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import Mathlib.CategoryTheory.EpiMono import Mathlib.CategoryTheory.Limits.HasLimits #align_import category_theory.limits.shapes.equalizers from "leanprover-community/mathlib"@"4698e35ca56a0d4fa53aa5639c3364e0a77f4eba" section open CategoryTheory Opposite namespace CategoryTheory.Limits -- attribute [local tidy] tactic.case_bash -- Porting note: no tidy nor cases_bash universe v v₂ u u₂ inductive WalkingParallelPair : Type \| zero \| one deriving DecidableEq, Inhabited #align category_theory.limits.walking_parallel_pair CategoryTheory.Limits.WalkingParallelPair open WalkingParallelPair inductive WalkingParallelPairHom : WalkingParallelPair → WalkingParallelPair → Type \| left : WalkingParallelPairHom zero one \| right : WalkingParallelPairHom zero one \| id (X : WalkingParallelPair) : WalkingParallelPairHom X X deriving DecidableEq #align category_theory.limits.walking_parallel_pair_hom CategoryTheory.Limits.WalkingParallelPairHom attribute [-simp, nolint simpNF] WalkingParallelPairHom.id.sizeOf_spec instance : Inhabited (WalkingParallelPairHom zero one) where default := WalkingParallelPairHom.left open WalkingParallelPairHom 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 #align category_theory.limits.walking_parallel_pair_hom.comp CategoryTheory.Limits.WalkingParallelPairHom.comp -- 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 #align category_theory.limits.walking_parallel_pair_hom_category CategoryTheory.Limits.walkingParallelPairHomCategory @[simp] theorem walkingParallelPairHom_id (X : WalkingParallelPair) : WalkingParallelPairHom.id X = 𝟙 X := rfl #align category_theory.limits.walking_parallel_pair_hom_id CategoryTheory.Limits.walkingParallelPairHom_id -- Porting note: simpNF asked me to do this because the LHS of the non-primed version reduced @[simp] theorem WalkingParallelPairHom.id.sizeOf_spec' (X : WalkingParallelPair) : (WalkingParallelPairHom._sizeOf_inst X X).sizeOf (𝟙 X) = 1 + sizeOf X := by cases X <;> rfl 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 #align category_theory.limits.walking_parallel_pair_op CategoryTheory.Limits.walkingParallelPairOp @[simp] theorem walkingParallelPairOp_zero : walkingParallelPairOp.obj zero = op one := rfl #align category_theory.limits.walking_parallel_pair_op_zero CategoryTheory.Limits.walkingParallelPairOp_zero @[simp] theorem walkingParallelPairOp_one : walkingParallelPairOp.obj one = op zero := rfl #align category_theory.limits.walking_parallel_pair_op_one CategoryTheory.Limits.walkingParallelPairOp_one @[simp] theorem walkingParallelPairOp_left : walkingParallelPairOp.map left = @Quiver.Hom.op _ _ zero one left := rfl #align category_theory.limits.walking_parallel_pair_op_left CategoryTheory.Limits.walkingParallelPairOp_left @[simp] theorem walkingParallelPairOp_right : walkingParallelPairOp.map right = @Quiver.Hom.op _ _ zero one right := rfl #align category_theory.limits.walking_parallel_pair_op_right CategoryTheory.Limits.walkingParallelPairOp_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 #align category_theory.limits.walking_parallel_pair_op_equiv CategoryTheory.Limits.walkingParallelPairOpEquiv @[simp] theorem walkingParallelPairOpEquiv_unitIso_zero : walkingParallelPairOpEquiv.unitIso.app zero = Iso.refl zero := rfl #align category_theory.limits.walking_parallel_pair_op_equiv_unit_iso_zero CategoryTheory.Limits.walkingParallelPairOpEquiv_unitIso_zero @[simp] theorem walkingParallelPairOpEquiv_unitIso_one : walkingParallelPairOpEquiv.unitIso.app one = Iso.refl one := rfl #align category_theory.limits.walking_parallel_pair_op_equiv_unit_iso_one CategoryTheory.Limits.walkingParallelPairOpEquiv_unitIso_one @[simp] theorem walkingParallelPairOpEquiv_counitIso_zero : walkingParallelPairOpEquiv.counitIso.app (op zero) = Iso.refl (op zero) := rfl #align category_theory.limits.walking_parallel_pair_op_equiv_counit_iso_zero CategoryTheory.Limits.walkingParallelPairOpEquiv_counitIso_zero @[simp] theorem walkingParallelPairOpEquiv_counitIso_one : walkingParallelPairOpEquiv.counitIso.app (op one) = Iso.refl (op one) := rfl #align category_theory.limits.walking_parallel_pair_op_equiv_counit_iso_one CategoryTheory.Limits.walkingParallelPairOpEquiv_counitIso_one variable {C : Type u} [Category.{v} C] variable {X Y : C} 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} #align category_theory.limits.parallel_pair CategoryTheory.Limits.parallelPair @[simp] theorem parallelPair_obj_zero (f g : X ⟶ Y) : (parallelPair f g).obj zero = X := rfl #align category_theory.limits.parallel_pair_obj_zero CategoryTheory.Limits.parallelPair_obj_zero @[simp] theorem parallelPair_obj_one (f g : X ⟶ Y) : (parallelPair f g).obj one = Y := rfl #align category_theory.limits.parallel_pair_obj_one CategoryTheory.Limits.parallelPair_obj_one @[simp] theorem parallelPair_map_left (f g : X ⟶ Y) : (parallelPair f g).map left = f := rfl #align category_theory.limits.parallel_pair_map_left CategoryTheory.Limits.parallelPair_map_left @[simp] theorem parallelPair_map_right (f g : X ⟶ Y) : (parallelPair f g).map right = g := rfl #align category_theory.limits.parallel_pair_map_right CategoryTheory.Limits.parallelPair_map_right @[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 #align category_theory.limits.parallel_pair_functor_obj CategoryTheory.Limits.parallelPair_functor_obj @[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) #align category_theory.limits.diagram_iso_parallel_pair CategoryTheory.Limits.diagramIsoParallelPair 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]} #align category_theory.limits.parallel_pair_hom CategoryTheory.Limits.parallelPairHom @[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 #align category_theory.limits.parallel_pair_hom_app_zero CategoryTheory.Limits.parallelPairHom_app_zero @[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 #align category_theory.limits.parallel_pair_hom_app_one CategoryTheory.Limits.parallelPairHom_app_one @[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]) #align category_theory.limits.parallel_pair.ext CategoryTheory.Limits.parallelPair.ext @[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]) #align category_theory.limits.parallel_pair.eq_of_hom_eq CategoryTheory.Limits.parallelPair.eqOfHomEq abbrev Fork (f g : X ⟶ Y) := Cone (parallelPair f g) #align category_theory.limits.fork CategoryTheory.Limits.Fork abbrev Cofork (f g : X ⟶ Y) := Cocone (parallelPair f g) #align category_theory.limits.cofork CategoryTheory.Limits.Cofork variable {f g : X ⟶ Y} def Fork.ι (t : Fork f g) := t.π.app zero #align category_theory.limits.fork.ι CategoryTheory.Limits.Fork.ι @[simp] theorem Fork.app_zero_eq_ι (t : Fork f g) : t.π.app zero = t.ι := rfl #align category_theory.limits.fork.app_zero_eq_ι CategoryTheory.Limits.Fork.app_zero_eq_ι def Cofork.π (t : Cofork f g) := t.ι.app one #align category_theory.limits.cofork.π CategoryTheory.Limits.Cofork.π @[simp] theorem Cofork.app_one_eq_π (t : Cofork f g) : t.ι.app one = t.π := rfl #align category_theory.limits.cofork.app_one_eq_π CategoryTheory.Limits.Cofork.app_one_eq_π @[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] #align category_theory.limits.fork.app_one_eq_ι_comp_left CategoryTheory.Limits.Fork.app_one_eq_ι_comp_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] #align category_theory.limits.fork.app_one_eq_ι_comp_right CategoryTheory.Limits.Fork.app_one_eq_ι_comp_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] #align category_theory.limits.cofork.app_zero_eq_comp_π_left CategoryTheory.Limits.Cofork.app_zero_eq_comp_π_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] #align category_theory.limits.cofork.app_zero_eq_comp_π_right CategoryTheory.Limits.Cofork.app_zero_eq_comp_π_right @[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 } #align category_theory.limits.fork.of_ι CategoryTheory.Limits.Fork.ofι @[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] } #align category_theory.limits.cofork.of_π CategoryTheory.Limits.Cofork.ofπ -- 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 #align category_theory.limits.fork.ι_of_ι CategoryTheory.Limits.Fork.ι_ofι @[simp] theorem Cofork.π_ofπ {P : C} (π : Y ⟶ P) (w : f ≫ π = g ≫ π) : (Cofork.ofπ π w).π = π := rfl #align category_theory.limits.cofork.π_of_π CategoryTheory.Limits.Cofork.π_ofπ @[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] #align category_theory.limits.fork.condition CategoryTheory.Limits.Fork.condition @[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] #align category_theory.limits.cofork.condition CategoryTheory.Limits.Cofork.condition 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] #align category_theory.limits.fork.equalizer_ext CategoryTheory.Limits.Fork.equalizer_ext 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 #align category_theory.limits.cofork.coequalizer_ext CategoryTheory.Limits.Cofork.coequalizer_ext 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 #align category_theory.limits.fork.is_limit.hom_ext CategoryTheory.Limits.Fork.IsLimit.hom_ext 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 #align category_theory.limits.cofork.is_colimit.hom_ext CategoryTheory.Limits.Cofork.IsColimit.hom_ext @[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 _ _ #align category_theory.limits.fork.is_limit.lift_ι CategoryTheory.Limits.Fork.IsLimit.lift_ι @[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 _ _ #align category_theory.limits.cofork.is_colimit.π_desc CategoryTheory.Limits.Cofork.IsColimit.π_desc -- Porting note: `Fork.IsLimit.lift` was added in order to ease the port 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 _ _ 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⟩ #align category_theory.limits.fork.is_limit.lift' CategoryTheory.Limits.Fork.IsLimit.lift' -- Porting note: `Cofork.IsColimit.desc` was added in order to ease the port 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 _ _ 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⟩ #align category_theory.limits.cofork.is_colimit.desc' CategoryTheory.Limits.Cofork.IsColimit.desc' 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⟩ #align category_theory.limits.fork.is_limit.exists_unique CategoryTheory.Limits.Fork.IsLimit.existsUnique 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⟩ #align category_theory.limits.cofork.is_colimit.exists_unique CategoryTheory.Limits.Cofork.IsColimit.existsUnique @[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} #align category_theory.limits.fork.is_limit.mk CategoryTheory.Limits.Fork.IsLimit.mk 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 #align category_theory.limits.fork.is_limit.mk' CategoryTheory.Limits.Fork.IsLimit.mk' 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 } #align category_theory.limits.cofork.is_colimit.mk CategoryTheory.Limits.Cofork.IsColimit.mk 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 #align category_theory.limits.cofork.is_colimit.mk' CategoryTheory.Limits.Cofork.IsColimit.mk' 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 #align category_theory.limits.fork.is_limit.of_exists_unique CategoryTheory.Limits.Fork.IsLimit.ofExistsUnique 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 #align category_theory.limits.cofork.is_colimit.of_exists_unique CategoryTheory.Limits.Cofork.IsColimit.ofExistsUnique @[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 k := Fork.IsLimit.hom_ext ht (Fork.IsLimit.lift' _ _ _).prop right_inv h := Subtype.ext (Fork.IsLimit.lift' ht _ _).prop #align category_theory.limits.fork.is_limit.hom_iso CategoryTheory.Limits.Fork.IsLimit.homIso 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 _ _ _ #align category_theory.limits.fork.is_limit.hom_iso_natural CategoryTheory.Limits.Fork.IsLimit.homIso_natural @[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 k := Cofork.IsColimit.hom_ext ht (Cofork.IsColimit.desc' _ _ _).prop right_inv h := Subtype.ext (Cofork.IsColimit.desc' ht _ _).prop #align category_theory.limits.cofork.is_colimit.hom_iso CategoryTheory.Limits.Cofork.IsColimit.homIso 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 #align category_theory.limits.cofork.is_colimit.hom_iso_natural CategoryTheory.Limits.Cofork.IsColimit.homIso_natural 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 aesop) naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp [t.condition]}} #align category_theory.limits.cone.of_fork CategoryTheory.Limits.Cone.ofFork 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 aesop) ≫ t.ι.app X naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp [t.condition]}} #align category_theory.limits.cocone.of_cofork CategoryTheory.Limits.Cocone.ofCofork @[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 aesop) := rfl #align category_theory.limits.cone.of_fork_π CategoryTheory.Limits.Cone.ofFork_π @[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 aesop) ≫ t.ι.app j := rfl #align category_theory.limits.cocone.of_cofork_ι CategoryTheory.Limits.Cocone.ofCofork_ι 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 aesop) naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp}} #align category_theory.limits.fork.of_cone CategoryTheory.Limits.Fork.ofCone 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 aesop) ≫ t.ι.app X naturality := by rintro _ _ (_\|_\|_) <;> {dsimp; simp}} #align category_theory.limits.cofork.of_cocone CategoryTheory.Limits.Cofork.ofCocone @[simp] theorem Fork.ofCone_π {F : WalkingParallelPair ⥤ C} (t : Cone F) (j) : (Fork.ofCone t).π.app j = t.π.app j ≫ eqToHom (by aesop) := rfl #align category_theory.limits.fork.of_cone_π CategoryTheory.Limits.Fork.ofCone_π @[simp] theorem Cofork.ofCocone_ι {F : WalkingParallelPair ⥤ C} (t : Cocone F) (j) : (Cofork.ofCocone t).ι.app j = eqToHom (by aesop) ≫ t.ι.app j := rfl #align category_theory.limits.cofork.of_cocone_ι CategoryTheory.Limits.Cofork.ofCocone_ι @[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 #align category_theory.limits.fork.ι_postcompose CategoryTheory.Limits.Fork.ι_postcompose @[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 #align category_theory.limits.cofork.π_precompose CategoryTheory.Limits.Cofork.π_precompose @[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 #align category_theory.limits.fork.mk_hom CategoryTheory.Limits.Fork.mkHom @[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]) #align category_theory.limits.fork.ext CategoryTheory.Limits.Fork.ext 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]) 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) #align category_theory.limits.fork.iso_fork_of_ι CategoryTheory.Limits.Fork.isoForkOfι 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 @[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 #align category_theory.limits.cofork.mk_hom CategoryTheory.Limits.Cofork.mkHom @[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 #align category_theory.limits.fork.hom_comp_ι CategoryTheory.Limits.Fork.hom_comp_ι @[reassoc (attr := simp)]	Mathlib/CategoryTheory/Limits/Shapes/Equalizers.lean	735	736	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
import Mathlib.CategoryTheory.Sites.Sieves import Mathlib.CategoryTheory.Limits.Shapes.Pullbacks import Mathlib.CategoryTheory.Limits.Shapes.Multiequalizer import Mathlib.CategoryTheory.Category.Preorder import Mathlib.Order.Copy import Mathlib.Data.Set.Subsingleton #align_import category_theory.sites.grothendieck from "leanprover-community/mathlib"@"14b69e9f3c16630440a2cbd46f1ddad0d561dee7" universe v₁ u₁ v u namespace CategoryTheory open CategoryTheory Category variable (C : Type u) [Category.{v} C] structure GrothendieckTopology where sieves : ∀ X : C, Set (Sieve X) top_mem' : ∀ X, ⊤ ∈ sieves X pullback_stable' : ∀ ⦃X Y : C⦄ ⦃S : Sieve X⦄ (f : Y ⟶ X), S ∈ sieves X → S.pullback f ∈ sieves Y transitive' : ∀ ⦃X⦄ ⦃S : Sieve X⦄ (_ : S ∈ sieves X) (R : Sieve X), (∀ ⦃Y⦄ ⦃f : Y ⟶ X⦄, S f → R.pullback f ∈ sieves Y) → R ∈ sieves X #align category_theory.grothendieck_topology CategoryTheory.GrothendieckTopology namespace GrothendieckTopology instance : CoeFun (GrothendieckTopology C) fun _ => ∀ X : C, Set (Sieve X) := ⟨sieves⟩ variable {C} variable {X Y : C} {S R : Sieve X} variable (J : GrothendieckTopology C) @[ext] theorem ext {J₁ J₂ : GrothendieckTopology C} (h : (J₁ : ∀ X : C, Set (Sieve X)) = J₂) : J₁ = J₂ := by cases J₁ cases J₂ congr #align category_theory.grothendieck_topology.ext CategoryTheory.GrothendieckTopology.ext @[simp] theorem top_mem (X : C) : ⊤ ∈ J X := J.top_mem' X #align category_theory.grothendieck_topology.top_mem CategoryTheory.GrothendieckTopology.top_mem @[simp] theorem pullback_stable (f : Y ⟶ X) (hS : S ∈ J X) : S.pullback f ∈ J Y := J.pullback_stable' f hS #align category_theory.grothendieck_topology.pullback_stable CategoryTheory.GrothendieckTopology.pullback_stable theorem transitive (hS : S ∈ J X) (R : Sieve X) (h : ∀ ⦃Y⦄ ⦃f : Y ⟶ X⦄, S f → R.pullback f ∈ J Y) : R ∈ J X := J.transitive' hS R h #align category_theory.grothendieck_topology.transitive CategoryTheory.GrothendieckTopology.transitive theorem covering_of_eq_top : S = ⊤ → S ∈ J X := fun h => h.symm ▸ J.top_mem X #align category_theory.grothendieck_topology.covering_of_eq_top CategoryTheory.GrothendieckTopology.covering_of_eq_top theorem superset_covering (Hss : S ≤ R) (sjx : S ∈ J X) : R ∈ J X := by apply J.transitive sjx R fun Y f hf => _ intros Y f hf apply covering_of_eq_top rw [← top_le_iff, ← S.pullback_eq_top_of_mem hf] apply Sieve.pullback_monotone _ Hss #align category_theory.grothendieck_topology.superset_covering CategoryTheory.GrothendieckTopology.superset_covering theorem intersection_covering (rj : R ∈ J X) (sj : S ∈ J X) : R ⊓ S ∈ J X := by apply J.transitive rj _ fun Y f Hf => _ intros Y f hf rw [Sieve.pullback_inter, R.pullback_eq_top_of_mem hf] simp [sj] #align category_theory.grothendieck_topology.intersection_covering CategoryTheory.GrothendieckTopology.intersection_covering @[simp] theorem intersection_covering_iff : R ⊓ S ∈ J X ↔ R ∈ J X ∧ S ∈ J X := ⟨fun h => ⟨J.superset_covering inf_le_left h, J.superset_covering inf_le_right h⟩, fun t => intersection_covering _ t.1 t.2⟩ #align category_theory.grothendieck_topology.intersection_covering_iff CategoryTheory.GrothendieckTopology.intersection_covering_iff theorem bind_covering {S : Sieve X} {R : ∀ ⦃Y : C⦄ ⦃f : Y ⟶ X⦄, S f → Sieve Y} (hS : S ∈ J X) (hR : ∀ ⦃Y⦄ ⦃f : Y ⟶ X⦄ (H : S f), R H ∈ J Y) : Sieve.bind S R ∈ J X := J.transitive hS _ fun _ f hf => superset_covering J (Sieve.le_pullback_bind S R f hf) (hR hf) #align category_theory.grothendieck_topology.bind_covering CategoryTheory.GrothendieckTopology.bind_covering def Covers (S : Sieve X) (f : Y ⟶ X) : Prop := S.pullback f ∈ J Y #align category_theory.grothendieck_topology.covers CategoryTheory.GrothendieckTopology.Covers theorem covers_iff (S : Sieve X) (f : Y ⟶ X) : J.Covers S f ↔ S.pullback f ∈ J Y := Iff.rfl #align category_theory.grothendieck_topology.covers_iff CategoryTheory.GrothendieckTopology.covers_iff theorem covering_iff_covers_id (S : Sieve X) : S ∈ J X ↔ J.Covers S (𝟙 X) := by simp [covers_iff] #align category_theory.grothendieck_topology.covering_iff_covers_id CategoryTheory.GrothendieckTopology.covering_iff_covers_id theorem arrow_max (f : Y ⟶ X) (S : Sieve X) (hf : S f) : J.Covers S f := by rw [Covers, (Sieve.pullback_eq_top_iff_mem f).1 hf] apply J.top_mem #align category_theory.grothendieck_topology.arrow_max CategoryTheory.GrothendieckTopology.arrow_max theorem arrow_stable (f : Y ⟶ X) (S : Sieve X) (h : J.Covers S f) {Z : C} (g : Z ⟶ Y) : J.Covers S (g ≫ f) := by rw [covers_iff] at h ⊢ simp [h, Sieve.pullback_comp] #align category_theory.grothendieck_topology.arrow_stable CategoryTheory.GrothendieckTopology.arrow_stable theorem arrow_trans (f : Y ⟶ X) (S R : Sieve X) (h : J.Covers S f) : (∀ {Z : C} (g : Z ⟶ X), S g → J.Covers R g) → J.Covers R f := by intro k apply J.transitive h intro Z g hg rw [← Sieve.pullback_comp] apply k (g ≫ f) hg #align category_theory.grothendieck_topology.arrow_trans CategoryTheory.GrothendieckTopology.arrow_trans theorem arrow_intersect (f : Y ⟶ X) (S R : Sieve X) (hS : J.Covers S f) (hR : J.Covers R f) : J.Covers (S ⊓ R) f := by simpa [covers_iff] using And.intro hS hR #align category_theory.grothendieck_topology.arrow_intersect CategoryTheory.GrothendieckTopology.arrow_intersect variable (C) def trivial : GrothendieckTopology C where sieves X := {⊤} top_mem' X := rfl pullback_stable' X Y S f hf := by rw [Set.mem_singleton_iff] at hf ⊢ simp [hf] transitive' X S hS R hR := by rw [Set.mem_singleton_iff, ← Sieve.id_mem_iff_eq_top] at hS simpa using hR hS #align category_theory.grothendieck_topology.trivial CategoryTheory.GrothendieckTopology.trivial def discrete : GrothendieckTopology C where sieves X := Set.univ top_mem' := by simp pullback_stable' X Y f := by simp transitive' := by simp #align category_theory.grothendieck_topology.discrete CategoryTheory.GrothendieckTopology.discrete variable {C} theorem trivial_covering : S ∈ trivial C X ↔ S = ⊤ := Set.mem_singleton_iff #align category_theory.grothendieck_topology.trivial_covering CategoryTheory.GrothendieckTopology.trivial_covering instance instLEGrothendieckTopology : LE (GrothendieckTopology C) where le J₁ J₂ := (J₁ : ∀ X : C, Set (Sieve X)) ≤ (J₂ : ∀ X : C, Set (Sieve X)) theorem le_def {J₁ J₂ : GrothendieckTopology C} : J₁ ≤ J₂ ↔ (J₁ : ∀ X : C, Set (Sieve X)) ≤ J₂ := Iff.rfl #align category_theory.grothendieck_topology.le_def CategoryTheory.GrothendieckTopology.le_def instance : PartialOrder (GrothendieckTopology C) := { instLEGrothendieckTopology with le_refl := fun J₁ => le_def.mpr le_rfl le_trans := fun J₁ J₂ J₃ h₁₂ h₂₃ => le_def.mpr (le_trans h₁₂ h₂₃) le_antisymm := fun J₁ J₂ h₁₂ h₂₁ => GrothendieckTopology.ext (le_antisymm h₁₂ h₂₁) } instance : InfSet (GrothendieckTopology C) where sInf T := { sieves := sInf (sieves '' T) top_mem' := by rintro X S ⟨⟨_, J, hJ, rfl⟩, rfl⟩ simp pullback_stable' := by rintro X Y S hS f _ ⟨⟨_, J, hJ, rfl⟩, rfl⟩ apply J.pullback_stable _ (f _ ⟨⟨_, _, hJ, rfl⟩, rfl⟩) transitive' := by rintro X S hS R h _ ⟨⟨_, J, hJ, rfl⟩, rfl⟩ apply J.transitive (hS _ ⟨⟨_, _, hJ, rfl⟩, rfl⟩) _ fun Y f hf => h hf _ ⟨⟨_, _, hJ, rfl⟩, rfl⟩ }	Mathlib/CategoryTheory/Sites/Grothendieck.lean	286	290	theorem isGLB_sInf (s : Set (GrothendieckTopology C)) : IsGLB s (sInf s) := by	refine @IsGLB.of_image _ _ _ _ sieves ?_ _ _ ?_ · intros rfl · exact _root_.isGLB_sInf _
import Mathlib.Algebra.Order.BigOperators.Ring.Finset import Mathlib.Analysis.Convex.Hull import Mathlib.LinearAlgebra.AffineSpace.Basis #align_import analysis.convex.combination from "leanprover-community/mathlib"@"92bd7b1ffeb306a89f450bee126ddd8a284c259d" open Set Function open scoped Classical open Pointwise universe u u' variable {R R' E F ι ι' α : Type} [LinearOrderedField R] [LinearOrderedField R'] [AddCommGroup E] [AddCommGroup F] [LinearOrderedAddCommGroup α] [Module R E] [Module R F] [Module R α] [OrderedSMul R α] {s : Set E} def Finset.centerMass (t : Finset ι) (w : ι → R) (z : ι → E) : E := (∑ i ∈ t, w i)⁻¹ • ∑ i ∈ t, w i • z i #align finset.center_mass Finset.centerMass variable (i j : ι) (c : R) (t : Finset ι) (w : ι → R) (z : ι → E) open Finset theorem Finset.centerMass_empty : (∅ : Finset ι).centerMass w z = 0 := by simp only [centerMass, sum_empty, smul_zero] #align finset.center_mass_empty Finset.centerMass_empty theorem Finset.centerMass_pair (hne : i ≠ j) : ({i, j} : Finset ι).centerMass w z = (w i / (w i + w j)) • z i + (w j / (w i + w j)) • z j := by simp only [centerMass, sum_pair hne, smul_add, (mul_smul _ _ _).symm, div_eq_inv_mul] #align finset.center_mass_pair Finset.centerMass_pair variable {w} theorem Finset.centerMass_insert (ha : i ∉ t) (hw : ∑ j ∈ t, w j ≠ 0) : (insert i t).centerMass w z = (w i / (w i + ∑ j ∈ t, w j)) • z i + ((∑ j ∈ t, w j) / (w i + ∑ j ∈ t, w j)) • t.centerMass w z := by simp only [centerMass, sum_insert ha, smul_add, (mul_smul _ _ _).symm, ← div_eq_inv_mul] congr 2 rw [div_mul_eq_mul_div, mul_inv_cancel hw, one_div] #align finset.center_mass_insert Finset.centerMass_insert theorem Finset.centerMass_singleton (hw : w i ≠ 0) : ({i} : Finset ι).centerMass w z = z i := by rw [centerMass, sum_singleton, sum_singleton, ← mul_smul, inv_mul_cancel hw, one_smul] #align finset.center_mass_singleton Finset.centerMass_singleton @[simp] lemma Finset.centerMass_neg_left : t.centerMass (-w) z = t.centerMass w z := by simp [centerMass, inv_neg] lemma Finset.centerMass_smul_left {c : R'} [Module R' R] [Module R' E] [SMulCommClass R' R R] [IsScalarTower R' R R] [SMulCommClass R R' E] [IsScalarTower R' R E] (hc : c ≠ 0) : t.centerMass (c • w) z = t.centerMass w z := by simp [centerMass, -smul_assoc, smul_assoc c, ← smul_sum, smul_inv₀, smul_smul_smul_comm, hc] theorem Finset.centerMass_eq_of_sum_1 (hw : ∑ i ∈ t, w i = 1) : t.centerMass w z = ∑ i ∈ t, w i • z i := by simp only [Finset.centerMass, hw, inv_one, one_smul] #align finset.center_mass_eq_of_sum_1 Finset.centerMass_eq_of_sum_1 theorem Finset.centerMass_smul : (t.centerMass w fun i => c • z i) = c • t.centerMass w z := by simp only [Finset.centerMass, Finset.smul_sum, (mul_smul _ _ _).symm, mul_comm c, mul_assoc] #align finset.center_mass_smul Finset.centerMass_smul theorem Finset.centerMass_segment' (s : Finset ι) (t : Finset ι') (ws : ι → R) (zs : ι → E) (wt : ι' → R) (zt : ι' → E) (hws : ∑ i ∈ s, ws i = 1) (hwt : ∑ i ∈ t, wt i = 1) (a b : R) (hab : a + b = 1) : a • s.centerMass ws zs + b • t.centerMass wt zt = (s.disjSum t).centerMass (Sum.elim (fun i => a ws i) fun j => b * wt j) (Sum.elim zs zt) := by rw [s.centerMass_eq_of_sum_1 _ hws, t.centerMass_eq_of_sum_1 _ hwt, smul_sum, smul_sum, ← Finset.sum_sum_elim, Finset.centerMass_eq_of_sum_1] · congr with ⟨⟩ <;> simp only [Sum.elim_inl, Sum.elim_inr, mul_smul] · rw [sum_sum_elim, ← mul_sum, ← mul_sum, hws, hwt, mul_one, mul_one, hab] #align finset.center_mass_segment' Finset.centerMass_segment' theorem Finset.centerMass_segment (s : Finset ι) (w₁ w₂ : ι → R) (z : ι → E) (hw₁ : ∑ i ∈ s, w₁ i = 1) (hw₂ : ∑ i ∈ s, w₂ i = 1) (a b : R) (hab : a + b = 1) : a • s.centerMass w₁ z + b • s.centerMass w₂ z = s.centerMass (fun i => a * w₁ i + b * w₂ i) z := by have hw : (∑ i ∈ s, (a * w₁ i + b * w₂ i)) = 1 := by simp only [← mul_sum, sum_add_distrib, mul_one, ] simp only [Finset.centerMass_eq_of_sum_1, Finset.centerMass_eq_of_sum_1 _ _ hw, smul_sum, sum_add_distrib, add_smul, mul_smul, ] #align finset.center_mass_segment Finset.centerMass_segment theorem Finset.centerMass_ite_eq (hi : i ∈ t) : t.centerMass (fun j => if i = j then (1 : R) else 0) z = z i := by rw [Finset.centerMass_eq_of_sum_1] · trans ∑ j ∈ t, if i = j then z i else 0 · congr with i split_ifs with h exacts [h ▸ one_smul _ _, zero_smul _ _] · rw [sum_ite_eq, if_pos hi] · rw [sum_ite_eq, if_pos hi] #align finset.center_mass_ite_eq Finset.centerMass_ite_eq variable {t} theorem Finset.centerMass_subset {t' : Finset ι} (ht : t ⊆ t') (h : ∀ i ∈ t', i ∉ t → w i = 0) : t.centerMass w z = t'.centerMass w z := by rw [centerMass, sum_subset ht h, smul_sum, centerMass, smul_sum] apply sum_subset ht intro i hit' hit rw [h i hit' hit, zero_smul, smul_zero] #align finset.center_mass_subset Finset.centerMass_subset theorem Finset.centerMass_filter_ne_zero : (t.filter fun i => w i ≠ 0).centerMass w z = t.centerMass w z := Finset.centerMass_subset z (filter_subset _ _) fun i hit hit' => by simpa only [hit, mem_filter, true_and_iff, Ne, Classical.not_not] using hit' #align finset.center_mass_filter_ne_zero Finset.centerMass_filter_ne_zero variable {z} lemma Finset.centerMass_of_sum_add_sum_eq_zero {s t : Finset ι} (hw : ∑ i ∈ s, w i + ∑ i ∈ t, w i = 0) (hz : ∑ i ∈ s, w i • z i + ∑ i ∈ t, w i • z i = 0) : s.centerMass w z = t.centerMass w z := by simp [centerMass, eq_neg_of_add_eq_zero_right hw, eq_neg_of_add_eq_zero_left hz, ← neg_inv] theorem Convex.centerMass_mem (hs : Convex R s) : (∀ i ∈ t, 0 ≤ w i) → (0 < ∑ i ∈ t, w i) → (∀ i ∈ t, z i ∈ s) → t.centerMass w z ∈ s := by induction' t using Finset.induction with i t hi ht · simp [lt_irrefl] intro h₀ hpos hmem have zi : z i ∈ s := hmem _ (mem_insert_self _ _) have hs₀ : ∀ j ∈ t, 0 ≤ w j := fun j hj => h₀ j <\| mem_insert_of_mem hj rw [sum_insert hi] at hpos by_cases hsum_t : ∑ j ∈ t, w j = 0 · have ws : ∀ j ∈ t, w j = 0 := (sum_eq_zero_iff_of_nonneg hs₀).1 hsum_t have wz : ∑ j ∈ t, w j • z j = 0 := sum_eq_zero fun i hi => by simp [ws i hi] simp only [centerMass, sum_insert hi, wz, hsum_t, add_zero] simp only [hsum_t, add_zero] at hpos rw [← mul_smul, inv_mul_cancel (ne_of_gt hpos), one_smul] exact zi · rw [Finset.centerMass_insert _ _ _ hi hsum_t] refine convex_iff_div.1 hs zi (ht hs₀ ?_ ?_) ?_ (sum_nonneg hs₀) hpos · exact lt_of_le_of_ne (sum_nonneg hs₀) (Ne.symm hsum_t) · intro j hj exact hmem j (mem_insert_of_mem hj) · exact h₀ _ (mem_insert_self _ _) #align convex.center_mass_mem Convex.centerMass_mem theorem Convex.sum_mem (hs : Convex R s) (h₀ : ∀ i ∈ t, 0 ≤ w i) (h₁ : ∑ i ∈ t, w i = 1) (hz : ∀ i ∈ t, z i ∈ s) : (∑ i ∈ t, w i • z i) ∈ s := by simpa only [h₁, centerMass, inv_one, one_smul] using hs.centerMass_mem h₀ (h₁.symm ▸ zero_lt_one) hz #align convex.sum_mem Convex.sum_mem theorem Convex.finsum_mem {ι : Sort} {w : ι → R} {z : ι → E} {s : Set E} (hs : Convex R s) (h₀ : ∀ i, 0 ≤ w i) (h₁ : ∑ᶠ i, w i = 1) (hz : ∀ i, w i ≠ 0 → z i ∈ s) : (∑ᶠ i, w i • z i) ∈ s := by have hfin_w : (support (w ∘ PLift.down)).Finite := by by_contra H rw [finsum, dif_neg H] at h₁ exact zero_ne_one h₁ have hsub : support ((fun i => w i • z i) ∘ PLift.down) ⊆ hfin_w.toFinset := (support_smul_subset_left _ _).trans hfin_w.coe_toFinset.ge rw [finsum_eq_sum_plift_of_support_subset hsub] refine hs.sum_mem (fun _ _ => h₀ _) ?_ fun i hi => hz _ ?_ · rwa [finsum, dif_pos hfin_w] at h₁ · rwa [hfin_w.mem_toFinset] at hi #align convex.finsum_mem Convex.finsum_mem theorem convex_iff_sum_mem : Convex R s ↔ ∀ (t : Finset E) (w : E → R), (∀ i ∈ t, 0 ≤ w i) → ∑ i ∈ t, w i = 1 → (∀ x ∈ t, x ∈ s) → (∑ x ∈ t, w x • x) ∈ s := by refine ⟨fun hs t w hw₀ hw₁ hts => hs.sum_mem hw₀ hw₁ hts, ?_⟩ intro h x hx y hy a b ha hb hab by_cases h_cases : x = y · rw [h_cases, ← add_smul, hab, one_smul] exact hy · convert h {x, y} (fun z => if z = y then b else a) _ _ _ -- Porting note: Original proof had 2 `simp_intro i hi` · simp only [sum_pair h_cases, if_neg h_cases, if_pos trivial] · intro i _ simp only split_ifs <;> assumption · simp only [sum_pair h_cases, if_neg h_cases, if_pos trivial, hab] · intro i hi simp only [Finset.mem_singleton, Finset.mem_insert] at hi cases hi <;> subst i <;> assumption #align convex_iff_sum_mem convex_iff_sum_mem theorem Finset.centerMass_mem_convexHull (t : Finset ι) {w : ι → R} (hw₀ : ∀ i ∈ t, 0 ≤ w i) (hws : 0 < ∑ i ∈ t, w i) {z : ι → E} (hz : ∀ i ∈ t, z i ∈ s) : t.centerMass w z ∈ convexHull R s := (convex_convexHull R s).centerMass_mem hw₀ hws fun i hi => subset_convexHull R s <\| hz i hi #align finset.center_mass_mem_convex_hull Finset.centerMass_mem_convexHull lemma Finset.centerMass_mem_convexHull_of_nonpos (t : Finset ι) (hw₀ : ∀ i ∈ t, w i ≤ 0) (hws : ∑ i ∈ t, w i < 0) (hz : ∀ i ∈ t, z i ∈ s) : t.centerMass w z ∈ convexHull R s := by rw [← centerMass_neg_left] exact Finset.centerMass_mem_convexHull _ (fun _i hi ↦ neg_nonneg.2 <\| hw₀ _ hi) (by simpa) hz theorem Finset.centerMass_id_mem_convexHull (t : Finset E) {w : E → R} (hw₀ : ∀ i ∈ t, 0 ≤ w i) (hws : 0 < ∑ i ∈ t, w i) : t.centerMass w id ∈ convexHull R (t : Set E) := t.centerMass_mem_convexHull hw₀ hws fun _ => mem_coe.2 #align finset.center_mass_id_mem_convex_hull Finset.centerMass_id_mem_convexHull lemma Finset.centerMass_id_mem_convexHull_of_nonpos (t : Finset E) {w : E → R} (hw₀ : ∀ i ∈ t, w i ≤ 0) (hws : ∑ i ∈ t, w i < 0) : t.centerMass w id ∈ convexHull R (t : Set E) := t.centerMass_mem_convexHull_of_nonpos hw₀ hws fun _ ↦ mem_coe.2 theorem affineCombination_eq_centerMass {ι : Type} {t : Finset ι} {p : ι → E} {w : ι → R} (hw₂ : ∑ i ∈ t, w i = 1) : t.affineCombination R p w = centerMass t w p := by rw [affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one _ w _ hw₂ (0 : E), Finset.weightedVSubOfPoint_apply, vadd_eq_add, add_zero, t.centerMass_eq_of_sum_1 _ hw₂] simp_rw [vsub_eq_sub, sub_zero] #align affine_combination_eq_center_mass affineCombination_eq_centerMass theorem affineCombination_mem_convexHull {s : Finset ι} {v : ι → E} {w : ι → R} (hw₀ : ∀ i ∈ s, 0 ≤ w i) (hw₁ : s.sum w = 1) : s.affineCombination R v w ∈ convexHull R (range v) := by rw [affineCombination_eq_centerMass hw₁] apply s.centerMass_mem_convexHull hw₀ · simp [hw₁] · simp #align affine_combination_mem_convex_hull affineCombination_mem_convexHull @[simp] theorem Finset.centroid_eq_centerMass (s : Finset ι) (hs : s.Nonempty) (p : ι → E) : s.centroid R p = s.centerMass (s.centroidWeights R) p := affineCombination_eq_centerMass (s.sum_centroidWeights_eq_one_of_nonempty R hs) #align finset.centroid_eq_center_mass Finset.centroid_eq_centerMass theorem Finset.centroid_mem_convexHull (s : Finset E) (hs : s.Nonempty) : s.centroid R id ∈ convexHull R (s : Set E) := by rw [s.centroid_eq_centerMass hs] apply s.centerMass_id_mem_convexHull · simp only [inv_nonneg, imp_true_iff, Nat.cast_nonneg, Finset.centroidWeights_apply] · have hs_card : (s.card : R) ≠ 0 := by simp [Finset.nonempty_iff_ne_empty.mp hs] simp only [hs_card, Finset.sum_const, nsmul_eq_mul, mul_inv_cancel, Ne, not_false_iff, Finset.centroidWeights_apply, zero_lt_one] #align finset.centroid_mem_convex_hull Finset.centroid_mem_convexHull theorem convexHull_range_eq_exists_affineCombination (v : ι → E) : convexHull R (range v) = { x \| ∃ (s : Finset ι) (w : ι → R), (∀ i ∈ s, 0 ≤ w i) ∧ s.sum w = 1 ∧ s.affineCombination R v w = x } := by refine Subset.antisymm (convexHull_min ?_ ?_) ?_ · intro x hx obtain ⟨i, hi⟩ := Set.mem_range.mp hx exact ⟨{i}, Function.const ι (1 : R), by simp, by simp, by simp [hi]⟩ · rintro x ⟨s, w, hw₀, hw₁, rfl⟩ y ⟨s', w', hw₀', hw₁', rfl⟩ a b ha hb hab let W : ι → R := fun i => (if i ∈ s then a * w i else 0) + if i ∈ s' then b * w' i else 0 have hW₁ : (s ∪ s').sum W = 1 := by rw [sum_add_distrib, ← sum_subset subset_union_left, ← sum_subset subset_union_right, sum_ite_of_true _ _ fun i hi => hi, sum_ite_of_true _ _ fun i hi => hi, ← mul_sum, ← mul_sum, hw₁, hw₁', ← add_mul, hab, mul_one] <;> intro i _ hi' <;> simp [hi'] refine ⟨s ∪ s', W, ?_, hW₁, ?_⟩ · rintro i - by_cases hi : i ∈ s <;> by_cases hi' : i ∈ s' <;> simp [W, hi, hi', add_nonneg, mul_nonneg ha (hw₀ i _), mul_nonneg hb (hw₀' i _)] · simp_rw [affineCombination_eq_linear_combination (s ∪ s') v _ hW₁, affineCombination_eq_linear_combination s v w hw₁, affineCombination_eq_linear_combination s' v w' hw₁', add_smul, sum_add_distrib] rw [← sum_subset subset_union_left, ← sum_subset subset_union_right] · simp only [ite_smul, sum_ite_of_true _ _ fun _ hi => hi, mul_smul, ← smul_sum] · intro i _ hi' simp [hi'] · intro i _ hi' simp [hi'] · rintro x ⟨s, w, hw₀, hw₁, rfl⟩ exact affineCombination_mem_convexHull hw₀ hw₁ #align convex_hull_range_eq_exists_affine_combination convexHull_range_eq_exists_affineCombination theorem convexHull_eq (s : Set E) : convexHull R s = { x : E \| ∃ (ι : Type) (t : Finset ι) (w : ι → R) (z : ι → E), (∀ i ∈ t, 0 ≤ w i) ∧ ∑ i ∈ t, w i = 1 ∧ (∀ i ∈ t, z i ∈ s) ∧ t.centerMass w z = x } := by refine Subset.antisymm (convexHull_min ?_ ?_) ?_ · intro x hx use PUnit, {PUnit.unit}, fun _ => 1, fun _ => x, fun _ _ => zero_le_one, sum_singleton _ _, fun _ _ => hx simp only [Finset.centerMass, Finset.sum_singleton, inv_one, one_smul] · rintro x ⟨ι, sx, wx, zx, hwx₀, hwx₁, hzx, rfl⟩ y ⟨ι', sy, wy, zy, hwy₀, hwy₁, hzy, rfl⟩ a b ha hb hab rw [Finset.centerMass_segment' _ _ _ _ _ _ hwx₁ hwy₁ _ _ hab] refine ⟨_, _, _, _, ?_, ?_, ?_, rfl⟩ · rintro i hi rw [Finset.mem_disjSum] at hi rcases hi with (⟨j, hj, rfl⟩ \| ⟨j, hj, rfl⟩) <;> simp only [Sum.elim_inl, Sum.elim_inr] <;> apply_rules [mul_nonneg, hwx₀, hwy₀] · simp [Finset.sum_sum_elim, ← mul_sum, ] · intro i hi rw [Finset.mem_disjSum] at hi rcases hi with (⟨j, hj, rfl⟩ \| ⟨j, hj, rfl⟩) <;> apply_rules [hzx, hzy] · rintro _ ⟨ι, t, w, z, hw₀, hw₁, hz, rfl⟩ exact t.centerMass_mem_convexHull hw₀ (hw₁.symm ▸ zero_lt_one) hz #align convex_hull_eq convexHull_eq theorem Finset.convexHull_eq (s : Finset E) : convexHull R ↑s = { x : E \| ∃ w : E → R, (∀ y ∈ s, 0 ≤ w y) ∧ ∑ y ∈ s, w y = 1 ∧ s.centerMass w id = x } := by refine Set.Subset.antisymm (convexHull_min ?_ ?_) ?_ · intro x hx rw [Finset.mem_coe] at hx refine ⟨_, ?_, ?_, Finset.centerMass_ite_eq _ _ _ hx⟩ · intros split_ifs exacts [zero_le_one, le_refl 0] · rw [Finset.sum_ite_eq, if_pos hx] · rintro x ⟨wx, hwx₀, hwx₁, rfl⟩ y ⟨wy, hwy₀, hwy₁, rfl⟩ a b ha hb hab rw [Finset.centerMass_segment _ _ _ _ hwx₁ hwy₁ _ _ hab] refine ⟨_, ?_, ?_, rfl⟩ · rintro i hi apply_rules [add_nonneg, mul_nonneg, hwx₀, hwy₀] · simp only [Finset.sum_add_distrib, ← mul_sum, mul_one, ] · rintro _ ⟨w, hw₀, hw₁, rfl⟩ exact s.centerMass_mem_convexHull (fun x hx => hw₀ _ hx) (hw₁.symm ▸ zero_lt_one) fun x hx => hx #align finset.convex_hull_eq Finset.convexHull_eq theorem Finset.mem_convexHull {s : Finset E} {x : E} : x ∈ convexHull R (s : Set E) ↔ ∃ w : E → R, (∀ y ∈ s, 0 ≤ w y) ∧ ∑ y ∈ s, w y = 1 ∧ s.centerMass w id = x := by rw [Finset.convexHull_eq, Set.mem_setOf_eq] #align finset.mem_convex_hull Finset.mem_convexHull lemma Finset.mem_convexHull' {s : Finset E} {x : E} : x ∈ convexHull R (s : Set E) ↔ ∃ w : E → R, (∀ y ∈ s, 0 ≤ w y) ∧ ∑ y ∈ s, w y = 1 ∧ ∑ y ∈ s, w y • y = x := by rw [mem_convexHull] refine exists_congr fun w ↦ and_congr_right' $ and_congr_right fun hw ↦ ?_ simp_rw [centerMass_eq_of_sum_1 _ _ hw, id_eq] theorem Set.Finite.convexHull_eq {s : Set E} (hs : s.Finite) : convexHull R s = { x : E \| ∃ w : E → R, (∀ y ∈ s, 0 ≤ w y) ∧ ∑ y ∈ hs.toFinset, w y = 1 ∧ hs.toFinset.centerMass w id = x } := by simpa only [Set.Finite.coe_toFinset, Set.Finite.mem_toFinset, exists_prop] using hs.toFinset.convexHull_eq #align set.finite.convex_hull_eq Set.Finite.convexHull_eq theorem convexHull_eq_union_convexHull_finite_subsets (s : Set E) : convexHull R s = ⋃ (t : Finset E) (w : ↑t ⊆ s), convexHull R ↑t := by refine Subset.antisymm ?_ ?_ · rw [_root_.convexHull_eq] rintro x ⟨ι, t, w, z, hw₀, hw₁, hz, rfl⟩ simp only [mem_iUnion] refine ⟨t.image z, ?_, ?_⟩ · rw [coe_image, Set.image_subset_iff] exact hz · apply t.centerMass_mem_convexHull hw₀ · simp only [hw₁, zero_lt_one] · exact fun i hi => Finset.mem_coe.2 (Finset.mem_image_of_mem _ hi) · exact iUnion_subset fun i => iUnion_subset convexHull_mono #align convex_hull_eq_union_convex_hull_finite_subsets convexHull_eq_union_convexHull_finite_subsets theorem mk_mem_convexHull_prod {t : Set F} {x : E} {y : F} (hx : x ∈ convexHull R s) (hy : y ∈ convexHull R t) : (x, y) ∈ convexHull R (s ×ˢ t) := by rw [_root_.convexHull_eq] at hx hy ⊢ obtain ⟨ι, a, w, S, hw, hw', hS, hSp⟩ := hx obtain ⟨κ, b, v, T, hv, hv', hT, hTp⟩ := hy have h_sum : ∑ i ∈ a ×ˢ b, w i.fst * v i.snd = 1 := by rw [Finset.sum_product, ← hw'] congr ext i have : ∑ y ∈ b, w i * v y = ∑ y ∈ b, v y * w i := by congr ext simp [mul_comm] rw [this, ← Finset.sum_mul, hv'] simp refine ⟨ι × κ, a ×ˢ b, fun p => w p.1 * v p.2, fun p => (S p.1, T p.2), fun p hp => ?_, h_sum, fun p hp => ?_, ?_⟩ · rw [mem_product] at hp exact mul_nonneg (hw p.1 hp.1) (hv p.2 hp.2) · rw [mem_product] at hp exact ⟨hS p.1 hp.1, hT p.2 hp.2⟩ ext · rw [← hSp, Finset.centerMass_eq_of_sum_1 _ _ hw', Finset.centerMass_eq_of_sum_1 _ _ h_sum] simp_rw [Prod.fst_sum, Prod.smul_mk] rw [Finset.sum_product] congr ext i have : (∑ j ∈ b, (w i * v j) • S i) = ∑ j ∈ b, v j • w i • S i := by congr ext rw [mul_smul, smul_comm] rw [this, ← Finset.sum_smul, hv', one_smul] · rw [← hTp, Finset.centerMass_eq_of_sum_1 _ _ hv', Finset.centerMass_eq_of_sum_1 _ _ h_sum] simp_rw [Prod.snd_sum, Prod.smul_mk] rw [Finset.sum_product, Finset.sum_comm] congr ext j simp_rw [mul_smul] rw [← Finset.sum_smul, hw', one_smul] #align mk_mem_convex_hull_prod mk_mem_convexHull_prod @[simp] theorem convexHull_prod (s : Set E) (t : Set F) : convexHull R (s ×ˢ t) = convexHull R s ×ˢ convexHull R t := Subset.antisymm (convexHull_min (prod_mono (subset_convexHull _ _) <\| subset_convexHull _ _) <\| (convex_convexHull _ _).prod <\| convex_convexHull _ _) <\| prod_subset_iff.2 fun _ hx _ => mk_mem_convexHull_prod hx #align convex_hull_prod convexHull_prod theorem convexHull_add (s t : Set E) : convexHull R (s + t) = convexHull R s + convexHull R t := by simp_rw [← image2_add, ← image_prod, ← IsLinearMap.isLinearMap_add.image_convexHull, convexHull_prod] #align convex_hull_add convexHull_add variable (R E) @[simps] def convexHullAddMonoidHom : Set E →+ Set E where toFun := convexHull R map_add' := convexHull_add map_zero' := convexHull_zero #align convex_hull_add_monoid_hom convexHullAddMonoidHom variable {R E} theorem convexHull_sub (s t : Set E) : convexHull R (s - t) = convexHull R s - convexHull R t := by simp_rw [sub_eq_add_neg, convexHull_add, ← convexHull_neg] #align convex_hull_sub convexHull_sub theorem convexHull_list_sum (l : List (Set E)) : convexHull R l.sum = (l.map <\| convexHull R).sum := map_list_sum (convexHullAddMonoidHom R E) l #align convex_hull_list_sum convexHull_list_sum theorem convexHull_multiset_sum (s : Multiset (Set E)) : convexHull R s.sum = (s.map <\| convexHull R).sum := map_multiset_sum (convexHullAddMonoidHom R E) s #align convex_hull_multiset_sum convexHull_multiset_sum theorem convexHull_sum {ι} (s : Finset ι) (t : ι → Set E) : convexHull R (∑ i ∈ s, t i) = ∑ i ∈ s, convexHull R (t i) := map_sum (convexHullAddMonoidHom R E) _ _ #align convex_hull_sum convexHull_sum variable (ι) [Fintype ι] {f : ι → R} theorem convexHull_basis_eq_stdSimplex : convexHull R (range fun i j : ι => if i = j then (1 : R) else 0) = stdSimplex R ι := by refine Subset.antisymm (convexHull_min ?_ (convex_stdSimplex R ι)) ?_ · rintro _ ⟨i, rfl⟩ exact ite_eq_mem_stdSimplex R i · rintro w ⟨hw₀, hw₁⟩ rw [pi_eq_sum_univ w, ← Finset.univ.centerMass_eq_of_sum_1 _ hw₁] exact Finset.univ.centerMass_mem_convexHull (fun i _ => hw₀ i) (hw₁.symm ▸ zero_lt_one) fun i _ => mem_range_self i #align convex_hull_basis_eq_std_simplex convexHull_basis_eq_stdSimplex variable {ι}	Mathlib/Analysis/Convex/Combination.lean	521	529	theorem Set.Finite.convexHull_eq_image {s : Set E} (hs : s.Finite) : convexHull R s = haveI := hs.fintype (⇑(∑ x : s, (@LinearMap.proj R s _ (fun _ => R) _ _ x).smulRight x.1)) '' stdSimplex R s := by	letI := hs.fintype rw [← convexHull_basis_eq_stdSimplex, LinearMap.image_convexHull, ← Set.range_comp] apply congr_arg simp_rw [Function.comp] convert Subtype.range_coe.symm simp [LinearMap.sum_apply, ite_smul, Finset.filter_eq, Finset.mem_univ]
import Mathlib.SetTheory.Ordinal.Basic import Mathlib.Data.Nat.SuccPred #align_import set_theory.ordinal.arithmetic from "leanprover-community/mathlib"@"31b269b60935483943542d547a6dd83a66b37dc7" assert_not_exists Field assert_not_exists Module noncomputable section open Function Cardinal Set Equiv Order open scoped Classical open Cardinal Ordinal universe u v w namespace Ordinal variable {α : Type} {β : Type} {γ : Type} {r : α → α → Prop} {s : β → β → Prop} {t : γ → γ → Prop} @[simp] theorem lift_add (a b : Ordinal.{v}) : lift.{u} (a + b) = lift.{u} a + lift.{u} b := Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift _).trans (RelIso.sumLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩ #align ordinal.lift_add Ordinal.lift_add @[simp] theorem lift_succ (a : Ordinal.{v}) : lift.{u} (succ a) = succ (lift.{u} a) := by rw [← add_one_eq_succ, lift_add, lift_one] rfl #align ordinal.lift_succ Ordinal.lift_succ instance add_contravariantClass_le : ContravariantClass Ordinal.{u} Ordinal.{u} (· + ·) (· ≤ ·) := ⟨fun a b c => inductionOn a fun α r hr => inductionOn b fun β₁ s₁ hs₁ => inductionOn c fun β₂ s₂ hs₂ ⟨f⟩ => ⟨have fl : ∀ a, f (Sum.inl a) = Sum.inl a := fun a => by simpa only [InitialSeg.trans_apply, InitialSeg.leAdd_apply] using @InitialSeg.eq _ _ _ _ _ ((InitialSeg.leAdd r s₁).trans f) (InitialSeg.leAdd r s₂) a have : ∀ b, { b' // f (Sum.inr b) = Sum.inr b' } := by intro b; cases e : f (Sum.inr b) · rw [← fl] at e have := f.inj' e contradiction · exact ⟨_, rfl⟩ let g (b) := (this b).1 have fr : ∀ b, f (Sum.inr b) = Sum.inr (g b) := fun b => (this b).2 ⟨⟨⟨g, fun x y h => by injection f.inj' (by rw [fr, fr, h] : f (Sum.inr x) = f (Sum.inr y))⟩, @fun a b => by -- Porting note: -- `relEmbedding.coe_fn_to_embedding` & `initial_seg.coe_fn_to_rel_embedding` -- → `InitialSeg.coe_coe_fn` simpa only [Sum.lex_inr_inr, fr, InitialSeg.coe_coe_fn, Embedding.coeFn_mk] using @RelEmbedding.map_rel_iff _ _ _ _ f.toRelEmbedding (Sum.inr a) (Sum.inr b)⟩, fun a b H => by rcases f.init (by rw [fr] <;> exact Sum.lex_inr_inr.2 H) with ⟨a' \| a', h⟩ · rw [fl] at h cases h · rw [fr] at h exact ⟨a', Sum.inr.inj h⟩⟩⟩⟩ #align ordinal.add_contravariant_class_le Ordinal.add_contravariantClass_le theorem add_left_cancel (a) {b c : Ordinal} : a + b = a + c ↔ b = c := by simp only [le_antisymm_iff, add_le_add_iff_left] #align ordinal.add_left_cancel Ordinal.add_left_cancel private theorem add_lt_add_iff_left' (a) {b c : Ordinal} : a + b < a + c ↔ b < c := by rw [← not_le, ← not_le, add_le_add_iff_left] instance add_covariantClass_lt : CovariantClass Ordinal.{u} Ordinal.{u} (· + ·) (· < ·) := ⟨fun a _b _c => (add_lt_add_iff_left' a).2⟩ #align ordinal.add_covariant_class_lt Ordinal.add_covariantClass_lt instance add_contravariantClass_lt : ContravariantClass Ordinal.{u} Ordinal.{u} (· + ·) (· < ·) := ⟨fun a _b _c => (add_lt_add_iff_left' a).1⟩ #align ordinal.add_contravariant_class_lt Ordinal.add_contravariantClass_lt instance add_swap_contravariantClass_lt : ContravariantClass Ordinal.{u} Ordinal.{u} (swap (· + ·)) (· < ·) := ⟨fun _a _b _c => lt_imp_lt_of_le_imp_le fun h => add_le_add_right h _⟩ #align ordinal.add_swap_contravariant_class_lt Ordinal.add_swap_contravariantClass_lt theorem add_le_add_iff_right {a b : Ordinal} : ∀ n : ℕ, a + n ≤ b + n ↔ a ≤ b \| 0 => by simp \| n + 1 => by simp only [natCast_succ, add_succ, add_succ, succ_le_succ_iff, add_le_add_iff_right] #align ordinal.add_le_add_iff_right Ordinal.add_le_add_iff_right theorem add_right_cancel {a b : Ordinal} (n : ℕ) : a + n = b + n ↔ a = b := by simp only [le_antisymm_iff, add_le_add_iff_right] #align ordinal.add_right_cancel Ordinal.add_right_cancel theorem add_eq_zero_iff {a b : Ordinal} : a + b = 0 ↔ a = 0 ∧ b = 0 := inductionOn a fun α r _ => inductionOn b fun β s _ => by simp_rw [← type_sum_lex, type_eq_zero_iff_isEmpty] exact isEmpty_sum #align ordinal.add_eq_zero_iff Ordinal.add_eq_zero_iff theorem left_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : a = 0 := (add_eq_zero_iff.1 h).1 #align ordinal.left_eq_zero_of_add_eq_zero Ordinal.left_eq_zero_of_add_eq_zero theorem right_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : b = 0 := (add_eq_zero_iff.1 h).2 #align ordinal.right_eq_zero_of_add_eq_zero Ordinal.right_eq_zero_of_add_eq_zero def pred (o : Ordinal) : Ordinal := if h : ∃ a, o = succ a then Classical.choose h else o #align ordinal.pred Ordinal.pred @[simp] theorem pred_succ (o) : pred (succ o) = o := by have h : ∃ a, succ o = succ a := ⟨_, rfl⟩; simpa only [pred, dif_pos h] using (succ_injective <\| Classical.choose_spec h).symm #align ordinal.pred_succ Ordinal.pred_succ theorem pred_le_self (o) : pred o ≤ o := if h : ∃ a, o = succ a then by let ⟨a, e⟩ := h rw [e, pred_succ]; exact le_succ a else by rw [pred, dif_neg h] #align ordinal.pred_le_self Ordinal.pred_le_self theorem pred_eq_iff_not_succ {o} : pred o = o ↔ ¬∃ a, o = succ a := ⟨fun e ⟨a, e'⟩ => by rw [e', pred_succ] at e; exact (lt_succ a).ne e, fun h => dif_neg h⟩ #align ordinal.pred_eq_iff_not_succ Ordinal.pred_eq_iff_not_succ theorem pred_eq_iff_not_succ' {o} : pred o = o ↔ ∀ a, o ≠ succ a := by simpa using pred_eq_iff_not_succ #align ordinal.pred_eq_iff_not_succ' Ordinal.pred_eq_iff_not_succ' theorem pred_lt_iff_is_succ {o} : pred o < o ↔ ∃ a, o = succ a := Iff.trans (by simp only [le_antisymm_iff, pred_le_self, true_and_iff, not_le]) (iff_not_comm.1 pred_eq_iff_not_succ).symm #align ordinal.pred_lt_iff_is_succ Ordinal.pred_lt_iff_is_succ @[simp] theorem pred_zero : pred 0 = 0 := pred_eq_iff_not_succ'.2 fun a => (succ_ne_zero a).symm #align ordinal.pred_zero Ordinal.pred_zero theorem succ_pred_iff_is_succ {o} : succ (pred o) = o ↔ ∃ a, o = succ a := ⟨fun e => ⟨_, e.symm⟩, fun ⟨a, e⟩ => by simp only [e, pred_succ]⟩ #align ordinal.succ_pred_iff_is_succ Ordinal.succ_pred_iff_is_succ theorem succ_lt_of_not_succ {o b : Ordinal} (h : ¬∃ a, o = succ a) : succ b < o ↔ b < o := ⟨(lt_succ b).trans, fun l => lt_of_le_of_ne (succ_le_of_lt l) fun e => h ⟨_, e.symm⟩⟩ #align ordinal.succ_lt_of_not_succ Ordinal.succ_lt_of_not_succ theorem lt_pred {a b} : a < pred b ↔ succ a < b := if h : ∃ a, b = succ a then by let ⟨c, e⟩ := h rw [e, pred_succ, succ_lt_succ_iff] else by simp only [pred, dif_neg h, succ_lt_of_not_succ h] #align ordinal.lt_pred Ordinal.lt_pred theorem pred_le {a b} : pred a ≤ b ↔ a ≤ succ b := le_iff_le_iff_lt_iff_lt.2 lt_pred #align ordinal.pred_le Ordinal.pred_le @[simp] theorem lift_is_succ {o : Ordinal.{v}} : (∃ a, lift.{u} o = succ a) ↔ ∃ a, o = succ a := ⟨fun ⟨a, h⟩ => let ⟨b, e⟩ := lift_down <\| show a ≤ lift.{u} o from le_of_lt <\| h.symm ▸ lt_succ a ⟨b, lift_inj.1 <\| by rw [h, ← e, lift_succ]⟩, fun ⟨a, h⟩ => ⟨lift.{u} a, by simp only [h, lift_succ]⟩⟩ #align ordinal.lift_is_succ Ordinal.lift_is_succ @[simp] theorem lift_pred (o : Ordinal.{v}) : lift.{u} (pred o) = pred (lift.{u} o) := if h : ∃ a, o = succ a then by cases' h with a e; simp only [e, pred_succ, lift_succ] else by rw [pred_eq_iff_not_succ.2 h, pred_eq_iff_not_succ.2 (mt lift_is_succ.1 h)] #align ordinal.lift_pred Ordinal.lift_pred def IsLimit (o : Ordinal) : Prop := o ≠ 0 ∧ ∀ a < o, succ a < o #align ordinal.is_limit Ordinal.IsLimit theorem IsLimit.isSuccLimit {o} (h : IsLimit o) : IsSuccLimit o := isSuccLimit_iff_succ_lt.mpr h.2 theorem IsLimit.succ_lt {o a : Ordinal} (h : IsLimit o) : a < o → succ a < o := h.2 a #align ordinal.is_limit.succ_lt Ordinal.IsLimit.succ_lt theorem isSuccLimit_zero : IsSuccLimit (0 : Ordinal) := isSuccLimit_bot theorem not_zero_isLimit : ¬IsLimit 0 \| ⟨h, _⟩ => h rfl #align ordinal.not_zero_is_limit Ordinal.not_zero_isLimit theorem not_succ_isLimit (o) : ¬IsLimit (succ o) \| ⟨_, h⟩ => lt_irrefl _ (h _ (lt_succ o)) #align ordinal.not_succ_is_limit Ordinal.not_succ_isLimit theorem not_succ_of_isLimit {o} (h : IsLimit o) : ¬∃ a, o = succ a \| ⟨a, e⟩ => not_succ_isLimit a (e ▸ h) #align ordinal.not_succ_of_is_limit Ordinal.not_succ_of_isLimit theorem succ_lt_of_isLimit {o a : Ordinal} (h : IsLimit o) : succ a < o ↔ a < o := ⟨(lt_succ a).trans, h.2 _⟩ #align ordinal.succ_lt_of_is_limit Ordinal.succ_lt_of_isLimit theorem le_succ_of_isLimit {o} (h : IsLimit o) {a} : o ≤ succ a ↔ o ≤ a := le_iff_le_iff_lt_iff_lt.2 <\| succ_lt_of_isLimit h #align ordinal.le_succ_of_is_limit Ordinal.le_succ_of_isLimit theorem limit_le {o} (h : IsLimit o) {a} : o ≤ a ↔ ∀ x < o, x ≤ a := ⟨fun h _x l => l.le.trans h, fun H => (le_succ_of_isLimit h).1 <\| le_of_not_lt fun hn => not_lt_of_le (H _ hn) (lt_succ a)⟩ #align ordinal.limit_le Ordinal.limit_le theorem lt_limit {o} (h : IsLimit o) {a} : a < o ↔ ∃ x < o, a < x := by -- Porting note: `bex_def` is required. simpa only [not_forall₂, not_le, bex_def] using not_congr (@limit_le _ h a) #align ordinal.lt_limit Ordinal.lt_limit @[simp] theorem lift_isLimit (o) : IsLimit (lift o) ↔ IsLimit o := and_congr (not_congr <\| by simpa only [lift_zero] using @lift_inj o 0) ⟨fun H a h => lift_lt.1 <\| by simpa only [lift_succ] using H _ (lift_lt.2 h), fun H a h => by obtain ⟨a', rfl⟩ := lift_down h.le rw [← lift_succ, lift_lt] exact H a' (lift_lt.1 h)⟩ #align ordinal.lift_is_limit Ordinal.lift_isLimit theorem IsLimit.pos {o : Ordinal} (h : IsLimit o) : 0 < o := lt_of_le_of_ne (Ordinal.zero_le _) h.1.symm #align ordinal.is_limit.pos Ordinal.IsLimit.pos theorem IsLimit.one_lt {o : Ordinal} (h : IsLimit o) : 1 < o := by simpa only [succ_zero] using h.2 _ h.pos #align ordinal.is_limit.one_lt Ordinal.IsLimit.one_lt theorem IsLimit.nat_lt {o : Ordinal} (h : IsLimit o) : ∀ n : ℕ, (n : Ordinal) < o \| 0 => h.pos \| n + 1 => h.2 _ (IsLimit.nat_lt h n) #align ordinal.is_limit.nat_lt Ordinal.IsLimit.nat_lt theorem zero_or_succ_or_limit (o : Ordinal) : o = 0 ∨ (∃ a, o = succ a) ∨ IsLimit o := if o0 : o = 0 then Or.inl o0 else if h : ∃ a, o = succ a then Or.inr (Or.inl h) else Or.inr <\| Or.inr ⟨o0, fun _a => (succ_lt_of_not_succ h).2⟩ #align ordinal.zero_or_succ_or_limit Ordinal.zero_or_succ_or_limit @[elab_as_elim] def limitRecOn {C : Ordinal → Sort} (o : Ordinal) (H₁ : C 0) (H₂ : ∀ o, C o → C (succ o)) (H₃ : ∀ o, IsLimit o → (∀ o' < o, C o') → C o) : C o := SuccOrder.limitRecOn o (fun o _ ↦ H₂ o) fun o hl ↦ if h : o = 0 then fun _ ↦ h ▸ H₁ else H₃ o ⟨h, fun _ ↦ hl.succ_lt⟩ #align ordinal.limit_rec_on Ordinal.limitRecOn @[simp] theorem limitRecOn_zero {C} (H₁ H₂ H₃) : @limitRecOn C 0 H₁ H₂ H₃ = H₁ := by rw [limitRecOn, SuccOrder.limitRecOn_limit _ _ isSuccLimit_zero, dif_pos rfl] #align ordinal.limit_rec_on_zero Ordinal.limitRecOn_zero @[simp] theorem limitRecOn_succ {C} (o H₁ H₂ H₃) : @limitRecOn C (succ o) H₁ H₂ H₃ = H₂ o (@limitRecOn C o H₁ H₂ H₃) := by simp_rw [limitRecOn, SuccOrder.limitRecOn_succ _ _ (not_isMax _)] #align ordinal.limit_rec_on_succ Ordinal.limitRecOn_succ @[simp] theorem limitRecOn_limit {C} (o H₁ H₂ H₃ h) : @limitRecOn C o H₁ H₂ H₃ = H₃ o h fun x _h => @limitRecOn C x H₁ H₂ H₃ := by simp_rw [limitRecOn, SuccOrder.limitRecOn_limit _ _ h.isSuccLimit, dif_neg h.1] #align ordinal.limit_rec_on_limit Ordinal.limitRecOn_limit instance orderTopOutSucc (o : Ordinal) : OrderTop (succ o).out.α := @OrderTop.mk _ _ (Top.mk _) le_enum_succ #align ordinal.order_top_out_succ Ordinal.orderTopOutSucc theorem enum_succ_eq_top {o : Ordinal} : enum (· < ·) o (by rw [type_lt] exact lt_succ o) = (⊤ : (succ o).out.α) := rfl #align ordinal.enum_succ_eq_top Ordinal.enum_succ_eq_top theorem has_succ_of_type_succ_lt {α} {r : α → α → Prop} [wo : IsWellOrder α r] (h : ∀ a < type r, succ a < type r) (x : α) : ∃ y, r x y := by use enum r (succ (typein r x)) (h _ (typein_lt_type r x)) convert (enum_lt_enum (typein_lt_type r x) (h _ (typein_lt_type r x))).mpr (lt_succ _); rw [enum_typein] #align ordinal.has_succ_of_type_succ_lt Ordinal.has_succ_of_type_succ_lt theorem out_no_max_of_succ_lt {o : Ordinal} (ho : ∀ a < o, succ a < o) : NoMaxOrder o.out.α := ⟨has_succ_of_type_succ_lt (by rwa [type_lt])⟩ #align ordinal.out_no_max_of_succ_lt Ordinal.out_no_max_of_succ_lt theorem bounded_singleton {r : α → α → Prop} [IsWellOrder α r] (hr : (type r).IsLimit) (x) : Bounded r {x} := by refine ⟨enum r (succ (typein r x)) (hr.2 _ (typein_lt_type r x)), ?_⟩ intro b hb rw [mem_singleton_iff.1 hb] nth_rw 1 [← enum_typein r x] rw [@enum_lt_enum _ r] apply lt_succ #align ordinal.bounded_singleton Ordinal.bounded_singleton -- Porting note: `· < ·` requires a type ascription for an `IsWellOrder` instance. theorem type_subrel_lt (o : Ordinal.{u}) : type (Subrel ((· < ·) : Ordinal → Ordinal → Prop) { o' : Ordinal \| o' < o }) = Ordinal.lift.{u + 1} o := by refine Quotient.inductionOn o ?_ rintro ⟨α, r, wo⟩; apply Quotient.sound -- Porting note: `symm; refine' [term]` → `refine' [term].symm` constructor; refine ((RelIso.preimage Equiv.ulift r).trans (enumIso r).symm).symm #align ordinal.type_subrel_lt Ordinal.type_subrel_lt theorem mk_initialSeg (o : Ordinal.{u}) : #{ o' : Ordinal \| o' < o } = Cardinal.lift.{u + 1} o.card := by rw [lift_card, ← type_subrel_lt, card_type] #align ordinal.mk_initial_seg Ordinal.mk_initialSeg def IsNormal (f : Ordinal → Ordinal) : Prop := (∀ o, f o < f (succ o)) ∧ ∀ o, IsLimit o → ∀ a, f o ≤ a ↔ ∀ b < o, f b ≤ a #align ordinal.is_normal Ordinal.IsNormal theorem IsNormal.limit_le {f} (H : IsNormal f) : ∀ {o}, IsLimit o → ∀ {a}, f o ≤ a ↔ ∀ b < o, f b ≤ a := @H.2 #align ordinal.is_normal.limit_le Ordinal.IsNormal.limit_le theorem IsNormal.limit_lt {f} (H : IsNormal f) {o} (h : IsLimit o) {a} : a < f o ↔ ∃ b < o, a < f b := not_iff_not.1 <\| by simpa only [exists_prop, not_exists, not_and, not_lt] using H.2 _ h a #align ordinal.is_normal.limit_lt Ordinal.IsNormal.limit_lt theorem IsNormal.strictMono {f} (H : IsNormal f) : StrictMono f := fun a b => limitRecOn b (Not.elim (not_lt_of_le <\| Ordinal.zero_le _)) (fun _b IH h => (lt_or_eq_of_le (le_of_lt_succ h)).elim (fun h => (IH h).trans (H.1 _)) fun e => e ▸ H.1 _) fun _b l _IH h => lt_of_lt_of_le (H.1 a) ((H.2 _ l _).1 le_rfl _ (l.2 _ h)) #align ordinal.is_normal.strict_mono Ordinal.IsNormal.strictMono theorem IsNormal.monotone {f} (H : IsNormal f) : Monotone f := H.strictMono.monotone #align ordinal.is_normal.monotone Ordinal.IsNormal.monotone theorem isNormal_iff_strictMono_limit (f : Ordinal → Ordinal) : IsNormal f ↔ StrictMono f ∧ ∀ o, IsLimit o → ∀ a, (∀ b < o, f b ≤ a) → f o ≤ a := ⟨fun hf => ⟨hf.strictMono, fun a ha c => (hf.2 a ha c).2⟩, fun ⟨hs, hl⟩ => ⟨fun a => hs (lt_succ a), fun a ha c => ⟨fun hac _b hba => ((hs hba).trans_le hac).le, hl a ha c⟩⟩⟩ #align ordinal.is_normal_iff_strict_mono_limit Ordinal.isNormal_iff_strictMono_limit theorem IsNormal.lt_iff {f} (H : IsNormal f) {a b} : f a < f b ↔ a < b := StrictMono.lt_iff_lt <\| H.strictMono #align ordinal.is_normal.lt_iff Ordinal.IsNormal.lt_iff theorem IsNormal.le_iff {f} (H : IsNormal f) {a b} : f a ≤ f b ↔ a ≤ b := le_iff_le_iff_lt_iff_lt.2 H.lt_iff #align ordinal.is_normal.le_iff Ordinal.IsNormal.le_iff theorem IsNormal.inj {f} (H : IsNormal f) {a b} : f a = f b ↔ a = b := by simp only [le_antisymm_iff, H.le_iff] #align ordinal.is_normal.inj Ordinal.IsNormal.inj theorem IsNormal.self_le {f} (H : IsNormal f) (a) : a ≤ f a := lt_wf.self_le_of_strictMono H.strictMono a #align ordinal.is_normal.self_le Ordinal.IsNormal.self_le theorem IsNormal.le_set {f o} (H : IsNormal f) (p : Set Ordinal) (p0 : p.Nonempty) (b) (H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f a ≤ o := ⟨fun h a pa => (H.le_iff.2 ((H₂ _).1 le_rfl _ pa)).trans h, fun h => by -- Porting note: `refine'` didn't work well so `induction` is used induction b using limitRecOn with \| H₁ => cases' p0 with x px have := Ordinal.le_zero.1 ((H₂ _).1 (Ordinal.zero_le _) _ px) rw [this] at px exact h _ px \| H₂ S _ => rcases not_forall₂.1 (mt (H₂ S).2 <\| (lt_succ S).not_le) with ⟨a, h₁, h₂⟩ exact (H.le_iff.2 <\| succ_le_of_lt <\| not_le.1 h₂).trans (h _ h₁) \| H₃ S L _ => refine (H.2 _ L _).2 fun a h' => ?_ rcases not_forall₂.1 (mt (H₂ a).2 h'.not_le) with ⟨b, h₁, h₂⟩ exact (H.le_iff.2 <\| (not_le.1 h₂).le).trans (h _ h₁)⟩ #align ordinal.is_normal.le_set Ordinal.IsNormal.le_set theorem IsNormal.le_set' {f o} (H : IsNormal f) (p : Set α) (p0 : p.Nonempty) (g : α → Ordinal) (b) (H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, g a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f (g a) ≤ o := by simpa [H₂] using H.le_set (g '' p) (p0.image g) b #align ordinal.is_normal.le_set' Ordinal.IsNormal.le_set' theorem IsNormal.refl : IsNormal id := ⟨lt_succ, fun _o l _a => Ordinal.limit_le l⟩ #align ordinal.is_normal.refl Ordinal.IsNormal.refl theorem IsNormal.trans {f g} (H₁ : IsNormal f) (H₂ : IsNormal g) : IsNormal (f ∘ g) := ⟨fun _x => H₁.lt_iff.2 (H₂.1 _), fun o l _a => H₁.le_set' (· < o) ⟨0, l.pos⟩ g _ fun _c => H₂.2 _ l _⟩ #align ordinal.is_normal.trans Ordinal.IsNormal.trans theorem IsNormal.isLimit {f} (H : IsNormal f) {o} (l : IsLimit o) : IsLimit (f o) := ⟨ne_of_gt <\| (Ordinal.zero_le _).trans_lt <\| H.lt_iff.2 l.pos, fun _ h => let ⟨_b, h₁, h₂⟩ := (H.limit_lt l).1 h (succ_le_of_lt h₂).trans_lt (H.lt_iff.2 h₁)⟩ #align ordinal.is_normal.is_limit Ordinal.IsNormal.isLimit theorem IsNormal.le_iff_eq {f} (H : IsNormal f) {a} : f a ≤ a ↔ f a = a := (H.self_le a).le_iff_eq #align ordinal.is_normal.le_iff_eq Ordinal.IsNormal.le_iff_eq theorem add_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a + b ≤ c ↔ ∀ b' < b, a + b' ≤ c := ⟨fun h b' l => (add_le_add_left l.le _).trans h, fun H => le_of_not_lt <\| by -- Porting note: `induction` tactics are required because of the parser bug. induction a using inductionOn with \| H α r => induction b using inductionOn with \| H β s => intro l suffices ∀ x : β, Sum.Lex r s (Sum.inr x) (enum _ _ l) by -- Porting note: `revert` & `intro` is required because `cases'` doesn't replace -- `enum _ _ l` in `this`. revert this; cases' enum _ _ l with x x <;> intro this · cases this (enum s 0 h.pos) · exact irrefl _ (this _) intro x rw [← typein_lt_typein (Sum.Lex r s), typein_enum] have := H _ (h.2 _ (typein_lt_type s x)) rw [add_succ, succ_le_iff] at this refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this · rcases a with ⟨a \| b, h⟩ · exact Sum.inl a · exact Sum.inr ⟨b, by cases h; assumption⟩ · rcases a with ⟨a \| a, h₁⟩ <;> rcases b with ⟨b \| b, h₂⟩ <;> cases h₁ <;> cases h₂ <;> rintro ⟨⟩ <;> constructor <;> assumption⟩ #align ordinal.add_le_of_limit Ordinal.add_le_of_limit theorem add_isNormal (a : Ordinal) : IsNormal (a + ·) := ⟨fun b => (add_lt_add_iff_left a).2 (lt_succ b), fun _b l _c => add_le_of_limit l⟩ #align ordinal.add_is_normal Ordinal.add_isNormal theorem add_isLimit (a) {b} : IsLimit b → IsLimit (a + b) := (add_isNormal a).isLimit #align ordinal.add_is_limit Ordinal.add_isLimit alias IsLimit.add := add_isLimit #align ordinal.is_limit.add Ordinal.IsLimit.add theorem sub_nonempty {a b : Ordinal} : { o \| a ≤ b + o }.Nonempty := ⟨a, le_add_left _ _⟩ #align ordinal.sub_nonempty Ordinal.sub_nonempty instance sub : Sub Ordinal := ⟨fun a b => sInf { o \| a ≤ b + o }⟩ theorem le_add_sub (a b : Ordinal) : a ≤ b + (a - b) := csInf_mem sub_nonempty #align ordinal.le_add_sub Ordinal.le_add_sub theorem sub_le {a b c : Ordinal} : a - b ≤ c ↔ a ≤ b + c := ⟨fun h => (le_add_sub a b).trans (add_le_add_left h _), fun h => csInf_le' h⟩ #align ordinal.sub_le Ordinal.sub_le theorem lt_sub {a b c : Ordinal} : a < b - c ↔ c + a < b := lt_iff_lt_of_le_iff_le sub_le #align ordinal.lt_sub Ordinal.lt_sub theorem add_sub_cancel (a b : Ordinal) : a + b - a = b := le_antisymm (sub_le.2 <\| le_rfl) ((add_le_add_iff_left a).1 <\| le_add_sub _ _) #align ordinal.add_sub_cancel Ordinal.add_sub_cancel theorem sub_eq_of_add_eq {a b c : Ordinal} (h : a + b = c) : c - a = b := h ▸ add_sub_cancel _ _ #align ordinal.sub_eq_of_add_eq Ordinal.sub_eq_of_add_eq theorem sub_le_self (a b : Ordinal) : a - b ≤ a := sub_le.2 <\| le_add_left _ _ #align ordinal.sub_le_self Ordinal.sub_le_self protected theorem add_sub_cancel_of_le {a b : Ordinal} (h : b ≤ a) : b + (a - b) = a := (le_add_sub a b).antisymm' (by rcases zero_or_succ_or_limit (a - b) with (e \| ⟨c, e⟩ \| l) · simp only [e, add_zero, h] · rw [e, add_succ, succ_le_iff, ← lt_sub, e] exact lt_succ c · exact (add_le_of_limit l).2 fun c l => (lt_sub.1 l).le) #align ordinal.add_sub_cancel_of_le Ordinal.add_sub_cancel_of_le theorem le_sub_of_le {a b c : Ordinal} (h : b ≤ a) : c ≤ a - b ↔ b + c ≤ a := by rw [← add_le_add_iff_left b, Ordinal.add_sub_cancel_of_le h] #align ordinal.le_sub_of_le Ordinal.le_sub_of_le theorem sub_lt_of_le {a b c : Ordinal} (h : b ≤ a) : a - b < c ↔ a < b + c := lt_iff_lt_of_le_iff_le (le_sub_of_le h) #align ordinal.sub_lt_of_le Ordinal.sub_lt_of_le instance existsAddOfLE : ExistsAddOfLE Ordinal := ⟨fun h => ⟨_, (Ordinal.add_sub_cancel_of_le h).symm⟩⟩ @[simp] theorem sub_zero (a : Ordinal) : a - 0 = a := by simpa only [zero_add] using add_sub_cancel 0 a #align ordinal.sub_zero Ordinal.sub_zero @[simp] theorem zero_sub (a : Ordinal) : 0 - a = 0 := by rw [← Ordinal.le_zero]; apply sub_le_self #align ordinal.zero_sub Ordinal.zero_sub @[simp] theorem sub_self (a : Ordinal) : a - a = 0 := by simpa only [add_zero] using add_sub_cancel a 0 #align ordinal.sub_self Ordinal.sub_self protected theorem sub_eq_zero_iff_le {a b : Ordinal} : a - b = 0 ↔ a ≤ b := ⟨fun h => by simpa only [h, add_zero] using le_add_sub a b, fun h => by rwa [← Ordinal.le_zero, sub_le, add_zero]⟩ #align ordinal.sub_eq_zero_iff_le Ordinal.sub_eq_zero_iff_le theorem sub_sub (a b c : Ordinal) : a - b - c = a - (b + c) := eq_of_forall_ge_iff fun d => by rw [sub_le, sub_le, sub_le, add_assoc] #align ordinal.sub_sub Ordinal.sub_sub @[simp] theorem add_sub_add_cancel (a b c : Ordinal) : a + b - (a + c) = b - c := by rw [← sub_sub, add_sub_cancel] #align ordinal.add_sub_add_cancel Ordinal.add_sub_add_cancel theorem sub_isLimit {a b} (l : IsLimit a) (h : b < a) : IsLimit (a - b) := ⟨ne_of_gt <\| lt_sub.2 <\| by rwa [add_zero], fun c h => by rw [lt_sub, add_succ]; exact l.2 _ (lt_sub.1 h)⟩ #align ordinal.sub_is_limit Ordinal.sub_isLimit -- @[simp] -- Porting note (#10618): simp can prove this theorem one_add_omega : 1 + ω = ω := by refine le_antisymm ?_ (le_add_left _ _) rw [omega, ← lift_one.{_, 0}, ← lift_add, lift_le, ← type_unit, ← type_sum_lex] refine ⟨RelEmbedding.collapse (RelEmbedding.ofMonotone ?_ ?_)⟩ · apply Sum.rec · exact fun _ => 0 · exact Nat.succ · intro a b cases a <;> cases b <;> intro H <;> cases' H with _ _ H _ _ H <;> [exact H.elim; exact Nat.succ_pos _; exact Nat.succ_lt_succ H] #align ordinal.one_add_omega Ordinal.one_add_omega @[simp] theorem one_add_of_omega_le {o} (h : ω ≤ o) : 1 + o = o := by rw [← Ordinal.add_sub_cancel_of_le h, ← add_assoc, one_add_omega] #align ordinal.one_add_of_omega_le Ordinal.one_add_of_omega_le instance monoid : Monoid Ordinal.{u} where mul a b := Quotient.liftOn₂ a b (fun ⟨α, r, wo⟩ ⟨β, s, wo'⟩ => ⟦⟨β × α, Prod.Lex s r, inferInstance⟩⟧ : WellOrder → WellOrder → Ordinal) fun ⟨α₁, r₁, o₁⟩ ⟨α₂, r₂, o₂⟩ ⟨β₁, s₁, p₁⟩ ⟨β₂, s₂, p₂⟩ ⟨f⟩ ⟨g⟩ => Quot.sound ⟨RelIso.prodLexCongr g f⟩ one := 1 mul_assoc a b c := Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Eq.symm <\| Quotient.sound ⟨⟨prodAssoc _ _ _, @fun a b => by rcases a with ⟨⟨a₁, a₂⟩, a₃⟩ rcases b with ⟨⟨b₁, b₂⟩, b₃⟩ simp [Prod.lex_def, and_or_left, or_assoc, and_assoc]⟩⟩ mul_one a := inductionOn a fun α r _ => Quotient.sound ⟨⟨punitProd _, @fun a b => by rcases a with ⟨⟨⟨⟩⟩, a⟩; rcases b with ⟨⟨⟨⟩⟩, b⟩ simp only [Prod.lex_def, EmptyRelation, false_or_iff] simp only [eq_self_iff_true, true_and_iff] rfl⟩⟩ one_mul a := inductionOn a fun α r _ => Quotient.sound ⟨⟨prodPUnit _, @fun a b => by rcases a with ⟨a, ⟨⟨⟩⟩⟩; rcases b with ⟨b, ⟨⟨⟩⟩⟩ simp only [Prod.lex_def, EmptyRelation, and_false_iff, or_false_iff] rfl⟩⟩ @[simp] theorem type_prod_lex {α β : Type u} (r : α → α → Prop) (s : β → β → Prop) [IsWellOrder α r] [IsWellOrder β s] : type (Prod.Lex s r) = type r * type s := rfl #align ordinal.type_prod_lex Ordinal.type_prod_lex private theorem mul_eq_zero' {a b : Ordinal} : a * b = 0 ↔ a = 0 ∨ b = 0 := inductionOn a fun α _ _ => inductionOn b fun β _ _ => by simp_rw [← type_prod_lex, type_eq_zero_iff_isEmpty] rw [or_comm] exact isEmpty_prod instance monoidWithZero : MonoidWithZero Ordinal := { Ordinal.monoid with zero := 0 mul_zero := fun _a => mul_eq_zero'.2 <\| Or.inr rfl zero_mul := fun _a => mul_eq_zero'.2 <\| Or.inl rfl } instance noZeroDivisors : NoZeroDivisors Ordinal := ⟨fun {_ _} => mul_eq_zero'.1⟩ @[simp] theorem lift_mul (a b : Ordinal.{v}) : lift.{u} (a * b) = lift.{u} a * lift.{u} b := Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift _).trans (RelIso.prodLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩ #align ordinal.lift_mul Ordinal.lift_mul @[simp] theorem card_mul (a b) : card (a * b) = card a * card b := Quotient.inductionOn₂ a b fun ⟨α, _r, _⟩ ⟨β, _s, _⟩ => mul_comm #β #α #align ordinal.card_mul Ordinal.card_mul instance leftDistribClass : LeftDistribClass Ordinal.{u} := ⟨fun a b c => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Quotient.sound ⟨⟨sumProdDistrib _ _ _, by rintro ⟨a₁ \| a₁, a₂⟩ ⟨b₁ \| b₁, b₂⟩ <;> simp only [Prod.lex_def, Sum.lex_inl_inl, Sum.Lex.sep, Sum.lex_inr_inl, Sum.lex_inr_inr, sumProdDistrib_apply_left, sumProdDistrib_apply_right] <;> -- Porting note: `Sum.inr.inj_iff` is required. simp only [Sum.inl.inj_iff, Sum.inr.inj_iff, true_or_iff, false_and_iff, false_or_iff]⟩⟩⟩ theorem mul_succ (a b : Ordinal) : a * succ b = a * b + a := mul_add_one a b #align ordinal.mul_succ Ordinal.mul_succ instance mul_covariantClass_le : CovariantClass Ordinal.{u} Ordinal.{u} (· * ·) (· ≤ ·) := ⟨fun c a b => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by refine (RelEmbedding.ofMonotone (fun a : α × γ => (f a.1, a.2)) fun a b h => ?_).ordinal_type_le cases' h with a₁ b₁ a₂ b₂ h' a b₁ b₂ h' · exact Prod.Lex.left _ _ (f.toRelEmbedding.map_rel_iff.2 h') · exact Prod.Lex.right _ h'⟩ #align ordinal.mul_covariant_class_le Ordinal.mul_covariantClass_le instance mul_swap_covariantClass_le : CovariantClass Ordinal.{u} Ordinal.{u} (swap (· * ·)) (· ≤ ·) := ⟨fun c a b => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by refine (RelEmbedding.ofMonotone (fun a : γ × α => (a.1, f a.2)) fun a b h => ?_).ordinal_type_le cases' h with a₁ b₁ a₂ b₂ h' a b₁ b₂ h' · exact Prod.Lex.left _ _ h' · exact Prod.Lex.right _ (f.toRelEmbedding.map_rel_iff.2 h')⟩ #align ordinal.mul_swap_covariant_class_le Ordinal.mul_swap_covariantClass_le theorem le_mul_left (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ a * b := by convert mul_le_mul_left' (one_le_iff_pos.2 hb) a rw [mul_one a] #align ordinal.le_mul_left Ordinal.le_mul_left theorem le_mul_right (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ b * a := by convert mul_le_mul_right' (one_le_iff_pos.2 hb) a rw [one_mul a] #align ordinal.le_mul_right Ordinal.le_mul_right private theorem mul_le_of_limit_aux {α β r s} [IsWellOrder α r] [IsWellOrder β s] {c} (h : IsLimit (type s)) (H : ∀ b' < type s, type r * b' ≤ c) (l : c < type r * type s) : False := by suffices ∀ a b, Prod.Lex s r (b, a) (enum _ _ l) by cases' enum _ _ l with b a exact irrefl _ (this _ _) intro a b rw [← typein_lt_typein (Prod.Lex s r), typein_enum] have := H _ (h.2 _ (typein_lt_type s b)) rw [mul_succ] at this have := ((add_lt_add_iff_left _).2 (typein_lt_type _ a)).trans_le this refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this · rcases a with ⟨⟨b', a'⟩, h⟩ by_cases e : b = b' · refine Sum.inr ⟨a', ?_⟩ subst e cases' h with _ _ _ _ h _ _ _ h · exact (irrefl _ h).elim · exact h · refine Sum.inl (⟨b', ?_⟩, a') cases' h with _ _ _ _ h _ _ _ h · exact h · exact (e rfl).elim · rcases a with ⟨⟨b₁, a₁⟩, h₁⟩ rcases b with ⟨⟨b₂, a₂⟩, h₂⟩ intro h by_cases e₁ : b = b₁ <;> by_cases e₂ : b = b₂ · substs b₁ b₂ simpa only [subrel_val, Prod.lex_def, @irrefl _ s _ b, true_and_iff, false_or_iff, eq_self_iff_true, dif_pos, Sum.lex_inr_inr] using h · subst b₁ simp only [subrel_val, Prod.lex_def, e₂, Prod.lex_def, dif_pos, subrel_val, eq_self_iff_true, or_false_iff, dif_neg, not_false_iff, Sum.lex_inr_inl, false_and_iff] at h ⊢ cases' h₂ with _ _ _ _ h₂_h h₂_h <;> [exact asymm h h₂_h; exact e₂ rfl] -- Porting note: `cc` hadn't ported yet. · simp [e₂, dif_neg e₁, show b₂ ≠ b₁ from e₂ ▸ e₁] · simpa only [dif_neg e₁, dif_neg e₂, Prod.lex_def, subrel_val, Subtype.mk_eq_mk, Sum.lex_inl_inl] using h theorem mul_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a * b ≤ c ↔ ∀ b' < b, a * b' ≤ c := ⟨fun h b' l => (mul_le_mul_left' l.le _).trans h, fun H => -- Porting note: `induction` tactics are required because of the parser bug. le_of_not_lt <\| by induction a using inductionOn with \| H α r => induction b using inductionOn with \| H β s => exact mul_le_of_limit_aux h H⟩ #align ordinal.mul_le_of_limit Ordinal.mul_le_of_limit theorem mul_isNormal {a : Ordinal} (h : 0 < a) : IsNormal (a * ·) := -- Porting note(#12129): additional beta reduction needed ⟨fun b => by beta_reduce rw [mul_succ] simpa only [add_zero] using (add_lt_add_iff_left (a * b)).2 h, fun b l c => mul_le_of_limit l⟩ #align ordinal.mul_is_normal Ordinal.mul_isNormal theorem lt_mul_of_limit {a b c : Ordinal} (h : IsLimit c) : a < b * c ↔ ∃ c' < c, a < b * c' := by -- Porting note: `bex_def` is required. simpa only [not_forall₂, not_le, bex_def] using not_congr (@mul_le_of_limit b c a h) #align ordinal.lt_mul_of_limit Ordinal.lt_mul_of_limit theorem mul_lt_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b < a * c ↔ b < c := (mul_isNormal a0).lt_iff #align ordinal.mul_lt_mul_iff_left Ordinal.mul_lt_mul_iff_left theorem mul_le_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b ≤ a * c ↔ b ≤ c := (mul_isNormal a0).le_iff #align ordinal.mul_le_mul_iff_left Ordinal.mul_le_mul_iff_left theorem mul_lt_mul_of_pos_left {a b c : Ordinal} (h : a < b) (c0 : 0 < c) : c * a < c * b := (mul_lt_mul_iff_left c0).2 h #align ordinal.mul_lt_mul_of_pos_left Ordinal.mul_lt_mul_of_pos_left theorem mul_pos {a b : Ordinal} (h₁ : 0 < a) (h₂ : 0 < b) : 0 < a * b := by simpa only [mul_zero] using mul_lt_mul_of_pos_left h₂ h₁ #align ordinal.mul_pos Ordinal.mul_pos theorem mul_ne_zero {a b : Ordinal} : a ≠ 0 → b ≠ 0 → a * b ≠ 0 := by simpa only [Ordinal.pos_iff_ne_zero] using mul_pos #align ordinal.mul_ne_zero Ordinal.mul_ne_zero theorem le_of_mul_le_mul_left {a b c : Ordinal} (h : c * a ≤ c * b) (h0 : 0 < c) : a ≤ b := le_imp_le_of_lt_imp_lt (fun h' => mul_lt_mul_of_pos_left h' h0) h #align ordinal.le_of_mul_le_mul_left Ordinal.le_of_mul_le_mul_left theorem mul_right_inj {a b c : Ordinal} (a0 : 0 < a) : a * b = a * c ↔ b = c := (mul_isNormal a0).inj #align ordinal.mul_right_inj Ordinal.mul_right_inj theorem mul_isLimit {a b : Ordinal} (a0 : 0 < a) : IsLimit b → IsLimit (a * b) := (mul_isNormal a0).isLimit #align ordinal.mul_is_limit Ordinal.mul_isLimit theorem mul_isLimit_left {a b : Ordinal} (l : IsLimit a) (b0 : 0 < b) : IsLimit (a * b) := by rcases zero_or_succ_or_limit b with (rfl \| ⟨b, rfl⟩ \| lb) · exact b0.false.elim · rw [mul_succ] exact add_isLimit _ l · exact mul_isLimit l.pos lb #align ordinal.mul_is_limit_left Ordinal.mul_isLimit_left theorem smul_eq_mul : ∀ (n : ℕ) (a : Ordinal), n • a = a * n \| 0, a => by rw [zero_nsmul, Nat.cast_zero, mul_zero] \| n + 1, a => by rw [succ_nsmul, Nat.cast_add, mul_add, Nat.cast_one, mul_one, smul_eq_mul n] #align ordinal.smul_eq_mul Ordinal.smul_eq_mul theorem div_nonempty {a b : Ordinal} (h : b ≠ 0) : { o \| a < b * succ o }.Nonempty := ⟨a, (succ_le_iff (a := a) (b := b * succ a)).1 <\| by simpa only [succ_zero, one_mul] using mul_le_mul_right' (succ_le_of_lt (Ordinal.pos_iff_ne_zero.2 h)) (succ a)⟩ #align ordinal.div_nonempty Ordinal.div_nonempty instance div : Div Ordinal := ⟨fun a b => if _h : b = 0 then 0 else sInf { o \| a < b * succ o }⟩ @[simp] theorem div_zero (a : Ordinal) : a / 0 = 0 := dif_pos rfl #align ordinal.div_zero Ordinal.div_zero theorem div_def (a) {b : Ordinal} (h : b ≠ 0) : a / b = sInf { o \| a < b * succ o } := dif_neg h #align ordinal.div_def Ordinal.div_def theorem lt_mul_succ_div (a) {b : Ordinal} (h : b ≠ 0) : a < b * succ (a / b) := by rw [div_def a h]; exact csInf_mem (div_nonempty h) #align ordinal.lt_mul_succ_div Ordinal.lt_mul_succ_div theorem lt_mul_div_add (a) {b : Ordinal} (h : b ≠ 0) : a < b * (a / b) + b := by simpa only [mul_succ] using lt_mul_succ_div a h #align ordinal.lt_mul_div_add Ordinal.lt_mul_div_add theorem div_le {a b c : Ordinal} (b0 : b ≠ 0) : a / b ≤ c ↔ a < b * succ c := ⟨fun h => (lt_mul_succ_div a b0).trans_le (mul_le_mul_left' (succ_le_succ_iff.2 h) _), fun h => by rw [div_def a b0]; exact csInf_le' h⟩ #align ordinal.div_le Ordinal.div_le theorem lt_div {a b c : Ordinal} (h : c ≠ 0) : a < b / c ↔ c * succ a ≤ b := by rw [← not_le, div_le h, not_lt] #align ordinal.lt_div Ordinal.lt_div theorem div_pos {b c : Ordinal} (h : c ≠ 0) : 0 < b / c ↔ c ≤ b := by simp [lt_div h] #align ordinal.div_pos Ordinal.div_pos theorem le_div {a b c : Ordinal} (c0 : c ≠ 0) : a ≤ b / c ↔ c * a ≤ b := by induction a using limitRecOn with \| H₁ => simp only [mul_zero, Ordinal.zero_le] \| H₂ _ _ => rw [succ_le_iff, lt_div c0] \| H₃ _ h₁ h₂ => revert h₁ h₂ simp (config := { contextual := true }) only [mul_le_of_limit, limit_le, iff_self_iff, forall_true_iff] #align ordinal.le_div Ordinal.le_div theorem div_lt {a b c : Ordinal} (b0 : b ≠ 0) : a / b < c ↔ a < b * c := lt_iff_lt_of_le_iff_le <\| le_div b0 #align ordinal.div_lt Ordinal.div_lt theorem div_le_of_le_mul {a b c : Ordinal} (h : a ≤ b * c) : a / b ≤ c := if b0 : b = 0 then by simp only [b0, div_zero, Ordinal.zero_le] else (div_le b0).2 <\| h.trans_lt <\| mul_lt_mul_of_pos_left (lt_succ c) (Ordinal.pos_iff_ne_zero.2 b0) #align ordinal.div_le_of_le_mul Ordinal.div_le_of_le_mul theorem mul_lt_of_lt_div {a b c : Ordinal} : a < b / c → c * a < b := lt_imp_lt_of_le_imp_le div_le_of_le_mul #align ordinal.mul_lt_of_lt_div Ordinal.mul_lt_of_lt_div @[simp] theorem zero_div (a : Ordinal) : 0 / a = 0 := Ordinal.le_zero.1 <\| div_le_of_le_mul <\| Ordinal.zero_le _ #align ordinal.zero_div Ordinal.zero_div theorem mul_div_le (a b : Ordinal) : b * (a / b) ≤ a := if b0 : b = 0 then by simp only [b0, zero_mul, Ordinal.zero_le] else (le_div b0).1 le_rfl #align ordinal.mul_div_le Ordinal.mul_div_le theorem mul_add_div (a) {b : Ordinal} (b0 : b ≠ 0) (c) : (b * a + c) / b = a + c / b := by apply le_antisymm · apply (div_le b0).2 rw [mul_succ, mul_add, add_assoc, add_lt_add_iff_left] apply lt_mul_div_add _ b0 · rw [le_div b0, mul_add, add_le_add_iff_left] apply mul_div_le #align ordinal.mul_add_div Ordinal.mul_add_div theorem div_eq_zero_of_lt {a b : Ordinal} (h : a < b) : a / b = 0 := by rw [← Ordinal.le_zero, div_le <\| Ordinal.pos_iff_ne_zero.1 <\| (Ordinal.zero_le _).trans_lt h] simpa only [succ_zero, mul_one] using h #align ordinal.div_eq_zero_of_lt Ordinal.div_eq_zero_of_lt @[simp] theorem mul_div_cancel (a) {b : Ordinal} (b0 : b ≠ 0) : b * a / b = a := by simpa only [add_zero, zero_div] using mul_add_div a b0 0 #align ordinal.mul_div_cancel Ordinal.mul_div_cancel @[simp] theorem div_one (a : Ordinal) : a / 1 = a := by simpa only [one_mul] using mul_div_cancel a Ordinal.one_ne_zero #align ordinal.div_one Ordinal.div_one @[simp] theorem div_self {a : Ordinal} (h : a ≠ 0) : a / a = 1 := by simpa only [mul_one] using mul_div_cancel 1 h #align ordinal.div_self Ordinal.div_self theorem mul_sub (a b c : Ordinal) : a * (b - c) = a * b - a * c := if a0 : a = 0 then by simp only [a0, zero_mul, sub_self] else eq_of_forall_ge_iff fun d => by rw [sub_le, ← le_div a0, sub_le, ← le_div a0, mul_add_div _ a0] #align ordinal.mul_sub Ordinal.mul_sub theorem isLimit_add_iff {a b} : IsLimit (a + b) ↔ IsLimit b ∨ b = 0 ∧ IsLimit a := by constructor <;> intro h · by_cases h' : b = 0 · rw [h', add_zero] at h right exact ⟨h', h⟩ left rw [← add_sub_cancel a b] apply sub_isLimit h suffices a + 0 < a + b by simpa only [add_zero] using this rwa [add_lt_add_iff_left, Ordinal.pos_iff_ne_zero] rcases h with (h \| ⟨rfl, h⟩) · exact add_isLimit a h · simpa only [add_zero] #align ordinal.is_limit_add_iff Ordinal.isLimit_add_iff theorem dvd_add_iff : ∀ {a b c : Ordinal}, a ∣ b → (a ∣ b + c ↔ a ∣ c) \| a, _, c, ⟨b, rfl⟩ => ⟨fun ⟨d, e⟩ => ⟨d - b, by rw [mul_sub, ← e, add_sub_cancel]⟩, fun ⟨d, e⟩ => by rw [e, ← mul_add] apply dvd_mul_right⟩ #align ordinal.dvd_add_iff Ordinal.dvd_add_iff theorem div_mul_cancel : ∀ {a b : Ordinal}, a ≠ 0 → a ∣ b → a * (b / a) = b \| a, _, a0, ⟨b, rfl⟩ => by rw [mul_div_cancel _ a0] #align ordinal.div_mul_cancel Ordinal.div_mul_cancel theorem le_of_dvd : ∀ {a b : Ordinal}, b ≠ 0 → a ∣ b → a ≤ b -- Porting note: `⟨b, rfl⟩ => by` → `⟨b, e⟩ => by subst e` \| a, _, b0, ⟨b, e⟩ => by subst e -- Porting note: `Ne` is required. simpa only [mul_one] using mul_le_mul_left' (one_le_iff_ne_zero.2 fun h : b = 0 => by simp only [h, mul_zero, Ne, not_true_eq_false] at b0) a #align ordinal.le_of_dvd Ordinal.le_of_dvd theorem dvd_antisymm {a b : Ordinal} (h₁ : a ∣ b) (h₂ : b ∣ a) : a = b := if a0 : a = 0 then by subst a; exact (eq_zero_of_zero_dvd h₁).symm else if b0 : b = 0 then by subst b; exact eq_zero_of_zero_dvd h₂ else (le_of_dvd b0 h₁).antisymm (le_of_dvd a0 h₂) #align ordinal.dvd_antisymm Ordinal.dvd_antisymm instance isAntisymm : IsAntisymm Ordinal (· ∣ ·) := ⟨@dvd_antisymm⟩ instance mod : Mod Ordinal := ⟨fun a b => a - b * (a / b)⟩ theorem mod_def (a b : Ordinal) : a % b = a - b * (a / b) := rfl #align ordinal.mod_def Ordinal.mod_def theorem mod_le (a b : Ordinal) : a % b ≤ a := sub_le_self a _ #align ordinal.mod_le Ordinal.mod_le @[simp] theorem mod_zero (a : Ordinal) : a % 0 = a := by simp only [mod_def, div_zero, zero_mul, sub_zero] #align ordinal.mod_zero Ordinal.mod_zero theorem mod_eq_of_lt {a b : Ordinal} (h : a < b) : a % b = a := by simp only [mod_def, div_eq_zero_of_lt h, mul_zero, sub_zero] #align ordinal.mod_eq_of_lt Ordinal.mod_eq_of_lt @[simp] theorem zero_mod (b : Ordinal) : 0 % b = 0 := by simp only [mod_def, zero_div, mul_zero, sub_self] #align ordinal.zero_mod Ordinal.zero_mod theorem div_add_mod (a b : Ordinal) : b * (a / b) + a % b = a := Ordinal.add_sub_cancel_of_le <\| mul_div_le _ _ #align ordinal.div_add_mod Ordinal.div_add_mod theorem mod_lt (a) {b : Ordinal} (h : b ≠ 0) : a % b < b := (add_lt_add_iff_left (b * (a / b))).1 <\| by rw [div_add_mod]; exact lt_mul_div_add a h #align ordinal.mod_lt Ordinal.mod_lt @[simp] theorem mod_self (a : Ordinal) : a % a = 0 := if a0 : a = 0 then by simp only [a0, zero_mod] else by simp only [mod_def, div_self a0, mul_one, sub_self] #align ordinal.mod_self Ordinal.mod_self @[simp] theorem mod_one (a : Ordinal) : a % 1 = 0 := by simp only [mod_def, div_one, one_mul, sub_self] #align ordinal.mod_one Ordinal.mod_one theorem dvd_of_mod_eq_zero {a b : Ordinal} (H : a % b = 0) : b ∣ a := ⟨a / b, by simpa [H] using (div_add_mod a b).symm⟩ #align ordinal.dvd_of_mod_eq_zero Ordinal.dvd_of_mod_eq_zero theorem mod_eq_zero_of_dvd {a b : Ordinal} (H : b ∣ a) : a % b = 0 := by rcases H with ⟨c, rfl⟩ rcases eq_or_ne b 0 with (rfl \| hb) · simp · simp [mod_def, hb] #align ordinal.mod_eq_zero_of_dvd Ordinal.mod_eq_zero_of_dvd theorem dvd_iff_mod_eq_zero {a b : Ordinal} : b ∣ a ↔ a % b = 0 := ⟨mod_eq_zero_of_dvd, dvd_of_mod_eq_zero⟩ #align ordinal.dvd_iff_mod_eq_zero Ordinal.dvd_iff_mod_eq_zero @[simp] theorem mul_add_mod_self (x y z : Ordinal) : (x * y + z) % x = z % x := by rcases eq_or_ne x 0 with rfl \| hx · simp · rwa [mod_def, mul_add_div, mul_add, ← sub_sub, add_sub_cancel, mod_def] #align ordinal.mul_add_mod_self Ordinal.mul_add_mod_self @[simp] theorem mul_mod (x y : Ordinal) : x * y % x = 0 := by simpa using mul_add_mod_self x y 0 #align ordinal.mul_mod Ordinal.mul_mod theorem mod_mod_of_dvd (a : Ordinal) {b c : Ordinal} (h : c ∣ b) : a % b % c = a % c := by nth_rw 2 [← div_add_mod a b] rcases h with ⟨d, rfl⟩ rw [mul_assoc, mul_add_mod_self] #align ordinal.mod_mod_of_dvd Ordinal.mod_mod_of_dvd @[simp] theorem mod_mod (a b : Ordinal) : a % b % b = a % b := mod_mod_of_dvd a dvd_rfl #align ordinal.mod_mod Ordinal.mod_mod def bfamilyOfFamily' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] (f : ι → α) : ∀ a < type r, α := fun a ha => f (enum r a ha) #align ordinal.bfamily_of_family' Ordinal.bfamilyOfFamily' def bfamilyOfFamily {ι : Type u} : (ι → α) → ∀ a < type (@WellOrderingRel ι), α := bfamilyOfFamily' WellOrderingRel #align ordinal.bfamily_of_family Ordinal.bfamilyOfFamily def familyOfBFamily' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] {o} (ho : type r = o) (f : ∀ a < o, α) : ι → α := fun i => f (typein r i) (by rw [← ho] exact typein_lt_type r i) #align ordinal.family_of_bfamily' Ordinal.familyOfBFamily' def familyOfBFamily (o : Ordinal) (f : ∀ a < o, α) : o.out.α → α := familyOfBFamily' (· < ·) (type_lt o) f #align ordinal.family_of_bfamily Ordinal.familyOfBFamily @[simp] theorem bfamilyOfFamily'_typein {ι} (r : ι → ι → Prop) [IsWellOrder ι r] (f : ι → α) (i) : bfamilyOfFamily' r f (typein r i) (typein_lt_type r i) = f i := by simp only [bfamilyOfFamily', enum_typein] #align ordinal.bfamily_of_family'_typein Ordinal.bfamilyOfFamily'_typein @[simp] theorem bfamilyOfFamily_typein {ι} (f : ι → α) (i) : bfamilyOfFamily f (typein _ i) (typein_lt_type _ i) = f i := bfamilyOfFamily'_typein _ f i #align ordinal.bfamily_of_family_typein Ordinal.bfamilyOfFamily_typein @[simp, nolint simpNF] -- Porting note (#10959): simp cannot prove this theorem familyOfBFamily'_enum {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] {o} (ho : type r = o) (f : ∀ a < o, α) (i hi) : familyOfBFamily' r ho f (enum r i (by rwa [ho])) = f i hi := by simp only [familyOfBFamily', typein_enum] #align ordinal.family_of_bfamily'_enum Ordinal.familyOfBFamily'_enum @[simp, nolint simpNF] -- Porting note (#10959): simp cannot prove this theorem familyOfBFamily_enum (o : Ordinal) (f : ∀ a < o, α) (i hi) : familyOfBFamily o f (enum (· < ·) i (by convert hi exact type_lt _)) = f i hi := familyOfBFamily'_enum _ (type_lt o) f _ _ #align ordinal.family_of_bfamily_enum Ordinal.familyOfBFamily_enum def brange (o : Ordinal) (f : ∀ a < o, α) : Set α := { a \| ∃ i hi, f i hi = a } #align ordinal.brange Ordinal.brange theorem mem_brange {o : Ordinal} {f : ∀ a < o, α} {a} : a ∈ brange o f ↔ ∃ i hi, f i hi = a := Iff.rfl #align ordinal.mem_brange Ordinal.mem_brange theorem mem_brange_self {o} (f : ∀ a < o, α) (i hi) : f i hi ∈ brange o f := ⟨i, hi, rfl⟩ #align ordinal.mem_brange_self Ordinal.mem_brange_self @[simp] theorem range_familyOfBFamily' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] {o} (ho : type r = o) (f : ∀ a < o, α) : range (familyOfBFamily' r ho f) = brange o f := by refine Set.ext fun a => ⟨?_, ?_⟩ · rintro ⟨b, rfl⟩ apply mem_brange_self · rintro ⟨i, hi, rfl⟩ exact ⟨_, familyOfBFamily'_enum _ _ _ _ _⟩ #align ordinal.range_family_of_bfamily' Ordinal.range_familyOfBFamily' @[simp] theorem range_familyOfBFamily {o} (f : ∀ a < o, α) : range (familyOfBFamily o f) = brange o f := range_familyOfBFamily' _ _ f #align ordinal.range_family_of_bfamily Ordinal.range_familyOfBFamily @[simp] theorem brange_bfamilyOfFamily' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] (f : ι → α) : brange _ (bfamilyOfFamily' r f) = range f := by refine Set.ext fun a => ⟨?_, ?_⟩ · rintro ⟨i, hi, rfl⟩ apply mem_range_self · rintro ⟨b, rfl⟩ exact ⟨_, _, bfamilyOfFamily'_typein _ _ _⟩ #align ordinal.brange_bfamily_of_family' Ordinal.brange_bfamilyOfFamily' @[simp] theorem brange_bfamilyOfFamily {ι : Type u} (f : ι → α) : brange _ (bfamilyOfFamily f) = range f := brange_bfamilyOfFamily' _ _ #align ordinal.brange_bfamily_of_family Ordinal.brange_bfamilyOfFamily @[simp] theorem brange_const {o : Ordinal} (ho : o ≠ 0) {c : α} : (brange o fun _ _ => c) = {c} := by rw [← range_familyOfBFamily] exact @Set.range_const _ o.out.α (out_nonempty_iff_ne_zero.2 ho) c #align ordinal.brange_const Ordinal.brange_const theorem comp_bfamilyOfFamily' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] (f : ι → α) (g : α → β) : (fun i hi => g (bfamilyOfFamily' r f i hi)) = bfamilyOfFamily' r (g ∘ f) := rfl #align ordinal.comp_bfamily_of_family' Ordinal.comp_bfamilyOfFamily' theorem comp_bfamilyOfFamily {ι : Type u} (f : ι → α) (g : α → β) : (fun i hi => g (bfamilyOfFamily f i hi)) = bfamilyOfFamily (g ∘ f) := rfl #align ordinal.comp_bfamily_of_family Ordinal.comp_bfamilyOfFamily theorem comp_familyOfBFamily' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] {o} (ho : type r = o) (f : ∀ a < o, α) (g : α → β) : g ∘ familyOfBFamily' r ho f = familyOfBFamily' r ho fun i hi => g (f i hi) := rfl #align ordinal.comp_family_of_bfamily' Ordinal.comp_familyOfBFamily' theorem comp_familyOfBFamily {o} (f : ∀ a < o, α) (g : α → β) : g ∘ familyOfBFamily o f = familyOfBFamily o fun i hi => g (f i hi) := rfl #align ordinal.comp_family_of_bfamily Ordinal.comp_familyOfBFamily -- Porting note: Universes should be specified in `sup`s. def sup {ι : Type u} (f : ι → Ordinal.{max u v}) : Ordinal.{max u v} := iSup f #align ordinal.sup Ordinal.sup @[simp] theorem sSup_eq_sup {ι : Type u} (f : ι → Ordinal.{max u v}) : sSup (Set.range f) = sup.{_, v} f := rfl #align ordinal.Sup_eq_sup Ordinal.sSup_eq_sup theorem bddAbove_range {ι : Type u} (f : ι → Ordinal.{max u v}) : BddAbove (Set.range f) := ⟨(iSup (succ ∘ card ∘ f)).ord, by rintro a ⟨i, rfl⟩ exact le_of_lt (Cardinal.lt_ord.2 ((lt_succ _).trans_le (le_ciSup (Cardinal.bddAbove_range.{_, v} _) _)))⟩ #align ordinal.bdd_above_range Ordinal.bddAbove_range theorem le_sup {ι : Type u} (f : ι → Ordinal.{max u v}) : ∀ i, f i ≤ sup.{_, v} f := fun i => le_csSup (bddAbove_range.{_, v} f) (mem_range_self i) #align ordinal.le_sup Ordinal.le_sup theorem sup_le_iff {ι : Type u} {f : ι → Ordinal.{max u v}} {a} : sup.{_, v} f ≤ a ↔ ∀ i, f i ≤ a := (csSup_le_iff' (bddAbove_range.{_, v} f)).trans (by simp) #align ordinal.sup_le_iff Ordinal.sup_le_iff theorem sup_le {ι : Type u} {f : ι → Ordinal.{max u v}} {a} : (∀ i, f i ≤ a) → sup.{_, v} f ≤ a := sup_le_iff.2 #align ordinal.sup_le Ordinal.sup_le theorem lt_sup {ι : Type u} {f : ι → Ordinal.{max u v}} {a} : a < sup.{_, v} f ↔ ∃ i, a < f i := by simpa only [not_forall, not_le] using not_congr (@sup_le_iff.{_, v} _ f a) #align ordinal.lt_sup Ordinal.lt_sup theorem ne_sup_iff_lt_sup {ι : Type u} {f : ι → Ordinal.{max u v}} : (∀ i, f i ≠ sup.{_, v} f) ↔ ∀ i, f i < sup.{_, v} f := ⟨fun hf _ => lt_of_le_of_ne (le_sup _ _) (hf _), fun hf _ => ne_of_lt (hf _)⟩ #align ordinal.ne_sup_iff_lt_sup Ordinal.ne_sup_iff_lt_sup theorem sup_not_succ_of_ne_sup {ι : Type u} {f : ι → Ordinal.{max u v}} (hf : ∀ i, f i ≠ sup.{_, v} f) {a} (hao : a < sup.{_, v} f) : succ a < sup.{_, v} f := by by_contra! hoa exact hao.not_le (sup_le fun i => le_of_lt_succ <\| (lt_of_le_of_ne (le_sup _ _) (hf i)).trans_le hoa) #align ordinal.sup_not_succ_of_ne_sup Ordinal.sup_not_succ_of_ne_sup @[simp] theorem sup_eq_zero_iff {ι : Type u} {f : ι → Ordinal.{max u v}} : sup.{_, v} f = 0 ↔ ∀ i, f i = 0 := by refine ⟨fun h i => ?_, fun h => le_antisymm (sup_le fun i => Ordinal.le_zero.2 (h i)) (Ordinal.zero_le _)⟩ rw [← Ordinal.le_zero, ← h] exact le_sup f i #align ordinal.sup_eq_zero_iff Ordinal.sup_eq_zero_iff theorem IsNormal.sup {f : Ordinal.{max u v} → Ordinal.{max u w}} (H : IsNormal f) {ι : Type u} (g : ι → Ordinal.{max u v}) [Nonempty ι] : f (sup.{_, v} g) = sup.{_, w} (f ∘ g) := eq_of_forall_ge_iff fun a => by rw [sup_le_iff]; simp only [comp]; rw [H.le_set' Set.univ Set.univ_nonempty g] <;> simp [sup_le_iff] #align ordinal.is_normal.sup Ordinal.IsNormal.sup @[simp] theorem sup_empty {ι} [IsEmpty ι] (f : ι → Ordinal) : sup f = 0 := ciSup_of_empty f #align ordinal.sup_empty Ordinal.sup_empty @[simp] theorem sup_const {ι} [_hι : Nonempty ι] (o : Ordinal) : (sup fun _ : ι => o) = o := ciSup_const #align ordinal.sup_const Ordinal.sup_const @[simp] theorem sup_unique {ι} [Unique ι] (f : ι → Ordinal) : sup f = f default := ciSup_unique #align ordinal.sup_unique Ordinal.sup_unique theorem sup_le_of_range_subset {ι ι'} {f : ι → Ordinal} {g : ι' → Ordinal} (h : Set.range f ⊆ Set.range g) : sup.{u, max v w} f ≤ sup.{v, max u w} g := sup_le fun i => match h (mem_range_self i) with \| ⟨_j, hj⟩ => hj ▸ le_sup _ _ #align ordinal.sup_le_of_range_subset Ordinal.sup_le_of_range_subset theorem sup_eq_of_range_eq {ι ι'} {f : ι → Ordinal} {g : ι' → Ordinal} (h : Set.range f = Set.range g) : sup.{u, max v w} f = sup.{v, max u w} g := (sup_le_of_range_subset.{u, v, w} h.le).antisymm (sup_le_of_range_subset.{v, u, w} h.ge) #align ordinal.sup_eq_of_range_eq Ordinal.sup_eq_of_range_eq @[simp] theorem sup_sum {α : Type u} {β : Type v} (f : Sum α β → Ordinal) : sup.{max u v, w} f = max (sup.{u, max v w} fun a => f (Sum.inl a)) (sup.{v, max u w} fun b => f (Sum.inr b)) := by apply (sup_le_iff.2 _).antisymm (max_le_iff.2 ⟨_, _⟩) · rintro (i \| i) · exact le_max_of_le_left (le_sup _ i) · exact le_max_of_le_right (le_sup _ i) all_goals apply sup_le_of_range_subset.{_, max u v, w} rintro i ⟨a, rfl⟩ apply mem_range_self #align ordinal.sup_sum Ordinal.sup_sum theorem unbounded_range_of_sup_ge {α β : Type u} (r : α → α → Prop) [IsWellOrder α r] (f : β → α) (h : type r ≤ sup.{u, u} (typein r ∘ f)) : Unbounded r (range f) := (not_bounded_iff _).1 fun ⟨x, hx⟩ => not_lt_of_le h <\| lt_of_le_of_lt (sup_le fun y => le_of_lt <\| (typein_lt_typein r).2 <\| hx _ <\| mem_range_self y) (typein_lt_type r x) #align ordinal.unbounded_range_of_sup_ge Ordinal.unbounded_range_of_sup_ge theorem le_sup_shrink_equiv {s : Set Ordinal.{u}} (hs : Small.{u} s) (a) (ha : a ∈ s) : a ≤ sup.{u, u} fun x => ((@equivShrink s hs).symm x).val := by convert le_sup.{u, u} (fun x => ((@equivShrink s hs).symm x).val) ((@equivShrink s hs) ⟨a, ha⟩) rw [symm_apply_apply] #align ordinal.le_sup_shrink_equiv Ordinal.le_sup_shrink_equiv instance small_Iio (o : Ordinal.{u}) : Small.{u} (Set.Iio o) := let f : o.out.α → Set.Iio o := fun x => ⟨typein ((· < ·) : o.out.α → o.out.α → Prop) x, typein_lt_self x⟩ let hf : Surjective f := fun b => ⟨enum (· < ·) b.val (by rw [type_lt] exact b.prop), Subtype.ext (typein_enum _ _)⟩ small_of_surjective hf #align ordinal.small_Iio Ordinal.small_Iio instance small_Iic (o : Ordinal.{u}) : Small.{u} (Set.Iic o) := by rw [← Iio_succ] infer_instance #align ordinal.small_Iic Ordinal.small_Iic theorem bddAbove_iff_small {s : Set Ordinal.{u}} : BddAbove s ↔ Small.{u} s := ⟨fun ⟨a, h⟩ => small_subset <\| show s ⊆ Iic a from fun _x hx => h hx, fun h => ⟨sup.{u, u} fun x => ((@equivShrink s h).symm x).val, le_sup_shrink_equiv h⟩⟩ #align ordinal.bdd_above_iff_small Ordinal.bddAbove_iff_small theorem bddAbove_of_small (s : Set Ordinal.{u}) [h : Small.{u} s] : BddAbove s := bddAbove_iff_small.2 h #align ordinal.bdd_above_of_small Ordinal.bddAbove_of_small theorem sup_eq_sSup {s : Set Ordinal.{u}} (hs : Small.{u} s) : (sup.{u, u} fun x => (@equivShrink s hs).symm x) = sSup s := let hs' := bddAbove_iff_small.2 hs ((csSup_le_iff' hs').2 (le_sup_shrink_equiv hs)).antisymm' (sup_le fun _x => le_csSup hs' (Subtype.mem _)) #align ordinal.sup_eq_Sup Ordinal.sup_eq_sSup theorem sSup_ord {s : Set Cardinal.{u}} (hs : BddAbove s) : (sSup s).ord = sSup (ord '' s) := eq_of_forall_ge_iff fun a => by rw [csSup_le_iff' (bddAbove_iff_small.2 (@small_image _ _ _ s (Cardinal.bddAbove_iff_small.1 hs))), ord_le, csSup_le_iff' hs] simp [ord_le] #align ordinal.Sup_ord Ordinal.sSup_ord theorem iSup_ord {ι} {f : ι → Cardinal} (hf : BddAbove (range f)) : (iSup f).ord = ⨆ i, (f i).ord := by unfold iSup convert sSup_ord hf -- Porting note: `change` is required. conv_lhs => change range (ord ∘ f) rw [range_comp] #align ordinal.supr_ord Ordinal.iSup_ord private theorem sup_le_sup {ι ι' : Type u} (r : ι → ι → Prop) (r' : ι' → ι' → Prop) [IsWellOrder ι r] [IsWellOrder ι' r'] {o} (ho : type r = o) (ho' : type r' = o) (f : ∀ a < o, Ordinal.{max u v}) : sup.{_, v} (familyOfBFamily' r ho f) ≤ sup.{_, v} (familyOfBFamily' r' ho' f) := sup_le fun i => by cases' typein_surj r' (by rw [ho', ← ho] exact typein_lt_type r i) with j hj simp_rw [familyOfBFamily', ← hj] apply le_sup theorem sup_eq_sup {ι ι' : Type u} (r : ι → ι → Prop) (r' : ι' → ι' → Prop) [IsWellOrder ι r] [IsWellOrder ι' r'] {o : Ordinal.{u}} (ho : type r = o) (ho' : type r' = o) (f : ∀ a < o, Ordinal.{max u v}) : sup.{_, v} (familyOfBFamily' r ho f) = sup.{_, v} (familyOfBFamily' r' ho' f) := sup_eq_of_range_eq.{u, u, v} (by simp) #align ordinal.sup_eq_sup Ordinal.sup_eq_sup def bsup (o : Ordinal.{u}) (f : ∀ a < o, Ordinal.{max u v}) : Ordinal.{max u v} := sup.{_, v} (familyOfBFamily o f) #align ordinal.bsup Ordinal.bsup @[simp] theorem sup_eq_bsup {o : Ordinal.{u}} (f : ∀ a < o, Ordinal.{max u v}) : sup.{_, v} (familyOfBFamily o f) = bsup.{_, v} o f := rfl #align ordinal.sup_eq_bsup Ordinal.sup_eq_bsup @[simp] theorem sup_eq_bsup' {o : Ordinal.{u}} {ι} (r : ι → ι → Prop) [IsWellOrder ι r] (ho : type r = o) (f : ∀ a < o, Ordinal.{max u v}) : sup.{_, v} (familyOfBFamily' r ho f) = bsup.{_, v} o f := sup_eq_sup r _ ho _ f #align ordinal.sup_eq_bsup' Ordinal.sup_eq_bsup' @[simp, nolint simpNF] -- Porting note (#10959): simp cannot prove this theorem sSup_eq_bsup {o : Ordinal.{u}} (f : ∀ a < o, Ordinal.{max u v}) : sSup (brange o f) = bsup.{_, v} o f := by congr rw [range_familyOfBFamily] #align ordinal.Sup_eq_bsup Ordinal.sSup_eq_bsup @[simp] theorem bsup_eq_sup' {ι : Type u} (r : ι → ι → Prop) [IsWellOrder ι r] (f : ι → Ordinal.{max u v}) : bsup.{_, v} _ (bfamilyOfFamily' r f) = sup.{_, v} f := by simp (config := { unfoldPartialApp := true }) only [← sup_eq_bsup' r, enum_typein, familyOfBFamily', bfamilyOfFamily'] #align ordinal.bsup_eq_sup' Ordinal.bsup_eq_sup' theorem bsup_eq_bsup {ι : Type u} (r r' : ι → ι → Prop) [IsWellOrder ι r] [IsWellOrder ι r'] (f : ι → Ordinal.{max u v}) : bsup.{_, v} _ (bfamilyOfFamily' r f) = bsup.{_, v} _ (bfamilyOfFamily' r' f) := by rw [bsup_eq_sup', bsup_eq_sup'] #align ordinal.bsup_eq_bsup Ordinal.bsup_eq_bsup @[simp] theorem bsup_eq_sup {ι : Type u} (f : ι → Ordinal.{max u v}) : bsup.{_, v} _ (bfamilyOfFamily f) = sup.{_, v} f := bsup_eq_sup' _ f #align ordinal.bsup_eq_sup Ordinal.bsup_eq_sup @[congr] theorem bsup_congr {o₁ o₂ : Ordinal.{u}} (f : ∀ a < o₁, Ordinal.{max u v}) (ho : o₁ = o₂) : bsup.{_, v} o₁ f = bsup.{_, v} o₂ fun a h => f a (h.trans_eq ho.symm) := by subst ho -- Porting note: `rfl` is required. rfl #align ordinal.bsup_congr Ordinal.bsup_congr theorem bsup_le_iff {o f a} : bsup.{u, v} o f ≤ a ↔ ∀ i h, f i h ≤ a := sup_le_iff.trans ⟨fun h i hi => by rw [← familyOfBFamily_enum o f] exact h _, fun h i => h _ _⟩ #align ordinal.bsup_le_iff Ordinal.bsup_le_iff theorem bsup_le {o : Ordinal} {f : ∀ b < o, Ordinal} {a} : (∀ i h, f i h ≤ a) → bsup.{u, v} o f ≤ a := bsup_le_iff.2 #align ordinal.bsup_le Ordinal.bsup_le theorem le_bsup {o} (f : ∀ a < o, Ordinal) (i h) : f i h ≤ bsup o f := bsup_le_iff.1 le_rfl _ _ #align ordinal.le_bsup Ordinal.le_bsup theorem lt_bsup {o : Ordinal.{u}} (f : ∀ a < o, Ordinal.{max u v}) {a} : a < bsup.{_, v} o f ↔ ∃ i hi, a < f i hi := by simpa only [not_forall, not_le] using not_congr (@bsup_le_iff.{_, v} _ f a) #align ordinal.lt_bsup Ordinal.lt_bsup theorem IsNormal.bsup {f : Ordinal.{max u v} → Ordinal.{max u w}} (H : IsNormal f) {o : Ordinal.{u}} : ∀ (g : ∀ a < o, Ordinal), o ≠ 0 → f (bsup.{_, v} o g) = bsup.{_, w} o fun a h => f (g a h) := inductionOn o fun α r _ g h => by haveI := type_ne_zero_iff_nonempty.1 h rw [← sup_eq_bsup' r, IsNormal.sup.{_, v, w} H, ← sup_eq_bsup' r] <;> rfl #align ordinal.is_normal.bsup Ordinal.IsNormal.bsup theorem lt_bsup_of_ne_bsup {o : Ordinal.{u}} {f : ∀ a < o, Ordinal.{max u v}} : (∀ i h, f i h ≠ bsup.{_, v} o f) ↔ ∀ i h, f i h < bsup.{_, v} o f := ⟨fun hf _ _ => lt_of_le_of_ne (le_bsup _ _ _) (hf _ _), fun hf _ _ => ne_of_lt (hf _ _)⟩ #align ordinal.lt_bsup_of_ne_bsup Ordinal.lt_bsup_of_ne_bsup theorem bsup_not_succ_of_ne_bsup {o : Ordinal.{u}} {f : ∀ a < o, Ordinal.{max u v}} (hf : ∀ {i : Ordinal} (h : i < o), f i h ≠ bsup.{_, v} o f) (a) : a < bsup.{_, v} o f → succ a < bsup.{_, v} o f := by rw [← sup_eq_bsup] at * exact sup_not_succ_of_ne_sup fun i => hf _ #align ordinal.bsup_not_succ_of_ne_bsup Ordinal.bsup_not_succ_of_ne_bsup @[simp] theorem bsup_eq_zero_iff {o} {f : ∀ a < o, Ordinal} : bsup o f = 0 ↔ ∀ i hi, f i hi = 0 := by refine ⟨fun h i hi => ?_, fun h => le_antisymm (bsup_le fun i hi => Ordinal.le_zero.2 (h i hi)) (Ordinal.zero_le _)⟩ rw [← Ordinal.le_zero, ← h] exact le_bsup f i hi #align ordinal.bsup_eq_zero_iff Ordinal.bsup_eq_zero_iff theorem lt_bsup_of_limit {o : Ordinal} {f : ∀ a < o, Ordinal} (hf : ∀ {a a'} (ha : a < o) (ha' : a' < o), a < a' → f a ha < f a' ha') (ho : ∀ a < o, succ a < o) (i h) : f i h < bsup o f := (hf _ _ <\| lt_succ i).trans_le (le_bsup f (succ i) <\| ho _ h) #align ordinal.lt_bsup_of_limit Ordinal.lt_bsup_of_limit theorem bsup_succ_of_mono {o : Ordinal} {f : ∀ a < succ o, Ordinal} (hf : ∀ {i j} (hi hj), i ≤ j → f i hi ≤ f j hj) : bsup _ f = f o (lt_succ o) := le_antisymm (bsup_le fun _i hi => hf _ _ <\| le_of_lt_succ hi) (le_bsup _ _ _) #align ordinal.bsup_succ_of_mono Ordinal.bsup_succ_of_mono @[simp] theorem bsup_zero (f : ∀ a < (0 : Ordinal), Ordinal) : bsup 0 f = 0 := bsup_eq_zero_iff.2 fun i hi => (Ordinal.not_lt_zero i hi).elim #align ordinal.bsup_zero Ordinal.bsup_zero theorem bsup_const {o : Ordinal.{u}} (ho : o ≠ 0) (a : Ordinal.{max u v}) : (bsup.{_, v} o fun _ _ => a) = a := le_antisymm (bsup_le fun _ _ => le_rfl) (le_bsup _ 0 (Ordinal.pos_iff_ne_zero.2 ho)) #align ordinal.bsup_const Ordinal.bsup_const @[simp] theorem bsup_one (f : ∀ a < (1 : Ordinal), Ordinal) : bsup 1 f = f 0 zero_lt_one := by simp_rw [← sup_eq_bsup, sup_unique, familyOfBFamily, familyOfBFamily', typein_one_out] #align ordinal.bsup_one Ordinal.bsup_one theorem bsup_le_of_brange_subset {o o'} {f : ∀ a < o, Ordinal} {g : ∀ a < o', Ordinal} (h : brange o f ⊆ brange o' g) : bsup.{u, max v w} o f ≤ bsup.{v, max u w} o' g := bsup_le fun i hi => by obtain ⟨j, hj, hj'⟩ := h ⟨i, hi, rfl⟩ rw [← hj'] apply le_bsup #align ordinal.bsup_le_of_brange_subset Ordinal.bsup_le_of_brange_subset theorem bsup_eq_of_brange_eq {o o'} {f : ∀ a < o, Ordinal} {g : ∀ a < o', Ordinal} (h : brange o f = brange o' g) : bsup.{u, max v w} o f = bsup.{v, max u w} o' g := (bsup_le_of_brange_subset.{u, v, w} h.le).antisymm (bsup_le_of_brange_subset.{v, u, w} h.ge) #align ordinal.bsup_eq_of_brange_eq Ordinal.bsup_eq_of_brange_eq def lsub {ι} (f : ι → Ordinal) : Ordinal := sup (succ ∘ f) #align ordinal.lsub Ordinal.lsub @[simp] theorem sup_eq_lsub {ι : Type u} (f : ι → Ordinal.{max u v}) : sup.{_, v} (succ ∘ f) = lsub.{_, v} f := rfl #align ordinal.sup_eq_lsub Ordinal.sup_eq_lsub theorem lsub_le_iff {ι : Type u} {f : ι → Ordinal.{max u v}} {a} : lsub.{_, v} f ≤ a ↔ ∀ i, f i < a := by convert sup_le_iff.{_, v} (f := succ ∘ f) (a := a) using 2 -- Porting note: `comp_apply` is required. simp only [comp_apply, succ_le_iff] #align ordinal.lsub_le_iff Ordinal.lsub_le_iff theorem lsub_le {ι} {f : ι → Ordinal} {a} : (∀ i, f i < a) → lsub f ≤ a := lsub_le_iff.2 #align ordinal.lsub_le Ordinal.lsub_le theorem lt_lsub {ι} (f : ι → Ordinal) (i) : f i < lsub f := succ_le_iff.1 (le_sup _ i) #align ordinal.lt_lsub Ordinal.lt_lsub	Mathlib/SetTheory/Ordinal/Arithmetic.lean	1,599	1,601	theorem lt_lsub_iff {ι : Type u} {f : ι → Ordinal.{max u v}} {a} : a < lsub.{_, v} f ↔ ∃ i, a ≤ f i := by	simpa only [not_forall, not_lt, not_le] using not_congr (@lsub_le_iff.{_, v} _ f a)
