A : Matrix m n R) (B : Matrix n m R) : trace (A * B) = trace (B * A) := by rw [← trace_transpose, ← trace_transpose_mul, transpose_mul] theorem trace_mul_cycle [NonUnitalCommSemiring R] (A : Matrix m n R) (B : Matrix n p R) (C : Matrix p m R) : trace (A * B * C) = trace (C * A * B) := by rw [trace_mul_comm, Matrix.mul_assoc] theorem trace_mul_cycle' [NonUnitalCommSemiring R] (A : Matrix m n R) (B : Matrix n p R) (C : Matrix p m R) : trace (A * (B * C)) = trace (C * (A * B)) := by rw [← Matrix.mul_assoc, trace_mul_comm] @[simp] theorem trace_replicateCol_mul_replicateRow {ι : Type} [Unique ι] [NonUnitalNonAssocSemiring R] (a b : n → R) : trace (replicateCol ι a replicateRow ι b) = dotProduct a b := by apply Finset.sum_congr rfl simp [mul_apply] @[deprecated (since := "2025-03-20")] alias trace_col_mul_row := trace_replicateCol_mul_replicateRow end Mul lemma trace_submatrix_succ {n : ℕ} [AddCommMonoid R] (M : Matrix (Fin n.succ) (Fin n.succ) R) : M 0 0 + trace (submatrix M Fin.succ Fin.succ) = trace M := by delta trace rw [← (finSuccEquiv n).symm.sum_comp] simp section CommSemiring variable [DecidableEq m] [CommSemiring R] -- TODO(https://github.com/leanprover-community/mathlib4/issues/6607): fix elaboration so that the ascription isn't needed theorem trace_units_conj (M : (Matrix m m R)ˣ) (N : Matrix m m R) : trace ((M : Matrix _ _ _) * N * (↑M⁻¹ : Matrix _ _ _)) = trace N := by rw [trace_mul_cycle, Units.inv_mul, one_mul]	set_option linter.docPrime false in -- TODO(https://github.com/leanprover-community/mathlib4/issues/6607): fix elaboration so that the ascription isn't needed theorem trace_units_conj' (M : (Matrix m m R)ˣ) (N : Matrix m m R) : trace ((↑M⁻¹ : Matrix _ _ _) * N * (↑M : Matrix _ _ _)) = trace N := trace_units_conj M⁻¹ N	Mathlib/LinearAlgebra/Matrix/Trace.lean	191	196
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes -/ import Mathlib.Algebra.Group.Conj import Mathlib.Algebra.Group.Subgroup.Lattice import Mathlib.Algebra.Group.Submonoid.BigOperators import Mathlib.Data.Finset.Fin import Mathlib.Data.Finset.Sort import Mathlib.Data.Fintype.Perm import Mathlib.Data.Fintype.Prod import Mathlib.Data.Fintype.Sum import Mathlib.Data.Int.Order.Units import Mathlib.GroupTheory.Perm.Support import Mathlib.Logic.Equiv.Fin.Basic import Mathlib.Logic.Equiv.Fintype import Mathlib.Tactic.NormNum.Ineq import Mathlib.Data.Finset.Sigma /-! # Sign of a permutation The main definition of this file is `Equiv.Perm.sign`, associating a `ℤˣ` sign with a permutation. Other lemmas have been moved to `Mathlib.GroupTheory.Perm.Fintype` -/ universe u v open Equiv Function Fintype Finset variable {α : Type u} [DecidableEq α] {β : Type v} namespace Equiv.Perm /-- `modSwap i j` contains permutations up to swapping `i` and `j`. We use this to partition permutations in `Matrix.det_zero_of_row_eq`, such that each partition sums up to `0`. -/ def modSwap (i j : α) : Setoid (Perm α) := ⟨fun σ τ => σ = τ ∨ σ = swap i j * τ, fun σ => Or.inl (refl σ), fun {σ τ} h => Or.casesOn h (fun h => Or.inl h.symm) fun h => Or.inr (by rw [h, swap_mul_self_mul]), fun {σ τ υ} hστ hτυ => by rcases hστ with hστ \| hστ <;> rcases hτυ with hτυ \| hτυ <;> (try rw [hστ, hτυ, swap_mul_self_mul]) <;> simp [hστ, hτυ]⟩ noncomputable instance {α : Type} [Fintype α] [DecidableEq α] (i j : α) : DecidableRel (modSwap i j).r := fun _ _ => inferInstanceAs (Decidable (_ ∨ _)) /-- Given a list `l : List α` and a permutation `f : Perm α` such that the nonfixed points of `f` are in `l`, recursively factors `f` as a product of transpositions. -/ def swapFactorsAux : ∀ (l : List α) (f : Perm α), (∀ {x}, f x ≠ x → x ∈ l) → { l : List (Perm α) // l.prod = f ∧ ∀ g ∈ l, IsSwap g } \| [] => fun f h => ⟨[], Equiv.ext fun x => by rw [List.prod_nil] exact (Classical.not_not.1 (mt h List.not_mem_nil)).symm, by simp⟩ \| x::l => fun f h => if hfx : x = f x then swapFactorsAux l f fun {y} hy => List.mem_of_ne_of_mem (fun h : y = x => by simp [h, hfx.symm] at hy) (h hy) else let m := swapFactorsAux l (swap x (f x) f) fun {y} hy => have : f y ≠ y ∧ y ≠ x := ne_and_ne_of_swap_mul_apply_ne_self hy List.mem_of_ne_of_mem this.2 (h this.1) ⟨swap x (f x)::m.1, by rw [List.prod_cons, m.2.1, ← mul_assoc, mul_def (swap x (f x)), swap_swap, ← one_def, one_mul], fun {_} hg => ((List.mem_cons).1 hg).elim (fun h => ⟨x, f x, hfx, h⟩) (m.2.2 _)⟩ /-- `swapFactors` represents a permutation as a product of a list of transpositions. The representation is non unique and depends on the linear order structure. For types without linear order `truncSwapFactors` can be used. -/ def swapFactors [Fintype α] [LinearOrder α] (f : Perm α) : { l : List (Perm α) // l.prod = f ∧ ∀ g ∈ l, IsSwap g } := swapFactorsAux ((@univ α _).sort (· ≤ ·)) f fun {_ _} => (mem_sort _).2 (mem_univ _) /-- This computably represents the fact that any permutation can be represented as the product of a list of transpositions. -/ def truncSwapFactors [Fintype α] (f : Perm α) : Trunc { l : List (Perm α) // l.prod = f ∧ ∀ g ∈ l, IsSwap g } := Quotient.recOnSubsingleton (@univ α _).1 (fun l h => Trunc.mk (swapFactorsAux l f (h _))) (show ∀ x, f x ≠ x → x ∈ (@univ α _).1 from fun _ _ => mem_univ _) /-- An induction principle for permutations. If `P` holds for the identity permutation, and is preserved under composition with a non-trivial swap, then `P` holds for all permutations. -/ @[elab_as_elim] theorem swap_induction_on [Finite α] {motive : Perm α → Prop} (f : Perm α) (one : motive 1) (swap_mul : ∀ f x y, x ≠ y → motive f → motive (swap x y * f)) : motive f := by cases nonempty_fintype α obtain ⟨l, hl⟩ := (truncSwapFactors f).out induction l generalizing f with \| nil => simp only [one, hl.left.symm, List.prod_nil, forall_true_iff] \| cons g l ih => rcases hl.2 g (by simp) with ⟨x, y, hxy⟩ rw [← hl.1, List.prod_cons, hxy.2] exact swap_mul _ _ _ hxy.1 (ih _ ⟨rfl, fun v hv => hl.2 _ (List.mem_cons_of_mem _ hv)⟩) theorem mclosure_isSwap [Finite α] : Submonoid.closure { σ : Perm α \| IsSwap σ } = ⊤ := by cases nonempty_fintype α refine top_unique fun x _ ↦ ?_ obtain ⟨h1, h2⟩ := Subtype.mem (truncSwapFactors x).out rw [← h1] exact Submonoid.list_prod_mem _ fun y hy ↦ Submonoid.subset_closure (h2 y hy) theorem closure_isSwap [Finite α] : Subgroup.closure { σ : Perm α \| IsSwap σ } = ⊤ := Subgroup.closure_eq_top_of_mclosure_eq_top mclosure_isSwap /-- Every finite symmetric group is generated by transpositions of adjacent elements. -/ theorem mclosure_swap_castSucc_succ (n : ℕ) : Submonoid.closure (Set.range fun i : Fin n ↦ swap i.castSucc i.succ) = ⊤ := by apply top_unique rw [← mclosure_isSwap, Submonoid.closure_le] rintro _ ⟨i, j, ne, rfl⟩ wlog lt : i < j generalizing i j · rw [swap_comm]; exact this _ _ ne.symm (ne.lt_or_lt.resolve_left lt) induction' j using Fin.induction with j ih · cases lt have mem : swap j.castSucc j.succ ∈ Submonoid.closure (Set.range fun (i : Fin n) ↦ swap i.castSucc i.succ) := Submonoid.subset_closure ⟨_, rfl⟩ obtain rfl \| lts := (Fin.le_castSucc_iff.mpr lt).eq_or_lt · exact mem rw [swap_comm, ← swap_mul_swap_mul_swap (y := Fin.castSucc j) lts.ne lt.ne] exact mul_mem (mul_mem mem <\| ih lts.ne lts) mem /-- Like `swap_induction_on`, but with the composition on the right of `f`. An induction principle for permutations. If `motive` holds for the identity permutation, and is preserved under composition with a non-trivial swap, then `motive` holds for all permutations. -/ @[elab_as_elim] theorem swap_induction_on' [Finite α] {motive : Perm α → Prop} (f : Perm α) (one : motive 1) (mul_swap : ∀ f x y, x ≠ y → motive f → motive (f * swap x y)) : motive f := inv_inv f ▸ swap_induction_on f⁻¹ one fun f => mul_swap f⁻¹ theorem isConj_swap {w x y z : α} (hwx : w ≠ x) (hyz : y ≠ z) : IsConj (swap w x) (swap y z) := isConj_iff.2 (have h : ∀ {y z : α}, y ≠ z → w ≠ z → swap w y * swap x z * swap w x * (swap w y * swap x z)⁻¹ = swap y z := fun {y z} hyz hwz => by rw [mul_inv_rev, swap_inv, swap_inv, mul_assoc (swap w y), mul_assoc (swap w y), ← mul_assoc _ (swap x z), swap_mul_swap_mul_swap hwx hwz, ← mul_assoc, swap_mul_swap_mul_swap hwz.symm hyz.symm] if hwz : w = z then have hwy : w ≠ y := by rw [hwz]; exact hyz.symm ⟨swap w z * swap x y, by rw [swap_comm y z, h hyz.symm hwy]⟩ else ⟨swap w y * swap x z, h hyz hwz⟩) /-- set of all pairs (⟨a, b⟩ : Σ a : fin n, fin n) such that b < a -/ def finPairsLT (n : ℕ) : Finset (Σ_ : Fin n, Fin n) := (univ : Finset (Fin n)).sigma fun a => (range a).attachFin fun _ hm => (mem_range.1 hm).trans a.2 theorem mem_finPairsLT {n : ℕ} {a : Σ _ : Fin n, Fin n} : a ∈ finPairsLT n ↔ a.2 < a.1 := by simp only [finPairsLT, Fin.lt_iff_val_lt_val, true_and, mem_attachFin, mem_range, mem_univ, mem_sigma] /-- `signAux σ` is the sign of a permutation on `Fin n`, defined as the parity of the number of pairs `(x₁, x₂)` such that `x₂ < x₁` but `σ x₁ ≤ σ x₂` -/ def signAux {n : ℕ} (a : Perm (Fin n)) : ℤˣ := ∏ x ∈ finPairsLT n, if a x.1 ≤ a x.2 then -1 else 1 @[simp] theorem signAux_one (n : ℕ) : signAux (1 : Perm (Fin n)) = 1 := by unfold signAux conv => rhs; rw [← @Finset.prod_const_one _ _ (finPairsLT n)] exact Finset.prod_congr rfl fun a ha => if_neg (mem_finPairsLT.1 ha).not_le /-- `signBijAux f ⟨a, b⟩` returns the pair consisting of `f a` and `f b` in decreasing order. -/ def signBijAux {n : ℕ} (f : Perm (Fin n)) (a : Σ _ : Fin n, Fin n) : Σ_ : Fin n, Fin n := if _ : f a.2 < f a.1 then ⟨f a.1, f a.2⟩ else ⟨f a.2, f a.1⟩ theorem signBijAux_injOn {n : ℕ} {f : Perm (Fin n)} : (finPairsLT n : Set (Σ _, Fin n)).InjOn (signBijAux f) := by rintro ⟨a₁, a₂⟩ ha ⟨b₁, b₂⟩ hb h dsimp [signBijAux] at h rw [Finset.mem_coe, mem_finPairsLT] at * have : ¬b₁ < b₂ := hb.le.not_lt split_ifs at h <;> simp_all only [not_lt, Sigma.mk.inj_iff, (Equiv.injective f).eq_iff, heq_eq_eq] · exact absurd this (not_le.mpr ha) · exact absurd this (not_le.mpr ha) theorem signBijAux_surj {n : ℕ} {f : Perm (Fin n)} : ∀ a ∈ finPairsLT n, ∃ b ∈ finPairsLT n, signBijAux f b = a := fun ⟨a₁, a₂⟩ ha => if hxa : f⁻¹ a₂ < f⁻¹ a₁ then ⟨⟨f⁻¹ a₁, f⁻¹ a₂⟩, mem_finPairsLT.2 hxa, by dsimp [signBijAux] rw [apply_inv_self, apply_inv_self, if_pos (mem_finPairsLT.1 ha)]⟩ else ⟨⟨f⁻¹ a₂, f⁻¹ a₁⟩, mem_finPairsLT.2 <\| (le_of_not_gt hxa).lt_of_ne fun h => by simp [mem_finPairsLT, f⁻¹.injective h, lt_irrefl] at ha, by dsimp [signBijAux] rw [apply_inv_self, apply_inv_self, if_neg (mem_finPairsLT.1 ha).le.not_lt]⟩ theorem signBijAux_mem {n : ℕ} {f : Perm (Fin n)} : ∀ a : Σ_ : Fin n, Fin n, a ∈ finPairsLT n → signBijAux f a ∈ finPairsLT n := fun ⟨a₁, a₂⟩ ha => by unfold signBijAux split_ifs with h · exact mem_finPairsLT.2 h · exact mem_finPairsLT.2 ((le_of_not_gt h).lt_of_ne fun h => (mem_finPairsLT.1 ha).ne (f.injective h.symm)) @[simp] theorem signAux_inv {n : ℕ} (f : Perm (Fin n)) : signAux f⁻¹ = signAux f := prod_nbij (signBijAux f⁻¹) signBijAux_mem signBijAux_injOn signBijAux_surj fun ⟨a, b⟩ hab ↦ if h : f⁻¹ b < f⁻¹ a then by simp_all [signBijAux, dif_pos h, if_neg h.not_le, apply_inv_self, apply_inv_self, if_neg (mem_finPairsLT.1 hab).not_le] else by simp_all [signBijAux, if_pos (le_of_not_gt h), dif_neg h, apply_inv_self, apply_inv_self, if_pos (mem_finPairsLT.1 hab).le] theorem signAux_mul {n : ℕ} (f g : Perm (Fin n)) : signAux (f * g) = signAux f * signAux g := by rw [← signAux_inv g] unfold signAux rw [← prod_mul_distrib] refine prod_nbij (signBijAux g) signBijAux_mem signBijAux_injOn signBijAux_surj ?_ rintro ⟨a, b⟩ hab dsimp only [signBijAux] rw [mul_apply, mul_apply] rw [mem_finPairsLT] at hab by_cases h : g b < g a · rw [dif_pos h] simp only [not_le_of_gt hab, mul_one, mul_ite, mul_neg, Perm.inv_apply_self, if_false] · rw [dif_neg h, inv_apply_self, inv_apply_self, if_pos hab.le] by_cases h₁ : f (g b) ≤ f (g a) · have : f (g b) ≠ f (g a) := by rw [Ne, f.injective.eq_iff, g.injective.eq_iff] exact ne_of_lt hab rw [if_pos h₁, if_neg (h₁.lt_of_ne this).not_le] rfl · rw [if_neg h₁, if_pos (lt_of_not_ge h₁).le] rfl private theorem signAux_swap_zero_one' (n : ℕ) : signAux (swap (0 : Fin (n + 2)) 1) = -1 := show _ = ∏ x ∈ {(⟨1, 0⟩ : Σ _ : Fin (n + 2), Fin (n + 2))}, if (Equiv.swap 0 1) x.1 ≤ swap 0 1 x.2 then (-1 : ℤˣ) else 1 by refine Eq.symm (prod_subset (fun ⟨x₁, x₂⟩ => by simp +contextual [mem_finPairsLT, Fin.one_pos]) fun a ha₁ ha₂ => ?_) rcases a with ⟨a₁, a₂⟩ replace ha₁ : a₂ < a₁ := mem_finPairsLT.1 ha₁ dsimp only rcases a₁.zero_le.eq_or_lt with (rfl \| H) · exact absurd a₂.zero_le ha₁.not_le rcases a₂.zero_le.eq_or_lt with (rfl \| H') · simp only [and_true, eq_self_iff_true, heq_iff_eq, mem_singleton, Sigma.mk.inj_iff] at ha₂ have : 1 < a₁ := lt_of_le_of_ne (Nat.succ_le_of_lt ha₁) (Ne.symm (by intro h; apply ha₂; simp [h])) have h01 : Equiv.swap (0 : Fin (n + 2)) 1 0 = 1 := by simp rw [swap_apply_of_ne_of_ne (ne_of_gt H) ha₂, h01, if_neg this.not_le] · have le : 1 ≤ a₂ := Nat.succ_le_of_lt H' have lt : 1 < a₁ := le.trans_lt ha₁ have h01 : Equiv.swap (0 : Fin (n + 2)) 1 1 = 0 := by simp only [swap_apply_right] rcases le.eq_or_lt with (rfl \| lt') · rw [swap_apply_of_ne_of_ne H.ne' lt.ne', h01, if_neg H.not_le] · rw [swap_apply_of_ne_of_ne (ne_of_gt H) (ne_of_gt lt), swap_apply_of_ne_of_ne (ne_of_gt H') (ne_of_gt lt'), if_neg ha₁.not_le] private theorem signAux_swap_zero_one {n : ℕ} (hn : 2 ≤ n) : signAux (swap (⟨0, lt_of_lt_of_le (by decide) hn⟩ : Fin n) ⟨1, lt_of_lt_of_le (by decide) hn⟩) = -1 := by rcases n with (_ \| _ \| n) · norm_num at hn · norm_num at hn · exact signAux_swap_zero_one' n theorem signAux_swap : ∀ {n : ℕ} {x y : Fin n} (_hxy : x ≠ y), signAux (swap x y) = -1 \| 0, x, y => by intro; exact Fin.elim0 x \| 1, x, y => by dsimp [signAux, swap, swapCore] simp only [eq_iff_true_of_subsingleton, not_true, ite_true, le_refl, prod_const, IsEmpty.forall_iff] \| n + 2, x, y => fun hxy => by have h2n : 2 ≤ n + 2 := by exact le_add_self rw [← isConj_iff_eq, ← signAux_swap_zero_one h2n] exact (MonoidHom.mk' signAux signAux_mul).map_isConj (isConj_swap hxy (by exact of_decide_eq_true rfl)) /-- When the list `l : List α` contains all nonfixed points of the permutation `f : Perm α`, `signAux2 l f` recursively calculates the sign of `f`. -/ def signAux2 : List α → Perm α → ℤˣ \| [], _ => 1 \| x::l, f => if x = f x then signAux2 l f else -signAux2 l (swap x (f x) * f) theorem signAux_eq_signAux2 {n : ℕ} : ∀ (l : List α) (f : Perm α) (e : α ≃ Fin n) (_h : ∀ x, f x ≠ x → x ∈ l), signAux ((e.symm.trans f).trans e) = signAux2 l f \| [], f, e, h => by have : f = 1 := Equiv.ext fun y => Classical.not_not.1 (mt (h y) List.not_mem_nil) rw [this, one_def, Equiv.trans_refl, Equiv.symm_trans_self, ← one_def, signAux_one, signAux2] \| x::l, f, e, h => by rw [signAux2] by_cases hfx : x = f x · rw [if_pos hfx] exact signAux_eq_signAux2 l f _ fun y (hy : f y ≠ y) => List.mem_of_ne_of_mem (fun h : y = x => by simp [h, hfx.symm] at hy) (h y hy) · have hy : ∀ y : α, (swap x (f x) * f) y ≠ y → y ∈ l := fun y hy => have : f y ≠ y ∧ y ≠ x := ne_and_ne_of_swap_mul_apply_ne_self hy List.mem_of_ne_of_mem this.2 (h _ this.1) have : (e.symm.trans (swap x (f x) * f)).trans e = swap (e x) (e (f x)) * (e.symm.trans f).trans e := by ext rw [← Equiv.symm_trans_swap_trans, mul_def, Equiv.symm_trans_swap_trans, mul_def] repeat (rw [trans_apply]) simp [swap, swapCore] split_ifs <;> rfl have hefx : e x ≠ e (f x) := mt e.injective.eq_iff.1 hfx rw [if_neg hfx, ← signAux_eq_signAux2 _ _ e hy, this, signAux_mul, signAux_swap hefx] simp only [neg_neg, one_mul, neg_mul] /-- When the multiset `s : Multiset α` contains all nonfixed points of the permutation `f : Perm α`, `signAux2 f _` recursively calculates the sign of `f`. -/ def signAux3 [Finite α] (f : Perm α) {s : Multiset α} : (∀ x, x ∈ s) → ℤˣ := Quotient.hrecOn s (fun l _ => signAux2 l f) fun l₁ l₂ h ↦ by rcases Finite.exists_equiv_fin α with ⟨n, ⟨e⟩⟩ refine Function.hfunext (forall_congr fun _ ↦ propext h.mem_iff) fun h₁ h₂ _ ↦ ?_ rw [← signAux_eq_signAux2 _ _ e fun _ _ => h₁ _, ← signAux_eq_signAux2 _ _ e fun _ _ => h₂ _] theorem signAux3_mul_and_swap [Finite α] (f g : Perm α) (s : Multiset α) (hs : ∀ x, x ∈ s) : signAux3 (f * g) hs = signAux3 f hs * signAux3 g hs ∧ Pairwise fun x y => signAux3 (swap x y) hs = -1 := by obtain ⟨n, ⟨e⟩⟩ := Finite.exists_equiv_fin α induction s using Quotient.inductionOn with \| _ l => ?_ show signAux2 l (f * g) = signAux2 l f * signAux2 l g ∧ Pairwise fun x y => signAux2 l (swap x y) = -1 have hfg : (e.symm.trans (f * g)).trans e = (e.symm.trans f).trans e * (e.symm.trans g).trans e := Equiv.ext fun h => by simp [mul_apply] constructor · rw [← signAux_eq_signAux2 _ _ e fun _ _ => hs _, ← signAux_eq_signAux2 _ _ e fun _ _ => hs _, ← signAux_eq_signAux2 _ _ e fun _ _ => hs _, hfg, signAux_mul] · intro x y hxy rw [← e.injective.ne_iff] at hxy rw [← signAux_eq_signAux2 _ _ e fun _ _ => hs _, symm_trans_swap_trans, signAux_swap hxy] theorem signAux3_symm_trans_trans [Finite α] [DecidableEq β] [Finite β] (f : Perm α) (e : α ≃ β) {s : Multiset α} {t : Multiset β} (hs : ∀ x, x ∈ s) (ht : ∀ x, x ∈ t) : signAux3 ((e.symm.trans f).trans e) ht = signAux3 f hs := by induction' t, s using Quotient.inductionOn₂ with t s ht hs show signAux2 _ _ = signAux2 _ _ rcases Finite.exists_equiv_fin β with ⟨n, ⟨e'⟩⟩ rw [← signAux_eq_signAux2 _ _ e' fun _ _ => ht _, ← signAux_eq_signAux2 _ _ (e.trans e') fun _ _ => hs _] exact congr_arg signAux (Equiv.ext fun x => by simp [Equiv.coe_trans, apply_eq_iff_eq, symm_trans_apply]) /-- `SignType.sign` of a permutation returns the signature or parity of a permutation, `1` for even permutations, `-1` for odd permutations. It is the unique surjective group homomorphism from `Perm α` to the group with two elements. -/ def sign [Fintype α] : Perm α →* ℤˣ := MonoidHom.mk' (fun f => signAux3 f mem_univ) fun f g => (signAux3_mul_and_swap f g _ mem_univ).1 section SignType.sign variable [Fintype α] @[simp] theorem sign_mul (f g : Perm α) : sign (f * g) = sign f * sign g := MonoidHom.map_mul sign f g @[simp] theorem sign_trans (f g : Perm α) : sign (f.trans g) = sign g * sign f := by rw [← mul_def, sign_mul] @[simp] theorem sign_one : sign (1 : Perm α) = 1 := MonoidHom.map_one sign @[simp] theorem sign_refl : sign (Equiv.refl α) = 1 := MonoidHom.map_one sign @[simp] theorem sign_inv (f : Perm α) : sign f⁻¹ = sign f := by rw [MonoidHom.map_inv sign f, Int.units_inv_eq_self] @[simp] theorem sign_symm (e : Perm α) : sign e.symm = sign e := sign_inv e theorem sign_swap {x y : α} (h : x ≠ y) : sign (swap x y) = -1 := (signAux3_mul_and_swap 1 1 _ mem_univ).2 h @[simp] theorem sign_swap' {x y : α} : sign (swap x y) = if x = y then 1 else -1 := if H : x = y then by simp [H, swap_self] else by simp [sign_swap H, H] theorem IsSwap.sign_eq {f : Perm α} (h : f.IsSwap) : sign f = -1 := let ⟨_, _, hxy⟩ := h hxy.2.symm ▸ sign_swap hxy.1 @[simp] theorem sign_symm_trans_trans [DecidableEq β] [Fintype β] (f : Perm α) (e : α ≃ β) : sign ((e.symm.trans f).trans e) = sign f := signAux3_symm_trans_trans f e mem_univ mem_univ @[simp] theorem sign_trans_trans_symm [DecidableEq β] [Fintype β] (f : Perm β) (e : α ≃ β) : sign ((e.trans f).trans e.symm) = sign f := sign_symm_trans_trans f e.symm theorem sign_prod_list_swap {l : List (Perm α)} (hl : ∀ g ∈ l, IsSwap g) :	sign l.prod = (-1) ^ l.length := by have h₁ : l.map sign = List.replicate l.length (-1) :=	Mathlib/GroupTheory/Perm/Sign.lean	420	421
/- Copyright (c) 2020 Patrick Massot. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Patrick Massot -/ import Mathlib.Topology.Path /-! # Path connectedness Continuing from `Mathlib.Topology.Path`, this file defines path components and path-connected spaces. ## Main definitions In the file the unit interval `[0, 1]` in `ℝ` is denoted by `I`, and `X` is a topological space. * `Joined (x y : X)` means there is a path between `x` and `y`. * `Joined.somePath (h : Joined x y)` selects some path between two points `x` and `y`. * `pathComponent (x : X)` is the set of points joined to `x`. * `PathConnectedSpace X` is a predicate class asserting that `X` is non-empty and every two points of `X` are joined. Then there are corresponding relative notions for `F : Set X`. * `JoinedIn F (x y : X)` means there is a path `γ` joining `x` to `y` with values in `F`. * `JoinedIn.somePath (h : JoinedIn F x y)` selects a path from `x` to `y` inside `F`. * `pathComponentIn F (x : X)` is the set of points joined to `x` in `F`. * `IsPathConnected F` asserts that `F` is non-empty and every two points of `F` are joined in `F`. ## Main theorems * `Joined` is an equivalence relation, while `JoinedIn F` is at least symmetric and transitive. One can link the absolute and relative version in two directions, using `(univ : Set X)` or the subtype `↥F`. * `pathConnectedSpace_iff_univ : PathConnectedSpace X ↔ IsPathConnected (univ : Set X)` * `isPathConnected_iff_pathConnectedSpace : IsPathConnected F ↔ PathConnectedSpace ↥F` Furthermore, it is shown that continuous images and quotients of path-connected sets/spaces are path-connected, and that every path-connected set/space is also connected. -/ noncomputable section open Topology Filter unitInterval Set Function variable {X Y : Type} [TopologicalSpace X] [TopologicalSpace Y] {x y z : X} {ι : Type} /-! ### Being joined by a path -/ /-- The relation "being joined by a path". This is an equivalence relation. -/ def Joined (x y : X) : Prop := Nonempty (Path x y) @[refl] theorem Joined.refl (x : X) : Joined x x := ⟨Path.refl x⟩ /-- When two points are joined, choose some path from `x` to `y`. -/ def Joined.somePath (h : Joined x y) : Path x y := Nonempty.some h @[symm] theorem Joined.symm {x y : X} (h : Joined x y) : Joined y x := ⟨h.somePath.symm⟩ @[trans] theorem Joined.trans {x y z : X} (hxy : Joined x y) (hyz : Joined y z) : Joined x z := ⟨hxy.somePath.trans hyz.somePath⟩ variable (X) /-- The setoid corresponding the equivalence relation of being joined by a continuous path. -/ def pathSetoid : Setoid X where r := Joined iseqv := Equivalence.mk Joined.refl Joined.symm Joined.trans /-- The quotient type of points of a topological space modulo being joined by a continuous path. -/ def ZerothHomotopy := Quotient (pathSetoid X) instance ZerothHomotopy.inhabited : Inhabited (ZerothHomotopy ℝ) := ⟨@Quotient.mk' ℝ (pathSetoid ℝ) 0⟩ variable {X} /-! ### Being joined by a path inside a set -/ /-- The relation "being joined by a path in `F`". Not quite an equivalence relation since it's not reflexive for points that do not belong to `F`. -/ def JoinedIn (F : Set X) (x y : X) : Prop := ∃ γ : Path x y, ∀ t, γ t ∈ F variable {F : Set X} theorem JoinedIn.mem (h : JoinedIn F x y) : x ∈ F ∧ y ∈ F := by rcases h with ⟨γ, γ_in⟩ have : γ 0 ∈ F ∧ γ 1 ∈ F := by constructor <;> apply γ_in simpa using this theorem JoinedIn.source_mem (h : JoinedIn F x y) : x ∈ F := h.mem.1 theorem JoinedIn.target_mem (h : JoinedIn F x y) : y ∈ F := h.mem.2 /-- When `x` and `y` are joined in `F`, choose a path from `x` to `y` inside `F` -/ def JoinedIn.somePath (h : JoinedIn F x y) : Path x y := Classical.choose h theorem JoinedIn.somePath_mem (h : JoinedIn F x y) (t : I) : h.somePath t ∈ F := Classical.choose_spec h t /-- If `x` and `y` are joined in the set `F`, then they are joined in the subtype `F`. -/ theorem JoinedIn.joined_subtype (h : JoinedIn F x y) : Joined (⟨x, h.source_mem⟩ : F) (⟨y, h.target_mem⟩ : F) := ⟨{ toFun := fun t => ⟨h.somePath t, h.somePath_mem t⟩ continuous_toFun := by fun_prop source' := by simp target' := by simp }⟩ theorem JoinedIn.ofLine {f : ℝ → X} (hf : ContinuousOn f I) (h₀ : f 0 = x) (h₁ : f 1 = y) (hF : f '' I ⊆ F) : JoinedIn F x y := ⟨Path.ofLine hf h₀ h₁, fun t => hF <\| Path.ofLine_mem hf h₀ h₁ t⟩ theorem JoinedIn.joined (h : JoinedIn F x y) : Joined x y := ⟨h.somePath⟩ theorem joinedIn_iff_joined (x_in : x ∈ F) (y_in : y ∈ F) : JoinedIn F x y ↔ Joined (⟨x, x_in⟩ : F) (⟨y, y_in⟩ : F) := ⟨fun h => h.joined_subtype, fun h => ⟨h.somePath.map continuous_subtype_val, by simp⟩⟩ @[simp] theorem joinedIn_univ : JoinedIn univ x y ↔ Joined x y := by simp [JoinedIn, Joined, exists_true_iff_nonempty] theorem JoinedIn.mono {U V : Set X} (h : JoinedIn U x y) (hUV : U ⊆ V) : JoinedIn V x y := ⟨h.somePath, fun t => hUV (h.somePath_mem t)⟩ theorem JoinedIn.refl (h : x ∈ F) : JoinedIn F x x := ⟨Path.refl x, fun _t => h⟩ @[symm] theorem JoinedIn.symm (h : JoinedIn F x y) : JoinedIn F y x := by obtain ⟨hx, hy⟩ := h.mem simp_all only [joinedIn_iff_joined] exact h.symm theorem JoinedIn.trans (hxy : JoinedIn F x y) (hyz : JoinedIn F y z) : JoinedIn F x z := by obtain ⟨hx, hy⟩ := hxy.mem obtain ⟨hx, hy⟩ := hyz.mem simp_all only [joinedIn_iff_joined] exact hxy.trans hyz theorem Specializes.joinedIn (h : x ⤳ y) (hx : x ∈ F) (hy : y ∈ F) : JoinedIn F x y := by refine ⟨⟨⟨Set.piecewise {1} (const I y) (const I x), ?_⟩, by simp, by simp⟩, fun t ↦ ?_⟩ · exact isClosed_singleton.continuous_piecewise_of_specializes continuous_const continuous_const fun _ ↦ h · simp only [Path.coe_mk_mk, piecewise] split_ifs <;> assumption theorem Inseparable.joinedIn (h : Inseparable x y) (hx : x ∈ F) (hy : y ∈ F) : JoinedIn F x y := h.specializes.joinedIn hx hy theorem JoinedIn.map_continuousOn (h : JoinedIn F x y) {f : X → Y} (hf : ContinuousOn f F) : JoinedIn (f '' F) (f x) (f y) := let ⟨γ, hγ⟩ := h ⟨γ.map' <\| hf.mono (range_subset_iff.mpr hγ), fun t ↦ mem_image_of_mem _ (hγ t)⟩ theorem JoinedIn.map (h : JoinedIn F x y) {f : X → Y} (hf : Continuous f) : JoinedIn (f '' F) (f x) (f y) := h.map_continuousOn hf.continuousOn theorem Topology.IsInducing.joinedIn_image {f : X → Y} (hf : IsInducing f) (hx : x ∈ F) (hy : y ∈ F) : JoinedIn (f '' F) (f x) (f y) ↔ JoinedIn F x y := by refine ⟨?_, (.map · hf.continuous)⟩ rintro ⟨γ, hγ⟩ choose γ' hγ'F hγ' using hγ have h₀ : x ⤳ γ' 0 := by rw [← hf.specializes_iff, hγ', γ.source] have h₁ : γ' 1 ⤳ y := by rw [← hf.specializes_iff, hγ', γ.target] have h : JoinedIn F (γ' 0) (γ' 1) := by refine ⟨⟨⟨γ', ?