import Mathlib.Order.Hom.CompleteLattice import Mathlib.Topology.Bases import Mathlib.Topology.Homeomorph import Mathlib.Topology.ContinuousFunction.Basic import Mathlib.Order.CompactlyGenerated.Basic import Mathlib.Order.Copy #align_import topology.sets.opens from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" open Filter Function Order Set open Topology variable {ι α β γ : Type} [TopologicalSpace α] [TopologicalSpace β] [TopologicalSpace γ] namespace TopologicalSpace variable (α) structure Opens where carrier : Set α is_open' : IsOpen carrier #align topological_space.opens TopologicalSpace.Opens variable {α} namespace Opens instance : SetLike (Opens α) α where coe := Opens.carrier coe_injective' := fun ⟨_, _⟩ ⟨_, _⟩ _ => by congr instance : CanLift (Set α) (Opens α) (↑) IsOpen := ⟨fun s h => ⟨⟨s, h⟩, rfl⟩⟩ theorem «forall» {p : Opens α → Prop} : (∀ U, p U) ↔ ∀ (U : Set α) (hU : IsOpen U), p ⟨U, hU⟩ := ⟨fun h _ _ => h _, fun h _ => h _ _⟩ #align topological_space.opens.forall TopologicalSpace.Opens.forall @[simp] theorem carrier_eq_coe (U : Opens α) : U.1 = ↑U := rfl #align topological_space.opens.carrier_eq_coe TopologicalSpace.Opens.carrier_eq_coe @[simp] theorem coe_mk {U : Set α} {hU : IsOpen U} : ↑(⟨U, hU⟩ : Opens α) = U := rfl #align topological_space.opens.coe_mk TopologicalSpace.Opens.coe_mk @[simp] theorem mem_mk {x : α} {U : Set α} {h : IsOpen U} : x ∈ mk U h ↔ x ∈ U := Iff.rfl #align topological_space.opens.mem_mk TopologicalSpace.Opens.mem_mk -- Porting note: removed @[simp] because LHS simplifies to `∃ x, x ∈ U` protected theorem nonempty_coeSort {U : Opens α} : Nonempty U ↔ (U : Set α).Nonempty := Set.nonempty_coe_sort #align topological_space.opens.nonempty_coe_sort TopologicalSpace.Opens.nonempty_coeSort -- Porting note (#10756): new lemma; todo: prove it for a `SetLike`? protected theorem nonempty_coe {U : Opens α} : (U : Set α).Nonempty ↔ ∃ x, x ∈ U := Iff.rfl @[ext] -- Porting note (#11215): TODO: replace with `∀ x, x ∈ U ↔ x ∈ V` theorem ext {U V : Opens α} (h : (U : Set α) = V) : U = V := SetLike.coe_injective h #align topological_space.opens.ext TopologicalSpace.Opens.ext -- Porting note: removed @[simp], simp can prove it theorem coe_inj {U V : Opens α} : (U : Set α) = V ↔ U = V := SetLike.ext'_iff.symm #align topological_space.opens.coe_inj TopologicalSpace.Opens.coe_inj protected theorem isOpen (U : Opens α) : IsOpen (U : Set α) := U.is_open' #align topological_space.opens.is_open TopologicalSpace.Opens.isOpen @[simp] theorem mk_coe (U : Opens α) : mk (↑U) U.isOpen = U := rfl #align topological_space.opens.mk_coe TopologicalSpace.Opens.mk_coe def Simps.coe (U : Opens α) : Set α := U #align topological_space.opens.simps.coe TopologicalSpace.Opens.Simps.coe initialize_simps_projections Opens (carrier → coe) nonrec def interior (s : Set α) : Opens α := ⟨interior s, isOpen_interior⟩ #align topological_space.opens.interior TopologicalSpace.Opens.interior theorem gc : GaloisConnection ((↑) : Opens α → Set α) interior := fun U _ => ⟨fun h => interior_maximal h U.isOpen, fun h => le_trans h interior_subset⟩ #align topological_space.opens.gc TopologicalSpace.Opens.gc def gi : GaloisCoinsertion (↑) (@interior α _) where choice s hs := ⟨s, interior_eq_iff_isOpen.mp <\| le_antisymm interior_subset hs⟩ gc := gc u_l_le _ := interior_subset choice_eq _s hs := le_antisymm hs interior_subset #align topological_space.opens.gi TopologicalSpace.Opens.gi instance : CompleteLattice (Opens α) := CompleteLattice.copy (GaloisCoinsertion.liftCompleteLattice gi) -- le (fun U V => (U : Set α) ⊆ V) rfl -- top ⟨univ, isOpen_univ⟩ (ext interior_univ.symm) -- bot ⟨∅, isOpen_empty⟩ rfl -- sup (fun U V => ⟨↑U ∪ ↑V, U.2.union V.2⟩) rfl -- inf (fun U V => ⟨↑U ∩ ↑V, U.2.inter V.2⟩) (funext₂ fun U V => ext (U.2.inter V.2).interior_eq.symm) -- sSup (fun S => ⟨⋃ s ∈ S, ↑s, isOpen_biUnion fun s _ => s.2⟩) (funext fun _ => ext sSup_image.symm) -- sInf _ rfl @[simp] theorem mk_inf_mk {U V : Set α} {hU : IsOpen U} {hV : IsOpen V} : (⟨U, hU⟩ ⊓ ⟨V, hV⟩ : Opens α) = ⟨U ⊓ V, IsOpen.inter hU hV⟩ := rfl #align topological_space.opens.mk_inf_mk TopologicalSpace.Opens.mk_inf_mk @[simp, norm_cast] theorem coe_inf (s t : Opens α) : (↑(s ⊓ t) : Set α) = ↑s ∩ ↑t := rfl #align topological_space.opens.coe_inf TopologicalSpace.Opens.coe_inf @[simp, norm_cast] theorem coe_sup (s t : Opens α) : (↑(s ⊔ t) : Set α) = ↑s ∪ ↑t := rfl #align topological_space.opens.coe_sup TopologicalSpace.Opens.coe_sup @[simp, norm_cast] theorem coe_bot : ((⊥ : Opens α) : Set α) = ∅ := rfl #align topological_space.opens.coe_bot TopologicalSpace.Opens.coe_bot @[simp] theorem mk_empty : (⟨∅, isOpen_empty⟩ : Opens α) = ⊥ := rfl -- Porting note (#10756): new lemma @[simp, norm_cast] theorem coe_eq_empty {U : Opens α} : (U : Set α) = ∅ ↔ U = ⊥ := SetLike.coe_injective.eq_iff' rfl @[simp, norm_cast] theorem coe_top : ((⊤ : Opens α) : Set α) = Set.univ := rfl #align topological_space.opens.coe_top TopologicalSpace.Opens.coe_top @[simp] theorem mk_univ : (⟨univ, isOpen_univ⟩ : Opens α) = ⊤ := rfl -- Porting note (#10756): new lemma @[simp, norm_cast] theorem coe_eq_univ {U : Opens α} : (U : Set α) = univ ↔ U = ⊤ := SetLike.coe_injective.eq_iff' rfl @[simp, norm_cast] theorem coe_sSup {S : Set (Opens α)} : (↑(sSup S) : Set α) = ⋃ i ∈ S, ↑i := rfl #align topological_space.opens.coe_Sup TopologicalSpace.Opens.coe_sSup @[simp, norm_cast] theorem coe_finset_sup (f : ι → Opens α) (s : Finset ι) : (↑(s.sup f) : Set α) = s.sup ((↑) ∘ f) := map_finset_sup (⟨⟨(↑), coe_sup⟩, coe_bot⟩ : SupBotHom (Opens α) (Set α)) _ _ #align topological_space.opens.coe_finset_sup TopologicalSpace.Opens.coe_finset_sup @[simp, norm_cast] theorem coe_finset_inf (f : ι → Opens α) (s : Finset ι) : (↑(s.inf f) : Set α) = s.inf ((↑) ∘ f) := map_finset_inf (⟨⟨(↑), coe_inf⟩, coe_top⟩ : InfTopHom (Opens α) (Set α)) _ _ #align topological_space.opens.coe_finset_inf TopologicalSpace.Opens.coe_finset_inf instance : Inhabited (Opens α) := ⟨⊥⟩ -- porting note (#10754): new instance instance [IsEmpty α] : Unique (Opens α) where uniq _ := ext <\| Subsingleton.elim _ _ -- porting note (#10754): new instance instance [Nonempty α] : Nontrivial (Opens α) where exists_pair_ne := ⟨⊥, ⊤, mt coe_inj.2 empty_ne_univ⟩ @[simp, norm_cast] theorem coe_iSup {ι} (s : ι → Opens α) : ((⨆ i, s i : Opens α) : Set α) = ⋃ i, s i := by simp [iSup] #align topological_space.opens.coe_supr TopologicalSpace.Opens.coe_iSup theorem iSup_def {ι} (s : ι → Opens α) : ⨆ i, s i = ⟨⋃ i, s i, isOpen_iUnion fun i => (s i).2⟩ := ext <\| coe_iSup s #align topological_space.opens.supr_def TopologicalSpace.Opens.iSup_def @[simp] theorem iSup_mk {ι} (s : ι → Set α) (h : ∀ i, IsOpen (s i)) : (⨆ i, ⟨s i, h i⟩ : Opens α) = ⟨⋃ i, s i, isOpen_iUnion h⟩ := iSup_def _ #align topological_space.opens.supr_mk TopologicalSpace.Opens.iSup_mk @[simp] theorem mem_iSup {ι} {x : α} {s : ι → Opens α} : x ∈ iSup s ↔ ∃ i, x ∈ s i := by rw [← SetLike.mem_coe] simp #align topological_space.opens.mem_supr TopologicalSpace.Opens.mem_iSup @[simp] theorem mem_sSup {Us : Set (Opens α)} {x : α} : x ∈ sSup Us ↔ ∃ u ∈ Us, x ∈ u := by simp_rw [sSup_eq_iSup, mem_iSup, exists_prop] #align topological_space.opens.mem_Sup TopologicalSpace.Opens.mem_sSup instance : Frame (Opens α) := { inferInstanceAs (CompleteLattice (Opens α)) with sSup := sSup inf_sSup_le_iSup_inf := fun a s => (ext <\| by simp only [coe_inf, coe_iSup, coe_sSup, Set.inter_iUnion₂]).le } theorem openEmbedding' (U : Opens α) : OpenEmbedding (Subtype.val : U → α) := U.isOpen.openEmbedding_subtype_val theorem openEmbedding_of_le {U V : Opens α} (i : U ≤ V) : OpenEmbedding (Set.inclusion <\| SetLike.coe_subset_coe.2 i) := { toEmbedding := embedding_inclusion i isOpen_range := by rw [Set.range_inclusion i] exact U.isOpen.preimage continuous_subtype_val } #align topological_space.opens.open_embedding_of_le TopologicalSpace.Opens.openEmbedding_of_le theorem not_nonempty_iff_eq_bot (U : Opens α) : ¬Set.Nonempty (U : Set α) ↔ U = ⊥ := by rw [← coe_inj, coe_bot, ← Set.not_nonempty_iff_eq_empty] #align topological_space.opens.not_nonempty_iff_eq_bot TopologicalSpace.Opens.not_nonempty_iff_eq_bot theorem ne_bot_iff_nonempty (U : Opens α) : U ≠ ⊥ ↔ Set.Nonempty (U : Set α) := by rw [Ne, ← not_nonempty_iff_eq_bot, not_not] #align topological_space.opens.ne_bot_iff_nonempty TopologicalSpace.Opens.ne_bot_iff_nonempty theorem eq_bot_or_top {α} [t : TopologicalSpace α] (h : t = ⊤) (U : Opens α) : U = ⊥ ∨ U = ⊤ := by subst h; letI : TopologicalSpace α := ⊤ rw [← coe_eq_empty, ← coe_eq_univ, ← isOpen_top_iff] exact U.2 #align topological_space.opens.eq_bot_or_top TopologicalSpace.Opens.eq_bot_or_top -- porting note (#10754): new instance instance [Nonempty α] [Subsingleton α] : IsSimpleOrder (Opens α) where eq_bot_or_eq_top := eq_bot_or_top <\| Subsingleton.elim _ _ def IsBasis (B : Set (Opens α)) : Prop := IsTopologicalBasis (((↑) : _ → Set α) '' B) #align topological_space.opens.is_basis TopologicalSpace.Opens.IsBasis theorem isBasis_iff_nbhd {B : Set (Opens α)} : IsBasis B ↔ ∀ {U : Opens α} {x}, x ∈ U → ∃ U' ∈ B, x ∈ U' ∧ U' ≤ U := by constructor <;> intro h · rintro ⟨sU, hU⟩ x hx rcases h.mem_nhds_iff.mp (IsOpen.mem_nhds hU hx) with ⟨sV, ⟨⟨V, H₁, H₂⟩, hsV⟩⟩ refine ⟨V, H₁, ?_⟩ cases V dsimp at H₂ subst H₂ exact hsV · refine isTopologicalBasis_of_isOpen_of_nhds ?_ ?_ · rintro sU ⟨U, -, rfl⟩ exact U.2 · intro x sU hx hsU rcases @h ⟨sU, hsU⟩ x hx with ⟨V, hV, H⟩ exact ⟨V, ⟨V, hV, rfl⟩, H⟩ #align topological_space.opens.is_basis_iff_nbhd TopologicalSpace.Opens.isBasis_iff_nbhd theorem isBasis_iff_cover {B : Set (Opens α)} : IsBasis B ↔ ∀ U : Opens α, ∃ Us, Us ⊆ B ∧ U = sSup Us := by constructor · intro hB U refine ⟨{ V : Opens α \| V ∈ B ∧ V ≤ U }, fun U hU => hU.left, ext ?_⟩ rw [coe_sSup, hB.open_eq_sUnion' U.isOpen] simp_rw [sUnion_eq_biUnion, iUnion, mem_setOf_eq, iSup_and, iSup_image] rfl · intro h rw [isBasis_iff_nbhd] intro U x hx rcases h U with ⟨Us, hUs, rfl⟩ rcases mem_sSup.1 hx with ⟨U, Us, xU⟩ exact ⟨U, hUs Us, xU, le_sSup Us⟩ #align topological_space.opens.is_basis_iff_cover TopologicalSpace.Opens.isBasis_iff_cover theorem IsBasis.isCompact_open_iff_eq_finite_iUnion {ι : Type} (b : ι → Opens α) (hb : IsBasis (Set.range b)) (hb' : ∀ i, IsCompact (b i : Set α)) (U : Set α) : IsCompact U ∧ IsOpen U ↔ ∃ s : Set ι, s.Finite ∧ U = ⋃ i ∈ s, b i := by apply isCompact_open_iff_eq_finite_iUnion_of_isTopologicalBasis fun i : ι => (b i).1 · convert (config := {transparency := .default}) hb ext simp · exact hb' #align topological_space.opens.is_basis.is_compact_open_iff_eq_finite_Union TopologicalSpace.Opens.IsBasis.isCompact_open_iff_eq_finite_iUnion @[simp]	Mathlib/Topology/Sets/Opens.lean	345	359	theorem isCompactElement_iff (s : Opens α) : CompleteLattice.IsCompactElement s ↔ IsCompact (s : Set α) := by	rw [isCompact_iff_finite_subcover, CompleteLattice.isCompactElement_iff] refine ⟨?_, fun H ι U hU => ?_⟩ · introv H hU hU' obtain ⟨t, ht⟩ := H ι (fun i => ⟨U i, hU i⟩) (by simpa) refine ⟨t, Set.Subset.trans ht ?_⟩ rw [coe_finset_sup, Finset.sup_eq_iSup] rfl · obtain ⟨t, ht⟩ := H (fun i => U i) (fun i => (U i).isOpen) (by simpa using show (s : Set α) ⊆ ↑(iSup U) from hU) refine ⟨t, Set.Subset.trans ht ?_⟩ simp only [Set.iUnion_subset_iff] show ∀ i ∈ t, U i ≤ t.sup U exact fun i => Finset.le_sup
import Mathlib.Algebra.Field.Basic import Mathlib.Algebra.Order.Field.Defs import Mathlib.Data.Tree.Basic import Mathlib.Logic.Basic import Mathlib.Tactic.NormNum.Core import Mathlib.Util.SynthesizeUsing import Mathlib.Util.Qq open Lean Parser Tactic Mathlib Meta NormNum Qq initialize registerTraceClass `CancelDenoms namespace CancelDenoms 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] #align cancel_factors.mul_subst CancelDenoms.mul_subst 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] #align cancel_factors.div_subst CancelDenoms.div_subst 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 #align cancel_factors.cancel_factors_eq_div CancelDenoms.cancel_factors_eq_div 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, ] #align cancel_factors.add_subst CancelDenoms.add_subst 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] #align cancel_factors.sub_subst CancelDenoms.sub_subst theorem neg_subst {α} [Ring α] {n e t : α} (h1 : n e = t) : n * -e = -t := by simp [] #align cancel_factors.neg_subst CancelDenoms.neg_subst 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} [LinearOrderedField 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 #align cancel_factors.cancel_factors_lt CancelDenoms.cancel_factors_lt	Mathlib/Tactic/CancelDenoms/Core.lean	81	86	theorem cancel_factors_le {α} [LinearOrderedField 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
import Mathlib.MeasureTheory.Measure.Lebesgue.Complex import Mathlib.MeasureTheory.Integral.DivergenceTheorem import Mathlib.MeasureTheory.Integral.CircleIntegral import Mathlib.Analysis.Calculus.Dslope import Mathlib.Analysis.Analytic.Basic import Mathlib.Analysis.Complex.ReImTopology import Mathlib.Analysis.Calculus.DiffContOnCl import Mathlib.Analysis.Calculus.FDeriv.Analytic import Mathlib.Data.Real.Cardinality #align_import analysis.complex.cauchy_integral from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" open TopologicalSpace Set MeasureTheory intervalIntegral Metric Filter Function open scoped Interval Real NNReal ENNReal Topology noncomputable section universe u variable {E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E] namespace Complex theorem integral_boundary_rect_of_hasFDerivAt_real_off_countable (f : ℂ → E) (f' : ℂ → ℂ →L[ℝ] E) (z w : ℂ) (s : Set ℂ) (hs : s.Countable) (Hc : ContinuousOn f ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) (Hd : ∀ x ∈ Ioo (min z.re w.re) (max z.re w.re) ×ℂ Ioo (min z.im w.im) (max z.im w.im) \ s, HasFDerivAt f (f' x) x) (Hi : IntegrableOn (fun z => I • f' z 1 - f' z I) ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) : (∫ x : ℝ in z.re..w.re, f (x + z.im * I)) - (∫ x : ℝ in z.re..w.re, f (x + w.im * I)) + I • (∫ y : ℝ in z.im..w.im, f (re w + y * I)) - I • ∫ y : ℝ in z.im..w.im, f (re z + y * I) = ∫ x : ℝ in z.re..w.re, ∫ y : ℝ in z.im..w.im, I • f' (x + y * I) 1 - f' (x + y * I) I := by set e : (ℝ × ℝ) ≃L[ℝ] ℂ := equivRealProdCLM.symm have he : ∀ x y : ℝ, ↑x + ↑y * I = e (x, y) := fun x y => (mk_eq_add_mul_I x y).symm have he₁ : e (1, 0) = 1 := rfl; have he₂ : e (0, 1) = I := rfl simp only [he] at * set F : ℝ × ℝ → E := f ∘ e set F' : ℝ × ℝ → ℝ × ℝ →L[ℝ] E := fun p => (f' (e p)).comp (e : ℝ × ℝ →L[ℝ] ℂ) have hF' : ∀ p : ℝ × ℝ, (-(I • F' p)) (1, 0) + F' p (0, 1) = -(I • f' (e p) 1 - f' (e p) I) := by rintro ⟨x, y⟩ simp only [F', ContinuousLinearMap.neg_apply, ContinuousLinearMap.smul_apply, ContinuousLinearMap.comp_apply, ContinuousLinearEquiv.coe_coe, he₁, he₂, neg_add_eq_sub, neg_sub] set R : Set (ℝ × ℝ) := [[z.re, w.re]] ×ˢ [[w.im, z.im]] set t : Set (ℝ × ℝ) := e ⁻¹' s rw [uIcc_comm z.im] at Hc Hi; rw [min_comm z.im, max_comm z.im] at Hd have hR : e ⁻¹' ([[z.re, w.re]] ×ℂ [[w.im, z.im]]) = R := rfl have htc : ContinuousOn F R := Hc.comp e.continuousOn hR.ge have htd : ∀ p ∈ Ioo (min z.re w.re) (max z.re w.re) ×ˢ Ioo (min w.im z.im) (max w.im z.im) \ t, HasFDerivAt F (F' p) p := fun p hp => (Hd (e p) hp).comp p e.hasFDerivAt simp_rw [← intervalIntegral.integral_smul, intervalIntegral.integral_symm w.im z.im, ← intervalIntegral.integral_neg, ← hF'] refine (integral2_divergence_prod_of_hasFDerivWithinAt_off_countable (fun p => -(I • F p)) F (fun p => -(I • F' p)) F' z.re w.im w.re z.im t (hs.preimage e.injective) (htc.const_smul _).neg htc (fun p hp => ((htd p hp).const_smul I).neg) htd ?_).symm rw [← (volume_preserving_equiv_real_prod.symm _).integrableOn_comp_preimage (MeasurableEquiv.measurableEmbedding _)] at Hi simpa only [hF'] using Hi.neg #align complex.integral_boundary_rect_of_has_fderiv_at_real_off_countable Complex.integral_boundary_rect_of_hasFDerivAt_real_off_countable theorem integral_boundary_rect_of_continuousOn_of_hasFDerivAt_real (f : ℂ → E) (f' : ℂ → ℂ →L[ℝ] E) (z w : ℂ) (Hc : ContinuousOn f ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) (Hd : ∀ x ∈ Ioo (min z.re w.re) (max z.re w.re) ×ℂ Ioo (min z.im w.im) (max z.im w.im), HasFDerivAt f (f' x) x) (Hi : IntegrableOn (fun z => I • f' z 1 - f' z I) ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) : (∫ x : ℝ in z.re..w.re, f (x + z.im * I)) - (∫ x : ℝ in z.re..w.re, f (x + w.im * I)) + I • (∫ y : ℝ in z.im..w.im, f (re w + y * I)) - I • (∫ y : ℝ in z.im..w.im, f (re z + y * I)) = ∫ x : ℝ in z.re..w.re, ∫ y : ℝ in z.im..w.im, I • f' (x + y * I) 1 - f' (x + y * I) I := integral_boundary_rect_of_hasFDerivAt_real_off_countable f f' z w ∅ countable_empty Hc (fun x hx => Hd x hx.1) Hi #align complex.integral_boundary_rect_of_continuous_on_of_has_fderiv_at_real Complex.integral_boundary_rect_of_continuousOn_of_hasFDerivAt_real theorem integral_boundary_rect_of_differentiableOn_real (f : ℂ → E) (z w : ℂ) (Hd : DifferentiableOn ℝ f ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) (Hi : IntegrableOn (fun z => I • fderiv ℝ f z 1 - fderiv ℝ f z I) ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) : (∫ x : ℝ in z.re..w.re, f (x + z.im * I)) - (∫ x : ℝ in z.re..w.re, f (x + w.im * I)) + I • (∫ y : ℝ in z.im..w.im, f (re w + y * I)) - I • (∫ y : ℝ in z.im..w.im, f (re z + y * I)) = ∫ x : ℝ in z.re..w.re, ∫ y : ℝ in z.im..w.im, I • fderiv ℝ f (x + y * I) 1 - fderiv ℝ f (x + y * I) I := integral_boundary_rect_of_hasFDerivAt_real_off_countable f (fderiv ℝ f) z w ∅ countable_empty Hd.continuousOn (fun x hx => Hd.hasFDerivAt <\| by simpa only [← mem_interior_iff_mem_nhds, interior_reProdIm, uIcc, interior_Icc] using hx.1) Hi #align complex.integral_boundary_rect_of_differentiable_on_real Complex.integral_boundary_rect_of_differentiableOn_real theorem integral_boundary_rect_eq_zero_of_differentiable_on_off_countable (f : ℂ → E) (z w : ℂ) (s : Set ℂ) (hs : s.Countable) (Hc : ContinuousOn f ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) (Hd : ∀ x ∈ Ioo (min z.re w.re) (max z.re w.re) ×ℂ Ioo (min z.im w.im) (max z.im w.im) \ s, DifferentiableAt ℂ f x) : (∫ x : ℝ in z.re..w.re, f (x + z.im * I)) - (∫ x : ℝ in z.re..w.re, f (x + w.im * I)) + I • (∫ y : ℝ in z.im..w.im, f (re w + y * I)) - I • (∫ y : ℝ in z.im..w.im, f (re z + y * I)) = 0 := by refine (integral_boundary_rect_of_hasFDerivAt_real_off_countable f (fun z => (fderiv ℂ f z).restrictScalars ℝ) z w s hs Hc (fun x hx => (Hd x hx).hasFDerivAt.restrictScalars ℝ) ?_).trans ?_ <;> simp [← ContinuousLinearMap.map_smul] #align complex.integral_boundary_rect_eq_zero_of_differentiable_on_off_countable Complex.integral_boundary_rect_eq_zero_of_differentiable_on_off_countable theorem integral_boundary_rect_eq_zero_of_continuousOn_of_differentiableOn (f : ℂ → E) (z w : ℂ) (Hc : ContinuousOn f ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) (Hd : DifferentiableOn ℂ f (Ioo (min z.re w.re) (max z.re w.re) ×ℂ Ioo (min z.im w.im) (max z.im w.im))) : (∫ x : ℝ in z.re..w.re, f (x + z.im * I)) - (∫ x : ℝ in z.re..w.re, f (x + w.im * I)) + I • (∫ y : ℝ in z.im..w.im, f (re w + y * I)) - I • (∫ y : ℝ in z.im..w.im, f (re z + y * I)) = 0 := integral_boundary_rect_eq_zero_of_differentiable_on_off_countable f z w ∅ countable_empty Hc fun _x hx => Hd.differentiableAt <\| (isOpen_Ioo.reProdIm isOpen_Ioo).mem_nhds hx.1 #align complex.integral_boundary_rect_eq_zero_of_continuous_on_of_differentiable_on Complex.integral_boundary_rect_eq_zero_of_continuousOn_of_differentiableOn theorem integral_boundary_rect_eq_zero_of_differentiableOn (f : ℂ → E) (z w : ℂ) (H : DifferentiableOn ℂ f ([[z.re, w.re]] ×ℂ [[z.im, w.im]])) : (∫ x : ℝ in z.re..w.re, f (x + z.im * I)) - (∫ x : ℝ in z.re..w.re, f (x + w.im * I)) + I • (∫ y : ℝ in z.im..w.im, f (re w + y * I)) - I • (∫ y : ℝ in z.im..w.im, f (re z + y * I)) = 0 := integral_boundary_rect_eq_zero_of_continuousOn_of_differentiableOn f z w H.continuousOn <\| H.mono <\| inter_subset_inter (preimage_mono Ioo_subset_Icc_self) (preimage_mono Ioo_subset_Icc_self) #align complex.integral_boundary_rect_eq_zero_of_differentiable_on Complex.integral_boundary_rect_eq_zero_of_differentiableOn	Mathlib/Analysis/Complex/CauchyIntegral.lean	295	324	theorem circleIntegral_sub_center_inv_smul_eq_of_differentiable_on_annulus_off_countable {c : ℂ} {r R : ℝ} (h0 : 0 < r) (hle : r ≤ R) {f : ℂ → E} {s : Set ℂ} (hs : s.Countable) (hc : ContinuousOn f (closedBall c R \ ball c r)) (hd : ∀ z ∈ (ball c R \ closedBall c r) \ s, DifferentiableAt ℂ f z) : (∮ z in C(c, R), (z - c)⁻¹ • f z) = ∮ z in C(c, r), (z - c)⁻¹ • f z := by	/- We apply the previous lemma to `fun z ↦ f (c + exp z)` on the rectangle `[log r, log R] × [0, 2 * π]`. -/ set A := closedBall c R \ ball c r obtain ⟨a, rfl⟩ : ∃ a, Real.exp a = r := ⟨Real.log r, Real.exp_log h0⟩ obtain ⟨b, rfl⟩ : ∃ b, Real.exp b = R := ⟨Real.log R, Real.exp_log (h0.trans_le hle)⟩ rw [Real.exp_le_exp] at hle -- Unfold definition of `circleIntegral` and cancel some terms. suffices (∫ θ in (0)..2 * π, I • f (circleMap c (Real.exp b) θ)) = ∫ θ in (0)..2 * π, I • f (circleMap c (Real.exp a) θ) by simpa only [circleIntegral, add_sub_cancel_left, ofReal_exp, ← exp_add, smul_smul, ← div_eq_mul_inv, mul_div_cancel_left₀ _ (circleMap_ne_center (Real.exp_pos _).ne'), circleMap_sub_center, deriv_circleMap] set R := [[a, b]] ×ℂ [[0, 2 * π]] set g : ℂ → ℂ := (c + exp ·) have hdg : Differentiable ℂ g := differentiable_exp.const_add _ replace hs : (g ⁻¹' s).Countable := (hs.preimage (add_right_injective c)).preimage_cexp have h_maps : MapsTo g R A := by rintro z ⟨h, -⟩; simpa [g, A, dist_eq, abs_exp, hle] using h.symm replace hc : ContinuousOn (f ∘ g) R := hc.comp hdg.continuous.continuousOn h_maps replace hd : ∀ z ∈ Ioo (min a b) (max a b) ×ℂ Ioo (min 0 (2 * π)) (max 0 (2 * π)) \ g ⁻¹' s, DifferentiableAt ℂ (f ∘ g) z := by refine fun z hz => (hd (g z) ⟨?_, hz.2⟩).comp z (hdg _) simpa [g, dist_eq, abs_exp, hle, and_comm] using hz.1.1 simpa [g, circleMap, exp_periodic _, sub_eq_zero, ← exp_add] using integral_boundary_rect_eq_zero_of_differentiable_on_off_countable _ ⟨a, 0⟩ ⟨b, 2 * π⟩ _ hs hc hd
import Mathlib.MeasureTheory.OuterMeasure.Basic open Filter Set open scoped ENNReal namespace MeasureTheory variable {α β F : Type} [FunLike F (Set α) ℝ≥0∞] [OuterMeasureClass F α] {μ : F} {s t : Set α} def ae (μ : F) : Filter α := .ofCountableUnion (μ · = 0) (fun _S hSc ↦ (measure_sUnion_null_iff hSc).2) fun _t ht _s hs ↦ measure_mono_null hs ht #align measure_theory.measure.ae MeasureTheory.ae notation3 "∀ᵐ "(...)" ∂"μ", "r:(scoped p => Filter.Eventually p <\| MeasureTheory.ae μ) => r notation3 "∃ᵐ "(...)" ∂"μ", "r:(scoped P => Filter.Frequently P <\| MeasureTheory.ae μ) => r notation:50 f " =ᵐ[" μ:50 "] " g:50 => Filter.EventuallyEq (MeasureTheory.ae μ) f g notation:50 f " ≤ᵐ[" μ:50 "] " g:50 => Filter.EventuallyLE (MeasureTheory.ae μ) f g theorem mem_ae_iff {s : Set α} : s ∈ ae μ ↔ μ sᶜ = 0 := Iff.rfl #align measure_theory.mem_ae_iff MeasureTheory.mem_ae_iff theorem ae_iff {p : α → Prop} : (∀ᵐ a ∂μ, p a) ↔ μ { a \| ¬p a } = 0 := Iff.rfl #align measure_theory.ae_iff MeasureTheory.ae_iff theorem compl_mem_ae_iff {s : Set α} : sᶜ ∈ ae μ ↔ μ s = 0 := by simp only [mem_ae_iff, compl_compl] #align measure_theory.compl_mem_ae_iff MeasureTheory.compl_mem_ae_iff theorem frequently_ae_iff {p : α → Prop} : (∃ᵐ a ∂μ, p a) ↔ μ { a \| p a } ≠ 0 := not_congr compl_mem_ae_iff #align measure_theory.frequently_ae_iff MeasureTheory.frequently_ae_iff theorem frequently_ae_mem_iff {s : Set α} : (∃ᵐ a ∂μ, a ∈ s) ↔ μ s ≠ 0 := not_congr compl_mem_ae_iff #align measure_theory.frequently_ae_mem_iff MeasureTheory.frequently_ae_mem_iff theorem measure_zero_iff_ae_nmem {s : Set α} : μ s = 0 ↔ ∀ᵐ a ∂μ, a ∉ s := compl_mem_ae_iff.symm #align measure_theory.measure_zero_iff_ae_nmem MeasureTheory.measure_zero_iff_ae_nmem theorem ae_of_all {p : α → Prop} (μ : F) : (∀ a, p a) → ∀ᵐ a ∂μ, p a := eventually_of_forall #align measure_theory.ae_of_all MeasureTheory.ae_of_all instance instCountableInterFilter : CountableInterFilter (ae μ) := by unfold ae; infer_instance #align measure_theory.measure.ae.countable_Inter_filter MeasureTheory.instCountableInterFilter theorem ae_all_iff {ι : Sort} [Countable ι] {p : α → ι → Prop} : (∀ᵐ a ∂μ, ∀ i, p a i) ↔ ∀ i, ∀ᵐ a ∂μ, p a i := eventually_countable_forall #align measure_theory.ae_all_iff MeasureTheory.ae_all_iff theorem all_ae_of {ι : Sort} {p : α → ι → Prop} (hp : ∀ᵐ a ∂μ, ∀ i, p a i) (i : ι) : ∀ᵐ a ∂μ, p a i := by filter_upwards [hp] with a ha using ha i lemma ae_iff_of_countable [Countable α] {p : α → Prop} : (∀ᵐ x ∂μ, p x) ↔ ∀ x, μ {x} ≠ 0 → p x := by rw [ae_iff, measure_null_iff_singleton] exacts [forall_congr' fun _ ↦ not_imp_comm, Set.to_countable _] theorem ae_ball_iff {ι : Type} {S : Set ι} (hS : S.Countable) {p : α → ∀ i ∈ S, Prop} : (∀ᵐ x ∂μ, ∀ i (hi : i ∈ S), p x i hi) ↔ ∀ i (hi : i ∈ S), ∀ᵐ x ∂μ, p x i hi := eventually_countable_ball hS #align measure_theory.ae_ball_iff MeasureTheory.ae_ball_iff theorem ae_eq_refl (f : α → β) : f =ᵐ[μ] f := EventuallyEq.rfl #align measure_theory.ae_eq_refl MeasureTheory.ae_eq_refl theorem ae_eq_symm {f g : α → β} (h : f =ᵐ[μ] g) : g =ᵐ[μ] f := h.symm #align measure_theory.ae_eq_symm MeasureTheory.ae_eq_symm theorem ae_eq_trans {f g h : α → β} (h₁ : f =ᵐ[μ] g) (h₂ : g =ᵐ[μ] h) : f =ᵐ[μ] h := h₁.trans h₂ #align measure_theory.ae_eq_trans MeasureTheory.ae_eq_trans theorem ae_le_of_ae_lt {β : Type*} [Preorder β] {f g : α → β} (h : ∀ᵐ x ∂μ, f x < g x) : f ≤ᵐ[μ] g := h.mono fun _ ↦ le_of_lt #align measure_theory.ae_le_of_ae_lt MeasureTheory.ae_le_of_ae_lt @[simp] theorem ae_eq_empty : s =ᵐ[μ] (∅ : Set α) ↔ μ s = 0 := eventuallyEq_empty.trans <\| by simp only [ae_iff, Classical.not_not, setOf_mem_eq] #align measure_theory.ae_eq_empty MeasureTheory.ae_eq_empty -- Porting note: The priority should be higher than `eventuallyEq_univ`. @[simp high] theorem ae_eq_univ : s =ᵐ[μ] (univ : Set α) ↔ μ sᶜ = 0 := eventuallyEq_univ #align measure_theory.ae_eq_univ MeasureTheory.ae_eq_univ theorem ae_le_set : s ≤ᵐ[μ] t ↔ μ (s \ t) = 0 := calc s ≤ᵐ[μ] t ↔ ∀ᵐ x ∂μ, x ∈ s → x ∈ t := Iff.rfl _ ↔ μ (s \ t) = 0 := by simp [ae_iff]; rfl #align measure_theory.ae_le_set MeasureTheory.ae_le_set theorem ae_le_set_inter {s' t' : Set α} (h : s ≤ᵐ[μ] t) (h' : s' ≤ᵐ[μ] t') : (s ∩ s' : Set α) ≤ᵐ[μ] (t ∩ t' : Set α) := h.inter h' #align measure_theory.ae_le_set_inter MeasureTheory.ae_le_set_inter theorem ae_le_set_union {s' t' : Set α} (h : s ≤ᵐ[μ] t) (h' : s' ≤ᵐ[μ] t') : (s ∪ s' : Set α) ≤ᵐ[μ] (t ∪ t' : Set α) := h.union h' #align measure_theory.ae_le_set_union MeasureTheory.ae_le_set_union	Mathlib/MeasureTheory/OuterMeasure/AE.lean	164	166	theorem union_ae_eq_right : (s ∪ t : Set α) =ᵐ[μ] t ↔ μ (s \ t) = 0 := by	simp [eventuallyLE_antisymm_iff, ae_le_set, union_diff_right, diff_eq_empty.2 Set.subset_union_right]
import Batteries.Tactic.SeqFocus namespace Batteries class TotalBLE (le : α → α → Bool) : Prop where total : le a b ∨ le b a class OrientedCmp (cmp : α → α → Ordering) : Prop where symm (x y) : (cmp x y).swap = cmp y x class TransCmp (cmp : α → α → Ordering) extends OrientedCmp cmp : Prop where le_trans : cmp x y ≠ .gt → cmp y z ≠ .gt → cmp x z ≠ .gt instance [inst : OrientedCmp cmp] : OrientedCmp (flip cmp) where symm _ _ := inst.symm .. instance [inst : TransCmp cmp] : TransCmp (flip cmp) where le_trans h1 h2 := inst.le_trans h2 h1 class BEqCmp [BEq α] (cmp : α → α → Ordering) : Prop where cmp_iff_beq : cmp x y = .eq ↔ x == y	.lake/packages/batteries/Batteries/Classes/Order.lean	121	122	theorem BEqCmp.cmp_iff_eq [BEq α] [LawfulBEq α] [BEqCmp (α := α) cmp] : cmp x y = .eq ↔ x = y := by	simp [BEqCmp.cmp_iff_beq]
import Mathlib.Data.List.Nodup import Mathlib.Data.List.Zip import Mathlib.Data.Nat.Defs import Mathlib.Data.List.Infix #align_import data.list.rotate from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" universe u variable {α : Type u} open Nat Function namespace List theorem rotate_mod (l : List α) (n : ℕ) : l.rotate (n % l.length) = l.rotate n := by simp [rotate] #align list.rotate_mod List.rotate_mod @[simp] theorem rotate_nil (n : ℕ) : ([] : List α).rotate n = [] := by simp [rotate] #align list.rotate_nil List.rotate_nil @[simp] theorem rotate_zero (l : List α) : l.rotate 0 = l := by simp [rotate] #align list.rotate_zero List.rotate_zero -- Porting note: removing simp, simp can prove it theorem rotate'_nil (n : ℕ) : ([] : List α).rotate' n = [] := by cases n <;> rfl #align list.rotate'_nil List.rotate'_nil @[simp] theorem rotate'_zero (l : List α) : l.rotate' 0 = l := by cases l <;> rfl #align list.rotate'_zero List.rotate'_zero theorem rotate'_cons_succ (l : List α) (a : α) (n : ℕ) : (a :: l : List α).rotate' n.succ = (l ++ [a]).rotate' n := by simp [rotate'] #align list.rotate'_cons_succ List.rotate'_cons_succ @[simp] theorem length_rotate' : ∀ (l : List α) (n : ℕ), (l.rotate' n).length = l.length \| [], _ => by simp \| a :: l, 0 => rfl \| a :: l, n + 1 => by rw [List.rotate', length_rotate' (l ++ [a]) n]; simp #align list.length_rotate' List.length_rotate' theorem rotate'_eq_drop_append_take : ∀ {l : List α} {n : ℕ}, n ≤ l.length → l.rotate' n = l.drop n ++ l.take n \| [], n, h => by simp [drop_append_of_le_length h] \| l, 0, h => by simp [take_append_of_le_length h] \| a :: l, n + 1, h => by have hnl : n ≤ l.length := le_of_succ_le_succ h have hnl' : n ≤ (l ++ [a]).length := by rw [length_append, length_cons, List.length]; exact le_of_succ_le h rw [rotate'_cons_succ, rotate'_eq_drop_append_take hnl', drop, take, drop_append_of_le_length hnl, take_append_of_le_length hnl]; simp #align list.rotate'_eq_drop_append_take List.rotate'_eq_drop_append_take theorem rotate'_rotate' : ∀ (l : List α) (n m : ℕ), (l.rotate' n).rotate' m = l.rotate' (n + m) \| a :: l, 0, m => by simp \| [], n, m => by simp \| a :: l, n + 1, m => by rw [rotate'_cons_succ, rotate'_rotate' _ n, Nat.add_right_comm, ← rotate'_cons_succ, Nat.succ_eq_add_one] #align list.rotate'_rotate' List.rotate'_rotate' @[simp] theorem rotate'_length (l : List α) : rotate' l l.length = l := by rw [rotate'_eq_drop_append_take le_rfl]; simp #align list.rotate'_length List.rotate'_length @[simp] theorem rotate'_length_mul (l : List α) : ∀ n : ℕ, l.rotate' (l.length * n) = l \| 0 => by simp \| n + 1 => calc l.rotate' (l.length * (n + 1)) = (l.rotate' (l.length * n)).rotate' (l.rotate' (l.length * n)).length := by simp [-rotate'_length, Nat.mul_succ, rotate'_rotate'] _ = l := by rw [rotate'_length, rotate'_length_mul l n] #align list.rotate'_length_mul List.rotate'_length_mul theorem rotate'_mod (l : List α) (n : ℕ) : l.rotate' (n % l.length) = l.rotate' n := calc l.rotate' (n % l.length) = (l.rotate' (n % l.length)).rotate' ((l.rotate' (n % l.length)).length * (n / l.length)) := by rw [rotate'_length_mul] _ = l.rotate' n := by rw [rotate'_rotate', length_rotate', Nat.mod_add_div] #align list.rotate'_mod List.rotate'_mod theorem rotate_eq_rotate' (l : List α) (n : ℕ) : l.rotate n = l.rotate' n := if h : l.length = 0 then by simp_all [length_eq_zero] else by rw [← rotate'_mod, rotate'_eq_drop_append_take (le_of_lt (Nat.mod_lt _ (Nat.pos_of_ne_zero h)))]; simp [rotate] #align list.rotate_eq_rotate' List.rotate_eq_rotate' theorem rotate_cons_succ (l : List α) (a : α) (n : ℕ) : (a :: l : List α).rotate (n + 1) = (l ++ [a]).rotate n := by rw [rotate_eq_rotate', rotate_eq_rotate', rotate'_cons_succ] #align list.rotate_cons_succ List.rotate_cons_succ @[simp] theorem mem_rotate : ∀ {l : List α} {a : α} {n : ℕ}, a ∈ l.rotate n ↔ a ∈ l \| [], _, n => by simp \| a :: l, _, 0 => by simp \| a :: l, _, n + 1 => by simp [rotate_cons_succ, mem_rotate, or_comm] #align list.mem_rotate List.mem_rotate @[simp] theorem length_rotate (l : List α) (n : ℕ) : (l.rotate n).length = l.length := by rw [rotate_eq_rotate', length_rotate'] #align list.length_rotate List.length_rotate @[simp] theorem rotate_replicate (a : α) (n : ℕ) (k : ℕ) : (replicate n a).rotate k = replicate n a := eq_replicate.2 ⟨by rw [length_rotate, length_replicate], fun b hb => eq_of_mem_replicate <\| mem_rotate.1 hb⟩ #align list.rotate_replicate List.rotate_replicate theorem rotate_eq_drop_append_take {l : List α} {n : ℕ} : n ≤ l.length → l.rotate n = l.drop n ++ l.take n := by rw [rotate_eq_rotate']; exact rotate'_eq_drop_append_take #align list.rotate_eq_drop_append_take List.rotate_eq_drop_append_take theorem rotate_eq_drop_append_take_mod {l : List α} {n : ℕ} : l.rotate n = l.drop (n % l.length) ++ l.take (n % l.length) := by rcases l.length.zero_le.eq_or_lt with hl \| hl · simp [eq_nil_of_length_eq_zero hl.symm] rw [← rotate_eq_drop_append_take (n.mod_lt hl).le, rotate_mod] #align list.rotate_eq_drop_append_take_mod List.rotate_eq_drop_append_take_mod @[simp] theorem rotate_append_length_eq (l l' : List α) : (l ++ l').rotate l.length = l' ++ l := by rw [rotate_eq_rotate'] induction l generalizing l' · simp · simp_all [rotate'] #align list.rotate_append_length_eq List.rotate_append_length_eq theorem rotate_rotate (l : List α) (n m : ℕ) : (l.rotate n).rotate m = l.rotate (n + m) := by rw [rotate_eq_rotate', rotate_eq_rotate', rotate_eq_rotate', rotate'_rotate'] #align list.rotate_rotate List.rotate_rotate @[simp] theorem rotate_length (l : List α) : rotate l l.length = l := by rw [rotate_eq_rotate', rotate'_length] #align list.rotate_length List.rotate_length @[simp] theorem rotate_length_mul (l : List α) (n : ℕ) : l.rotate (l.length * n) = l := by rw [rotate_eq_rotate', rotate'_length_mul] #align list.rotate_length_mul List.rotate_length_mul theorem rotate_perm (l : List α) (n : ℕ) : l.rotate n ~ l := by rw [rotate_eq_rotate'] induction' n with n hn generalizing l · simp · cases' l with hd tl · simp · rw [rotate'_cons_succ] exact (hn _).trans (perm_append_singleton _ _) #align list.rotate_perm List.rotate_perm @[simp] theorem nodup_rotate {l : List α} {n : ℕ} : Nodup (l.rotate n) ↔ Nodup l := (rotate_perm l n).nodup_iff #align list.nodup_rotate List.nodup_rotate @[simp] theorem rotate_eq_nil_iff {l : List α} {n : ℕ} : l.rotate n = [] ↔ l = [] := by induction' n with n hn generalizing l · simp · cases' l with hd tl · simp · simp [rotate_cons_succ, hn] #align list.rotate_eq_nil_iff List.rotate_eq_nil_iff @[simp] theorem nil_eq_rotate_iff {l : List α} {n : ℕ} : [] = l.rotate n ↔ [] = l := by rw [eq_comm, rotate_eq_nil_iff, eq_comm] #align list.nil_eq_rotate_iff List.nil_eq_rotate_iff @[simp] theorem rotate_singleton (x : α) (n : ℕ) : [x].rotate n = [x] := rotate_replicate x 1 n #align list.rotate_singleton List.rotate_singleton theorem zipWith_rotate_distrib {β γ : Type} (f : α → β → γ) (l : List α) (l' : List β) (n : ℕ) (h : l.length = l'.length) : (zipWith f l l').rotate n = zipWith f (l.rotate n) (l'.rotate n) := by rw [rotate_eq_drop_append_take_mod, rotate_eq_drop_append_take_mod, rotate_eq_drop_append_take_mod, h, zipWith_append, ← zipWith_distrib_drop, ← zipWith_distrib_take, List.length_zipWith, h, min_self] rw [length_drop, length_drop, h] #align list.zip_with_rotate_distrib List.zipWith_rotate_distrib attribute [local simp] rotate_cons_succ -- Porting note: removing @[simp], simp can prove it theorem zipWith_rotate_one {β : Type} (f : α → α → β) (x y : α) (l : List α) : zipWith f (x :: y :: l) ((x :: y :: l).rotate 1) = f x y :: zipWith f (y :: l) (l ++ [x]) := by simp #align list.zip_with_rotate_one List.zipWith_rotate_one theorem get?_rotate {l : List α} {n m : ℕ} (hml : m < l.length) : (l.rotate n).get? m = l.get? ((m + n) % l.length) := by rw [rotate_eq_drop_append_take_mod] rcases lt_or_le m (l.drop (n % l.length)).length with hm \| hm · rw [get?_append hm, get?_drop, ← add_mod_mod] rw [length_drop, Nat.lt_sub_iff_add_lt] at hm rw [mod_eq_of_lt hm, Nat.add_comm] · have hlt : n % length l < length l := mod_lt _ (m.zero_le.trans_lt hml) rw [get?_append_right hm, get?_take, length_drop] · congr 1 rw [length_drop] at hm have hm' := Nat.sub_le_iff_le_add'.1 hm have : n % length l + m - length l < length l := by rw [Nat.sub_lt_iff_lt_add' hm'] exact Nat.add_lt_add hlt hml conv_rhs => rw [Nat.add_comm m, ← mod_add_mod, mod_eq_sub_mod hm', mod_eq_of_lt this] rw [← Nat.add_right_inj, ← Nat.add_sub_assoc, Nat.add_sub_sub_cancel, Nat.add_sub_cancel', Nat.add_comm] exacts [hm', hlt.le, hm] · rwa [Nat.sub_lt_iff_lt_add hm, length_drop, Nat.sub_add_cancel hlt.le] #align list.nth_rotate List.get?_rotate -- Porting note (#10756): new lemma theorem get_rotate (l : List α) (n : ℕ) (k : Fin (l.rotate n).length) : (l.rotate n).get k = l.get ⟨(k + n) % l.length, mod_lt _ (length_rotate l n ▸ k.1.zero_le.trans_lt k.2)⟩ := by rw [← Option.some_inj, ← get?_eq_get, ← get?_eq_get, get?_rotate] exact k.2.trans_eq (length_rotate _ _) theorem head?_rotate {l : List α} {n : ℕ} (h : n < l.length) : head? (l.rotate n) = l.get? n := by rw [← get?_zero, get?_rotate (n.zero_le.trans_lt h), Nat.zero_add, Nat.mod_eq_of_lt h] #align list.head'_rotate List.head?_rotate -- Porting note: moved down from its original location below `get_rotate` so that the -- non-deprecated lemma does not use the deprecated version set_option linter.deprecated false in @[deprecated get_rotate (since := "2023-01-13")] theorem nthLe_rotate (l : List α) (n k : ℕ) (hk : k < (l.rotate n).length) : (l.rotate n).nthLe k hk = l.nthLe ((k + n) % l.length) (mod_lt _ (length_rotate l n ▸ k.zero_le.trans_lt hk)) := get_rotate l n ⟨k, hk⟩ #align list.nth_le_rotate List.nthLe_rotate set_option linter.deprecated false in theorem nthLe_rotate_one (l : List α) (k : ℕ) (hk : k < (l.rotate 1).length) : (l.rotate 1).nthLe k hk = l.nthLe ((k + 1) % l.length) (mod_lt _ (length_rotate l 1 ▸ k.zero_le.trans_lt hk)) := nthLe_rotate l 1 k hk #align list.nth_le_rotate_one List.nthLe_rotate_one -- Porting note (#10756): new lemma theorem get_eq_get_rotate (l : List α) (n : ℕ) (k : Fin l.length) : l.get k = (l.rotate n).get ⟨(l.length - n % l.length + k) % l.length, (Nat.mod_lt _ (k.1.zero_le.trans_lt k.2)).trans_eq (length_rotate _ _).symm⟩ := by rw [get_rotate] refine congr_arg l.get (Fin.eq_of_val_eq ?_) simp only [mod_add_mod] rw [← add_mod_mod, Nat.add_right_comm, Nat.sub_add_cancel, add_mod_left, mod_eq_of_lt] exacts [k.2, (mod_lt _ (k.1.zero_le.trans_lt k.2)).le] set_option linter.deprecated false in @[deprecated get_eq_get_rotate] theorem nthLe_rotate' (l : List α) (n k : ℕ) (hk : k < l.length) : (l.rotate n).nthLe ((l.length - n % l.length + k) % l.length) ((Nat.mod_lt _ (k.zero_le.trans_lt hk)).trans_le (length_rotate _ _).ge) = l.nthLe k hk := (get_eq_get_rotate l n ⟨k, hk⟩).symm #align list.nth_le_rotate' List.nthLe_rotate' theorem rotate_eq_self_iff_eq_replicate [hα : Nonempty α] : ∀ {l : List α}, (∀ n, l.rotate n = l) ↔ ∃ a, l = replicate l.length a \| [] => by simp \| a :: l => ⟨fun h => ⟨a, ext_get (length_replicate _ _).symm fun n h₁ h₂ => by rw [get_replicate, ← Option.some_inj, ← get?_eq_get, ← head?_rotate h₁, h, head?_cons]⟩, fun ⟨b, hb⟩ n => by rw [hb, rotate_replicate]⟩ #align list.rotate_eq_self_iff_eq_replicate List.rotate_eq_self_iff_eq_replicate theorem rotate_one_eq_self_iff_eq_replicate [Nonempty α] {l : List α} : l.rotate 1 = l ↔ ∃ a : α, l = List.replicate l.length a := ⟨fun h => rotate_eq_self_iff_eq_replicate.mp fun n => Nat.rec l.rotate_zero (fun n hn => by rwa [Nat.succ_eq_add_one, ← l.rotate_rotate, hn]) n, fun h => rotate_eq_self_iff_eq_replicate.mpr h 1⟩ #align list.rotate_one_eq_self_iff_eq_replicate List.rotate_one_eq_self_iff_eq_replicate theorem rotate_injective (n : ℕ) : Function.Injective fun l : List α => l.rotate n := by rintro l l' (h : l.rotate n = l'.rotate n) have hle : l.length = l'.length := (l.length_rotate n).symm.trans (h.symm ▸ l'.length_rotate n) rw [rotate_eq_drop_append_take_mod, rotate_eq_drop_append_take_mod] at h obtain ⟨hd, ht⟩ := append_inj h (by simp_all) rw [← take_append_drop _ l, ht, hd, take_append_drop] #align list.rotate_injective List.rotate_injective @[simp] theorem rotate_eq_rotate {l l' : List α} {n : ℕ} : l.rotate n = l'.rotate n ↔ l = l' := (rotate_injective n).eq_iff #align list.rotate_eq_rotate List.rotate_eq_rotate theorem rotate_eq_iff {l l' : List α} {n : ℕ} : l.rotate n = l' ↔ l = l'.rotate (l'.length - n % l'.length) := by rw [← @rotate_eq_rotate _ l _ n, rotate_rotate, ← rotate_mod l', add_mod] rcases l'.length.zero_le.eq_or_lt with hl \| hl · rw [eq_nil_of_length_eq_zero hl.symm, rotate_nil] · rcases (Nat.zero_le (n % l'.length)).eq_or_lt with hn \| hn · simp [← hn] · rw [mod_eq_of_lt (Nat.sub_lt hl hn), Nat.sub_add_cancel, mod_self, rotate_zero] exact (Nat.mod_lt _ hl).le #align list.rotate_eq_iff List.rotate_eq_iff @[simp] theorem rotate_eq_singleton_iff {l : List α} {n : ℕ} {x : α} : l.rotate n = [x] ↔ l = [x] := by rw [rotate_eq_iff, rotate_singleton] #align list.rotate_eq_singleton_iff List.rotate_eq_singleton_iff @[simp] theorem singleton_eq_rotate_iff {l : List α} {n : ℕ} {x : α} : [x] = l.rotate n ↔ [x] = l := by rw [eq_comm, rotate_eq_singleton_iff, eq_comm] #align list.singleton_eq_rotate_iff List.singleton_eq_rotate_iff theorem reverse_rotate (l : List α) (n : ℕ) : (l.rotate n).reverse = l.reverse.rotate (l.length - n % l.length) := by rw [← length_reverse l, ← rotate_eq_iff] induction' n with n hn generalizing l · simp · cases' l with hd tl · simp · rw [rotate_cons_succ, ← rotate_rotate, hn] simp #align list.reverse_rotate List.reverse_rotate theorem rotate_reverse (l : List α) (n : ℕ) : l.reverse.rotate n = (l.rotate (l.length - n % l.length)).reverse := by rw [← reverse_reverse l] simp_rw [reverse_rotate, reverse_reverse, rotate_eq_iff, rotate_rotate, length_rotate, length_reverse] rw [← length_reverse l] let k := n % l.reverse.length cases' hk' : k with k' · simp_all! [k, length_reverse, ← rotate_rotate] · cases' l with x l · simp · rw [Nat.mod_eq_of_lt, Nat.sub_add_cancel, rotate_length] · exact Nat.sub_le _ _ · exact Nat.sub_lt (by simp) (by simp_all! [k]) #align list.rotate_reverse List.rotate_reverse theorem map_rotate {β : Type} (f : α → β) (l : List α) (n : ℕ) : map f (l.rotate n) = (map f l).rotate n := by induction' n with n hn IH generalizing l · simp · cases' l with hd tl · simp · simp [hn] #align list.map_rotate List.map_rotate theorem Nodup.rotate_congr {l : List α} (hl : l.Nodup) (hn : l ≠ []) (i j : ℕ) (h : l.rotate i = l.rotate j) : i % l.length = j % l.length := by rw [← rotate_mod l i, ← rotate_mod l j] at h simpa only [head?_rotate, mod_lt, length_pos_of_ne_nil hn, get?_eq_get, Option.some_inj, hl.get_inj_iff, Fin.ext_iff] using congr_arg head? h #align list.nodup.rotate_congr List.Nodup.rotate_congr theorem Nodup.rotate_congr_iff {l : List α} (hl : l.Nodup) {i j : ℕ} : l.rotate i = l.rotate j ↔ i % l.length = j % l.length ∨ l = [] := by rcases eq_or_ne l [] with rfl \| hn · simp · simp only [hn, or_false] refine ⟨hl.rotate_congr hn _ _, fun h ↦ ?_⟩ rw [← rotate_mod, h, rotate_mod] theorem Nodup.rotate_eq_self_iff {l : List α} (hl : l.Nodup) {n : ℕ} : l.rotate n = l ↔ n % l.length = 0 ∨ l = [] := by rw [← zero_mod, ← hl.rotate_congr_iff, rotate_zero] #align list.nodup.rotate_eq_self_iff List.Nodup.rotate_eq_self_iff section IsRotated variable (l l' : List α) def IsRotated : Prop := ∃ n, l.rotate n = l' #align list.is_rotated List.IsRotated @[inherit_doc List.IsRotated] infixr:1000 " ~r " => IsRotated variable {l l'} @[refl] theorem IsRotated.refl (l : List α) : l ~r l := ⟨0, by simp⟩ #align list.is_rotated.refl List.IsRotated.refl @[symm] theorem IsRotated.symm (h : l ~r l') : l' ~r l := by obtain ⟨n, rfl⟩ := h cases' l with hd tl · exists 0 · use (hd :: tl).length n - n rw [rotate_rotate, Nat.add_sub_cancel', rotate_length_mul] exact Nat.le_mul_of_pos_left _ (by simp) #align list.is_rotated.symm List.IsRotated.symm theorem isRotated_comm : l ~r l' ↔ l' ~r l := ⟨IsRotated.symm, IsRotated.symm⟩ #align list.is_rotated_comm List.isRotated_comm @[simp] protected theorem IsRotated.forall (l : List α) (n : ℕ) : l.rotate n ~r l := IsRotated.symm ⟨n, rfl⟩ #align list.is_rotated.forall List.IsRotated.forall @[trans] theorem IsRotated.trans : ∀ {l l' l'' : List α}, l ~r l' → l' ~r l'' → l ~r l'' \| _, _, _, ⟨n, rfl⟩, ⟨m, rfl⟩ => ⟨n + m, by rw [rotate_rotate]⟩ #align list.is_rotated.trans List.IsRotated.trans theorem IsRotated.eqv : Equivalence (@IsRotated α) := Equivalence.mk IsRotated.refl IsRotated.symm IsRotated.trans #align list.is_rotated.eqv List.IsRotated.eqv def IsRotated.setoid (α : Type) : Setoid (List α) where r := IsRotated iseqv := IsRotated.eqv #align list.is_rotated.setoid List.IsRotated.setoid theorem IsRotated.perm (h : l ~r l') : l ~ l' := Exists.elim h fun _ hl => hl ▸ (rotate_perm _ _).symm #align list.is_rotated.perm List.IsRotated.perm theorem IsRotated.nodup_iff (h : l ~r l') : Nodup l ↔ Nodup l' := h.perm.nodup_iff #align list.is_rotated.nodup_iff List.IsRotated.nodup_iff theorem IsRotated.mem_iff (h : l ~r l') {a : α} : a ∈ l ↔ a ∈ l' := h.perm.mem_iff #align list.is_rotated.mem_iff List.IsRotated.mem_iff @[simp] theorem isRotated_nil_iff : l ~r [] ↔ l = [] := ⟨fun ⟨n, hn⟩ => by simpa using hn, fun h => h ▸ by rfl⟩ #align list.is_rotated_nil_iff List.isRotated_nil_iff @[simp] theorem isRotated_nil_iff' : [] ~r l ↔ [] = l := by rw [isRotated_comm, isRotated_nil_iff, eq_comm] #align list.is_rotated_nil_iff' List.isRotated_nil_iff' @[simp] theorem isRotated_singleton_iff {x : α} : l ~r [x] ↔ l = [x] := ⟨fun ⟨n, hn⟩ => by simpa using hn, fun h => h ▸ by rfl⟩ #align list.is_rotated_singleton_iff List.isRotated_singleton_iff @[simp] theorem isRotated_singleton_iff' {x : α} : [x] ~r l ↔ [x] = l := by rw [isRotated_comm, isRotated_singleton_iff, eq_comm] #align list.is_rotated_singleton_iff' List.isRotated_singleton_iff' theorem isRotated_concat (hd : α) (tl : List α) : (tl ++ [hd]) ~r (hd :: tl) := IsRotated.symm ⟨1, by simp⟩ #align list.is_rotated_concat List.isRotated_concat theorem isRotated_append : (l ++ l') ~r (l' ++ l) := ⟨l.length, by simp⟩ #align list.is_rotated_append List.isRotated_append theorem IsRotated.reverse (h : l ~r l') : l.reverse ~r l'.reverse := by obtain ⟨n, rfl⟩ := h exact ⟨_, (reverse_rotate _ _).symm⟩ #align list.is_rotated.reverse List.IsRotated.reverse theorem isRotated_reverse_comm_iff : l.reverse ~r l' ↔ l ~r l'.reverse := by constructor <;> · intro h simpa using h.reverse #align list.is_rotated_reverse_comm_iff List.isRotated_reverse_comm_iff @[simp] theorem isRotated_reverse_iff : l.reverse ~r l'.reverse ↔ l ~r l' := by simp [isRotated_reverse_comm_iff] #align list.is_rotated_reverse_iff List.isRotated_reverse_iff theorem isRotated_iff_mod : l ~r l' ↔ ∃ n ≤ l.length, l.rotate n = l' := by refine ⟨fun h => ?_, fun ⟨n, _, h⟩ => ⟨n, h⟩⟩ obtain ⟨n, rfl⟩ := h cases' l with hd tl · simp · refine ⟨n % (hd :: tl).length, ?_, rotate_mod _ _⟩ refine (Nat.mod_lt _ ?_).le simp #align list.is_rotated_iff_mod List.isRotated_iff_mod theorem isRotated_iff_mem_map_range : l ~r l' ↔ l' ∈ (List.range (l.length + 1)).map l.rotate := by simp_rw [mem_map, mem_range, isRotated_iff_mod] exact ⟨fun ⟨n, hn, h⟩ => ⟨n, Nat.lt_succ_of_le hn, h⟩, fun ⟨n, hn, h⟩ => ⟨n, Nat.le_of_lt_succ hn, h⟩⟩ #align list.is_rotated_iff_mem_map_range List.isRotated_iff_mem_map_range -- Porting note: @[congr] only works for equality. -- @[congr] theorem IsRotated.map {β : Type} {l₁ l₂ : List α} (h : l₁ ~r l₂) (f : α → β) : map f l₁ ~r map f l₂ := by obtain ⟨n, rfl⟩ := h rw [map_rotate] use n #align list.is_rotated.map List.IsRotated.map def cyclicPermutations : List α → List (List α) \| [] => [[]] \| l@(_ :: _) => dropLast (zipWith (· ++ ·) (tails l) (inits l)) #align list.cyclic_permutations List.cyclicPermutations @[simp] theorem cyclicPermutations_nil : cyclicPermutations ([] : List α) = [[]] := rfl #align list.cyclic_permutations_nil List.cyclicPermutations_nil theorem cyclicPermutations_cons (x : α) (l : List α) : cyclicPermutations (x :: l) = dropLast (zipWith (· ++ ·) (tails (x :: l)) (inits (x :: l))) := rfl #align list.cyclic_permutations_cons List.cyclicPermutations_cons theorem cyclicPermutations_of_ne_nil (l : List α) (h : l ≠ []) : cyclicPermutations l = dropLast (zipWith (· ++ ·) (tails l) (inits l)) := by obtain ⟨hd, tl, rfl⟩ := exists_cons_of_ne_nil h exact cyclicPermutations_cons _ _ #align list.cyclic_permutations_of_ne_nil List.cyclicPermutations_of_ne_nil theorem length_cyclicPermutations_cons (x : α) (l : List α) : length (cyclicPermutations (x :: l)) = length l + 1 := by simp [cyclicPermutations_cons] #align list.length_cyclic_permutations_cons List.length_cyclicPermutations_cons @[simp] theorem length_cyclicPermutations_of_ne_nil (l : List α) (h : l ≠ []) : length (cyclicPermutations l) = length l := by simp [cyclicPermutations_of_ne_nil _ h] #align list.length_cyclic_permutations_of_ne_nil List.length_cyclicPermutations_of_ne_nil @[simp] theorem cyclicPermutations_ne_nil : ∀ l : List α, cyclicPermutations l ≠ [] \| a::l, h => by simpa using congr_arg length h @[simp] theorem get_cyclicPermutations (l : List α) (n : Fin (length (cyclicPermutations l))) : (cyclicPermutations l).get n = l.rotate n := by cases l with \| nil => simp \| cons a l => simp only [cyclicPermutations_cons, get_dropLast, get_zipWith, get_tails, get_inits] rw [rotate_eq_drop_append_take (by simpa using n.2.le)] #align list.nth_le_cyclic_permutations List.get_cyclicPermutations @[simp] theorem head_cyclicPermutations (l : List α) : (cyclicPermutations l).head (cyclicPermutations_ne_nil l) = l := by have h : 0 < length (cyclicPermutations l) := length_pos_of_ne_nil (cyclicPermutations_ne_nil _) rw [← get_mk_zero h, get_cyclicPermutations, Fin.val_mk, rotate_zero] @[simp] theorem head?_cyclicPermutations (l : List α) : (cyclicPermutations l).head? = l := by rw [head?_eq_head, head_cyclicPermutations] theorem cyclicPermutations_injective : Function.Injective (@cyclicPermutations α) := fun l l' h ↦ by simpa using congr_arg head? h @[simp] theorem cyclicPermutations_inj {l l' : List α} : cyclicPermutations l = cyclicPermutations l' ↔ l = l' := cyclicPermutations_injective.eq_iff theorem length_mem_cyclicPermutations (l : List α) (h : l' ∈ cyclicPermutations l) : length l' = length l := by obtain ⟨k, hk, rfl⟩ := get_of_mem h simp #align list.length_mem_cyclic_permutations List.length_mem_cyclicPermutations theorem mem_cyclicPermutations_self (l : List α) : l ∈ cyclicPermutations l := by simpa using head_mem (cyclicPermutations_ne_nil l) #align list.mem_cyclic_permutations_self List.mem_cyclicPermutations_self @[simp]	Mathlib/Data/List/Rotate.lean	624	632	theorem cyclicPermutations_rotate (l : List α) (k : ℕ) : (l.rotate k).cyclicPermutations = l.cyclicPermutations.rotate k := by	have : (l.rotate k).cyclicPermutations.length = length (l.cyclicPermutations.rotate k) := by cases l · simp · rw [length_cyclicPermutations_of_ne_nil] <;> simp refine ext_get this fun n hn hn' => ?_ rw [get_rotate, get_cyclicPermutations, rotate_rotate, ← rotate_mod, Nat.add_comm] cases l <;> simp
import Mathlib.MeasureTheory.Function.LpOrder #align_import measure_theory.function.l1_space from "leanprover-community/mathlib"@"ccdbfb6e5614667af5aa3ab2d50885e0ef44a46f" noncomputable section open scoped Classical open Topology ENNReal MeasureTheory NNReal open Set Filter TopologicalSpace ENNReal EMetric MeasureTheory variable {α β γ δ : Type} {m : MeasurableSpace α} {μ ν : Measure α} [MeasurableSpace δ] variable [NormedAddCommGroup β] variable [NormedAddCommGroup γ] namespace MeasureTheory theorem lintegral_nnnorm_eq_lintegral_edist (f : α → β) : ∫⁻ a, ‖f a‖₊ ∂μ = ∫⁻ a, edist (f a) 0 ∂μ := by simp only [edist_eq_coe_nnnorm] #align measure_theory.lintegral_nnnorm_eq_lintegral_edist MeasureTheory.lintegral_nnnorm_eq_lintegral_edist theorem lintegral_norm_eq_lintegral_edist (f : α → β) : ∫⁻ a, ENNReal.ofReal ‖f a‖ ∂μ = ∫⁻ a, edist (f a) 0 ∂μ := by simp only [ofReal_norm_eq_coe_nnnorm, edist_eq_coe_nnnorm] #align measure_theory.lintegral_norm_eq_lintegral_edist MeasureTheory.lintegral_norm_eq_lintegral_edist theorem lintegral_edist_triangle {f g h : α → β} (hf : AEStronglyMeasurable f μ) (hh : AEStronglyMeasurable h μ) : (∫⁻ a, edist (f a) (g a) ∂μ) ≤ (∫⁻ a, edist (f a) (h a) ∂μ) + ∫⁻ a, edist (g a) (h a) ∂μ := by rw [← lintegral_add_left' (hf.edist hh)] refine lintegral_mono fun a => ?_ apply edist_triangle_right #align measure_theory.lintegral_edist_triangle MeasureTheory.lintegral_edist_triangle theorem lintegral_nnnorm_zero : (∫⁻ _ : α, ‖(0 : β)‖₊ ∂μ) = 0 := by simp #align measure_theory.lintegral_nnnorm_zero MeasureTheory.lintegral_nnnorm_zero theorem lintegral_nnnorm_add_left {f : α → β} (hf : AEStronglyMeasurable f μ) (g : α → γ) : ∫⁻ a, ‖f a‖₊ + ‖g a‖₊ ∂μ = (∫⁻ a, ‖f a‖₊ ∂μ) + ∫⁻ a, ‖g a‖₊ ∂μ := lintegral_add_left' hf.ennnorm _ #align measure_theory.lintegral_nnnorm_add_left MeasureTheory.lintegral_nnnorm_add_left theorem lintegral_nnnorm_add_right (f : α → β) {g : α → γ} (hg : AEStronglyMeasurable g μ) : ∫⁻ a, ‖f a‖₊ + ‖g a‖₊ ∂μ = (∫⁻ a, ‖f a‖₊ ∂μ) + ∫⁻ a, ‖g a‖₊ ∂μ := lintegral_add_right' _ hg.ennnorm #align measure_theory.lintegral_nnnorm_add_right MeasureTheory.lintegral_nnnorm_add_right theorem lintegral_nnnorm_neg {f : α → β} : (∫⁻ a, ‖(-f) a‖₊ ∂μ) = ∫⁻ a, ‖f a‖₊ ∂μ := by simp only [Pi.neg_apply, nnnorm_neg] #align measure_theory.lintegral_nnnorm_neg MeasureTheory.lintegral_nnnorm_neg def HasFiniteIntegral {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := (∫⁻ a, ‖f a‖₊ ∂μ) < ∞ #align measure_theory.has_finite_integral MeasureTheory.HasFiniteIntegral theorem hasFiniteIntegral_def {_ : MeasurableSpace α} (f : α → β) (μ : Measure α) : HasFiniteIntegral f μ ↔ ((∫⁻ a, ‖f a‖₊ ∂μ) < ∞) := Iff.rfl theorem hasFiniteIntegral_iff_norm (f : α → β) : HasFiniteIntegral f μ ↔ (∫⁻ a, ENNReal.ofReal ‖f a‖ ∂μ) < ∞ := by simp only [HasFiniteIntegral, ofReal_norm_eq_coe_nnnorm] #align measure_theory.has_finite_integral_iff_norm MeasureTheory.hasFiniteIntegral_iff_norm theorem hasFiniteIntegral_iff_edist (f : α → β) : HasFiniteIntegral f μ ↔ (∫⁻ a, edist (f a) 0 ∂μ) < ∞ := by simp only [hasFiniteIntegral_iff_norm, edist_dist, dist_zero_right] #align measure_theory.has_finite_integral_iff_edist MeasureTheory.hasFiniteIntegral_iff_edist theorem hasFiniteIntegral_iff_ofReal {f : α → ℝ} (h : 0 ≤ᵐ[μ] f) : HasFiniteIntegral f μ ↔ (∫⁻ a, ENNReal.ofReal (f a) ∂μ) < ∞ := by rw [HasFiniteIntegral, lintegral_nnnorm_eq_of_ae_nonneg h] #align measure_theory.has_finite_integral_iff_of_real MeasureTheory.hasFiniteIntegral_iff_ofReal theorem hasFiniteIntegral_iff_ofNNReal {f : α → ℝ≥0} : HasFiniteIntegral (fun x => (f x : ℝ)) μ ↔ (∫⁻ a, f a ∂μ) < ∞ := by simp [hasFiniteIntegral_iff_norm] #align measure_theory.has_finite_integral_iff_of_nnreal MeasureTheory.hasFiniteIntegral_iff_ofNNReal theorem HasFiniteIntegral.mono {f : α → β} {g : α → γ} (hg : HasFiniteIntegral g μ) (h : ∀ᵐ a ∂μ, ‖f a‖ ≤ ‖g a‖) : HasFiniteIntegral f μ := by simp only [hasFiniteIntegral_iff_norm] at calc (∫⁻ a, ENNReal.ofReal ‖f a‖ ∂μ) ≤ ∫⁻ a : α, ENNReal.ofReal ‖g a‖ ∂μ := lintegral_mono_ae (h.mono fun a h => ofReal_le_ofReal h) _ < ∞ := hg #align measure_theory.has_finite_integral.mono MeasureTheory.HasFiniteIntegral.mono theorem HasFiniteIntegral.mono' {f : α → β} {g : α → ℝ} (hg : HasFiniteIntegral g μ) (h : ∀ᵐ a ∂μ, ‖f a‖ ≤ g a) : HasFiniteIntegral f μ := hg.mono <\| h.mono fun _x hx => le_trans hx (le_abs_self _) #align measure_theory.has_finite_integral.mono' MeasureTheory.HasFiniteIntegral.mono' theorem HasFiniteIntegral.congr' {f : α → β} {g : α → γ} (hf : HasFiniteIntegral f μ) (h : ∀ᵐ a ∂μ, ‖f a‖ = ‖g a‖) : HasFiniteIntegral g μ := hf.mono <\| EventuallyEq.le <\| EventuallyEq.symm h #align measure_theory.has_finite_integral.congr' MeasureTheory.HasFiniteIntegral.congr' theorem hasFiniteIntegral_congr' {f : α → β} {g : α → γ} (h : ∀ᵐ a ∂μ, ‖f a‖ = ‖g a‖) : HasFiniteIntegral f μ ↔ HasFiniteIntegral g μ := ⟨fun hf => hf.congr' h, fun hg => hg.congr' <\| EventuallyEq.symm h⟩ #align measure_theory.has_finite_integral_congr' MeasureTheory.hasFiniteIntegral_congr' theorem HasFiniteIntegral.congr {f g : α → β} (hf : HasFiniteIntegral f μ) (h : f =ᵐ[μ] g) : HasFiniteIntegral g μ := hf.congr' <\| h.fun_comp norm #align measure_theory.has_finite_integral.congr MeasureTheory.HasFiniteIntegral.congr theorem hasFiniteIntegral_congr {f g : α → β} (h : f =ᵐ[μ] g) : HasFiniteIntegral f μ ↔ HasFiniteIntegral g μ := hasFiniteIntegral_congr' <\| h.fun_comp norm #align measure_theory.has_finite_integral_congr MeasureTheory.hasFiniteIntegral_congr theorem hasFiniteIntegral_const_iff {c : β} : HasFiniteIntegral (fun _ : α => c) μ ↔ c = 0 ∨ μ univ < ∞ := by simp [HasFiniteIntegral, lintegral_const, lt_top_iff_ne_top, ENNReal.mul_eq_top, or_iff_not_imp_left] #align measure_theory.has_finite_integral_const_iff MeasureTheory.hasFiniteIntegral_const_iff theorem hasFiniteIntegral_const [IsFiniteMeasure μ] (c : β) : HasFiniteIntegral (fun _ : α => c) μ := hasFiniteIntegral_const_iff.2 (Or.inr <\| measure_lt_top _ _) #align measure_theory.has_finite_integral_const MeasureTheory.hasFiniteIntegral_const theorem hasFiniteIntegral_of_bounded [IsFiniteMeasure μ] {f : α → β} {C : ℝ} (hC : ∀ᵐ a ∂μ, ‖f a‖ ≤ C) : HasFiniteIntegral f μ := (hasFiniteIntegral_const C).mono' hC #align measure_theory.has_finite_integral_of_bounded MeasureTheory.hasFiniteIntegral_of_bounded theorem HasFiniteIntegral.of_finite [Finite α] [IsFiniteMeasure μ] {f : α → β} : HasFiniteIntegral f μ := let ⟨_⟩ := nonempty_fintype α hasFiniteIntegral_of_bounded <\| ae_of_all μ <\| norm_le_pi_norm f @[deprecated (since := "2024-02-05")] alias hasFiniteIntegral_of_fintype := HasFiniteIntegral.of_finite theorem HasFiniteIntegral.mono_measure {f : α → β} (h : HasFiniteIntegral f ν) (hμ : μ ≤ ν) : HasFiniteIntegral f μ := lt_of_le_of_lt (lintegral_mono' hμ le_rfl) h #align measure_theory.has_finite_integral.mono_measure MeasureTheory.HasFiniteIntegral.mono_measure theorem HasFiniteIntegral.add_measure {f : α → β} (hμ : HasFiniteIntegral f μ) (hν : HasFiniteIntegral f ν) : HasFiniteIntegral f (μ + ν) := by simp only [HasFiniteIntegral, lintegral_add_measure] at * exact add_lt_top.2 ⟨hμ, hν⟩ #align measure_theory.has_finite_integral.add_measure MeasureTheory.HasFiniteIntegral.add_measure theorem HasFiniteIntegral.left_of_add_measure {f : α → β} (h : HasFiniteIntegral f (μ + ν)) : HasFiniteIntegral f μ := h.mono_measure <\| Measure.le_add_right <\| le_rfl #align measure_theory.has_finite_integral.left_of_add_measure MeasureTheory.HasFiniteIntegral.left_of_add_measure theorem HasFiniteIntegral.right_of_add_measure {f : α → β} (h : HasFiniteIntegral f (μ + ν)) : HasFiniteIntegral f ν := h.mono_measure <\| Measure.le_add_left <\| le_rfl #align measure_theory.has_finite_integral.right_of_add_measure MeasureTheory.HasFiniteIntegral.right_of_add_measure @[simp] theorem hasFiniteIntegral_add_measure {f : α → β} : HasFiniteIntegral f (μ + ν) ↔ HasFiniteIntegral f μ ∧ HasFiniteIntegral f ν := ⟨fun h => ⟨h.left_of_add_measure, h.right_of_add_measure⟩, fun h => h.1.add_measure h.2⟩ #align measure_theory.has_finite_integral_add_measure MeasureTheory.hasFiniteIntegral_add_measure theorem HasFiniteIntegral.smul_measure {f : α → β} (h : HasFiniteIntegral f μ) {c : ℝ≥0∞} (hc : c ≠ ∞) : HasFiniteIntegral f (c • μ) := by simp only [HasFiniteIntegral, lintegral_smul_measure] at * exact mul_lt_top hc h.ne #align measure_theory.has_finite_integral.smul_measure MeasureTheory.HasFiniteIntegral.smul_measure @[simp] theorem hasFiniteIntegral_zero_measure {m : MeasurableSpace α} (f : α → β) : HasFiniteIntegral f (0 : Measure α) := by simp only [HasFiniteIntegral, lintegral_zero_measure, zero_lt_top] #align measure_theory.has_finite_integral_zero_measure MeasureTheory.hasFiniteIntegral_zero_measure variable (α β μ) @[simp] theorem hasFiniteIntegral_zero : HasFiniteIntegral (fun _ : α => (0 : β)) μ := by simp [HasFiniteIntegral] #align measure_theory.has_finite_integral_zero MeasureTheory.hasFiniteIntegral_zero variable {α β μ} theorem HasFiniteIntegral.neg {f : α → β} (hfi : HasFiniteIntegral f μ) : HasFiniteIntegral (-f) μ := by simpa [HasFiniteIntegral] using hfi #align measure_theory.has_finite_integral.neg MeasureTheory.HasFiniteIntegral.neg @[simp] theorem hasFiniteIntegral_neg_iff {f : α → β} : HasFiniteIntegral (-f) μ ↔ HasFiniteIntegral f μ := ⟨fun h => neg_neg f ▸ h.neg, HasFiniteIntegral.neg⟩ #align measure_theory.has_finite_integral_neg_iff MeasureTheory.hasFiniteIntegral_neg_iff theorem HasFiniteIntegral.norm {f : α → β} (hfi : HasFiniteIntegral f μ) : HasFiniteIntegral (fun a => ‖f a‖) μ := by have eq : (fun a => (nnnorm ‖f a‖ : ℝ≥0∞)) = fun a => (‖f a‖₊ : ℝ≥0∞) := by funext rw [nnnorm_norm] rwa [HasFiniteIntegral, eq] #align measure_theory.has_finite_integral.norm MeasureTheory.HasFiniteIntegral.norm theorem hasFiniteIntegral_norm_iff (f : α → β) : HasFiniteIntegral (fun a => ‖f a‖) μ ↔ HasFiniteIntegral f μ := hasFiniteIntegral_congr' <\| eventually_of_forall fun x => norm_norm (f x) #align measure_theory.has_finite_integral_norm_iff MeasureTheory.hasFiniteIntegral_norm_iff theorem hasFiniteIntegral_toReal_of_lintegral_ne_top {f : α → ℝ≥0∞} (hf : (∫⁻ x, f x ∂μ) ≠ ∞) : HasFiniteIntegral (fun x => (f x).toReal) μ := by have : ∀ x, (‖(f x).toReal‖₊ : ℝ≥0∞) = ENNReal.ofNNReal ⟨(f x).toReal, ENNReal.toReal_nonneg⟩ := by intro x rw [Real.nnnorm_of_nonneg] simp_rw [HasFiniteIntegral, this] refine lt_of_le_of_lt (lintegral_mono fun x => ?_) (lt_top_iff_ne_top.2 hf) by_cases hfx : f x = ∞ · simp [hfx] · lift f x to ℝ≥0 using hfx with fx h simp [← h, ← NNReal.coe_le_coe] #align measure_theory.has_finite_integral_to_real_of_lintegral_ne_top MeasureTheory.hasFiniteIntegral_toReal_of_lintegral_ne_top theorem isFiniteMeasure_withDensity_ofReal {f : α → ℝ} (hfi : HasFiniteIntegral f μ) : IsFiniteMeasure (μ.withDensity fun x => ENNReal.ofReal <\| f x) := by refine isFiniteMeasure_withDensity ((lintegral_mono fun x => ?_).trans_lt hfi).ne exact Real.ofReal_le_ennnorm (f x) #align measure_theory.is_finite_measure_with_density_of_real MeasureTheory.isFiniteMeasure_withDensity_ofReal -- variable [MeasurableSpace β] [MeasurableSpace γ] [MeasurableSpace δ] def Integrable {α} {_ : MeasurableSpace α} (f : α → β) (μ : Measure α := by volume_tac) : Prop := AEStronglyMeasurable f μ ∧ HasFiniteIntegral f μ #align measure_theory.integrable MeasureTheory.Integrable theorem memℒp_one_iff_integrable {f : α → β} : Memℒp f 1 μ ↔ Integrable f μ := by simp_rw [Integrable, HasFiniteIntegral, Memℒp, snorm_one_eq_lintegral_nnnorm] #align measure_theory.mem_ℒp_one_iff_integrable MeasureTheory.memℒp_one_iff_integrable theorem Integrable.aestronglyMeasurable {f : α → β} (hf : Integrable f μ) : AEStronglyMeasurable f μ := hf.1 #align measure_theory.integrable.ae_strongly_measurable MeasureTheory.Integrable.aestronglyMeasurable theorem Integrable.aemeasurable [MeasurableSpace β] [BorelSpace β] {f : α → β} (hf : Integrable f μ) : AEMeasurable f μ := hf.aestronglyMeasurable.aemeasurable #align measure_theory.integrable.ae_measurable MeasureTheory.Integrable.aemeasurable theorem Integrable.hasFiniteIntegral {f : α → β} (hf : Integrable f μ) : HasFiniteIntegral f μ := hf.2 #align measure_theory.integrable.has_finite_integral MeasureTheory.Integrable.hasFiniteIntegral theorem Integrable.mono {f : α → β} {g : α → γ} (hg : Integrable g μ) (hf : AEStronglyMeasurable f μ) (h : ∀ᵐ a ∂μ, ‖f a‖ ≤ ‖g a‖) : Integrable f μ := ⟨hf, hg.hasFiniteIntegral.mono h⟩ #align measure_theory.integrable.mono MeasureTheory.Integrable.mono theorem Integrable.mono' {f : α → β} {g : α → ℝ} (hg : Integrable g μ) (hf : AEStronglyMeasurable f μ) (h : ∀ᵐ a ∂μ, ‖f a‖ ≤ g a) : Integrable f μ := ⟨hf, hg.hasFiniteIntegral.mono' h⟩ #align measure_theory.integrable.mono' MeasureTheory.Integrable.mono' theorem Integrable.congr' {f : α → β} {g : α → γ} (hf : Integrable f μ) (hg : AEStronglyMeasurable g μ) (h : ∀ᵐ a ∂μ, ‖f a‖ = ‖g a‖) : Integrable g μ := ⟨hg, hf.hasFiniteIntegral.congr' h⟩ #align measure_theory.integrable.congr' MeasureTheory.Integrable.congr' theorem integrable_congr' {f : α → β} {g : α → γ} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) (h : ∀ᵐ a ∂μ, ‖f a‖ = ‖g a‖) : Integrable f μ ↔ Integrable g μ := ⟨fun h2f => h2f.congr' hg h, fun h2g => h2g.congr' hf <\| EventuallyEq.symm h⟩ #align measure_theory.integrable_congr' MeasureTheory.integrable_congr' theorem Integrable.congr {f g : α → β} (hf : Integrable f μ) (h : f =ᵐ[μ] g) : Integrable g μ := ⟨hf.1.congr h, hf.2.congr h⟩ #align measure_theory.integrable.congr MeasureTheory.Integrable.congr theorem integrable_congr {f g : α → β} (h : f =ᵐ[μ] g) : Integrable f μ ↔ Integrable g μ := ⟨fun hf => hf.congr h, fun hg => hg.congr h.symm⟩ #align measure_theory.integrable_congr MeasureTheory.integrable_congr theorem integrable_const_iff {c : β} : Integrable (fun _ : α => c) μ ↔ c = 0 ∨ μ univ < ∞ := by have : AEStronglyMeasurable (fun _ : α => c) μ := aestronglyMeasurable_const rw [Integrable, and_iff_right this, hasFiniteIntegral_const_iff] #align measure_theory.integrable_const_iff MeasureTheory.integrable_const_iff @[simp] theorem integrable_const [IsFiniteMeasure μ] (c : β) : Integrable (fun _ : α => c) μ := integrable_const_iff.2 <\| Or.inr <\| measure_lt_top _ _ #align measure_theory.integrable_const MeasureTheory.integrable_const @[simp] theorem Integrable.of_finite [Finite α] [MeasurableSpace α] [MeasurableSingletonClass α] (μ : Measure α) [IsFiniteMeasure μ] (f : α → β) : Integrable (fun a ↦ f a) μ := ⟨(StronglyMeasurable.of_finite f).aestronglyMeasurable, .of_finite⟩ @[deprecated (since := "2024-02-05")] alias integrable_of_fintype := Integrable.of_finite theorem Memℒp.integrable_norm_rpow {f : α → β} {p : ℝ≥0∞} (hf : Memℒp f p μ) (hp_ne_zero : p ≠ 0) (hp_ne_top : p ≠ ∞) : Integrable (fun x : α => ‖f x‖ ^ p.toReal) μ := by rw [← memℒp_one_iff_integrable] exact hf.norm_rpow hp_ne_zero hp_ne_top #align measure_theory.mem_ℒp.integrable_norm_rpow MeasureTheory.Memℒp.integrable_norm_rpow theorem Memℒp.integrable_norm_rpow' [IsFiniteMeasure μ] {f : α → β} {p : ℝ≥0∞} (hf : Memℒp f p μ) : Integrable (fun x : α => ‖f x‖ ^ p.toReal) μ := by by_cases h_zero : p = 0 · simp [h_zero, integrable_const] by_cases h_top : p = ∞ · simp [h_top, integrable_const] exact hf.integrable_norm_rpow h_zero h_top #align measure_theory.mem_ℒp.integrable_norm_rpow' MeasureTheory.Memℒp.integrable_norm_rpow' theorem Integrable.mono_measure {f : α → β} (h : Integrable f ν) (hμ : μ ≤ ν) : Integrable f μ := ⟨h.aestronglyMeasurable.mono_measure hμ, h.hasFiniteIntegral.mono_measure hμ⟩ #align measure_theory.integrable.mono_measure MeasureTheory.Integrable.mono_measure theorem Integrable.of_measure_le_smul {μ' : Measure α} (c : ℝ≥0∞) (hc : c ≠ ∞) (hμ'_le : μ' ≤ c • μ) {f : α → β} (hf : Integrable f μ) : Integrable f μ' := by rw [← memℒp_one_iff_integrable] at hf ⊢ exact hf.of_measure_le_smul c hc hμ'_le #align measure_theory.integrable.of_measure_le_smul MeasureTheory.Integrable.of_measure_le_smul theorem Integrable.add_measure {f : α → β} (hμ : Integrable f μ) (hν : Integrable f ν) : Integrable f (μ + ν) := by simp_rw [← memℒp_one_iff_integrable] at hμ hν ⊢ refine ⟨hμ.aestronglyMeasurable.add_measure hν.aestronglyMeasurable, ?_⟩ rw [snorm_one_add_measure, ENNReal.add_lt_top] exact ⟨hμ.snorm_lt_top, hν.snorm_lt_top⟩ #align measure_theory.integrable.add_measure MeasureTheory.Integrable.add_measure theorem Integrable.left_of_add_measure {f : α → β} (h : Integrable f (μ + ν)) : Integrable f μ := by rw [← memℒp_one_iff_integrable] at h ⊢ exact h.left_of_add_measure #align measure_theory.integrable.left_of_add_measure MeasureTheory.Integrable.left_of_add_measure theorem Integrable.right_of_add_measure {f : α → β} (h : Integrable f (μ + ν)) : Integrable f ν := by rw [← memℒp_one_iff_integrable] at h ⊢ exact h.right_of_add_measure #align measure_theory.integrable.right_of_add_measure MeasureTheory.Integrable.right_of_add_measure @[simp] theorem integrable_add_measure {f : α → β} : Integrable f (μ + ν) ↔ Integrable f μ ∧ Integrable f ν := ⟨fun h => ⟨h.left_of_add_measure, h.right_of_add_measure⟩, fun h => h.1.add_measure h.2⟩ #align measure_theory.integrable_add_measure MeasureTheory.integrable_add_measure @[simp] theorem integrable_zero_measure {_ : MeasurableSpace α} {f : α → β} : Integrable f (0 : Measure α) := ⟨aestronglyMeasurable_zero_measure f, hasFiniteIntegral_zero_measure f⟩ #align measure_theory.integrable_zero_measure MeasureTheory.integrable_zero_measure theorem integrable_finset_sum_measure {ι} {m : MeasurableSpace α} {f : α → β} {μ : ι → Measure α} {s : Finset ι} : Integrable f (∑ i ∈ s, μ i) ↔ ∀ i ∈ s, Integrable f (μ i) := by induction s using Finset.induction_on <;> simp [*] #align measure_theory.integrable_finset_sum_measure MeasureTheory.integrable_finset_sum_measure theorem Integrable.smul_measure {f : α → β} (h : Integrable f μ) {c : ℝ≥0∞} (hc : c ≠ ∞) : Integrable f (c • μ) := by rw [← memℒp_one_iff_integrable] at h ⊢ exact h.smul_measure hc #align measure_theory.integrable.smul_measure MeasureTheory.Integrable.smul_measure theorem Integrable.smul_measure_nnreal {f : α → β} (h : Integrable f μ) {c : ℝ≥0} : Integrable f (c • μ) := by apply h.smul_measure simp theorem integrable_smul_measure {f : α → β} {c : ℝ≥0∞} (h₁ : c ≠ 0) (h₂ : c ≠ ∞) : Integrable f (c • μ) ↔ Integrable f μ := ⟨fun h => by simpa only [smul_smul, ENNReal.inv_mul_cancel h₁ h₂, one_smul] using h.smul_measure (ENNReal.inv_ne_top.2 h₁), fun h => h.smul_measure h₂⟩ #align measure_theory.integrable_smul_measure MeasureTheory.integrable_smul_measure theorem integrable_inv_smul_measure {f : α → β} {c : ℝ≥0∞} (h₁ : c ≠ 0) (h₂ : c ≠ ∞) : Integrable f (c⁻¹ • μ) ↔ Integrable f μ := integrable_smul_measure (by simpa using h₂) (by simpa using h₁) #align measure_theory.integrable_inv_smul_measure MeasureTheory.integrable_inv_smul_measure theorem Integrable.to_average {f : α → β} (h : Integrable f μ) : Integrable f ((μ univ)⁻¹ • μ) := by rcases eq_or_ne μ 0 with (rfl \| hne) · rwa [smul_zero] · apply h.smul_measure simpa #align measure_theory.integrable.to_average MeasureTheory.Integrable.to_average theorem integrable_average [IsFiniteMeasure μ] {f : α → β} : Integrable f ((μ univ)⁻¹ • μ) ↔ Integrable f μ := (eq_or_ne μ 0).by_cases (fun h => by simp [h]) fun h => integrable_smul_measure (ENNReal.inv_ne_zero.2 <\| measure_ne_top _ _) (ENNReal.inv_ne_top.2 <\| mt Measure.measure_univ_eq_zero.1 h) #align measure_theory.integrable_average MeasureTheory.integrable_average theorem integrable_map_measure {f : α → δ} {g : δ → β} (hg : AEStronglyMeasurable g (Measure.map f μ)) (hf : AEMeasurable f μ) : Integrable g (Measure.map f μ) ↔ Integrable (g ∘ f) μ := by simp_rw [← memℒp_one_iff_integrable] exact memℒp_map_measure_iff hg hf #align measure_theory.integrable_map_measure MeasureTheory.integrable_map_measure theorem Integrable.comp_aemeasurable {f : α → δ} {g : δ → β} (hg : Integrable g (Measure.map f μ)) (hf : AEMeasurable f μ) : Integrable (g ∘ f) μ := (integrable_map_measure hg.aestronglyMeasurable hf).mp hg #align measure_theory.integrable.comp_ae_measurable MeasureTheory.Integrable.comp_aemeasurable theorem Integrable.comp_measurable {f : α → δ} {g : δ → β} (hg : Integrable g (Measure.map f μ)) (hf : Measurable f) : Integrable (g ∘ f) μ := hg.comp_aemeasurable hf.aemeasurable #align measure_theory.integrable.comp_measurable MeasureTheory.Integrable.comp_measurable	Mathlib/MeasureTheory/Function/L1Space.lean	621	624	theorem _root_.MeasurableEmbedding.integrable_map_iff {f : α → δ} (hf : MeasurableEmbedding f) {g : δ → β} : Integrable g (Measure.map f μ) ↔ Integrable (g ∘ f) μ := by	simp_rw [← memℒp_one_iff_integrable] exact hf.memℒp_map_measure_iff
import Mathlib.NumberTheory.Zsqrtd.Basic import Mathlib.RingTheory.PrincipalIdealDomain import Mathlib.Data.Complex.Basic import Mathlib.Data.Real.Archimedean #align_import number_theory.zsqrtd.gaussian_int from "leanprover-community/mathlib"@"5b2fe80501ff327b9109fb09b7cc8c325cd0d7d9" open Zsqrtd Complex open scoped ComplexConjugate abbrev GaussianInt : Type := Zsqrtd (-1) #align gaussian_int GaussianInt local notation "ℤ[i]" => GaussianInt namespace GaussianInt instance : Repr ℤ[i] := ⟨fun x _ => "⟨" ++ repr x.re ++ ", " ++ repr x.im ++ "⟩"⟩ instance instCommRing : CommRing ℤ[i] := Zsqrtd.commRing #align gaussian_int.comm_ring GaussianInt.instCommRing section attribute [-instance] Complex.instField -- Avoid making things noncomputable unnecessarily. def toComplex : ℤ[i] →+* ℂ := Zsqrtd.lift ⟨I, by simp⟩ #align gaussian_int.to_complex GaussianInt.toComplex end instance : Coe ℤ[i] ℂ := ⟨toComplex⟩ theorem toComplex_def (x : ℤ[i]) : (x : ℂ) = x.re + x.im * I := rfl #align gaussian_int.to_complex_def GaussianInt.toComplex_def theorem toComplex_def' (x y : ℤ) : ((⟨x, y⟩ : ℤ[i]) : ℂ) = x + y * I := by simp [toComplex_def] #align gaussian_int.to_complex_def' GaussianInt.toComplex_def' theorem toComplex_def₂ (x : ℤ[i]) : (x : ℂ) = ⟨x.re, x.im⟩ := by apply Complex.ext <;> simp [toComplex_def] #align gaussian_int.to_complex_def₂ GaussianInt.toComplex_def₂ @[simp] theorem to_real_re (x : ℤ[i]) : ((x.re : ℤ) : ℝ) = (x : ℂ).re := by simp [toComplex_def] #align gaussian_int.to_real_re GaussianInt.to_real_re @[simp] theorem to_real_im (x : ℤ[i]) : ((x.im : ℤ) : ℝ) = (x : ℂ).im := by simp [toComplex_def] #align gaussian_int.to_real_im GaussianInt.to_real_im @[simp] theorem toComplex_re (x y : ℤ) : ((⟨x, y⟩ : ℤ[i]) : ℂ).re = x := by simp [toComplex_def] #align gaussian_int.to_complex_re GaussianInt.toComplex_re @[simp] theorem toComplex_im (x y : ℤ) : ((⟨x, y⟩ : ℤ[i]) : ℂ).im = y := by simp [toComplex_def] #align gaussian_int.to_complex_im GaussianInt.toComplex_im -- Porting note (#10618): @[simp] can prove this theorem toComplex_add (x y : ℤ[i]) : ((x + y : ℤ[i]) : ℂ) = x + y := toComplex.map_add _ _ #align gaussian_int.to_complex_add GaussianInt.toComplex_add -- Porting note (#10618): @[simp] can prove this theorem toComplex_mul (x y : ℤ[i]) : ((x * y : ℤ[i]) : ℂ) = x * y := toComplex.map_mul _ _ #align gaussian_int.to_complex_mul GaussianInt.toComplex_mul -- Porting note (#10618): @[simp] can prove this theorem toComplex_one : ((1 : ℤ[i]) : ℂ) = 1 := toComplex.map_one #align gaussian_int.to_complex_one GaussianInt.toComplex_one -- Porting note (#10618): @[simp] can prove this theorem toComplex_zero : ((0 : ℤ[i]) : ℂ) = 0 := toComplex.map_zero #align gaussian_int.to_complex_zero GaussianInt.toComplex_zero -- Porting note (#10618): @[simp] can prove this theorem toComplex_neg (x : ℤ[i]) : ((-x : ℤ[i]) : ℂ) = -x := toComplex.map_neg _ #align gaussian_int.to_complex_neg GaussianInt.toComplex_neg -- Porting note (#10618): @[simp] can prove this theorem toComplex_sub (x y : ℤ[i]) : ((x - y : ℤ[i]) : ℂ) = x - y := toComplex.map_sub _ _ #align gaussian_int.to_complex_sub GaussianInt.toComplex_sub @[simp] theorem toComplex_star (x : ℤ[i]) : ((star x : ℤ[i]) : ℂ) = conj (x : ℂ) := by rw [toComplex_def₂, toComplex_def₂] exact congr_arg₂ _ rfl (Int.cast_neg _) #align gaussian_int.to_complex_star GaussianInt.toComplex_star @[simp] theorem toComplex_inj {x y : ℤ[i]} : (x : ℂ) = y ↔ x = y := by cases x; cases y; simp [toComplex_def₂] #align gaussian_int.to_complex_inj GaussianInt.toComplex_inj lemma toComplex_injective : Function.Injective GaussianInt.toComplex := fun ⦃_ _⦄ ↦ toComplex_inj.mp @[simp] theorem toComplex_eq_zero {x : ℤ[i]} : (x : ℂ) = 0 ↔ x = 0 := by rw [← toComplex_zero, toComplex_inj] #align gaussian_int.to_complex_eq_zero GaussianInt.toComplex_eq_zero @[simp] theorem intCast_real_norm (x : ℤ[i]) : (x.norm : ℝ) = Complex.normSq (x : ℂ) := by rw [Zsqrtd.norm, normSq]; simp #align gaussian_int.nat_cast_real_norm GaussianInt.intCast_real_norm @[deprecated (since := "2024-04-17")] alias int_cast_real_norm := intCast_real_norm @[simp] theorem intCast_complex_norm (x : ℤ[i]) : (x.norm : ℂ) = Complex.normSq (x : ℂ) := by cases x; rw [Zsqrtd.norm, normSq]; simp #align gaussian_int.nat_cast_complex_norm GaussianInt.intCast_complex_norm @[deprecated (since := "2024-04-17")] alias int_cast_complex_norm := intCast_complex_norm theorem norm_nonneg (x : ℤ[i]) : 0 ≤ norm x := Zsqrtd.norm_nonneg (by norm_num) _ #align gaussian_int.norm_nonneg GaussianInt.norm_nonneg @[simp] theorem norm_eq_zero {x : ℤ[i]} : norm x = 0 ↔ x = 0 := by rw [← @Int.cast_inj ℝ _ _ _]; simp #align gaussian_int.norm_eq_zero GaussianInt.norm_eq_zero theorem norm_pos {x : ℤ[i]} : 0 < norm x ↔ x ≠ 0 := by rw [lt_iff_le_and_ne, Ne, eq_comm, norm_eq_zero]; simp [norm_nonneg] #align gaussian_int.norm_pos GaussianInt.norm_pos theorem abs_natCast_norm (x : ℤ[i]) : (x.norm.natAbs : ℤ) = x.norm := Int.natAbs_of_nonneg (norm_nonneg _) #align gaussian_int.abs_coe_nat_norm GaussianInt.abs_natCast_norm -- 2024-04-05 @[deprecated] alias abs_coe_nat_norm := abs_natCast_norm @[simp] theorem natCast_natAbs_norm {α : Type} [Ring α] (x : ℤ[i]) : (x.norm.natAbs : α) = x.norm := by rw [← Int.cast_natCast, abs_natCast_norm] #align gaussian_int.nat_cast_nat_abs_norm GaussianInt.natCast_natAbs_norm @[deprecated (since := "2024-04-17")] alias nat_cast_natAbs_norm := natCast_natAbs_norm theorem natAbs_norm_eq (x : ℤ[i]) : x.norm.natAbs = x.re.natAbs x.re.natAbs + x.im.natAbs * x.im.natAbs := Int.ofNat.inj <\| by simp; simp [Zsqrtd.norm] #align gaussian_int.nat_abs_norm_eq GaussianInt.natAbs_norm_eq instance : Div ℤ[i] := ⟨fun x y => let n := (norm y : ℚ)⁻¹ let c := star y ⟨round ((x * c).re * n : ℚ), round ((x * c).im * n : ℚ)⟩⟩ theorem div_def (x y : ℤ[i]) : x / y = ⟨round ((x * star y).re / norm y : ℚ), round ((x * star y).im / norm y : ℚ)⟩ := show Zsqrtd.mk _ _ = _ by simp [div_eq_mul_inv] #align gaussian_int.div_def GaussianInt.div_def	Mathlib/NumberTheory/Zsqrtd/GaussianInt.lean	212	214	theorem toComplex_div_re (x y : ℤ[i]) : ((x / y : ℤ[i]) : ℂ).re = round (x / y : ℂ).re := by	rw [div_def, ← @Rat.round_cast ℝ _ _] simp [-Rat.round_cast, mul_assoc, div_eq_mul_inv, mul_add, add_mul]
import Mathlib.Algebra.Field.Basic import Mathlib.Algebra.Order.Group.Basic import Mathlib.Algebra.Order.Ring.Basic import Mathlib.RingTheory.Int.Basic import Mathlib.Tactic.Ring import Mathlib.Tactic.FieldSimp import Mathlib.Data.Int.NatPrime import Mathlib.Data.ZMod.Basic #align_import number_theory.pythagorean_triples from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3" theorem sq_ne_two_fin_zmod_four (z : ZMod 4) : z * z ≠ 2 := by change Fin 4 at z fin_cases z <;> decide #align sq_ne_two_fin_zmod_four sq_ne_two_fin_zmod_four theorem Int.sq_ne_two_mod_four (z : ℤ) : z * z % 4 ≠ 2 := by suffices ¬z * z % (4 : ℕ) = 2 % (4 : ℕ) by exact this rw [← ZMod.intCast_eq_intCast_iff'] simpa using sq_ne_two_fin_zmod_four _ #align int.sq_ne_two_mod_four Int.sq_ne_two_mod_four noncomputable section open scoped Classical def PythagoreanTriple (x y z : ℤ) : Prop := x * x + y * y = z * z #align pythagorean_triple PythagoreanTriple theorem pythagoreanTriple_comm {x y z : ℤ} : PythagoreanTriple x y z ↔ PythagoreanTriple y x z := by delta PythagoreanTriple rw [add_comm] #align pythagorean_triple_comm pythagoreanTriple_comm theorem PythagoreanTriple.zero : PythagoreanTriple 0 0 0 := by simp only [PythagoreanTriple, zero_mul, zero_add] #align pythagorean_triple.zero PythagoreanTriple.zero namespace PythagoreanTriple variable {x y z : ℤ} (h : PythagoreanTriple x y z) theorem eq : x * x + y * y = z * z := h #align pythagorean_triple.eq PythagoreanTriple.eq @[symm] theorem symm : PythagoreanTriple y x z := by rwa [pythagoreanTriple_comm] #align pythagorean_triple.symm PythagoreanTriple.symm theorem mul (k : ℤ) : PythagoreanTriple (k * x) (k * y) (k * z) := calc k * x * (k * x) + k * y * (k * y) = k ^ 2 * (x * x + y * y) := by ring _ = k ^ 2 * (z * z) := by rw [h.eq] _ = k * z * (k * z) := by ring #align pythagorean_triple.mul PythagoreanTriple.mul theorem mul_iff (k : ℤ) (hk : k ≠ 0) : PythagoreanTriple (k * x) (k * y) (k * z) ↔ PythagoreanTriple x y z := by refine ⟨?_, fun h => h.mul k⟩ simp only [PythagoreanTriple] intro h rw [← mul_left_inj' (mul_ne_zero hk hk)] convert h using 1 <;> ring #align pythagorean_triple.mul_iff PythagoreanTriple.mul_iff @[nolint unusedArguments] def IsClassified (_ : PythagoreanTriple x y z) := ∃ k m n : ℤ, (x = k * (m ^ 2 - n ^ 2) ∧ y = k * (2 * m * n) ∨ x = k * (2 * m * n) ∧ y = k * (m ^ 2 - n ^ 2)) ∧ Int.gcd m n = 1 #align pythagorean_triple.is_classified PythagoreanTriple.IsClassified @[nolint unusedArguments] def IsPrimitiveClassified (_ : PythagoreanTriple x y z) := ∃ m n : ℤ, (x = m ^ 2 - n ^ 2 ∧ y = 2 * m * n ∨ x = 2 * m * n ∧ y = m ^ 2 - n ^ 2) ∧ Int.gcd m n = 1 ∧ (m % 2 = 0 ∧ n % 2 = 1 ∨ m % 2 = 1 ∧ n % 2 = 0) #align pythagorean_triple.is_primitive_classified PythagoreanTriple.IsPrimitiveClassified theorem mul_isClassified (k : ℤ) (hc : h.IsClassified) : (h.mul k).IsClassified := by obtain ⟨l, m, n, ⟨⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩, co⟩⟩ := hc · use k * l, m, n apply And.intro _ co left constructor <;> ring · use k * l, m, n apply And.intro _ co right constructor <;> ring #align pythagorean_triple.mul_is_classified PythagoreanTriple.mul_isClassified theorem even_odd_of_coprime (hc : Int.gcd x y = 1) : x % 2 = 0 ∧ y % 2 = 1 ∨ x % 2 = 1 ∧ y % 2 = 0 := by cases' Int.emod_two_eq_zero_or_one x with hx hx <;> cases' Int.emod_two_eq_zero_or_one y with hy hy -- x even, y even · exfalso apply Nat.not_coprime_of_dvd_of_dvd (by decide : 1 < 2) _ _ hc · apply Int.natCast_dvd.1 apply Int.dvd_of_emod_eq_zero hx · apply Int.natCast_dvd.1 apply Int.dvd_of_emod_eq_zero hy -- x even, y odd · left exact ⟨hx, hy⟩ -- x odd, y even · right exact ⟨hx, hy⟩ -- x odd, y odd · exfalso obtain ⟨x0, y0, rfl, rfl⟩ : ∃ x0 y0, x = x0 * 2 + 1 ∧ y = y0 * 2 + 1 := by cases' exists_eq_mul_left_of_dvd (Int.dvd_sub_of_emod_eq hx) with x0 hx2 cases' exists_eq_mul_left_of_dvd (Int.dvd_sub_of_emod_eq hy) with y0 hy2 rw [sub_eq_iff_eq_add] at hx2 hy2 exact ⟨x0, y0, hx2, hy2⟩ apply Int.sq_ne_two_mod_four z rw [show z * z = 4 * (x0 * x0 + x0 + y0 * y0 + y0) + 2 by rw [← h.eq] ring] simp only [Int.add_emod, Int.mul_emod_right, zero_add] decide #align pythagorean_triple.even_odd_of_coprime PythagoreanTriple.even_odd_of_coprime theorem gcd_dvd : (Int.gcd x y : ℤ) ∣ z := by by_cases h0 : Int.gcd x y = 0 · have hx : x = 0 := by apply Int.natAbs_eq_zero.mp apply Nat.eq_zero_of_gcd_eq_zero_left h0 have hy : y = 0 := by apply Int.natAbs_eq_zero.mp apply Nat.eq_zero_of_gcd_eq_zero_right h0 have hz : z = 0 := by simpa only [PythagoreanTriple, hx, hy, add_zero, zero_eq_mul, mul_zero, or_self_iff] using h simp only [hz, dvd_zero] obtain ⟨k, x0, y0, _, h2, rfl, rfl⟩ : ∃ (k : ℕ) (x0 y0 : _), 0 < k ∧ Int.gcd x0 y0 = 1 ∧ x = x0 * k ∧ y = y0 * k := Int.exists_gcd_one' (Nat.pos_of_ne_zero h0) rw [Int.gcd_mul_right, h2, Int.natAbs_ofNat, one_mul] rw [← Int.pow_dvd_pow_iff two_ne_zero, sq z, ← h.eq] rw [(by ring : x0 * k * (x0 * k) + y0 * k * (y0 * k) = (k : ℤ) ^ 2 * (x0 * x0 + y0 * y0))] exact dvd_mul_right _ _ #align pythagorean_triple.gcd_dvd PythagoreanTriple.gcd_dvd	Mathlib/NumberTheory/PythagoreanTriples.lean	185	207	theorem normalize : PythagoreanTriple (x / Int.gcd x y) (y / Int.gcd x y) (z / Int.gcd x y) := by	by_cases h0 : Int.gcd x y = 0 · have hx : x = 0 := by apply Int.natAbs_eq_zero.mp apply Nat.eq_zero_of_gcd_eq_zero_left h0 have hy : y = 0 := by apply Int.natAbs_eq_zero.mp apply Nat.eq_zero_of_gcd_eq_zero_right h0 have hz : z = 0 := by simpa only [PythagoreanTriple, hx, hy, add_zero, zero_eq_mul, mul_zero, or_self_iff] using h simp only [hx, hy, hz, Int.zero_div] exact zero rcases h.gcd_dvd with ⟨z0, rfl⟩ obtain ⟨k, x0, y0, k0, h2, rfl, rfl⟩ : ∃ (k : ℕ) (x0 y0 : _), 0 < k ∧ Int.gcd x0 y0 = 1 ∧ x = x0 * k ∧ y = y0 * k := Int.exists_gcd_one' (Nat.pos_of_ne_zero h0) have hk : (k : ℤ) ≠ 0 := by norm_cast rwa [pos_iff_ne_zero] at k0 rw [Int.gcd_mul_right, h2, Int.natAbs_ofNat, one_mul] at h ⊢ rw [mul_comm x0, mul_comm y0, mul_iff k hk] at h rwa [Int.mul_ediv_cancel _ hk, Int.mul_ediv_cancel _ hk, Int.mul_ediv_cancel_left _ hk]
import Mathlib.Order.Bounds.Basic import Mathlib.Order.WellFounded import Mathlib.Data.Set.Image import Mathlib.Order.Interval.Set.Basic import Mathlib.Data.Set.Lattice #align_import order.conditionally_complete_lattice.basic from "leanprover-community/mathlib"@"29cb56a7b35f72758b05a30490e1f10bd62c35c1" open Function OrderDual Set variable {α β γ : Type} {ι : Sort} section variable [Preorder α] open scoped Classical noncomputable instance WithTop.instSupSet [SupSet α] : SupSet (WithTop α) := ⟨fun S => if ⊤ ∈ S then ⊤ else if BddAbove ((fun (a : α) ↦ ↑a) ⁻¹' S : Set α) then ↑(sSup ((fun (a : α) ↦ (a : WithTop α)) ⁻¹' S : Set α)) else ⊤⟩ noncomputable instance WithTop.instInfSet [InfSet α] : InfSet (WithTop α) := ⟨fun S => if S ⊆ {⊤} ∨ ¬BddBelow S then ⊤ else ↑(sInf ((fun (a : α) ↦ ↑a) ⁻¹' S : Set α))⟩ noncomputable instance WithBot.instSupSet [SupSet α] : SupSet (WithBot α) := ⟨(WithTop.instInfSet (α := αᵒᵈ)).sInf⟩ noncomputable instance WithBot.instInfSet [InfSet α] : InfSet (WithBot α) := ⟨(WithTop.instSupSet (α := αᵒᵈ)).sSup⟩ theorem WithTop.sSup_eq [SupSet α] {s : Set (WithTop α)} (hs : ⊤ ∉ s) (hs' : BddAbove ((↑) ⁻¹' s : Set α)) : sSup s = ↑(sSup ((↑) ⁻¹' s) : α) := (if_neg hs).trans <\| if_pos hs' #align with_top.Sup_eq WithTop.sSup_eq theorem WithTop.sInf_eq [InfSet α] {s : Set (WithTop α)} (hs : ¬s ⊆ {⊤}) (h's : BddBelow s) : sInf s = ↑(sInf ((↑) ⁻¹' s) : α) := if_neg <\| by simp [hs, h's] #align with_top.Inf_eq WithTop.sInf_eq theorem WithBot.sInf_eq [InfSet α] {s : Set (WithBot α)} (hs : ⊥ ∉ s) (hs' : BddBelow ((↑) ⁻¹' s : Set α)) : sInf s = ↑(sInf ((↑) ⁻¹' s) : α) := (if_neg hs).trans <\| if_pos hs' #align with_bot.Inf_eq WithBot.sInf_eq theorem WithBot.sSup_eq [SupSet α] {s : Set (WithBot α)} (hs : ¬s ⊆ {⊥}) (h's : BddAbove s) : sSup s = ↑(sSup ((↑) ⁻¹' s) : α) := WithTop.sInf_eq (α := αᵒᵈ) hs h's #align with_bot.Sup_eq WithBot.sSup_eq @[simp] theorem WithTop.sInf_empty [InfSet α] : sInf (∅ : Set (WithTop α)) = ⊤ := if_pos <\| by simp #align with_top.cInf_empty WithTop.sInf_empty @[simp] theorem WithTop.iInf_empty [IsEmpty ι] [InfSet α] (f : ι → WithTop α) : ⨅ i, f i = ⊤ := by rw [iInf, range_eq_empty, WithTop.sInf_empty] #align with_top.cinfi_empty WithTop.iInf_empty theorem WithTop.coe_sInf' [InfSet α] {s : Set α} (hs : s.Nonempty) (h's : BddBelow s) : ↑(sInf s) = (sInf ((fun (a : α) ↦ ↑a) '' s) : WithTop α) := by obtain ⟨x, hx⟩ := hs change _ = ite _ _ _ split_ifs with h · rcases h with h1 \| h2 · cases h1 (mem_image_of_mem _ hx) · exact (h2 (Monotone.map_bddBelow coe_mono h's)).elim · rw [preimage_image_eq] exact Option.some_injective _ #align with_top.coe_Inf' WithTop.coe_sInf' -- Porting note: the mathlib3 proof uses `range_comp` in the opposite direction and -- does not need `rfl`. @[norm_cast] theorem WithTop.coe_iInf [Nonempty ι] [InfSet α] {f : ι → α} (hf : BddBelow (range f)) : ↑(⨅ i, f i) = (⨅ i, f i : WithTop α) := by rw [iInf, iInf, WithTop.coe_sInf' (range_nonempty f) hf, ← range_comp] rfl #align with_top.coe_infi WithTop.coe_iInf theorem WithTop.coe_sSup' [SupSet α] {s : Set α} (hs : BddAbove s) : ↑(sSup s) = (sSup ((fun (a : α) ↦ ↑a) '' s) : WithTop α) := by change _ = ite _ _ _ rw [if_neg, preimage_image_eq, if_pos hs] · exact Option.some_injective _ · rintro ⟨x, _, ⟨⟩⟩ #align with_top.coe_Sup' WithTop.coe_sSup' -- Porting note: the mathlib3 proof uses `range_comp` in the opposite direction and -- does not need `rfl`. @[norm_cast]	Mathlib/Order/ConditionallyCompleteLattice/Basic.lean	127	129	theorem WithTop.coe_iSup [SupSet α] (f : ι → α) (h : BddAbove (Set.range f)) : ↑(⨆ i, f i) = (⨆ i, f i : WithTop α) := by	rw [iSup, iSup, WithTop.coe_sSup' h, ← range_comp]; rfl
import Mathlib.Data.List.Basic #align_import data.list.infix from "leanprover-community/mathlib"@"26f081a2fb920140ed5bc5cc5344e84bcc7cb2b2" open Nat variable {α β : Type*} namespace List variable {l l₁ l₂ l₃ : List α} {a b : α} {m n : ℕ} section Fix #align list.prefix_append List.prefix_append #align list.suffix_append List.suffix_append #align list.infix_append List.infix_append #align list.infix_append' List.infix_append' #align list.is_prefix.is_infix List.IsPrefix.isInfix #align list.is_suffix.is_infix List.IsSuffix.isInfix #align list.nil_prefix List.nil_prefix #align list.nil_suffix List.nil_suffix #align list.nil_infix List.nil_infix #align list.prefix_refl List.prefix_refl #align list.suffix_refl List.suffix_refl #align list.infix_refl List.infix_refl theorem prefix_rfl : l <+: l := prefix_refl _ #align list.prefix_rfl List.prefix_rfl theorem suffix_rfl : l <:+ l := suffix_refl _ #align list.suffix_rfl List.suffix_rfl theorem infix_rfl : l <:+: l := infix_refl _ #align list.infix_rfl List.infix_rfl #align list.suffix_cons List.suffix_cons theorem prefix_concat (a : α) (l) : l <+: concat l a := by simp #align list.prefix_concat List.prefix_concat	Mathlib/Data/List/Infix.lean	73	76	theorem prefix_concat_iff {l₁ l₂ : List α} {a : α} : l₁ <+: l₂ ++ [a] ↔ l₁ = l₂ ++ [a] ∨ l₁ <+: l₂ := by	simpa only [← reverse_concat', reverse_inj, reverse_suffix] using suffix_cons_iff (l₁ := l₁.reverse) (l₂ := l₂.reverse)
import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Algebra.Order.Group.Int import Mathlib.Algebra.Order.Ring.Nat import Mathlib.Algebra.Ring.Rat import Mathlib.Data.PNat.Defs #align_import data.rat.lemmas from "leanprover-community/mathlib"@"550b58538991c8977703fdeb7c9d51a5aa27df11" namespace Rat open Rat theorem num_dvd (a) {b : ℤ} (b0 : b ≠ 0) : (a /. b).num ∣ a := by cases' e : a /. b with n d h c rw [Rat.mk'_eq_divInt, divInt_eq_iff b0 (mod_cast h)] at e refine Int.natAbs_dvd.1 <\| Int.dvd_natAbs.1 <\| Int.natCast_dvd_natCast.2 <\| c.dvd_of_dvd_mul_right ?_ have := congr_arg Int.natAbs e simp only [Int.natAbs_mul, Int.natAbs_ofNat] at this; simp [this] #align rat.num_dvd Rat.num_dvd theorem den_dvd (a b : ℤ) : ((a /. b).den : ℤ) ∣ b := by by_cases b0 : b = 0; · simp [b0] cases' e : a /. b with n d h c rw [mk'_eq_divInt, divInt_eq_iff b0 (ne_of_gt (Int.natCast_pos.2 (Nat.pos_of_ne_zero h)))] at e refine Int.dvd_natAbs.1 <\| Int.natCast_dvd_natCast.2 <\| c.symm.dvd_of_dvd_mul_left ?_ rw [← Int.natAbs_mul, ← Int.natCast_dvd_natCast, Int.dvd_natAbs, ← e]; simp #align rat.denom_dvd Rat.den_dvd theorem num_den_mk {q : ℚ} {n d : ℤ} (hd : d ≠ 0) (qdf : q = n /. d) : ∃ c : ℤ, n = c * q.num ∧ d = c * q.den := by obtain rfl \| hn := eq_or_ne n 0 · simp [qdf] have : q.num * d = n * ↑q.den := by refine (divInt_eq_iff ?_ hd).mp ?_ · exact Int.natCast_ne_zero.mpr (Rat.den_nz _) · rwa [num_divInt_den] have hqdn : q.num ∣ n := by rw [qdf] exact Rat.num_dvd _ hd refine ⟨n / q.num, ?_, ?_⟩ · rw [Int.ediv_mul_cancel hqdn] · refine Int.eq_mul_div_of_mul_eq_mul_of_dvd_left ?_ hqdn this rw [qdf] exact Rat.num_ne_zero.2 ((divInt_ne_zero hd).mpr hn) #align rat.num_denom_mk Rat.num_den_mk #noalign rat.mk_pnat_num #noalign rat.mk_pnat_denom theorem num_mk (n d : ℤ) : (n /. d).num = d.sign * n / n.gcd d := by have (m : ℕ) : Int.natAbs (m + 1) = m + 1 := by rw [← Nat.cast_one, ← Nat.cast_add, Int.natAbs_cast] rcases d with ((_ \| _) \| _) <;> rw [← Int.div_eq_ediv_of_dvd] <;> simp [divInt, mkRat, Rat.normalize, Nat.succPNat, Int.sign, Int.gcd, Int.zero_ediv, Int.ofNat_dvd_left, Nat.gcd_dvd_left, this] #align rat.num_mk Rat.num_mk theorem den_mk (n d : ℤ) : (n /. d).den = if d = 0 then 1 else d.natAbs / n.gcd d := by have (m : ℕ) : Int.natAbs (m + 1) = m + 1 := by rw [← Nat.cast_one, ← Nat.cast_add, Int.natAbs_cast] rcases d with ((_ \| _) \| _) <;> simp [divInt, mkRat, Rat.normalize, Nat.succPNat, Int.sign, Int.gcd, if_neg (Nat.cast_add_one_ne_zero _), this] #align rat.denom_mk Rat.den_mk #noalign rat.mk_pnat_denom_dvd theorem add_den_dvd (q₁ q₂ : ℚ) : (q₁ + q₂).den ∣ q₁.den * q₂.den := by rw [add_def, normalize_eq] apply Nat.div_dvd_of_dvd apply Nat.gcd_dvd_right #align rat.add_denom_dvd Rat.add_den_dvd theorem mul_den_dvd (q₁ q₂ : ℚ) : (q₁ * q₂).den ∣ q₁.den * q₂.den := by rw [mul_def, normalize_eq] apply Nat.div_dvd_of_dvd apply Nat.gcd_dvd_right #align rat.mul_denom_dvd Rat.mul_den_dvd theorem mul_num (q₁ q₂ : ℚ) : (q₁ * q₂).num = q₁.num * q₂.num / Nat.gcd (q₁.num * q₂.num).natAbs (q₁.den * q₂.den) := by rw [mul_def, normalize_eq] #align rat.mul_num Rat.mul_num theorem mul_den (q₁ q₂ : ℚ) : (q₁ * q₂).den = q₁.den * q₂.den / Nat.gcd (q₁.num * q₂.num).natAbs (q₁.den * q₂.den) := by rw [mul_def, normalize_eq] #align rat.mul_denom Rat.mul_den theorem mul_self_num (q : ℚ) : (q * q).num = q.num * q.num := by rw [mul_num, Int.natAbs_mul, Nat.Coprime.gcd_eq_one, Int.ofNat_one, Int.ediv_one] exact (q.reduced.mul_right q.reduced).mul (q.reduced.mul_right q.reduced) #align rat.mul_self_num Rat.mul_self_num theorem mul_self_den (q : ℚ) : (q * q).den = q.den * q.den := by rw [Rat.mul_den, Int.natAbs_mul, Nat.Coprime.gcd_eq_one, Nat.div_one] exact (q.reduced.mul_right q.reduced).mul (q.reduced.mul_right q.reduced) #align rat.mul_self_denom Rat.mul_self_den theorem add_num_den (q r : ℚ) : q + r = (q.num * r.den + q.den * r.num : ℤ) /. (↑q.den * ↑r.den : ℤ) := by have hqd : (q.den : ℤ) ≠ 0 := Int.natCast_ne_zero_iff_pos.2 q.den_pos have hrd : (r.den : ℤ) ≠ 0 := Int.natCast_ne_zero_iff_pos.2 r.den_pos conv_lhs => rw [← num_divInt_den q, ← num_divInt_den r, divInt_add_divInt _ _ hqd hrd] rw [mul_comm r.num q.den] #align rat.add_num_denom Rat.add_num_den protected theorem inv_neg (q : ℚ) : (-q)⁻¹ = -q⁻¹ := by rw [← num_divInt_den q] simp only [Rat.neg_divInt, Rat.inv_divInt', eq_self_iff_true, Rat.divInt_neg] #align rat.inv_neg Rat.inv_neg theorem num_div_eq_of_coprime {a b : ℤ} (hb0 : 0 < b) (h : Nat.Coprime a.natAbs b.natAbs) : (a / b : ℚ).num = a := by -- Porting note: was `lift b to ℕ using le_of_lt hb0` rw [← Int.natAbs_of_nonneg hb0.le, ← Rat.divInt_eq_div, ← mk_eq_divInt _ _ (Int.natAbs_ne_zero.mpr hb0.ne') h] #align rat.num_div_eq_of_coprime Rat.num_div_eq_of_coprime theorem den_div_eq_of_coprime {a b : ℤ} (hb0 : 0 < b) (h : Nat.Coprime a.natAbs b.natAbs) : ((a / b : ℚ).den : ℤ) = b := by -- Porting note: was `lift b to ℕ using le_of_lt hb0` rw [← Int.natAbs_of_nonneg hb0.le, ← Rat.divInt_eq_div, ← mk_eq_divInt _ _ (Int.natAbs_ne_zero.mpr hb0.ne') h] #align rat.denom_div_eq_of_coprime Rat.den_div_eq_of_coprime theorem div_int_inj {a b c d : ℤ} (hb0 : 0 < b) (hd0 : 0 < d) (h1 : Nat.Coprime a.natAbs b.natAbs) (h2 : Nat.Coprime c.natAbs d.natAbs) (h : (a : ℚ) / b = (c : ℚ) / d) : a = c ∧ b = d := by apply And.intro · rw [← num_div_eq_of_coprime hb0 h1, h, num_div_eq_of_coprime hd0 h2] · rw [← den_div_eq_of_coprime hb0 h1, h, den_div_eq_of_coprime hd0 h2] #align rat.div_int_inj Rat.div_int_inj @[norm_cast] theorem intCast_div_self (n : ℤ) : ((n / n : ℤ) : ℚ) = n / n := by by_cases hn : n = 0 · subst hn simp only [Int.cast_zero, Int.zero_div, zero_div, Int.ediv_zero] · have : (n : ℚ) ≠ 0 := by rwa [← coe_int_inj] at hn simp only [Int.ediv_self hn, Int.cast_one, Ne, not_false_iff, div_self this] #align rat.coe_int_div_self Rat.intCast_div_self @[norm_cast] theorem natCast_div_self (n : ℕ) : ((n / n : ℕ) : ℚ) = n / n := intCast_div_self n #align rat.coe_nat_div_self Rat.natCast_div_self theorem intCast_div (a b : ℤ) (h : b ∣ a) : ((a / b : ℤ) : ℚ) = a / b := by rcases h with ⟨c, rfl⟩ rw [mul_comm b, Int.mul_ediv_assoc c (dvd_refl b), Int.cast_mul, intCast_div_self, Int.cast_mul, mul_div_assoc] #align rat.coe_int_div Rat.intCast_div theorem natCast_div (a b : ℕ) (h : b ∣ a) : ((a / b : ℕ) : ℚ) = a / b := intCast_div a b (Int.ofNat_dvd.mpr h) #align rat.coe_nat_div Rat.natCast_div	Mathlib/Data/Rat/Lemmas.lean	223	228	theorem den_div_intCast_eq_one_iff (m n : ℤ) (hn : n ≠ 0) : ((m : ℚ) / n).den = 1 ↔ n ∣ m := by	replace hn : (n : ℚ) ≠ 0 := num_ne_zero.mp hn constructor · rw [Rat.den_eq_one_iff, eq_div_iff hn] exact mod_cast (Dvd.intro_left _) · exact (intCast_div _ _ · ▸ rfl)
import Mathlib.Analysis.NormedSpace.OperatorNorm.Bilinear import Mathlib.Analysis.NormedSpace.OperatorNorm.NNNorm import Mathlib.Analysis.NormedSpace.Span suppress_compilation open Bornology open Filter hiding map_smul open scoped Classical NNReal Topology Uniformity -- the `ₗ` subscript variables are for special cases about linear (as opposed to semilinear) maps variable {𝕜 𝕜₂ 𝕜₃ E Eₗ F Fₗ G Gₗ 𝓕 : Type} section Normed variable [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedAddCommGroup G] [NormedAddCommGroup Fₗ] open Metric ContinuousLinearMap section variable [NontriviallyNormedField 𝕜] [NontriviallyNormedField 𝕜₂] [NontriviallyNormedField 𝕜₃] [NormedSpace 𝕜 E] [NormedSpace 𝕜₂ F] [NormedSpace 𝕜₃ G] [NormedSpace 𝕜 Fₗ] (c : 𝕜) {σ₁₂ : 𝕜 →+ 𝕜₂} {σ₂₃ : 𝕜₂ →+* 𝕜₃} (f g : E →SL[σ₁₂] F) (x y z : E) namespace LinearMap	Mathlib/Analysis/NormedSpace/OperatorNorm/NormedSpace.lean	42	46	theorem bound_of_shell [RingHomIsometric σ₁₂] (f : E →ₛₗ[σ₁₂] F) {ε C : ℝ} (ε_pos : 0 < ε) {c : 𝕜} (hc : 1 < ‖c‖) (hf : ∀ x, ε / ‖c‖ ≤ ‖x‖ → ‖x‖ < ε → ‖f x‖ ≤ C * ‖x‖) (x : E) : ‖f x‖ ≤ C * ‖x‖ := by	by_cases hx : x = 0; · simp [hx] exact SemilinearMapClass.bound_of_shell_semi_normed f ε_pos hc hf (norm_ne_zero_iff.2 hx)
import Mathlib.Analysis.InnerProductSpace.Basic import Mathlib.LinearAlgebra.SesquilinearForm #align_import analysis.inner_product_space.orthogonal from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" variable {𝕜 E F : Type*} [RCLike 𝕜] variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace 𝕜 F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y namespace Submodule variable (K : Submodule 𝕜 E) def orthogonal : Submodule 𝕜 E where carrier := { v \| ∀ u ∈ K, ⟪u, v⟫ = 0 } zero_mem' _ _ := inner_zero_right _ add_mem' hx hy u hu := by rw [inner_add_right, hx u hu, hy u hu, add_zero] smul_mem' c x hx u hu := by rw [inner_smul_right, hx u hu, mul_zero] #align submodule.orthogonal Submodule.orthogonal @[inherit_doc] notation:1200 K "ᗮ" => orthogonal K theorem mem_orthogonal (v : E) : v ∈ Kᗮ ↔ ∀ u ∈ K, ⟪u, v⟫ = 0 := Iff.rfl #align submodule.mem_orthogonal Submodule.mem_orthogonal theorem mem_orthogonal' (v : E) : v ∈ Kᗮ ↔ ∀ u ∈ K, ⟪v, u⟫ = 0 := by simp_rw [mem_orthogonal, inner_eq_zero_symm] #align submodule.mem_orthogonal' Submodule.mem_orthogonal' variable {K} theorem inner_right_of_mem_orthogonal {u v : E} (hu : u ∈ K) (hv : v ∈ Kᗮ) : ⟪u, v⟫ = 0 := (K.mem_orthogonal v).1 hv u hu #align submodule.inner_right_of_mem_orthogonal Submodule.inner_right_of_mem_orthogonal theorem inner_left_of_mem_orthogonal {u v : E} (hu : u ∈ K) (hv : v ∈ Kᗮ) : ⟪v, u⟫ = 0 := by rw [inner_eq_zero_symm]; exact inner_right_of_mem_orthogonal hu hv #align submodule.inner_left_of_mem_orthogonal Submodule.inner_left_of_mem_orthogonal theorem mem_orthogonal_singleton_iff_inner_right {u v : E} : v ∈ (𝕜 ∙ u)ᗮ ↔ ⟪u, v⟫ = 0 := by refine ⟨inner_right_of_mem_orthogonal (mem_span_singleton_self u), ?_⟩ intro hv w hw rw [mem_span_singleton] at hw obtain ⟨c, rfl⟩ := hw simp [inner_smul_left, hv] #align submodule.mem_orthogonal_singleton_iff_inner_right Submodule.mem_orthogonal_singleton_iff_inner_right theorem mem_orthogonal_singleton_iff_inner_left {u v : E} : v ∈ (𝕜 ∙ u)ᗮ ↔ ⟪v, u⟫ = 0 := by rw [mem_orthogonal_singleton_iff_inner_right, inner_eq_zero_symm] #align submodule.mem_orthogonal_singleton_iff_inner_left Submodule.mem_orthogonal_singleton_iff_inner_left theorem sub_mem_orthogonal_of_inner_left {x y : E} (h : ∀ v : K, ⟪x, v⟫ = ⟪y, v⟫) : x - y ∈ Kᗮ := by rw [mem_orthogonal'] intro u hu rw [inner_sub_left, sub_eq_zero] exact h ⟨u, hu⟩ #align submodule.sub_mem_orthogonal_of_inner_left Submodule.sub_mem_orthogonal_of_inner_left theorem sub_mem_orthogonal_of_inner_right {x y : E} (h : ∀ v : K, ⟪(v : E), x⟫ = ⟪(v : E), y⟫) : x - y ∈ Kᗮ := by intro u hu rw [inner_sub_right, sub_eq_zero] exact h ⟨u, hu⟩ #align submodule.sub_mem_orthogonal_of_inner_right Submodule.sub_mem_orthogonal_of_inner_right variable (K)	Mathlib/Analysis/InnerProductSpace/Orthogonal.lean	103	107	theorem inf_orthogonal_eq_bot : K ⊓ Kᗮ = ⊥ := by	rw [eq_bot_iff] intro x rw [mem_inf] exact fun ⟨hx, ho⟩ => inner_self_eq_zero.1 (ho x hx)
import Mathlib.Probability.Variance import Mathlib.MeasureTheory.Function.UniformIntegrable #align_import probability.ident_distrib from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open MeasureTheory Filter Finset noncomputable section open scoped Topology MeasureTheory ENNReal NNReal variable {α β γ δ : Type*} [MeasurableSpace α] [MeasurableSpace β] [MeasurableSpace γ] [MeasurableSpace δ] namespace ProbabilityTheory structure IdentDistrib (f : α → γ) (g : β → γ) (μ : Measure α := by volume_tac) (ν : Measure β := by volume_tac) : Prop where aemeasurable_fst : AEMeasurable f μ aemeasurable_snd : AEMeasurable g ν map_eq : Measure.map f μ = Measure.map g ν #align probability_theory.ident_distrib ProbabilityTheory.IdentDistrib namespace IdentDistrib open TopologicalSpace variable {μ : Measure α} {ν : Measure β} {f : α → γ} {g : β → γ} protected theorem refl (hf : AEMeasurable f μ) : IdentDistrib f f μ μ := { aemeasurable_fst := hf aemeasurable_snd := hf map_eq := rfl } #align probability_theory.ident_distrib.refl ProbabilityTheory.IdentDistrib.refl protected theorem symm (h : IdentDistrib f g μ ν) : IdentDistrib g f ν μ := { aemeasurable_fst := h.aemeasurable_snd aemeasurable_snd := h.aemeasurable_fst map_eq := h.map_eq.symm } #align probability_theory.ident_distrib.symm ProbabilityTheory.IdentDistrib.symm protected theorem trans {ρ : Measure δ} {h : δ → γ} (h₁ : IdentDistrib f g μ ν) (h₂ : IdentDistrib g h ν ρ) : IdentDistrib f h μ ρ := { aemeasurable_fst := h₁.aemeasurable_fst aemeasurable_snd := h₂.aemeasurable_snd map_eq := h₁.map_eq.trans h₂.map_eq } #align probability_theory.ident_distrib.trans ProbabilityTheory.IdentDistrib.trans protected theorem comp_of_aemeasurable {u : γ → δ} (h : IdentDistrib f g μ ν) (hu : AEMeasurable u (Measure.map f μ)) : IdentDistrib (u ∘ f) (u ∘ g) μ ν := { aemeasurable_fst := hu.comp_aemeasurable h.aemeasurable_fst aemeasurable_snd := by rw [h.map_eq] at hu; exact hu.comp_aemeasurable h.aemeasurable_snd map_eq := by rw [← AEMeasurable.map_map_of_aemeasurable hu h.aemeasurable_fst, ← AEMeasurable.map_map_of_aemeasurable _ h.aemeasurable_snd, h.map_eq] rwa [← h.map_eq] } #align probability_theory.ident_distrib.comp_of_ae_measurable ProbabilityTheory.IdentDistrib.comp_of_aemeasurable protected theorem comp {u : γ → δ} (h : IdentDistrib f g μ ν) (hu : Measurable u) : IdentDistrib (u ∘ f) (u ∘ g) μ ν := h.comp_of_aemeasurable hu.aemeasurable #align probability_theory.ident_distrib.comp ProbabilityTheory.IdentDistrib.comp protected theorem of_ae_eq {g : α → γ} (hf : AEMeasurable f μ) (heq : f =ᵐ[μ] g) : IdentDistrib f g μ μ := { aemeasurable_fst := hf aemeasurable_snd := hf.congr heq map_eq := Measure.map_congr heq } #align probability_theory.ident_distrib.of_ae_eq ProbabilityTheory.IdentDistrib.of_ae_eq lemma _root_.MeasureTheory.AEMeasurable.identDistrib_mk (hf : AEMeasurable f μ) : IdentDistrib f (hf.mk f) μ μ := IdentDistrib.of_ae_eq hf hf.ae_eq_mk lemma _root_.MeasureTheory.AEStronglyMeasurable.identDistrib_mk [TopologicalSpace γ] [PseudoMetrizableSpace γ] [BorelSpace γ] (hf : AEStronglyMeasurable f μ) : IdentDistrib f (hf.mk f) μ μ := IdentDistrib.of_ae_eq hf.aemeasurable hf.ae_eq_mk theorem measure_mem_eq (h : IdentDistrib f g μ ν) {s : Set γ} (hs : MeasurableSet s) : μ (f ⁻¹' s) = ν (g ⁻¹' s) := by rw [← Measure.map_apply_of_aemeasurable h.aemeasurable_fst hs, ← Measure.map_apply_of_aemeasurable h.aemeasurable_snd hs, h.map_eq] #align probability_theory.ident_distrib.measure_mem_eq ProbabilityTheory.IdentDistrib.measure_mem_eq alias measure_preimage_eq := measure_mem_eq #align probability_theory.ident_distrib.measure_preimage_eq ProbabilityTheory.IdentDistrib.measure_preimage_eq theorem ae_snd (h : IdentDistrib f g μ ν) {p : γ → Prop} (pmeas : MeasurableSet {x \| p x}) (hp : ∀ᵐ x ∂μ, p (f x)) : ∀ᵐ x ∂ν, p (g x) := by apply (ae_map_iff h.aemeasurable_snd pmeas).1 rw [← h.map_eq] exact (ae_map_iff h.aemeasurable_fst pmeas).2 hp #align probability_theory.ident_distrib.ae_snd ProbabilityTheory.IdentDistrib.ae_snd theorem ae_mem_snd (h : IdentDistrib f g μ ν) {t : Set γ} (tmeas : MeasurableSet t) (ht : ∀ᵐ x ∂μ, f x ∈ t) : ∀ᵐ x ∂ν, g x ∈ t := h.ae_snd tmeas ht #align probability_theory.ident_distrib.ae_mem_snd ProbabilityTheory.IdentDistrib.ae_mem_snd theorem aestronglyMeasurable_fst [TopologicalSpace γ] [MetrizableSpace γ] [OpensMeasurableSpace γ] [SecondCountableTopology γ] (h : IdentDistrib f g μ ν) : AEStronglyMeasurable f μ := h.aemeasurable_fst.aestronglyMeasurable #align probability_theory.ident_distrib.ae_strongly_measurable_fst ProbabilityTheory.IdentDistrib.aestronglyMeasurable_fst theorem aestronglyMeasurable_snd [TopologicalSpace γ] [MetrizableSpace γ] [BorelSpace γ] (h : IdentDistrib f g μ ν) (hf : AEStronglyMeasurable f μ) : AEStronglyMeasurable g ν := by refine aestronglyMeasurable_iff_aemeasurable_separable.2 ⟨h.aemeasurable_snd, ?_⟩ rcases (aestronglyMeasurable_iff_aemeasurable_separable.1 hf).2 with ⟨t, t_sep, ht⟩ refine ⟨closure t, t_sep.closure, ?_⟩ apply h.ae_mem_snd isClosed_closure.measurableSet filter_upwards [ht] with x hx using subset_closure hx #align probability_theory.ident_distrib.ae_strongly_measurable_snd ProbabilityTheory.IdentDistrib.aestronglyMeasurable_snd theorem aestronglyMeasurable_iff [TopologicalSpace γ] [MetrizableSpace γ] [BorelSpace γ] (h : IdentDistrib f g μ ν) : AEStronglyMeasurable f μ ↔ AEStronglyMeasurable g ν := ⟨fun hf => h.aestronglyMeasurable_snd hf, fun hg => h.symm.aestronglyMeasurable_snd hg⟩ #align probability_theory.ident_distrib.ae_strongly_measurable_iff ProbabilityTheory.IdentDistrib.aestronglyMeasurable_iff theorem essSup_eq [ConditionallyCompleteLinearOrder γ] [TopologicalSpace γ] [OpensMeasurableSpace γ] [OrderClosedTopology γ] (h : IdentDistrib f g μ ν) : essSup f μ = essSup g ν := by have I : ∀ a, μ {x : α \| a < f x} = ν {x : β \| a < g x} := fun a => h.measure_mem_eq measurableSet_Ioi simp_rw [essSup_eq_sInf, I] #align probability_theory.ident_distrib.ess_sup_eq ProbabilityTheory.IdentDistrib.essSup_eq theorem lintegral_eq {f : α → ℝ≥0∞} {g : β → ℝ≥0∞} (h : IdentDistrib f g μ ν) : ∫⁻ x, f x ∂μ = ∫⁻ x, g x ∂ν := by change ∫⁻ x, id (f x) ∂μ = ∫⁻ x, id (g x) ∂ν rw [← lintegral_map' aemeasurable_id h.aemeasurable_fst, ← lintegral_map' aemeasurable_id h.aemeasurable_snd, h.map_eq] #align probability_theory.ident_distrib.lintegral_eq ProbabilityTheory.IdentDistrib.lintegral_eq theorem integral_eq [NormedAddCommGroup γ] [NormedSpace ℝ γ] [BorelSpace γ] (h : IdentDistrib f g μ ν) : ∫ x, f x ∂μ = ∫ x, g x ∂ν := by by_cases hf : AEStronglyMeasurable f μ · have A : AEStronglyMeasurable id (Measure.map f μ) := by rw [aestronglyMeasurable_iff_aemeasurable_separable] rcases (aestronglyMeasurable_iff_aemeasurable_separable.1 hf).2 with ⟨t, t_sep, ht⟩ refine ⟨aemeasurable_id, ⟨closure t, t_sep.closure, ?_⟩⟩ rw [ae_map_iff h.aemeasurable_fst] · filter_upwards [ht] with x hx using subset_closure hx · exact isClosed_closure.measurableSet change ∫ x, id (f x) ∂μ = ∫ x, id (g x) ∂ν rw [← integral_map h.aemeasurable_fst A] rw [h.map_eq] at A rw [← integral_map h.aemeasurable_snd A, h.map_eq] · rw [integral_non_aestronglyMeasurable hf] rw [h.aestronglyMeasurable_iff] at hf rw [integral_non_aestronglyMeasurable hf] #align probability_theory.ident_distrib.integral_eq ProbabilityTheory.IdentDistrib.integral_eq	Mathlib/Probability/IdentDistrib.lean	209	221	theorem snorm_eq [NormedAddCommGroup γ] [OpensMeasurableSpace γ] (h : IdentDistrib f g μ ν) (p : ℝ≥0∞) : snorm f p μ = snorm g p ν := by	by_cases h0 : p = 0 · simp [h0] by_cases h_top : p = ∞ · simp only [h_top, snorm, snormEssSup, ENNReal.top_ne_zero, eq_self_iff_true, if_true, if_false] apply essSup_eq exact h.comp (measurable_coe_nnreal_ennreal.comp measurable_nnnorm) simp only [snorm_eq_snorm' h0 h_top, snorm', one_div] congr 1 apply lintegral_eq exact h.comp (Measurable.pow_const (measurable_coe_nnreal_ennreal.comp measurable_nnnorm) p.toReal)
import Mathlib.Algebra.Algebra.Defs import Mathlib.Algebra.Polynomial.FieldDivision import Mathlib.FieldTheory.Minpoly.Basic import Mathlib.RingTheory.Adjoin.Basic import Mathlib.RingTheory.FinitePresentation import Mathlib.RingTheory.FiniteType import Mathlib.RingTheory.PowerBasis import Mathlib.RingTheory.PrincipalIdealDomain import Mathlib.RingTheory.QuotientNoetherian #align_import ring_theory.adjoin_root from "leanprover-community/mathlib"@"5c4b3d41a84bd2a1d79c7d9265e58a891e71be89" noncomputable section open scoped Classical open Polynomial universe u v w variable {R : Type u} {S : Type v} {K : Type w} open Polynomial Ideal def AdjoinRoot [CommRing R] (f : R[X]) : Type u := Polynomial R ⧸ (span {f} : Ideal R[X]) #align adjoin_root AdjoinRoot namespace AdjoinRoot section CommRing variable [CommRing R] (f : R[X]) instance instCommRing : CommRing (AdjoinRoot f) := Ideal.Quotient.commRing _ #align adjoin_root.comm_ring AdjoinRoot.instCommRing instance : Inhabited (AdjoinRoot f) := ⟨0⟩ instance : DecidableEq (AdjoinRoot f) := Classical.decEq _ protected theorem nontrivial [IsDomain R] (h : degree f ≠ 0) : Nontrivial (AdjoinRoot f) := Ideal.Quotient.nontrivial (by simp_rw [Ne, span_singleton_eq_top, Polynomial.isUnit_iff, not_exists, not_and] rintro x hx rfl exact h (degree_C hx.ne_zero)) #align adjoin_root.nontrivial AdjoinRoot.nontrivial def mk : R[X] →+* AdjoinRoot f := Ideal.Quotient.mk _ #align adjoin_root.mk AdjoinRoot.mk @[elab_as_elim] theorem induction_on {C : AdjoinRoot f → Prop} (x : AdjoinRoot f) (ih : ∀ p : R[X], C (mk f p)) : C x := Quotient.inductionOn' x ih #align adjoin_root.induction_on AdjoinRoot.induction_on def of : R →+* AdjoinRoot f := (mk f).comp C #align adjoin_root.of AdjoinRoot.of instance instSMulAdjoinRoot [DistribSMul S R] [IsScalarTower S R R] : SMul S (AdjoinRoot f) := Submodule.Quotient.instSMul' _ instance [DistribSMul S R] [IsScalarTower S R R] : DistribSMul S (AdjoinRoot f) := Submodule.Quotient.distribSMul' _ @[simp] theorem smul_mk [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R[X]) : a • mk f x = mk f (a • x) := rfl #align adjoin_root.smul_mk AdjoinRoot.smul_mk theorem smul_of [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R) : a • of f x = of f (a • x) := by rw [of, RingHom.comp_apply, RingHom.comp_apply, smul_mk, smul_C] #align adjoin_root.smul_of AdjoinRoot.smul_of instance (R₁ R₂ : Type) [SMul R₁ R₂] [DistribSMul R₁ R] [DistribSMul R₂ R] [IsScalarTower R₁ R R] [IsScalarTower R₂ R R] [IsScalarTower R₁ R₂ R] (f : R[X]) : IsScalarTower R₁ R₂ (AdjoinRoot f) := Submodule.Quotient.isScalarTower _ _ instance (R₁ R₂ : Type) [DistribSMul R₁ R] [DistribSMul R₂ R] [IsScalarTower R₁ R R] [IsScalarTower R₂ R R] [SMulCommClass R₁ R₂ R] (f : R[X]) : SMulCommClass R₁ R₂ (AdjoinRoot f) := Submodule.Quotient.smulCommClass _ _ instance isScalarTower_right [DistribSMul S R] [IsScalarTower S R R] : IsScalarTower S (AdjoinRoot f) (AdjoinRoot f) := Ideal.Quotient.isScalarTower_right #align adjoin_root.is_scalar_tower_right AdjoinRoot.isScalarTower_right instance [Monoid S] [DistribMulAction S R] [IsScalarTower S R R] (f : R[X]) : DistribMulAction S (AdjoinRoot f) := Submodule.Quotient.distribMulAction' _ instance [CommSemiring S] [Algebra S R] : Algebra S (AdjoinRoot f) := Ideal.Quotient.algebra S @[simp] theorem algebraMap_eq : algebraMap R (AdjoinRoot f) = of f := rfl #align adjoin_root.algebra_map_eq AdjoinRoot.algebraMap_eq variable (S) theorem algebraMap_eq' [CommSemiring S] [Algebra S R] : algebraMap S (AdjoinRoot f) = (of f).comp (algebraMap S R) := rfl #align adjoin_root.algebra_map_eq' AdjoinRoot.algebraMap_eq' variable {S} theorem finiteType : Algebra.FiniteType R (AdjoinRoot f) := (Algebra.FiniteType.polynomial R).of_surjective _ (Ideal.Quotient.mkₐ_surjective R _) #align adjoin_root.finite_type AdjoinRoot.finiteType theorem finitePresentation : Algebra.FinitePresentation R (AdjoinRoot f) := (Algebra.FinitePresentation.polynomial R).quotient (Submodule.fg_span_singleton f) #align adjoin_root.finite_presentation AdjoinRoot.finitePresentation def root : AdjoinRoot f := mk f X #align adjoin_root.root AdjoinRoot.root variable {f} instance hasCoeT : CoeTC R (AdjoinRoot f) := ⟨of f⟩ #align adjoin_root.has_coe_t AdjoinRoot.hasCoeT @[ext] theorem algHom_ext [Semiring S] [Algebra R S] {g₁ g₂ : AdjoinRoot f →ₐ[R] S} (h : g₁ (root f) = g₂ (root f)) : g₁ = g₂ := Ideal.Quotient.algHom_ext R <\| Polynomial.algHom_ext h #align adjoin_root.alg_hom_ext AdjoinRoot.algHom_ext @[simp] theorem mk_eq_mk {g h : R[X]} : mk f g = mk f h ↔ f ∣ g - h := Ideal.Quotient.eq.trans Ideal.mem_span_singleton #align adjoin_root.mk_eq_mk AdjoinRoot.mk_eq_mk @[simp] theorem mk_eq_zero {g : R[X]} : mk f g = 0 ↔ f ∣ g := mk_eq_mk.trans <\| by rw [sub_zero] #align adjoin_root.mk_eq_zero AdjoinRoot.mk_eq_zero @[simp] theorem mk_self : mk f f = 0 := Quotient.sound' <\| QuotientAddGroup.leftRel_apply.mpr (mem_span_singleton.2 <\| by simp) #align adjoin_root.mk_self AdjoinRoot.mk_self @[simp] theorem mk_C (x : R) : mk f (C x) = x := rfl set_option linter.uppercaseLean3 false in #align adjoin_root.mk_C AdjoinRoot.mk_C @[simp] theorem mk_X : mk f X = root f := rfl set_option linter.uppercaseLean3 false in #align adjoin_root.mk_X AdjoinRoot.mk_X theorem mk_ne_zero_of_degree_lt (hf : Monic f) {g : R[X]} (h0 : g ≠ 0) (hd : degree g < degree f) : mk f g ≠ 0 := mk_eq_zero.not.2 <\| hf.not_dvd_of_degree_lt h0 hd #align adjoin_root.mk_ne_zero_of_degree_lt AdjoinRoot.mk_ne_zero_of_degree_lt theorem mk_ne_zero_of_natDegree_lt (hf : Monic f) {g : R[X]} (h0 : g ≠ 0) (hd : natDegree g < natDegree f) : mk f g ≠ 0 := mk_eq_zero.not.2 <\| hf.not_dvd_of_natDegree_lt h0 hd #align adjoin_root.mk_ne_zero_of_nat_degree_lt AdjoinRoot.mk_ne_zero_of_natDegree_lt @[simp] theorem aeval_eq (p : R[X]) : aeval (root f) p = mk f p := Polynomial.induction_on p (fun x => by rw [aeval_C] rfl) (fun p q ihp ihq => by rw [AlgHom.map_add, RingHom.map_add, ihp, ihq]) fun n x _ => by rw [AlgHom.map_mul, aeval_C, AlgHom.map_pow, aeval_X, RingHom.map_mul, mk_C, RingHom.map_pow, mk_X] rfl #align adjoin_root.aeval_eq AdjoinRoot.aeval_eq -- Porting note: the following proof was partly in term-mode, but I was not able to fix it. theorem adjoinRoot_eq_top : Algebra.adjoin R ({root f} : Set (AdjoinRoot f)) = ⊤ := by refine Algebra.eq_top_iff.2 fun x => ?_ induction x using AdjoinRoot.induction_on with \| ih p => exact (Algebra.adjoin_singleton_eq_range_aeval R (root f)).symm ▸ ⟨p, aeval_eq p⟩ #align adjoin_root.adjoin_root_eq_top AdjoinRoot.adjoinRoot_eq_top @[simp] theorem eval₂_root (f : R[X]) : f.eval₂ (of f) (root f) = 0 := by rw [← algebraMap_eq, ← aeval_def, aeval_eq, mk_self] #align adjoin_root.eval₂_root AdjoinRoot.eval₂_root theorem isRoot_root (f : R[X]) : IsRoot (f.map (of f)) (root f) := by rw [IsRoot, eval_map, eval₂_root] #align adjoin_root.is_root_root AdjoinRoot.isRoot_root theorem isAlgebraic_root (hf : f ≠ 0) : IsAlgebraic R (root f) := ⟨f, hf, eval₂_root f⟩ #align adjoin_root.is_algebraic_root AdjoinRoot.isAlgebraic_root theorem of.injective_of_degree_ne_zero [IsDomain R] (hf : f.degree ≠ 0) : Function.Injective (AdjoinRoot.of f) := by rw [injective_iff_map_eq_zero] intro p hp rw [AdjoinRoot.of, RingHom.comp_apply, AdjoinRoot.mk_eq_zero] at hp by_cases h : f = 0 · exact C_eq_zero.mp (eq_zero_of_zero_dvd (by rwa [h] at hp)) · contrapose! hf with h_contra rw [← degree_C h_contra] apply le_antisymm (degree_le_of_dvd hp (by rwa [Ne, C_eq_zero])) _ rwa [degree_C h_contra, zero_le_degree_iff] #align adjoin_root.of.injective_of_degree_ne_zero AdjoinRoot.of.injective_of_degree_ne_zero variable [CommRing S] def lift (i : R →+* S) (x : S) (h : f.eval₂ i x = 0) : AdjoinRoot f →+* S := by apply Ideal.Quotient.lift _ (eval₂RingHom i x) intro g H rcases mem_span_singleton.1 H with ⟨y, hy⟩ rw [hy, RingHom.map_mul, coe_eval₂RingHom, h, zero_mul] #align adjoin_root.lift AdjoinRoot.lift variable {i : R →+* S} {a : S} (h : f.eval₂ i a = 0) @[simp] theorem lift_mk (g : R[X]) : lift i a h (mk f g) = g.eval₂ i a := Ideal.Quotient.lift_mk _ _ _ #align adjoin_root.lift_mk AdjoinRoot.lift_mk @[simp]	Mathlib/RingTheory/AdjoinRoot.lean	287	287	theorem lift_root : lift i a h (root f) = a := by	rw [root, lift_mk, eval₂_X]
import Mathlib.Logic.Function.Basic import Mathlib.Logic.Relator import Mathlib.Init.Data.Quot import Mathlib.Tactic.Cases import Mathlib.Tactic.Use import Mathlib.Tactic.MkIffOfInductiveProp import Mathlib.Tactic.SimpRw #align_import logic.relation from "leanprover-community/mathlib"@"3365b20c2ffa7c35e47e5209b89ba9abdddf3ffe" open Function variable {α β γ δ ε ζ : Type*} namespace Relation variable {r : α → α → Prop} {a b c d : α} @[mk_iff ReflTransGen.cases_tail_iff] inductive ReflTransGen (r : α → α → Prop) (a : α) : α → Prop \| refl : ReflTransGen r a a \| tail {b c} : ReflTransGen r a b → r b c → ReflTransGen r a c #align relation.refl_trans_gen Relation.ReflTransGen #align relation.refl_trans_gen.cases_tail_iff Relation.ReflTransGen.cases_tail_iff attribute [refl] ReflTransGen.refl @[mk_iff] inductive ReflGen (r : α → α → Prop) (a : α) : α → Prop \| refl : ReflGen r a a \| single {b} : r a b → ReflGen r a b #align relation.refl_gen Relation.ReflGen #align relation.refl_gen_iff Relation.reflGen_iff @[mk_iff] inductive TransGen (r : α → α → Prop) (a : α) : α → Prop \| single {b} : r a b → TransGen r a b \| tail {b c} : TransGen r a b → r b c → TransGen r a c #align relation.trans_gen Relation.TransGen #align relation.trans_gen_iff Relation.transGen_iff attribute [refl] ReflGen.refl namespace ReflTransGen @[trans]	Mathlib/Logic/Relation.lean	296	299	theorem trans (hab : ReflTransGen r a b) (hbc : ReflTransGen r b c) : ReflTransGen r a c := by	induction hbc with \| refl => assumption \| tail _ hcd hac => exact hac.tail hcd
import Mathlib.Analysis.Complex.RemovableSingularity import Mathlib.Analysis.Calculus.UniformLimitsDeriv import Mathlib.Analysis.NormedSpace.FunctionSeries #align_import analysis.complex.locally_uniform_limit from "leanprover-community/mathlib"@"fe44cd36149e675eb5dec87acc7e8f1d6568e081" open Set Metric MeasureTheory Filter Complex intervalIntegral open scoped Real Topology variable {E ι : Type} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E] {U K : Set ℂ} {z : ℂ} {M r δ : ℝ} {φ : Filter ι} {F : ι → ℂ → E} {f g : ℂ → E} namespace Complex section Cderiv noncomputable def cderiv (r : ℝ) (f : ℂ → E) (z : ℂ) : E := (2 π * I : ℂ)⁻¹ • ∮ w in C(z, r), ((w - z) ^ 2)⁻¹ • f w #align complex.cderiv Complex.cderiv theorem cderiv_eq_deriv (hU : IsOpen U) (hf : DifferentiableOn ℂ f U) (hr : 0 < r) (hzr : closedBall z r ⊆ U) : cderiv r f z = deriv f z := two_pi_I_inv_smul_circleIntegral_sub_sq_inv_smul_of_differentiable hU hzr hf (mem_ball_self hr) #align complex.cderiv_eq_deriv Complex.cderiv_eq_deriv	Mathlib/Analysis/Complex/LocallyUniformLimit.lean	50	64	theorem norm_cderiv_le (hr : 0 < r) (hf : ∀ w ∈ sphere z r, ‖f w‖ ≤ M) : ‖cderiv r f z‖ ≤ M / r := by	have hM : 0 ≤ M := by obtain ⟨w, hw⟩ : (sphere z r).Nonempty := NormedSpace.sphere_nonempty.mpr hr.le exact (norm_nonneg _).trans (hf w hw) have h1 : ∀ w ∈ sphere z r, ‖((w - z) ^ 2)⁻¹ • f w‖ ≤ M / r ^ 2 := by intro w hw simp only [mem_sphere_iff_norm, norm_eq_abs] at hw simp only [norm_smul, inv_mul_eq_div, hw, norm_eq_abs, map_inv₀, Complex.abs_pow] exact div_le_div hM (hf w hw) (sq_pos_of_pos hr) le_rfl have h2 := circleIntegral.norm_integral_le_of_norm_le_const hr.le h1 simp only [cderiv, norm_smul] refine (mul_le_mul le_rfl h2 (norm_nonneg _) (norm_nonneg _)).trans (le_of_eq ?_) field_simp [_root_.abs_of_nonneg Real.pi_pos.le] ring
import Mathlib.CategoryTheory.Extensive import Mathlib.CategoryTheory.Limits.Shapes.KernelPair #align_import category_theory.adhesive from "leanprover-community/mathlib"@"afff1f24a6b68d0077c9d63782a1d093e337758c" namespace CategoryTheory open Limits universe v' u' v u variable {J : Type v'} [Category.{u'} J] {C : Type u} [Category.{v} C] variable {W X Y Z : C} {f : W ⟶ X} {g : W ⟶ Y} {h : X ⟶ Z} {i : Y ⟶ Z} -- This only makes sense when the original diagram is a pushout. @[nolint unusedArguments] def IsPushout.IsVanKampen (_ : IsPushout f g h i) : Prop := ∀ ⦃W' X' Y' Z' : C⦄ (f' : W' ⟶ X') (g' : W' ⟶ Y') (h' : X' ⟶ Z') (i' : Y' ⟶ Z') (αW : W' ⟶ W) (αX : X' ⟶ X) (αY : Y' ⟶ Y) (αZ : Z' ⟶ Z) (_ : IsPullback f' αW αX f) (_ : IsPullback g' αW αY g) (_ : CommSq h' αX αZ h) (_ : CommSq i' αY αZ i) (_ : CommSq f' g' h' i'), IsPushout f' g' h' i' ↔ IsPullback h' αX αZ h ∧ IsPullback i' αY αZ i #align category_theory.is_pushout.is_van_kampen CategoryTheory.IsPushout.IsVanKampen	Mathlib/CategoryTheory/Adhesive.lean	59	63	theorem IsPushout.IsVanKampen.flip {H : IsPushout f g h i} (H' : H.IsVanKampen) : H.flip.IsVanKampen := by	introv W' hf hg hh hi w simpa only [IsPushout.flip_iff, IsPullback.flip_iff, and_comm] using H' g' f' i' h' αW αY αX αZ hg hf hi hh w.flip
import Mathlib.LinearAlgebra.AffineSpace.AffineMap import Mathlib.Tactic.FieldSimp #align_import linear_algebra.affine_space.slope from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" open AffineMap variable {k E PE : Type*} [Field k] [AddCommGroup E] [Module k E] [AddTorsor E PE] def slope (f : k → PE) (a b : k) : E := (b - a)⁻¹ • (f b -ᵥ f a) #align slope slope theorem slope_fun_def (f : k → PE) : slope f = fun a b => (b - a)⁻¹ • (f b -ᵥ f a) := rfl #align slope_fun_def slope_fun_def theorem slope_def_field (f : k → k) (a b : k) : slope f a b = (f b - f a) / (b - a) := (div_eq_inv_mul _ _).symm #align slope_def_field slope_def_field theorem slope_fun_def_field (f : k → k) (a : k) : slope f a = fun b => (f b - f a) / (b - a) := (div_eq_inv_mul _ _).symm #align slope_fun_def_field slope_fun_def_field @[simp] theorem slope_same (f : k → PE) (a : k) : (slope f a a : E) = 0 := by rw [slope, sub_self, inv_zero, zero_smul] #align slope_same slope_same theorem slope_def_module (f : k → E) (a b : k) : slope f a b = (b - a)⁻¹ • (f b - f a) := rfl #align slope_def_module slope_def_module @[simp] theorem sub_smul_slope (f : k → PE) (a b : k) : (b - a) • slope f a b = f b -ᵥ f a := by rcases eq_or_ne a b with (rfl \| hne) · rw [sub_self, zero_smul, vsub_self] · rw [slope, smul_inv_smul₀ (sub_ne_zero.2 hne.symm)] #align sub_smul_slope sub_smul_slope theorem sub_smul_slope_vadd (f : k → PE) (a b : k) : (b - a) • slope f a b +ᵥ f a = f b := by rw [sub_smul_slope, vsub_vadd] #align sub_smul_slope_vadd sub_smul_slope_vadd @[simp] theorem slope_vadd_const (f : k → E) (c : PE) : (slope fun x => f x +ᵥ c) = slope f := by ext a b simp only [slope, vadd_vsub_vadd_cancel_right, vsub_eq_sub] #align slope_vadd_const slope_vadd_const @[simp] theorem slope_sub_smul (f : k → E) {a b : k} (h : a ≠ b) : slope (fun x => (x - a) • f x) a b = f b := by simp [slope, inv_smul_smul₀ (sub_ne_zero.2 h.symm)] #align slope_sub_smul slope_sub_smul	Mathlib/LinearAlgebra/AffineSpace/Slope.lean	78	79	theorem eq_of_slope_eq_zero {f : k → PE} {a b : k} (h : slope f a b = (0 : E)) : f a = f b := by	rw [← sub_smul_slope_vadd f a b, h, smul_zero, zero_vadd]
import Mathlib.Algebra.Order.Ring.Rat import Mathlib.Tactic.NormNum.Inv import Mathlib.Tactic.NormNum.Pow import Mathlib.Util.AtomM set_option autoImplicit true namespace Mathlib.Tactic namespace Ring open Mathlib.Meta Qq NormNum Lean.Meta AtomM open Lean (MetaM Expr mkRawNatLit) def instCommSemiringNat : CommSemiring ℕ := inferInstance def sℕ : Q(CommSemiring ℕ) := q(instCommSemiringNat) -- In this file, we would like to use multi-character auto-implicits. set_option relaxedAutoImplicit true mutual inductive ExBase : ∀ {α : Q(Type u)}, Q(CommSemiring $α) → (e : Q($α)) → Type \| atom (id : ℕ) : ExBase sα e \| sum (_ : ExSum sα e) : ExBase sα e inductive ExProd : ∀ {α : Q(Type u)}, Q(CommSemiring $α) → (e : Q($α)) → Type \| const (value : ℚ) (hyp : Option Expr := none) : ExProd sα e \| mul {α : Q(Type u)} {sα : Q(CommSemiring $α)} {x : Q($α)} {e : Q(ℕ)} {b : Q($α)} : ExBase sα x → ExProd sℕ e → ExProd sα b → ExProd sα q($x ^ $e * $b) inductive ExSum : ∀ {α : Q(Type u)}, Q(CommSemiring $α) → (e : Q($α)) → Type \| zero {α : Q(Type u)} {sα : Q(CommSemiring $α)} : ExSum sα q(0 : $α) \| add {α : Q(Type u)} {sα : Q(CommSemiring $α)} {a b : Q($α)} : ExProd sα a → ExSum sα b → ExSum sα q($a + $b) end mutual -- partial only to speed up compilation partial def ExBase.eq : ExBase sα a → ExBase sα b → Bool \| .atom i, .atom j => i == j \| .sum a, .sum b => a.eq b \| _, _ => false @[inherit_doc ExBase.eq] partial def ExProd.eq : ExProd sα a → ExProd sα b → Bool \| .const i _, .const j _ => i == j \| .mul a₁ a₂ a₃, .mul b₁ b₂ b₃ => a₁.eq b₁ && a₂.eq b₂ && a₃.eq b₃ \| _, _ => false @[inherit_doc ExBase.eq] partial def ExSum.eq : ExSum sα a → ExSum sα b → Bool \| .zero, .zero => true \| .add a₁ a₂, .add b₁ b₂ => a₁.eq b₁ && a₂.eq b₂ \| _, _ => false end mutual -- partial only to speed up compilation partial def ExBase.cmp : ExBase sα a → ExBase sα b → Ordering \| .atom i, .atom j => compare i j \| .sum a, .sum b => a.cmp b \| .atom .., .sum .. => .lt \| .sum .., .atom .. => .gt @[inherit_doc ExBase.cmp] partial def ExProd.cmp : ExProd sα a → ExProd sα b → Ordering \| .const i _, .const j _ => compare i j \| .mul a₁ a₂ a₃, .mul b₁ b₂ b₃ => (a₁.cmp b₁).then (a₂.cmp b₂) \|>.then (a₃.cmp b₃) \| .const _ _, .mul .. => .lt \| .mul .., .const _ _ => .gt @[inherit_doc ExBase.cmp] partial def ExSum.cmp : ExSum sα a → ExSum sα b → Ordering \| .zero, .zero => .eq \| .add a₁ a₂, .add b₁ b₂ => (a₁.cmp b₁).then (a₂.cmp b₂) \| .zero, .add .. => .lt \| .add .., .zero => .gt end instance : Inhabited (Σ e, (ExBase sα) e) := ⟨default, .atom 0⟩ instance : Inhabited (Σ e, (ExSum sα) e) := ⟨_, .zero⟩ instance : Inhabited (Σ e, (ExProd sα) e) := ⟨default, .const 0 none⟩ mutual partial def ExBase.cast : ExBase sα a → Σ a, ExBase sβ a \| .atom i => ⟨a, .atom i⟩ \| .sum a => let ⟨_, vb⟩ := a.cast; ⟨_, .sum vb⟩ partial def ExProd.cast : ExProd sα a → Σ a, ExProd sβ a \| .const i h => ⟨a, .const i h⟩ \| .mul a₁ a₂ a₃ => ⟨_, .mul a₁.cast.2 a₂ a₃.cast.2⟩ partial def ExSum.cast : ExSum sα a → Σ a, ExSum sβ a \| .zero => ⟨_, .zero⟩ \| .add a₁ a₂ => ⟨_, .add a₁.cast.2 a₂.cast.2⟩ end structure Result {α : Q(Type u)} (E : Q($α) → Type) (e : Q($α)) where expr : Q($α) val : E expr proof : Q($e = $expr) instance [Inhabited (Σ e, E e)] : Inhabited (Result E e) := let ⟨e', v⟩ : Σ e, E e := default; ⟨e', v, default⟩ variable {α : Q(Type u)} (sα : Q(CommSemiring $α)) [CommSemiring R] def ExProd.mkNat (n : ℕ) : (e : Q($α)) × ExProd sα e := let lit : Q(ℕ) := mkRawNatLit n ⟨q(($lit).rawCast : $α), .const n none⟩ def ExProd.mkNegNat (_ : Q(Ring $α)) (n : ℕ) : (e : Q($α)) × ExProd sα e := let lit : Q(ℕ) := mkRawNatLit n ⟨q((Int.negOfNat $lit).rawCast : $α), .const (-n) none⟩ def ExProd.mkRat (_ : Q(DivisionRing $α)) (q : ℚ) (n : Q(ℤ)) (d : Q(ℕ)) (h : Expr) : (e : Q($α)) × ExProd sα e := ⟨q(Rat.rawCast $n $d : $α), .const q h⟩ section variable {sα} def ExBase.toProd (va : ExBase sα a) (vb : ExProd sℕ b) : ExProd sα q($a ^ $b * (nat_lit 1).rawCast) := .mul va vb (.const 1 none) def ExProd.toSum (v : ExProd sα e) : ExSum sα q($e + 0) := .add v .zero def ExProd.coeff : ExProd sα e → ℚ \| .const q _ => q \| .mul _ _ v => v.coeff end inductive Overlap (e : Q($α)) where \| zero (_ : Q(IsNat $e (nat_lit 0))) \| nonzero (_ : Result (ExProd sα) e) theorem add_overlap_pf (x : R) (e) (pq_pf : a + b = c) : x ^ e * a + x ^ e * b = x ^ e * c := by subst_vars; simp [mul_add] theorem add_overlap_pf_zero (x : R) (e) : IsNat (a + b) (nat_lit 0) → IsNat (x ^ e * a + x ^ e * b) (nat_lit 0) \| ⟨h⟩ => ⟨by simp [h, ← mul_add]⟩ def evalAddOverlap (va : ExProd sα a) (vb : ExProd sα b) : Option (Overlap sα q($a + $b)) := match va, vb with \| .const za ha, .const zb hb => do let ra := Result.ofRawRat za a ha; let rb := Result.ofRawRat zb b hb let res ← NormNum.evalAdd.core q($a + $b) q(HAdd.hAdd) a b ra rb match res with \| .isNat _ (.lit (.natVal 0)) p => pure <\| .zero p \| rc => let ⟨zc, hc⟩ ← rc.toRatNZ let ⟨c, pc⟩ := rc.toRawEq pure <\| .nonzero ⟨c, .const zc hc, pc⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃, .mul vb₁ vb₂ vb₃ => do guard (va₁.eq vb₁ && va₂.eq vb₂) match ← evalAddOverlap va₃ vb₃ with \| .zero p => pure <\| .zero (q(add_overlap_pf_zero $a₁ $a₂ $p) : Expr) \| .nonzero ⟨_, vc, p⟩ => pure <\| .nonzero ⟨_, .mul va₁ va₂ vc, (q(add_overlap_pf $a₁ $a₂ $p) : Expr)⟩ \| _, _ => none theorem add_pf_zero_add (b : R) : 0 + b = b := by simp theorem add_pf_add_zero (a : R) : a + 0 = a := by simp theorem add_pf_add_overlap (_ : a₁ + b₁ = c₁) (_ : a₂ + b₂ = c₂) : (a₁ + a₂ : R) + (b₁ + b₂) = c₁ + c₂ := by subst_vars; simp [add_assoc, add_left_comm] theorem add_pf_add_overlap_zero (h : IsNat (a₁ + b₁) (nat_lit 0)) (h₄ : a₂ + b₂ = c) : (a₁ + a₂ : R) + (b₁ + b₂) = c := by subst_vars; rw [add_add_add_comm, h.1, Nat.cast_zero, add_pf_zero_add] theorem add_pf_add_lt (a₁ : R) (_ : a₂ + b = c) : (a₁ + a₂) + b = a₁ + c := by simp [, add_assoc] theorem add_pf_add_gt (b₁ : R) (_ : a + b₂ = c) : a + (b₁ + b₂) = b₁ + c := by subst_vars; simp [add_left_comm] partial def evalAdd (va : ExSum sα a) (vb : ExSum sα b) : Result (ExSum sα) q($a + $b) := match va, vb with \| .zero, vb => ⟨b, vb, q(add_pf_zero_add $b)⟩ \| va, .zero => ⟨a, va, q(add_pf_add_zero $a)⟩ \| .add (a := a₁) (b := _a₂) va₁ va₂, .add (a := b₁) (b := _b₂) vb₁ vb₂ => match evalAddOverlap sα va₁ vb₁ with \| some (.nonzero ⟨_, vc₁, pc₁⟩) => let ⟨_, vc₂, pc₂⟩ := evalAdd va₂ vb₂ ⟨_, .add vc₁ vc₂, q(add_pf_add_overlap $pc₁ $pc₂)⟩ \| some (.zero pc₁) => let ⟨c₂, vc₂, pc₂⟩ := evalAdd va₂ vb₂ ⟨c₂, vc₂, q(add_pf_add_overlap_zero $pc₁ $pc₂)⟩ \| none => if let .lt := va₁.cmp vb₁ then let ⟨_c, vc, (pc : Q($_a₂ + ($b₁ + $_b₂) = $_c))⟩ := evalAdd va₂ vb ⟨_, .add va₁ vc, q(add_pf_add_lt $a₁ $pc)⟩ else let ⟨_c, vc, (pc : Q($a₁ + $_a₂ + $_b₂ = $_c))⟩ := evalAdd va vb₂ ⟨_, .add vb₁ vc, q(add_pf_add_gt $b₁ $pc)⟩ theorem one_mul (a : R) : (nat_lit 1).rawCast a = a := by simp [Nat.rawCast] theorem mul_one (a : R) : a * (nat_lit 1).rawCast = a := by simp [Nat.rawCast] theorem mul_pf_left (a₁ : R) (a₂) (_ : a₃ * b = c) : (a₁ ^ a₂ * a₃ : R) * b = a₁ ^ a₂ * c := by subst_vars; rw [mul_assoc] theorem mul_pf_right (b₁ : R) (b₂) (_ : a * b₃ = c) : a * (b₁ ^ b₂ * b₃) = b₁ ^ b₂ * c := by subst_vars; rw [mul_left_comm] theorem mul_pp_pf_overlap (x : R) (_ : ea + eb = e) (_ : a₂ * b₂ = c) : (x ^ ea * a₂ : R) * (x ^ eb * b₂) = x ^ e * c := by subst_vars; simp [pow_add, mul_mul_mul_comm] partial def evalMulProd (va : ExProd sα a) (vb : ExProd sα b) : Result (ExProd sα) q($a * $b) := match va, vb with \| .const za ha, .const zb hb => if za = 1 then ⟨b, .const zb hb, (q(one_mul $b) : Expr)⟩ else if zb = 1 then ⟨a, .const za ha, (q(mul_one $a) : Expr)⟩ else let ra := Result.ofRawRat za a ha; let rb := Result.ofRawRat zb b hb let rc := (NormNum.evalMul.core q($a * $b) q(HMul.hMul) _ _ q(CommSemiring.toSemiring) ra rb).get! let ⟨zc, hc⟩ := rc.toRatNZ.get! let ⟨c, pc⟩ := rc.toRawEq ⟨c, .const zc hc, pc⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃, .const _ _ => let ⟨_, vc, pc⟩ := evalMulProd va₃ vb ⟨_, .mul va₁ va₂ vc, (q(mul_pf_left $a₁ $a₂ $pc) : Expr)⟩ \| .const _ _, .mul (x := b₁) (e := b₂) vb₁ vb₂ vb₃ => let ⟨_, vc, pc⟩ := evalMulProd va vb₃ ⟨_, .mul vb₁ vb₂ vc, (q(mul_pf_right $b₁ $b₂ $pc) : Expr)⟩ \| .mul (x := xa) (e := ea) vxa vea va₂, .mul (x := xb) (e := eb) vxb veb vb₂ => Id.run do if vxa.eq vxb then if let some (.nonzero ⟨_, ve, pe⟩) := evalAddOverlap sℕ vea veb then let ⟨_, vc, pc⟩ := evalMulProd va₂ vb₂ return ⟨_, .mul vxa ve vc, (q(mul_pp_pf_overlap $xa $pe $pc) : Expr)⟩ if let .lt := (vxa.cmp vxb).then (vea.cmp veb) then let ⟨_, vc, pc⟩ := evalMulProd va₂ vb ⟨_, .mul vxa vea vc, (q(mul_pf_left $xa $ea $pc) : Expr)⟩ else let ⟨_, vc, pc⟩ := evalMulProd va vb₂ ⟨_, .mul vxb veb vc, (q(mul_pf_right $xb $eb $pc) : Expr)⟩ theorem mul_zero (a : R) : a * 0 = 0 := by simp theorem mul_add (_ : (a : R) * b₁ = c₁) (_ : a * b₂ = c₂) (_ : c₁ + 0 + c₂ = d) : a * (b₁ + b₂) = d := by subst_vars; simp [_root_.mul_add] def evalMul₁ (va : ExProd sα a) (vb : ExSum sα b) : Result (ExSum sα) q($a * $b) := match vb with \| .zero => ⟨_, .zero, q(mul_zero $a)⟩ \| .add vb₁ vb₂ => let ⟨_, vc₁, pc₁⟩ := evalMulProd sα va vb₁ let ⟨_, vc₂, pc₂⟩ := evalMul₁ va vb₂ let ⟨_, vd, pd⟩ := evalAdd sα vc₁.toSum vc₂ ⟨_, vd, q(mul_add $pc₁ $pc₂ $pd)⟩ theorem zero_mul (b : R) : 0 * b = 0 := by simp theorem add_mul (_ : (a₁ : R) * b = c₁) (_ : a₂ * b = c₂) (_ : c₁ + c₂ = d) : (a₁ + a₂) * b = d := by subst_vars; simp [_root_.add_mul] def evalMul (va : ExSum sα a) (vb : ExSum sα b) : Result (ExSum sα) q($a * $b) := match va with \| .zero => ⟨_, .zero, q(zero_mul $b)⟩ \| .add va₁ va₂ => let ⟨_, vc₁, pc₁⟩ := evalMul₁ sα va₁ vb let ⟨_, vc₂, pc₂⟩ := evalMul va₂ vb let ⟨_, vd, pd⟩ := evalAdd sα vc₁ vc₂ ⟨_, vd, q(add_mul $pc₁ $pc₂ $pd)⟩ theorem natCast_nat (n) : ((Nat.rawCast n : ℕ) : R) = Nat.rawCast n := by simp theorem natCast_mul (a₂) (_ : ((a₁ : ℕ) : R) = b₁) (_ : ((a₃ : ℕ) : R) = b₃) : ((a₁ ^ a₂ * a₃ : ℕ) : R) = b₁ ^ a₂ * b₃ := by subst_vars; simp theorem natCast_zero : ((0 : ℕ) : R) = 0 := Nat.cast_zero theorem natCast_add (_ : ((a₁ : ℕ) : R) = b₁) (_ : ((a₂ : ℕ) : R) = b₂) : ((a₁ + a₂ : ℕ) : R) = b₁ + b₂ := by subst_vars; simp mutual partial def ExBase.evalNatCast (va : ExBase sℕ a) : AtomM (Result (ExBase sα) q($a)) := match va with \| .atom _ => do let a' : Q($α) := q($a) let i ← addAtom a' pure ⟨a', ExBase.atom i, (q(Eq.refl $a') : Expr)⟩ \| .sum va => do let ⟨_, vc, p⟩ ← va.evalNatCast pure ⟨_, .sum vc, p⟩ partial def ExProd.evalNatCast (va : ExProd sℕ a) : AtomM (Result (ExProd sα) q($a)) := match va with \| .const c hc => have n : Q(ℕ) := a.appArg! pure ⟨q(Nat.rawCast $n), .const c hc, (q(natCast_nat (R := $α) $n) : Expr)⟩ \| .mul (e := a₂) va₁ va₂ va₃ => do let ⟨_, vb₁, pb₁⟩ ← va₁.evalNatCast let ⟨_, vb₃, pb₃⟩ ← va₃.evalNatCast pure ⟨_, .mul vb₁ va₂ vb₃, q(natCast_mul $a₂ $pb₁ $pb₃)⟩ partial def ExSum.evalNatCast (va : ExSum sℕ a) : AtomM (Result (ExSum sα) q($a)) := match va with \| .zero => pure ⟨_, .zero, q(natCast_zero (R := $α))⟩ \| .add va₁ va₂ => do let ⟨_, vb₁, pb₁⟩ ← va₁.evalNatCast let ⟨_, vb₂, pb₂⟩ ← va₂.evalNatCast pure ⟨_, .add vb₁ vb₂, q(natCast_add $pb₁ $pb₂)⟩ end theorem smul_nat (_ : (a * b : ℕ) = c) : a • b = c := by subst_vars; simp theorem smul_eq_cast (_ : ((a : ℕ) : R) = a') (_ : a' * b = c) : a • b = c := by subst_vars; simp def evalNSMul (va : ExSum sℕ a) (vb : ExSum sα b) : AtomM (Result (ExSum sα) q($a • $b)) := do if ← isDefEq sα sℕ then let ⟨_, va'⟩ := va.cast have _b : Q(ℕ) := b let ⟨(_c : Q(ℕ)), vc, (pc : Q($a * $_b = $_c))⟩ := evalMul sα va' vb pure ⟨_, vc, (q(smul_nat $pc) : Expr)⟩ else let ⟨_, va', pa'⟩ ← va.evalNatCast sα let ⟨_, vc, pc⟩ := evalMul sα va' vb pure ⟨_, vc, (q(smul_eq_cast $pa' $pc) : Expr)⟩ theorem neg_one_mul {R} [Ring R] {a b : R} (_ : (Int.negOfNat (nat_lit 1)).rawCast * a = b) : -a = b := by subst_vars; simp [Int.negOfNat] theorem neg_mul {R} [Ring R] (a₁ : R) (a₂) {a₃ b : R} (_ : -a₃ = b) : -(a₁ ^ a₂ * a₃) = a₁ ^ a₂ * b := by subst_vars; simp def evalNegProd (rα : Q(Ring $α)) (va : ExProd sα a) : Result (ExProd sα) q(-$a) := match va with \| .const za ha => let lit : Q(ℕ) := mkRawNatLit 1 let ⟨m1, _⟩ := ExProd.mkNegNat sα rα 1 let rm := Result.isNegNat rα lit (q(IsInt.of_raw $α (.negOfNat $lit)) : Expr) let ra := Result.ofRawRat za a ha let rb := (NormNum.evalMul.core q($m1 * $a) q(HMul.hMul) _ _ q(CommSemiring.toSemiring) rm ra).get! let ⟨zb, hb⟩ := rb.toRatNZ.get! let ⟨b, (pb : Q((Int.negOfNat (nat_lit 1)).rawCast * $a = $b))⟩ := rb.toRawEq ⟨b, .const zb hb, (q(neg_one_mul (R := $α) $pb) : Expr)⟩ \| .mul (x := a₁) (e := a₂) va₁ va₂ va₃ => let ⟨_, vb, pb⟩ := evalNegProd rα va₃ ⟨_, .mul va₁ va₂ vb, (q(neg_mul $a₁ $a₂ $pb) : Expr)⟩ theorem neg_zero {R} [Ring R] : -(0 : R) = 0 := by simp theorem neg_add {R} [Ring R] {a₁ a₂ b₁ b₂ : R} (_ : -a₁ = b₁) (_ : -a₂ = b₂) : -(a₁ + a₂) = b₁ + b₂ := by subst_vars; simp [add_comm] def evalNeg (rα : Q(Ring $α)) (va : ExSum sα a) : Result (ExSum sα) q(-$a) := match va with \| .zero => ⟨_, .zero, (q(neg_zero (R := $α)) : Expr)⟩ \| .add va₁ va₂ => let ⟨_, vb₁, pb₁⟩ := evalNegProd sα rα va₁ let ⟨_, vb₂, pb₂⟩ := evalNeg rα va₂ ⟨_, .add vb₁ vb₂, (q(neg_add $pb₁ $pb₂) : Expr)⟩ theorem sub_pf {R} [Ring R] {a b c d : R} (_ : -b = c) (_ : a + c = d) : a - b = d := by subst_vars; simp [sub_eq_add_neg] def evalSub (rα : Q(Ring $α)) (va : ExSum sα a) (vb : ExSum sα b) : Result (ExSum sα) q($a - $b) := let ⟨_c, vc, pc⟩ := evalNeg sα rα vb let ⟨d, vd, (pd : Q($a + $_c = $d))⟩ := evalAdd sα va vc ⟨d, vd, (q(sub_pf $pc $pd) : Expr)⟩ theorem pow_prod_atom (a : R) (b) : a ^ b = (a + 0) ^ b * (nat_lit 1).rawCast := by simp def evalPowProdAtom (va : ExProd sα a) (vb : ExProd sℕ b) : Result (ExProd sα) q($a ^ $b) := ⟨_, (ExBase.sum va.toSum).toProd vb, q(pow_prod_atom $a $b)⟩	Mathlib/Tactic/Ring/Basic.lean	598	598	theorem pow_atom (a : R) (b) : a ^ b = a ^ b * (nat_lit 1).rawCast + 0 := by	simp
import Mathlib.Algebra.Periodic import Mathlib.Data.Nat.Count import Mathlib.Data.Nat.GCD.Basic import Mathlib.Order.Interval.Finset.Nat #align_import data.nat.periodic from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" namespace Nat open Nat Function theorem periodic_gcd (a : ℕ) : Periodic (gcd a) a := by simp only [forall_const, gcd_add_self_right, eq_self_iff_true, Periodic] #align nat.periodic_gcd Nat.periodic_gcd theorem periodic_coprime (a : ℕ) : Periodic (Coprime a) a := by simp only [coprime_add_self_right, forall_const, iff_self_iff, eq_iff_iff, Periodic] #align nat.periodic_coprime Nat.periodic_coprime theorem periodic_mod (a : ℕ) : Periodic (fun n => n % a) a := by simp only [forall_const, eq_self_iff_true, add_mod_right, Periodic] #align nat.periodic_mod Nat.periodic_mod theorem _root_.Function.Periodic.map_mod_nat {α : Type*} {f : ℕ → α} {a : ℕ} (hf : Periodic f a) : ∀ n, f (n % a) = f n := fun n => by conv_rhs => rw [← Nat.mod_add_div n a, mul_comm, ← Nat.nsmul_eq_mul, hf.nsmul] #align function.periodic.map_mod_nat Function.Periodic.map_mod_nat section Multiset open Multiset	Mathlib/Data/Nat/Periodic.lean	48	54	theorem filter_multiset_Ico_card_eq_of_periodic (n a : ℕ) (p : ℕ → Prop) [DecidablePred p] (pp : Periodic p a) : card (filter p (Ico n (n + a))) = a.count p := by	rw [count_eq_card_filter_range, Finset.card, Finset.filter_val, Finset.range_val, ← multiset_Ico_map_mod n, ← map_count_True_eq_filter_card, ← map_count_True_eq_filter_card, map_map] congr; funext n exact (Function.Periodic.map_mod_nat pp n).symm
import Mathlib.Topology.Algebra.Module.WeakDual import Mathlib.MeasureTheory.Integral.BoundedContinuousFunction import Mathlib.MeasureTheory.Measure.HasOuterApproxClosed #align_import measure_theory.measure.finite_measure from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" noncomputable section open MeasureTheory open Set open Filter open BoundedContinuousFunction open scoped Topology ENNReal NNReal BoundedContinuousFunction namespace MeasureTheory namespace FiniteMeasure section FiniteMeasure variable {Ω : Type} [MeasurableSpace Ω] def _root_.MeasureTheory.FiniteMeasure (Ω : Type) [MeasurableSpace Ω] : Type _ := { μ : Measure Ω // IsFiniteMeasure μ } #align measure_theory.finite_measure MeasureTheory.FiniteMeasure -- Porting note: as with other subtype synonyms (e.g., `ℝ≥0`, we need a new function for the -- coercion instead of relying on `Subtype.val`. @[coe] def toMeasure : FiniteMeasure Ω → Measure Ω := Subtype.val instance instCoe : Coe (FiniteMeasure Ω) (MeasureTheory.Measure Ω) where coe := toMeasure instance isFiniteMeasure (μ : FiniteMeasure Ω) : IsFiniteMeasure (μ : Measure Ω) := μ.prop #align measure_theory.finite_measure.is_finite_measure MeasureTheory.FiniteMeasure.isFiniteMeasure @[simp] theorem val_eq_toMeasure (ν : FiniteMeasure Ω) : ν.val = (ν : Measure Ω) := rfl #align measure_theory.finite_measure.val_eq_to_measure MeasureTheory.FiniteMeasure.val_eq_toMeasure theorem toMeasure_injective : Function.Injective ((↑) : FiniteMeasure Ω → Measure Ω) := Subtype.coe_injective #align measure_theory.finite_measure.coe_injective MeasureTheory.FiniteMeasure.toMeasure_injective instance instFunLike : FunLike (FiniteMeasure Ω) (Set Ω) ℝ≥0 where coe μ s := ((μ : Measure Ω) s).toNNReal coe_injective' μ ν h := toMeasure_injective $ Measure.ext fun s _ ↦ by simpa [ENNReal.toNNReal_eq_toNNReal_iff, measure_ne_top] using congr_fun h s lemma coeFn_def (μ : FiniteMeasure Ω) : μ = fun s ↦ ((μ : Measure Ω) s).toNNReal := rfl #align measure_theory.finite_measure.coe_fn_eq_to_nnreal_coe_fn_to_measure MeasureTheory.FiniteMeasure.coeFn_def lemma coeFn_mk (μ : Measure Ω) (hμ) : DFunLike.coe (F := FiniteMeasure Ω) ⟨μ, hμ⟩ = fun s ↦ (μ s).toNNReal := rfl @[simp, norm_cast] lemma mk_apply (μ : Measure Ω) (hμ) (s : Set Ω) : DFunLike.coe (F := FiniteMeasure Ω) ⟨μ, hμ⟩ s = (μ s).toNNReal := rfl @[simp] theorem ennreal_coeFn_eq_coeFn_toMeasure (ν : FiniteMeasure Ω) (s : Set Ω) : (ν s : ℝ≥0∞) = (ν : Measure Ω) s := ENNReal.coe_toNNReal (measure_lt_top (↑ν) s).ne #align measure_theory.finite_measure.ennreal_coe_fn_eq_coe_fn_to_measure MeasureTheory.FiniteMeasure.ennreal_coeFn_eq_coeFn_toMeasure theorem apply_mono (μ : FiniteMeasure Ω) {s₁ s₂ : Set Ω} (h : s₁ ⊆ s₂) : μ s₁ ≤ μ s₂ := by change ((μ : Measure Ω) s₁).toNNReal ≤ ((μ : Measure Ω) s₂).toNNReal have key : (μ : Measure Ω) s₁ ≤ (μ : Measure Ω) s₂ := (μ : Measure Ω).mono h apply (ENNReal.toNNReal_le_toNNReal (measure_ne_top _ s₁) (measure_ne_top _ s₂)).mpr key #align measure_theory.finite_measure.apply_mono MeasureTheory.FiniteMeasure.apply_mono def mass (μ : FiniteMeasure Ω) : ℝ≥0 := μ univ #align measure_theory.finite_measure.mass MeasureTheory.FiniteMeasure.mass @[simp] theorem apply_le_mass (μ : FiniteMeasure Ω) (s : Set Ω) : μ s ≤ μ.mass := by simpa using apply_mono μ (subset_univ s) @[simp] theorem ennreal_mass {μ : FiniteMeasure Ω} : (μ.mass : ℝ≥0∞) = (μ : Measure Ω) univ := ennreal_coeFn_eq_coeFn_toMeasure μ Set.univ #align measure_theory.finite_measure.ennreal_mass MeasureTheory.FiniteMeasure.ennreal_mass instance instZero : Zero (FiniteMeasure Ω) where zero := ⟨0, MeasureTheory.isFiniteMeasureZero⟩ #align measure_theory.finite_measure.has_zero MeasureTheory.FiniteMeasure.instZero @[simp, norm_cast] lemma coeFn_zero : ⇑(0 : FiniteMeasure Ω) = 0 := rfl #align measure_theory.finite_measure.coe_fn_zero MeasureTheory.FiniteMeasure.coeFn_zero @[simp] theorem zero_mass : (0 : FiniteMeasure Ω).mass = 0 := rfl #align measure_theory.finite_measure.zero.mass MeasureTheory.FiniteMeasure.zero_mass @[simp] theorem mass_zero_iff (μ : FiniteMeasure Ω) : μ.mass = 0 ↔ μ = 0 := by refine ⟨fun μ_mass => ?_, fun hμ => by simp only [hμ, zero_mass]⟩ apply toMeasure_injective apply Measure.measure_univ_eq_zero.mp rwa [← ennreal_mass, ENNReal.coe_eq_zero] #align measure_theory.finite_measure.mass_zero_iff MeasureTheory.FiniteMeasure.mass_zero_iff theorem mass_nonzero_iff (μ : FiniteMeasure Ω) : μ.mass ≠ 0 ↔ μ ≠ 0 := by rw [not_iff_not] exact FiniteMeasure.mass_zero_iff μ #align measure_theory.finite_measure.mass_nonzero_iff MeasureTheory.FiniteMeasure.mass_nonzero_iff @[ext]	Mathlib/MeasureTheory/Measure/FiniteMeasure.lean	213	217	theorem eq_of_forall_toMeasure_apply_eq (μ ν : FiniteMeasure Ω) (h : ∀ s : Set Ω, MeasurableSet s → (μ : Measure Ω) s = (ν : Measure Ω) s) : μ = ν := by	apply Subtype.ext ext1 s s_mble exact h s s_mble
import Mathlib.Data.Int.Interval import Mathlib.Data.Int.SuccPred import Mathlib.Data.Int.ConditionallyCompleteOrder import Mathlib.Topology.Instances.Discrete import Mathlib.Topology.MetricSpace.Bounded import Mathlib.Order.Filter.Archimedean #align_import topology.instances.int from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" noncomputable section open Metric Set Filter namespace Int instance : Dist ℤ := ⟨fun x y => dist (x : ℝ) y⟩ theorem dist_eq (x y : ℤ) : dist x y = \|(x : ℝ) - y\| := rfl #align int.dist_eq Int.dist_eq theorem dist_eq' (m n : ℤ) : dist m n = \|m - n\| := by rw [dist_eq]; norm_cast @[norm_cast, simp] theorem dist_cast_real (x y : ℤ) : dist (x : ℝ) y = dist x y := rfl #align int.dist_cast_real Int.dist_cast_real	Mathlib/Topology/Instances/Int.lean	41	43	theorem pairwise_one_le_dist : Pairwise fun m n : ℤ => 1 ≤ dist m n := by	intro m n hne rw [dist_eq]; norm_cast; rwa [← zero_add (1 : ℤ), Int.add_one_le_iff, abs_pos, sub_ne_zero]
import Mathlib.Algebra.GroupWithZero.Indicator import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Instances.ENNReal #align_import topology.semicontinuous from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open Topology ENNReal open Set Function Filter variable {α : Type} [TopologicalSpace α] {β : Type} [Preorder β] {f g : α → β} {x : α} {s t : Set α} {y z : β} def LowerSemicontinuousWithinAt (f : α → β) (s : Set α) (x : α) := ∀ y < f x, ∀ᶠ x' in 𝓝[s] x, y < f x' #align lower_semicontinuous_within_at LowerSemicontinuousWithinAt def LowerSemicontinuousOn (f : α → β) (s : Set α) := ∀ x ∈ s, LowerSemicontinuousWithinAt f s x #align lower_semicontinuous_on LowerSemicontinuousOn def LowerSemicontinuousAt (f : α → β) (x : α) := ∀ y < f x, ∀ᶠ x' in 𝓝 x, y < f x' #align lower_semicontinuous_at LowerSemicontinuousAt def LowerSemicontinuous (f : α → β) := ∀ x, LowerSemicontinuousAt f x #align lower_semicontinuous LowerSemicontinuous def UpperSemicontinuousWithinAt (f : α → β) (s : Set α) (x : α) := ∀ y, f x < y → ∀ᶠ x' in 𝓝[s] x, f x' < y #align upper_semicontinuous_within_at UpperSemicontinuousWithinAt def UpperSemicontinuousOn (f : α → β) (s : Set α) := ∀ x ∈ s, UpperSemicontinuousWithinAt f s x #align upper_semicontinuous_on UpperSemicontinuousOn def UpperSemicontinuousAt (f : α → β) (x : α) := ∀ y, f x < y → ∀ᶠ x' in 𝓝 x, f x' < y #align upper_semicontinuous_at UpperSemicontinuousAt def UpperSemicontinuous (f : α → β) := ∀ x, UpperSemicontinuousAt f x #align upper_semicontinuous UpperSemicontinuous theorem LowerSemicontinuousWithinAt.mono (h : LowerSemicontinuousWithinAt f s x) (hst : t ⊆ s) : LowerSemicontinuousWithinAt f t x := fun y hy => Filter.Eventually.filter_mono (nhdsWithin_mono _ hst) (h y hy) #align lower_semicontinuous_within_at.mono LowerSemicontinuousWithinAt.mono theorem lowerSemicontinuousWithinAt_univ_iff : LowerSemicontinuousWithinAt f univ x ↔ LowerSemicontinuousAt f x := by simp [LowerSemicontinuousWithinAt, LowerSemicontinuousAt, nhdsWithin_univ] #align lower_semicontinuous_within_at_univ_iff lowerSemicontinuousWithinAt_univ_iff theorem LowerSemicontinuousAt.lowerSemicontinuousWithinAt (s : Set α) (h : LowerSemicontinuousAt f x) : LowerSemicontinuousWithinAt f s x := fun y hy => Filter.Eventually.filter_mono nhdsWithin_le_nhds (h y hy) #align lower_semicontinuous_at.lower_semicontinuous_within_at LowerSemicontinuousAt.lowerSemicontinuousWithinAt theorem LowerSemicontinuousOn.lowerSemicontinuousWithinAt (h : LowerSemicontinuousOn f s) (hx : x ∈ s) : LowerSemicontinuousWithinAt f s x := h x hx #align lower_semicontinuous_on.lower_semicontinuous_within_at LowerSemicontinuousOn.lowerSemicontinuousWithinAt theorem LowerSemicontinuousOn.mono (h : LowerSemicontinuousOn f s) (hst : t ⊆ s) : LowerSemicontinuousOn f t := fun x hx => (h x (hst hx)).mono hst #align lower_semicontinuous_on.mono LowerSemicontinuousOn.mono theorem lowerSemicontinuousOn_univ_iff : LowerSemicontinuousOn f univ ↔ LowerSemicontinuous f := by simp [LowerSemicontinuousOn, LowerSemicontinuous, lowerSemicontinuousWithinAt_univ_iff] #align lower_semicontinuous_on_univ_iff lowerSemicontinuousOn_univ_iff theorem LowerSemicontinuous.lowerSemicontinuousAt (h : LowerSemicontinuous f) (x : α) : LowerSemicontinuousAt f x := h x #align lower_semicontinuous.lower_semicontinuous_at LowerSemicontinuous.lowerSemicontinuousAt theorem LowerSemicontinuous.lowerSemicontinuousWithinAt (h : LowerSemicontinuous f) (s : Set α) (x : α) : LowerSemicontinuousWithinAt f s x := (h x).lowerSemicontinuousWithinAt s #align lower_semicontinuous.lower_semicontinuous_within_at LowerSemicontinuous.lowerSemicontinuousWithinAt theorem LowerSemicontinuous.lowerSemicontinuousOn (h : LowerSemicontinuous f) (s : Set α) : LowerSemicontinuousOn f s := fun x _hx => h.lowerSemicontinuousWithinAt s x #align lower_semicontinuous.lower_semicontinuous_on LowerSemicontinuous.lowerSemicontinuousOn theorem lowerSemicontinuousWithinAt_const : LowerSemicontinuousWithinAt (fun _x => z) s x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align lower_semicontinuous_within_at_const lowerSemicontinuousWithinAt_const theorem lowerSemicontinuousAt_const : LowerSemicontinuousAt (fun _x => z) x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align lower_semicontinuous_at_const lowerSemicontinuousAt_const theorem lowerSemicontinuousOn_const : LowerSemicontinuousOn (fun _x => z) s := fun _x _hx => lowerSemicontinuousWithinAt_const #align lower_semicontinuous_on_const lowerSemicontinuousOn_const theorem lowerSemicontinuous_const : LowerSemicontinuous fun _x : α => z := fun _x => lowerSemicontinuousAt_const #align lower_semicontinuous_const lowerSemicontinuous_const section variable [Zero β] theorem IsOpen.lowerSemicontinuous_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuous (indicator s fun _x => y) := by intro x z hz by_cases h : x ∈ s <;> simp [h] at hz · filter_upwards [hs.mem_nhds h] simp (config := { contextual := true }) [hz] · refine Filter.eventually_of_forall fun x' => ?_ by_cases h' : x' ∈ s <;> simp [h', hz.trans_le hy, hz] #align is_open.lower_semicontinuous_indicator IsOpen.lowerSemicontinuous_indicator theorem IsOpen.lowerSemicontinuousOn_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousOn (indicator s fun _x => y) t := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousOn t #align is_open.lower_semicontinuous_on_indicator IsOpen.lowerSemicontinuousOn_indicator theorem IsOpen.lowerSemicontinuousAt_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousAt (indicator s fun _x => y) x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousAt x #align is_open.lower_semicontinuous_at_indicator IsOpen.lowerSemicontinuousAt_indicator theorem IsOpen.lowerSemicontinuousWithinAt_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousWithinAt t x #align is_open.lower_semicontinuous_within_at_indicator IsOpen.lowerSemicontinuousWithinAt_indicator theorem IsClosed.lowerSemicontinuous_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuous (indicator s fun _x => y) := by intro x z hz by_cases h : x ∈ s <;> simp [h] at hz · refine Filter.eventually_of_forall fun x' => ?_ by_cases h' : x' ∈ s <;> simp [h', hz, hz.trans_le hy] · filter_upwards [hs.isOpen_compl.mem_nhds h] simp (config := { contextual := true }) [hz] #align is_closed.lower_semicontinuous_indicator IsClosed.lowerSemicontinuous_indicator theorem IsClosed.lowerSemicontinuousOn_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousOn (indicator s fun _x => y) t := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousOn t #align is_closed.lower_semicontinuous_on_indicator IsClosed.lowerSemicontinuousOn_indicator theorem IsClosed.lowerSemicontinuousAt_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousAt (indicator s fun _x => y) x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousAt x #align is_closed.lower_semicontinuous_at_indicator IsClosed.lowerSemicontinuousAt_indicator theorem IsClosed.lowerSemicontinuousWithinAt_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousWithinAt t x #align is_closed.lower_semicontinuous_within_at_indicator IsClosed.lowerSemicontinuousWithinAt_indicator end theorem lowerSemicontinuous_iff_isOpen_preimage : LowerSemicontinuous f ↔ ∀ y, IsOpen (f ⁻¹' Ioi y) := ⟨fun H y => isOpen_iff_mem_nhds.2 fun x hx => H x y hx, fun H _x y y_lt => IsOpen.mem_nhds (H y) y_lt⟩ #align lower_semicontinuous_iff_is_open_preimage lowerSemicontinuous_iff_isOpen_preimage theorem LowerSemicontinuous.isOpen_preimage (hf : LowerSemicontinuous f) (y : β) : IsOpen (f ⁻¹' Ioi y) := lowerSemicontinuous_iff_isOpen_preimage.1 hf y #align lower_semicontinuous.is_open_preimage LowerSemicontinuous.isOpen_preimage section variable {γ : Type} [LinearOrder γ] theorem lowerSemicontinuous_iff_isClosed_preimage {f : α → γ} : LowerSemicontinuous f ↔ ∀ y, IsClosed (f ⁻¹' Iic y) := by rw [lowerSemicontinuous_iff_isOpen_preimage] simp only [← isOpen_compl_iff, ← preimage_compl, compl_Iic] #align lower_semicontinuous_iff_is_closed_preimage lowerSemicontinuous_iff_isClosed_preimage theorem LowerSemicontinuous.isClosed_preimage {f : α → γ} (hf : LowerSemicontinuous f) (y : γ) : IsClosed (f ⁻¹' Iic y) := lowerSemicontinuous_iff_isClosed_preimage.1 hf y #align lower_semicontinuous.is_closed_preimage LowerSemicontinuous.isClosed_preimage variable [TopologicalSpace γ] [OrderTopology γ] theorem ContinuousWithinAt.lowerSemicontinuousWithinAt {f : α → γ} (h : ContinuousWithinAt f s x) : LowerSemicontinuousWithinAt f s x := fun _y hy => h (Ioi_mem_nhds hy) #align continuous_within_at.lower_semicontinuous_within_at ContinuousWithinAt.lowerSemicontinuousWithinAt theorem ContinuousAt.lowerSemicontinuousAt {f : α → γ} (h : ContinuousAt f x) : LowerSemicontinuousAt f x := fun _y hy => h (Ioi_mem_nhds hy) #align continuous_at.lower_semicontinuous_at ContinuousAt.lowerSemicontinuousAt theorem ContinuousOn.lowerSemicontinuousOn {f : α → γ} (h : ContinuousOn f s) : LowerSemicontinuousOn f s := fun x hx => (h x hx).lowerSemicontinuousWithinAt #align continuous_on.lower_semicontinuous_on ContinuousOn.lowerSemicontinuousOn theorem Continuous.lowerSemicontinuous {f : α → γ} (h : Continuous f) : LowerSemicontinuous f := fun _x => h.continuousAt.lowerSemicontinuousAt #align continuous.lower_semicontinuous Continuous.lowerSemicontinuous end section variable {γ : Type} [CompleteLinearOrder γ] [DenselyOrdered γ] theorem lowerSemicontinuousWithinAt_iff_le_liminf {f : α → γ} : LowerSemicontinuousWithinAt f s x ↔ f x ≤ liminf f (𝓝[s] x) := by constructor · intro hf; unfold LowerSemicontinuousWithinAt at hf contrapose! hf obtain ⟨y, lty, ylt⟩ := exists_between hf; use y exact ⟨ylt, fun h => lty.not_le (le_liminf_of_le (by isBoundedDefault) (h.mono fun _ hx => le_of_lt hx))⟩ exact fun hf y ylt => eventually_lt_of_lt_liminf (ylt.trans_le hf) alias ⟨LowerSemicontinuousWithinAt.le_liminf, _⟩ := lowerSemicontinuousWithinAt_iff_le_liminf theorem lowerSemicontinuousAt_iff_le_liminf {f : α → γ} : LowerSemicontinuousAt f x ↔ f x ≤ liminf f (𝓝 x) := by rw [← lowerSemicontinuousWithinAt_univ_iff, lowerSemicontinuousWithinAt_iff_le_liminf, ← nhdsWithin_univ] alias ⟨LowerSemicontinuousAt.le_liminf, _⟩ := lowerSemicontinuousAt_iff_le_liminf theorem lowerSemicontinuous_iff_le_liminf {f : α → γ} : LowerSemicontinuous f ↔ ∀ x, f x ≤ liminf f (𝓝 x) := by simp only [← lowerSemicontinuousAt_iff_le_liminf, LowerSemicontinuous] alias ⟨LowerSemicontinuous.le_liminf, _⟩ := lowerSemicontinuous_iff_le_liminf theorem lowerSemicontinuousOn_iff_le_liminf {f : α → γ} : LowerSemicontinuousOn f s ↔ ∀ x ∈ s, f x ≤ liminf f (𝓝[s] x) := by simp only [← lowerSemicontinuousWithinAt_iff_le_liminf, LowerSemicontinuousOn] alias ⟨LowerSemicontinuousOn.le_liminf, _⟩ := lowerSemicontinuousOn_iff_le_liminf variable [TopologicalSpace γ] [OrderTopology γ] theorem lowerSemicontinuous_iff_isClosed_epigraph {f : α → γ} : LowerSemicontinuous f ↔ IsClosed {p : α × γ \| f p.1 ≤ p.2} := by constructor · rw [lowerSemicontinuous_iff_le_liminf, isClosed_iff_forall_filter] rintro hf ⟨x, y⟩ F F_ne h h' rw [nhds_prod_eq, le_prod] at h' calc f x ≤ liminf f (𝓝 x) := hf x _ ≤ liminf f (map Prod.fst F) := liminf_le_liminf_of_le h'.1 _ = liminf (f ∘ Prod.fst) F := (Filter.liminf_comp _ _ _).symm _ ≤ liminf Prod.snd F := liminf_le_liminf <\| by simpa using (eventually_principal.2 fun (_ : α × γ) ↦ id).filter_mono h _ = y := h'.2.liminf_eq · rw [lowerSemicontinuous_iff_isClosed_preimage] exact fun hf y ↦ hf.preimage (Continuous.Prod.mk_left y) @[deprecated (since := "2024-03-02")] alias lowerSemicontinuous_iff_IsClosed_epigraph := lowerSemicontinuous_iff_isClosed_epigraph alias ⟨LowerSemicontinuous.isClosed_epigraph, _⟩ := lowerSemicontinuous_iff_isClosed_epigraph @[deprecated (since := "2024-03-02")] alias LowerSemicontinuous.IsClosed_epigraph := LowerSemicontinuous.isClosed_epigraph end section variable {γ : Type} [LinearOrder γ] [TopologicalSpace γ] [OrderTopology γ] variable {δ : Type} [LinearOrder δ] [TopologicalSpace δ] [OrderTopology δ] variable {ι : Type*} [TopologicalSpace ι] theorem ContinuousAt.comp_lowerSemicontinuousWithinAt {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : LowerSemicontinuousWithinAt f s x) (gmon : Monotone g) : LowerSemicontinuousWithinAt (g ∘ f) s x := by intro y hy by_cases h : ∃ l, l < f x · obtain ⟨z, zlt, hz⟩ : ∃ z < f x, Ioc z (f x) ⊆ g ⁻¹' Ioi y := exists_Ioc_subset_of_mem_nhds (hg (Ioi_mem_nhds hy)) h filter_upwards [hf z zlt] with a ha calc y < g (min (f x) (f a)) := hz (by simp [zlt, ha, le_refl]) _ ≤ g (f a) := gmon (min_le_right _ _) · simp only [not_exists, not_lt] at h exact Filter.eventually_of_forall fun a => hy.trans_le (gmon (h (f a))) #align continuous_at.comp_lower_semicontinuous_within_at ContinuousAt.comp_lowerSemicontinuousWithinAt	Mathlib/Topology/Semicontinuous.lean	403	406	theorem ContinuousAt.comp_lowerSemicontinuousAt {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : LowerSemicontinuousAt f x) (gmon : Monotone g) : LowerSemicontinuousAt (g ∘ f) x := by	simp only [← lowerSemicontinuousWithinAt_univ_iff] at hf ⊢ exact hg.comp_lowerSemicontinuousWithinAt hf gmon
import Mathlib.CategoryTheory.Category.Cat import Mathlib.CategoryTheory.Elements #align_import category_theory.grothendieck from "leanprover-community/mathlib"@"14b69e9f3c16630440a2cbd46f1ddad0d561dee7" universe u namespace CategoryTheory variable {C D : Type*} [Category C] [Category D] variable (F : C ⥤ Cat) -- Porting note(#5171): no such linter yet -- @[nolint has_nonempty_instance] structure Grothendieck where base : C fiber : F.obj base #align category_theory.grothendieck CategoryTheory.Grothendieck namespace Grothendieck variable {F} structure Hom (X Y : Grothendieck F) where base : X.base ⟶ Y.base fiber : (F.map base).obj X.fiber ⟶ Y.fiber #align category_theory.grothendieck.hom CategoryTheory.Grothendieck.Hom @[ext] theorem ext {X Y : Grothendieck F} (f g : Hom X Y) (w_base : f.base = g.base) (w_fiber : eqToHom (by rw [w_base]) ≫ f.fiber = g.fiber) : f = g := by cases f; cases g congr dsimp at w_base aesop_cat #align category_theory.grothendieck.ext CategoryTheory.Grothendieck.ext @[simps] def id (X : Grothendieck F) : Hom X X where base := 𝟙 X.base fiber := eqToHom (by erw [CategoryTheory.Functor.map_id, Functor.id_obj X.fiber]) #align category_theory.grothendieck.id CategoryTheory.Grothendieck.id instance (X : Grothendieck F) : Inhabited (Hom X X) := ⟨id X⟩ @[simps] def comp {X Y Z : Grothendieck F} (f : Hom X Y) (g : Hom Y Z) : Hom X Z where base := f.base ≫ g.base fiber := eqToHom (by erw [Functor.map_comp, Functor.comp_obj]) ≫ (F.map g.base).map f.fiber ≫ g.fiber #align category_theory.grothendieck.comp CategoryTheory.Grothendieck.comp attribute [local simp] eqToHom_map instance : Category (Grothendieck F) where Hom X Y := Grothendieck.Hom X Y id X := Grothendieck.id X comp := @fun X Y Z f g => Grothendieck.comp f g comp_id := @fun X Y f => by dsimp; ext · simp · dsimp rw [← NatIso.naturality_2 (eqToIso (F.map_id Y.base)) f.fiber] simp id_comp := @fun X Y f => by dsimp; ext <;> simp assoc := @fun W X Y Z f g h => by dsimp; ext · simp · dsimp rw [← NatIso.naturality_2 (eqToIso (F.map_comp _ _)) f.fiber] simp @[simp] theorem id_fiber' (X : Grothendieck F) : Hom.fiber (𝟙 X) = eqToHom (by erw [CategoryTheory.Functor.map_id, Functor.id_obj X.fiber]) := id_fiber X #align category_theory.grothendieck.id_fiber' CategoryTheory.Grothendieck.id_fiber'	Mathlib/CategoryTheory/Grothendieck.lean	132	136	theorem congr {X Y : Grothendieck F} {f g : X ⟶ Y} (h : f = g) : f.fiber = eqToHom (by subst h; rfl) ≫ g.fiber := by	subst h dsimp simp
import Mathlib.Topology.UniformSpace.UniformConvergenceTopology #align_import topology.uniform_space.equicontinuity from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" section open UniformSpace Filter Set Uniformity Topology UniformConvergence Function variable {ι κ X X' Y Z α α' β β' γ 𝓕 : Type} [tX : TopologicalSpace X] [tY : TopologicalSpace Y] [tZ : TopologicalSpace Z] [uα : UniformSpace α] [uβ : UniformSpace β] [uγ : UniformSpace γ] def EquicontinuousAt (F : ι → X → α) (x₀ : X) : Prop := ∀ U ∈ 𝓤 α, ∀ᶠ x in 𝓝 x₀, ∀ i, (F i x₀, F i x) ∈ U #align equicontinuous_at EquicontinuousAt protected abbrev Set.EquicontinuousAt (H : Set <\| X → α) (x₀ : X) : Prop := EquicontinuousAt ((↑) : H → X → α) x₀ #align set.equicontinuous_at Set.EquicontinuousAt def EquicontinuousWithinAt (F : ι → X → α) (S : Set X) (x₀ : X) : Prop := ∀ U ∈ 𝓤 α, ∀ᶠ x in 𝓝[S] x₀, ∀ i, (F i x₀, F i x) ∈ U protected abbrev Set.EquicontinuousWithinAt (H : Set <\| X → α) (S : Set X) (x₀ : X) : Prop := EquicontinuousWithinAt ((↑) : H → X → α) S x₀ def Equicontinuous (F : ι → X → α) : Prop := ∀ x₀, EquicontinuousAt F x₀ #align equicontinuous Equicontinuous protected abbrev Set.Equicontinuous (H : Set <\| X → α) : Prop := Equicontinuous ((↑) : H → X → α) #align set.equicontinuous Set.Equicontinuous def EquicontinuousOn (F : ι → X → α) (S : Set X) : Prop := ∀ x₀ ∈ S, EquicontinuousWithinAt F S x₀ protected abbrev Set.EquicontinuousOn (H : Set <\| X → α) (S : Set X) : Prop := EquicontinuousOn ((↑) : H → X → α) S def UniformEquicontinuous (F : ι → β → α) : Prop := ∀ U ∈ 𝓤 α, ∀ᶠ xy : β × β in 𝓤 β, ∀ i, (F i xy.1, F i xy.2) ∈ U #align uniform_equicontinuous UniformEquicontinuous protected abbrev Set.UniformEquicontinuous (H : Set <\| β → α) : Prop := UniformEquicontinuous ((↑) : H → β → α) #align set.uniform_equicontinuous Set.UniformEquicontinuous def UniformEquicontinuousOn (F : ι → β → α) (S : Set β) : Prop := ∀ U ∈ 𝓤 α, ∀ᶠ xy : β × β in 𝓤 β ⊓ 𝓟 (S ×ˢ S), ∀ i, (F i xy.1, F i xy.2) ∈ U protected abbrev Set.UniformEquicontinuousOn (H : Set <\| β → α) (S : Set β) : Prop := UniformEquicontinuousOn ((↑) : H → β → α) S lemma EquicontinuousAt.equicontinuousWithinAt {F : ι → X → α} {x₀ : X} (H : EquicontinuousAt F x₀) (S : Set X) : EquicontinuousWithinAt F S x₀ := fun U hU ↦ (H U hU).filter_mono inf_le_left lemma EquicontinuousWithinAt.mono {F : ι → X → α} {x₀ : X} {S T : Set X} (H : EquicontinuousWithinAt F T x₀) (hST : S ⊆ T) : EquicontinuousWithinAt F S x₀ := fun U hU ↦ (H U hU).filter_mono <\| nhdsWithin_mono x₀ hST @[simp] lemma equicontinuousWithinAt_univ (F : ι → X → α) (x₀ : X) : EquicontinuousWithinAt F univ x₀ ↔ EquicontinuousAt F x₀ := by rw [EquicontinuousWithinAt, EquicontinuousAt, nhdsWithin_univ] lemma equicontinuousAt_restrict_iff (F : ι → X → α) {S : Set X} (x₀ : S) : EquicontinuousAt (S.restrict ∘ F) x₀ ↔ EquicontinuousWithinAt F S x₀ := by simp [EquicontinuousWithinAt, EquicontinuousAt, ← eventually_nhds_subtype_iff] lemma Equicontinuous.equicontinuousOn {F : ι → X → α} (H : Equicontinuous F) (S : Set X) : EquicontinuousOn F S := fun x _ ↦ (H x).equicontinuousWithinAt S lemma EquicontinuousOn.mono {F : ι → X → α} {S T : Set X} (H : EquicontinuousOn F T) (hST : S ⊆ T) : EquicontinuousOn F S := fun x hx ↦ (H x (hST hx)).mono hST lemma equicontinuousOn_univ (F : ι → X → α) : EquicontinuousOn F univ ↔ Equicontinuous F := by simp [EquicontinuousOn, Equicontinuous] lemma equicontinuous_restrict_iff (F : ι → X → α) {S : Set X} : Equicontinuous (S.restrict ∘ F) ↔ EquicontinuousOn F S := by simp [Equicontinuous, EquicontinuousOn, equicontinuousAt_restrict_iff] lemma UniformEquicontinuous.uniformEquicontinuousOn {F : ι → β → α} (H : UniformEquicontinuous F) (S : Set β) : UniformEquicontinuousOn F S := fun U hU ↦ (H U hU).filter_mono inf_le_left lemma UniformEquicontinuousOn.mono {F : ι → β → α} {S T : Set β} (H : UniformEquicontinuousOn F T) (hST : S ⊆ T) : UniformEquicontinuousOn F S := fun U hU ↦ (H U hU).filter_mono <\| by gcongr lemma uniformEquicontinuousOn_univ (F : ι → β → α) : UniformEquicontinuousOn F univ ↔ UniformEquicontinuous F := by simp [UniformEquicontinuousOn, UniformEquicontinuous] lemma uniformEquicontinuous_restrict_iff (F : ι → β → α) {S : Set β} : UniformEquicontinuous (S.restrict ∘ F) ↔ UniformEquicontinuousOn F S := by rw [UniformEquicontinuous, UniformEquicontinuousOn] conv in _ ⊓ _ => rw [← Subtype.range_val (s := S), ← range_prod_map, ← map_comap] rfl @[simp] lemma equicontinuousAt_empty [h : IsEmpty ι] (F : ι → X → α) (x₀ : X) : EquicontinuousAt F x₀ := fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim) @[simp] lemma equicontinuousWithinAt_empty [h : IsEmpty ι] (F : ι → X → α) (S : Set X) (x₀ : X) : EquicontinuousWithinAt F S x₀ := fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim) @[simp] lemma equicontinuous_empty [IsEmpty ι] (F : ι → X → α) : Equicontinuous F := equicontinuousAt_empty F @[simp] lemma equicontinuousOn_empty [IsEmpty ι] (F : ι → X → α) (S : Set X) : EquicontinuousOn F S := fun x₀ _ ↦ equicontinuousWithinAt_empty F S x₀ @[simp] lemma uniformEquicontinuous_empty [h : IsEmpty ι] (F : ι → β → α) : UniformEquicontinuous F := fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim) @[simp] lemma uniformEquicontinuousOn_empty [h : IsEmpty ι] (F : ι → β → α) (S : Set β) : UniformEquicontinuousOn F S := fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim) theorem equicontinuousAt_finite [Finite ι] {F : ι → X → α} {x₀ : X} : EquicontinuousAt F x₀ ↔ ∀ i, ContinuousAt (F i) x₀ := by simp [EquicontinuousAt, ContinuousAt, (nhds_basis_uniformity' (𝓤 α).basis_sets).tendsto_right_iff, UniformSpace.ball, @forall_swap _ ι] theorem equicontinuousWithinAt_finite [Finite ι] {F : ι → X → α} {S : Set X} {x₀ : X} : EquicontinuousWithinAt F S x₀ ↔ ∀ i, ContinuousWithinAt (F i) S x₀ := by simp [EquicontinuousWithinAt, ContinuousWithinAt, (nhds_basis_uniformity' (𝓤 α).basis_sets).tendsto_right_iff, UniformSpace.ball, @forall_swap _ ι] theorem equicontinuous_finite [Finite ι] {F : ι → X → α} : Equicontinuous F ↔ ∀ i, Continuous (F i) := by simp only [Equicontinuous, equicontinuousAt_finite, continuous_iff_continuousAt, @forall_swap ι] theorem equicontinuousOn_finite [Finite ι] {F : ι → X → α} {S : Set X} : EquicontinuousOn F S ↔ ∀ i, ContinuousOn (F i) S := by simp only [EquicontinuousOn, equicontinuousWithinAt_finite, ContinuousOn, @forall_swap ι] theorem uniformEquicontinuous_finite [Finite ι] {F : ι → β → α} : UniformEquicontinuous F ↔ ∀ i, UniformContinuous (F i) := by simp only [UniformEquicontinuous, eventually_all, @forall_swap _ ι]; rfl theorem uniformEquicontinuousOn_finite [Finite ι] {F : ι → β → α} {S : Set β} : UniformEquicontinuousOn F S ↔ ∀ i, UniformContinuousOn (F i) S := by simp only [UniformEquicontinuousOn, eventually_all, @forall_swap _ ι]; rfl theorem equicontinuousAt_unique [Unique ι] {F : ι → X → α} {x : X} : EquicontinuousAt F x ↔ ContinuousAt (F default) x := equicontinuousAt_finite.trans Unique.forall_iff theorem equicontinuousWithinAt_unique [Unique ι] {F : ι → X → α} {S : Set X} {x : X} : EquicontinuousWithinAt F S x ↔ ContinuousWithinAt (F default) S x := equicontinuousWithinAt_finite.trans Unique.forall_iff theorem equicontinuous_unique [Unique ι] {F : ι → X → α} : Equicontinuous F ↔ Continuous (F default) := equicontinuous_finite.trans Unique.forall_iff theorem equicontinuousOn_unique [Unique ι] {F : ι → X → α} {S : Set X} : EquicontinuousOn F S ↔ ContinuousOn (F default) S := equicontinuousOn_finite.trans Unique.forall_iff theorem uniformEquicontinuous_unique [Unique ι] {F : ι → β → α} : UniformEquicontinuous F ↔ UniformContinuous (F default) := uniformEquicontinuous_finite.trans Unique.forall_iff theorem uniformEquicontinuousOn_unique [Unique ι] {F : ι → β → α} {S : Set β} : UniformEquicontinuousOn F S ↔ UniformContinuousOn (F default) S := uniformEquicontinuousOn_finite.trans Unique.forall_iff theorem equicontinuousWithinAt_iff_pair {F : ι → X → α} {S : Set X} {x₀ : X} (hx₀ : x₀ ∈ S) : EquicontinuousWithinAt F S x₀ ↔ ∀ U ∈ 𝓤 α, ∃ V ∈ 𝓝[S] x₀, ∀ x ∈ V, ∀ y ∈ V, ∀ i, (F i x, F i y) ∈ U := by constructor <;> intro H U hU · rcases comp_symm_mem_uniformity_sets hU with ⟨V, hV, hVsymm, hVU⟩ refine ⟨_, H V hV, fun x hx y hy i => hVU (prod_mk_mem_compRel ?_ (hy i))⟩ exact hVsymm.mk_mem_comm.mp (hx i) · rcases H U hU with ⟨V, hV, hVU⟩ filter_upwards [hV] using fun x hx i => hVU x₀ (mem_of_mem_nhdsWithin hx₀ hV) x hx i theorem equicontinuousAt_iff_pair {F : ι → X → α} {x₀ : X} : EquicontinuousAt F x₀ ↔ ∀ U ∈ 𝓤 α, ∃ V ∈ 𝓝 x₀, ∀ x ∈ V, ∀ y ∈ V, ∀ i, (F i x, F i y) ∈ U := by simp_rw [← equicontinuousWithinAt_univ, equicontinuousWithinAt_iff_pair (mem_univ x₀), nhdsWithin_univ] #align equicontinuous_at_iff_pair equicontinuousAt_iff_pair theorem UniformEquicontinuous.equicontinuous {F : ι → β → α} (h : UniformEquicontinuous F) : Equicontinuous F := fun x₀ U hU ↦ mem_of_superset (ball_mem_nhds x₀ (h U hU)) fun _ hx i ↦ hx i #align uniform_equicontinuous.equicontinuous UniformEquicontinuous.equicontinuous theorem UniformEquicontinuousOn.equicontinuousOn {F : ι → β → α} {S : Set β} (h : UniformEquicontinuousOn F S) : EquicontinuousOn F S := fun _ hx₀ U hU ↦ mem_of_superset (ball_mem_nhdsWithin hx₀ (h U hU)) fun _ hx i ↦ hx i theorem EquicontinuousAt.continuousAt {F : ι → X → α} {x₀ : X} (h : EquicontinuousAt F x₀) (i : ι) : ContinuousAt (F i) x₀ := (UniformSpace.hasBasis_nhds _).tendsto_right_iff.2 fun U ⟨hU, _⟩ ↦ (h U hU).mono fun _x hx ↦ hx i #align equicontinuous_at.continuous_at EquicontinuousAt.continuousAt theorem EquicontinuousWithinAt.continuousWithinAt {F : ι → X → α} {S : Set X} {x₀ : X} (h : EquicontinuousWithinAt F S x₀) (i : ι) : ContinuousWithinAt (F i) S x₀ := (UniformSpace.hasBasis_nhds _).tendsto_right_iff.2 fun U ⟨hU, _⟩ ↦ (h U hU).mono fun _x hx ↦ hx i protected theorem Set.EquicontinuousAt.continuousAt_of_mem {H : Set <\| X → α} {x₀ : X} (h : H.EquicontinuousAt x₀) {f : X → α} (hf : f ∈ H) : ContinuousAt f x₀ := h.continuousAt ⟨f, hf⟩ #align set.equicontinuous_at.continuous_at_of_mem Set.EquicontinuousAt.continuousAt_of_mem protected theorem Set.EquicontinuousWithinAt.continuousWithinAt_of_mem {H : Set <\| X → α} {S : Set X} {x₀ : X} (h : H.EquicontinuousWithinAt S x₀) {f : X → α} (hf : f ∈ H) : ContinuousWithinAt f S x₀ := h.continuousWithinAt ⟨f, hf⟩ theorem Equicontinuous.continuous {F : ι → X → α} (h : Equicontinuous F) (i : ι) : Continuous (F i) := continuous_iff_continuousAt.mpr fun x => (h x).continuousAt i #align equicontinuous.continuous Equicontinuous.continuous theorem EquicontinuousOn.continuousOn {F : ι → X → α} {S : Set X} (h : EquicontinuousOn F S) (i : ι) : ContinuousOn (F i) S := fun x hx ↦ (h x hx).continuousWithinAt i protected theorem Set.Equicontinuous.continuous_of_mem {H : Set <\| X → α} (h : H.Equicontinuous) {f : X → α} (hf : f ∈ H) : Continuous f := h.continuous ⟨f, hf⟩ #align set.equicontinuous.continuous_of_mem Set.Equicontinuous.continuous_of_mem protected theorem Set.EquicontinuousOn.continuousOn_of_mem {H : Set <\| X → α} {S : Set X} (h : H.EquicontinuousOn S) {f : X → α} (hf : f ∈ H) : ContinuousOn f S := h.continuousOn ⟨f, hf⟩ theorem UniformEquicontinuous.uniformContinuous {F : ι → β → α} (h : UniformEquicontinuous F) (i : ι) : UniformContinuous (F i) := fun U hU => mem_map.mpr (mem_of_superset (h U hU) fun _ hxy => hxy i) #align uniform_equicontinuous.uniform_continuous UniformEquicontinuous.uniformContinuous theorem UniformEquicontinuousOn.uniformContinuousOn {F : ι → β → α} {S : Set β} (h : UniformEquicontinuousOn F S) (i : ι) : UniformContinuousOn (F i) S := fun U hU => mem_map.mpr (mem_of_superset (h U hU) fun _ hxy => hxy i) protected theorem Set.UniformEquicontinuous.uniformContinuous_of_mem {H : Set <\| β → α} (h : H.UniformEquicontinuous) {f : β → α} (hf : f ∈ H) : UniformContinuous f := h.uniformContinuous ⟨f, hf⟩ #align set.uniform_equicontinuous.uniform_continuous_of_mem Set.UniformEquicontinuous.uniformContinuous_of_mem protected theorem Set.UniformEquicontinuousOn.uniformContinuousOn_of_mem {H : Set <\| β → α} {S : Set β} (h : H.UniformEquicontinuousOn S) {f : β → α} (hf : f ∈ H) : UniformContinuousOn f S := h.uniformContinuousOn ⟨f, hf⟩ theorem EquicontinuousAt.comp {F : ι → X → α} {x₀ : X} (h : EquicontinuousAt F x₀) (u : κ → ι) : EquicontinuousAt (F ∘ u) x₀ := fun U hU => (h U hU).mono fun _ H k => H (u k) #align equicontinuous_at.comp EquicontinuousAt.comp theorem EquicontinuousWithinAt.comp {F : ι → X → α} {S : Set X} {x₀ : X} (h : EquicontinuousWithinAt F S x₀) (u : κ → ι) : EquicontinuousWithinAt (F ∘ u) S x₀ := fun U hU ↦ (h U hU).mono fun _ H k => H (u k) protected theorem Set.EquicontinuousAt.mono {H H' : Set <\| X → α} {x₀ : X} (h : H.EquicontinuousAt x₀) (hH : H' ⊆ H) : H'.EquicontinuousAt x₀ := h.comp (inclusion hH) #align set.equicontinuous_at.mono Set.EquicontinuousAt.mono protected theorem Set.EquicontinuousWithinAt.mono {H H' : Set <\| X → α} {S : Set X} {x₀ : X} (h : H.EquicontinuousWithinAt S x₀) (hH : H' ⊆ H) : H'.EquicontinuousWithinAt S x₀ := h.comp (inclusion hH) theorem Equicontinuous.comp {F : ι → X → α} (h : Equicontinuous F) (u : κ → ι) : Equicontinuous (F ∘ u) := fun x => (h x).comp u #align equicontinuous.comp Equicontinuous.comp theorem EquicontinuousOn.comp {F : ι → X → α} {S : Set X} (h : EquicontinuousOn F S) (u : κ → ι) : EquicontinuousOn (F ∘ u) S := fun x hx ↦ (h x hx).comp u protected theorem Set.Equicontinuous.mono {H H' : Set <\| X → α} (h : H.Equicontinuous) (hH : H' ⊆ H) : H'.Equicontinuous := h.comp (inclusion hH) #align set.equicontinuous.mono Set.Equicontinuous.mono protected theorem Set.EquicontinuousOn.mono {H H' : Set <\| X → α} {S : Set X} (h : H.EquicontinuousOn S) (hH : H' ⊆ H) : H'.EquicontinuousOn S := h.comp (inclusion hH) theorem UniformEquicontinuous.comp {F : ι → β → α} (h : UniformEquicontinuous F) (u : κ → ι) : UniformEquicontinuous (F ∘ u) := fun U hU => (h U hU).mono fun _ H k => H (u k) #align uniform_equicontinuous.comp UniformEquicontinuous.comp theorem UniformEquicontinuousOn.comp {F : ι → β → α} {S : Set β} (h : UniformEquicontinuousOn F S) (u : κ → ι) : UniformEquicontinuousOn (F ∘ u) S := fun U hU ↦ (h U hU).mono fun _ H k => H (u k) protected theorem Set.UniformEquicontinuous.mono {H H' : Set <\| β → α} (h : H.UniformEquicontinuous) (hH : H' ⊆ H) : H'.UniformEquicontinuous := h.comp (inclusion hH) #align set.uniform_equicontinuous.mono Set.UniformEquicontinuous.mono protected theorem Set.UniformEquicontinuousOn.mono {H H' : Set <\| β → α} {S : Set β} (h : H.UniformEquicontinuousOn S) (hH : H' ⊆ H) : H'.UniformEquicontinuousOn S := h.comp (inclusion hH) theorem equicontinuousAt_iff_range {F : ι → X → α} {x₀ : X} : EquicontinuousAt F x₀ ↔ EquicontinuousAt ((↑) : range F → X → α) x₀ := by simp only [EquicontinuousAt, forall_subtype_range_iff] #align equicontinuous_at_iff_range equicontinuousAt_iff_range theorem equicontinuousWithinAt_iff_range {F : ι → X → α} {S : Set X} {x₀ : X} : EquicontinuousWithinAt F S x₀ ↔ EquicontinuousWithinAt ((↑) : range F → X → α) S x₀ := by simp only [EquicontinuousWithinAt, forall_subtype_range_iff] theorem equicontinuous_iff_range {F : ι → X → α} : Equicontinuous F ↔ Equicontinuous ((↑) : range F → X → α) := forall_congr' fun _ => equicontinuousAt_iff_range #align equicontinuous_iff_range equicontinuous_iff_range theorem equicontinuousOn_iff_range {F : ι → X → α} {S : Set X} : EquicontinuousOn F S ↔ EquicontinuousOn ((↑) : range F → X → α) S := forall_congr' fun _ ↦ forall_congr' fun _ ↦ equicontinuousWithinAt_iff_range theorem uniformEquicontinuous_iff_range {F : ι → β → α} : UniformEquicontinuous F ↔ UniformEquicontinuous ((↑) : range F → β → α) := ⟨fun h => by rw [← comp_rangeSplitting F]; exact h.comp _, fun h => h.comp (rangeFactorization F)⟩ #align uniform_equicontinuous_at_iff_range uniformEquicontinuous_iff_range theorem uniformEquicontinuousOn_iff_range {F : ι → β → α} {S : Set β} : UniformEquicontinuousOn F S ↔ UniformEquicontinuousOn ((↑) : range F → β → α) S := ⟨fun h => by rw [← comp_rangeSplitting F]; exact h.comp _, fun h => h.comp (rangeFactorization F)⟩ section open UniformFun theorem equicontinuousAt_iff_continuousAt {F : ι → X → α} {x₀ : X} : EquicontinuousAt F x₀ ↔ ContinuousAt (ofFun ∘ Function.swap F : X → ι →ᵤ α) x₀ := by rw [ContinuousAt, (UniformFun.hasBasis_nhds ι α _).tendsto_right_iff] rfl #align equicontinuous_at_iff_continuous_at equicontinuousAt_iff_continuousAt theorem equicontinuousWithinAt_iff_continuousWithinAt {F : ι → X → α} {S : Set X} {x₀ : X} : EquicontinuousWithinAt F S x₀ ↔ ContinuousWithinAt (ofFun ∘ Function.swap F : X → ι →ᵤ α) S x₀ := by rw [ContinuousWithinAt, (UniformFun.hasBasis_nhds ι α _).tendsto_right_iff] rfl theorem equicontinuous_iff_continuous {F : ι → X → α} : Equicontinuous F ↔ Continuous (ofFun ∘ Function.swap F : X → ι →ᵤ α) := by simp_rw [Equicontinuous, continuous_iff_continuousAt, equicontinuousAt_iff_continuousAt] #align equicontinuous_iff_continuous equicontinuous_iff_continuous theorem equicontinuousOn_iff_continuousOn {F : ι → X → α} {S : Set X} : EquicontinuousOn F S ↔ ContinuousOn (ofFun ∘ Function.swap F : X → ι →ᵤ α) S := by simp_rw [EquicontinuousOn, ContinuousOn, equicontinuousWithinAt_iff_continuousWithinAt] theorem uniformEquicontinuous_iff_uniformContinuous {F : ι → β → α} : UniformEquicontinuous F ↔ UniformContinuous (ofFun ∘ Function.swap F : β → ι →ᵤ α) := by rw [UniformContinuous, (UniformFun.hasBasis_uniformity ι α).tendsto_right_iff] rfl #align uniform_equicontinuous_iff_uniform_continuous uniformEquicontinuous_iff_uniformContinuous theorem uniformEquicontinuousOn_iff_uniformContinuousOn {F : ι → β → α} {S : Set β} : UniformEquicontinuousOn F S ↔ UniformContinuousOn (ofFun ∘ Function.swap F : β → ι →ᵤ α) S := by rw [UniformContinuousOn, (UniformFun.hasBasis_uniformity ι α).tendsto_right_iff] rfl theorem equicontinuousWithinAt_iInf_rng {u : κ → UniformSpace α'} {F : ι → X → α'} {S : Set X} {x₀ : X} : EquicontinuousWithinAt (uα := ⨅ k, u k) F S x₀ ↔ ∀ k, EquicontinuousWithinAt (uα := u k) F S x₀ := by simp only [equicontinuousWithinAt_iff_continuousWithinAt (uα := _), topologicalSpace] unfold ContinuousWithinAt rw [UniformFun.iInf_eq, toTopologicalSpace_iInf, nhds_iInf, tendsto_iInf] theorem equicontinuousAt_iInf_rng {u : κ → UniformSpace α'} {F : ι → X → α'} {x₀ : X} : EquicontinuousAt (uα := ⨅ k, u k) F x₀ ↔ ∀ k, EquicontinuousAt (uα := u k) F x₀ := by simp only [← equicontinuousWithinAt_univ (uα := _), equicontinuousWithinAt_iInf_rng] theorem equicontinuous_iInf_rng {u : κ → UniformSpace α'} {F : ι → X → α'} : Equicontinuous (uα := ⨅ k, u k) F ↔ ∀ k, Equicontinuous (uα := u k) F := by simp_rw [equicontinuous_iff_continuous (uα := _), UniformFun.topologicalSpace] rw [UniformFun.iInf_eq, toTopologicalSpace_iInf, continuous_iInf_rng] theorem equicontinuousOn_iInf_rng {u : κ → UniformSpace α'} {F : ι → X → α'} {S : Set X} : EquicontinuousOn (uα := ⨅ k, u k) F S ↔ ∀ k, EquicontinuousOn (uα := u k) F S := by simp_rw [EquicontinuousOn, equicontinuousWithinAt_iInf_rng, @forall_swap _ κ] theorem uniformEquicontinuous_iInf_rng {u : κ → UniformSpace α'} {F : ι → β → α'} : UniformEquicontinuous (uα := ⨅ k, u k) F ↔ ∀ k, UniformEquicontinuous (uα := u k) F := by simp_rw [uniformEquicontinuous_iff_uniformContinuous (uα := _)] rw [UniformFun.iInf_eq, uniformContinuous_iInf_rng] theorem uniformEquicontinuousOn_iInf_rng {u : κ → UniformSpace α'} {F : ι → β → α'} {S : Set β} : UniformEquicontinuousOn (uα := ⨅ k, u k) F S ↔ ∀ k, UniformEquicontinuousOn (uα := u k) F S := by simp_rw [uniformEquicontinuousOn_iff_uniformContinuousOn (uα := _)] unfold UniformContinuousOn rw [UniformFun.iInf_eq, iInf_uniformity, tendsto_iInf] theorem equicontinuousWithinAt_iInf_dom {t : κ → TopologicalSpace X'} {F : ι → X' → α} {S : Set X'} {x₀ : X'} {k : κ} (hk : EquicontinuousWithinAt (tX := t k) F S x₀) : EquicontinuousWithinAt (tX := ⨅ k, t k) F S x₀ := by simp [equicontinuousWithinAt_iff_continuousWithinAt (tX := _)] at hk ⊢ unfold ContinuousWithinAt nhdsWithin at hk ⊢ rw [nhds_iInf] exact hk.mono_left <\| inf_le_inf_right _ <\| iInf_le _ k theorem equicontinuousAt_iInf_dom {t : κ → TopologicalSpace X'} {F : ι → X' → α} {x₀ : X'} {k : κ} (hk : EquicontinuousAt (tX := t k) F x₀) : EquicontinuousAt (tX := ⨅ k, t k) F x₀ := by rw [← equicontinuousWithinAt_univ (tX := _)] at hk ⊢ exact equicontinuousWithinAt_iInf_dom hk theorem equicontinuous_iInf_dom {t : κ → TopologicalSpace X'} {F : ι → X' → α} {k : κ} (hk : Equicontinuous (tX := t k) F) : Equicontinuous (tX := ⨅ k, t k) F := fun x ↦ equicontinuousAt_iInf_dom (hk x) theorem equicontinuousOn_iInf_dom {t : κ → TopologicalSpace X'} {F : ι → X' → α} {S : Set X'} {k : κ} (hk : EquicontinuousOn (tX := t k) F S) : EquicontinuousOn (tX := ⨅ k, t k) F S := fun x hx ↦ equicontinuousWithinAt_iInf_dom (hk x hx) theorem uniformEquicontinuous_iInf_dom {u : κ → UniformSpace β'} {F : ι → β' → α} {k : κ} (hk : UniformEquicontinuous (uβ := u k) F) : UniformEquicontinuous (uβ := ⨅ k, u k) F := by simp_rw [uniformEquicontinuous_iff_uniformContinuous (uβ := _)] at hk ⊢ exact uniformContinuous_iInf_dom hk theorem uniformEquicontinuousOn_iInf_dom {u : κ → UniformSpace β'} {F : ι → β' → α} {S : Set β'} {k : κ} (hk : UniformEquicontinuousOn (uβ := u k) F S) : UniformEquicontinuousOn (uβ := ⨅ k, u k) F S := by simp_rw [uniformEquicontinuousOn_iff_uniformContinuousOn (uβ := _)] at hk ⊢ unfold UniformContinuousOn rw [iInf_uniformity] exact hk.mono_left <\| inf_le_inf_right _ <\| iInf_le _ k theorem Filter.HasBasis.equicontinuousAt_iff_left {p : κ → Prop} {s : κ → Set X} {F : ι → X → α} {x₀ : X} (hX : (𝓝 x₀).HasBasis p s) : EquicontinuousAt F x₀ ↔ ∀ U ∈ 𝓤 α, ∃ k, p k ∧ ∀ x ∈ s k, ∀ i, (F i x₀, F i x) ∈ U := by rw [equicontinuousAt_iff_continuousAt, ContinuousAt, hX.tendsto_iff (UniformFun.hasBasis_nhds ι α _)] rfl #align filter.has_basis.equicontinuous_at_iff_left Filter.HasBasis.equicontinuousAt_iff_left theorem Filter.HasBasis.equicontinuousWithinAt_iff_left {p : κ → Prop} {s : κ → Set X} {F : ι → X → α} {S : Set X} {x₀ : X} (hX : (𝓝[S] x₀).HasBasis p s) : EquicontinuousWithinAt F S x₀ ↔ ∀ U ∈ 𝓤 α, ∃ k, p k ∧ ∀ x ∈ s k, ∀ i, (F i x₀, F i x) ∈ U := by rw [equicontinuousWithinAt_iff_continuousWithinAt, ContinuousWithinAt, hX.tendsto_iff (UniformFun.hasBasis_nhds ι α _)] rfl theorem Filter.HasBasis.equicontinuousAt_iff_right {p : κ → Prop} {s : κ → Set (α × α)} {F : ι → X → α} {x₀ : X} (hα : (𝓤 α).HasBasis p s) : EquicontinuousAt F x₀ ↔ ∀ k, p k → ∀ᶠ x in 𝓝 x₀, ∀ i, (F i x₀, F i x) ∈ s k := by rw [equicontinuousAt_iff_continuousAt, ContinuousAt, (UniformFun.hasBasis_nhds_of_basis ι α _ hα).tendsto_right_iff] rfl #align filter.has_basis.equicontinuous_at_iff_right Filter.HasBasis.equicontinuousAt_iff_right theorem Filter.HasBasis.equicontinuousWithinAt_iff_right {p : κ → Prop} {s : κ → Set (α × α)} {F : ι → X → α} {S : Set X} {x₀ : X} (hα : (𝓤 α).HasBasis p s) : EquicontinuousWithinAt F S x₀ ↔ ∀ k, p k → ∀ᶠ x in 𝓝[S] x₀, ∀ i, (F i x₀, F i x) ∈ s k := by rw [equicontinuousWithinAt_iff_continuousWithinAt, ContinuousWithinAt, (UniformFun.hasBasis_nhds_of_basis ι α _ hα).tendsto_right_iff] rfl theorem Filter.HasBasis.equicontinuousAt_iff {κ₁ κ₂ : Type} {p₁ : κ₁ → Prop} {s₁ : κ₁ → Set X} {p₂ : κ₂ → Prop} {s₂ : κ₂ → Set (α × α)} {F : ι → X → α} {x₀ : X} (hX : (𝓝 x₀).HasBasis p₁ s₁) (hα : (𝓤 α).HasBasis p₂ s₂) : EquicontinuousAt F x₀ ↔ ∀ k₂, p₂ k₂ → ∃ k₁, p₁ k₁ ∧ ∀ x ∈ s₁ k₁, ∀ i, (F i x₀, F i x) ∈ s₂ k₂ := by rw [equicontinuousAt_iff_continuousAt, ContinuousAt, hX.tendsto_iff (UniformFun.hasBasis_nhds_of_basis ι α _ hα)] rfl #align filter.has_basis.equicontinuous_at_iff Filter.HasBasis.equicontinuousAt_iff theorem Filter.HasBasis.equicontinuousWithinAt_iff {κ₁ κ₂ : Type} {p₁ : κ₁ → Prop} {s₁ : κ₁ → Set X} {p₂ : κ₂ → Prop} {s₂ : κ₂ → Set (α × α)} {F : ι → X → α} {S : Set X} {x₀ : X} (hX : (𝓝[S] x₀).HasBasis p₁ s₁) (hα : (𝓤 α).HasBasis p₂ s₂) : EquicontinuousWithinAt F S x₀ ↔ ∀ k₂, p₂ k₂ → ∃ k₁, p₁ k₁ ∧ ∀ x ∈ s₁ k₁, ∀ i, (F i x₀, F i x) ∈ s₂ k₂ := by rw [equicontinuousWithinAt_iff_continuousWithinAt, ContinuousWithinAt, hX.tendsto_iff (UniformFun.hasBasis_nhds_of_basis ι α _ hα)] rfl theorem Filter.HasBasis.uniformEquicontinuous_iff_left {p : κ → Prop} {s : κ → Set (β × β)} {F : ι → β → α} (hβ : (𝓤 β).HasBasis p s) : UniformEquicontinuous F ↔ ∀ U ∈ 𝓤 α, ∃ k, p k ∧ ∀ x y, (x, y) ∈ s k → ∀ i, (F i x, F i y) ∈ U := by rw [uniformEquicontinuous_iff_uniformContinuous, UniformContinuous, hβ.tendsto_iff (UniformFun.hasBasis_uniformity ι α)] simp only [Prod.forall] rfl #align filter.has_basis.uniform_equicontinuous_iff_left Filter.HasBasis.uniformEquicontinuous_iff_left theorem Filter.HasBasis.uniformEquicontinuousOn_iff_left {p : κ → Prop} {s : κ → Set (β × β)} {F : ι → β → α} {S : Set β} (hβ : (𝓤 β ⊓ 𝓟 (S ×ˢ S)).HasBasis p s) : UniformEquicontinuousOn F S ↔ ∀ U ∈ 𝓤 α, ∃ k, p k ∧ ∀ x y, (x, y) ∈ s k → ∀ i, (F i x, F i y) ∈ U := by rw [uniformEquicontinuousOn_iff_uniformContinuousOn, UniformContinuousOn, hβ.tendsto_iff (UniformFun.hasBasis_uniformity ι α)] simp only [Prod.forall] rfl theorem Filter.HasBasis.uniformEquicontinuous_iff_right {p : κ → Prop} {s : κ → Set (α × α)} {F : ι → β → α} (hα : (𝓤 α).HasBasis p s) : UniformEquicontinuous F ↔ ∀ k, p k → ∀ᶠ xy : β × β in 𝓤 β, ∀ i, (F i xy.1, F i xy.2) ∈ s k := by rw [uniformEquicontinuous_iff_uniformContinuous, UniformContinuous, (UniformFun.hasBasis_uniformity_of_basis ι α hα).tendsto_right_iff] rfl #align filter.has_basis.uniform_equicontinuous_iff_right Filter.HasBasis.uniformEquicontinuous_iff_right theorem Filter.HasBasis.uniformEquicontinuousOn_iff_right {p : κ → Prop} {s : κ → Set (α × α)} {F : ι → β → α} {S : Set β} (hα : (𝓤 α).HasBasis p s) : UniformEquicontinuousOn F S ↔ ∀ k, p k → ∀ᶠ xy : β × β in 𝓤 β ⊓ 𝓟 (S ×ˢ S), ∀ i, (F i xy.1, F i xy.2) ∈ s k := by rw [uniformEquicontinuousOn_iff_uniformContinuousOn, UniformContinuousOn, (UniformFun.hasBasis_uniformity_of_basis ι α hα).tendsto_right_iff] rfl theorem Filter.HasBasis.uniformEquicontinuous_iff {κ₁ κ₂ : Type} {p₁ : κ₁ → Prop} {s₁ : κ₁ → Set (β × β)} {p₂ : κ₂ → Prop} {s₂ : κ₂ → Set (α × α)} {F : ι → β → α} (hβ : (𝓤 β).HasBasis p₁ s₁) (hα : (𝓤 α).HasBasis p₂ s₂) : UniformEquicontinuous F ↔ ∀ k₂, p₂ k₂ → ∃ k₁, p₁ k₁ ∧ ∀ x y, (x, y) ∈ s₁ k₁ → ∀ i, (F i x, F i y) ∈ s₂ k₂ := by rw [uniformEquicontinuous_iff_uniformContinuous, UniformContinuous, hβ.tendsto_iff (UniformFun.hasBasis_uniformity_of_basis ι α hα)] simp only [Prod.forall] rfl #align filter.has_basis.uniform_equicontinuous_iff Filter.HasBasis.uniformEquicontinuous_iff theorem Filter.HasBasis.uniformEquicontinuousOn_iff {κ₁ κ₂ : Type*} {p₁ : κ₁ → Prop} {s₁ : κ₁ → Set (β × β)} {p₂ : κ₂ → Prop} {s₂ : κ₂ → Set (α × α)} {F : ι → β → α} {S : Set β} (hβ : (𝓤 β ⊓ 𝓟 (S ×ˢ S)).HasBasis p₁ s₁) (hα : (𝓤 α).HasBasis p₂ s₂) : UniformEquicontinuousOn F S ↔ ∀ k₂, p₂ k₂ → ∃ k₁, p₁ k₁ ∧ ∀ x y, (x, y) ∈ s₁ k₁ → ∀ i, (F i x, F i y) ∈ s₂ k₂ := by rw [uniformEquicontinuousOn_iff_uniformContinuousOn, UniformContinuousOn, hβ.tendsto_iff (UniformFun.hasBasis_uniformity_of_basis ι α hα)] simp only [Prod.forall] rfl theorem UniformInducing.equicontinuousAt_iff {F : ι → X → α} {x₀ : X} {u : α → β} (hu : UniformInducing u) : EquicontinuousAt F x₀ ↔ EquicontinuousAt ((u ∘ ·) ∘ F) x₀ := by have := (UniformFun.postcomp_uniformInducing (α := ι) hu).inducing rw [equicontinuousAt_iff_continuousAt, equicontinuousAt_iff_continuousAt, this.continuousAt_iff] rfl #align uniform_inducing.equicontinuous_at_iff UniformInducing.equicontinuousAt_iff theorem UniformInducing.equicontinuousWithinAt_iff {F : ι → X → α} {S : Set X} {x₀ : X} {u : α → β} (hu : UniformInducing u) : EquicontinuousWithinAt F S x₀ ↔ EquicontinuousWithinAt ((u ∘ ·) ∘ F) S x₀ := by have := (UniformFun.postcomp_uniformInducing (α := ι) hu).inducing simp only [equicontinuousWithinAt_iff_continuousWithinAt, this.continuousWithinAt_iff] rfl theorem UniformInducing.equicontinuous_iff {F : ι → X → α} {u : α → β} (hu : UniformInducing u) : Equicontinuous F ↔ Equicontinuous ((u ∘ ·) ∘ F) := by congrm ∀ x, ?_ rw [hu.equicontinuousAt_iff] #align uniform_inducing.equicontinuous_iff UniformInducing.equicontinuous_iff theorem UniformInducing.equicontinuousOn_iff {F : ι → X → α} {S : Set X} {u : α → β} (hu : UniformInducing u) : EquicontinuousOn F S ↔ EquicontinuousOn ((u ∘ ·) ∘ F) S := by congrm ∀ x ∈ S, ?_ rw [hu.equicontinuousWithinAt_iff] theorem UniformInducing.uniformEquicontinuous_iff {F : ι → β → α} {u : α → γ} (hu : UniformInducing u) : UniformEquicontinuous F ↔ UniformEquicontinuous ((u ∘ ·) ∘ F) := by have := UniformFun.postcomp_uniformInducing (α := ι) hu simp only [uniformEquicontinuous_iff_uniformContinuous, this.uniformContinuous_iff] rfl #align uniform_inducing.uniform_equicontinuous_iff UniformInducing.uniformEquicontinuous_iff	Mathlib/Topology/UniformSpace/Equicontinuity.lean	787	792	theorem UniformInducing.uniformEquicontinuousOn_iff {F : ι → β → α} {S : Set β} {u : α → γ} (hu : UniformInducing u) : UniformEquicontinuousOn F S ↔ UniformEquicontinuousOn ((u ∘ ·) ∘ F) S := by	have := UniformFun.postcomp_uniformInducing (α := ι) hu simp only [uniformEquicontinuousOn_iff_uniformContinuousOn, this.uniformContinuousOn_iff] rfl