_⟩, rfl, rfl⟩, hγ'F⟩ simpa only [hf.continuous_iff, comp_def, hγ'] using map_continuous γ exact (h₀.joinedIn hx (hγ'F _)).trans <\| h.trans <\| h₁.joinedIn (hγ'F _) hy @[deprecated (since := "2024-10-28")] alias Inducing.joinedIn_image := IsInducing.joinedIn_image /-! ### Path component -/ /-- The path component of `x` is the set of points that can be joined to `x`. -/ def pathComponent (x : X) := { y \| Joined x y } theorem mem_pathComponent_iff : x ∈ pathComponent y ↔ Joined y x := .rfl @[simp] theorem mem_pathComponent_self (x : X) : x ∈ pathComponent x := Joined.refl x @[simp] theorem pathComponent.nonempty (x : X) : (pathComponent x).Nonempty := ⟨x, mem_pathComponent_self x⟩ theorem mem_pathComponent_of_mem (h : x ∈ pathComponent y) : y ∈ pathComponent x := Joined.symm h theorem pathComponent_symm : x ∈ pathComponent y ↔ y ∈ pathComponent x := ⟨fun h => mem_pathComponent_of_mem h, fun h => mem_pathComponent_of_mem h⟩ theorem pathComponent_congr (h : x ∈ pathComponent y) : pathComponent x = pathComponent y := by ext z constructor · intro h' rw [pathComponent_symm] exact (h.trans h').symm · intro h' rw [pathComponent_symm] at h' ⊢ exact h'.trans h theorem pathComponent_subset_component (x : X) : pathComponent x ⊆ connectedComponent x := fun y h => (isConnected_range h.somePath.continuous).subset_connectedComponent ⟨0, by simp⟩ ⟨1, by simp⟩ /-- The path component of `x` in `F` is the set of points that can be joined to `x` in `F`. -/ def pathComponentIn (x : X) (F : Set X) := { y \| JoinedIn F x y } @[simp] theorem pathComponentIn_univ (x : X) : pathComponentIn x univ = pathComponent x := by simp [pathComponentIn, pathComponent, JoinedIn, Joined, exists_true_iff_nonempty] theorem Joined.mem_pathComponent (hyz : Joined y z) (hxy : y ∈ pathComponent x) : z ∈ pathComponent x := hxy.trans hyz theorem mem_pathComponentIn_self (h : x ∈ F) : x ∈ pathComponentIn x F := JoinedIn.refl h theorem pathComponentIn_subset : pathComponentIn x F ⊆ F := fun _ hy ↦ hy.target_mem theorem pathComponentIn_nonempty_iff : (pathComponentIn x F).Nonempty ↔ x ∈ F := ⟨fun ⟨_, ⟨γ, hγ⟩⟩ ↦ γ.source ▸ hγ 0, fun hx ↦ ⟨x, mem_pathComponentIn_self hx⟩⟩ theorem pathComponentIn_congr (h : x ∈ pathComponentIn y F) : pathComponentIn x F = pathComponentIn y F := by ext; exact ⟨h.trans, h.symm.trans⟩ @[gcongr] theorem pathComponentIn_mono {G : Set X} (h : F ⊆ G) : pathComponentIn x F ⊆ pathComponentIn x G := fun _ ⟨γ, hγ⟩ ↦ ⟨γ, fun t ↦ h (hγ t)⟩ /-! ### Path connected sets -/ /-- A set `F` is path connected if it contains a point that can be joined to all other in `F`. -/ def IsPathConnected (F : Set X) : Prop := ∃ x ∈ F, ∀ {y}, y ∈ F → JoinedIn F x y theorem isPathConnected_iff_eq : IsPathConnected F ↔ ∃ x ∈ F, pathComponentIn x F = F := by constructor <;> rintro ⟨x, x_in, h⟩ <;> use x, x_in · ext y exact ⟨fun hy => hy.mem.2, h⟩ · intro y y_in rwa [← h] at y_in theorem IsPathConnected.joinedIn (h : IsPathConnected F) : ∀ᵉ (x ∈ F) (y ∈ F), JoinedIn F x y := fun _x x_in _y y_in => let ⟨_b, _b_in, hb⟩ := h (hb x_in).symm.trans (hb y_in) theorem isPathConnected_iff : IsPathConnected F ↔ F.Nonempty ∧ ∀ᵉ (x ∈ F) (y ∈ F), JoinedIn F x y := ⟨fun h => ⟨let ⟨b, b_in, _hb⟩ := h; ⟨b, b_in⟩, h.joinedIn⟩, fun ⟨⟨b, b_in⟩, h⟩ => ⟨b, b_in, fun x_in => h _ b_in _ x_in⟩⟩ /-- If `f` is continuous on `F` and `F` is path-connected, so is `f(F)`. -/ theorem IsPathConnected.image' (hF : IsPathConnected F) {f : X → Y} (hf : ContinuousOn f F) : IsPathConnected (f '' F) := by rcases hF with ⟨x, x_in, hx⟩ use f x, mem_image_of_mem f x_in rintro _ ⟨y, y_in, rfl⟩ refine ⟨(hx y_in).somePath.map' ?_, fun t ↦ ⟨_, (hx y_in).somePath_mem t, rfl⟩⟩ exact hf.mono (range_subset_iff.2 (hx y_in).somePath_mem) /-- If `f` is continuous and `F` is path-connected, so is `f(F)`. -/ theorem IsPathConnected.image (hF : IsPathConnected F) {f : X → Y} (hf : Continuous f) : IsPathConnected (f '' F) := hF.image' hf.continuousOn /-- If `f : X → Y` is an inducing map, `f(F)` is path-connected iff `F` is. -/ nonrec theorem Topology.IsInducing.isPathConnected_iff {f : X → Y} (hf : IsInducing f) : IsPathConnected F ↔ IsPathConnected (f '' F) := by simp only [IsPathConnected, forall_mem_image, exists_mem_image] refine exists_congr fun x ↦ and_congr_right fun hx ↦ forall₂_congr fun y hy ↦ ?_ rw [hf.joinedIn_image hx hy] @[deprecated (since := "2024-10-28")] alias Inducing.isPathConnected_iff := IsInducing.isPathConnected_iff /-- If `h : X → Y` is a homeomorphism, `h(s)` is path-connected iff `s` is. -/ @[simp] theorem Homeomorph.isPathConnected_image {s : Set X} (h : X ≃ₜ Y) : IsPathConnected (h '' s) ↔ IsPathConnected s := h.isInducing.isPathConnected_iff.symm /-- If `h : X → Y` is a homeomorphism, `h⁻¹(s)` is path-connected iff `s` is. -/ @[simp] theorem Homeomorph.isPathConnected_preimage {s : Set Y} (h : X ≃ₜ Y) : IsPathConnected (h ⁻¹' s) ↔ IsPathConnected s := by rw [← Homeomorph.image_symm]; exact h.symm.isPathConnected_image theorem IsPathConnected.mem_pathComponent (h : IsPathConnected F) (x_in : x ∈ F) (y_in : y ∈ F) : y ∈ pathComponent x := (h.joinedIn x x_in y y_in).joined theorem IsPathConnected.subset_pathComponent (h : IsPathConnected F) (x_in : x ∈ F) : F ⊆ pathComponent x := fun _y y_in => h.mem_pathComponent x_in y_in theorem IsPathConnected.subset_pathComponentIn {s : Set X} (hs : IsPathConnected s) (hxs : x ∈ s) (hsF : s ⊆ F) : s ⊆ pathComponentIn x F := fun y hys ↦ (hs.joinedIn x hxs y hys).mono hsF theorem isPathConnected_singleton (x : X) : IsPathConnected ({x} : Set X) := by refine ⟨x, rfl, ?_⟩ rintro y rfl exact JoinedIn.refl rfl theorem isPathConnected_pathComponentIn (h : x ∈ F) : IsPathConnected (pathComponentIn x F) := ⟨x, mem_pathComponentIn_self h, fun ⟨γ, hγ⟩ ↦ by refine ⟨γ, fun t ↦ ⟨(γ.truncateOfLE t.2.1).cast (γ.extend_zero.symm) (γ.extend_extends' t).symm, fun t' ↦ ?_⟩⟩ dsimp [Path.truncateOfLE, Path.truncate] exact γ.extend_extends' ⟨min (max t'.1 0) t.1, by simp [t.2.1, t.2.2]⟩ ▸ hγ _⟩	theorem isPathConnected_pathComponent : IsPathConnected (pathComponent x) := by rw [← pathComponentIn_univ] exact isPathConnected_pathComponentIn (mem_univ x) theorem IsPathConnected.union {U V : Set X} (hU : IsPathConnected U) (hV : IsPathConnected V) (hUV : (U ∩ V).Nonempty) : IsPathConnected (U ∪ V) := by rcases hUV with ⟨x, xU, xV⟩ use x, Or.inl xU rintro y (yU \| yV) · exact (hU.joinedIn x xU y yU).mono subset_union_left · exact (hV.joinedIn x xV y yV).mono subset_union_right	Mathlib/Topology/Connected/PathConnected.lean	342	354
/- Copyright (c) 2021 Adam Topaz. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Adam Topaz -/ import Mathlib.CategoryTheory.Sites.CompatiblePlus import Mathlib.CategoryTheory.Sites.ConcreteSheafification /-! In this file, we prove that sheafification is compatible with functors which preserve the correct limits and colimits. -/ namespace CategoryTheory.GrothendieckTopology open CategoryTheory open CategoryTheory.Limits open Opposite universe w₁ w₂ v u variable {C : Type u} [Category.{v} C] (J : GrothendieckTopology C) variable {D : Type w₁} [Category.{max v u} D] variable {E : Type w₂} [Category.{max v u} E] variable (F : D ⥤ E) variable [∀ (J : MulticospanShape.{max v u, max v u}), HasLimitsOfShape (WalkingMulticospan J) D] variable [∀ (J : MulticospanShape.{max v u, max v u}), HasLimitsOfShape (WalkingMulticospan J) E] variable [∀ X : C, HasColimitsOfShape (J.Cover X)ᵒᵖ D] variable [∀ X : C, HasColimitsOfShape (J.Cover X)ᵒᵖ E] variable [∀ X : C, PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] variable [∀ (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] variable (P : Cᵒᵖ ⥤ D) /-- The isomorphism between the sheafification of `P` composed with `F` and the sheafification of `P ⋙ F`. Use the lemmas `whisker_right_to_sheafify_sheafify_comp_iso_hom`, `to_sheafify_comp_sheafify_comp_iso_inv` and `sheafify_comp_iso_inv_eq_sheafify_lift` to reduce the components of this isomorphisms to a state that can be handled using the universal property of sheafification. -/ noncomputable def sheafifyCompIso : J.sheafify P ⋙ F ≅ J.sheafify (P ⋙ F) := J.plusCompIso _ _ ≪≫ (J.plusFunctor _).mapIso (J.plusCompIso _ _) /-- The isomorphism between the sheafification of `P` composed with `F` and the sheafification of `P ⋙ F`, functorially in `F`. -/ noncomputable def sheafificationWhiskerLeftIso (P : Cᵒᵖ ⥤ D) [∀ (F : D ⥤ E) (X : C), PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] [∀ (F : D ⥤ E) (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] : (whiskeringLeft _ _ E).obj (J.sheafify P) ≅ (whiskeringLeft _ _ _).obj P ⋙ J.sheafification E := by refine J.plusFunctorWhiskerLeftIso _ ≪≫ ?_ ≪≫ Functor.associator _ _ _ refine isoWhiskerRight ?_ _ exact J.plusFunctorWhiskerLeftIso _ @[simp] theorem sheafificationWhiskerLeftIso_hom_app (P : Cᵒᵖ ⥤ D) (F : D ⥤ E) [∀ (F : D ⥤ E) (X : C), PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] [∀ (F : D ⥤ E) (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] : (sheafificationWhiskerLeftIso J P).hom.app F = (J.sheafifyCompIso F P).hom := by dsimp [sheafificationWhiskerLeftIso, sheafifyCompIso] rw [Category.comp_id] @[simp] theorem sheafificationWhiskerLeftIso_inv_app (P : Cᵒᵖ ⥤ D) (F : D ⥤ E) [∀ (F : D ⥤ E) (X : C), PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] [∀ (F : D ⥤ E) (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] : (sheafificationWhiskerLeftIso J P).inv.app F = (J.sheafifyCompIso F P).inv := by dsimp [sheafificationWhiskerLeftIso, sheafifyCompIso] erw [Category.id_comp] /-- The isomorphism between the sheafification of `P` composed with `F` and the sheafification of `P ⋙ F`, functorially in `P`. -/ noncomputable def sheafificationWhiskerRightIso : J.sheafification D ⋙ (whiskeringRight _ _ _).obj F ≅ (whiskeringRight _ _ _).obj F ⋙ J.sheafification E := by refine Functor.associator _ _ _ ≪≫ ?_ refine isoWhiskerLeft (J.plusFunctor D) (J.plusFunctorWhiskerRightIso _) ≪≫ ?_ refine ?_ ≪≫ Functor.associator _ _ _ refine (Functor.associator _ _ _).symm ≪≫ ?_ exact isoWhiskerRight (J.plusFunctorWhiskerRightIso _) (J.plusFunctor E) @[simp] theorem sheafificationWhiskerRightIso_hom_app : (J.sheafificationWhiskerRightIso F).hom.app P = (J.sheafifyCompIso F P).hom := by dsimp [sheafificationWhiskerRightIso, sheafifyCompIso] simp only [Category.id_comp, Category.comp_id] erw [Category.id_comp] @[simp] theorem sheafificationWhiskerRightIso_inv_app : (J.sheafificationWhiskerRightIso F).inv.app P = (J.sheafifyCompIso F P).inv := by dsimp [sheafificationWhiskerRightIso, sheafifyCompIso] simp only [Category.id_comp, Category.comp_id] erw [Category.id_comp] @[simp, reassoc] theorem whiskerRight_toSheafify_sheafifyCompIso_hom : whiskerRight (J.toSheafify _) _ ≫ (J.sheafifyCompIso F P).hom = J.toSheafify _ := by dsimp [sheafifyCompIso] erw [whiskerRight_comp, Category.assoc] slice_lhs 2 3 => rw [plusCompIso_whiskerRight] rw [Category.assoc, ← J.plusMap_comp, whiskerRight_toPlus_comp_plusCompIso_hom, ← Category.assoc, whiskerRight_toPlus_comp_plusCompIso_hom] rfl @[simp, reassoc] theorem toSheafify_comp_sheafifyCompIso_inv : J.toSheafify _ ≫ (J.sheafifyCompIso F P).inv = whiskerRight (J.toSheafify _) _ := by	rw [Iso.comp_inv_eq]; simp section -- We will sheafify `D`-valued presheaves in this section. variable {FD : D → D → Type*} {CD : D → Type (max v u)} [∀ X Y, FunLike (FD X Y) (CD X) (CD Y)] variable [ConcreteCategory.{max v u} D FD] [PreservesLimits (forget D)] [∀ X : C, PreservesColimitsOfShape (J.Cover X)ᵒᵖ (forget D)] [(forget D).ReflectsIsomorphisms]	Mathlib/CategoryTheory/Sites/CompatibleSheafification.lean	118	125
/- 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	743	745
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro -/ import Mathlib.Data.ENNReal.Action import Mathlib.MeasureTheory.MeasurableSpace.Constructions import Mathlib.MeasureTheory.OuterMeasure.Caratheodory /-! # Induced Outer Measure We can extend a function defined on a subset of `Set α` to an outer measure. The underlying function is called `extend`, and the measure it induces is called `inducedOuterMeasure`. Some lemmas below are proven twice, once in the general case, and one where the function `m` is only defined on measurable sets (i.e. when `P = MeasurableSet`). In the latter cases, we can remove some hypotheses in the statement. The general version has the same name, but with a prime at the end. ## Tags outer measure -/ noncomputable section open Set Function Filter open scoped NNReal Topology ENNReal namespace MeasureTheory open OuterMeasure section Extend variable {α : Type} {P : α → Prop} variable (m : ∀ s : α, P s → ℝ≥0∞) /-- We can trivially extend a function defined on a subclass of objects (with codomain `ℝ≥0∞`) to all objects by defining it to be `∞` on the objects not in the class. -/ def extend (s : α) : ℝ≥0∞ := ⨅ h : P s, m s h theorem extend_eq {s : α} (h : P s) : extend m s = m s h := by simp [extend, h] theorem extend_eq_top {s : α} (h : ¬P s) : extend m s = ∞ := by simp [extend, h] theorem smul_extend {R} [Zero R] [SMulWithZero R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] [NoZeroSMulDivisors R ℝ≥0∞] {c : R} (hc : c ≠ 0) : c • extend m = extend fun s h => c • m s h := by classical ext1 s dsimp [extend] by_cases h : P s · simp [h] · simp [h, ENNReal.smul_top, hc] theorem le_extend {s : α} (h : P s) : m s h ≤ extend m s := by simp only [extend, le_iInf_iff] intro rfl -- TODO: why this is a bad `congr` lemma? theorem extend_congr {β : Type} {Pb : β → Prop} {mb : ∀ s : β, Pb s → ℝ≥0∞} {sa : α} {sb : β} (hP : P sa ↔ Pb sb) (hm : ∀ (ha : P sa) (hb : Pb sb), m sa ha = mb sb hb) : extend m sa = extend mb sb := iInf_congr_Prop hP fun _h => hm _ _ @[simp] theorem extend_top {α : Type} {P : α → Prop} : extend (fun _ _ => ∞ : ∀ s : α, P s → ℝ≥0∞) = ⊤ := funext fun _ => iInf_eq_top.mpr fun _ => rfl end Extend section ExtendSet variable {α : Type} {P : Set α → Prop} variable {m : ∀ s : Set α, P s → ℝ≥0∞} variable (P0 : P ∅) (m0 : m ∅ P0 = 0) variable (PU : ∀ ⦃f : ℕ → Set α⦄ (_hm : ∀ i, P (f i)), P (⋃ i, f i)) variable (mU : ∀ ⦃f : ℕ → Set α⦄ (hm : ∀ i, P (f i)), Pairwise (Disjoint on f) → m (⋃ i, f i) (PU hm) = ∑' i, m (f i) (hm i)) variable (msU : ∀ ⦃f : ℕ → Set α⦄ (hm : ∀ i, P (f i)), m (⋃ i, f i) (PU hm) ≤ ∑' i, m (f i) (hm i)) variable (m_mono : ∀ ⦃s₁ s₂ : Set α⦄ (hs₁ : P s₁) (hs₂ : P s₂), s₁ ⊆ s₂ → m s₁ hs₁ ≤ m s₂ hs₂) theorem extend_iUnion_nat {f : ℕ → Set α} (hm : ∀ i, P (f i)) (mU : m (⋃ i, f i) (PU hm) = ∑' i, m (f i) (hm i)) : extend m (⋃ i, f i) = ∑' i, extend m (f i) := (extend_eq _ _).trans <\| mU.trans <\| by congr with i rw [extend_eq] include P0 m0 in theorem extend_empty : extend m ∅ = 0 := (extend_eq _ P0).trans m0 section Subadditive include PU msU in theorem extend_iUnion_le_tsum_nat' (s : ℕ → Set α) : extend m (⋃ i, s i) ≤ ∑' i, extend m (s i) := by by_cases h : ∀ i, P (s i) · rw [extend_eq _ (PU h), congr_arg tsum _] · apply msU h funext i apply extend_eq _ (h i) · obtain ⟨i, hi⟩ := not_forall.1 h exact le_trans (le_iInf fun h => hi.elim h) (ENNReal.le_tsum i) end Subadditive section Mono include m_mono in theorem extend_mono' ⦃s₁ s₂ : Set α⦄ (h₁ : P s₁) (hs : s₁ ⊆ s₂) : extend m s₁ ≤ extend m s₂ := by refine le_iInf ?_ intro h₂ rw [extend_eq m h₁] exact m_mono h₁ h₂ hs end Mono section Unions include P0 m0 PU mU in theorem extend_iUnion {β} [Countable β] {f : β → Set α} (hd : Pairwise (Disjoint on f)) (hm : ∀ i, P (f i)) : extend m (⋃ i, f i) = ∑' i, extend m (f i) := by cases nonempty_encodable β rw [← Encodable.iUnion_decode₂, ← tsum_iUnion_decode₂] · exact extend_iUnion_nat PU (fun n => Encodable.iUnion_decode₂_cases P0 hm) (mU _ (Encodable.iUnion_decode₂_disjoint_on hd)) · exact extend_empty P0 m0 include P0 m0 PU mU in theorem extend_union {s₁ s₂ : Set α} (hd : Disjoint s₁ s₂) (h₁ : P s₁) (h₂ : P s₂) : extend m (s₁ ∪ s₂) = extend m s₁ + extend m s₂ := by rw [union_eq_iUnion, extend_iUnion P0 m0 PU mU (pairwise_disjoint_on_bool.2 hd) (Bool.forall_bool.2 ⟨h₂, h₁⟩), tsum_fintype] simp end Unions variable (m) /-- Given an arbitrary function on a subset of sets, we can define the outer measure corresponding to it (this is the unique maximal outer measure that is at most `m` on the domain of `m`). -/ def inducedOuterMeasure : OuterMeasure α := OuterMeasure.ofFunction (extend m) (extend_empty P0 m0) variable {m P0 m0} theorem le_inducedOuterMeasure {μ : OuterMeasure α} : μ ≤ inducedOuterMeasure m P0 m0 ↔ ∀ (s) (hs : P s), μ s ≤ m s hs := le_ofFunction.trans <\| forall_congr' fun _s => le_iInf_iff /-- If `P u` is `False` for any set `u` that has nonempty intersection both with `s` and `t`, then `μ (s ∪ t) = μ s + μ t`, where `μ = inducedOuterMeasure m P0 m0`. E.g., if `α` is an (e)metric space and `P u = diam u < r`, then this lemma implies that `μ (s ∪ t) = μ s + μ t` on any two sets such that `r ≤ edist x y` for all `x ∈ s` and `y ∈ t`. -/ theorem inducedOuterMeasure_union_of_false_of_nonempty_inter {s t : Set α} (h : ∀ u, (s ∩ u).Nonempty → (t ∩ u).Nonempty → ¬P u) : inducedOuterMeasure m P0 m0 (s ∪ t) = inducedOuterMeasure m P0 m0 s + inducedOuterMeasure m P0 m0 t := ofFunction_union_of_top_of_nonempty_inter fun u hsu htu => @iInf_of_empty _ _ _ ⟨h u hsu htu⟩ _ include PU msU m_mono theorem inducedOuterMeasure_eq_extend' {s : Set α} (hs : P s) : inducedOuterMeasure m P0 m0 s = extend m s := ofFunction_eq s (fun _t => extend_mono' m_mono hs) (extend_iUnion_le_tsum_nat' PU msU) theorem inducedOuterMeasure_eq' {s : Set α} (hs : P s) : inducedOuterMeasure m P0 m0 s = m s hs := (inducedOuterMeasure_eq_extend' PU msU m_mono hs).trans <\| extend_eq _ _ theorem inducedOuterMeasure_eq_iInf (s : Set α) : inducedOuterMeasure m P0 m0 s = ⨅ (t : Set α) (ht : P t) (_ : s ⊆ t), m t ht := by apply le_antisymm · simp only [le_iInf_iff] intro t ht hs refine le_trans (measure_mono hs) ?_ exact le_of_eq (inducedOuterMeasure_eq' _ msU m_mono _) · refine le_iInf ?_ intro f refine le_iInf ?_ intro hf refine le_trans ?_ (extend_iUnion_le_tsum_nat' _ msU _) refine le_iInf ?_ intro h2f exact iInf_le_of_le _ (iInf_le_of_le h2f <\| iInf_le _ hf) theorem inducedOuterMeasure_preimage (f : α ≃ α) (Pm : ∀ s : Set α, P (f ⁻¹' s) ↔ P s) (mm : ∀ (s : Set α) (hs : P s), m (f ⁻¹' s) ((Pm _).mpr hs) = m s hs) {A : Set α} : inducedOuterMeasure m P0 m0 (f ⁻¹' A) = inducedOuterMeasure m P0 m0 A := by rw [inducedOuterMeasure_eq_iInf _ msU m_mono, inducedOuterMeasure_eq_iInf _ msU m_mono]; symm refine f.injective.preimage_surjective.iInf_congr (preimage f) fun s => ?_ refine iInf_congr_Prop (Pm s) ?_; intro hs refine iInf_congr_Prop f.surjective.preimage_subset_preimage_iff ?_ intro _; exact mm s hs theorem inducedOuterMeasure_exists_set {s : Set α} (hs : inducedOuterMeasure m P0 m0 s ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) :	∃ t : Set α, P t ∧ s ⊆ t ∧ inducedOuterMeasure m P0 m0 t ≤ inducedOuterMeasure m P0 m0 s + ε := by have h := ENNReal.lt_add_right hs hε conv at h => lhs rw [inducedOuterMeasure_eq_iInf _ msU m_mono] simp only [iInf_lt_iff] at h rcases h with ⟨t, h1t, h2t, h3t⟩	Mathlib/MeasureTheory/OuterMeasure/Induced.lean	213	220
/- Copyright (c) 2022 Adam Topaz. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Adam Topaz -/ import Mathlib.LinearAlgebra.Dimension.FreeAndStrongRankCondition import Mathlib.LinearAlgebra.FiniteDimensional.Basic /-! # Projective Spaces This file contains the definition of the projectivization of a vector space over a field, as well as the bijection between said projectivization and the collection of all one dimensional subspaces of the vector space. ## Notation `ℙ K V` is localized notation for `Projectivization K V`, the projectivization of a `K`-vector space `V`. ## Constructing terms of `ℙ K V`. We have three ways to construct terms of `ℙ K V`: - `Projectivization.mk K v hv` where `v : V` and `hv : v ≠ 0`. - `Projectivization.mk' K v` where `v : { w : V // w ≠ 0 }`. - `Projectivization.mk'' H h` where `H : Submodule K V` and `h : finrank H = 1`. ## Other definitions - For `v : ℙ K V`, `v.submodule` gives the corresponding submodule of `V`. - `Projectivization.equivSubmodule` is the equivalence between `ℙ K V` and `{ H : Submodule K V // finrank H = 1 }`. - For `v : ℙ K V`, `v.rep : V` is a representative of `v`. -/ variable (K V : Type) [DivisionRing K] [AddCommGroup V] [Module K V] /-- The setoid whose quotient is the projectivization of `V`. -/ def projectivizationSetoid : Setoid { v : V // v ≠ 0 } := (MulAction.orbitRel Kˣ V).comap (↑) /-- The projectivization of the `K`-vector space `V`. The notation `ℙ K V` is preferred. -/ def Projectivization := Quotient (projectivizationSetoid K V) /-- We define notations `ℙ K V` for the projectivization of the `K`-vector space `V`. -/ scoped[LinearAlgebra.Projectivization] notation "ℙ" => Projectivization namespace Projectivization open scoped LinearAlgebra.Projectivization variable {V} /-- Construct an element of the projectivization from a nonzero vector. -/ def mk (v : V) (hv : v ≠ 0) : ℙ K V := Quotient.mk'' ⟨v, hv⟩ /-- A variant of `Projectivization.mk` in terms of a subtype. `mk` is preferred. -/ def mk' (v : { v : V // v ≠ 0 }) : ℙ K V := Quotient.mk'' v @[simp] theorem mk'_eq_mk (v : { v : V // v ≠ 0 }) : mk' K v = mk K ↑v v.2 := rfl instance [Nontrivial V] : Nonempty (ℙ K V) := let ⟨v, hv⟩ := exists_ne (0 : V) ⟨mk K v hv⟩ variable {K} /-- A function on non-zero vectors which is independent of scale, descends to a function on the projectivization. -/ protected def lift {α : Type} (f : { v : V // v ≠ 0 } → α) (hf : ∀ (a b : { v : V // v ≠ 0 }) (t : K), a = t • (b : V) → f a = f b) (x : ℙ K V) : α := Quotient.lift f (by rintro ⟨-, hv⟩ ⟨w, hw⟩ ⟨⟨t, -⟩, rfl⟩; exact hf ⟨_, hv⟩ ⟨w, hw⟩ t rfl) x @[simp] protected lemma lift_mk {α : Type} (f : { v : V // v ≠ 0 } → α) (hf : ∀ (a b : { v : V // v ≠ 0 }) (t : K), a = t • (b : V) → f a = f b) (v : V) (hv : v ≠ 0) : Projectivization.lift f hf (mk K v hv) = f ⟨v, hv⟩ := rfl /-- Choose a representative of `v : Projectivization K V` in `V`. -/ protected noncomputable def rep (v : ℙ K V) : V := v.out theorem rep_nonzero (v : ℙ K V) : v.rep ≠ 0 := v.out.2 @[simp] theorem mk_rep (v : ℙ K V) : mk K v.rep v.rep_nonzero = v := Quotient.out_eq' _ open Module /-- Consider an element of the projectivization as a submodule of `V`. -/ protected def submodule (v : ℙ K V) : Submodule K V := (Quotient.liftOn' v fun v => K ∙ (v : V)) <\| by rintro ⟨a, ha⟩ ⟨b, hb⟩ ⟨x, rfl : x • b = a⟩ exact Submodule.span_singleton_group_smul_eq _ x _ variable (K) theorem mk_eq_mk_iff (v w : V) (hv : v ≠ 0) (hw : w ≠ 0) : mk K v hv = mk K w hw ↔ ∃ a : Kˣ, a • w = v := Quotient.eq'' /-- Two nonzero vectors go to the same point in projective space if and only if one is a scalar multiple of the other. -/ theorem mk_eq_mk_iff' (v w : V) (hv : v ≠ 0) (hw : w ≠ 0) : mk K v hv = mk K w hw ↔ ∃ a : K, a • w = v := by rw [mk_eq_mk_iff K v w hv hw] constructor · rintro ⟨a, ha⟩ exact ⟨a, ha⟩ · rintro ⟨a, ha⟩ refine ⟨Units.mk0 a fun c => hv.symm ?_, ha⟩ rwa [c, zero_smul] at ha theorem exists_smul_eq_mk_rep (v : V) (hv : v ≠ 0) : ∃ a : Kˣ, a • v = (mk K v hv).rep := (mk_eq_mk_iff K _ _ (rep_nonzero _) hv).1 (mk_rep _) variable {K} /-- An induction principle for `Projectivization`. Use as `induction v`. -/ @[elab_as_elim, cases_eliminator, induction_eliminator] theorem ind {P : ℙ K V → Prop} (h : ∀ (v : V) (h : v ≠ 0), P (mk K v h)) : ∀ p, P p := Quotient.ind' <\| Subtype.rec <\| h @[simp] theorem submodule_mk (v : V) (hv : v ≠ 0) : (mk K v hv).submodule = K ∙ v := rfl theorem submodule_eq (v : ℙ K V) : v.submodule = K ∙ v.rep := by conv_lhs => rw [← v.mk_rep] rfl theorem finrank_submodule (v : ℙ K V) : finrank K v.submodule = 1 := by rw [submodule_eq] exact finrank_span_singleton v.rep_nonzero instance (v : ℙ K V) : FiniteDimensional K v.submodule := by rw [← v.mk_rep] change FiniteDimensional K (K ∙ v.rep) infer_instance theorem submodule_injective : Function.Injective (Projectivization.submodule : ℙ K V → Submodule K V) := fun u v h ↦ by induction u using ind with \| h u hu => induction v using ind with \| h v hv => rw [submodule_mk, submodule_mk, Submodule.span_singleton_eq_span_singleton] at h exact ((mk_eq_mk_iff K v u hv hu).2 h).symm variable (K V) /-- The equivalence between the projectivization and the collection of subspaces of dimension 1. -/ noncomputable def equivSubmodule : ℙ K V ≃ { H : Submodule K V // finrank K H = 1 } := (Equiv.ofInjective _ submodule_injective).trans <\| .subtypeEquiv (.refl _) fun H ↦ by refine ⟨fun ⟨v, hv⟩ ↦ hv ▸ v.finrank_submodule, fun h ↦ ?_⟩ rcases finrank_eq_one_iff'.1 h with ⟨v : H, hv₀, hv : ∀ w : H, _⟩ use mk K (v : V) (Subtype.coe_injective.ne hv₀) rw [submodule_mk, SetLike.ext'_iff, Submodule.span_singleton_eq_range] refine (Set.range_subset_iff.2 fun _ ↦ H.smul_mem _ v.2).antisymm fun x hx ↦ ?_ rcases hv ⟨x, hx⟩ with ⟨c, hc⟩ exact ⟨c, congr_arg Subtype.val hc⟩ variable {K V} /-- Construct an element of the projectivization from a subspace of dimension 1. -/ noncomputable def mk'' (H : Submodule K V) (h : finrank K H = 1) : ℙ K V := (equivSubmodule K V).symm ⟨H, h⟩ @[simp] theorem submodule_mk'' (H : Submodule K V) (h : finrank K H = 1) : (mk'' H h).submodule = H := congr_arg Subtype.val <\| (equivSubmodule K V).apply_symm_apply ⟨H, h⟩ @[simp] theorem mk''_submodule (v : ℙ K V) : mk'' v.submodule v.finrank_submodule = v := (equivSubmodule K V).symm_apply_apply v section Map variable {L W : Type} [DivisionRing L] [AddCommGroup W] [Module L W] /-- An injective semilinear map of vector spaces induces a map on projective spaces. -/ def map {σ : K →+* L} (f : V →ₛₗ[σ] W) (hf : Function.Injective f) : ℙ K V → ℙ L W := Quotient.map' (fun v => ⟨f v, fun c => v.2 (hf (by simp [c]))⟩) (by rintro ⟨u, hu⟩ ⟨v, hv⟩ ⟨a, ha⟩ use Units.map σ.toMonoidHom a dsimp at ha ⊢ erw [← f.map_smulₛₗ, ha]) theorem map_mk {σ : K →+* L} (f : V →ₛₗ[σ] W) (hf : Function.Injective f) (v : V) (hv : v ≠ 0) : map f hf (mk K v hv) = mk L (f v) (map_zero f ▸ hf.ne hv) := rfl /-- Mapping with respect to a semilinear map over an isomorphism of fields yields an injective map on projective spaces. -/ theorem map_injective {σ : K →+* L} {τ : L →+* K} [RingHomInvPair σ τ] (f : V →ₛₗ[σ] W) (hf : Function.Injective f) : Function.Injective (map f hf) := fun u v h ↦ by induction u using ind with \| h u hu => induction v using ind with \| h v hv => simp only [map_mk, mk_eq_mk_iff'] at h ⊢ rcases h with ⟨a, ha⟩ refine ⟨τ a, hf ?_⟩ rwa [f.map_smulₛₗ, RingHomInvPair.comp_apply_eq₂] @[simp] theorem map_id : map (LinearMap.id : V →ₗ[K] V) (LinearEquiv.refl K V).injective = id := by ext ⟨v⟩ rfl @[simp] theorem map_comp {F U : Type} [DivisionRing F] [AddCommGroup U] [Module F U] {σ : K →+ L} {τ : L →+* F} {γ : K →+* F} [RingHomCompTriple σ τ γ] (f : V →ₛₗ[σ] W) (hf : Function.Injective f) (g : W →ₛₗ[τ] U) (hg : Function.Injective g) (hgf : Function.Injective (g.comp f) := hg.comp hf) : map (g.comp f) hgf = map g hg ∘ map f hf := by	ext ⟨v⟩ rfl	Mathlib/LinearAlgebra/Projectivization/Basic.lean	221	223