import Mathlib.Analysis.Calculus.FDeriv.Add import Mathlib.Analysis.Calculus.FDeriv.Equiv import Mathlib.Analysis.Calculus.FDeriv.Prod import Mathlib.Analysis.Calculus.Monotone import Mathlib.Data.Set.Function import Mathlib.Algebra.Group.Basic import Mathlib.Tactic.WLOG #align_import analysis.bounded_variation from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" open scoped NNReal ENNReal Topology UniformConvergence open Set MeasureTheory Filter -- Porting note: sectioned variables because a `wlog` was broken due to extra variables in context variable {α : Type} [LinearOrder α] {E : Type} [PseudoEMetricSpace E] noncomputable def eVariationOn (f : α → E) (s : Set α) : ℝ≥0∞ := ⨆ p : ℕ × { u : ℕ → α // Monotone u ∧ ∀ i, u i ∈ s }, ∑ i ∈ Finset.range p.1, edist (f (p.2.1 (i + 1))) (f (p.2.1 i)) #align evariation_on eVariationOn def BoundedVariationOn (f : α → E) (s : Set α) := eVariationOn f s ≠ ∞ #align has_bounded_variation_on BoundedVariationOn def LocallyBoundedVariationOn (f : α → E) (s : Set α) := ∀ a b, a ∈ s → b ∈ s → BoundedVariationOn f (s ∩ Icc a b) #align has_locally_bounded_variation_on LocallyBoundedVariationOn namespace eVariationOn theorem nonempty_monotone_mem {s : Set α} (hs : s.Nonempty) : Nonempty { u // Monotone u ∧ ∀ i : ℕ, u i ∈ s } := by obtain ⟨x, hx⟩ := hs exact ⟨⟨fun _ => x, fun i j _ => le_rfl, fun _ => hx⟩⟩ #align evariation_on.nonempty_monotone_mem eVariationOn.nonempty_monotone_mem theorem eq_of_edist_zero_on {f f' : α → E} {s : Set α} (h : ∀ ⦃x⦄, x ∈ s → edist (f x) (f' x) = 0) : eVariationOn f s = eVariationOn f' s := by dsimp only [eVariationOn] congr 1 with p : 1 congr 1 with i : 1 rw [edist_congr_right (h <\| p.snd.prop.2 (i + 1)), edist_congr_left (h <\| p.snd.prop.2 i)] #align evariation_on.eq_of_edist_zero_on eVariationOn.eq_of_edist_zero_on theorem eq_of_eqOn {f f' : α → E} {s : Set α} (h : EqOn f f' s) : eVariationOn f s = eVariationOn f' s := eq_of_edist_zero_on fun x xs => by rw [h xs, edist_self] #align evariation_on.eq_of_eq_on eVariationOn.eq_of_eqOn theorem sum_le (f : α → E) {s : Set α} (n : ℕ) {u : ℕ → α} (hu : Monotone u) (us : ∀ i, u i ∈ s) : (∑ i ∈ Finset.range n, edist (f (u (i + 1))) (f (u i))) ≤ eVariationOn f s := le_iSup_of_le ⟨n, u, hu, us⟩ le_rfl #align evariation_on.sum_le eVariationOn.sum_le theorem sum_le_of_monotoneOn_Icc (f : α → E) {s : Set α} {m n : ℕ} {u : ℕ → α} (hu : MonotoneOn u (Icc m n)) (us : ∀ i ∈ Icc m n, u i ∈ s) : (∑ i ∈ Finset.Ico m n, edist (f (u (i + 1))) (f (u i))) ≤ eVariationOn f s := by rcases le_total n m with hnm \| hmn · simp [Finset.Ico_eq_empty_of_le hnm] let π := projIcc m n hmn let v i := u (π i) calc ∑ i ∈ Finset.Ico m n, edist (f (u (i + 1))) (f (u i)) = ∑ i ∈ Finset.Ico m n, edist (f (v (i + 1))) (f (v i)) := Finset.sum_congr rfl fun i hi ↦ by rw [Finset.mem_Ico] at hi simp only [v, π, projIcc_of_mem hmn ⟨hi.1, hi.2.le⟩, projIcc_of_mem hmn ⟨hi.1.trans i.le_succ, hi.2⟩] _ ≤ ∑ i ∈ Finset.range n, edist (f (v (i + 1))) (f (v i)) := Finset.sum_mono_set _ (Nat.Iio_eq_range ▸ Finset.Ico_subset_Iio_self) _ ≤ eVariationOn f s := sum_le _ _ (fun i j h ↦ hu (π i).2 (π j).2 (monotone_projIcc hmn h)) fun i ↦ us _ (π i).2 #align evariation_on.sum_le_of_monotone_on_Icc eVariationOn.sum_le_of_monotoneOn_Icc theorem sum_le_of_monotoneOn_Iic (f : α → E) {s : Set α} {n : ℕ} {u : ℕ → α} (hu : MonotoneOn u (Iic n)) (us : ∀ i ≤ n, u i ∈ s) : (∑ i ∈ Finset.range n, edist (f (u (i + 1))) (f (u i))) ≤ eVariationOn f s := by simpa using sum_le_of_monotoneOn_Icc f (m := 0) (hu.mono Icc_subset_Iic_self) fun i hi ↦ us i hi.2 #align evariation_on.sum_le_of_monotone_on_Iic eVariationOn.sum_le_of_monotoneOn_Iic theorem mono (f : α → E) {s t : Set α} (hst : t ⊆ s) : eVariationOn f t ≤ eVariationOn f s := by apply iSup_le _ rintro ⟨n, ⟨u, hu, ut⟩⟩ exact sum_le f n hu fun i => hst (ut i) #align evariation_on.mono eVariationOn.mono theorem _root_.BoundedVariationOn.mono {f : α → E} {s : Set α} (h : BoundedVariationOn f s) {t : Set α} (ht : t ⊆ s) : BoundedVariationOn f t := ne_top_of_le_ne_top h (eVariationOn.mono f ht) #align has_bounded_variation_on.mono BoundedVariationOn.mono theorem _root_.BoundedVariationOn.locallyBoundedVariationOn {f : α → E} {s : Set α} (h : BoundedVariationOn f s) : LocallyBoundedVariationOn f s := fun _ _ _ _ => h.mono inter_subset_left #align has_bounded_variation_on.has_locally_bounded_variation_on BoundedVariationOn.locallyBoundedVariationOn	Mathlib/Analysis/BoundedVariation.lean	149	161	theorem edist_le (f : α → E) {s : Set α} {x y : α} (hx : x ∈ s) (hy : y ∈ s) : edist (f x) (f y) ≤ eVariationOn f s := by	wlog hxy : y ≤ x generalizing x y · rw [edist_comm] exact this hy hx (le_of_not_le hxy) let u : ℕ → α := fun n => if n = 0 then y else x have hu : Monotone u := monotone_nat_of_le_succ fun \| 0 => hxy \| (_ + 1) => le_rfl have us : ∀ i, u i ∈ s := fun \| 0 => hy \| (_ + 1) => hx simpa only [Finset.sum_range_one] using sum_le f 1 hu us
import Batteries.Tactic.Alias import Batteries.Data.Nat.Basic namespace Nat @[simp] theorem recAux_zero {motive : Nat → Sort _} (zero : motive 0) (succ : ∀ n, motive n → motive (n+1)) : Nat.recAux zero succ 0 = zero := rfl theorem recAux_succ {motive : Nat → Sort _} (zero : motive 0) (succ : ∀ n, motive n → motive (n+1)) (n) : Nat.recAux zero succ (n+1) = succ n (Nat.recAux zero succ n) := rfl @[simp] theorem recAuxOn_zero {motive : Nat → Sort _} (zero : motive 0) (succ : ∀ n, motive n → motive (n+1)) : Nat.recAuxOn 0 zero succ = zero := rfl theorem recAuxOn_succ {motive : Nat → Sort _} (zero : motive 0) (succ : ∀ n, motive n → motive (n+1)) (n) : Nat.recAuxOn (n+1) zero succ = succ n (Nat.recAuxOn n zero succ) := rfl @[simp] theorem casesAuxOn_zero {motive : Nat → Sort _} (zero : motive 0) (succ : ∀ n, motive (n+1)) : Nat.casesAuxOn 0 zero succ = zero := rfl theorem casesAuxOn_succ {motive : Nat → Sort _} (zero : motive 0) (succ : ∀ n, motive (n+1)) (n) : Nat.casesAuxOn (n+1) zero succ = succ n := rfl theorem strongRec_eq {motive : Nat → Sort _} (ind : ∀ n, (∀ m, m < n → motive m) → motive n) (t : Nat) : Nat.strongRec ind t = ind t fun m _ => Nat.strongRec ind m := by conv => lhs; unfold Nat.strongRec theorem strongRecOn_eq {motive : Nat → Sort _} (ind : ∀ n, (∀ m, m < n → motive m) → motive n) (t : Nat) : Nat.strongRecOn t ind = ind t fun m _ => Nat.strongRecOn m ind := Nat.strongRec_eq .. @[simp] theorem recDiagAux_zero_left {motive : Nat → Nat → Sort _} (zero_left : ∀ n, motive 0 n) (zero_right : ∀ m, motive m 0) (succ_succ : ∀ m n, motive m n → motive (m+1) (n+1)) (n) : Nat.recDiagAux zero_left zero_right succ_succ 0 n = zero_left n := by cases n <;> rfl @[simp] theorem recDiagAux_zero_right {motive : Nat → Nat → Sort _} (zero_left : ∀ n, motive 0 n) (zero_right : ∀ m, motive m 0) (succ_succ : ∀ m n, motive m n → motive (m+1) (n+1)) (m) (h : zero_left 0 = zero_right 0 := by first \| assumption \| trivial) : Nat.recDiagAux zero_left zero_right succ_succ m 0 = zero_right m := by cases m; exact h; rfl theorem recDiagAux_succ_succ {motive : Nat → Nat → Sort _} (zero_left : ∀ n, motive 0 n) (zero_right : ∀ m, motive m 0) (succ_succ : ∀ m n, motive m n → motive (m+1) (n+1)) (m n) : Nat.recDiagAux zero_left zero_right succ_succ (m+1) (n+1) = succ_succ m n (Nat.recDiagAux zero_left zero_right succ_succ m n) := rfl @[simp] theorem recDiag_zero_zero {motive : Nat → Nat → Sort _} (zero_zero : motive 0 0) (zero_succ : ∀ n, motive 0 n → motive 0 (n+1)) (succ_zero : ∀ m, motive m 0 → motive (m+1) 0) (succ_succ : ∀ m n, motive m n → motive (m+1) (n+1)) : Nat.recDiag (motive:=motive) zero_zero zero_succ succ_zero succ_succ 0 0 = zero_zero := rfl	.lake/packages/batteries/Batteries/Data/Nat/Lemmas.lean	74	79	theorem recDiag_zero_succ {motive : Nat → Nat → Sort _} (zero_zero : motive 0 0) (zero_succ : ∀ n, motive 0 n → motive 0 (n+1)) (succ_zero : ∀ m, motive m 0 → motive (m+1) 0) (succ_succ : ∀ m n, motive m n → motive (m+1) (n+1)) (n) : Nat.recDiag zero_zero zero_succ succ_zero succ_succ 0 (n+1) = zero_succ n (Nat.recDiag zero_zero zero_succ succ_zero succ_succ 0 n) := by	simp [Nat.recDiag]; rfl
import Mathlib.MeasureTheory.Integral.Lebesgue #align_import measure_theory.measure.giry_monad from "leanprover-community/mathlib"@"56f4cd1ef396e9fd389b5d8371ee9ad91d163625" noncomputable section open scoped Classical open ENNReal open scoped Classical open Set Filter variable {α β : Type} namespace MeasureTheory namespace Measure variable [MeasurableSpace α] [MeasurableSpace β] instance instMeasurableSpace : MeasurableSpace (Measure α) := ⨆ (s : Set α) (_ : MeasurableSet s), (borel ℝ≥0∞).comap fun μ => μ s #align measure_theory.measure.measurable_space MeasureTheory.Measure.instMeasurableSpace theorem measurable_coe {s : Set α} (hs : MeasurableSet s) : Measurable fun μ : Measure α => μ s := Measurable.of_comap_le <\| le_iSup_of_le s <\| le_iSup_of_le hs <\| le_rfl #align measure_theory.measure.measurable_coe MeasureTheory.Measure.measurable_coe theorem measurable_of_measurable_coe (f : β → Measure α) (h : ∀ (s : Set α), MeasurableSet s → Measurable fun b => f b s) : Measurable f := Measurable.of_le_map <\| iSup₂_le fun s hs => MeasurableSpace.comap_le_iff_le_map.2 <\| by rw [MeasurableSpace.map_comp]; exact h s hs #align measure_theory.measure.measurable_of_measurable_coe MeasureTheory.Measure.measurable_of_measurable_coe instance instMeasurableAdd₂ {α : Type} {m : MeasurableSpace α} : MeasurableAdd₂ (Measure α) := by refine ⟨Measure.measurable_of_measurable_coe _ fun s hs => ?_⟩ simp_rw [Measure.coe_add, Pi.add_apply] refine Measurable.add ?_ ?_ · exact (Measure.measurable_coe hs).comp measurable_fst · exact (Measure.measurable_coe hs).comp measurable_snd #align measure_theory.measure.has_measurable_add₂ MeasureTheory.Measure.instMeasurableAdd₂ theorem measurable_measure {μ : α → Measure β} : Measurable μ ↔ ∀ (s : Set β), MeasurableSet s → Measurable fun b => μ b s := ⟨fun hμ _s hs => (measurable_coe hs).comp hμ, measurable_of_measurable_coe μ⟩ #align measure_theory.measure.measurable_measure MeasureTheory.Measure.measurable_measure theorem measurable_map (f : α → β) (hf : Measurable f) : Measurable fun μ : Measure α => map f μ := by refine measurable_of_measurable_coe _ fun s hs => ?_ simp_rw [map_apply hf hs] exact measurable_coe (hf hs) #align measure_theory.measure.measurable_map MeasureTheory.Measure.measurable_map theorem measurable_dirac : Measurable (Measure.dirac : α → Measure α) := by refine measurable_of_measurable_coe _ fun s hs => ?_ simp_rw [dirac_apply' _ hs] exact measurable_one.indicator hs #align measure_theory.measure.measurable_dirac MeasureTheory.Measure.measurable_dirac theorem measurable_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) : Measurable fun μ : Measure α => ∫⁻ x, f x ∂μ := by simp only [lintegral_eq_iSup_eapprox_lintegral, hf, SimpleFunc.lintegral] refine measurable_iSup fun n => Finset.measurable_sum _ fun i _ => ?_ refine Measurable.const_mul ?_ _ exact measurable_coe ((SimpleFunc.eapprox f n).measurableSet_preimage _) #align measure_theory.measure.measurable_lintegral MeasureTheory.Measure.measurable_lintegral def join (m : Measure (Measure α)) : Measure α := Measure.ofMeasurable (fun s _ => ∫⁻ μ, μ s ∂m) (by simp only [measure_empty, lintegral_const, zero_mul]) (by intro f hf h simp_rw [measure_iUnion h hf] apply lintegral_tsum intro i; exact (measurable_coe (hf i)).aemeasurable) #align measure_theory.measure.join MeasureTheory.Measure.join @[simp] theorem join_apply {m : Measure (Measure α)} {s : Set α} (hs : MeasurableSet s) : join m s = ∫⁻ μ, μ s ∂m := Measure.ofMeasurable_apply s hs #align measure_theory.measure.join_apply MeasureTheory.Measure.join_apply @[simp] theorem join_zero : (0 : Measure (Measure α)).join = 0 := by ext1 s hs simp only [hs, join_apply, lintegral_zero_measure, coe_zero, Pi.zero_apply] #align measure_theory.measure.join_zero MeasureTheory.Measure.join_zero theorem measurable_join : Measurable (join : Measure (Measure α) → Measure α) := measurable_of_measurable_coe _ fun s hs => by simp only [join_apply hs]; exact measurable_lintegral (measurable_coe hs) #align measure_theory.measure.measurable_join MeasureTheory.Measure.measurable_join	Mathlib/MeasureTheory/Measure/GiryMonad.lean	128	149	theorem lintegral_join {m : Measure (Measure α)} {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ x, f x ∂join m = ∫⁻ μ, ∫⁻ x, f x ∂μ ∂m := by	simp_rw [lintegral_eq_iSup_eapprox_lintegral hf, SimpleFunc.lintegral, join_apply (SimpleFunc.measurableSet_preimage _ _)] suffices ∀ (s : ℕ → Finset ℝ≥0∞) (f : ℕ → ℝ≥0∞ → Measure α → ℝ≥0∞), (∀ n r, Measurable (f n r)) → Monotone (fun n μ => ∑ r ∈ s n, r * f n r μ) → ⨆ n, ∑ r ∈ s n, r * ∫⁻ μ, f n r μ ∂m = ∫⁻ μ, ⨆ n, ∑ r ∈ s n, r * f n r μ ∂m by refine this (fun n => SimpleFunc.range (SimpleFunc.eapprox f n)) (fun n r μ => μ (SimpleFunc.eapprox f n ⁻¹' {r})) ?_ ?_ · exact fun n r => measurable_coe (SimpleFunc.measurableSet_preimage _ _) · exact fun n m h μ => SimpleFunc.lintegral_mono (SimpleFunc.monotone_eapprox _ h) le_rfl intro s f hf hm rw [lintegral_iSup _ hm] swap · exact fun n => Finset.measurable_sum _ fun r _ => (hf _ _).const_mul _ congr funext n rw [lintegral_finset_sum (s n)] · simp_rw [lintegral_const_mul _ (hf _ _)] · exact fun r _ => (hf _ _).const_mul _
import Mathlib.Analysis.Calculus.ContDiff.Basic import Mathlib.Analysis.Calculus.Deriv.Linear import Mathlib.Analysis.Complex.Conformal import Mathlib.Analysis.Calculus.Conformal.NormedSpace #align_import analysis.complex.real_deriv from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" section RealDerivOfComplex open Complex variable {e : ℂ → ℂ} {e' : ℂ} {z : ℝ} theorem HasStrictDerivAt.real_of_complex (h : HasStrictDerivAt e e' z) : HasStrictDerivAt (fun x : ℝ => (e x).re) e'.re z := by have A : HasStrictFDerivAt ((↑) : ℝ → ℂ) ofRealCLM z := ofRealCLM.hasStrictFDerivAt have B : HasStrictFDerivAt e ((ContinuousLinearMap.smulRight 1 e' : ℂ →L[ℂ] ℂ).restrictScalars ℝ) (ofRealCLM z) := h.hasStrictFDerivAt.restrictScalars ℝ have C : HasStrictFDerivAt re reCLM (e (ofRealCLM z)) := reCLM.hasStrictFDerivAt -- Porting note: this should be by: -- simpa using (C.comp z (B.comp z A)).hasStrictDerivAt -- but for some reason simp can not use `ContinuousLinearMap.comp_apply` convert (C.comp z (B.comp z A)).hasStrictDerivAt rw [ContinuousLinearMap.comp_apply, ContinuousLinearMap.comp_apply] simp #align has_strict_deriv_at.real_of_complex HasStrictDerivAt.real_of_complex theorem HasDerivAt.real_of_complex (h : HasDerivAt e e' z) : HasDerivAt (fun x : ℝ => (e x).re) e'.re z := by have A : HasFDerivAt ((↑) : ℝ → ℂ) ofRealCLM z := ofRealCLM.hasFDerivAt have B : HasFDerivAt e ((ContinuousLinearMap.smulRight 1 e' : ℂ →L[ℂ] ℂ).restrictScalars ℝ) (ofRealCLM z) := h.hasFDerivAt.restrictScalars ℝ have C : HasFDerivAt re reCLM (e (ofRealCLM z)) := reCLM.hasFDerivAt -- Porting note: this should be by: -- simpa using (C.comp z (B.comp z A)).hasStrictDerivAt -- but for some reason simp can not use `ContinuousLinearMap.comp_apply` convert (C.comp z (B.comp z A)).hasDerivAt rw [ContinuousLinearMap.comp_apply, ContinuousLinearMap.comp_apply] simp #align has_deriv_at.real_of_complex HasDerivAt.real_of_complex theorem ContDiffAt.real_of_complex {n : ℕ∞} (h : ContDiffAt ℂ n e z) : ContDiffAt ℝ n (fun x : ℝ => (e x).re) z := by have A : ContDiffAt ℝ n ((↑) : ℝ → ℂ) z := ofRealCLM.contDiff.contDiffAt have B : ContDiffAt ℝ n e z := h.restrict_scalars ℝ have C : ContDiffAt ℝ n re (e z) := reCLM.contDiff.contDiffAt exact C.comp z (B.comp z A) #align cont_diff_at.real_of_complex ContDiffAt.real_of_complex theorem ContDiff.real_of_complex {n : ℕ∞} (h : ContDiff ℂ n e) : ContDiff ℝ n fun x : ℝ => (e x).re := contDiff_iff_contDiffAt.2 fun _ => h.contDiffAt.real_of_complex #align cont_diff.real_of_complex ContDiff.real_of_complex variable {E : Type*} [NormedAddCommGroup E] [NormedSpace ℂ E] theorem HasStrictDerivAt.complexToReal_fderiv' {f : ℂ → E} {x : ℂ} {f' : E} (h : HasStrictDerivAt f f' x) : HasStrictFDerivAt f (reCLM.smulRight f' + I • imCLM.smulRight f') x := by simpa only [Complex.restrictScalars_one_smulRight'] using h.hasStrictFDerivAt.restrictScalars ℝ #align has_strict_deriv_at.complex_to_real_fderiv' HasStrictDerivAt.complexToReal_fderiv' theorem HasDerivAt.complexToReal_fderiv' {f : ℂ → E} {x : ℂ} {f' : E} (h : HasDerivAt f f' x) : HasFDerivAt f (reCLM.smulRight f' + I • imCLM.smulRight f') x := by simpa only [Complex.restrictScalars_one_smulRight'] using h.hasFDerivAt.restrictScalars ℝ #align has_deriv_at.complex_to_real_fderiv' HasDerivAt.complexToReal_fderiv' theorem HasDerivWithinAt.complexToReal_fderiv' {f : ℂ → E} {s : Set ℂ} {x : ℂ} {f' : E} (h : HasDerivWithinAt f f' s x) : HasFDerivWithinAt f (reCLM.smulRight f' + I • imCLM.smulRight f') s x := by simpa only [Complex.restrictScalars_one_smulRight'] using h.hasFDerivWithinAt.restrictScalars ℝ #align has_deriv_within_at.complex_to_real_fderiv' HasDerivWithinAt.complexToReal_fderiv'	Mathlib/Analysis/Complex/RealDeriv.lean	118	120	theorem HasStrictDerivAt.complexToReal_fderiv {f : ℂ → ℂ} {f' x : ℂ} (h : HasStrictDerivAt f f' x) : HasStrictFDerivAt f (f' • (1 : ℂ →L[ℝ] ℂ)) x := by	simpa only [Complex.restrictScalars_one_smulRight] using h.hasStrictFDerivAt.restrictScalars ℝ
import Mathlib.LinearAlgebra.Quotient import Mathlib.RingTheory.Ideal.Operations namespace Submodule open Pointwise variable {R M M' F G : Type} [CommRing R] [AddCommGroup M] [Module R M] variable {N N₁ N₂ P P₁ P₂ : Submodule R M} def colon (N P : Submodule R M) : Ideal R := annihilator (P.map N.mkQ) #align submodule.colon Submodule.colon theorem mem_colon {r} : r ∈ N.colon P ↔ ∀ p ∈ P, r • p ∈ N := mem_annihilator.trans ⟨fun H p hp => (Quotient.mk_eq_zero N).1 (H (Quotient.mk p) (mem_map_of_mem hp)), fun H _ ⟨p, hp, hpm⟩ => hpm ▸ ((Quotient.mk_eq_zero N).2 <\| H p hp)⟩ #align submodule.mem_colon Submodule.mem_colon theorem mem_colon' {r} : r ∈ N.colon P ↔ P ≤ comap (r • (LinearMap.id : M →ₗ[R] M)) N := mem_colon #align submodule.mem_colon' Submodule.mem_colon' @[simp] theorem colon_top {I : Ideal R} : I.colon ⊤ = I := by simp_rw [SetLike.ext_iff, mem_colon, smul_eq_mul] exact fun x ↦ ⟨fun h ↦ mul_one x ▸ h 1 trivial, fun h _ _ ↦ I.mul_mem_right _ h⟩ @[simp] theorem colon_bot : colon ⊥ N = N.annihilator := by simp_rw [SetLike.ext_iff, mem_colon, mem_annihilator, mem_bot, forall_const] theorem colon_mono (hn : N₁ ≤ N₂) (hp : P₁ ≤ P₂) : N₁.colon P₂ ≤ N₂.colon P₁ := fun _ hrnp => mem_colon.2 fun p₁ hp₁ => hn <\| mem_colon.1 hrnp p₁ <\| hp hp₁ #align submodule.colon_mono Submodule.colon_mono theorem iInf_colon_iSup (ι₁ : Sort) (f : ι₁ → Submodule R M) (ι₂ : Sort*) (g : ι₂ → Submodule R M) : (⨅ i, f i).colon (⨆ j, g j) = ⨅ (i) (j), (f i).colon (g j) := le_antisymm (le_iInf fun _ => le_iInf fun _ => colon_mono (iInf_le _ _) (le_iSup _ _)) fun _ H => mem_colon'.2 <\| iSup_le fun j => map_le_iff_le_comap.1 <\| le_iInf fun i => map_le_iff_le_comap.2 <\| mem_colon'.1 <\| have := (mem_iInf _).1 H i have := (mem_iInf _).1 this j this #align submodule.infi_colon_supr Submodule.iInf_colon_iSup @[simp] theorem mem_colon_singleton {N : Submodule R M} {x : M} {r : R} : r ∈ N.colon (Submodule.span R {x}) ↔ r • x ∈ N := calc r ∈ N.colon (Submodule.span R {x}) ↔ ∀ a : R, r • a • x ∈ N := by simp [Submodule.mem_colon, Submodule.mem_span_singleton] _ ↔ r • x ∈ N := by simp_rw [fun (a : R) ↦ smul_comm r a x]; exact SetLike.forall_smul_mem_iff #align submodule.mem_colon_singleton Submodule.mem_colon_singleton @[simp]	Mathlib/RingTheory/Ideal/Colon.lean	76	78	theorem _root_.Ideal.mem_colon_singleton {I : Ideal R} {x r : R} : r ∈ I.colon (Ideal.span {x}) ↔ r * x ∈ I := by	simp only [← Ideal.submodule_span_eq, Submodule.mem_colon_singleton, smul_eq_mul]
import Mathlib.Algebra.BigOperators.GroupWithZero.Finset import Mathlib.Data.Finite.Card import Mathlib.GroupTheory.Finiteness import Mathlib.GroupTheory.GroupAction.Quotient #align_import group_theory.index from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" namespace Subgroup open Cardinal variable {G : Type} [Group G] (H K L : Subgroup G) @[to_additive "The index of a subgroup as a natural number, and returns 0 if the index is infinite."] noncomputable def index : ℕ := Nat.card (G ⧸ H) #align subgroup.index Subgroup.index #align add_subgroup.index AddSubgroup.index @[to_additive "The relative index of a subgroup as a natural number, and returns 0 if the relative index is infinite."] noncomputable def relindex : ℕ := (H.subgroupOf K).index #align subgroup.relindex Subgroup.relindex #align add_subgroup.relindex AddSubgroup.relindex @[to_additive] theorem index_comap_of_surjective {G' : Type} [Group G'] {f : G' →* G} (hf : Function.Surjective f) : (H.comap f).index = H.index := by letI := QuotientGroup.leftRel H letI := QuotientGroup.leftRel (H.comap f) have key : ∀ x y : G', Setoid.r x y ↔ Setoid.r (f x) (f y) := by simp only [QuotientGroup.leftRel_apply] exact fun x y => iff_of_eq (congr_arg (· ∈ H) (by rw [f.map_mul, f.map_inv])) refine Cardinal.toNat_congr (Equiv.ofBijective (Quotient.map' f fun x y => (key x y).mp) ⟨?_, ?_⟩) · simp_rw [← Quotient.eq''] at key refine Quotient.ind' fun x => ?_ refine Quotient.ind' fun y => ?_ exact (key x y).mpr · refine Quotient.ind' fun x => ?_ obtain ⟨y, hy⟩ := hf x exact ⟨y, (Quotient.map'_mk'' f _ y).trans (congr_arg Quotient.mk'' hy)⟩ #align subgroup.index_comap_of_surjective Subgroup.index_comap_of_surjective #align add_subgroup.index_comap_of_surjective AddSubgroup.index_comap_of_surjective @[to_additive] theorem index_comap {G' : Type} [Group G'] (f : G' → G) : (H.comap f).index = H.relindex f.range := Eq.trans (congr_arg index (by rfl)) ((H.subgroupOf f.range).index_comap_of_surjective f.rangeRestrict_surjective) #align subgroup.index_comap Subgroup.index_comap #align add_subgroup.index_comap AddSubgroup.index_comap @[to_additive] theorem relindex_comap {G' : Type} [Group G'] (f : G' → G) (K : Subgroup G') : relindex (comap f H) K = relindex H (map f K) := by rw [relindex, subgroupOf, comap_comap, index_comap, ← f.map_range, K.subtype_range] #align subgroup.relindex_comap Subgroup.relindex_comap #align add_subgroup.relindex_comap AddSubgroup.relindex_comap variable {H K L} @[to_additive relindex_mul_index] theorem relindex_mul_index (h : H ≤ K) : H.relindex K * K.index = H.index := ((mul_comm _ _).trans (Cardinal.toNat_mul _ _).symm).trans (congr_arg Cardinal.toNat (Equiv.cardinal_eq (quotientEquivProdOfLE h))).symm #align subgroup.relindex_mul_index Subgroup.relindex_mul_index #align add_subgroup.relindex_mul_index AddSubgroup.relindex_mul_index @[to_additive] theorem index_dvd_of_le (h : H ≤ K) : K.index ∣ H.index := dvd_of_mul_left_eq (H.relindex K) (relindex_mul_index h) #align subgroup.index_dvd_of_le Subgroup.index_dvd_of_le #align add_subgroup.index_dvd_of_le AddSubgroup.index_dvd_of_le @[to_additive] theorem relindex_dvd_index_of_le (h : H ≤ K) : H.relindex K ∣ H.index := dvd_of_mul_right_eq K.index (relindex_mul_index h) #align subgroup.relindex_dvd_index_of_le Subgroup.relindex_dvd_index_of_le #align add_subgroup.relindex_dvd_index_of_le AddSubgroup.relindex_dvd_index_of_le @[to_additive] theorem relindex_subgroupOf (hKL : K ≤ L) : (H.subgroupOf L).relindex (K.subgroupOf L) = H.relindex K := ((index_comap (H.subgroupOf L) (inclusion hKL)).trans (congr_arg _ (inclusion_range hKL))).symm #align subgroup.relindex_subgroup_of Subgroup.relindex_subgroupOf #align add_subgroup.relindex_add_subgroup_of AddSubgroup.relindex_addSubgroupOf variable (H K L) @[to_additive relindex_mul_relindex] theorem relindex_mul_relindex (hHK : H ≤ K) (hKL : K ≤ L) : H.relindex K * K.relindex L = H.relindex L := by rw [← relindex_subgroupOf hKL] exact relindex_mul_index fun x hx => hHK hx #align subgroup.relindex_mul_relindex Subgroup.relindex_mul_relindex #align add_subgroup.relindex_mul_relindex AddSubgroup.relindex_mul_relindex @[to_additive] theorem inf_relindex_right : (H ⊓ K).relindex K = H.relindex K := by rw [relindex, relindex, inf_subgroupOf_right] #align subgroup.inf_relindex_right Subgroup.inf_relindex_right #align add_subgroup.inf_relindex_right AddSubgroup.inf_relindex_right @[to_additive]	Mathlib/GroupTheory/Index.lean	140	141	theorem inf_relindex_left : (H ⊓ K).relindex H = K.relindex H := by	rw [inf_comm, inf_relindex_right]
import Mathlib.Analysis.Normed.Group.Basic import Mathlib.Topology.ContinuousFunction.CocompactMap open Filter Metric variable {𝕜 E F 𝓕 : Type*} variable [NormedAddCommGroup E] [NormedAddCommGroup F] [ProperSpace E] [ProperSpace F] variable {f : 𝓕}	Mathlib/Analysis/Normed/Group/CocompactMap.lean	29	39	theorem CocompactMapClass.norm_le [FunLike 𝓕 E F] [CocompactMapClass 𝓕 E F] (ε : ℝ) : ∃ r : ℝ, ∀ x : E, r < ‖x‖ → ε < ‖f x‖ := by	have h := cocompact_tendsto f rw [tendsto_def] at h specialize h (Metric.closedBall 0 ε)ᶜ (mem_cocompact_of_closedBall_compl_subset 0 ⟨ε, rfl.subset⟩) rcases closedBall_compl_subset_of_mem_cocompact h 0 with ⟨r, hr⟩ use r intro x hx suffices x ∈ f⁻¹' (Metric.closedBall 0 ε)ᶜ by aesop apply hr simp [hx]
import Mathlib.Algebra.GroupWithZero.Indicator import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Instances.ENNReal #align_import topology.semicontinuous from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open Topology ENNReal open Set Function Filter variable {α : Type} [TopologicalSpace α] {β : Type} [Preorder β] {f g : α → β} {x : α} {s t : Set α} {y z : β} def LowerSemicontinuousWithinAt (f : α → β) (s : Set α) (x : α) := ∀ y < f x, ∀ᶠ x' in 𝓝[s] x, y < f x' #align lower_semicontinuous_within_at LowerSemicontinuousWithinAt def LowerSemicontinuousOn (f : α → β) (s : Set α) := ∀ x ∈ s, LowerSemicontinuousWithinAt f s x #align lower_semicontinuous_on LowerSemicontinuousOn def LowerSemicontinuousAt (f : α → β) (x : α) := ∀ y < f x, ∀ᶠ x' in 𝓝 x, y < f x' #align lower_semicontinuous_at LowerSemicontinuousAt def LowerSemicontinuous (f : α → β) := ∀ x, LowerSemicontinuousAt f x #align lower_semicontinuous LowerSemicontinuous def UpperSemicontinuousWithinAt (f : α → β) (s : Set α) (x : α) := ∀ y, f x < y → ∀ᶠ x' in 𝓝[s] x, f x' < y #align upper_semicontinuous_within_at UpperSemicontinuousWithinAt def UpperSemicontinuousOn (f : α → β) (s : Set α) := ∀ x ∈ s, UpperSemicontinuousWithinAt f s x #align upper_semicontinuous_on UpperSemicontinuousOn def UpperSemicontinuousAt (f : α → β) (x : α) := ∀ y, f x < y → ∀ᶠ x' in 𝓝 x, f x' < y #align upper_semicontinuous_at UpperSemicontinuousAt def UpperSemicontinuous (f : α → β) := ∀ x, UpperSemicontinuousAt f x #align upper_semicontinuous UpperSemicontinuous theorem LowerSemicontinuousWithinAt.mono (h : LowerSemicontinuousWithinAt f s x) (hst : t ⊆ s) : LowerSemicontinuousWithinAt f t x := fun y hy => Filter.Eventually.filter_mono (nhdsWithin_mono _ hst) (h y hy) #align lower_semicontinuous_within_at.mono LowerSemicontinuousWithinAt.mono theorem lowerSemicontinuousWithinAt_univ_iff : LowerSemicontinuousWithinAt f univ x ↔ LowerSemicontinuousAt f x := by simp [LowerSemicontinuousWithinAt, LowerSemicontinuousAt, nhdsWithin_univ] #align lower_semicontinuous_within_at_univ_iff lowerSemicontinuousWithinAt_univ_iff theorem LowerSemicontinuousAt.lowerSemicontinuousWithinAt (s : Set α) (h : LowerSemicontinuousAt f x) : LowerSemicontinuousWithinAt f s x := fun y hy => Filter.Eventually.filter_mono nhdsWithin_le_nhds (h y hy) #align lower_semicontinuous_at.lower_semicontinuous_within_at LowerSemicontinuousAt.lowerSemicontinuousWithinAt theorem LowerSemicontinuousOn.lowerSemicontinuousWithinAt (h : LowerSemicontinuousOn f s) (hx : x ∈ s) : LowerSemicontinuousWithinAt f s x := h x hx #align lower_semicontinuous_on.lower_semicontinuous_within_at LowerSemicontinuousOn.lowerSemicontinuousWithinAt theorem LowerSemicontinuousOn.mono (h : LowerSemicontinuousOn f s) (hst : t ⊆ s) : LowerSemicontinuousOn f t := fun x hx => (h x (hst hx)).mono hst #align lower_semicontinuous_on.mono LowerSemicontinuousOn.mono theorem lowerSemicontinuousOn_univ_iff : LowerSemicontinuousOn f univ ↔ LowerSemicontinuous f := by simp [LowerSemicontinuousOn, LowerSemicontinuous, lowerSemicontinuousWithinAt_univ_iff] #align lower_semicontinuous_on_univ_iff lowerSemicontinuousOn_univ_iff theorem LowerSemicontinuous.lowerSemicontinuousAt (h : LowerSemicontinuous f) (x : α) : LowerSemicontinuousAt f x := h x #align lower_semicontinuous.lower_semicontinuous_at LowerSemicontinuous.lowerSemicontinuousAt theorem LowerSemicontinuous.lowerSemicontinuousWithinAt (h : LowerSemicontinuous f) (s : Set α) (x : α) : LowerSemicontinuousWithinAt f s x := (h x).lowerSemicontinuousWithinAt s #align lower_semicontinuous.lower_semicontinuous_within_at LowerSemicontinuous.lowerSemicontinuousWithinAt theorem LowerSemicontinuous.lowerSemicontinuousOn (h : LowerSemicontinuous f) (s : Set α) : LowerSemicontinuousOn f s := fun x _hx => h.lowerSemicontinuousWithinAt s x #align lower_semicontinuous.lower_semicontinuous_on LowerSemicontinuous.lowerSemicontinuousOn theorem lowerSemicontinuousWithinAt_const : LowerSemicontinuousWithinAt (fun _x => z) s x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align lower_semicontinuous_within_at_const lowerSemicontinuousWithinAt_const theorem lowerSemicontinuousAt_const : LowerSemicontinuousAt (fun _x => z) x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align lower_semicontinuous_at_const lowerSemicontinuousAt_const theorem lowerSemicontinuousOn_const : LowerSemicontinuousOn (fun _x => z) s := fun _x _hx => lowerSemicontinuousWithinAt_const #align lower_semicontinuous_on_const lowerSemicontinuousOn_const theorem lowerSemicontinuous_const : LowerSemicontinuous fun _x : α => z := fun _x => lowerSemicontinuousAt_const #align lower_semicontinuous_const lowerSemicontinuous_const section variable [Zero β] theorem IsOpen.lowerSemicontinuous_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuous (indicator s fun _x => y) := by intro x z hz by_cases h : x ∈ s <;> simp [h] at hz · filter_upwards [hs.mem_nhds h] simp (config := { contextual := true }) [hz] · refine Filter.eventually_of_forall fun x' => ?_ by_cases h' : x' ∈ s <;> simp [h', hz.trans_le hy, hz] #align is_open.lower_semicontinuous_indicator IsOpen.lowerSemicontinuous_indicator theorem IsOpen.lowerSemicontinuousOn_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousOn (indicator s fun _x => y) t := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousOn t #align is_open.lower_semicontinuous_on_indicator IsOpen.lowerSemicontinuousOn_indicator theorem IsOpen.lowerSemicontinuousAt_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousAt (indicator s fun _x => y) x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousAt x #align is_open.lower_semicontinuous_at_indicator IsOpen.lowerSemicontinuousAt_indicator theorem IsOpen.lowerSemicontinuousWithinAt_indicator (hs : IsOpen s) (hy : 0 ≤ y) : LowerSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousWithinAt t x #align is_open.lower_semicontinuous_within_at_indicator IsOpen.lowerSemicontinuousWithinAt_indicator theorem IsClosed.lowerSemicontinuous_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuous (indicator s fun _x => y) := by intro x z hz by_cases h : x ∈ s <;> simp [h] at hz · refine Filter.eventually_of_forall fun x' => ?_ by_cases h' : x' ∈ s <;> simp [h', hz, hz.trans_le hy] · filter_upwards [hs.isOpen_compl.mem_nhds h] simp (config := { contextual := true }) [hz] #align is_closed.lower_semicontinuous_indicator IsClosed.lowerSemicontinuous_indicator theorem IsClosed.lowerSemicontinuousOn_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousOn (indicator s fun _x => y) t := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousOn t #align is_closed.lower_semicontinuous_on_indicator IsClosed.lowerSemicontinuousOn_indicator theorem IsClosed.lowerSemicontinuousAt_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousAt (indicator s fun _x => y) x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousAt x #align is_closed.lower_semicontinuous_at_indicator IsClosed.lowerSemicontinuousAt_indicator theorem IsClosed.lowerSemicontinuousWithinAt_indicator (hs : IsClosed s) (hy : y ≤ 0) : LowerSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.lowerSemicontinuous_indicator hy).lowerSemicontinuousWithinAt t x #align is_closed.lower_semicontinuous_within_at_indicator IsClosed.lowerSemicontinuousWithinAt_indicator end theorem lowerSemicontinuous_iff_isOpen_preimage : LowerSemicontinuous f ↔ ∀ y, IsOpen (f ⁻¹' Ioi y) := ⟨fun H y => isOpen_iff_mem_nhds.2 fun x hx => H x y hx, fun H _x y y_lt => IsOpen.mem_nhds (H y) y_lt⟩ #align lower_semicontinuous_iff_is_open_preimage lowerSemicontinuous_iff_isOpen_preimage theorem LowerSemicontinuous.isOpen_preimage (hf : LowerSemicontinuous f) (y : β) : IsOpen (f ⁻¹' Ioi y) := lowerSemicontinuous_iff_isOpen_preimage.1 hf y #align lower_semicontinuous.is_open_preimage LowerSemicontinuous.isOpen_preimage section variable {γ : Type} [LinearOrder γ] theorem lowerSemicontinuous_iff_isClosed_preimage {f : α → γ} : LowerSemicontinuous f ↔ ∀ y, IsClosed (f ⁻¹' Iic y) := by rw [lowerSemicontinuous_iff_isOpen_preimage] simp only [← isOpen_compl_iff, ← preimage_compl, compl_Iic] #align lower_semicontinuous_iff_is_closed_preimage lowerSemicontinuous_iff_isClosed_preimage theorem LowerSemicontinuous.isClosed_preimage {f : α → γ} (hf : LowerSemicontinuous f) (y : γ) : IsClosed (f ⁻¹' Iic y) := lowerSemicontinuous_iff_isClosed_preimage.1 hf y #align lower_semicontinuous.is_closed_preimage LowerSemicontinuous.isClosed_preimage variable [TopologicalSpace γ] [OrderTopology γ] theorem ContinuousWithinAt.lowerSemicontinuousWithinAt {f : α → γ} (h : ContinuousWithinAt f s x) : LowerSemicontinuousWithinAt f s x := fun _y hy => h (Ioi_mem_nhds hy) #align continuous_within_at.lower_semicontinuous_within_at ContinuousWithinAt.lowerSemicontinuousWithinAt theorem ContinuousAt.lowerSemicontinuousAt {f : α → γ} (h : ContinuousAt f x) : LowerSemicontinuousAt f x := fun _y hy => h (Ioi_mem_nhds hy) #align continuous_at.lower_semicontinuous_at ContinuousAt.lowerSemicontinuousAt theorem ContinuousOn.lowerSemicontinuousOn {f : α → γ} (h : ContinuousOn f s) : LowerSemicontinuousOn f s := fun x hx => (h x hx).lowerSemicontinuousWithinAt #align continuous_on.lower_semicontinuous_on ContinuousOn.lowerSemicontinuousOn theorem Continuous.lowerSemicontinuous {f : α → γ} (h : Continuous f) : LowerSemicontinuous f := fun _x => h.continuousAt.lowerSemicontinuousAt #align continuous.lower_semicontinuous Continuous.lowerSemicontinuous end section variable {γ : Type} [CompleteLinearOrder γ] [DenselyOrdered γ] theorem lowerSemicontinuousWithinAt_iff_le_liminf {f : α → γ} : LowerSemicontinuousWithinAt f s x ↔ f x ≤ liminf f (𝓝[s] x) := by constructor · intro hf; unfold LowerSemicontinuousWithinAt at hf contrapose! hf obtain ⟨y, lty, ylt⟩ := exists_between hf; use y exact ⟨ylt, fun h => lty.not_le (le_liminf_of_le (by isBoundedDefault) (h.mono fun _ hx => le_of_lt hx))⟩ exact fun hf y ylt => eventually_lt_of_lt_liminf (ylt.trans_le hf) alias ⟨LowerSemicontinuousWithinAt.le_liminf, _⟩ := lowerSemicontinuousWithinAt_iff_le_liminf theorem lowerSemicontinuousAt_iff_le_liminf {f : α → γ} : LowerSemicontinuousAt f x ↔ f x ≤ liminf f (𝓝 x) := by rw [← lowerSemicontinuousWithinAt_univ_iff, lowerSemicontinuousWithinAt_iff_le_liminf, ← nhdsWithin_univ] alias ⟨LowerSemicontinuousAt.le_liminf, _⟩ := lowerSemicontinuousAt_iff_le_liminf theorem lowerSemicontinuous_iff_le_liminf {f : α → γ} : LowerSemicontinuous f ↔ ∀ x, f x ≤ liminf f (𝓝 x) := by simp only [← lowerSemicontinuousAt_iff_le_liminf, LowerSemicontinuous] alias ⟨LowerSemicontinuous.le_liminf, _⟩ := lowerSemicontinuous_iff_le_liminf theorem lowerSemicontinuousOn_iff_le_liminf {f : α → γ} : LowerSemicontinuousOn f s ↔ ∀ x ∈ s, f x ≤ liminf f (𝓝[s] x) := by simp only [← lowerSemicontinuousWithinAt_iff_le_liminf, LowerSemicontinuousOn] alias ⟨LowerSemicontinuousOn.le_liminf, _⟩ := lowerSemicontinuousOn_iff_le_liminf variable [TopologicalSpace γ] [OrderTopology γ] theorem lowerSemicontinuous_iff_isClosed_epigraph {f : α → γ} : LowerSemicontinuous f ↔ IsClosed {p : α × γ \| f p.1 ≤ p.2} := by constructor · rw [lowerSemicontinuous_iff_le_liminf, isClosed_iff_forall_filter] rintro hf ⟨x, y⟩ F F_ne h h' rw [nhds_prod_eq, le_prod] at h' calc f x ≤ liminf f (𝓝 x) := hf x _ ≤ liminf f (map Prod.fst F) := liminf_le_liminf_of_le h'.1 _ = liminf (f ∘ Prod.fst) F := (Filter.liminf_comp _ _ _).symm _ ≤ liminf Prod.snd F := liminf_le_liminf <\| by simpa using (eventually_principal.2 fun (_ : α × γ) ↦ id).filter_mono h _ = y := h'.2.liminf_eq · rw [lowerSemicontinuous_iff_isClosed_preimage] exact fun hf y ↦ hf.preimage (Continuous.Prod.mk_left y) @[deprecated (since := "2024-03-02")] alias lowerSemicontinuous_iff_IsClosed_epigraph := lowerSemicontinuous_iff_isClosed_epigraph alias ⟨LowerSemicontinuous.isClosed_epigraph, _⟩ := lowerSemicontinuous_iff_isClosed_epigraph @[deprecated (since := "2024-03-02")] alias LowerSemicontinuous.IsClosed_epigraph := LowerSemicontinuous.isClosed_epigraph end section variable {γ : Type} [LinearOrder γ] [TopologicalSpace γ] [OrderTopology γ] variable {δ : Type} [LinearOrder δ] [TopologicalSpace δ] [OrderTopology δ] variable {ι : Type} [TopologicalSpace ι] theorem ContinuousAt.comp_lowerSemicontinuousWithinAt {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : LowerSemicontinuousWithinAt f s x) (gmon : Monotone g) : LowerSemicontinuousWithinAt (g ∘ f) s x := by intro y hy by_cases h : ∃ l, l < f x · obtain ⟨z, zlt, hz⟩ : ∃ z < f x, Ioc z (f x) ⊆ g ⁻¹' Ioi y := exists_Ioc_subset_of_mem_nhds (hg (Ioi_mem_nhds hy)) h filter_upwards [hf z zlt] with a ha calc y < g (min (f x) (f a)) := hz (by simp [zlt, ha, le_refl]) _ ≤ g (f a) := gmon (min_le_right _ _) · simp only [not_exists, not_lt] at h exact Filter.eventually_of_forall fun a => hy.trans_le (gmon (h (f a))) #align continuous_at.comp_lower_semicontinuous_within_at ContinuousAt.comp_lowerSemicontinuousWithinAt theorem ContinuousAt.comp_lowerSemicontinuousAt {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : LowerSemicontinuousAt f x) (gmon : Monotone g) : LowerSemicontinuousAt (g ∘ f) x := by simp only [← lowerSemicontinuousWithinAt_univ_iff] at hf ⊢ exact hg.comp_lowerSemicontinuousWithinAt hf gmon #align continuous_at.comp_lower_semicontinuous_at ContinuousAt.comp_lowerSemicontinuousAt theorem Continuous.comp_lowerSemicontinuousOn {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : LowerSemicontinuousOn f s) (gmon : Monotone g) : LowerSemicontinuousOn (g ∘ f) s := fun x hx => hg.continuousAt.comp_lowerSemicontinuousWithinAt (hf x hx) gmon #align continuous.comp_lower_semicontinuous_on Continuous.comp_lowerSemicontinuousOn theorem Continuous.comp_lowerSemicontinuous {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : LowerSemicontinuous f) (gmon : Monotone g) : LowerSemicontinuous (g ∘ f) := fun x => hg.continuousAt.comp_lowerSemicontinuousAt (hf x) gmon #align continuous.comp_lower_semicontinuous Continuous.comp_lowerSemicontinuous theorem ContinuousAt.comp_lowerSemicontinuousWithinAt_antitone {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : LowerSemicontinuousWithinAt f s x) (gmon : Antitone g) : UpperSemicontinuousWithinAt (g ∘ f) s x := @ContinuousAt.comp_lowerSemicontinuousWithinAt α _ x s γ _ _ _ δᵒᵈ _ _ _ g f hg hf gmon #align continuous_at.comp_lower_semicontinuous_within_at_antitone ContinuousAt.comp_lowerSemicontinuousWithinAt_antitone theorem ContinuousAt.comp_lowerSemicontinuousAt_antitone {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : LowerSemicontinuousAt f x) (gmon : Antitone g) : UpperSemicontinuousAt (g ∘ f) x := @ContinuousAt.comp_lowerSemicontinuousAt α _ x γ _ _ _ δᵒᵈ _ _ _ g f hg hf gmon #align continuous_at.comp_lower_semicontinuous_at_antitone ContinuousAt.comp_lowerSemicontinuousAt_antitone theorem Continuous.comp_lowerSemicontinuousOn_antitone {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : LowerSemicontinuousOn f s) (gmon : Antitone g) : UpperSemicontinuousOn (g ∘ f) s := fun x hx => hg.continuousAt.comp_lowerSemicontinuousWithinAt_antitone (hf x hx) gmon #align continuous.comp_lower_semicontinuous_on_antitone Continuous.comp_lowerSemicontinuousOn_antitone theorem Continuous.comp_lowerSemicontinuous_antitone {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : LowerSemicontinuous f) (gmon : Antitone g) : UpperSemicontinuous (g ∘ f) := fun x => hg.continuousAt.comp_lowerSemicontinuousAt_antitone (hf x) gmon #align continuous.comp_lower_semicontinuous_antitone Continuous.comp_lowerSemicontinuous_antitone theorem LowerSemicontinuousAt.comp_continuousAt {f : α → β} {g : ι → α} {x : ι} (hf : LowerSemicontinuousAt f (g x)) (hg : ContinuousAt g x) : LowerSemicontinuousAt (fun x ↦ f (g x)) x := fun _ lt ↦ hg.eventually (hf _ lt) theorem LowerSemicontinuousAt.comp_continuousAt_of_eq {f : α → β} {g : ι → α} {y : α} {x : ι} (hf : LowerSemicontinuousAt f y) (hg : ContinuousAt g x) (hy : g x = y) : LowerSemicontinuousAt (fun x ↦ f (g x)) x := by rw [← hy] at hf exact comp_continuousAt hf hg theorem LowerSemicontinuous.comp_continuous {f : α → β} {g : ι → α} (hf : LowerSemicontinuous f) (hg : Continuous g) : LowerSemicontinuous fun x ↦ f (g x) := fun x ↦ (hf (g x)).comp_continuousAt hg.continuousAt end section variable {ι : Type} {γ : Type} [LinearOrderedAddCommMonoid γ] [TopologicalSpace γ] [OrderTopology γ] theorem LowerSemicontinuousWithinAt.add' {f g : α → γ} (hf : LowerSemicontinuousWithinAt f s x) (hg : LowerSemicontinuousWithinAt g s x) (hcont : ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : LowerSemicontinuousWithinAt (fun z => f z + g z) s x := by intro y hy obtain ⟨u, v, u_open, xu, v_open, xv, h⟩ : ∃ u v : Set γ, IsOpen u ∧ f x ∈ u ∧ IsOpen v ∧ g x ∈ v ∧ u ×ˢ v ⊆ { p : γ × γ \| y < p.fst + p.snd } := mem_nhds_prod_iff'.1 (hcont (isOpen_Ioi.mem_nhds hy)) by_cases hx₁ : ∃ l, l < f x · obtain ⟨z₁, z₁lt, h₁⟩ : ∃ z₁ < f x, Ioc z₁ (f x) ⊆ u := exists_Ioc_subset_of_mem_nhds (u_open.mem_nhds xu) hx₁ by_cases hx₂ : ∃ l, l < g x · obtain ⟨z₂, z₂lt, h₂⟩ : ∃ z₂ < g x, Ioc z₂ (g x) ⊆ v := exists_Ioc_subset_of_mem_nhds (v_open.mem_nhds xv) hx₂ filter_upwards [hf z₁ z₁lt, hg z₂ z₂lt] with z h₁z h₂z have A1 : min (f z) (f x) ∈ u := by by_cases H : f z ≤ f x · simp [H] exact h₁ ⟨h₁z, H⟩ · simp [le_of_not_le H] exact h₁ ⟨z₁lt, le_rfl⟩ have A2 : min (g z) (g x) ∈ v := by by_cases H : g z ≤ g x · simp [H] exact h₂ ⟨h₂z, H⟩ · simp [le_of_not_le H] exact h₂ ⟨z₂lt, le_rfl⟩ have : (min (f z) (f x), min (g z) (g x)) ∈ u ×ˢ v := ⟨A1, A2⟩ calc y < min (f z) (f x) + min (g z) (g x) := h this _ ≤ f z + g z := add_le_add (min_le_left _ _) (min_le_left _ _) · simp only [not_exists, not_lt] at hx₂ filter_upwards [hf z₁ z₁lt] with z h₁z have A1 : min (f z) (f x) ∈ u := by by_cases H : f z ≤ f x · simp [H] exact h₁ ⟨h₁z, H⟩ · simp [le_of_not_le H] exact h₁ ⟨z₁lt, le_rfl⟩ have : (min (f z) (f x), g x) ∈ u ×ˢ v := ⟨A1, xv⟩ calc y < min (f z) (f x) + g x := h this _ ≤ f z + g z := add_le_add (min_le_left _ _) (hx₂ (g z)) · simp only [not_exists, not_lt] at hx₁ by_cases hx₂ : ∃ l, l < g x · obtain ⟨z₂, z₂lt, h₂⟩ : ∃ z₂ < g x, Ioc z₂ (g x) ⊆ v := exists_Ioc_subset_of_mem_nhds (v_open.mem_nhds xv) hx₂ filter_upwards [hg z₂ z₂lt] with z h₂z have A2 : min (g z) (g x) ∈ v := by by_cases H : g z ≤ g x · simp [H] exact h₂ ⟨h₂z, H⟩ · simp [le_of_not_le H] exact h₂ ⟨z₂lt, le_rfl⟩ have : (f x, min (g z) (g x)) ∈ u ×ˢ v := ⟨xu, A2⟩ calc y < f x + min (g z) (g x) := h this _ ≤ f z + g z := add_le_add (hx₁ (f z)) (min_le_left _ _) · simp only [not_exists, not_lt] at hx₁ hx₂ apply Filter.eventually_of_forall intro z have : (f x, g x) ∈ u ×ˢ v := ⟨xu, xv⟩ calc y < f x + g x := h this _ ≤ f z + g z := add_le_add (hx₁ (f z)) (hx₂ (g z)) #align lower_semicontinuous_within_at.add' LowerSemicontinuousWithinAt.add' theorem LowerSemicontinuousAt.add' {f g : α → γ} (hf : LowerSemicontinuousAt f x) (hg : LowerSemicontinuousAt g x) (hcont : ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : LowerSemicontinuousAt (fun z => f z + g z) x := by simp_rw [← lowerSemicontinuousWithinAt_univ_iff] at exact hf.add' hg hcont #align lower_semicontinuous_at.add' LowerSemicontinuousAt.add' theorem LowerSemicontinuousOn.add' {f g : α → γ} (hf : LowerSemicontinuousOn f s) (hg : LowerSemicontinuousOn g s) (hcont : ∀ x ∈ s, ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : LowerSemicontinuousOn (fun z => f z + g z) s := fun x hx => (hf x hx).add' (hg x hx) (hcont x hx) #align lower_semicontinuous_on.add' LowerSemicontinuousOn.add' theorem LowerSemicontinuous.add' {f g : α → γ} (hf : LowerSemicontinuous f) (hg : LowerSemicontinuous g) (hcont : ∀ x, ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : LowerSemicontinuous fun z => f z + g z := fun x => (hf x).add' (hg x) (hcont x) #align lower_semicontinuous.add' LowerSemicontinuous.add' variable [ContinuousAdd γ] theorem LowerSemicontinuousWithinAt.add {f g : α → γ} (hf : LowerSemicontinuousWithinAt f s x) (hg : LowerSemicontinuousWithinAt g s x) : LowerSemicontinuousWithinAt (fun z => f z + g z) s x := hf.add' hg continuous_add.continuousAt #align lower_semicontinuous_within_at.add LowerSemicontinuousWithinAt.add theorem LowerSemicontinuousAt.add {f g : α → γ} (hf : LowerSemicontinuousAt f x) (hg : LowerSemicontinuousAt g x) : LowerSemicontinuousAt (fun z => f z + g z) x := hf.add' hg continuous_add.continuousAt #align lower_semicontinuous_at.add LowerSemicontinuousAt.add theorem LowerSemicontinuousOn.add {f g : α → γ} (hf : LowerSemicontinuousOn f s) (hg : LowerSemicontinuousOn g s) : LowerSemicontinuousOn (fun z => f z + g z) s := hf.add' hg fun _x _hx => continuous_add.continuousAt #align lower_semicontinuous_on.add LowerSemicontinuousOn.add theorem LowerSemicontinuous.add {f g : α → γ} (hf : LowerSemicontinuous f) (hg : LowerSemicontinuous g) : LowerSemicontinuous fun z => f z + g z := hf.add' hg fun _x => continuous_add.continuousAt #align lower_semicontinuous.add LowerSemicontinuous.add theorem lowerSemicontinuousWithinAt_sum {f : ι → α → γ} {a : Finset ι} (ha : ∀ i ∈ a, LowerSemicontinuousWithinAt (f i) s x) : LowerSemicontinuousWithinAt (fun z => ∑ i ∈ a, f i z) s x := by classical induction' a using Finset.induction_on with i a ia IH · exact lowerSemicontinuousWithinAt_const · simp only [ia, Finset.sum_insert, not_false_iff] exact LowerSemicontinuousWithinAt.add (ha _ (Finset.mem_insert_self i a)) (IH fun j ja => ha j (Finset.mem_insert_of_mem ja)) #align lower_semicontinuous_within_at_sum lowerSemicontinuousWithinAt_sum theorem lowerSemicontinuousAt_sum {f : ι → α → γ} {a : Finset ι} (ha : ∀ i ∈ a, LowerSemicontinuousAt (f i) x) : LowerSemicontinuousAt (fun z => ∑ i ∈ a, f i z) x := by simp_rw [← lowerSemicontinuousWithinAt_univ_iff] at * exact lowerSemicontinuousWithinAt_sum ha #align lower_semicontinuous_at_sum lowerSemicontinuousAt_sum theorem lowerSemicontinuousOn_sum {f : ι → α → γ} {a : Finset ι} (ha : ∀ i ∈ a, LowerSemicontinuousOn (f i) s) : LowerSemicontinuousOn (fun z => ∑ i ∈ a, f i z) s := fun x hx => lowerSemicontinuousWithinAt_sum fun i hi => ha i hi x hx #align lower_semicontinuous_on_sum lowerSemicontinuousOn_sum theorem lowerSemicontinuous_sum {f : ι → α → γ} {a : Finset ι} (ha : ∀ i ∈ a, LowerSemicontinuous (f i)) : LowerSemicontinuous fun z => ∑ i ∈ a, f i z := fun x => lowerSemicontinuousAt_sum fun i hi => ha i hi x #align lower_semicontinuous_sum lowerSemicontinuous_sum end section variable {ι : Sort} {δ δ' : Type} [CompleteLinearOrder δ] [ConditionallyCompleteLinearOrder δ'] theorem lowerSemicontinuousWithinAt_ciSup {f : ι → α → δ'} (bdd : ∀ᶠ y in 𝓝[s] x, BddAbove (range fun i => f i y)) (h : ∀ i, LowerSemicontinuousWithinAt (f i) s x) : LowerSemicontinuousWithinAt (fun x' => ⨆ i, f i x') s x := by cases isEmpty_or_nonempty ι · simpa only [iSup_of_empty'] using lowerSemicontinuousWithinAt_const · intro y hy rcases exists_lt_of_lt_ciSup hy with ⟨i, hi⟩ filter_upwards [h i y hi, bdd] with y hy hy' using hy.trans_le (le_ciSup hy' i) #align lower_semicontinuous_within_at_csupr lowerSemicontinuousWithinAt_ciSup theorem lowerSemicontinuousWithinAt_iSup {f : ι → α → δ} (h : ∀ i, LowerSemicontinuousWithinAt (f i) s x) : LowerSemicontinuousWithinAt (fun x' => ⨆ i, f i x') s x := lowerSemicontinuousWithinAt_ciSup (by simp) h #align lower_semicontinuous_within_at_supr lowerSemicontinuousWithinAt_iSup theorem lowerSemicontinuousWithinAt_biSup {p : ι → Prop} {f : ∀ i, p i → α → δ} (h : ∀ i hi, LowerSemicontinuousWithinAt (f i hi) s x) : LowerSemicontinuousWithinAt (fun x' => ⨆ (i) (hi), f i hi x') s x := lowerSemicontinuousWithinAt_iSup fun i => lowerSemicontinuousWithinAt_iSup fun hi => h i hi #align lower_semicontinuous_within_at_bsupr lowerSemicontinuousWithinAt_biSup theorem lowerSemicontinuousAt_ciSup {f : ι → α → δ'} (bdd : ∀ᶠ y in 𝓝 x, BddAbove (range fun i => f i y)) (h : ∀ i, LowerSemicontinuousAt (f i) x) : LowerSemicontinuousAt (fun x' => ⨆ i, f i x') x := by simp_rw [← lowerSemicontinuousWithinAt_univ_iff] at * rw [← nhdsWithin_univ] at bdd exact lowerSemicontinuousWithinAt_ciSup bdd h #align lower_semicontinuous_at_csupr lowerSemicontinuousAt_ciSup theorem lowerSemicontinuousAt_iSup {f : ι → α → δ} (h : ∀ i, LowerSemicontinuousAt (f i) x) : LowerSemicontinuousAt (fun x' => ⨆ i, f i x') x := lowerSemicontinuousAt_ciSup (by simp) h #align lower_semicontinuous_at_supr lowerSemicontinuousAt_iSup theorem lowerSemicontinuousAt_biSup {p : ι → Prop} {f : ∀ i, p i → α → δ} (h : ∀ i hi, LowerSemicontinuousAt (f i hi) x) : LowerSemicontinuousAt (fun x' => ⨆ (i) (hi), f i hi x') x := lowerSemicontinuousAt_iSup fun i => lowerSemicontinuousAt_iSup fun hi => h i hi #align lower_semicontinuous_at_bsupr lowerSemicontinuousAt_biSup theorem lowerSemicontinuousOn_ciSup {f : ι → α → δ'} (bdd : ∀ x ∈ s, BddAbove (range fun i => f i x)) (h : ∀ i, LowerSemicontinuousOn (f i) s) : LowerSemicontinuousOn (fun x' => ⨆ i, f i x') s := fun x hx => lowerSemicontinuousWithinAt_ciSup (eventually_nhdsWithin_of_forall bdd) fun i => h i x hx #align lower_semicontinuous_on_csupr lowerSemicontinuousOn_ciSup theorem lowerSemicontinuousOn_iSup {f : ι → α → δ} (h : ∀ i, LowerSemicontinuousOn (f i) s) : LowerSemicontinuousOn (fun x' => ⨆ i, f i x') s := lowerSemicontinuousOn_ciSup (by simp) h #align lower_semicontinuous_on_supr lowerSemicontinuousOn_iSup theorem lowerSemicontinuousOn_biSup {p : ι → Prop} {f : ∀ i, p i → α → δ} (h : ∀ i hi, LowerSemicontinuousOn (f i hi) s) : LowerSemicontinuousOn (fun x' => ⨆ (i) (hi), f i hi x') s := lowerSemicontinuousOn_iSup fun i => lowerSemicontinuousOn_iSup fun hi => h i hi #align lower_semicontinuous_on_bsupr lowerSemicontinuousOn_biSup theorem lowerSemicontinuous_ciSup {f : ι → α → δ'} (bdd : ∀ x, BddAbove (range fun i => f i x)) (h : ∀ i, LowerSemicontinuous (f i)) : LowerSemicontinuous fun x' => ⨆ i, f i x' := fun x => lowerSemicontinuousAt_ciSup (eventually_of_forall bdd) fun i => h i x #align lower_semicontinuous_csupr lowerSemicontinuous_ciSup theorem lowerSemicontinuous_iSup {f : ι → α → δ} (h : ∀ i, LowerSemicontinuous (f i)) : LowerSemicontinuous fun x' => ⨆ i, f i x' := lowerSemicontinuous_ciSup (by simp) h #align lower_semicontinuous_supr lowerSemicontinuous_iSup theorem lowerSemicontinuous_biSup {p : ι → Prop} {f : ∀ i, p i → α → δ} (h : ∀ i hi, LowerSemicontinuous (f i hi)) : LowerSemicontinuous fun x' => ⨆ (i) (hi), f i hi x' := lowerSemicontinuous_iSup fun i => lowerSemicontinuous_iSup fun hi => h i hi #align lower_semicontinuous_bsupr lowerSemicontinuous_biSup end section variable {ι : Type} theorem lowerSemicontinuousWithinAt_tsum {f : ι → α → ℝ≥0∞} (h : ∀ i, LowerSemicontinuousWithinAt (f i) s x) : LowerSemicontinuousWithinAt (fun x' => ∑' i, f i x') s x := by simp_rw [ENNReal.tsum_eq_iSup_sum] refine lowerSemicontinuousWithinAt_iSup fun b => ?_ exact lowerSemicontinuousWithinAt_sum fun i _hi => h i #align lower_semicontinuous_within_at_tsum lowerSemicontinuousWithinAt_tsum theorem lowerSemicontinuousAt_tsum {f : ι → α → ℝ≥0∞} (h : ∀ i, LowerSemicontinuousAt (f i) x) : LowerSemicontinuousAt (fun x' => ∑' i, f i x') x := by simp_rw [← lowerSemicontinuousWithinAt_univ_iff] at exact lowerSemicontinuousWithinAt_tsum h #align lower_semicontinuous_at_tsum lowerSemicontinuousAt_tsum theorem lowerSemicontinuousOn_tsum {f : ι → α → ℝ≥0∞} (h : ∀ i, LowerSemicontinuousOn (f i) s) : LowerSemicontinuousOn (fun x' => ∑' i, f i x') s := fun x hx => lowerSemicontinuousWithinAt_tsum fun i => h i x hx #align lower_semicontinuous_on_tsum lowerSemicontinuousOn_tsum theorem lowerSemicontinuous_tsum {f : ι → α → ℝ≥0∞} (h : ∀ i, LowerSemicontinuous (f i)) : LowerSemicontinuous fun x' => ∑' i, f i x' := fun x => lowerSemicontinuousAt_tsum fun i => h i x #align lower_semicontinuous_tsum lowerSemicontinuous_tsum end theorem UpperSemicontinuousWithinAt.mono (h : UpperSemicontinuousWithinAt f s x) (hst : t ⊆ s) : UpperSemicontinuousWithinAt f t x := fun y hy => Filter.Eventually.filter_mono (nhdsWithin_mono _ hst) (h y hy) #align upper_semicontinuous_within_at.mono UpperSemicontinuousWithinAt.mono theorem upperSemicontinuousWithinAt_univ_iff : UpperSemicontinuousWithinAt f univ x ↔ UpperSemicontinuousAt f x := by simp [UpperSemicontinuousWithinAt, UpperSemicontinuousAt, nhdsWithin_univ] #align upper_semicontinuous_within_at_univ_iff upperSemicontinuousWithinAt_univ_iff theorem UpperSemicontinuousAt.upperSemicontinuousWithinAt (s : Set α) (h : UpperSemicontinuousAt f x) : UpperSemicontinuousWithinAt f s x := fun y hy => Filter.Eventually.filter_mono nhdsWithin_le_nhds (h y hy) #align upper_semicontinuous_at.upper_semicontinuous_within_at UpperSemicontinuousAt.upperSemicontinuousWithinAt theorem UpperSemicontinuousOn.upperSemicontinuousWithinAt (h : UpperSemicontinuousOn f s) (hx : x ∈ s) : UpperSemicontinuousWithinAt f s x := h x hx #align upper_semicontinuous_on.upper_semicontinuous_within_at UpperSemicontinuousOn.upperSemicontinuousWithinAt theorem UpperSemicontinuousOn.mono (h : UpperSemicontinuousOn f s) (hst : t ⊆ s) : UpperSemicontinuousOn f t := fun x hx => (h x (hst hx)).mono hst #align upper_semicontinuous_on.mono UpperSemicontinuousOn.mono theorem upperSemicontinuousOn_univ_iff : UpperSemicontinuousOn f univ ↔ UpperSemicontinuous f := by simp [UpperSemicontinuousOn, UpperSemicontinuous, upperSemicontinuousWithinAt_univ_iff] #align upper_semicontinuous_on_univ_iff upperSemicontinuousOn_univ_iff theorem UpperSemicontinuous.upperSemicontinuousAt (h : UpperSemicontinuous f) (x : α) : UpperSemicontinuousAt f x := h x #align upper_semicontinuous.upper_semicontinuous_at UpperSemicontinuous.upperSemicontinuousAt theorem UpperSemicontinuous.upperSemicontinuousWithinAt (h : UpperSemicontinuous f) (s : Set α) (x : α) : UpperSemicontinuousWithinAt f s x := (h x).upperSemicontinuousWithinAt s #align upper_semicontinuous.upper_semicontinuous_within_at UpperSemicontinuous.upperSemicontinuousWithinAt theorem UpperSemicontinuous.upperSemicontinuousOn (h : UpperSemicontinuous f) (s : Set α) : UpperSemicontinuousOn f s := fun x _hx => h.upperSemicontinuousWithinAt s x #align upper_semicontinuous.upper_semicontinuous_on UpperSemicontinuous.upperSemicontinuousOn theorem upperSemicontinuousWithinAt_const : UpperSemicontinuousWithinAt (fun _x => z) s x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align upper_semicontinuous_within_at_const upperSemicontinuousWithinAt_const theorem upperSemicontinuousAt_const : UpperSemicontinuousAt (fun _x => z) x := fun _y hy => Filter.eventually_of_forall fun _x => hy #align upper_semicontinuous_at_const upperSemicontinuousAt_const theorem upperSemicontinuousOn_const : UpperSemicontinuousOn (fun _x => z) s := fun _x _hx => upperSemicontinuousWithinAt_const #align upper_semicontinuous_on_const upperSemicontinuousOn_const theorem upperSemicontinuous_const : UpperSemicontinuous fun _x : α => z := fun _x => upperSemicontinuousAt_const #align upper_semicontinuous_const upperSemicontinuous_const section variable [Zero β] theorem IsOpen.upperSemicontinuous_indicator (hs : IsOpen s) (hy : y ≤ 0) : UpperSemicontinuous (indicator s fun _x => y) := @IsOpen.lowerSemicontinuous_indicator α _ βᵒᵈ _ s y _ hs hy #align is_open.upper_semicontinuous_indicator IsOpen.upperSemicontinuous_indicator theorem IsOpen.upperSemicontinuousOn_indicator (hs : IsOpen s) (hy : y ≤ 0) : UpperSemicontinuousOn (indicator s fun _x => y) t := (hs.upperSemicontinuous_indicator hy).upperSemicontinuousOn t #align is_open.upper_semicontinuous_on_indicator IsOpen.upperSemicontinuousOn_indicator theorem IsOpen.upperSemicontinuousAt_indicator (hs : IsOpen s) (hy : y ≤ 0) : UpperSemicontinuousAt (indicator s fun _x => y) x := (hs.upperSemicontinuous_indicator hy).upperSemicontinuousAt x #align is_open.upper_semicontinuous_at_indicator IsOpen.upperSemicontinuousAt_indicator theorem IsOpen.upperSemicontinuousWithinAt_indicator (hs : IsOpen s) (hy : y ≤ 0) : UpperSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.upperSemicontinuous_indicator hy).upperSemicontinuousWithinAt t x #align is_open.upper_semicontinuous_within_at_indicator IsOpen.upperSemicontinuousWithinAt_indicator theorem IsClosed.upperSemicontinuous_indicator (hs : IsClosed s) (hy : 0 ≤ y) : UpperSemicontinuous (indicator s fun _x => y) := @IsClosed.lowerSemicontinuous_indicator α _ βᵒᵈ _ s y _ hs hy #align is_closed.upper_semicontinuous_indicator IsClosed.upperSemicontinuous_indicator theorem IsClosed.upperSemicontinuousOn_indicator (hs : IsClosed s) (hy : 0 ≤ y) : UpperSemicontinuousOn (indicator s fun _x => y) t := (hs.upperSemicontinuous_indicator hy).upperSemicontinuousOn t #align is_closed.upper_semicontinuous_on_indicator IsClosed.upperSemicontinuousOn_indicator theorem IsClosed.upperSemicontinuousAt_indicator (hs : IsClosed s) (hy : 0 ≤ y) : UpperSemicontinuousAt (indicator s fun _x => y) x := (hs.upperSemicontinuous_indicator hy).upperSemicontinuousAt x #align is_closed.upper_semicontinuous_at_indicator IsClosed.upperSemicontinuousAt_indicator theorem IsClosed.upperSemicontinuousWithinAt_indicator (hs : IsClosed s) (hy : 0 ≤ y) : UpperSemicontinuousWithinAt (indicator s fun _x => y) t x := (hs.upperSemicontinuous_indicator hy).upperSemicontinuousWithinAt t x #align is_closed.upper_semicontinuous_within_at_indicator IsClosed.upperSemicontinuousWithinAt_indicator end theorem upperSemicontinuous_iff_isOpen_preimage : UpperSemicontinuous f ↔ ∀ y, IsOpen (f ⁻¹' Iio y) := ⟨fun H y => isOpen_iff_mem_nhds.2 fun x hx => H x y hx, fun H _x y y_lt => IsOpen.mem_nhds (H y) y_lt⟩ #align upper_semicontinuous_iff_is_open_preimage upperSemicontinuous_iff_isOpen_preimage theorem UpperSemicontinuous.isOpen_preimage (hf : UpperSemicontinuous f) (y : β) : IsOpen (f ⁻¹' Iio y) := upperSemicontinuous_iff_isOpen_preimage.1 hf y #align upper_semicontinuous.is_open_preimage UpperSemicontinuous.isOpen_preimage section variable {γ : Type} [LinearOrder γ] theorem upperSemicontinuous_iff_isClosed_preimage {f : α → γ} : UpperSemicontinuous f ↔ ∀ y, IsClosed (f ⁻¹' Ici y) := by rw [upperSemicontinuous_iff_isOpen_preimage] simp only [← isOpen_compl_iff, ← preimage_compl, compl_Ici] #align upper_semicontinuous_iff_is_closed_preimage upperSemicontinuous_iff_isClosed_preimage theorem UpperSemicontinuous.isClosed_preimage {f : α → γ} (hf : UpperSemicontinuous f) (y : γ) : IsClosed (f ⁻¹' Ici y) := upperSemicontinuous_iff_isClosed_preimage.1 hf y #align upper_semicontinuous.is_closed_preimage UpperSemicontinuous.isClosed_preimage variable [TopologicalSpace γ] [OrderTopology γ] theorem ContinuousWithinAt.upperSemicontinuousWithinAt {f : α → γ} (h : ContinuousWithinAt f s x) : UpperSemicontinuousWithinAt f s x := fun _y hy => h (Iio_mem_nhds hy) #align continuous_within_at.upper_semicontinuous_within_at ContinuousWithinAt.upperSemicontinuousWithinAt theorem ContinuousAt.upperSemicontinuousAt {f : α → γ} (h : ContinuousAt f x) : UpperSemicontinuousAt f x := fun _y hy => h (Iio_mem_nhds hy) #align continuous_at.upper_semicontinuous_at ContinuousAt.upperSemicontinuousAt theorem ContinuousOn.upperSemicontinuousOn {f : α → γ} (h : ContinuousOn f s) : UpperSemicontinuousOn f s := fun x hx => (h x hx).upperSemicontinuousWithinAt #align continuous_on.upper_semicontinuous_on ContinuousOn.upperSemicontinuousOn theorem Continuous.upperSemicontinuous {f : α → γ} (h : Continuous f) : UpperSemicontinuous f := fun _x => h.continuousAt.upperSemicontinuousAt #align continuous.upper_semicontinuous Continuous.upperSemicontinuous end section variable {γ : Type} [CompleteLinearOrder γ] [DenselyOrdered γ] theorem upperSemicontinuousWithinAt_iff_limsup_le {f : α → γ} : UpperSemicontinuousWithinAt f s x ↔ limsup f (𝓝[s] x) ≤ f x := lowerSemicontinuousWithinAt_iff_le_liminf (γ := γᵒᵈ) alias ⟨UpperSemicontinuousWithinAt.limsup_le, _⟩ := upperSemicontinuousWithinAt_iff_limsup_le theorem upperSemicontinuousAt_iff_limsup_le {f : α → γ} : UpperSemicontinuousAt f x ↔ limsup f (𝓝 x) ≤ f x := lowerSemicontinuousAt_iff_le_liminf (γ := γᵒᵈ) alias ⟨UpperSemicontinuousAt.limsup_le, _⟩ := upperSemicontinuousAt_iff_limsup_le theorem upperSemicontinuous_iff_limsup_le {f : α → γ} : UpperSemicontinuous f ↔ ∀ x, limsup f (𝓝 x) ≤ f x := lowerSemicontinuous_iff_le_liminf (γ := γᵒᵈ) alias ⟨UpperSemicontinuous.limsup_le, _⟩ := upperSemicontinuous_iff_limsup_le theorem upperSemicontinuousOn_iff_limsup_le {f : α → γ} : UpperSemicontinuousOn f s ↔ ∀ x ∈ s, limsup f (𝓝[s] x) ≤ f x := lowerSemicontinuousOn_iff_le_liminf (γ := γᵒᵈ) alias ⟨UpperSemicontinuousOn.limsup_le, _⟩ := upperSemicontinuousOn_iff_limsup_le variable [TopologicalSpace γ] [OrderTopology γ] theorem upperSemicontinuous_iff_IsClosed_hypograph {f : α → γ} : UpperSemicontinuous f ↔ IsClosed {p : α × γ \| p.2 ≤ f p.1} := lowerSemicontinuous_iff_isClosed_epigraph (γ := γᵒᵈ) alias ⟨UpperSemicontinuous.IsClosed_hypograph, _⟩ := upperSemicontinuous_iff_IsClosed_hypograph end section variable {γ : Type} [LinearOrder γ] [TopologicalSpace γ] [OrderTopology γ] variable {δ : Type} [LinearOrder δ] [TopologicalSpace δ] [OrderTopology δ] variable {ι : Type} [TopologicalSpace ι] theorem ContinuousAt.comp_upperSemicontinuousWithinAt {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : UpperSemicontinuousWithinAt f s x) (gmon : Monotone g) : UpperSemicontinuousWithinAt (g ∘ f) s x := @ContinuousAt.comp_lowerSemicontinuousWithinAt α _ x s γᵒᵈ _ _ _ δᵒᵈ _ _ _ g f hg hf gmon.dual #align continuous_at.comp_upper_semicontinuous_within_at ContinuousAt.comp_upperSemicontinuousWithinAt theorem ContinuousAt.comp_upperSemicontinuousAt {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : UpperSemicontinuousAt f x) (gmon : Monotone g) : UpperSemicontinuousAt (g ∘ f) x := @ContinuousAt.comp_lowerSemicontinuousAt α _ x γᵒᵈ _ _ _ δᵒᵈ _ _ _ g f hg hf gmon.dual #align continuous_at.comp_upper_semicontinuous_at ContinuousAt.comp_upperSemicontinuousAt theorem Continuous.comp_upperSemicontinuousOn {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : UpperSemicontinuousOn f s) (gmon : Monotone g) : UpperSemicontinuousOn (g ∘ f) s := fun x hx => hg.continuousAt.comp_upperSemicontinuousWithinAt (hf x hx) gmon #align continuous.comp_upper_semicontinuous_on Continuous.comp_upperSemicontinuousOn theorem Continuous.comp_upperSemicontinuous {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : UpperSemicontinuous f) (gmon : Monotone g) : UpperSemicontinuous (g ∘ f) := fun x => hg.continuousAt.comp_upperSemicontinuousAt (hf x) gmon #align continuous.comp_upper_semicontinuous Continuous.comp_upperSemicontinuous theorem ContinuousAt.comp_upperSemicontinuousWithinAt_antitone {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : UpperSemicontinuousWithinAt f s x) (gmon : Antitone g) : LowerSemicontinuousWithinAt (g ∘ f) s x := @ContinuousAt.comp_upperSemicontinuousWithinAt α _ x s γ _ _ _ δᵒᵈ _ _ _ g f hg hf gmon #align continuous_at.comp_upper_semicontinuous_within_at_antitone ContinuousAt.comp_upperSemicontinuousWithinAt_antitone theorem ContinuousAt.comp_upperSemicontinuousAt_antitone {g : γ → δ} {f : α → γ} (hg : ContinuousAt g (f x)) (hf : UpperSemicontinuousAt f x) (gmon : Antitone g) : LowerSemicontinuousAt (g ∘ f) x := @ContinuousAt.comp_upperSemicontinuousAt α _ x γ _ _ _ δᵒᵈ _ _ _ g f hg hf gmon #align continuous_at.comp_upper_semicontinuous_at_antitone ContinuousAt.comp_upperSemicontinuousAt_antitone theorem Continuous.comp_upperSemicontinuousOn_antitone {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : UpperSemicontinuousOn f s) (gmon : Antitone g) : LowerSemicontinuousOn (g ∘ f) s := fun x hx => hg.continuousAt.comp_upperSemicontinuousWithinAt_antitone (hf x hx) gmon #align continuous.comp_upper_semicontinuous_on_antitone Continuous.comp_upperSemicontinuousOn_antitone theorem Continuous.comp_upperSemicontinuous_antitone {g : γ → δ} {f : α → γ} (hg : Continuous g) (hf : UpperSemicontinuous f) (gmon : Antitone g) : LowerSemicontinuous (g ∘ f) := fun x => hg.continuousAt.comp_upperSemicontinuousAt_antitone (hf x) gmon #align continuous.comp_upper_semicontinuous_antitone Continuous.comp_upperSemicontinuous_antitone theorem UpperSemicontinuousAt.comp_continuousAt {f : α → β} {g : ι → α} {x : ι} (hf : UpperSemicontinuousAt f (g x)) (hg : ContinuousAt g x) : UpperSemicontinuousAt (fun x ↦ f (g x)) x := fun _ lt ↦ hg.eventually (hf _ lt) theorem UpperSemicontinuousAt.comp_continuousAt_of_eq {f : α → β} {g : ι → α} {y : α} {x : ι} (hf : UpperSemicontinuousAt f y) (hg : ContinuousAt g x) (hy : g x = y) : UpperSemicontinuousAt (fun x ↦ f (g x)) x := by rw [← hy] at hf exact comp_continuousAt hf hg theorem UpperSemicontinuous.comp_continuous {f : α → β} {g : ι → α} (hf : UpperSemicontinuous f) (hg : Continuous g) : UpperSemicontinuous fun x ↦ f (g x) := fun x ↦ (hf (g x)).comp_continuousAt hg.continuousAt end section variable {ι : Type} {γ : Type} [LinearOrderedAddCommMonoid γ] [TopologicalSpace γ] [OrderTopology γ] theorem UpperSemicontinuousWithinAt.add' {f g : α → γ} (hf : UpperSemicontinuousWithinAt f s x) (hg : UpperSemicontinuousWithinAt g s x) (hcont : ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : UpperSemicontinuousWithinAt (fun z => f z + g z) s x := @LowerSemicontinuousWithinAt.add' α _ x s γᵒᵈ _ _ _ _ _ hf hg hcont #align upper_semicontinuous_within_at.add' UpperSemicontinuousWithinAt.add' theorem UpperSemicontinuousAt.add' {f g : α → γ} (hf : UpperSemicontinuousAt f x) (hg : UpperSemicontinuousAt g x) (hcont : ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : UpperSemicontinuousAt (fun z => f z + g z) x := by simp_rw [← upperSemicontinuousWithinAt_univ_iff] at exact hf.add' hg hcont #align upper_semicontinuous_at.add' UpperSemicontinuousAt.add' theorem UpperSemicontinuousOn.add' {f g : α → γ} (hf : UpperSemicontinuousOn f s) (hg : UpperSemicontinuousOn g s) (hcont : ∀ x ∈ s, ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : UpperSemicontinuousOn (fun z => f z + g z) s := fun x hx => (hf x hx).add' (hg x hx) (hcont x hx) #align upper_semicontinuous_on.add' UpperSemicontinuousOn.add' theorem UpperSemicontinuous.add' {f g : α → γ} (hf : UpperSemicontinuous f) (hg : UpperSemicontinuous g) (hcont : ∀ x, ContinuousAt (fun p : γ × γ => p.1 + p.2) (f x, g x)) : UpperSemicontinuous fun z => f z + g z := fun x => (hf x).add' (hg x) (hcont x) #align upper_semicontinuous.add' UpperSemicontinuous.add' variable [ContinuousAdd γ] theorem UpperSemicontinuousWithinAt.add {f g : α → γ} (hf : UpperSemicontinuousWithinAt f s x) (hg : UpperSemicontinuousWithinAt g s x) : UpperSemicontinuousWithinAt (fun z => f z + g z) s x := hf.add' hg continuous_add.continuousAt #align upper_semicontinuous_within_at.add UpperSemicontinuousWithinAt.add theorem UpperSemicontinuousAt.add {f g : α → γ} (hf : UpperSemicontinuousAt f x) (hg : UpperSemicontinuousAt g x) : UpperSemicontinuousAt (fun z => f z + g z) x := hf.add' hg continuous_add.continuousAt #align upper_semicontinuous_at.add UpperSemicontinuousAt.add theorem UpperSemicontinuousOn.add {f g : α → γ} (hf : UpperSemicontinuousOn f s) (hg : UpperSemicontinuousOn g s) : UpperSemicontinuousOn (fun z => f z + g z) s := hf.add' hg fun _x _hx => continuous_add.continuousAt #align upper_semicontinuous_on.add UpperSemicontinuousOn.add theorem UpperSemicontinuous.add {f g : α → γ} (hf : UpperSemicontinuous f) (hg : UpperSemicontinuous g) : UpperSemicontinuous fun z => f z + g z := hf.add' hg fun _x => continuous_add.continuousAt #align upper_semicontinuous.add UpperSemicontinuous.add theorem upperSemicontinuousWithinAt_sum {f : ι → α → γ} {a : Finset ι} (ha : ∀ i ∈ a, UpperSemicontinuousWithinAt (f i) s x) : UpperSemicontinuousWithinAt (fun z => ∑ i ∈ a, f i z) s x := @lowerSemicontinuousWithinAt_sum α _ x s ι γᵒᵈ _ _ _ _ f a ha #align upper_semicontinuous_within_at_sum upperSemicontinuousWithinAt_sum	Mathlib/Topology/Semicontinuous.lean	1,116	1,120	theorem upperSemicontinuousAt_sum {f : ι → α → γ} {a : Finset ι} (ha : ∀ i ∈ a, UpperSemicontinuousAt (f i) x) : UpperSemicontinuousAt (fun z => ∑ i ∈ a, f i z) x := by	simp_rw [← upperSemicontinuousWithinAt_univ_iff] at * exact upperSemicontinuousWithinAt_sum ha
import Mathlib.Data.Fintype.Card import Mathlib.Order.UpperLower.Basic #align_import combinatorics.set_family.intersecting from "leanprover-community/mathlib"@"d90e4e186f1d18e375dcd4e5b5f6364b01cb3e46" open Finset variable {α : Type*} namespace Set section SemilatticeInf variable [SemilatticeInf α] [OrderBot α] {s t : Set α} {a b c : α} def Intersecting (s : Set α) : Prop := ∀ ⦃a⦄, a ∈ s → ∀ ⦃b⦄, b ∈ s → ¬Disjoint a b #align set.intersecting Set.Intersecting @[mono] theorem Intersecting.mono (h : t ⊆ s) (hs : s.Intersecting) : t.Intersecting := fun _a ha _b hb => hs (h ha) (h hb) #align set.intersecting.mono Set.Intersecting.mono theorem Intersecting.not_bot_mem (hs : s.Intersecting) : ⊥ ∉ s := fun h => hs h h disjoint_bot_left #align set.intersecting.not_bot_mem Set.Intersecting.not_bot_mem theorem Intersecting.ne_bot (hs : s.Intersecting) (ha : a ∈ s) : a ≠ ⊥ := ne_of_mem_of_not_mem ha hs.not_bot_mem #align set.intersecting.ne_bot Set.Intersecting.ne_bot theorem intersecting_empty : (∅ : Set α).Intersecting := fun _ => False.elim #align set.intersecting_empty Set.intersecting_empty @[simp]	Mathlib/Combinatorics/SetFamily/Intersecting.lean	61	61	theorem intersecting_singleton : ({a} : Set α).Intersecting ↔ a ≠ ⊥ := by	simp [Intersecting]
import Mathlib.Algebra.Group.Aut import Mathlib.Algebra.Group.Subgroup.Basic import Mathlib.Logic.Function.Basic #align_import group_theory.semidirect_product from "leanprover-community/mathlib"@"f7fc89d5d5ff1db2d1242c7bb0e9062ce47ef47c" variable (N : Type) (G : Type) {H : Type} [Group N] [Group G] [Group H] @[ext] structure SemidirectProduct (φ : G → MulAut N) where left : N right : G deriving DecidableEq #align semidirect_product SemidirectProduct -- Porting note: these lemmas are autogenerated by the inductive definition and are not -- in simple form due to the existence of mk_eq_inl_mul_inr attribute [nolint simpNF] SemidirectProduct.mk.injEq attribute [nolint simpNF] SemidirectProduct.mk.sizeOf_spec -- 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 #align semidirect_product.mul_left SemidirectProduct.mul_left @[simp] theorem mul_right (a b : N ⋊[φ] G) : (a * b).right = a.right * b.right := rfl #align semidirect_product.mul_right SemidirectProduct.mul_right instance : One (SemidirectProduct N G φ) where one := ⟨1, 1⟩ @[simp] theorem one_left : (1 : N ⋊[φ] G).left = 1 := rfl #align semidirect_product.one_left SemidirectProduct.one_left @[simp] theorem one_right : (1 : N ⋊[φ] G).right = 1 := rfl #align semidirect_product.one_right SemidirectProduct.one_right 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 #align semidirect_product.inv_left SemidirectProduct.inv_left @[simp] theorem inv_right (a : N ⋊[φ] G) : a⁻¹.right = a.right⁻¹ := rfl #align semidirect_product.inv_right SemidirectProduct.inv_right 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 _) mul_left_inv a := SemidirectProduct.ext _ _ (by simp) (by simp) instance : Inhabited (N ⋊[φ] G) := ⟨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] #align semidirect_product.inl SemidirectProduct.inl @[simp] theorem left_inl (n : N) : (inl n : N ⋊[φ] G).left = n := rfl #align semidirect_product.left_inl SemidirectProduct.left_inl @[simp] theorem right_inl (n : N) : (inl n : N ⋊[φ] G).right = 1 := rfl #align semidirect_product.right_inl SemidirectProduct.right_inl theorem inl_injective : Function.Injective (inl : N → N ⋊[φ] G) := Function.injective_iff_hasLeftInverse.2 ⟨left, left_inl⟩ #align semidirect_product.inl_injective SemidirectProduct.inl_injective @[simp] theorem inl_inj {n₁ n₂ : N} : (inl n₁ : N ⋊[φ] G) = inl n₂ ↔ n₁ = n₂ := inl_injective.eq_iff #align semidirect_product.inl_inj SemidirectProduct.inl_inj def inr : G →* N ⋊[φ] G where toFun g := ⟨1, g⟩ map_one' := rfl map_mul' := by intros; ext <;> simp #align semidirect_product.inr SemidirectProduct.inr @[simp] theorem left_inr (g : G) : (inr g : N ⋊[φ] G).left = 1 := rfl #align semidirect_product.left_inr SemidirectProduct.left_inr @[simp] theorem right_inr (g : G) : (inr g : N ⋊[φ] G).right = g := rfl #align semidirect_product.right_inr SemidirectProduct.right_inr theorem inr_injective : Function.Injective (inr : G → N ⋊[φ] G) := Function.injective_iff_hasLeftInverse.2 ⟨right, right_inr⟩ #align semidirect_product.inr_injective SemidirectProduct.inr_injective @[simp] theorem inr_inj {g₁ g₂ : G} : (inr g₁ : N ⋊[φ] G) = inr g₂ ↔ g₁ = g₂ := inr_injective.eq_iff #align semidirect_product.inr_inj SemidirectProduct.inr_inj theorem inl_aut (g : G) (n : N) : (inl (φ g n) : N ⋊[φ] G) = inr g * inl n * inr g⁻¹ := by ext <;> simp #align semidirect_product.inl_aut SemidirectProduct.inl_aut 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] #align semidirect_product.inl_aut_inv SemidirectProduct.inl_aut_inv @[simp] theorem mk_eq_inl_mul_inr (g : G) (n : N) : (⟨n, g⟩ : N ⋊[φ] G) = inl n * inr g := by ext <;> simp #align semidirect_product.mk_eq_inl_mul_inr SemidirectProduct.mk_eq_inl_mul_inr @[simp] theorem inl_left_mul_inr_right (x : N ⋊[φ] G) : inl x.left * inr x.right = x := by ext <;> simp #align semidirect_product.inl_left_mul_inr_right SemidirectProduct.inl_left_mul_inr_right def rightHom : N ⋊[φ] G →* G where toFun := SemidirectProduct.right map_one' := rfl map_mul' _ _ := rfl #align semidirect_product.right_hom SemidirectProduct.rightHom @[simp] theorem rightHom_eq_right : (rightHom : N ⋊[φ] G → G) = right := rfl #align semidirect_product.right_hom_eq_right SemidirectProduct.rightHom_eq_right @[simp] theorem rightHom_comp_inl : (rightHom : N ⋊[φ] G →* G).comp inl = 1 := by ext; simp [rightHom] #align semidirect_product.right_hom_comp_inl SemidirectProduct.rightHom_comp_inl @[simp] theorem rightHom_comp_inr : (rightHom : N ⋊[φ] G →* G).comp inr = MonoidHom.id _ := by ext; simp [rightHom] #align semidirect_product.right_hom_comp_inr SemidirectProduct.rightHom_comp_inr @[simp] theorem rightHom_inl (n : N) : rightHom (inl n : N ⋊[φ] G) = 1 := by simp [rightHom] #align semidirect_product.right_hom_inl SemidirectProduct.rightHom_inl @[simp]	Mathlib/GroupTheory/SemidirectProduct.lean	198	198	theorem rightHom_inr (g : G) : rightHom (inr g : N ⋊[φ] G) = g := by	simp [rightHom]
import Mathlib.Data.Nat.Defs import Mathlib.Data.Option.Basic import Mathlib.Data.List.Defs import Mathlib.Init.Data.List.Basic import Mathlib.Init.Data.List.Instances import Mathlib.Init.Data.List.Lemmas import Mathlib.Logic.Unique import Mathlib.Order.Basic import Mathlib.Tactic.Common #align_import data.list.basic from "leanprover-community/mathlib"@"65a1391a0106c9204fe45bc73a039f056558cb83" assert_not_exists Set.range assert_not_exists GroupWithZero assert_not_exists Ring 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} -- Porting note: Delete this attribute -- attribute [inline] List.head! instance uniqueOfIsEmpty [IsEmpty α] : Unique (List α) := { instInhabitedList with uniq := fun l => match l with \| [] => rfl \| a :: _ => isEmptyElim a } #align list.unique_of_is_empty List.uniqueOfIsEmpty 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 #align list.cons_ne_nil List.cons_ne_nil #align list.cons_ne_self List.cons_ne_self #align list.head_eq_of_cons_eq List.head_eq_of_cons_eqₓ -- implicits order #align list.tail_eq_of_cons_eq List.tail_eq_of_cons_eqₓ -- implicits order @[simp] theorem cons_injective {a : α} : Injective (cons a) := fun _ _ => tail_eq_of_cons_eq #align list.cons_injective List.cons_injective #align list.cons_inj List.cons_inj #align list.cons_eq_cons List.cons_eq_cons theorem singleton_injective : Injective fun a : α => [a] := fun _ _ h => (cons_eq_cons.1 h).1 #align list.singleton_injective List.singleton_injective theorem singleton_inj {a b : α} : [a] = [b] ↔ a = b := singleton_injective.eq_iff #align list.singleton_inj List.singleton_inj #align list.exists_cons_of_ne_nil List.exists_cons_of_ne_nil theorem set_of_mem_cons (l : List α) (a : α) : { x \| x ∈ a :: l } = insert a { x \| x ∈ l } := Set.ext fun _ => mem_cons #align list.set_of_mem_cons List.set_of_mem_cons #align list.mem_singleton_self List.mem_singleton_self #align list.eq_of_mem_singleton List.eq_of_mem_singleton #align list.mem_singleton List.mem_singleton #align list.mem_of_mem_cons_of_mem List.mem_of_mem_cons_of_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⟩)) #align decidable.list.eq_or_ne_mem_of_mem Decidable.List.eq_or_ne_mem_of_mem #align list.eq_or_ne_mem_of_mem List.eq_or_ne_mem_of_mem #align list.not_mem_append List.not_mem_append #align list.ne_nil_of_mem List.ne_nil_of_mem lemma mem_pair {a b c : α} : a ∈ [b, c] ↔ a = b ∨ a = c := by rw [mem_cons, mem_singleton] @[deprecated (since := "2024-03-23")] alias mem_split := append_of_mem #align list.mem_split List.append_of_mem #align list.mem_of_ne_of_mem List.mem_of_ne_of_mem #align list.ne_of_not_mem_cons List.ne_of_not_mem_cons #align list.not_mem_of_not_mem_cons List.not_mem_of_not_mem_cons #align list.not_mem_cons_of_ne_of_not_mem List.not_mem_cons_of_ne_of_not_mem #align list.ne_and_not_mem_of_not_mem_cons List.ne_and_not_mem_of_not_mem_cons #align list.mem_map List.mem_map #align list.exists_of_mem_map List.exists_of_mem_map #align list.mem_map_of_mem List.mem_map_of_memₓ -- implicits order -- The simpNF linter says that the LHS can be simplified via `List.mem_map`. -- However this is a higher priority lemma. -- 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 _⟩ #align list.mem_map_of_injective List.mem_map_of_injective @[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 _⟩⟩ #align function.involutive.exists_mem_and_apply_eq_iff Function.Involutive.exists_mem_and_apply_eq_iff 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] #align list.mem_map_of_involutive List.mem_map_of_involutive #align list.forall_mem_map_iff List.forall_mem_map_iffₓ -- universe order #align list.map_eq_nil List.map_eq_nilₓ -- universe order attribute [simp] List.mem_join #align list.mem_join List.mem_join #align list.exists_of_mem_join List.exists_of_mem_join #align list.mem_join_of_mem List.mem_join_of_memₓ -- implicits order attribute [simp] List.mem_bind #align list.mem_bind List.mem_bindₓ -- implicits order -- Porting note: bExists in Lean3, And in Lean4 #align list.exists_of_mem_bind List.exists_of_mem_bindₓ -- implicits order #align list.mem_bind_of_mem List.mem_bind_of_memₓ -- implicits order #align list.bind_map List.bind_mapₓ -- implicits order theorem map_bind (g : β → List γ) (f : α → β) : ∀ l : List α, (List.map f l).bind g = l.bind fun a => g (f a) \| [] => rfl \| a :: l => by simp only [cons_bind, map_cons, map_bind _ _ l] #align list.map_bind List.map_bind #align list.length_eq_zero List.length_eq_zero #align list.length_singleton List.length_singleton #align list.length_pos_of_mem List.length_pos_of_mem #align list.exists_mem_of_length_pos List.exists_mem_of_length_pos #align list.length_pos_iff_exists_mem List.length_pos_iff_exists_mem alias ⟨ne_nil_of_length_pos, length_pos_of_ne_nil⟩ := length_pos #align list.ne_nil_of_length_pos List.ne_nil_of_length_pos #align list.length_pos_of_ne_nil List.length_pos_of_ne_nil theorem length_pos_iff_ne_nil {l : List α} : 0 < length l ↔ l ≠ [] := ⟨ne_nil_of_length_pos, length_pos_of_ne_nil⟩ #align list.length_pos_iff_ne_nil List.length_pos_iff_ne_nil #align list.exists_mem_of_ne_nil List.exists_mem_of_ne_nil #align list.length_eq_one List.length_eq_one 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⟩ #align list.exists_of_length_succ List.exists_of_length_succ @[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 · exact Subsingleton.elim _ _ · apply ih; simpa using hl #align list.length_injective_iff List.length_injective_iff @[simp default+1] -- Porting note: this used to be just @[simp] lemma length_injective [Subsingleton α] : Injective (length : List α → ℕ) := length_injective_iff.mpr inferInstance #align list.length_injective List.length_injective 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⟩ #align list.length_eq_two List.length_eq_two 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⟩ #align list.length_eq_three List.length_eq_three #align list.sublist.length_le List.Sublist.length_le -- ADHOC Porting note: instance from Lean3 core instance instSingletonList : Singleton α (List α) := ⟨fun x => [x]⟩ #align list.has_singleton List.instSingletonList -- ADHOC Porting note: instance from Lean3 core instance [DecidableEq α] : Insert α (List α) := ⟨List.insert⟩ -- ADHOC Porting note: instance from Lean3 core instance [DecidableEq α] : LawfulSingleton α (List α) := { insert_emptyc_eq := fun x => show (if x ∈ ([] : List α) then [] else [x]) = [x] from if_neg (not_mem_nil _) } #align list.empty_eq List.empty_eq theorem singleton_eq (x : α) : ({x} : List α) = [x] := rfl #align list.singleton_eq List.singleton_eq theorem insert_neg [DecidableEq α] {x : α} {l : List α} (h : x ∉ l) : Insert.insert x l = x :: l := insert_of_not_mem h #align list.insert_neg List.insert_neg theorem insert_pos [DecidableEq α] {x : α} {l : List α} (h : x ∈ l) : Insert.insert x l = l := insert_of_mem h #align list.insert_pos List.insert_pos 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] #align list.doubleton_eq List.doubleton_eq #align list.forall_mem_nil List.forall_mem_nil #align list.forall_mem_cons List.forall_mem_cons 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 #align list.forall_mem_of_forall_mem_cons List.forall_mem_of_forall_mem_cons #align list.forall_mem_singleton List.forall_mem_singleton #align list.forall_mem_append List.forall_mem_append #align list.not_exists_mem_nil List.not_exists_mem_nilₓ -- bExists change -- Porting note: bExists in Lean3 and And in Lean4 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⟩ #align list.exists_mem_cons_of List.exists_mem_cons_ofₓ -- bExists change -- Porting note: bExists in Lean3 and And in Lean4 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⟩ #align list.exists_mem_cons_of_exists List.exists_mem_cons_of_existsₓ -- bExists change -- Porting note: bExists in Lean3 and And in Lean4 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⟩ #align list.or_exists_of_exists_mem_cons List.or_exists_of_exists_mem_consₓ -- bExists change 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 #align list.exists_mem_cons_iff List.exists_mem_cons_iff instance : IsTrans (List α) Subset where trans := fun _ _ _ => List.Subset.trans #align list.subset_def List.subset_def #align list.subset_append_of_subset_left List.subset_append_of_subset_left #align list.subset_append_of_subset_right List.subset_append_of_subset_right #align list.cons_subset List.cons_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⟩ #align list.cons_subset_of_subset_of_mem List.cons_subset_of_subset_of_mem 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 _) #align list.append_subset_of_subset_of_subset List.append_subset_of_subset_of_subset -- Porting note: in Batteries #align list.append_subset_iff List.append_subset alias ⟨eq_nil_of_subset_nil, _⟩ := subset_nil #align list.eq_nil_of_subset_nil List.eq_nil_of_subset_nil #align list.eq_nil_iff_forall_not_mem List.eq_nil_iff_forall_not_mem #align list.map_subset List.map_subset 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 f hx)) with ⟨x', hx', hxx'⟩ cases h hxx'; exact hx' #align list.map_subset_iff List.map_subset_iff theorem append_eq_has_append {L₁ L₂ : List α} : List.append L₁ L₂ = L₁ ++ L₂ := rfl #align list.append_eq_has_append List.append_eq_has_append #align list.singleton_append List.singleton_append #align list.append_ne_nil_of_ne_nil_left List.append_ne_nil_of_ne_nil_left #align list.append_ne_nil_of_ne_nil_right List.append_ne_nil_of_ne_nil_right #align list.append_eq_nil List.append_eq_nil -- Porting note: in Batteries #align list.nil_eq_append_iff List.nil_eq_append @[deprecated (since := "2024-03-24")] alias append_eq_cons_iff := append_eq_cons #align list.append_eq_cons_iff List.append_eq_cons @[deprecated (since := "2024-03-24")] alias cons_eq_append_iff := cons_eq_append #align list.cons_eq_append_iff List.cons_eq_append #align list.append_eq_append_iff List.append_eq_append_iff #align list.take_append_drop List.take_append_drop #align list.append_inj List.append_inj #align list.append_inj_right List.append_inj_rightₓ -- implicits order #align list.append_inj_left List.append_inj_leftₓ -- implicits order #align list.append_inj' List.append_inj'ₓ -- implicits order #align list.append_inj_right' List.append_inj_right'ₓ -- implicits order #align list.append_inj_left' List.append_inj_left'ₓ -- implicits order @[deprecated (since := "2024-01-18")] alias append_left_cancel := append_cancel_left #align list.append_left_cancel List.append_cancel_left @[deprecated (since := "2024-01-18")] alias append_right_cancel := append_cancel_right #align list.append_right_cancel List.append_cancel_right @[simp] theorem append_left_eq_self {x y : List α} : x ++ y = y ↔ x = [] := by rw [← append_left_inj (s₁ := x), nil_append] @[simp] theorem self_eq_append_left {x y : List α} : y = x ++ y ↔ x = [] := by rw [eq_comm, append_left_eq_self] @[simp] theorem append_right_eq_self {x y : List α} : x ++ y = x ↔ y = [] := by rw [← append_right_inj (t₁ := y), append_nil] @[simp] theorem self_eq_append_right {x y : List α} : x = x ++ y ↔ y = [] := by rw [eq_comm, append_right_eq_self] theorem append_right_injective (s : List α) : Injective fun t ↦ s ++ t := fun _ _ ↦ append_cancel_left #align list.append_right_injective List.append_right_injective #align list.append_right_inj List.append_right_inj theorem append_left_injective (t : List α) : Injective fun s ↦ s ++ t := fun _ _ ↦ append_cancel_right #align list.append_left_injective List.append_left_injective #align list.append_left_inj List.append_left_inj #align list.map_eq_append_split List.map_eq_append_split @[simp] lemma replicate_zero (a : α) : replicate 0 a = [] := rfl #align list.replicate_zero List.replicate_zero attribute [simp] replicate_succ #align list.replicate_succ List.replicate_succ lemma replicate_one (a : α) : replicate 1 a = [a] := rfl #align list.replicate_one List.replicate_one #align list.length_replicate List.length_replicate #align list.mem_replicate List.mem_replicate #align list.eq_of_mem_replicate List.eq_of_mem_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] #align list.eq_replicate_length List.eq_replicate_length #align list.eq_replicate_of_mem List.eq_replicate_of_mem #align list.eq_replicate List.eq_replicate theorem replicate_add (m n) (a : α) : replicate (m + n) a = replicate m a ++ replicate n a := by induction m <;> simp [, succ_add, replicate] #align list.replicate_add List.replicate_add theorem replicate_succ' (n) (a : α) : replicate (n + 1) a = replicate n a ++ [a] := replicate_add n 1 a #align list.replicate_succ' List.replicate_succ' theorem replicate_subset_singleton (n) (a : α) : replicate n a ⊆ [a] := fun _ h => mem_singleton.2 (eq_of_mem_replicate h) #align list.replicate_subset_singleton List.replicate_subset_singleton theorem subset_singleton_iff {a : α} {L : List α} : L ⊆ [a] ↔ ∃ n, L = replicate n a := by simp only [eq_replicate, subset_def, mem_singleton, exists_eq_left'] #align list.subset_singleton_iff List.subset_singleton_iff @[simp] theorem map_replicate (f : α → β) (n) (a : α) : map f (replicate n a) = replicate n (f a) := by induction n <;> [rfl; simp only [, replicate, map]] #align list.map_replicate List.map_replicate @[simp] theorem tail_replicate (a : α) (n) : tail (replicate n a) = replicate (n - 1) a := by cases n <;> rfl #align list.tail_replicate List.tail_replicate @[simp] theorem join_replicate_nil (n : ℕ) : join (replicate n []) = @nil α := by induction n <;> [rfl; simp only [, replicate, join, append_nil]] #align list.join_replicate_nil List.join_replicate_nil theorem replicate_right_injective {n : ℕ} (hn : n ≠ 0) : Injective (@replicate α n) := fun _ _ h => (eq_replicate.1 h).2 _ <\| mem_replicate.2 ⟨hn, rfl⟩ #align list.replicate_right_injective List.replicate_right_injective 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 #align list.replicate_right_inj List.replicate_right_inj @[simp] 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] #align list.replicate_right_inj' List.replicate_right_inj' theorem replicate_left_injective (a : α) : Injective (replicate · a) := LeftInverse.injective (length_replicate · a) #align list.replicate_left_injective List.replicate_left_injective @[simp] theorem replicate_left_inj {a : α} {n m : ℕ} : replicate n a = replicate m a ↔ n = m := (replicate_left_injective a).eq_iff #align list.replicate_left_inj List.replicate_left_inj @[simp] theorem head_replicate (n : ℕ) (a : α) (h) : head (replicate n a) h = a := by cases n <;> simp at h ⊢ theorem mem_pure (x y : α) : x ∈ (pure y : List α) ↔ x = y := by simp #align list.mem_pure List.mem_pure @[simp] theorem bind_eq_bind {α β} (f : α → List β) (l : List α) : l >>= f = l.bind f := rfl #align list.bind_eq_bind List.bind_eq_bind #align list.bind_append List.append_bind #align list.concat_nil List.concat_nil #align list.concat_cons List.concat_cons #align list.concat_eq_append List.concat_eq_append #align list.init_eq_of_concat_eq List.init_eq_of_concat_eq #align list.last_eq_of_concat_eq List.last_eq_of_concat_eq #align list.concat_ne_nil List.concat_ne_nil #align list.concat_append List.concat_append #align list.length_concat List.length_concat #align list.append_concat List.append_concat #align list.reverse_nil List.reverse_nil #align list.reverse_core List.reverseAux -- Porting note: Do we need this? attribute [local simp] reverseAux #align list.reverse_cons List.reverse_cons #align list.reverse_core_eq List.reverseAux_eq theorem reverse_cons' (a : α) (l : List α) : reverse (a :: l) = concat (reverse l) a := by simp only [reverse_cons, concat_eq_append] #align list.reverse_cons' List.reverse_cons' theorem reverse_concat' (l : List α) (a : α) : (l ++ [a]).reverse = a :: l.reverse := by rw [reverse_append]; rfl -- Porting note (#10618): simp can prove this -- @[simp] theorem reverse_singleton (a : α) : reverse [a] = [a] := rfl #align list.reverse_singleton List.reverse_singleton #align list.reverse_append List.reverse_append #align list.reverse_concat List.reverse_concat #align list.reverse_reverse List.reverse_reverse @[simp] theorem reverse_involutive : Involutive (@reverse α) := reverse_reverse #align list.reverse_involutive List.reverse_involutive @[simp] theorem reverse_injective : Injective (@reverse α) := reverse_involutive.injective #align list.reverse_injective List.reverse_injective theorem reverse_surjective : Surjective (@reverse α) := reverse_involutive.surjective #align list.reverse_surjective List.reverse_surjective theorem reverse_bijective : Bijective (@reverse α) := reverse_involutive.bijective #align list.reverse_bijective List.reverse_bijective @[simp] theorem reverse_inj {l₁ l₂ : List α} : reverse l₁ = reverse l₂ ↔ l₁ = l₂ := reverse_injective.eq_iff #align list.reverse_inj List.reverse_inj theorem reverse_eq_iff {l l' : List α} : l.reverse = l' ↔ l = l'.reverse := reverse_involutive.eq_iff #align list.reverse_eq_iff List.reverse_eq_iff #align list.reverse_eq_nil List.reverse_eq_nil_iff 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] #align list.concat_eq_reverse_cons List.concat_eq_reverse_cons #align list.length_reverse List.length_reverse -- Porting note: This one was @[simp] in mathlib 3, -- but Lean contains a competing simp lemma reverse_map. -- For now we remove @[simp] to avoid simplification loops. -- TODO: Change Lean lemma to match mathlib 3? theorem map_reverse (f : α → β) (l : List α) : map f (reverse l) = reverse (map f l) := (reverse_map f l).symm #align list.map_reverse List.map_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] #align list.map_reverse_core List.map_reverseAux #align list.mem_reverse List.mem_reverse @[simp] theorem reverse_replicate (n) (a : α) : reverse (replicate n a) = replicate n a := eq_replicate.2 ⟨by rw [length_reverse, length_replicate], fun b h => eq_of_mem_replicate (mem_reverse.1 h)⟩ #align list.reverse_replicate List.reverse_replicate -- Porting note: this does not work as desired -- attribute [simp] List.isEmpty theorem isEmpty_iff_eq_nil {l : List α} : l.isEmpty ↔ l = [] := by cases l <;> simp [isEmpty] #align list.empty_iff_eq_nil List.isEmpty_iff_eq_nil #align list.length_init List.length_dropLast @[simp] theorem getLast_cons {a : α} {l : List α} : ∀ h : l ≠ nil, getLast (a :: l) (cons_ne_nil a l) = getLast l h := by induction l <;> intros · contradiction · rfl #align list.last_cons List.getLast_cons theorem getLast_append_singleton {a : α} (l : List α) : getLast (l ++ [a]) (append_ne_nil_of_ne_nil_right l _ (cons_ne_nil a _)) = a := by simp only [getLast_append] #align list.last_append_singleton List.getLast_append_singleton -- Porting note: name should be fixed upstream theorem getLast_append' (l₁ l₂ : List α) (h : l₂ ≠ []) : getLast (l₁ ++ l₂) (append_ne_nil_of_ne_nil_right l₁ l₂ h) = getLast l₂ h := by induction' l₁ with _ _ ih · simp · simp only [cons_append] rw [List.getLast_cons] exact ih #align list.last_append List.getLast_append' theorem getLast_concat' {a : α} (l : List α) : getLast (concat l a) (concat_ne_nil a l) = a := getLast_concat .. #align list.last_concat List.getLast_concat' @[simp] theorem getLast_singleton' (a : α) : getLast [a] (cons_ne_nil a []) = a := rfl #align list.last_singleton List.getLast_singleton' -- Porting note (#10618): simp can prove this -- @[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 #align list.last_cons_cons List.getLast_cons_cons theorem dropLast_append_getLast : ∀ {l : List α} (h : l ≠ []), dropLast l ++ [getLast l h] = l \| [], h => absurd rfl h \| [a], 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) #align list.init_append_last List.dropLast_append_getLast	Mathlib/Data/List/Basic.lean	662	663	theorem getLast_congr {l₁ l₂ : List α} (h₁ : l₁ ≠ []) (h₂ : l₂ ≠ []) (h₃ : l₁ = l₂) : getLast l₁ h₁ = getLast l₂ h₂ := by	subst l₁; rfl