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Simon Hudon, Mario Carneiro -/ import Aesop import Mathlib.Algebra.Group.Defs import Mathlib.Data.Nat.Init import Mathlib.Data.Int.Init import Mathlib.Logic.Function.Iterate import Mathlib.Tactic.SimpRw import Mathlib.Tactic.SplitIfs /-! # Basic lemmas about semigroups, monoids, and groups This file lists various basic lemmas about semigroups, monoids, and groups. Most proofs are one-liners from the corresponding axioms. For the definitions of semigroups, monoids and groups, see `Algebra/Group/Defs.lean`. -/ assert_not_exists MonoidWithZero DenselyOrdered open Function variable {α β G M : Type} section ite variable [Pow α β] @[to_additive (attr := simp) dite_smul] lemma pow_dite (p : Prop) [Decidable p] (a : α) (b : p → β) (c : ¬ p → β) : a ^ (if h : p then b h else c h) = if h : p then a ^ b h else a ^ c h := by split_ifs <;> rfl @[to_additive (attr := simp) smul_dite] lemma dite_pow (p : Prop) [Decidable p] (a : p → α) (b : ¬ p → α) (c : β) : (if h : p then a h else b h) ^ c = if h : p then a h ^ c else b h ^ c := by split_ifs <;> rfl @[to_additive (attr := simp) ite_smul] lemma pow_ite (p : Prop) [Decidable p] (a : α) (b c : β) : a ^ (if p then b else c) = if p then a ^ b else a ^ c := pow_dite _ _ _ _ @[to_additive (attr := simp) smul_ite] lemma ite_pow (p : Prop) [Decidable p] (a b : α) (c : β) : (if p then a else b) ^ c = if p then a ^ c else b ^ c := dite_pow _ _ _ _ set_option linter.existingAttributeWarning false in attribute [to_additive (attr := simp)] dite_smul smul_dite ite_smul smul_ite end ite section Semigroup variable [Semigroup α] @[to_additive] instance Semigroup.to_isAssociative : Std.Associative (α := α) (· ·) := ⟨mul_assoc⟩ /-- Composing two multiplications on the left by `y` then `x` is equal to a multiplication on the left by `x * y`. -/ @[to_additive (attr := simp) "Composing two additions on the left by `y` then `x` is equal to an addition on the left by `x + y`."] theorem comp_mul_left (x y : α) : (x * ·) ∘ (y * ·) = (x * y * ·) := by ext z simp [mul_assoc] /-- Composing two multiplications on the right by `y` and `x` is equal to a multiplication on the right by `y * x`. -/ @[to_additive (attr := simp) "Composing two additions on the right by `y` and `x` is equal to an addition on the right by `y + x`."] theorem comp_mul_right (x y : α) : (· * x) ∘ (· * y) = (· * (y * x)) := by ext z simp [mul_assoc] end Semigroup @[to_additive] instance CommMagma.to_isCommutative [CommMagma G] : Std.Commutative (α := G) (· * ·) := ⟨mul_comm⟩ section MulOneClass variable [MulOneClass M] @[to_additive] theorem ite_mul_one {P : Prop} [Decidable P] {a b : M} : ite P (a * b) 1 = ite P a 1 * ite P b 1 := by by_cases h : P <;> simp [h] @[to_additive] theorem ite_one_mul {P : Prop} [Decidable P] {a b : M} : ite P 1 (a * b) = ite P 1 a * ite P 1 b := by by_cases h : P <;> simp [h] @[to_additive] theorem eq_one_iff_eq_one_of_mul_eq_one {a b : M} (h : a * b = 1) : a = 1 ↔ b = 1 := by constructor <;> (rintro rfl; simpa using h) @[to_additive] theorem one_mul_eq_id : ((1 : M) * ·) = id := funext one_mul @[to_additive] theorem mul_one_eq_id : (· * (1 : M)) = id := funext mul_one end MulOneClass section CommSemigroup variable [CommSemigroup G] @[to_additive] theorem mul_left_comm (a b c : G) : a * (b * c) = b * (a * c) := by rw [← mul_assoc, mul_comm a, mul_assoc] @[to_additive] theorem mul_right_comm (a b c : G) : a * b * c = a * c * b := by rw [mul_assoc, mul_comm b, mul_assoc] @[to_additive] theorem mul_mul_mul_comm (a b c d : G) : a * b * (c * d) = a * c * (b * d) := by simp only [mul_left_comm, mul_assoc] @[to_additive] theorem mul_rotate (a b c : G) : a * b * c = b * c * a := by simp only [mul_left_comm, mul_comm] @[to_additive] theorem mul_rotate' (a b c : G) : a * (b * c) = b * (c * a) := by simp only [mul_left_comm, mul_comm] end CommSemigroup attribute [local simp] mul_assoc sub_eq_add_neg section Monoid variable [Monoid M] {a b : M} {m n : ℕ} @[to_additive boole_nsmul] lemma pow_boole (P : Prop) [Decidable P] (a : M) : (a ^ if P then 1 else 0) = if P then a else 1 := by simp only [pow_ite, pow_one, pow_zero] @[to_additive nsmul_add_sub_nsmul] lemma pow_mul_pow_sub (a : M) (h : m ≤ n) : a ^ m * a ^ (n - m) = a ^ n := by rw [← pow_add, Nat.add_comm, Nat.sub_add_cancel h] @[to_additive sub_nsmul_nsmul_add] lemma pow_sub_mul_pow (a : M) (h : m ≤ n) : a ^ (n - m) * a ^ m = a ^ n := by rw [← pow_add, Nat.sub_add_cancel h] @[to_additive sub_one_nsmul_add] lemma mul_pow_sub_one (hn : n ≠ 0) (a : M) : a * a ^ (n - 1) = a ^ n := by rw [← pow_succ', Nat.sub_add_cancel <\| Nat.one_le_iff_ne_zero.2 hn] @[to_additive add_sub_one_nsmul] lemma pow_sub_one_mul (hn : n ≠ 0) (a : M) : a ^ (n - 1) * a = a ^ n := by rw [← pow_succ, Nat.sub_add_cancel <\| Nat.one_le_iff_ne_zero.2 hn] /-- If `x ^ n = 1`, then `x ^ m` is the same as `x ^ (m % n)` -/ @[to_additive nsmul_eq_mod_nsmul "If `n • x = 0`, then `m • x` is the same as `(m % n) • x`"] lemma pow_eq_pow_mod (m : ℕ) (ha : a ^ n = 1) : a ^ m = a ^ (m % n) := by calc a ^ m = a ^ (m % n + n * (m / n)) := by rw [Nat.mod_add_div] _ = a ^ (m % n) := by simp [pow_add, pow_mul, ha] @[to_additive] lemma pow_mul_pow_eq_one : ∀ n, a * b = 1 → a ^ n * b ^ n = 1 \| 0, _ => by simp \| n + 1, h => calc a ^ n.succ * b ^ n.succ = a ^ n * a * (b * b ^ n) := by rw [pow_succ, pow_succ'] _ = a ^ n * (a * b) * b ^ n := by simp only [mul_assoc] _ = 1 := by simp [h, pow_mul_pow_eq_one] @[to_additive (attr := simp)] lemma mul_left_iterate (a : M) : ∀ n : ℕ, (a * ·)^[n] = (a ^ n * ·) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_succ, mul_left_iterate] @[to_additive (attr := simp)] lemma mul_right_iterate (a : M) : ∀ n : ℕ, (· * a)^[n] = (· * a ^ n) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_succ', mul_right_iterate] @[to_additive] lemma mul_left_iterate_apply_one (a : M) : (a * ·)^[n] 1 = a ^ n := by simp [mul_right_iterate] @[to_additive] lemma mul_right_iterate_apply_one (a : M) : (· * a)^[n] 1 = a ^ n := by simp [mul_right_iterate] @[to_additive (attr := simp)] lemma pow_iterate (k : ℕ) : ∀ n : ℕ, (fun x : M ↦ x ^ k)^[n] = (· ^ k ^ n) \| 0 => by ext; simp \| n + 1 => by ext; simp [pow_iterate, Nat.pow_succ', pow_mul] end Monoid section CommMonoid variable [CommMonoid M] {x y z : M} @[to_additive] theorem inv_unique (hy : x * y = 1) (hz : x * z = 1) : y = z := left_inv_eq_right_inv (Trans.trans (mul_comm _ _) hy) hz @[to_additive nsmul_add] lemma mul_pow (a b : M) : ∀ n, (a * b) ^ n = a ^ n * b ^ n \| 0 => by rw [pow_zero, pow_zero, pow_zero, one_mul] \| n + 1 => by rw [pow_succ', pow_succ', pow_succ', mul_pow, mul_mul_mul_comm] end CommMonoid section LeftCancelMonoid variable [Monoid M] [IsLeftCancelMul M] {a b : M} @[to_additive (attr := simp)] theorem mul_eq_left : a * b = a ↔ b = 1 := calc a * b = a ↔ a * b = a * 1 := by rw [mul_one] _ ↔ b = 1 := mul_left_cancel_iff @[deprecated (since := "2025-03-05")] alias mul_right_eq_self := mul_eq_left @[deprecated (since := "2025-03-05")] alias add_right_eq_self := add_eq_left set_option linter.existingAttributeWarning false in attribute [to_additive existing] mul_right_eq_self @[to_additive (attr := simp)] theorem left_eq_mul : a = a * b ↔ b = 1 :=	eq_comm.trans mul_eq_left	Mathlib/Algebra/Group/Basic.lean	228	229
/- Copyright (c) 2021 Yakov Pechersky. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yakov Pechersky -/ import Mathlib.Algebra.Order.Monoid.Canonical.Defs import Mathlib.Algebra.Order.Monoid.Unbundled.OrderDual import Mathlib.Algebra.BigOperators.Group.List.Basic /-! # Big operators on a list in ordered groups This file contains the results concerning the interaction of list big operators with ordered groups/monoids. -/ variable {ι α M N : Type} namespace List section Monoid variable [Monoid M] @[to_additive sum_le_sum] lemma Forall₂.prod_le_prod' [Preorder M] [MulRightMono M] [MulLeftMono M] {l₁ l₂ : List M} (h : Forall₂ (· ≤ ·) l₁ l₂) : l₁.prod ≤ l₂.prod := by induction h with \| nil => rfl \| cons hab ih ih' => simpa only [prod_cons] using mul_le_mul' hab ih' /-- If `l₁` is a sublist of `l₂` and all elements of `l₂` are greater than or equal to one, then `l₁.prod ≤ l₂.prod`. One can prove a stronger version assuming `∀ a ∈ l₂.diff l₁, 1 ≤ a` instead of `∀ a ∈ l₂, 1 ≤ a` but this lemma is not yet in `mathlib`. -/ @[to_additive sum_le_sum "If `l₁` is a sublist of `l₂` and all elements of `l₂` are nonnegative, then `l₁.sum ≤ l₂.sum`. One can prove a stronger version assuming `∀ a ∈ l₂.diff l₁, 0 ≤ a` instead of `∀ a ∈ l₂, 0 ≤ a` but this lemma is not yet in `mathlib`."] lemma Sublist.prod_le_prod' [Preorder M] [MulRightMono M] [MulLeftMono M] {l₁ l₂ : List M} (h : l₁ <+ l₂) (h₁ : ∀ a ∈ l₂, (1 : M) ≤ a) : l₁.prod ≤ l₂.prod := by induction h with \| slnil => rfl \| cons a _ ih' => simp only [prod_cons, forall_mem_cons] at h₁ ⊢ exact (ih' h₁.2).trans (le_mul_of_one_le_left' h₁.1) \| cons₂ a _ ih' => simp only [prod_cons, forall_mem_cons] at h₁ ⊢ exact mul_le_mul_left' (ih' h₁.2) _ @[to_additive sum_le_sum] lemma SublistForall₂.prod_le_prod' [Preorder M] [MulRightMono M] [MulLeftMono M] {l₁ l₂ : List M} (h : SublistForall₂ (· ≤ ·) l₁ l₂) (h₁ : ∀ a ∈ l₂, (1 : M) ≤ a) : l₁.prod ≤ l₂.prod := let ⟨_, hall, hsub⟩ := sublistForall₂_iff.1 h hall.prod_le_prod'.trans <\| hsub.prod_le_prod' h₁ @[to_additive sum_le_sum] lemma prod_le_prod' [Preorder M] [MulRightMono M] [MulLeftMono M] {l : List ι} {f g : ι → M} (h : ∀ i ∈ l, f i ≤ g i) : (l.map f).prod ≤ (l.map g).prod := Forall₂.prod_le_prod' <\| by simpa @[to_additive sum_lt_sum] lemma prod_lt_prod' [Preorder M] [MulLeftStrictMono M] [MulLeftMono M] [MulRightStrictMono M] [MulRightMono M] {l : List ι} (f g : ι → M) (h₁ : ∀ i ∈ l, f i ≤ g i) (h₂ : ∃ i ∈ l, f i < g i) : (l.map f).prod < (l.map g).prod := by induction' l with i l ihl · rcases h₂ with ⟨_, ⟨⟩, _⟩ simp only [forall_mem_cons, map_cons, prod_cons] at h₁ ⊢ simp only [mem_cons, exists_eq_or_imp] at h₂ cases h₂ · exact mul_lt_mul_of_lt_of_le ‹_› (prod_le_prod' h₁.2) · exact mul_lt_mul_of_le_of_lt h₁.1 <\| ihl h₁.2 ‹_› @[to_additive] lemma prod_lt_prod_of_ne_nil [Preorder M] [MulLeftStrictMono M] [MulLeftMono M] [MulRightStrictMono M] [MulRightMono M] {l : List ι} (hl : l ≠ []) (f g : ι → M) (hlt : ∀ i ∈ l, f i < g i) : (l.map f).prod < (l.map g).prod := (prod_lt_prod' f g fun i hi => (hlt i hi).le) <\| (exists_mem_of_ne_nil l hl).imp fun i hi => ⟨hi, hlt i hi⟩ @[to_additive sum_le_card_nsmul] lemma prod_le_pow_card [Preorder M] [MulRightMono M] [MulLeftMono M] (l : List M) (n : M) (h : ∀ x ∈ l, x ≤ n) : l.prod ≤ n ^ l.length := by simpa only [map_id', map_const', prod_replicate] using prod_le_prod' h @[to_additive card_nsmul_le_sum] lemma pow_card_le_prod [Preorder M] [MulRightMono M] [MulLeftMono M] (l : List M) (n : M) (h : ∀ x ∈ l, n ≤ x) : n ^ l.length ≤ l.prod := @prod_le_pow_card Mᵒᵈ _ _ _ _ l n h @[to_additive exists_lt_of_sum_lt] lemma exists_lt_of_prod_lt' [LinearOrder M] [MulRightMono M] [MulLeftMono M] {l : List ι} (f g : ι → M) (h : (l.map f).prod < (l.map g).prod) : ∃ i ∈ l, f i < g i := by contrapose! h exact prod_le_prod' h @[to_additive exists_le_of_sum_le] lemma exists_le_of_prod_le' [LinearOrder M] [MulLeftStrictMono M] [MulLeftMono M] [MulRightStrictMono M] [MulRightMono M] {l : List ι} (hl : l ≠ []) (f g : ι → M) (h : (l.map f).prod ≤ (l.map g).prod) : ∃ x ∈ l, f x ≤ g x := by contrapose! h exact prod_lt_prod_of_ne_nil hl _ _ h @[to_additive sum_nonneg] lemma one_le_prod_of_one_le [Preorder M] [MulLeftMono M] {l : List M} (hl₁ : ∀ x ∈ l, (1 : M) ≤ x) : 1 ≤ l.prod := by -- We don't use `pow_card_le_prod` to avoid assumption -- [covariant_class M M (function.swap ()) (≤)] induction' l with hd tl ih · rfl rw [prod_cons] exact one_le_mul (hl₁ hd mem_cons_self) (ih fun x h => hl₁ x (mem_cons_of_mem hd h)) @[to_additive] lemma max_prod_le (l : List α) (f g : α → M) [LinearOrder M] [MulLeftMono M] [MulRightMono M] : max (l.map f).prod (l.map g).prod ≤ (l.map fun i ↦ max (f i) (g i)).prod := by rw [max_le_iff] constructor <;> apply List.prod_le_prod' <;> intros · apply le_max_left · apply le_max_right @[to_additive]	lemma prod_min_le [LinearOrder M] [MulLeftMono M] [MulRightMono M] (l : List α) (f g : α → M) : (l.map fun i ↦ min (f i) (g i)).prod ≤ min (l.map f).prod (l.map g).prod := by rw [le_min_iff] constructor <;> apply List.prod_le_prod' <;> intros · apply min_le_left · apply min_le_right end Monoid	Mathlib/Algebra/Order/BigOperators/Group/List.lean	132	140
/- Copyright (c) 2016 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Mario Carneiro, Johannes Hölzl -/ import Mathlib.Algebra.Order.Group.Unbundled.Basic import Mathlib.Algebra.Order.Monoid.Defs import Mathlib.Algebra.Order.Sub.Defs import Mathlib.Util.AssertExists /-! # Ordered groups This file defines bundled ordered groups and develops a few basic results. ## Implementation details Unfortunately, the number of `'` appended to lemmas in this file may differ between the multiplicative and the additive version of a lemma. The reason is that we did not want to change existing names in the library. -/ /- `NeZero` theory should not be needed at this point in the ordered algebraic hierarchy. -/ assert_not_imported Mathlib.Algebra.NeZero open Function universe u variable {α : Type u} /-- An ordered additive commutative group is an additive commutative group with a partial order in which addition is strictly monotone. -/ @[deprecated "Use `[AddCommGroup α] [PartialOrder α] [IsOrderedAddMonoid α]` instead." (since := "2025-04-10")] structure OrderedAddCommGroup (α : Type u) extends AddCommGroup α, PartialOrder α where /-- Addition is monotone in an ordered additive commutative group. -/ protected add_le_add_left : ∀ a b : α, a ≤ b → ∀ c : α, c + a ≤ c + b set_option linter.existingAttributeWarning false in /-- An ordered commutative group is a commutative group with a partial order in which multiplication is strictly monotone. -/ @[to_additive, deprecated "Use `[CommGroup α] [PartialOrder α] [IsOrderedMonoid α]` instead." (since := "2025-04-10")] structure OrderedCommGroup (α : Type u) extends CommGroup α, PartialOrder α where /-- Multiplication is monotone in an ordered commutative group. -/ protected mul_le_mul_left : ∀ a b : α, a ≤ b → ∀ c : α, c * a ≤ c * b alias OrderedCommGroup.mul_lt_mul_left' := mul_lt_mul_left' attribute [to_additive OrderedAddCommGroup.add_lt_add_left] OrderedCommGroup.mul_lt_mul_left' alias OrderedCommGroup.le_of_mul_le_mul_left := le_of_mul_le_mul_left' attribute [to_additive] OrderedCommGroup.le_of_mul_le_mul_left alias OrderedCommGroup.lt_of_mul_lt_mul_left := lt_of_mul_lt_mul_left' attribute [to_additive] OrderedCommGroup.lt_of_mul_lt_mul_left -- See note [lower instance priority] @[to_additive IsOrderedAddMonoid.toIsOrderedCancelAddMonoid] instance (priority := 100) IsOrderedMonoid.toIsOrderedCancelMonoid [CommGroup α] [PartialOrder α] [IsOrderedMonoid α] : IsOrderedCancelMonoid α where le_of_mul_le_mul_left a b c bc := by simpa using mul_le_mul_left' bc a⁻¹ le_of_mul_le_mul_right a b c bc := by simpa using mul_le_mul_left' bc a⁻¹ /-! ### Linearly ordered commutative groups -/ set_option linter.deprecated false in /-- A linearly ordered additive commutative group is an additive commutative group with a linear order in which addition is monotone. -/ @[deprecated "Use `[AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α]` instead." (since := "2025-04-10")] structure LinearOrderedAddCommGroup (α : Type u) extends OrderedAddCommGroup α, LinearOrder α set_option linter.existingAttributeWarning false in set_option linter.deprecated false in /-- A linearly ordered commutative group is a commutative group with a linear order in which multiplication is monotone. -/ @[to_additive, deprecated "Use `[CommGroup α] [LinearOrder α] [IsOrderedMonoid α]` instead." (since := "2025-04-10")] structure LinearOrderedCommGroup (α : Type u) extends OrderedCommGroup α, LinearOrder α attribute [nolint docBlame] LinearOrderedCommGroup.toLinearOrder LinearOrderedAddCommGroup.toLinearOrder section LinearOrderedCommGroup variable [CommGroup α] [LinearOrder α] [IsOrderedMonoid α] {a : α} @[to_additive LinearOrderedAddCommGroup.add_lt_add_left] theorem LinearOrderedCommGroup.mul_lt_mul_left' (a b : α) (h : a < b) (c : α) : c * a < c * b := _root_.mul_lt_mul_left' h c @[to_additive eq_zero_of_neg_eq] theorem eq_one_of_inv_eq' (h : a⁻¹ = a) : a = 1 := match lt_trichotomy a 1 with \| Or.inl h₁ => have : 1 < a := h ▸ one_lt_inv_of_inv h₁ absurd h₁ this.asymm \| Or.inr (Or.inl h₁) => h₁ \| Or.inr (Or.inr h₁) => have : a < 1 := h ▸ inv_lt_one'.mpr h₁ absurd h₁ this.asymm @[to_additive exists_zero_lt] theorem exists_one_lt' [Nontrivial α] : ∃ a : α, 1 < a := by obtain ⟨y, hy⟩ := Decidable.exists_ne (1 : α) obtain h\|h := hy.lt_or_lt · exact ⟨y⁻¹, one_lt_inv'.mpr h⟩ · exact ⟨y, h⟩ -- see Note [lower instance priority] @[to_additive] instance (priority := 100) LinearOrderedCommGroup.to_noMaxOrder [Nontrivial α] : NoMaxOrder α := ⟨by obtain ⟨y, hy⟩ : ∃ a : α, 1 < a := exists_one_lt' exact fun a => ⟨a * y, lt_mul_of_one_lt_right' a hy⟩⟩ -- see Note [lower instance priority] @[to_additive] instance (priority := 100) LinearOrderedCommGroup.to_noMinOrder [Nontrivial α] : NoMinOrder α := ⟨by obtain ⟨y, hy⟩ : ∃ a : α, 1 < a := exists_one_lt' exact fun a => ⟨a / y, (div_lt_self_iff a).mpr hy⟩⟩ @[to_additive (attr := simp)] theorem inv_le_self_iff : a⁻¹ ≤ a ↔ 1 ≤ a := by simp [inv_le_iff_one_le_mul'] @[to_additive (attr := simp)] theorem inv_lt_self_iff : a⁻¹ < a ↔ 1 < a := by simp [inv_lt_iff_one_lt_mul] @[to_additive (attr := simp)] theorem le_inv_self_iff : a ≤ a⁻¹ ↔ a ≤ 1 := by simp [← not_iff_not] @[to_additive (attr := simp)] theorem lt_inv_self_iff : a < a⁻¹ ↔ a < 1 := by simp [← not_iff_not] end LinearOrderedCommGroup section NormNumLemmas /- The following lemmas are stated so that the `norm_num` tactic can use them with the expected signatures. -/ variable [CommGroup α] [PartialOrder α] [IsOrderedMonoid α] {a b : α} @[to_additive (attr := gcongr) neg_le_neg] theorem inv_le_inv' : a ≤ b → b⁻¹ ≤ a⁻¹ := inv_le_inv_iff.mpr @[to_additive (attr := gcongr) neg_lt_neg] theorem inv_lt_inv' : a < b → b⁻¹ < a⁻¹ := inv_lt_inv_iff.mpr -- The additive version is also a `linarith` lemma. @[to_additive] theorem inv_lt_one_of_one_lt : 1 < a → a⁻¹ < 1 := inv_lt_one_iff_one_lt.mpr -- The additive version is also a `linarith` lemma. @[to_additive] theorem inv_le_one_of_one_le : 1 ≤ a → a⁻¹ ≤ 1 := inv_le_one'.mpr @[to_additive neg_nonneg_of_nonpos] theorem one_le_inv_of_le_one : a ≤ 1 → 1 ≤ a⁻¹ := one_le_inv'.mpr end NormNumLemmas		Mathlib/Algebra/Order/Group/Defs.lean	1,016	1,018
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov, Eric Wieser -/ import Mathlib.Algebra.Quaternion import Mathlib.Analysis.InnerProductSpace.Continuous import Mathlib.Analysis.InnerProductSpace.PiL2 import Mathlib.Topology.Algebra.Algebra /-! # Quaternions as a normed algebra In this file we define the following structures on the space `ℍ := ℍ[ℝ]` of quaternions: * inner product space; * normed ring; * normed space over `ℝ`. We show that the norm on `ℍ[ℝ]` agrees with the euclidean norm of its components. ## Notation The following notation is available with `open Quaternion` or `open scoped Quaternion`: * `ℍ` : quaternions ## Tags quaternion, normed ring, normed space, normed algebra -/ @[inherit_doc] scoped[Quaternion] notation "ℍ" => Quaternion ℝ open scoped RealInnerProductSpace namespace Quaternion instance : Inner ℝ ℍ := ⟨fun a b => (a * star b).re⟩ theorem inner_self (a : ℍ) : ⟪a, a⟫ = normSq a := rfl theorem inner_def (a b : ℍ) : ⟪a, b⟫ = (a * star b).re := rfl noncomputable instance : NormedAddCommGroup ℍ := @InnerProductSpace.Core.toNormedAddCommGroup ℝ ℍ _ _ _ { toInner := inferInstance conj_inner_symm := fun x y => by simp [inner_def, mul_comm] re_inner_nonneg := fun _ => normSq_nonneg definite := fun _ => normSq_eq_zero.1 add_left := fun x y z => by simp only [inner_def, add_mul, add_re] smul_left := fun x y r => by simp [inner_def] } noncomputable instance : InnerProductSpace ℝ ℍ := InnerProductSpace.ofCore _ theorem normSq_eq_norm_mul_self (a : ℍ) : normSq a = ‖a‖ * ‖a‖ := by rw [← inner_self, real_inner_self_eq_norm_mul_norm] instance : NormOneClass ℍ := ⟨by rw [norm_eq_sqrt_real_inner, inner_self, normSq.map_one, Real.sqrt_one]⟩ @[simp, norm_cast] theorem norm_coe (a : ℝ) : ‖(a : ℍ)‖ = ‖a‖ := by rw [norm_eq_sqrt_real_inner, inner_self, normSq_coe, Real.sqrt_sq_eq_abs, Real.norm_eq_abs] @[simp, norm_cast] theorem nnnorm_coe (a : ℝ) : ‖(a : ℍ)‖₊ = ‖a‖₊ := Subtype.ext <\| norm_coe a -- This does not need to be `@[simp]`, as it is a consequence of later simp lemmas. theorem norm_star (a : ℍ) : ‖star a‖ = ‖a‖ := by simp_rw [norm_eq_sqrt_real_inner, inner_self, normSq_star] -- This does not need to be `@[simp]`, as it is a consequence of later simp lemmas. theorem nnnorm_star (a : ℍ) : ‖star a‖₊ = ‖a‖₊ := Subtype.ext <\| norm_star a noncomputable instance : NormedDivisionRing ℍ where dist_eq _ _ := rfl norm_mul _ _ := by simp [norm_eq_sqrt_real_inner, inner_self] noncomputable instance : NormedAlgebra ℝ ℍ where norm_smul_le := norm_smul_le toAlgebra := Quaternion.algebra instance : CStarRing ℍ where norm_mul_self_le x := le_of_eq <\| Eq.symm <\| (norm_mul _ _).trans <\| congr_arg (· * ‖x‖) (norm_star x) /-- Coercion from `ℂ` to `ℍ`. -/ @[coe] def coeComplex (z : ℂ) : ℍ := ⟨z.re, z.im, 0, 0⟩ instance : Coe ℂ ℍ := ⟨coeComplex⟩ @[simp, norm_cast] theorem coeComplex_re (z : ℂ) : (z : ℍ).re = z.re := rfl @[simp, norm_cast] theorem coeComplex_imI (z : ℂ) : (z : ℍ).imI = z.im := rfl @[simp, norm_cast] theorem coeComplex_imJ (z : ℂ) : (z : ℍ).imJ = 0 := rfl @[simp, norm_cast] theorem coeComplex_imK (z : ℂ) : (z : ℍ).imK = 0 := rfl @[simp, norm_cast] theorem coeComplex_add (z w : ℂ) : ↑(z + w) = (z + w : ℍ) := by ext <;> simp @[simp, norm_cast] theorem coeComplex_mul (z w : ℂ) : ↑(z * w) = (z * w : ℍ) := by ext <;> simp @[simp, norm_cast] theorem coeComplex_zero : ((0 : ℂ) : ℍ) = 0 := rfl @[simp, norm_cast] theorem coeComplex_one : ((1 : ℂ) : ℍ) = 1 := rfl @[simp, norm_cast] theorem coe_real_complex_mul (r : ℝ) (z : ℂ) : (r • z : ℍ) = ↑r * ↑z := by ext <;> simp @[simp, norm_cast] theorem coeComplex_coe (r : ℝ) : ((r : ℂ) : ℍ) = r := rfl /-- Coercion `ℂ →ₐ[ℝ] ℍ` as an algebra homomorphism. -/ def ofComplex : ℂ →ₐ[ℝ] ℍ where toFun := (↑) map_one' := rfl map_zero' := rfl map_add' := coeComplex_add map_mul' := coeComplex_mul commutes' _ := rfl @[simp] theorem coe_ofComplex : ⇑ofComplex = coeComplex := rfl /-- The norm of the components as a euclidean vector equals the norm of the quaternion. -/ theorem norm_piLp_equiv_symm_equivTuple (x : ℍ) : ‖(WithLp.equiv 2 (Fin 4 → _)).symm (equivTuple ℝ x)‖ = ‖x‖ := by rw [norm_eq_sqrt_real_inner, norm_eq_sqrt_real_inner, inner_self, normSq_def', PiLp.inner_apply, Fin.sum_univ_four] simp_rw [RCLike.inner_apply, starRingEnd_apply, star_trivial, ← sq] rfl /-- `QuaternionAlgebra.linearEquivTuple` as a `LinearIsometryEquiv`. -/ @[simps apply symm_apply] noncomputable def linearIsometryEquivTuple : ℍ ≃ₗᵢ[ℝ] EuclideanSpace ℝ (Fin 4) := { (QuaternionAlgebra.linearEquivTuple (-1 : ℝ) (0 : ℝ) (-1 : ℝ)).trans (WithLp.linearEquiv 2 ℝ (Fin 4 → ℝ)).symm with toFun := fun a => !₂[a.1, a.2, a.3, a.4] invFun := fun a => ⟨a 0, a 1, a 2, a 3⟩ norm_map' := norm_piLp_equiv_symm_equivTuple } @[continuity] theorem continuous_coe : Continuous (coe : ℝ → ℍ) := continuous_algebraMap ℝ ℍ @[continuity] theorem continuous_normSq : Continuous (normSq : ℍ → ℝ) := by simpa [← normSq_eq_norm_mul_self] using (continuous_norm.mul continuous_norm : Continuous fun q : ℍ => ‖q‖ * ‖q‖) @[continuity] theorem continuous_re : Continuous fun q : ℍ => q.re := (continuous_apply 0).comp linearIsometryEquivTuple.continuous @[continuity] theorem continuous_imI : Continuous fun q : ℍ => q.imI := (continuous_apply 1).comp linearIsometryEquivTuple.continuous @[continuity] theorem continuous_imJ : Continuous fun q : ℍ => q.imJ := (continuous_apply 2).comp linearIsometryEquivTuple.continuous @[continuity] theorem continuous_imK : Continuous fun q : ℍ => q.imK := (continuous_apply 3).comp linearIsometryEquivTuple.continuous @[continuity] theorem continuous_im : Continuous fun q : ℍ => q.im := by simpa only [← sub_self_re] using continuous_id.sub (continuous_coe.comp continuous_re) instance : CompleteSpace ℍ := haveI : IsUniformEmbedding linearIsometryEquivTuple.toLinearEquiv.toEquiv.symm := linearIsometryEquivTuple.toContinuousLinearEquiv.symm.isUniformEmbedding	(completeSpace_congr this).1 inferInstance section infinite_sum	Mathlib/Analysis/Quaternion.lean	198	200
/- 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 theorem norm_cpow_le (z w : ℂ) : ‖z ^ w‖ ≤ ‖z‖ ^ w.re / Real.exp (arg z * im w) := by by_cases h : z = 0 → w.re = 0 → w = 0 · exact (norm_cpow_of_imp h).le · push_neg at h simp [h] @[simp] theorem norm_cpow_real (x : ℂ) (y : ℝ) : ‖x ^ (y : ℂ)‖ = ‖x‖ ^ y := by rw [norm_cpow_of_imp] <;> simp @[simp] theorem norm_cpow_inv_nat (x : ℂ) (n : ℕ) : ‖x ^ (n⁻¹ : ℂ)‖ = ‖x‖ ^ (n⁻¹ : ℝ) := by rw [← norm_cpow_real]; simp theorem norm_cpow_eq_rpow_re_of_pos {x : ℝ} (hx : 0 < x) (y : ℂ) : ‖(x : ℂ) ^ y‖ = x ^ y.re := by rw [norm_cpow_of_ne_zero (ofReal_ne_zero.mpr hx.ne'), arg_ofReal_of_nonneg hx.le, zero_mul, Real.exp_zero, div_one, Complex.norm_of_nonneg hx.le] theorem norm_cpow_eq_rpow_re_of_nonneg {x : ℝ} (hx : 0 ≤ x) {y : ℂ} (hy : re y ≠ 0) : ‖(x : ℂ) ^ y‖ = x ^ re y := by rw [norm_cpow_of_imp] <;> simp [, arg_ofReal_of_nonneg, abs_of_nonneg] @[deprecated (since := "2025-02-17")] alias abs_cpow_of_ne_zero := norm_cpow_of_ne_zero @[deprecated (since := "2025-02-17")] alias abs_cpow_of_imp := norm_cpow_of_imp @[deprecated (since := "2025-02-17")] alias abs_cpow_le := norm_cpow_le @[deprecated (since := "2025-02-17")] alias abs_cpow_real := norm_cpow_real @[deprecated (since := "2025-02-17")] alias abs_cpow_inv_nat := norm_cpow_inv_nat @[deprecated (since := "2025-02-17")] alias abs_cpow_eq_rpow_re_of_pos := norm_cpow_eq_rpow_re_of_pos @[deprecated (since := "2025-02-17")] alias abs_cpow_eq_rpow_re_of_nonneg := norm_cpow_eq_rpow_re_of_nonneg open Filter in lemma norm_ofReal_cpow_eventually_eq_atTop (c : ℂ) : (fun t : ℝ ↦ ‖(t : ℂ) ^ c‖) =ᶠ[atTop] fun t ↦ t ^ c.re := by filter_upwards [eventually_gt_atTop 0] with t ht rw [norm_cpow_eq_rpow_re_of_pos ht] lemma norm_natCast_cpow_of_re_ne_zero (n : ℕ) {s : ℂ} (hs : s.re ≠ 0) : ‖(n : ℂ) ^ s‖ = (n : ℝ) ^ (s.re) := by rw [← ofReal_natCast, norm_cpow_eq_rpow_re_of_nonneg n.cast_nonneg hs] lemma norm_natCast_cpow_of_pos {n : ℕ} (hn : 0 < n) (s : ℂ) : ‖(n : ℂ) ^ s‖ = (n : ℝ) ^ (s.re) := by rw [← ofReal_natCast, norm_cpow_eq_rpow_re_of_pos (Nat.cast_pos.mpr hn) _] lemma norm_natCast_cpow_pos_of_pos {n : ℕ} (hn : 0 < n) (s : ℂ) : 0 < ‖(n : ℂ) ^ s‖ := (norm_natCast_cpow_of_pos hn _).symm ▸ Real.rpow_pos_of_pos (Nat.cast_pos.mpr hn) _ theorem cpow_mul_ofReal_nonneg {x : ℝ} (hx : 0 ≤ x) (y : ℝ) (z : ℂ) : (x : ℂ) ^ (↑y z) = (↑(x ^ y) : ℂ) ^ z := by rw [cpow_mul, ofReal_cpow hx] · rw [← ofReal_log hx, ← ofReal_mul, ofReal_im, neg_lt_zero]; exact Real.pi_pos · rw [← ofReal_log hx, ← ofReal_mul, ofReal_im]; exact Real.pi_pos.le end Complex /-! ### Positivity extension -/ namespace Mathlib.Meta.Positivity open Lean Meta Qq /-- Extension for the `positivity` tactic: exponentiation by a real number is positive (namely 1) when the exponent is zero. The other cases are done in `evalRpow`. -/ @[positivity (_ : ℝ) ^ (0 : ℝ)] def evalRpowZero : PositivityExt where eval {u α} _ _ e := do match u, α, e with \| 0, ~q(ℝ), ~q($a ^ (0 : ℝ)) => assertInstancesCommute pure (.positive q(Real.rpow_zero_pos $a)) \| _, _, _ => throwError "not Real.rpow" /-- Extension for the `positivity` tactic: exponentiation by a real number is nonnegative when the base is nonnegative and positive when the base is positive. -/ @[positivity (_ : ℝ) ^ (_ : ℝ)] def evalRpow : PositivityExt where eval {u α} _zα _pα e := do match u, α, e with \| 0, ~q(ℝ), ~q($a ^ ($b : ℝ)) => let ra ← core q(inferInstance) q(inferInstance) a assertInstancesCommute match ra with \| .positive pa => pure (.positive q(Real.rpow_pos_of_pos $pa $b)) \| .nonnegative pa => pure (.nonnegative q(Real.rpow_nonneg $pa $b)) \| _ => pure .none \| _, _, _ => throwError "not Real.rpow" end Mathlib.Meta.Positivity /-! ## Further algebraic properties of `rpow` -/ namespace Real variable {x y z : ℝ} {n : ℕ} theorem rpow_mul {x : ℝ} (hx : 0 ≤ x) (y z : ℝ) : x ^ (y * z) = (x ^ y) ^ z := by rw [← Complex.ofReal_inj, Complex.ofReal_cpow (rpow_nonneg hx _), Complex.ofReal_cpow hx, Complex.ofReal_mul, Complex.cpow_mul, Complex.ofReal_cpow hx] <;> simp only [(Complex.ofReal_mul _ _).symm, (Complex.ofReal_log hx).symm, Complex.ofReal_im, neg_lt_zero, pi_pos, le_of_lt pi_pos] lemma rpow_pow_comm {x : ℝ} (hx : 0 ≤ x) (y : ℝ) (n : ℕ) : (x ^ y) ^ n = (x ^ n) ^ y := by simp_rw [← rpow_natCast, ← rpow_mul hx, mul_comm y] lemma rpow_zpow_comm {x : ℝ} (hx : 0 ≤ x) (y : ℝ) (n : ℤ) : (x ^ y) ^ n = (x ^ n) ^ y := by simp_rw [← rpow_intCast, ← rpow_mul hx, mul_comm y] lemma rpow_add_intCast {x : ℝ} (hx : x ≠ 0) (y : ℝ) (n : ℤ) : x ^ (y + n) = x ^ y * x ^ n := by rw [rpow_def, rpow_def, Complex.ofReal_add, Complex.cpow_add _ _ (Complex.ofReal_ne_zero.mpr hx), Complex.ofReal_intCast, Complex.cpow_intCast, ← Complex.ofReal_zpow, mul_comm, Complex.re_ofReal_mul, mul_comm] lemma rpow_add_natCast {x : ℝ} (hx : x ≠ 0) (y : ℝ) (n : ℕ) : x ^ (y + n) = x ^ y * x ^ n := by simpa using rpow_add_intCast hx y n lemma rpow_sub_intCast {x : ℝ} (hx : x ≠ 0) (y : ℝ) (n : ℕ) : x ^ (y - n) = x ^ y / x ^ n := by simpa using rpow_add_intCast hx y (-n) lemma rpow_sub_natCast {x : ℝ} (hx : x ≠ 0) (y : ℝ) (n : ℕ) : x ^ (y - n) = x ^ y / x ^ n := by simpa using rpow_sub_intCast hx y n lemma rpow_add_intCast' (hx : 0 ≤ x) {n : ℤ} (h : y + n ≠ 0) : x ^ (y + n) = x ^ y * x ^ n := by rw [rpow_add' hx h, rpow_intCast] lemma rpow_add_natCast' (hx : 0 ≤ x) (h : y + n ≠ 0) : x ^ (y + n) = x ^ y * x ^ n := by rw [rpow_add' hx h, rpow_natCast] lemma rpow_sub_intCast' (hx : 0 ≤ x) {n : ℤ} (h : y - n ≠ 0) : x ^ (y - n) = x ^ y / x ^ n := by rw [rpow_sub' hx h, rpow_intCast] lemma rpow_sub_natCast' (hx : 0 ≤ x) (h : y - n ≠ 0) : x ^ (y - n) = x ^ y / x ^ n := by rw [rpow_sub' hx h, rpow_natCast] theorem rpow_add_one {x : ℝ} (hx : x ≠ 0) (y : ℝ) : x ^ (y + 1) = x ^ y * x := by simpa using rpow_add_natCast hx y 1 theorem rpow_sub_one {x : ℝ} (hx : x ≠ 0) (y : ℝ) : x ^ (y - 1) = x ^ y / x := by simpa using rpow_sub_natCast hx y 1 lemma rpow_add_one' (hx : 0 ≤ x) (h : y + 1 ≠ 0) : x ^ (y + 1) = x ^ y * x := by rw [rpow_add' hx h, rpow_one] lemma rpow_one_add' (hx : 0 ≤ x) (h : 1 + y ≠ 0) : x ^ (1 + y) = x * x ^ y := by rw [rpow_add' hx h, rpow_one] lemma rpow_sub_one' (hx : 0 ≤ x) (h : y - 1 ≠ 0) : x ^ (y - 1) = x ^ y / x := by rw [rpow_sub' hx h, rpow_one] lemma rpow_one_sub' (hx : 0 ≤ x) (h : 1 - y ≠ 0) : x ^ (1 - y) = x / x ^ y := by rw [rpow_sub' hx h, rpow_one] @[simp] theorem rpow_two (x : ℝ) : x ^ (2 : ℝ) = x ^ 2 := by rw [← rpow_natCast] simp only [Nat.cast_ofNat] theorem rpow_neg_one (x : ℝ) : x ^ (-1 : ℝ) = x⁻¹ := by suffices H : x ^ ((-1 : ℤ) : ℝ) = x⁻¹ by rwa [Int.cast_neg, Int.cast_one] at H simp only [rpow_intCast, zpow_one, zpow_neg] theorem mul_rpow (hx : 0 ≤ x) (hy : 0 ≤ y) : (x * y) ^ z = x ^ z * y ^ z := by iterate 2 rw [Real.rpow_def_of_nonneg]; split_ifs with h_ifs <;> simp_all · rw [log_mul ‹_› ‹_›, add_mul, exp_add, rpow_def_of_pos (hy.lt_of_ne' ‹_›)] all_goals positivity theorem inv_rpow (hx : 0 ≤ x) (y : ℝ) : x⁻¹ ^ y = (x ^ y)⁻¹ := by simp only [← rpow_neg_one, ← rpow_mul hx, mul_comm] theorem div_rpow (hx : 0 ≤ x) (hy : 0 ≤ y) (z : ℝ) : (x / y) ^ z = x ^ z / y ^ z := by simp only [div_eq_mul_inv, mul_rpow hx (inv_nonneg.2 hy), inv_rpow hy] theorem log_rpow {x : ℝ} (hx : 0 < x) (y : ℝ) : log (x ^ y) = y * log x := by apply exp_injective rw [exp_log (rpow_pos_of_pos hx y), ← exp_log hx, mul_comm, rpow_def_of_pos (exp_pos (log x)) y] theorem mul_log_eq_log_iff {x y z : ℝ} (hx : 0 < x) (hz : 0 < z) : y * log x = log z ↔ x ^ y = z := ⟨fun h ↦ log_injOn_pos (rpow_pos_of_pos hx _) hz <\| log_rpow hx _ \|>.trans h, by rintro rfl; rw [log_rpow hx]⟩ @[simp] lemma rpow_rpow_inv (hx : 0 ≤ x) (hy : y ≠ 0) : (x ^ y) ^ y⁻¹ = x := by rw [← rpow_mul hx, mul_inv_cancel₀ hy, rpow_one] @[simp] lemma rpow_inv_rpow (hx : 0 ≤ x) (hy : y ≠ 0) : (x ^ y⁻¹) ^ y = x := by rw [← rpow_mul hx, inv_mul_cancel₀ hy, rpow_one] theorem pow_rpow_inv_natCast (hx : 0 ≤ x) (hn : n ≠ 0) : (x ^ n) ^ (n⁻¹ : ℝ) = x := by have hn0 : (n : ℝ) ≠ 0 := Nat.cast_ne_zero.2 hn rw [← rpow_natCast, ← rpow_mul hx, mul_inv_cancel₀ hn0, rpow_one] theorem rpow_inv_natCast_pow (hx : 0 ≤ x) (hn : n ≠ 0) : (x ^ (n⁻¹ : ℝ)) ^ n = x := by have hn0 : (n : ℝ) ≠ 0 := Nat.cast_ne_zero.2 hn rw [← rpow_natCast, ← rpow_mul hx, inv_mul_cancel₀ hn0, rpow_one] lemma rpow_natCast_mul (hx : 0 ≤ x) (n : ℕ) (z : ℝ) : x ^ (n * z) = (x ^ n) ^ z := by rw [rpow_mul hx, rpow_natCast] lemma rpow_mul_natCast (hx : 0 ≤ x) (y : ℝ) (n : ℕ) : x ^ (y * n) = (x ^ y) ^ n := by rw [rpow_mul hx, rpow_natCast] lemma rpow_intCast_mul (hx : 0 ≤ x) (n : ℤ) (z : ℝ) : x ^ (n * z) = (x ^ n) ^ z := by rw [rpow_mul hx, rpow_intCast] lemma rpow_mul_intCast (hx : 0 ≤ x) (y : ℝ) (n : ℤ) : x ^ (y * n) = (x ^ y) ^ n := by rw [rpow_mul hx, rpow_intCast] /-! Note: lemmas about `(∏ i ∈ s, f i ^ r)` such as `Real.finset_prod_rpow` are proved in `Mathlib/Analysis/SpecialFunctions/Pow/NNReal.lean` instead. -/ /-! ## Order and monotonicity -/ @[gcongr, bound] theorem rpow_lt_rpow (hx : 0 ≤ x) (hxy : x < y) (hz : 0 < z) : x ^ z < y ^ z := by rw [le_iff_eq_or_lt] at hx; rcases hx with hx \| hx · rw [← hx, zero_rpow (ne_of_gt hz)] exact rpow_pos_of_pos (by rwa [← hx] at hxy) _ · rw [rpow_def_of_pos hx, rpow_def_of_pos (lt_trans hx hxy), exp_lt_exp] exact mul_lt_mul_of_pos_right (log_lt_log hx hxy) hz theorem strictMonoOn_rpow_Ici_of_exponent_pos {r : ℝ} (hr : 0 < r) : StrictMonoOn (fun (x : ℝ) => x ^ r) (Set.Ici 0) := fun _ ha _ _ hab => rpow_lt_rpow ha hab hr @[gcongr, bound] theorem rpow_le_rpow {x y z : ℝ} (h : 0 ≤ x) (h₁ : x ≤ y) (h₂ : 0 ≤ z) : x ^ z ≤ y ^ z := by rcases eq_or_lt_of_le h₁ with (rfl \| h₁'); · rfl rcases eq_or_lt_of_le h₂ with (rfl \| h₂'); · simp exact le_of_lt (rpow_lt_rpow h h₁' h₂') theorem monotoneOn_rpow_Ici_of_exponent_nonneg {r : ℝ} (hr : 0 ≤ r) : MonotoneOn (fun (x : ℝ) => x ^ r) (Set.Ici 0) := fun _ ha _ _ hab => rpow_le_rpow ha hab hr lemma rpow_lt_rpow_of_neg (hx : 0 < x) (hxy : x < y) (hz : z < 0) : y ^ z < x ^ z := by have := hx.trans hxy rw [← inv_lt_inv₀, ← rpow_neg, ← rpow_neg] on_goal 1 => refine rpow_lt_rpow ?_ hxy (neg_pos.2 hz) all_goals positivity lemma rpow_le_rpow_of_nonpos (hx : 0 < x) (hxy : x ≤ y) (hz : z ≤ 0) : y ^ z ≤ x ^ z := by have := hx.trans_le hxy rw [← inv_le_inv₀, ← rpow_neg, ← rpow_neg] on_goal 1 => refine rpow_le_rpow ?_ hxy (neg_nonneg.2 hz) all_goals positivity theorem rpow_lt_rpow_iff (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 < z) : x ^ z < y ^ z ↔ x < y := ⟨lt_imp_lt_of_le_imp_le fun h => rpow_le_rpow hy h (le_of_lt hz), fun h => rpow_lt_rpow hx h hz⟩ theorem rpow_le_rpow_iff (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 < z) : x ^ z ≤ y ^ z ↔ x ≤ y := le_iff_le_iff_lt_iff_lt.2 <\| rpow_lt_rpow_iff hy hx hz lemma rpow_lt_rpow_iff_of_neg (hx : 0 < x) (hy : 0 < y) (hz : z < 0) : x ^ z < y ^ z ↔ y < x := ⟨lt_imp_lt_of_le_imp_le fun h ↦ rpow_le_rpow_of_nonpos hx h hz.le, fun h ↦ rpow_lt_rpow_of_neg hy h hz⟩ lemma rpow_le_rpow_iff_of_neg (hx : 0 < x) (hy : 0 < y) (hz : z < 0) : x ^ z ≤ y ^ z ↔ y ≤ x := le_iff_le_iff_lt_iff_lt.2 <\| rpow_lt_rpow_iff_of_neg hy hx hz lemma le_rpow_inv_iff_of_pos (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 < z) : x ≤ y ^ z⁻¹ ↔ x ^ z ≤ y := by rw [← rpow_le_rpow_iff hx _ hz, rpow_inv_rpow] <;> positivity lemma rpow_inv_le_iff_of_pos (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 < z) : x ^ z⁻¹ ≤ y ↔ x ≤ y ^ z := by rw [← rpow_le_rpow_iff _ hy hz, rpow_inv_rpow] <;> positivity lemma lt_rpow_inv_iff_of_pos (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 < z) : x < y ^ z⁻¹ ↔ x ^ z < y := lt_iff_lt_of_le_iff_le <\| rpow_inv_le_iff_of_pos hy hx hz lemma rpow_inv_lt_iff_of_pos (hx : 0 ≤ x) (hy : 0 ≤ y) (hz : 0 < z) : x ^ z⁻¹ < y ↔ x < y ^ z := lt_iff_lt_of_le_iff_le <\| le_rpow_inv_iff_of_pos hy hx hz theorem le_rpow_inv_iff_of_neg (hx : 0 < x) (hy : 0 < y) (hz : z < 0) : x ≤ y ^ z⁻¹ ↔ y ≤ x ^ z := by rw [← rpow_le_rpow_iff_of_neg _ hx hz, rpow_inv_rpow _ hz.ne] <;> positivity theorem lt_rpow_inv_iff_of_neg (hx : 0 < x) (hy : 0 < y) (hz : z < 0) : x < y ^ z⁻¹ ↔ y < x ^ z := by rw [← rpow_lt_rpow_iff_of_neg _ hx hz, rpow_inv_rpow _ hz.ne] <;> positivity theorem rpow_inv_lt_iff_of_neg (hx : 0 < x) (hy : 0 < y) (hz : z < 0) : x ^ z⁻¹ < y ↔ y ^ z < x := by rw [← rpow_lt_rpow_iff_of_neg hy _ hz, rpow_inv_rpow _ hz.ne] <;> positivity theorem rpow_inv_le_iff_of_neg (hx : 0 < x) (hy : 0 < y) (hz : z < 0) : x ^ z⁻¹ ≤ y ↔ y ^ z ≤ x := by rw [← rpow_le_rpow_iff_of_neg hy _ hz, rpow_inv_rpow _ hz.ne] <;> positivity theorem rpow_lt_rpow_of_exponent_lt (hx : 1 < x) (hyz : y < z) : x ^ y < x ^ z := by repeat' rw [rpow_def_of_pos (lt_trans zero_lt_one hx)] rw [exp_lt_exp]; exact mul_lt_mul_of_pos_left hyz (log_pos hx) @[gcongr] theorem rpow_le_rpow_of_exponent_le (hx : 1 ≤ x) (hyz : y ≤ z) : x ^ y ≤ x ^ z := by repeat' rw [rpow_def_of_pos (lt_of_lt_of_le zero_lt_one hx)] rw [exp_le_exp]; exact mul_le_mul_of_nonneg_left hyz (log_nonneg hx) theorem rpow_lt_rpow_of_exponent_neg {x y z : ℝ} (hy : 0 < y) (hxy : y < x) (hz : z < 0) : x ^ z < y ^ z := by have hx : 0 < x := hy.trans hxy rw [← neg_neg z, Real.rpow_neg (le_of_lt hx) (-z), Real.rpow_neg (le_of_lt hy) (-z), inv_lt_inv₀ (rpow_pos_of_pos hx _) (rpow_pos_of_pos hy _)] exact Real.rpow_lt_rpow (by positivity) hxy <\| neg_pos_of_neg hz theorem strictAntiOn_rpow_Ioi_of_exponent_neg {r : ℝ} (hr : r < 0) : StrictAntiOn (fun (x : ℝ) => x ^ r) (Set.Ioi 0) := fun _ ha _ _ hab => rpow_lt_rpow_of_exponent_neg ha hab hr theorem rpow_le_rpow_of_exponent_nonpos {x y : ℝ} (hy : 0 < y) (hxy : y ≤ x) (hz : z ≤ 0) : x ^ z ≤ y ^ z := by rcases ne_or_eq z 0 with hz_zero \| rfl case inl => rcases ne_or_eq x y with hxy' \| rfl case inl => exact le_of_lt <\| rpow_lt_rpow_of_exponent_neg hy (Ne.lt_of_le (id (Ne.symm hxy')) hxy) (Ne.lt_of_le hz_zero hz) case inr => simp case inr => simp theorem antitoneOn_rpow_Ioi_of_exponent_nonpos {r : ℝ} (hr : r ≤ 0) : AntitoneOn (fun (x : ℝ) => x ^ r) (Set.Ioi 0) := fun _ ha _ _ hab => rpow_le_rpow_of_exponent_nonpos ha hab hr @[simp] theorem rpow_le_rpow_left_iff (hx : 1 < x) : x ^ y ≤ x ^ z ↔ y ≤ z := by have x_pos : 0 < x := lt_trans zero_lt_one hx rw [← log_le_log_iff (rpow_pos_of_pos x_pos y) (rpow_pos_of_pos x_pos z), log_rpow x_pos, log_rpow x_pos, mul_le_mul_right (log_pos hx)] @[simp] theorem rpow_lt_rpow_left_iff (hx : 1 < x) : x ^ y < x ^ z ↔ y < z := by rw [lt_iff_not_le, rpow_le_rpow_left_iff hx, lt_iff_not_le] theorem rpow_lt_rpow_of_exponent_gt (hx0 : 0 < x) (hx1 : x < 1) (hyz : z < y) : x ^ y < x ^ z := by repeat' rw [rpow_def_of_pos hx0] rw [exp_lt_exp]; exact mul_lt_mul_of_neg_left hyz (log_neg hx0 hx1) theorem rpow_le_rpow_of_exponent_ge (hx0 : 0 < x) (hx1 : x ≤ 1) (hyz : z ≤ y) : x ^ y ≤ x ^ z := by repeat' rw [rpow_def_of_pos hx0] rw [exp_le_exp]; exact mul_le_mul_of_nonpos_left hyz (log_nonpos (le_of_lt hx0) hx1) @[simp] theorem rpow_le_rpow_left_iff_of_base_lt_one (hx0 : 0 < x) (hx1 : x < 1) : x ^ y ≤ x ^ z ↔ z ≤ y := by rw [← log_le_log_iff (rpow_pos_of_pos hx0 y) (rpow_pos_of_pos hx0 z), log_rpow hx0, log_rpow hx0, mul_le_mul_right_of_neg (log_neg hx0 hx1)] @[simp] theorem rpow_lt_rpow_left_iff_of_base_lt_one (hx0 : 0 < x) (hx1 : x < 1) : x ^ y < x ^ z ↔ z < y := by rw [lt_iff_not_le, rpow_le_rpow_left_iff_of_base_lt_one hx0 hx1, lt_iff_not_le] theorem rpow_lt_one {x z : ℝ} (hx1 : 0 ≤ x) (hx2 : x < 1) (hz : 0 < z) : x ^ z < 1 := by rw [← one_rpow z] exact rpow_lt_rpow hx1 hx2 hz theorem rpow_le_one {x z : ℝ} (hx1 : 0 ≤ x) (hx2 : x ≤ 1) (hz : 0 ≤ z) : x ^ z ≤ 1 := by rw [← one_rpow z] exact rpow_le_rpow hx1 hx2 hz theorem rpow_lt_one_of_one_lt_of_neg {x z : ℝ} (hx : 1 < x) (hz : z < 0) : x ^ z < 1 := by convert rpow_lt_rpow_of_exponent_lt hx hz exact (rpow_zero x).symm theorem rpow_le_one_of_one_le_of_nonpos {x z : ℝ} (hx : 1 ≤ x) (hz : z ≤ 0) : x ^ z ≤ 1 := by convert rpow_le_rpow_of_exponent_le hx hz exact (rpow_zero x).symm theorem one_lt_rpow {x z : ℝ} (hx : 1 < x) (hz : 0 < z) : 1 < x ^ z := by rw [← one_rpow z] exact rpow_lt_rpow zero_le_one hx hz theorem one_le_rpow {x z : ℝ} (hx : 1 ≤ x) (hz : 0 ≤ z) : 1 ≤ x ^ z := by rw [← one_rpow z] exact rpow_le_rpow zero_le_one hx hz theorem one_lt_rpow_of_pos_of_lt_one_of_neg (hx1 : 0 < x) (hx2 : x < 1) (hz : z < 0) : 1 < x ^ z := by convert rpow_lt_rpow_of_exponent_gt hx1 hx2 hz exact (rpow_zero x).symm theorem one_le_rpow_of_pos_of_le_one_of_nonpos (hx1 : 0 < x) (hx2 : x ≤ 1) (hz : z ≤ 0) : 1 ≤ x ^ z := by convert rpow_le_rpow_of_exponent_ge hx1 hx2 hz exact (rpow_zero x).symm theorem rpow_lt_one_iff_of_pos (hx : 0 < x) : x ^ y < 1 ↔ 1 < x ∧ y < 0 ∨ x < 1 ∧ 0 < y := by rw [rpow_def_of_pos hx, exp_lt_one_iff, mul_neg_iff, log_pos_iff hx.le, log_neg_iff hx] theorem rpow_lt_one_iff (hx : 0 ≤ x) : x ^ y < 1 ↔ x = 0 ∧ y ≠ 0 ∨ 1 < x ∧ y < 0 ∨ x < 1 ∧ 0 < y := by rcases hx.eq_or_lt with (rfl \| hx) · rcases _root_.em (y = 0) with (rfl \| hy) <;> simp [*, lt_irrefl, zero_lt_one] · simp [rpow_lt_one_iff_of_pos hx, hx.ne.symm] theorem rpow_lt_one_iff' {x y : ℝ} (hx : 0 ≤ x) (hy : 0 < y) : x ^ y < 1 ↔ x < 1 := by rw [← Real.rpow_lt_rpow_iff hx zero_le_one hy, Real.one_rpow]	theorem one_lt_rpow_iff_of_pos (hx : 0 < x) : 1 < x ^ y ↔ 1 < x ∧ 0 < y ∨ x < 1 ∧ y < 0 := by rw [rpow_def_of_pos hx, one_lt_exp_iff, mul_pos_iff, log_pos_iff hx.le, log_neg_iff hx]	Mathlib/Analysis/SpecialFunctions/Pow/Real.lean	697	699
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Johannes Hölzl -/ import Mathlib.Algebra.Order.Pi import Mathlib.MeasureTheory.Constructions.BorelSpace.Order /-! # Simple functions A function `f` from a measurable space to any type is called simple, if every preimage `f ⁻¹' {x}` is measurable, and the range is finite. In this file, we define simple functions and establish their basic properties; and we construct a sequence of simple functions approximating an arbitrary Borel measurable function `f : α → ℝ≥0∞`. The theorem `Measurable.ennreal_induction` shows that in order to prove something for an arbitrary measurable function into `ℝ≥0∞`, it is sufficient to show that the property holds for (multiples of) characteristic functions and is closed under addition and supremum of increasing sequences of functions. -/ noncomputable section open Set hiding restrict restrict_apply open Filter ENNReal open Function (support) open Topology NNReal ENNReal MeasureTheory namespace MeasureTheory variable {α β γ δ : Type} /-- A function `f` from a measurable space to any type is called simple, if every preimage `f ⁻¹' {x}` is measurable, and the range is finite. This structure bundles a function with these properties. -/ structure SimpleFunc.{u, v} (α : Type u) [MeasurableSpace α] (β : Type v) where /-- The underlying function -/ toFun : α → β measurableSet_fiber' : ∀ x, MeasurableSet (toFun ⁻¹' {x}) finite_range' : (Set.range toFun).Finite local infixr:25 " →ₛ " => SimpleFunc namespace SimpleFunc section Measurable variable [MeasurableSpace α] instance instFunLike : FunLike (α →ₛ β) α β where coe := toFun coe_injective' \| ⟨_, _, _⟩, ⟨_, _, _⟩, rfl => rfl theorem coe_injective ⦃f g : α →ₛ β⦄ (H : (f : α → β) = g) : f = g := DFunLike.ext' H @[ext] theorem ext {f g : α →ₛ β} (H : ∀ a, f a = g a) : f = g := DFunLike.ext _ _ H theorem finite_range (f : α →ₛ β) : (Set.range f).Finite := f.finite_range' theorem measurableSet_fiber (f : α →ₛ β) (x : β) : MeasurableSet (f ⁻¹' {x}) := f.measurableSet_fiber' x @[simp] theorem coe_mk (f : α → β) (h h') : ⇑(mk f h h') = f := rfl theorem apply_mk (f : α → β) (h h') (x : α) : SimpleFunc.mk f h h' x = f x := rfl /-- Simple function defined on a finite type. -/ def ofFinite [Finite α] [MeasurableSingletonClass α] (f : α → β) : α →ₛ β where toFun := f measurableSet_fiber' x := (toFinite (f ⁻¹' {x})).measurableSet finite_range' := Set.finite_range f /-- Simple function defined on the empty type. -/ def ofIsEmpty [IsEmpty α] : α →ₛ β := ofFinite isEmptyElim /-- Range of a simple function `α →ₛ β` as a `Finset β`. -/ protected def range (f : α →ₛ β) : Finset β := f.finite_range.toFinset @[simp] theorem mem_range {f : α →ₛ β} {b} : b ∈ f.range ↔ b ∈ range f := Finite.mem_toFinset _ theorem mem_range_self (f : α →ₛ β) (x : α) : f x ∈ f.range := mem_range.2 ⟨x, rfl⟩ @[simp] theorem coe_range (f : α →ₛ β) : (↑f.range : Set β) = Set.range f := f.finite_range.coe_toFinset theorem mem_range_of_measure_ne_zero {f : α →ₛ β} {x : β} {μ : Measure α} (H : μ (f ⁻¹' {x}) ≠ 0) : x ∈ f.range := let ⟨a, ha⟩ := nonempty_of_measure_ne_zero H mem_range.2 ⟨a, ha⟩ theorem forall_mem_range {f : α →ₛ β} {p : β → Prop} : (∀ y ∈ f.range, p y) ↔ ∀ x, p (f x) := by simp only [mem_range, Set.forall_mem_range] theorem exists_range_iff {f : α →ₛ β} {p : β → Prop} : (∃ y ∈ f.range, p y) ↔ ∃ x, p (f x) := by simpa only [mem_range, exists_prop] using Set.exists_range_iff theorem preimage_eq_empty_iff (f : α →ₛ β) (b : β) : f ⁻¹' {b} = ∅ ↔ b ∉ f.range := preimage_singleton_eq_empty.trans <\| not_congr mem_range.symm theorem exists_forall_le [Nonempty β] [Preorder β] [IsDirected β (· ≤ ·)] (f : α →ₛ β) : ∃ C, ∀ x, f x ≤ C := f.range.exists_le.imp fun _ => forall_mem_range.1 /-- Constant function as a `SimpleFunc`. -/ def const (α) {β} [MeasurableSpace α] (b : β) : α →ₛ β := ⟨fun _ => b, fun _ => MeasurableSet.const _, finite_range_const⟩ instance instInhabited [Inhabited β] : Inhabited (α →ₛ β) := ⟨const _ default⟩ theorem const_apply (a : α) (b : β) : (const α b) a = b := rfl @[simp] theorem coe_const (b : β) : ⇑(const α b) = Function.const α b := rfl @[simp] theorem range_const (α) [MeasurableSpace α] [Nonempty α] (b : β) : (const α b).range = {b} := Finset.coe_injective <\| by simp +unfoldPartialApp [Function.const] theorem range_const_subset (α) [MeasurableSpace α] (b : β) : (const α b).range ⊆ {b} := Finset.coe_subset.1 <\| by simp theorem simpleFunc_bot {α} (f : @SimpleFunc α ⊥ β) [Nonempty β] : ∃ c, ∀ x, f x = c := by have hf_meas := @SimpleFunc.measurableSet_fiber α _ ⊥ f simp_rw [MeasurableSpace.measurableSet_bot_iff] at hf_meas exact (exists_eq_const_of_preimage_singleton hf_meas).imp fun c hc ↦ congr_fun hc theorem simpleFunc_bot' {α} [Nonempty β] (f : @SimpleFunc α ⊥ β) : ∃ c, f = @SimpleFunc.const α _ ⊥ c := letI : MeasurableSpace α := ⊥; (simpleFunc_bot f).imp fun _ ↦ ext theorem measurableSet_cut (r : α → β → Prop) (f : α →ₛ β) (h : ∀ b, MeasurableSet { a \| r a b }) : MeasurableSet { a \| r a (f a) } := by have : { a \| r a (f a) } = ⋃ b ∈ range f, { a \| r a b } ∩ f ⁻¹' {b} := by ext a suffices r a (f a) ↔ ∃ i, r a (f i) ∧ f a = f i by simpa exact ⟨fun h => ⟨a, ⟨h, rfl⟩⟩, fun ⟨a', ⟨h', e⟩⟩ => e.symm ▸ h'⟩ rw [this] exact MeasurableSet.biUnion f.finite_range.countable fun b _ => MeasurableSet.inter (h b) (f.measurableSet_fiber _) @[measurability] theorem measurableSet_preimage (f : α →ₛ β) (s) : MeasurableSet (f ⁻¹' s) := measurableSet_cut (fun _ b => b ∈ s) f fun b => MeasurableSet.const (b ∈ s) /-- A simple function is measurable -/ @[measurability, fun_prop] protected theorem measurable [MeasurableSpace β] (f : α →ₛ β) : Measurable f := fun s _ => measurableSet_preimage f s @[measurability] protected theorem aemeasurable [MeasurableSpace β] {μ : Measure α} (f : α →ₛ β) : AEMeasurable f μ := f.measurable.aemeasurable protected theorem sum_measure_preimage_singleton (f : α →ₛ β) {μ : Measure α} (s : Finset β) : (∑ y ∈ s, μ (f ⁻¹' {y})) = μ (f ⁻¹' ↑s) := sum_measure_preimage_singleton _ fun _ _ => f.measurableSet_fiber _ theorem sum_range_measure_preimage_singleton (f : α →ₛ β) (μ : Measure α) : (∑ y ∈ f.range, μ (f ⁻¹' {y})) = μ univ := by rw [f.sum_measure_preimage_singleton, coe_range, preimage_range] open scoped Classical in /-- If-then-else as a `SimpleFunc`. -/ def piecewise (s : Set α) (hs : MeasurableSet s) (f g : α →ₛ β) : α →ₛ β := ⟨s.piecewise f g, fun _ => letI : MeasurableSpace β := ⊤ f.measurable.piecewise hs g.measurable trivial, (f.finite_range.union g.finite_range).subset range_ite_subset⟩ open scoped Classical in @[simp] theorem coe_piecewise {s : Set α} (hs : MeasurableSet s) (f g : α →ₛ β) : ⇑(piecewise s hs f g) = s.piecewise f g := rfl open scoped Classical in theorem piecewise_apply {s : Set α} (hs : MeasurableSet s) (f g : α →ₛ β) (a) : piecewise s hs f g a = if a ∈ s then f a else g a := rfl open scoped Classical in @[simp] theorem piecewise_compl {s : Set α} (hs : MeasurableSet sᶜ) (f g : α →ₛ β) : piecewise sᶜ hs f g = piecewise s hs.of_compl g f := coe_injective <\| by simp [hs] @[simp] theorem piecewise_univ (f g : α →ₛ β) : piecewise univ MeasurableSet.univ f g = f := coe_injective <\| by simp @[simp] theorem piecewise_empty (f g : α →ₛ β) : piecewise ∅ MeasurableSet.empty f g = g := coe_injective <\| by simp open scoped Classical in @[simp] theorem piecewise_same (f : α →ₛ β) {s : Set α} (hs : MeasurableSet s) : piecewise s hs f f = f := coe_injective <\| Set.piecewise_same _ _ theorem support_indicator [Zero β] {s : Set α} (hs : MeasurableSet s) (f : α →ₛ β) : Function.support (f.piecewise s hs (SimpleFunc.const α 0)) = s ∩ Function.support f := Set.support_indicator open scoped Classical in theorem range_indicator {s : Set α} (hs : MeasurableSet s) (hs_nonempty : s.Nonempty) (hs_ne_univ : s ≠ univ) (x y : β) : (piecewise s hs (const α x) (const α y)).range = {x, y} := by simp only [← Finset.coe_inj, coe_range, coe_piecewise, range_piecewise, coe_const, Finset.coe_insert, Finset.coe_singleton, hs_nonempty.image_const, (nonempty_compl.2 hs_ne_univ).image_const, singleton_union, Function.const] theorem measurable_bind [MeasurableSpace γ] (f : α →ₛ β) (g : β → α → γ) (hg : ∀ b, Measurable (g b)) : Measurable fun a => g (f a) a := fun s hs => f.measurableSet_cut (fun a b => g b a ∈ s) fun b => hg b hs /-- If `f : α →ₛ β` is a simple function and `g : β → α →ₛ γ` is a family of simple functions, then `f.bind g` binds the first argument of `g` to `f`. In other words, `f.bind g a = g (f a) a`. -/ def bind (f : α →ₛ β) (g : β → α →ₛ γ) : α →ₛ γ := ⟨fun a => g (f a) a, fun c => f.measurableSet_cut (fun a b => g b a = c) fun b => (g b).measurableSet_preimage {c}, (f.finite_range.biUnion fun b _ => (g b).finite_range).subset <\| by rintro _ ⟨a, rfl⟩; simp⟩ @[simp] theorem bind_apply (f : α →ₛ β) (g : β → α →ₛ γ) (a) : f.bind g a = g (f a) a := rfl /-- Given a function `g : β → γ` and a simple function `f : α →ₛ β`, `f.map g` return the simple function `g ∘ f : α →ₛ γ` -/ def map (g : β → γ) (f : α →ₛ β) : α →ₛ γ := bind f (const α ∘ g) theorem map_apply (g : β → γ) (f : α →ₛ β) (a) : f.map g a = g (f a) := rfl theorem map_map (g : β → γ) (h : γ → δ) (f : α →ₛ β) : (f.map g).map h = f.map (h ∘ g) := rfl @[simp] theorem coe_map (g : β → γ) (f : α →ₛ β) : (f.map g : α → γ) = g ∘ f := rfl @[simp] theorem range_map [DecidableEq γ] (g : β → γ) (f : α →ₛ β) : (f.map g).range = f.range.image g := Finset.coe_injective <\| by simp only [coe_range, coe_map, Finset.coe_image, range_comp] @[simp] theorem map_const (g : β → γ) (b : β) : (const α b).map g = const α (g b) := rfl open scoped Classical in theorem map_preimage (f : α →ₛ β) (g : β → γ) (s : Set γ) : f.map g ⁻¹' s = f ⁻¹' ↑{b ∈ f.range \| g b ∈ s} := by simp only [coe_range, sep_mem_eq, coe_map, Finset.coe_filter, ← mem_preimage, inter_comm, preimage_inter_range, ← Finset.mem_coe] exact preimage_comp open scoped Classical in theorem map_preimage_singleton (f : α →ₛ β) (g : β → γ) (c : γ) : f.map g ⁻¹' {c} = f ⁻¹' ↑{b ∈ f.range \| g b = c} := map_preimage _ _ _ /-- Composition of a `SimpleFun` and a measurable function is a `SimpleFunc`. -/ def comp [MeasurableSpace β] (f : β →ₛ γ) (g : α → β) (hgm : Measurable g) : α →ₛ γ where toFun := f ∘ g finite_range' := f.finite_range.subset <\| Set.range_comp_subset_range _ _ measurableSet_fiber' z := hgm (f.measurableSet_fiber z) @[simp] theorem coe_comp [MeasurableSpace β] (f : β →ₛ γ) {g : α → β} (hgm : Measurable g) : ⇑(f.comp g hgm) = f ∘ g := rfl theorem range_comp_subset_range [MeasurableSpace β] (f : β →ₛ γ) {g : α → β} (hgm : Measurable g) : (f.comp g hgm).range ⊆ f.range := Finset.coe_subset.1 <\| by simp only [coe_range, coe_comp, Set.range_comp_subset_range] /-- Extend a `SimpleFunc` along a measurable embedding: `f₁.extend g hg f₂` is the function `F : β →ₛ γ` such that `F ∘ g = f₁` and `F y = f₂ y` whenever `y ∉ range g`. -/ def extend [MeasurableSpace β] (f₁ : α →ₛ γ) (g : α → β) (hg : MeasurableEmbedding g) (f₂ : β →ₛ γ) : β →ₛ γ where toFun := Function.extend g f₁ f₂ finite_range' := (f₁.finite_range.union <\| f₂.finite_range.subset (image_subset_range _ _)).subset (range_extend_subset _ _ _) measurableSet_fiber' := by letI : MeasurableSpace γ := ⊤; haveI : MeasurableSingletonClass γ := ⟨fun _ => trivial⟩ exact fun x => hg.measurable_extend f₁.measurable f₂.measurable (measurableSet_singleton _) @[simp] theorem extend_apply [MeasurableSpace β] (f₁ : α →ₛ γ) {g : α → β} (hg : MeasurableEmbedding g) (f₂ : β →ₛ γ) (x : α) : (f₁.extend g hg f₂) (g x) = f₁ x := hg.injective.extend_apply _ _ _ @[simp] theorem extend_apply' [MeasurableSpace β] (f₁ : α →ₛ γ) {g : α → β} (hg : MeasurableEmbedding g) (f₂ : β →ₛ γ) {y : β} (h : ¬∃ x, g x = y) : (f₁.extend g hg f₂) y = f₂ y := Function.extend_apply' _ _ _ h @[simp] theorem extend_comp_eq' [MeasurableSpace β] (f₁ : α →ₛ γ) {g : α → β} (hg : MeasurableEmbedding g) (f₂ : β →ₛ γ) : f₁.extend g hg f₂ ∘ g = f₁ := funext fun _ => extend_apply _ _ _ _ @[simp] theorem extend_comp_eq [MeasurableSpace β] (f₁ : α →ₛ γ) {g : α → β} (hg : MeasurableEmbedding g) (f₂ : β →ₛ γ) : (f₁.extend g hg f₂).comp g hg.measurable = f₁ := coe_injective <\| extend_comp_eq' _ hg _ /-- If `f` is a simple function taking values in `β → γ` and `g` is another simple function with the same domain and codomain `β`, then `f.seq g = f a (g a)`. -/ def seq (f : α →ₛ β → γ) (g : α →ₛ β) : α →ₛ γ := f.bind fun f => g.map f @[simp] theorem seq_apply (f : α →ₛ β → γ) (g : α →ₛ β) (a : α) : f.seq g a = f a (g a) := rfl /-- Combine two simple functions `f : α →ₛ β` and `g : α →ₛ β` into `fun a => (f a, g a)`. -/ def pair (f : α →ₛ β) (g : α →ₛ γ) : α →ₛ β × γ := (f.map Prod.mk).seq g @[simp] theorem pair_apply (f : α →ₛ β) (g : α →ₛ γ) (a) : pair f g a = (f a, g a) := rfl theorem pair_preimage (f : α →ₛ β) (g : α →ₛ γ) (s : Set β) (t : Set γ) : pair f g ⁻¹' s ×ˢ t = f ⁻¹' s ∩ g ⁻¹' t := rfl -- A special form of `pair_preimage` theorem pair_preimage_singleton (f : α →ₛ β) (g : α →ₛ γ) (b : β) (c : γ) : pair f g ⁻¹' {(b, c)} = f ⁻¹' {b} ∩ g ⁻¹' {c} := by rw [← singleton_prod_singleton] exact pair_preimage _ _ _ _ @[simp] theorem map_fst_pair (f : α →ₛ β) (g : α →ₛ γ) : (f.pair g).map Prod.fst = f := rfl @[simp] theorem map_snd_pair (f : α →ₛ β) (g : α →ₛ γ) : (f.pair g).map Prod.snd = g := rfl @[simp] theorem bind_const (f : α →ₛ β) : f.bind (const α) = f := by ext; simp @[to_additive] instance instOne [One β] : One (α →ₛ β) := ⟨const α 1⟩ @[to_additive] instance instMul [Mul β] : Mul (α →ₛ β) := ⟨fun f g => (f.map (· ·)).seq g⟩ @[to_additive] instance instDiv [Div β] : Div (α →ₛ β) := ⟨fun f g => (f.map (· / ·)).seq g⟩ @[to_additive] instance instInv [Inv β] : Inv (α →ₛ β) := ⟨fun f => f.map Inv.inv⟩ instance instSup [Max β] : Max (α →ₛ β) := ⟨fun f g => (f.map (· ⊔ ·)).seq g⟩ instance instInf [Min β] : Min (α →ₛ β) := ⟨fun f g => (f.map (· ⊓ ·)).seq g⟩ instance instLE [LE β] : LE (α →ₛ β) := ⟨fun f g => ∀ a, f a ≤ g a⟩ @[to_additive (attr := simp)] theorem const_one [One β] : const α (1 : β) = 1 := rfl @[to_additive (attr := simp, norm_cast)] theorem coe_one [One β] : ⇑(1 : α →ₛ β) = 1 := rfl @[to_additive (attr := simp, norm_cast)] theorem coe_mul [Mul β] (f g : α →ₛ β) : ⇑(f * g) = ⇑f * ⇑g := rfl @[to_additive (attr := simp, norm_cast)] theorem coe_inv [Inv β] (f : α →ₛ β) : ⇑(f⁻¹) = (⇑f)⁻¹ := rfl @[to_additive (attr := simp, norm_cast)] theorem coe_div [Div β] (f g : α →ₛ β) : ⇑(f / g) = ⇑f / ⇑g := rfl @[simp, norm_cast] theorem coe_le [LE β] {f g : α →ₛ β} : (f : α → β) ≤ g ↔ f ≤ g := Iff.rfl @[simp, norm_cast] theorem coe_sup [Max β] (f g : α →ₛ β) : ⇑(f ⊔ g) = ⇑f ⊔ ⇑g := rfl @[simp, norm_cast] theorem coe_inf [Min β] (f g : α →ₛ β) : ⇑(f ⊓ g) = ⇑f ⊓ ⇑g := rfl @[to_additive] theorem mul_apply [Mul β] (f g : α →ₛ β) (a : α) : (f * g) a = f a * g a := rfl @[to_additive] theorem div_apply [Div β] (f g : α →ₛ β) (x : α) : (f / g) x = f x / g x := rfl @[to_additive] theorem inv_apply [Inv β] (f : α →ₛ β) (x : α) : f⁻¹ x = (f x)⁻¹ := rfl theorem sup_apply [Max β] (f g : α →ₛ β) (a : α) : (f ⊔ g) a = f a ⊔ g a := rfl theorem inf_apply [Min β] (f g : α →ₛ β) (a : α) : (f ⊓ g) a = f a ⊓ g a := rfl @[to_additive (attr := simp)] theorem range_one [Nonempty α] [One β] : (1 : α →ₛ β).range = {1} := Finset.ext fun x => by simp [eq_comm] @[simp] theorem range_eq_empty_of_isEmpty {β} [hα : IsEmpty α] (f : α →ₛ β) : f.range = ∅ := by rw [← Finset.not_nonempty_iff_eq_empty] by_contra h obtain ⟨y, hy_mem⟩ := h rw [SimpleFunc.mem_range, Set.mem_range] at hy_mem obtain ⟨x, hxy⟩ := hy_mem rw [isEmpty_iff] at hα exact hα x theorem eq_zero_of_mem_range_zero [Zero β] : ∀ {y : β}, y ∈ (0 : α →ₛ β).range → y = 0 := @(forall_mem_range.2 fun _ => rfl) @[to_additive] theorem mul_eq_map₂ [Mul β] (f g : α →ₛ β) : f * g = (pair f g).map fun p : β × β => p.1 * p.2 := rfl theorem sup_eq_map₂ [Max β] (f g : α →ₛ β) : f ⊔ g = (pair f g).map fun p : β × β => p.1 ⊔ p.2 := rfl @[to_additive] theorem const_mul_eq_map [Mul β] (f : α →ₛ β) (b : β) : const α b * f = f.map fun a => b * a := rfl @[to_additive] theorem map_mul [Mul β] [Mul γ] {g : β → γ} (hg : ∀ x y, g (x * y) = g x * g y) (f₁ f₂ : α →ₛ β) : (f₁ * f₂).map g = f₁.map g * f₂.map g := ext fun _ => hg _ _ variable {K : Type} @[to_additive] instance instSMul [SMul K β] : SMul K (α →ₛ β) := ⟨fun k f => f.map (k • ·)⟩ @[to_additive (attr := simp)] theorem coe_smul [SMul K β] (c : K) (f : α →ₛ β) : ⇑(c • f) = c • ⇑f := rfl @[to_additive (attr := simp)] theorem smul_apply [SMul K β] (k : K) (f : α →ₛ β) (a : α) : (k • f) a = k • f a := rfl instance hasNatSMul [AddMonoid β] : SMul ℕ (α →ₛ β) := inferInstance @[to_additive existing hasNatSMul] instance hasNatPow [Monoid β] : Pow (α →ₛ β) ℕ := ⟨fun f n => f.map (· ^ n)⟩ @[simp] theorem coe_pow [Monoid β] (f : α →ₛ β) (n : ℕ) : ⇑(f ^ n) = (⇑f) ^ n := rfl theorem pow_apply [Monoid β] (n : ℕ) (f : α →ₛ β) (a : α) : (f ^ n) a = f a ^ n := rfl instance hasIntPow [DivInvMonoid β] : Pow (α →ₛ β) ℤ := ⟨fun f n => f.map (· ^ n)⟩ @[simp] theorem coe_zpow [DivInvMonoid β] (f : α →ₛ β) (z : ℤ) : ⇑(f ^ z) = (⇑f) ^ z := rfl theorem zpow_apply [DivInvMonoid β] (z : ℤ) (f : α →ₛ β) (a : α) : (f ^ z) a = f a ^ z := rfl -- TODO: work out how to generate these instances with `to_additive`, which gets confused by the -- argument order swap between `coe_smul` and `coe_pow`. section Additive instance instAddMonoid [AddMonoid β] : AddMonoid (α →ₛ β) := Function.Injective.addMonoid (fun f => show α → β from f) coe_injective coe_zero coe_add fun _ _ => coe_smul _ _ instance instAddCommMonoid [AddCommMonoid β] : AddCommMonoid (α →ₛ β) := Function.Injective.addCommMonoid (fun f => show α → β from f) coe_injective coe_zero coe_add fun _ _ => coe_smul _ _ instance instAddGroup [AddGroup β] : AddGroup (α →ₛ β) := Function.Injective.addGroup (fun f => show α → β from f) coe_injective coe_zero coe_add coe_neg coe_sub (fun _ _ => coe_smul _ _) fun _ _ => coe_smul _ _ instance instAddCommGroup [AddCommGroup β] : AddCommGroup (α →ₛ β) := Function.Injective.addCommGroup (fun f => show α → β from f) coe_injective coe_zero coe_add coe_neg coe_sub (fun _ _ => coe_smul _ _) fun _ _ => coe_smul _ _ end Additive @[to_additive existing] instance instMonoid [Monoid β] : Monoid (α →ₛ β) := Function.Injective.monoid (fun f => show α → β from f) coe_injective coe_one coe_mul coe_pow @[to_additive existing] instance instCommMonoid [CommMonoid β] : CommMonoid (α →ₛ β) := Function.Injective.commMonoid (fun f => show α → β from f) coe_injective coe_one coe_mul coe_pow @[to_additive existing] instance instGroup [Group β] : Group (α →ₛ β) := Function.Injective.group (fun f => show α → β from f) coe_injective coe_one coe_mul coe_inv coe_div coe_pow coe_zpow @[to_additive existing] instance instCommGroup [CommGroup β] : CommGroup (α →ₛ β) := Function.Injective.commGroup (fun f => show α → β from f) coe_injective coe_one coe_mul coe_inv coe_div coe_pow coe_zpow instance instModule [Semiring K] [AddCommMonoid β] [Module K β] : Module K (α →ₛ β) := Function.Injective.module K ⟨⟨fun f => show α → β from f, coe_zero⟩, coe_add⟩ coe_injective coe_smul theorem smul_eq_map [SMul K β] (k : K) (f : α →ₛ β) : k • f = f.map (k • ·) := rfl section Preorder variable [Preorder β] {s : Set α} {f f₁ f₂ g g₁ g₂ : α →ₛ β} {hs : MeasurableSet s} instance instPreorder : Preorder (α →ₛ β) := Preorder.lift (⇑) @[norm_cast] lemma coe_le_coe : ⇑f ≤ g ↔ f ≤ g := .rfl @[simp, norm_cast] lemma coe_lt_coe : ⇑f < g ↔ f < g := .rfl @[simp] lemma mk_le_mk {f g : α → β} {hf hg hf' hg'} : mk f hf hf' ≤ mk g hg hg' ↔ f ≤ g := Iff.rfl @[simp] lemma mk_lt_mk {f g : α → β} {hf hg hf' hg'} : mk f hf hf' < mk g hg hg' ↔ f < g := Iff.rfl @[gcongr] protected alias ⟨_, GCongr.mk_le_mk⟩ := mk_le_mk @[gcongr] protected alias ⟨_, GCongr.mk_lt_mk⟩ := mk_lt_mk @[gcongr] protected alias ⟨_, GCongr.coe_le_coe⟩ := coe_le_coe @[gcongr] protected alias ⟨_, GCongr.coe_lt_coe⟩ := coe_lt_coe open scoped Classical in @[gcongr] lemma piecewise_mono (hf : ∀ a ∈ s, f₁ a ≤ f₂ a) (hg : ∀ a ∉ s, g₁ a ≤ g₂ a) : piecewise s hs f₁ g₁ ≤ piecewise s hs f₂ g₂ := Set.piecewise_mono hf hg end Preorder instance instPartialOrder [PartialOrder β] : PartialOrder (α →ₛ β) := { SimpleFunc.instPreorder with le_antisymm := fun _f _g hfg hgf => ext fun a => le_antisymm (hfg a) (hgf a) } instance instOrderBot [LE β] [OrderBot β] : OrderBot (α →ₛ β) where bot := const α ⊥ bot_le _ _ := bot_le instance instOrderTop [LE β] [OrderTop β] : OrderTop (α →ₛ β) where top := const α ⊤ le_top _ _ := le_top @[to_additive] instance [CommMonoid β] [PartialOrder β] [IsOrderedMonoid β] : IsOrderedMonoid (α →ₛ β) where mul_le_mul_left _ _ h _ _ := mul_le_mul_left' (h _) _ instance instSemilatticeInf [SemilatticeInf β] : SemilatticeInf (α →ₛ β) := { SimpleFunc.instPartialOrder with inf := (· ⊓ ·) inf_le_left := fun _ _ _ => inf_le_left inf_le_right := fun _ _ _ => inf_le_right le_inf := fun _f _g _h hfh hgh a => le_inf (hfh a) (hgh a) } instance instSemilatticeSup [SemilatticeSup β] : SemilatticeSup (α →ₛ β) := { SimpleFunc.instPartialOrder with sup := (· ⊔ ·) le_sup_left := fun _ _ _ => le_sup_left le_sup_right := fun _ _ _ => le_sup_right sup_le := fun _f _g _h hfh hgh a => sup_le (hfh a) (hgh a) } instance instLattice [Lattice β] : Lattice (α →ₛ β) := { SimpleFunc.instSemilatticeSup, SimpleFunc.instSemilatticeInf with } instance instBoundedOrder [LE β] [BoundedOrder β] : BoundedOrder (α →ₛ β) := { SimpleFunc.instOrderBot, SimpleFunc.instOrderTop with } theorem finset_sup_apply [SemilatticeSup β] [OrderBot β] {f : γ → α →ₛ β} (s : Finset γ) (a : α) : s.sup f a = s.sup fun c => f c a := by classical refine Finset.induction_on s rfl ?_ intro a s _ ih rw [Finset.sup_insert, Finset.sup_insert, sup_apply, ih] section Restrict variable [Zero β] open scoped Classical in /-- Restrict a simple function `f : α →ₛ β` to a set `s`. If `s` is measurable, then `f.restrict s a = if a ∈ s then f a else 0`, otherwise `f.restrict s = const α 0`. -/ def restrict (f : α →ₛ β) (s : Set α) : α →ₛ β := if hs : MeasurableSet s then piecewise s hs f 0 else 0 theorem restrict_of_not_measurable {f : α →ₛ β} {s : Set α} (hs : ¬MeasurableSet s) : restrict f s = 0 := dif_neg hs @[simp] theorem coe_restrict (f : α →ₛ β) {s : Set α} (hs : MeasurableSet s) : ⇑(restrict f s) = indicator s f := by classical rw [restrict, dif_pos hs, coe_piecewise, coe_zero, piecewise_eq_indicator] @[simp] theorem restrict_univ (f : α →ₛ β) : restrict f univ = f := by simp [restrict] @[simp] theorem restrict_empty (f : α →ₛ β) : restrict f ∅ = 0 := by simp [restrict] open scoped Classical in theorem map_restrict_of_zero [Zero γ] {g : β → γ} (hg : g 0 = 0) (f : α →ₛ β) (s : Set α) : (f.restrict s).map g = (f.map g).restrict s := ext fun x => if hs : MeasurableSet s then by simp [hs, Set.indicator_comp_of_zero hg] else by simp [restrict_of_not_measurable hs, hg] theorem map_coe_ennreal_restrict (f : α →ₛ ℝ≥0) (s : Set α) : (f.restrict s).map ((↑) : ℝ≥0 → ℝ≥0∞) = (f.map (↑)).restrict s := map_restrict_of_zero ENNReal.coe_zero _ _ theorem map_coe_nnreal_restrict (f : α →ₛ ℝ≥0) (s : Set α) : (f.restrict s).map ((↑) : ℝ≥0 → ℝ) = (f.map (↑)).restrict s := map_restrict_of_zero NNReal.coe_zero _ _ theorem restrict_apply (f : α →ₛ β) {s : Set α} (hs : MeasurableSet s) (a) : restrict f s a = indicator s f a := by simp only [f.coe_restrict hs] theorem restrict_preimage (f : α →ₛ β) {s : Set α} (hs : MeasurableSet s) {t : Set β} (ht : (0 : β) ∉ t) : restrict f s ⁻¹' t = s ∩ f ⁻¹' t := by simp [hs, indicator_preimage_of_not_mem _ _ ht, inter_comm] theorem restrict_preimage_singleton (f : α →ₛ β) {s : Set α} (hs : MeasurableSet s) {r : β} (hr : r ≠ 0) : restrict f s ⁻¹' {r} = s ∩ f ⁻¹' {r} := f.restrict_preimage hs hr.symm theorem mem_restrict_range {r : β} {s : Set α} {f : α →ₛ β} (hs : MeasurableSet s) : r ∈ (restrict f s).range ↔ r = 0 ∧ s ≠ univ ∨ r ∈ f '' s := by rw [← Finset.mem_coe, coe_range, coe_restrict _ hs, mem_range_indicator] open scoped Classical in theorem mem_image_of_mem_range_restrict {r : β} {s : Set α} {f : α →ₛ β} (hr : r ∈ (restrict f s).range) (h0 : r ≠ 0) : r ∈ f '' s := if hs : MeasurableSet s then by simpa [mem_restrict_range hs, h0, -mem_range] using hr else by rw [restrict_of_not_measurable hs] at hr exact (h0 <\| eq_zero_of_mem_range_zero hr).elim open scoped Classical in @[gcongr, mono] theorem restrict_mono [Preorder β] (s : Set α) {f g : α →ₛ β} (H : f ≤ g) : f.restrict s ≤ g.restrict s := if hs : MeasurableSet s then fun x => by simp only [coe_restrict _ hs, indicator_le_indicator (H x)] else by simp only [restrict_of_not_measurable hs, le_refl] end Restrict section Approx section variable [SemilatticeSup β] [OrderBot β] [Zero β] /-- Fix a sequence `i : ℕ → β`. Given a function `α → β`, its `n`-th approximation by simple functions is defined so that in case `β = ℝ≥0∞` it sends each `a` to the supremum of the set `{i k \| k ≤ n ∧ i k ≤ f a}`, see `approx_apply` and `iSup_approx_apply` for details. -/ def approx (i : ℕ → β) (f : α → β) (n : ℕ) : α →ₛ β := (Finset.range n).sup fun k => restrict (const α (i k)) { a : α \| i k ≤ f a } open scoped Classical in theorem approx_apply [TopologicalSpace β] [OrderClosedTopology β] [MeasurableSpace β] [OpensMeasurableSpace β] {i : ℕ → β} {f : α → β} {n : ℕ} (a : α) (hf : Measurable f) : (approx i f n : α →ₛ β) a = (Finset.range n).sup fun k => if i k ≤ f a then i k else 0 := by dsimp only [approx] rw [finset_sup_apply] congr funext k rw [restrict_apply] · simp only [coe_const, mem_setOf_eq, indicator_apply, Function.const_apply] · exact hf measurableSet_Ici theorem monotone_approx (i : ℕ → β) (f : α → β) : Monotone (approx i f) := fun _ _ h => Finset.sup_mono <\| Finset.range_subset.2 h theorem approx_comp [TopologicalSpace β] [OrderClosedTopology β] [MeasurableSpace β] [OpensMeasurableSpace β] [MeasurableSpace γ] {i : ℕ → β} {f : γ → β} {g : α → γ} {n : ℕ} (a : α) (hf : Measurable f) (hg : Measurable g) : (approx i (f ∘ g) n : α →ₛ β) a = (approx i f n : γ →ₛ β) (g a) := by rw [approx_apply _ hf, approx_apply _ (hf.comp hg), Function.comp_apply] end theorem iSup_approx_apply [TopologicalSpace β] [CompleteLattice β] [OrderClosedTopology β] [Zero β] [MeasurableSpace β] [OpensMeasurableSpace β] (i : ℕ → β) (f : α → β) (a : α) (hf : Measurable f) (h_zero : (0 : β) = ⊥) : ⨆ n, (approx i f n : α →ₛ β) a = ⨆ (k) (_ : i k ≤ f a), i k := by refine le_antisymm (iSup_le fun n => ?_) (iSup_le fun k => iSup_le fun hk => ?_) · rw [approx_apply a hf, h_zero] refine Finset.sup_le fun k _ => ?_ split_ifs with h · exact le_iSup_of_le k (le_iSup (fun _ : i k ≤ f a => i k) h) · exact bot_le · refine le_iSup_of_le (k + 1) ?_ rw [approx_apply a hf] have : k ∈ Finset.range (k + 1) := Finset.mem_range.2 (Nat.lt_succ_self _) refine le_trans (le_of_eq ?_) (Finset.le_sup this) rw [if_pos hk] end Approx section EApprox variable {f : α → ℝ≥0∞} /-- A sequence of `ℝ≥0∞`s such that its range is the set of non-negative rational numbers. -/ def ennrealRatEmbed (n : ℕ) : ℝ≥0∞ := ENNReal.ofReal ((Encodable.decode (α := ℚ) n).getD (0 : ℚ)) theorem ennrealRatEmbed_encode (q : ℚ) : ennrealRatEmbed (Encodable.encode q) = Real.toNNReal q := by rw [ennrealRatEmbed, Encodable.encodek]; rfl /-- Approximate a function `α → ℝ≥0∞` by a sequence of simple functions. -/ def eapprox : (α → ℝ≥0∞) → ℕ → α →ₛ ℝ≥0∞ := approx ennrealRatEmbed theorem eapprox_lt_top (f : α → ℝ≥0∞) (n : ℕ) (a : α) : eapprox f n a < ∞ := by simp only [eapprox, approx, finset_sup_apply, Finset.mem_range, ENNReal.bot_eq_zero, restrict] rw [Finset.sup_lt_iff (α := ℝ≥0∞) WithTop.top_pos] intro b _ split_ifs · simp only [coe_zero, coe_piecewise, piecewise_eq_indicator, coe_const] calc { a : α \| ennrealRatEmbed b ≤ f a }.indicator (fun _ => ennrealRatEmbed b) a ≤ ennrealRatEmbed b := indicator_le_self _ _ a _ < ⊤ := ENNReal.coe_lt_top · exact WithTop.top_pos @[mono] theorem monotone_eapprox (f : α → ℝ≥0∞) : Monotone (eapprox f) := monotone_approx _ f @[gcongr] lemma eapprox_mono {m n : ℕ} (hmn : m ≤ n) : eapprox f m ≤ eapprox f n := monotone_eapprox _ hmn lemma iSup_eapprox_apply (hf : Measurable f) (a : α) : ⨆ n, (eapprox f n : α →ₛ ℝ≥0∞) a = f a := by rw [eapprox, iSup_approx_apply ennrealRatEmbed f a hf rfl] refine le_antisymm (iSup_le fun i => iSup_le fun hi => hi) (le_of_not_gt ?_) intro h rcases ENNReal.lt_iff_exists_rat_btwn.1 h with ⟨q, _, lt_q, q_lt⟩ have : (Real.toNNReal q : ℝ≥0∞) ≤ ⨆ (k : ℕ) (_ : ennrealRatEmbed k ≤ f a), ennrealRatEmbed k := by refine le_iSup_of_le (Encodable.encode q) ?_ rw [ennrealRatEmbed_encode q] exact le_iSup_of_le (le_of_lt q_lt) le_rfl exact lt_irrefl _ (lt_of_le_of_lt this lt_q) lemma iSup_coe_eapprox (hf : Measurable f) : ⨆ n, ⇑(eapprox f n) = f := by simpa [funext_iff] using iSup_eapprox_apply hf theorem eapprox_comp [MeasurableSpace γ] {f : γ → ℝ≥0∞} {g : α → γ} {n : ℕ} (hf : Measurable f) (hg : Measurable g) : (eapprox (f ∘ g) n : α → ℝ≥0∞) = (eapprox f n : γ →ₛ ℝ≥0∞) ∘ g := funext fun a => approx_comp a hf hg lemma tendsto_eapprox {f : α → ℝ≥0∞} (hf_meas : Measurable f) (a : α) : Tendsto (fun n ↦ eapprox f n a) atTop (𝓝 (f a)) := by nth_rw 2 [← iSup_coe_eapprox hf_meas] rw [iSup_apply] exact tendsto_atTop_iSup fun _ _ hnm ↦ monotone_eapprox f hnm a /-- Approximate a function `α → ℝ≥0∞` by a series of simple functions taking their values in `ℝ≥0`. -/ def eapproxDiff (f : α → ℝ≥0∞) : ℕ → α →ₛ ℝ≥0 \| 0 => (eapprox f 0).map ENNReal.toNNReal \| n + 1 => (eapprox f (n + 1) - eapprox f n).map ENNReal.toNNReal theorem sum_eapproxDiff (f : α → ℝ≥0∞) (n : ℕ) (a : α) : (∑ k ∈ Finset.range (n + 1), (eapproxDiff f k a : ℝ≥0∞)) = eapprox f n a := by induction' n with n IH · simp only [Nat.zero_add, Finset.sum_singleton, Finset.range_one] rfl · rw [Finset.sum_range_succ, IH, eapproxDiff, coe_map, Function.comp_apply, coe_sub, Pi.sub_apply, ENNReal.coe_toNNReal, add_tsub_cancel_of_le (monotone_eapprox f (Nat.le_succ _) _)] apply (lt_of_le_of_lt _ (eapprox_lt_top f (n + 1) a)).ne rw [tsub_le_iff_right] exact le_self_add theorem tsum_eapproxDiff (f : α → ℝ≥0∞) (hf : Measurable f) (a : α) : (∑' n, (eapproxDiff f n a : ℝ≥0∞)) = f a := by simp_rw [ENNReal.tsum_eq_iSup_nat' (tendsto_add_atTop_nat 1), sum_eapproxDiff, iSup_eapprox_apply hf a] end EApprox end Measurable section Measure variable {m : MeasurableSpace α} {μ ν : Measure α} /-- Integral of a simple function whose codomain is `ℝ≥0∞`. -/ def lintegral {_m : MeasurableSpace α} (f : α →ₛ ℝ≥0∞) (μ : Measure α) : ℝ≥0∞ := ∑ x ∈ f.range, x μ (f ⁻¹' {x}) theorem lintegral_eq_of_subset (f : α →ₛ ℝ≥0∞) {s : Finset ℝ≥0∞} (hs : ∀ x, f x ≠ 0 → μ (f ⁻¹' {f x}) ≠ 0 → f x ∈ s) : f.lintegral μ = ∑ x ∈ s, x * μ (f ⁻¹' {x}) := by refine Finset.sum_bij_ne_zero (fun r _ _ => r) ?_ ?_ ?_ ?_ · simpa only [forall_mem_range, mul_ne_zero_iff, and_imp] · intros assumption · intro b _ hb refine ⟨b, ?_, hb, rfl⟩ rw [mem_range, ← preimage_singleton_nonempty] exact nonempty_of_measure_ne_zero (mul_ne_zero_iff.1 hb).2 · intros rfl theorem lintegral_eq_of_subset' (f : α →ₛ ℝ≥0∞) {s : Finset ℝ≥0∞} (hs : f.range \ {0} ⊆ s) : f.lintegral μ = ∑ x ∈ s, x * μ (f ⁻¹' {x}) := f.lintegral_eq_of_subset fun x hfx _ => hs <\| Finset.mem_sdiff.2 ⟨f.mem_range_self x, mt Finset.mem_singleton.1 hfx⟩ /-- Calculate the integral of `(g ∘ f)`, where `g : β → ℝ≥0∞` and `f : α →ₛ β`. -/ theorem map_lintegral (g : β → ℝ≥0∞) (f : α →ₛ β) : (f.map g).lintegral μ = ∑ x ∈ f.range, g x * μ (f ⁻¹' {x}) := by simp only [lintegral, range_map] refine Finset.sum_image' _ fun b hb => ?_ rcases mem_range.1 hb with ⟨a, rfl⟩ rw [map_preimage_singleton, ← f.sum_measure_preimage_singleton, Finset.mul_sum] refine Finset.sum_congr ?_ ?_ · congr · intro x simp only [Finset.mem_filter] rintro ⟨_, h⟩ rw [h] theorem add_lintegral (f g : α →ₛ ℝ≥0∞) : (f + g).lintegral μ = f.lintegral μ + g.lintegral μ := calc (f + g).lintegral μ = ∑ x ∈ (pair f g).range, (x.1 * μ (pair f g ⁻¹' {x}) + x.2 * μ (pair f g ⁻¹' {x})) := by rw [add_eq_map₂, map_lintegral]; exact Finset.sum_congr rfl fun a _ => add_mul _ _ _ _ = (∑ x ∈ (pair f g).range, x.1 * μ (pair f g ⁻¹' {x})) + ∑ x ∈ (pair f g).range, x.2 * μ (pair f g ⁻¹' {x}) := by rw [Finset.sum_add_distrib] _ = ((pair f g).map Prod.fst).lintegral μ + ((pair f g).map Prod.snd).lintegral μ := by rw [map_lintegral, map_lintegral] _ = lintegral f μ + lintegral g μ := rfl theorem const_mul_lintegral (f : α →ₛ ℝ≥0∞) (x : ℝ≥0∞) : (const α x * f).lintegral μ = x * f.lintegral μ := calc (f.map fun a => x * a).lintegral μ = ∑ r ∈ f.range, x * r * μ (f ⁻¹' {r}) := map_lintegral _ _ _ = x * ∑ r ∈ f.range, r * μ (f ⁻¹' {r}) := by simp_rw [Finset.mul_sum, mul_assoc] /-- Integral of a simple function `α →ₛ ℝ≥0∞` as a bilinear map. -/ def lintegralₗ {m : MeasurableSpace α} : (α →ₛ ℝ≥0∞) →ₗ[ℝ≥0∞] Measure α →ₗ[ℝ≥0∞] ℝ≥0∞ where toFun f := { toFun := lintegral f map_add' := by simp [lintegral, mul_add, Finset.sum_add_distrib] map_smul' := fun c μ => by simp [lintegral, mul_left_comm _ c, Finset.mul_sum, Measure.smul_apply c] } map_add' f g := LinearMap.ext fun _ => add_lintegral f g map_smul' c f := LinearMap.ext fun _ => const_mul_lintegral f c @[simp] theorem zero_lintegral : (0 : α →ₛ ℝ≥0∞).lintegral μ = 0 := LinearMap.ext_iff.1 lintegralₗ.map_zero μ theorem lintegral_add {ν} (f : α →ₛ ℝ≥0∞) : f.lintegral (μ + ν) = f.lintegral μ + f.lintegral ν := (lintegralₗ f).map_add μ ν theorem lintegral_smul {R : Type} [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] (f : α →ₛ ℝ≥0∞) (c : R) : f.lintegral (c • μ) = c • f.lintegral μ := by simpa only [smul_one_smul] using (lintegralₗ f).map_smul (c • 1) μ @[simp] theorem lintegral_zero [MeasurableSpace α] (f : α →ₛ ℝ≥0∞) : f.lintegral 0 = 0 := (lintegralₗ f).map_zero theorem lintegral_finset_sum {ι} (f : α →ₛ ℝ≥0∞) (μ : ι → Measure α) (s : Finset ι) : f.lintegral (∑ i ∈ s, μ i) = ∑ i ∈ s, f.lintegral (μ i) := map_sum (lintegralₗ f) .. theorem lintegral_sum {m : MeasurableSpace α} {ι} (f : α →ₛ ℝ≥0∞) (μ : ι → Measure α) : f.lintegral (Measure.sum μ) = ∑' i, f.lintegral (μ i) := by simp only [lintegral, Measure.sum_apply, f.measurableSet_preimage, ← Finset.tsum_subtype, ← ENNReal.tsum_mul_left] apply ENNReal.tsum_comm open scoped Classical in theorem restrict_lintegral (f : α →ₛ ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : (restrict f s).lintegral μ = ∑ r ∈ f.range, r μ (f ⁻¹' {r} ∩ s) := calc (restrict f s).lintegral μ = ∑ r ∈ f.range, r * μ (restrict f s ⁻¹' {r}) := lintegral_eq_of_subset _ fun x hx => if hxs : x ∈ s then fun _ => by simp only [f.restrict_apply hs, indicator_of_mem hxs, mem_range_self] else False.elim <\| hx <\| by simp [] _ = ∑ r ∈ f.range, r μ (f ⁻¹' {r} ∩ s) := Finset.sum_congr rfl <\| forall_mem_range.2 fun b => if hb : f b = 0 then by simp only [hb, zero_mul] else by rw [restrict_preimage_singleton _ hs hb, inter_comm] theorem lintegral_restrict {m : MeasurableSpace α} (f : α →ₛ ℝ≥0∞) (s : Set α) (μ : Measure α) : f.lintegral (μ.restrict s) = ∑ y ∈ f.range, y * μ (f ⁻¹' {y} ∩ s) := by simp only [lintegral, Measure.restrict_apply, f.measurableSet_preimage] theorem restrict_lintegral_eq_lintegral_restrict (f : α →ₛ ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : (restrict f s).lintegral μ = f.lintegral (μ.restrict s) := by rw [f.restrict_lintegral hs, lintegral_restrict] theorem lintegral_restrict_iUnion_of_directed {ι : Type} [Countable ι] (f : α →ₛ ℝ≥0∞) {s : ι → Set α} (hd : Directed (· ⊆ ·) s) (μ : Measure α) : f.lintegral (μ.restrict (⋃ i, s i)) = ⨆ i, f.lintegral (μ.restrict (s i)) := by simp only [lintegral, Measure.restrict_iUnion_apply_eq_iSup hd (measurableSet_preimage ..), ENNReal.mul_iSup] refine finsetSum_iSup fun i j ↦ (hd i j).imp fun k ⟨hik, hjk⟩ ↦ fun a ↦ ?_ -- TODO https://github.com/leanprover-community/mathlib4/pull/14739 make `gcongr` close this goal constructor <;> · gcongr; refine Measure.restrict_mono ?_ le_rfl _; assumption theorem const_lintegral (c : ℝ≥0∞) : (const α c).lintegral μ = c μ univ := by rw [lintegral] cases isEmpty_or_nonempty α · simp [μ.eq_zero_of_isEmpty] · simp only [range_const, coe_const, Finset.sum_singleton] unfold Function.const; rw [preimage_const_of_mem (mem_singleton c)] theorem const_lintegral_restrict (c : ℝ≥0∞) (s : Set α) : (const α c).lintegral (μ.restrict s) = c * μ s := by rw [const_lintegral, Measure.restrict_apply MeasurableSet.univ, univ_inter] theorem restrict_const_lintegral (c : ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : ((const α c).restrict s).lintegral μ = c * μ s := by rw [restrict_lintegral_eq_lintegral_restrict _ hs, const_lintegral_restrict] @[gcongr] theorem lintegral_mono_fun {f g : α →ₛ ℝ≥0∞} (h : f ≤ g) : f.lintegral μ ≤ g.lintegral μ := by refine Monotone.of_left_le_map_sup (f := (lintegral · μ)) (fun f g ↦ ?_) h calc f.lintegral μ = ((pair f g).map Prod.fst).lintegral μ := by rw [map_fst_pair] _ ≤ ((pair f g).map fun p ↦ p.1 ⊔ p.2).lintegral μ := by simp only [map_lintegral] gcongr exact le_sup_left theorem le_sup_lintegral (f g : α →ₛ ℝ≥0∞) : f.lintegral μ ⊔ g.lintegral μ ≤ (f ⊔ g).lintegral μ := Monotone.le_map_sup (fun _ _ ↦ lintegral_mono_fun) f g @[gcongr] theorem lintegral_mono_measure {f : α →ₛ ℝ≥0∞} (h : μ ≤ ν) : f.lintegral μ ≤ f.lintegral ν := by simp only [lintegral] gcongr apply h /-- `SimpleFunc.lintegral` is monotone both in function and in measure. -/ @[mono, gcongr] theorem lintegral_mono {f g : α →ₛ ℝ≥0∞} (hfg : f ≤ g) (hμν : μ ≤ ν) : f.lintegral μ ≤ g.lintegral ν := (lintegral_mono_fun hfg).trans (lintegral_mono_measure hμν) /-- `SimpleFunc.lintegral` depends only on the measures of `f ⁻¹' {y}`. -/ theorem lintegral_eq_of_measure_preimage [MeasurableSpace β] {f : α →ₛ ℝ≥0∞} {g : β →ₛ ℝ≥0∞} {ν : Measure β} (H : ∀ y, μ (f ⁻¹' {y}) = ν (g ⁻¹' {y})) : f.lintegral μ = g.lintegral ν := by simp only [lintegral, ← H] apply lintegral_eq_of_subset simp only [H] intros exact mem_range_of_measure_ne_zero ‹_› /-- If two simple functions are equal a.e., then their `lintegral`s are equal. -/ theorem lintegral_congr {f g : α →ₛ ℝ≥0∞} (h : f =ᵐ[μ] g) : f.lintegral μ = g.lintegral μ := lintegral_eq_of_measure_preimage fun y => measure_congr <\| Eventually.set_eq <\| h.mono fun x hx => by simp [hx] theorem lintegral_map' {β} [MeasurableSpace β] {μ' : Measure β} (f : α →ₛ ℝ≥0∞) (g : β →ₛ ℝ≥0∞) (m' : α → β) (eq : ∀ a, f a = g (m' a)) (h : ∀ s, MeasurableSet s → μ' s = μ (m' ⁻¹' s)) : f.lintegral μ = g.lintegral μ' := lintegral_eq_of_measure_preimage fun y => by simp only [preimage, eq] exact (h (g ⁻¹' {y}) (g.measurableSet_preimage _)).symm theorem lintegral_map {β} [MeasurableSpace β] (g : β →ₛ ℝ≥0∞) {f : α → β} (hf : Measurable f) : g.lintegral (Measure.map f μ) = (g.comp f hf).lintegral μ := Eq.symm <\| lintegral_map' _ _ f (fun _ => rfl) fun _s hs => Measure.map_apply hf hs end Measure section FinMeasSupp open Finset Function open scoped Classical in theorem support_eq [MeasurableSpace α] [Zero β] (f : α →ₛ β) : support f = ⋃ y ∈ {y ∈ f.range \| y ≠ 0}, f ⁻¹' {y} := Set.ext fun x => by simp only [mem_support, Set.mem_preimage, mem_filter, mem_range_self, true_and, exists_prop, mem_iUnion, Set.mem_range, mem_singleton_iff, exists_eq_right'] variable {m : MeasurableSpace α} [Zero β] [Zero γ] {μ : Measure α} {f : α →ₛ β} theorem measurableSet_support [MeasurableSpace α] (f : α →ₛ β) : MeasurableSet (support f) := by rw [f.support_eq] exact Finset.measurableSet_biUnion _ fun y _ => measurableSet_fiber _ _ lemma measure_support_lt_top (f : α →ₛ β) (hf : ∀ y, y ≠ 0 → μ (f ⁻¹' {y}) < ∞) : μ (support f) < ∞ := by classical rw [support_eq] refine (measure_biUnion_finset_le _ _).trans_lt (ENNReal.sum_lt_top.mpr fun y hy => ?_) rw [Finset.mem_filter] at hy exact hf y hy.2 /-- A `SimpleFunc` has finite measure support if it is equal to `0` outside of a set of finite measure. -/ protected def FinMeasSupp {_m : MeasurableSpace α} (f : α →ₛ β) (μ : Measure α) : Prop := f =ᶠ[μ.cofinite] 0 theorem finMeasSupp_iff_support : f.FinMeasSupp μ ↔ μ (support f) < ∞ := Iff.rfl theorem finMeasSupp_iff : f.FinMeasSupp μ ↔ ∀ y, y ≠ 0 → μ (f ⁻¹' {y}) < ∞ := by classical constructor · refine fun h y hy => lt_of_le_of_lt (measure_mono ?_) h exact fun x hx (H : f x = 0) => hy <\| H ▸ Eq.symm hx · intro H rw [finMeasSupp_iff_support, support_eq] exact measure_biUnion_lt_top (finite_toSet _) fun y hy ↦ H y (mem_filter.1 hy).2 namespace FinMeasSupp theorem meas_preimage_singleton_ne_zero (h : f.FinMeasSupp μ) {y : β} (hy : y ≠ 0) : μ (f ⁻¹' {y}) < ∞ := finMeasSupp_iff.1 h y hy protected theorem map {g : β → γ} (hf : f.FinMeasSupp μ) (hg : g 0 = 0) : (f.map g).FinMeasSupp μ := flip lt_of_le_of_lt hf (measure_mono <\| support_comp_subset hg f) theorem of_map {g : β → γ} (h : (f.map g).FinMeasSupp μ) (hg : ∀ b, g b = 0 → b = 0) : f.FinMeasSupp μ := flip lt_of_le_of_lt h <\| measure_mono <\| support_subset_comp @(hg) _ theorem map_iff {g : β → γ} (hg : ∀ {b}, g b = 0 ↔ b = 0) : (f.map g).FinMeasSupp μ ↔ f.FinMeasSupp μ := ⟨fun h => h.of_map fun _ => hg.1, fun h => h.map <\| hg.2 rfl⟩ protected theorem pair {g : α →ₛ γ} (hf : f.FinMeasSupp μ) (hg : g.FinMeasSupp μ) : (pair f g).FinMeasSupp μ := calc μ (support <\| pair f g) = μ (support f ∪ support g) := congr_arg μ <\| support_prod_mk f g _ ≤ μ (support f) + μ (support g) := measure_union_le _ _ _ < _ := add_lt_top.2 ⟨hf, hg⟩ protected theorem map₂ [Zero δ] (hf : f.FinMeasSupp μ) {g : α →ₛ γ} (hg : g.FinMeasSupp μ) {op : β → γ → δ} (H : op 0 0 = 0) : ((pair f g).map (Function.uncurry op)).FinMeasSupp μ := (hf.pair hg).map H protected theorem add {β} [AddZeroClass β] {f g : α →ₛ β} (hf : f.FinMeasSupp μ) (hg : g.FinMeasSupp μ) : (f + g).FinMeasSupp μ := by rw [add_eq_map₂] exact hf.map₂ hg (zero_add 0) protected theorem mul {β} [MulZeroClass β] {f g : α →ₛ β} (hf : f.FinMeasSupp μ) (hg : g.FinMeasSupp μ) : (f * g).FinMeasSupp μ := by rw [mul_eq_map₂] exact hf.map₂ hg (zero_mul 0) theorem lintegral_lt_top {f : α →ₛ ℝ≥0∞} (hm : f.FinMeasSupp μ) (hf : ∀ᵐ a ∂μ, f a ≠ ∞) : f.lintegral μ < ∞ := by refine sum_lt_top.2 fun a ha => ?_ rcases eq_or_ne a ∞ with (rfl \| ha) · simp only [ae_iff, Ne, Classical.not_not] at hf simp [Set.preimage, hf] · by_cases ha0 : a = 0 · subst a simp · exact mul_lt_top ha.lt_top (finMeasSupp_iff.1 hm _ ha0) theorem of_lintegral_ne_top {f : α →ₛ ℝ≥0∞} (h : f.lintegral μ ≠ ∞) : f.FinMeasSupp μ := by refine finMeasSupp_iff.2 fun b hb => ?_ rw [f.lintegral_eq_of_subset' (Finset.subset_insert b _)] at h refine ENNReal.lt_top_of_mul_ne_top_right ?_ hb exact (lt_top_of_sum_ne_top h (Finset.mem_insert_self _ _)).ne theorem iff_lintegral_lt_top {f : α →ₛ ℝ≥0∞} (hf : ∀ᵐ a ∂μ, f a ≠ ∞) : f.FinMeasSupp μ ↔ f.lintegral μ < ∞ := ⟨fun h => h.lintegral_lt_top hf, fun h => of_lintegral_ne_top h.ne⟩ end FinMeasSupp lemma measure_support_lt_top_of_lintegral_ne_top {f : α →ₛ ℝ≥0∞} (hf : f.lintegral μ ≠ ∞) : μ (support f) < ∞ := by refine measure_support_lt_top f ?_ rw [← finMeasSupp_iff] exact FinMeasSupp.of_lintegral_ne_top hf end FinMeasSupp /-- To prove something for an arbitrary simple function, it suffices to show that the property holds for (multiples of) characteristic functions and is closed under addition (of functions with disjoint support). It is possible to make the hypotheses in `h_add` a bit stronger, and such conditions can be added once we need them (for example it is only necessary to consider the case where `g` is a multiple of a characteristic function, and that this multiple doesn't appear in the image of `f`). To use in an induction proof, the syntax is `induction f using SimpleFunc.induction with`. -/ @[elab_as_elim] protected theorem induction {α γ} [MeasurableSpace α] [AddZeroClass γ] {motive : SimpleFunc α γ → Prop} (const : ∀ (c) {s} (hs : MeasurableSet s), motive (SimpleFunc.piecewise s hs (SimpleFunc.const _ c) (SimpleFunc.const _ 0))) (add : ∀ ⦃f g : SimpleFunc α γ⦄, Disjoint (support f) (support g) → motive f → motive g → motive (f + g)) (f : SimpleFunc α γ) : motive f := by classical generalize h : f.range \ {0} = s rw [← Finset.coe_inj, Finset.coe_sdiff, Finset.coe_singleton, SimpleFunc.coe_range] at h induction s using Finset.induction generalizing f with \| empty => rw [Finset.coe_empty, diff_eq_empty, range_subset_singleton] at h convert const 0 MeasurableSet.univ ext x simp [h] \| insert x s hxs ih => have mx := f.measurableSet_preimage {x} let g := SimpleFunc.piecewise (f ⁻¹' {x}) mx 0 f have Pg : motive g := by apply ih	simp only [g, SimpleFunc.coe_piecewise, range_piecewise] rw [image_compl_preimage, union_diff_distrib, diff_diff_comm, h, Finset.coe_insert, insert_diff_self_of_not_mem, diff_eq_empty.mpr, Set.empty_union]	Mathlib/MeasureTheory/Function/SimpleFunc.lean	1,171	1,173