import Mathlib.Algebra.Group.Basic import Mathlib.Algebra.Group.Pi.Basic import Mathlib.Order.Fin import Mathlib.Order.PiLex import Mathlib.Order.Interval.Set.Basic #align_import data.fin.tuple.basic from "leanprover-community/mathlib"@"ef997baa41b5c428be3fb50089a7139bf4ee886b" assert_not_exists MonoidWithZero universe u v namespace Fin variable {m n : ℕ} open Function section Tuple 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 #align fin.tuple0_le Fin.tuple0_le variable {α : Fin (n + 1) → Type 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) def tail (q : ∀ i, α i) : ∀ i : Fin n, α i.succ := fun i ↦ q i.succ #align fin.tail Fin.tail theorem tail_def {n : ℕ} {α : Fin (n + 1) → Type} {q : ∀ i, α i} : (tail fun k : Fin (n + 1) ↦ q k) = fun k : Fin n ↦ q k.succ := rfl #align fin.tail_def Fin.tail_def def cons (x : α 0) (p : ∀ i : Fin n, α i.succ) : ∀ i, α i := fun j ↦ Fin.cases x p j #align fin.cons Fin.cons @[simp] theorem tail_cons : tail (cons x p) = p := by simp (config := { unfoldPartialApp := true }) [tail, cons] #align fin.tail_cons Fin.tail_cons @[simp] theorem cons_succ : cons x p i.succ = p i := by simp [cons] #align fin.cons_succ Fin.cons_succ @[simp] theorem cons_zero : cons x p 0 = x := by simp [cons] #align fin.cons_zero Fin.cons_zero @[simp] theorem cons_one {α : Fin (n + 2) → Type} (x : α 0) (p : ∀ i : Fin n.succ, α i.succ) : cons x p 1 = p 0 := by rw [← cons_succ x p]; rfl @[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_noteq h', update_noteq this, cons_succ] #align fin.cons_update Fin.cons_update 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)⟩ #align fin.cons_injective2 Fin.cons_injective2 @[simp] theorem cons_eq_cons {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 #align fin.cons_eq_cons Fin.cons_eq_cons theorem cons_left_injective (x : ∀ i : Fin n, α i.succ) : Function.Injective fun x₀ ↦ cons x₀ x := cons_injective2.left _ #align fin.cons_left_injective Fin.cons_left_injective theorem cons_right_injective (x₀ : α 0) : Function.Injective (cons x₀) := cons_injective2.right _ #align fin.cons_right_injective Fin.cons_right_injective 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_noteq, Ne, not_false_iff] let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ, cons_succ] #align fin.update_cons_zero Fin.update_cons_zero @[simp, nolint simpNF] -- Porting note: linter claims LHS doesn't simplify 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] #align fin.cons_self_tail Fin.cons_self_tail -- Porting note: Mathport removes `_root_`? @[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) #align fin.cons_cases Fin.consCases @[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 #align fin.cons_cases_cons Fin.consCases_cons @[elab_as_elim] def consInduction {α : Type} {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 \| n + 1, x => consCases (fun x₀ x ↦ h _ _ <\| consInduction h0 h _) x #align fin.cons_induction Fin.consInductionₓ -- Porting note: universes 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) #align fin.cons_injective_of_injective Fin.cons_injective_of_injective 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, succ_ne_zero] at h · simpa [Function.comp] using h.comp (Fin.succ_injective _) #align fin.cons_injective_iff Fin.cons_injective_iff @[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⟩ #align fin.forall_fin_zero_pi Fin.forall_fin_zero_pi @[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⟩⟩ #align fin.exists_fin_zero_pi Fin.exists_fin_zero_pi 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⟩ #align fin.forall_fin_succ_pi Fin.forall_fin_succ_pi 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⟩⟩ #align fin.exists_fin_succ_pi Fin.exists_fin_succ_pi @[simp] theorem tail_update_zero : tail (update q 0 z) = tail q := by ext j simp [tail, Fin.succ_ne_zero] #align fin.tail_update_zero Fin.tail_update_zero @[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] #align fin.tail_update_succ Fin.tail_update_succ theorem comp_cons {α : Type} {β : Type} (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] #align fin.comp_cons Fin.comp_cons theorem comp_tail {α : Type} {β : Type} (g : α → β) (q : Fin n.succ → α) : g ∘ tail q = tail (g ∘ q) := by ext j simp [tail] #align fin.comp_tail Fin.comp_tail 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] #align fin.le_cons Fin.le_cons 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 #align fin.cons_le Fin.cons_le 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] #align fin.cons_le_cons Fin.cons_le_cons theorem pi_lex_lt_cons_cons {x₀ y₀ : α 0} {x y : ∀ i : Fin n, α i.succ} (s : ∀ {i : Fin n.succ}, α i → α i → Prop) : Pi.Lex (· < ·) (@s) (Fin.cons x₀ x) (Fin.cons y₀ y) ↔ s x₀ y₀ ∨ x₀ = y₀ ∧ Pi.Lex (· < ·) (@fun i : Fin n ↦ @s i.succ) x y := by simp_rw [Pi.Lex, Fin.exists_fin_succ, Fin.cons_succ, Fin.cons_zero, Fin.forall_fin_succ] simp [and_assoc, exists_and_left] #align fin.pi_lex_lt_cons_cons Fin.pi_lex_lt_cons_cons 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 #align fin.range_fin_succ Fin.range_fin_succ @[simp] theorem range_cons {α : Type*} {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] #align fin.range_cons Fin.range_cons section InsertNth variable {α : Fin (n + 1) → Type u} {β : Type v} @[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 _ _ <\| (Ne.lt_or_lt hj).resolve_left hlt) (p _) #align fin.succ_above_cases Fin.succAboveCases theorem forall_iff_succAbove {p : Fin (n + 1) → Prop} (i : Fin (n + 1)) : (∀ j, p j) ↔ p i ∧ ∀ j, p (i.succAbove j) := ⟨fun h ↦ ⟨h _, fun _ ↦ h _⟩, fun h ↦ succAboveCases i h.1 h.2⟩ #align fin.forall_iff_succ_above Fin.forall_iff_succAbove 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 #align fin.insert_nth Fin.insertNth @[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] #align fin.insert_nth_apply_same Fin.insertNth_apply_same @[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 H₁ H₂; revert H₂ generalize hk : pred (succAbove i j) H₁ = k erw [pred_succAbove _ _ (le_of_not_lt hlt)] at hk; cases hk intro; rfl #align fin.insert_nth_apply_succ_above Fin.insertNth_apply_succAbove @[simp] theorem succAbove_cases_eq_insertNth : @succAboveCases.{u + 1} = @insertNth.{u} := rfl #align fin.succ_above_cases_eq_insert_nth Fin.succAbove_cases_eq_insertNth @[simp] theorem insertNth_comp_succAbove (i : Fin (n + 1)) (x : β) (p : Fin n → β) : insertNth i x p ∘ i.succAbove = p := funext (by unfold comp; exact insertNth_apply_succAbove i _ _) #align fin.insert_nth_comp_succ_above Fin.insertNth_comp_succAbove theorem insertNth_eq_iff {i : Fin (n + 1)} {x : α i} {p : ∀ j, α (i.succAbove j)} {q : ∀ j, α j} : i.insertNth x p = q ↔ q i = x ∧ p = fun j ↦ q (i.succAbove j) := by simp [funext_iff, forall_iff_succAbove i, eq_comm] #align fin.insert_nth_eq_iff Fin.insertNth_eq_iff theorem eq_insertNth_iff {i : Fin (n + 1)} {x : α i} {p : ∀ j, α (i.succAbove j)} {q : ∀ j, α j} : q = i.insertNth x p ↔ q i = x ∧ p = fun j ↦ q (i.succAbove j) := eq_comm.trans insertNth_eq_iff #align fin.eq_insert_nth_iff Fin.eq_insertNth_iff 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 h.ne, dif_pos h] #align fin.insert_nth_apply_below Fin.insertNth_apply_below	Mathlib/Data/Fin/Tuple/Basic.lean	827	831	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 h.ne', dif_neg h.not_lt]
import Mathlib.Data.Finset.Lattice import Mathlib.Data.Fintype.Vector import Mathlib.Data.Multiset.Sym #align_import data.finset.sym from "leanprover-community/mathlib"@"02ba8949f486ebecf93fe7460f1ed0564b5e442c" namespace Finset variable {α : Type*} @[simps] protected def sym2 (s : Finset α) : Finset (Sym2 α) := ⟨s.1.sym2, s.2.sym2⟩ #align finset.sym2 Finset.sym2 section variable {s t : Finset α} {a b : α} theorem mk_mem_sym2_iff : s(a, b) ∈ s.sym2 ↔ a ∈ s ∧ b ∈ s := by rw [mem_mk, sym2_val, Multiset.mk_mem_sym2_iff, mem_mk, mem_mk] #align finset.mk_mem_sym2_iff Finset.mk_mem_sym2_iff @[simp] theorem mem_sym2_iff {m : Sym2 α} : m ∈ s.sym2 ↔ ∀ a ∈ m, a ∈ s := by rw [mem_mk, sym2_val, Multiset.mem_sym2_iff] simp only [mem_val] #align finset.mem_sym2_iff Finset.mem_sym2_iff instance _root_.Sym2.instFintype [Fintype α] : Fintype (Sym2 α) where elems := Finset.univ.sym2 complete := fun x ↦ by rw [mem_sym2_iff]; exact (fun a _ ↦ mem_univ a) -- Note(kmill): Using a default argument to make this simp lemma more general. @[simp] theorem sym2_univ [Fintype α] (inst : Fintype (Sym2 α) := Sym2.instFintype) : (univ : Finset α).sym2 = univ := by ext simp only [mem_sym2_iff, mem_univ, implies_true] #align finset.sym2_univ Finset.sym2_univ @[simp, mono] theorem sym2_mono (h : s ⊆ t) : s.sym2 ⊆ t.sym2 := by rw [← val_le_iff, sym2_val, sym2_val] apply Multiset.sym2_mono rwa [val_le_iff] #align finset.sym2_mono Finset.sym2_mono theorem monotone_sym2 : Monotone (Finset.sym2 : Finset α → _) := fun _ _ => sym2_mono theorem injective_sym2 : Function.Injective (Finset.sym2 : Finset α → _) := by intro s t h ext x simpa using congr(s(x, x) ∈ $h) theorem strictMono_sym2 : StrictMono (Finset.sym2 : Finset α → _) := monotone_sym2.strictMono_of_injective injective_sym2 theorem sym2_toFinset [DecidableEq α] (m : Multiset α) : m.toFinset.sym2 = m.sym2.toFinset := by ext z refine z.ind fun x y ↦ ?_ simp only [mk_mem_sym2_iff, Multiset.mem_toFinset, Multiset.mk_mem_sym2_iff] @[simp] theorem sym2_empty : (∅ : Finset α).sym2 = ∅ := rfl #align finset.sym2_empty Finset.sym2_empty @[simp] theorem sym2_eq_empty : s.sym2 = ∅ ↔ s = ∅ := by rw [← val_eq_zero, sym2_val, Multiset.sym2_eq_zero_iff, val_eq_zero] #align finset.sym2_eq_empty Finset.sym2_eq_empty @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem sym2_nonempty : s.sym2.Nonempty ↔ s.Nonempty := by rw [← not_iff_not] simp_rw [not_nonempty_iff_eq_empty, sym2_eq_empty] #align finset.sym2_nonempty Finset.sym2_nonempty protected alias ⟨_, Nonempty.sym2⟩ := sym2_nonempty #align finset.nonempty.sym2 Finset.Nonempty.sym2 @[simp] theorem sym2_singleton (a : α) : ({a} : Finset α).sym2 = {Sym2.diag a} := rfl #align finset.sym2_singleton Finset.sym2_singleton theorem card_sym2 (s : Finset α) : s.sym2.card = Nat.choose (s.card + 1) 2 := by rw [card_def, sym2_val, Multiset.card_sym2, ← card_def] #align finset.card_sym2 Finset.card_sym2 end variable [DecidableEq α] {s t : Finset α} {a b : α} theorem sym2_eq_image : s.sym2 = (s ×ˢ s).image Sym2.mk := by ext z refine z.ind fun x y ↦ ?_ rw [mk_mem_sym2_iff, mem_image] constructor · intro h use (x, y) simp only [mem_product, h, and_self, true_and] · rintro ⟨⟨a, b⟩, h⟩ simp only [mem_product, Sym2.eq_iff] at h obtain ⟨h, (⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩)⟩ := h <;> simp [h] theorem isDiag_mk_of_mem_diag {a : α × α} (h : a ∈ s.diag) : (Sym2.mk a).IsDiag := (Sym2.isDiag_iff_proj_eq _).2 (mem_diag.1 h).2 #align finset.is_diag_mk_of_mem_diag Finset.isDiag_mk_of_mem_diag theorem not_isDiag_mk_of_mem_offDiag {a : α × α} (h : a ∈ s.offDiag) : ¬ (Sym2.mk a).IsDiag := by rw [Sym2.isDiag_iff_proj_eq] exact (mem_offDiag.1 h).2.2 #align finset.not_is_diag_mk_of_mem_off_diag Finset.not_isDiag_mk_of_mem_offDiag section Sym2 variable {m : Sym2 α} -- Porting note: add this lemma and remove simp in the next lemma since simpNF lint -- warns that its LHS is not in normal form @[simp]	Mathlib/Data/Finset/Sym.lean	152	154	theorem diag_mem_sym2_mem_iff : (∀ b, b ∈ Sym2.diag a → b ∈ s) ↔ a ∈ s := by	rw [← mem_sym2_iff] exact mk_mem_sym2_iff.trans <\| and_self_iff
import Mathlib.Order.Interval.Set.Image import Mathlib.Order.CompleteLatticeIntervals import Mathlib.Topology.Order.DenselyOrdered import Mathlib.Topology.Order.Monotone #align_import topology.algebra.order.intermediate_value from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" open Filter OrderDual TopologicalSpace Function Set open Topology Filter universe u v w section variable {X : Type u} {α : Type v} [TopologicalSpace X] [LinearOrder α] [TopologicalSpace α] [OrderClosedTopology α] theorem intermediate_value_univ₂ [PreconnectedSpace X] {a b : X} {f g : X → α} (hf : Continuous f) (hg : Continuous g) (ha : f a ≤ g a) (hb : g b ≤ f b) : ∃ x, f x = g x := by obtain ⟨x, _, hfg, hgf⟩ : (univ ∩ { x \| f x ≤ g x ∧ g x ≤ f x }).Nonempty := isPreconnected_closed_iff.1 PreconnectedSpace.isPreconnected_univ _ _ (isClosed_le hf hg) (isClosed_le hg hf) (fun _ _ => le_total _ _) ⟨a, trivial, ha⟩ ⟨b, trivial, hb⟩ exact ⟨x, le_antisymm hfg hgf⟩ #align intermediate_value_univ₂ intermediate_value_univ₂ theorem intermediate_value_univ₂_eventually₁ [PreconnectedSpace X] {a : X} {l : Filter X} [NeBot l] {f g : X → α} (hf : Continuous f) (hg : Continuous g) (ha : f a ≤ g a) (he : g ≤ᶠ[l] f) : ∃ x, f x = g x := let ⟨_, h⟩ := he.exists; intermediate_value_univ₂ hf hg ha h #align intermediate_value_univ₂_eventually₁ intermediate_value_univ₂_eventually₁ theorem intermediate_value_univ₂_eventually₂ [PreconnectedSpace X] {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] {f g : X → α} (hf : Continuous f) (hg : Continuous g) (he₁ : f ≤ᶠ[l₁] g) (he₂ : g ≤ᶠ[l₂] f) : ∃ x, f x = g x := let ⟨_, h₁⟩ := he₁.exists let ⟨_, h₂⟩ := he₂.exists intermediate_value_univ₂ hf hg h₁ h₂ #align intermediate_value_univ₂_eventually₂ intermediate_value_univ₂_eventually₂ theorem IsPreconnected.intermediate_value₂ {s : Set X} (hs : IsPreconnected s) {a b : X} (ha : a ∈ s) (hb : b ∈ s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (ha' : f a ≤ g a) (hb' : g b ≤ f b) : ∃ x ∈ s, f x = g x := let ⟨x, hx⟩ := @intermediate_value_univ₂ s α _ _ _ _ (Subtype.preconnectedSpace hs) ⟨a, ha⟩ ⟨b, hb⟩ _ _ (continuousOn_iff_continuous_restrict.1 hf) (continuousOn_iff_continuous_restrict.1 hg) ha' hb' ⟨x, x.2, hx⟩ #align is_preconnected.intermediate_value₂ IsPreconnected.intermediate_value₂ theorem IsPreconnected.intermediate_value₂_eventually₁ {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (ha' : f a ≤ g a) (he : g ≤ᶠ[l] f) : ∃ x ∈ s, f x = g x := by rw [continuousOn_iff_continuous_restrict] at hf hg obtain ⟨b, h⟩ := @intermediate_value_univ₂_eventually₁ _ _ _ _ _ _ (Subtype.preconnectedSpace hs) ⟨a, ha⟩ _ (comap_coe_neBot_of_le_principal hl) _ _ hf hg ha' (he.comap _) exact ⟨b, b.prop, h⟩ #align is_preconnected.intermediate_value₂_eventually₁ IsPreconnected.intermediate_value₂_eventually₁ theorem IsPreconnected.intermediate_value₂_eventually₂ {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (he₁ : f ≤ᶠ[l₁] g) (he₂ : g ≤ᶠ[l₂] f) : ∃ x ∈ s, f x = g x := by rw [continuousOn_iff_continuous_restrict] at hf hg obtain ⟨b, h⟩ := @intermediate_value_univ₂_eventually₂ _ _ _ _ _ _ (Subtype.preconnectedSpace hs) _ _ (comap_coe_neBot_of_le_principal hl₁) (comap_coe_neBot_of_le_principal hl₂) _ _ hf hg (he₁.comap _) (he₂.comap _) exact ⟨b, b.prop, h⟩ #align is_preconnected.intermediate_value₂_eventually₂ IsPreconnected.intermediate_value₂_eventually₂ theorem IsPreconnected.intermediate_value {s : Set X} (hs : IsPreconnected s) {a b : X} (ha : a ∈ s) (hb : b ∈ s) {f : X → α} (hf : ContinuousOn f s) : Icc (f a) (f b) ⊆ f '' s := fun _x hx => hs.intermediate_value₂ ha hb hf continuousOn_const hx.1 hx.2 #align is_preconnected.intermediate_value IsPreconnected.intermediate_value theorem IsPreconnected.intermediate_value_Ico {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht : Tendsto f l (𝓝 v)) : Ico (f a) v ⊆ f '' s := fun _ h => hs.intermediate_value₂_eventually₁ ha hl hf continuousOn_const h.1 (eventually_ge_of_tendsto_gt h.2 ht) #align is_preconnected.intermediate_value_Ico IsPreconnected.intermediate_value_Ico theorem IsPreconnected.intermediate_value_Ioc {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht : Tendsto f l (𝓝 v)) : Ioc v (f a) ⊆ f '' s := fun _ h => (hs.intermediate_value₂_eventually₁ ha hl continuousOn_const hf h.2 (eventually_le_of_tendsto_lt h.1 ht)).imp fun _ h => h.imp_right Eq.symm #align is_preconnected.intermediate_value_Ioc IsPreconnected.intermediate_value_Ioc theorem IsPreconnected.intermediate_value_Ioo {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v₁ v₂ : α} (ht₁ : Tendsto f l₁ (𝓝 v₁)) (ht₂ : Tendsto f l₂ (𝓝 v₂)) : Ioo v₁ v₂ ⊆ f '' s := fun _ h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (eventually_le_of_tendsto_lt h.1 ht₁) (eventually_ge_of_tendsto_gt h.2 ht₂) #align is_preconnected.intermediate_value_Ioo IsPreconnected.intermediate_value_Ioo theorem IsPreconnected.intermediate_value_Ici {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht : Tendsto f l atTop) : Ici (f a) ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₁ ha hl hf continuousOn_const h (tendsto_atTop.1 ht y) #align is_preconnected.intermediate_value_Ici IsPreconnected.intermediate_value_Ici theorem IsPreconnected.intermediate_value_Iic {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht : Tendsto f l atBot) : Iic (f a) ⊆ f '' s := fun y h => (hs.intermediate_value₂_eventually₁ ha hl continuousOn_const hf h (tendsto_atBot.1 ht y)).imp fun _ h => h.imp_right Eq.symm #align is_preconnected.intermediate_value_Iic IsPreconnected.intermediate_value_Iic theorem IsPreconnected.intermediate_value_Ioi {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht₁ : Tendsto f l₁ (𝓝 v)) (ht₂ : Tendsto f l₂ atTop) : Ioi v ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (eventually_le_of_tendsto_lt h ht₁) (tendsto_atTop.1 ht₂ y) #align is_preconnected.intermediate_value_Ioi IsPreconnected.intermediate_value_Ioi theorem IsPreconnected.intermediate_value_Iio {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht₁ : Tendsto f l₁ atBot) (ht₂ : Tendsto f l₂ (𝓝 v)) : Iio v ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (tendsto_atBot.1 ht₁ y) (eventually_ge_of_tendsto_gt h ht₂) #align is_preconnected.intermediate_value_Iio IsPreconnected.intermediate_value_Iio theorem IsPreconnected.intermediate_value_Iii {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht₁ : Tendsto f l₁ atBot) (ht₂ : Tendsto f l₂ atTop) : univ ⊆ f '' s := fun y _ => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (tendsto_atBot.1 ht₁ y) (tendsto_atTop.1 ht₂ y) set_option linter.uppercaseLean3 false in #align is_preconnected.intermediate_value_Iii IsPreconnected.intermediate_value_Iii theorem intermediate_value_univ [PreconnectedSpace X] (a b : X) {f : X → α} (hf : Continuous f) : Icc (f a) (f b) ⊆ range f := fun _ hx => intermediate_value_univ₂ hf continuous_const hx.1 hx.2 #align intermediate_value_univ intermediate_value_univ theorem mem_range_of_exists_le_of_exists_ge [PreconnectedSpace X] {c : α} {f : X → α} (hf : Continuous f) (h₁ : ∃ a, f a ≤ c) (h₂ : ∃ b, c ≤ f b) : c ∈ range f := let ⟨a, ha⟩ := h₁; let ⟨b, hb⟩ := h₂; intermediate_value_univ a b hf ⟨ha, hb⟩ #align mem_range_of_exists_le_of_exists_ge mem_range_of_exists_le_of_exists_ge theorem IsPreconnected.Icc_subset {s : Set α} (hs : IsPreconnected s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : Icc a b ⊆ s := by simpa only [image_id] using hs.intermediate_value ha hb continuousOn_id #align is_preconnected.Icc_subset IsPreconnected.Icc_subset theorem IsPreconnected.ordConnected {s : Set α} (h : IsPreconnected s) : OrdConnected s := ⟨fun _ hx _ hy => h.Icc_subset hx hy⟩ #align is_preconnected.ord_connected IsPreconnected.ordConnected theorem IsConnected.Icc_subset {s : Set α} (hs : IsConnected s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : Icc a b ⊆ s := hs.2.Icc_subset ha hb #align is_connected.Icc_subset IsConnected.Icc_subset theorem IsPreconnected.eq_univ_of_unbounded {s : Set α} (hs : IsPreconnected s) (hb : ¬BddBelow s) (ha : ¬BddAbove s) : s = univ := by refine eq_univ_of_forall fun x => ?_ obtain ⟨y, ys, hy⟩ : ∃ y ∈ s, y < x := not_bddBelow_iff.1 hb x obtain ⟨z, zs, hz⟩ : ∃ z ∈ s, x < z := not_bddAbove_iff.1 ha x exact hs.Icc_subset ys zs ⟨le_of_lt hy, le_of_lt hz⟩ #align is_preconnected.eq_univ_of_unbounded IsPreconnected.eq_univ_of_unbounded end variable {α : Type u} {β : Type v} {γ : Type w} [ConditionallyCompleteLinearOrder α] [TopologicalSpace α] [OrderTopology α] [ConditionallyCompleteLinearOrder β] [TopologicalSpace β] [OrderTopology β] [Nonempty γ] theorem IsConnected.Ioo_csInf_csSup_subset {s : Set α} (hs : IsConnected s) (hb : BddBelow s) (ha : BddAbove s) : Ioo (sInf s) (sSup s) ⊆ s := fun _x hx => let ⟨_y, ys, hy⟩ := (isGLB_lt_iff (isGLB_csInf hs.nonempty hb)).1 hx.1 let ⟨_z, zs, hz⟩ := (lt_isLUB_iff (isLUB_csSup hs.nonempty ha)).1 hx.2 hs.Icc_subset ys zs ⟨hy.le, hz.le⟩ #align is_connected.Ioo_cInf_cSup_subset IsConnected.Ioo_csInf_csSup_subset theorem eq_Icc_csInf_csSup_of_connected_bdd_closed {s : Set α} (hc : IsConnected s) (hb : BddBelow s) (ha : BddAbove s) (hcl : IsClosed s) : s = Icc (sInf s) (sSup s) := (subset_Icc_csInf_csSup hb ha).antisymm <\| hc.Icc_subset (hcl.csInf_mem hc.nonempty hb) (hcl.csSup_mem hc.nonempty ha) #align eq_Icc_cInf_cSup_of_connected_bdd_closed eq_Icc_csInf_csSup_of_connected_bdd_closed theorem IsPreconnected.Ioi_csInf_subset {s : Set α} (hs : IsPreconnected s) (hb : BddBelow s) (ha : ¬BddAbove s) : Ioi (sInf s) ⊆ s := fun x hx => have sne : s.Nonempty := nonempty_of_not_bddAbove ha let ⟨_y, ys, hy⟩ : ∃ y ∈ s, y < x := (isGLB_lt_iff (isGLB_csInf sne hb)).1 hx let ⟨_z, zs, hz⟩ : ∃ z ∈ s, x < z := not_bddAbove_iff.1 ha x hs.Icc_subset ys zs ⟨hy.le, hz.le⟩ #align is_preconnected.Ioi_cInf_subset IsPreconnected.Ioi_csInf_subset theorem IsPreconnected.Iio_csSup_subset {s : Set α} (hs : IsPreconnected s) (hb : ¬BddBelow s) (ha : BddAbove s) : Iio (sSup s) ⊆ s := IsPreconnected.Ioi_csInf_subset (α := αᵒᵈ) hs ha hb #align is_preconnected.Iio_cSup_subset IsPreconnected.Iio_csSup_subset theorem IsPreconnected.mem_intervals {s : Set α} (hs : IsPreconnected s) : s ∈ ({Icc (sInf s) (sSup s), Ico (sInf s) (sSup s), Ioc (sInf s) (sSup s), Ioo (sInf s) (sSup s), Ici (sInf s), Ioi (sInf s), Iic (sSup s), Iio (sSup s), univ, ∅} : Set (Set α)) := by rcases s.eq_empty_or_nonempty with (rfl \| hne) · apply_rules [Or.inr, mem_singleton] have hs' : IsConnected s := ⟨hne, hs⟩ by_cases hb : BddBelow s <;> by_cases ha : BddAbove s · refine mem_of_subset_of_mem ?_ <\| mem_Icc_Ico_Ioc_Ioo_of_subset_of_subset (hs'.Ioo_csInf_csSup_subset hb ha) (subset_Icc_csInf_csSup hb ha) simp only [insert_subset_iff, mem_insert_iff, mem_singleton_iff, true_or, or_true, singleton_subset_iff, and_self] · refine Or.inr <\| Or.inr <\| Or.inr <\| Or.inr ?_ cases' mem_Ici_Ioi_of_subset_of_subset (hs.Ioi_csInf_subset hb ha) fun x hx => csInf_le hb hx with hs hs · exact Or.inl hs · exact Or.inr (Or.inl hs) · iterate 6 apply Or.inr cases' mem_Iic_Iio_of_subset_of_subset (hs.Iio_csSup_subset hb ha) fun x hx => le_csSup ha hx with hs hs · exact Or.inl hs · exact Or.inr (Or.inl hs) · iterate 8 apply Or.inr exact Or.inl (hs.eq_univ_of_unbounded hb ha) #align is_preconnected.mem_intervals IsPreconnected.mem_intervals theorem setOf_isPreconnected_subset_of_ordered : { s : Set α \| IsPreconnected s } ⊆ -- bounded intervals (range (uncurry Icc) ∪ range (uncurry Ico) ∪ range (uncurry Ioc) ∪ range (uncurry Ioo)) ∪ -- unbounded intervals and `univ` (range Ici ∪ range Ioi ∪ range Iic ∪ range Iio ∪ {univ, ∅}) := by intro s hs rcases hs.mem_intervals with (hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs) <;> rw [hs] <;> simp only [union_insert, union_singleton, mem_insert_iff, mem_union, mem_range, Prod.exists, uncurry_apply_pair, exists_apply_eq_apply, true_or, or_true, exists_apply_eq_apply2] #align set_of_is_preconnected_subset_of_ordered setOf_isPreconnected_subset_of_ordered theorem IsClosed.mem_of_ge_of_forall_exists_gt {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hab : a ≤ b) (hgt : ∀ x ∈ s ∩ Ico a b, (s ∩ Ioc x b).Nonempty) : b ∈ s := by let S := s ∩ Icc a b replace ha : a ∈ S := ⟨ha, left_mem_Icc.2 hab⟩ have Sbd : BddAbove S := ⟨b, fun z hz => hz.2.2⟩ let c := sSup (s ∩ Icc a b) have c_mem : c ∈ S := hs.csSup_mem ⟨_, ha⟩ Sbd have c_le : c ≤ b := csSup_le ⟨_, ha⟩ fun x hx => hx.2.2 cases' eq_or_lt_of_le c_le with hc hc · exact hc ▸ c_mem.1 exfalso rcases hgt c ⟨c_mem.1, c_mem.2.1, hc⟩ with ⟨x, xs, cx, xb⟩ exact not_lt_of_le (le_csSup Sbd ⟨xs, le_trans (le_csSup Sbd ha) (le_of_lt cx), xb⟩) cx #align is_closed.mem_of_ge_of_forall_exists_gt IsClosed.mem_of_ge_of_forall_exists_gt theorem IsClosed.Icc_subset_of_forall_exists_gt {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hgt : ∀ x ∈ s ∩ Ico a b, ∀ y ∈ Ioi x, (s ∩ Ioc x y).Nonempty) : Icc a b ⊆ s := by intro y hy have : IsClosed (s ∩ Icc a y) := by suffices s ∩ Icc a y = s ∩ Icc a b ∩ Icc a y by rw [this] exact IsClosed.inter hs isClosed_Icc rw [inter_assoc] congr exact (inter_eq_self_of_subset_right <\| Icc_subset_Icc_right hy.2).symm exact IsClosed.mem_of_ge_of_forall_exists_gt this ha hy.1 fun x hx => hgt x ⟨hx.1, Ico_subset_Ico_right hy.2 hx.2⟩ y hx.2.2 #align is_closed.Icc_subset_of_forall_exists_gt IsClosed.Icc_subset_of_forall_exists_gt variable [DenselyOrdered α] {a b : α} theorem IsClosed.Icc_subset_of_forall_mem_nhdsWithin {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hgt : ∀ x ∈ s ∩ Ico a b, s ∈ 𝓝[>] x) : Icc a b ⊆ s := by apply hs.Icc_subset_of_forall_exists_gt ha rintro x ⟨hxs, hxab⟩ y hyxb have : s ∩ Ioc x y ∈ 𝓝[>] x := inter_mem (hgt x ⟨hxs, hxab⟩) (Ioc_mem_nhdsWithin_Ioi ⟨le_rfl, hyxb⟩) exact (nhdsWithin_Ioi_self_neBot' ⟨b, hxab.2⟩).nonempty_of_mem this #align is_closed.Icc_subset_of_forall_mem_nhds_within IsClosed.Icc_subset_of_forall_mem_nhdsWithin theorem isPreconnected_Icc_aux (x y : α) (s t : Set α) (hxy : x ≤ y) (hs : IsClosed s) (ht : IsClosed t) (hab : Icc a b ⊆ s ∪ t) (hx : x ∈ Icc a b ∩ s) (hy : y ∈ Icc a b ∩ t) : (Icc a b ∩ (s ∩ t)).Nonempty := by have xyab : Icc x y ⊆ Icc a b := Icc_subset_Icc hx.1.1 hy.1.2 by_contra hst suffices Icc x y ⊆ s from hst ⟨y, xyab <\| right_mem_Icc.2 hxy, this <\| right_mem_Icc.2 hxy, hy.2⟩ apply (IsClosed.inter hs isClosed_Icc).Icc_subset_of_forall_mem_nhdsWithin hx.2 rintro z ⟨zs, hz⟩ have zt : z ∈ tᶜ := fun zt => hst ⟨z, xyab <\| Ico_subset_Icc_self hz, zs, zt⟩ have : tᶜ ∩ Ioc z y ∈ 𝓝[>] z := by rw [← nhdsWithin_Ioc_eq_nhdsWithin_Ioi hz.2] exact mem_nhdsWithin.2 ⟨tᶜ, ht.isOpen_compl, zt, Subset.rfl⟩ apply mem_of_superset this have : Ioc z y ⊆ s ∪ t := fun w hw => hab (xyab ⟨le_trans hz.1 (le_of_lt hw.1), hw.2⟩) exact fun w ⟨wt, wzy⟩ => (this wzy).elim id fun h => (wt h).elim #align is_preconnected_Icc_aux isPreconnected_Icc_aux theorem isPreconnected_Icc : IsPreconnected (Icc a b) := isPreconnected_closed_iff.2 (by rintro s t hs ht hab ⟨x, hx⟩ ⟨y, hy⟩ -- This used to use `wlog`, but it was causing timeouts. rcases le_total x y with h \| h · exact isPreconnected_Icc_aux x y s t h hs ht hab hx hy · rw [inter_comm s t] rw [union_comm s t] at hab exact isPreconnected_Icc_aux y x t s h ht hs hab hy hx) #align is_preconnected_Icc isPreconnected_Icc theorem isPreconnected_uIcc : IsPreconnected (uIcc a b) := isPreconnected_Icc #align is_preconnected_uIcc isPreconnected_uIcc theorem Set.OrdConnected.isPreconnected {s : Set α} (h : s.OrdConnected) : IsPreconnected s := isPreconnected_of_forall_pair fun x hx y hy => ⟨uIcc x y, h.uIcc_subset hx hy, left_mem_uIcc, right_mem_uIcc, isPreconnected_uIcc⟩ #align set.ord_connected.is_preconnected Set.OrdConnected.isPreconnected theorem isPreconnected_iff_ordConnected {s : Set α} : IsPreconnected s ↔ OrdConnected s := ⟨IsPreconnected.ordConnected, Set.OrdConnected.isPreconnected⟩ #align is_preconnected_iff_ord_connected isPreconnected_iff_ordConnected theorem isPreconnected_Ici : IsPreconnected (Ici a) := ordConnected_Ici.isPreconnected #align is_preconnected_Ici isPreconnected_Ici theorem isPreconnected_Iic : IsPreconnected (Iic a) := ordConnected_Iic.isPreconnected #align is_preconnected_Iic isPreconnected_Iic theorem isPreconnected_Iio : IsPreconnected (Iio a) := ordConnected_Iio.isPreconnected #align is_preconnected_Iio isPreconnected_Iio theorem isPreconnected_Ioi : IsPreconnected (Ioi a) := ordConnected_Ioi.isPreconnected #align is_preconnected_Ioi isPreconnected_Ioi theorem isPreconnected_Ioo : IsPreconnected (Ioo a b) := ordConnected_Ioo.isPreconnected #align is_preconnected_Ioo isPreconnected_Ioo theorem isPreconnected_Ioc : IsPreconnected (Ioc a b) := ordConnected_Ioc.isPreconnected #align is_preconnected_Ioc isPreconnected_Ioc theorem isPreconnected_Ico : IsPreconnected (Ico a b) := ordConnected_Ico.isPreconnected #align is_preconnected_Ico isPreconnected_Ico theorem isConnected_Ici : IsConnected (Ici a) := ⟨nonempty_Ici, isPreconnected_Ici⟩ #align is_connected_Ici isConnected_Ici theorem isConnected_Iic : IsConnected (Iic a) := ⟨nonempty_Iic, isPreconnected_Iic⟩ #align is_connected_Iic isConnected_Iic theorem isConnected_Ioi [NoMaxOrder α] : IsConnected (Ioi a) := ⟨nonempty_Ioi, isPreconnected_Ioi⟩ #align is_connected_Ioi isConnected_Ioi theorem isConnected_Iio [NoMinOrder α] : IsConnected (Iio a) := ⟨nonempty_Iio, isPreconnected_Iio⟩ #align is_connected_Iio isConnected_Iio theorem isConnected_Icc (h : a ≤ b) : IsConnected (Icc a b) := ⟨nonempty_Icc.2 h, isPreconnected_Icc⟩ #align is_connected_Icc isConnected_Icc theorem isConnected_Ioo (h : a < b) : IsConnected (Ioo a b) := ⟨nonempty_Ioo.2 h, isPreconnected_Ioo⟩ #align is_connected_Ioo isConnected_Ioo theorem isConnected_Ioc (h : a < b) : IsConnected (Ioc a b) := ⟨nonempty_Ioc.2 h, isPreconnected_Ioc⟩ #align is_connected_Ioc isConnected_Ioc theorem isConnected_Ico (h : a < b) : IsConnected (Ico a b) := ⟨nonempty_Ico.2 h, isPreconnected_Ico⟩ #align is_connected_Ico isConnected_Ico instance (priority := 100) ordered_connected_space : PreconnectedSpace α := ⟨ordConnected_univ.isPreconnected⟩ #align ordered_connected_space ordered_connected_space theorem setOf_isPreconnected_eq_of_ordered : { s : Set α \| IsPreconnected s } = -- bounded intervals range (uncurry Icc) ∪ range (uncurry Ico) ∪ range (uncurry Ioc) ∪ range (uncurry Ioo) ∪ -- unbounded intervals and `univ` (range Ici ∪ range Ioi ∪ range Iic ∪ range Iio ∪ {univ, ∅}) := by refine Subset.antisymm setOf_isPreconnected_subset_of_ordered ?_ simp only [subset_def, forall_mem_range, uncurry, or_imp, forall_and, mem_union, mem_setOf_eq, insert_eq, mem_singleton_iff, forall_eq, forall_true_iff, and_true_iff, isPreconnected_Icc, isPreconnected_Ico, isPreconnected_Ioc, isPreconnected_Ioo, isPreconnected_Ioi, isPreconnected_Iio, isPreconnected_Ici, isPreconnected_Iic, isPreconnected_univ, isPreconnected_empty] #align set_of_is_preconnected_eq_of_ordered setOf_isPreconnected_eq_of_ordered lemma isTotallyDisconnected_iff_lt {s : Set α} : IsTotallyDisconnected s ↔ ∀ x ∈ s, ∀ y ∈ s, x < y → ∃ z ∉ s, z ∈ Ioo x y := by simp only [IsTotallyDisconnected, isPreconnected_iff_ordConnected, ← not_nontrivial_iff, nontrivial_iff_exists_lt, not_exists, not_and] refine ⟨fun h x hx y hy hxy ↦ ?_, fun h t hts ht x hx y hy hxy ↦ ?_⟩ · simp_rw [← not_ordConnected_inter_Icc_iff hx hy] exact fun hs ↦ h _ inter_subset_left hs _ ⟨hx, le_rfl, hxy.le⟩ _ ⟨hy, hxy.le, le_rfl⟩ hxy · obtain ⟨z, h1z, h2z⟩ := h x (hts hx) y (hts hy) hxy exact h1z <\| hts <\| ht.1 hx hy ⟨h2z.1.le, h2z.2.le⟩ variable {δ : Type} [LinearOrder δ] [TopologicalSpace δ] [OrderClosedTopology δ] theorem intermediate_value_Icc {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Icc (f a) (f b) ⊆ f '' Icc a b := isPreconnected_Icc.intermediate_value (left_mem_Icc.2 hab) (right_mem_Icc.2 hab) hf #align intermediate_value_Icc intermediate_value_Icc theorem intermediate_value_Icc' {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Icc (f b) (f a) ⊆ f '' Icc a b := isPreconnected_Icc.intermediate_value (right_mem_Icc.2 hab) (left_mem_Icc.2 hab) hf #align intermediate_value_Icc' intermediate_value_Icc' theorem intermediate_value_uIcc {a b : α} {f : α → δ} (hf : ContinuousOn f (uIcc a b)) : uIcc (f a) (f b) ⊆ f '' uIcc a b := by cases le_total (f a) (f b) <;> simp [, isPreconnected_uIcc.intermediate_value] #align intermediate_value_uIcc intermediate_value_uIcc theorem intermediate_value_Ico {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Ico (f a) (f b) ⊆ f '' Ico a b := Or.elim (eq_or_lt_of_le hab) (fun he _ h => absurd h.2 (not_lt_of_le (he ▸ h.1))) fun hlt => @IsPreconnected.intermediate_value_Ico _ _ _ _ _ _ _ isPreconnected_Ico _ _ ⟨refl a, hlt⟩ (right_nhdsWithin_Ico_neBot hlt) inf_le_right _ (hf.mono Ico_subset_Icc_self) _ ((hf.continuousWithinAt ⟨hab, refl b⟩).mono Ico_subset_Icc_self) #align intermediate_value_Ico intermediate_value_Ico theorem intermediate_value_Ico' {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Ioc (f b) (f a) ⊆ f '' Ico a b := Or.elim (eq_or_lt_of_le hab) (fun he _ h => absurd h.1 (not_lt_of_le (he ▸ h.2))) fun hlt => @IsPreconnected.intermediate_value_Ioc _ _ _ _ _ _ _ isPreconnected_Ico _ _ ⟨refl a, hlt⟩ (right_nhdsWithin_Ico_neBot hlt) inf_le_right _ (hf.mono Ico_subset_Icc_self) _ ((hf.continuousWithinAt ⟨hab, refl b⟩).mono Ico_subset_Icc_self) #align intermediate_value_Ico' intermediate_value_Ico' theorem intermediate_value_Ioc {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Ioc (f a) (f b) ⊆ f '' Ioc a b := Or.elim (eq_or_lt_of_le hab) (fun he _ h => absurd h.2 (not_le_of_lt (he ▸ h.1))) fun hlt => @IsPreconnected.intermediate_value_Ioc _ _ _ _ _ _ _ isPreconnected_Ioc _ _ ⟨hlt, refl b⟩ (left_nhdsWithin_Ioc_neBot hlt) inf_le_right _ (hf.mono Ioc_subset_Icc_self) _ ((hf.continuousWithinAt ⟨refl a, hab⟩).mono Ioc_subset_Icc_self) #align intermediate_value_Ioc intermediate_value_Ioc theorem intermediate_value_Ioc' {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Ico (f b) (f a) ⊆ f '' Ioc a b := Or.elim (eq_or_lt_of_le hab) (fun he _ h => absurd h.1 (not_le_of_lt (he ▸ h.2))) fun hlt => @IsPreconnected.intermediate_value_Ico _ _ _ _ _ _ _ isPreconnected_Ioc _ _ ⟨hlt, refl b⟩ (left_nhdsWithin_Ioc_neBot hlt) inf_le_right _ (hf.mono Ioc_subset_Icc_self) _ ((hf.continuousWithinAt ⟨refl a, hab⟩).mono Ioc_subset_Icc_self) #align intermediate_value_Ioc' intermediate_value_Ioc' theorem intermediate_value_Ioo {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Ioo (f a) (f b) ⊆ f '' Ioo a b := Or.elim (eq_or_lt_of_le hab) (fun he _ h => absurd h.2 (not_lt_of_lt (he ▸ h.1))) fun hlt => @IsPreconnected.intermediate_value_Ioo _ _ _ _ _ _ _ isPreconnected_Ioo _ _ (left_nhdsWithin_Ioo_neBot hlt) (right_nhdsWithin_Ioo_neBot hlt) inf_le_right inf_le_right _ (hf.mono Ioo_subset_Icc_self) _ _ ((hf.continuousWithinAt ⟨refl a, hab⟩).mono Ioo_subset_Icc_self) ((hf.continuousWithinAt ⟨hab, refl b⟩).mono Ioo_subset_Icc_self) #align intermediate_value_Ioo intermediate_value_Ioo theorem intermediate_value_Ioo' {a b : α} (hab : a ≤ b) {f : α → δ} (hf : ContinuousOn f (Icc a b)) : Ioo (f b) (f a) ⊆ f '' Ioo a b := Or.elim (eq_or_lt_of_le hab) (fun he _ h => absurd h.1 (not_lt_of_lt (he ▸ h.2))) fun hlt => @IsPreconnected.intermediate_value_Ioo _ _ _ _ _ _ _ isPreconnected_Ioo _ _ (right_nhdsWithin_Ioo_neBot hlt) (left_nhdsWithin_Ioo_neBot hlt) inf_le_right inf_le_right _ (hf.mono Ioo_subset_Icc_self) _ _ ((hf.continuousWithinAt ⟨hab, refl b⟩).mono Ioo_subset_Icc_self) ((hf.continuousWithinAt ⟨refl a, hab⟩).mono Ioo_subset_Icc_self) #align intermediate_value_Ioo' intermediate_value_Ioo' theorem ContinuousOn.surjOn_Icc {s : Set α} [hs : OrdConnected s] {f : α → δ} (hf : ContinuousOn f s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : SurjOn f s (Icc (f a) (f b)) := hs.isPreconnected.intermediate_value ha hb hf #align continuous_on.surj_on_Icc ContinuousOn.surjOn_Icc theorem ContinuousOn.surjOn_uIcc {s : Set α} [hs : OrdConnected s] {f : α → δ} (hf : ContinuousOn f s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : SurjOn f s (uIcc (f a) (f b)) := by rcases le_total (f a) (f b) with hab \| hab <;> simp [hf.surjOn_Icc, *] #align continuous_on.surj_on_uIcc ContinuousOn.surjOn_uIcc theorem Continuous.surjective {f : α → δ} (hf : Continuous f) (h_top : Tendsto f atTop atTop) (h_bot : Tendsto f atBot atBot) : Function.Surjective f := fun p => mem_range_of_exists_le_of_exists_ge hf (h_bot.eventually (eventually_le_atBot p)).exists (h_top.eventually (eventually_ge_atTop p)).exists #align continuous.surjective Continuous.surjective theorem Continuous.surjective' {f : α → δ} (hf : Continuous f) (h_top : Tendsto f atBot atTop) (h_bot : Tendsto f atTop atBot) : Function.Surjective f := Continuous.surjective (α := αᵒᵈ) hf h_top h_bot #align continuous.surjective' Continuous.surjective' theorem ContinuousOn.surjOn_of_tendsto {f : α → δ} {s : Set α} [OrdConnected s] (hs : s.Nonempty) (hf : ContinuousOn f s) (hbot : Tendsto (fun x : s => f x) atBot atBot) (htop : Tendsto (fun x : s => f x) atTop atTop) : SurjOn f s univ := haveI := Classical.inhabited_of_nonempty hs.to_subtype surjOn_iff_surjective.2 <\| hf.restrict.surjective htop hbot #align continuous_on.surj_on_of_tendsto ContinuousOn.surjOn_of_tendsto theorem ContinuousOn.surjOn_of_tendsto' {f : α → δ} {s : Set α} [OrdConnected s] (hs : s.Nonempty) (hf : ContinuousOn f s) (hbot : Tendsto (fun x : s => f x) atBot atTop) (htop : Tendsto (fun x : s => f x) atTop atBot) : SurjOn f s univ := ContinuousOn.surjOn_of_tendsto (δ := δᵒᵈ) hs hf hbot htop #align continuous_on.surj_on_of_tendsto' ContinuousOn.surjOn_of_tendsto' theorem Continuous.strictMono_of_inj_boundedOrder [BoundedOrder α] {f : α → δ} (hf_c : Continuous f) (hf : f ⊥ ≤ f ⊤) (hf_i : Injective f) : StrictMono f := by intro a b hab by_contra! h have H : f b < f a := lt_of_le_of_ne h <\| hf_i.ne hab.ne' by_cases ha : f a ≤ f ⊥ · obtain ⟨u, hu⟩ := intermediate_value_Ioc le_top hf_c.continuousOn ⟨H.trans_le ha, hf⟩ have : u = ⊥ := hf_i hu.2 aesop · by_cases hb : f ⊥ < f b · obtain ⟨u, hu⟩ := intermediate_value_Ioo bot_le hf_c.continuousOn ⟨hb, H⟩ rw [hf_i hu.2] at hu exact (hab.trans hu.1.2).false · push_neg at ha hb replace hb : f b < f ⊥ := lt_of_le_of_ne hb <\| hf_i.ne (lt_of_lt_of_le' hab bot_le).ne' obtain ⟨u, hu⟩ := intermediate_value_Ioo' hab.le hf_c.continuousOn ⟨hb, ha⟩ have : u = ⊥ := hf_i hu.2 aesop theorem Continuous.strictAnti_of_inj_boundedOrder [BoundedOrder α] {f : α → δ} (hf_c : Continuous f) (hf : f ⊤ ≤ f ⊥) (hf_i : Injective f) : StrictAnti f := hf_c.strictMono_of_inj_boundedOrder (δ := δᵒᵈ) hf hf_i theorem Continuous.strictMono_of_inj_boundedOrder' [BoundedOrder α] {f : α → δ} (hf_c : Continuous f) (hf_i : Injective f) : StrictMono f ∨ StrictAnti f := (le_total (f ⊥) (f ⊤)).imp (hf_c.strictMono_of_inj_boundedOrder · hf_i) (hf_c.strictAnti_of_inj_boundedOrder · hf_i) theorem Continuous.strictMonoOn_of_inj_rigidity {f : α → δ} (hf_c : Continuous f) (hf_i : Injective f) {a b : α} (hab : a < b) (hf_mono : StrictMonoOn f (Icc a b)) : StrictMono f := by intro x y hxy let s := min a x let t := max b y have hsa : s ≤ a := min_le_left a x have hbt : b ≤ t := le_max_left b y have hst : s ≤ t := hsa.trans $ hbt.trans' hab.le have hf_mono_st : StrictMonoOn f (Icc s t) ∨ StrictAntiOn f (Icc s t) := by letI := Icc.completeLinearOrder hst have := Continuous.strictMono_of_inj_boundedOrder' (f := Set.restrict (Icc s t) f) hf_c.continuousOn.restrict hf_i.injOn.injective exact this.imp strictMono_restrict.mp strictAntiOn_iff_strictAnti.mpr have (h : StrictAntiOn f (Icc s t)) : False := by have : Icc a b ⊆ Icc s t := Icc_subset_Icc hsa hbt replace : StrictAntiOn f (Icc a b) := StrictAntiOn.mono h this replace : IsAntichain (· ≤ ·) (Icc a b) := IsAntichain.of_strictMonoOn_antitoneOn hf_mono this.antitoneOn exact this.not_lt (left_mem_Icc.mpr (le_of_lt hab)) (right_mem_Icc.mpr (le_of_lt hab)) hab replace hf_mono_st : StrictMonoOn f (Icc s t) := hf_mono_st.resolve_right this have hsx : s ≤ x := min_le_right a x have hyt : y ≤ t := le_max_right b y replace : Icc x y ⊆ Icc s t := Icc_subset_Icc hsx hyt replace : StrictMonoOn f (Icc x y) := StrictMonoOn.mono hf_mono_st this exact this (left_mem_Icc.mpr (le_of_lt hxy)) (right_mem_Icc.mpr (le_of_lt hxy)) hxy theorem ContinuousOn.strictMonoOn_of_injOn_Icc {a b : α} {f : α → δ} (hab : a ≤ b) (hfab : f a ≤ f b) (hf_c : ContinuousOn f (Icc a b)) (hf_i : InjOn f (Icc a b)) : StrictMonoOn f (Icc a b) := by letI := Icc.completeLinearOrder hab refine StrictMono.of_restrict ?_ set g : Icc a b → δ := Set.restrict (Icc a b) f have hgab : g ⊥ ≤ g ⊤ := by aesop exact Continuous.strictMono_of_inj_boundedOrder (f := g) hf_c.restrict hgab hf_i.injective theorem ContinuousOn.strictAntiOn_of_injOn_Icc {a b : α} {f : α → δ} (hab : a ≤ b) (hfab : f b ≤ f a) (hf_c : ContinuousOn f (Icc a b)) (hf_i : InjOn f (Icc a b)) : StrictAntiOn f (Icc a b) := ContinuousOn.strictMonoOn_of_injOn_Icc (δ := δᵒᵈ) hab hfab hf_c hf_i theorem ContinuousOn.strictMonoOn_of_injOn_Icc' {a b : α} {f : α → δ} (hab : a ≤ b) (hf_c : ContinuousOn f (Icc a b)) (hf_i : InjOn f (Icc a b)) : StrictMonoOn f (Icc a b) ∨ StrictAntiOn f (Icc a b) := (le_total (f a) (f b)).imp (ContinuousOn.strictMonoOn_of_injOn_Icc hab · hf_c hf_i) (ContinuousOn.strictAntiOn_of_injOn_Icc hab · hf_c hf_i) theorem Continuous.strictMono_of_inj {f : α → δ} (hf_c : Continuous f) (hf_i : Injective f) : StrictMono f ∨ StrictAnti f := by have H {c d : α} (hcd : c < d) : StrictMono f ∨ StrictAnti f := (hf_c.continuousOn.strictMonoOn_of_injOn_Icc' hcd.le hf_i.injOn).imp (hf_c.strictMonoOn_of_inj_rigidity hf_i hcd) (hf_c.strictMonoOn_of_inj_rigidity (δ := δᵒᵈ) hf_i hcd) by_cases hn : Nonempty α · let a : α := Classical.choice ‹_› by_cases h : ∃ b : α, a ≠ b · choose b hb using h by_cases hab : a < b · exact H hab · push_neg at hab have : b < a := by exact Ne.lt_of_le (id (Ne.symm hb)) hab exact H this · push_neg at h haveI : Subsingleton α := ⟨fun c d => Trans.trans (h c).symm (h d)⟩ exact Or.inl <\| Subsingleton.strictMono f · aesop	Mathlib/Topology/Order/IntermediateValue.lean	765	772	theorem ContinuousOn.strictMonoOn_of_injOn_Ioo {a b : α} {f : α → δ} (hab : a < b) (hf_c : ContinuousOn f (Ioo a b)) (hf_i : InjOn f (Ioo a b)) : StrictMonoOn f (Ioo a b) ∨ StrictAntiOn f (Ioo a b) := by	haveI : Inhabited (Ioo a b) := Classical.inhabited_of_nonempty (nonempty_Ioo_subtype hab) let g : Ioo a b → δ := Set.restrict (Ioo a b) f have : StrictMono g ∨ StrictAnti g := Continuous.strictMono_of_inj hf_c.restrict hf_i.injective exact this.imp strictMono_restrict.mp strictAntiOn_iff_strictAnti.mpr
import Mathlib.Data.PFunctor.Multivariate.Basic #align_import data.qpf.multivariate.basic from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" universe u open MvFunctor class MvQPF {n : ℕ} (F : TypeVec.{u} n → Type) [MvFunctor F] where P : MvPFunctor.{u} n abs : ∀ {α}, P α → F α repr : ∀ {α}, F α → P α abs_repr : ∀ {α} (x : F α), abs (repr x) = x abs_map : ∀ {α β} (f : α ⟹ β) (p : P α), abs (f <$$> p) = f <$$> abs p #align mvqpf MvQPF namespace MvQPF variable {n : ℕ} {F : TypeVec.{u} n → Type} [MvFunctor F] [q : MvQPF F] open MvFunctor (LiftP LiftR) protected theorem id_map {α : TypeVec n} (x : F α) : TypeVec.id <$$> x = x := by rw [← abs_repr x] cases' repr x with a f rw [← abs_map] rfl #align mvqpf.id_map MvQPF.id_map @[simp] theorem comp_map {α β γ : TypeVec n} (f : α ⟹ β) (g : β ⟹ γ) (x : F α) : (g ⊚ f) <$$> x = g <$$> f <$$> x := by rw [← abs_repr x] cases' repr x with a f rw [← abs_map, ← abs_map, ← abs_map] rfl #align mvqpf.comp_map MvQPF.comp_map instance (priority := 100) lawfulMvFunctor : LawfulMvFunctor F where id_map := @MvQPF.id_map n F _ _ comp_map := @comp_map n F _ _ #align mvqpf.is_lawful_mvfunctor MvQPF.lawfulMvFunctor -- Lifting predicates and relations theorem liftP_iff {α : TypeVec n} (p : ∀ ⦃i⦄, α i → Prop) (x : F α) : LiftP p x ↔ ∃ a f, x = abs ⟨a, f⟩ ∧ ∀ i j, p (f i j) := by constructor · rintro ⟨y, hy⟩ cases' h : repr y with a f use a, fun i j => (f i j).val constructor · rw [← hy, ← abs_repr y, h, ← abs_map]; rfl intro i j apply (f i j).property rintro ⟨a, f, h₀, h₁⟩ use abs ⟨a, fun i j => ⟨f i j, h₁ i j⟩⟩ rw [← abs_map, h₀]; rfl #align mvqpf.liftp_iff MvQPF.liftP_iff	Mathlib/Data/QPF/Multivariate/Basic.lean	141	157	theorem liftR_iff {α : TypeVec n} (r : ∀ /- ⦃i⦄ -/ {i}, α i → α i → Prop) (x y : F α) : LiftR r x y ↔ ∃ a f₀ f₁, x = abs ⟨a, f₀⟩ ∧ y = abs ⟨a, f₁⟩ ∧ ∀ i j, r (f₀ i j) (f₁ i j) := by	constructor · rintro ⟨u, xeq, yeq⟩ cases' h : repr u with a f use a, fun i j => (f i j).val.fst, fun i j => (f i j).val.snd constructor · rw [← xeq, ← abs_repr u, h, ← abs_map]; rfl constructor · rw [← yeq, ← abs_repr u, h, ← abs_map]; rfl intro i j exact (f i j).property rintro ⟨a, f₀, f₁, xeq, yeq, h⟩ use abs ⟨a, fun i j => ⟨(f₀ i j, f₁ i j), h i j⟩⟩ dsimp; constructor · rw [xeq, ← abs_map]; rfl rw [yeq, ← abs_map]; rfl
import Mathlib.Analysis.NormedSpace.Basic #align_import analysis.normed_space.enorm from "leanprover-community/mathlib"@"57ac39bd365c2f80589a700f9fbb664d3a1a30c2" noncomputable section attribute [local instance] Classical.propDecidable open ENNReal structure ENorm (𝕜 : Type) (V : Type) [NormedField 𝕜] [AddCommGroup V] [Module 𝕜 V] where toFun : V → ℝ≥0∞ eq_zero' : ∀ x, toFun x = 0 → x = 0 map_add_le' : ∀ x y : V, toFun (x + y) ≤ toFun x + toFun y map_smul_le' : ∀ (c : 𝕜) (x : V), toFun (c • x) ≤ ‖c‖₊ * toFun x #align enorm ENorm namespace ENorm variable {𝕜 : Type} {V : Type} [NormedField 𝕜] [AddCommGroup V] [Module 𝕜 V] (e : ENorm 𝕜 V) -- Porting note: added to appease norm_cast complaints attribute [coe] ENorm.toFun instance : CoeFun (ENorm 𝕜 V) fun _ => V → ℝ≥0∞ := ⟨ENorm.toFun⟩ theorem coeFn_injective : Function.Injective ((↑) : ENorm 𝕜 V → V → ℝ≥0∞) := fun e₁ e₂ h => by cases e₁ cases e₂ congr #align enorm.coe_fn_injective ENorm.coeFn_injective @[ext] theorem ext {e₁ e₂ : ENorm 𝕜 V} (h : ∀ x, e₁ x = e₂ x) : e₁ = e₂ := coeFn_injective <\| funext h #align enorm.ext ENorm.ext theorem ext_iff {e₁ e₂ : ENorm 𝕜 V} : e₁ = e₂ ↔ ∀ x, e₁ x = e₂ x := ⟨fun h _ => h ▸ rfl, ext⟩ #align enorm.ext_iff ENorm.ext_iff @[simp, norm_cast] theorem coe_inj {e₁ e₂ : ENorm 𝕜 V} : (e₁ : V → ℝ≥0∞) = e₂ ↔ e₁ = e₂ := coeFn_injective.eq_iff #align enorm.coe_inj ENorm.coe_inj @[simp]	Mathlib/Analysis/NormedSpace/ENorm.lean	82	92	theorem map_smul (c : 𝕜) (x : V) : e (c • x) = ‖c‖₊ * e x := by	apply le_antisymm (e.map_smul_le' c x) by_cases hc : c = 0 · simp [hc] calc (‖c‖₊ : ℝ≥0∞) * e x = ‖c‖₊ * e (c⁻¹ • c • x) := by rw [inv_smul_smul₀ hc] _ ≤ ‖c‖₊ * (‖c⁻¹‖₊ * e (c • x)) := mul_le_mul_left' (e.map_smul_le' _ _) _ _ = e (c • x) := by rw [← mul_assoc, nnnorm_inv, ENNReal.coe_inv, ENNReal.mul_inv_cancel _ ENNReal.coe_ne_top, one_mul] <;> simp [hc]
import Mathlib.Data.Set.Subsingleton import Mathlib.Order.WithBot #align_import data.set.image from "leanprover-community/mathlib"@"001ffdc42920050657fd45bd2b8bfbec8eaaeb29" universe u v open Function Set namespace Set variable {α β γ : Type} {ι ι' : Sort} section Image variable {f : α → β} {s t : Set α} -- Porting note: `Set.image` is already defined in `Init.Set` #align set.image Set.image @[deprecated mem_image (since := "2024-03-23")] theorem mem_image_iff_bex {f : α → β} {s : Set α} {y : β} : y ∈ f '' s ↔ ∃ (x : _) (_ : x ∈ s), f x = y := bex_def.symm #align set.mem_image_iff_bex Set.mem_image_iff_bex theorem image_eta (f : α → β) : f '' s = (fun x => f x) '' s := rfl #align set.image_eta Set.image_eta theorem _root_.Function.Injective.mem_set_image {f : α → β} (hf : Injective f) {s : Set α} {a : α} : f a ∈ f '' s ↔ a ∈ s := ⟨fun ⟨_, hb, Eq⟩ => hf Eq ▸ hb, mem_image_of_mem f⟩ #align function.injective.mem_set_image Function.Injective.mem_set_image theorem forall_mem_image {f : α → β} {s : Set α} {p : β → Prop} : (∀ y ∈ f '' s, p y) ↔ ∀ ⦃x⦄, x ∈ s → p (f x) := by simp #align set.ball_image_iff Set.forall_mem_image theorem exists_mem_image {f : α → β} {s : Set α} {p : β → Prop} : (∃ y ∈ f '' s, p y) ↔ ∃ x ∈ s, p (f x) := by simp #align set.bex_image_iff Set.exists_mem_image @[deprecated (since := "2024-02-21")] alias ball_image_iff := forall_mem_image @[deprecated (since := "2024-02-21")] alias bex_image_iff := exists_mem_image @[deprecated (since := "2024-02-21")] alias ⟨_, ball_image_of_ball⟩ := forall_mem_image #align set.ball_image_of_ball Set.ball_image_of_ball @[deprecated forall_mem_image (since := "2024-02-21")] theorem mem_image_elim {f : α → β} {s : Set α} {C : β → Prop} (h : ∀ x : α, x ∈ s → C (f x)) : ∀ {y : β}, y ∈ f '' s → C y := forall_mem_image.2 h _ #align set.mem_image_elim Set.mem_image_elim @[deprecated forall_mem_image (since := "2024-02-21")] theorem mem_image_elim_on {f : α → β} {s : Set α} {C : β → Prop} {y : β} (h_y : y ∈ f '' s) (h : ∀ x : α, x ∈ s → C (f x)) : C y := forall_mem_image.2 h _ h_y #align set.mem_image_elim_on Set.mem_image_elim_on -- Porting note: used to be `safe` @[congr] theorem image_congr {f g : α → β} {s : Set α} (h : ∀ a ∈ s, f a = g a) : f '' s = g '' s := by ext x exact exists_congr fun a ↦ and_congr_right fun ha ↦ by rw [h a ha] #align set.image_congr Set.image_congr theorem image_congr' {f g : α → β} {s : Set α} (h : ∀ x : α, f x = g x) : f '' s = g '' s := image_congr fun x _ => h x #align set.image_congr' Set.image_congr' @[gcongr] lemma image_mono (h : s ⊆ t) : f '' s ⊆ f '' t := by rintro - ⟨a, ha, rfl⟩; exact mem_image_of_mem f (h ha) theorem image_comp (f : β → γ) (g : α → β) (a : Set α) : f ∘ g '' a = f '' (g '' a) := by aesop #align set.image_comp Set.image_comp theorem image_comp_eq {g : β → γ} : image (g ∘ f) = image g ∘ image f := by ext; simp theorem image_image (g : β → γ) (f : α → β) (s : Set α) : g '' (f '' s) = (fun x => g (f x)) '' s := (image_comp g f s).symm #align set.image_image Set.image_image theorem image_comm {β'} {f : β → γ} {g : α → β} {f' : α → β'} {g' : β' → γ} (h_comm : ∀ a, f (g a) = g' (f' a)) : (s.image g).image f = (s.image f').image g' := by simp_rw [image_image, h_comm] #align set.image_comm Set.image_comm theorem _root_.Function.Semiconj.set_image {f : α → β} {ga : α → α} {gb : β → β} (h : Function.Semiconj f ga gb) : Function.Semiconj (image f) (image ga) (image gb) := fun _ => image_comm h #align function.semiconj.set_image Function.Semiconj.set_image theorem _root_.Function.Commute.set_image {f g : α → α} (h : Function.Commute f g) : Function.Commute (image f) (image g) := Function.Semiconj.set_image h #align function.commute.set_image Function.Commute.set_image @[gcongr] theorem image_subset {a b : Set α} (f : α → β) (h : a ⊆ b) : f '' a ⊆ f '' b := by simp only [subset_def, mem_image] exact fun x => fun ⟨w, h1, h2⟩ => ⟨w, h h1, h2⟩ #align set.image_subset Set.image_subset lemma monotone_image {f : α → β} : Monotone (image f) := fun _ _ => image_subset _ #align set.monotone_image Set.monotone_image theorem image_union (f : α → β) (s t : Set α) : f '' (s ∪ t) = f '' s ∪ f '' t := ext fun x => ⟨by rintro ⟨a, h \| h, rfl⟩ <;> [left; right] <;> exact ⟨_, h, rfl⟩, by rintro (⟨a, h, rfl⟩ \| ⟨a, h, rfl⟩) <;> refine ⟨_, ?_, rfl⟩ · exact mem_union_left t h · exact mem_union_right s h⟩ #align set.image_union Set.image_union @[simp] theorem image_empty (f : α → β) : f '' ∅ = ∅ := by ext simp #align set.image_empty Set.image_empty theorem image_inter_subset (f : α → β) (s t : Set α) : f '' (s ∩ t) ⊆ f '' s ∩ f '' t := subset_inter (image_subset _ inter_subset_left) (image_subset _ inter_subset_right) #align set.image_inter_subset Set.image_inter_subset theorem image_inter_on {f : α → β} {s t : Set α} (h : ∀ x ∈ t, ∀ y ∈ s, f x = f y → x = y) : f '' (s ∩ t) = f '' s ∩ f '' t := (image_inter_subset _ _ _).antisymm fun b ⟨⟨a₁, ha₁, h₁⟩, ⟨a₂, ha₂, h₂⟩⟩ ↦ have : a₂ = a₁ := h _ ha₂ _ ha₁ (by simp []) ⟨a₁, ⟨ha₁, this ▸ ha₂⟩, h₁⟩ #align set.image_inter_on Set.image_inter_on theorem image_inter {f : α → β} {s t : Set α} (H : Injective f) : f '' (s ∩ t) = f '' s ∩ f '' t := image_inter_on fun _ _ _ _ h => H h #align set.image_inter Set.image_inter theorem image_univ_of_surjective {ι : Type} {f : ι → β} (H : Surjective f) : f '' univ = univ := eq_univ_of_forall <\| by simpa [image] #align set.image_univ_of_surjective Set.image_univ_of_surjective @[simp] theorem image_singleton {f : α → β} {a : α} : f '' {a} = {f a} := by ext simp [image, eq_comm] #align set.image_singleton Set.image_singleton @[simp] theorem Nonempty.image_const {s : Set α} (hs : s.Nonempty) (a : β) : (fun _ => a) '' s = {a} := ext fun _ => ⟨fun ⟨_, _, h⟩ => h ▸ mem_singleton _, fun h => (eq_of_mem_singleton h).symm ▸ hs.imp fun _ hy => ⟨hy, rfl⟩⟩ #align set.nonempty.image_const Set.Nonempty.image_const @[simp, mfld_simps] theorem image_eq_empty {α β} {f : α → β} {s : Set α} : f '' s = ∅ ↔ s = ∅ := by simp only [eq_empty_iff_forall_not_mem] exact ⟨fun H a ha => H _ ⟨_, ha, rfl⟩, fun H b ⟨_, ha, _⟩ => H _ ha⟩ #align set.image_eq_empty Set.image_eq_empty -- Porting note: `compl` is already defined in `Init.Set` theorem preimage_compl_eq_image_compl [BooleanAlgebra α] (S : Set α) : HasCompl.compl ⁻¹' S = HasCompl.compl '' S := Set.ext fun x => ⟨fun h => ⟨xᶜ, h, compl_compl x⟩, fun h => Exists.elim h fun _ hy => (compl_eq_comm.mp hy.2).symm.subst hy.1⟩ #align set.preimage_compl_eq_image_compl Set.preimage_compl_eq_image_compl theorem mem_compl_image [BooleanAlgebra α] (t : α) (S : Set α) : t ∈ HasCompl.compl '' S ↔ tᶜ ∈ S := by simp [← preimage_compl_eq_image_compl] #align set.mem_compl_image Set.mem_compl_image @[simp] theorem image_id_eq : image (id : α → α) = id := by ext; simp @[simp]	Mathlib/Data/Set/Image.lean	371	373	theorem image_id' (s : Set α) : (fun x => x) '' s = s := by	ext simp
import Mathlib.Analysis.Calculus.ContDiff.Basic import Mathlib.Analysis.Calculus.ParametricIntegral import Mathlib.MeasureTheory.Constructions.Prod.Integral import Mathlib.MeasureTheory.Function.LocallyIntegrable import Mathlib.MeasureTheory.Group.Integral import Mathlib.MeasureTheory.Group.Prod import Mathlib.MeasureTheory.Integral.IntervalIntegral #align_import analysis.convolution from "leanprover-community/mathlib"@"8905e5ed90859939681a725b00f6063e65096d95" open Set Function Filter MeasureTheory MeasureTheory.Measure TopologicalSpace open ContinuousLinearMap Metric Bornology open scoped Pointwise Topology NNReal Filter universe u𝕜 uG uE uE' uE'' uF uF' uF'' uP variable {𝕜 : Type u𝕜} {G : Type uG} {E : Type uE} {E' : Type uE'} {E'' : Type uE''} {F : Type uF} {F' : Type uF'} {F'' : Type uF''} {P : Type uP} variable [NormedAddCommGroup E] [NormedAddCommGroup E'] [NormedAddCommGroup E''] [NormedAddCommGroup F] {f f' : G → E} {g g' : G → E'} {x x' : G} {y y' : E} namespace MeasureTheory section NontriviallyNormedField variable [NontriviallyNormedField 𝕜] variable [NormedSpace 𝕜 E] [NormedSpace 𝕜 E'] [NormedSpace 𝕜 E''] [NormedSpace 𝕜 F] variable (L : E →L[𝕜] E' →L[𝕜] F) section NoMeasurability variable [AddGroup G] [TopologicalSpace G] theorem convolution_integrand_bound_right_of_le_of_subset {C : ℝ} (hC : ∀ i, ‖g i‖ ≤ C) {x t : G} {s u : Set G} (hx : x ∈ s) (hu : -tsupport g + s ⊆ u) : ‖L (f t) (g (x - t))‖ ≤ u.indicator (fun t => ‖L‖ * ‖f t‖ * C) t := by -- Porting note: had to add `f := _` refine le_indicator (f := fun t ↦ ‖L (f t) (g (x - t))‖) (fun t _ => ?_) (fun t ht => ?_) t · apply_rules [L.le_of_opNorm₂_le_of_le, le_rfl] · have : x - t ∉ support g := by refine mt (fun hxt => hu ?_) ht refine ⟨_, Set.neg_mem_neg.mpr (subset_closure hxt), _, hx, ?_⟩ simp only [neg_sub, sub_add_cancel] simp only [nmem_support.mp this, (L _).map_zero, norm_zero, le_rfl] #align convolution_integrand_bound_right_of_le_of_subset MeasureTheory.convolution_integrand_bound_right_of_le_of_subset theorem _root_.HasCompactSupport.convolution_integrand_bound_right_of_subset (hcg : HasCompactSupport g) (hg : Continuous g) {x t : G} {s u : Set G} (hx : x ∈ s) (hu : -tsupport g + s ⊆ u) : ‖L (f t) (g (x - t))‖ ≤ u.indicator (fun t => ‖L‖ * ‖f t‖ * ⨆ i, ‖g i‖) t := by refine convolution_integrand_bound_right_of_le_of_subset _ (fun i => ?_) hx hu exact le_ciSup (hg.norm.bddAbove_range_of_hasCompactSupport hcg.norm) _ #align has_compact_support.convolution_integrand_bound_right_of_subset HasCompactSupport.convolution_integrand_bound_right_of_subset theorem _root_.HasCompactSupport.convolution_integrand_bound_right (hcg : HasCompactSupport g) (hg : Continuous g) {x t : G} {s : Set G} (hx : x ∈ s) : ‖L (f t) (g (x - t))‖ ≤ (-tsupport g + s).indicator (fun t => ‖L‖ * ‖f t‖ * ⨆ i, ‖g i‖) t := hcg.convolution_integrand_bound_right_of_subset L hg hx Subset.rfl #align has_compact_support.convolution_integrand_bound_right HasCompactSupport.convolution_integrand_bound_right theorem _root_.Continuous.convolution_integrand_fst [ContinuousSub G] (hg : Continuous g) (t : G) : Continuous fun x => L (f t) (g (x - t)) := L.continuous₂.comp₂ continuous_const <\| hg.comp <\| continuous_id.sub continuous_const #align continuous.convolution_integrand_fst Continuous.convolution_integrand_fst	Mathlib/Analysis/Convolution.lean	150	155	theorem _root_.HasCompactSupport.convolution_integrand_bound_left (hcf : HasCompactSupport f) (hf : Continuous f) {x t : G} {s : Set G} (hx : x ∈ s) : ‖L (f (x - t)) (g t)‖ ≤ (-tsupport f + s).indicator (fun t => (‖L‖ * ⨆ i, ‖f i‖) * ‖g t‖) t := by	convert hcf.convolution_integrand_bound_right L.flip hf hx using 1 simp_rw [L.opNorm_flip, mul_right_comm]
import Mathlib.CategoryTheory.Sites.IsSheafFor import Mathlib.CategoryTheory.Limits.Shapes.Types import Mathlib.Tactic.ApplyFun #align_import category_theory.sites.sheaf_of_types from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" universe w v u namespace CategoryTheory open Opposite CategoryTheory Category Limits Sieve namespace Equalizer variable {C : Type u} [Category.{v} C] (P : Cᵒᵖ ⥤ Type max v u) {X : C} (R : Presieve X) (S : Sieve X) noncomputable section def FirstObj : Type max v u := ∏ᶜ fun f : ΣY, { f : Y ⟶ X // R f } => P.obj (op f.1) #align category_theory.equalizer.first_obj CategoryTheory.Equalizer.FirstObj variable {P R} -- Porting note (#10688): added to ease automation @[ext] lemma FirstObj.ext (z₁ z₂ : FirstObj P R) (h : ∀ (Y : C) (f : Y ⟶ X) (hf : R f), (Pi.π _ ⟨Y, f, hf⟩ : FirstObj P R ⟶ _) z₁ = (Pi.π _ ⟨Y, f, hf⟩ : FirstObj P R ⟶ _) z₂) : z₁ = z₂ := by apply Limits.Types.limit_ext rintro ⟨⟨Y, f, hf⟩⟩ exact h Y f hf variable (P R) @[simps] def firstObjEqFamily : FirstObj P R ≅ R.FamilyOfElements P where hom t Y f hf := Pi.π (fun f : ΣY, { f : Y ⟶ X // R f } => P.obj (op f.1)) ⟨_, _, hf⟩ t inv := Pi.lift fun f x => x _ f.2.2 #align category_theory.equalizer.first_obj_eq_family CategoryTheory.Equalizer.firstObjEqFamily instance : Inhabited (FirstObj P (⊥ : Presieve X)) := (firstObjEqFamily P _).toEquiv.inhabited -- Porting note: was not needed in mathlib instance : Inhabited (FirstObj P ((⊥ : Sieve X) : Presieve X)) := (inferInstance : Inhabited (FirstObj P (⊥ : Presieve X))) def forkMap : P.obj (op X) ⟶ FirstObj P R := Pi.lift fun f => P.map f.2.1.op #align category_theory.equalizer.fork_map CategoryTheory.Equalizer.forkMap namespace Presieve variable [R.hasPullbacks] @[simp] def SecondObj : Type max v u := ∏ᶜ fun fg : (ΣY, { f : Y ⟶ X // R f }) × ΣZ, { g : Z ⟶ X // R g } => haveI := Presieve.hasPullbacks.has_pullbacks fg.1.2.2 fg.2.2.2 P.obj (op (pullback fg.1.2.1 fg.2.2.1)) #align category_theory.equalizer.presieve.second_obj CategoryTheory.Equalizer.Presieve.SecondObj def firstMap : FirstObj P R ⟶ SecondObj P R := Pi.lift fun fg => haveI := Presieve.hasPullbacks.has_pullbacks fg.1.2.2 fg.2.2.2 Pi.π _ _ ≫ P.map pullback.fst.op #align category_theory.equalizer.presieve.first_map CategoryTheory.Equalizer.Presieve.firstMap instance [HasPullbacks C] : Inhabited (SecondObj P (⊥ : Presieve X)) := ⟨firstMap _ _ default⟩ def secondMap : FirstObj P R ⟶ SecondObj P R := Pi.lift fun fg => haveI := Presieve.hasPullbacks.has_pullbacks fg.1.2.2 fg.2.2.2 Pi.π _ _ ≫ P.map pullback.snd.op #align category_theory.equalizer.presieve.second_map CategoryTheory.Equalizer.Presieve.secondMap theorem w : forkMap P R ≫ firstMap P R = forkMap P R ≫ secondMap P R := by dsimp ext fg simp only [firstMap, secondMap, forkMap] simp only [limit.lift_π, limit.lift_π_assoc, assoc, Fan.mk_π_app] haveI := Presieve.hasPullbacks.has_pullbacks fg.1.2.2 fg.2.2.2 rw [← P.map_comp, ← op_comp, pullback.condition] simp #align category_theory.equalizer.presieve.w CategoryTheory.Equalizer.Presieve.w theorem compatible_iff (x : FirstObj P R) : ((firstObjEqFamily P R).hom x).Compatible ↔ firstMap P R x = secondMap P R x := by rw [Presieve.pullbackCompatible_iff] constructor · intro t apply Limits.Types.limit_ext rintro ⟨⟨Y, f, hf⟩, Z, g, hg⟩ simpa [firstMap, secondMap] using t hf hg · intro t Y Z f g hf hg rw [Types.limit_ext_iff'] at t simpa [firstMap, secondMap] using t ⟨⟨⟨Y, f, hf⟩, Z, g, hg⟩⟩ #align category_theory.equalizer.presieve.compatible_iff CategoryTheory.Equalizer.Presieve.compatible_iff theorem sheaf_condition : R.IsSheafFor P ↔ Nonempty (IsLimit (Fork.ofι _ (w P R))) := by rw [Types.type_equalizer_iff_unique] erw [← Equiv.forall_congr_left (firstObjEqFamily P R).toEquiv.symm] simp_rw [← compatible_iff, ← Iso.toEquiv_fun, Equiv.apply_symm_apply] apply forall₂_congr intro x _ apply exists_unique_congr intro t rw [Equiv.eq_symm_apply] constructor · intro q funext Y f hf simpa [forkMap] using q _ _ · intro q Y f hf rw [← q] simp [forkMap] #align category_theory.equalizer.presieve.sheaf_condition CategoryTheory.Equalizer.Presieve.sheaf_condition namespace Arrows variable (P : Cᵒᵖ ⥤ Type w) {X : C} (R : Presieve X) (S : Sieve X) open Presieve variable {B : C} {I : Type} (X : I → C) (π : (i : I) → X i ⟶ B) [(Presieve.ofArrows X π).hasPullbacks] -- TODO: allow `I : Type w` def FirstObj : Type w := ∏ᶜ (fun i ↦ P.obj (op (X i))) @[ext] lemma FirstObj.ext (z₁ z₂ : FirstObj P X) (h : ∀ i, (Pi.π _ i : FirstObj P X ⟶ _) z₁ = (Pi.π _ i : FirstObj P X ⟶ _) z₂) : z₁ = z₂ := by apply Limits.Types.limit_ext rintro ⟨i⟩ exact h i def SecondObj : Type w := ∏ᶜ (fun (ij : I × I) ↦ P.obj (op (pullback (π ij.1) (π ij.2)))) @[ext] lemma SecondObj.ext (z₁ z₂ : SecondObj P X π) (h : ∀ ij, (Pi.π _ ij : SecondObj P X π ⟶ _) z₁ = (Pi.π _ ij : SecondObj P X π ⟶ _) z₂) : z₁ = z₂ := by apply Limits.Types.limit_ext rintro ⟨i⟩ exact h i def forkMap : P.obj (op B) ⟶ FirstObj P X := Pi.lift (fun i ↦ P.map (π i).op) def firstMap : FirstObj P X ⟶ SecondObj P X π := Pi.lift fun _ => Pi.π _ _ ≫ P.map pullback.fst.op def secondMap : FirstObj P X ⟶ SecondObj P X π := Pi.lift fun _ => Pi.π _ _ ≫ P.map pullback.snd.op	Mathlib/CategoryTheory/Sites/EqualizerSheafCondition.lean	320	323	theorem w : forkMap P X π ≫ firstMap P X π = forkMap P X π ≫ secondMap P X π := by	ext x ij simp only [firstMap, secondMap, forkMap, types_comp_apply, Types.pi_lift_π_apply, ← FunctorToTypes.map_comp_apply, ← op_comp, pullback.condition]
import Mathlib.Data.Fin.Fin2 import Mathlib.Logic.Function.Basic import Mathlib.Tactic.Common #align_import data.typevec from "leanprover-community/mathlib"@"48fb5b5280e7c81672afc9524185ae994553ebf4" universe u v w @[pp_with_univ] def TypeVec (n : ℕ) := Fin2 n → Type* #align typevec TypeVec instance {n} : Inhabited (TypeVec.{u} n) := ⟨fun _ => PUnit⟩ namespace TypeVec variable {n : ℕ} def Arrow (α β : TypeVec n) := ∀ i : Fin2 n, α i → β i #align typevec.arrow TypeVec.Arrow @[inherit_doc] scoped[MvFunctor] infixl:40 " ⟹ " => TypeVec.Arrow open MvFunctor @[ext] theorem Arrow.ext {α β : TypeVec n} (f g : α ⟹ β) : (∀ i, f i = g i) → f = g := by intro h; funext i; apply h instance Arrow.inhabited (α β : TypeVec n) [∀ i, Inhabited (β i)] : Inhabited (α ⟹ β) := ⟨fun _ _ => default⟩ #align typevec.arrow.inhabited TypeVec.Arrow.inhabited def id {α : TypeVec n} : α ⟹ α := fun _ x => x #align typevec.id TypeVec.id def comp {α β γ : TypeVec n} (g : β ⟹ γ) (f : α ⟹ β) : α ⟹ γ := fun i x => g i (f i x) #align typevec.comp TypeVec.comp @[inherit_doc] scoped[MvFunctor] infixr:80 " ⊚ " => TypeVec.comp -- type as \oo @[simp] theorem id_comp {α β : TypeVec n} (f : α ⟹ β) : id ⊚ f = f := rfl #align typevec.id_comp TypeVec.id_comp @[simp] theorem comp_id {α β : TypeVec n} (f : α ⟹ β) : f ⊚ id = f := rfl #align typevec.comp_id TypeVec.comp_id theorem comp_assoc {α β γ δ : TypeVec n} (h : γ ⟹ δ) (g : β ⟹ γ) (f : α ⟹ β) : (h ⊚ g) ⊚ f = h ⊚ g ⊚ f := rfl #align typevec.comp_assoc TypeVec.comp_assoc def append1 (α : TypeVec n) (β : Type) : TypeVec (n + 1) \| Fin2.fs i => α i \| Fin2.fz => β #align typevec.append1 TypeVec.append1 @[inherit_doc] infixl:67 " ::: " => append1 def drop (α : TypeVec.{u} (n + 1)) : TypeVec n := fun i => α i.fs #align typevec.drop TypeVec.drop def last (α : TypeVec.{u} (n + 1)) : Type _ := α Fin2.fz #align typevec.last TypeVec.last instance last.inhabited (α : TypeVec (n + 1)) [Inhabited (α Fin2.fz)] : Inhabited (last α) := ⟨show α Fin2.fz from default⟩ #align typevec.last.inhabited TypeVec.last.inhabited theorem drop_append1 {α : TypeVec n} {β : Type} {i : Fin2 n} : drop (append1 α β) i = α i := rfl #align typevec.drop_append1 TypeVec.drop_append1 theorem drop_append1' {α : TypeVec n} {β : Type} : drop (append1 α β) = α := funext fun _ => drop_append1 #align typevec.drop_append1' TypeVec.drop_append1' theorem last_append1 {α : TypeVec n} {β : Type} : last (append1 α β) = β := rfl #align typevec.last_append1 TypeVec.last_append1 @[simp] theorem append1_drop_last (α : TypeVec (n + 1)) : append1 (drop α) (last α) = α := funext fun i => by cases i <;> rfl #align typevec.append1_drop_last TypeVec.append1_drop_last @[elab_as_elim] def append1Cases {C : TypeVec (n + 1) → Sort u} (H : ∀ α β, C (append1 α β)) (γ) : C γ := by rw [← @append1_drop_last _ γ]; apply H #align typevec.append1_cases TypeVec.append1Cases @[simp] theorem append1_cases_append1 {C : TypeVec (n + 1) → Sort u} (H : ∀ α β, C (append1 α β)) (α β) : @append1Cases _ C H (append1 α β) = H α β := rfl #align typevec.append1_cases_append1 TypeVec.append1_cases_append1 def splitFun {α α' : TypeVec (n + 1)} (f : drop α ⟹ drop α') (g : last α → last α') : α ⟹ α' \| Fin2.fs i => f i \| Fin2.fz => g #align typevec.split_fun TypeVec.splitFun def appendFun {α α' : TypeVec n} {β β' : Type} (f : α ⟹ α') (g : β → β') : append1 α β ⟹ append1 α' β' := splitFun f g #align typevec.append_fun TypeVec.appendFun @[inherit_doc] infixl:0 " ::: " => appendFun def dropFun {α β : TypeVec (n + 1)} (f : α ⟹ β) : drop α ⟹ drop β := fun i => f i.fs #align typevec.drop_fun TypeVec.dropFun def lastFun {α β : TypeVec (n + 1)} (f : α ⟹ β) : last α → last β := f Fin2.fz #align typevec.last_fun TypeVec.lastFun -- Porting note: Lean wasn't able to infer the motive in term mode def nilFun {α : TypeVec 0} {β : TypeVec 0} : α ⟹ β := fun i => by apply Fin2.elim0 i #align typevec.nil_fun TypeVec.nilFun theorem eq_of_drop_last_eq {α β : TypeVec (n + 1)} {f g : α ⟹ β} (h₀ : dropFun f = dropFun g) (h₁ : lastFun f = lastFun g) : f = g := by -- Porting note: FIXME: congr_fun h₀ <;> ext1 ⟨⟩ <;> apply_assumption refine funext (fun x => ?_) cases x · apply h₁ · apply congr_fun h₀ #align typevec.eq_of_drop_last_eq TypeVec.eq_of_drop_last_eq @[simp] theorem dropFun_splitFun {α α' : TypeVec (n + 1)} (f : drop α ⟹ drop α') (g : last α → last α') : dropFun (splitFun f g) = f := rfl #align typevec.drop_fun_split_fun TypeVec.dropFun_splitFun def Arrow.mp {α β : TypeVec n} (h : α = β) : α ⟹ β \| _ => Eq.mp (congr_fun h _) #align typevec.arrow.mp TypeVec.Arrow.mp def Arrow.mpr {α β : TypeVec n} (h : α = β) : β ⟹ α \| _ => Eq.mpr (congr_fun h _) #align typevec.arrow.mpr TypeVec.Arrow.mpr def toAppend1DropLast {α : TypeVec (n + 1)} : α ⟹ (drop α ::: last α) := Arrow.mpr (append1_drop_last _) #align typevec.to_append1_drop_last TypeVec.toAppend1DropLast def fromAppend1DropLast {α : TypeVec (n + 1)} : (drop α ::: last α) ⟹ α := Arrow.mp (append1_drop_last _) #align typevec.from_append1_drop_last TypeVec.fromAppend1DropLast @[simp] theorem lastFun_splitFun {α α' : TypeVec (n + 1)} (f : drop α ⟹ drop α') (g : last α → last α') : lastFun (splitFun f g) = g := rfl #align typevec.last_fun_split_fun TypeVec.lastFun_splitFun @[simp] theorem dropFun_appendFun {α α' : TypeVec n} {β β' : Type} (f : α ⟹ α') (g : β → β') : dropFun (f ::: g) = f := rfl #align typevec.drop_fun_append_fun TypeVec.dropFun_appendFun @[simp] theorem lastFun_appendFun {α α' : TypeVec n} {β β' : Type} (f : α ⟹ α') (g : β → β') : lastFun (f ::: g) = g := rfl #align typevec.last_fun_append_fun TypeVec.lastFun_appendFun theorem split_dropFun_lastFun {α α' : TypeVec (n + 1)} (f : α ⟹ α') : splitFun (dropFun f) (lastFun f) = f := eq_of_drop_last_eq rfl rfl #align typevec.split_drop_fun_last_fun TypeVec.split_dropFun_lastFun theorem splitFun_inj {α α' : TypeVec (n + 1)} {f f' : drop α ⟹ drop α'} {g g' : last α → last α'} (H : splitFun f g = splitFun f' g') : f = f' ∧ g = g' := by rw [← dropFun_splitFun f g, H, ← lastFun_splitFun f g, H]; simp #align typevec.split_fun_inj TypeVec.splitFun_inj theorem appendFun_inj {α α' : TypeVec n} {β β' : Type} {f f' : α ⟹ α'} {g g' : β → β'} : (f ::: g : (α ::: β) ⟹ _) = (f' ::: g' : (α ::: β) ⟹ _) → f = f' ∧ g = g' := splitFun_inj #align typevec.append_fun_inj TypeVec.appendFun_inj theorem splitFun_comp {α₀ α₁ α₂ : TypeVec (n + 1)} (f₀ : drop α₀ ⟹ drop α₁) (f₁ : drop α₁ ⟹ drop α₂) (g₀ : last α₀ → last α₁) (g₁ : last α₁ → last α₂) : splitFun (f₁ ⊚ f₀) (g₁ ∘ g₀) = splitFun f₁ g₁ ⊚ splitFun f₀ g₀ := eq_of_drop_last_eq rfl rfl #align typevec.split_fun_comp TypeVec.splitFun_comp theorem appendFun_comp_splitFun {α γ : TypeVec n} {β δ : Type} {ε : TypeVec (n + 1)} (f₀ : drop ε ⟹ α) (f₁ : α ⟹ γ) (g₀ : last ε → β) (g₁ : β → δ) : appendFun f₁ g₁ ⊚ splitFun f₀ g₀ = splitFun (α' := γ.append1 δ) (f₁ ⊚ f₀) (g₁ ∘ g₀) := (splitFun_comp _ _ _ _).symm #align typevec.append_fun_comp_split_fun TypeVec.appendFun_comp_splitFun theorem appendFun_comp {α₀ α₁ α₂ : TypeVec n} {β₀ β₁ β₂ : Type} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) (g₀ : β₀ → β₁) (g₁ : β₁ → β₂) : (f₁ ⊚ f₀ ::: g₁ ∘ g₀) = (f₁ ::: g₁) ⊚ (f₀ ::: g₀) := eq_of_drop_last_eq rfl rfl #align typevec.append_fun_comp TypeVec.appendFun_comp theorem appendFun_comp' {α₀ α₁ α₂ : TypeVec n} {β₀ β₁ β₂ : Type} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) (g₀ : β₀ → β₁) (g₁ : β₁ → β₂) : (f₁ ::: g₁) ⊚ (f₀ ::: g₀) = (f₁ ⊚ f₀ ::: g₁ ∘ g₀) := eq_of_drop_last_eq rfl rfl #align typevec.append_fun_comp' TypeVec.appendFun_comp' theorem nilFun_comp {α₀ : TypeVec 0} (f₀ : α₀ ⟹ Fin2.elim0) : nilFun ⊚ f₀ = f₀ := funext fun x => by apply Fin2.elim0 x -- Porting note: `by apply` is necessary? #align typevec.nil_fun_comp TypeVec.nilFun_comp theorem appendFun_comp_id {α : TypeVec n} {β₀ β₁ β₂ : Type u} (g₀ : β₀ → β₁) (g₁ : β₁ → β₂) : (@id _ α ::: g₁ ∘ g₀) = (id ::: g₁) ⊚ (id ::: g₀) := eq_of_drop_last_eq rfl rfl #align typevec.append_fun_comp_id TypeVec.appendFun_comp_id @[simp] theorem dropFun_comp {α₀ α₁ α₂ : TypeVec (n + 1)} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) : dropFun (f₁ ⊚ f₀) = dropFun f₁ ⊚ dropFun f₀ := rfl #align typevec.drop_fun_comp TypeVec.dropFun_comp @[simp] theorem lastFun_comp {α₀ α₁ α₂ : TypeVec (n + 1)} (f₀ : α₀ ⟹ α₁) (f₁ : α₁ ⟹ α₂) : lastFun (f₁ ⊚ f₀) = lastFun f₁ ∘ lastFun f₀ := rfl #align typevec.last_fun_comp TypeVec.lastFun_comp theorem appendFun_aux {α α' : TypeVec n} {β β' : Type} (f : (α ::: β) ⟹ (α' ::: β')) : (dropFun f ::: lastFun f) = f := eq_of_drop_last_eq rfl rfl #align typevec.append_fun_aux TypeVec.appendFun_aux theorem appendFun_id_id {α : TypeVec n} {β : Type} : (@TypeVec.id n α ::: @_root_.id β) = TypeVec.id := eq_of_drop_last_eq rfl rfl #align typevec.append_fun_id_id TypeVec.appendFun_id_id instance subsingleton0 : Subsingleton (TypeVec 0) := ⟨fun a b => funext fun a => by apply Fin2.elim0 a⟩ -- Porting note: `by apply` necessary? #align typevec.subsingleton0 TypeVec.subsingleton0 -- Porting note: `simp` attribute `TypeVec` moved to file `Tactic/Attr/Register.lean` protected def casesNil {β : TypeVec 0 → Sort} (f : β Fin2.elim0) : ∀ v, β v := fun v => cast (by congr; funext i; cases i) f #align typevec.cases_nil TypeVec.casesNil protected def casesCons (n : ℕ) {β : TypeVec (n + 1) → Sort} (f : ∀ (t) (v : TypeVec n), β (v ::: t)) : ∀ v, β v := fun v : TypeVec (n + 1) => cast (by simp) (f v.last v.drop) #align typevec.cases_cons TypeVec.casesCons protected theorem casesNil_append1 {β : TypeVec 0 → Sort} (f : β Fin2.elim0) : TypeVec.casesNil f Fin2.elim0 = f := rfl #align typevec.cases_nil_append1 TypeVec.casesNil_append1 protected theorem casesCons_append1 (n : ℕ) {β : TypeVec (n + 1) → Sort} (f : ∀ (t) (v : TypeVec n), β (v ::: t)) (v : TypeVec n) (α) : TypeVec.casesCons n f (v ::: α) = f α v := rfl #align typevec.cases_cons_append1 TypeVec.casesCons_append1 def typevecCasesNil₃ {β : ∀ v v' : TypeVec 0, v ⟹ v' → Sort} (f : β Fin2.elim0 Fin2.elim0 nilFun) : ∀ v v' fs, β v v' fs := fun v v' fs => by refine cast ?_ f have eq₁ : v = Fin2.elim0 := by funext i; contradiction have eq₂ : v' = Fin2.elim0 := by funext i; contradiction have eq₃ : fs = nilFun := by funext i; contradiction cases eq₁; cases eq₂; cases eq₃; rfl #align typevec.typevec_cases_nil₃ TypeVec.typevecCasesNil₃ def typevecCasesCons₃ (n : ℕ) {β : ∀ v v' : TypeVec (n + 1), v ⟹ v' → Sort} (F : ∀ (t t') (f : t → t') (v v' : TypeVec n) (fs : v ⟹ v'), β (v ::: t) (v' ::: t') (fs ::: f)) : ∀ v v' fs, β v v' fs := by intro v v' rw [← append1_drop_last v, ← append1_drop_last v'] intro fs rw [← split_dropFun_lastFun fs] apply F #align typevec.typevec_cases_cons₃ TypeVec.typevecCasesCons₃ def typevecCasesNil₂ {β : Fin2.elim0 ⟹ Fin2.elim0 → Sort} (f : β nilFun) : ∀ f, β f := by intro g suffices g = nilFun by rwa [this] ext ⟨⟩ #align typevec.typevec_cases_nil₂ TypeVec.typevecCasesNil₂ def typevecCasesCons₂ (n : ℕ) (t t' : Type) (v v' : TypeVec n) {β : (v ::: t) ⟹ (v' ::: t') → Sort} (F : ∀ (f : t → t') (fs : v ⟹ v'), β (fs ::: f)) : ∀ fs, β fs := by intro fs rw [← split_dropFun_lastFun fs] apply F #align typevec.typevec_cases_cons₂ TypeVec.typevecCasesCons₂ theorem typevecCasesNil₂_appendFun {β : Fin2.elim0 ⟹ Fin2.elim0 → Sort} (f : β nilFun) : typevecCasesNil₂ f nilFun = f := rfl #align typevec.typevec_cases_nil₂_append_fun TypeVec.typevecCasesNil₂_appendFun theorem typevecCasesCons₂_appendFun (n : ℕ) (t t' : Type) (v v' : TypeVec n) {β : (v ::: t) ⟹ (v' ::: t') → Sort} (F : ∀ (f : t → t') (fs : v ⟹ v'), β (fs ::: f)) (f fs) : typevecCasesCons₂ n t t' v v' F (fs ::: f) = F f fs := rfl #align typevec.typevec_cases_cons₂_append_fun TypeVec.typevecCasesCons₂_appendFun -- for lifting predicates and relations def PredLast (α : TypeVec n) {β : Type} (p : β → Prop) : ∀ ⦃i⦄, (α.append1 β) i → Prop \| Fin2.fs _ => fun _ => True \| Fin2.fz => p #align typevec.pred_last TypeVec.PredLast def RelLast (α : TypeVec n) {β γ : Type u} (r : β → γ → Prop) : ∀ ⦃i⦄, (α.append1 β) i → (α.append1 γ) i → Prop \| Fin2.fs _ => Eq \| Fin2.fz => r #align typevec.rel_last TypeVec.RelLast section Liftp' open Nat def «repeat» : ∀ (n : ℕ), Sort _ → TypeVec n \| 0, _ => Fin2.elim0 \| Nat.succ i, t => append1 («repeat» i t) t #align typevec.repeat TypeVec.repeat def prod : ∀ {n}, TypeVec.{u} n → TypeVec.{u} n → TypeVec n \| 0, _, _ => Fin2.elim0 \| n + 1, α, β => (@prod n (drop α) (drop β)) ::: (last α × last β) #align typevec.prod TypeVec.prod @[inherit_doc] scoped[MvFunctor] infixl:45 " ⊗ " => TypeVec.prod protected def const {β} (x : β) : ∀ {n} (α : TypeVec n), α ⟹ «repeat» _ β \| succ _, α, Fin2.fs _ => TypeVec.const x (drop α) _ \| succ _, _, Fin2.fz => fun _ => x #align typevec.const TypeVec.const open Function (uncurry) def repeatEq : ∀ {n} (α : TypeVec n), (α ⊗ α) ⟹ «repeat» _ Prop \| 0, _ => nilFun \| succ _, α => repeatEq (drop α) ::: uncurry Eq #align typevec.repeat_eq TypeVec.repeatEq theorem const_append1 {β γ} (x : γ) {n} (α : TypeVec n) : TypeVec.const x (α ::: β) = appendFun (TypeVec.const x α) fun _ => x := by ext i : 1; cases i <;> rfl #align typevec.const_append1 TypeVec.const_append1 theorem eq_nilFun {α β : TypeVec 0} (f : α ⟹ β) : f = nilFun := by ext x; cases x #align typevec.eq_nil_fun TypeVec.eq_nilFun theorem id_eq_nilFun {α : TypeVec 0} : @id _ α = nilFun := by ext x; cases x #align typevec.id_eq_nil_fun TypeVec.id_eq_nilFun theorem const_nil {β} (x : β) (α : TypeVec 0) : TypeVec.const x α = nilFun := by ext i : 1; cases i #align typevec.const_nil TypeVec.const_nil @[typevec] theorem repeat_eq_append1 {β} {n} (α : TypeVec n) : repeatEq (α ::: β) = splitFun (α := (α ⊗ α) ::: _ ) (α' := («repeat» n Prop) ::: _) (repeatEq α) (uncurry Eq) := by induction n <;> rfl #align typevec.repeat_eq_append1 TypeVec.repeat_eq_append1 @[typevec] theorem repeat_eq_nil (α : TypeVec 0) : repeatEq α = nilFun := by ext i; cases i #align typevec.repeat_eq_nil TypeVec.repeat_eq_nil def PredLast' (α : TypeVec n) {β : Type} (p : β → Prop) : (α ::: β) ⟹ «repeat» (n + 1) Prop := splitFun (TypeVec.const True α) p #align typevec.pred_last' TypeVec.PredLast' def RelLast' (α : TypeVec n) {β : Type} (p : β → β → Prop) : (α ::: β) ⊗ (α ::: β) ⟹ «repeat» (n + 1) Prop := splitFun (repeatEq α) (uncurry p) #align typevec.rel_last' TypeVec.RelLast' def Curry (F : TypeVec.{u} (n + 1) → Type) (α : Type u) (β : TypeVec.{u} n) : Type _ := F (β ::: α) #align typevec.curry TypeVec.Curry instance Curry.inhabited (F : TypeVec.{u} (n + 1) → Type) (α : Type u) (β : TypeVec.{u} n) [I : Inhabited (F <\| (β ::: α))] : Inhabited (Curry F α β) := I #align typevec.curry.inhabited TypeVec.Curry.inhabited def dropRepeat (α : Type*) : ∀ {n}, drop («repeat» (succ n) α) ⟹ «repeat» n α \| succ _, Fin2.fs i => dropRepeat α i \| succ _, Fin2.fz => fun (a : α) => a #align typevec.drop_repeat TypeVec.dropRepeat def ofRepeat {α : Sort _} : ∀ {n i}, «repeat» n α i → α \| _, Fin2.fz => fun (a : α) => a \| _, Fin2.fs i => @ofRepeat _ _ i #align typevec.of_repeat TypeVec.ofRepeat theorem const_iff_true {α : TypeVec n} {i x p} : ofRepeat (TypeVec.const p α i x) ↔ p := by induction i with \| fz => rfl \| fs _ ih => erw [TypeVec.const, @ih (drop α) x] #align typevec.const_iff_true TypeVec.const_iff_true section variable {α β γ : TypeVec.{u} n} variable (p : α ⟹ «repeat» n Prop) (r : α ⊗ α ⟹ «repeat» n Prop) def prod.fst : ∀ {n} {α β : TypeVec.{u} n}, α ⊗ β ⟹ α \| succ _, α, β, Fin2.fs i => @prod.fst _ (drop α) (drop β) i \| succ _, _, _, Fin2.fz => Prod.fst #align typevec.prod.fst TypeVec.prod.fst def prod.snd : ∀ {n} {α β : TypeVec.{u} n}, α ⊗ β ⟹ β \| succ _, α, β, Fin2.fs i => @prod.snd _ (drop α) (drop β) i \| succ _, _, _, Fin2.fz => Prod.snd #align typevec.prod.snd TypeVec.prod.snd def prod.diag : ∀ {n} {α : TypeVec.{u} n}, α ⟹ α ⊗ α \| succ _, α, Fin2.fs _, x => @prod.diag _ (drop α) _ x \| succ _, _, Fin2.fz, x => (x, x) #align typevec.prod.diag TypeVec.prod.diag def prod.mk : ∀ {n} {α β : TypeVec.{u} n} (i : Fin2 n), α i → β i → (α ⊗ β) i \| succ _, α, β, Fin2.fs i => mk (α := fun i => α i.fs) (β := fun i => β i.fs) i \| succ _, _, _, Fin2.fz => Prod.mk #align typevec.prod.mk TypeVec.prod.mk end @[simp] theorem prod_fst_mk {α β : TypeVec n} (i : Fin2 n) (a : α i) (b : β i) : TypeVec.prod.fst i (prod.mk i a b) = a := by induction' i with _ _ _ i_ih · simp_all only [prod.fst, prod.mk] apply i_ih #align typevec.prod_fst_mk TypeVec.prod_fst_mk @[simp] theorem prod_snd_mk {α β : TypeVec n} (i : Fin2 n) (a : α i) (b : β i) : TypeVec.prod.snd i (prod.mk i a b) = b := by induction' i with _ _ _ i_ih · simp_all [prod.snd, prod.mk] apply i_ih #align typevec.prod_snd_mk TypeVec.prod_snd_mk protected def prod.map : ∀ {n} {α α' β β' : TypeVec.{u} n}, α ⟹ β → α' ⟹ β' → α ⊗ α' ⟹ β ⊗ β' \| succ _, α, α', β, β', x, y, Fin2.fs _, a => @prod.map _ (drop α) (drop α') (drop β) (drop β') (dropFun x) (dropFun y) _ a \| succ _, _, _, _, _, x, y, Fin2.fz, a => (x _ a.1, y _ a.2) #align typevec.prod.map TypeVec.prod.map @[inherit_doc] scoped[MvFunctor] infixl:45 " ⊗' " => TypeVec.prod.map theorem fst_prod_mk {α α' β β' : TypeVec n} (f : α ⟹ β) (g : α' ⟹ β') : TypeVec.prod.fst ⊚ (f ⊗' g) = f ⊚ TypeVec.prod.fst := by funext i; induction i with \| fz => rfl \| fs _ i_ih => apply i_ih #align typevec.fst_prod_mk TypeVec.fst_prod_mk theorem snd_prod_mk {α α' β β' : TypeVec n} (f : α ⟹ β) (g : α' ⟹ β') : TypeVec.prod.snd ⊚ (f ⊗' g) = g ⊚ TypeVec.prod.snd := by funext i; induction i with \| fz => rfl \| fs _ i_ih => apply i_ih #align typevec.snd_prod_mk TypeVec.snd_prod_mk theorem fst_diag {α : TypeVec n} : TypeVec.prod.fst ⊚ (prod.diag : α ⟹ _) = id := by funext i; induction i with \| fz => rfl \| fs _ i_ih => apply i_ih #align typevec.fst_diag TypeVec.fst_diag theorem snd_diag {α : TypeVec n} : TypeVec.prod.snd ⊚ (prod.diag : α ⟹ _) = id := by funext i; induction i with \| fz => rfl \| fs _ i_ih => apply i_ih #align typevec.snd_diag TypeVec.snd_diag	Mathlib/Data/TypeVec.lean	582	586	theorem repeatEq_iff_eq {α : TypeVec n} {i x y} : ofRepeat (repeatEq α i (prod.mk _ x y)) ↔ x = y := by	induction' i with _ _ _ i_ih · rfl erw [repeatEq, i_ih]
import Mathlib.Analysis.Convex.Jensen import Mathlib.Analysis.Convex.Mul import Mathlib.Analysis.Convex.SpecificFunctions.Basic import Mathlib.Analysis.SpecialFunctions.Pow.NNReal #align_import analysis.mean_inequalities_pow from "leanprover-community/mathlib"@"ccdbfb6e5614667af5aa3ab2d50885e0ef44a46f" universe u v open Finset open scoped Classical open NNReal ENNReal noncomputable section variable {ι : Type u} (s : Finset ι) namespace Real theorem pow_arith_mean_le_arith_mean_pow (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 ≤ z i) (n : ℕ) : (∑ i ∈ s, w i * z i) ^ n ≤ ∑ i ∈ s, w i * z i ^ n := (convexOn_pow n).map_sum_le hw hw' hz #align real.pow_arith_mean_le_arith_mean_pow Real.pow_arith_mean_le_arith_mean_pow theorem pow_arith_mean_le_arith_mean_pow_of_even (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1) {n : ℕ} (hn : Even n) : (∑ i ∈ s, w i * z i) ^ n ≤ ∑ i ∈ s, w i * z i ^ n := hn.convexOn_pow.map_sum_le hw hw' fun _ _ => Set.mem_univ _ #align real.pow_arith_mean_le_arith_mean_pow_of_even Real.pow_arith_mean_le_arith_mean_pow_of_even theorem pow_sum_div_card_le_sum_pow {f : ι → ℝ} (n : ℕ) (hf : ∀ a ∈ s, 0 ≤ f a) : (∑ x ∈ s, f x) ^ (n + 1) / (s.card : ℝ) ^ n ≤ ∑ x ∈ s, f x ^ (n + 1) := by rcases s.eq_empty_or_nonempty with (rfl \| hs) · simp_rw [Finset.sum_empty, zero_pow n.succ_ne_zero, zero_div]; rfl · have hs0 : 0 < (s.card : ℝ) := Nat.cast_pos.2 hs.card_pos suffices (∑ x ∈ s, f x / s.card) ^ (n + 1) ≤ ∑ x ∈ s, f x ^ (n + 1) / s.card by rwa [← Finset.sum_div, ← Finset.sum_div, div_pow, pow_succ (s.card : ℝ), ← div_div, div_le_iff hs0, div_mul, div_self hs0.ne', div_one] at this have := @ConvexOn.map_sum_le ℝ ℝ ℝ ι _ _ _ _ _ _ (Set.Ici 0) (fun x => x ^ (n + 1)) s (fun _ => 1 / s.card) ((↑) ∘ f) (convexOn_pow (n + 1)) ?_ ?_ fun i hi => Set.mem_Ici.2 (hf i hi) · simpa only [inv_mul_eq_div, one_div, Algebra.id.smul_eq_mul] using this · simp only [one_div, inv_nonneg, Nat.cast_nonneg, imp_true_iff] · simpa only [one_div, Finset.sum_const, nsmul_eq_mul] using mul_inv_cancel hs0.ne' #align real.pow_sum_div_card_le_sum_pow Real.pow_sum_div_card_le_sum_pow theorem zpow_arith_mean_le_arith_mean_zpow (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 < z i) (m : ℤ) : (∑ i ∈ s, w i * z i) ^ m ≤ ∑ i ∈ s, w i * z i ^ m := (convexOn_zpow m).map_sum_le hw hw' hz #align real.zpow_arith_mean_le_arith_mean_zpow Real.zpow_arith_mean_le_arith_mean_zpow theorem rpow_arith_mean_le_arith_mean_rpow (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 ≤ z i) {p : ℝ} (hp : 1 ≤ p) : (∑ i ∈ s, w i * z i) ^ p ≤ ∑ i ∈ s, w i * z i ^ p := (convexOn_rpow hp).map_sum_le hw hw' hz #align real.rpow_arith_mean_le_arith_mean_rpow Real.rpow_arith_mean_le_arith_mean_rpow	Mathlib/Analysis/MeanInequalitiesPow.lean	101	110	theorem arith_mean_le_rpow_mean (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 ≤ z i) {p : ℝ} (hp : 1 ≤ p) : ∑ i ∈ s, w i * z i ≤ (∑ i ∈ s, w i * z i ^ p) ^ (1 / p) := by	have : 0 < p := by positivity rw [← rpow_le_rpow_iff _ _ this, ← rpow_mul, one_div_mul_cancel (ne_of_gt this), rpow_one] · exact rpow_arith_mean_le_arith_mean_rpow s w z hw hw' hz hp all_goals apply_rules [sum_nonneg, rpow_nonneg] intro i hi apply_rules [mul_nonneg, rpow_nonneg, hw i hi, hz i hi]