/- Copyright (c) 2020 Simon Hudon. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon, Ira Fesefeldt -/ import Mathlib.Control.Monad.Basic import Mathlib.Dynamics.FixedPoints.Basic import Mathlib.Order.CompleteLattice.Basic import Mathlib.Order.Iterate import Mathlib.Order.Part import Mathlib.Order.Preorder.Chain import Mathlib.Order.ScottContinuity /-! # Omega Complete Partial Orders An omega-complete partial order is a partial order with a supremum operation on increasing sequences indexed by natural numbers (which we call `ωSup`). In this sense, it is strictly weaker than join complete semi-lattices as only ω-sized totally ordered sets have a supremum. The concept of an omega-complete partial order (ωCPO) is useful for the formalization of the semantics of programming languages. Its notion of supremum helps define the meaning of recursive procedures. ## Main definitions * class `OmegaCompletePartialOrder` * `ite`, `map`, `bind`, `seq` as continuous morphisms ## Instances of `OmegaCompletePartialOrder` * `Part` * every `CompleteLattice` * pi-types * product types * `OrderHom` * `ContinuousHom` (with notation →𝒄) * an instance of `OmegaCompletePartialOrder (α →𝒄 β)` * `ContinuousHom.ofFun` * `ContinuousHom.ofMono` * continuous functions: * `id` * `ite` * `const` * `Part.bind` * `Part.map` * `Part.seq` ## References * [Chain-complete posets and directed sets with applications][markowsky1976] * [Recursive definitions of partial functions and their computations][cadiou1972] * [Semantics of Programming Languages: Structures and Techniques][gunter1992] -/ assert_not_exists OrderedCommMonoid universe u v variable {ι : Sort} {α β γ δ : Type} namespace OmegaCompletePartialOrder /-- A chain is a monotone sequence. See the definition on page 114 of [gunter1992]. -/ def Chain (α : Type u) [Preorder α] := ℕ →o α namespace Chain variable [Preorder α] [Preorder β] [Preorder γ] instance : FunLike (Chain α) ℕ α := inferInstanceAs <\| FunLike (ℕ →o α) ℕ α instance : OrderHomClass (Chain α) ℕ α := inferInstanceAs <\| OrderHomClass (ℕ →o α) ℕ α instance [Inhabited α] : Inhabited (Chain α) := ⟨⟨default, fun _ _ _ => le_rfl⟩⟩ instance : Membership α (Chain α) := ⟨fun (c : ℕ →o α) a => ∃ i, a = c i⟩ variable (c c' : Chain α) variable (f : α →o β) variable (g : β →o γ) instance : LE (Chain α) where le x y := ∀ i, ∃ j, x i ≤ y j lemma isChain_range : IsChain (· ≤ ·) (Set.range c) := Monotone.isChain_range (OrderHomClass.mono c) lemma directed : Directed (· ≤ ·) c := directedOn_range.2 c.isChain_range.directedOn /-- `map` function for `Chain` -/ -- Porting note: `simps` doesn't work with type synonyms -- @[simps! -fullyApplied] def map : Chain β := f.comp c @[simp] theorem map_coe : ⇑(map c f) = f ∘ c := rfl variable {f} theorem mem_map (x : α) : x ∈ c → f x ∈ Chain.map c f := fun ⟨i, h⟩ => ⟨i, h.symm ▸ rfl⟩ theorem exists_of_mem_map {b : β} : b ∈ c.map f → ∃ a, a ∈ c ∧ f a = b := fun ⟨i, h⟩ => ⟨c i, ⟨i, rfl⟩, h.symm⟩ @[simp] theorem mem_map_iff {b : β} : b ∈ c.map f ↔ ∃ a, a ∈ c ∧ f a = b := ⟨exists_of_mem_map _, fun h => by rcases h with ⟨w, h, h'⟩ subst b apply mem_map c _ h⟩ @[simp] theorem map_id : c.map OrderHom.id = c := OrderHom.comp_id _ theorem map_comp : (c.map f).map g = c.map (g.comp f) := rfl @[mono] theorem map_le_map {g : α →o β} (h : f ≤ g) : c.map f ≤ c.map g := fun i => by simp only [map_coe, Function.comp_apply]; exists i; apply h /-- `OmegaCompletePartialOrder.Chain.zip` pairs up the elements of two chains that have the same index. -/ -- Porting note: `simps` doesn't work with type synonyms -- @[simps!] def zip (c₀ : Chain α) (c₁ : Chain β) : Chain (α × β) := OrderHom.prod c₀ c₁ @[simp] theorem zip_coe (c₀ : Chain α) (c₁ : Chain β) (n : ℕ) : c₀.zip c₁ n = (c₀ n, c₁ n) := rfl /-- An example of a `Chain` constructed from an ordered pair. -/ def pair (a b : α) (hab : a ≤ b) : Chain α where toFun \| 0 => a \| _ => b monotone' _ _ _ := by aesop @[simp] lemma pair_zero (a b : α) (hab) : pair a b hab 0 = a := rfl @[simp] lemma pair_succ (a b : α) (hab) (n : ℕ) : pair a b hab (n + 1) = b := rfl @[simp] lemma range_pair (a b : α) (hab) : Set.range (pair a b hab) = {a, b} := by ext; exact Nat.or_exists_add_one.symm.trans (by aesop) @[simp] lemma pair_zip_pair (a₁ a₂ : α) (b₁ b₂ : β) (ha hb) : (pair a₁ a₂ ha).zip (pair b₁ b₂ hb) = pair (a₁, b₁) (a₂, b₂) (Prod.le_def.2 ⟨ha, hb⟩) := by unfold Chain; ext n : 2; cases n <;> rfl end Chain end OmegaCompletePartialOrder open OmegaCompletePartialOrder /-- An omega-complete partial order is a partial order with a supremum operation on increasing sequences indexed by natural numbers (which we call `ωSup`). In this sense, it is strictly weaker than join complete semi-lattices as only ω-sized totally ordered sets have a supremum. See the definition on page 114 of [gunter1992]. -/ class OmegaCompletePartialOrder (α : Type) extends PartialOrder α where /-- The supremum of an increasing sequence -/ ωSup : Chain α → α /-- `ωSup` is an upper bound of the increasing sequence -/ le_ωSup : ∀ c : Chain α, ∀ i, c i ≤ ωSup c /-- `ωSup` is a lower bound of the set of upper bounds of the increasing sequence -/ ωSup_le : ∀ (c : Chain α) (x), (∀ i, c i ≤ x) → ωSup c ≤ x namespace OmegaCompletePartialOrder variable [OmegaCompletePartialOrder α] /-- Transfer an `OmegaCompletePartialOrder` on `β` to an `OmegaCompletePartialOrder` on `α` using a strictly monotone function `f : β →o α`, a definition of ωSup and a proof that `f` is continuous with regard to the provided `ωSup` and the ωCPO on `α`. -/ protected abbrev lift [PartialOrder β] (f : β →o α) (ωSup₀ : Chain β → β) (h : ∀ x y, f x ≤ f y → x ≤ y) (h' : ∀ c, f (ωSup₀ c) = ωSup (c.map f)) : OmegaCompletePartialOrder β where ωSup := ωSup₀ ωSup_le c x hx := h _ _ (by rw [h']; apply ωSup_le; intro i; apply f.monotone (hx i)) le_ωSup c i := h _ _ (by rw [h']; apply le_ωSup (c.map f)) theorem le_ωSup_of_le {c : Chain α} {x : α} (i : ℕ) (h : x ≤ c i) : x ≤ ωSup c := le_trans h (le_ωSup c _) theorem ωSup_total {c : Chain α} {x : α} (h : ∀ i, c i ≤ x ∨ x ≤ c i) : ωSup c ≤ x ∨ x ≤ ωSup c := by_cases (fun (this : ∀ i, c i ≤ x) => Or.inl (ωSup_le _ _ this)) (fun (this : ¬∀ i, c i ≤ x) => have : ∃ i, ¬c i ≤ x := by simp only [not_forall] at this ⊢; assumption let ⟨i, hx⟩ := this have : x ≤ c i := (h i).resolve_left hx Or.inr <\| le_ωSup_of_le _ this) @[mono] theorem ωSup_le_ωSup_of_le {c₀ c₁ : Chain α} (h : c₀ ≤ c₁) : ωSup c₀ ≤ ωSup c₁ := (ωSup_le _ _) fun i => by obtain ⟨_, h⟩ := h i exact le_trans h (le_ωSup _ _) @[simp] theorem ωSup_le_iff {c : Chain α} {x : α} : ωSup c ≤ x ↔ ∀ i, c i ≤ x := by constructor <;> intros · trans ωSup c · exact le_ωSup _ _ · assumption exact ωSup_le _ _ ‹_› lemma isLUB_range_ωSup (c : Chain α) : IsLUB (Set.range c) (ωSup c) := by constructor · simp only [upperBounds, Set.mem_range, forall_exists_index, forall_apply_eq_imp_iff, Set.mem_setOf_eq] exact fun a ↦ le_ωSup c a · simp only [lowerBounds, upperBounds, Set.mem_range, forall_exists_index, forall_apply_eq_imp_iff, Set.mem_setOf_eq] exact fun ⦃a⦄ a_1 ↦ ωSup_le c a a_1 lemma ωSup_eq_of_isLUB {c : Chain α} {a : α} (h : IsLUB (Set.range c) a) : a = ωSup c := by rw [le_antisymm_iff] simp only [IsLUB, IsLeast, upperBounds, lowerBounds, Set.mem_range, forall_exists_index, forall_apply_eq_imp_iff, Set.mem_setOf_eq] at h constructor · apply h.2 exact fun a ↦ le_ωSup c a · rw [ωSup_le_iff] apply h.1 /-- A subset `p : α → Prop` of the type closed under `ωSup` induces an `OmegaCompletePartialOrder` on the subtype `{a : α // p a}`. -/ def subtype {α : Type} [OmegaCompletePartialOrder α] (p : α → Prop) (hp : ∀ c : Chain α, (∀ i ∈ c, p i) → p (ωSup c)) : OmegaCompletePartialOrder (Subtype p) := OmegaCompletePartialOrder.lift (OrderHom.Subtype.val p) (fun c => ⟨ωSup _, hp (c.map (OrderHom.Subtype.val p)) fun _ ⟨n, q⟩ => q.symm ▸ (c n).2⟩) (fun _ _ h => h) (fun _ => rfl) section Continuity	open Chain variable [OmegaCompletePartialOrder β] variable [OmegaCompletePartialOrder γ] variable {f : α → β} {g : β → γ} /-- A function `f` between `ω`-complete partial orders is `ωScottContinuous` if it is	Mathlib/Order/OmegaCompletePartialOrder.lean	238	245
/- Copyright (c) 2021 Chris Birkbeck. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Birkbeck -/ import Mathlib.Algebra.Group.Subgroup.Pointwise import Mathlib.GroupTheory.Coset.Basic /-! # Double cosets This file defines double cosets for two subgroups `H K` of a group `G` and the quotient of `G` by the double coset relation, i.e. `H \ G / K`. We also prove that `G` can be written as a disjoint union of the double cosets and that if one of `H` or `K` is the trivial group (i.e. `⊥` ) then this is the usual left or right quotient of a group by a subgroup. ## Main definitions * `rel`: The double coset relation defined by two subgroups `H K` of `G`. * `Doset.quotient`: The quotient of `G` by the double coset relation, i.e, `H \ G / K`. -/ assert_not_exists MonoidWithZero variable {G : Type} [Group G] {α : Type} [Mul α] open MulOpposite open scoped Pointwise namespace Doset /-- The double coset as an element of `Set α` corresponding to `s a t` -/ def doset (a : α) (s t : Set α) : Set α := s * {a} * t lemma doset_eq_image2 (a : α) (s t : Set α) : doset a s t = Set.image2 (· * a * ·) s t := by simp_rw [doset, Set.mul_singleton, ← Set.image2_mul, Set.image2_image_left] theorem mem_doset {s t : Set α} {a b : α} : b ∈ doset a s t ↔ ∃ x ∈ s, ∃ y ∈ t, b = x * a * y := by simp only [doset_eq_image2, Set.mem_image2, eq_comm] theorem mem_doset_self (H K : Subgroup G) (a : G) : a ∈ doset a H K := mem_doset.mpr ⟨1, H.one_mem, 1, K.one_mem, (one_mul a).symm.trans (mul_one (1 * a)).symm⟩	theorem doset_eq_of_mem {H K : Subgroup G} {a b : G} (hb : b ∈ doset a H K) :	Mathlib/GroupTheory/DoubleCoset.lean	44	45
/- Copyright (c) 2018 Louis Carlin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Louis Carlin, Mario Carneiro -/ import Mathlib.Algebra.EuclideanDomain.Defs import Mathlib.Algebra.Ring.Divisibility.Basic import Mathlib.Algebra.Ring.Regular import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Algebra.Ring.Basic /-! # Lemmas about Euclidean domains ## Main statements * `gcd_eq_gcd_ab`: states Bézout's lemma for Euclidean domains. -/ universe u namespace EuclideanDomain variable {R : Type u} variable [EuclideanDomain R] /-- The well founded relation in a Euclidean Domain satisfying `a % b ≺ b` for `b ≠ 0` -/ local infixl:50 " ≺ " => EuclideanDomain.r -- See note [lower instance priority] instance (priority := 100) toMulDivCancelClass : MulDivCancelClass R where mul_div_cancel a b hb := by refine (eq_of_sub_eq_zero ?_).symm by_contra h have := mul_right_not_lt b h rw [sub_mul, mul_comm (_ / _), sub_eq_iff_eq_add'.2 (div_add_mod (a * b) b).symm] at this exact this (mod_lt _ hb) theorem mod_eq_sub_mul_div {R : Type} [EuclideanDomain R] (a b : R) : a % b = a - b (a / b) := calc a % b = b * (a / b) + a % b - b * (a / b) := (add_sub_cancel_left _ _).symm _ = a - b * (a / b) := by rw [div_add_mod] theorem val_dvd_le : ∀ a b : R, b ∣ a → a ≠ 0 → ¬a ≺ b \| _, b, ⟨d, rfl⟩, ha => mul_left_not_lt b (mt (by rintro rfl; exact mul_zero _) ha) @[simp] theorem mod_eq_zero {a b : R} : a % b = 0 ↔ b ∣ a := ⟨fun h => by rw [← div_add_mod a b, h, add_zero] exact dvd_mul_right _ _, fun ⟨c, e⟩ => by rw [e, ← add_left_cancel_iff, div_add_mod, add_zero] haveI := Classical.dec by_cases b0 : b = 0 · simp only [b0, zero_mul] · rw [mul_div_cancel_left₀ _ b0]⟩ @[simp] theorem mod_self (a : R) : a % a = 0 := mod_eq_zero.2 dvd_rfl theorem dvd_mod_iff {a b c : R} (h : c ∣ b) : c ∣ a % b ↔ c ∣ a := by rw [← dvd_add_right (h.mul_right _), div_add_mod] @[simp] theorem mod_one (a : R) : a % 1 = 0 := mod_eq_zero.2 (one_dvd _) @[simp] theorem zero_mod (b : R) : 0 % b = 0 := mod_eq_zero.2 (dvd_zero _) @[simp] theorem zero_div {a : R} : 0 / a = 0 := by_cases (fun a0 : a = 0 => a0.symm ▸ div_zero 0) fun a0 => by simpa only [zero_mul] using mul_div_cancel_right₀ 0 a0 @[simp] theorem div_self {a : R} (a0 : a ≠ 0) : a / a = 1 := by simpa only [one_mul] using mul_div_cancel_right₀ 1 a0 theorem eq_div_of_mul_eq_left {a b c : R} (hb : b ≠ 0) (h : a * b = c) : a = c / b := by rw [← h, mul_div_cancel_right₀ _ hb] theorem eq_div_of_mul_eq_right {a b c : R} (ha : a ≠ 0) (h : a * b = c) : b = c / a := by rw [← h, mul_div_cancel_left₀ _ ha] theorem mul_div_assoc (x : R) {y z : R} (h : z ∣ y) : x * y / z = x * (y / z) := by by_cases hz : z = 0 · subst hz rw [div_zero, div_zero, mul_zero] rcases h with ⟨p, rfl⟩ rw [mul_div_cancel_left₀ _ hz, mul_left_comm, mul_div_cancel_left₀ _ hz] protected theorem mul_div_cancel' {a b : R} (hb : b ≠ 0) (hab : b ∣ a) : b * (a / b) = a := by rw [← mul_div_assoc _ hab, mul_div_cancel_left₀ _ hb] -- This generalizes `Int.div_one`, see note [simp-normal form] @[simp] theorem div_one (p : R) : p / 1 = p := (EuclideanDomain.eq_div_of_mul_eq_left (one_ne_zero' R) (mul_one p)).symm theorem div_dvd_of_dvd {p q : R} (hpq : q ∣ p) : p / q ∣ p := by by_cases hq : q = 0 · rw [hq, zero_dvd_iff] at hpq rw [hpq] exact dvd_zero _ use q rw [mul_comm, ← EuclideanDomain.mul_div_assoc _ hpq, mul_comm, mul_div_cancel_right₀ _ hq] theorem dvd_div_of_mul_dvd {a b c : R} (h : a * b ∣ c) : b ∣ c / a := by rcases eq_or_ne a 0 with (rfl \| ha) · simp only [div_zero, dvd_zero] rcases h with ⟨d, rfl⟩ refine ⟨d, ?_⟩ rw [mul_assoc, mul_div_cancel_left₀ _ ha] section GCD variable [DecidableEq R] @[simp] theorem gcd_zero_right (a : R) : gcd a 0 = a := by rw [gcd] split_ifs with h <;> simp only [h, zero_mod, gcd_zero_left] theorem gcd_val (a b : R) : gcd a b = gcd (b % a) a := by rw [gcd] split_ifs with h <;> [simp only [h, mod_zero, gcd_zero_right]; rfl] theorem gcd_dvd (a b : R) : gcd a b ∣ a ∧ gcd a b ∣ b := GCD.induction a b (fun b => by rw [gcd_zero_left] exact ⟨dvd_zero _, dvd_rfl⟩) fun a b _ ⟨IH₁, IH₂⟩ => by rw [gcd_val] exact ⟨IH₂, (dvd_mod_iff IH₂).1 IH₁⟩ theorem gcd_dvd_left (a b : R) : gcd a b ∣ a := (gcd_dvd a b).left theorem gcd_dvd_right (a b : R) : gcd a b ∣ b := (gcd_dvd a b).right protected theorem gcd_eq_zero_iff {a b : R} : gcd a b = 0 ↔ a = 0 ∧ b = 0 := ⟨fun h => by simpa [h] using gcd_dvd a b, by rintro ⟨rfl, rfl⟩ exact gcd_zero_right _⟩ theorem dvd_gcd {a b c : R} : c ∣ a → c ∣ b → c ∣ gcd a b := GCD.induction a b (fun _ _ H => by simpa only [gcd_zero_left] using H) fun a b _ IH ca cb => by rw [gcd_val] exact IH ((dvd_mod_iff ca).2 cb) ca theorem gcd_eq_left {a b : R} : gcd a b = a ↔ a ∣ b := ⟨fun h => by rw [← h] apply gcd_dvd_right, fun h => by rw [gcd_val, mod_eq_zero.2 h, gcd_zero_left]⟩ @[simp] theorem gcd_one_left (a : R) : gcd 1 a = 1 := gcd_eq_left.2 (one_dvd _) @[simp] theorem gcd_self (a : R) : gcd a a = a := gcd_eq_left.2 dvd_rfl @[simp] theorem xgcdAux_fst (x y : R) : ∀ s t s' t', (xgcdAux x s t y s' t').1 = gcd x y := GCD.induction x y (by intros rw [xgcd_zero_left, gcd_zero_left]) fun x y h IH s t s' t' => by simp only [xgcdAux_rec h, if_neg h, IH] rw [← gcd_val] theorem xgcdAux_val (x y : R) : xgcdAux x 1 0 y 0 1 = (gcd x y, xgcd x y) := by rw [xgcd, ← xgcdAux_fst x y 1 0 0 1] private def P (a b : R) : R × R × R → Prop \| (r, s, t) => (r : R) = a * s + b * t theorem xgcdAux_P (a b : R) {r r' : R} {s t s' t'} (p : P a b (r, s, t)) (p' : P a b (r', s', t')) : P a b (xgcdAux r s t r' s' t') := by induction r, r' using GCD.induction generalizing s t s' t' with \| H0 n => simpa only [xgcd_zero_left] \| H1 _ _ h IH => rw [xgcdAux_rec h]	refine IH ?_ p unfold P at p p' ⊢ dsimp rw [mul_sub, mul_sub, add_sub, sub_add_eq_add_sub, ← p', sub_sub, mul_comm _ s, ← mul_assoc, mul_comm _ t, ← mul_assoc, ← add_mul, ← p, mod_eq_sub_mul_div] /-- An explicit version of Bézout's lemma for Euclidean domains. -/ theorem gcd_eq_gcd_ab (a b : R) : (gcd a b : R) = a * gcdA a b + b * gcdB a b := by	Mathlib/Algebra/EuclideanDomain/Basic.lean	193	200
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Johannes Hölzl, Kim Morrison, Jens Wagemaker -/ import Mathlib.Algebra.MonoidAlgebra.Degree import Mathlib.Algebra.Order.Ring.WithTop import Mathlib.Algebra.Polynomial.Basic import Mathlib.Data.Nat.Cast.WithTop import Mathlib.Data.Nat.SuccPred import Mathlib.Order.SuccPred.WithBot /-! # Degree of univariate polynomials ## Main definitions * `Polynomial.degree`: the degree of a polynomial, where `0` has degree `⊥` * `Polynomial.natDegree`: the degree of a polynomial, where `0` has degree `0` * `Polynomial.leadingCoeff`: the leading coefficient of a polynomial * `Polynomial.Monic`: a polynomial is monic if its leading coefficient is 0 * `Polynomial.nextCoeff`: the next coefficient after the leading coefficient ## Main results * `Polynomial.degree_eq_natDegree`: the degree and natDegree coincide for nonzero polynomials -/ noncomputable section open Finsupp Finset open Polynomial namespace Polynomial universe u v variable {R : Type u} {S : Type v} {a b c d : R} {n m : ℕ} section Semiring variable [Semiring R] {p q r : R[X]} /-- `degree p` is the degree of the polynomial `p`, i.e. the largest `X`-exponent in `p`. `degree p = some n` when `p ≠ 0` and `n` is the highest power of `X` that appears in `p`, otherwise `degree 0 = ⊥`. -/ def degree (p : R[X]) : WithBot ℕ := p.support.max /-- `natDegree p` forces `degree p` to ℕ, by defining `natDegree 0 = 0`. -/ def natDegree (p : R[X]) : ℕ := (degree p).unbotD 0 /-- `leadingCoeff p` gives the coefficient of the highest power of `X` in `p`. -/ def leadingCoeff (p : R[X]) : R := coeff p (natDegree p) /-- a polynomial is `Monic` if its leading coefficient is 1 -/ def Monic (p : R[X]) := leadingCoeff p = (1 : R) theorem Monic.def : Monic p ↔ leadingCoeff p = 1 := Iff.rfl instance Monic.decidable [DecidableEq R] : Decidable (Monic p) := by unfold Monic; infer_instance @[simp] theorem Monic.leadingCoeff {p : R[X]} (hp : p.Monic) : leadingCoeff p = 1 := hp theorem Monic.coeff_natDegree {p : R[X]} (hp : p.Monic) : p.coeff p.natDegree = 1 := hp @[simp] theorem degree_zero : degree (0 : R[X]) = ⊥ := rfl @[simp] theorem natDegree_zero : natDegree (0 : R[X]) = 0 := rfl @[simp] theorem coeff_natDegree : coeff p (natDegree p) = leadingCoeff p := rfl @[simp] theorem degree_eq_bot : degree p = ⊥ ↔ p = 0 := ⟨fun h => support_eq_empty.1 (Finset.max_eq_bot.1 h), fun h => h.symm ▸ rfl⟩ theorem degree_ne_bot : degree p ≠ ⊥ ↔ p ≠ 0 := degree_eq_bot.not theorem degree_eq_natDegree (hp : p ≠ 0) : degree p = (natDegree p : WithBot ℕ) := by let ⟨n, hn⟩ := not_forall.1 (mt Option.eq_none_iff_forall_not_mem.2 (mt degree_eq_bot.1 hp)) have hn : degree p = some n := Classical.not_not.1 hn rw [natDegree, hn]; rfl theorem degree_eq_iff_natDegree_eq {p : R[X]} {n : ℕ} (hp : p ≠ 0) : p.degree = n ↔ p.natDegree = n := by rw [degree_eq_natDegree hp]; exact WithBot.coe_eq_coe theorem degree_eq_iff_natDegree_eq_of_pos {p : R[X]} {n : ℕ} (hn : 0 < n) : p.degree = n ↔ p.natDegree = n := by obtain rfl\|h := eq_or_ne p 0 · simp [hn.ne] · exact degree_eq_iff_natDegree_eq h theorem natDegree_eq_of_degree_eq_some {p : R[X]} {n : ℕ} (h : degree p = n) : natDegree p = n := by rw [natDegree, h, Nat.cast_withBot, WithBot.unbotD_coe] theorem degree_ne_of_natDegree_ne {n : ℕ} : p.natDegree ≠ n → degree p ≠ n := mt natDegree_eq_of_degree_eq_some @[simp] theorem degree_le_natDegree : degree p ≤ natDegree p := WithBot.giUnbotDBot.gc.le_u_l _ theorem natDegree_eq_of_degree_eq [Semiring S] {q : S[X]} (h : degree p = degree q) : natDegree p = natDegree q := by unfold natDegree; rw [h] theorem le_degree_of_ne_zero (h : coeff p n ≠ 0) : (n : WithBot ℕ) ≤ degree p := by rw [Nat.cast_withBot] exact Finset.le_sup (mem_support_iff.2 h) theorem degree_mono [Semiring S] {f : R[X]} {g : S[X]} (h : f.support ⊆ g.support) : f.degree ≤ g.degree := Finset.sup_mono h theorem degree_le_degree (h : coeff q (natDegree p) ≠ 0) : degree p ≤ degree q := by by_cases hp : p = 0 · rw [hp, degree_zero] exact bot_le · rw [degree_eq_natDegree hp] exact le_degree_of_ne_zero h theorem natDegree_le_iff_degree_le {n : ℕ} : natDegree p ≤ n ↔ degree p ≤ n := WithBot.unbotD_le_iff (fun _ ↦ bot_le) theorem natDegree_lt_iff_degree_lt (hp : p ≠ 0) : p.natDegree < n ↔ p.degree < ↑n := WithBot.unbotD_lt_iff (absurd · (degree_eq_bot.not.mpr hp)) alias ⟨degree_le_of_natDegree_le, natDegree_le_of_degree_le⟩ := natDegree_le_iff_degree_le theorem natDegree_le_natDegree [Semiring S] {q : S[X]} (hpq : p.degree ≤ q.degree) : p.natDegree ≤ q.natDegree := WithBot.giUnbotDBot.gc.monotone_l hpq @[simp] theorem degree_C (ha : a ≠ 0) : degree (C a) = (0 : WithBot ℕ) := by rw [degree, ← monomial_zero_left, support_monomial 0 ha, max_eq_sup_coe, sup_singleton, WithBot.coe_zero] theorem degree_C_le : degree (C a) ≤ 0 := by by_cases h : a = 0 · rw [h, C_0] exact bot_le · rw [degree_C h] theorem degree_C_lt : degree (C a) < 1 := degree_C_le.trans_lt <\| WithBot.coe_lt_coe.mpr zero_lt_one theorem degree_one_le : degree (1 : R[X]) ≤ (0 : WithBot ℕ) := by rw [← C_1]; exact degree_C_le @[simp] theorem natDegree_C (a : R) : natDegree (C a) = 0 := by by_cases ha : a = 0 · have : C a = 0 := by rw [ha, C_0] rw [natDegree, degree_eq_bot.2 this, WithBot.unbotD_bot] · rw [natDegree, degree_C ha, WithBot.unbotD_zero] @[simp] theorem natDegree_one : natDegree (1 : R[X]) = 0 := natDegree_C 1 @[simp] theorem natDegree_natCast (n : ℕ) : natDegree (n : R[X]) = 0 := by simp only [← C_eq_natCast, natDegree_C] @[simp] theorem natDegree_ofNat (n : ℕ) [Nat.AtLeastTwo n] : natDegree (ofNat(n) : R[X]) = 0 := natDegree_natCast _ theorem degree_natCast_le (n : ℕ) : degree (n : R[X]) ≤ 0 := degree_le_of_natDegree_le (by simp) @[simp] theorem degree_monomial (n : ℕ) (ha : a ≠ 0) : degree (monomial n a) = n := by rw [degree, support_monomial n ha, max_singleton, Nat.cast_withBot] @[simp] theorem degree_C_mul_X_pow (n : ℕ) (ha : a ≠ 0) : degree (C a * X ^ n) = n := by rw [C_mul_X_pow_eq_monomial, degree_monomial n ha] theorem degree_C_mul_X (ha : a ≠ 0) : degree (C a * X) = 1 := by simpa only [pow_one] using degree_C_mul_X_pow 1 ha theorem degree_monomial_le (n : ℕ) (a : R) : degree (monomial n a) ≤ n := letI := Classical.decEq R if h : a = 0 then by rw [h, (monomial n).map_zero, degree_zero]; exact bot_le else le_of_eq (degree_monomial n h) theorem degree_C_mul_X_pow_le (n : ℕ) (a : R) : degree (C a * X ^ n) ≤ n := by rw [C_mul_X_pow_eq_monomial] apply degree_monomial_le theorem degree_C_mul_X_le (a : R) : degree (C a * X) ≤ 1 := by simpa only [pow_one] using degree_C_mul_X_pow_le 1 a @[simp] theorem natDegree_C_mul_X_pow (n : ℕ) (a : R) (ha : a ≠ 0) : natDegree (C a * X ^ n) = n := natDegree_eq_of_degree_eq_some (degree_C_mul_X_pow n ha) @[simp]	theorem natDegree_C_mul_X (a : R) (ha : a ≠ 0) : natDegree (C a * X) = 1 := by simpa only [pow_one] using natDegree_C_mul_X_pow 1 a ha @[simp] theorem natDegree_monomial [DecidableEq R] (i : ℕ) (r : R) : natDegree (monomial i r) = if r = 0 then 0 else i := by	Mathlib/Algebra/Polynomial/Degree/Definitions.lean	213	218