import Mathlib.Tactic.CategoryTheory.Coherence import Mathlib.CategoryTheory.Monoidal.Free.Coherence #align_import category_theory.monoidal.coherence_lemmas from "leanprover-community/mathlib"@"b8b8bf3ea0c625fa1f950034a184e07c67f7bcfe" open CategoryTheory Category Iso namespace CategoryTheory.MonoidalCategory variable {C : Type*} [Category C] [MonoidalCategory C] -- See Proposition 2.2.4 of <http://www-math.mit.edu/~etingof/egnobookfinal.pdf> @[reassoc] theorem leftUnitor_tensor'' (X Y : C) : (α_ (𝟙_ C) X Y).hom ≫ (λ_ (X ⊗ Y)).hom = (λ_ X).hom ⊗ 𝟙 Y := by coherence #align category_theory.monoidal_category.left_unitor_tensor' CategoryTheory.MonoidalCategory.leftUnitor_tensor'' @[reassoc] theorem leftUnitor_tensor' (X Y : C) : (λ_ (X ⊗ Y)).hom = (α_ (𝟙_ C) X Y).inv ≫ ((λ_ X).hom ⊗ 𝟙 Y) := by coherence #align category_theory.monoidal_category.left_unitor_tensor CategoryTheory.MonoidalCategory.leftUnitor_tensor' @[reassoc] theorem leftUnitor_tensor_inv' (X Y : C) : (λ_ (X ⊗ Y)).inv = ((λ_ X).inv ⊗ 𝟙 Y) ≫ (α_ (𝟙_ C) X Y).hom := by coherence #align category_theory.monoidal_category.left_unitor_tensor_inv CategoryTheory.MonoidalCategory.leftUnitor_tensor_inv' @[reassoc] theorem id_tensor_rightUnitor_inv (X Y : C) : 𝟙 X ⊗ (ρ_ Y).inv = (ρ_ _).inv ≫ (α_ _ _ _).hom := by coherence #align category_theory.monoidal_category.id_tensor_right_unitor_inv CategoryTheory.MonoidalCategory.id_tensor_rightUnitor_inv @[reassoc] theorem leftUnitor_inv_tensor_id (X Y : C) : (λ_ X).inv ⊗ 𝟙 Y = (λ_ _).inv ≫ (α_ _ _ _).inv := by coherence #align category_theory.monoidal_category.left_unitor_inv_tensor_id CategoryTheory.MonoidalCategory.leftUnitor_inv_tensor_id @[reassoc]	Mathlib/CategoryTheory/Monoidal/CoherenceLemmas.lean	57	60	theorem pentagon_inv_inv_hom (W X Y Z : C) : (α_ W (X ⊗ Y) Z).inv ≫ ((α_ W X Y).inv ⊗ 𝟙 Z) ≫ (α_ (W ⊗ X) Y Z).hom = (𝟙 W ⊗ (α_ X Y Z).hom) ≫ (α_ W X (Y ⊗ Z)).inv := by	coherence
import Mathlib.Data.Matroid.IndepAxioms open Set namespace Matroid variable {α : Type*} {M : Matroid α} {I B X : Set α} section dual @[simps] def dualIndepMatroid (M : Matroid α) : IndepMatroid α where E := M.E Indep I := I ⊆ M.E ∧ ∃ B, M.Base B ∧ Disjoint I B indep_empty := ⟨empty_subset M.E, M.exists_base.imp (fun B hB ↦ ⟨hB, empty_disjoint _⟩)⟩ indep_subset := by rintro I J ⟨hJE, B, hB, hJB⟩ hIJ exact ⟨hIJ.trans hJE, ⟨B, hB, disjoint_of_subset_left hIJ hJB⟩⟩ indep_aug := by rintro I X ⟨hIE, B, hB, hIB⟩ hI_not_max hX_max have hXE := hX_max.1.1 have hB' := (base_compl_iff_mem_maximals_disjoint_base hXE).mpr hX_max set B' := M.E \ X with hX have hI := (not_iff_not.mpr (base_compl_iff_mem_maximals_disjoint_base)).mpr hI_not_max obtain ⟨B'', hB'', hB''₁, hB''₂⟩ := (hB'.indep.diff I).exists_base_subset_union_base hB rw [← compl_subset_compl, ← hIB.sdiff_eq_right, ← union_diff_distrib, diff_eq, compl_inter, compl_compl, union_subset_iff, compl_subset_compl] at hB''₂ have hssu := (subset_inter (hB''₂.2) hIE).ssubset_of_ne (by { rintro rfl; apply hI; convert hB''; simp [hB''.subset_ground] }) obtain ⟨e, ⟨(heB'' : e ∉ _), heE⟩, heI⟩ := exists_of_ssubset hssu use e simp_rw [mem_diff, insert_subset_iff, and_iff_left heI, and_iff_right heE, and_iff_right hIE] refine ⟨by_contra (fun heX ↦ heB'' (hB''₁ ⟨?_, heI⟩)), ⟨B'', hB'', ?_⟩⟩ · rw [hX]; exact ⟨heE, heX⟩ rw [← union_singleton, disjoint_union_left, disjoint_singleton_left, and_iff_left heB''] exact disjoint_of_subset_left hB''₂.2 disjoint_compl_left indep_maximal := by rintro X - I'⟨hI'E, B, hB, hI'B⟩ hI'X obtain ⟨I, hI⟩ := M.exists_basis (M.E \ X) obtain ⟨B', hB', hIB', hB'IB⟩ := hI.indep.exists_base_subset_union_base hB refine ⟨(X \ B') ∩ M.E, ⟨?_, subset_inter (subset_diff.mpr ?_) hI'E, inter_subset_left.trans diff_subset⟩, ?_⟩ · simp only [inter_subset_right, true_and] exact ⟨B', hB', disjoint_of_subset_left inter_subset_left disjoint_sdiff_left⟩ · rw [and_iff_right hI'X] refine disjoint_of_subset_right hB'IB ?_ rw [disjoint_union_right, and_iff_left hI'B] exact disjoint_of_subset hI'X hI.subset disjoint_sdiff_right simp only [mem_setOf_eq, subset_inter_iff, and_imp, forall_exists_index] intros J hJE B'' hB'' hdj _ hJX hssJ rw [and_iff_left hJE] rw [diff_eq, inter_right_comm, ← diff_eq, diff_subset_iff] at hssJ have hI' : (B'' ∩ X) ∪ (B' \ X) ⊆ B' := by rw [union_subset_iff, and_iff_left diff_subset, ← inter_eq_self_of_subset_left hB''.subset_ground, inter_right_comm, inter_assoc] calc _ ⊆ _ := inter_subset_inter_right _ hssJ _ ⊆ _ := by rw [inter_union_distrib_left, hdj.symm.inter_eq, union_empty] _ ⊆ _ := inter_subset_right obtain ⟨B₁,hB₁,hI'B₁,hB₁I⟩ := (hB'.indep.subset hI').exists_base_subset_union_base hB'' rw [union_comm, ← union_assoc, union_eq_self_of_subset_right inter_subset_left] at hB₁I have : B₁ = B' := by refine hB₁.eq_of_subset_indep hB'.indep (fun e he ↦ ?_) refine (hB₁I he).elim (fun heB'' ↦ ?_) (fun h ↦ h.1) refine (em (e ∈ X)).elim (fun heX ↦ hI' (Or.inl ⟨heB'', heX⟩)) (fun heX ↦ hIB' ?_) refine hI.mem_of_insert_indep ⟨hB₁.subset_ground he, heX⟩ (hB₁.indep.subset (insert_subset he ?_)) refine (subset_union_of_subset_right (subset_diff.mpr ⟨hIB',?_⟩) _).trans hI'B₁ exact disjoint_of_subset_left hI.subset disjoint_sdiff_left subst this refine subset_diff.mpr ⟨hJX, by_contra (fun hne ↦ ?_)⟩ obtain ⟨e, heJ, heB'⟩ := not_disjoint_iff.mp hne obtain (heB'' \| ⟨-,heX⟩ ) := hB₁I heB' · exact hdj.ne_of_mem heJ heB'' rfl exact heX (hJX heJ) subset_ground := by tauto def dual (M : Matroid α) : Matroid α := M.dualIndepMatroid.matroid postfix:max "✶" => Matroid.dual theorem dual_indep_iff_exists' : (M✶.Indep I) ↔ I ⊆ M.E ∧ (∃ B, M.Base B ∧ Disjoint I B) := Iff.rfl @[simp] theorem dual_ground : M✶.E = M.E := rfl @[simp] theorem dual_indep_iff_exists (hI : I ⊆ M.E := by aesop_mat) : M✶.Indep I ↔ (∃ B, M.Base B ∧ Disjoint I B) := by rw [dual_indep_iff_exists', and_iff_right hI] theorem dual_dep_iff_forall : (M✶.Dep I) ↔ (∀ B, M.Base B → (I ∩ B).Nonempty) ∧ I ⊆ M.E := by simp_rw [dep_iff, dual_indep_iff_exists', dual_ground, and_congr_left_iff, not_and, not_exists, not_and, not_disjoint_iff_nonempty_inter, Classical.imp_iff_right_iff, iff_true_intro Or.inl] instance dual_finite [M.Finite] : M✶.Finite := ⟨M.ground_finite⟩ instance dual_nonempty [M.Nonempty] : M✶.Nonempty := ⟨M.ground_nonempty⟩ @[simp] theorem dual_base_iff (hB : B ⊆ M.E := by aesop_mat) : M✶.Base B ↔ M.Base (M.E \ B) := by rw [base_compl_iff_mem_maximals_disjoint_base, base_iff_maximal_indep, dual_indep_iff_exists', mem_maximals_setOf_iff] simp [dual_indep_iff_exists'] theorem dual_base_iff' : M✶.Base B ↔ M.Base (M.E \ B) ∧ B ⊆ M.E := (em (B ⊆ M.E)).elim (fun h ↦ by rw [dual_base_iff, and_iff_left h]) (fun h ↦ iff_of_false (h ∘ (fun h' ↦ h'.subset_ground)) (h ∘ And.right)) theorem setOf_dual_base_eq : {B \| M✶.Base B} = (fun X ↦ M.E \ X) '' {B \| M.Base B} := by ext B simp only [mem_setOf_eq, mem_image, dual_base_iff'] refine ⟨fun h ↦ ⟨_, h.1, diff_diff_cancel_left h.2⟩, fun ⟨B', hB', h⟩ ↦ ⟨?_,h.symm.trans_subset diff_subset⟩⟩ rwa [← h, diff_diff_cancel_left hB'.subset_ground] @[simp] theorem dual_dual (M : Matroid α) : M✶✶ = M := eq_of_base_iff_base_forall rfl (fun B (h : B ⊆ M.E) ↦ by rw [dual_base_iff, dual_base_iff, dual_ground, diff_diff_cancel_left h]) theorem dual_involutive : Function.Involutive (dual : Matroid α → Matroid α) := dual_dual theorem dual_injective : Function.Injective (dual : Matroid α → Matroid α) := dual_involutive.injective @[simp] theorem dual_inj {M₁ M₂ : Matroid α} : M₁✶ = M₂✶ ↔ M₁ = M₂ := dual_injective.eq_iff theorem eq_dual_comm {M₁ M₂ : Matroid α} : M₁ = M₂✶ ↔ M₂ = M₁✶ := by rw [← dual_inj, dual_dual, eq_comm] theorem eq_dual_iff_dual_eq {M₁ M₂ : Matroid α} : M₁ = M₂✶ ↔ M₁✶ = M₂ := dual_involutive.eq_iff.symm theorem Base.compl_base_of_dual (h : M✶.Base B) : M.Base (M.E \ B) := (dual_base_iff'.1 h).1 theorem Base.compl_base_dual (h : M.Base B) : M✶.Base (M.E \ B) := by rwa [dual_base_iff, diff_diff_cancel_left h.subset_ground] theorem Base.compl_inter_basis_of_inter_basis (hB : M.Base B) (hBX : M.Basis (B ∩ X) X) : M✶.Basis ((M.E \ B) ∩ (M.E \ X)) (M.E \ X) := by refine Indep.basis_of_forall_insert ?_ inter_subset_right (fun e he ↦ ?_) · rw [dual_indep_iff_exists] exact ⟨B, hB, disjoint_of_subset_left inter_subset_left disjoint_sdiff_left⟩ simp only [diff_inter_self_eq_diff, mem_diff, not_and, not_not, imp_iff_right he.1.1] at he simp_rw [dual_dep_iff_forall, insert_subset_iff, and_iff_right he.1.1, and_iff_left (inter_subset_left.trans diff_subset)] refine fun B' hB' ↦ by_contra (fun hem ↦ ?_) rw [nonempty_iff_ne_empty, not_ne_iff, ← union_singleton, diff_inter_diff, union_inter_distrib_right, union_empty_iff, singleton_inter_eq_empty, diff_eq, inter_right_comm, inter_eq_self_of_subset_right hB'.subset_ground, ← diff_eq, diff_eq_empty] at hem obtain ⟨f, hfb, hBf⟩ := hB.exchange hB' ⟨he.2, hem.2⟩ have hi : M.Indep (insert f (B ∩ X)) := by refine hBf.indep.subset (insert_subset_insert ?_) simp_rw [subset_diff, and_iff_right inter_subset_left, disjoint_singleton_right, mem_inter_iff, iff_false_intro he.1.2, and_false, not_false_iff] exact hfb.2 (hBX.mem_of_insert_indep (Or.elim (hem.1 hfb.1) (False.elim ∘ hfb.2) id) hi).1 theorem Base.inter_basis_iff_compl_inter_basis_dual (hB : M.Base B) (hX : X ⊆ M.E := by aesop_mat): M.Basis (B ∩ X) X ↔ M✶.Basis ((M.E \ B) ∩ (M.E \ X)) (M.E \ X) := by refine ⟨hB.compl_inter_basis_of_inter_basis, fun h ↦ ?_⟩ simpa [inter_eq_self_of_subset_right hX, inter_eq_self_of_subset_right hB.subset_ground] using hB.compl_base_dual.compl_inter_basis_of_inter_basis h theorem base_iff_dual_base_compl (hB : B ⊆ M.E := by aesop_mat) : M.Base B ↔ M✶.Base (M.E \ B) := by rw [dual_base_iff, diff_diff_cancel_left hB] theorem ground_not_base (M : Matroid α) [h : RkPos M✶] : ¬M.Base M.E := by rwa [rkPos_iff_empty_not_base, dual_base_iff, diff_empty] at h theorem Base.ssubset_ground [h : RkPos M✶] (hB : M.Base B) : B ⊂ M.E := hB.subset_ground.ssubset_of_ne (by rintro rfl; exact M.ground_not_base hB) theorem Indep.ssubset_ground [h : RkPos M✶] (hI : M.Indep I) : I ⊂ M.E := by obtain ⟨B, hB⟩ := hI.exists_base_superset; exact hB.2.trans_ssubset hB.1.ssubset_ground abbrev Coindep (M : Matroid α) (I : Set α) : Prop := M✶.Indep I theorem coindep_def : M.Coindep X ↔ M✶.Indep X := Iff.rfl theorem Coindep.indep (hX : M.Coindep X) : M✶.Indep X := hX @[simp] theorem dual_coindep_iff : M✶.Coindep X ↔ M.Indep X := by rw [Coindep, dual_dual] theorem Indep.coindep (hI : M.Indep I) : M✶.Coindep I := dual_coindep_iff.2 hI	Mathlib/Data/Matroid/Dual.lean	237	240	theorem coindep_iff_exists' : M.Coindep X ↔ (∃ B, M.Base B ∧ B ⊆ M.E \ X) ∧ X ⊆ M.E := by	simp_rw [Coindep, dual_indep_iff_exists', and_comm (a := _ ⊆ _), and_congr_left_iff, subset_diff] exact fun _ ↦ ⟨fun ⟨B, hB, hXB⟩ ↦ ⟨B, hB, hB.subset_ground, hXB.symm⟩, fun ⟨B, hB, _, hBX⟩ ↦ ⟨B, hB, hBX.symm⟩⟩
import Mathlib.Analysis.Convex.Basic import Mathlib.Analysis.InnerProductSpace.Orthogonal import Mathlib.Analysis.InnerProductSpace.Symmetric import Mathlib.Analysis.NormedSpace.RCLike import Mathlib.Analysis.RCLike.Lemmas import Mathlib.Algebra.DirectSum.Decomposition #align_import analysis.inner_product_space.projection from "leanprover-community/mathlib"@"0b7c740e25651db0ba63648fbae9f9d6f941e31b" noncomputable section open RCLike Real Filter open LinearMap (ker range) open Topology variable {𝕜 E F : Type} [RCLike 𝕜] variable [NormedAddCommGroup E] [NormedAddCommGroup F] variable [InnerProductSpace 𝕜 E] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y local notation "absR" => abs -- FIXME this monolithic proof causes a deterministic timeout with `-T50000` -- It should be broken in a sequence of more manageable pieces, -- perhaps with individual statements for the three steps below. theorem exists_norm_eq_iInf_of_complete_convex {K : Set F} (ne : K.Nonempty) (h₁ : IsComplete K) (h₂ : Convex ℝ K) : ∀ u : F, ∃ v ∈ K, ‖u - v‖ = ⨅ w : K, ‖u - w‖ := fun u => by let δ := ⨅ w : K, ‖u - w‖ letI : Nonempty K := ne.to_subtype have zero_le_δ : 0 ≤ δ := le_ciInf fun _ => norm_nonneg _ have δ_le : ∀ w : K, δ ≤ ‖u - w‖ := ciInf_le ⟨0, Set.forall_mem_range.2 fun _ => norm_nonneg _⟩ have δ_le' : ∀ w ∈ K, δ ≤ ‖u - w‖ := fun w hw => δ_le ⟨w, hw⟩ -- Step 1: since `δ` is the infimum, can find a sequence `w : ℕ → K` in `K` -- such that `‖u - w n‖ < δ + 1 / (n + 1)` (which implies `‖u - w n‖ --> δ`); -- maybe this should be a separate lemma have exists_seq : ∃ w : ℕ → K, ∀ n, ‖u - w n‖ < δ + 1 / (n + 1) := by have hδ : ∀ n : ℕ, δ < δ + 1 / (n + 1) := fun n => lt_add_of_le_of_pos le_rfl Nat.one_div_pos_of_nat have h := fun n => exists_lt_of_ciInf_lt (hδ n) let w : ℕ → K := fun n => Classical.choose (h n) exact ⟨w, fun n => Classical.choose_spec (h n)⟩ rcases exists_seq with ⟨w, hw⟩ have norm_tendsto : Tendsto (fun n => ‖u - w n‖) atTop (𝓝 δ) := by have h : Tendsto (fun _ : ℕ => δ) atTop (𝓝 δ) := tendsto_const_nhds have h' : Tendsto (fun n : ℕ => δ + 1 / (n + 1)) atTop (𝓝 δ) := by convert h.add tendsto_one_div_add_atTop_nhds_zero_nat simp only [add_zero] exact tendsto_of_tendsto_of_tendsto_of_le_of_le h h' (fun x => δ_le _) fun x => le_of_lt (hw _) -- Step 2: Prove that the sequence `w : ℕ → K` is a Cauchy sequence have seq_is_cauchy : CauchySeq fun n => (w n : F) := by rw [cauchySeq_iff_le_tendsto_0] -- splits into three goals let b := fun n : ℕ => 8 δ * (1 / (n + 1)) + 4 * (1 / (n + 1)) * (1 / (n + 1)) use fun n => √(b n) constructor -- first goal : `∀ (n : ℕ), 0 ≤ √(b n)` · intro n exact sqrt_nonneg _ constructor -- second goal : `∀ (n m N : ℕ), N ≤ n → N ≤ m → dist ↑(w n) ↑(w m) ≤ √(b N)` · intro p q N hp hq let wp := (w p : F) let wq := (w q : F) let a := u - wq let b := u - wp let half := 1 / (2 : ℝ) let div := 1 / ((N : ℝ) + 1) have : 4 * ‖u - half • (wq + wp)‖ * ‖u - half • (wq + wp)‖ + ‖wp - wq‖ * ‖wp - wq‖ = 2 * (‖a‖ * ‖a‖ + ‖b‖ * ‖b‖) := calc 4 * ‖u - half • (wq + wp)‖ * ‖u - half • (wq + wp)‖ + ‖wp - wq‖ * ‖wp - wq‖ = 2 * ‖u - half • (wq + wp)‖ * (2 * ‖u - half • (wq + wp)‖) + ‖wp - wq‖ * ‖wp - wq‖ := by ring _ = absR (2 : ℝ) * ‖u - half • (wq + wp)‖ * (absR (2 : ℝ) * ‖u - half • (wq + wp)‖) + ‖wp - wq‖ * ‖wp - wq‖ := by rw [_root_.abs_of_nonneg] exact zero_le_two _ = ‖(2 : ℝ) • (u - half • (wq + wp))‖ * ‖(2 : ℝ) • (u - half • (wq + wp))‖ + ‖wp - wq‖ * ‖wp - wq‖ := by simp [norm_smul] _ = ‖a + b‖ * ‖a + b‖ + ‖a - b‖ * ‖a - b‖ := by rw [smul_sub, smul_smul, mul_one_div_cancel (_root_.two_ne_zero : (2 : ℝ) ≠ 0), ← one_add_one_eq_two, add_smul] simp only [one_smul] have eq₁ : wp - wq = a - b := (sub_sub_sub_cancel_left _ _ _).symm have eq₂ : u + u - (wq + wp) = a + b := by show u + u - (wq + wp) = u - wq + (u - wp) abel rw [eq₁, eq₂] _ = 2 * (‖a‖ * ‖a‖ + ‖b‖ * ‖b‖) := parallelogram_law_with_norm ℝ _ _ have eq : δ ≤ ‖u - half • (wq + wp)‖ := by rw [smul_add] apply δ_le' apply h₂ repeat' exact Subtype.mem _ repeat' exact le_of_lt one_half_pos exact add_halves 1 have eq₁ : 4 * δ * δ ≤ 4 * ‖u - half • (wq + wp)‖ * ‖u - half • (wq + wp)‖ := by simp_rw [mul_assoc] gcongr have eq₂ : ‖a‖ ≤ δ + div := le_trans (le_of_lt <\| hw q) (add_le_add_left (Nat.one_div_le_one_div hq) _) have eq₂' : ‖b‖ ≤ δ + div := le_trans (le_of_lt <\| hw p) (add_le_add_left (Nat.one_div_le_one_div hp) _) rw [dist_eq_norm] apply nonneg_le_nonneg_of_sq_le_sq · exact sqrt_nonneg _ rw [mul_self_sqrt] · calc ‖wp - wq‖ * ‖wp - wq‖ = 2 * (‖a‖ * ‖a‖ + ‖b‖ * ‖b‖) - 4 * ‖u - half • (wq + wp)‖ * ‖u - half • (wq + wp)‖ := by simp [← this] _ ≤ 2 * (‖a‖ * ‖a‖ + ‖b‖ * ‖b‖) - 4 * δ * δ := by gcongr _ ≤ 2 * ((δ + div) * (δ + div) + (δ + div) * (δ + div)) - 4 * δ * δ := by gcongr _ = 8 * δ * div + 4 * div * div := by ring positivity -- third goal : `Tendsto (fun (n : ℕ) => √(b n)) atTop (𝓝 0)` suffices Tendsto (fun x ↦ √(8 * δ * x + 4 * x * x) : ℝ → ℝ) (𝓝 0) (𝓝 0) from this.comp tendsto_one_div_add_atTop_nhds_zero_nat exact Continuous.tendsto' (by continuity) _ _ (by simp) -- Step 3: By completeness of `K`, let `w : ℕ → K` converge to some `v : K`. -- Prove that it satisfies all requirements. rcases cauchySeq_tendsto_of_isComplete h₁ (fun n => Subtype.mem _) seq_is_cauchy with ⟨v, hv, w_tendsto⟩ use v use hv have h_cont : Continuous fun v => ‖u - v‖ := Continuous.comp continuous_norm (Continuous.sub continuous_const continuous_id) have : Tendsto (fun n => ‖u - w n‖) atTop (𝓝 ‖u - v‖) := by convert Tendsto.comp h_cont.continuousAt w_tendsto exact tendsto_nhds_unique this norm_tendsto #align exists_norm_eq_infi_of_complete_convex exists_norm_eq_iInf_of_complete_convex theorem norm_eq_iInf_iff_real_inner_le_zero {K : Set F} (h : Convex ℝ K) {u : F} {v : F} (hv : v ∈ K) : (‖u - v‖ = ⨅ w : K, ‖u - w‖) ↔ ∀ w ∈ K, ⟪u - v, w - v⟫_ℝ ≤ 0 := by letI : Nonempty K := ⟨⟨v, hv⟩⟩ constructor · intro eq w hw let δ := ⨅ w : K, ‖u - w‖ let p := ⟪u - v, w - v⟫_ℝ let q := ‖w - v‖ ^ 2 have δ_le (w : K) : δ ≤ ‖u - w‖ := ciInf_le ⟨0, fun _ ⟨_, h⟩ => h ▸ norm_nonneg _⟩ _ have δ_le' (w) (hw : w ∈ K) : δ ≤ ‖u - w‖ := δ_le ⟨w, hw⟩ have (θ : ℝ) (hθ₁ : 0 < θ) (hθ₂ : θ ≤ 1) : 2 * p ≤ θ * q := by have : ‖u - v‖ ^ 2 ≤ ‖u - v‖ ^ 2 - 2 * θ * ⟪u - v, w - v⟫_ℝ + θ * θ * ‖w - v‖ ^ 2 := calc ‖u - v‖ ^ 2 _ ≤ ‖u - (θ • w + (1 - θ) • v)‖ ^ 2 := by simp only [sq]; apply mul_self_le_mul_self (norm_nonneg _) rw [eq]; apply δ_le' apply h hw hv exacts [le_of_lt hθ₁, sub_nonneg.2 hθ₂, add_sub_cancel _ _] _ = ‖u - v - θ • (w - v)‖ ^ 2 := by have : u - (θ • w + (1 - θ) • v) = u - v - θ • (w - v) := by rw [smul_sub, sub_smul, one_smul] simp only [sub_eq_add_neg, add_comm, add_left_comm, add_assoc, neg_add_rev] rw [this] _ = ‖u - v‖ ^ 2 - 2 * θ * inner (u - v) (w - v) + θ * θ * ‖w - v‖ ^ 2 := by rw [@norm_sub_sq ℝ, inner_smul_right, norm_smul] simp only [sq] show ‖u - v‖ * ‖u - v‖ - 2 * (θ * inner (u - v) (w - v)) + absR θ * ‖w - v‖ * (absR θ * ‖w - v‖) = ‖u - v‖ * ‖u - v‖ - 2 * θ * inner (u - v) (w - v) + θ * θ * (‖w - v‖ * ‖w - v‖) rw [abs_of_pos hθ₁]; ring have eq₁ : ‖u - v‖ ^ 2 - 2 * θ * inner (u - v) (w - v) + θ * θ * ‖w - v‖ ^ 2 = ‖u - v‖ ^ 2 + (θ * θ * ‖w - v‖ ^ 2 - 2 * θ * inner (u - v) (w - v)) := by abel rw [eq₁, le_add_iff_nonneg_right] at this have eq₂ : θ * θ * ‖w - v‖ ^ 2 - 2 * θ * inner (u - v) (w - v) = θ * (θ * ‖w - v‖ ^ 2 - 2 * inner (u - v) (w - v)) := by ring rw [eq₂] at this have := le_of_sub_nonneg (nonneg_of_mul_nonneg_right this hθ₁) exact this by_cases hq : q = 0 · rw [hq] at this have : p ≤ 0 := by have := this (1 : ℝ) (by norm_num) (by norm_num) linarith exact this · have q_pos : 0 < q := lt_of_le_of_ne (sq_nonneg _) fun h ↦ hq h.symm by_contra hp rw [not_le] at hp let θ := min (1 : ℝ) (p / q) have eq₁ : θ * q ≤ p := calc θ * q ≤ p / q * q := mul_le_mul_of_nonneg_right (min_le_right _ _) (sq_nonneg _) _ = p := div_mul_cancel₀ _ hq have : 2 * p ≤ p := calc 2 * p ≤ θ * q := by set_option tactic.skipAssignedInstances false in exact this θ (lt_min (by norm_num) (div_pos hp q_pos)) (by norm_num [θ]) _ ≤ p := eq₁ linarith · intro h apply le_antisymm · apply le_ciInf intro w apply nonneg_le_nonneg_of_sq_le_sq (norm_nonneg _) have := h w w.2 calc ‖u - v‖ * ‖u - v‖ ≤ ‖u - v‖ * ‖u - v‖ - 2 * inner (u - v) ((w : F) - v) := by linarith _ ≤ ‖u - v‖ ^ 2 - 2 * inner (u - v) ((w : F) - v) + ‖(w : F) - v‖ ^ 2 := by rw [sq] refine le_add_of_nonneg_right ?_ exact sq_nonneg _ _ = ‖u - v - (w - v)‖ ^ 2 := (@norm_sub_sq ℝ _ _ _ _ _ _).symm _ = ‖u - w‖ * ‖u - w‖ := by have : u - v - (w - v) = u - w := by abel rw [this, sq] · show ⨅ w : K, ‖u - w‖ ≤ (fun w : K => ‖u - w‖) ⟨v, hv⟩ apply ciInf_le use 0 rintro y ⟨z, rfl⟩ exact norm_nonneg _ #align norm_eq_infi_iff_real_inner_le_zero norm_eq_iInf_iff_real_inner_le_zero variable (K : Submodule 𝕜 E) theorem exists_norm_eq_iInf_of_complete_subspace (h : IsComplete (↑K : Set E)) : ∀ u : E, ∃ v ∈ K, ‖u - v‖ = ⨅ w : (K : Set E), ‖u - w‖ := by letI : InnerProductSpace ℝ E := InnerProductSpace.rclikeToReal 𝕜 E letI : Module ℝ E := RestrictScalars.module ℝ 𝕜 E let K' : Submodule ℝ E := Submodule.restrictScalars ℝ K exact exists_norm_eq_iInf_of_complete_convex ⟨0, K'.zero_mem⟩ h K'.convex #align exists_norm_eq_infi_of_complete_subspace exists_norm_eq_iInf_of_complete_subspace theorem norm_eq_iInf_iff_real_inner_eq_zero (K : Submodule ℝ F) {u : F} {v : F} (hv : v ∈ K) : (‖u - v‖ = ⨅ w : (↑K : Set F), ‖u - w‖) ↔ ∀ w ∈ K, ⟪u - v, w⟫_ℝ = 0 := Iff.intro (by intro h have h : ∀ w ∈ K, ⟪u - v, w - v⟫_ℝ ≤ 0 := by rwa [norm_eq_iInf_iff_real_inner_le_zero] at h exacts [K.convex, hv] intro w hw have le : ⟪u - v, w⟫_ℝ ≤ 0 := by let w' := w + v have : w' ∈ K := Submodule.add_mem _ hw hv have h₁ := h w' this have h₂ : w' - v = w := by simp only [w', add_neg_cancel_right, sub_eq_add_neg] rw [h₂] at h₁ exact h₁ have ge : ⟪u - v, w⟫_ℝ ≥ 0 := by let w'' := -w + v have : w'' ∈ K := Submodule.add_mem _ (Submodule.neg_mem _ hw) hv have h₁ := h w'' this have h₂ : w'' - v = -w := by simp only [w'', neg_inj, add_neg_cancel_right, sub_eq_add_neg] rw [h₂, inner_neg_right] at h₁ linarith exact le_antisymm le ge) (by intro h have : ∀ w ∈ K, ⟪u - v, w - v⟫_ℝ ≤ 0 := by intro w hw let w' := w - v have : w' ∈ K := Submodule.sub_mem _ hw hv have h₁ := h w' this exact le_of_eq h₁ rwa [norm_eq_iInf_iff_real_inner_le_zero] exacts [Submodule.convex _, hv]) #align norm_eq_infi_iff_real_inner_eq_zero norm_eq_iInf_iff_real_inner_eq_zero theorem norm_eq_iInf_iff_inner_eq_zero {u : E} {v : E} (hv : v ∈ K) : (‖u - v‖ = ⨅ w : K, ‖u - w‖) ↔ ∀ w ∈ K, ⟪u - v, w⟫ = 0 := by letI : InnerProductSpace ℝ E := InnerProductSpace.rclikeToReal 𝕜 E letI : Module ℝ E := RestrictScalars.module ℝ 𝕜 E let K' : Submodule ℝ E := K.restrictScalars ℝ constructor · intro H have A : ∀ w ∈ K, re ⟪u - v, w⟫ = 0 := (norm_eq_iInf_iff_real_inner_eq_zero K' hv).1 H intro w hw apply ext · simp [A w hw] · symm calc im (0 : 𝕜) = 0 := im.map_zero _ = re ⟪u - v, (-I : 𝕜) • w⟫ := (A _ (K.smul_mem (-I) hw)).symm _ = re (-I * ⟪u - v, w⟫) := by rw [inner_smul_right] _ = im ⟪u - v, w⟫ := by simp · intro H have : ∀ w ∈ K', ⟪u - v, w⟫_ℝ = 0 := by intro w hw rw [real_inner_eq_re_inner, H w hw] exact zero_re' exact (norm_eq_iInf_iff_real_inner_eq_zero K' hv).2 this #align norm_eq_infi_iff_inner_eq_zero norm_eq_iInf_iff_inner_eq_zero class HasOrthogonalProjection (K : Submodule 𝕜 E) : Prop where exists_orthogonal (v : E) : ∃ w ∈ K, v - w ∈ Kᗮ instance (priority := 100) HasOrthogonalProjection.ofCompleteSpace [CompleteSpace K] : HasOrthogonalProjection K where exists_orthogonal v := by rcases exists_norm_eq_iInf_of_complete_subspace K (completeSpace_coe_iff_isComplete.mp ‹_›) v with ⟨w, hwK, hw⟩ refine ⟨w, hwK, (K.mem_orthogonal' _).2 ?_⟩ rwa [← norm_eq_iInf_iff_inner_eq_zero K hwK] instance [HasOrthogonalProjection K] : HasOrthogonalProjection Kᗮ where exists_orthogonal v := by rcases HasOrthogonalProjection.exists_orthogonal (K := K) v with ⟨w, hwK, hw⟩ refine ⟨_, hw, ?_⟩ rw [sub_sub_cancel] exact K.le_orthogonal_orthogonal hwK instance HasOrthogonalProjection.map_linearIsometryEquiv [HasOrthogonalProjection K] {E' : Type} [NormedAddCommGroup E'] [InnerProductSpace 𝕜 E'] (f : E ≃ₗᵢ[𝕜] E') : HasOrthogonalProjection (K.map (f.toLinearEquiv : E →ₗ[𝕜] E')) where exists_orthogonal v := by rcases HasOrthogonalProjection.exists_orthogonal (K := K) (f.symm v) with ⟨w, hwK, hw⟩ refine ⟨f w, Submodule.mem_map_of_mem hwK, Set.forall_mem_image.2 fun u hu ↦ ?_⟩ erw [← f.symm.inner_map_map, f.symm_apply_apply, map_sub, f.symm_apply_apply, hw u hu] instance HasOrthogonalProjection.map_linearIsometryEquiv' [HasOrthogonalProjection K] {E' : Type} [NormedAddCommGroup E'] [InnerProductSpace 𝕜 E'] (f : E ≃ₗᵢ[𝕜] E') : HasOrthogonalProjection (K.map f.toLinearIsometry) := HasOrthogonalProjection.map_linearIsometryEquiv K f instance : HasOrthogonalProjection (⊤ : Submodule 𝕜 E) := ⟨fun v ↦ ⟨v, trivial, by simp⟩⟩ section orthogonalProjection variable [HasOrthogonalProjection K] def orthogonalProjectionFn (v : E) := (HasOrthogonalProjection.exists_orthogonal (K := K) v).choose #align orthogonal_projection_fn orthogonalProjectionFn variable {K} theorem orthogonalProjectionFn_mem (v : E) : orthogonalProjectionFn K v ∈ K := (HasOrthogonalProjection.exists_orthogonal (K := K) v).choose_spec.left #align orthogonal_projection_fn_mem orthogonalProjectionFn_mem theorem orthogonalProjectionFn_inner_eq_zero (v : E) : ∀ w ∈ K, ⟪v - orthogonalProjectionFn K v, w⟫ = 0 := (K.mem_orthogonal' _).1 (HasOrthogonalProjection.exists_orthogonal (K := K) v).choose_spec.right #align orthogonal_projection_fn_inner_eq_zero orthogonalProjectionFn_inner_eq_zero theorem eq_orthogonalProjectionFn_of_mem_of_inner_eq_zero {u v : E} (hvm : v ∈ K) (hvo : ∀ w ∈ K, ⟪u - v, w⟫ = 0) : orthogonalProjectionFn K u = v := by rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜] have hvs : orthogonalProjectionFn K u - v ∈ K := Submodule.sub_mem K (orthogonalProjectionFn_mem u) hvm have huo : ⟪u - orthogonalProjectionFn K u, orthogonalProjectionFn K u - v⟫ = 0 := orthogonalProjectionFn_inner_eq_zero u _ hvs have huv : ⟪u - v, orthogonalProjectionFn K u - v⟫ = 0 := hvo _ hvs have houv : ⟪u - v - (u - orthogonalProjectionFn K u), orthogonalProjectionFn K u - v⟫ = 0 := by rw [inner_sub_left, huo, huv, sub_zero] rwa [sub_sub_sub_cancel_left] at houv #align eq_orthogonal_projection_fn_of_mem_of_inner_eq_zero eq_orthogonalProjectionFn_of_mem_of_inner_eq_zero variable (K) theorem orthogonalProjectionFn_norm_sq (v : E) : ‖v‖ * ‖v‖ = ‖v - orthogonalProjectionFn K v‖ * ‖v - orthogonalProjectionFn K v‖ + ‖orthogonalProjectionFn K v‖ * ‖orthogonalProjectionFn K v‖ := by set p := orthogonalProjectionFn K v have h' : ⟪v - p, p⟫ = 0 := orthogonalProjectionFn_inner_eq_zero _ _ (orthogonalProjectionFn_mem v) convert norm_add_sq_eq_norm_sq_add_norm_sq_of_inner_eq_zero (v - p) p h' using 2 <;> simp #align orthogonal_projection_fn_norm_sq orthogonalProjectionFn_norm_sq def orthogonalProjection : E →L[𝕜] K := LinearMap.mkContinuous { toFun := fun v => ⟨orthogonalProjectionFn K v, orthogonalProjectionFn_mem v⟩ map_add' := fun x y => by have hm : orthogonalProjectionFn K x + orthogonalProjectionFn K y ∈ K := Submodule.add_mem K (orthogonalProjectionFn_mem x) (orthogonalProjectionFn_mem y) have ho : ∀ w ∈ K, ⟪x + y - (orthogonalProjectionFn K x + orthogonalProjectionFn K y), w⟫ = 0 := by intro w hw rw [add_sub_add_comm, inner_add_left, orthogonalProjectionFn_inner_eq_zero _ w hw, orthogonalProjectionFn_inner_eq_zero _ w hw, add_zero] ext simp [eq_orthogonalProjectionFn_of_mem_of_inner_eq_zero hm ho] map_smul' := fun c x => by have hm : c • orthogonalProjectionFn K x ∈ K := Submodule.smul_mem K _ (orthogonalProjectionFn_mem x) have ho : ∀ w ∈ K, ⟪c • x - c • orthogonalProjectionFn K x, w⟫ = 0 := by intro w hw rw [← smul_sub, inner_smul_left, orthogonalProjectionFn_inner_eq_zero _ w hw, mul_zero] ext simp [eq_orthogonalProjectionFn_of_mem_of_inner_eq_zero hm ho] } 1 fun x => by simp only [one_mul, LinearMap.coe_mk] refine le_of_pow_le_pow_left two_ne_zero (norm_nonneg _) ?_ change ‖orthogonalProjectionFn K x‖ ^ 2 ≤ ‖x‖ ^ 2 nlinarith [orthogonalProjectionFn_norm_sq K x] #align orthogonal_projection orthogonalProjection variable {K} @[simp] theorem orthogonalProjectionFn_eq (v : E) : orthogonalProjectionFn K v = (orthogonalProjection K v : E) := rfl #align orthogonal_projection_fn_eq orthogonalProjectionFn_eq @[simp] theorem orthogonalProjection_inner_eq_zero (v : E) : ∀ w ∈ K, ⟪v - orthogonalProjection K v, w⟫ = 0 := orthogonalProjectionFn_inner_eq_zero v #align orthogonal_projection_inner_eq_zero orthogonalProjection_inner_eq_zero @[simp] theorem sub_orthogonalProjection_mem_orthogonal (v : E) : v - orthogonalProjection K v ∈ Kᗮ := by intro w hw rw [inner_eq_zero_symm] exact orthogonalProjection_inner_eq_zero _ _ hw #align sub_orthogonal_projection_mem_orthogonal sub_orthogonalProjection_mem_orthogonal theorem eq_orthogonalProjection_of_mem_of_inner_eq_zero {u v : E} (hvm : v ∈ K) (hvo : ∀ w ∈ K, ⟪u - v, w⟫ = 0) : (orthogonalProjection K u : E) = v := eq_orthogonalProjectionFn_of_mem_of_inner_eq_zero hvm hvo #align eq_orthogonal_projection_of_mem_of_inner_eq_zero eq_orthogonalProjection_of_mem_of_inner_eq_zero theorem eq_orthogonalProjection_of_mem_orthogonal {u v : E} (hv : v ∈ K) (hvo : u - v ∈ Kᗮ) : (orthogonalProjection K u : E) = v := eq_orthogonalProjectionFn_of_mem_of_inner_eq_zero hv <\| (Submodule.mem_orthogonal' _ _).1 hvo #align eq_orthogonal_projection_of_mem_orthogonal eq_orthogonalProjection_of_mem_orthogonal theorem eq_orthogonalProjection_of_mem_orthogonal' {u v z : E} (hv : v ∈ K) (hz : z ∈ Kᗮ) (hu : u = v + z) : (orthogonalProjection K u : E) = v := eq_orthogonalProjection_of_mem_orthogonal hv (by simpa [hu] ) #align eq_orthogonal_projection_of_mem_orthogonal' eq_orthogonalProjection_of_mem_orthogonal' @[simp] theorem orthogonalProjection_orthogonal_val (u : E) : (orthogonalProjection Kᗮ u : E) = u - orthogonalProjection K u := eq_orthogonalProjection_of_mem_orthogonal' (sub_orthogonalProjection_mem_orthogonal _) (K.le_orthogonal_orthogonal (orthogonalProjection K u).2) <\| by simp theorem orthogonalProjection_orthogonal (u : E) : orthogonalProjection Kᗮ u = ⟨u - orthogonalProjection K u, sub_orthogonalProjection_mem_orthogonal _⟩ := Subtype.eq <\| orthogonalProjection_orthogonal_val _ theorem orthogonalProjection_minimal {U : Submodule 𝕜 E} [HasOrthogonalProjection U] (y : E) : ‖y - orthogonalProjection U y‖ = ⨅ x : U, ‖y - x‖ := by rw [norm_eq_iInf_iff_inner_eq_zero _ (Submodule.coe_mem _)] exact orthogonalProjection_inner_eq_zero _ #align orthogonal_projection_minimal orthogonalProjection_minimal	Mathlib/Analysis/InnerProductSpace/Projection.lean	544	546	theorem eq_orthogonalProjection_of_eq_submodule {K' : Submodule 𝕜 E} [HasOrthogonalProjection K'] (h : K = K') (u : E) : (orthogonalProjection K u : E) = (orthogonalProjection K' u : E) := by	subst h; rfl
import Mathlib.Geometry.Manifold.ContMDiff.Atlas import Mathlib.Geometry.Manifold.VectorBundle.FiberwiseLinear import Mathlib.Topology.VectorBundle.Constructions #align_import geometry.manifold.vector_bundle.basic from "leanprover-community/mathlib"@"e473c3198bb41f68560cab68a0529c854b618833" assert_not_exists mfderiv open Bundle Set PartialHomeomorph open Function (id_def) open Filter open scoped Manifold Bundle Topology variable {𝕜 B B' F M : Type} {E : B → Type} section variable [TopologicalSpace F] [TopologicalSpace (TotalSpace F E)] [∀ x, TopologicalSpace (E x)] {HB : Type} [TopologicalSpace HB] [TopologicalSpace B] [ChartedSpace HB B] [FiberBundle F E] instance FiberBundle.chartedSpace' : ChartedSpace (B × F) (TotalSpace F E) where atlas := (fun e : Trivialization F (π F E) => e.toPartialHomeomorph) '' trivializationAtlas F E chartAt x := (trivializationAt F E x.proj).toPartialHomeomorph mem_chart_source x := (trivializationAt F E x.proj).mem_source.mpr (mem_baseSet_trivializationAt F E x.proj) chart_mem_atlas _ := mem_image_of_mem _ (trivialization_mem_atlas F E _) #align fiber_bundle.charted_space FiberBundle.chartedSpace' theorem FiberBundle.chartedSpace'_chartAt (x : TotalSpace F E) : chartAt (B × F) x = (trivializationAt F E x.proj).toPartialHomeomorph := rfl --attribute [local reducible] ModelProd instance FiberBundle.chartedSpace : ChartedSpace (ModelProd HB F) (TotalSpace F E) := ChartedSpace.comp _ (B × F) _ #align fiber_bundle.charted_space' FiberBundle.chartedSpace theorem FiberBundle.chartedSpace_chartAt (x : TotalSpace F E) : chartAt (ModelProd HB F) x = (trivializationAt F E x.proj).toPartialHomeomorph ≫ₕ (chartAt HB x.proj).prod (PartialHomeomorph.refl F) := by dsimp only [chartAt_comp, prodChartedSpace_chartAt, FiberBundle.chartedSpace'_chartAt, chartAt_self_eq] rw [Trivialization.coe_coe, Trivialization.coe_fst' _ (mem_baseSet_trivializationAt F E x.proj)] #align fiber_bundle.charted_space_chart_at FiberBundle.chartedSpace_chartAt theorem FiberBundle.chartedSpace_chartAt_symm_fst (x : TotalSpace F E) (y : ModelProd HB F) (hy : y ∈ (chartAt (ModelProd HB F) x).target) : ((chartAt (ModelProd HB F) x).symm y).proj = (chartAt HB x.proj).symm y.1 := by simp only [FiberBundle.chartedSpace_chartAt, mfld_simps] at hy ⊢ exact (trivializationAt F E x.proj).proj_symm_apply hy.2 #align fiber_bundle.charted_space_chart_at_symm_fst FiberBundle.chartedSpace_chartAt_symm_fst end section variable [NontriviallyNormedField 𝕜] [NormedAddCommGroup F] [NormedSpace 𝕜 F] [TopologicalSpace (TotalSpace F E)] [∀ x, TopologicalSpace (E x)] {EB : Type} [NormedAddCommGroup EB] [NormedSpace 𝕜 EB] {HB : Type} [TopologicalSpace HB] (IB : ModelWithCorners 𝕜 EB HB) (E' : B → Type) [∀ x, Zero (E' x)] {EM : Type} [NormedAddCommGroup EM] [NormedSpace 𝕜 EM] {HM : Type} [TopologicalSpace HM] {IM : ModelWithCorners 𝕜 EM HM} [TopologicalSpace M] [ChartedSpace HM M] [Is : SmoothManifoldWithCorners IM M] {n : ℕ∞} variable [TopologicalSpace B] [ChartedSpace HB B] [FiberBundle F E] protected theorem FiberBundle.extChartAt (x : TotalSpace F E) : extChartAt (IB.prod 𝓘(𝕜, F)) x = (trivializationAt F E x.proj).toPartialEquiv ≫ (extChartAt IB x.proj).prod (PartialEquiv.refl F) := by simp_rw [extChartAt, FiberBundle.chartedSpace_chartAt, extend] simp only [PartialEquiv.trans_assoc, mfld_simps] -- Porting note: should not be needed rw [PartialEquiv.prod_trans, PartialEquiv.refl_trans] #align fiber_bundle.ext_chart_at FiberBundle.extChartAt protected theorem FiberBundle.extChartAt_target (x : TotalSpace F E) : (extChartAt (IB.prod 𝓘(𝕜, F)) x).target = ((extChartAt IB x.proj).target ∩ (extChartAt IB x.proj).symm ⁻¹' (trivializationAt F E x.proj).baseSet) ×ˢ univ := by rw [FiberBundle.extChartAt, PartialEquiv.trans_target, Trivialization.target_eq, inter_prod] rfl theorem FiberBundle.writtenInExtChartAt_trivializationAt {x : TotalSpace F E} {y} (hy : y ∈ (extChartAt (IB.prod 𝓘(𝕜, F)) x).target) : writtenInExtChartAt (IB.prod 𝓘(𝕜, F)) (IB.prod 𝓘(𝕜, F)) x (trivializationAt F E x.proj) y = y := writtenInExtChartAt_chartAt_comp _ _ hy theorem FiberBundle.writtenInExtChartAt_trivializationAt_symm {x : TotalSpace F E} {y} (hy : y ∈ (extChartAt (IB.prod 𝓘(𝕜, F)) x).target) : writtenInExtChartAt (IB.prod 𝓘(𝕜, F)) (IB.prod 𝓘(𝕜, F)) (trivializationAt F E x.proj x) (trivializationAt F E x.proj).toPartialHomeomorph.symm y = y := writtenInExtChartAt_chartAt_symm_comp _ _ hy namespace Bundle variable {IB} theorem contMDiffWithinAt_totalSpace (f : M → TotalSpace F E) {s : Set M} {x₀ : M} : ContMDiffWithinAt IM (IB.prod 𝓘(𝕜, F)) n f s x₀ ↔ ContMDiffWithinAt IM IB n (fun x => (f x).proj) s x₀ ∧ ContMDiffWithinAt IM 𝓘(𝕜, F) n (fun x ↦ (trivializationAt F E (f x₀).proj (f x)).2) s x₀ := by simp (config := { singlePass := true }) only [contMDiffWithinAt_iff_target] rw [and_and_and_comm, ← FiberBundle.continuousWithinAt_totalSpace, and_congr_right_iff] intro hf simp_rw [modelWithCornersSelf_prod, FiberBundle.extChartAt, Function.comp, PartialEquiv.trans_apply, PartialEquiv.prod_coe, PartialEquiv.refl_coe, extChartAt_self_apply, modelWithCornersSelf_coe, Function.id_def, ← chartedSpaceSelf_prod] refine (contMDiffWithinAt_prod_iff _).trans (and_congr ?_ Iff.rfl) have h1 : (fun x => (f x).proj) ⁻¹' (trivializationAt F E (f x₀).proj).baseSet ∈ 𝓝[s] x₀ := ((FiberBundle.continuous_proj F E).continuousWithinAt.comp hf (mapsTo_image f s)) ((Trivialization.open_baseSet _).mem_nhds (mem_baseSet_trivializationAt F E _)) refine EventuallyEq.contMDiffWithinAt_iff (eventually_of_mem h1 fun x hx => ?_) ?_ · simp_rw [Function.comp, PartialHomeomorph.coe_coe, Trivialization.coe_coe] rw [Trivialization.coe_fst'] exact hx · simp only [mfld_simps] #align bundle.cont_mdiff_within_at_total_space Bundle.contMDiffWithinAt_totalSpace	Mathlib/Geometry/Manifold/VectorBundle/Basic.lean	200	204	theorem contMDiffAt_totalSpace (f : M → TotalSpace F E) (x₀ : M) : ContMDiffAt IM (IB.prod 𝓘(𝕜, F)) n f x₀ ↔ ContMDiffAt IM IB n (fun x => (f x).proj) x₀ ∧ ContMDiffAt IM 𝓘(𝕜, F) n (fun x => (trivializationAt F E (f x₀).proj (f x)).2) x₀ := by	simp_rw [← contMDiffWithinAt_univ]; exact contMDiffWithinAt_totalSpace f
import Mathlib.AlgebraicGeometry.Gluing import Mathlib.CategoryTheory.Limits.Opposites import Mathlib.AlgebraicGeometry.AffineScheme import Mathlib.CategoryTheory.Limits.Shapes.Diagonal #align_import algebraic_geometry.pullbacks from "leanprover-community/mathlib"@"7316286ff2942aa14e540add9058c6b0aa1c8070" set_option linter.uppercaseLean3 false universe v u noncomputable section open CategoryTheory CategoryTheory.Limits AlgebraicGeometry namespace AlgebraicGeometry.Scheme namespace Pullback variable {C : Type u} [Category.{v} C] variable {X Y Z : Scheme.{u}} (𝒰 : OpenCover.{u} X) (f : X ⟶ Z) (g : Y ⟶ Z) variable [∀ i, HasPullback (𝒰.map i ≫ f) g] def v (i j : 𝒰.J) : Scheme := pullback ((pullback.fst : pullback (𝒰.map i ≫ f) g ⟶ _) ≫ 𝒰.map i) (𝒰.map j) #align algebraic_geometry.Scheme.pullback.V AlgebraicGeometry.Scheme.Pullback.v def t (i j : 𝒰.J) : v 𝒰 f g i j ⟶ v 𝒰 f g j i := by have : HasPullback (pullback.snd ≫ 𝒰.map i ≫ f) g := hasPullback_assoc_symm (𝒰.map j) (𝒰.map i) (𝒰.map i ≫ f) g have : HasPullback (pullback.snd ≫ 𝒰.map j ≫ f) g := hasPullback_assoc_symm (𝒰.map i) (𝒰.map j) (𝒰.map j ≫ f) g refine (pullbackSymmetry ..).hom ≫ (pullbackAssoc ..).inv ≫ ?_ refine ?_ ≫ (pullbackAssoc ..).hom ≫ (pullbackSymmetry ..).hom refine pullback.map _ _ _ _ (pullbackSymmetry _ _).hom (𝟙 _) (𝟙 _) ?_ ?_ · rw [pullbackSymmetry_hom_comp_snd_assoc, pullback.condition_assoc, Category.comp_id] · rw [Category.comp_id, Category.id_comp] #align algebraic_geometry.Scheme.pullback.t AlgebraicGeometry.Scheme.Pullback.t @[simp, reassoc] theorem t_fst_fst (i j : 𝒰.J) : t 𝒰 f g i j ≫ pullback.fst ≫ pullback.fst = pullback.snd := by simp only [t, Category.assoc, pullbackSymmetry_hom_comp_fst_assoc, pullbackAssoc_hom_snd_fst, pullback.lift_fst_assoc, pullbackSymmetry_hom_comp_snd, pullbackAssoc_inv_fst_fst, pullbackSymmetry_hom_comp_fst] #align algebraic_geometry.Scheme.pullback.t_fst_fst AlgebraicGeometry.Scheme.Pullback.t_fst_fst @[simp, reassoc] theorem t_fst_snd (i j : 𝒰.J) : t 𝒰 f g i j ≫ pullback.fst ≫ pullback.snd = pullback.fst ≫ pullback.snd := by simp only [t, Category.assoc, pullbackSymmetry_hom_comp_fst_assoc, pullbackAssoc_hom_snd_snd, pullback.lift_snd, Category.comp_id, pullbackAssoc_inv_snd, pullbackSymmetry_hom_comp_snd_assoc] #align algebraic_geometry.Scheme.pullback.t_fst_snd AlgebraicGeometry.Scheme.Pullback.t_fst_snd @[simp, reassoc] theorem t_snd (i j : 𝒰.J) : t 𝒰 f g i j ≫ pullback.snd = pullback.fst ≫ pullback.fst := by simp only [t, Category.assoc, pullbackSymmetry_hom_comp_snd, pullbackAssoc_hom_fst, pullback.lift_fst_assoc, pullbackSymmetry_hom_comp_fst, pullbackAssoc_inv_fst_snd, pullbackSymmetry_hom_comp_snd_assoc] #align algebraic_geometry.Scheme.pullback.t_snd AlgebraicGeometry.Scheme.Pullback.t_snd theorem t_id (i : 𝒰.J) : t 𝒰 f g i i = 𝟙 _ := by apply pullback.hom_ext <;> rw [Category.id_comp] · apply pullback.hom_ext · rw [← cancel_mono (𝒰.map i)]; simp only [pullback.condition, Category.assoc, t_fst_fst] · simp only [Category.assoc, t_fst_snd] · rw [← cancel_mono (𝒰.map i)]; simp only [pullback.condition, t_snd, Category.assoc] #align algebraic_geometry.Scheme.pullback.t_id AlgebraicGeometry.Scheme.Pullback.t_id abbrev fV (i j : 𝒰.J) : v 𝒰 f g i j ⟶ pullback (𝒰.map i ≫ f) g := pullback.fst #align algebraic_geometry.Scheme.pullback.fV AlgebraicGeometry.Scheme.Pullback.fV def t' (i j k : 𝒰.J) : pullback (fV 𝒰 f g i j) (fV 𝒰 f g i k) ⟶ pullback (fV 𝒰 f g j k) (fV 𝒰 f g j i) := by refine (pullbackRightPullbackFstIso ..).hom ≫ ?_ refine ?_ ≫ (pullbackSymmetry _ _).hom refine ?_ ≫ (pullbackRightPullbackFstIso ..).inv refine pullback.map _ _ _ _ (t 𝒰 f g i j) (𝟙 _) (𝟙 _) ?_ ?_ · simp_rw [Category.comp_id, t_fst_fst_assoc, ← pullback.condition] · rw [Category.comp_id, Category.id_comp] #align algebraic_geometry.Scheme.pullback.t' AlgebraicGeometry.Scheme.Pullback.t' @[simp, reassoc] theorem t'_fst_fst_fst (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ pullback.fst ≫ pullback.fst ≫ pullback.fst = pullback.fst ≫ pullback.snd := by simp only [t', Category.assoc, pullbackSymmetry_hom_comp_fst_assoc, pullbackRightPullbackFstIso_inv_snd_fst_assoc, pullback.lift_fst_assoc, t_fst_fst, pullbackRightPullbackFstIso_hom_fst_assoc] #align algebraic_geometry.Scheme.pullback.t'_fst_fst_fst AlgebraicGeometry.Scheme.Pullback.t'_fst_fst_fst @[simp, reassoc] theorem t'_fst_fst_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ pullback.fst ≫ pullback.fst ≫ pullback.snd = pullback.fst ≫ pullback.fst ≫ pullback.snd := by simp only [t', Category.assoc, pullbackSymmetry_hom_comp_fst_assoc, pullbackRightPullbackFstIso_inv_snd_fst_assoc, pullback.lift_fst_assoc, t_fst_snd, pullbackRightPullbackFstIso_hom_fst_assoc] #align algebraic_geometry.Scheme.pullback.t'_fst_fst_snd AlgebraicGeometry.Scheme.Pullback.t'_fst_fst_snd @[simp, reassoc] theorem t'_fst_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ pullback.fst ≫ pullback.snd = pullback.snd ≫ pullback.snd := by simp only [t', Category.assoc, pullbackSymmetry_hom_comp_fst_assoc, pullbackRightPullbackFstIso_inv_snd_snd, pullback.lift_snd, Category.comp_id, pullbackRightPullbackFstIso_hom_snd] #align algebraic_geometry.Scheme.pullback.t'_fst_snd AlgebraicGeometry.Scheme.Pullback.t'_fst_snd @[simp, reassoc] theorem t'_snd_fst_fst (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ pullback.snd ≫ pullback.fst ≫ pullback.fst = pullback.fst ≫ pullback.snd := by simp only [t', Category.assoc, pullbackSymmetry_hom_comp_snd_assoc, pullbackRightPullbackFstIso_inv_fst_assoc, pullback.lift_fst_assoc, t_fst_fst, pullbackRightPullbackFstIso_hom_fst_assoc] #align algebraic_geometry.Scheme.pullback.t'_snd_fst_fst AlgebraicGeometry.Scheme.Pullback.t'_snd_fst_fst @[simp, reassoc] theorem t'_snd_fst_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ pullback.snd ≫ pullback.fst ≫ pullback.snd = pullback.fst ≫ pullback.fst ≫ pullback.snd := by simp only [t', Category.assoc, pullbackSymmetry_hom_comp_snd_assoc, pullbackRightPullbackFstIso_inv_fst_assoc, pullback.lift_fst_assoc, t_fst_snd, pullbackRightPullbackFstIso_hom_fst_assoc] #align algebraic_geometry.Scheme.pullback.t'_snd_fst_snd AlgebraicGeometry.Scheme.Pullback.t'_snd_fst_snd @[simp, reassoc] theorem t'_snd_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ pullback.snd ≫ pullback.snd = pullback.fst ≫ pullback.fst ≫ pullback.fst := by simp only [t', Category.assoc, pullbackSymmetry_hom_comp_snd_assoc, pullbackRightPullbackFstIso_inv_fst_assoc, pullback.lift_fst_assoc, t_snd, pullbackRightPullbackFstIso_hom_fst_assoc] #align algebraic_geometry.Scheme.pullback.t'_snd_snd AlgebraicGeometry.Scheme.Pullback.t'_snd_snd theorem cocycle_fst_fst_fst (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j ≫ pullback.fst ≫ pullback.fst ≫ pullback.fst = pullback.fst ≫ pullback.fst ≫ pullback.fst := by simp only [t'_fst_fst_fst, t'_fst_snd, t'_snd_snd] #align algebraic_geometry.Scheme.pullback.cocycle_fst_fst_fst AlgebraicGeometry.Scheme.Pullback.cocycle_fst_fst_fst theorem cocycle_fst_fst_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j ≫ pullback.fst ≫ pullback.fst ≫ pullback.snd = pullback.fst ≫ pullback.fst ≫ pullback.snd := by simp only [t'_fst_fst_snd] #align algebraic_geometry.Scheme.pullback.cocycle_fst_fst_snd AlgebraicGeometry.Scheme.Pullback.cocycle_fst_fst_snd theorem cocycle_fst_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j ≫ pullback.fst ≫ pullback.snd = pullback.fst ≫ pullback.snd := by simp only [t'_fst_snd, t'_snd_snd, t'_fst_fst_fst] #align algebraic_geometry.Scheme.pullback.cocycle_fst_snd AlgebraicGeometry.Scheme.Pullback.cocycle_fst_snd theorem cocycle_snd_fst_fst (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j ≫ pullback.snd ≫ pullback.fst ≫ pullback.fst = pullback.snd ≫ pullback.fst ≫ pullback.fst := by rw [← cancel_mono (𝒰.map i)] simp only [pullback.condition_assoc, t'_snd_fst_fst, t'_fst_snd, t'_snd_snd] #align algebraic_geometry.Scheme.pullback.cocycle_snd_fst_fst AlgebraicGeometry.Scheme.Pullback.cocycle_snd_fst_fst theorem cocycle_snd_fst_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j ≫ pullback.snd ≫ pullback.fst ≫ pullback.snd = pullback.snd ≫ pullback.fst ≫ pullback.snd := by simp only [pullback.condition_assoc, t'_snd_fst_snd] #align algebraic_geometry.Scheme.pullback.cocycle_snd_fst_snd AlgebraicGeometry.Scheme.Pullback.cocycle_snd_fst_snd theorem cocycle_snd_snd (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j ≫ pullback.snd ≫ pullback.snd = pullback.snd ≫ pullback.snd := by simp only [t'_snd_snd, t'_fst_fst_fst, t'_fst_snd] #align algebraic_geometry.Scheme.pullback.cocycle_snd_snd AlgebraicGeometry.Scheme.Pullback.cocycle_snd_snd -- `by tidy` should solve it, but it times out. theorem cocycle (i j k : 𝒰.J) : t' 𝒰 f g i j k ≫ t' 𝒰 f g j k i ≫ t' 𝒰 f g k i j = 𝟙 _ := by apply pullback.hom_ext <;> rw [Category.id_comp] · apply pullback.hom_ext · apply pullback.hom_ext · simp_rw [Category.assoc, cocycle_fst_fst_fst 𝒰 f g i j k] · simp_rw [Category.assoc, cocycle_fst_fst_snd 𝒰 f g i j k] · simp_rw [Category.assoc, cocycle_fst_snd 𝒰 f g i j k] · apply pullback.hom_ext · apply pullback.hom_ext · simp_rw [Category.assoc, cocycle_snd_fst_fst 𝒰 f g i j k] · simp_rw [Category.assoc, cocycle_snd_fst_snd 𝒰 f g i j k] · simp_rw [Category.assoc, cocycle_snd_snd 𝒰 f g i j k] #align algebraic_geometry.Scheme.pullback.cocycle AlgebraicGeometry.Scheme.Pullback.cocycle @[simps U V f t t', simps (config := .lemmasOnly) J] def gluing : Scheme.GlueData.{u} where J := 𝒰.J U i := pullback (𝒰.map i ≫ f) g V := fun ⟨i, j⟩ => v 𝒰 f g i j -- `p⁻¹(Uᵢ ∩ Uⱼ)` where `p : Uᵢ ×[Z] Y ⟶ Uᵢ ⟶ X`. f i j := pullback.fst f_id i := inferInstance f_open := inferInstance t i j := t 𝒰 f g i j t_id i := t_id 𝒰 f g i t' i j k := t' 𝒰 f g i j k t_fac i j k := by apply pullback.hom_ext on_goal 1 => apply pullback.hom_ext all_goals simp only [t'_snd_fst_fst, t'_snd_fst_snd, t'_snd_snd, t_fst_fst, t_fst_snd, t_snd, Category.assoc] cocycle i j k := cocycle 𝒰 f g i j k #align algebraic_geometry.Scheme.pullback.gluing AlgebraicGeometry.Scheme.Pullback.gluing @[simp] lemma gluing_ι (j : 𝒰.J) : (gluing 𝒰 f g).ι j = Multicoequalizer.π (gluing 𝒰 f g).diagram j := rfl def p1 : (gluing 𝒰 f g).glued ⟶ X := by apply Multicoequalizer.desc (gluing 𝒰 f g).diagram _ fun i ↦ pullback.fst ≫ 𝒰.map i simp [t_fst_fst_assoc, ← pullback.condition] #align algebraic_geometry.Scheme.pullback.p1 AlgebraicGeometry.Scheme.Pullback.p1 def p2 : (gluing 𝒰 f g).glued ⟶ Y := by apply Multicoequalizer.desc _ _ fun i ↦ pullback.snd simp [t_fst_snd] #align algebraic_geometry.Scheme.pullback.p2 AlgebraicGeometry.Scheme.Pullback.p2 theorem p_comm : p1 𝒰 f g ≫ f = p2 𝒰 f g ≫ g := by apply Multicoequalizer.hom_ext simp [p1, p2, pullback.condition] #align algebraic_geometry.Scheme.pullback.p_comm AlgebraicGeometry.Scheme.Pullback.p_comm variable (s : PullbackCone f g) def gluedLiftPullbackMap (i j : 𝒰.J) : pullback ((𝒰.pullbackCover s.fst).map i) ((𝒰.pullbackCover s.fst).map j) ⟶ (gluing 𝒰 f g).V ⟨i, j⟩ := by refine (pullbackRightPullbackFstIso _ _ _).hom ≫ ?_ refine pullback.map _ _ _ _ ?_ (𝟙 _) (𝟙 _) ?_ ?_ · exact (pullbackSymmetry _ _).hom ≫ pullback.map _ _ _ _ (𝟙 _) s.snd f (Category.id_comp _).symm s.condition · simpa using pullback.condition · simp only [Category.comp_id, Category.id_comp] #align algebraic_geometry.Scheme.pullback.glued_lift_pullback_map AlgebraicGeometry.Scheme.Pullback.gluedLiftPullbackMap @[reassoc] theorem gluedLiftPullbackMap_fst (i j : 𝒰.J) : gluedLiftPullbackMap 𝒰 f g s i j ≫ pullback.fst = pullback.fst ≫ (pullbackSymmetry _ _).hom ≫ pullback.map _ _ _ _ (𝟙 _) s.snd f (Category.id_comp _).symm s.condition := by simp [gluedLiftPullbackMap] #align algebraic_geometry.Scheme.pullback.glued_lift_pullback_map_fst AlgebraicGeometry.Scheme.Pullback.gluedLiftPullbackMap_fst @[reassoc] theorem gluedLiftPullbackMap_snd (i j : 𝒰.J) : gluedLiftPullbackMap 𝒰 f g s i j ≫ pullback.snd = pullback.snd ≫ pullback.snd := by simp [gluedLiftPullbackMap] #align algebraic_geometry.Scheme.pullback.glued_lift_pullback_map_snd AlgebraicGeometry.Scheme.Pullback.gluedLiftPullbackMap_snd def gluedLift : s.pt ⟶ (gluing 𝒰 f g).glued := by fapply (𝒰.pullbackCover s.fst).glueMorphisms · exact fun i ↦ (pullbackSymmetry _ _).hom ≫ pullback.map _ _ _ _ (𝟙 _) s.snd f (Category.id_comp _).symm s.condition ≫ (gluing 𝒰 f g).ι i intro i j rw [← gluedLiftPullbackMap_fst_assoc, ← gluing_f, ← (gluing 𝒰 f g).glue_condition i j, gluing_t, gluing_f] simp_rw [← Category.assoc] congr 1 apply pullback.hom_ext <;> simp_rw [Category.assoc] · rw [t_fst_fst, gluedLiftPullbackMap_snd] congr 1 rw [← Iso.inv_comp_eq, pullbackSymmetry_inv_comp_snd, pullback.lift_fst, Category.comp_id] · rw [t_fst_snd, gluedLiftPullbackMap_fst_assoc, pullback.lift_snd, pullback.lift_snd] simp_rw [pullbackSymmetry_hom_comp_snd_assoc] exact pullback.condition_assoc _ #align algebraic_geometry.Scheme.pullback.glued_lift AlgebraicGeometry.Scheme.Pullback.gluedLift theorem gluedLift_p1 : gluedLift 𝒰 f g s ≫ p1 𝒰 f g = s.fst := by rw [← cancel_epi (𝒰.pullbackCover s.fst).fromGlued] apply Multicoequalizer.hom_ext intro b simp_rw [OpenCover.fromGlued, Multicoequalizer.π_desc_assoc, gluedLift, ← Category.assoc] simp_rw [(𝒰.pullbackCover s.fst).ι_glueMorphisms] simp [p1, pullback.condition] #align algebraic_geometry.Scheme.pullback.glued_lift_p1 AlgebraicGeometry.Scheme.Pullback.gluedLift_p1 theorem gluedLift_p2 : gluedLift 𝒰 f g s ≫ p2 𝒰 f g = s.snd := by rw [← cancel_epi (𝒰.pullbackCover s.fst).fromGlued] apply Multicoequalizer.hom_ext intro b simp_rw [OpenCover.fromGlued, Multicoequalizer.π_desc_assoc, gluedLift, ← Category.assoc] simp_rw [(𝒰.pullbackCover s.fst).ι_glueMorphisms] simp [p2, pullback.condition] #align algebraic_geometry.Scheme.pullback.glued_lift_p2 AlgebraicGeometry.Scheme.Pullback.gluedLift_p2 def pullbackFstιToV (i j : 𝒰.J) : pullback (pullback.fst : pullback (p1 𝒰 f g) (𝒰.map i) ⟶ _) ((gluing 𝒰 f g).ι j) ⟶ v 𝒰 f g j i := (pullbackSymmetry _ _ ≪≫ pullbackRightPullbackFstIso (p1 𝒰 f g) (𝒰.map i) _).hom ≫ (pullback.congrHom (Multicoequalizer.π_desc ..) rfl).hom #align algebraic_geometry.Scheme.pullback.pullback_fst_ι_to_V AlgebraicGeometry.Scheme.Pullback.pullbackFstιToV @[simp, reassoc] theorem pullbackFstιToV_fst (i j : 𝒰.J) : pullbackFstιToV 𝒰 f g i j ≫ pullback.fst = pullback.snd := by simp [pullbackFstιToV, p1] #align algebraic_geometry.Scheme.pullback.pullback_fst_ι_to_V_fst AlgebraicGeometry.Scheme.Pullback.pullbackFstιToV_fst @[simp, reassoc] theorem pullbackFstιToV_snd (i j : 𝒰.J) : pullbackFstιToV 𝒰 f g i j ≫ pullback.snd = pullback.fst ≫ pullback.snd := by simp [pullbackFstιToV, p1] #align algebraic_geometry.Scheme.pullback.pullback_fst_ι_to_V_snd AlgebraicGeometry.Scheme.Pullback.pullbackFstιToV_snd theorem lift_comp_ι (i : 𝒰.J) : pullback.lift pullback.snd (pullback.fst ≫ p2 𝒰 f g) (by rw [← pullback.condition_assoc, Category.assoc, p_comm]) ≫ (gluing 𝒰 f g).ι i = (pullback.fst : pullback (p1 𝒰 f g) (𝒰.map i) ⟶ _) := by apply ((gluing 𝒰 f g).openCover.pullbackCover pullback.fst).hom_ext intro j dsimp only [OpenCover.pullbackCover] trans pullbackFstιToV 𝒰 f g i j ≫ fV 𝒰 f g j i ≫ (gluing 𝒰 f g).ι _ · rw [← show _ = fV 𝒰 f g j i ≫ _ from (gluing 𝒰 f g).glue_condition j i] simp_rw [← Category.assoc] congr 1 rw [gluing_f, gluing_t] apply pullback.hom_ext <;> simp_rw [Category.assoc] · simp_rw [t_fst_fst, pullback.lift_fst, pullbackFstιToV_snd, GlueData.openCover_map] · simp_rw [t_fst_snd, pullback.lift_snd, pullbackFstιToV_fst_assoc, pullback.condition_assoc, GlueData.openCover_map, p2] simp · rw [pullback.condition, ← Category.assoc] simp_rw [pullbackFstιToV_fst, GlueData.openCover_map] #align algebraic_geometry.Scheme.pullback.lift_comp_ι AlgebraicGeometry.Scheme.Pullback.lift_comp_ι def pullbackP1Iso (i : 𝒰.J) : pullback (p1 𝒰 f g) (𝒰.map i) ≅ pullback (𝒰.map i ≫ f) g := by fconstructor · exact pullback.lift pullback.snd (pullback.fst ≫ p2 𝒰 f g) (by rw [← pullback.condition_assoc, Category.assoc, p_comm]) · apply pullback.lift ((gluing 𝒰 f g).ι i) pullback.fst rw [gluing_ι, p1, Multicoequalizer.π_desc] · apply pullback.hom_ext · simpa using lift_comp_ι 𝒰 f g i · simp_rw [Category.assoc, pullback.lift_snd, pullback.lift_fst, Category.id_comp] · apply pullback.hom_ext · simp_rw [Category.assoc, pullback.lift_fst, pullback.lift_snd, Category.id_comp] · simp [p2] #align algebraic_geometry.Scheme.pullback.pullback_p1_iso AlgebraicGeometry.Scheme.Pullback.pullbackP1Iso @[simp, reassoc]	Mathlib/AlgebraicGeometry/Pullbacks.lean	401	403	theorem pullbackP1Iso_hom_fst (i : 𝒰.J) : (pullbackP1Iso 𝒰 f g i).hom ≫ pullback.fst = pullback.snd := by	simp_rw [pullbackP1Iso, pullback.lift_fst]
import Mathlib.MeasureTheory.Measure.VectorMeasure import Mathlib.MeasureTheory.Function.AEEqOfIntegral #align_import measure_theory.measure.with_density_vector_measure from "leanprover-community/mathlib"@"d1bd9c5df2867c1cb463bc6364446d57bdd9f7f1" noncomputable section open scoped Classical MeasureTheory NNReal ENNReal variable {α β : Type} {m : MeasurableSpace α} namespace MeasureTheory open TopologicalSpace variable {μ ν : Measure α} variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [CompleteSpace E] def Measure.withDensityᵥ {m : MeasurableSpace α} (μ : Measure α) (f : α → E) : VectorMeasure α E := if hf : Integrable f μ then { measureOf' := fun s => if MeasurableSet s then ∫ x in s, f x ∂μ else 0 empty' := by simp not_measurable' := fun s hs => if_neg hs m_iUnion' := fun s hs₁ hs₂ => by dsimp only convert hasSum_integral_iUnion hs₁ hs₂ hf.integrableOn with n · rw [if_pos (hs₁ n)] · rw [if_pos (MeasurableSet.iUnion hs₁)] } else 0 #align measure_theory.measure.with_densityᵥ MeasureTheory.Measure.withDensityᵥ open Measure variable {f g : α → E} theorem withDensityᵥ_apply (hf : Integrable f μ) {s : Set α} (hs : MeasurableSet s) : μ.withDensityᵥ f s = ∫ x in s, f x ∂μ := by rw [withDensityᵥ, dif_pos hf]; exact dif_pos hs #align measure_theory.with_densityᵥ_apply MeasureTheory.withDensityᵥ_apply @[simp] theorem withDensityᵥ_zero : μ.withDensityᵥ (0 : α → E) = 0 := by ext1 s hs; erw [withDensityᵥ_apply (integrable_zero α E μ) hs]; simp #align measure_theory.with_densityᵥ_zero MeasureTheory.withDensityᵥ_zero @[simp] theorem withDensityᵥ_neg : μ.withDensityᵥ (-f) = -μ.withDensityᵥ f := by by_cases hf : Integrable f μ · ext1 i hi rw [VectorMeasure.neg_apply, withDensityᵥ_apply hf hi, ← integral_neg, withDensityᵥ_apply hf.neg hi] rfl · rw [withDensityᵥ, withDensityᵥ, dif_neg hf, dif_neg, neg_zero] rwa [integrable_neg_iff] #align measure_theory.with_densityᵥ_neg MeasureTheory.withDensityᵥ_neg theorem withDensityᵥ_neg' : (μ.withDensityᵥ fun x => -f x) = -μ.withDensityᵥ f := withDensityᵥ_neg #align measure_theory.with_densityᵥ_neg' MeasureTheory.withDensityᵥ_neg' @[simp] theorem withDensityᵥ_add (hf : Integrable f μ) (hg : Integrable g μ) : μ.withDensityᵥ (f + g) = μ.withDensityᵥ f + μ.withDensityᵥ g := by ext1 i hi rw [withDensityᵥ_apply (hf.add hg) hi, VectorMeasure.add_apply, withDensityᵥ_apply hf hi, withDensityᵥ_apply hg hi] simp_rw [Pi.add_apply] rw [integral_add] <;> rw [← integrableOn_univ] · exact hf.integrableOn.restrict MeasurableSet.univ · exact hg.integrableOn.restrict MeasurableSet.univ #align measure_theory.with_densityᵥ_add MeasureTheory.withDensityᵥ_add theorem withDensityᵥ_add' (hf : Integrable f μ) (hg : Integrable g μ) : (μ.withDensityᵥ fun x => f x + g x) = μ.withDensityᵥ f + μ.withDensityᵥ g := withDensityᵥ_add hf hg #align measure_theory.with_densityᵥ_add' MeasureTheory.withDensityᵥ_add' @[simp]	Mathlib/MeasureTheory/Measure/WithDensityVectorMeasure.lean	101	103	theorem withDensityᵥ_sub (hf : Integrable f μ) (hg : Integrable g μ) : μ.withDensityᵥ (f - g) = μ.withDensityᵥ f - μ.withDensityᵥ g := by	rw [sub_eq_add_neg, sub_eq_add_neg, withDensityᵥ_add hf hg.neg, withDensityᵥ_neg]
import Mathlib.Data.List.Nodup #align_import data.list.duplicate from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" variable {α : Type*} namespace List inductive Duplicate (x : α) : List α → Prop \| cons_mem {l : List α} : x ∈ l → Duplicate x (x :: l) \| cons_duplicate {y : α} {l : List α} : Duplicate x l → Duplicate x (y :: l) #align list.duplicate List.Duplicate local infixl:50 " ∈+ " => List.Duplicate variable {l : List α} {x : α} theorem Mem.duplicate_cons_self (h : x ∈ l) : x ∈+ x :: l := Duplicate.cons_mem h #align list.mem.duplicate_cons_self List.Mem.duplicate_cons_self theorem Duplicate.duplicate_cons (h : x ∈+ l) (y : α) : x ∈+ y :: l := Duplicate.cons_duplicate h #align list.duplicate.duplicate_cons List.Duplicate.duplicate_cons theorem Duplicate.mem (h : x ∈+ l) : x ∈ l := by induction' h with l' _ y l' _ hm · exact mem_cons_self _ _ · exact mem_cons_of_mem _ hm #align list.duplicate.mem List.Duplicate.mem theorem Duplicate.mem_cons_self (h : x ∈+ x :: l) : x ∈ l := by cases' h with _ h _ _ h · exact h · exact h.mem #align list.duplicate.mem_cons_self List.Duplicate.mem_cons_self @[simp] theorem duplicate_cons_self_iff : x ∈+ x :: l ↔ x ∈ l := ⟨Duplicate.mem_cons_self, Mem.duplicate_cons_self⟩ #align list.duplicate_cons_self_iff List.duplicate_cons_self_iff theorem Duplicate.ne_nil (h : x ∈+ l) : l ≠ [] := fun H => (mem_nil_iff x).mp (H ▸ h.mem) #align list.duplicate.ne_nil List.Duplicate.ne_nil @[simp] theorem not_duplicate_nil (x : α) : ¬x ∈+ [] := fun H => H.ne_nil rfl #align list.not_duplicate_nil List.not_duplicate_nil	Mathlib/Data/List/Duplicate.lean	70	73	theorem Duplicate.ne_singleton (h : x ∈+ l) (y : α) : l ≠ [y] := by	induction' h with l' h z l' h _ · simp [ne_nil_of_mem h] · simp [ne_nil_of_mem h.mem]
import Mathlib.Analysis.SpecialFunctions.Integrals import Mathlib.MeasureTheory.Integral.Layercake #align_import measure_theory.integral.layercake from "leanprover-community/mathlib"@"08a4542bec7242a5c60f179e4e49de8c0d677b1b" open Set namespace MeasureTheory variable {α : Type*} [MeasurableSpace α] {f : α → ℝ} (μ : Measure α) (f_nn : 0 ≤ᵐ[μ] f) (f_mble : AEMeasurable f μ) {p : ℝ} (p_pos : 0 < p) section Layercake	Mathlib/Analysis/SpecialFunctions/Pow/Integral.lean	50	72	theorem lintegral_rpow_eq_lintegral_meas_le_mul : ∫⁻ ω, ENNReal.ofReal (f ω ^ p) ∂μ = ENNReal.ofReal p * ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (t ^ (p - 1)) := by	have one_lt_p : -1 < p - 1 := by linarith have obs : ∀ x : ℝ, ∫ t : ℝ in (0)..x, t ^ (p - 1) = x ^ p / p := by intro x rw [integral_rpow (Or.inl one_lt_p)] simp [Real.zero_rpow p_pos.ne.symm] set g := fun t : ℝ => t ^ (p - 1) have g_nn : ∀ᵐ t ∂volume.restrict (Ioi (0 : ℝ)), 0 ≤ g t := by filter_upwards [self_mem_ae_restrict (measurableSet_Ioi : MeasurableSet (Ioi (0 : ℝ)))] intro t t_pos exact Real.rpow_nonneg (mem_Ioi.mp t_pos).le (p - 1) have g_intble : ∀ t > 0, IntervalIntegrable g volume 0 t := fun _ _ => intervalIntegral.intervalIntegrable_rpow' one_lt_p have key := lintegral_comp_eq_lintegral_meas_le_mul μ f_nn f_mble g_intble g_nn rw [← key, ← lintegral_const_mul'' (ENNReal.ofReal p)] <;> simp_rw [obs] · congr with ω rw [← ENNReal.ofReal_mul p_pos.le, mul_div_cancel₀ (f ω ^ p) p_pos.ne.symm] · have aux := (@measurable_const ℝ α (by infer_instance) (by infer_instance) p).aemeasurable (μ := μ) exact (Measurable.ennreal_ofReal (hf := measurable_id)).comp_aemeasurable ((f_mble.pow aux).div_const p)
import Mathlib.Algebra.Polynomial.Eval import Mathlib.RingTheory.Ideal.Quotient #align_import linear_algebra.smodeq from "leanprover-community/mathlib"@"146d3d1fa59c091fedaad8a4afa09d6802886d24" open Submodule open Polynomial variable {R : Type} [Ring R] variable {A : Type} [CommRing A] variable {M : Type} [AddCommGroup M] [Module R M] (U U₁ U₂ : Submodule R M) variable {x x₁ x₂ y y₁ y₂ z z₁ z₂ : M} variable {N : Type} [AddCommGroup N] [Module R N] (V V₁ V₂ : Submodule R N) set_option backward.isDefEq.lazyWhnfCore false in -- See https://github.com/leanprover-community/mathlib4/issues/12534 def SModEq (x y : M) : Prop := (Submodule.Quotient.mk x : M ⧸ U) = Submodule.Quotient.mk y #align smodeq SModEq notation:50 x " ≡ " y " [SMOD " N "]" => SModEq N x y variable {U U₁ U₂} set_option backward.isDefEq.lazyWhnfCore false in -- See https://github.com/leanprover-community/mathlib4/issues/12534 protected theorem SModEq.def : x ≡ y [SMOD U] ↔ (Submodule.Quotient.mk x : M ⧸ U) = Submodule.Quotient.mk y := Iff.rfl #align smodeq.def SModEq.def namespace SModEq	Mathlib/LinearAlgebra/SModEq.lean	44	44	theorem sub_mem : x ≡ y [SMOD U] ↔ x - y ∈ U := by	rw [SModEq.def, Submodule.Quotient.eq]
import Mathlib.Data.Nat.Defs import Mathlib.Tactic.GCongr.Core import Mathlib.Tactic.Common import Mathlib.Tactic.Monotonicity.Attr #align_import data.nat.factorial.basic from "leanprover-community/mathlib"@"d012cd09a9b256d870751284dd6a29882b0be105" namespace Nat def factorial : ℕ → ℕ \| 0 => 1 \| succ n => succ n * factorial n #align nat.factorial Nat.factorial scoped notation:10000 n "!" => Nat.factorial n section Factorial variable {m n : ℕ} @[simp] theorem factorial_zero : 0! = 1 := rfl #align nat.factorial_zero Nat.factorial_zero theorem factorial_succ (n : ℕ) : (n + 1)! = (n + 1) * n ! := rfl #align nat.factorial_succ Nat.factorial_succ @[simp] theorem factorial_one : 1! = 1 := rfl #align nat.factorial_one Nat.factorial_one @[simp] theorem factorial_two : 2! = 2 := rfl #align nat.factorial_two Nat.factorial_two theorem mul_factorial_pred (hn : 0 < n) : n * (n - 1)! = n ! := Nat.sub_add_cancel (Nat.succ_le_of_lt hn) ▸ rfl #align nat.mul_factorial_pred Nat.mul_factorial_pred theorem factorial_pos : ∀ n, 0 < n ! \| 0 => Nat.zero_lt_one \| succ n => Nat.mul_pos (succ_pos _) (factorial_pos n) #align nat.factorial_pos Nat.factorial_pos theorem factorial_ne_zero (n : ℕ) : n ! ≠ 0 := ne_of_gt (factorial_pos _) #align nat.factorial_ne_zero Nat.factorial_ne_zero theorem factorial_dvd_factorial {m n} (h : m ≤ n) : m ! ∣ n ! := by induction' h with n _ ih · exact Nat.dvd_refl _ · exact Nat.dvd_trans ih (Nat.dvd_mul_left _ _) #align nat.factorial_dvd_factorial Nat.factorial_dvd_factorial theorem dvd_factorial : ∀ {m n}, 0 < m → m ≤ n → m ∣ n ! \| succ _, _, _, h => Nat.dvd_trans (Nat.dvd_mul_right _ _) (factorial_dvd_factorial h) #align nat.dvd_factorial Nat.dvd_factorial @[mono, gcongr] theorem factorial_le {m n} (h : m ≤ n) : m ! ≤ n ! := le_of_dvd (factorial_pos _) (factorial_dvd_factorial h) #align nat.factorial_le Nat.factorial_le theorem factorial_mul_pow_le_factorial : ∀ {m n : ℕ}, m ! * (m + 1) ^ n ≤ (m + n)! \| m, 0 => by simp \| m, n + 1 => by rw [← Nat.add_assoc, factorial_succ, Nat.mul_comm (_ + 1), Nat.pow_succ, ← Nat.mul_assoc] exact Nat.mul_le_mul factorial_mul_pow_le_factorial (succ_le_succ (le_add_right _ _)) #align nat.factorial_mul_pow_le_factorial Nat.factorial_mul_pow_le_factorial theorem factorial_lt (hn : 0 < n) : n ! < m ! ↔ n < m := by refine ⟨fun h => not_le.mp fun hmn => Nat.not_le_of_lt h (factorial_le hmn), fun h => ?_⟩ have : ∀ {n}, 0 < n → n ! < (n + 1)! := by intro k hk rw [factorial_succ, succ_mul, Nat.lt_add_left_iff_pos] exact Nat.mul_pos hk k.factorial_pos induction' h with k hnk ih generalizing hn · exact this hn · exact lt_trans (ih hn) $ this <\| lt_trans hn <\| lt_of_succ_le hnk #align nat.factorial_lt Nat.factorial_lt @[gcongr] lemma factorial_lt_of_lt {m n : ℕ} (hn : 0 < n) (h : n < m) : n ! < m ! := (factorial_lt hn).mpr h @[simp] lemma one_lt_factorial : 1 < n ! ↔ 1 < n := factorial_lt Nat.one_pos #align nat.one_lt_factorial Nat.one_lt_factorial @[simp] theorem factorial_eq_one : n ! = 1 ↔ n ≤ 1 := by constructor · intro h rw [← not_lt, ← one_lt_factorial, h] apply lt_irrefl · rintro (_\|_\|_) <;> rfl #align nat.factorial_eq_one Nat.factorial_eq_one	Mathlib/Data/Nat/Factorial/Basic.lean	121	129	theorem factorial_inj (hn : 1 < n) : n ! = m ! ↔ n = m := by	refine ⟨fun h => ?_, congr_arg _⟩ obtain hnm \| rfl \| hnm := lt_trichotomy n m · rw [← factorial_lt <\| lt_of_succ_lt hn, h] at hnm cases lt_irrefl _ hnm · rfl rw [← one_lt_factorial, h, one_lt_factorial] at hn rw [← factorial_lt <\| lt_of_succ_lt hn, h] at hnm cases lt_irrefl _ hnm
import Mathlib.MeasureTheory.Measure.GiryMonad import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Integral.Lebesgue import Mathlib.MeasureTheory.Measure.OpenPos #align_import measure_theory.constructions.prod.basic from "leanprover-community/mathlib"@"00abe0695d8767201e6d008afa22393978bb324d" noncomputable section open scoped Classical open Topology ENNReal MeasureTheory open Set Function Real ENNReal open MeasureTheory MeasurableSpace MeasureTheory.Measure open TopologicalSpace hiding generateFrom open Filter hiding prod_eq map variable {α α' β β' γ E : Type} theorem 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) #align is_pi_system.prod IsPiSystem.prod theorem IsCountablySpanning.prod {C : Set (Set α)} {D : Set (Set β)} (hC : IsCountablySpanning C) (hD : IsCountablySpanning D) : IsCountablySpanning (image2 (· ×ˢ ·) C D) := by rcases hC, hD with ⟨⟨s, h1s, h2s⟩, t, h1t, h2t⟩ refine ⟨fun n => s n.unpair.1 ×ˢ t n.unpair.2, fun n => mem_image2_of_mem (h1s _) (h1t _), ?_⟩ rw [iUnion_unpair_prod, h2s, h2t, univ_prod_univ] #align is_countably_spanning.prod IsCountablySpanning.prod variable [MeasurableSpace α] [MeasurableSpace α'] [MeasurableSpace β] [MeasurableSpace β'] variable [MeasurableSpace γ] variable {μ μ' : Measure α} {ν ν' : Measure β} {τ : Measure γ} variable [NormedAddCommGroup E] theorem generateFrom_prod_eq {α β} {C : Set (Set α)} {D : Set (Set β)} (hC : IsCountablySpanning C) (hD : IsCountablySpanning D) : @Prod.instMeasurableSpace _ _ (generateFrom C) (generateFrom D) = generateFrom (image2 (· ×ˢ ·) C D) := by apply le_antisymm · refine sup_le ?_ ?_ <;> rw [comap_generateFrom] <;> apply generateFrom_le <;> rintro _ ⟨s, hs, rfl⟩ · rcases hD with ⟨t, h1t, h2t⟩ rw [← prod_univ, ← h2t, prod_iUnion] apply MeasurableSet.iUnion intro n apply measurableSet_generateFrom exact ⟨s, hs, t n, h1t n, rfl⟩ · rcases hC with ⟨t, h1t, h2t⟩ rw [← univ_prod, ← h2t, iUnion_prod_const] apply MeasurableSet.iUnion rintro n apply measurableSet_generateFrom exact mem_image2_of_mem (h1t n) hs · apply generateFrom_le rintro _ ⟨s, hs, t, ht, rfl⟩ dsimp only rw [prod_eq] apply (measurable_fst _).inter (measurable_snd _) · exact measurableSet_generateFrom hs · exact measurableSet_generateFrom ht #align generate_from_prod_eq generateFrom_prod_eq theorem generateFrom_eq_prod {C : Set (Set α)} {D : Set (Set β)} (hC : generateFrom C = ‹_›) (hD : generateFrom D = ‹_›) (h2C : IsCountablySpanning C) (h2D : IsCountablySpanning D) : generateFrom (image2 (· ×ˢ ·) C D) = Prod.instMeasurableSpace := by rw [← hC, ← hD, generateFrom_prod_eq h2C h2D] #align generate_from_eq_prod generateFrom_eq_prod theorem generateFrom_prod : generateFrom (image2 (· ×ˢ ·) { s : Set α \| MeasurableSet s } { t : Set β \| MeasurableSet t }) = Prod.instMeasurableSpace := generateFrom_eq_prod generateFrom_measurableSet generateFrom_measurableSet isCountablySpanning_measurableSet isCountablySpanning_measurableSet #align generate_from_prod generateFrom_prod theorem isPiSystem_prod : IsPiSystem (image2 (· ×ˢ ·) { s : Set α \| MeasurableSet s } { t : Set β \| MeasurableSet t }) := isPiSystem_measurableSet.prod isPiSystem_measurableSet #align is_pi_system_prod isPiSystem_prod theorem measurable_measure_prod_mk_left_finite [IsFiniteMeasure ν] {s : Set (α × β)} (hs : MeasurableSet s) : Measurable fun x => ν (Prod.mk x ⁻¹' s) := by refine induction_on_inter (C := fun s => Measurable fun x => ν (Prod.mk x ⁻¹' s)) generateFrom_prod.symm isPiSystem_prod ?_ ?_ ?_ ?_ hs · simp · rintro _ ⟨s, hs, t, _, rfl⟩ simp only [mk_preimage_prod_right_eq_if, measure_if] exact measurable_const.indicator hs · intro t ht h2t simp_rw [preimage_compl, measure_compl (measurable_prod_mk_left ht) (measure_ne_top ν _)] exact h2t.const_sub _ · intro f h1f h2f h3f simp_rw [preimage_iUnion] have : ∀ b, ν (⋃ i, Prod.mk b ⁻¹' f i) = ∑' i, ν (Prod.mk b ⁻¹' f i) := fun b => measure_iUnion (fun i j hij => Disjoint.preimage _ (h1f hij)) fun i => measurable_prod_mk_left (h2f i) simp_rw [this] apply Measurable.ennreal_tsum h3f #align measurable_measure_prod_mk_left_finite measurable_measure_prod_mk_left_finite theorem measurable_measure_prod_mk_left [SFinite ν] {s : Set (α × β)} (hs : MeasurableSet s) : Measurable fun x => ν (Prod.mk x ⁻¹' s) := by rw [← sum_sFiniteSeq ν] simp_rw [Measure.sum_apply_of_countable] exact Measurable.ennreal_tsum (fun i ↦ measurable_measure_prod_mk_left_finite hs) #align measurable_measure_prod_mk_left measurable_measure_prod_mk_left theorem measurable_measure_prod_mk_right {μ : Measure α} [SFinite μ] {s : Set (α × β)} (hs : MeasurableSet s) : Measurable fun y => μ ((fun x => (x, y)) ⁻¹' s) := measurable_measure_prod_mk_left (measurableSet_swap_iff.mpr hs) #align measurable_measure_prod_mk_right measurable_measure_prod_mk_right theorem Measurable.map_prod_mk_left [SFinite ν] : Measurable fun x : α => map (Prod.mk x) ν := by apply measurable_of_measurable_coe; intro s hs simp_rw [map_apply measurable_prod_mk_left hs] exact measurable_measure_prod_mk_left hs #align measurable.map_prod_mk_left Measurable.map_prod_mk_left theorem Measurable.map_prod_mk_right {μ : Measure α} [SFinite μ] : Measurable fun y : β => map (fun x : α => (x, y)) μ := by apply measurable_of_measurable_coe; intro s hs simp_rw [map_apply measurable_prod_mk_right hs] exact measurable_measure_prod_mk_right hs #align measurable.map_prod_mk_right Measurable.map_prod_mk_right theorem MeasurableEmbedding.prod_mk {α β γ δ : Type} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} {mγ : MeasurableSpace γ} {mδ : MeasurableSpace δ} {f : α → β} {g : γ → δ} (hg : MeasurableEmbedding g) (hf : MeasurableEmbedding f) : MeasurableEmbedding fun x : γ × α => (g x.1, f x.2) := by have h_inj : Function.Injective fun x : γ × α => (g x.fst, f x.snd) := by intro x y hxy rw [← @Prod.mk.eta _ _ x, ← @Prod.mk.eta _ _ y] simp only [Prod.mk.inj_iff] at hxy ⊢ exact ⟨hg.injective hxy.1, hf.injective hxy.2⟩ refine ⟨h_inj, ?_, ?_⟩ · exact (hg.measurable.comp measurable_fst).prod_mk (hf.measurable.comp measurable_snd) · -- Induction using the π-system of rectangles refine fun s hs => @MeasurableSpace.induction_on_inter _ (fun s => MeasurableSet ((fun x : γ × α => (g x.fst, f x.snd)) '' s)) _ _ generateFrom_prod.symm isPiSystem_prod ?_ ?_ ?_ ?_ _ hs · simp only [Set.image_empty, MeasurableSet.empty] · rintro t ⟨t₁, ht₁, t₂, ht₂, rfl⟩ rw [← Set.prod_image_image_eq] exact (hg.measurableSet_image.mpr ht₁).prod (hf.measurableSet_image.mpr ht₂) · intro t _ ht_m rw [← Set.range_diff_image h_inj, ← Set.prod_range_range_eq] exact MeasurableSet.diff (MeasurableSet.prod hg.measurableSet_range hf.measurableSet_range) ht_m · intro g _ _ hg simp_rw [Set.image_iUnion] exact MeasurableSet.iUnion hg #align measurable_embedding.prod_mk MeasurableEmbedding.prod_mk lemma MeasurableEmbedding.prod_mk_left {β γ : Type} [MeasurableSingletonClass α] {mβ : MeasurableSpace β} {mγ : MeasurableSpace γ} (x : α) {f : γ → β} (hf : MeasurableEmbedding f) : MeasurableEmbedding (fun y ↦ (x, f y)) where injective := by intro y y' simp only [Prod.mk.injEq, true_and] exact fun h ↦ hf.injective h measurable := Measurable.prod_mk measurable_const hf.measurable measurableSet_image' := by intro s hs convert (MeasurableSet.singleton x).prod (hf.measurableSet_image.mpr hs) ext x simp lemma measurableEmbedding_prod_mk_left [MeasurableSingletonClass α] (x : α) : MeasurableEmbedding (Prod.mk x : β → α × β) := MeasurableEmbedding.prod_mk_left x MeasurableEmbedding.id lemma MeasurableEmbedding.prod_mk_right {β γ : Type} [MeasurableSingletonClass α] {mβ : MeasurableSpace β} {mγ : MeasurableSpace γ} {f : γ → β} (hf : MeasurableEmbedding f) (x : α) : MeasurableEmbedding (fun y ↦ (f y, x)) where injective := by intro y y' simp only [Prod.mk.injEq, and_true] exact fun h ↦ hf.injective h measurable := Measurable.prod_mk hf.measurable measurable_const measurableSet_image' := by intro s hs convert (hf.measurableSet_image.mpr hs).prod (MeasurableSet.singleton x) ext x simp lemma measurableEmbedding_prod_mk_right [MeasurableSingletonClass α] (x : α) : MeasurableEmbedding (fun y ↦ (y, x) : β → β × α) := MeasurableEmbedding.prod_mk_right MeasurableEmbedding.id x theorem Measurable.lintegral_prod_right' [SFinite ν] : ∀ {f : α × β → ℝ≥0∞}, Measurable f → Measurable fun x => ∫⁻ y, f (x, y) ∂ν := by have m := @measurable_prod_mk_left refine Measurable.ennreal_induction (P := fun f => Measurable fun (x : α) => ∫⁻ y, f (x, y) ∂ν) ?_ ?_ ?_ · intro c s hs simp only [← indicator_comp_right] suffices Measurable fun x => c * ν (Prod.mk x ⁻¹' s) by simpa [lintegral_indicator _ (m hs)] exact (measurable_measure_prod_mk_left hs).const_mul _ · rintro f g - hf - h2f h2g simp only [Pi.add_apply] conv => enter [1, x]; erw [lintegral_add_left (hf.comp m)] exact h2f.add h2g · intro f hf h2f h3f have := measurable_iSup h3f have : ∀ x, Monotone fun n y => f n (x, y) := fun x i j hij y => h2f hij (x, y) conv => enter [1, x]; erw [lintegral_iSup (fun n => (hf n).comp m) (this x)] assumption #align measurable.lintegral_prod_right' Measurable.lintegral_prod_right' theorem Measurable.lintegral_prod_right [SFinite ν] {f : α → β → ℝ≥0∞} (hf : Measurable (uncurry f)) : Measurable fun x => ∫⁻ y, f x y ∂ν := hf.lintegral_prod_right' #align measurable.lintegral_prod_right Measurable.lintegral_prod_right theorem Measurable.lintegral_prod_left' [SFinite μ] {f : α × β → ℝ≥0∞} (hf : Measurable f) : Measurable fun y => ∫⁻ x, f (x, y) ∂μ := (measurable_swap_iff.mpr hf).lintegral_prod_right' #align measurable.lintegral_prod_left' Measurable.lintegral_prod_left' theorem Measurable.lintegral_prod_left [SFinite μ] {f : α → β → ℝ≥0∞} (hf : Measurable (uncurry f)) : Measurable fun y => ∫⁻ x, f x y ∂μ := hf.lintegral_prod_left' #align measurable.lintegral_prod_left Measurable.lintegral_prod_left namespace MeasureTheory namespace Measure protected irreducible_def prod (μ : Measure α) (ν : Measure β) : Measure (α × β) := bind μ fun x : α => map (Prod.mk x) ν #align measure_theory.measure.prod MeasureTheory.Measure.prod instance prod.measureSpace {α β} [MeasureSpace α] [MeasureSpace β] : MeasureSpace (α × β) where volume := volume.prod volume #align measure_theory.measure.prod.measure_space MeasureTheory.Measure.prod.measureSpace theorem volume_eq_prod (α β) [MeasureSpace α] [MeasureSpace β] : (volume : Measure (α × β)) = (volume : Measure α).prod (volume : Measure β) := rfl #align measure_theory.measure.volume_eq_prod MeasureTheory.Measure.volume_eq_prod variable [SFinite ν] theorem prod_apply {s : Set (α × β)} (hs : MeasurableSet s) : μ.prod ν s = ∫⁻ x, ν (Prod.mk x ⁻¹' s) ∂μ := by simp_rw [Measure.prod, bind_apply hs (Measurable.map_prod_mk_left (ν := ν)), map_apply measurable_prod_mk_left hs] #align measure_theory.measure.prod_apply MeasureTheory.Measure.prod_apply @[simp] theorem prod_prod (s : Set α) (t : Set β) : μ.prod ν (s ×ˢ t) = μ s * ν t := by apply le_antisymm · set S := toMeasurable μ s set T := toMeasurable ν t have hSTm : MeasurableSet (S ×ˢ T) := (measurableSet_toMeasurable _ _).prod (measurableSet_toMeasurable _ _) calc μ.prod ν (s ×ˢ t) ≤ μ.prod ν (S ×ˢ T) := by gcongr <;> apply subset_toMeasurable _ = μ S * ν T := by rw [prod_apply hSTm] simp_rw [mk_preimage_prod_right_eq_if, measure_if, lintegral_indicator _ (measurableSet_toMeasurable _ _), lintegral_const, restrict_apply_univ, mul_comm] _ = μ s * ν t := by rw [measure_toMeasurable, measure_toMeasurable] · -- Formalization is based on https://mathoverflow.net/a/254134/136589 set ST := toMeasurable (μ.prod ν) (s ×ˢ t) have hSTm : MeasurableSet ST := measurableSet_toMeasurable _ _ have hST : s ×ˢ t ⊆ ST := subset_toMeasurable _ _ set f : α → ℝ≥0∞ := fun x => ν (Prod.mk x ⁻¹' ST) have hfm : Measurable f := measurable_measure_prod_mk_left hSTm set s' : Set α := { x \| ν t ≤ f x } have hss' : s ⊆ s' := fun x hx => measure_mono fun y hy => hST <\| mk_mem_prod hx hy calc μ s * ν t ≤ μ s' * ν t := by gcongr _ = ∫⁻ _ in s', ν t ∂μ := by rw [set_lintegral_const, mul_comm] _ ≤ ∫⁻ x in s', f x ∂μ := set_lintegral_mono measurable_const hfm fun x => id _ ≤ ∫⁻ x, f x ∂μ := lintegral_mono' restrict_le_self le_rfl _ = μ.prod ν ST := (prod_apply hSTm).symm _ = μ.prod ν (s ×ˢ t) := measure_toMeasurable _ #align measure_theory.measure.prod_prod MeasureTheory.Measure.prod_prod @[simp] lemma map_fst_prod : Measure.map Prod.fst (μ.prod ν) = (ν univ) • μ := by ext s hs simp [Measure.map_apply measurable_fst hs, ← prod_univ, mul_comm] @[simp] lemma map_snd_prod : Measure.map Prod.snd (μ.prod ν) = (μ univ) • ν := by ext s hs simp [Measure.map_apply measurable_snd hs, ← univ_prod] instance prod.instIsOpenPosMeasure {X Y : Type} [TopologicalSpace X] [TopologicalSpace Y] {m : MeasurableSpace X} {μ : Measure X} [IsOpenPosMeasure μ] {m' : MeasurableSpace Y} {ν : Measure Y} [IsOpenPosMeasure ν] [SFinite ν] : IsOpenPosMeasure (μ.prod ν) := by constructor rintro U U_open ⟨⟨x, y⟩, hxy⟩ rcases isOpen_prod_iff.1 U_open x y hxy with ⟨u, v, u_open, v_open, xu, yv, huv⟩ refine ne_of_gt (lt_of_lt_of_le ?_ (measure_mono huv)) simp only [prod_prod, CanonicallyOrderedCommSemiring.mul_pos] constructor · exact u_open.measure_pos μ ⟨x, xu⟩ · exact v_open.measure_pos ν ⟨y, yv⟩ #align measure_theory.measure.prod.is_open_pos_measure MeasureTheory.Measure.prod.instIsOpenPosMeasure instance {X Y : Type} [TopologicalSpace X] [MeasureSpace X] [IsOpenPosMeasure (volume : Measure X)] [TopologicalSpace Y] [MeasureSpace Y] [IsOpenPosMeasure (volume : Measure Y)] [SFinite (volume : Measure Y)] : IsOpenPosMeasure (volume : Measure (X × Y)) := prod.instIsOpenPosMeasure instance prod.instIsFiniteMeasure {α β : Type} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} (μ : Measure α) (ν : Measure β) [IsFiniteMeasure μ] [IsFiniteMeasure ν] : IsFiniteMeasure (μ.prod ν) := by constructor rw [← univ_prod_univ, prod_prod] exact mul_lt_top (measure_lt_top _ _).ne (measure_lt_top _ _).ne #align measure_theory.measure.prod.measure_theory.is_finite_measure MeasureTheory.Measure.prod.instIsFiniteMeasure instance {α β : Type} [MeasureSpace α] [MeasureSpace β] [IsFiniteMeasure (volume : Measure α)] [IsFiniteMeasure (volume : Measure β)] : IsFiniteMeasure (volume : Measure (α × β)) := prod.instIsFiniteMeasure _ _ instance prod.instIsProbabilityMeasure {α β : Type} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} (μ : Measure α) (ν : Measure β) [IsProbabilityMeasure μ] [IsProbabilityMeasure ν] : IsProbabilityMeasure (μ.prod ν) := ⟨by rw [← univ_prod_univ, prod_prod, measure_univ, measure_univ, mul_one]⟩ #align measure_theory.measure.prod.measure_theory.is_probability_measure MeasureTheory.Measure.prod.instIsProbabilityMeasure instance {α β : Type} [MeasureSpace α] [MeasureSpace β] [IsProbabilityMeasure (volume : Measure α)] [IsProbabilityMeasure (volume : Measure β)] : IsProbabilityMeasure (volume : Measure (α × β)) := prod.instIsProbabilityMeasure _ _ instance prod.instIsFiniteMeasureOnCompacts {α β : Type} [TopologicalSpace α] [TopologicalSpace β] {mα : MeasurableSpace α} {mβ : MeasurableSpace β} (μ : Measure α) (ν : Measure β) [IsFiniteMeasureOnCompacts μ] [IsFiniteMeasureOnCompacts ν] [SFinite ν] : IsFiniteMeasureOnCompacts (μ.prod ν) := by refine ⟨fun K hK => ?_⟩ set L := (Prod.fst '' K) ×ˢ (Prod.snd '' K) with hL have : K ⊆ L := by rintro ⟨x, y⟩ hxy simp only [L, prod_mk_mem_set_prod_eq, mem_image, Prod.exists, exists_and_right, exists_eq_right] exact ⟨⟨y, hxy⟩, ⟨x, hxy⟩⟩ apply lt_of_le_of_lt (measure_mono this) rw [hL, prod_prod] exact mul_lt_top (IsCompact.measure_lt_top (hK.image continuous_fst)).ne (IsCompact.measure_lt_top (hK.image continuous_snd)).ne #align measure_theory.measure.prod.measure_theory.is_finite_measure_on_compacts MeasureTheory.Measure.prod.instIsFiniteMeasureOnCompacts instance {X Y : Type} [TopologicalSpace X] [MeasureSpace X] [IsFiniteMeasureOnCompacts (volume : Measure X)] [TopologicalSpace Y] [MeasureSpace Y] [IsFiniteMeasureOnCompacts (volume : Measure Y)] [SFinite (volume : Measure Y)] : IsFiniteMeasureOnCompacts (volume : Measure (X × Y)) := prod.instIsFiniteMeasureOnCompacts _ _ instance prod.instNoAtoms_fst [NoAtoms μ] : NoAtoms (Measure.prod μ ν) := by refine NoAtoms.mk (fun x => ?_) rw [← Set.singleton_prod_singleton, Measure.prod_prod, measure_singleton, zero_mul] instance prod.instNoAtoms_snd [NoAtoms ν] : NoAtoms (Measure.prod μ ν) := by refine NoAtoms.mk (fun x => ?_) rw [← Set.singleton_prod_singleton, Measure.prod_prod, measure_singleton (μ := ν), mul_zero]	Mathlib/MeasureTheory/Constructions/Prod/Basic.lean	465	468	theorem ae_measure_lt_top {s : Set (α × β)} (hs : MeasurableSet s) (h2s : (μ.prod ν) s ≠ ∞) : ∀ᵐ x ∂μ, ν (Prod.mk x ⁻¹' s) < ∞ := by	rw [prod_apply hs] at h2s exact ae_lt_top (measurable_measure_prod_mk_left hs) h2s
import Mathlib.Algebra.GroupWithZero.NonZeroDivisors import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.RingTheory.Coprime.Basic import Mathlib.Tactic.AdaptationNote #align_import ring_theory.polynomial.scale_roots from "leanprover-community/mathlib"@"40ac1b258344e0c2b4568dc37bfad937ec35a727" variable {R S A K : Type} namespace Polynomial open Polynomial section Semiring variable [Semiring R] [Semiring S] noncomputable def scaleRoots (p : R[X]) (s : R) : R[X] := ∑ i ∈ p.support, monomial i (p.coeff i s ^ (p.natDegree - i)) #align polynomial.scale_roots Polynomial.scaleRoots @[simp] theorem coeff_scaleRoots (p : R[X]) (s : R) (i : ℕ) : (scaleRoots p s).coeff i = coeff p i * s ^ (p.natDegree - i) := by simp (config := { contextual := true }) [scaleRoots, coeff_monomial] #align polynomial.coeff_scale_roots Polynomial.coeff_scaleRoots theorem coeff_scaleRoots_natDegree (p : R[X]) (s : R) : (scaleRoots p s).coeff p.natDegree = p.leadingCoeff := by rw [leadingCoeff, coeff_scaleRoots, tsub_self, pow_zero, mul_one] #align polynomial.coeff_scale_roots_nat_degree Polynomial.coeff_scaleRoots_natDegree @[simp] theorem zero_scaleRoots (s : R) : scaleRoots 0 s = 0 := by ext simp #align polynomial.zero_scale_roots Polynomial.zero_scaleRoots theorem scaleRoots_ne_zero {p : R[X]} (hp : p ≠ 0) (s : R) : scaleRoots p s ≠ 0 := by intro h have : p.coeff p.natDegree ≠ 0 := mt leadingCoeff_eq_zero.mp hp have : (scaleRoots p s).coeff p.natDegree = 0 := congr_fun (congr_arg (coeff : R[X] → ℕ → R) h) p.natDegree rw [coeff_scaleRoots_natDegree] at this contradiction #align polynomial.scale_roots_ne_zero Polynomial.scaleRoots_ne_zero	Mathlib/RingTheory/Polynomial/ScaleRoots.lean	62	64	theorem support_scaleRoots_le (p : R[X]) (s : R) : (scaleRoots p s).support ≤ p.support := by	intro simpa using left_ne_zero_of_mul
import Mathlib.Algebra.Order.Group.Abs import Mathlib.Algebra.Order.Group.Basic import Mathlib.Algebra.Order.Group.OrderIso import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Data.Int.Cast.Lemmas import Mathlib.Order.Interval.Set.Basic import Mathlib.Logic.Pairwise #align_import data.set.intervals.group from "leanprover-community/mathlib"@"c227d107bbada5d0d9d20287e3282c0a7f1651a0" variable {α : Type} namespace Set section PairwiseDisjoint section OrderedCommGroup variable [OrderedCommGroup α] (a b : α) @[to_additive] theorem pairwise_disjoint_Ioc_mul_zpow : Pairwise (Disjoint on fun n : ℤ => Ioc (a b ^ n) (a * b ^ (n + 1))) := by simp (config := { unfoldPartialApp := true }) only [Function.onFun] simp_rw [Set.disjoint_iff] intro m n hmn x hx apply hmn have hb : 1 < b := by have : a * b ^ m < a * b ^ (m + 1) := hx.1.1.trans_le hx.1.2 rwa [mul_lt_mul_iff_left, ← mul_one (b ^ m), zpow_add_one, mul_lt_mul_iff_left] at this have i1 := hx.1.1.trans_le hx.2.2 have i2 := hx.2.1.trans_le hx.1.2 rw [mul_lt_mul_iff_left, zpow_lt_zpow_iff hb, Int.lt_add_one_iff] at i1 i2 exact le_antisymm i1 i2 #align set.pairwise_disjoint_Ioc_mul_zpow Set.pairwise_disjoint_Ioc_mul_zpow #align set.pairwise_disjoint_Ioc_add_zsmul Set.pairwise_disjoint_Ioc_add_zsmul @[to_additive] theorem pairwise_disjoint_Ico_mul_zpow : Pairwise (Disjoint on fun n : ℤ => Ico (a * b ^ n) (a * b ^ (n + 1))) := by simp (config := { unfoldPartialApp := true }) only [Function.onFun] simp_rw [Set.disjoint_iff] intro m n hmn x hx apply hmn have hb : 1 < b := by have : a * b ^ m < a * b ^ (m + 1) := hx.1.1.trans_lt hx.1.2 rwa [mul_lt_mul_iff_left, ← mul_one (b ^ m), zpow_add_one, mul_lt_mul_iff_left] at this have i1 := hx.1.1.trans_lt hx.2.2 have i2 := hx.2.1.trans_lt hx.1.2 rw [mul_lt_mul_iff_left, zpow_lt_zpow_iff hb, Int.lt_add_one_iff] at i1 i2 exact le_antisymm i1 i2 #align set.pairwise_disjoint_Ico_mul_zpow Set.pairwise_disjoint_Ico_mul_zpow #align set.pairwise_disjoint_Ico_add_zsmul Set.pairwise_disjoint_Ico_add_zsmul @[to_additive] theorem pairwise_disjoint_Ioo_mul_zpow : Pairwise (Disjoint on fun n : ℤ => Ioo (a * b ^ n) (a * b ^ (n + 1))) := fun _ _ hmn => (pairwise_disjoint_Ioc_mul_zpow a b hmn).mono Ioo_subset_Ioc_self Ioo_subset_Ioc_self #align set.pairwise_disjoint_Ioo_mul_zpow Set.pairwise_disjoint_Ioo_mul_zpow #align set.pairwise_disjoint_Ioo_add_zsmul Set.pairwise_disjoint_Ioo_add_zsmul @[to_additive] theorem pairwise_disjoint_Ioc_zpow : Pairwise (Disjoint on fun n : ℤ => Ioc (b ^ n) (b ^ (n + 1))) := by simpa only [one_mul] using pairwise_disjoint_Ioc_mul_zpow 1 b #align set.pairwise_disjoint_Ioc_zpow Set.pairwise_disjoint_Ioc_zpow #align set.pairwise_disjoint_Ioc_zsmul Set.pairwise_disjoint_Ioc_zsmul @[to_additive] theorem pairwise_disjoint_Ico_zpow : Pairwise (Disjoint on fun n : ℤ => Ico (b ^ n) (b ^ (n + 1))) := by simpa only [one_mul] using pairwise_disjoint_Ico_mul_zpow 1 b #align set.pairwise_disjoint_Ico_zpow Set.pairwise_disjoint_Ico_zpow #align set.pairwise_disjoint_Ico_zsmul Set.pairwise_disjoint_Ico_zsmul @[to_additive]	Mathlib/Algebra/Order/Interval/Set/Group.lean	226	228	theorem pairwise_disjoint_Ioo_zpow : Pairwise (Disjoint on fun n : ℤ => Ioo (b ^ n) (b ^ (n + 1))) := by	simpa only [one_mul] using pairwise_disjoint_Ioo_mul_zpow 1 b
import Mathlib.Data.Fintype.Option import Mathlib.Topology.Separation import Mathlib.Topology.Sets.Opens #align_import topology.alexandroff from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" open Set Filter Topology variable {X : Type} def OnePoint (X : Type) := Option X #align alexandroff OnePoint instance [Repr X] : Repr (OnePoint X) := ⟨fun o _ => match o with \| none => "∞" \| some a => "↑" ++ repr a⟩ namespace OnePoint @[match_pattern] def infty : OnePoint X := none #align alexandroff.infty OnePoint.infty @[inherit_doc] scoped notation "∞" => OnePoint.infty @[coe, match_pattern] def some : X → OnePoint X := Option.some instance : CoeTC X (OnePoint X) := ⟨some⟩ instance : Inhabited (OnePoint X) := ⟨∞⟩ instance [Fintype X] : Fintype (OnePoint X) := inferInstanceAs (Fintype (Option X)) instance infinite [Infinite X] : Infinite (OnePoint X) := inferInstanceAs (Infinite (Option X)) #align alexandroff.infinite OnePoint.infinite theorem coe_injective : Function.Injective ((↑) : X → OnePoint X) := Option.some_injective X #align alexandroff.coe_injective OnePoint.coe_injective @[norm_cast] theorem coe_eq_coe {x y : X} : (x : OnePoint X) = y ↔ x = y := coe_injective.eq_iff #align alexandroff.coe_eq_coe OnePoint.coe_eq_coe @[simp] theorem coe_ne_infty (x : X) : (x : OnePoint X) ≠ ∞ := nofun #align alexandroff.coe_ne_infty OnePoint.coe_ne_infty @[simp] theorem infty_ne_coe (x : X) : ∞ ≠ (x : OnePoint X) := nofun #align alexandroff.infty_ne_coe OnePoint.infty_ne_coe @[elab_as_elim] protected def rec {C : OnePoint X → Sort*} (h₁ : C ∞) (h₂ : ∀ x : X, C x) : ∀ z : OnePoint X, C z \| ∞ => h₁ \| (x : X) => h₂ x #align alexandroff.rec OnePoint.rec theorem isCompl_range_coe_infty : IsCompl (range ((↑) : X → OnePoint X)) {∞} := isCompl_range_some_none X #align alexandroff.is_compl_range_coe_infty OnePoint.isCompl_range_coe_infty -- Porting note: moved @[simp] to a new lemma theorem range_coe_union_infty : range ((↑) : X → OnePoint X) ∪ {∞} = univ := range_some_union_none X #align alexandroff.range_coe_union_infty OnePoint.range_coe_union_infty @[simp] theorem insert_infty_range_coe : insert ∞ (range (@some X)) = univ := insert_none_range_some _ @[simp] theorem range_coe_inter_infty : range ((↑) : X → OnePoint X) ∩ {∞} = ∅ := range_some_inter_none X #align alexandroff.range_coe_inter_infty OnePoint.range_coe_inter_infty @[simp] theorem compl_range_coe : (range ((↑) : X → OnePoint X))ᶜ = {∞} := compl_range_some X #align alexandroff.compl_range_coe OnePoint.compl_range_coe theorem compl_infty : ({∞}ᶜ : Set (OnePoint X)) = range ((↑) : X → OnePoint X) := (@isCompl_range_coe_infty X).symm.compl_eq #align alexandroff.compl_infty OnePoint.compl_infty theorem compl_image_coe (s : Set X) : ((↑) '' s : Set (OnePoint X))ᶜ = (↑) '' sᶜ ∪ {∞} := by rw [coe_injective.compl_image_eq, compl_range_coe] #align alexandroff.compl_image_coe OnePoint.compl_image_coe theorem ne_infty_iff_exists {x : OnePoint X} : x ≠ ∞ ↔ ∃ y : X, (y : OnePoint X) = x := by induction x using OnePoint.rec <;> simp #align alexandroff.ne_infty_iff_exists OnePoint.ne_infty_iff_exists instance canLift : CanLift (OnePoint X) X (↑) fun x => x ≠ ∞ := WithTop.canLift #align alexandroff.can_lift OnePoint.canLift theorem not_mem_range_coe_iff {x : OnePoint X} : x ∉ range some ↔ x = ∞ := by rw [← mem_compl_iff, compl_range_coe, mem_singleton_iff] #align alexandroff.not_mem_range_coe_iff OnePoint.not_mem_range_coe_iff theorem infty_not_mem_range_coe : ∞ ∉ range ((↑) : X → OnePoint X) := not_mem_range_coe_iff.2 rfl #align alexandroff.infty_not_mem_range_coe OnePoint.infty_not_mem_range_coe theorem infty_not_mem_image_coe {s : Set X} : ∞ ∉ ((↑) : X → OnePoint X) '' s := not_mem_subset (image_subset_range _ _) infty_not_mem_range_coe #align alexandroff.infty_not_mem_image_coe OnePoint.infty_not_mem_image_coe @[simp] theorem coe_preimage_infty : ((↑) : X → OnePoint X) ⁻¹' {∞} = ∅ := by ext simp #align alexandroff.coe_preimage_infty OnePoint.coe_preimage_infty variable [TopologicalSpace X] instance : TopologicalSpace (OnePoint X) where IsOpen s := (∞ ∈ s → IsCompact (((↑) : X → OnePoint X) ⁻¹' s)ᶜ) ∧ IsOpen (((↑) : X → OnePoint X) ⁻¹' s) isOpen_univ := by simp isOpen_inter s t := by rintro ⟨hms, hs⟩ ⟨hmt, ht⟩ refine ⟨?_, hs.inter ht⟩ rintro ⟨hms', hmt'⟩ simpa [compl_inter] using (hms hms').union (hmt hmt') isOpen_sUnion S ho := by suffices IsOpen ((↑) ⁻¹' ⋃₀ S : Set X) by refine ⟨?_, this⟩ rintro ⟨s, hsS : s ∈ S, hs : ∞ ∈ s⟩ refine IsCompact.of_isClosed_subset ((ho s hsS).1 hs) this.isClosed_compl ?_ exact compl_subset_compl.mpr (preimage_mono <\| subset_sUnion_of_mem hsS) rw [preimage_sUnion] exact isOpen_biUnion fun s hs => (ho s hs).2 variable {s : Set (OnePoint X)} {t : Set X} theorem isOpen_def : IsOpen s ↔ (∞ ∈ s → IsCompact ((↑) ⁻¹' s : Set X)ᶜ) ∧ IsOpen ((↑) ⁻¹' s : Set X) := Iff.rfl #align alexandroff.is_open_def OnePoint.isOpen_def theorem isOpen_iff_of_mem' (h : ∞ ∈ s) : IsOpen s ↔ IsCompact ((↑) ⁻¹' s : Set X)ᶜ ∧ IsOpen ((↑) ⁻¹' s : Set X) := by simp [isOpen_def, h] #align alexandroff.is_open_iff_of_mem' OnePoint.isOpen_iff_of_mem' theorem isOpen_iff_of_mem (h : ∞ ∈ s) : IsOpen s ↔ IsClosed ((↑) ⁻¹' s : Set X)ᶜ ∧ IsCompact ((↑) ⁻¹' s : Set X)ᶜ := by simp only [isOpen_iff_of_mem' h, isClosed_compl_iff, and_comm] #align alexandroff.is_open_iff_of_mem OnePoint.isOpen_iff_of_mem theorem isOpen_iff_of_not_mem (h : ∞ ∉ s) : IsOpen s ↔ IsOpen ((↑) ⁻¹' s : Set X) := by simp [isOpen_def, h] #align alexandroff.is_open_iff_of_not_mem OnePoint.isOpen_iff_of_not_mem	Mathlib/Topology/Compactification/OnePoint.lean	225	227	theorem isClosed_iff_of_mem (h : ∞ ∈ s) : IsClosed s ↔ IsClosed ((↑) ⁻¹' s : Set X) := by	have : ∞ ∉ sᶜ := fun H => H h rw [← isOpen_compl_iff, isOpen_iff_of_not_mem this, ← isOpen_compl_iff, preimage_compl]