/- Copyright (c) 2022 Pim Otte. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kyle Miller, Pim Otte -/ import Mathlib.Algebra.BigOperators.Fin import Mathlib.Algebra.Order.Antidiag.Pi import Mathlib.Data.Nat.Choose.Sum import Mathlib.Data.Nat.Factorial.BigOperators import Mathlib.Data.Nat.Factorial.DoubleFactorial import Mathlib.Data.Fin.VecNotation import Mathlib.Data.Finset.Sym import Mathlib.Data.Finsupp.Multiset /-! # Multinomial This file defines the multinomial coefficient and several small lemma's for manipulating it. ## Main declarations - `Nat.multinomial`: the multinomial coefficient ## Main results - `Finset.sum_pow`: The expansion of `(s.sum x) ^ n` using multinomial coefficients -/ open Finset open scoped Nat namespace Nat variable {α : Type} (s : Finset α) (f : α → ℕ) {a b : α} (n : ℕ) /-- The multinomial coefficient. Gives the number of strings consisting of symbols from `s`, where `c ∈ s` appears with multiplicity `f c`. Defined as `(∑ i ∈ s, f i)! / ∏ i ∈ s, (f i)!`. -/ def multinomial : ℕ := (∑ i ∈ s, f i)! / ∏ i ∈ s, (f i)! theorem multinomial_pos : 0 < multinomial s f := Nat.div_pos (le_of_dvd (factorial_pos _) (prod_factorial_dvd_factorial_sum s f)) (prod_factorial_pos s f) theorem multinomial_spec : (∏ i ∈ s, (f i)!) multinomial s f = (∑ i ∈ s, f i)! := Nat.mul_div_cancel' (prod_factorial_dvd_factorial_sum s f) @[simp] lemma multinomial_empty : multinomial ∅ f = 1 := by simp [multinomial] variable {s f} lemma multinomial_cons (ha : a ∉ s) (f : α → ℕ) : multinomial (s.cons a ha) f = (f a + ∑ i ∈ s, f i).choose (f a) * multinomial s f := by rw [multinomial, Nat.div_eq_iff_eq_mul_left _ (prod_factorial_dvd_factorial_sum _ _), prod_cons, multinomial, mul_assoc, mul_left_comm _ (f a)!, Nat.div_mul_cancel (prod_factorial_dvd_factorial_sum _ _), ← mul_assoc, Nat.choose_symm_add, Nat.add_choose_mul_factorial_mul_factorial, Finset.sum_cons] positivity lemma multinomial_insert [DecidableEq α] (ha : a ∉ s) (f : α → ℕ) : multinomial (insert a s) f = (f a + ∑ i ∈ s, f i).choose (f a) * multinomial s f := by rw [← cons_eq_insert _ _ ha, multinomial_cons] @[simp] lemma multinomial_singleton (a : α) (f : α → ℕ) : multinomial {a} f = 1 := by rw [← cons_empty, multinomial_cons]; simp @[simp] theorem multinomial_insert_one [DecidableEq α] (h : a ∉ s) (h₁ : f a = 1) : multinomial (insert a s) f = (s.sum f).succ * multinomial s f := by simp only [multinomial] rw [Finset.sum_insert h, Finset.prod_insert h, h₁, add_comm, ← succ_eq_add_one, factorial_succ] simp only [factorial, succ_eq_add_one, zero_add, mul_one, one_mul] rw [Nat.mul_div_assoc _ (prod_factorial_dvd_factorial_sum _ _)] theorem multinomial_congr {f g : α → ℕ} (h : ∀ a ∈ s, f a = g a) : multinomial s f = multinomial s g := by simp only [multinomial]; congr 1 · rw [Finset.sum_congr rfl h] · exact Finset.prod_congr rfl fun a ha => by rw [h a ha] /-! ### Connection to binomial coefficients When `Nat.multinomial` is applied to a `Finset` of two elements `{a, b}`, the result a binomial coefficient. We use `binomial` in the names of lemmas that involves `Nat.multinomial {a, b}`. -/ theorem binomial_eq [DecidableEq α] (h : a ≠ b) : multinomial {a, b} f = (f a + f b)! / ((f a)! * (f b)!) := by simp [multinomial, Finset.sum_pair h, Finset.prod_pair h] theorem binomial_eq_choose [DecidableEq α] (h : a ≠ b) : multinomial {a, b} f = (f a + f b).choose (f a) := by simp [binomial_eq h, choose_eq_factorial_div_factorial (Nat.le_add_right _ _)] theorem binomial_spec [DecidableEq α] (hab : a ≠ b) : (f a)! * (f b)! * multinomial {a, b} f = (f a + f b)! := by	simpa [Finset.sum_pair hab, Finset.prod_pair hab] using multinomial_spec {a, b} f @[simp]	Mathlib/Data/Nat/Choose/Multinomial.lean	102	104
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Johannes Hölzl, Sander Dahmen, Kim Morrison -/ import Mathlib.SetTheory.Cardinal.Cofinality import Mathlib.LinearAlgebra.FreeModule.Finite.Basic import Mathlib.LinearAlgebra.Dimension.StrongRankCondition import Mathlib.LinearAlgebra.Dimension.Constructions /-! # Conditions for rank to be finite Also contains characterization for when rank equals zero or rank equals one. -/ noncomputable section universe u v v' w variable {R : Type u} {M M₁ : Type v} {M' : Type v'} {ι : Type w} variable [Ring R] [AddCommGroup M] [AddCommGroup M'] [AddCommGroup M₁] variable [Module R M] [Module R M'] [Module R M₁] attribute [local instance] nontrivial_of_invariantBasisNumber open Basis Cardinal Function Module Set Submodule /-- If every finite set of linearly independent vectors has cardinality at most `n`, then the same is true for arbitrary sets of linearly independent vectors. -/ theorem linearIndependent_bounded_of_finset_linearIndependent_bounded {n : ℕ} (H : ∀ s : Finset M, (LinearIndependent R fun i : s => (i : M)) → s.card ≤ n) : ∀ s : Set M, LinearIndependent R ((↑) : s → M) → #s ≤ n := by intro s li apply Cardinal.card_le_of intro t rw [← Finset.card_map (Embedding.subtype s)] apply H apply linearIndependent_finset_map_embedding_subtype _ li theorem rank_le {n : ℕ} (H : ∀ s : Finset M, (LinearIndependent R fun i : s => (i : M)) → s.card ≤ n) : Module.rank R M ≤ n := by rw [Module.rank_def] apply ciSup_le' rintro ⟨s, li⟩ exact linearIndependent_bounded_of_finset_linearIndependent_bounded H _ li section RankZero /-- See `rank_zero_iff` for a stronger version with `NoZeroSMulDivisor R M`. -/ lemma rank_eq_zero_iff : Module.rank R M = 0 ↔ ∀ x : M, ∃ a : R, a ≠ 0 ∧ a • x = 0 := by nontriviality R constructor · contrapose! rintro ⟨x, hx⟩ rw [← Cardinal.one_le_iff_ne_zero] have : LinearIndependent R (fun _ : Unit ↦ x) := linearIndependent_iff.mpr (fun l hl ↦ Finsupp.unique_ext <\| not_not.mp fun H ↦ hx _ H ((Finsupp.linearCombination_unique _ _ _).symm.trans hl)) simpa using this.cardinal_lift_le_rank · intro h rw [← le_zero_iff, Module.rank_def] apply ciSup_le' intro ⟨s, hs⟩ rw [nonpos_iff_eq_zero, Cardinal.mk_eq_zero_iff, ← not_nonempty_iff] rintro ⟨i : s⟩ obtain ⟨a, ha, ha'⟩ := h i apply ha simpa using DFunLike.congr_fun (linearIndependent_iff.mp hs (Finsupp.single i a) (by simpa)) i theorem rank_pos_of_free [Module.Free R M] [Nontrivial M] : 0 < Module.rank R M := have := Module.nontrivial R M (pos_of_ne_zero <\| Cardinal.mk_ne_zero _).trans_le (Free.chooseBasis R M).linearIndependent.cardinal_le_rank variable [Nontrivial R] section variable [NoZeroSMulDivisors R M] theorem rank_zero_iff_forall_zero : Module.rank R M = 0 ↔ ∀ x : M, x = 0 := by simp_rw [rank_eq_zero_iff, smul_eq_zero, and_or_left, not_and_self_iff, false_or, exists_and_right, and_iff_right (exists_ne (0 : R))] /-- See `rank_subsingleton` for the reason that `Nontrivial R` is needed. Also see `rank_eq_zero_iff` for the version without `NoZeroSMulDivisor R M`. -/ theorem rank_zero_iff : Module.rank R M = 0 ↔ Subsingleton M := rank_zero_iff_forall_zero.trans (subsingleton_iff_forall_eq 0).symm theorem rank_pos_iff_exists_ne_zero : 0 < Module.rank R M ↔ ∃ x : M, x ≠ 0 := by rw [← not_iff_not] simpa using rank_zero_iff_forall_zero theorem rank_pos_iff_nontrivial : 0 < Module.rank R M ↔ Nontrivial M := rank_pos_iff_exists_ne_zero.trans (nontrivial_iff_exists_ne 0).symm theorem rank_pos [Nontrivial M] : 0 < Module.rank R M := rank_pos_iff_nontrivial.mpr ‹_› end variable (R M) /-- See `rank_subsingleton` that assumes `Subsingleton R` instead. -/ @[nontriviality] theorem rank_subsingleton' [Subsingleton M] : Module.rank R M = 0 := rank_eq_zero_iff.mpr fun _ ↦ ⟨1, one_ne_zero, Subsingleton.elim _ _⟩ @[simp] theorem rank_punit : Module.rank R PUnit = 0 := rank_subsingleton' _ _ @[simp] theorem rank_bot : Module.rank R (⊥ : Submodule R M) = 0 := rank_subsingleton' _ _ variable {R M} theorem exists_mem_ne_zero_of_rank_pos {s : Submodule R M} (h : 0 < Module.rank R s) : ∃ b : M, b ∈ s ∧ b ≠ 0 := exists_mem_ne_zero_of_ne_bot fun eq => by rw [eq, rank_bot] at h; exact lt_irrefl _ h end RankZero section Finite theorem Module.finite_of_rank_eq_nat [Module.Free R M] {n : ℕ} (h : Module.rank R M = n) : Module.Finite R M := by nontriviality R obtain ⟨⟨ι, b⟩⟩ := Module.Free.exists_basis (R := R) (M := M) have := mk_lt_aleph0_iff.mp <\| b.linearIndependent.cardinal_le_rank \|>.trans_eq h \|>.trans_lt <\| nat_lt_aleph0 n exact Module.Finite.of_basis b theorem Module.finite_of_rank_eq_zero [NoZeroSMulDivisors R M] (h : Module.rank R M = 0) : Module.Finite R M := by nontriviality R rw [rank_zero_iff] at h infer_instance theorem Module.finite_of_rank_eq_one [Module.Free R M] (h : Module.rank R M = 1) : Module.Finite R M := Module.finite_of_rank_eq_nat <\| h.trans Nat.cast_one.symm section variable [StrongRankCondition R] /-- If a module has a finite dimension, all bases are indexed by a finite type. -/ theorem Basis.nonempty_fintype_index_of_rank_lt_aleph0 {ι : Type} (b : Basis ι R M) (h : Module.rank R M < ℵ₀) : Nonempty (Fintype ι) := by rwa [← Cardinal.lift_lt, ← b.mk_eq_rank, Cardinal.lift_aleph0, Cardinal.lift_lt_aleph0, Cardinal.lt_aleph0_iff_fintype] at h /-- If a module has a finite dimension, all bases are indexed by a finite type. -/ noncomputable def Basis.fintypeIndexOfRankLtAleph0 {ι : Type} (b : Basis ι R M) (h : Module.rank R M < ℵ₀) : Fintype ι := Classical.choice (b.nonempty_fintype_index_of_rank_lt_aleph0 h) /-- If a module has a finite dimension, all bases are indexed by a finite set. -/ theorem Basis.finite_index_of_rank_lt_aleph0 {ι : Type} {s : Set ι} (b : Basis s R M) (h : Module.rank R M < ℵ₀) : s.Finite := finite_def.2 (b.nonempty_fintype_index_of_rank_lt_aleph0 h) end namespace LinearIndependent variable [StrongRankCondition R] theorem cardinalMk_le_finrank [Module.Finite R M] {ι : Type w} {b : ι → M} (h : LinearIndependent R b) : #ι ≤ finrank R M := by rw [← lift_le.{max v w}] simpa only [← finrank_eq_rank, lift_natCast, lift_le_nat_iff] using h.cardinal_lift_le_rank @[deprecated (since := "2024-11-10")] alias cardinal_mk_le_finrank := cardinalMk_le_finrank theorem fintype_card_le_finrank [Module.Finite R M] {ι : Type} [Fintype ι] {b : ι → M} (h : LinearIndependent R b) : Fintype.card ι ≤ finrank R M := by simpa using h.cardinalMk_le_finrank	theorem finset_card_le_finrank [Module.Finite R M] {b : Finset M} (h : LinearIndependent R (fun x => x : b → M)) : b.card ≤ finrank R M := by rw [← Fintype.card_coe] exact h.fintype_card_le_finrank theorem lt_aleph0_of_finite {ι : Type w}	Mathlib/LinearAlgebra/Dimension/Finite.lean	186	192
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Algebra.ModEq import Mathlib.Algebra.Order.Archimedean.Basic import Mathlib.Algebra.Ring.Periodic import Mathlib.Data.Int.SuccPred import Mathlib.Order.Circular /-! # Reducing to an interval modulo its length This file defines operations that reduce a number (in an `Archimedean` `LinearOrderedAddCommGroup`) to a number in a given interval, modulo the length of that interval. ## Main definitions * `toIcoDiv hp a b` (where `hp : 0 < p`): The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ico a (a + p)`. * `toIcoMod hp a b` (where `hp : 0 < p`): Reduce `b` to the interval `Ico a (a + p)`. * `toIocDiv hp a b` (where `hp : 0 < p`): The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ioc a (a + p)`. * `toIocMod hp a b` (where `hp : 0 < p`): Reduce `b` to the interval `Ioc a (a + p)`. -/ assert_not_exists TwoSidedIdeal noncomputable section section LinearOrderedAddCommGroup variable {α : Type*} [AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α] [hα : Archimedean α] {p : α} (hp : 0 < p) {a b c : α} {n : ℤ} section include hp /-- The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ico a (a + p)`. -/ def toIcoDiv (a b : α) : ℤ := (existsUnique_sub_zsmul_mem_Ico hp b a).choose theorem sub_toIcoDiv_zsmul_mem_Ico (a b : α) : b - toIcoDiv hp a b • p ∈ Set.Ico a (a + p) := (existsUnique_sub_zsmul_mem_Ico hp b a).choose_spec.1 theorem toIcoDiv_eq_of_sub_zsmul_mem_Ico (h : b - n • p ∈ Set.Ico a (a + p)) : toIcoDiv hp a b = n := ((existsUnique_sub_zsmul_mem_Ico hp b a).choose_spec.2 _ h).symm /-- The unique integer such that this multiple of `p`, subtracted from `b`, is in `Ioc a (a + p)`. -/ def toIocDiv (a b : α) : ℤ := (existsUnique_sub_zsmul_mem_Ioc hp b a).choose theorem sub_toIocDiv_zsmul_mem_Ioc (a b : α) : b - toIocDiv hp a b • p ∈ Set.Ioc a (a + p) := (existsUnique_sub_zsmul_mem_Ioc hp b a).choose_spec.1 theorem toIocDiv_eq_of_sub_zsmul_mem_Ioc (h : b - n • p ∈ Set.Ioc a (a + p)) : toIocDiv hp a b = n := ((existsUnique_sub_zsmul_mem_Ioc hp b a).choose_spec.2 _ h).symm /-- Reduce `b` to the interval `Ico a (a + p)`. -/ def toIcoMod (a b : α) : α := b - toIcoDiv hp a b • p /-- Reduce `b` to the interval `Ioc a (a + p)`. -/ def toIocMod (a b : α) : α := b - toIocDiv hp a b • p theorem toIcoMod_mem_Ico (a b : α) : toIcoMod hp a b ∈ Set.Ico a (a + p) := sub_toIcoDiv_zsmul_mem_Ico hp a b theorem toIcoMod_mem_Ico' (b : α) : toIcoMod hp 0 b ∈ Set.Ico 0 p := by convert toIcoMod_mem_Ico hp 0 b exact (zero_add p).symm theorem toIocMod_mem_Ioc (a b : α) : toIocMod hp a b ∈ Set.Ioc a (a + p) := sub_toIocDiv_zsmul_mem_Ioc hp a b theorem left_le_toIcoMod (a b : α) : a ≤ toIcoMod hp a b := (Set.mem_Ico.1 (toIcoMod_mem_Ico hp a b)).1 theorem left_lt_toIocMod (a b : α) : a < toIocMod hp a b := (Set.mem_Ioc.1 (toIocMod_mem_Ioc hp a b)).1 theorem toIcoMod_lt_right (a b : α) : toIcoMod hp a b < a + p := (Set.mem_Ico.1 (toIcoMod_mem_Ico hp a b)).2 theorem toIocMod_le_right (a b : α) : toIocMod hp a b ≤ a + p := (Set.mem_Ioc.1 (toIocMod_mem_Ioc hp a b)).2 @[simp] theorem self_sub_toIcoDiv_zsmul (a b : α) : b - toIcoDiv hp a b • p = toIcoMod hp a b := rfl @[simp] theorem self_sub_toIocDiv_zsmul (a b : α) : b - toIocDiv hp a b • p = toIocMod hp a b := rfl @[simp] theorem toIcoDiv_zsmul_sub_self (a b : α) : toIcoDiv hp a b • p - b = -toIcoMod hp a b := by rw [toIcoMod, neg_sub] @[simp] theorem toIocDiv_zsmul_sub_self (a b : α) : toIocDiv hp a b • p - b = -toIocMod hp a b := by rw [toIocMod, neg_sub] @[simp] theorem toIcoMod_sub_self (a b : α) : toIcoMod hp a b - b = -toIcoDiv hp a b • p := by rw [toIcoMod, sub_sub_cancel_left, neg_smul] @[simp] theorem toIocMod_sub_self (a b : α) : toIocMod hp a b - b = -toIocDiv hp a b • p := by rw [toIocMod, sub_sub_cancel_left, neg_smul] @[simp] theorem self_sub_toIcoMod (a b : α) : b - toIcoMod hp a b = toIcoDiv hp a b • p := by rw [toIcoMod, sub_sub_cancel] @[simp] theorem self_sub_toIocMod (a b : α) : b - toIocMod hp a b = toIocDiv hp a b • p := by rw [toIocMod, sub_sub_cancel] @[simp] theorem toIcoMod_add_toIcoDiv_zsmul (a b : α) : toIcoMod hp a b + toIcoDiv hp a b • p = b := by rw [toIcoMod, sub_add_cancel] @[simp] theorem toIocMod_add_toIocDiv_zsmul (a b : α) : toIocMod hp a b + toIocDiv hp a b • p = b := by rw [toIocMod, sub_add_cancel] @[simp] theorem toIcoDiv_zsmul_sub_toIcoMod (a b : α) : toIcoDiv hp a b • p + toIcoMod hp a b = b := by rw [add_comm, toIcoMod_add_toIcoDiv_zsmul] @[simp] theorem toIocDiv_zsmul_sub_toIocMod (a b : α) : toIocDiv hp a b • p + toIocMod hp a b = b := by rw [add_comm, toIocMod_add_toIocDiv_zsmul] theorem toIcoMod_eq_iff : toIcoMod hp a b = c ↔ c ∈ Set.Ico a (a + p) ∧ ∃ z : ℤ, b = c + z • p := by refine ⟨fun h => ⟨h ▸ toIcoMod_mem_Ico hp a b, toIcoDiv hp a b, h ▸ (toIcoMod_add_toIcoDiv_zsmul _ _ _).symm⟩, ?_⟩ simp_rw [← @sub_eq_iff_eq_add] rintro ⟨hc, n, rfl⟩ rw [← toIcoDiv_eq_of_sub_zsmul_mem_Ico hp hc, toIcoMod] theorem toIocMod_eq_iff : toIocMod hp a b = c ↔ c ∈ Set.Ioc a (a + p) ∧ ∃ z : ℤ, b = c + z • p := by refine ⟨fun h => ⟨h ▸ toIocMod_mem_Ioc hp a b, toIocDiv hp a b, h ▸ (toIocMod_add_toIocDiv_zsmul hp _ _).symm⟩, ?_⟩ simp_rw [← @sub_eq_iff_eq_add] rintro ⟨hc, n, rfl⟩ rw [← toIocDiv_eq_of_sub_zsmul_mem_Ioc hp hc, toIocMod] @[simp] theorem toIcoDiv_apply_left (a : α) : toIcoDiv hp a a = 0 := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simp [hp] @[simp] theorem toIocDiv_apply_left (a : α) : toIocDiv hp a a = -1 := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simp [hp] @[simp] theorem toIcoMod_apply_left (a : α) : toIcoMod hp a a = a := by rw [toIcoMod_eq_iff hp, Set.left_mem_Ico] exact ⟨lt_add_of_pos_right _ hp, 0, by simp⟩ @[simp] theorem toIocMod_apply_left (a : α) : toIocMod hp a a = a + p := by rw [toIocMod_eq_iff hp, Set.right_mem_Ioc] exact ⟨lt_add_of_pos_right _ hp, -1, by simp⟩ theorem toIcoDiv_apply_right (a : α) : toIcoDiv hp a (a + p) = 1 := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simp [hp] theorem toIocDiv_apply_right (a : α) : toIocDiv hp a (a + p) = 0 := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simp [hp] theorem toIcoMod_apply_right (a : α) : toIcoMod hp a (a + p) = a := by rw [toIcoMod_eq_iff hp, Set.left_mem_Ico] exact ⟨lt_add_of_pos_right _ hp, 1, by simp⟩ theorem toIocMod_apply_right (a : α) : toIocMod hp a (a + p) = a + p := by rw [toIocMod_eq_iff hp, Set.right_mem_Ioc] exact ⟨lt_add_of_pos_right _ hp, 0, by simp⟩ @[simp] theorem toIcoDiv_add_zsmul (a b : α) (m : ℤ) : toIcoDiv hp a (b + m • p) = toIcoDiv hp a b + m := toIcoDiv_eq_of_sub_zsmul_mem_Ico hp <\| by simpa only [add_smul, add_sub_add_right_eq_sub] using sub_toIcoDiv_zsmul_mem_Ico hp a b @[simp] theorem toIcoDiv_add_zsmul' (a b : α) (m : ℤ) : toIcoDiv hp (a + m • p) b = toIcoDiv hp a b - m := by refine toIcoDiv_eq_of_sub_zsmul_mem_Ico _ ?_ rw [sub_smul, ← sub_add, add_right_comm] simpa using sub_toIcoDiv_zsmul_mem_Ico hp a b @[simp] theorem toIocDiv_add_zsmul (a b : α) (m : ℤ) : toIocDiv hp a (b + m • p) = toIocDiv hp a b + m := toIocDiv_eq_of_sub_zsmul_mem_Ioc hp <\| by simpa only [add_smul, add_sub_add_right_eq_sub] using sub_toIocDiv_zsmul_mem_Ioc hp a b @[simp] theorem toIocDiv_add_zsmul' (a b : α) (m : ℤ) : toIocDiv hp (a + m • p) b = toIocDiv hp a b - m := by refine toIocDiv_eq_of_sub_zsmul_mem_Ioc _ ?_ rw [sub_smul, ← sub_add, add_right_comm] simpa using sub_toIocDiv_zsmul_mem_Ioc hp a b @[simp] theorem toIcoDiv_zsmul_add (a b : α) (m : ℤ) : toIcoDiv hp a (m • p + b) = m + toIcoDiv hp a b := by rw [add_comm, toIcoDiv_add_zsmul, add_comm] /-! Note we omit `toIcoDiv_zsmul_add'` as `-m + toIcoDiv hp a b` is not very convenient. -/ @[simp] theorem toIocDiv_zsmul_add (a b : α) (m : ℤ) : toIocDiv hp a (m • p + b) = m + toIocDiv hp a b := by rw [add_comm, toIocDiv_add_zsmul, add_comm] /-! Note we omit `toIocDiv_zsmul_add'` as `-m + toIocDiv hp a b` is not very convenient. -/ @[simp] theorem toIcoDiv_sub_zsmul (a b : α) (m : ℤ) : toIcoDiv hp a (b - m • p) = toIcoDiv hp a b - m := by rw [sub_eq_add_neg, ← neg_smul, toIcoDiv_add_zsmul, sub_eq_add_neg] @[simp] theorem toIcoDiv_sub_zsmul' (a b : α) (m : ℤ) : toIcoDiv hp (a - m • p) b = toIcoDiv hp a b + m := by rw [sub_eq_add_neg, ← neg_smul, toIcoDiv_add_zsmul', sub_neg_eq_add] @[simp] theorem toIocDiv_sub_zsmul (a b : α) (m : ℤ) : toIocDiv hp a (b - m • p) = toIocDiv hp a b - m := by rw [sub_eq_add_neg, ← neg_smul, toIocDiv_add_zsmul, sub_eq_add_neg] @[simp] theorem toIocDiv_sub_zsmul' (a b : α) (m : ℤ) : toIocDiv hp (a - m • p) b = toIocDiv hp a b + m := by rw [sub_eq_add_neg, ← neg_smul, toIocDiv_add_zsmul', sub_neg_eq_add] @[simp] theorem toIcoDiv_add_right (a b : α) : toIcoDiv hp a (b + p) = toIcoDiv hp a b + 1 := by simpa only [one_zsmul] using toIcoDiv_add_zsmul hp a b 1 @[simp] theorem toIcoDiv_add_right' (a b : α) : toIcoDiv hp (a + p) b = toIcoDiv hp a b - 1 := by simpa only [one_zsmul] using toIcoDiv_add_zsmul' hp a b 1 @[simp] theorem toIocDiv_add_right (a b : α) : toIocDiv hp a (b + p) = toIocDiv hp a b + 1 := by simpa only [one_zsmul] using toIocDiv_add_zsmul hp a b 1 @[simp] theorem toIocDiv_add_right' (a b : α) : toIocDiv hp (a + p) b = toIocDiv hp a b - 1 := by simpa only [one_zsmul] using toIocDiv_add_zsmul' hp a b 1 @[simp] theorem toIcoDiv_add_left (a b : α) : toIcoDiv hp a (p + b) = toIcoDiv hp a b + 1 := by rw [add_comm, toIcoDiv_add_right] @[simp] theorem toIcoDiv_add_left' (a b : α) : toIcoDiv hp (p + a) b = toIcoDiv hp a b - 1 := by rw [add_comm, toIcoDiv_add_right'] @[simp] theorem toIocDiv_add_left (a b : α) : toIocDiv hp a (p + b) = toIocDiv hp a b + 1 := by rw [add_comm, toIocDiv_add_right] @[simp] theorem toIocDiv_add_left' (a b : α) : toIocDiv hp (p + a) b = toIocDiv hp a b - 1 := by rw [add_comm, toIocDiv_add_right'] @[simp] theorem toIcoDiv_sub (a b : α) : toIcoDiv hp a (b - p) = toIcoDiv hp a b - 1 := by simpa only [one_zsmul] using toIcoDiv_sub_zsmul hp a b 1 @[simp] theorem toIcoDiv_sub' (a b : α) : toIcoDiv hp (a - p) b = toIcoDiv hp a b + 1 := by simpa only [one_zsmul] using toIcoDiv_sub_zsmul' hp a b 1 @[simp] theorem toIocDiv_sub (a b : α) : toIocDiv hp a (b - p) = toIocDiv hp a b - 1 := by simpa only [one_zsmul] using toIocDiv_sub_zsmul hp a b 1 @[simp] theorem toIocDiv_sub' (a b : α) : toIocDiv hp (a - p) b = toIocDiv hp a b + 1 := by simpa only [one_zsmul] using toIocDiv_sub_zsmul' hp a b 1 theorem toIcoDiv_sub_eq_toIcoDiv_add (a b c : α) : toIcoDiv hp a (b - c) = toIcoDiv hp (a + c) b := by apply toIcoDiv_eq_of_sub_zsmul_mem_Ico rw [← sub_right_comm, Set.sub_mem_Ico_iff_left, add_right_comm] exact sub_toIcoDiv_zsmul_mem_Ico hp (a + c) b theorem toIocDiv_sub_eq_toIocDiv_add (a b c : α) : toIocDiv hp a (b - c) = toIocDiv hp (a + c) b := by apply toIocDiv_eq_of_sub_zsmul_mem_Ioc rw [← sub_right_comm, Set.sub_mem_Ioc_iff_left, add_right_comm] exact sub_toIocDiv_zsmul_mem_Ioc hp (a + c) b theorem toIcoDiv_sub_eq_toIcoDiv_add' (a b c : α) : toIcoDiv hp (a - c) b = toIcoDiv hp a (b + c) := by rw [← sub_neg_eq_add, toIcoDiv_sub_eq_toIcoDiv_add, sub_eq_add_neg] theorem toIocDiv_sub_eq_toIocDiv_add' (a b c : α) : toIocDiv hp (a - c) b = toIocDiv hp a (b + c) := by rw [← sub_neg_eq_add, toIocDiv_sub_eq_toIocDiv_add, sub_eq_add_neg] theorem toIcoDiv_neg (a b : α) : toIcoDiv hp a (-b) = -(toIocDiv hp (-a) b + 1) := by suffices toIcoDiv hp a (-b) = -toIocDiv hp (-(a + p)) b by rwa [neg_add, ← sub_eq_add_neg, toIocDiv_sub_eq_toIocDiv_add', toIocDiv_add_right] at this rw [← neg_eq_iff_eq_neg, eq_comm] apply toIocDiv_eq_of_sub_zsmul_mem_Ioc obtain ⟨hc, ho⟩ := sub_toIcoDiv_zsmul_mem_Ico hp a (-b) rw [← neg_lt_neg_iff, neg_sub' (-b), neg_neg, ← neg_smul] at ho rw [← neg_le_neg_iff, neg_sub' (-b), neg_neg, ← neg_smul] at hc refine ⟨ho, hc.trans_eq ?_⟩ rw [neg_add, neg_add_cancel_right] theorem toIcoDiv_neg' (a b : α) : toIcoDiv hp (-a) b = -(toIocDiv hp a (-b) + 1) := by simpa only [neg_neg] using toIcoDiv_neg hp (-a) (-b) theorem toIocDiv_neg (a b : α) : toIocDiv hp a (-b) = -(toIcoDiv hp (-a) b + 1) := by rw [← neg_neg b, toIcoDiv_neg, neg_neg, neg_neg, neg_add', neg_neg, add_sub_cancel_right] theorem toIocDiv_neg' (a b : α) : toIocDiv hp (-a) b = -(toIcoDiv hp a (-b) + 1) := by simpa only [neg_neg] using toIocDiv_neg hp (-a) (-b) @[simp] theorem toIcoMod_add_zsmul (a b : α) (m : ℤ) : toIcoMod hp a (b + m • p) = toIcoMod hp a b := by rw [toIcoMod, toIcoDiv_add_zsmul, toIcoMod, add_smul] abel @[simp] theorem toIcoMod_add_zsmul' (a b : α) (m : ℤ) : toIcoMod hp (a + m • p) b = toIcoMod hp a b + m • p := by simp only [toIcoMod, toIcoDiv_add_zsmul', sub_smul, sub_add] @[simp] theorem toIocMod_add_zsmul (a b : α) (m : ℤ) : toIocMod hp a (b + m • p) = toIocMod hp a b := by rw [toIocMod, toIocDiv_add_zsmul, toIocMod, add_smul] abel @[simp] theorem toIocMod_add_zsmul' (a b : α) (m : ℤ) : toIocMod hp (a + m • p) b = toIocMod hp a b + m • p := by simp only [toIocMod, toIocDiv_add_zsmul', sub_smul, sub_add] @[simp] theorem toIcoMod_zsmul_add (a b : α) (m : ℤ) : toIcoMod hp a (m • p + b) = toIcoMod hp a b := by rw [add_comm, toIcoMod_add_zsmul] @[simp] theorem toIcoMod_zsmul_add' (a b : α) (m : ℤ) : toIcoMod hp (m • p + a) b = m • p + toIcoMod hp a b := by rw [add_comm, toIcoMod_add_zsmul', add_comm] @[simp] theorem toIocMod_zsmul_add (a b : α) (m : ℤ) : toIocMod hp a (m • p + b) = toIocMod hp a b := by rw [add_comm, toIocMod_add_zsmul] @[simp] theorem toIocMod_zsmul_add' (a b : α) (m : ℤ) : toIocMod hp (m • p + a) b = m • p + toIocMod hp a b := by rw [add_comm, toIocMod_add_zsmul', add_comm] @[simp] theorem toIcoMod_sub_zsmul (a b : α) (m : ℤ) : toIcoMod hp a (b - m • p) = toIcoMod hp a b := by rw [sub_eq_add_neg, ← neg_smul, toIcoMod_add_zsmul] @[simp] theorem toIcoMod_sub_zsmul' (a b : α) (m : ℤ) : toIcoMod hp (a - m • p) b = toIcoMod hp a b - m • p := by simp_rw [sub_eq_add_neg, ← neg_smul, toIcoMod_add_zsmul'] @[simp] theorem toIocMod_sub_zsmul (a b : α) (m : ℤ) : toIocMod hp a (b - m • p) = toIocMod hp a b := by rw [sub_eq_add_neg, ← neg_smul, toIocMod_add_zsmul] @[simp] theorem toIocMod_sub_zsmul' (a b : α) (m : ℤ) : toIocMod hp (a - m • p) b = toIocMod hp a b - m • p := by simp_rw [sub_eq_add_neg, ← neg_smul, toIocMod_add_zsmul'] @[simp] theorem toIcoMod_add_right (a b : α) : toIcoMod hp a (b + p) = toIcoMod hp a b := by simpa only [one_zsmul] using toIcoMod_add_zsmul hp a b 1 @[simp] theorem toIcoMod_add_right' (a b : α) : toIcoMod hp (a + p) b = toIcoMod hp a b + p := by simpa only [one_zsmul] using toIcoMod_add_zsmul' hp a b 1 @[simp] theorem toIocMod_add_right (a b : α) : toIocMod hp a (b + p) = toIocMod hp a b := by simpa only [one_zsmul] using toIocMod_add_zsmul hp a b 1 @[simp] theorem toIocMod_add_right' (a b : α) : toIocMod hp (a + p) b = toIocMod hp a b + p := by simpa only [one_zsmul] using toIocMod_add_zsmul' hp a b 1 @[simp] theorem toIcoMod_add_left (a b : α) : toIcoMod hp a (p + b) = toIcoMod hp a b := by rw [add_comm, toIcoMod_add_right] @[simp] theorem toIcoMod_add_left' (a b : α) : toIcoMod hp (p + a) b = p + toIcoMod hp a b := by rw [add_comm, toIcoMod_add_right', add_comm] @[simp] theorem toIocMod_add_left (a b : α) : toIocMod hp a (p + b) = toIocMod hp a b := by rw [add_comm, toIocMod_add_right] @[simp] theorem toIocMod_add_left' (a b : α) : toIocMod hp (p + a) b = p + toIocMod hp a b := by rw [add_comm, toIocMod_add_right', add_comm] @[simp] theorem toIcoMod_sub (a b : α) : toIcoMod hp a (b - p) = toIcoMod hp a b := by simpa only [one_zsmul] using toIcoMod_sub_zsmul hp a b 1 @[simp] theorem toIcoMod_sub' (a b : α) : toIcoMod hp (a - p) b = toIcoMod hp a b - p := by simpa only [one_zsmul] using toIcoMod_sub_zsmul' hp a b 1 @[simp] theorem toIocMod_sub (a b : α) : toIocMod hp a (b - p) = toIocMod hp a b := by simpa only [one_zsmul] using toIocMod_sub_zsmul hp a b 1 @[simp] theorem toIocMod_sub' (a b : α) : toIocMod hp (a - p) b = toIocMod hp a b - p := by simpa only [one_zsmul] using toIocMod_sub_zsmul' hp a b 1 theorem toIcoMod_sub_eq_sub (a b c : α) : toIcoMod hp a (b - c) = toIcoMod hp (a + c) b - c := by simp_rw [toIcoMod, toIcoDiv_sub_eq_toIcoDiv_add, sub_right_comm] theorem toIocMod_sub_eq_sub (a b c : α) : toIocMod hp a (b - c) = toIocMod hp (a + c) b - c := by simp_rw [toIocMod, toIocDiv_sub_eq_toIocDiv_add, sub_right_comm] theorem toIcoMod_add_right_eq_add (a b c : α) : toIcoMod hp a (b + c) = toIcoMod hp (a - c) b + c := by simp_rw [toIcoMod, toIcoDiv_sub_eq_toIcoDiv_add', sub_add_eq_add_sub] theorem toIocMod_add_right_eq_add (a b c : α) : toIocMod hp a (b + c) = toIocMod hp (a - c) b + c := by simp_rw [toIocMod, toIocDiv_sub_eq_toIocDiv_add', sub_add_eq_add_sub] theorem toIcoMod_neg (a b : α) : toIcoMod hp a (-b) = p - toIocMod hp (-a) b := by simp_rw [toIcoMod, toIocMod, toIcoDiv_neg, neg_smul, add_smul] abel theorem toIcoMod_neg' (a b : α) : toIcoMod hp (-a) b = p - toIocMod hp a (-b) := by simpa only [neg_neg] using toIcoMod_neg hp (-a) (-b) theorem toIocMod_neg (a b : α) : toIocMod hp a (-b) = p - toIcoMod hp (-a) b := by simp_rw [toIocMod, toIcoMod, toIocDiv_neg, neg_smul, add_smul] abel theorem toIocMod_neg' (a b : α) : toIocMod hp (-a) b = p - toIcoMod hp a (-b) := by simpa only [neg_neg] using toIocMod_neg hp (-a) (-b) theorem toIcoMod_eq_toIcoMod : toIcoMod hp a b = toIcoMod hp a c ↔ ∃ n : ℤ, c - b = n • p := by refine ⟨fun h => ⟨toIcoDiv hp a c - toIcoDiv hp a b, ?_⟩, fun h => ?_⟩ · conv_lhs => rw [← toIcoMod_add_toIcoDiv_zsmul hp a b, ← toIcoMod_add_toIcoDiv_zsmul hp a c] rw [h, sub_smul] abel · rcases h with ⟨z, hz⟩ rw [sub_eq_iff_eq_add] at hz rw [hz, toIcoMod_zsmul_add] theorem toIocMod_eq_toIocMod : toIocMod hp a b = toIocMod hp a c ↔ ∃ n : ℤ, c - b = n • p := by refine ⟨fun h => ⟨toIocDiv hp a c - toIocDiv hp a b, ?_⟩, fun h => ?_⟩ · conv_lhs => rw [← toIocMod_add_toIocDiv_zsmul hp a b, ← toIocMod_add_toIocDiv_zsmul hp a c] rw [h, sub_smul] abel · rcases h with ⟨z, hz⟩ rw [sub_eq_iff_eq_add] at hz rw [hz, toIocMod_zsmul_add] /-! ### Links between the `Ico` and `Ioc` variants applied to the same element -/ section IcoIoc namespace AddCommGroup theorem modEq_iff_toIcoMod_eq_left : a ≡ b [PMOD p] ↔ toIcoMod hp a b = a := modEq_iff_eq_add_zsmul.trans ⟨by rintro ⟨n, rfl⟩ rw [toIcoMod_add_zsmul, toIcoMod_apply_left], fun h => ⟨toIcoDiv hp a b, eq_add_of_sub_eq h⟩⟩ theorem modEq_iff_toIocMod_eq_right : a ≡ b [PMOD p] ↔ toIocMod hp a b = a + p := by refine modEq_iff_eq_add_zsmul.trans ⟨?_, fun h => ⟨toIocDiv hp a b + 1, ?_⟩⟩ · rintro ⟨z, rfl⟩ rw [toIocMod_add_zsmul, toIocMod_apply_left] · rwa [add_one_zsmul, add_left_comm, ← sub_eq_iff_eq_add'] alias ⟨ModEq.toIcoMod_eq_left, _⟩ := modEq_iff_toIcoMod_eq_left alias ⟨ModEq.toIcoMod_eq_right, _⟩ := modEq_iff_toIocMod_eq_right variable (a b) open List in theorem tfae_modEq : TFAE [a ≡ b [PMOD p], ∀ z : ℤ, b - z • p ∉ Set.Ioo a (a + p), toIcoMod hp a b ≠ toIocMod hp a b, toIcoMod hp a b + p = toIocMod hp a b] := by rw [modEq_iff_toIcoMod_eq_left hp] tfae_have 3 → 2 := by rw [← not_exists, not_imp_not] exact fun ⟨i, hi⟩ => ((toIcoMod_eq_iff hp).2 ⟨Set.Ioo_subset_Ico_self hi, i, (sub_add_cancel b _).symm⟩).trans ((toIocMod_eq_iff hp).2 ⟨Set.Ioo_subset_Ioc_self hi, i, (sub_add_cancel b _).symm⟩).symm tfae_have 4 → 3 \| h => by rw [← h, Ne, eq_comm, add_eq_left] exact hp.ne' tfae_have 1 → 4 \| h => by rw [h, eq_comm, toIocMod_eq_iff, Set.right_mem_Ioc] refine ⟨lt_add_of_pos_right a hp, toIcoDiv hp a b - 1, ?_⟩ rw [sub_one_zsmul, add_add_add_comm, add_neg_cancel, add_zero] conv_lhs => rw [← toIcoMod_add_toIcoDiv_zsmul hp a b, h] tfae_have 2 → 1 := by rw [← not_exists, not_imp_comm] have h' := toIcoMod_mem_Ico hp a b exact fun h => ⟨_, h'.1.lt_of_ne' h, h'.2⟩ tfae_finish variable {a b} theorem modEq_iff_not_forall_mem_Ioo_mod : a ≡ b [PMOD p] ↔ ∀ z : ℤ, b - z • p ∉ Set.Ioo a (a + p) := (tfae_modEq hp a b).out 0 1 theorem modEq_iff_toIcoMod_ne_toIocMod : a ≡ b [PMOD p] ↔ toIcoMod hp a b ≠ toIocMod hp a b := (tfae_modEq hp a b).out 0 2 theorem modEq_iff_toIcoMod_add_period_eq_toIocMod : a ≡ b [PMOD p] ↔ toIcoMod hp a b + p = toIocMod hp a b := (tfae_modEq hp a b).out 0 3 theorem not_modEq_iff_toIcoMod_eq_toIocMod : ¬a ≡ b [PMOD p] ↔ toIcoMod hp a b = toIocMod hp a b := (modEq_iff_toIcoMod_ne_toIocMod _).not_left theorem not_modEq_iff_toIcoDiv_eq_toIocDiv : ¬a ≡ b [PMOD p] ↔ toIcoDiv hp a b = toIocDiv hp a b := by rw [not_modEq_iff_toIcoMod_eq_toIocMod hp, toIcoMod, toIocMod, sub_right_inj, zsmul_left_inj hp] theorem modEq_iff_toIcoDiv_eq_toIocDiv_add_one : a ≡ b [PMOD p] ↔ toIcoDiv hp a b = toIocDiv hp a b + 1 := by rw [modEq_iff_toIcoMod_add_period_eq_toIocMod hp, toIcoMod, toIocMod, ← eq_sub_iff_add_eq, sub_sub, sub_right_inj, ← add_one_zsmul, zsmul_left_inj hp] end AddCommGroup open AddCommGroup /-- If `a` and `b` fall within the same cycle WRT `c`, then they are congruent modulo `p`. -/ @[simp] theorem toIcoMod_inj {c : α} : toIcoMod hp c a = toIcoMod hp c b ↔ a ≡ b [PMOD p] := by simp_rw [toIcoMod_eq_toIcoMod, modEq_iff_eq_add_zsmul, sub_eq_iff_eq_add'] alias ⟨_, AddCommGroup.ModEq.toIcoMod_eq_toIcoMod⟩ := toIcoMod_inj theorem Ico_eq_locus_Ioc_eq_iUnion_Ioo : { b \| toIcoMod hp a b = toIocMod hp a b } = ⋃ z : ℤ, Set.Ioo (a + z • p) (a + p + z • p) := by ext1 simp_rw [Set.mem_setOf, Set.mem_iUnion, ← Set.sub_mem_Ioo_iff_left, ← not_modEq_iff_toIcoMod_eq_toIocMod, modEq_iff_not_forall_mem_Ioo_mod hp, not_forall, Classical.not_not] theorem toIocDiv_wcovBy_toIcoDiv (a b : α) : toIocDiv hp a b ⩿ toIcoDiv hp a b := by suffices toIocDiv hp a b = toIcoDiv hp a b ∨ toIocDiv hp a b + 1 = toIcoDiv hp a b by rwa [wcovBy_iff_eq_or_covBy, ← Order.succ_eq_iff_covBy] rw [eq_comm, ← not_modEq_iff_toIcoDiv_eq_toIocDiv, eq_comm, ← modEq_iff_toIcoDiv_eq_toIocDiv_add_one] exact em' _ theorem toIcoMod_le_toIocMod (a b : α) : toIcoMod hp a b ≤ toIocMod hp a b := by rw [toIcoMod, toIocMod, sub_le_sub_iff_left] exact zsmul_left_mono hp.le (toIocDiv_wcovBy_toIcoDiv _ _ _).le theorem toIocMod_le_toIcoMod_add (a b : α) : toIocMod hp a b ≤ toIcoMod hp a b + p := by rw [toIcoMod, toIocMod, sub_add, sub_le_sub_iff_left, sub_le_iff_le_add, ← add_one_zsmul, (zsmul_left_strictMono hp).le_iff_le] apply (toIocDiv_wcovBy_toIcoDiv _ _ _).le_succ end IcoIoc open AddCommGroup theorem toIcoMod_eq_self : toIcoMod hp a b = b ↔ b ∈ Set.Ico a (a + p) := by rw [toIcoMod_eq_iff, and_iff_left] exact ⟨0, by simp⟩ theorem toIocMod_eq_self : toIocMod hp a b = b ↔ b ∈ Set.Ioc a (a + p) := by rw [toIocMod_eq_iff, and_iff_left] exact ⟨0, by simp⟩ @[simp] theorem toIcoMod_toIcoMod (a₁ a₂ b : α) : toIcoMod hp a₁ (toIcoMod hp a₂ b) = toIcoMod hp a₁ b := (toIcoMod_eq_toIcoMod _).2 ⟨toIcoDiv hp a₂ b, self_sub_toIcoMod hp a₂ b⟩ @[simp] theorem toIcoMod_toIocMod (a₁ a₂ b : α) : toIcoMod hp a₁ (toIocMod hp a₂ b) = toIcoMod hp a₁ b := (toIcoMod_eq_toIcoMod _).2 ⟨toIocDiv hp a₂ b, self_sub_toIocMod hp a₂ b⟩ @[simp] theorem toIocMod_toIocMod (a₁ a₂ b : α) : toIocMod hp a₁ (toIocMod hp a₂ b) = toIocMod hp a₁ b := (toIocMod_eq_toIocMod _).2 ⟨toIocDiv hp a₂ b, self_sub_toIocMod hp a₂ b⟩ @[simp] theorem toIocMod_toIcoMod (a₁ a₂ b : α) : toIocMod hp a₁ (toIcoMod hp a₂ b) = toIocMod hp a₁ b := (toIocMod_eq_toIocMod _).2 ⟨toIcoDiv hp a₂ b, self_sub_toIcoMod hp a₂ b⟩ theorem toIcoMod_periodic (a : α) : Function.Periodic (toIcoMod hp a) p := toIcoMod_add_right hp a theorem toIocMod_periodic (a : α) : Function.Periodic (toIocMod hp a) p := toIocMod_add_right hp a -- helper lemmas for when `a = 0` section Zero theorem toIcoMod_zero_sub_comm (a b : α) : toIcoMod hp 0 (a - b) = p - toIocMod hp 0 (b - a) := by rw [← neg_sub, toIcoMod_neg, neg_zero] theorem toIocMod_zero_sub_comm (a b : α) : toIocMod hp 0 (a - b) = p - toIcoMod hp 0 (b - a) := by rw [← neg_sub, toIocMod_neg, neg_zero] theorem toIcoDiv_eq_sub (a b : α) : toIcoDiv hp a b = toIcoDiv hp 0 (b - a) := by rw [toIcoDiv_sub_eq_toIcoDiv_add, zero_add] theorem toIocDiv_eq_sub (a b : α) : toIocDiv hp a b = toIocDiv hp 0 (b - a) := by rw [toIocDiv_sub_eq_toIocDiv_add, zero_add] theorem toIcoMod_eq_sub (a b : α) : toIcoMod hp a b = toIcoMod hp 0 (b - a) + a := by rw [toIcoMod_sub_eq_sub, zero_add, sub_add_cancel] theorem toIocMod_eq_sub (a b : α) : toIocMod hp a b = toIocMod hp 0 (b - a) + a := by rw [toIocMod_sub_eq_sub, zero_add, sub_add_cancel] theorem toIcoMod_add_toIocMod_zero (a b : α) : toIcoMod hp 0 (a - b) + toIocMod hp 0 (b - a) = p := by rw [toIcoMod_zero_sub_comm, sub_add_cancel] theorem toIocMod_add_toIcoMod_zero (a b : α) : toIocMod hp 0 (a - b) + toIcoMod hp 0 (b - a) = p := by rw [_root_.add_comm, toIcoMod_add_toIocMod_zero] end Zero /-- `toIcoMod` as an equiv from the quotient. -/ @[simps symm_apply] def QuotientAddGroup.equivIcoMod (a : α) : α ⧸ AddSubgroup.zmultiples p ≃ Set.Ico a (a + p) where toFun b := ⟨(toIcoMod_periodic hp a).lift b, QuotientAddGroup.induction_on b <\| toIcoMod_mem_Ico hp a⟩ invFun := (↑) right_inv b := Subtype.ext <\| (toIcoMod_eq_self hp).mpr b.prop left_inv b := by induction b using QuotientAddGroup.induction_on dsimp rw [QuotientAddGroup.eq_iff_sub_mem, toIcoMod_sub_self] apply AddSubgroup.zsmul_mem_zmultiples @[simp] theorem QuotientAddGroup.equivIcoMod_coe (a b : α) : QuotientAddGroup.equivIcoMod hp a ↑b = ⟨toIcoMod hp a b, toIcoMod_mem_Ico hp a _⟩ := rfl @[simp] theorem QuotientAddGroup.equivIcoMod_zero (a : α) : QuotientAddGroup.equivIcoMod hp a 0 = ⟨toIcoMod hp a 0, toIcoMod_mem_Ico hp a _⟩ := rfl /-- `toIocMod` as an equiv from the quotient. -/ @[simps symm_apply] def QuotientAddGroup.equivIocMod (a : α) : α ⧸ AddSubgroup.zmultiples p ≃ Set.Ioc a (a + p) where toFun b := ⟨(toIocMod_periodic hp a).lift b, QuotientAddGroup.induction_on b <\| toIocMod_mem_Ioc hp a⟩ invFun := (↑) right_inv b := Subtype.ext <\| (toIocMod_eq_self hp).mpr b.prop left_inv b := by induction b using QuotientAddGroup.induction_on dsimp rw [QuotientAddGroup.eq_iff_sub_mem, toIocMod_sub_self] apply AddSubgroup.zsmul_mem_zmultiples	@[simp] theorem QuotientAddGroup.equivIocMod_coe (a b : α) : QuotientAddGroup.equivIocMod hp a ↑b = ⟨toIocMod hp a b, toIocMod_mem_Ioc hp a _⟩ := rfl	Mathlib/Algebra/Order/ToIntervalMod.lean	700	705
/- Copyright (c) 2023 Xavier Roblot. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Xavier Roblot -/ import Mathlib.LinearAlgebra.Matrix.Gershgorin import Mathlib.NumberTheory.NumberField.CanonicalEmbedding.ConvexBody import Mathlib.NumberTheory.NumberField.Units.Basic /-! # Dirichlet theorem on the group of units of a number field This file is devoted to the proof of Dirichlet unit theorem that states that the group of units `(𝓞 K)ˣ` of units of the ring of integers `𝓞 K` of a number field `K` modulo its torsion subgroup is a free `ℤ`-module of rank `card (InfinitePlace K) - 1`. ## Main definitions * `NumberField.Units.rank`: the unit rank of the number field `K`. * `NumberField.Units.fundSystem`: a fundamental system of units of `K`. * `NumberField.Units.basisModTorsion`: a `ℤ`-basis of `(𝓞 K)ˣ ⧸ (torsion K)` as an additive `ℤ`-module. ## Main results * `NumberField.Units.rank_modTorsion`: the `ℤ`-rank of `(𝓞 K)ˣ ⧸ (torsion K)` is equal to `card (InfinitePlace K) - 1`. * `NumberField.Units.exist_unique_eq_mul_prod`: Dirichlet Unit Theorem. Any unit of `𝓞 K` can be written uniquely as the product of a root of unity and powers of the units of the fundamental system `fundSystem`. ## Tags number field, units, Dirichlet unit theorem -/ open scoped NumberField noncomputable section open NumberField NumberField.InfinitePlace NumberField.Units variable (K : Type) [Field K] namespace NumberField.Units.dirichletUnitTheorem /-! ### Dirichlet Unit Theorem We define a group morphism from `(𝓞 K)ˣ` to `logSpace K`, defined as `{w : InfinitePlace K // w ≠ w₀} → ℝ` where `w₀` is a distinguished (arbitrary) infinite place, prove that its kernel is the torsion subgroup (see `logEmbedding_eq_zero_iff`) and that its image, called `unitLattice`, is a full `ℤ`-lattice. It follows that `unitLattice` is a free `ℤ`-module (see `instModuleFree_unitLattice`) of rank `card (InfinitePlaces K) - 1` (see `unitLattice_rank`). To prove that the `unitLattice` is a full `ℤ`-lattice, we need to prove that it is discrete (see `unitLattice_inter_ball_finite`) and that it spans the full space over `ℝ` (see `unitLattice_span_eq_top`); this is the main part of the proof, see the section `span_top` below for more details. -/ open Finset variable {K} section NumberField variable [NumberField K] /-- The distinguished infinite place. -/ def w₀ : InfinitePlace K := (inferInstance : Nonempty (InfinitePlace K)).some variable (K) in /-- The `logSpace` is defined as `{w : InfinitePlace K // w ≠ w₀} → ℝ` where `w₀` is the distinguished infinite place. -/ abbrev logSpace := {w : InfinitePlace K // w ≠ w₀} → ℝ variable (K) in /-- The logarithmic embedding of the units (seen as an `Additive` group). -/ def _root_.NumberField.Units.logEmbedding : Additive ((𝓞 K)ˣ) →+ logSpace K := { toFun := fun x w => mult w.val Real.log (w.val ↑x.toMul) map_zero' := by simp; rfl map_add' := fun _ _ => by simp [Real.log_mul, mul_add]; rfl } @[simp] theorem logEmbedding_component (x : (𝓞 K)ˣ) (w : {w : InfinitePlace K // w ≠ w₀}) : (logEmbedding K (Additive.ofMul x)) w = mult w.val * Real.log (w.val x) := rfl open scoped Classical in theorem sum_logEmbedding_component (x : (𝓞 K)ˣ) : ∑ w, logEmbedding K (Additive.ofMul x) w = - mult (w₀ : InfinitePlace K) * Real.log (w₀ (x : K)) := by have h := sum_mult_mul_log x rw [Fintype.sum_eq_add_sum_subtype_ne _ w₀, add_comm, add_eq_zero_iff_eq_neg, ← neg_mul] at h simpa [logEmbedding_component] using h end NumberField theorem mult_log_place_eq_zero {x : (𝓞 K)ˣ} {w : InfinitePlace K} : mult w * Real.log (w x) = 0 ↔ w x = 1 := by rw [mul_eq_zero, or_iff_right, Real.log_eq_zero, or_iff_right, or_iff_left] · linarith [(apply_nonneg _ _ : 0 ≤ w x)] · simp only [ne_eq, map_eq_zero, coe_ne_zero x, not_false_eq_true] · refine (ne_of_gt ?_) rw [mult]; split_ifs <;> norm_num variable [NumberField K] theorem logEmbedding_eq_zero_iff {x : (𝓞 K)ˣ} : logEmbedding K (Additive.ofMul x) = 0 ↔ x ∈ torsion K := by rw [mem_torsion] refine ⟨fun h w => ?_, fun h => ?_⟩ · by_cases hw : w = w₀ · suffices -mult w₀ * Real.log (w₀ (x : K)) = 0 by rw [neg_mul, neg_eq_zero, ← hw] at this exact mult_log_place_eq_zero.mp this rw [← sum_logEmbedding_component, sum_eq_zero] exact fun w _ => congrFun h w · exact mult_log_place_eq_zero.mp (congrFun h ⟨w, hw⟩) · ext w rw [logEmbedding_component, h w.val, Real.log_one, mul_zero, Pi.zero_apply] open scoped Classical in theorem logEmbedding_component_le {r : ℝ} {x : (𝓞 K)ˣ} (hr : 0 ≤ r) (h : ‖logEmbedding K x‖ ≤ r) (w : {w : InfinitePlace K // w ≠ w₀}) : \|logEmbedding K (Additive.ofMul x) w\| ≤ r := by lift r to NNReal using hr simp_rw [Pi.norm_def, NNReal.coe_le_coe, Finset.sup_le_iff, ← NNReal.coe_le_coe] at h exact h w (mem_univ _) open scoped Classical in theorem log_le_of_logEmbedding_le {r : ℝ} {x : (𝓞 K)ˣ} (hr : 0 ≤ r) (h : ‖logEmbedding K (Additive.ofMul x)‖ ≤ r) (w : InfinitePlace K) : \|Real.log (w x)\| ≤ (Fintype.card (InfinitePlace K)) * r := by have tool : ∀ x : ℝ, 0 ≤ x → x ≤ mult w * x := fun x hx => by nth_rw 1 [← one_mul x] refine mul_le_mul ?_ le_rfl hx ?_ all_goals { rw [mult]; split_ifs <;> norm_num } by_cases hw : w = w₀ · have hyp := congr_arg (‖·‖) (sum_logEmbedding_component x).symm replace hyp := (le_of_eq hyp).trans (norm_sum_le _ _) simp_rw [norm_mul, norm_neg, Real.norm_eq_abs, Nat.abs_cast] at hyp refine (le_trans ?_ hyp).trans ?_ · rw [← hw] exact tool _ (abs_nonneg _) · refine (sum_le_card_nsmul univ _ _ (fun w _ => logEmbedding_component_le hr h w)).trans ?_ rw [nsmul_eq_mul] refine mul_le_mul ?_ le_rfl hr (Fintype.card (InfinitePlace K)).cast_nonneg simp · have hyp := logEmbedding_component_le hr h ⟨w, hw⟩ rw [logEmbedding_component, abs_mul, Nat.abs_cast] at hyp refine (le_trans ?_ hyp).trans ?_ · exact tool _ (abs_nonneg _) · nth_rw 1 [← one_mul r] exact mul_le_mul (Nat.one_le_cast.mpr Fintype.card_pos) (le_of_eq rfl) hr (Nat.cast_nonneg _) variable (K) /-- The lattice formed by the image of the logarithmic embedding. -/ noncomputable def _root_.NumberField.Units.unitLattice : Submodule ℤ (logSpace K) := Submodule.map (logEmbedding K).toIntLinearMap ⊤ open scoped Classical in theorem unitLattice_inter_ball_finite (r : ℝ) : ((unitLattice K : Set (logSpace K)) ∩ Metric.closedBall 0 r).Finite := by obtain hr \| hr := lt_or_le r 0 · convert Set.finite_empty rw [Metric.closedBall_eq_empty.mpr hr] exact Set.inter_empty _ · suffices {x : (𝓞 K)ˣ \| IsIntegral ℤ (x : K) ∧ ∀ (φ : K →+* ℂ), ‖φ x‖ ≤ Real.exp ((Fintype.card (InfinitePlace K)) * r)}.Finite by refine (Set.Finite.image (logEmbedding K) this).subset ?_ rintro _ ⟨⟨x, ⟨_, rfl⟩⟩, hx⟩ refine ⟨x, ⟨x.val.prop, (le_iff_le _ _).mp (fun w => (Real.log_le_iff_le_exp ?_).mp ?_)⟩, rfl⟩ · exact pos_iff.mpr (coe_ne_zero x) · rw [mem_closedBall_zero_iff] at hx exact (le_abs_self _).trans (log_le_of_logEmbedding_le hr hx w) refine Set.Finite.of_finite_image ?_ (coe_injective K).injOn refine (Embeddings.finite_of_norm_le K ℂ (Real.exp ((Fintype.card (InfinitePlace K)) * r))).subset ?_ rintro _ ⟨x, ⟨⟨h_int, h_le⟩, rfl⟩⟩ exact ⟨h_int, h_le⟩ section span_top /-! #### Section `span_top` In this section, we prove that the span over `ℝ` of the `unitLattice` is equal to the full space. For this, we construct for each infinite place `w₁ ≠ w₀` a unit `u_w₁` of `K` such that, for all infinite places `w` such that `w ≠ w₁`, we have `Real.log w (u_w₁) < 0` (and thus `Real.log w₁ (u_w₁) > 0`). It follows then from a determinant computation (using `Matrix.det_ne_zero_of_sum_col_lt_diag`) that the image by `logEmbedding` of these units is a `ℝ`-linearly independent family. The unit `u_w₁` is obtained by constructing a sequence `seq n` of nonzero algebraic integers that is strictly decreasing at infinite places distinct from `w₁` and of norm `≤ B`. Since there are finitely many ideals of norm `≤ B`, there exists two term in the sequence defining the same ideal and their quotient is the desired unit `u_w₁` (see `exists_unit`). -/ open NumberField.mixedEmbedding NNReal variable (w₁ : InfinitePlace K) {B : ℕ} (hB : minkowskiBound K 1 < (convexBodyLTFactor K) * B) include hB in /-- This result shows that there always exists a next term in the sequence. -/ theorem seq_next {x : 𝓞 K} (hx : x ≠ 0) : ∃ y : 𝓞 K, y ≠ 0 ∧ (∀ w, w ≠ w₁ → w y < w x) ∧ \|Algebra.norm ℚ (y : K)\| ≤ B := by have hx' := RingOfIntegers.coe_ne_zero_iff.mpr hx let f : InfinitePlace K → ℝ≥0 := fun w => ⟨(w x) / 2, div_nonneg (AbsoluteValue.nonneg _ _) (by norm_num)⟩ suffices ∀ w, w ≠ w₁ → f w ≠ 0 by obtain ⟨g, h_geqf, h_gprod⟩ := adjust_f K B this obtain ⟨y, h_ynz, h_yle⟩ := exists_ne_zero_mem_ringOfIntegers_lt K (f := g) (by rw [convexBodyLT_volume]; convert hB; exact congr_arg ((↑) : NNReal → ENNReal) h_gprod) refine ⟨y, h_ynz, fun w hw => (h_geqf w hw ▸ h_yle w).trans ?_, ?_⟩ · rw [← Rat.cast_le (K := ℝ), Rat.cast_natCast] calc _ = ∏ w : InfinitePlace K, w (algebraMap _ K y) ^ mult w := (prod_eq_abs_norm (algebraMap _ K y)).symm _ ≤ ∏ w : InfinitePlace K, (g w : ℝ) ^ mult w := by gcongr with w; exact (h_yle w).le _ ≤ (B : ℝ) := by simp_rw [← NNReal.coe_pow, ← NNReal.coe_prod] exact le_of_eq (congr_arg toReal h_gprod) · refine div_lt_self ?_ (by norm_num) exact pos_iff.mpr hx' intro _ _ rw [ne_eq, Nonneg.mk_eq_zero, div_eq_zero_iff, map_eq_zero, not_or] exact ⟨hx', by norm_num⟩ /-- An infinite sequence of nonzero algebraic integers of `K` satisfying the following properties: • `seq n` is nonzero; • for `w : InfinitePlace K`, `w ≠ w₁ → w (seq n+1) < w (seq n)`; • `∣norm (seq n)∣ ≤ B`. -/ def seq : ℕ → { x : 𝓞 K // x ≠ 0 } \| 0 => ⟨1, by norm_num⟩ \| n + 1 => ⟨(seq_next K w₁ hB (seq n).prop).choose, (seq_next K w₁ hB (seq n).prop).choose_spec.1⟩ /-- The terms of the sequence are nonzero. -/ theorem seq_ne_zero (n : ℕ) : algebraMap (𝓞 K) K (seq K w₁ hB n) ≠ 0 := RingOfIntegers.coe_ne_zero_iff.mpr (seq K w₁ hB n).prop /-- The sequence is strictly decreasing at infinite places distinct from `w₁`. -/ theorem seq_decreasing {n m : ℕ} (h : n < m) (w : InfinitePlace K) (hw : w ≠ w₁) : w (algebraMap (𝓞 K) K (seq K w₁ hB m)) < w (algebraMap (𝓞 K) K (seq K w₁ hB n)) := by induction m with \| zero => exfalso exact Nat.not_succ_le_zero n h \| succ m m_ih => cases eq_or_lt_of_le (Nat.le_of_lt_succ h) with \| inl hr => rw [hr] exact (seq_next K w₁ hB (seq K w₁ hB m).prop).choose_spec.2.1 w hw \| inr hr => refine lt_trans ?_ (m_ih hr) exact (seq_next K w₁ hB (seq K w₁ hB m).prop).choose_spec.2.1 w hw /-- The terms of the sequence have norm bounded by `B`. -/ theorem seq_norm_le (n : ℕ) : Int.natAbs (Algebra.norm ℤ (seq K w₁ hB n : 𝓞 K)) ≤ B := by cases n with \| zero => have : 1 ≤ B := by contrapose! hB simp only [Nat.lt_one_iff.mp hB, CharP.cast_eq_zero, mul_zero, zero_le] simp only [ne_eq, seq, map_one, Int.natAbs_one, this] \| succ n => rw [← Nat.cast_le (α := ℚ), Int.cast_natAbs, Int.cast_abs, Algebra.coe_norm_int] exact (seq_next K w₁ hB (seq K w₁ hB n).prop).choose_spec.2.2 /-- Construct a unit associated to the place `w₁`. The family, for `w₁ ≠ w₀`, formed by the image by the `logEmbedding` of these units is `ℝ`-linearly independent, see `unitLattice_span_eq_top`. -/ theorem exists_unit (w₁ : InfinitePlace K) : ∃ u : (𝓞 K)ˣ, ∀ w : InfinitePlace K, w ≠ w₁ → Real.log (w u) < 0 := by obtain ⟨B, hB⟩ : ∃ B : ℕ, minkowskiBound K 1 < (convexBodyLTFactor K) * B := by conv => congr; ext; rw [mul_comm] exact ENNReal.exists_nat_mul_gt (ENNReal.coe_ne_zero.mpr (convexBodyLTFactor_ne_zero K)) (ne_of_lt (minkowskiBound_lt_top K 1)) rsuffices ⟨n, m, hnm, h⟩ : ∃ n m, n < m ∧ (Ideal.span ({ (seq K w₁ hB n : 𝓞 K) }) = Ideal.span ({ (seq K w₁ hB m : 𝓞 K) })) · have hu := Ideal.span_singleton_eq_span_singleton.mp h refine ⟨hu.choose, fun w hw => Real.log_neg ?_ ?_⟩ · exact pos_iff.mpr (coe_ne_zero _) · calc _ = w (algebraMap (𝓞 K) K (seq K w₁ hB m) * (algebraMap (𝓞 K) K (seq K w₁ hB n))⁻¹) := by rw [← congr_arg (algebraMap (𝓞 K) K) hu.choose_spec, mul_comm, map_mul (algebraMap _ _), ← mul_assoc, inv_mul_cancel₀ (seq_ne_zero K w₁ hB n), one_mul] _ = w (algebraMap (𝓞 K) K (seq K w₁ hB m)) * w (algebraMap (𝓞 K) K (seq K w₁ hB n))⁻¹ := map_mul _ _ _ _ < 1 := by rw [map_inv₀, mul_inv_lt_iff₀' (pos_iff.mpr (seq_ne_zero K w₁ hB n)), mul_one] exact seq_decreasing K w₁ hB hnm w hw refine Set.Finite.exists_lt_map_eq_of_forall_mem (t := {I : Ideal (𝓞 K) \| Ideal.absNorm I ≤ B}) (fun n ↦ ?_) (Ideal.finite_setOf_absNorm_le B) rw [Set.mem_setOf_eq, Ideal.absNorm_span_singleton] exact seq_norm_le K w₁ hB n theorem unitLattice_span_eq_top : Submodule.span ℝ (unitLattice K : Set (logSpace K)) = ⊤ := by classical refine le_antisymm le_top ?_ -- The standard basis let B := Pi.basisFun ℝ {w : InfinitePlace K // w ≠ w₀} -- The image by log_embedding of the family of units constructed above let v := fun w : { w : InfinitePlace K // w ≠ w₀ } => logEmbedding K (Additive.ofMul (exists_unit K w).choose) -- To prove the result, it is enough to prove that the family `v` is linearly independent suffices B.det v ≠ 0 by rw [← isUnit_iff_ne_zero, ← is_basis_iff_det] at this rw [← this.2] refine Submodule.span_monotone fun _ ⟨w, hw⟩ ↦ ⟨(exists_unit K w).choose, trivial, hw⟩ rw [Basis.det_apply] -- We use a specific lemma to prove that this determinant is nonzero refine det_ne_zero_of_sum_col_lt_diag (fun w => ?_) simp_rw [Real.norm_eq_abs, B, Basis.coePiBasisFun.toMatrix_eq_transpose, Matrix.transpose_apply] rw [← sub_pos, sum_congr rfl (fun x hx => abs_of_neg ?_), sum_neg_distrib, sub_neg_eq_add, sum_erase_eq_sub (mem_univ _), ← add_comm_sub] · refine add_pos_of_nonneg_of_pos ?_ ?_ · rw [sub_nonneg] exact le_abs_self _ · rw [sum_logEmbedding_component (exists_unit K w).choose] refine mul_pos_of_neg_of_neg ?_ ((exists_unit K w).choose_spec _ w.prop.symm) rw [mult]; split_ifs <;> norm_num · refine mul_neg_of_pos_of_neg ?_ ((exists_unit K w).choose_spec x ?_) · rw [mult]; split_ifs <;> norm_num · exact Subtype.ext_iff_val.not.mp (ne_of_mem_erase hx) end span_top end dirichletUnitTheorem section statements variable [NumberField K] open dirichletUnitTheorem Module /-- The unit rank of the number field `K`, it is equal to `card (InfinitePlace K) - 1`. -/ def rank : ℕ := Fintype.card (InfinitePlace K) - 1 instance instDiscrete_unitLattice : DiscreteTopology (unitLattice K) := by classical refine discreteTopology_of_isOpen_singleton_zero ?_ refine isOpen_singleton_of_finite_mem_nhds 0 (s := Metric.closedBall 0 1) ?_ ?_ · exact Metric.closedBall_mem_nhds _ (by norm_num) · refine Set.Finite.of_finite_image ?_ (Set.injOn_of_injective Subtype.val_injective) convert unitLattice_inter_ball_finite K 1 ext x refine ⟨?_, fun ⟨hx1, hx2⟩ => ⟨⟨x, hx1⟩, hx2, rfl⟩⟩ rintro ⟨x, hx, rfl⟩ exact ⟨Subtype.mem x, hx⟩ open scoped Classical in instance instZLattice_unitLattice : IsZLattice ℝ (unitLattice K) where span_top := unitLattice_span_eq_top K protected theorem finrank_eq_rank : finrank ℝ (logSpace K) = Units.rank K := by classical simp only [finrank_fintype_fun_eq_card, Fintype.card_subtype_compl, Fintype.card_ofSubsingleton, rank] @[simp] theorem unitLattice_rank : finrank ℤ (unitLattice K) = Units.rank K := by classical rw [← Units.finrank_eq_rank, ZLattice.rank ℝ] /-- The map obtained by quotienting by the kernel of `logEmbedding`. -/ def logEmbeddingQuot : Additive ((𝓞 K)ˣ ⧸ (torsion K)) →+ logSpace K := MonoidHom.toAdditive' <\| (QuotientGroup.kerLift (AddMonoidHom.toMultiplicative' (logEmbedding K))).comp (QuotientGroup.quotientMulEquivOfEq (by ext rw [MonoidHom.mem_ker, AddMonoidHom.toMultiplicative'_apply_apply, ofAdd_eq_one, ← logEmbedding_eq_zero_iff])).toMonoidHom @[simp] theorem logEmbeddingQuot_apply (x : (𝓞 K)ˣ) : logEmbeddingQuot K (Additive.ofMul (QuotientGroup.mk x)) = logEmbedding K (Additive.ofMul x) := rfl theorem logEmbeddingQuot_injective : Function.Injective (logEmbeddingQuot K) := by unfold logEmbeddingQuot intro _ _ h simp_rw [MonoidHom.toAdditive'_apply_apply, MonoidHom.coe_comp, MulEquiv.coe_toMonoidHom, Function.comp_apply, EmbeddingLike.apply_eq_iff_eq] at h exact (EmbeddingLike.apply_eq_iff_eq _).mp <\| (QuotientGroup.kerLift_injective _).eq_iff.mp h /-- The linear equivalence between `(𝓞 K)ˣ ⧸ (torsion K)` as an additive `ℤ`-module and `unitLattice` . -/ def logEmbeddingEquiv : Additive ((𝓞 K)ˣ ⧸ (torsion K)) ≃ₗ[ℤ] (unitLattice K) := LinearEquiv.ofBijective ((logEmbeddingQuot K).codRestrict (unitLattice K) (Quotient.ind fun _ ↦ logEmbeddingQuot_apply K _ ▸ Submodule.mem_map_of_mem trivial)).toIntLinearMap ⟨fun _ _ ↦ by rw [AddMonoidHom.coe_toIntLinearMap, AddMonoidHom.codRestrict_apply, AddMonoidHom.codRestrict_apply, Subtype.mk.injEq] apply logEmbeddingQuot_injective K, fun ⟨a, ⟨b, _, ha⟩⟩ ↦ ⟨⟦b⟧, by simpa using ha⟩⟩ @[simp] theorem logEmbeddingEquiv_apply (x : (𝓞 K)ˣ) : logEmbeddingEquiv K (Additive.ofMul (QuotientGroup.mk x)) = logEmbedding K (Additive.ofMul x) := rfl instance : Module.Free ℤ (Additive ((𝓞 K)ˣ ⧸ (torsion K))) := by classical exact Module.Free.of_equiv (logEmbeddingEquiv K).symm instance : Module.Finite ℤ (Additive ((𝓞 K)ˣ ⧸ (torsion K))) := by classical exact Module.Finite.equiv (logEmbeddingEquiv K).symm -- Note that we prove this instance first and then deduce from it the instance -- `Monoid.FG (𝓞 K)ˣ`, and not the other way around, due to no `Subgroup` version -- of `Submodule.fg_of_fg_map_of_fg_inf_ker` existing. instance : Module.Finite ℤ (Additive (𝓞 K)ˣ) := by rw [Module.finite_def] refine Submodule.fg_of_fg_map_of_fg_inf_ker (MonoidHom.toAdditive (QuotientGroup.mk' (torsion K))).toIntLinearMap ?_ ?_ · rw [Submodule.map_top, LinearMap.range_eq_top.mpr (by exact QuotientGroup.mk'_surjective (torsion K)), ← Module.finite_def] infer_instance · rw [inf_of_le_right le_top, AddMonoidHom.coe_toIntLinearMap_ker, MonoidHom.coe_toAdditive_ker, QuotientGroup.ker_mk', Submodule.fg_iff_add_subgroup_fg, AddSubgroup.toIntSubmodule_toAddSubgroup, ← AddGroup.fg_iff_addSubgroup_fg] have : Finite (Subgroup.toAddSubgroup (torsion K)) := (inferInstance : Finite (torsion K)) exact AddGroup.fg_of_finite instance : Monoid.FG (𝓞 K)ˣ := by rw [Monoid.fg_iff_add_fg, ← AddGroup.fg_iff_addMonoid_fg, ← Module.Finite.iff_addGroup_fg] infer_instance theorem rank_modTorsion : Module.finrank ℤ (Additive ((𝓞 K)ˣ ⧸ (torsion K))) = rank K := by rw [← LinearEquiv.finrank_eq (logEmbeddingEquiv K).symm, unitLattice_rank] /-- A basis of the quotient `(𝓞 K)ˣ ⧸ (torsion K)` seen as an additive ℤ-module. -/ def basisModTorsion : Basis (Fin (rank K)) ℤ (Additive ((𝓞 K)ˣ ⧸ (torsion K))) := Basis.reindex (Module.Free.chooseBasis ℤ _) (Fintype.equivOfCardEq <\| by rw [← Module.finrank_eq_card_chooseBasisIndex, rank_modTorsion, Fintype.card_fin]) /-- The basis of the `unitLattice` obtained by mapping `basisModTorsion` via `logEmbedding`. -/ def basisUnitLattice : Basis (Fin (rank K)) ℤ (unitLattice K) := (basisModTorsion K).map (logEmbeddingEquiv K) /-- A fundamental system of units of `K`. The units of `fundSystem` are arbitrary lifts of the units in `basisModTorsion`. -/ def fundSystem : Fin (rank K) → (𝓞 K)ˣ := -- `:)` prevents the `⧸` decaying to a quotient by `leftRel` when we unfold this later fun i => Quotient.out ((basisModTorsion K i).toMul:) theorem fundSystem_mk (i : Fin (rank K)) : Additive.ofMul (QuotientGroup.mk (fundSystem K i)) = (basisModTorsion K i) := by simp_rw [fundSystem, Equiv.apply_eq_iff_eq_symm_apply, Additive.ofMul_symm_eq, Quotient.out_eq'] theorem logEmbedding_fundSystem (i : Fin (rank K)) : logEmbedding K (Additive.ofMul (fundSystem K i)) = basisUnitLattice K i := by rw [basisUnitLattice, Basis.map_apply, ← fundSystem_mk, logEmbeddingEquiv_apply]	/-- The exponents that appear in the unique decomposition of a unit as the product of a root of unity and powers of the units of the fundamental system `fundSystem` (see `exist_unique_eq_mul_prod`) are given by the representation of the unit on `basisModTorsion`. -/ theorem fun_eq_repr {x ζ : (𝓞 K)ˣ} {f : Fin (rank K) → ℤ} (hζ : ζ ∈ torsion K)	Mathlib/NumberTheory/NumberField/Units/DirichletTheorem.lean	467	471

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