import Mathlib.Geometry.Euclidean.Angle.Oriented.Affine import Mathlib.Geometry.Euclidean.Angle.Unoriented.RightAngle #align_import geometry.euclidean.angle.oriented.right_angle from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" noncomputable section open scoped EuclideanGeometry open scoped Real open scoped RealInnerProductSpace namespace Orientation open FiniteDimensional variable {V : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] variable [hd2 : Fact (finrank ℝ V = 2)] (o : Orientation ℝ V (Fin 2)) theorem oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle x (x + y) = Real.arccos (‖x‖ / ‖x + y‖) := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_add_eq_arccos_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two theorem oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x + y) y = Real.arccos (‖y‖ / ‖x + y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two h #align orientation.oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two theorem oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle x (x + y) = Real.arcsin (‖y‖ / ‖x + y‖) := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_add_eq_arcsin_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two theorem oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x + y) y = Real.arcsin (‖x‖ / ‖x + y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two h #align orientation.oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two theorem oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle x (x + y) = Real.arctan (‖y‖ / ‖x‖) := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_add_eq_arctan_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (o.left_ne_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two theorem oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x + y) y = Real.arctan (‖x‖ / ‖y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two h #align orientation.oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two theorem cos_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle x (x + y)) = ‖x‖ / ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, InnerProductGeometry.cos_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.cos_oangle_add_right_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_right_of_oangle_eq_pi_div_two theorem cos_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle (x + y) y) = ‖y‖ / ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).cos_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.cos_oangle_add_left_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_left_of_oangle_eq_pi_div_two theorem sin_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle x (x + y)) = ‖y‖ / ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, InnerProductGeometry.sin_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.sin_oangle_add_right_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_right_of_oangle_eq_pi_div_two theorem sin_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle (x + y) y) = ‖x‖ / ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).sin_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.sin_oangle_add_left_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_left_of_oangle_eq_pi_div_two theorem tan_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle x (x + y)) = ‖y‖ / ‖x‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, InnerProductGeometry.tan_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.tan_oangle_add_right_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_right_of_oangle_eq_pi_div_two theorem tan_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle (x + y) y) = ‖x‖ / ‖y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).tan_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.tan_oangle_add_left_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_left_of_oangle_eq_pi_div_two theorem cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle x (x + y)) ‖x + y‖ = ‖x‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, InnerProductGeometry.cos_angle_add_mul_norm_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two theorem cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle (x + y) y) * ‖x + y‖ = ‖y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h #align orientation.cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two theorem sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle x (x + y)) * ‖x + y‖ = ‖y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, InnerProductGeometry.sin_angle_add_mul_norm_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two theorem sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle (x + y) y) * ‖x + y‖ = ‖x‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h #align orientation.sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two theorem tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle x (x + y)) * ‖x‖ = ‖y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, InnerProductGeometry.tan_angle_add_mul_norm_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two theorem tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle (x + y) y) * ‖y‖ = ‖x‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h #align orientation.tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two theorem norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.cos (o.oangle x (x + y)) = ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, InnerProductGeometry.norm_div_cos_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two theorem norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.cos (o.oangle (x + y) y) = ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two theorem norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.sin (o.oangle x (x + y)) = ‖x + y‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, InnerProductGeometry.norm_div_sin_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inr (o.right_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two theorem norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.sin (o.oangle (x + y) y) = ‖x + y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two theorem norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.tan (o.oangle x (x + y)) = ‖x‖ := by have hs : (o.oangle x (x + y)).sign = 1 := by rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, InnerProductGeometry.norm_div_tan_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h) (Or.inr (o.right_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two theorem norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.tan (o.oangle (x + y) y) = ‖y‖ := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ rw [add_comm] exact (-o).norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two h #align orientation.norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two theorem oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle y (y - x) = Real.arccos (‖y‖ / ‖y - x‖) := by have hs : (o.oangle y (y - x)).sign = 1 := by rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_sub_eq_arccos_of_inner_eq_zero (o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two theorem oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x - y) x = Real.arccos (‖x‖ / ‖x - y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ exact (-o).oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two h #align orientation.oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two theorem oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle y (y - x) = Real.arcsin (‖x‖ / ‖y - x‖) := by have hs : (o.oangle y (y - x)).sign = 1 := by rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_sub_eq_arcsin_of_inner_eq_zero (o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h) (Or.inl (o.right_ne_zero_of_oangle_eq_pi_div_two h))] #align orientation.oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two theorem oangle_sub_left_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x - y) x = Real.arcsin (‖y‖ / ‖x - y‖) := by rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ exact (-o).oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two h #align orientation.oangle_sub_left_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_sub_left_eq_arcsin_of_oangle_eq_pi_div_two theorem oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle y (y - x) = Real.arctan (‖x‖ / ‖y‖) := by have hs : (o.oangle y (y - x)).sign = 1 := by rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two] rw [o.oangle_eq_angle_of_sign_eq_one hs, InnerProductGeometry.angle_sub_eq_arctan_of_inner_eq_zero (o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h) (o.right_ne_zero_of_oangle_eq_pi_div_two h)] #align orientation.oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two	Mathlib/Geometry/Euclidean/Angle/Oriented/RightAngle.lean	312	315	theorem oangle_sub_left_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) : o.oangle (x - y) x = Real.arctan (‖y‖ / ‖x‖) := by	rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢ exact (-o).oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two h
import Mathlib.Topology.Algebra.Constructions import Mathlib.Topology.Bases import Mathlib.Topology.UniformSpace.Basic #align_import topology.uniform_space.cauchy from "leanprover-community/mathlib"@"22131150f88a2d125713ffa0f4693e3355b1eb49" universe u v open scoped Classical open Filter TopologicalSpace Set UniformSpace Function open scoped Classical open Uniformity Topology Filter variable {α : Type u} {β : Type v} [uniformSpace : UniformSpace α] def Cauchy (f : Filter α) := NeBot f ∧ f ×ˢ f ≤ 𝓤 α #align cauchy Cauchy def IsComplete (s : Set α) := ∀ f, Cauchy f → f ≤ 𝓟 s → ∃ x ∈ s, f ≤ 𝓝 x #align is_complete IsComplete theorem Filter.HasBasis.cauchy_iff {ι} {p : ι → Prop} {s : ι → Set (α × α)} (h : (𝓤 α).HasBasis p s) {f : Filter α} : Cauchy f ↔ NeBot f ∧ ∀ i, p i → ∃ t ∈ f, ∀ x ∈ t, ∀ y ∈ t, (x, y) ∈ s i := and_congr Iff.rfl <\| (f.basis_sets.prod_self.le_basis_iff h).trans <\| by simp only [subset_def, Prod.forall, mem_prod_eq, and_imp, id, forall_mem_comm] #align filter.has_basis.cauchy_iff Filter.HasBasis.cauchy_iff theorem cauchy_iff' {f : Filter α} : Cauchy f ↔ NeBot f ∧ ∀ s ∈ 𝓤 α, ∃ t ∈ f, ∀ x ∈ t, ∀ y ∈ t, (x, y) ∈ s := (𝓤 α).basis_sets.cauchy_iff #align cauchy_iff' cauchy_iff' theorem cauchy_iff {f : Filter α} : Cauchy f ↔ NeBot f ∧ ∀ s ∈ 𝓤 α, ∃ t ∈ f, t ×ˢ t ⊆ s := cauchy_iff'.trans <\| by simp only [subset_def, Prod.forall, mem_prod_eq, and_imp, id, forall_mem_comm] #align cauchy_iff cauchy_iff lemma cauchy_iff_le {l : Filter α} [hl : l.NeBot] : Cauchy l ↔ l ×ˢ l ≤ 𝓤 α := by simp only [Cauchy, hl, true_and] theorem Cauchy.ultrafilter_of {l : Filter α} (h : Cauchy l) : Cauchy (@Ultrafilter.of _ l h.1 : Filter α) := by haveI := h.1 have := Ultrafilter.of_le l exact ⟨Ultrafilter.neBot _, (Filter.prod_mono this this).trans h.2⟩ #align cauchy.ultrafilter_of Cauchy.ultrafilter_of theorem cauchy_map_iff {l : Filter β} {f : β → α} : Cauchy (l.map f) ↔ NeBot l ∧ Tendsto (fun p : β × β => (f p.1, f p.2)) (l ×ˢ l) (𝓤 α) := by rw [Cauchy, map_neBot_iff, prod_map_map_eq, Tendsto] #align cauchy_map_iff cauchy_map_iff theorem cauchy_map_iff' {l : Filter β} [hl : NeBot l] {f : β → α} : Cauchy (l.map f) ↔ Tendsto (fun p : β × β => (f p.1, f p.2)) (l ×ˢ l) (𝓤 α) := cauchy_map_iff.trans <\| and_iff_right hl #align cauchy_map_iff' cauchy_map_iff' theorem Cauchy.mono {f g : Filter α} [hg : NeBot g] (h_c : Cauchy f) (h_le : g ≤ f) : Cauchy g := ⟨hg, le_trans (Filter.prod_mono h_le h_le) h_c.right⟩ #align cauchy.mono Cauchy.mono theorem Cauchy.mono' {f g : Filter α} (h_c : Cauchy f) (_ : NeBot g) (h_le : g ≤ f) : Cauchy g := h_c.mono h_le #align cauchy.mono' Cauchy.mono' theorem cauchy_nhds {a : α} : Cauchy (𝓝 a) := ⟨nhds_neBot, nhds_prod_eq.symm.trans_le (nhds_le_uniformity a)⟩ #align cauchy_nhds cauchy_nhds theorem cauchy_pure {a : α} : Cauchy (pure a) := cauchy_nhds.mono (pure_le_nhds a) #align cauchy_pure cauchy_pure theorem Filter.Tendsto.cauchy_map {l : Filter β} [NeBot l] {f : β → α} {a : α} (h : Tendsto f l (𝓝 a)) : Cauchy (map f l) := cauchy_nhds.mono h #align filter.tendsto.cauchy_map Filter.Tendsto.cauchy_map lemma Cauchy.mono_uniformSpace {u v : UniformSpace β} {F : Filter β} (huv : u ≤ v) (hF : Cauchy (uniformSpace := u) F) : Cauchy (uniformSpace := v) F := ⟨hF.1, hF.2.trans huv⟩ lemma cauchy_inf_uniformSpace {u v : UniformSpace β} {F : Filter β} : Cauchy (uniformSpace := u ⊓ v) F ↔ Cauchy (uniformSpace := u) F ∧ Cauchy (uniformSpace := v) F := by unfold Cauchy rw [inf_uniformity (u := u), le_inf_iff, and_and_left] lemma cauchy_iInf_uniformSpace {ι : Sort} [Nonempty ι] {u : ι → UniformSpace β} {l : Filter β} : Cauchy (uniformSpace := ⨅ i, u i) l ↔ ∀ i, Cauchy (uniformSpace := u i) l := by unfold Cauchy rw [iInf_uniformity, le_iInf_iff, forall_and, forall_const] lemma cauchy_iInf_uniformSpace' {ι : Sort} {u : ι → UniformSpace β} {l : Filter β} [l.NeBot] : Cauchy (uniformSpace := ⨅ i, u i) l ↔ ∀ i, Cauchy (uniformSpace := u i) l := by simp_rw [cauchy_iff_le (uniformSpace := _), iInf_uniformity, le_iInf_iff] lemma cauchy_comap_uniformSpace {u : UniformSpace β} {f : α → β} {l : Filter α} : Cauchy (uniformSpace := comap f u) l ↔ Cauchy (map f l) := by simp only [Cauchy, map_neBot_iff, prod_map_map_eq, map_le_iff_le_comap] rfl lemma cauchy_prod_iff [UniformSpace β] {F : Filter (α × β)} : Cauchy F ↔ Cauchy (map Prod.fst F) ∧ Cauchy (map Prod.snd F) := by simp_rw [instUniformSpaceProd, ← cauchy_comap_uniformSpace, ← cauchy_inf_uniformSpace] theorem Cauchy.prod [UniformSpace β] {f : Filter α} {g : Filter β} (hf : Cauchy f) (hg : Cauchy g) : Cauchy (f ×ˢ g) := by have := hf.1; have := hg.1 simpa [cauchy_prod_iff, hf.1] using ⟨hf, hg⟩ #align cauchy.prod Cauchy.prod theorem le_nhds_of_cauchy_adhp_aux {f : Filter α} {x : α} (adhs : ∀ s ∈ 𝓤 α, ∃ t ∈ f, t ×ˢ t ⊆ s ∧ ∃ y, (x, y) ∈ s ∧ y ∈ t) : f ≤ 𝓝 x := by -- Consider a neighborhood `s` of `x` intro s hs -- Take an entourage twice smaller than `s` rcases comp_mem_uniformity_sets (mem_nhds_uniformity_iff_right.1 hs) with ⟨U, U_mem, hU⟩ -- Take a set `t ∈ f`, `t × t ⊆ U`, and a point `y ∈ t` such that `(x, y) ∈ U` rcases adhs U U_mem with ⟨t, t_mem, ht, y, hxy, hy⟩ apply mem_of_superset t_mem -- Given a point `z ∈ t`, we have `(x, y) ∈ U` and `(y, z) ∈ t × t ⊆ U`, hence `z ∈ s` exact fun z hz => hU (prod_mk_mem_compRel hxy (ht <\| mk_mem_prod hy hz)) rfl #align le_nhds_of_cauchy_adhp_aux le_nhds_of_cauchy_adhp_aux theorem le_nhds_of_cauchy_adhp {f : Filter α} {x : α} (hf : Cauchy f) (adhs : ClusterPt x f) : f ≤ 𝓝 x := le_nhds_of_cauchy_adhp_aux (fun s hs => by obtain ⟨t, t_mem, ht⟩ : ∃ t ∈ f, t ×ˢ t ⊆ s := (cauchy_iff.1 hf).2 s hs use t, t_mem, ht exact forall_mem_nonempty_iff_neBot.2 adhs _ (inter_mem_inf (mem_nhds_left x hs) t_mem)) #align le_nhds_of_cauchy_adhp le_nhds_of_cauchy_adhp theorem le_nhds_iff_adhp_of_cauchy {f : Filter α} {x : α} (hf : Cauchy f) : f ≤ 𝓝 x ↔ ClusterPt x f := ⟨fun h => ClusterPt.of_le_nhds' h hf.1, le_nhds_of_cauchy_adhp hf⟩ #align le_nhds_iff_adhp_of_cauchy le_nhds_iff_adhp_of_cauchy nonrec theorem Cauchy.map [UniformSpace β] {f : Filter α} {m : α → β} (hf : Cauchy f) (hm : UniformContinuous m) : Cauchy (map m f) := ⟨hf.1.map _, calc map m f ×ˢ map m f = map (Prod.map m m) (f ×ˢ f) := Filter.prod_map_map_eq _ ≤ Filter.map (Prod.map m m) (𝓤 α) := map_mono hf.right _ ≤ 𝓤 β := hm⟩ #align cauchy.map Cauchy.map nonrec theorem Cauchy.comap [UniformSpace β] {f : Filter β} {m : α → β} (hf : Cauchy f) (hm : comap (fun p : α × α => (m p.1, m p.2)) (𝓤 β) ≤ 𝓤 α) [NeBot (comap m f)] : Cauchy (comap m f) := ⟨‹_›, calc comap m f ×ˢ comap m f = comap (Prod.map m m) (f ×ˢ f) := prod_comap_comap_eq _ ≤ comap (Prod.map m m) (𝓤 β) := comap_mono hf.right _ ≤ 𝓤 α := hm⟩ #align cauchy.comap Cauchy.comap theorem Cauchy.comap' [UniformSpace β] {f : Filter β} {m : α → β} (hf : Cauchy f) (hm : Filter.comap (fun p : α × α => (m p.1, m p.2)) (𝓤 β) ≤ 𝓤 α) (_ : NeBot (Filter.comap m f)) : Cauchy (Filter.comap m f) := hf.comap hm #align cauchy.comap' Cauchy.comap' def CauchySeq [Preorder β] (u : β → α) := Cauchy (atTop.map u) #align cauchy_seq CauchySeq theorem CauchySeq.tendsto_uniformity [Preorder β] {u : β → α} (h : CauchySeq u) : Tendsto (Prod.map u u) atTop (𝓤 α) := by simpa only [Tendsto, prod_map_map_eq', prod_atTop_atTop_eq] using h.right #align cauchy_seq.tendsto_uniformity CauchySeq.tendsto_uniformity theorem CauchySeq.nonempty [Preorder β] {u : β → α} (hu : CauchySeq u) : Nonempty β := @nonempty_of_neBot _ _ <\| (map_neBot_iff _).1 hu.1 #align cauchy_seq.nonempty CauchySeq.nonempty theorem CauchySeq.mem_entourage {β : Type*} [SemilatticeSup β] {u : β → α} (h : CauchySeq u) {V : Set (α × α)} (hV : V ∈ 𝓤 α) : ∃ k₀, ∀ i j, k₀ ≤ i → k₀ ≤ j → (u i, u j) ∈ V := by haveI := h.nonempty have := h.tendsto_uniformity; rw [← prod_atTop_atTop_eq] at this simpa [MapsTo] using atTop_basis.prod_self.tendsto_left_iff.1 this V hV #align cauchy_seq.mem_entourage CauchySeq.mem_entourage theorem Filter.Tendsto.cauchySeq [SemilatticeSup β] [Nonempty β] {f : β → α} {x} (hx : Tendsto f atTop (𝓝 x)) : CauchySeq f := hx.cauchy_map #align filter.tendsto.cauchy_seq Filter.Tendsto.cauchySeq theorem cauchySeq_const [SemilatticeSup β] [Nonempty β] (x : α) : CauchySeq fun _ : β => x := tendsto_const_nhds.cauchySeq #align cauchy_seq_const cauchySeq_const theorem cauchySeq_iff_tendsto [Nonempty β] [SemilatticeSup β] {u : β → α} : CauchySeq u ↔ Tendsto (Prod.map u u) atTop (𝓤 α) := cauchy_map_iff'.trans <\| by simp only [prod_atTop_atTop_eq, Prod.map_def] #align cauchy_seq_iff_tendsto cauchySeq_iff_tendsto theorem CauchySeq.comp_tendsto {γ} [Preorder β] [SemilatticeSup γ] [Nonempty γ] {f : β → α} (hf : CauchySeq f) {g : γ → β} (hg : Tendsto g atTop atTop) : CauchySeq (f ∘ g) := ⟨inferInstance, le_trans (prod_le_prod.mpr ⟨Tendsto.comp le_rfl hg, Tendsto.comp le_rfl hg⟩) hf.2⟩ #align cauchy_seq.comp_tendsto CauchySeq.comp_tendsto theorem CauchySeq.comp_injective [SemilatticeSup β] [NoMaxOrder β] [Nonempty β] {u : ℕ → α} (hu : CauchySeq u) {f : β → ℕ} (hf : Injective f) : CauchySeq (u ∘ f) := hu.comp_tendsto <\| Nat.cofinite_eq_atTop ▸ hf.tendsto_cofinite.mono_left atTop_le_cofinite #align cauchy_seq.comp_injective CauchySeq.comp_injective theorem Function.Bijective.cauchySeq_comp_iff {f : ℕ → ℕ} (hf : Bijective f) (u : ℕ → α) : CauchySeq (u ∘ f) ↔ CauchySeq u := by refine ⟨fun H => ?_, fun H => H.comp_injective hf.injective⟩ lift f to ℕ ≃ ℕ using hf simpa only [(· ∘ ·), f.apply_symm_apply] using H.comp_injective f.symm.injective #align function.bijective.cauchy_seq_comp_iff Function.Bijective.cauchySeq_comp_iff	Mathlib/Topology/UniformSpace/Cauchy.lean	249	253	theorem CauchySeq.subseq_subseq_mem {V : ℕ → Set (α × α)} (hV : ∀ n, V n ∈ 𝓤 α) {u : ℕ → α} (hu : CauchySeq u) {f g : ℕ → ℕ} (hf : Tendsto f atTop atTop) (hg : Tendsto g atTop atTop) : ∃ φ : ℕ → ℕ, StrictMono φ ∧ ∀ n, ((u ∘ f ∘ φ) n, (u ∘ g ∘ φ) n) ∈ V n := by	rw [cauchySeq_iff_tendsto] at hu exact ((hu.comp <\| hf.prod_atTop hg).comp tendsto_atTop_diagonal).subseq_mem hV
import Mathlib.Algebra.BigOperators.Fin import Mathlib.Algebra.BigOperators.NatAntidiagonal import Mathlib.Algebra.CharZero.Lemmas import Mathlib.Data.Finset.NatAntidiagonal import Mathlib.Data.Nat.Choose.Central import Mathlib.Data.Tree.Basic import Mathlib.Tactic.FieldSimp import Mathlib.Tactic.GCongr import Mathlib.Tactic.Positivity #align_import combinatorics.catalan from "leanprover-community/mathlib"@"26b40791e4a5772a4e53d0e28e4df092119dc7da" open Finset open Finset.antidiagonal (fst_le snd_le) def catalan : ℕ → ℕ \| 0 => 1 \| n + 1 => ∑ i : Fin n.succ, catalan i * catalan (n - i) #align catalan catalan @[simp] theorem catalan_zero : catalan 0 = 1 := by rw [catalan] #align catalan_zero catalan_zero	Mathlib/Combinatorics/Enumerative/Catalan.lean	68	69	theorem catalan_succ (n : ℕ) : catalan (n + 1) = ∑ i : Fin n.succ, catalan i * catalan (n - i) := by	rw [catalan]
import Mathlib.Topology.Compactness.SigmaCompact import Mathlib.Topology.Connected.TotallyDisconnected import Mathlib.Topology.Inseparable #align_import topology.separation from "leanprover-community/mathlib"@"d91e7f7a7f1c7e9f0e18fdb6bde4f652004c735d" open Function Set Filter Topology TopologicalSpace open scoped Classical universe u v variable {X : Type} {Y : Type} [TopologicalSpace X] section Separation def SeparatedNhds : Set X → Set X → Prop := fun s t : Set X => ∃ U V : Set X, IsOpen U ∧ IsOpen V ∧ s ⊆ U ∧ t ⊆ V ∧ Disjoint U V #align separated_nhds SeparatedNhds theorem separatedNhds_iff_disjoint {s t : Set X} : SeparatedNhds s t ↔ Disjoint (𝓝ˢ s) (𝓝ˢ t) := by simp only [(hasBasis_nhdsSet s).disjoint_iff (hasBasis_nhdsSet t), SeparatedNhds, exists_prop, ← exists_and_left, and_assoc, and_comm, and_left_comm] #align separated_nhds_iff_disjoint separatedNhds_iff_disjoint alias ⟨SeparatedNhds.disjoint_nhdsSet, _⟩ := separatedNhds_iff_disjoint class T0Space (X : Type u) [TopologicalSpace X] : Prop where t0 : ∀ ⦃x y : X⦄, Inseparable x y → x = y #align t0_space T0Space theorem t0Space_iff_inseparable (X : Type u) [TopologicalSpace X] : T0Space X ↔ ∀ x y : X, Inseparable x y → x = y := ⟨fun ⟨h⟩ => h, fun h => ⟨h⟩⟩ #align t0_space_iff_inseparable t0Space_iff_inseparable theorem t0Space_iff_not_inseparable (X : Type u) [TopologicalSpace X] : T0Space X ↔ Pairwise fun x y : X => ¬Inseparable x y := by simp only [t0Space_iff_inseparable, Ne, not_imp_not, Pairwise] #align t0_space_iff_not_inseparable t0Space_iff_not_inseparable theorem Inseparable.eq [T0Space X] {x y : X} (h : Inseparable x y) : x = y := T0Space.t0 h #align inseparable.eq Inseparable.eq protected theorem Inducing.injective [TopologicalSpace Y] [T0Space X] {f : X → Y} (hf : Inducing f) : Injective f := fun _ _ h => (hf.inseparable_iff.1 <\| .of_eq h).eq #align inducing.injective Inducing.injective protected theorem Inducing.embedding [TopologicalSpace Y] [T0Space X] {f : X → Y} (hf : Inducing f) : Embedding f := ⟨hf, hf.injective⟩ #align inducing.embedding Inducing.embedding lemma embedding_iff_inducing [TopologicalSpace Y] [T0Space X] {f : X → Y} : Embedding f ↔ Inducing f := ⟨Embedding.toInducing, Inducing.embedding⟩ #align embedding_iff_inducing embedding_iff_inducing theorem t0Space_iff_nhds_injective (X : Type u) [TopologicalSpace X] : T0Space X ↔ Injective (𝓝 : X → Filter X) := t0Space_iff_inseparable X #align t0_space_iff_nhds_injective t0Space_iff_nhds_injective theorem nhds_injective [T0Space X] : Injective (𝓝 : X → Filter X) := (t0Space_iff_nhds_injective X).1 ‹_› #align nhds_injective nhds_injective theorem inseparable_iff_eq [T0Space X] {x y : X} : Inseparable x y ↔ x = y := nhds_injective.eq_iff #align inseparable_iff_eq inseparable_iff_eq @[simp] theorem nhds_eq_nhds_iff [T0Space X] {a b : X} : 𝓝 a = 𝓝 b ↔ a = b := nhds_injective.eq_iff #align nhds_eq_nhds_iff nhds_eq_nhds_iff @[simp] theorem inseparable_eq_eq [T0Space X] : Inseparable = @Eq X := funext₂ fun _ _ => propext inseparable_iff_eq #align inseparable_eq_eq inseparable_eq_eq theorem TopologicalSpace.IsTopologicalBasis.inseparable_iff {b : Set (Set X)} (hb : IsTopologicalBasis b) {x y : X} : Inseparable x y ↔ ∀ s ∈ b, (x ∈ s ↔ y ∈ s) := ⟨fun h s hs ↦ inseparable_iff_forall_open.1 h _ (hb.isOpen hs), fun h ↦ hb.nhds_hasBasis.eq_of_same_basis <\| by convert hb.nhds_hasBasis using 2 exact and_congr_right (h _)⟩ theorem TopologicalSpace.IsTopologicalBasis.eq_iff [T0Space X] {b : Set (Set X)} (hb : IsTopologicalBasis b) {x y : X} : x = y ↔ ∀ s ∈ b, (x ∈ s ↔ y ∈ s) := inseparable_iff_eq.symm.trans hb.inseparable_iff theorem t0Space_iff_exists_isOpen_xor'_mem (X : Type u) [TopologicalSpace X] : T0Space X ↔ Pairwise fun x y => ∃ U : Set X, IsOpen U ∧ Xor' (x ∈ U) (y ∈ U) := by simp only [t0Space_iff_not_inseparable, xor_iff_not_iff, not_forall, exists_prop, inseparable_iff_forall_open, Pairwise] #align t0_space_iff_exists_is_open_xor_mem t0Space_iff_exists_isOpen_xor'_mem theorem exists_isOpen_xor'_mem [T0Space X] {x y : X} (h : x ≠ y) : ∃ U : Set X, IsOpen U ∧ Xor' (x ∈ U) (y ∈ U) := (t0Space_iff_exists_isOpen_xor'_mem X).1 ‹_› h #align exists_is_open_xor_mem exists_isOpen_xor'_mem def specializationOrder (X) [TopologicalSpace X] [T0Space X] : PartialOrder X := { specializationPreorder X, PartialOrder.lift (OrderDual.toDual ∘ 𝓝) nhds_injective with } #align specialization_order specializationOrder instance SeparationQuotient.instT0Space : T0Space (SeparationQuotient X) := ⟨fun x y => Quotient.inductionOn₂' x y fun _ _ h => SeparationQuotient.mk_eq_mk.2 <\| SeparationQuotient.inducing_mk.inseparable_iff.1 h⟩ theorem minimal_nonempty_closed_subsingleton [T0Space X] {s : Set X} (hs : IsClosed s) (hmin : ∀ t, t ⊆ s → t.Nonempty → IsClosed t → t = s) : s.Subsingleton := by clear Y -- Porting note: added refine fun x hx y hy => of_not_not fun hxy => ?_ rcases exists_isOpen_xor'_mem hxy with ⟨U, hUo, hU⟩ wlog h : x ∈ U ∧ y ∉ U · refine this hs hmin y hy x hx (Ne.symm hxy) U hUo hU.symm (hU.resolve_left h) cases' h with hxU hyU have : s \ U = s := hmin (s \ U) diff_subset ⟨y, hy, hyU⟩ (hs.sdiff hUo) exact (this.symm.subset hx).2 hxU #align minimal_nonempty_closed_subsingleton minimal_nonempty_closed_subsingleton theorem minimal_nonempty_closed_eq_singleton [T0Space X] {s : Set X} (hs : IsClosed s) (hne : s.Nonempty) (hmin : ∀ t, t ⊆ s → t.Nonempty → IsClosed t → t = s) : ∃ x, s = {x} := exists_eq_singleton_iff_nonempty_subsingleton.2 ⟨hne, minimal_nonempty_closed_subsingleton hs hmin⟩ #align minimal_nonempty_closed_eq_singleton minimal_nonempty_closed_eq_singleton	Mathlib/Topology/Separation.lean	301	305	theorem IsClosed.exists_closed_singleton [T0Space X] [CompactSpace X] {S : Set X} (hS : IsClosed S) (hne : S.Nonempty) : ∃ x : X, x ∈ S ∧ IsClosed ({x} : Set X) := by	obtain ⟨V, Vsub, Vne, Vcls, hV⟩ := hS.exists_minimal_nonempty_closed_subset hne rcases minimal_nonempty_closed_eq_singleton Vcls Vne hV with ⟨x, rfl⟩ exact ⟨x, Vsub (mem_singleton x), Vcls⟩
import Mathlib.MeasureTheory.Decomposition.RadonNikodym import Mathlib.MeasureTheory.Measure.Haar.OfBasis import Mathlib.Probability.Independence.Basic #align_import probability.density from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" open scoped Classical MeasureTheory NNReal ENNReal open TopologicalSpace MeasureTheory.Measure noncomputable section namespace MeasureTheory variable {Ω E : Type*} [MeasurableSpace E] class HasPDF {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) : Prop where pdf' : AEMeasurable X ℙ ∧ (map X ℙ).HaveLebesgueDecomposition μ ∧ map X ℙ ≪ μ #align measure_theory.has_pdf MeasureTheory.HasPDF def pdf {_ : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) : E → ℝ≥0∞ := (map X ℙ).rnDeriv μ #align measure_theory.pdf MeasureTheory.pdf theorem pdf_def {_ : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} {X : Ω → E} : pdf X ℙ μ = (map X ℙ).rnDeriv μ := rfl theorem pdf_of_not_aemeasurable {_ : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} {X : Ω → E} (hX : ¬AEMeasurable X ℙ) : pdf X ℙ μ =ᵐ[μ] 0 := by rw [pdf_def, map_of_not_aemeasurable hX] exact rnDeriv_zero μ #align measure_theory.pdf_eq_zero_of_not_measurable MeasureTheory.pdf_of_not_aemeasurable theorem pdf_of_not_haveLebesgueDecomposition {_ : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} {X : Ω → E} (h : ¬(map X ℙ).HaveLebesgueDecomposition μ) : pdf X ℙ μ = 0 := rnDeriv_of_not_haveLebesgueDecomposition h theorem aemeasurable_of_pdf_ne_zero {m : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} (X : Ω → E) (h : ¬pdf X ℙ μ =ᵐ[μ] 0) : AEMeasurable X ℙ := by contrapose! h exact pdf_of_not_aemeasurable h #align measure_theory.measurable_of_pdf_ne_zero MeasureTheory.aemeasurable_of_pdf_ne_zero theorem hasPDF_of_pdf_ne_zero {m : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} {X : Ω → E} (hac : map X ℙ ≪ μ) (hpdf : ¬pdf X ℙ μ =ᵐ[μ] 0) : HasPDF X ℙ μ := by refine ⟨?_, ?_, hac⟩ · exact aemeasurable_of_pdf_ne_zero X hpdf · contrapose! hpdf have := pdf_of_not_haveLebesgueDecomposition hpdf filter_upwards using congrFun this #align measure_theory.has_pdf_of_pdf_ne_zero MeasureTheory.hasPDF_of_pdf_ne_zero @[measurability]	Mathlib/Probability/Density.lean	168	170	theorem measurable_pdf {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω) (μ : Measure E := by	volume_tac) : Measurable (pdf X ℙ μ) := by exact measurable_rnDeriv _ _
import Mathlib.Analysis.SpecificLimits.Basic import Mathlib.Analysis.RCLike.Basic open Set Algebra Filter open scoped Topology variable (𝕜 : Type*) [RCLike 𝕜]	Mathlib/Analysis/SpecificLimits/RCLike.lean	19	22	theorem RCLike.tendsto_inverse_atTop_nhds_zero_nat : Tendsto (fun n : ℕ => (n : 𝕜)⁻¹) atTop (𝓝 0) := by	convert tendsto_algebraMap_inverse_atTop_nhds_zero_nat 𝕜 simp
import Mathlib.AlgebraicTopology.DoldKan.FunctorN #align_import algebraic_topology.dold_kan.normalized from "leanprover-community/mathlib"@"32a7e535287f9c73f2e4d2aef306a39190f0b504" open CategoryTheory CategoryTheory.Category CategoryTheory.Limits CategoryTheory.Subobject CategoryTheory.Idempotents DoldKan noncomputable section namespace AlgebraicTopology namespace DoldKan universe v variable {A : Type*} [Category A] [Abelian A] {X : SimplicialObject A} theorem HigherFacesVanish.inclusionOfMooreComplexMap (n : ℕ) : HigherFacesVanish (n + 1) ((inclusionOfMooreComplexMap X).f (n + 1)) := fun j _ => by dsimp [AlgebraicTopology.inclusionOfMooreComplexMap, NormalizedMooreComplex.objX] rw [← factorThru_arrow _ _ (finset_inf_arrow_factors Finset.univ _ j (by simp only [Finset.mem_univ])), assoc, kernelSubobject_arrow_comp, comp_zero] set_option linter.uppercaseLean3 false in #align algebraic_topology.dold_kan.higher_faces_vanish.inclusion_of_Moore_complex_map AlgebraicTopology.DoldKan.HigherFacesVanish.inclusionOfMooreComplexMap	Mathlib/AlgebraicTopology/DoldKan/Normalized.lean	52	59	theorem factors_normalizedMooreComplex_PInfty (n : ℕ) : Subobject.Factors (NormalizedMooreComplex.objX X n) (PInfty.f n) := by	rcases n with _\|n · apply top_factors · rw [PInfty_f, NormalizedMooreComplex.objX, finset_inf_factors] intro i _ apply kernelSubobject_factors exact (HigherFacesVanish.of_P (n + 1) n) i le_add_self
import Mathlib.Algebra.Group.Hom.Defs #align_import algebra.group.ext from "leanprover-community/mathlib"@"e574b1a4e891376b0ef974b926da39e05da12a06" assert_not_exists MonoidWithZero assert_not_exists DenselyOrdered open Function universe u @[to_additive (attr := ext)] theorem Monoid.ext {M : Type u} ⦃m₁ m₂ : Monoid M⦄ (h_mul : (letI := m₁; HMul.hMul : M → M → M) = (letI := m₂; HMul.hMul : M → M → M)) : m₁ = m₂ := by have : m₁.toMulOneClass = m₂.toMulOneClass := MulOneClass.ext h_mul have h₁ : m₁.one = m₂.one := congr_arg (·.one) this let f : @MonoidHom M M m₁.toMulOneClass m₂.toMulOneClass := @MonoidHom.mk _ _ (_) _ (@OneHom.mk _ _ (_) _ id h₁) (fun x y => congr_fun (congr_fun h_mul x) y) have : m₁.npow = m₂.npow := by ext n x exact @MonoidHom.map_pow M M m₁ m₂ f x n rcases m₁ with @⟨@⟨⟨_⟩⟩, ⟨_⟩⟩ rcases m₂ with @⟨@⟨⟨_⟩⟩, ⟨_⟩⟩ congr #align monoid.ext Monoid.ext #align add_monoid.ext AddMonoid.ext @[to_additive] theorem CommMonoid.toMonoid_injective {M : Type u} : Function.Injective (@CommMonoid.toMonoid M) := by rintro ⟨⟩ ⟨⟩ h congr #align comm_monoid.to_monoid_injective CommMonoid.toMonoid_injective #align add_comm_monoid.to_add_monoid_injective AddCommMonoid.toAddMonoid_injective @[to_additive (attr := ext)] theorem CommMonoid.ext {M : Type*} ⦃m₁ m₂ : CommMonoid M⦄ (h_mul : (letI := m₁; HMul.hMul : M → M → M) = (letI := m₂; HMul.hMul : M → M → M)) : m₁ = m₂ := CommMonoid.toMonoid_injective <\| Monoid.ext h_mul #align comm_monoid.ext CommMonoid.ext #align add_comm_monoid.ext AddCommMonoid.ext @[to_additive]	Mathlib/Algebra/Group/Ext.lean	71	74	theorem LeftCancelMonoid.toMonoid_injective {M : Type u} : Function.Injective (@LeftCancelMonoid.toMonoid M) := by	rintro @⟨@⟨⟩⟩ @⟨@⟨⟩⟩ h congr <;> injection h
import Mathlib.LinearAlgebra.Dimension.Free import Mathlib.Algebra.Homology.ShortComplex.ModuleCat open CategoryTheory namespace ModuleCat variable {ι ι' R : Type*} [Ring R] {S : ShortComplex (ModuleCat R)} (hS : S.Exact) (hS' : S.ShortExact) {v : ι → S.X₁} open CategoryTheory Submodule Set section LinearIndependent variable (hv : LinearIndependent R v) {u : ι ⊕ ι' → S.X₂} (hw : LinearIndependent R (S.g ∘ u ∘ Sum.inr)) (hm : Mono S.f) (huv : u ∘ Sum.inl = S.f ∘ v)	Mathlib/Algebra/Category/ModuleCat/Free.lean	44	49	theorem disjoint_span_sum : Disjoint (span R (range (u ∘ Sum.inl))) (span R (range (u ∘ Sum.inr))) := by	rw [huv, disjoint_comm] refine Disjoint.mono_right (span_mono (range_comp_subset_range _ _)) ?_ rw [← LinearMap.range_coe, span_eq (LinearMap.range S.f), hS.moduleCat_range_eq_ker] exact range_ker_disjoint hw
import Mathlib.Data.Finsupp.Encodable import Mathlib.LinearAlgebra.Pi import Mathlib.LinearAlgebra.Span import Mathlib.Data.Set.Countable #align_import linear_algebra.finsupp from "leanprover-community/mathlib"@"9d684a893c52e1d6692a504a118bfccbae04feeb" noncomputable section open Set LinearMap Submodule namespace Finsupp variable {α : Type} {M : Type} {N : Type} {P : Type} {R : Type} {S : Type} variable [Semiring R] [Semiring S] [AddCommMonoid M] [Module R M] variable [AddCommMonoid N] [Module R N] variable [AddCommMonoid P] [Module R P] def lsingle (a : α) : M →ₗ[R] α →₀ M := { Finsupp.singleAddHom a with map_smul' := fun _ _ => (smul_single _ _ _).symm } #align finsupp.lsingle Finsupp.lsingle theorem lhom_ext ⦃φ ψ : (α →₀ M) →ₗ[R] N⦄ (h : ∀ a b, φ (single a b) = ψ (single a b)) : φ = ψ := LinearMap.toAddMonoidHom_injective <\| addHom_ext h #align finsupp.lhom_ext Finsupp.lhom_ext -- Porting note: The priority should be higher than `LinearMap.ext`. @[ext high] theorem lhom_ext' ⦃φ ψ : (α →₀ M) →ₗ[R] N⦄ (h : ∀ a, φ.comp (lsingle a) = ψ.comp (lsingle a)) : φ = ψ := lhom_ext fun a => LinearMap.congr_fun (h a) #align finsupp.lhom_ext' Finsupp.lhom_ext' def lapply (a : α) : (α →₀ M) →ₗ[R] M := { Finsupp.applyAddHom a with map_smul' := fun _ _ => rfl } #align finsupp.lapply Finsupp.lapply @[simps] def lcoeFun : (α →₀ M) →ₗ[R] α → M where toFun := (⇑) map_add' x y := by ext simp map_smul' x y := by ext simp #align finsupp.lcoe_fun Finsupp.lcoeFun @[simp] theorem lsingle_apply (a : α) (b : M) : (lsingle a : M →ₗ[R] α →₀ M) b = single a b := rfl #align finsupp.lsingle_apply Finsupp.lsingle_apply @[simp] theorem lapply_apply (a : α) (f : α →₀ M) : (lapply a : (α →₀ M) →ₗ[R] M) f = f a := rfl #align finsupp.lapply_apply Finsupp.lapply_apply @[simp] theorem lapply_comp_lsingle_same (a : α) : lapply a ∘ₗ lsingle a = (.id : M →ₗ[R] M) := by ext; simp @[simp]	Mathlib/LinearAlgebra/Finsupp.lean	237	238	theorem lapply_comp_lsingle_of_ne (a a' : α) (h : a ≠ a') : lapply a ∘ₗ lsingle a' = (0 : M →ₗ[R] M) := by	ext; simp [h.symm]
import Mathlib.Algebra.Module.Submodule.Map #align_import linear_algebra.basic from "leanprover-community/mathlib"@"9d684a893c52e1d6692a504a118bfccbae04feeb" open Function open Pointwise variable {R : Type} {R₁ : Type} {R₂ : Type} {R₃ : Type} variable {K : Type} variable {M : Type} {M₁ : Type} {M₂ : Type} {M₃ : Type} variable {V : Type} {V₂ : Type} namespace LinearMap section AddCommMonoid variable [Semiring R] [Semiring R₂] [Semiring R₃] variable [AddCommMonoid M] [AddCommMonoid M₂] [AddCommMonoid M₃] variable {σ₁₂ : R →+ R₂} {σ₂₃ : R₂ →+* R₃} {σ₁₃ : R →+* R₃} variable [RingHomCompTriple σ₁₂ σ₂₃ σ₁₃] variable [Module R M] [Module R₂ M₂] [Module R₃ M₃] open Submodule variable {σ₂₁ : R₂ →+* R} {τ₁₂ : R →+* R₂} {τ₂₃ : R₂ →+* R₃} {τ₁₃ : R →+* R₃} variable [RingHomCompTriple τ₁₂ τ₂₃ τ₁₃] variable {F : Type} [FunLike F M M₂] [SemilinearMapClass F τ₁₂ M M₂] def ker (f : F) : Submodule R M := comap f ⊥ #align linear_map.ker LinearMap.ker @[simp] theorem mem_ker {f : F} {y} : y ∈ ker f ↔ f y = 0 := mem_bot R₂ #align linear_map.mem_ker LinearMap.mem_ker @[simp] theorem ker_id : ker (LinearMap.id : M →ₗ[R] M) = ⊥ := rfl #align linear_map.ker_id LinearMap.ker_id @[simp] theorem map_coe_ker (f : F) (x : ker f) : f x = 0 := mem_ker.1 x.2 #align linear_map.map_coe_ker LinearMap.map_coe_ker theorem ker_toAddSubmonoid (f : M →ₛₗ[τ₁₂] M₂) : f.ker.toAddSubmonoid = (AddMonoidHom.mker f) := rfl #align linear_map.ker_to_add_submonoid LinearMap.ker_toAddSubmonoid theorem comp_ker_subtype (f : M →ₛₗ[τ₁₂] M₂) : f.comp f.ker.subtype = 0 := LinearMap.ext fun x => mem_ker.1 x.2 #align linear_map.comp_ker_subtype LinearMap.comp_ker_subtype theorem ker_comp (f : M →ₛₗ[τ₁₂] M₂) (g : M₂ →ₛₗ[τ₂₃] M₃) : ker (g.comp f : M →ₛₗ[τ₁₃] M₃) = comap f (ker g) := rfl #align linear_map.ker_comp LinearMap.ker_comp theorem ker_le_ker_comp (f : M →ₛₗ[τ₁₂] M₂) (g : M₂ →ₛₗ[τ₂₃] M₃) : ker f ≤ ker (g.comp f : M →ₛₗ[τ₁₃] M₃) := by rw [ker_comp]; exact comap_mono bot_le #align linear_map.ker_le_ker_comp LinearMap.ker_le_ker_comp theorem ker_sup_ker_le_ker_comp_of_commute {f g : M →ₗ[R] M} (h : Commute f g) : ker f ⊔ ker g ≤ ker (f ∘ₗ g) := by refine sup_le_iff.mpr ⟨?_, ker_le_ker_comp g f⟩ rw [← mul_eq_comp, h.eq, mul_eq_comp] exact ker_le_ker_comp f g @[simp] theorem ker_le_comap {p : Submodule R₂ M₂} (f : M →ₛₗ[τ₁₂] M₂) : ker f ≤ p.comap f := fun x hx ↦ by simp [mem_ker.mp hx] theorem disjoint_ker {f : F} {p : Submodule R M} : Disjoint p (ker f) ↔ ∀ x ∈ p, f x = 0 → x = 0 := by simp [disjoint_def] #align linear_map.disjoint_ker LinearMap.disjoint_ker theorem ker_eq_bot' {f : F} : ker f = ⊥ ↔ ∀ m, f m = 0 → m = 0 := by simpa [disjoint_iff_inf_le] using disjoint_ker (f := f) (p := ⊤) #align linear_map.ker_eq_bot' LinearMap.ker_eq_bot' theorem ker_eq_bot_of_inverse {τ₂₁ : R₂ →+ R} [RingHomInvPair τ₁₂ τ₂₁] {f : M →ₛₗ[τ₁₂] M₂} {g : M₂ →ₛₗ[τ₂₁] M} (h : (g.comp f : M →ₗ[R] M) = id) : ker f = ⊥ := ker_eq_bot'.2 fun m hm => by rw [← id_apply (R := R) m, ← h, comp_apply, hm, g.map_zero] #align linear_map.ker_eq_bot_of_inverse LinearMap.ker_eq_bot_of_inverse theorem le_ker_iff_map [RingHomSurjective τ₁₂] {f : F} {p : Submodule R M} : p ≤ ker f ↔ map f p = ⊥ := by rw [ker, eq_bot_iff, map_le_iff_le_comap] #align linear_map.le_ker_iff_map LinearMap.le_ker_iff_map	Mathlib/Algebra/Module/Submodule/Ker.lean	125	126	theorem ker_codRestrict {τ₂₁ : R₂ →+* R} (p : Submodule R M) (f : M₂ →ₛₗ[τ₂₁] M) (hf) : ker (codRestrict p f hf) = ker f := by	rw [ker, comap_codRestrict, Submodule.map_bot]; rfl
import Mathlib.Algebra.Ring.Int import Mathlib.SetTheory.Game.PGame import Mathlib.Tactic.Abel #align_import set_theory.game.basic from "leanprover-community/mathlib"@"8900d545017cd21961daa2a1734bb658ef52c618" -- Porting note: many definitions here are noncomputable as the compiler does not support PGame.rec noncomputable section namespace SetTheory open Function PGame open PGame universe u -- Porting note: moved the setoid instance to PGame.lean abbrev Game := Quotient PGame.setoid #align game SetTheory.Game namespace Game -- Porting note (#11445): added this definition instance : Neg Game where neg := Quot.map Neg.neg <\| fun _ _ => (neg_equiv_neg_iff).2 instance : Zero Game where zero := ⟦0⟧ instance : Add Game where add := Quotient.map₂ HAdd.hAdd <\| fun _ _ hx _ _ hy => PGame.add_congr hx hy instance instAddCommGroupWithOneGame : AddCommGroupWithOne Game where zero := ⟦0⟧ one := ⟦1⟧ add_zero := by rintro ⟨x⟩ exact Quot.sound (add_zero_equiv x) zero_add := by rintro ⟨x⟩ exact Quot.sound (zero_add_equiv x) add_assoc := by rintro ⟨x⟩ ⟨y⟩ ⟨z⟩ exact Quot.sound add_assoc_equiv add_left_neg := Quotient.ind <\| fun x => Quot.sound (add_left_neg_equiv x) add_comm := by rintro ⟨x⟩ ⟨y⟩ exact Quot.sound add_comm_equiv nsmul := nsmulRec zsmul := zsmulRec instance : Inhabited Game := ⟨0⟩ instance instPartialOrderGame : PartialOrder Game where le := Quotient.lift₂ (· ≤ ·) fun x₁ y₁ x₂ y₂ hx hy => propext (le_congr hx hy) le_refl := by rintro ⟨x⟩ exact le_refl x le_trans := by rintro ⟨x⟩ ⟨y⟩ ⟨z⟩ exact @le_trans _ _ x y z le_antisymm := by rintro ⟨x⟩ ⟨y⟩ h₁ h₂ apply Quot.sound exact ⟨h₁, h₂⟩ lt := Quotient.lift₂ (· < ·) fun x₁ y₁ x₂ y₂ hx hy => propext (lt_congr hx hy) lt_iff_le_not_le := by rintro ⟨x⟩ ⟨y⟩ exact @lt_iff_le_not_le _ _ x y def LF : Game → Game → Prop := Quotient.lift₂ PGame.LF fun _ _ _ _ hx hy => propext (lf_congr hx hy) #align game.lf SetTheory.Game.LF local infixl:50 " ⧏ " => LF @[simp]	Mathlib/SetTheory/Game/Basic.lean	111	113	theorem not_le : ∀ {x y : Game}, ¬x ≤ y ↔ y ⧏ x := by	rintro ⟨x⟩ ⟨y⟩ exact PGame.not_le
import Mathlib.Algebra.DirectSum.Finsupp import Mathlib.LinearAlgebra.Finsupp import Mathlib.LinearAlgebra.DirectSum.TensorProduct #align_import linear_algebra.direct_sum.finsupp from "leanprover-community/mathlib"@"9b9d125b7be0930f564a68f1d73ace10cf46064d" noncomputable section open DirectSum TensorProduct open Set LinearMap Submodule variable (R S M N ι κ : Type) [CommSemiring R] [AddCommMonoid M] [Module R M] [AddCommMonoid N] [Module R N] [Semiring S] [Algebra R S] [Module S M] [IsScalarTower R S M] open scoped Classical in def finsuppTensorFinsupp : (ι →₀ M) ⊗[R] (κ →₀ N) ≃ₗ[S] ι × κ →₀ M ⊗[R] N := TensorProduct.AlgebraTensorModule.congr (finsuppLEquivDirectSum S M ι) (finsuppLEquivDirectSum R N κ) ≪≫ₗ ((TensorProduct.directSum R S (fun _ : ι => M) fun _ : κ => N) ≪≫ₗ (finsuppLEquivDirectSum S (M ⊗[R] N) (ι × κ)).symm) #align finsupp_tensor_finsupp finsuppTensorFinsupp @[simp] theorem finsuppTensorFinsupp_single (i : ι) (m : M) (k : κ) (n : N) : finsuppTensorFinsupp R S M N ι κ (Finsupp.single i m ⊗ₜ Finsupp.single k n) = Finsupp.single (i, k) (m ⊗ₜ n) := by simp [finsuppTensorFinsupp] #align finsupp_tensor_finsupp_single finsuppTensorFinsupp_single @[simp] theorem finsuppTensorFinsupp_apply (f : ι →₀ M) (g : κ →₀ N) (i : ι) (k : κ) : finsuppTensorFinsupp R S M N ι κ (f ⊗ₜ g) (i, k) = f i ⊗ₜ g k := by apply Finsupp.induction_linear f · simp · intro f₁ f₂ hf₁ hf₂ simp [add_tmul, hf₁, hf₂] intro i' m apply Finsupp.induction_linear g · simp · intro g₁ g₂ hg₁ hg₂ simp [tmul_add, hg₁, hg₂] intro k' n classical simp_rw [finsuppTensorFinsupp_single, Finsupp.single_apply, Prod.mk.inj_iff, ite_and] split_ifs <;> simp #align finsupp_tensor_finsupp_apply finsuppTensorFinsupp_apply @[simp] theorem finsuppTensorFinsupp_symm_single (i : ι × κ) (m : M) (n : N) : (finsuppTensorFinsupp R S M N ι κ).symm (Finsupp.single i (m ⊗ₜ n)) = Finsupp.single i.1 m ⊗ₜ Finsupp.single i.2 n := Prod.casesOn i fun _ _ => (LinearEquiv.symm_apply_eq _).2 (finsuppTensorFinsupp_single _ _ _ _ _ _ _ _ _ _).symm #align finsupp_tensor_finsupp_symm_single finsuppTensorFinsupp_symm_single def finsuppTensorFinsuppLid : (ι →₀ R) ⊗[R] (κ →₀ N) ≃ₗ[R] ι × κ →₀ N := finsuppTensorFinsupp R R R N ι κ ≪≫ₗ Finsupp.lcongr (Equiv.refl _) (TensorProduct.lid R N) @[simp] theorem finsuppTensorFinsuppLid_apply_apply (f : ι →₀ R) (g : κ →₀ N) (a : ι) (b : κ) : finsuppTensorFinsuppLid R N ι κ (f ⊗ₜ[R] g) (a, b) = f a • g b := by simp [finsuppTensorFinsuppLid] @[simp] theorem finsuppTensorFinsuppLid_single_tmul_single (a : ι) (b : κ) (r : R) (n : N) : finsuppTensorFinsuppLid R N ι κ (Finsupp.single a r ⊗ₜ[R] Finsupp.single b n) = Finsupp.single (a, b) (r • n) := by simp [finsuppTensorFinsuppLid] @[simp] theorem finsuppTensorFinsuppLid_symm_single_smul (i : ι × κ) (r : R) (n : N) : (finsuppTensorFinsuppLid R N ι κ).symm (Finsupp.single i (r • n)) = Finsupp.single i.1 r ⊗ₜ Finsupp.single i.2 n := Prod.casesOn i fun _ _ => (LinearEquiv.symm_apply_eq _).2 (finsuppTensorFinsuppLid_single_tmul_single ..).symm def finsuppTensorFinsuppRid : (ι →₀ M) ⊗[R] (κ →₀ R) ≃ₗ[R] ι × κ →₀ M := finsuppTensorFinsupp R R M R ι κ ≪≫ₗ Finsupp.lcongr (Equiv.refl _) (TensorProduct.rid R M) @[simp] theorem finsuppTensorFinsuppRid_apply_apply (f : ι →₀ M) (g : κ →₀ R) (a : ι) (b : κ) : finsuppTensorFinsuppRid R M ι κ (f ⊗ₜ[R] g) (a, b) = g b • f a := by simp [finsuppTensorFinsuppRid] @[simp] theorem finsuppTensorFinsuppRid_single_tmul_single (a : ι) (b : κ) (m : M) (r : R) : finsuppTensorFinsuppRid R M ι κ (Finsupp.single a m ⊗ₜ[R] Finsupp.single b r) = Finsupp.single (a, b) (r • m) := by simp [finsuppTensorFinsuppRid] @[simp] theorem finsuppTensorFinsuppRid_symm_single_smul (i : ι × κ) (m : M) (r : R) : (finsuppTensorFinsuppRid R M ι κ).symm (Finsupp.single i (r • m)) = Finsupp.single i.1 m ⊗ₜ Finsupp.single i.2 r := Prod.casesOn i fun _ _ => (LinearEquiv.symm_apply_eq _).2 (finsuppTensorFinsuppRid_single_tmul_single ..).symm def finsuppTensorFinsupp' : (ι →₀ R) ⊗[R] (κ →₀ R) ≃ₗ[R] ι × κ →₀ R := finsuppTensorFinsuppLid R R ι κ #align finsupp_tensor_finsupp' finsuppTensorFinsupp' @[simp] theorem finsuppTensorFinsupp'_apply_apply (f : ι →₀ R) (g : κ →₀ R) (a : ι) (b : κ) : finsuppTensorFinsupp' R ι κ (f ⊗ₜ[R] g) (a, b) = f a g b := finsuppTensorFinsuppLid_apply_apply R R ι κ f g a b #align finsupp_tensor_finsupp'_apply_apply finsuppTensorFinsupp'_apply_apply @[simp] theorem finsuppTensorFinsupp'_single_tmul_single (a : ι) (b : κ) (r₁ r₂ : R) : finsuppTensorFinsupp' R ι κ (Finsupp.single a r₁ ⊗ₜ[R] Finsupp.single b r₂) = Finsupp.single (a, b) (r₁ * r₂) := finsuppTensorFinsuppLid_single_tmul_single R R ι κ a b r₁ r₂ #align finsupp_tensor_finsupp'_single_tmul_single finsuppTensorFinsupp'_single_tmul_single theorem finsuppTensorFinsupp'_symm_single_mul (i : ι × κ) (r₁ r₂ : R) : (finsuppTensorFinsupp' R ι κ).symm (Finsupp.single i (r₁ * r₂)) = Finsupp.single i.1 r₁ ⊗ₜ Finsupp.single i.2 r₂ := finsuppTensorFinsuppLid_symm_single_smul R R ι κ i r₁ r₂ theorem finsuppTensorFinsupp'_symm_single_eq_single_one_tmul (i : ι × κ) (r : R) : (finsuppTensorFinsupp' R ι κ).symm (Finsupp.single i r) = Finsupp.single i.1 1 ⊗ₜ Finsupp.single i.2 r := by nth_rw 1 [← one_mul r] exact finsuppTensorFinsupp'_symm_single_mul R ι κ i _ _	Mathlib/LinearAlgebra/DirectSum/Finsupp.lean	361	365	theorem finsuppTensorFinsupp'_symm_single_eq_tmul_single_one (i : ι × κ) (r : R) : (finsuppTensorFinsupp' R ι κ).symm (Finsupp.single i r) = Finsupp.single i.1 r ⊗ₜ Finsupp.single i.2 1 := by	nth_rw 1 [← mul_one r] exact finsuppTensorFinsupp'_symm_single_mul R ι κ i _ _
import Mathlib.Tactic.FinCases import Mathlib.Data.Nat.Choose.Sum import Mathlib.LinearAlgebra.Finsupp import Mathlib.Algebra.Field.IsField #align_import ring_theory.ideal.basic from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" universe u v w variable {α : Type u} {β : Type v} open Set Function open Pointwise abbrev Ideal (R : Type u) [Semiring R] := Submodule R R #align ideal Ideal @[mk_iff] class IsPrincipalIdealRing (R : Type u) [Semiring R] : Prop where principal : ∀ S : Ideal R, S.IsPrincipal #align is_principal_ideal_ring IsPrincipalIdealRing attribute [instance] IsPrincipalIdealRing.principal section Semiring namespace Ideal variable [Semiring α] (I : Ideal α) {a b : α} protected theorem zero_mem : (0 : α) ∈ I := Submodule.zero_mem I #align ideal.zero_mem Ideal.zero_mem protected theorem add_mem : a ∈ I → b ∈ I → a + b ∈ I := Submodule.add_mem I #align ideal.add_mem Ideal.add_mem variable (a) theorem mul_mem_left : b ∈ I → a * b ∈ I := Submodule.smul_mem I a #align ideal.mul_mem_left Ideal.mul_mem_left variable {a} @[ext] theorem ext {I J : Ideal α} (h : ∀ x, x ∈ I ↔ x ∈ J) : I = J := Submodule.ext h #align ideal.ext Ideal.ext theorem sum_mem (I : Ideal α) {ι : Type} {t : Finset ι} {f : ι → α} : (∀ c ∈ t, f c ∈ I) → (∑ i ∈ t, f i) ∈ I := Submodule.sum_mem I #align ideal.sum_mem Ideal.sum_mem theorem eq_top_of_unit_mem (x y : α) (hx : x ∈ I) (h : y x = 1) : I = ⊤ := eq_top_iff.2 fun z _ => calc z = z * (y * x) := by simp [h] _ = z * y * x := Eq.symm <\| mul_assoc z y x _ ∈ I := I.mul_mem_left _ hx #align ideal.eq_top_of_unit_mem Ideal.eq_top_of_unit_mem theorem eq_top_of_isUnit_mem {x} (hx : x ∈ I) (h : IsUnit x) : I = ⊤ := let ⟨y, hy⟩ := h.exists_left_inv eq_top_of_unit_mem I x y hx hy #align ideal.eq_top_of_is_unit_mem Ideal.eq_top_of_isUnit_mem theorem eq_top_iff_one : I = ⊤ ↔ (1 : α) ∈ I := ⟨by rintro rfl; trivial, fun h => eq_top_of_unit_mem _ _ 1 h (by simp)⟩ #align ideal.eq_top_iff_one Ideal.eq_top_iff_one theorem ne_top_iff_one : I ≠ ⊤ ↔ (1 : α) ∉ I := not_congr I.eq_top_iff_one #align ideal.ne_top_iff_one Ideal.ne_top_iff_one @[simp] theorem unit_mul_mem_iff_mem {x y : α} (hy : IsUnit y) : y * x ∈ I ↔ x ∈ I := by refine ⟨fun h => ?_, fun h => I.mul_mem_left y h⟩ obtain ⟨y', hy'⟩ := hy.exists_left_inv have := I.mul_mem_left y' h rwa [← mul_assoc, hy', one_mul] at this #align ideal.unit_mul_mem_iff_mem Ideal.unit_mul_mem_iff_mem def span (s : Set α) : Ideal α := Submodule.span α s #align ideal.span Ideal.span @[simp] theorem submodule_span_eq {s : Set α} : Submodule.span α s = Ideal.span s := rfl #align ideal.submodule_span_eq Ideal.submodule_span_eq @[simp] theorem span_empty : span (∅ : Set α) = ⊥ := Submodule.span_empty #align ideal.span_empty Ideal.span_empty @[simp] theorem span_univ : span (Set.univ : Set α) = ⊤ := Submodule.span_univ #align ideal.span_univ Ideal.span_univ theorem span_union (s t : Set α) : span (s ∪ t) = span s ⊔ span t := Submodule.span_union _ _ #align ideal.span_union Ideal.span_union theorem span_iUnion {ι} (s : ι → Set α) : span (⋃ i, s i) = ⨆ i, span (s i) := Submodule.span_iUnion _ #align ideal.span_Union Ideal.span_iUnion theorem mem_span {s : Set α} (x) : x ∈ span s ↔ ∀ p : Ideal α, s ⊆ p → x ∈ p := mem_iInter₂ #align ideal.mem_span Ideal.mem_span theorem subset_span {s : Set α} : s ⊆ span s := Submodule.subset_span #align ideal.subset_span Ideal.subset_span theorem span_le {s : Set α} {I} : span s ≤ I ↔ s ⊆ I := Submodule.span_le #align ideal.span_le Ideal.span_le theorem span_mono {s t : Set α} : s ⊆ t → span s ≤ span t := Submodule.span_mono #align ideal.span_mono Ideal.span_mono @[simp] theorem span_eq : span (I : Set α) = I := Submodule.span_eq _ #align ideal.span_eq Ideal.span_eq @[simp] theorem span_singleton_one : span ({1} : Set α) = ⊤ := (eq_top_iff_one _).2 <\| subset_span <\| mem_singleton _ #align ideal.span_singleton_one Ideal.span_singleton_one theorem isCompactElement_top : CompleteLattice.IsCompactElement (⊤ : Ideal α) := by simpa only [← span_singleton_one] using Submodule.singleton_span_isCompactElement 1 theorem mem_span_insert {s : Set α} {x y} : x ∈ span (insert y s) ↔ ∃ a, ∃ z ∈ span s, x = a * y + z := Submodule.mem_span_insert #align ideal.mem_span_insert Ideal.mem_span_insert theorem mem_span_singleton' {x y : α} : x ∈ span ({y} : Set α) ↔ ∃ a, a * y = x := Submodule.mem_span_singleton #align ideal.mem_span_singleton' Ideal.mem_span_singleton' theorem span_singleton_le_iff_mem {x : α} : span {x} ≤ I ↔ x ∈ I := Submodule.span_singleton_le_iff_mem _ _ #align ideal.span_singleton_le_iff_mem Ideal.span_singleton_le_iff_mem theorem span_singleton_mul_left_unit {a : α} (h2 : IsUnit a) (x : α) : span ({a * x} : Set α) = span {x} := by apply le_antisymm <;> rw [span_singleton_le_iff_mem, mem_span_singleton'] exacts [⟨a, rfl⟩, ⟨_, h2.unit.inv_mul_cancel_left x⟩] #align ideal.span_singleton_mul_left_unit Ideal.span_singleton_mul_left_unit theorem span_insert (x) (s : Set α) : span (insert x s) = span ({x} : Set α) ⊔ span s := Submodule.span_insert x s #align ideal.span_insert Ideal.span_insert theorem span_eq_bot {s : Set α} : span s = ⊥ ↔ ∀ x ∈ s, (x : α) = 0 := Submodule.span_eq_bot #align ideal.span_eq_bot Ideal.span_eq_bot @[simp] theorem span_singleton_eq_bot {x} : span ({x} : Set α) = ⊥ ↔ x = 0 := Submodule.span_singleton_eq_bot #align ideal.span_singleton_eq_bot Ideal.span_singleton_eq_bot theorem span_singleton_ne_top {α : Type} [CommSemiring α] {x : α} (hx : ¬IsUnit x) : Ideal.span ({x} : Set α) ≠ ⊤ := (Ideal.ne_top_iff_one _).mpr fun h1 => let ⟨y, hy⟩ := Ideal.mem_span_singleton'.mp h1 hx ⟨⟨x, y, mul_comm y x ▸ hy, hy⟩, rfl⟩ #align ideal.span_singleton_ne_top Ideal.span_singleton_ne_top @[simp] theorem span_zero : span (0 : Set α) = ⊥ := by rw [← Set.singleton_zero, span_singleton_eq_bot] #align ideal.span_zero Ideal.span_zero @[simp] theorem span_one : span (1 : Set α) = ⊤ := by rw [← Set.singleton_one, span_singleton_one] #align ideal.span_one Ideal.span_one theorem span_eq_top_iff_finite (s : Set α) : span s = ⊤ ↔ ∃ s' : Finset α, ↑s' ⊆ s ∧ span (s' : Set α) = ⊤ := by simp_rw [eq_top_iff_one] exact ⟨Submodule.mem_span_finite_of_mem_span, fun ⟨s', h₁, h₂⟩ => span_mono h₁ h₂⟩ #align ideal.span_eq_top_iff_finite Ideal.span_eq_top_iff_finite theorem mem_span_singleton_sup {S : Type} [CommSemiring S] {x y : S} {I : Ideal S} : x ∈ Ideal.span {y} ⊔ I ↔ ∃ a : S, ∃ b ∈ I, a * y + b = x := by rw [Submodule.mem_sup] constructor · rintro ⟨ya, hya, b, hb, rfl⟩ obtain ⟨a, rfl⟩ := mem_span_singleton'.mp hya exact ⟨a, b, hb, rfl⟩ · rintro ⟨a, b, hb, rfl⟩ exact ⟨a * y, Ideal.mem_span_singleton'.mpr ⟨a, rfl⟩, b, hb, rfl⟩ #align ideal.mem_span_singleton_sup Ideal.mem_span_singleton_sup def ofRel (r : α → α → Prop) : Ideal α := Submodule.span α { x \| ∃ a b, r a b ∧ x + b = a } #align ideal.of_rel Ideal.ofRel class IsPrime (I : Ideal α) : Prop where ne_top' : I ≠ ⊤ mem_or_mem' : ∀ {x y : α}, x * y ∈ I → x ∈ I ∨ y ∈ I #align ideal.is_prime Ideal.IsPrime theorem isPrime_iff {I : Ideal α} : IsPrime I ↔ I ≠ ⊤ ∧ ∀ {x y : α}, x * y ∈ I → x ∈ I ∨ y ∈ I := ⟨fun h => ⟨h.1, h.2⟩, fun h => ⟨h.1, h.2⟩⟩ #align ideal.is_prime_iff Ideal.isPrime_iff theorem IsPrime.ne_top {I : Ideal α} (hI : I.IsPrime) : I ≠ ⊤ := hI.1 #align ideal.is_prime.ne_top Ideal.IsPrime.ne_top theorem IsPrime.mem_or_mem {I : Ideal α} (hI : I.IsPrime) {x y : α} : x * y ∈ I → x ∈ I ∨ y ∈ I := hI.2 #align ideal.is_prime.mem_or_mem Ideal.IsPrime.mem_or_mem theorem IsPrime.mem_or_mem_of_mul_eq_zero {I : Ideal α} (hI : I.IsPrime) {x y : α} (h : x * y = 0) : x ∈ I ∨ y ∈ I := hI.mem_or_mem (h.symm ▸ I.zero_mem) #align ideal.is_prime.mem_or_mem_of_mul_eq_zero Ideal.IsPrime.mem_or_mem_of_mul_eq_zero theorem IsPrime.mem_of_pow_mem {I : Ideal α} (hI : I.IsPrime) {r : α} (n : ℕ) (H : r ^ n ∈ I) : r ∈ I := by induction' n with n ih · rw [pow_zero] at H exact (mt (eq_top_iff_one _).2 hI.1).elim H · rw [pow_succ] at H exact Or.casesOn (hI.mem_or_mem H) ih id #align ideal.is_prime.mem_of_pow_mem Ideal.IsPrime.mem_of_pow_mem theorem not_isPrime_iff {I : Ideal α} : ¬I.IsPrime ↔ I = ⊤ ∨ ∃ (x : α) (_hx : x ∉ I) (y : α) (_hy : y ∉ I), x * y ∈ I := by simp_rw [Ideal.isPrime_iff, not_and_or, Ne, Classical.not_not, not_forall, not_or] exact or_congr Iff.rfl ⟨fun ⟨x, y, hxy, hx, hy⟩ => ⟨x, hx, y, hy, hxy⟩, fun ⟨x, hx, y, hy, hxy⟩ => ⟨x, y, hxy, hx, hy⟩⟩ #align ideal.not_is_prime_iff Ideal.not_isPrime_iff theorem zero_ne_one_of_proper {I : Ideal α} (h : I ≠ ⊤) : (0 : α) ≠ 1 := fun hz => I.ne_top_iff_one.1 h <\| hz ▸ I.zero_mem #align ideal.zero_ne_one_of_proper Ideal.zero_ne_one_of_proper theorem bot_prime [IsDomain α] : (⊥ : Ideal α).IsPrime := ⟨fun h => one_ne_zero (by rwa [Ideal.eq_top_iff_one, Submodule.mem_bot] at h), fun h => mul_eq_zero.mp (by simpa only [Submodule.mem_bot] using h)⟩ #align ideal.bot_prime Ideal.bot_prime class IsMaximal (I : Ideal α) : Prop where out : IsCoatom I #align ideal.is_maximal Ideal.IsMaximal theorem isMaximal_def {I : Ideal α} : I.IsMaximal ↔ IsCoatom I := ⟨fun h => h.1, fun h => ⟨h⟩⟩ #align ideal.is_maximal_def Ideal.isMaximal_def theorem IsMaximal.ne_top {I : Ideal α} (h : I.IsMaximal) : I ≠ ⊤ := (isMaximal_def.1 h).1 #align ideal.is_maximal.ne_top Ideal.IsMaximal.ne_top theorem isMaximal_iff {I : Ideal α} : I.IsMaximal ↔ (1 : α) ∉ I ∧ ∀ (J : Ideal α) (x), I ≤ J → x ∉ I → x ∈ J → (1 : α) ∈ J := isMaximal_def.trans <\| and_congr I.ne_top_iff_one <\| forall_congr' fun J => by rw [lt_iff_le_not_le]; exact ⟨fun H x h hx₁ hx₂ => J.eq_top_iff_one.1 <\| H ⟨h, not_subset.2 ⟨_, hx₂, hx₁⟩⟩, fun H ⟨h₁, h₂⟩ => let ⟨x, xJ, xI⟩ := not_subset.1 h₂ J.eq_top_iff_one.2 <\| H x h₁ xI xJ⟩ #align ideal.is_maximal_iff Ideal.isMaximal_iff theorem IsMaximal.eq_of_le {I J : Ideal α} (hI : I.IsMaximal) (hJ : J ≠ ⊤) (IJ : I ≤ J) : I = J := eq_iff_le_not_lt.2 ⟨IJ, fun h => hJ (hI.1.2 _ h)⟩ #align ideal.is_maximal.eq_of_le Ideal.IsMaximal.eq_of_le instance : IsCoatomic (Ideal α) := by apply CompleteLattice.coatomic_of_top_compact rw [← span_singleton_one] exact Submodule.singleton_span_isCompactElement 1 theorem IsMaximal.coprime_of_ne {M M' : Ideal α} (hM : M.IsMaximal) (hM' : M'.IsMaximal) (hne : M ≠ M') : M ⊔ M' = ⊤ := by contrapose! hne with h exact hM.eq_of_le hM'.ne_top (le_sup_left.trans_eq (hM'.eq_of_le h le_sup_right).symm) #align ideal.is_maximal.coprime_of_ne Ideal.IsMaximal.coprime_of_ne theorem exists_le_maximal (I : Ideal α) (hI : I ≠ ⊤) : ∃ M : Ideal α, M.IsMaximal ∧ I ≤ M := let ⟨m, hm⟩ := (eq_top_or_exists_le_coatom I).resolve_left hI ⟨m, ⟨⟨hm.1⟩, hm.2⟩⟩ #align ideal.exists_le_maximal Ideal.exists_le_maximal variable (α) theorem exists_maximal [Nontrivial α] : ∃ M : Ideal α, M.IsMaximal := let ⟨I, ⟨hI, _⟩⟩ := exists_le_maximal (⊥ : Ideal α) bot_ne_top ⟨I, hI⟩ #align ideal.exists_maximal Ideal.exists_maximal variable {α} instance [Nontrivial α] : Nontrivial (Ideal α) := by rcases@exists_maximal α _ _ with ⟨M, hM, _⟩ exact nontrivial_of_ne M ⊤ hM theorem maximal_of_no_maximal {P : Ideal α} (hmax : ∀ m : Ideal α, P < m → ¬IsMaximal m) (J : Ideal α) (hPJ : P < J) : J = ⊤ := by by_contra hnonmax rcases exists_le_maximal J hnonmax with ⟨M, hM1, hM2⟩ exact hmax M (lt_of_lt_of_le hPJ hM2) hM1 #align ideal.maximal_of_no_maximal Ideal.maximal_of_no_maximal theorem span_pair_comm {x y : α} : (span {x, y} : Ideal α) = span {y, x} := by simp only [span_insert, sup_comm] #align ideal.span_pair_comm Ideal.span_pair_comm theorem mem_span_pair {x y z : α} : z ∈ span ({x, y} : Set α) ↔ ∃ a b, a * x + b * y = z := Submodule.mem_span_pair #align ideal.mem_span_pair Ideal.mem_span_pair @[simp] theorem span_pair_add_mul_left {R : Type u} [CommRing R] {x y : R} (z : R) : (span {x + y * z, y} : Ideal R) = span {x, y} := by ext rw [mem_span_pair, mem_span_pair] exact ⟨fun ⟨a, b, h⟩ => ⟨a, b + a * z, by rw [← h] ring1⟩, fun ⟨a, b, h⟩ => ⟨a, b - a * z, by rw [← h] ring1⟩⟩ #align ideal.span_pair_add_mul_left Ideal.span_pair_add_mul_left @[simp] theorem span_pair_add_mul_right {R : Type u} [CommRing R] {x y : R} (z : R) : (span {x, y + x * z} : Ideal R) = span {x, y} := by rw [span_pair_comm, span_pair_add_mul_left, span_pair_comm] #align ideal.span_pair_add_mul_right Ideal.span_pair_add_mul_right theorem IsMaximal.exists_inv {I : Ideal α} (hI : I.IsMaximal) {x} (hx : x ∉ I) : ∃ y, ∃ i ∈ I, y * x + i = 1 := by cases' isMaximal_iff.1 hI with H₁ H₂ rcases mem_span_insert.1 (H₂ (span (insert x I)) x (Set.Subset.trans (subset_insert _ _) subset_span) hx (subset_span (mem_insert _ _))) with ⟨y, z, hz, hy⟩ refine ⟨y, z, ?_, hy.symm⟩ rwa [← span_eq I] #align ideal.is_maximal.exists_inv Ideal.IsMaximal.exists_inv section DivisionSemiring variable {K : Type u} [DivisionSemiring K] (I : Ideal K) namespace Ideal	Mathlib/RingTheory/Ideal/Basic.lean	750	758	theorem eq_bot_or_top : I = ⊥ ∨ I = ⊤ := by	rw [or_iff_not_imp_right] change _ ≠ _ → _ rw [Ideal.ne_top_iff_one] intro h1 rw [eq_bot_iff] intro r hr by_cases H : r = 0; · simpa simpa [H, h1] using I.mul_mem_left r⁻¹ hr
import Mathlib.CategoryTheory.Subobject.Lattice #align_import category_theory.subobject.limits from "leanprover-community/mathlib"@"956af7c76589f444f2e1313911bad16366ea476d" universe v u noncomputable section open CategoryTheory CategoryTheory.Category CategoryTheory.Limits CategoryTheory.Subobject Opposite variable {C : Type u} [Category.{v} C] {X Y Z : C} namespace CategoryTheory namespace Limits section Kernel variable [HasZeroMorphisms C] (f : X ⟶ Y) [HasKernel f] abbrev kernelSubobject : Subobject X := Subobject.mk (kernel.ι f) #align category_theory.limits.kernel_subobject CategoryTheory.Limits.kernelSubobject def kernelSubobjectIso : (kernelSubobject f : C) ≅ kernel f := Subobject.underlyingIso (kernel.ι f) #align category_theory.limits.kernel_subobject_iso CategoryTheory.Limits.kernelSubobjectIso @[reassoc (attr := simp), elementwise (attr := simp)] theorem kernelSubobject_arrow : (kernelSubobjectIso f).hom ≫ kernel.ι f = (kernelSubobject f).arrow := by simp [kernelSubobjectIso] #align category_theory.limits.kernel_subobject_arrow CategoryTheory.Limits.kernelSubobject_arrow @[reassoc (attr := simp), elementwise (attr := simp)] theorem kernelSubobject_arrow' : (kernelSubobjectIso f).inv ≫ (kernelSubobject f).arrow = kernel.ι f := by simp [kernelSubobjectIso] #align category_theory.limits.kernel_subobject_arrow' CategoryTheory.Limits.kernelSubobject_arrow' @[reassoc (attr := simp), elementwise (attr := simp)]	Mathlib/CategoryTheory/Subobject/Limits.lean	110	112	theorem kernelSubobject_arrow_comp : (kernelSubobject f).arrow ≫ f = 0 := by	rw [← kernelSubobject_arrow] simp only [Category.assoc, kernel.condition, comp_zero]
import Mathlib.Algebra.BigOperators.Fin import Mathlib.Algebra.GeomSum import Mathlib.LinearAlgebra.Matrix.Block import Mathlib.LinearAlgebra.Matrix.Determinant.Basic import Mathlib.LinearAlgebra.Matrix.Nondegenerate #align_import linear_algebra.vandermonde from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" variable {R : Type} [CommRing R] open Equiv Finset open Matrix namespace Matrix def vandermonde {n : ℕ} (v : Fin n → R) : Matrix (Fin n) (Fin n) R := fun i j => v i ^ (j : ℕ) #align matrix.vandermonde Matrix.vandermonde @[simp] theorem vandermonde_apply {n : ℕ} (v : Fin n → R) (i j) : vandermonde v i j = v i ^ (j : ℕ) := rfl #align matrix.vandermonde_apply Matrix.vandermonde_apply @[simp] theorem vandermonde_cons {n : ℕ} (v0 : R) (v : Fin n → R) : vandermonde (Fin.cons v0 v : Fin n.succ → R) = Fin.cons (fun (j : Fin n.succ) => v0 ^ (j : ℕ)) fun i => Fin.cons 1 fun j => v i vandermonde v i j := by ext i j refine Fin.cases (by simp) (fun i => ?_) i refine Fin.cases (by simp) (fun j => ?_) j simp [pow_succ'] #align matrix.vandermonde_cons Matrix.vandermonde_cons theorem vandermonde_succ {n : ℕ} (v : Fin n.succ → R) : vandermonde v = Fin.cons (fun (j : Fin n.succ) => v 0 ^ (j : ℕ)) fun i => Fin.cons 1 fun j => v i.succ * vandermonde (Fin.tail v) i j := by conv_lhs => rw [← Fin.cons_self_tail v, vandermonde_cons] rfl #align matrix.vandermonde_succ Matrix.vandermonde_succ theorem vandermonde_mul_vandermonde_transpose {n : ℕ} (v w : Fin n → R) (i j) : (vandermonde v * (vandermonde w)ᵀ) i j = ∑ k : Fin n, (v i * w j) ^ (k : ℕ) := by simp only [vandermonde_apply, Matrix.mul_apply, Matrix.transpose_apply, mul_pow] #align matrix.vandermonde_mul_vandermonde_transpose Matrix.vandermonde_mul_vandermonde_transpose theorem vandermonde_transpose_mul_vandermonde {n : ℕ} (v : Fin n → R) (i j) : ((vandermonde v)ᵀ * vandermonde v) i j = ∑ k : Fin n, v k ^ (i + j : ℕ) := by simp only [vandermonde_apply, Matrix.mul_apply, Matrix.transpose_apply, pow_add] #align matrix.vandermonde_transpose_mul_vandermonde Matrix.vandermonde_transpose_mul_vandermonde theorem det_vandermonde {n : ℕ} (v : Fin n → R) : det (vandermonde v) = ∏ i : Fin n, ∏ j ∈ Ioi i, (v j - v i) := by unfold vandermonde induction' n with n ih · exact det_eq_one_of_card_eq_zero (Fintype.card_fin 0) calc det (of fun i j : Fin n.succ => v i ^ (j : ℕ)) = det (of fun i j : Fin n.succ => Matrix.vecCons (v 0 ^ (j : ℕ)) (fun i => v (Fin.succ i) ^ (j : ℕ) - v 0 ^ (j : ℕ)) i) := det_eq_of_forall_row_eq_smul_add_const (Matrix.vecCons 0 1) 0 (Fin.cons_zero _ _) ?_ _ = det (of fun i j : Fin n => Matrix.vecCons (v 0 ^ (j.succ : ℕ)) (fun i : Fin n => v (Fin.succ i) ^ (j.succ : ℕ) - v 0 ^ (j.succ : ℕ)) (Fin.succAbove 0 i)) := by simp_rw [det_succ_column_zero, Fin.sum_univ_succ, of_apply, Matrix.cons_val_zero, submatrix, of_apply, Matrix.cons_val_succ, Fin.val_zero, pow_zero, one_mul, sub_self, mul_zero, zero_mul, Finset.sum_const_zero, add_zero] _ = det (of fun i j : Fin n => (v (Fin.succ i) - v 0) * ∑ k ∈ Finset.range (j + 1 : ℕ), v i.succ ^ k * v 0 ^ (j - k : ℕ) : Matrix _ _ R) := by congr ext i j rw [Fin.succAbove_zero, Matrix.cons_val_succ, Fin.val_succ, mul_comm] exact (geom_sum₂_mul (v i.succ) (v 0) (j + 1 : ℕ)).symm _ = (∏ i ∈ Finset.univ, (v (Fin.succ i) - v 0)) * det fun i j : Fin n => ∑ k ∈ Finset.range (j + 1 : ℕ), v i.succ ^ k * v 0 ^ (j - k : ℕ) := (det_mul_column (fun i => v (Fin.succ i) - v 0) _) _ = (∏ i ∈ Finset.univ, (v (Fin.succ i) - v 0)) * det fun i j : Fin n => v (Fin.succ i) ^ (j : ℕ) := congr_arg _ ?_ _ = ∏ i : Fin n.succ, ∏ j ∈ Ioi i, (v j - v i) := by simp_rw [Fin.prod_univ_succ, Fin.prod_Ioi_zero, Fin.prod_Ioi_succ] have h := ih (v ∘ Fin.succ) unfold Function.comp at h rw [h] · intro i j simp_rw [of_apply] rw [Matrix.cons_val_zero] refine Fin.cases ?_ (fun i => ?_) i · simp rw [Matrix.cons_val_succ, Matrix.cons_val_succ, Pi.one_apply] ring · cases n · rw [det_eq_one_of_card_eq_zero (Fintype.card_fin 0), det_eq_one_of_card_eq_zero (Fintype.card_fin 0)] apply det_eq_of_forall_col_eq_smul_add_pred fun _ => v 0 · intro j simp · intro i j simp only [smul_eq_mul, Pi.add_apply, Fin.val_succ, Fin.coe_castSucc, Pi.smul_apply] rw [Finset.sum_range_succ, add_comm, tsub_self, pow_zero, mul_one, Finset.mul_sum] congr 1 refine Finset.sum_congr rfl fun i' hi' => ?_ rw [mul_left_comm (v 0), Nat.succ_sub, pow_succ'] exact Nat.lt_succ_iff.mp (Finset.mem_range.mp hi') #align matrix.det_vandermonde Matrix.det_vandermonde	Mathlib/LinearAlgebra/Vandermonde.lean	142	150	theorem det_vandermonde_eq_zero_iff [IsDomain R] {n : ℕ} {v : Fin n → R} : det (vandermonde v) = 0 ↔ ∃ i j : Fin n, v i = v j ∧ i ≠ j := by	constructor · simp only [det_vandermonde v, Finset.prod_eq_zero_iff, sub_eq_zero, forall_exists_index] rintro i ⟨_, j, h₁, h₂⟩ exact ⟨j, i, h₂, (mem_Ioi.mp h₁).ne'⟩ · simp only [Ne, forall_exists_index, and_imp] refine fun i j h₁ h₂ => Matrix.det_zero_of_row_eq h₂ (funext fun k => ?_) rw [vandermonde_apply, vandermonde_apply, h₁]
import Mathlib.Analysis.InnerProductSpace.PiL2 import Mathlib.Analysis.SpecialFunctions.Sqrt import Mathlib.Analysis.NormedSpace.HomeomorphBall #align_import analysis.inner_product_space.calculus from "leanprover-community/mathlib"@"f9dd3204df14a0749cd456fac1e6849dfe7d2b88" noncomputable section open RCLike Real Filter open scoped Classical Topology section DerivInner variable {𝕜 E F : Type} [RCLike 𝕜] variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y variable (𝕜) [NormedSpace ℝ E] def fderivInnerCLM (p : E × E) : E × E →L[ℝ] 𝕜 := isBoundedBilinearMap_inner.deriv p #align fderiv_inner_clm fderivInnerCLM @[simp] theorem fderivInnerCLM_apply (p x : E × E) : fderivInnerCLM 𝕜 p x = ⟪p.1, x.2⟫ + ⟪x.1, p.2⟫ := rfl #align fderiv_inner_clm_apply fderivInnerCLM_apply variable {𝕜} -- Porting note: Lean 3 magically switches back to `{𝕜}` here theorem contDiff_inner {n} : ContDiff ℝ n fun p : E × E => ⟪p.1, p.2⟫ := isBoundedBilinearMap_inner.contDiff #align cont_diff_inner contDiff_inner theorem contDiffAt_inner {p : E × E} {n} : ContDiffAt ℝ n (fun p : E × E => ⟪p.1, p.2⟫) p := ContDiff.contDiffAt contDiff_inner #align cont_diff_at_inner contDiffAt_inner theorem differentiable_inner : Differentiable ℝ fun p : E × E => ⟪p.1, p.2⟫ := isBoundedBilinearMap_inner.differentiableAt #align differentiable_inner differentiable_inner variable (𝕜) variable {G : Type} [NormedAddCommGroup G] [NormedSpace ℝ G] {f g : G → E} {f' g' : G →L[ℝ] E} {s : Set G} {x : G} {n : ℕ∞} theorem ContDiffWithinAt.inner (hf : ContDiffWithinAt ℝ n f s x) (hg : ContDiffWithinAt ℝ n g s x) : ContDiffWithinAt ℝ n (fun x => ⟪f x, g x⟫) s x := contDiffAt_inner.comp_contDiffWithinAt x (hf.prod hg) #align cont_diff_within_at.inner ContDiffWithinAt.inner nonrec theorem ContDiffAt.inner (hf : ContDiffAt ℝ n f x) (hg : ContDiffAt ℝ n g x) : ContDiffAt ℝ n (fun x => ⟪f x, g x⟫) x := hf.inner 𝕜 hg #align cont_diff_at.inner ContDiffAt.inner theorem ContDiffOn.inner (hf : ContDiffOn ℝ n f s) (hg : ContDiffOn ℝ n g s) : ContDiffOn ℝ n (fun x => ⟪f x, g x⟫) s := fun x hx => (hf x hx).inner 𝕜 (hg x hx) #align cont_diff_on.inner ContDiffOn.inner theorem ContDiff.inner (hf : ContDiff ℝ n f) (hg : ContDiff ℝ n g) : ContDiff ℝ n fun x => ⟪f x, g x⟫ := contDiff_inner.comp (hf.prod hg) #align cont_diff.inner ContDiff.inner theorem HasFDerivWithinAt.inner (hf : HasFDerivWithinAt f f' s x) (hg : HasFDerivWithinAt g g' s x) : HasFDerivWithinAt (fun t => ⟪f t, g t⟫) ((fderivInnerCLM 𝕜 (f x, g x)).comp <\| f'.prod g') s x := (isBoundedBilinearMap_inner.hasFDerivAt (f x, g x)).comp_hasFDerivWithinAt x (hf.prod hg) #align has_fderiv_within_at.inner HasFDerivWithinAt.inner theorem HasStrictFDerivAt.inner (hf : HasStrictFDerivAt f f' x) (hg : HasStrictFDerivAt g g' x) : HasStrictFDerivAt (fun t => ⟪f t, g t⟫) ((fderivInnerCLM 𝕜 (f x, g x)).comp <\| f'.prod g') x := (isBoundedBilinearMap_inner.hasStrictFDerivAt (f x, g x)).comp x (hf.prod hg) #align has_strict_fderiv_at.inner HasStrictFDerivAt.inner theorem HasFDerivAt.inner (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) : HasFDerivAt (fun t => ⟪f t, g t⟫) ((fderivInnerCLM 𝕜 (f x, g x)).comp <\| f'.prod g') x := (isBoundedBilinearMap_inner.hasFDerivAt (f x, g x)).comp x (hf.prod hg) #align has_fderiv_at.inner HasFDerivAt.inner theorem HasDerivWithinAt.inner {f g : ℝ → E} {f' g' : E} {s : Set ℝ} {x : ℝ} (hf : HasDerivWithinAt f f' s x) (hg : HasDerivWithinAt g g' s x) : HasDerivWithinAt (fun t => ⟪f t, g t⟫) (⟪f x, g'⟫ + ⟪f', g x⟫) s x := by simpa using (hf.hasFDerivWithinAt.inner 𝕜 hg.hasFDerivWithinAt).hasDerivWithinAt #align has_deriv_within_at.inner HasDerivWithinAt.inner theorem HasDerivAt.inner {f g : ℝ → E} {f' g' : E} {x : ℝ} : HasDerivAt f f' x → HasDerivAt g g' x → HasDerivAt (fun t => ⟪f t, g t⟫) (⟪f x, g'⟫ + ⟪f', g x⟫) x := by simpa only [← hasDerivWithinAt_univ] using HasDerivWithinAt.inner 𝕜 #align has_deriv_at.inner HasDerivAt.inner theorem DifferentiableWithinAt.inner (hf : DifferentiableWithinAt ℝ f s x) (hg : DifferentiableWithinAt ℝ g s x) : DifferentiableWithinAt ℝ (fun x => ⟪f x, g x⟫) s x := ((differentiable_inner _).hasFDerivAt.comp_hasFDerivWithinAt x (hf.prod hg).hasFDerivWithinAt).differentiableWithinAt #align differentiable_within_at.inner DifferentiableWithinAt.inner theorem DifferentiableAt.inner (hf : DifferentiableAt ℝ f x) (hg : DifferentiableAt ℝ g x) : DifferentiableAt ℝ (fun x => ⟪f x, g x⟫) x := (differentiable_inner _).comp x (hf.prod hg) #align differentiable_at.inner DifferentiableAt.inner theorem DifferentiableOn.inner (hf : DifferentiableOn ℝ f s) (hg : DifferentiableOn ℝ g s) : DifferentiableOn ℝ (fun x => ⟪f x, g x⟫) s := fun x hx => (hf x hx).inner 𝕜 (hg x hx) #align differentiable_on.inner DifferentiableOn.inner theorem Differentiable.inner (hf : Differentiable ℝ f) (hg : Differentiable ℝ g) : Differentiable ℝ fun x => ⟪f x, g x⟫ := fun x => (hf x).inner 𝕜 (hg x) #align differentiable.inner Differentiable.inner theorem fderiv_inner_apply (hf : DifferentiableAt ℝ f x) (hg : DifferentiableAt ℝ g x) (y : G) : fderiv ℝ (fun t => ⟪f t, g t⟫) x y = ⟪f x, fderiv ℝ g x y⟫ + ⟪fderiv ℝ f x y, g x⟫ := by rw [(hf.hasFDerivAt.inner 𝕜 hg.hasFDerivAt).fderiv]; rfl #align fderiv_inner_apply fderiv_inner_apply theorem deriv_inner_apply {f g : ℝ → E} {x : ℝ} (hf : DifferentiableAt ℝ f x) (hg : DifferentiableAt ℝ g x) : deriv (fun t => ⟪f t, g t⟫) x = ⟪f x, deriv g x⟫ + ⟪deriv f x, g x⟫ := (hf.hasDerivAt.inner 𝕜 hg.hasDerivAt).deriv #align deriv_inner_apply deriv_inner_apply theorem contDiff_norm_sq : ContDiff ℝ n fun x : E => ‖x‖ ^ 2 := by convert (reCLM : 𝕜 →L[ℝ] ℝ).contDiff.comp ((contDiff_id (E := E)).inner 𝕜 (contDiff_id (E := E))) exact (inner_self_eq_norm_sq _).symm #align cont_diff_norm_sq contDiff_norm_sq theorem ContDiff.norm_sq (hf : ContDiff ℝ n f) : ContDiff ℝ n fun x => ‖f x‖ ^ 2 := (contDiff_norm_sq 𝕜).comp hf #align cont_diff.norm_sq ContDiff.norm_sq theorem ContDiffWithinAt.norm_sq (hf : ContDiffWithinAt ℝ n f s x) : ContDiffWithinAt ℝ n (fun y => ‖f y‖ ^ 2) s x := (contDiff_norm_sq 𝕜).contDiffAt.comp_contDiffWithinAt x hf #align cont_diff_within_at.norm_sq ContDiffWithinAt.norm_sq nonrec theorem ContDiffAt.norm_sq (hf : ContDiffAt ℝ n f x) : ContDiffAt ℝ n (‖f ·‖ ^ 2) x := hf.norm_sq 𝕜 #align cont_diff_at.norm_sq ContDiffAt.norm_sq theorem contDiffAt_norm {x : E} (hx : x ≠ 0) : ContDiffAt ℝ n norm x := by have : ‖id x‖ ^ 2 ≠ 0 := pow_ne_zero 2 (norm_pos_iff.2 hx).ne' simpa only [id, sqrt_sq, norm_nonneg] using (contDiffAt_id.norm_sq 𝕜).sqrt this #align cont_diff_at_norm contDiffAt_norm theorem ContDiffAt.norm (hf : ContDiffAt ℝ n f x) (h0 : f x ≠ 0) : ContDiffAt ℝ n (fun y => ‖f y‖) x := (contDiffAt_norm 𝕜 h0).comp x hf #align cont_diff_at.norm ContDiffAt.norm theorem ContDiffAt.dist (hf : ContDiffAt ℝ n f x) (hg : ContDiffAt ℝ n g x) (hne : f x ≠ g x) : ContDiffAt ℝ n (fun y => dist (f y) (g y)) x := by simp only [dist_eq_norm] exact (hf.sub hg).norm 𝕜 (sub_ne_zero.2 hne) #align cont_diff_at.dist ContDiffAt.dist theorem ContDiffWithinAt.norm (hf : ContDiffWithinAt ℝ n f s x) (h0 : f x ≠ 0) : ContDiffWithinAt ℝ n (fun y => ‖f y‖) s x := (contDiffAt_norm 𝕜 h0).comp_contDiffWithinAt x hf #align cont_diff_within_at.norm ContDiffWithinAt.norm theorem ContDiffWithinAt.dist (hf : ContDiffWithinAt ℝ n f s x) (hg : ContDiffWithinAt ℝ n g s x) (hne : f x ≠ g x) : ContDiffWithinAt ℝ n (fun y => dist (f y) (g y)) s x := by simp only [dist_eq_norm]; exact (hf.sub hg).norm 𝕜 (sub_ne_zero.2 hne) #align cont_diff_within_at.dist ContDiffWithinAt.dist theorem ContDiffOn.norm_sq (hf : ContDiffOn ℝ n f s) : ContDiffOn ℝ n (fun y => ‖f y‖ ^ 2) s := fun x hx => (hf x hx).norm_sq 𝕜 #align cont_diff_on.norm_sq ContDiffOn.norm_sq theorem ContDiffOn.norm (hf : ContDiffOn ℝ n f s) (h0 : ∀ x ∈ s, f x ≠ 0) : ContDiffOn ℝ n (fun y => ‖f y‖) s := fun x hx => (hf x hx).norm 𝕜 (h0 x hx) #align cont_diff_on.norm ContDiffOn.norm theorem ContDiffOn.dist (hf : ContDiffOn ℝ n f s) (hg : ContDiffOn ℝ n g s) (hne : ∀ x ∈ s, f x ≠ g x) : ContDiffOn ℝ n (fun y => dist (f y) (g y)) s := fun x hx => (hf x hx).dist 𝕜 (hg x hx) (hne x hx) #align cont_diff_on.dist ContDiffOn.dist theorem ContDiff.norm (hf : ContDiff ℝ n f) (h0 : ∀ x, f x ≠ 0) : ContDiff ℝ n fun y => ‖f y‖ := contDiff_iff_contDiffAt.2 fun x => hf.contDiffAt.norm 𝕜 (h0 x) #align cont_diff.norm ContDiff.norm theorem ContDiff.dist (hf : ContDiff ℝ n f) (hg : ContDiff ℝ n g) (hne : ∀ x, f x ≠ g x) : ContDiff ℝ n fun y => dist (f y) (g y) := contDiff_iff_contDiffAt.2 fun x => hf.contDiffAt.dist 𝕜 hg.contDiffAt (hne x) #align cont_diff.dist ContDiff.dist -- Porting note: use `2 •` instead of `bit0`	Mathlib/Analysis/InnerProductSpace/Calculus.lean	218	223	theorem hasStrictFDerivAt_norm_sq (x : F) : HasStrictFDerivAt (fun x => ‖x‖ ^ 2) (2 • (innerSL ℝ x)) x := by	simp only [sq, ← @inner_self_eq_norm_mul_norm ℝ] convert (hasStrictFDerivAt_id x).inner ℝ (hasStrictFDerivAt_id x) ext y simp [two_smul, real_inner_comm]
import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Function.SimpleFunc import Mathlib.MeasureTheory.Measure.MutuallySingular import Mathlib.MeasureTheory.Measure.Count import Mathlib.Topology.IndicatorConstPointwise import Mathlib.MeasureTheory.Constructions.BorelSpace.Real #align_import measure_theory.integral.lebesgue from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" assert_not_exists NormedSpace set_option autoImplicit true noncomputable section open Set hiding restrict restrict_apply open Filter ENNReal open Function (support) open scoped Classical open Topology NNReal ENNReal MeasureTheory namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc variable {α β γ δ : Type} section Lintegral open SimpleFunc variable {m : MeasurableSpace α} {μ ν : Measure α} irreducible_def lintegral {_ : MeasurableSpace α} (μ : Measure α) (f : α → ℝ≥0∞) : ℝ≥0∞ := ⨆ (g : α →ₛ ℝ≥0∞) (_ : ⇑g ≤ f), g.lintegral μ #align measure_theory.lintegral MeasureTheory.lintegral @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => f)" ∂"μ:70 => lintegral μ r @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => lintegral volume f) => r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => f)" ∂"μ:70 => lintegral (Measure.restrict μ s) r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => lintegral (Measure.restrict volume s) f) => r theorem SimpleFunc.lintegral_eq_lintegral {m : MeasurableSpace α} (f : α →ₛ ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = f.lintegral μ := by rw [MeasureTheory.lintegral] exact le_antisymm (iSup₂_le fun g hg => lintegral_mono hg <\| le_rfl) (le_iSup₂_of_le f le_rfl le_rfl) #align measure_theory.simple_func.lintegral_eq_lintegral MeasureTheory.SimpleFunc.lintegral_eq_lintegral @[mono] theorem lintegral_mono' {m : MeasurableSpace α} ⦃μ ν : Measure α⦄ (hμν : μ ≤ ν) ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂ν := by rw [lintegral, lintegral] exact iSup_mono fun φ => iSup_mono' fun hφ => ⟨le_trans hφ hfg, lintegral_mono (le_refl φ) hμν⟩ #align measure_theory.lintegral_mono' MeasureTheory.lintegral_mono' -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn' ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) (h2 : μ ≤ ν) : lintegral μ f ≤ lintegral ν g := lintegral_mono' h2 hfg theorem lintegral_mono ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono' (le_refl μ) hfg #align measure_theory.lintegral_mono MeasureTheory.lintegral_mono -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) : lintegral μ f ≤ lintegral μ g := lintegral_mono hfg theorem lintegral_mono_nnreal {f g : α → ℝ≥0} (h : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono fun a => ENNReal.coe_le_coe.2 (h a) #align measure_theory.lintegral_mono_nnreal MeasureTheory.lintegral_mono_nnreal theorem iSup_lintegral_measurable_le_eq_lintegral (f : α → ℝ≥0∞) : ⨆ (g : α → ℝ≥0∞) (_ : Measurable g) (_ : g ≤ f), ∫⁻ a, g a ∂μ = ∫⁻ a, f a ∂μ := by apply le_antisymm · exact iSup_le fun i => iSup_le fun _ => iSup_le fun h'i => lintegral_mono h'i · rw [lintegral] refine iSup₂_le fun i hi => le_iSup₂_of_le i i.measurable <\| le_iSup_of_le hi ?_ exact le_of_eq (i.lintegral_eq_lintegral _).symm #align measure_theory.supr_lintegral_measurable_le_eq_lintegral MeasureTheory.iSup_lintegral_measurable_le_eq_lintegral theorem lintegral_mono_set {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ⊆ t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set MeasureTheory.lintegral_mono_set theorem lintegral_mono_set' {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ≤ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono' hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set' MeasureTheory.lintegral_mono_set' theorem monotone_lintegral {_ : MeasurableSpace α} (μ : Measure α) : Monotone (lintegral μ) := lintegral_mono #align measure_theory.monotone_lintegral MeasureTheory.monotone_lintegral @[simp] theorem lintegral_const (c : ℝ≥0∞) : ∫⁻ _, c ∂μ = c μ univ := by rw [← SimpleFunc.const_lintegral, ← SimpleFunc.lintegral_eq_lintegral, SimpleFunc.coe_const] rfl #align measure_theory.lintegral_const MeasureTheory.lintegral_const theorem lintegral_zero : ∫⁻ _ : α, 0 ∂μ = 0 := by simp #align measure_theory.lintegral_zero MeasureTheory.lintegral_zero theorem lintegral_zero_fun : lintegral μ (0 : α → ℝ≥0∞) = 0 := lintegral_zero #align measure_theory.lintegral_zero_fun MeasureTheory.lintegral_zero_fun -- @[simp] -- Porting note (#10618): simp can prove this theorem lintegral_one : ∫⁻ _, (1 : ℝ≥0∞) ∂μ = μ univ := by rw [lintegral_const, one_mul] #align measure_theory.lintegral_one MeasureTheory.lintegral_one theorem set_lintegral_const (s : Set α) (c : ℝ≥0∞) : ∫⁻ _ in s, c ∂μ = c * μ s := by rw [lintegral_const, Measure.restrict_apply_univ] #align measure_theory.set_lintegral_const MeasureTheory.set_lintegral_const theorem set_lintegral_one (s) : ∫⁻ _ in s, 1 ∂μ = μ s := by rw [set_lintegral_const, one_mul] #align measure_theory.set_lintegral_one MeasureTheory.set_lintegral_one theorem set_lintegral_const_lt_top [IsFiniteMeasure μ] (s : Set α) {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _ in s, c ∂μ < ∞ := by rw [lintegral_const] exact ENNReal.mul_lt_top hc (measure_ne_top (μ.restrict s) univ) #align measure_theory.set_lintegral_const_lt_top MeasureTheory.set_lintegral_const_lt_top theorem lintegral_const_lt_top [IsFiniteMeasure μ] {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _, c ∂μ < ∞ := by simpa only [Measure.restrict_univ] using set_lintegral_const_lt_top (univ : Set α) hc #align measure_theory.lintegral_const_lt_top MeasureTheory.lintegral_const_lt_top section variable (μ) theorem exists_measurable_le_lintegral_eq (f : α → ℝ≥0∞) : ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by rcases eq_or_ne (∫⁻ a, f a ∂μ) 0 with h₀ \| h₀ · exact ⟨0, measurable_zero, zero_le f, h₀.trans lintegral_zero.symm⟩ rcases exists_seq_strictMono_tendsto' h₀.bot_lt with ⟨L, _, hLf, hL_tendsto⟩ have : ∀ n, ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ L n < ∫⁻ a, g a ∂μ := by intro n simpa only [← iSup_lintegral_measurable_le_eq_lintegral f, lt_iSup_iff, exists_prop] using (hLf n).2 choose g hgm hgf hLg using this refine ⟨fun x => ⨆ n, g n x, measurable_iSup hgm, fun x => iSup_le fun n => hgf n x, le_antisymm ?_ ?_⟩ · refine le_of_tendsto' hL_tendsto fun n => (hLg n).le.trans <\| lintegral_mono fun x => ?_ exact le_iSup (fun n => g n x) n · exact lintegral_mono fun x => iSup_le fun n => hgf n x #align measure_theory.exists_measurable_le_lintegral_eq MeasureTheory.exists_measurable_le_lintegral_eq end theorem lintegral_eq_nnreal {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = ⨆ (φ : α →ₛ ℝ≥0) (_ : ∀ x, ↑(φ x) ≤ f x), (φ.map ((↑) : ℝ≥0 → ℝ≥0∞)).lintegral μ := by rw [lintegral] refine le_antisymm (iSup₂_le fun φ hφ => ?_) (iSup_mono' fun φ => ⟨φ.map ((↑) : ℝ≥0 → ℝ≥0∞), le_rfl⟩) by_cases h : ∀ᵐ a ∂μ, φ a ≠ ∞ · let ψ := φ.map ENNReal.toNNReal replace h : ψ.map ((↑) : ℝ≥0 → ℝ≥0∞) =ᵐ[μ] φ := h.mono fun a => ENNReal.coe_toNNReal have : ∀ x, ↑(ψ x) ≤ f x := fun x => le_trans ENNReal.coe_toNNReal_le_self (hφ x) exact le_iSup_of_le (φ.map ENNReal.toNNReal) (le_iSup_of_le this (ge_of_eq <\| lintegral_congr h)) · have h_meas : μ (φ ⁻¹' {∞}) ≠ 0 := mt measure_zero_iff_ae_nmem.1 h refine le_trans le_top (ge_of_eq <\| (iSup_eq_top _).2 fun b hb => ?_) obtain ⟨n, hn⟩ : ∃ n : ℕ, b < n * μ (φ ⁻¹' {∞}) := exists_nat_mul_gt h_meas (ne_of_lt hb) use (const α (n : ℝ≥0)).restrict (φ ⁻¹' {∞}) simp only [lt_iSup_iff, exists_prop, coe_restrict, φ.measurableSet_preimage, coe_const, ENNReal.coe_indicator, map_coe_ennreal_restrict, SimpleFunc.map_const, ENNReal.coe_natCast, restrict_const_lintegral] refine ⟨indicator_le fun x hx => le_trans ?_ (hφ _), hn⟩ simp only [mem_preimage, mem_singleton_iff] at hx simp only [hx, le_top] #align measure_theory.lintegral_eq_nnreal MeasureTheory.lintegral_eq_nnreal theorem exists_simpleFunc_forall_lintegral_sub_lt_of_pos {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) : ∃ φ : α →ₛ ℝ≥0, (∀ x, ↑(φ x) ≤ f x) ∧ ∀ ψ : α →ₛ ℝ≥0, (∀ x, ↑(ψ x) ≤ f x) → (map (↑) (ψ - φ)).lintegral μ < ε := by rw [lintegral_eq_nnreal] at h have := ENNReal.lt_add_right h hε erw [ENNReal.biSup_add] at this <;> [skip; exact ⟨0, fun x => zero_le _⟩] simp_rw [lt_iSup_iff, iSup_lt_iff, iSup_le_iff] at this rcases this with ⟨φ, hle : ∀ x, ↑(φ x) ≤ f x, b, hbφ, hb⟩ refine ⟨φ, hle, fun ψ hψ => ?_⟩ have : (map (↑) φ).lintegral μ ≠ ∞ := ne_top_of_le_ne_top h (by exact le_iSup₂ (α := ℝ≥0∞) φ hle) rw [← ENNReal.add_lt_add_iff_left this, ← add_lintegral, ← SimpleFunc.map_add @ENNReal.coe_add] refine (hb _ fun x => le_trans ?_ (max_le (hle x) (hψ x))).trans_lt hbφ norm_cast simp only [add_apply, sub_apply, add_tsub_eq_max] rfl #align measure_theory.exists_simple_func_forall_lintegral_sub_lt_of_pos MeasureTheory.exists_simpleFunc_forall_lintegral_sub_lt_of_pos theorem iSup_lintegral_le {ι : Sort} (f : ι → α → ℝ≥0∞) : ⨆ i, ∫⁻ a, f i a ∂μ ≤ ∫⁻ a, ⨆ i, f i a ∂μ := by simp only [← iSup_apply] exact (monotone_lintegral μ).le_map_iSup #align measure_theory.supr_lintegral_le MeasureTheory.iSup_lintegral_le theorem iSup₂_lintegral_le {ι : Sort} {ι' : ι → Sort} (f : ∀ i, ι' i → α → ℝ≥0∞) : ⨆ (i) (j), ∫⁻ a, f i j a ∂μ ≤ ∫⁻ a, ⨆ (i) (j), f i j a ∂μ := by convert (monotone_lintegral μ).le_map_iSup₂ f with a simp only [iSup_apply] #align measure_theory.supr₂_lintegral_le MeasureTheory.iSup₂_lintegral_le theorem le_iInf_lintegral {ι : Sort} (f : ι → α → ℝ≥0∞) : ∫⁻ a, ⨅ i, f i a ∂μ ≤ ⨅ i, ∫⁻ a, f i a ∂μ := by simp only [← iInf_apply] exact (monotone_lintegral μ).map_iInf_le #align measure_theory.le_infi_lintegral MeasureTheory.le_iInf_lintegral theorem le_iInf₂_lintegral {ι : Sort} {ι' : ι → Sort} (f : ∀ i, ι' i → α → ℝ≥0∞) : ∫⁻ a, ⨅ (i) (h : ι' i), f i h a ∂μ ≤ ⨅ (i) (h : ι' i), ∫⁻ a, f i h a ∂μ := by convert (monotone_lintegral μ).map_iInf₂_le f with a simp only [iInf_apply] #align measure_theory.le_infi₂_lintegral MeasureTheory.le_iInf₂_lintegral theorem lintegral_mono_ae {f g : α → ℝ≥0∞} (h : ∀ᵐ a ∂μ, f a ≤ g a) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := by rcases exists_measurable_superset_of_null h with ⟨t, hts, ht, ht0⟩ have : ∀ᵐ x ∂μ, x ∉ t := measure_zero_iff_ae_nmem.1 ht0 rw [lintegral, lintegral] refine iSup_le fun s => iSup_le fun hfs => le_iSup_of_le (s.restrict tᶜ) <\| le_iSup_of_le ?_ ?_ · intro a by_cases h : a ∈ t <;> simp only [restrict_apply s ht.compl, mem_compl_iff, h, not_true, not_false_eq_true, indicator_of_not_mem, zero_le, not_false_eq_true, indicator_of_mem] exact le_trans (hfs a) (_root_.by_contradiction fun hnfg => h (hts hnfg)) · refine le_of_eq (SimpleFunc.lintegral_congr <\| this.mono fun a hnt => ?_) by_cases hat : a ∈ t <;> simp only [restrict_apply s ht.compl, mem_compl_iff, hat, not_true, not_false_eq_true, indicator_of_not_mem, not_false_eq_true, indicator_of_mem] exact (hnt hat).elim #align measure_theory.lintegral_mono_ae MeasureTheory.lintegral_mono_ae theorem set_lintegral_mono_ae {s : Set α} {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := lintegral_mono_ae <\| (ae_restrict_iff <\| measurableSet_le hf hg).2 hfg #align measure_theory.set_lintegral_mono_ae MeasureTheory.set_lintegral_mono_ae theorem set_lintegral_mono {s : Set α} {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (hfg : ∀ x ∈ s, f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := set_lintegral_mono_ae hf hg (ae_of_all _ hfg) #align measure_theory.set_lintegral_mono MeasureTheory.set_lintegral_mono theorem set_lintegral_mono_ae' {s : Set α} {f g : α → ℝ≥0∞} (hs : MeasurableSet s) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := lintegral_mono_ae <\| (ae_restrict_iff' hs).2 hfg theorem set_lintegral_mono' {s : Set α} {f g : α → ℝ≥0∞} (hs : MeasurableSet s) (hfg : ∀ x ∈ s, f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := set_lintegral_mono_ae' hs (ae_of_all _ hfg) theorem set_lintegral_le_lintegral (s : Set α) (f : α → ℝ≥0∞) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x, f x ∂μ := lintegral_mono' Measure.restrict_le_self le_rfl theorem lintegral_congr_ae {f g : α → ℝ≥0∞} (h : f =ᵐ[μ] g) : ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := le_antisymm (lintegral_mono_ae <\| h.le) (lintegral_mono_ae <\| h.symm.le) #align measure_theory.lintegral_congr_ae MeasureTheory.lintegral_congr_ae theorem lintegral_congr {f g : α → ℝ≥0∞} (h : ∀ a, f a = g a) : ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by simp only [h] #align measure_theory.lintegral_congr MeasureTheory.lintegral_congr theorem set_lintegral_congr {f : α → ℝ≥0∞} {s t : Set α} (h : s =ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ = ∫⁻ x in t, f x ∂μ := by rw [Measure.restrict_congr_set h] #align measure_theory.set_lintegral_congr MeasureTheory.set_lintegral_congr theorem set_lintegral_congr_fun {f g : α → ℝ≥0∞} {s : Set α} (hs : MeasurableSet s) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x = g x) : ∫⁻ x in s, f x ∂μ = ∫⁻ x in s, g x ∂μ := by rw [lintegral_congr_ae] rw [EventuallyEq] rwa [ae_restrict_iff' hs] #align measure_theory.set_lintegral_congr_fun MeasureTheory.set_lintegral_congr_fun theorem lintegral_ofReal_le_lintegral_nnnorm (f : α → ℝ) : ∫⁻ x, ENNReal.ofReal (f x) ∂μ ≤ ∫⁻ x, ‖f x‖₊ ∂μ := by simp_rw [← ofReal_norm_eq_coe_nnnorm] refine lintegral_mono fun x => ENNReal.ofReal_le_ofReal ?_ rw [Real.norm_eq_abs] exact le_abs_self (f x) #align measure_theory.lintegral_of_real_le_lintegral_nnnorm MeasureTheory.lintegral_ofReal_le_lintegral_nnnorm theorem lintegral_nnnorm_eq_of_ae_nonneg {f : α → ℝ} (h_nonneg : 0 ≤ᵐ[μ] f) : ∫⁻ x, ‖f x‖₊ ∂μ = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := by apply lintegral_congr_ae filter_upwards [h_nonneg] with x hx rw [Real.nnnorm_of_nonneg hx, ENNReal.ofReal_eq_coe_nnreal hx] #align measure_theory.lintegral_nnnorm_eq_of_ae_nonneg MeasureTheory.lintegral_nnnorm_eq_of_ae_nonneg theorem lintegral_nnnorm_eq_of_nonneg {f : α → ℝ} (h_nonneg : 0 ≤ f) : ∫⁻ x, ‖f x‖₊ ∂μ = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := lintegral_nnnorm_eq_of_ae_nonneg (Filter.eventually_of_forall h_nonneg) #align measure_theory.lintegral_nnnorm_eq_of_nonneg MeasureTheory.lintegral_nnnorm_eq_of_nonneg theorem lintegral_iSup {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, Measurable (f n)) (h_mono : Monotone f) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by set c : ℝ≥0 → ℝ≥0∞ := (↑) set F := fun a : α => ⨆ n, f n a refine le_antisymm ?_ (iSup_lintegral_le _) rw [lintegral_eq_nnreal] refine iSup_le fun s => iSup_le fun hsf => ?_ refine ENNReal.le_of_forall_lt_one_mul_le fun a ha => ?_ rcases ENNReal.lt_iff_exists_coe.1 ha with ⟨r, rfl, _⟩ have ha : r < 1 := ENNReal.coe_lt_coe.1 ha let rs := s.map fun a => r * a have eq_rs : rs.map c = (const α r : α →ₛ ℝ≥0∞) * map c s := rfl have eq : ∀ p, rs.map c ⁻¹' {p} = ⋃ n, rs.map c ⁻¹' {p} ∩ { a \| p ≤ f n a } := by intro p rw [← inter_iUnion]; nth_rw 1 [← inter_univ (map c rs ⁻¹' {p})] refine Set.ext fun x => and_congr_right fun hx => true_iff_iff.2 ?_ by_cases p_eq : p = 0 · simp [p_eq] simp only [coe_map, mem_preimage, Function.comp_apply, mem_singleton_iff] at hx subst hx have : r * s x ≠ 0 := by rwa [Ne, ← ENNReal.coe_eq_zero] have : s x ≠ 0 := right_ne_zero_of_mul this have : (rs.map c) x < ⨆ n : ℕ, f n x := by refine lt_of_lt_of_le (ENNReal.coe_lt_coe.2 ?_) (hsf x) suffices r * s x < 1 * s x by simpa exact mul_lt_mul_of_pos_right ha (pos_iff_ne_zero.2 this) rcases lt_iSup_iff.1 this with ⟨i, hi⟩ exact mem_iUnion.2 ⟨i, le_of_lt hi⟩ have mono : ∀ r : ℝ≥0∞, Monotone fun n => rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a } := by intro r i j h refine inter_subset_inter_right _ ?_ simp_rw [subset_def, mem_setOf] intro x hx exact le_trans hx (h_mono h x) have h_meas : ∀ n, MeasurableSet {a : α \| map c rs a ≤ f n a} := fun n => measurableSet_le (SimpleFunc.measurable _) (hf n) calc (r : ℝ≥0∞) * (s.map c).lintegral μ = ∑ r ∈ (rs.map c).range, r * μ (rs.map c ⁻¹' {r}) := by rw [← const_mul_lintegral, eq_rs, SimpleFunc.lintegral] _ = ∑ r ∈ (rs.map c).range, r * μ (⋃ n, rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := by simp only [(eq _).symm] _ = ∑ r ∈ (rs.map c).range, ⨆ n, r * μ (rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := (Finset.sum_congr rfl fun x _ => by rw [measure_iUnion_eq_iSup (mono x).directed_le, ENNReal.mul_iSup]) _ = ⨆ n, ∑ r ∈ (rs.map c).range, r * μ (rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := by refine ENNReal.finset_sum_iSup_nat fun p i j h ↦ ?_ gcongr _ * μ ?_ exact mono p h _ ≤ ⨆ n : ℕ, ((rs.map c).restrict { a \| (rs.map c) a ≤ f n a }).lintegral μ := by gcongr with n rw [restrict_lintegral _ (h_meas n)] refine le_of_eq (Finset.sum_congr rfl fun r _ => ?_) congr 2 with a refine and_congr_right ?_ simp (config := { contextual := true }) _ ≤ ⨆ n, ∫⁻ a, f n a ∂μ := by simp only [← SimpleFunc.lintegral_eq_lintegral] gcongr with n a simp only [map_apply] at h_meas simp only [coe_map, restrict_apply _ (h_meas _), (· ∘ ·)] exact indicator_apply_le id #align measure_theory.lintegral_supr MeasureTheory.lintegral_iSup theorem lintegral_iSup' {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n => f n x) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iSup_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Monotone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_mono have h_ae_seq_mono : Monotone (aeSeq hf p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet hf p · exact aeSeq.prop_of_mem_aeSeqSet hf hx hnm · simp only [aeSeq, hx, if_false, le_rfl] rw [lintegral_congr_ae (aeSeq.iSup hf hp).symm] simp_rw [iSup_apply] rw [lintegral_iSup (aeSeq.measurable hf p) h_ae_seq_mono] congr with n exact lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae hf hp n) #align measure_theory.lintegral_supr' MeasureTheory.lintegral_iSup' theorem lintegral_tendsto_of_tendsto_of_monotone {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n => f n x) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n => f n x) atTop (𝓝 <\| F x)) : Tendsto (fun n => ∫⁻ x, f n x ∂μ) atTop (𝓝 <\| ∫⁻ x, F x ∂μ) := by have : Monotone fun n => ∫⁻ x, f n x ∂μ := fun i j hij => lintegral_mono_ae (h_mono.mono fun x hx => hx hij) suffices key : ∫⁻ x, F x ∂μ = ⨆ n, ∫⁻ x, f n x ∂μ by rw [key] exact tendsto_atTop_iSup this rw [← lintegral_iSup' hf h_mono] refine lintegral_congr_ae ?_ filter_upwards [h_mono, h_tendsto] with _ hx_mono hx_tendsto using tendsto_nhds_unique hx_tendsto (tendsto_atTop_iSup hx_mono) #align measure_theory.lintegral_tendsto_of_tendsto_of_monotone MeasureTheory.lintegral_tendsto_of_tendsto_of_monotone theorem lintegral_eq_iSup_eapprox_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂μ = ⨆ n, (eapprox f n).lintegral μ := calc ∫⁻ a, f a ∂μ = ∫⁻ a, ⨆ n, (eapprox f n : α → ℝ≥0∞) a ∂μ := by congr; ext a; rw [iSup_eapprox_apply f hf] _ = ⨆ n, ∫⁻ a, (eapprox f n : α → ℝ≥0∞) a ∂μ := by apply lintegral_iSup · measurability · intro i j h exact monotone_eapprox f h _ = ⨆ n, (eapprox f n).lintegral μ := by congr; ext n; rw [(eapprox f n).lintegral_eq_lintegral] #align measure_theory.lintegral_eq_supr_eapprox_lintegral MeasureTheory.lintegral_eq_iSup_eapprox_lintegral theorem exists_pos_set_lintegral_lt_of_measure_lt {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) : ∃ δ > 0, ∀ s, μ s < δ → ∫⁻ x in s, f x ∂μ < ε := by rcases exists_between (pos_iff_ne_zero.mpr hε) with ⟨ε₂, hε₂0, hε₂ε⟩ rcases exists_between hε₂0 with ⟨ε₁, hε₁0, hε₁₂⟩ rcases exists_simpleFunc_forall_lintegral_sub_lt_of_pos h hε₁0.ne' with ⟨φ, _, hφ⟩ rcases φ.exists_forall_le with ⟨C, hC⟩ use (ε₂ - ε₁) / C, ENNReal.div_pos_iff.2 ⟨(tsub_pos_iff_lt.2 hε₁₂).ne', ENNReal.coe_ne_top⟩ refine fun s hs => lt_of_le_of_lt ?_ hε₂ε simp only [lintegral_eq_nnreal, iSup_le_iff] intro ψ hψ calc (map (↑) ψ).lintegral (μ.restrict s) ≤ (map (↑) φ).lintegral (μ.restrict s) + (map (↑) (ψ - φ)).lintegral (μ.restrict s) := by rw [← SimpleFunc.add_lintegral, ← SimpleFunc.map_add @ENNReal.coe_add] refine SimpleFunc.lintegral_mono (fun x => ?_) le_rfl simp only [add_tsub_eq_max, le_max_right, coe_map, Function.comp_apply, SimpleFunc.coe_add, SimpleFunc.coe_sub, Pi.add_apply, Pi.sub_apply, ENNReal.coe_max (φ x) (ψ x)] _ ≤ (map (↑) φ).lintegral (μ.restrict s) + ε₁ := by gcongr refine le_trans ?_ (hφ _ hψ).le exact SimpleFunc.lintegral_mono le_rfl Measure.restrict_le_self _ ≤ (SimpleFunc.const α (C : ℝ≥0∞)).lintegral (μ.restrict s) + ε₁ := by gcongr exact SimpleFunc.lintegral_mono (fun x ↦ ENNReal.coe_le_coe.2 (hC x)) le_rfl _ = C * μ s + ε₁ := by simp only [← SimpleFunc.lintegral_eq_lintegral, coe_const, lintegral_const, Measure.restrict_apply, MeasurableSet.univ, univ_inter, Function.const] _ ≤ C * ((ε₂ - ε₁) / C) + ε₁ := by gcongr _ ≤ ε₂ - ε₁ + ε₁ := by gcongr; apply mul_div_le _ = ε₂ := tsub_add_cancel_of_le hε₁₂.le #align measure_theory.exists_pos_set_lintegral_lt_of_measure_lt MeasureTheory.exists_pos_set_lintegral_lt_of_measure_lt theorem tendsto_set_lintegral_zero {ι} {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {l : Filter ι} {s : ι → Set α} (hl : Tendsto (μ ∘ s) l (𝓝 0)) : Tendsto (fun i => ∫⁻ x in s i, f x ∂μ) l (𝓝 0) := by simp only [ENNReal.nhds_zero, tendsto_iInf, tendsto_principal, mem_Iio, ← pos_iff_ne_zero] at hl ⊢ intro ε ε0 rcases exists_pos_set_lintegral_lt_of_measure_lt h ε0.ne' with ⟨δ, δ0, hδ⟩ exact (hl δ δ0).mono fun i => hδ _ #align measure_theory.tendsto_set_lintegral_zero MeasureTheory.tendsto_set_lintegral_zero theorem le_lintegral_add (f g : α → ℝ≥0∞) : ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ ≤ ∫⁻ a, f a + g a ∂μ := by simp only [lintegral] refine ENNReal.biSup_add_biSup_le' (p := fun h : α →ₛ ℝ≥0∞ => h ≤ f) (q := fun h : α →ₛ ℝ≥0∞ => h ≤ g) ⟨0, zero_le f⟩ ⟨0, zero_le g⟩ fun f' hf' g' hg' => ?_ exact le_iSup₂_of_le (f' + g') (add_le_add hf' hg') (add_lintegral _ _).ge #align measure_theory.le_lintegral_add MeasureTheory.le_lintegral_add -- Use stronger lemmas `lintegral_add_left`/`lintegral_add_right` instead theorem lintegral_add_aux {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := calc ∫⁻ a, f a + g a ∂μ = ∫⁻ a, (⨆ n, (eapprox f n : α → ℝ≥0∞) a) + ⨆ n, (eapprox g n : α → ℝ≥0∞) a ∂μ := by simp only [iSup_eapprox_apply, hf, hg] _ = ∫⁻ a, ⨆ n, (eapprox f n + eapprox g n : α → ℝ≥0∞) a ∂μ := by congr; funext a rw [ENNReal.iSup_add_iSup_of_monotone] · simp only [Pi.add_apply] · intro i j h exact monotone_eapprox _ h a · intro i j h exact monotone_eapprox _ h a _ = ⨆ n, (eapprox f n).lintegral μ + (eapprox g n).lintegral μ := by rw [lintegral_iSup] · congr funext n rw [← SimpleFunc.add_lintegral, ← SimpleFunc.lintegral_eq_lintegral] simp only [Pi.add_apply, SimpleFunc.coe_add] · measurability · intro i j h a dsimp gcongr <;> exact monotone_eapprox _ h _ _ = (⨆ n, (eapprox f n).lintegral μ) + ⨆ n, (eapprox g n).lintegral μ := by refine (ENNReal.iSup_add_iSup_of_monotone ?_ ?_).symm <;> · intro i j h exact SimpleFunc.lintegral_mono (monotone_eapprox _ h) le_rfl _ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by rw [lintegral_eq_iSup_eapprox_lintegral hf, lintegral_eq_iSup_eapprox_lintegral hg] #align measure_theory.lintegral_add_aux MeasureTheory.lintegral_add_aux @[simp] theorem lintegral_add_left {f : α → ℝ≥0∞} (hf : Measurable f) (g : α → ℝ≥0∞) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by refine le_antisymm ?_ (le_lintegral_add _ _) rcases exists_measurable_le_lintegral_eq μ fun a => f a + g a with ⟨φ, hφm, hφ_le, hφ_eq⟩ calc ∫⁻ a, f a + g a ∂μ = ∫⁻ a, φ a ∂μ := hφ_eq _ ≤ ∫⁻ a, f a + (φ a - f a) ∂μ := lintegral_mono fun a => le_add_tsub _ = ∫⁻ a, f a ∂μ + ∫⁻ a, φ a - f a ∂μ := lintegral_add_aux hf (hφm.sub hf) _ ≤ ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := add_le_add_left (lintegral_mono fun a => tsub_le_iff_left.2 <\| hφ_le a) _ #align measure_theory.lintegral_add_left MeasureTheory.lintegral_add_left theorem lintegral_add_left' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (g : α → ℝ≥0∞) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by rw [lintegral_congr_ae hf.ae_eq_mk, ← lintegral_add_left hf.measurable_mk, lintegral_congr_ae (hf.ae_eq_mk.add (ae_eq_refl g))] #align measure_theory.lintegral_add_left' MeasureTheory.lintegral_add_left' theorem lintegral_add_right' (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : AEMeasurable g μ) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by simpa only [add_comm] using lintegral_add_left' hg f #align measure_theory.lintegral_add_right' MeasureTheory.lintegral_add_right' @[simp] theorem lintegral_add_right (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : Measurable g) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := lintegral_add_right' f hg.aemeasurable #align measure_theory.lintegral_add_right MeasureTheory.lintegral_add_right @[simp] theorem lintegral_smul_measure (c : ℝ≥0∞) (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂c • μ = c * ∫⁻ a, f a ∂μ := by simp only [lintegral, iSup_subtype', SimpleFunc.lintegral_smul, ENNReal.mul_iSup, smul_eq_mul] #align measure_theory.lintegral_smul_measure MeasureTheory.lintegral_smul_measure lemma set_lintegral_smul_measure (c : ℝ≥0∞) (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a in s, f a ∂(c • μ) = c * ∫⁻ a in s, f a ∂μ := by rw [Measure.restrict_smul, lintegral_smul_measure] @[simp] theorem lintegral_sum_measure {m : MeasurableSpace α} {ι} (f : α → ℝ≥0∞) (μ : ι → Measure α) : ∫⁻ a, f a ∂Measure.sum μ = ∑' i, ∫⁻ a, f a ∂μ i := by simp only [lintegral, iSup_subtype', SimpleFunc.lintegral_sum, ENNReal.tsum_eq_iSup_sum] rw [iSup_comm] congr; funext s induction' s using Finset.induction_on with i s hi hs · simp simp only [Finset.sum_insert hi, ← hs] refine (ENNReal.iSup_add_iSup ?_).symm intro φ ψ exact ⟨⟨φ ⊔ ψ, fun x => sup_le (φ.2 x) (ψ.2 x)⟩, add_le_add (SimpleFunc.lintegral_mono le_sup_left le_rfl) (Finset.sum_le_sum fun j _ => SimpleFunc.lintegral_mono le_sup_right le_rfl)⟩ #align measure_theory.lintegral_sum_measure MeasureTheory.lintegral_sum_measure theorem hasSum_lintegral_measure {ι} {_ : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : ι → Measure α) : HasSum (fun i => ∫⁻ a, f a ∂μ i) (∫⁻ a, f a ∂Measure.sum μ) := (lintegral_sum_measure f μ).symm ▸ ENNReal.summable.hasSum #align measure_theory.has_sum_lintegral_measure MeasureTheory.hasSum_lintegral_measure @[simp] theorem lintegral_add_measure {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ ν : Measure α) : ∫⁻ a, f a ∂(μ + ν) = ∫⁻ a, f a ∂μ + ∫⁻ a, f a ∂ν := by simpa [tsum_fintype] using lintegral_sum_measure f fun b => cond b μ ν #align measure_theory.lintegral_add_measure MeasureTheory.lintegral_add_measure @[simp] theorem lintegral_finset_sum_measure {ι} {m : MeasurableSpace α} (s : Finset ι) (f : α → ℝ≥0∞) (μ : ι → Measure α) : ∫⁻ a, f a ∂(∑ i ∈ s, μ i) = ∑ i ∈ s, ∫⁻ a, f a ∂μ i := by rw [← Measure.sum_coe_finset, lintegral_sum_measure, ← Finset.tsum_subtype'] simp only [Finset.coe_sort_coe] #align measure_theory.lintegral_finset_sum_measure MeasureTheory.lintegral_finset_sum_measure @[simp] theorem lintegral_zero_measure {m : MeasurableSpace α} (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂(0 : Measure α) = 0 := by simp [lintegral] #align measure_theory.lintegral_zero_measure MeasureTheory.lintegral_zero_measure @[simp] theorem lintegral_of_isEmpty {α} [MeasurableSpace α] [IsEmpty α] (μ : Measure α) (f : α → ℝ≥0∞) : ∫⁻ x, f x ∂μ = 0 := by have : Subsingleton (Measure α) := inferInstance convert lintegral_zero_measure f theorem set_lintegral_empty (f : α → ℝ≥0∞) : ∫⁻ x in ∅, f x ∂μ = 0 := by rw [Measure.restrict_empty, lintegral_zero_measure] #align measure_theory.set_lintegral_empty MeasureTheory.set_lintegral_empty theorem set_lintegral_univ (f : α → ℝ≥0∞) : ∫⁻ x in univ, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [Measure.restrict_univ] #align measure_theory.set_lintegral_univ MeasureTheory.set_lintegral_univ theorem set_lintegral_measure_zero (s : Set α) (f : α → ℝ≥0∞) (hs' : μ s = 0) : ∫⁻ x in s, f x ∂μ = 0 := by convert lintegral_zero_measure _ exact Measure.restrict_eq_zero.2 hs' #align measure_theory.set_lintegral_measure_zero MeasureTheory.set_lintegral_measure_zero theorem lintegral_finset_sum' (s : Finset β) {f : β → α → ℝ≥0∞} (hf : ∀ b ∈ s, AEMeasurable (f b) μ) : ∫⁻ a, ∑ b ∈ s, f b a ∂μ = ∑ b ∈ s, ∫⁻ a, f b a ∂μ := by induction' s using Finset.induction_on with a s has ih · simp · simp only [Finset.sum_insert has] rw [Finset.forall_mem_insert] at hf rw [lintegral_add_left' hf.1, ih hf.2] #align measure_theory.lintegral_finset_sum' MeasureTheory.lintegral_finset_sum' theorem lintegral_finset_sum (s : Finset β) {f : β → α → ℝ≥0∞} (hf : ∀ b ∈ s, Measurable (f b)) : ∫⁻ a, ∑ b ∈ s, f b a ∂μ = ∑ b ∈ s, ∫⁻ a, f b a ∂μ := lintegral_finset_sum' s fun b hb => (hf b hb).aemeasurable #align measure_theory.lintegral_finset_sum MeasureTheory.lintegral_finset_sum @[simp] theorem lintegral_const_mul (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := calc ∫⁻ a, r * f a ∂μ = ∫⁻ a, ⨆ n, (const α r * eapprox f n) a ∂μ := by congr funext a rw [← iSup_eapprox_apply f hf, ENNReal.mul_iSup] simp _ = ⨆ n, r * (eapprox f n).lintegral μ := by rw [lintegral_iSup] · congr funext n rw [← SimpleFunc.const_mul_lintegral, ← SimpleFunc.lintegral_eq_lintegral] · intro n exact SimpleFunc.measurable _ · intro i j h a exact mul_le_mul_left' (monotone_eapprox _ h _) _ _ = r * ∫⁻ a, f a ∂μ := by rw [← ENNReal.mul_iSup, lintegral_eq_iSup_eapprox_lintegral hf] #align measure_theory.lintegral_const_mul MeasureTheory.lintegral_const_mul theorem lintegral_const_mul'' (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := by have A : ∫⁻ a, f a ∂μ = ∫⁻ a, hf.mk f a ∂μ := lintegral_congr_ae hf.ae_eq_mk have B : ∫⁻ a, r * f a ∂μ = ∫⁻ a, r * hf.mk f a ∂μ := lintegral_congr_ae (EventuallyEq.fun_comp hf.ae_eq_mk _) rw [A, B, lintegral_const_mul _ hf.measurable_mk] #align measure_theory.lintegral_const_mul'' MeasureTheory.lintegral_const_mul'' theorem lintegral_const_mul_le (r : ℝ≥0∞) (f : α → ℝ≥0∞) : r * ∫⁻ a, f a ∂μ ≤ ∫⁻ a, r * f a ∂μ := by rw [lintegral, ENNReal.mul_iSup] refine iSup_le fun s => ?_ rw [ENNReal.mul_iSup, iSup_le_iff] intro hs rw [← SimpleFunc.const_mul_lintegral, lintegral] refine le_iSup_of_le (const α r * s) (le_iSup_of_le (fun x => ?_) le_rfl) exact mul_le_mul_left' (hs x) _ #align measure_theory.lintegral_const_mul_le MeasureTheory.lintegral_const_mul_le theorem lintegral_const_mul' (r : ℝ≥0∞) (f : α → ℝ≥0∞) (hr : r ≠ ∞) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := by by_cases h : r = 0 · simp [h] apply le_antisymm _ (lintegral_const_mul_le r f) have rinv : r * r⁻¹ = 1 := ENNReal.mul_inv_cancel h hr have rinv' : r⁻¹ * r = 1 := by rw [mul_comm] exact rinv have := lintegral_const_mul_le (μ := μ) r⁻¹ fun x => r * f x simp? [(mul_assoc _ _ _).symm, rinv'] at this says simp only [(mul_assoc _ _ _).symm, rinv', one_mul] at this simpa [(mul_assoc _ _ _).symm, rinv] using mul_le_mul_left' this r #align measure_theory.lintegral_const_mul' MeasureTheory.lintegral_const_mul' theorem lintegral_mul_const (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul r hf] #align measure_theory.lintegral_mul_const MeasureTheory.lintegral_mul_const theorem lintegral_mul_const'' (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul'' r hf] #align measure_theory.lintegral_mul_const'' MeasureTheory.lintegral_mul_const'' theorem lintegral_mul_const_le (r : ℝ≥0∞) (f : α → ℝ≥0∞) : (∫⁻ a, f a ∂μ) * r ≤ ∫⁻ a, f a * r ∂μ := by simp_rw [mul_comm, lintegral_const_mul_le r f] #align measure_theory.lintegral_mul_const_le MeasureTheory.lintegral_mul_const_le theorem lintegral_mul_const' (r : ℝ≥0∞) (f : α → ℝ≥0∞) (hr : r ≠ ∞) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul' r f hr] #align measure_theory.lintegral_mul_const' MeasureTheory.lintegral_mul_const' theorem lintegral_lintegral_mul {β} [MeasurableSpace β] {ν : Measure β} {f : α → ℝ≥0∞} {g : β → ℝ≥0∞} (hf : AEMeasurable f μ) (hg : AEMeasurable g ν) : ∫⁻ x, ∫⁻ y, f x * g y ∂ν ∂μ = (∫⁻ x, f x ∂μ) * ∫⁻ y, g y ∂ν := by simp [lintegral_const_mul'' _ hg, lintegral_mul_const'' _ hf] #align measure_theory.lintegral_lintegral_mul MeasureTheory.lintegral_lintegral_mul -- TODO: Need a better way of rewriting inside of an integral theorem lintegral_rw₁ {f f' : α → β} (h : f =ᵐ[μ] f') (g : β → ℝ≥0∞) : ∫⁻ a, g (f a) ∂μ = ∫⁻ a, g (f' a) ∂μ := lintegral_congr_ae <\| h.mono fun a h => by dsimp only; rw [h] #align measure_theory.lintegral_rw₁ MeasureTheory.lintegral_rw₁ -- TODO: Need a better way of rewriting inside of an integral theorem lintegral_rw₂ {f₁ f₁' : α → β} {f₂ f₂' : α → γ} (h₁ : f₁ =ᵐ[μ] f₁') (h₂ : f₂ =ᵐ[μ] f₂') (g : β → γ → ℝ≥0∞) : ∫⁻ a, g (f₁ a) (f₂ a) ∂μ = ∫⁻ a, g (f₁' a) (f₂' a) ∂μ := lintegral_congr_ae <\| h₁.mp <\| h₂.mono fun _ h₂ h₁ => by dsimp only; rw [h₁, h₂] #align measure_theory.lintegral_rw₂ MeasureTheory.lintegral_rw₂ theorem lintegral_indicator_le (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a, s.indicator f a ∂μ ≤ ∫⁻ a in s, f a ∂μ := by simp only [lintegral] apply iSup_le (fun g ↦ (iSup_le (fun hg ↦ ?_))) have : g ≤ f := hg.trans (indicator_le_self s f) refine le_iSup_of_le g (le_iSup_of_le this (le_of_eq ?_)) rw [lintegral_restrict, SimpleFunc.lintegral] congr with t by_cases H : t = 0 · simp [H] congr with x simp only [mem_preimage, mem_singleton_iff, mem_inter_iff, iff_self_and] rintro rfl contrapose! H simpa [H] using hg x @[simp] theorem lintegral_indicator (f : α → ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : ∫⁻ a, s.indicator f a ∂μ = ∫⁻ a in s, f a ∂μ := by apply le_antisymm (lintegral_indicator_le f s) simp only [lintegral, ← restrict_lintegral_eq_lintegral_restrict _ hs, iSup_subtype'] refine iSup_mono' (Subtype.forall.2 fun φ hφ => ?_) refine ⟨⟨φ.restrict s, fun x => ?_⟩, le_rfl⟩ simp [hφ x, hs, indicator_le_indicator] #align measure_theory.lintegral_indicator MeasureTheory.lintegral_indicator theorem lintegral_indicator₀ (f : α → ℝ≥0∞) {s : Set α} (hs : NullMeasurableSet s μ) : ∫⁻ a, s.indicator f a ∂μ = ∫⁻ a in s, f a ∂μ := by rw [← lintegral_congr_ae (indicator_ae_eq_of_ae_eq_set hs.toMeasurable_ae_eq), lintegral_indicator _ (measurableSet_toMeasurable _ _), Measure.restrict_congr_set hs.toMeasurable_ae_eq] #align measure_theory.lintegral_indicator₀ MeasureTheory.lintegral_indicator₀ theorem lintegral_indicator_const_le (s : Set α) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ ≤ c * μ s := (lintegral_indicator_le _ _).trans (set_lintegral_const s c).le theorem lintegral_indicator_const₀ {s : Set α} (hs : NullMeasurableSet s μ) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ = c * μ s := by rw [lintegral_indicator₀ _ hs, set_lintegral_const] theorem lintegral_indicator_const {s : Set α} (hs : MeasurableSet s) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ = c * μ s := lintegral_indicator_const₀ hs.nullMeasurableSet c #align measure_theory.lintegral_indicator_const MeasureTheory.lintegral_indicator_const theorem set_lintegral_eq_const {f : α → ℝ≥0∞} (hf : Measurable f) (r : ℝ≥0∞) : ∫⁻ x in { x \| f x = r }, f x ∂μ = r * μ { x \| f x = r } := by have : ∀ᵐ x ∂μ, x ∈ { x \| f x = r } → f x = r := ae_of_all μ fun _ hx => hx rw [set_lintegral_congr_fun _ this] · rw [lintegral_const, Measure.restrict_apply MeasurableSet.univ, Set.univ_inter] · exact hf (measurableSet_singleton r) #align measure_theory.set_lintegral_eq_const MeasureTheory.set_lintegral_eq_const theorem lintegral_indicator_one_le (s : Set α) : ∫⁻ a, s.indicator 1 a ∂μ ≤ μ s := (lintegral_indicator_const_le _ _).trans <\| (one_mul _).le @[simp] theorem lintegral_indicator_one₀ (hs : NullMeasurableSet s μ) : ∫⁻ a, s.indicator 1 a ∂μ = μ s := (lintegral_indicator_const₀ hs _).trans <\| one_mul _ @[simp] theorem lintegral_indicator_one (hs : MeasurableSet s) : ∫⁻ a, s.indicator 1 a ∂μ = μ s := (lintegral_indicator_const hs _).trans <\| one_mul _ #align measure_theory.lintegral_indicator_one MeasureTheory.lintegral_indicator_one theorem lintegral_add_mul_meas_add_le_le_lintegral {f g : α → ℝ≥0∞} (hle : f ≤ᵐ[μ] g) (hg : AEMeasurable g μ) (ε : ℝ≥0∞) : ∫⁻ a, f a ∂μ + ε * μ { x \| f x + ε ≤ g x } ≤ ∫⁻ a, g a ∂μ := by rcases exists_measurable_le_lintegral_eq μ f with ⟨φ, hφm, hφ_le, hφ_eq⟩ calc ∫⁻ x, f x ∂μ + ε * μ { x \| f x + ε ≤ g x } = ∫⁻ x, φ x ∂μ + ε * μ { x \| f x + ε ≤ g x } := by rw [hφ_eq] _ ≤ ∫⁻ x, φ x ∂μ + ε * μ { x \| φ x + ε ≤ g x } := by gcongr exact fun x => (add_le_add_right (hφ_le _) _).trans _ = ∫⁻ x, φ x + indicator { x \| φ x + ε ≤ g x } (fun _ => ε) x ∂μ := by rw [lintegral_add_left hφm, lintegral_indicator₀, set_lintegral_const] exact measurableSet_le (hφm.nullMeasurable.measurable'.add_const _) hg.nullMeasurable _ ≤ ∫⁻ x, g x ∂μ := lintegral_mono_ae (hle.mono fun x hx₁ => ?_) simp only [indicator_apply]; split_ifs with hx₂ exacts [hx₂, (add_zero _).trans_le <\| (hφ_le x).trans hx₁] #align measure_theory.lintegral_add_mul_meas_add_le_le_lintegral MeasureTheory.lintegral_add_mul_meas_add_le_le_lintegral theorem mul_meas_ge_le_lintegral₀ {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (ε : ℝ≥0∞) : ε * μ { x \| ε ≤ f x } ≤ ∫⁻ a, f a ∂μ := by simpa only [lintegral_zero, zero_add] using lintegral_add_mul_meas_add_le_le_lintegral (ae_of_all _ fun x => zero_le (f x)) hf ε #align measure_theory.mul_meas_ge_le_lintegral₀ MeasureTheory.mul_meas_ge_le_lintegral₀ theorem mul_meas_ge_le_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) (ε : ℝ≥0∞) : ε * μ { x \| ε ≤ f x } ≤ ∫⁻ a, f a ∂μ := mul_meas_ge_le_lintegral₀ hf.aemeasurable ε #align measure_theory.mul_meas_ge_le_lintegral MeasureTheory.mul_meas_ge_le_lintegral lemma meas_le_lintegral₀ {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) {s : Set α} (hs : ∀ x ∈ s, 1 ≤ f x) : μ s ≤ ∫⁻ a, f a ∂μ := by apply le_trans _ (mul_meas_ge_le_lintegral₀ hf 1) rw [one_mul] exact measure_mono hs lemma lintegral_le_meas {s : Set α} {f : α → ℝ≥0∞} (hf : ∀ a, f a ≤ 1) (h'f : ∀ a ∈ sᶜ, f a = 0) : ∫⁻ a, f a ∂μ ≤ μ s := by apply (lintegral_mono (fun x ↦ ?_)).trans (lintegral_indicator_one_le s) by_cases hx : x ∈ s · simpa [hx] using hf x · simpa [hx] using h'f x hx theorem lintegral_eq_top_of_measure_eq_top_ne_zero {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (hμf : μ {x \| f x = ∞} ≠ 0) : ∫⁻ x, f x ∂μ = ∞ := eq_top_iff.mpr <\| calc ∞ = ∞ * μ { x \| ∞ ≤ f x } := by simp [mul_eq_top, hμf] _ ≤ ∫⁻ x, f x ∂μ := mul_meas_ge_le_lintegral₀ hf ∞ #align measure_theory.lintegral_eq_top_of_measure_eq_top_ne_zero MeasureTheory.lintegral_eq_top_of_measure_eq_top_ne_zero theorem setLintegral_eq_top_of_measure_eq_top_ne_zero (hf : AEMeasurable f (μ.restrict s)) (hμf : μ ({x ∈ s \| f x = ∞}) ≠ 0) : ∫⁻ x in s, f x ∂μ = ∞ := lintegral_eq_top_of_measure_eq_top_ne_zero hf <\| mt (eq_bot_mono <\| by rw [← setOf_inter_eq_sep]; exact Measure.le_restrict_apply _ _) hμf #align measure_theory.set_lintegral_eq_top_of_measure_eq_top_ne_zero MeasureTheory.setLintegral_eq_top_of_measure_eq_top_ne_zero theorem measure_eq_top_of_lintegral_ne_top (hf : AEMeasurable f μ) (hμf : ∫⁻ x, f x ∂μ ≠ ∞) : μ {x \| f x = ∞} = 0 := of_not_not fun h => hμf <\| lintegral_eq_top_of_measure_eq_top_ne_zero hf h #align measure_theory.measure_eq_top_of_lintegral_ne_top MeasureTheory.measure_eq_top_of_lintegral_ne_top theorem measure_eq_top_of_setLintegral_ne_top (hf : AEMeasurable f (μ.restrict s)) (hμf : ∫⁻ x in s, f x ∂μ ≠ ∞) : μ ({x ∈ s \| f x = ∞}) = 0 := of_not_not fun h => hμf <\| setLintegral_eq_top_of_measure_eq_top_ne_zero hf h #align measure_theory.measure_eq_top_of_set_lintegral_ne_top MeasureTheory.measure_eq_top_of_setLintegral_ne_top theorem meas_ge_le_lintegral_div {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) {ε : ℝ≥0∞} (hε : ε ≠ 0) (hε' : ε ≠ ∞) : μ { x \| ε ≤ f x } ≤ (∫⁻ a, f a ∂μ) / ε := (ENNReal.le_div_iff_mul_le (Or.inl hε) (Or.inl hε')).2 <\| by rw [mul_comm] exact mul_meas_ge_le_lintegral₀ hf ε #align measure_theory.meas_ge_le_lintegral_div MeasureTheory.meas_ge_le_lintegral_div theorem ae_eq_of_ae_le_of_lintegral_le {f g : α → ℝ≥0∞} (hfg : f ≤ᵐ[μ] g) (hf : ∫⁻ x, f x ∂μ ≠ ∞) (hg : AEMeasurable g μ) (hgf : ∫⁻ x, g x ∂μ ≤ ∫⁻ x, f x ∂μ) : f =ᵐ[μ] g := by have : ∀ n : ℕ, ∀ᵐ x ∂μ, g x < f x + (n : ℝ≥0∞)⁻¹ := by intro n simp only [ae_iff, not_lt] have : ∫⁻ x, f x ∂μ + (↑n)⁻¹ * μ { x : α \| f x + (n : ℝ≥0∞)⁻¹ ≤ g x } ≤ ∫⁻ x, f x ∂μ := (lintegral_add_mul_meas_add_le_le_lintegral hfg hg n⁻¹).trans hgf rw [(ENNReal.cancel_of_ne hf).add_le_iff_nonpos_right, nonpos_iff_eq_zero, mul_eq_zero] at this exact this.resolve_left (ENNReal.inv_ne_zero.2 (ENNReal.natCast_ne_top _)) refine hfg.mp ((ae_all_iff.2 this).mono fun x hlt hle => hle.antisymm ?_) suffices Tendsto (fun n : ℕ => f x + (n : ℝ≥0∞)⁻¹) atTop (𝓝 (f x)) from ge_of_tendsto' this fun i => (hlt i).le simpa only [inv_top, add_zero] using tendsto_const_nhds.add (ENNReal.tendsto_inv_iff.2 ENNReal.tendsto_nat_nhds_top) #align measure_theory.ae_eq_of_ae_le_of_lintegral_le MeasureTheory.ae_eq_of_ae_le_of_lintegral_le @[simp] theorem lintegral_eq_zero_iff' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, f a ∂μ = 0 ↔ f =ᵐ[μ] 0 := have : ∫⁻ _ : α, 0 ∂μ ≠ ∞ := by simp [lintegral_zero, zero_ne_top] ⟨fun h => (ae_eq_of_ae_le_of_lintegral_le (ae_of_all _ <\| zero_le f) this hf (h.trans lintegral_zero.symm).le).symm, fun h => (lintegral_congr_ae h).trans lintegral_zero⟩ #align measure_theory.lintegral_eq_zero_iff' MeasureTheory.lintegral_eq_zero_iff' @[simp] theorem lintegral_eq_zero_iff {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂μ = 0 ↔ f =ᵐ[μ] 0 := lintegral_eq_zero_iff' hf.aemeasurable #align measure_theory.lintegral_eq_zero_iff MeasureTheory.lintegral_eq_zero_iff theorem lintegral_pos_iff_support {f : α → ℝ≥0∞} (hf : Measurable f) : (0 < ∫⁻ a, f a ∂μ) ↔ 0 < μ (Function.support f) := by simp [pos_iff_ne_zero, hf, Filter.EventuallyEq, ae_iff, Function.support] #align measure_theory.lintegral_pos_iff_support MeasureTheory.lintegral_pos_iff_support theorem setLintegral_pos_iff {f : α → ℝ≥0∞} (hf : Measurable f) {s : Set α} : 0 < ∫⁻ a in s, f a ∂μ ↔ 0 < μ (Function.support f ∩ s) := by rw [lintegral_pos_iff_support hf, Measure.restrict_apply (measurableSet_support hf)] theorem lintegral_iSup_ae {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, Measurable (f n)) (h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f n.succ a) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by let ⟨s, hs⟩ := exists_measurable_superset_of_null (ae_iff.1 (ae_all_iff.2 h_mono)) let g n a := if a ∈ s then 0 else f n a have g_eq_f : ∀ᵐ a ∂μ, ∀ n, g n a = f n a := (measure_zero_iff_ae_nmem.1 hs.2.2).mono fun a ha n => if_neg ha calc ∫⁻ a, ⨆ n, f n a ∂μ = ∫⁻ a, ⨆ n, g n a ∂μ := lintegral_congr_ae <\| g_eq_f.mono fun a ha => by simp only [ha] _ = ⨆ n, ∫⁻ a, g n a ∂μ := (lintegral_iSup (fun n => measurable_const.piecewise hs.2.1 (hf n)) (monotone_nat_of_le_succ fun n a => ?_)) _ = ⨆ n, ∫⁻ a, f n a ∂μ := by simp only [lintegral_congr_ae (g_eq_f.mono fun _a ha => ha _)] simp only [g] split_ifs with h · rfl · have := Set.not_mem_subset hs.1 h simp only [not_forall, not_le, mem_setOf_eq, not_exists, not_lt] at this exact this n #align measure_theory.lintegral_supr_ae MeasureTheory.lintegral_iSup_ae	Mathlib/MeasureTheory/Integral/Lebesgue.lean	967	971	theorem lintegral_sub' {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := by	refine ENNReal.eq_sub_of_add_eq hg_fin ?_ rw [← lintegral_add_right' _ hg] exact lintegral_congr_ae (h_le.mono fun x hx => tsub_add_cancel_of_le hx)
import Mathlib.Geometry.Manifold.MFDeriv.Basic noncomputable section open scoped Manifold variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {E' : Type*} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {f : E → E'} {s : Set E} {x : E} section MFDerivFderiv theorem uniqueMDiffWithinAt_iff_uniqueDiffWithinAt : UniqueMDiffWithinAt 𝓘(𝕜, E) s x ↔ UniqueDiffWithinAt 𝕜 s x := by simp only [UniqueMDiffWithinAt, mfld_simps] #align unique_mdiff_within_at_iff_unique_diff_within_at uniqueMDiffWithinAt_iff_uniqueDiffWithinAt alias ⟨UniqueMDiffWithinAt.uniqueDiffWithinAt, UniqueDiffWithinAt.uniqueMDiffWithinAt⟩ := uniqueMDiffWithinAt_iff_uniqueDiffWithinAt #align unique_mdiff_within_at.unique_diff_within_at UniqueMDiffWithinAt.uniqueDiffWithinAt #align unique_diff_within_at.unique_mdiff_within_at UniqueDiffWithinAt.uniqueMDiffWithinAt theorem uniqueMDiffOn_iff_uniqueDiffOn : UniqueMDiffOn 𝓘(𝕜, E) s ↔ UniqueDiffOn 𝕜 s := by simp [UniqueMDiffOn, UniqueDiffOn, uniqueMDiffWithinAt_iff_uniqueDiffWithinAt] #align unique_mdiff_on_iff_unique_diff_on uniqueMDiffOn_iff_uniqueDiffOn alias ⟨UniqueMDiffOn.uniqueDiffOn, UniqueDiffOn.uniqueMDiffOn⟩ := uniqueMDiffOn_iff_uniqueDiffOn #align unique_mdiff_on.unique_diff_on UniqueMDiffOn.uniqueDiffOn #align unique_diff_on.unique_mdiff_on UniqueDiffOn.uniqueMDiffOn -- Porting note (#10618): was `@[simp, mfld_simps]` but `simp` can prove it theorem writtenInExtChartAt_model_space : writtenInExtChartAt 𝓘(𝕜, E) 𝓘(𝕜, E') x f = f := rfl #align written_in_ext_chart_model_space writtenInExtChartAt_model_space theorem hasMFDerivWithinAt_iff_hasFDerivWithinAt {f'} : HasMFDerivWithinAt 𝓘(𝕜, E) 𝓘(𝕜, E') f s x f' ↔ HasFDerivWithinAt f f' s x := by simpa only [HasMFDerivWithinAt, and_iff_right_iff_imp, mfld_simps] using HasFDerivWithinAt.continuousWithinAt #align has_mfderiv_within_at_iff_has_fderiv_within_at hasMFDerivWithinAt_iff_hasFDerivWithinAt alias ⟨HasMFDerivWithinAt.hasFDerivWithinAt, HasFDerivWithinAt.hasMFDerivWithinAt⟩ := hasMFDerivWithinAt_iff_hasFDerivWithinAt #align has_mfderiv_within_at.has_fderiv_within_at HasMFDerivWithinAt.hasFDerivWithinAt #align has_fderiv_within_at.has_mfderiv_within_at HasFDerivWithinAt.hasMFDerivWithinAt theorem hasMFDerivAt_iff_hasFDerivAt {f'} : HasMFDerivAt 𝓘(𝕜, E) 𝓘(𝕜, E') f x f' ↔ HasFDerivAt f f' x := by rw [← hasMFDerivWithinAt_univ, hasMFDerivWithinAt_iff_hasFDerivWithinAt, hasFDerivWithinAt_univ] #align has_mfderiv_at_iff_has_fderiv_at hasMFDerivAt_iff_hasFDerivAt alias ⟨HasMFDerivAt.hasFDerivAt, HasFDerivAt.hasMFDerivAt⟩ := hasMFDerivAt_iff_hasFDerivAt #align has_mfderiv_at.has_fderiv_at HasMFDerivAt.hasFDerivAt #align has_fderiv_at.has_mfderiv_at HasFDerivAt.hasMFDerivAt theorem mdifferentiableWithinAt_iff_differentiableWithinAt : MDifferentiableWithinAt 𝓘(𝕜, E) 𝓘(𝕜, E') f s x ↔ DifferentiableWithinAt 𝕜 f s x := by simp only [mdifferentiableWithinAt_iff', mfld_simps] exact ⟨fun H => H.2, fun H => ⟨H.continuousWithinAt, H⟩⟩ #align mdifferentiable_within_at_iff_differentiable_within_at mdifferentiableWithinAt_iff_differentiableWithinAt alias ⟨MDifferentiableWithinAt.differentiableWithinAt, DifferentiableWithinAt.mdifferentiableWithinAt⟩ := mdifferentiableWithinAt_iff_differentiableWithinAt #align mdifferentiable_within_at.differentiable_within_at MDifferentiableWithinAt.differentiableWithinAt #align differentiable_within_at.mdifferentiable_within_at DifferentiableWithinAt.mdifferentiableWithinAt theorem mdifferentiableAt_iff_differentiableAt : MDifferentiableAt 𝓘(𝕜, E) 𝓘(𝕜, E') f x ↔ DifferentiableAt 𝕜 f x := by simp only [mdifferentiableAt_iff, differentiableWithinAt_univ, mfld_simps] exact ⟨fun H => H.2, fun H => ⟨H.continuousAt, H⟩⟩ #align mdifferentiable_at_iff_differentiable_at mdifferentiableAt_iff_differentiableAt alias ⟨MDifferentiableAt.differentiableAt, DifferentiableAt.mdifferentiableAt⟩ := mdifferentiableAt_iff_differentiableAt #align mdifferentiable_at.differentiable_at MDifferentiableAt.differentiableAt #align differentiable_at.mdifferentiable_at DifferentiableAt.mdifferentiableAt theorem mdifferentiableOn_iff_differentiableOn : MDifferentiableOn 𝓘(𝕜, E) 𝓘(𝕜, E') f s ↔ DifferentiableOn 𝕜 f s := by simp only [MDifferentiableOn, DifferentiableOn, mdifferentiableWithinAt_iff_differentiableWithinAt] #align mdifferentiable_on_iff_differentiable_on mdifferentiableOn_iff_differentiableOn alias ⟨MDifferentiableOn.differentiableOn, DifferentiableOn.mdifferentiableOn⟩ := mdifferentiableOn_iff_differentiableOn #align mdifferentiable_on.differentiable_on MDifferentiableOn.differentiableOn #align differentiable_on.mdifferentiable_on DifferentiableOn.mdifferentiableOn theorem mdifferentiable_iff_differentiable : MDifferentiable 𝓘(𝕜, E) 𝓘(𝕜, E') f ↔ Differentiable 𝕜 f := by simp only [MDifferentiable, Differentiable, mdifferentiableAt_iff_differentiableAt] #align mdifferentiable_iff_differentiable mdifferentiable_iff_differentiable alias ⟨MDifferentiable.differentiable, Differentiable.mdifferentiable⟩ := mdifferentiable_iff_differentiable #align mdifferentiable.differentiable MDifferentiable.differentiable #align differentiable.mdifferentiable Differentiable.mdifferentiable @[simp]	Mathlib/Geometry/Manifold/MFDeriv/FDeriv.lean	120	126	theorem mfderivWithin_eq_fderivWithin : mfderivWithin 𝓘(𝕜, E) 𝓘(𝕜, E') f s x = fderivWithin 𝕜 f s x := by	by_cases h : MDifferentiableWithinAt 𝓘(𝕜, E) 𝓘(𝕜, E') f s x · simp only [mfderivWithin, h, if_pos, mfld_simps] · simp only [mfderivWithin, h, if_neg, not_false_iff] rw [mdifferentiableWithinAt_iff_differentiableWithinAt] at h exact (fderivWithin_zero_of_not_differentiableWithinAt h).symm
import Mathlib.Topology.Algebra.InfiniteSum.Constructions import Mathlib.Topology.Algebra.Module.Basic #align_import topology.algebra.infinite_sum.module from "leanprover-community/mathlib"@"32253a1a1071173b33dc7d6a218cf722c6feb514" variable {α β γ δ : Type} open Filter Finset Function variable {ι κ R R₂ M M₂ : Type} section HasSum -- Results in this section hold for continuous additive monoid homomorphisms or equivalences but we -- don't have bundled continuous additive homomorphisms. variable [Semiring R] [Semiring R₂] [AddCommMonoid M] [Module R M] [AddCommMonoid M₂] [Module R₂ M₂] [TopologicalSpace M] [TopologicalSpace M₂] {σ : R →+* R₂} {σ' : R₂ →+* R} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] protected theorem ContinuousLinearMap.hasSum {f : ι → M} (φ : M →SL[σ] M₂) {x : M} (hf : HasSum f x) : HasSum (fun b : ι ↦ φ (f b)) (φ x) := by simpa only using hf.map φ.toLinearMap.toAddMonoidHom φ.continuous #align continuous_linear_map.has_sum ContinuousLinearMap.hasSum alias HasSum.mapL := ContinuousLinearMap.hasSum set_option linter.uppercaseLean3 false in #align has_sum.mapL HasSum.mapL protected theorem ContinuousLinearMap.summable {f : ι → M} (φ : M →SL[σ] M₂) (hf : Summable f) : Summable fun b : ι ↦ φ (f b) := (hf.hasSum.mapL φ).summable #align continuous_linear_map.summable ContinuousLinearMap.summable alias Summable.mapL := ContinuousLinearMap.summable set_option linter.uppercaseLean3 false in #align summable.mapL Summable.mapL protected theorem ContinuousLinearMap.map_tsum [T2Space M₂] {f : ι → M} (φ : M →SL[σ] M₂) (hf : Summable f) : φ (∑' z, f z) = ∑' z, φ (f z) := (hf.hasSum.mapL φ).tsum_eq.symm #align continuous_linear_map.map_tsum ContinuousLinearMap.map_tsum protected theorem ContinuousLinearEquiv.hasSum {f : ι → M} (e : M ≃SL[σ] M₂) {y : M₂} : HasSum (fun b : ι ↦ e (f b)) y ↔ HasSum f (e.symm y) := ⟨fun h ↦ by simpa only [e.symm.coe_coe, e.symm_apply_apply] using h.mapL (e.symm : M₂ →SL[σ'] M), fun h ↦ by simpa only [e.coe_coe, e.apply_symm_apply] using (e : M →SL[σ] M₂).hasSum h⟩ #align continuous_linear_equiv.has_sum ContinuousLinearEquiv.hasSum protected theorem ContinuousLinearEquiv.hasSum' {f : ι → M} (e : M ≃SL[σ] M₂) {x : M} : HasSum (fun b : ι ↦ e (f b)) (e x) ↔ HasSum f x := by rw [e.hasSum, ContinuousLinearEquiv.symm_apply_apply] #align continuous_linear_equiv.has_sum' ContinuousLinearEquiv.hasSum' protected theorem ContinuousLinearEquiv.summable {f : ι → M} (e : M ≃SL[σ] M₂) : (Summable fun b : ι ↦ e (f b)) ↔ Summable f := ⟨fun hf ↦ (e.hasSum.1 hf.hasSum).summable, (e : M →SL[σ] M₂).summable⟩ #align continuous_linear_equiv.summable ContinuousLinearEquiv.summable	Mathlib/Topology/Algebra/InfiniteSum/Module.lean	167	178	theorem ContinuousLinearEquiv.tsum_eq_iff [T2Space M] [T2Space M₂] {f : ι → M} (e : M ≃SL[σ] M₂) {y : M₂} : (∑' z, e (f z)) = y ↔ ∑' z, f z = e.symm y := by	by_cases hf : Summable f · exact ⟨fun h ↦ (e.hasSum.mp ((e.summable.mpr hf).hasSum_iff.mpr h)).tsum_eq, fun h ↦ (e.hasSum.mpr (hf.hasSum_iff.mpr h)).tsum_eq⟩ · have hf' : ¬Summable fun z ↦ e (f z) := fun h ↦ hf (e.summable.mp h) rw [tsum_eq_zero_of_not_summable hf, tsum_eq_zero_of_not_summable hf'] refine ⟨?_, fun H ↦ ?_⟩ · rintro rfl simp · simpa using congr_arg (fun z ↦ e z) H
import Mathlib.Algebra.Group.Basic import Mathlib.Algebra.Group.Pi.Basic import Mathlib.Order.Fin import Mathlib.Order.PiLex import Mathlib.Order.Interval.Set.Basic #align_import data.fin.tuple.basic from "leanprover-community/mathlib"@"ef997baa41b5c428be3fb50089a7139bf4ee886b" assert_not_exists MonoidWithZero universe u v namespace Fin variable {m n : ℕ} open Function section Tuple 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 #align fin.tuple0_le Fin.tuple0_le variable {α : Fin (n + 1) → Type 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) def tail (q : ∀ i, α i) : ∀ i : Fin n, α i.succ := fun i ↦ q i.succ #align fin.tail Fin.tail theorem tail_def {n : ℕ} {α : Fin (n + 1) → Type} {q : ∀ i, α i} : (tail fun k : Fin (n + 1) ↦ q k) = fun k : Fin n ↦ q k.succ := rfl #align fin.tail_def Fin.tail_def def cons (x : α 0) (p : ∀ i : Fin n, α i.succ) : ∀ i, α i := fun j ↦ Fin.cases x p j #align fin.cons Fin.cons @[simp] theorem tail_cons : tail (cons x p) = p := by simp (config := { unfoldPartialApp := true }) [tail, cons] #align fin.tail_cons Fin.tail_cons @[simp] theorem cons_succ : cons x p i.succ = p i := by simp [cons] #align fin.cons_succ Fin.cons_succ @[simp] theorem cons_zero : cons x p 0 = x := by simp [cons] #align fin.cons_zero Fin.cons_zero @[simp] theorem cons_one {α : Fin (n + 2) → Type} (x : α 0) (p : ∀ i : Fin n.succ, α i.succ) : cons x p 1 = p 0 := by rw [← cons_succ x p]; rfl @[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_noteq h', update_noteq this, cons_succ] #align fin.cons_update Fin.cons_update 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)⟩ #align fin.cons_injective2 Fin.cons_injective2 @[simp] theorem cons_eq_cons {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 #align fin.cons_eq_cons Fin.cons_eq_cons theorem cons_left_injective (x : ∀ i : Fin n, α i.succ) : Function.Injective fun x₀ ↦ cons x₀ x := cons_injective2.left _ #align fin.cons_left_injective Fin.cons_left_injective theorem cons_right_injective (x₀ : α 0) : Function.Injective (cons x₀) := cons_injective2.right _ #align fin.cons_right_injective Fin.cons_right_injective 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_noteq, Ne, not_false_iff] let j' := pred j h have : j'.succ = j := succ_pred j h rw [← this, cons_succ, cons_succ] #align fin.update_cons_zero Fin.update_cons_zero @[simp, nolint simpNF] -- Porting note: linter claims LHS doesn't simplify 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] #align fin.cons_self_tail Fin.cons_self_tail -- Porting note: Mathport removes `_root_`? @[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) #align fin.cons_cases Fin.consCases @[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 #align fin.cons_cases_cons Fin.consCases_cons @[elab_as_elim] def consInduction {α : Type} {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 \| n + 1, x => consCases (fun x₀ x ↦ h _ _ <\| consInduction h0 h _) x #align fin.cons_induction Fin.consInductionₓ -- Porting note: universes 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) #align fin.cons_injective_of_injective Fin.cons_injective_of_injective 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, succ_ne_zero] at h · simpa [Function.comp] using h.comp (Fin.succ_injective _) #align fin.cons_injective_iff Fin.cons_injective_iff @[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⟩ #align fin.forall_fin_zero_pi Fin.forall_fin_zero_pi @[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⟩⟩ #align fin.exists_fin_zero_pi Fin.exists_fin_zero_pi 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⟩ #align fin.forall_fin_succ_pi Fin.forall_fin_succ_pi 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⟩⟩ #align fin.exists_fin_succ_pi Fin.exists_fin_succ_pi @[simp] theorem tail_update_zero : tail (update q 0 z) = tail q := by ext j simp [tail, Fin.succ_ne_zero] #align fin.tail_update_zero Fin.tail_update_zero @[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] #align fin.tail_update_succ Fin.tail_update_succ theorem comp_cons {α : Type} {β : Type} (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] #align fin.comp_cons Fin.comp_cons	Mathlib/Data/Fin/Tuple/Basic.lean	252	255	theorem comp_tail {α : Type} {β : Type} (g : α → β) (q : Fin n.succ → α) : g ∘ tail q = tail (g ∘ q) := by	ext j simp [tail]
import Mathlib.Order.Interval.Set.Basic import Mathlib.Order.Hom.Set #align_import data.set.intervals.order_iso from "leanprover-community/mathlib"@"d012cd09a9b256d870751284dd6a29882b0be105" open Set namespace OrderIso section Preorder variable {α β : Type*} [Preorder α] [Preorder β] @[simp] theorem preimage_Iic (e : α ≃o β) (b : β) : e ⁻¹' Iic b = Iic (e.symm b) := by ext x simp [← e.le_iff_le] #align order_iso.preimage_Iic OrderIso.preimage_Iic @[simp] theorem preimage_Ici (e : α ≃o β) (b : β) : e ⁻¹' Ici b = Ici (e.symm b) := by ext x simp [← e.le_iff_le] #align order_iso.preimage_Ici OrderIso.preimage_Ici @[simp] theorem preimage_Iio (e : α ≃o β) (b : β) : e ⁻¹' Iio b = Iio (e.symm b) := by ext x simp [← e.lt_iff_lt] #align order_iso.preimage_Iio OrderIso.preimage_Iio @[simp] theorem preimage_Ioi (e : α ≃o β) (b : β) : e ⁻¹' Ioi b = Ioi (e.symm b) := by ext x simp [← e.lt_iff_lt] #align order_iso.preimage_Ioi OrderIso.preimage_Ioi @[simp] theorem preimage_Icc (e : α ≃o β) (a b : β) : e ⁻¹' Icc a b = Icc (e.symm a) (e.symm b) := by simp [← Ici_inter_Iic] #align order_iso.preimage_Icc OrderIso.preimage_Icc @[simp] theorem preimage_Ico (e : α ≃o β) (a b : β) : e ⁻¹' Ico a b = Ico (e.symm a) (e.symm b) := by simp [← Ici_inter_Iio] #align order_iso.preimage_Ico OrderIso.preimage_Ico @[simp] theorem preimage_Ioc (e : α ≃o β) (a b : β) : e ⁻¹' Ioc a b = Ioc (e.symm a) (e.symm b) := by simp [← Ioi_inter_Iic] #align order_iso.preimage_Ioc OrderIso.preimage_Ioc @[simp] theorem preimage_Ioo (e : α ≃o β) (a b : β) : e ⁻¹' Ioo a b = Ioo (e.symm a) (e.symm b) := by simp [← Ioi_inter_Iio] #align order_iso.preimage_Ioo OrderIso.preimage_Ioo @[simp] theorem image_Iic (e : α ≃o β) (a : α) : e '' Iic a = Iic (e a) := by rw [e.image_eq_preimage, e.symm.preimage_Iic, e.symm_symm] #align order_iso.image_Iic OrderIso.image_Iic @[simp] theorem image_Ici (e : α ≃o β) (a : α) : e '' Ici a = Ici (e a) := e.dual.image_Iic a #align order_iso.image_Ici OrderIso.image_Ici @[simp]	Mathlib/Order/Interval/Set/OrderIso.lean	78	79	theorem image_Iio (e : α ≃o β) (a : α) : e '' Iio a = Iio (e a) := by	rw [e.image_eq_preimage, e.symm.preimage_Iio, e.symm_symm]
import Mathlib.Combinatorics.SimpleGraph.Connectivity import Mathlib.Tactic.Linarith #align_import combinatorics.simple_graph.acyclic from "leanprover-community/mathlib"@"b07688016d62f81d14508ff339ea3415558d6353" universe u v namespace SimpleGraph open Walk variable {V : Type u} (G : SimpleGraph V) def IsAcyclic : Prop := ∀ ⦃v : V⦄ (c : G.Walk v v), ¬c.IsCycle #align simple_graph.is_acyclic SimpleGraph.IsAcyclic @[mk_iff] structure IsTree : Prop where protected isConnected : G.Connected protected IsAcyclic : G.IsAcyclic #align simple_graph.is_tree SimpleGraph.IsTree variable {G} @[simp] lemma isAcyclic_bot : IsAcyclic (⊥ : SimpleGraph V) := fun _a _w hw ↦ hw.ne_bot rfl theorem isAcyclic_iff_forall_adj_isBridge : G.IsAcyclic ↔ ∀ ⦃v w : V⦄, G.Adj v w → G.IsBridge s(v, w) := by simp_rw [isBridge_iff_adj_and_forall_cycle_not_mem] constructor · intro ha v w hvw apply And.intro hvw intro u p hp cases ha p hp · rintro hb v (_ \| ⟨ha, p⟩) hp · exact hp.not_of_nil · apply (hb ha).2 _ hp rw [Walk.edges_cons] apply List.mem_cons_self #align simple_graph.is_acyclic_iff_forall_adj_is_bridge SimpleGraph.isAcyclic_iff_forall_adj_isBridge theorem isAcyclic_iff_forall_edge_isBridge : G.IsAcyclic ↔ ∀ ⦃e⦄, e ∈ (G.edgeSet) → G.IsBridge e := by simp [isAcyclic_iff_forall_adj_isBridge, Sym2.forall] #align simple_graph.is_acyclic_iff_forall_edge_is_bridge SimpleGraph.isAcyclic_iff_forall_edge_isBridge theorem IsAcyclic.path_unique {G : SimpleGraph V} (h : G.IsAcyclic) {v w : V} (p q : G.Path v w) : p = q := by obtain ⟨p, hp⟩ := p obtain ⟨q, hq⟩ := q rw [Subtype.mk.injEq] induction p with \| nil => cases (Walk.isPath_iff_eq_nil _).mp hq rfl \| cons ph p ih => rw [isAcyclic_iff_forall_adj_isBridge] at h specialize h ph rw [isBridge_iff_adj_and_forall_walk_mem_edges] at h replace h := h.2 (q.append p.reverse) simp only [Walk.edges_append, Walk.edges_reverse, List.mem_append, List.mem_reverse] at h cases' h with h h · cases q with \| nil => simp [Walk.isPath_def] at hp \| cons _ q => rw [Walk.cons_isPath_iff] at hp hq simp only [Walk.edges_cons, List.mem_cons, Sym2.eq_iff, true_and] at h rcases h with (⟨h, rfl⟩ \| ⟨rfl, rfl⟩) \| h · cases ih hp.1 q hq.1 rfl · simp at hq · exact absurd (Walk.fst_mem_support_of_mem_edges _ h) hq.2 · rw [Walk.cons_isPath_iff] at hp exact absurd (Walk.fst_mem_support_of_mem_edges _ h) hp.2 #align simple_graph.is_acyclic.path_unique SimpleGraph.IsAcyclic.path_unique	Mathlib/Combinatorics/SimpleGraph/Acyclic.lean	118	127	theorem isAcyclic_of_path_unique (h : ∀ (v w : V) (p q : G.Path v w), p = q) : G.IsAcyclic := by	intro v c hc simp only [Walk.isCycle_def, Ne] at hc cases c with \| nil => cases hc.2.1 rfl \| cons ha c' => simp only [Walk.cons_isTrail_iff, Walk.support_cons, List.tail_cons, true_and_iff] at hc specialize h _ _ ⟨c', by simp only [Walk.isPath_def, hc.2]⟩ (Path.singleton ha.symm) rw [Path.singleton, Subtype.mk.injEq] at h simp [h] at hc
import Mathlib.RingTheory.IntegrallyClosed import Mathlib.RingTheory.Trace import Mathlib.RingTheory.Norm #align_import ring_theory.discriminant from "leanprover-community/mathlib"@"3e068ece210655b7b9a9477c3aff38a492400aa1" universe u v w z open scoped Matrix open Matrix FiniteDimensional Fintype Polynomial Finset IntermediateField namespace Algebra variable (A : Type u) {B : Type v} (C : Type z) {ι : Type w} [DecidableEq ι] variable [CommRing A] [CommRing B] [Algebra A B] [CommRing C] [Algebra A C] section Discr -- Porting note: using `[DecidableEq ι]` instead of `by classical...` did not work in -- mathlib3. noncomputable def discr (A : Type u) {B : Type v} [CommRing A] [CommRing B] [Algebra A B] [Fintype ι] (b : ι → B) := (traceMatrix A b).det #align algebra.discr Algebra.discr theorem discr_def [Fintype ι] (b : ι → B) : discr A b = (traceMatrix A b).det := rfl variable {A C} in theorem discr_eq_discr_of_algEquiv [Fintype ι] (b : ι → B) (f : B ≃ₐ[A] C) : Algebra.discr A b = Algebra.discr A (f ∘ b) := by rw [discr_def]; congr; ext simp_rw [traceMatrix_apply, traceForm_apply, Function.comp, ← map_mul f, trace_eq_of_algEquiv] #align algebra.discr_def Algebra.discr_def variable {ι' : Type*} [Fintype ι'] [Fintype ι] [DecidableEq ι'] section Basic @[simp] theorem discr_reindex (b : Basis ι A B) (f : ι ≃ ι') : discr A (b ∘ ⇑f.symm) = discr A b := by classical rw [← Basis.coe_reindex, discr_def, traceMatrix_reindex, det_reindex_self, ← discr_def] #align algebra.discr_reindex Algebra.discr_reindex	Mathlib/RingTheory/Discriminant.lean	93	106	theorem discr_zero_of_not_linearIndependent [IsDomain A] {b : ι → B} (hli : ¬LinearIndependent A b) : discr A b = 0 := by	classical obtain ⟨g, hg, i, hi⟩ := Fintype.not_linearIndependent_iff.1 hli have : (traceMatrix A b) ᵥ g = 0 := by ext i have : ∀ j, (trace A B) (b i b j) * g j = (trace A B) (g j • b j * b i) := by intro j; simp [mul_comm] simp only [mulVec, dotProduct, traceMatrix_apply, Pi.zero_apply, traceForm_apply, fun j => this j, ← map_sum, ← sum_mul, hg, zero_mul, LinearMap.map_zero] by_contra h rw [discr_def] at h simp [Matrix.eq_zero_of_mulVec_eq_zero h this] at hi
import Mathlib.Analysis.Analytic.Basic variable {𝕜 E F G : Type*} [NontriviallyNormedField 𝕜] [NormedAddCommGroup E] [NormedSpace 𝕜 E] [NormedAddCommGroup F] [NormedSpace 𝕜 F] [NormedAddCommGroup G] [NormedSpace 𝕜 G] open scoped Classical open Topology NNReal Filter ENNReal open Set Filter Asymptotics variable {f g : E → F} {p pf pg : FormalMultilinearSeries 𝕜 E F} {x : E} {r r' : ℝ≥0∞} {n m : ℕ} section FiniteFPowerSeries structure HasFiniteFPowerSeriesOnBall (f : E → F) (p : FormalMultilinearSeries 𝕜 E F) (x : E) (n : ℕ) (r : ℝ≥0∞) extends HasFPowerSeriesOnBall f p x r : Prop where finite : ∀ (m : ℕ), n ≤ m → p m = 0 theorem HasFiniteFPowerSeriesOnBall.mk' {f : E → F} {p : FormalMultilinearSeries 𝕜 E F} {x : E} {n : ℕ} {r : ℝ≥0∞} (finite : ∀ (m : ℕ), n ≤ m → p m = 0) (pos : 0 < r) (sum_eq : ∀ y ∈ EMetric.ball 0 r, (∑ i ∈ Finset.range n, p i fun _ ↦ y) = f (x + y)) : HasFiniteFPowerSeriesOnBall f p x n r where r_le := p.radius_eq_top_of_eventually_eq_zero (Filter.eventually_atTop.mpr ⟨n, finite⟩) ▸ le_top r_pos := pos hasSum hy := sum_eq _ hy ▸ hasSum_sum_of_ne_finset_zero fun m hm ↦ by rw [Finset.mem_range, not_lt] at hm; rw [finite m hm]; rfl finite := finite def HasFiniteFPowerSeriesAt (f : E → F) (p : FormalMultilinearSeries 𝕜 E F) (x : E) (n : ℕ) := ∃ r, HasFiniteFPowerSeriesOnBall f p x n r theorem HasFiniteFPowerSeriesAt.toHasFPowerSeriesAt (hf : HasFiniteFPowerSeriesAt f p x n) : HasFPowerSeriesAt f p x := let ⟨r, hf⟩ := hf ⟨r, hf.toHasFPowerSeriesOnBall⟩ theorem HasFiniteFPowerSeriesAt.finite (hf : HasFiniteFPowerSeriesAt f p x n) : ∀ m : ℕ, n ≤ m → p m = 0 := let ⟨_, hf⟩ := hf; hf.finite variable (𝕜) def CPolynomialAt (f : E → F) (x : E) := ∃ (p : FormalMultilinearSeries 𝕜 E F) (n : ℕ), HasFiniteFPowerSeriesAt f p x n def CPolynomialOn (f : E → F) (s : Set E) := ∀ x, x ∈ s → CPolynomialAt 𝕜 f x variable {𝕜} theorem HasFiniteFPowerSeriesOnBall.hasFiniteFPowerSeriesAt (hf : HasFiniteFPowerSeriesOnBall f p x n r) : HasFiniteFPowerSeriesAt f p x n := ⟨r, hf⟩ theorem HasFiniteFPowerSeriesAt.cPolynomialAt (hf : HasFiniteFPowerSeriesAt f p x n) : CPolynomialAt 𝕜 f x := ⟨p, n, hf⟩ theorem HasFiniteFPowerSeriesOnBall.cPolynomialAt (hf : HasFiniteFPowerSeriesOnBall f p x n r) : CPolynomialAt 𝕜 f x := hf.hasFiniteFPowerSeriesAt.cPolynomialAt theorem CPolynomialAt.analyticAt (hf : CPolynomialAt 𝕜 f x) : AnalyticAt 𝕜 f x := let ⟨p, _, hp⟩ := hf ⟨p, hp.toHasFPowerSeriesAt⟩ theorem CPolynomialOn.analyticOn {s : Set E} (hf : CPolynomialOn 𝕜 f s) : AnalyticOn 𝕜 f s := fun x hx ↦ (hf x hx).analyticAt theorem HasFiniteFPowerSeriesOnBall.congr (hf : HasFiniteFPowerSeriesOnBall f p x n r) (hg : EqOn f g (EMetric.ball x r)) : HasFiniteFPowerSeriesOnBall g p x n r := ⟨hf.1.congr hg, hf.finite⟩ theorem HasFiniteFPowerSeriesOnBall.comp_sub (hf : HasFiniteFPowerSeriesOnBall f p x n r) (y : E) : HasFiniteFPowerSeriesOnBall (fun z => f (z - y)) p (x + y) n r := ⟨hf.1.comp_sub y, hf.finite⟩ theorem HasFiniteFPowerSeriesOnBall.mono (hf : HasFiniteFPowerSeriesOnBall f p x n r) (r'_pos : 0 < r') (hr : r' ≤ r) : HasFiniteFPowerSeriesOnBall f p x n r' := ⟨hf.1.mono r'_pos hr, hf.finite⟩ theorem HasFiniteFPowerSeriesAt.congr (hf : HasFiniteFPowerSeriesAt f p x n) (hg : f =ᶠ[𝓝 x] g) : HasFiniteFPowerSeriesAt g p x n := Exists.imp (fun _ hg ↦ ⟨hg, hf.finite⟩) (hf.toHasFPowerSeriesAt.congr hg) protected theorem HasFiniteFPowerSeriesAt.eventually (hf : HasFiniteFPowerSeriesAt f p x n) : ∀ᶠ r : ℝ≥0∞ in 𝓝[>] 0, HasFiniteFPowerSeriesOnBall f p x n r := hf.toHasFPowerSeriesAt.eventually.mono fun _ h ↦ ⟨h, hf.finite⟩ theorem hasFiniteFPowerSeriesOnBall_const {c : F} {e : E} : HasFiniteFPowerSeriesOnBall (fun _ => c) (constFormalMultilinearSeries 𝕜 E c) e 1 ⊤ := ⟨hasFPowerSeriesOnBall_const, fun n hn ↦ constFormalMultilinearSeries_apply (id hn : 0 < n).ne'⟩ theorem hasFiniteFPowerSeriesAt_const {c : F} {e : E} : HasFiniteFPowerSeriesAt (fun _ => c) (constFormalMultilinearSeries 𝕜 E c) e 1 := ⟨⊤, hasFiniteFPowerSeriesOnBall_const⟩ theorem CPolynomialAt_const {v : F} : CPolynomialAt 𝕜 (fun _ => v) x := ⟨constFormalMultilinearSeries 𝕜 E v, 1, hasFiniteFPowerSeriesAt_const⟩ theorem CPolynomialOn_const {v : F} {s : Set E} : CPolynomialOn 𝕜 (fun _ => v) s := fun _ _ => CPolynomialAt_const theorem HasFiniteFPowerSeriesOnBall.add (hf : HasFiniteFPowerSeriesOnBall f pf x n r) (hg : HasFiniteFPowerSeriesOnBall g pg x m r) : HasFiniteFPowerSeriesOnBall (f + g) (pf + pg) x (max n m) r := ⟨hf.1.add hg.1, fun N hN ↦ by rw [Pi.add_apply, hf.finite _ ((le_max_left n m).trans hN), hg.finite _ ((le_max_right n m).trans hN), zero_add]⟩ theorem HasFiniteFPowerSeriesAt.add (hf : HasFiniteFPowerSeriesAt f pf x n) (hg : HasFiniteFPowerSeriesAt g pg x m) : HasFiniteFPowerSeriesAt (f + g) (pf + pg) x (max n m) := by rcases (hf.eventually.and hg.eventually).exists with ⟨r, hr⟩ exact ⟨r, hr.1.add hr.2⟩ theorem CPolynomialAt.congr (hf : CPolynomialAt 𝕜 f x) (hg : f =ᶠ[𝓝 x] g) : CPolynomialAt 𝕜 g x := let ⟨_, _, hpf⟩ := hf (hpf.congr hg).cPolynomialAt theorem CPolynomialAt_congr (h : f =ᶠ[𝓝 x] g) : CPolynomialAt 𝕜 f x ↔ CPolynomialAt 𝕜 g x := ⟨fun hf ↦ hf.congr h, fun hg ↦ hg.congr h.symm⟩ theorem CPolynomialAt.add (hf : CPolynomialAt 𝕜 f x) (hg : CPolynomialAt 𝕜 g x) : CPolynomialAt 𝕜 (f + g) x := let ⟨_, _, hpf⟩ := hf let ⟨_, _, hqf⟩ := hg (hpf.add hqf).cPolynomialAt theorem HasFiniteFPowerSeriesOnBall.neg (hf : HasFiniteFPowerSeriesOnBall f pf x n r) : HasFiniteFPowerSeriesOnBall (-f) (-pf) x n r := ⟨hf.1.neg, fun m hm ↦ by rw [Pi.neg_apply, hf.finite m hm, neg_zero]⟩ theorem HasFiniteFPowerSeriesAt.neg (hf : HasFiniteFPowerSeriesAt f pf x n) : HasFiniteFPowerSeriesAt (-f) (-pf) x n := let ⟨_, hrf⟩ := hf hrf.neg.hasFiniteFPowerSeriesAt theorem CPolynomialAt.neg (hf : CPolynomialAt 𝕜 f x) : CPolynomialAt 𝕜 (-f) x := let ⟨_, _, hpf⟩ := hf hpf.neg.cPolynomialAt theorem HasFiniteFPowerSeriesOnBall.sub (hf : HasFiniteFPowerSeriesOnBall f pf x n r) (hg : HasFiniteFPowerSeriesOnBall g pg x m r) : HasFiniteFPowerSeriesOnBall (f - g) (pf - pg) x (max n m) r := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem HasFiniteFPowerSeriesAt.sub (hf : HasFiniteFPowerSeriesAt f pf x n) (hg : HasFiniteFPowerSeriesAt g pg x m) : HasFiniteFPowerSeriesAt (f - g) (pf - pg) x (max n m) := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem CPolynomialAt.sub (hf : CPolynomialAt 𝕜 f x) (hg : CPolynomialAt 𝕜 g x) : CPolynomialAt 𝕜 (f - g) x := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem CPolynomialOn.mono {s t : Set E} (hf : CPolynomialOn 𝕜 f t) (hst : s ⊆ t) : CPolynomialOn 𝕜 f s := fun z hz => hf z (hst hz) theorem CPolynomialOn.congr' {s : Set E} (hf : CPolynomialOn 𝕜 f s) (hg : f =ᶠ[𝓝ˢ s] g) : CPolynomialOn 𝕜 g s := fun z hz => (hf z hz).congr (mem_nhdsSet_iff_forall.mp hg z hz) theorem CPolynomialOn_congr' {s : Set E} (h : f =ᶠ[𝓝ˢ s] g) : CPolynomialOn 𝕜 f s ↔ CPolynomialOn 𝕜 g s := ⟨fun hf => hf.congr' h, fun hg => hg.congr' h.symm⟩ theorem CPolynomialOn.congr {s : Set E} (hs : IsOpen s) (hf : CPolynomialOn 𝕜 f s) (hg : s.EqOn f g) : CPolynomialOn 𝕜 g s := hf.congr' <\| mem_nhdsSet_iff_forall.mpr (fun _ hz => eventuallyEq_iff_exists_mem.mpr ⟨s, hs.mem_nhds hz, hg⟩) theorem CPolynomialOn_congr {s : Set E} (hs : IsOpen s) (h : s.EqOn f g) : CPolynomialOn 𝕜 f s ↔ CPolynomialOn 𝕜 g s := ⟨fun hf => hf.congr hs h, fun hg => hg.congr hs h.symm⟩ theorem CPolynomialOn.add {s : Set E} (hf : CPolynomialOn 𝕜 f s) (hg : CPolynomialOn 𝕜 g s) : CPolynomialOn 𝕜 (f + g) s := fun z hz => (hf z hz).add (hg z hz) theorem CPolynomialOn.sub {s : Set E} (hf : CPolynomialOn 𝕜 f s) (hg : CPolynomialOn 𝕜 g s) : CPolynomialOn 𝕜 (f - g) s := fun z hz => (hf z hz).sub (hg z hz) theorem ContinuousLinearMap.comp_hasFiniteFPowerSeriesOnBall (g : F →L[𝕜] G) (h : HasFiniteFPowerSeriesOnBall f p x n r) : HasFiniteFPowerSeriesOnBall (g ∘ f) (g.compFormalMultilinearSeries p) x n r := ⟨g.comp_hasFPowerSeriesOnBall h.1, fun m hm ↦ by rw [compFormalMultilinearSeries_apply, h.finite m hm] ext; exact map_zero g⟩ theorem ContinuousLinearMap.comp_cPolynomialOn {s : Set E} (g : F →L[𝕜] G) (h : CPolynomialOn 𝕜 f s) : CPolynomialOn 𝕜 (g ∘ f) s := by rintro x hx rcases h x hx with ⟨p, n, r, hp⟩ exact ⟨g.compFormalMultilinearSeries p, n, r, g.comp_hasFiniteFPowerSeriesOnBall hp⟩ theorem HasFiniteFPowerSeriesOnBall.eq_partialSum (hf : HasFiniteFPowerSeriesOnBall f p x n r) : ∀ y ∈ EMetric.ball (0 : E) r, ∀ m, n ≤ m → f (x + y) = p.partialSum m y := fun y hy m hm ↦ (hf.hasSum hy).unique (hasSum_sum_of_ne_finset_zero (f := fun m => p m (fun _ => y)) (s := Finset.range m) (fun N hN => by simp only; simp only [Finset.mem_range, not_lt] at hN rw [hf.finite _ (le_trans hm hN), ContinuousMultilinearMap.zero_apply])) theorem HasFiniteFPowerSeriesOnBall.eq_partialSum' (hf : HasFiniteFPowerSeriesOnBall f p x n r) : ∀ y ∈ EMetric.ball x r, ∀ m, n ≤ m → f y = p.partialSum m (y - x) := by intro y hy m hm rw [EMetric.mem_ball, edist_eq_coe_nnnorm_sub, ← mem_emetric_ball_zero_iff] at hy rw [← (HasFiniteFPowerSeriesOnBall.eq_partialSum hf _ hy m hm), add_sub_cancel] theorem HasFiniteFPowerSeriesOnBall.eq_zero_of_bound_zero (hf : HasFiniteFPowerSeriesOnBall f pf x 0 r) : ∀ y ∈ EMetric.ball x r, f y = 0 := by intro y hy rw [hf.eq_partialSum' y hy 0 le_rfl, FormalMultilinearSeries.partialSum] simp only [Finset.range_zero, Finset.sum_empty]	Mathlib/Analysis/Analytic/CPolynomial.lean	284	294	theorem HasFiniteFPowerSeriesOnBall.bound_zero_of_eq_zero (hf : ∀ y ∈ EMetric.ball x r, f y = 0) (r_pos : 0 < r) (hp : ∀ n, p n = 0) : HasFiniteFPowerSeriesOnBall f p x 0 r := by	refine ⟨⟨?_, r_pos, ?_⟩, fun n _ ↦ hp n⟩ · rw [p.radius_eq_top_of_forall_image_add_eq_zero 0 (fun n ↦ by rw [add_zero]; exact hp n)] exact le_top · intro y hy rw [hf (x + y)] · convert hasSum_zero rw [hp, ContinuousMultilinearMap.zero_apply] · rwa [EMetric.mem_ball, edist_eq_coe_nnnorm_sub, add_comm, add_sub_cancel_right, ← edist_eq_coe_nnnorm, ← EMetric.mem_ball]
import Mathlib.Algebra.BigOperators.Group.List import Mathlib.Algebra.Group.Prod import Mathlib.Data.Multiset.Basic #align_import algebra.big_operators.multiset.basic from "leanprover-community/mathlib"@"6c5f73fd6f6cc83122788a80a27cdd54663609f4" assert_not_exists MonoidWithZero variable {F ι α β γ : Type} namespace Multiset section CommMonoid variable [CommMonoid α] [CommMonoid β] {s t : Multiset α} {a : α} {m : Multiset ι} {f g : ι → α} @[to_additive "Sum of a multiset given a commutative additive monoid structure on `α`. `sum {a, b, c} = a + b + c`"] def prod : Multiset α → α := foldr (· ·) (fun x y z => by simp [mul_left_comm]) 1 #align multiset.prod Multiset.prod #align multiset.sum Multiset.sum @[to_additive] theorem prod_eq_foldr (s : Multiset α) : prod s = foldr (· * ·) (fun x y z => by simp [mul_left_comm]) 1 s := rfl #align multiset.prod_eq_foldr Multiset.prod_eq_foldr #align multiset.sum_eq_foldr Multiset.sum_eq_foldr @[to_additive] theorem prod_eq_foldl (s : Multiset α) : prod s = foldl (· * ·) (fun x y z => by simp [mul_right_comm]) 1 s := (foldr_swap _ _ _ _).trans (by simp [mul_comm]) #align multiset.prod_eq_foldl Multiset.prod_eq_foldl #align multiset.sum_eq_foldl Multiset.sum_eq_foldl @[to_additive (attr := simp, norm_cast)] theorem prod_coe (l : List α) : prod ↑l = l.prod := prod_eq_foldl _ #align multiset.coe_prod Multiset.prod_coe #align multiset.coe_sum Multiset.sum_coe @[to_additive (attr := simp)] theorem prod_toList (s : Multiset α) : s.toList.prod = s.prod := by conv_rhs => rw [← coe_toList s] rw [prod_coe] #align multiset.prod_to_list Multiset.prod_toList #align multiset.sum_to_list Multiset.sum_toList @[to_additive (attr := simp)] theorem prod_zero : @prod α _ 0 = 1 := rfl #align multiset.prod_zero Multiset.prod_zero #align multiset.sum_zero Multiset.sum_zero @[to_additive (attr := simp)] theorem prod_cons (a : α) (s) : prod (a ::ₘ s) = a * prod s := foldr_cons _ _ _ _ _ #align multiset.prod_cons Multiset.prod_cons #align multiset.sum_cons Multiset.sum_cons @[to_additive (attr := simp)] theorem prod_erase [DecidableEq α] (h : a ∈ s) : a * (s.erase a).prod = s.prod := by rw [← s.coe_toList, coe_erase, prod_coe, prod_coe, List.prod_erase (mem_toList.2 h)] #align multiset.prod_erase Multiset.prod_erase #align multiset.sum_erase Multiset.sum_erase @[to_additive (attr := simp)] theorem prod_map_erase [DecidableEq ι] {a : ι} (h : a ∈ m) : f a * ((m.erase a).map f).prod = (m.map f).prod := by rw [← m.coe_toList, coe_erase, map_coe, map_coe, prod_coe, prod_coe, List.prod_map_erase f (mem_toList.2 h)] #align multiset.prod_map_erase Multiset.prod_map_erase #align multiset.sum_map_erase Multiset.sum_map_erase @[to_additive (attr := simp)] theorem prod_singleton (a : α) : prod {a} = a := by simp only [mul_one, prod_cons, ← cons_zero, eq_self_iff_true, prod_zero] #align multiset.prod_singleton Multiset.prod_singleton #align multiset.sum_singleton Multiset.sum_singleton @[to_additive] theorem prod_pair (a b : α) : ({a, b} : Multiset α).prod = a * b := by rw [insert_eq_cons, prod_cons, prod_singleton] #align multiset.prod_pair Multiset.prod_pair #align multiset.sum_pair Multiset.sum_pair @[to_additive (attr := simp)] theorem prod_add (s t : Multiset α) : prod (s + t) = prod s * prod t := Quotient.inductionOn₂ s t fun l₁ l₂ => by simp #align multiset.prod_add Multiset.prod_add #align multiset.sum_add Multiset.sum_add @[to_additive] theorem prod_nsmul (m : Multiset α) : ∀ n : ℕ, (n • m).prod = m.prod ^ n \| 0 => by rw [zero_nsmul, pow_zero] rfl \| n + 1 => by rw [add_nsmul, one_nsmul, pow_add, pow_one, prod_add, prod_nsmul m n] #align multiset.prod_nsmul Multiset.prod_nsmul @[to_additive] theorem prod_filter_mul_prod_filter_not (p) [DecidablePred p] : (s.filter p).prod * (s.filter (fun a ↦ ¬ p a)).prod = s.prod := by rw [← prod_add, filter_add_not] @[to_additive (attr := simp)] theorem prod_replicate (n : ℕ) (a : α) : (replicate n a).prod = a ^ n := by simp [replicate, List.prod_replicate] #align multiset.prod_replicate Multiset.prod_replicate #align multiset.sum_replicate Multiset.sum_replicate @[to_additive] theorem prod_map_eq_pow_single [DecidableEq ι] (i : ι) (hf : ∀ i' ≠ i, i' ∈ m → f i' = 1) : (m.map f).prod = f i ^ m.count i := by induction' m using Quotient.inductionOn with l simp [List.prod_map_eq_pow_single i f hf] #align multiset.prod_map_eq_pow_single Multiset.prod_map_eq_pow_single #align multiset.sum_map_eq_nsmul_single Multiset.sum_map_eq_nsmul_single @[to_additive] theorem prod_eq_pow_single [DecidableEq α] (a : α) (h : ∀ a' ≠ a, a' ∈ s → a' = 1) : s.prod = a ^ s.count a := by induction' s using Quotient.inductionOn with l simp [List.prod_eq_pow_single a h] #align multiset.prod_eq_pow_single Multiset.prod_eq_pow_single #align multiset.sum_eq_nsmul_single Multiset.sum_eq_nsmul_single @[to_additive] lemma prod_eq_one (h : ∀ x ∈ s, x = (1 : α)) : s.prod = 1 := by induction' s using Quotient.inductionOn with l; simp [List.prod_eq_one h] #align multiset.prod_eq_one Multiset.prod_eq_one #align multiset.sum_eq_zero Multiset.sum_eq_zero @[to_additive] theorem pow_count [DecidableEq α] (a : α) : a ^ s.count a = (s.filter (Eq a)).prod := by rw [filter_eq, prod_replicate] #align multiset.pow_count Multiset.pow_count #align multiset.nsmul_count Multiset.nsmul_count @[to_additive] theorem prod_hom [CommMonoid β] (s : Multiset α) {F : Type} [FunLike F α β] [MonoidHomClass F α β] (f : F) : (s.map f).prod = f s.prod := Quotient.inductionOn s fun l => by simp only [l.prod_hom f, quot_mk_to_coe, map_coe, prod_coe] #align multiset.prod_hom Multiset.prod_hom #align multiset.sum_hom Multiset.sum_hom @[to_additive] theorem prod_hom' [CommMonoid β] (s : Multiset ι) {F : Type} [FunLike F α β] [MonoidHomClass F α β] (f : F) (g : ι → α) : (s.map fun i => f <\| g i).prod = f (s.map g).prod := by convert (s.map g).prod_hom f exact (map_map _ _ _).symm #align multiset.prod_hom' Multiset.prod_hom' #align multiset.sum_hom' Multiset.sum_hom' @[to_additive] theorem prod_hom₂ [CommMonoid β] [CommMonoid γ] (s : Multiset ι) (f : α → β → γ) (hf : ∀ a b c d, f (a * b) (c * d) = f a c * f b d) (hf' : f 1 1 = 1) (f₁ : ι → α) (f₂ : ι → β) : (s.map fun i => f (f₁ i) (f₂ i)).prod = f (s.map f₁).prod (s.map f₂).prod := Quotient.inductionOn s fun l => by simp only [l.prod_hom₂ f hf hf', quot_mk_to_coe, map_coe, prod_coe] #align multiset.prod_hom₂ Multiset.prod_hom₂ #align multiset.sum_hom₂ Multiset.sum_hom₂ @[to_additive] theorem prod_hom_rel [CommMonoid β] (s : Multiset ι) {r : α → β → Prop} {f : ι → α} {g : ι → β} (h₁ : r 1 1) (h₂ : ∀ ⦃a b c⦄, r b c → r (f a * b) (g a * c)) : r (s.map f).prod (s.map g).prod := Quotient.inductionOn s fun l => by simp only [l.prod_hom_rel h₁ h₂, quot_mk_to_coe, map_coe, prod_coe] #align multiset.prod_hom_rel Multiset.prod_hom_rel #align multiset.sum_hom_rel Multiset.sum_hom_rel @[to_additive] theorem prod_map_one : prod (m.map fun _ => (1 : α)) = 1 := by rw [map_const', prod_replicate, one_pow] #align multiset.prod_map_one Multiset.prod_map_one #align multiset.sum_map_zero Multiset.sum_map_zero @[to_additive (attr := simp)] theorem prod_map_mul : (m.map fun i => f i * g i).prod = (m.map f).prod * (m.map g).prod := m.prod_hom₂ (· * ·) mul_mul_mul_comm (mul_one _) _ _ #align multiset.prod_map_mul Multiset.prod_map_mul #align multiset.sum_map_add Multiset.sum_map_add @[to_additive] theorem prod_map_pow {n : ℕ} : (m.map fun i => f i ^ n).prod = (m.map f).prod ^ n := m.prod_hom' (powMonoidHom n : α →* α) f #align multiset.prod_map_pow Multiset.prod_map_pow #align multiset.sum_map_nsmul Multiset.sum_map_nsmul @[to_additive] theorem prod_map_prod_map (m : Multiset β) (n : Multiset γ) {f : β → γ → α} : prod (m.map fun a => prod <\| n.map fun b => f a b) = prod (n.map fun b => prod <\| m.map fun a => f a b) := Multiset.induction_on m (by simp) fun a m ih => by simp [ih] #align multiset.prod_map_prod_map Multiset.prod_map_prod_map #align multiset.sum_map_sum_map Multiset.sum_map_sum_map @[to_additive] theorem prod_induction (p : α → Prop) (s : Multiset α) (p_mul : ∀ a b, p a → p b → p (a * b)) (p_one : p 1) (p_s : ∀ a ∈ s, p a) : p s.prod := by rw [prod_eq_foldr] exact foldr_induction (· * ·) (fun x y z => by simp [mul_left_comm]) 1 p s p_mul p_one p_s #align multiset.prod_induction Multiset.prod_induction #align multiset.sum_induction Multiset.sum_induction @[to_additive]	Mathlib/Algebra/BigOperators/Group/Multiset.lean	233	242	theorem prod_induction_nonempty (p : α → Prop) (p_mul : ∀ a b, p a → p b → p (a * b)) (hs : s ≠ ∅) (p_s : ∀ a ∈ s, p a) : p s.prod := by	-- Porting note: used to be `refine' Multiset.induction _ _` induction' s using Multiset.induction_on with a s hsa · simp at hs rw [prod_cons] by_cases hs_empty : s = ∅ · simp [hs_empty, p_s a] have hps : ∀ x, x ∈ s → p x := fun x hxs => p_s x (mem_cons_of_mem hxs) exact p_mul a s.prod (p_s a (mem_cons_self a s)) (hsa hs_empty hps)
import Mathlib.Topology.UniformSpace.Cauchy import Mathlib.Topology.UniformSpace.Separation import Mathlib.Topology.DenseEmbedding #align_import topology.uniform_space.uniform_embedding from "leanprover-community/mathlib"@"195fcd60ff2bfe392543bceb0ec2adcdb472db4c" open Filter Function Set Uniformity Topology section universe u v w variable {α : Type u} {β : Type v} {γ : Type w} [UniformSpace α] [UniformSpace β] [UniformSpace γ] @[mk_iff] structure UniformInducing (f : α → β) : Prop where comap_uniformity : comap (fun x : α × α => (f x.1, f x.2)) (𝓤 β) = 𝓤 α #align uniform_inducing UniformInducing #align uniform_inducing_iff uniformInducing_iff lemma uniformInducing_iff_uniformSpace {f : α → β} : UniformInducing f ↔ ‹UniformSpace β›.comap f = ‹UniformSpace α› := by rw [uniformInducing_iff, UniformSpace.ext_iff, Filter.ext_iff] rfl protected alias ⟨UniformInducing.comap_uniformSpace, _⟩ := uniformInducing_iff_uniformSpace #align uniform_inducing.comap_uniform_space UniformInducing.comap_uniformSpace lemma uniformInducing_iff' {f : α → β} : UniformInducing f ↔ UniformContinuous f ∧ comap (Prod.map f f) (𝓤 β) ≤ 𝓤 α := by rw [uniformInducing_iff, UniformContinuous, tendsto_iff_comap, le_antisymm_iff, and_comm]; rfl #align uniform_inducing_iff' uniformInducing_iff' protected lemma Filter.HasBasis.uniformInducing_iff {ι ι'} {p : ι → Prop} {p' : ι' → Prop} {s s'} (h : (𝓤 α).HasBasis p s) (h' : (𝓤 β).HasBasis p' s') {f : α → β} : UniformInducing f ↔ (∀ i, p' i → ∃ j, p j ∧ ∀ x y, (x, y) ∈ s j → (f x, f y) ∈ s' i) ∧ (∀ j, p j → ∃ i, p' i ∧ ∀ x y, (f x, f y) ∈ s' i → (x, y) ∈ s j) := by simp [uniformInducing_iff', h.uniformContinuous_iff h', (h'.comap _).le_basis_iff h, subset_def] #align filter.has_basis.uniform_inducing_iff Filter.HasBasis.uniformInducing_iff theorem UniformInducing.mk' {f : α → β} (h : ∀ s, s ∈ 𝓤 α ↔ ∃ t ∈ 𝓤 β, ∀ x y : α, (f x, f y) ∈ t → (x, y) ∈ s) : UniformInducing f := ⟨by simp [eq_comm, Filter.ext_iff, subset_def, h]⟩ #align uniform_inducing.mk' UniformInducing.mk' theorem uniformInducing_id : UniformInducing (@id α) := ⟨by rw [← Prod.map_def, Prod.map_id, comap_id]⟩ #align uniform_inducing_id uniformInducing_id theorem UniformInducing.comp {g : β → γ} (hg : UniformInducing g) {f : α → β} (hf : UniformInducing f) : UniformInducing (g ∘ f) := ⟨by rw [← hf.1, ← hg.1, comap_comap]; rfl⟩ #align uniform_inducing.comp UniformInducing.comp theorem UniformInducing.of_comp_iff {g : β → γ} (hg : UniformInducing g) {f : α → β} : UniformInducing (g ∘ f) ↔ UniformInducing f := by refine ⟨fun h ↦ ?_, hg.comp⟩ rw [uniformInducing_iff, ← hg.comap_uniformity, comap_comap, ← h.comap_uniformity, Function.comp, Function.comp] theorem UniformInducing.basis_uniformity {f : α → β} (hf : UniformInducing f) {ι : Sort} {p : ι → Prop} {s : ι → Set (β × β)} (H : (𝓤 β).HasBasis p s) : (𝓤 α).HasBasis p fun i => Prod.map f f ⁻¹' s i := hf.1 ▸ H.comap _ #align uniform_inducing.basis_uniformity UniformInducing.basis_uniformity theorem UniformInducing.cauchy_map_iff {f : α → β} (hf : UniformInducing f) {F : Filter α} : Cauchy (map f F) ↔ Cauchy F := by simp only [Cauchy, map_neBot_iff, prod_map_map_eq, map_le_iff_le_comap, ← hf.comap_uniformity] #align uniform_inducing.cauchy_map_iff UniformInducing.cauchy_map_iff theorem uniformInducing_of_compose {f : α → β} {g : β → γ} (hf : UniformContinuous f) (hg : UniformContinuous g) (hgf : UniformInducing (g ∘ f)) : UniformInducing f := by refine ⟨le_antisymm ?_ hf.le_comap⟩ rw [← hgf.1, ← Prod.map_def, ← Prod.map_def, ← Prod.map_comp_map f f g g, ← comap_comap] exact comap_mono hg.le_comap #align uniform_inducing_of_compose uniformInducing_of_compose theorem UniformInducing.uniformContinuous {f : α → β} (hf : UniformInducing f) : UniformContinuous f := (uniformInducing_iff'.1 hf).1 #align uniform_inducing.uniform_continuous UniformInducing.uniformContinuous theorem UniformInducing.uniformContinuous_iff {f : α → β} {g : β → γ} (hg : UniformInducing g) : UniformContinuous f ↔ UniformContinuous (g ∘ f) := by dsimp only [UniformContinuous, Tendsto] rw [← hg.comap_uniformity, ← map_le_iff_le_comap, Filter.map_map]; rfl #align uniform_inducing.uniform_continuous_iff UniformInducing.uniformContinuous_iff theorem UniformInducing.uniformContinuousOn_iff {f : α → β} {g : β → γ} {S : Set α} (hg : UniformInducing g) : UniformContinuousOn f S ↔ UniformContinuousOn (g ∘ f) S := by dsimp only [UniformContinuousOn, Tendsto] rw [← hg.comap_uniformity, ← map_le_iff_le_comap, Filter.map_map, comp_def, comp_def] theorem UniformInducing.inducing {f : α → β} (h : UniformInducing f) : Inducing f := by obtain rfl := h.comap_uniformSpace exact inducing_induced f #align uniform_inducing.inducing UniformInducing.inducing theorem UniformInducing.prod {α' : Type} {β' : Type*} [UniformSpace α'] [UniformSpace β'] {e₁ : α → α'} {e₂ : β → β'} (h₁ : UniformInducing e₁) (h₂ : UniformInducing e₂) : UniformInducing fun p : α × β => (e₁ p.1, e₂ p.2) := ⟨by simp [(· ∘ ·), uniformity_prod, ← h₁.1, ← h₂.1, comap_inf, comap_comap]⟩ #align uniform_inducing.prod UniformInducing.prod theorem UniformInducing.denseInducing {f : α → β} (h : UniformInducing f) (hd : DenseRange f) : DenseInducing f := { dense := hd induced := h.inducing.induced } #align uniform_inducing.dense_inducing UniformInducing.denseInducing theorem SeparationQuotient.uniformInducing_mk : UniformInducing (mk : α → SeparationQuotient α) := ⟨comap_mk_uniformity⟩ protected theorem UniformInducing.injective [T0Space α] {f : α → β} (h : UniformInducing f) : Injective f := h.inducing.injective @[mk_iff] structure UniformEmbedding (f : α → β) extends UniformInducing f : Prop where inj : Function.Injective f #align uniform_embedding UniformEmbedding #align uniform_embedding_iff uniformEmbedding_iff theorem uniformEmbedding_iff' {f : α → β} : UniformEmbedding f ↔ Injective f ∧ UniformContinuous f ∧ comap (Prod.map f f) (𝓤 β) ≤ 𝓤 α := by rw [uniformEmbedding_iff, and_comm, uniformInducing_iff'] #align uniform_embedding_iff' uniformEmbedding_iff' theorem Filter.HasBasis.uniformEmbedding_iff' {ι ι'} {p : ι → Prop} {p' : ι' → Prop} {s s'} (h : (𝓤 α).HasBasis p s) (h' : (𝓤 β).HasBasis p' s') {f : α → β} : UniformEmbedding f ↔ Injective f ∧ (∀ i, p' i → ∃ j, p j ∧ ∀ x y, (x, y) ∈ s j → (f x, f y) ∈ s' i) ∧ (∀ j, p j → ∃ i, p' i ∧ ∀ x y, (f x, f y) ∈ s' i → (x, y) ∈ s j) := by rw [uniformEmbedding_iff, and_comm, h.uniformInducing_iff h'] #align filter.has_basis.uniform_embedding_iff' Filter.HasBasis.uniformEmbedding_iff'	Mathlib/Topology/UniformSpace/UniformEmbedding.lean	166	170	theorem Filter.HasBasis.uniformEmbedding_iff {ι ι'} {p : ι → Prop} {p' : ι' → Prop} {s s'} (h : (𝓤 α).HasBasis p s) (h' : (𝓤 β).HasBasis p' s') {f : α → β} : UniformEmbedding f ↔ Injective f ∧ UniformContinuous f ∧ (∀ j, p j → ∃ i, p' i ∧ ∀ x y, (f x, f y) ∈ s' i → (x, y) ∈ s j) := by	simp only [h.uniformEmbedding_iff' h', h.uniformContinuous_iff h']
import Mathlib.Analysis.SpecialFunctions.Pow.Asymptotics #align_import analysis.special_functions.pow.continuity from "leanprover-community/mathlib"@"0b9eaaa7686280fad8cce467f5c3c57ee6ce77f8" noncomputable section open scoped Classical open Real Topology NNReal ENNReal Filter ComplexConjugate open Filter Finset Set section CpowLimits open Complex variable {α : Type} theorem zero_cpow_eq_nhds {b : ℂ} (hb : b ≠ 0) : (fun x : ℂ => (0 : ℂ) ^ x) =ᶠ[𝓝 b] 0 := by suffices ∀ᶠ x : ℂ in 𝓝 b, x ≠ 0 from this.mono fun x hx ↦ by dsimp only rw [zero_cpow hx, Pi.zero_apply] exact IsOpen.eventually_mem isOpen_ne hb #align zero_cpow_eq_nhds zero_cpow_eq_nhds theorem cpow_eq_nhds {a b : ℂ} (ha : a ≠ 0) : (fun x => x ^ b) =ᶠ[𝓝 a] fun x => exp (log x b) := by suffices ∀ᶠ x : ℂ in 𝓝 a, x ≠ 0 from this.mono fun x hx ↦ by dsimp only rw [cpow_def_of_ne_zero hx] exact IsOpen.eventually_mem isOpen_ne ha #align cpow_eq_nhds cpow_eq_nhds theorem cpow_eq_nhds' {p : ℂ × ℂ} (hp_fst : p.fst ≠ 0) : (fun x => x.1 ^ x.2) =ᶠ[𝓝 p] fun x => exp (log x.1 * x.2) := by suffices ∀ᶠ x : ℂ × ℂ in 𝓝 p, x.1 ≠ 0 from this.mono fun x hx ↦ by dsimp only rw [cpow_def_of_ne_zero hx] refine IsOpen.eventually_mem ?_ hp_fst change IsOpen { x : ℂ × ℂ \| x.1 = 0 }ᶜ rw [isOpen_compl_iff] exact isClosed_eq continuous_fst continuous_const #align cpow_eq_nhds' cpow_eq_nhds' -- Continuity of `fun x => a ^ x`: union of these two lemmas is optimal. theorem continuousAt_const_cpow {a b : ℂ} (ha : a ≠ 0) : ContinuousAt (fun x : ℂ => a ^ x) b := by have cpow_eq : (fun x : ℂ => a ^ x) = fun x => exp (log a * x) := by ext1 b rw [cpow_def_of_ne_zero ha] rw [cpow_eq] exact continuous_exp.continuousAt.comp (ContinuousAt.mul continuousAt_const continuousAt_id) #align continuous_at_const_cpow continuousAt_const_cpow theorem continuousAt_const_cpow' {a b : ℂ} (h : b ≠ 0) : ContinuousAt (fun x : ℂ => a ^ x) b := by by_cases ha : a = 0 · rw [ha, continuousAt_congr (zero_cpow_eq_nhds h)] exact continuousAt_const · exact continuousAt_const_cpow ha #align continuous_at_const_cpow' continuousAt_const_cpow'	Mathlib/Analysis/SpecialFunctions/Pow/Continuity.lean	84	91	theorem continuousAt_cpow {p : ℂ × ℂ} (hp_fst : p.fst ∈ slitPlane) : ContinuousAt (fun x : ℂ × ℂ => x.1 ^ x.2) p := by	rw [continuousAt_congr (cpow_eq_nhds' <\| slitPlane_ne_zero hp_fst)] refine continuous_exp.continuousAt.comp ?_ exact ContinuousAt.mul (ContinuousAt.comp (continuousAt_clog hp_fst) continuous_fst.continuousAt) continuous_snd.continuousAt
import Mathlib.Topology.Maps import Mathlib.Topology.NhdsSet #align_import topology.constructions from "leanprover-community/mathlib"@"f7ebde7ee0d1505dfccac8644ae12371aa3c1c9f" noncomputable section open scoped Classical open Topology TopologicalSpace Set Filter Function universe u v variable {X : Type u} {Y : Type v} {Z W ε ζ : Type} section Constructions instance instTopologicalSpaceSubtype {p : X → Prop} [t : TopologicalSpace X] : TopologicalSpace (Subtype p) := induced (↑) t 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 instTopologicalSpaceProd [t₁ : TopologicalSpace X] [t₂ : TopologicalSpace Y] : TopologicalSpace (X × Y) := induced Prod.fst t₁ ⊓ induced Prod.snd t₂ instance instTopologicalSpaceSum [t₁ : TopologicalSpace X] [t₂ : TopologicalSpace Y] : TopologicalSpace (X ⊕ Y) := coinduced Sum.inl t₁ ⊔ coinduced Sum.inr t₂ 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) #align Pi.topological_space Pi.topologicalSpace instance ULift.topologicalSpace [t : TopologicalSpace X] : TopologicalSpace (ULift.{v, u} X) := t.induced ULift.down #align ulift.topological_space ULift.topologicalSpace 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 #align continuous_of_mul continuous_ofMul theorem continuous_toMul : Continuous (toMul : Additive X → X) := continuous_id #align continuous_to_mul continuous_toMul theorem continuous_ofAdd : Continuous (ofAdd : X → Multiplicative X) := continuous_id #align continuous_of_add continuous_ofAdd theorem continuous_toAdd : Continuous (toAdd : Multiplicative X → X) := continuous_id #align continuous_to_add continuous_toAdd theorem isOpenMap_ofMul : IsOpenMap (ofMul : X → Additive X) := IsOpenMap.id #align is_open_map_of_mul isOpenMap_ofMul theorem isOpenMap_toMul : IsOpenMap (toMul : Additive X → X) := IsOpenMap.id #align is_open_map_to_mul isOpenMap_toMul theorem isOpenMap_ofAdd : IsOpenMap (ofAdd : X → Multiplicative X) := IsOpenMap.id #align is_open_map_of_add isOpenMap_ofAdd theorem isOpenMap_toAdd : IsOpenMap (toAdd : Multiplicative X → X) := IsOpenMap.id #align is_open_map_to_add isOpenMap_toAdd theorem isClosedMap_ofMul : IsClosedMap (ofMul : X → Additive X) := IsClosedMap.id #align is_closed_map_of_mul isClosedMap_ofMul theorem isClosedMap_toMul : IsClosedMap (toMul : Additive X → X) := IsClosedMap.id #align is_closed_map_to_mul isClosedMap_toMul theorem isClosedMap_ofAdd : IsClosedMap (ofAdd : X → Multiplicative X) := IsClosedMap.id #align is_closed_map_of_add isClosedMap_ofAdd theorem isClosedMap_toAdd : IsClosedMap (toAdd : Multiplicative X → X) := IsClosedMap.id #align is_closed_map_to_add isClosedMap_toAdd theorem nhds_ofMul (x : X) : 𝓝 (ofMul x) = map ofMul (𝓝 x) := rfl #align nhds_of_mul nhds_ofMul theorem nhds_ofAdd (x : X) : 𝓝 (ofAdd x) = map ofAdd (𝓝 x) := rfl #align nhds_of_add nhds_ofAdd theorem nhds_toMul (x : Additive X) : 𝓝 (toMul x) = map toMul (𝓝 x) := rfl #align nhds_to_mul nhds_toMul theorem nhds_toAdd (x : Multiplicative X) : 𝓝 (toAdd x) = map toAdd (𝓝 x) := rfl #align nhds_to_add nhds_toAdd end section variable [TopologicalSpace X] open OrderDual instance : TopologicalSpace Xᵒᵈ := ‹TopologicalSpace X› instance [DiscreteTopology X] : DiscreteTopology Xᵒᵈ := ‹DiscreteTopology X› theorem continuous_toDual : Continuous (toDual : X → Xᵒᵈ) := continuous_id #align continuous_to_dual continuous_toDual theorem continuous_ofDual : Continuous (ofDual : Xᵒᵈ → X) := continuous_id #align continuous_of_dual continuous_ofDual theorem isOpenMap_toDual : IsOpenMap (toDual : X → Xᵒᵈ) := IsOpenMap.id #align is_open_map_to_dual isOpenMap_toDual theorem isOpenMap_ofDual : IsOpenMap (ofDual : Xᵒᵈ → X) := IsOpenMap.id #align is_open_map_of_dual isOpenMap_ofDual theorem isClosedMap_toDual : IsClosedMap (toDual : X → Xᵒᵈ) := IsClosedMap.id #align is_closed_map_to_dual isClosedMap_toDual theorem isClosedMap_ofDual : IsClosedMap (ofDual : Xᵒᵈ → X) := IsClosedMap.id #align is_closed_map_of_dual isClosedMap_ofDual theorem nhds_toDual (x : X) : 𝓝 (toDual x) = map toDual (𝓝 x) := rfl #align nhds_to_dual nhds_toDual theorem nhds_ofDual (x : X) : 𝓝 (ofDual x) = map ofDual (𝓝 x) := rfl #align nhds_of_dual nhds_ofDual 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 #align quotient.preimage_mem_nhds Quotient.preimage_mem_nhds theorem Dense.quotient [Setoid X] [TopologicalSpace X] {s : Set X} (H : Dense s) : Dense (Quotient.mk' '' s) := Quotient.surjective_Quotient_mk''.denseRange.dense_image continuous_coinduced_rng H #align dense.quotient Dense.quotient theorem DenseRange.quotient [Setoid X] [TopologicalSpace X] {f : Y → X} (hf : DenseRange f) : DenseRange (Quotient.mk' ∘ f) := Quotient.surjective_Quotient_mk''.denseRange.comp hf continuous_coinduced_rng #align dense_range.quotient DenseRange.quotient 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]⟩ #align sum.discrete_topology Sum.discreteTopology 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]⟩ #align sigma.discrete_topology Sigma.discreteTopology def CofiniteTopology (X : Type*) := X #align cofinite_topology CofiniteTopology section Sum open Sum variable [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] [TopologicalSpace W] theorem continuous_sum_dom {f : X ⊕ Y → Z} : Continuous f ↔ Continuous (f ∘ Sum.inl) ∧ Continuous (f ∘ Sum.inr) := (continuous_sup_dom (t₁ := TopologicalSpace.coinduced Sum.inl _) (t₂ := TopologicalSpace.coinduced Sum.inr _)).trans <\| continuous_coinduced_dom.and continuous_coinduced_dom #align continuous_sum_dom continuous_sum_dom theorem continuous_sum_elim {f : X → Z} {g : Y → Z} : Continuous (Sum.elim f g) ↔ Continuous f ∧ Continuous g := continuous_sum_dom #align continuous_sum_elim continuous_sum_elim @[continuity] theorem Continuous.sum_elim {f : X → Z} {g : Y → Z} (hf : Continuous f) (hg : Continuous g) : Continuous (Sum.elim f g) := continuous_sum_elim.2 ⟨hf, hg⟩ #align continuous.sum_elim Continuous.sum_elim @[continuity] theorem continuous_isLeft : Continuous (isLeft : X ⊕ Y → Bool) := continuous_sum_dom.2 ⟨continuous_const, continuous_const⟩ @[continuity] theorem continuous_isRight : Continuous (isRight : X ⊕ Y → Bool) := continuous_sum_dom.2 ⟨continuous_const, continuous_const⟩ @[continuity] -- Porting note: the proof was `continuous_sup_rng_left continuous_coinduced_rng` theorem continuous_inl : Continuous (@inl X Y) := ⟨fun _ => And.left⟩ #align continuous_inl continuous_inl @[continuity] -- Porting note: the proof was `continuous_sup_rng_right continuous_coinduced_rng` theorem continuous_inr : Continuous (@inr X Y) := ⟨fun _ => And.right⟩ #align continuous_inr continuous_inr theorem isOpen_sum_iff {s : Set (X ⊕ Y)} : IsOpen s ↔ IsOpen (inl ⁻¹' s) ∧ IsOpen (inr ⁻¹' s) := Iff.rfl #align is_open_sum_iff isOpen_sum_iff -- Porting note (#10756): new theorem theorem isClosed_sum_iff {s : Set (X ⊕ Y)} : IsClosed s ↔ IsClosed (inl ⁻¹' s) ∧ IsClosed (inr ⁻¹' s) := by simp only [← isOpen_compl_iff, isOpen_sum_iff, preimage_compl] theorem isOpenMap_inl : IsOpenMap (@inl X Y) := fun u hu => by simpa [isOpen_sum_iff, preimage_image_eq u Sum.inl_injective] #align is_open_map_inl isOpenMap_inl theorem isOpenMap_inr : IsOpenMap (@inr X Y) := fun u hu => by simpa [isOpen_sum_iff, preimage_image_eq u Sum.inr_injective] #align is_open_map_inr isOpenMap_inr theorem openEmbedding_inl : OpenEmbedding (@inl X Y) := openEmbedding_of_continuous_injective_open continuous_inl inl_injective isOpenMap_inl #align open_embedding_inl openEmbedding_inl theorem openEmbedding_inr : OpenEmbedding (@inr X Y) := openEmbedding_of_continuous_injective_open continuous_inr inr_injective isOpenMap_inr #align open_embedding_inr openEmbedding_inr theorem embedding_inl : Embedding (@inl X Y) := openEmbedding_inl.1 #align embedding_inl embedding_inl theorem embedding_inr : Embedding (@inr X Y) := openEmbedding_inr.1 #align embedding_inr embedding_inr theorem isOpen_range_inl : IsOpen (range (inl : X → X ⊕ Y)) := openEmbedding_inl.2 #align is_open_range_inl isOpen_range_inl theorem isOpen_range_inr : IsOpen (range (inr : Y → X ⊕ Y)) := openEmbedding_inr.2 #align is_open_range_inr isOpen_range_inr theorem isClosed_range_inl : IsClosed (range (inl : X → X ⊕ Y)) := by rw [← isOpen_compl_iff, compl_range_inl] exact isOpen_range_inr #align is_closed_range_inl isClosed_range_inl	Mathlib/Topology/Constructions.lean	1,008	1,010	theorem isClosed_range_inr : IsClosed (range (inr : Y → X ⊕ Y)) := by	rw [← isOpen_compl_iff, compl_range_inr] exact isOpen_range_inl
import Mathlib.Geometry.Euclidean.Angle.Oriented.Affine import Mathlib.Geometry.Euclidean.Angle.Unoriented.RightAngle #align_import geometry.euclidean.angle.oriented.right_angle from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" noncomputable section open scoped EuclideanGeometry open scoped Real open scoped RealInnerProductSpace namespace EuclideanGeometry open FiniteDimensional 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)] theorem oangle_right_eq_arccos_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : ∡ p₂ p₃ p₁ = Real.arccos (dist p₃ p₂ / dist p₁ p₃) := by have hs : (∡ p₂ p₃ p₁).sign = 1 := by rw [oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_eq_arccos_of_angle_eq_pi_div_two (angle_eq_pi_div_two_of_oangle_eq_pi_div_two h)] #align euclidean_geometry.oangle_right_eq_arccos_of_oangle_eq_pi_div_two EuclideanGeometry.oangle_right_eq_arccos_of_oangle_eq_pi_div_two theorem oangle_left_eq_arccos_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : ∡ p₃ p₁ p₂ = Real.arccos (dist p₁ p₂ / dist p₁ p₃) := by have hs : (∡ p₃ p₁ p₂).sign = 1 := by rw [← oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_comm, angle_eq_arccos_of_angle_eq_pi_div_two (angle_rev_eq_pi_div_two_of_oangle_eq_pi_div_two h), dist_comm p₁ p₃] #align euclidean_geometry.oangle_left_eq_arccos_of_oangle_eq_pi_div_two EuclideanGeometry.oangle_left_eq_arccos_of_oangle_eq_pi_div_two theorem oangle_right_eq_arcsin_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : ∡ p₂ p₃ p₁ = Real.arcsin (dist p₁ p₂ / dist p₁ p₃) := by have hs : (∡ p₂ p₃ p₁).sign = 1 := by rw [oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_eq_arcsin_of_angle_eq_pi_div_two (angle_eq_pi_div_two_of_oangle_eq_pi_div_two h) (Or.inl (left_ne_of_oangle_eq_pi_div_two h))] #align euclidean_geometry.oangle_right_eq_arcsin_of_oangle_eq_pi_div_two EuclideanGeometry.oangle_right_eq_arcsin_of_oangle_eq_pi_div_two theorem oangle_left_eq_arcsin_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : ∡ p₃ p₁ p₂ = Real.arcsin (dist p₃ p₂ / dist p₁ p₃) := by have hs : (∡ p₃ p₁ p₂).sign = 1 := by rw [← oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_comm, angle_eq_arcsin_of_angle_eq_pi_div_two (angle_rev_eq_pi_div_two_of_oangle_eq_pi_div_two h) (Or.inr (left_ne_of_oangle_eq_pi_div_two h)), dist_comm p₁ p₃] #align euclidean_geometry.oangle_left_eq_arcsin_of_oangle_eq_pi_div_two EuclideanGeometry.oangle_left_eq_arcsin_of_oangle_eq_pi_div_two theorem oangle_right_eq_arctan_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : ∡ p₂ p₃ p₁ = Real.arctan (dist p₁ p₂ / dist p₃ p₂) := by have hs : (∡ p₂ p₃ p₁).sign = 1 := by rw [oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_eq_arctan_of_angle_eq_pi_div_two (angle_eq_pi_div_two_of_oangle_eq_pi_div_two h) (right_ne_of_oangle_eq_pi_div_two h)] #align euclidean_geometry.oangle_right_eq_arctan_of_oangle_eq_pi_div_two EuclideanGeometry.oangle_right_eq_arctan_of_oangle_eq_pi_div_two theorem oangle_left_eq_arctan_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : ∡ p₃ p₁ p₂ = Real.arctan (dist p₃ p₂ / dist p₁ p₂) := by have hs : (∡ p₃ p₁ p₂).sign = 1 := by rw [← oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_comm, angle_eq_arctan_of_angle_eq_pi_div_two (angle_rev_eq_pi_div_two_of_oangle_eq_pi_div_two h) (left_ne_of_oangle_eq_pi_div_two h)] #align euclidean_geometry.oangle_left_eq_arctan_of_oangle_eq_pi_div_two EuclideanGeometry.oangle_left_eq_arctan_of_oangle_eq_pi_div_two theorem cos_oangle_right_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : Real.Angle.cos (∡ p₂ p₃ p₁) = dist p₃ p₂ / dist p₁ p₃ := by have hs : (∡ p₂ p₃ p₁).sign = 1 := by rw [oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe, cos_angle_of_angle_eq_pi_div_two (angle_eq_pi_div_two_of_oangle_eq_pi_div_two h)] #align euclidean_geometry.cos_oangle_right_of_oangle_eq_pi_div_two EuclideanGeometry.cos_oangle_right_of_oangle_eq_pi_div_two theorem cos_oangle_left_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : Real.Angle.cos (∡ p₃ p₁ p₂) = dist p₁ p₂ / dist p₁ p₃ := by have hs : (∡ p₃ p₁ p₂).sign = 1 := by rw [← oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_comm, Real.Angle.cos_coe, cos_angle_of_angle_eq_pi_div_two (angle_rev_eq_pi_div_two_of_oangle_eq_pi_div_two h), dist_comm p₁ p₃] #align euclidean_geometry.cos_oangle_left_of_oangle_eq_pi_div_two EuclideanGeometry.cos_oangle_left_of_oangle_eq_pi_div_two theorem sin_oangle_right_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : Real.Angle.sin (∡ p₂ p₃ p₁) = dist p₁ p₂ / dist p₁ p₃ := by have hs : (∡ p₂ p₃ p₁).sign = 1 := by rw [oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe, sin_angle_of_angle_eq_pi_div_two (angle_eq_pi_div_two_of_oangle_eq_pi_div_two h) (Or.inl (left_ne_of_oangle_eq_pi_div_two h))] #align euclidean_geometry.sin_oangle_right_of_oangle_eq_pi_div_two EuclideanGeometry.sin_oangle_right_of_oangle_eq_pi_div_two theorem sin_oangle_left_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : Real.Angle.sin (∡ p₃ p₁ p₂) = dist p₃ p₂ / dist p₁ p₃ := by have hs : (∡ p₃ p₁ p₂).sign = 1 := by rw [← oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_comm, Real.Angle.sin_coe, sin_angle_of_angle_eq_pi_div_two (angle_rev_eq_pi_div_two_of_oangle_eq_pi_div_two h) (Or.inr (left_ne_of_oangle_eq_pi_div_two h)), dist_comm p₁ p₃] #align euclidean_geometry.sin_oangle_left_of_oangle_eq_pi_div_two EuclideanGeometry.sin_oangle_left_of_oangle_eq_pi_div_two theorem tan_oangle_right_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : Real.Angle.tan (∡ p₂ p₃ p₁) = dist p₁ p₂ / dist p₃ p₂ := by have hs : (∡ p₂ p₃ p₁).sign = 1 := by rw [oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe, tan_angle_of_angle_eq_pi_div_two (angle_eq_pi_div_two_of_oangle_eq_pi_div_two h)] #align euclidean_geometry.tan_oangle_right_of_oangle_eq_pi_div_two EuclideanGeometry.tan_oangle_right_of_oangle_eq_pi_div_two	Mathlib/Geometry/Euclidean/Angle/Oriented/RightAngle.lean	682	686	theorem tan_oangle_left_of_oangle_eq_pi_div_two {p₁ p₂ p₃ : P} (h : ∡ p₁ p₂ p₃ = ↑(π / 2)) : Real.Angle.tan (∡ p₃ p₁ p₂) = dist p₃ p₂ / dist p₁ p₂ := by	have hs : (∡ p₃ p₁ p₂).sign = 1 := by rw [← oangle_rotate_sign, h, Real.Angle.sign_coe_pi_div_two] rw [oangle_eq_angle_of_sign_eq_one hs, angle_comm, Real.Angle.tan_coe, tan_angle_of_angle_eq_pi_div_two (angle_rev_eq_pi_div_two_of_oangle_eq_pi_div_two h)]
import Mathlib.LinearAlgebra.Matrix.Reindex import Mathlib.LinearAlgebra.Matrix.ToLin #align_import linear_algebra.matrix.basis from "leanprover-community/mathlib"@"6c263e4bfc2e6714de30f22178b4d0ca4d149a76" noncomputable section open LinearMap Matrix Set Submodule open Matrix section BasisToMatrix variable {ι ι' κ κ' : Type} variable {R M : Type} [CommSemiring R] [AddCommMonoid M] [Module R M] variable {R₂ M₂ : Type*} [CommRing R₂] [AddCommGroup M₂] [Module R₂ M₂] open Function Matrix def Basis.toMatrix (e : Basis ι R M) (v : ι' → M) : Matrix ι ι' R := fun i j => e.repr (v j) i #align basis.to_matrix Basis.toMatrix variable (e : Basis ι R M) (v : ι' → M) (i : ι) (j : ι') namespace Basis theorem toMatrix_apply : e.toMatrix v i j = e.repr (v j) i := rfl #align basis.to_matrix_apply Basis.toMatrix_apply theorem toMatrix_transpose_apply : (e.toMatrix v)ᵀ j = e.repr (v j) := funext fun _ => rfl #align basis.to_matrix_transpose_apply Basis.toMatrix_transpose_apply theorem toMatrix_eq_toMatrix_constr [Fintype ι] [DecidableEq ι] (v : ι → M) : e.toMatrix v = LinearMap.toMatrix e e (e.constr ℕ v) := by ext rw [Basis.toMatrix_apply, LinearMap.toMatrix_apply, Basis.constr_basis] #align basis.to_matrix_eq_to_matrix_constr Basis.toMatrix_eq_toMatrix_constr -- TODO (maybe) Adjust the definition of `Basis.toMatrix` to eliminate the transpose. theorem coePiBasisFun.toMatrix_eq_transpose [Finite ι] : ((Pi.basisFun R ι).toMatrix : Matrix ι ι R → Matrix ι ι R) = Matrix.transpose := by ext M i j rfl #align basis.coe_pi_basis_fun.to_matrix_eq_transpose Basis.coePiBasisFun.toMatrix_eq_transpose @[simp] theorem toMatrix_self [DecidableEq ι] : e.toMatrix e = 1 := by unfold Basis.toMatrix ext i j simp [Basis.equivFun, Matrix.one_apply, Finsupp.single_apply, eq_comm] #align basis.to_matrix_self Basis.toMatrix_self	Mathlib/LinearAlgebra/Matrix/Basis.lean	86	92	theorem toMatrix_update [DecidableEq ι'] (x : M) : e.toMatrix (Function.update v j x) = Matrix.updateColumn (e.toMatrix v) j (e.repr x) := by	ext i' k rw [Basis.toMatrix, Matrix.updateColumn_apply, e.toMatrix_apply] split_ifs with h · rw [h, update_same j x v] · rw [update_noteq h]
import Mathlib.LinearAlgebra.Span import Mathlib.LinearAlgebra.BilinearMap #align_import algebra.module.submodule.bilinear from "leanprover-community/mathlib"@"6010cf523816335f7bae7f8584cb2edaace73940" universe uι u v open Set open Pointwise namespace Submodule variable {ι : Sort uι} {R M N P : Type} variable [CommSemiring R] [AddCommMonoid M] [AddCommMonoid N] [AddCommMonoid P] variable [Module R M] [Module R N] [Module R P] def map₂ (f : M →ₗ[R] N →ₗ[R] P) (p : Submodule R M) (q : Submodule R N) : Submodule R P := ⨆ s : p, q.map (f s) #align submodule.map₂ Submodule.map₂ theorem apply_mem_map₂ (f : M →ₗ[R] N →ₗ[R] P) {m : M} {n : N} {p : Submodule R M} {q : Submodule R N} (hm : m ∈ p) (hn : n ∈ q) : f m n ∈ map₂ f p q := (le_iSup _ ⟨m, hm⟩ : _ ≤ map₂ f p q) ⟨n, hn, by rfl⟩ #align submodule.apply_mem_map₂ Submodule.apply_mem_map₂ theorem map₂_le {f : M →ₗ[R] N →ₗ[R] P} {p : Submodule R M} {q : Submodule R N} {r : Submodule R P} : map₂ f p q ≤ r ↔ ∀ m ∈ p, ∀ n ∈ q, f m n ∈ r := ⟨fun H _m hm _n hn => H <\| apply_mem_map₂ _ hm hn, fun H => iSup_le fun ⟨m, hm⟩ => map_le_iff_le_comap.2 fun n hn => H m hm n hn⟩ #align submodule.map₂_le Submodule.map₂_le variable (R) theorem map₂_span_span (f : M →ₗ[R] N →ₗ[R] P) (s : Set M) (t : Set N) : map₂ f (span R s) (span R t) = span R (Set.image2 (fun m n => f m n) s t) := by apply le_antisymm · rw [map₂_le] apply @span_induction' R M _ _ _ s intro a ha apply @span_induction' R N _ _ _ t intro b hb exact subset_span ⟨_, ‹_›, _, ‹_›, rfl⟩ all_goals intros; simp only [, add_mem, smul_mem, zero_mem, _root_.map_zero, map_add, LinearMap.zero_apply, LinearMap.add_apply, LinearMap.smul_apply, map_smul] · rw [span_le, image2_subset_iff] intro a ha b hb exact apply_mem_map₂ _ (subset_span ha) (subset_span hb) #align submodule.map₂_span_span Submodule.map₂_span_span variable {R} @[simp] theorem map₂_bot_right (f : M →ₗ[R] N →ₗ[R] P) (p : Submodule R M) : map₂ f p ⊥ = ⊥ := eq_bot_iff.2 <\| map₂_le.2 fun m _hm n hn => by rw [Submodule.mem_bot] at hn rw [hn, LinearMap.map_zero]; simp only [mem_bot] #align submodule.map₂_bot_right Submodule.map₂_bot_right @[simp] theorem map₂_bot_left (f : M →ₗ[R] N →ₗ[R] P) (q : Submodule R N) : map₂ f ⊥ q = ⊥ := eq_bot_iff.2 <\| map₂_le.2 fun m hm n hn => by rw [Submodule.mem_bot] at hm ⊢ rw [hm, LinearMap.map_zero₂] #align submodule.map₂_bot_left Submodule.map₂_bot_left @[mono] theorem map₂_le_map₂ {f : M →ₗ[R] N →ₗ[R] P} {p₁ p₂ : Submodule R M} {q₁ q₂ : Submodule R N} (hp : p₁ ≤ p₂) (hq : q₁ ≤ q₂) : map₂ f p₁ q₁ ≤ map₂ f p₂ q₂ := map₂_le.2 fun _m hm _n hn => apply_mem_map₂ _ (hp hm) (hq hn) #align submodule.map₂_le_map₂ Submodule.map₂_le_map₂ theorem map₂_le_map₂_left {f : M →ₗ[R] N →ₗ[R] P} {p₁ p₂ : Submodule R M} {q : Submodule R N} (h : p₁ ≤ p₂) : map₂ f p₁ q ≤ map₂ f p₂ q := map₂_le_map₂ h (le_refl q) #align submodule.map₂_le_map₂_left Submodule.map₂_le_map₂_left theorem map₂_le_map₂_right {f : M →ₗ[R] N →ₗ[R] P} {p : Submodule R M} {q₁ q₂ : Submodule R N} (h : q₁ ≤ q₂) : map₂ f p q₁ ≤ map₂ f p q₂ := map₂_le_map₂ (le_refl p) h #align submodule.map₂_le_map₂_right Submodule.map₂_le_map₂_right theorem map₂_sup_right (f : M →ₗ[R] N →ₗ[R] P) (p : Submodule R M) (q₁ q₂ : Submodule R N) : map₂ f p (q₁ ⊔ q₂) = map₂ f p q₁ ⊔ map₂ f p q₂ := le_antisymm (map₂_le.2 fun _m hm _np hnp => let ⟨_n, hn, _p, hp, hnp⟩ := mem_sup.1 hnp mem_sup.2 ⟨_, apply_mem_map₂ _ hm hn, _, apply_mem_map₂ _ hm hp, hnp ▸ (map_add _ _ _).symm⟩) (sup_le (map₂_le_map₂_right le_sup_left) (map₂_le_map₂_right le_sup_right)) #align submodule.map₂_sup_right Submodule.map₂_sup_right theorem map₂_sup_left (f : M →ₗ[R] N →ₗ[R] P) (p₁ p₂ : Submodule R M) (q : Submodule R N) : map₂ f (p₁ ⊔ p₂) q = map₂ f p₁ q ⊔ map₂ f p₂ q := le_antisymm (map₂_le.2 fun _mn hmn _p hp => let ⟨_m, hm, _n, hn, hmn⟩ := mem_sup.1 hmn mem_sup.2 ⟨_, apply_mem_map₂ _ hm hp, _, apply_mem_map₂ _ hn hp, hmn ▸ (LinearMap.map_add₂ _ _ _ _).symm⟩) (sup_le (map₂_le_map₂_left le_sup_left) (map₂_le_map₂_left le_sup_right)) #align submodule.map₂_sup_left Submodule.map₂_sup_left theorem image2_subset_map₂ (f : M →ₗ[R] N →ₗ[R] P) (p : Submodule R M) (q : Submodule R N) : Set.image2 (fun m n => f m n) (↑p : Set M) (↑q : Set N) ⊆ (↑(map₂ f p q) : Set P) := by rintro _ ⟨i, hi, j, hj, rfl⟩ exact apply_mem_map₂ _ hi hj #align submodule.image2_subset_map₂ Submodule.image2_subset_map₂ theorem map₂_eq_span_image2 (f : M →ₗ[R] N →ₗ[R] P) (p : Submodule R M) (q : Submodule R N) : map₂ f p q = span R (Set.image2 (fun m n => f m n) (p : Set M) (q : Set N)) := by rw [← map₂_span_span, span_eq, span_eq] #align submodule.map₂_eq_span_image2 Submodule.map₂_eq_span_image2 theorem map₂_flip (f : M →ₗ[R] N →ₗ[R] P) (p : Submodule R M) (q : Submodule R N) : map₂ f.flip q p = map₂ f p q := by rw [map₂_eq_span_image2, map₂_eq_span_image2, Set.image2_swap] rfl #align submodule.map₂_flip Submodule.map₂_flip theorem map₂_iSup_left (f : M →ₗ[R] N →ₗ[R] P) (s : ι → Submodule R M) (t : Submodule R N) : map₂ f (⨆ i, s i) t = ⨆ i, map₂ f (s i) t := by suffices map₂ f (⨆ i, span R (s i : Set M)) (span R t) = ⨆ i, map₂ f (span R (s i)) (span R t) by simpa only [span_eq] using this simp_rw [map₂_span_span, ← span_iUnion, map₂_span_span, Set.image2_iUnion_left] #align submodule.map₂_supr_left Submodule.map₂_iSup_left	Mathlib/Algebra/Module/Submodule/Bilinear.lean	153	157	theorem map₂_iSup_right (f : M →ₗ[R] N →ₗ[R] P) (s : Submodule R M) (t : ι → Submodule R N) : map₂ f s (⨆ i, t i) = ⨆ i, map₂ f s (t i) := by	suffices map₂ f (span R s) (⨆ i, span R (t i : Set N)) = ⨆ i, map₂ f (span R s) (span R (t i)) by simpa only [span_eq] using this simp_rw [map₂_span_span, ← span_iUnion, map₂_span_span, Set.image2_iUnion_right]
import Mathlib.Topology.MetricSpace.Basic #align_import topology.metric_space.infsep from "leanprover-community/mathlib"@"5316314b553dcf8c6716541851517c1a9715e22b" variable {α β : Type*} namespace Set section Einfsep open ENNReal open Function noncomputable def einfsep [EDist α] (s : Set α) : ℝ≥0∞ := ⨅ (x ∈ s) (y ∈ s) (_ : x ≠ y), edist x y #align set.einfsep Set.einfsep section Infsep open ENNReal open Set Function noncomputable def infsep [EDist α] (s : Set α) : ℝ := ENNReal.toReal s.einfsep #align set.infsep Set.infsep section EDist variable [EDist α] {x y : α} {s : Set α}	Mathlib/Topology/MetricSpace/Infsep.lean	332	333	theorem infsep_zero : s.infsep = 0 ↔ s.einfsep = 0 ∨ s.einfsep = ∞ := by	rw [infsep, ENNReal.toReal_eq_zero_iff]
import Mathlib.Data.List.Cycle import Mathlib.GroupTheory.Perm.Cycle.Type import Mathlib.GroupTheory.Perm.List #align_import group_theory.perm.cycle.concrete from "leanprover-community/mathlib"@"00638177efd1b2534fc5269363ebf42a7871df9a" open Equiv Equiv.Perm List variable {α : Type*} namespace Equiv.Perm section Fintype variable [Fintype α] [DecidableEq α] (p : Equiv.Perm α) (x : α) def toList : List α := (List.range (cycleOf p x).support.card).map fun k => (p ^ k) x #align equiv.perm.to_list Equiv.Perm.toList @[simp] theorem toList_one : toList (1 : Perm α) x = [] := by simp [toList, cycleOf_one] #align equiv.perm.to_list_one Equiv.Perm.toList_one @[simp] theorem toList_eq_nil_iff {p : Perm α} {x} : toList p x = [] ↔ x ∉ p.support := by simp [toList] #align equiv.perm.to_list_eq_nil_iff Equiv.Perm.toList_eq_nil_iff @[simp] theorem length_toList : length (toList p x) = (cycleOf p x).support.card := by simp [toList] #align equiv.perm.length_to_list Equiv.Perm.length_toList theorem toList_ne_singleton (y : α) : toList p x ≠ [y] := by intro H simpa [card_support_ne_one] using congr_arg length H #align equiv.perm.to_list_ne_singleton Equiv.Perm.toList_ne_singleton theorem two_le_length_toList_iff_mem_support {p : Perm α} {x : α} : 2 ≤ length (toList p x) ↔ x ∈ p.support := by simp #align equiv.perm.two_le_length_to_list_iff_mem_support Equiv.Perm.two_le_length_toList_iff_mem_support theorem length_toList_pos_of_mem_support (h : x ∈ p.support) : 0 < length (toList p x) := zero_lt_two.trans_le (two_le_length_toList_iff_mem_support.mpr h) #align equiv.perm.length_to_list_pos_of_mem_support Equiv.Perm.length_toList_pos_of_mem_support theorem get_toList (n : ℕ) (hn : n < length (toList p x)) : (toList p x).get ⟨n, hn⟩ = (p ^ n) x := by simp [toList]	Mathlib/GroupTheory/Perm/Cycle/Concrete.lean	248	249	theorem toList_get_zero (h : x ∈ p.support) : (toList p x).get ⟨0, (length_toList_pos_of_mem_support _ _ h)⟩ = x := by	simp [toList]

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